0	1	.	.
0	0	 	 
0	1	<~>	<~>
0	1	<split-s>	<split-s>
0	1	<split-h>	<split-h>
0	1	<name2>	<name2>
0	8	<>	<name>
0	4	<aphaerese>	<aphaerese>
0	7	<>	<aphaerese>
0	1	<elision3>	<elision3>
0	7	<>	<elision3>
0	1	<elision2>	<elision2>
0	7	<>	<elision2>
0	1	<elision1>	<elision1>
0	7	<>	<elision1>
0	12480	.	υ
0	12519	s	υ
0	11395	H	υ
0	12480	.	u
0	12519	s	u
0	11409	H	u
0	10	.	κ
0	12520	s	κ
0	11413	H	κ
0	12521	s	k
0	11416	H	k
0	12522	s	U
0	11359	H	U
0	12524	s	K
0	11362	H	K
0	12480	.	α
0	12519	s	α
0	11419	H	α
0	12480	.	a
0	12519	s	a
0	11424	H	a
0	12526	s	A
0	11189	H	A
0	12521	s	λ
0	11428	H	λ
0	12521	s	l
0	12527	H	l
0	12528	s	L
0	11760	H	L
0	11442	<K>	<>
1	1	.	.
1	0	 	 
1	1	<~>	<~>
1	1	<split-s>	<split-s>
1	1	<split-h>	<split-h>
1	1	<name2>	<name2>
1	2	<>	<name>
1	4	<aphaerese>	<aphaerese>
1	1	<>	<aphaerese>
1	1	<elision3>	<elision3>
1	1	<>	<elision3>
1	1	<elision2>	<elision2>
1	1	<>	<elision2>
1	1	<elision1>	<elision1>
1	1	<>	<elision1>
1	12480	.	υ
1	12483	s	υ
1	11436	H	υ
1	12480	.	u
1	12483	s	u
1	11438	H	u
1	10	.	κ
1	12322	s	κ
1	11018	H	κ
1	12453	s	k
1	11346	H	k
1	12456	s	U
1	11359	H	U
1	12459	s	K
1	11362	H	K
1	12480	.	α
1	12483	s	α
1	11422	H	α
1	12480	.	a
1	12483	s	a
1	11427	H	a
1	12471	s	A
1	11189	H	A
1	12453	s	λ
1	11373	H	λ
1	12453	s	l
1	11755	H	l
1	12474	s	L
1	11760	H	L
1	11442	<K>	<>
2	3	.	.
2	6	 	 
2	3	<~>	<~>
2	3	<split-s>	<split-s>
2	3	<split-h>	<split-h>
2	3	<name2>	<name2>
2	9	<aphaerese>	<aphaerese>
2	3	<>	<aphaerese>
2	3	<elision3>	<elision3>
2	3	<>	<elision3>
2	3	<elision2>	<elision2>
2	3	<>	<elision2>
2	3	<elision1>	<elision1>
2	3	<>	<elision1>
2	12482	.	υ
2	12485	s	υ
2	11431	H	υ
2	12482	.	u
2	12485	s	u
2	11435	H	u
2	12	.	κ
2	12430	s	κ
2	11383	H	κ
2	12455	s	k
2	11387	H	k
2	12458	s	U
2	11361	H	U
2	12462	s	K
2	11391	H	K
2	12482	.	α
2	12485	s	α
2	11421	H	α
2	12482	.	a
2	12485	s	a
2	11426	H	a
2	12473	s	A
2	11192	H	A
2	12455	s	λ
2	11375	H	λ
2	12455	s	l
2	11754	H	l
2	12476	s	L
2	11757	H	L
2	11443	<K>	<>
3	1	.	.
3	0	 	 
3	1	<~>	<~>
3	1	<split-s>	<split-s>
3	1	<split-h>	<split-h>
3	1	<name2>	<name2>
3	4	<aphaerese>	<aphaerese>
3	1	<>	<aphaerese>
3	1	<elision3>	<elision3>
3	1	<>	<elision3>
3	1	<elision2>	<elision2>
3	1	<>	<elision2>
3	1	<elision1>	<elision1>
3	1	<>	<elision1>
3	12480	.	υ
3	12483	s	υ
3	11436	H	υ
3	12480	.	u
3	12483	s	u
3	11438	H	u
3	10	.	κ
3	12322	s	κ
3	11018	H	κ
3	12453	s	k
3	11346	H	k
3	12456	s	U
3	11359	H	U
3	12459	s	K
3	11362	H	K
3	12480	.	α
3	12483	s	α
3	11422	H	α
3	12480	.	a
3	12483	s	a
3	11427	H	a
3	12471	s	A
3	11189	H	A
3	12453	s	λ
3	11373	H	λ
3	12453	s	l
3	11755	H	l
3	12474	s	L
3	11760	H	L
3	11444	<K>	<>
4	1	.	.
4	0	 	 
4	1	<~>	<~>
4	1	<split-s>	<split-s>
4	1	<split-h>	<split-h>
4	1	<name2>	<name2>
4	5	<>	<name>
4	4	<aphaerese>	<aphaerese>
4	4	<>	<aphaerese>
4	1	<elision3>	<elision3>
4	4	<>	<elision3>
4	1	<elision2>	<elision2>
4	4	<>	<elision2>
4	1	<elision1>	<elision1>
4	4	<>	<elision1>
4	1	.	υ
4	1	.	u
4	10	.	κ
4	12322	s	κ
4	11018	H	κ
4	12453	s	k
4	11346	H	k
4	12456	s	U
4	11359	H	U
4	12459	s	K
4	11362	H	K
4	1	.	α
4	1	.	a
4	12471	s	A
4	11189	H	A
4	12453	s	λ
4	11373	H	λ
4	12453	s	l
4	11755	H	l
4	12474	s	L
4	11760	H	L
4	11445	<K>	<>
5	3	.	.
5	6	 	 
5	3	<~>	<~>
5	3	<split-s>	<split-s>
5	3	<split-h>	<split-h>
5	3	<name2>	<name2>
5	9	<aphaerese>	<aphaerese>
5	9	<>	<aphaerese>
5	3	<elision3>	<elision3>
5	9	<>	<elision3>
5	3	<elision2>	<elision2>
5	9	<>	<elision2>
5	3	<elision1>	<elision1>
5	9	<>	<elision1>
5	3	.	υ
5	3	.	u
5	12	.	κ
5	12430	s	κ
5	11383	H	κ
5	12455	s	k
5	11387	H	k
5	12458	s	U
5	11361	H	U
5	12462	s	K
5	11391	H	K
5	3	.	α
5	3	.	a
5	12473	s	A
5	11192	H	A
5	12455	s	λ
5	11375	H	λ
5	12455	s	l
5	11754	H	l
5	12476	s	L
5	11757	H	L
5	11446	<K>	<>
6	1	.	.
6	0	 	 
6	1	<~>	<~>
6	1	<split-s>	<split-s>
6	1	<split-h>	<split-h>
6	1	<name2>	<name2>
6	4	<aphaerese>	<aphaerese>
6	7	<>	<aphaerese>
6	1	<elision3>	<elision3>
6	7	<>	<elision3>
6	1	<elision2>	<elision2>
6	7	<>	<elision2>
6	1	<elision1>	<elision1>
6	7	<>	<elision1>
6	12480	.	υ
6	12519	s	υ
6	11395	H	υ
6	12480	.	u
6	12519	s	u
6	11409	H	u
6	10	.	κ
6	12520	s	κ
6	11413	H	κ
6	12521	s	k
6	11416	H	k
6	12522	s	U
6	11359	H	U
6	12524	s	K
6	11362	H	K
6	12480	.	α
6	12519	s	α
6	11419	H	α
6	12480	.	a
6	12519	s	a
6	11424	H	a
6	12526	s	A
6	11189	H	A
6	12521	s	λ
6	11428	H	λ
6	12521	s	l
6	12527	H	l
6	12528	s	L
6	11760	H	L
6	11444	<K>	<>
7	1	.	.
7	0	 	 
7	1	<~>	<~>
7	1	<split-s>	<split-s>
7	1	<split-h>	<split-h>
7	1	<name2>	<name2>
7	8	<>	<name>
7	4	<aphaerese>	<aphaerese>
7	7	<>	<aphaerese>
7	1	<elision3>	<elision3>
7	7	<>	<elision3>
7	1	<elision2>	<elision2>
7	7	<>	<elision2>
7	1	<elision1>	<elision1>
7	7	<>	<elision1>
7	12480	.	υ
7	12483	s	υ
7	11436	H	υ
7	12480	.	u
7	12483	s	u
7	11438	H	u
7	10	.	κ
7	12322	s	κ
7	11018	H	κ
7	12453	s	k
7	11346	H	k
7	12456	s	U
7	11359	H	U
7	12486	s	K
7	11362	H	K
7	12480	.	α
7	12483	s	α
7	11422	H	α
7	12480	.	a
7	12483	s	a
7	11427	H	a
7	12471	s	A
7	11189	H	A
7	12453	s	λ
7	11373	H	λ
7	12453	s	l
7	11755	H	l
7	12511	s	L
7	11760	H	L
7	11442	<K>	<>
8	3	.	.
8	6	 	 
8	3	<~>	<~>
8	3	<split-s>	<split-s>
8	3	<split-h>	<split-h>
8	3	<name2>	<name2>
8	9	<aphaerese>	<aphaerese>
8	12479	<>	<aphaerese>
8	3	<elision3>	<elision3>
8	12479	<>	<elision3>
8	3	<elision2>	<elision2>
8	12479	<>	<elision2>
8	3	<elision1>	<elision1>
8	12479	<>	<elision1>
8	12482	.	υ
8	12485	s	υ
8	11431	H	υ
8	12482	.	u
8	12485	s	u
8	11435	H	u
8	12	.	κ
8	12430	s	κ
8	11383	H	κ
8	12455	s	k
8	11387	H	k
8	12458	s	U
8	11361	H	U
8	12488	s	K
8	11391	H	K
8	12482	.	α
8	12485	s	α
8	11421	H	α
8	12482	.	a
8	12485	s	a
8	11426	H	a
8	12473	s	A
8	11192	H	A
8	12455	s	λ
8	11375	H	λ
8	12455	s	l
8	11754	H	l
8	12513	s	L
8	11757	H	L
8	11443	<K>	<>
9	1	.	.
9	0	 	 
9	1	<~>	<~>
9	1	<split-s>	<split-s>
9	1	<split-h>	<split-h>
9	1	<name2>	<name2>
9	4	<aphaerese>	<aphaerese>
9	4	<>	<aphaerese>
9	1	<elision3>	<elision3>
9	4	<>	<elision3>
9	1	<elision2>	<elision2>
9	4	<>	<elision2>
9	1	<elision1>	<elision1>
9	4	<>	<elision1>
9	1	.	υ
9	1	.	u
9	10	.	κ
9	12322	s	κ
9	11018	H	κ
9	12453	s	k
9	11346	H	k
9	12456	s	U
9	11359	H	U
9	12459	s	K
9	11362	H	K
9	1	.	α
9	1	.	a
9	12471	s	A
9	11189	H	A
9	12453	s	λ
9	11373	H	λ
9	12453	s	l
9	11755	H	l
9	12474	s	L
9	11760	H	L
9	11447	<K>	<>
10	11	<>	<name>
10	10	<>	<aphaerese>
10	13	<elision3>	<elision3>
10	10	<>	<elision3>
10	13	<elision2>	<elision2>
10	10	<>	<elision2>
10	13	<elision1>	<elision1>
10	10	<>	<elision1>
10	11448	<K>	<>
11	12	<>	<aphaerese>
11	15	<elision3>	<elision3>
11	12	<>	<elision3>
11	15	<elision2>	<elision2>
11	12	<>	<elision2>
11	15	<elision1>	<elision1>
11	12	<>	<elision1>
11	11449	<K>	<>
12	10	<>	<aphaerese>
12	13	<elision3>	<elision3>
12	10	<>	<elision3>
12	13	<elision2>	<elision2>
12	10	<>	<elision2>
12	13	<elision1>	<elision1>
12	10	<>	<elision1>
12	11450	<K>	<>
13	14	<>	<name>
13	13	<>	<aphaerese>
13	13	<>	<elision3>
13	13	<>	<elision2>
13	13	<>	<elision1>
13	16	s	κ
13	48	H	κ
13	16	s	k
13	10998	H	k
13	12316	s	K
13	11002	H	K
13	16	s	λ
13	11006	H	λ
13	16	s	l
13	11613	H	l
13	12319	s	L
13	11742	H	L
13	11451	<K>	<>
14	15	<>	<aphaerese>
14	15	<>	<elision3>
14	15	<>	<elision2>
14	15	<>	<elision1>
14	18	s	κ
14	11012	H	κ
14	18	s	k
14	11016	H	k
14	12318	s	K
14	11017	H	K
14	18	s	λ
14	11008	H	λ
14	18	s	l
14	11612	H	l
14	12321	s	L
14	11741	H	L
14	11452	<K>	<>
15	13	<>	<aphaerese>
15	13	<>	<elision3>
15	13	<>	<elision2>
15	13	<>	<elision1>
15	16	s	κ
15	48	H	κ
15	16	s	k
15	10998	H	k
15	12316	s	K
15	11002	H	K
15	16	s	λ
15	11006	H	λ
15	16	s	l
15	11613	H	l
15	12319	s	L
15	11742	H	L
15	11453	<K>	<>
16	17	<>	<name>
16	16	<>	<aphaerese>
16	16	<>	<elision3>
16	16	<>	<elision2>
16	16	<>	<elision1>
16	19	s	κ
16	12296	s	k
16	12299	s	K
16	19	s	λ
16	12296	s	l
16	12311	s	L
16	11785	<A1>	<>
17	18	<>	<aphaerese>
17	18	<>	<elision3>
17	18	<>	<elision2>
17	18	<>	<elision1>
17	12292	s	κ
17	12298	s	k
17	12302	s	K
17	12292	s	λ
17	12298	s	l
17	12313	s	L
17	11786	<A1>	<>
18	16	<>	<aphaerese>
18	16	<>	<elision3>
18	16	<>	<elision2>
18	16	<>	<elision1>
18	19	s	κ
18	12296	s	k
18	12299	s	K
18	19	s	λ
18	12296	s	l
18	12311	s	L
18	11784	<A1>	<>
19	20	.	.
19	21	 	 
19	20	<~>	<~>
19	20	<split-s>	<split-s>
19	20	<split-h>	<split-h>
19	20	<name2>	<name2>
19	12291	<>	<name>
19	24	<aphaerese>	<aphaerese>
19	19	<>	<aphaerese>
19	19	<>	<elision3>
19	19	<>	<elision2>
19	19	<>	<elision1>
19	28	.	υ
19	11584	s	υ
19	28	.	u
19	11584	s	u
19	28	.	κ
19	12293	s	κ
19	12219	s	k
19	12222	s	U
19	12277	s	K
19	28	.	α
19	11584	s	α
19	28	.	a
19	11584	s	a
19	12255	s	A
19	28	.	λ
19	12293	s	λ
19	12219	s	l
19	12284	s	L
19	12161	<A2>	<>
20	20	.	.
20	21	 	 
20	20	<~>	<~>
20	20	<split-s>	<split-s>
20	20	<split-h>	<split-h>
20	20	<name2>	<name2>
20	12290	<>	<name>
20	24	<aphaerese>	<aphaerese>
20	20	<>	<aphaerese>
20	20	<elision3>	<elision3>
20	20	<>	<elision3>
20	20	<elision2>	<elision2>
20	20	<>	<elision2>
20	20	<elision1>	<elision1>
20	20	<>	<elision1>
20	28	.	υ
20	11584	s	υ
20	28	.	u
20	11584	s	u
20	12148	.	κ
20	12172	s	κ
20	12219	s	k
20	12222	s	U
20	12277	s	K
20	28	.	α
20	11584	s	α
20	28	.	a
20	11584	s	a
20	12255	s	A
20	12219	s	λ
20	12219	s	l
20	12284	s	L
20	11765	<A2>	<>
21	20	.	.
21	21	 	 
21	20	<~>	<~>
21	20	<split-s>	<split-s>
21	20	<split-h>	<split-h>
21	20	<name2>	<name2>
21	22	<>	<name>
21	24	<aphaerese>	<aphaerese>
21	27	<>	<aphaerese>
21	20	<elision3>	<elision3>
21	27	<>	<elision3>
21	20	<elision2>	<elision2>
21	27	<>	<elision2>
21	20	<elision1>	<elision1>
21	27	<>	<elision1>
21	28	.	υ
21	12266	s	υ
21	28	.	u
21	12266	s	u
21	12148	.	κ
21	12267	s	κ
21	12268	s	k
21	12269	s	U
21	12271	s	K
21	28	.	α
21	12266	s	α
21	28	.	a
21	12266	s	a
21	12273	s	A
21	12268	s	λ
21	12268	s	l
21	12274	s	L
21	11765	<A2>	<>
22	23	.	.
22	26	 	 
22	23	<~>	<~>
22	23	<split-s>	<split-s>
22	23	<split-h>	<split-h>
22	23	<name2>	<name2>
22	12276	<aphaerese>	<aphaerese>
22	12289	<>	<aphaerese>
22	23	<elision3>	<elision3>
22	12289	<>	<elision3>
22	23	<elision2>	<elision2>
22	12289	<>	<elision2>
22	23	<elision1>	<elision1>
22	12289	<>	<elision1>
22	30	.	υ
22	12147	s	υ
22	30	.	u
22	12147	s	u
22	12150	.	κ
22	12174	s	κ
22	12221	s	k
22	12224	s	U
22	12228	s	K
22	30	.	α
22	12147	s	α
22	30	.	a
22	12147	s	a
22	12257	s	A
22	12221	s	λ
22	12221	s	l
22	12260	s	L
22	11766	<A2>	<>
23	20	.	.
23	21	 	 
23	20	<~>	<~>
23	20	<split-s>	<split-s>
23	20	<split-h>	<split-h>
23	20	<name2>	<name2>
23	24	<aphaerese>	<aphaerese>
23	20	<>	<aphaerese>
23	20	<elision3>	<elision3>
23	20	<>	<elision3>
23	20	<elision2>	<elision2>
23	20	<>	<elision2>
23	20	<elision1>	<elision1>
23	20	<>	<elision1>
23	28	.	υ
23	11584	s	υ
23	28	.	u
23	11584	s	u
23	12148	.	κ
23	12172	s	κ
23	12219	s	k
23	12222	s	U
23	12277	s	K
23	28	.	α
23	11584	s	α
23	28	.	a
23	11584	s	a
23	12255	s	A
23	12219	s	λ
23	12219	s	l
23	12284	s	L
23	11764	<A2>	<>
24	20	.	.
24	21	 	 
24	20	<~>	<~>
24	20	<split-s>	<split-s>
24	20	<split-h>	<split-h>
24	20	<name2>	<name2>
24	25	<>	<name>
24	24	<aphaerese>	<aphaerese>
24	24	<>	<aphaerese>
24	20	<elision3>	<elision3>
24	24	<>	<elision3>
24	20	<elision2>	<elision2>
24	24	<>	<elision2>
24	20	<elision1>	<elision1>
24	24	<>	<elision1>
24	20	.	υ
24	20	.	u
24	12148	.	κ
24	12172	s	κ
24	12219	s	k
24	12222	s	U
24	12277	s	K
24	20	.	α
24	20	.	a
24	12255	s	A
24	12219	s	λ
24	12219	s	l
24	12284	s	L
24	11752	<A2>	<>
25	23	.	.
25	26	 	 
25	23	<~>	<~>
25	23	<split-s>	<split-s>
25	23	<split-h>	<split-h>
25	23	<name2>	<name2>
25	12276	<aphaerese>	<aphaerese>
25	12276	<>	<aphaerese>
25	23	<elision3>	<elision3>
25	12276	<>	<elision3>
25	23	<elision2>	<elision2>
25	12276	<>	<elision2>
25	23	<elision1>	<elision1>
25	12276	<>	<elision1>
25	23	.	υ
25	23	.	u
25	12150	.	κ
25	12174	s	κ
25	12221	s	k
25	12224	s	U
25	12279	s	K
25	23	.	α
25	23	.	a
25	12257	s	A
25	12221	s	λ
25	12221	s	l
25	12286	s	L
25	11753	<A2>	<>
26	20	.	.
26	21	 	 
26	20	<~>	<~>
26	20	<split-s>	<split-s>
26	20	<split-h>	<split-h>
26	20	<name2>	<name2>
26	24	<aphaerese>	<aphaerese>
26	27	<>	<aphaerese>
26	20	<elision3>	<elision3>
26	27	<>	<elision3>
26	20	<elision2>	<elision2>
26	27	<>	<elision2>
26	20	<elision1>	<elision1>
26	27	<>	<elision1>
26	28	.	υ
26	12266	s	υ
26	28	.	u
26	12266	s	u
26	12148	.	κ
26	12267	s	κ
26	12268	s	k
26	12269	s	U
26	12271	s	K
26	28	.	α
26	12266	s	α
26	28	.	a
26	12266	s	a
26	12273	s	A
26	12268	s	λ
26	12268	s	l
26	12274	s	L
26	11764	<A2>	<>
27	20	.	.
27	21	 	 
27	20	<~>	<~>
27	20	<split-s>	<split-s>
27	20	<split-h>	<split-h>
27	20	<name2>	<name2>
27	22	<>	<name>
27	24	<aphaerese>	<aphaerese>
27	27	<>	<aphaerese>
27	20	<elision3>	<elision3>
27	27	<>	<elision3>
27	20	<elision2>	<elision2>
27	27	<>	<elision2>
27	20	<elision1>	<elision1>
27	27	<>	<elision1>
27	28	.	υ
27	11584	s	υ
27	28	.	u
27	11584	s	u
27	12148	.	κ
27	12172	s	κ
27	12219	s	k
27	12222	s	U
27	12225	s	K
27	28	.	α
27	11584	s	α
27	28	.	a
27	11584	s	a
27	12255	s	A
27	12219	s	λ
27	12219	s	l
27	12258	s	L
27	11765	<A2>	<>
28	29	<>	<name>
28	28	<>	<aphaerese>
28	20	<elision3>	<elision3>
28	28	<>	<elision3>
28	20	<elision2>	<elision2>
28	28	<>	<elision2>
28	20	<elision1>	<elision1>
28	28	<>	<elision1>
28	32	<A2>	<>
29	30	<>	<aphaerese>
29	23	<elision3>	<elision3>
29	30	<>	<elision3>
29	23	<elision2>	<elision2>
29	30	<>	<elision2>
29	23	<elision1>	<elision1>
29	30	<>	<elision1>
29	33	<A2>	<>
30	28	<>	<aphaerese>
30	20	<elision3>	<elision3>
30	28	<>	<elision3>
30	20	<elision2>	<elision2>
30	28	<>	<elision2>
30	20	<elision1>	<elision1>
30	28	<>	<elision1>
30	31	<A2>	<>
31	32	<>	<aphaerese>
31	35	<elision3>	<elision3>
31	32	<>	<elision3>
31	35	<elision2>	<elision2>
31	32	<>	<elision2>
31	35	<elision1>	<elision1>
31	32	<>	<elision1>
31	11440	<K>	<>
32	33	<>	<name>
32	32	<>	<aphaerese>
32	35	<elision3>	<elision3>
32	32	<>	<elision3>
32	35	<elision2>	<elision2>
32	32	<>	<elision2>
32	35	<elision1>	<elision1>
32	32	<>	<elision1>
32	11441	<K>	<>
33	31	<>	<aphaerese>
33	34	<elision3>	<elision3>
33	31	<>	<elision3>
33	34	<elision2>	<elision2>
33	31	<>	<elision2>
33	34	<elision1>	<elision1>
33	31	<>	<elision1>
33	11439	<K>	<>
34	35	.	.
34	36	 	 
34	35	<~>	<~>
34	35	<split-s>	<split-s>
34	35	<split-h>	<split-h>
34	35	<name2>	<name2>
34	39	<aphaerese>	<aphaerese>
34	35	<>	<aphaerese>
34	35	<elision3>	<elision3>
34	35	<>	<elision3>
34	35	<elision2>	<elision2>
34	35	<>	<elision2>
34	35	<elision1>	<elision1>
34	35	<>	<elision1>
34	11392	.	υ
34	11436	H	υ
34	11392	.	u
34	11438	H	u
34	42	.	κ
34	11018	H	κ
34	11346	H	k
34	11359	H	U
34	11362	H	K
34	11392	.	α
34	11422	H	α
34	11392	.	a
34	11427	H	a
34	11189	H	A
34	11373	H	λ
34	11379	H	l
34	11382	H	L
35	35	.	.
35	36	 	 
35	35	<~>	<~>
35	35	<split-s>	<split-s>
35	35	<split-h>	<split-h>
35	35	<name2>	<name2>
35	37	<>	<name>
35	39	<aphaerese>	<aphaerese>
35	35	<>	<aphaerese>
35	35	<elision3>	<elision3>
35	35	<>	<elision3>
35	35	<elision2>	<elision2>
35	35	<>	<elision2>
35	35	<elision1>	<elision1>
35	35	<>	<elision1>
35	11392	.	υ
35	11436	H	υ
35	11392	.	u
35	11438	H	u
35	42	.	κ
35	11018	H	κ
35	11346	H	k
35	11359	H	U
35	11362	H	K
35	11392	.	α
35	11422	H	α
35	11392	.	a
35	11427	H	a
35	11189	H	A
35	11373	H	λ
35	11379	H	l
35	11382	H	L
36	35	.	.
36	36	 	 
36	35	<~>	<~>
36	35	<split-s>	<split-s>
36	35	<split-h>	<split-h>
36	35	<name2>	<name2>
36	37	<>	<name>
36	39	<aphaerese>	<aphaerese>
36	35	<>	<aphaerese>
36	35	<elision3>	<elision3>
36	35	<>	<elision3>
36	35	<elision2>	<elision2>
36	35	<>	<elision2>
36	35	<elision1>	<elision1>
36	35	<>	<elision1>
36	11392	.	υ
36	11395	H	υ
36	11392	.	u
36	11409	H	u
36	42	.	κ
36	11413	H	κ
36	11416	H	k
36	11359	H	U
36	11362	H	K
36	11392	.	α
36	11419	H	α
36	11392	.	a
36	11424	H	a
36	11189	H	A
36	11428	H	λ
36	11430	H	l
36	11382	H	L
37	34	.	.
37	38	 	 
37	34	<~>	<~>
37	34	<split-s>	<split-s>
37	34	<split-h>	<split-h>
37	34	<name2>	<name2>
37	41	<aphaerese>	<aphaerese>
37	34	<>	<aphaerese>
37	34	<elision3>	<elision3>
37	34	<>	<elision3>
37	34	<elision2>	<elision2>
37	34	<>	<elision2>
37	34	<elision1>	<elision1>
37	34	<>	<elision1>
37	11394	.	υ
37	11431	H	υ
37	11394	.	u
37	11435	H	u
37	44	.	κ
37	11383	H	κ
37	11387	H	k
37	11361	H	U
37	11391	H	K
37	11394	.	α
37	11421	H	α
37	11394	.	a
37	11426	H	a
37	11192	H	A
37	11375	H	λ
37	11381	H	l
37	11376	H	L
38	35	.	.
38	36	 	 
38	35	<~>	<~>
38	35	<split-s>	<split-s>
38	35	<split-h>	<split-h>
38	35	<name2>	<name2>
38	39	<aphaerese>	<aphaerese>
38	35	<>	<aphaerese>
38	35	<elision3>	<elision3>
38	35	<>	<elision3>
38	35	<elision2>	<elision2>
38	35	<>	<elision2>
38	35	<elision1>	<elision1>
38	35	<>	<elision1>
38	11392	.	υ
38	11395	H	υ
38	11392	.	u
38	11409	H	u
38	42	.	κ
38	11413	H	κ
38	11416	H	k
38	11359	H	U
38	11362	H	K
38	11392	.	α
38	11419	H	α
38	11392	.	a
38	11424	H	a
38	11189	H	A
38	11428	H	λ
38	11430	H	l
38	11382	H	L
39	35	.	.
39	36	 	 
39	35	<~>	<~>
39	35	<split-s>	<split-s>
39	35	<split-h>	<split-h>
39	35	<name2>	<name2>
39	40	<>	<name>
39	39	<aphaerese>	<aphaerese>
39	39	<>	<aphaerese>
39	35	<elision3>	<elision3>
39	39	<>	<elision3>
39	35	<elision2>	<elision2>
39	39	<>	<elision2>
39	35	<elision1>	<elision1>
39	39	<>	<elision1>
39	35	.	υ
39	35	.	u
39	42	.	κ
39	11018	H	κ
39	11346	H	k
39	11359	H	U
39	11362	H	K
39	35	.	α
39	35	.	a
39	11189	H	A
39	11373	H	λ
39	11379	H	l
39	11382	H	L
40	34	.	.
40	38	 	 
40	34	<~>	<~>
40	34	<split-s>	<split-s>
40	34	<split-h>	<split-h>
40	34	<name2>	<name2>
40	41	<aphaerese>	<aphaerese>
40	41	<>	<aphaerese>
40	34	<elision3>	<elision3>
40	41	<>	<elision3>
40	34	<elision2>	<elision2>
40	41	<>	<elision2>
40	34	<elision1>	<elision1>
40	41	<>	<elision1>
40	34	.	υ
40	34	.	u
40	44	.	κ
40	11383	H	κ
40	11387	H	k
40	11361	H	U
40	11391	H	K
40	34	.	α
40	34	.	a
40	11192	H	A
40	11375	H	λ
40	11381	H	l
40	11376	H	L
41	35	.	.
41	36	 	 
41	35	<~>	<~>
41	35	<split-s>	<split-s>
41	35	<split-h>	<split-h>
41	35	<name2>	<name2>
41	39	<aphaerese>	<aphaerese>
41	39	<>	<aphaerese>
41	35	<elision3>	<elision3>
41	39	<>	<elision3>
41	35	<elision2>	<elision2>
41	39	<>	<elision2>
41	35	<elision1>	<elision1>
41	39	<>	<elision1>
41	35	.	υ
41	35	.	u
41	42	.	κ
41	11018	H	κ
41	11346	H	k
41	11359	H	U
41	11362	H	K
41	35	.	α
41	35	.	a
41	11189	H	A
41	11373	H	λ
41	11379	H	l
41	11382	H	L
42	43	<>	<name>
42	42	<>	<aphaerese>
42	45	<elision3>	<elision3>
42	42	<>	<elision3>
42	45	<elision2>	<elision2>
42	42	<>	<elision2>
42	45	<elision1>	<elision1>
42	42	<>	<elision1>
43	44	<>	<aphaerese>
43	47	<elision3>	<elision3>
43	44	<>	<elision3>
43	47	<elision2>	<elision2>
43	44	<>	<elision2>
43	47	<elision1>	<elision1>
43	44	<>	<elision1>
44	42	<>	<aphaerese>
44	45	<elision3>	<elision3>
44	42	<>	<elision3>
44	45	<elision2>	<elision2>
44	42	<>	<elision2>
44	45	<elision1>	<elision1>
44	42	<>	<elision1>
45	46	<>	<name>
45	45	<>	<aphaerese>
45	45	<>	<elision3>
45	45	<>	<elision2>
45	45	<>	<elision1>
45	48	H	κ
45	10998	H	k
45	11002	H	K
45	11006	H	λ
45	11009	H	l
45	10828	H	L
46	47	<>	<aphaerese>
46	47	<>	<elision3>
46	47	<>	<elision2>
46	47	<>	<elision1>
46	11012	H	κ
46	11016	H	k
46	11017	H	K
46	11008	H	λ
46	11011	H	l
46	10830	H	L
47	45	<>	<aphaerese>
47	45	<>	<elision3>
47	45	<>	<elision2>
47	45	<>	<elision1>
47	48	H	κ
47	10998	H	k
47	11002	H	K
47	11006	H	λ
47	11009	H	l
47	10828	H	L
48	49	<>	<name>
48	51	<>	<aphaerese>
48	51	<>	<elision3>
48	51	<>	<elision2>
48	51	<>	<elision1>
48	52	<kappa2K>	<>
48	10995	<kappa2L>	<>
49	50	<>	<aphaerese>
49	50	<>	<elision3>
49	50	<>	<elision2>
49	50	<>	<elision1>
49	53	<kappa2K>	<>
49	10829	<kappa2L>	<>
50	51	<>	<aphaerese>
50	51	<>	<elision3>
50	51	<>	<elision2>
50	51	<>	<elision1>
50	54	<kappa2K>	<>
50	10830	<kappa2L>	<>
51	49	<>	<name>
51	51	<>	<aphaerese>
51	51	<>	<elision3>
51	51	<>	<elision2>
51	51	<>	<elision1>
51	52	<kappa2K>	<>
51	10828	<kappa2L>	<>
52	53	<>	<name>
52	52	<>	<aphaerese>
52	52	<>	<elision3>
52	52	<>	<elision2>
52	52	<>	<elision1>
52	55	s	κ
52	10772	s	k
52	10805	s	K
52	55	s	λ
52	10820	s	l
52	10823	s	L
53	54	<>	<aphaerese>
53	54	<>	<elision3>
53	54	<>	<elision2>
53	54	<>	<elision1>
53	10765	s	κ
53	10774	s	k
53	10808	s	K
53	10765	s	λ
53	10822	s	l
53	10825	s	L
54	52	<>	<aphaerese>
54	52	<>	<elision3>
54	52	<>	<elision2>
54	52	<>	<elision1>
54	55	s	κ
54	10772	s	k
54	10805	s	K
54	55	s	λ
54	10820	s	l
54	10823	s	L
55	56	.	.
55	57	 	 
55	56	<~>	<~>
55	56	<split-s>	<split-s>
55	56	<split-h>	<split-h>
55	56	<name2>	<name2>
55	10764	<>	<name>
55	60	<aphaerese>	<aphaerese>
55	55	<>	<aphaerese>
55	55	<>	<elision3>
55	55	<>	<elision2>
55	55	<>	<elision1>
55	64	.	υ
55	9961	s	υ
55	64	.	u
55	9961	s	u
55	64	.	κ
55	10766	s	κ
55	10626	s	k
55	10647	s	U
55	10746	s	K
55	64	.	α
55	10702	s	α
55	64	.	a
55	10702	s	a
55	10705	s	A
55	64	.	λ
55	10766	s	λ
55	10711	s	l
55	10756	s	L
55	10556	<2s>	<>
56	56	.	.
56	57	 	 
56	56	<~>	<~>
56	56	<split-s>	<split-s>
56	56	<split-h>	<split-h>
56	56	<name2>	<name2>
56	10763	<>	<name>
56	60	<aphaerese>	<aphaerese>
56	56	<>	<aphaerese>
56	56	<elision3>	<elision3>
56	56	<>	<elision3>
56	56	<elision2>	<elision2>
56	56	<>	<elision2>
56	56	<elision1>	<elision1>
56	56	<>	<elision1>
56	64	.	υ
56	9961	s	υ
56	64	.	u
56	9961	s	u
56	10543	.	κ
56	10573	s	κ
56	10626	s	k
56	10647	s	U
56	10746	s	K
56	64	.	α
56	10702	s	α
56	64	.	a
56	10702	s	a
56	10705	s	A
56	10708	s	λ
56	10711	s	l
56	10756	s	L
56	10145	<2s>	<>
57	56	.	.
57	57	 	 
57	56	<~>	<~>
57	56	<split-s>	<split-s>
57	56	<split-h>	<split-h>
57	56	<name2>	<name2>
57	58	<>	<name>
57	60	<aphaerese>	<aphaerese>
57	63	<>	<aphaerese>
57	56	<elision3>	<elision3>
57	63	<>	<elision3>
57	56	<elision2>	<elision2>
57	63	<>	<elision2>
57	56	<elision1>	<elision1>
57	63	<>	<elision1>
57	64	.	υ
57	10726	s	υ
57	64	.	u
57	10726	s	u
57	10543	.	κ
57	10728	s	κ
57	10730	s	k
57	10732	s	U
57	10735	s	K
57	64	.	α
57	10738	s	α
57	64	.	a
57	10738	s	a
57	10739	s	A
57	10740	s	λ
57	10741	s	l
57	10742	s	L
57	10145	<2s>	<>
58	59	.	.
58	62	 	 
58	59	<~>	<~>
58	59	<split-s>	<split-s>
58	59	<split-h>	<split-h>
58	59	<name2>	<name2>
58	10745	<aphaerese>	<aphaerese>
58	10762	<>	<aphaerese>
58	59	<elision3>	<elision3>
58	10762	<>	<elision3>
58	59	<elision2>	<elision2>
58	10762	<>	<elision2>
58	59	<elision1>	<elision1>
58	10762	<>	<elision1>
58	66	.	υ
58	10539	s	υ
58	66	.	u
58	10539	s	u
58	10545	.	κ
58	10575	s	κ
58	10628	s	k
58	10649	s	U
58	10654	s	K
58	66	.	α
58	10704	s	α
58	66	.	a
58	10704	s	a
58	10707	s	A
58	10710	s	λ
58	10713	s	l
58	10716	s	L
58	10146	<2s>	<>
59	56	.	.
59	57	 	 
59	56	<~>	<~>
59	56	<split-s>	<split-s>
59	56	<split-h>	<split-h>
59	56	<name2>	<name2>
59	60	<aphaerese>	<aphaerese>
59	56	<>	<aphaerese>
59	56	<elision3>	<elision3>
59	56	<>	<elision3>
59	56	<elision2>	<elision2>
59	56	<>	<elision2>
59	56	<elision1>	<elision1>
59	56	<>	<elision1>
59	64	.	υ
59	9961	s	υ
59	64	.	u
59	9961	s	u
59	10543	.	κ
59	10573	s	κ
59	10626	s	k
59	10647	s	U
59	10746	s	K
59	64	.	α
59	10702	s	α
59	64	.	a
59	10702	s	a
59	10705	s	A
59	10708	s	λ
59	10711	s	l
59	10756	s	L
59	10144	<2s>	<>
60	56	.	.
60	57	 	 
60	56	<~>	<~>
60	56	<split-s>	<split-s>
60	56	<split-h>	<split-h>
60	56	<name2>	<name2>
60	61	<>	<name>
60	60	<aphaerese>	<aphaerese>
60	60	<>	<aphaerese>
60	56	<elision3>	<elision3>
60	60	<>	<elision3>
60	56	<elision2>	<elision2>
60	60	<>	<elision2>
60	56	<elision1>	<elision1>
60	60	<>	<elision1>
60	56	.	υ
60	56	.	u
60	10543	.	κ
60	10573	s	κ
60	10626	s	k
60	10647	s	U
60	10746	s	K
60	56	.	α
60	56	.	a
60	10705	s	A
60	10708	s	λ
60	10711	s	l
60	10756	s	L
60	10132	<2s>	<>
61	59	.	.
61	62	 	 
61	59	<~>	<~>
61	59	<split-s>	<split-s>
61	59	<split-h>	<split-h>
61	59	<name2>	<name2>
61	10745	<aphaerese>	<aphaerese>
61	10745	<>	<aphaerese>
61	59	<elision3>	<elision3>
61	10745	<>	<elision3>
61	59	<elision2>	<elision2>
61	10745	<>	<elision2>
61	59	<elision1>	<elision1>
61	10745	<>	<elision1>
61	59	.	υ
61	59	.	u
61	10545	.	κ
61	10575	s	κ
61	10628	s	k
61	10649	s	U
61	10748	s	K
61	59	.	α
61	59	.	a
61	10707	s	A
61	10710	s	λ
61	10713	s	l
61	10758	s	L
61	10133	<2s>	<>
62	56	.	.
62	57	 	 
62	56	<~>	<~>
62	56	<split-s>	<split-s>
62	56	<split-h>	<split-h>
62	56	<name2>	<name2>
62	60	<aphaerese>	<aphaerese>
62	63	<>	<aphaerese>
62	56	<elision3>	<elision3>
62	63	<>	<elision3>
62	56	<elision2>	<elision2>
62	63	<>	<elision2>
62	56	<elision1>	<elision1>
62	63	<>	<elision1>
62	64	.	υ
62	10726	s	υ
62	64	.	u
62	10726	s	u
62	10543	.	κ
62	10728	s	κ
62	10730	s	k
62	10732	s	U
62	10735	s	K
62	64	.	α
62	10738	s	α
62	64	.	a
62	10738	s	a
62	10739	s	A
62	10740	s	λ
62	10741	s	l
62	10742	s	L
62	10144	<2s>	<>
63	56	.	.
63	57	 	 
63	56	<~>	<~>
63	56	<split-s>	<split-s>
63	56	<split-h>	<split-h>
63	56	<name2>	<name2>
63	58	<>	<name>
63	60	<aphaerese>	<aphaerese>
63	63	<>	<aphaerese>
63	56	<elision3>	<elision3>
63	63	<>	<elision3>
63	56	<elision2>	<elision2>
63	63	<>	<elision2>
63	56	<elision1>	<elision1>
63	63	<>	<elision1>
63	64	.	υ
63	9961	s	υ
63	64	.	u
63	9961	s	u
63	10543	.	κ
63	10573	s	κ
63	10626	s	k
63	10647	s	U
63	10650	s	K
63	64	.	α
63	10702	s	α
63	64	.	a
63	10702	s	a
63	10705	s	A
63	10708	s	λ
63	10711	s	l
63	10714	s	L
63	10145	<2s>	<>
64	65	<>	<name>
64	64	<>	<aphaerese>
64	56	<elision3>	<elision3>
64	64	<>	<elision3>
64	56	<elision2>	<elision2>
64	64	<>	<elision2>
64	56	<elision1>	<elision1>
64	64	<>	<elision1>
64	68	<2s>	<>
65	66	<>	<aphaerese>
65	59	<elision3>	<elision3>
65	66	<>	<elision3>
65	59	<elision2>	<elision2>
65	66	<>	<elision2>
65	59	<elision1>	<elision1>
65	66	<>	<elision1>
65	69	<2s>	<>
66	64	<>	<aphaerese>
66	56	<elision3>	<elision3>
66	64	<>	<elision3>
66	56	<elision2>	<elision2>
66	64	<>	<elision2>
66	56	<elision1>	<elision1>
66	64	<>	<elision1>
66	67	<2s>	<>
67	68	<>	<aphaerese>
67	71	<elision3>	<elision3>
67	68	<>	<elision3>
67	71	<elision2>	<elision2>
67	68	<>	<elision2>
67	71	<elision1>	<elision1>
67	68	<>	<elision1>
67	9799	<K>	<>
68	69	<>	<name>
68	68	<>	<aphaerese>
68	71	<elision3>	<elision3>
68	68	<>	<elision3>
68	71	<elision2>	<elision2>
68	68	<>	<elision2>
68	71	<elision1>	<elision1>
68	68	<>	<elision1>
68	9800	<K>	<>
69	67	<>	<aphaerese>
69	70	<elision3>	<elision3>
69	67	<>	<elision3>
69	70	<elision2>	<elision2>
69	67	<>	<elision2>
69	70	<elision1>	<elision1>
69	67	<>	<elision1>
69	9798	<K>	<>
70	71	.	.
70	72	 	 
70	71	<~>	<~>
70	71	<split-s>	<split-s>
70	71	<split-h>	<split-h>
70	71	<name2>	<name2>
70	75	<aphaerese>	<aphaerese>
70	71	<>	<aphaerese>
70	71	<elision3>	<elision3>
70	71	<>	<elision3>
70	71	<elision2>	<elision2>
70	71	<>	<elision2>
70	71	<elision1>	<elision1>
70	71	<>	<elision1>
70	9751	.	υ
70	9795	H	υ
70	9751	.	u
70	9797	H	u
70	78	.	κ
70	9377	H	κ
70	9705	H	k
70	9718	H	U
70	9721	H	K
70	9751	.	α
70	9781	H	α
70	9751	.	a
70	9786	H	a
70	9548	H	A
70	9732	H	λ
70	9738	H	l
70	9741	H	L
71	71	.	.
71	72	 	 
71	71	<~>	<~>
71	71	<split-s>	<split-s>
71	71	<split-h>	<split-h>
71	71	<name2>	<name2>
71	73	<>	<name>
71	75	<aphaerese>	<aphaerese>
71	71	<>	<aphaerese>
71	71	<elision3>	<elision3>
71	71	<>	<elision3>
71	71	<elision2>	<elision2>
71	71	<>	<elision2>
71	71	<elision1>	<elision1>
71	71	<>	<elision1>
71	9751	.	υ
71	9795	H	υ
71	9751	.	u
71	9797	H	u
71	78	.	κ
71	9377	H	κ
71	9705	H	k
71	9718	H	U
71	9721	H	K
71	9751	.	α
71	9781	H	α
71	9751	.	a
71	9786	H	a
71	9548	H	A
71	9732	H	λ
71	9738	H	l
71	9741	H	L
72	71	.	.
72	72	 	 
72	71	<~>	<~>
72	71	<split-s>	<split-s>
72	71	<split-h>	<split-h>
72	71	<name2>	<name2>
72	73	<>	<name>
72	75	<aphaerese>	<aphaerese>
72	71	<>	<aphaerese>
72	71	<elision3>	<elision3>
72	71	<>	<elision3>
72	71	<elision2>	<elision2>
72	71	<>	<elision2>
72	71	<elision1>	<elision1>
72	71	<>	<elision1>
72	9751	.	υ
72	9754	H	υ
72	9751	.	u
72	9768	H	u
72	78	.	κ
72	9772	H	κ
72	9775	H	k
72	9718	H	U
72	9721	H	K
72	9751	.	α
72	9778	H	α
72	9751	.	a
72	9783	H	a
72	9548	H	A
72	9787	H	λ
72	9789	H	l
72	9741	H	L
73	70	.	.
73	74	 	 
73	70	<~>	<~>
73	70	<split-s>	<split-s>
73	70	<split-h>	<split-h>
73	70	<name2>	<name2>
73	77	<aphaerese>	<aphaerese>
73	70	<>	<aphaerese>
73	70	<elision3>	<elision3>
73	70	<>	<elision3>
73	70	<elision2>	<elision2>
73	70	<>	<elision2>
73	70	<elision1>	<elision1>
73	70	<>	<elision1>
73	9753	.	υ
73	9790	H	υ
73	9753	.	u
73	9794	H	u
73	80	.	κ
73	9742	H	κ
73	9746	H	k
73	9720	H	U
73	9750	H	K
73	9753	.	α
73	9780	H	α
73	9753	.	a
73	9785	H	a
73	9551	H	A
73	9734	H	λ
73	9740	H	l
73	9735	H	L
74	71	.	.
74	72	 	 
74	71	<~>	<~>
74	71	<split-s>	<split-s>
74	71	<split-h>	<split-h>
74	71	<name2>	<name2>
74	75	<aphaerese>	<aphaerese>
74	71	<>	<aphaerese>
74	71	<elision3>	<elision3>
74	71	<>	<elision3>
74	71	<elision2>	<elision2>
74	71	<>	<elision2>
74	71	<elision1>	<elision1>
74	71	<>	<elision1>
74	9751	.	υ
74	9754	H	υ
74	9751	.	u
74	9768	H	u
74	78	.	κ
74	9772	H	κ
74	9775	H	k
74	9718	H	U
74	9721	H	K
74	9751	.	α
74	9778	H	α
74	9751	.	a
74	9783	H	a
74	9548	H	A
74	9787	H	λ
74	9789	H	l
74	9741	H	L
75	71	.	.
75	72	 	 
75	71	<~>	<~>
75	71	<split-s>	<split-s>
75	71	<split-h>	<split-h>
75	71	<name2>	<name2>
75	76	<>	<name>
75	75	<aphaerese>	<aphaerese>
75	75	<>	<aphaerese>
75	71	<elision3>	<elision3>
75	75	<>	<elision3>
75	71	<elision2>	<elision2>
75	75	<>	<elision2>
75	71	<elision1>	<elision1>
75	75	<>	<elision1>
75	71	.	υ
75	71	.	u
75	78	.	κ
75	9377	H	κ
75	9705	H	k
75	9718	H	U
75	9721	H	K
75	71	.	α
75	71	.	a
75	9548	H	A
75	9732	H	λ
75	9738	H	l
75	9741	H	L
76	70	.	.
76	74	 	 
76	70	<~>	<~>
76	70	<split-s>	<split-s>
76	70	<split-h>	<split-h>
76	70	<name2>	<name2>
76	77	<aphaerese>	<aphaerese>
76	77	<>	<aphaerese>
76	70	<elision3>	<elision3>
76	77	<>	<elision3>
76	70	<elision2>	<elision2>
76	77	<>	<elision2>
76	70	<elision1>	<elision1>
76	77	<>	<elision1>
76	70	.	υ
76	70	.	u
76	80	.	κ
76	9742	H	κ
76	9746	H	k
76	9720	H	U
76	9750	H	K
76	70	.	α
76	70	.	a
76	9551	H	A
76	9734	H	λ
76	9740	H	l
76	9735	H	L
77	71	.	.
77	72	 	 
77	71	<~>	<~>
77	71	<split-s>	<split-s>
77	71	<split-h>	<split-h>
77	71	<name2>	<name2>
77	75	<aphaerese>	<aphaerese>
77	75	<>	<aphaerese>
77	71	<elision3>	<elision3>
77	75	<>	<elision3>
77	71	<elision2>	<elision2>
77	75	<>	<elision2>
77	71	<elision1>	<elision1>
77	75	<>	<elision1>
77	71	.	υ
77	71	.	u
77	78	.	κ
77	9377	H	κ
77	9705	H	k
77	9718	H	U
77	9721	H	K
77	71	.	α
77	71	.	a
77	9548	H	A
77	9732	H	λ
77	9738	H	l
77	9741	H	L
78	79	<>	<name>
78	78	<>	<aphaerese>
78	81	<elision3>	<elision3>
78	78	<>	<elision3>
78	81	<elision2>	<elision2>
78	78	<>	<elision2>
78	81	<elision1>	<elision1>
78	78	<>	<elision1>
79	80	<>	<aphaerese>
79	83	<elision3>	<elision3>
79	80	<>	<elision3>
79	83	<elision2>	<elision2>
79	80	<>	<elision2>
79	83	<elision1>	<elision1>
79	80	<>	<elision1>
80	78	<>	<aphaerese>
80	81	<elision3>	<elision3>
80	78	<>	<elision3>
80	81	<elision2>	<elision2>
80	78	<>	<elision2>
80	81	<elision1>	<elision1>
80	78	<>	<elision1>
81	82	<>	<name>
81	81	<>	<aphaerese>
81	81	<>	<elision3>
81	81	<>	<elision2>
81	81	<>	<elision1>
81	84	H	κ
81	9357	H	k
81	9361	H	K
81	9365	H	λ
81	9368	H	l
81	9187	H	L
82	83	<>	<aphaerese>
82	83	<>	<elision3>
82	83	<>	<elision2>
82	83	<>	<elision1>
82	9371	H	κ
82	9375	H	k
82	9376	H	K
82	9367	H	λ
82	9370	H	l
82	9189	H	L
83	81	<>	<aphaerese>
83	81	<>	<elision3>
83	81	<>	<elision2>
83	81	<>	<elision1>
83	84	H	κ
83	9357	H	k
83	9361	H	K
83	9365	H	λ
83	9368	H	l
83	9187	H	L
84	85	<>	<name>
84	87	<>	<aphaerese>
84	87	<>	<elision3>
84	87	<>	<elision2>
84	87	<>	<elision1>
84	88	<kappa2K>	<>
84	9354	<kappa2L>	<>
85	86	<>	<aphaerese>
85	86	<>	<elision3>
85	86	<>	<elision2>
85	86	<>	<elision1>
85	89	<kappa2K>	<>
85	9188	<kappa2L>	<>
86	87	<>	<aphaerese>
86	87	<>	<elision3>
86	87	<>	<elision2>
86	87	<>	<elision1>
86	90	<kappa2K>	<>
86	9189	<kappa2L>	<>
87	85	<>	<name>
87	87	<>	<aphaerese>
87	87	<>	<elision3>
87	87	<>	<elision2>
87	87	<>	<elision1>
87	88	<kappa2K>	<>
87	9187	<kappa2L>	<>
88	89	<>	<name>
88	88	<>	<aphaerese>
88	88	<>	<elision3>
88	88	<>	<elision2>
88	88	<>	<elision1>
88	91	s	κ
88	9131	s	k
88	9164	s	K
88	91	s	λ
88	9179	s	l
88	9182	s	L
89	90	<>	<aphaerese>
89	90	<>	<elision3>
89	90	<>	<elision2>
89	90	<>	<elision1>
89	9124	s	κ
89	9133	s	k
89	9167	s	K
89	9124	s	λ
89	9181	s	l
89	9184	s	L
90	88	<>	<aphaerese>
90	88	<>	<elision3>
90	88	<>	<elision2>
90	88	<>	<elision1>
90	91	s	κ
90	9131	s	k
90	9164	s	K
90	91	s	λ
90	9179	s	l
90	9182	s	L
91	92	.	.
91	93	 	 
91	92	<~>	<~>
91	92	<split-s>	<split-s>
91	92	<split-h>	<split-h>
91	92	<name2>	<name2>
91	9123	<>	<name>
91	96	<aphaerese>	<aphaerese>
91	91	<>	<aphaerese>
91	91	<>	<elision3>
91	91	<>	<elision2>
91	91	<>	<elision1>
91	100	.	υ
91	8320	s	υ
91	100	.	u
91	8320	s	u
91	100	.	κ
91	9125	s	κ
91	8985	s	k
91	9006	s	U
91	9105	s	K
91	100	.	α
91	9061	s	α
91	100	.	a
91	9061	s	a
91	9064	s	A
91	100	.	λ
91	9125	s	λ
91	9070	s	l
91	9115	s	L
91	8915	<2s>	<>
92	92	.	.
92	93	 	 
92	92	<~>	<~>
92	92	<split-s>	<split-s>
92	92	<split-h>	<split-h>
92	92	<name2>	<name2>
92	9122	<>	<name>
92	96	<aphaerese>	<aphaerese>
92	92	<>	<aphaerese>
92	92	<elision3>	<elision3>
92	92	<>	<elision3>
92	92	<elision2>	<elision2>
92	92	<>	<elision2>
92	92	<elision1>	<elision1>
92	92	<>	<elision1>
92	100	.	υ
92	8320	s	υ
92	100	.	u
92	8320	s	u
92	8902	.	κ
92	8932	s	κ
92	8985	s	k
92	9006	s	U
92	9105	s	K
92	100	.	α
92	9061	s	α
92	100	.	a
92	9061	s	a
92	9064	s	A
92	9067	s	λ
92	9070	s	l
92	9115	s	L
92	8504	<2s>	<>
93	92	.	.
93	93	 	 
93	92	<~>	<~>
93	92	<split-s>	<split-s>
93	92	<split-h>	<split-h>
93	92	<name2>	<name2>
93	94	<>	<name>
93	96	<aphaerese>	<aphaerese>
93	99	<>	<aphaerese>
93	92	<elision3>	<elision3>
93	99	<>	<elision3>
93	92	<elision2>	<elision2>
93	99	<>	<elision2>
93	92	<elision1>	<elision1>
93	99	<>	<elision1>
93	100	.	υ
93	9085	s	υ
93	100	.	u
93	9085	s	u
93	8902	.	κ
93	9087	s	κ
93	9089	s	k
93	9091	s	U
93	9094	s	K
93	100	.	α
93	9097	s	α
93	100	.	a
93	9097	s	a
93	9098	s	A
93	9099	s	λ
93	9100	s	l
93	9101	s	L
93	8504	<2s>	<>
94	95	.	.
94	98	 	 
94	95	<~>	<~>
94	95	<split-s>	<split-s>
94	95	<split-h>	<split-h>
94	95	<name2>	<name2>
94	9104	<aphaerese>	<aphaerese>
94	9121	<>	<aphaerese>
94	95	<elision3>	<elision3>
94	9121	<>	<elision3>
94	95	<elision2>	<elision2>
94	9121	<>	<elision2>
94	95	<elision1>	<elision1>
94	9121	<>	<elision1>
94	102	.	υ
94	8898	s	υ
94	102	.	u
94	8898	s	u
94	8904	.	κ
94	8934	s	κ
94	8987	s	k
94	9008	s	U
94	9013	s	K
94	102	.	α
94	9063	s	α
94	102	.	a
94	9063	s	a
94	9066	s	A
94	9069	s	λ
94	9072	s	l
94	9075	s	L
94	8505	<2s>	<>
95	92	.	.
95	93	 	 
95	92	<~>	<~>
95	92	<split-s>	<split-s>
95	92	<split-h>	<split-h>
95	92	<name2>	<name2>
95	96	<aphaerese>	<aphaerese>
95	92	<>	<aphaerese>
95	92	<elision3>	<elision3>
95	92	<>	<elision3>
95	92	<elision2>	<elision2>
95	92	<>	<elision2>
95	92	<elision1>	<elision1>
95	92	<>	<elision1>
95	100	.	υ
95	8320	s	υ
95	100	.	u
95	8320	s	u
95	8902	.	κ
95	8932	s	κ
95	8985	s	k
95	9006	s	U
95	9105	s	K
95	100	.	α
95	9061	s	α
95	100	.	a
95	9061	s	a
95	9064	s	A
95	9067	s	λ
95	9070	s	l
95	9115	s	L
95	8503	<2s>	<>
96	92	.	.
96	93	 	 
96	92	<~>	<~>
96	92	<split-s>	<split-s>
96	92	<split-h>	<split-h>
96	92	<name2>	<name2>
96	97	<>	<name>
96	96	<aphaerese>	<aphaerese>
96	96	<>	<aphaerese>
96	92	<elision3>	<elision3>
96	96	<>	<elision3>
96	92	<elision2>	<elision2>
96	96	<>	<elision2>
96	92	<elision1>	<elision1>
96	96	<>	<elision1>
96	92	.	υ
96	92	.	u
96	8902	.	κ
96	8932	s	κ
96	8985	s	k
96	9006	s	U
96	9105	s	K
96	92	.	α
96	92	.	a
96	9064	s	A
96	9067	s	λ
96	9070	s	l
96	9115	s	L
96	8491	<2s>	<>
97	95	.	.
97	98	 	 
97	95	<~>	<~>
97	95	<split-s>	<split-s>
97	95	<split-h>	<split-h>
97	95	<name2>	<name2>
97	9104	<aphaerese>	<aphaerese>
97	9104	<>	<aphaerese>
97	95	<elision3>	<elision3>
97	9104	<>	<elision3>
97	95	<elision2>	<elision2>
97	9104	<>	<elision2>
97	95	<elision1>	<elision1>
97	9104	<>	<elision1>
97	95	.	υ
97	95	.	u
97	8904	.	κ
97	8934	s	κ
97	8987	s	k
97	9008	s	U
97	9107	s	K
97	95	.	α
97	95	.	a
97	9066	s	A
97	9069	s	λ
97	9072	s	l
97	9117	s	L
97	8492	<2s>	<>
98	92	.	.
98	93	 	 
98	92	<~>	<~>
98	92	<split-s>	<split-s>
98	92	<split-h>	<split-h>
98	92	<name2>	<name2>
98	96	<aphaerese>	<aphaerese>
98	99	<>	<aphaerese>
98	92	<elision3>	<elision3>
98	99	<>	<elision3>
98	92	<elision2>	<elision2>
98	99	<>	<elision2>
98	92	<elision1>	<elision1>
98	99	<>	<elision1>
98	100	.	υ
98	9085	s	υ
98	100	.	u
98	9085	s	u
98	8902	.	κ
98	9087	s	κ
98	9089	s	k
98	9091	s	U
98	9094	s	K
98	100	.	α
98	9097	s	α
98	100	.	a
98	9097	s	a
98	9098	s	A
98	9099	s	λ
98	9100	s	l
98	9101	s	L
98	8503	<2s>	<>
99	92	.	.
99	93	 	 
99	92	<~>	<~>
99	92	<split-s>	<split-s>
99	92	<split-h>	<split-h>
99	92	<name2>	<name2>
99	94	<>	<name>
99	96	<aphaerese>	<aphaerese>
99	99	<>	<aphaerese>
99	92	<elision3>	<elision3>
99	99	<>	<elision3>
99	92	<elision2>	<elision2>
99	99	<>	<elision2>
99	92	<elision1>	<elision1>
99	99	<>	<elision1>
99	100	.	υ
99	8320	s	υ
99	100	.	u
99	8320	s	u
99	8902	.	κ
99	8932	s	κ
99	8985	s	k
99	9006	s	U
99	9009	s	K
99	100	.	α
99	9061	s	α
99	100	.	a
99	9061	s	a
99	9064	s	A
99	9067	s	λ
99	9070	s	l
99	9073	s	L
99	8504	<2s>	<>
100	101	<>	<name>
100	100	<>	<aphaerese>
100	92	<elision3>	<elision3>
100	100	<>	<elision3>
100	92	<elision2>	<elision2>
100	100	<>	<elision2>
100	92	<elision1>	<elision1>
100	100	<>	<elision1>
100	104	<2s>	<>
101	102	<>	<aphaerese>
101	95	<elision3>	<elision3>
101	102	<>	<elision3>
101	95	<elision2>	<elision2>
101	102	<>	<elision2>
101	95	<elision1>	<elision1>
101	102	<>	<elision1>
101	105	<2s>	<>
102	100	<>	<aphaerese>
102	92	<elision3>	<elision3>
102	100	<>	<elision3>
102	92	<elision2>	<elision2>
102	100	<>	<elision2>
102	92	<elision1>	<elision1>
102	100	<>	<elision1>
102	103	<2s>	<>
103	104	<>	<aphaerese>
103	107	<elision3>	<elision3>
103	104	<>	<elision3>
103	107	<elision2>	<elision2>
103	104	<>	<elision2>
103	107	<elision1>	<elision1>
103	104	<>	<elision1>
103	8158	<K>	<>
104	105	<>	<name>
104	104	<>	<aphaerese>
104	107	<elision3>	<elision3>
104	104	<>	<elision3>
104	107	<elision2>	<elision2>
104	104	<>	<elision2>
104	107	<elision1>	<elision1>
104	104	<>	<elision1>
104	8159	<K>	<>
105	103	<>	<aphaerese>
105	106	<elision3>	<elision3>
105	103	<>	<elision3>
105	106	<elision2>	<elision2>
105	103	<>	<elision2>
105	106	<elision1>	<elision1>
105	103	<>	<elision1>
105	8157	<K>	<>
106	107	.	.
106	108	 	 
106	107	<~>	<~>
106	107	<split-s>	<split-s>
106	107	<split-h>	<split-h>
106	107	<name2>	<name2>
106	111	<aphaerese>	<aphaerese>
106	107	<>	<aphaerese>
106	107	<elision3>	<elision3>
106	107	<>	<elision3>
106	107	<elision2>	<elision2>
106	107	<>	<elision2>
106	107	<elision1>	<elision1>
106	107	<>	<elision1>
106	8110	.	υ
106	8154	H	υ
106	8110	.	u
106	8156	H	u
106	114	.	κ
106	7736	H	κ
106	8064	H	k
106	8077	H	U
106	8080	H	K
106	8110	.	α
106	8140	H	α
106	8110	.	a
106	8145	H	a
106	7907	H	A
106	8091	H	λ
106	8097	H	l
106	8100	H	L
107	107	.	.
107	108	 	 
107	107	<~>	<~>
107	107	<split-s>	<split-s>
107	107	<split-h>	<split-h>
107	107	<name2>	<name2>
107	109	<>	<name>
107	111	<aphaerese>	<aphaerese>
107	107	<>	<aphaerese>
107	107	<elision3>	<elision3>
107	107	<>	<elision3>
107	107	<elision2>	<elision2>
107	107	<>	<elision2>
107	107	<elision1>	<elision1>
107	107	<>	<elision1>
107	8110	.	υ
107	8154	H	υ
107	8110	.	u
107	8156	H	u
107	114	.	κ
107	7736	H	κ
107	8064	H	k
107	8077	H	U
107	8080	H	K
107	8110	.	α
107	8140	H	α
107	8110	.	a
107	8145	H	a
107	7907	H	A
107	8091	H	λ
107	8097	H	l
107	8100	H	L
108	107	.	.
108	108	 	 
108	107	<~>	<~>
108	107	<split-s>	<split-s>
108	107	<split-h>	<split-h>
108	107	<name2>	<name2>
108	109	<>	<name>
108	111	<aphaerese>	<aphaerese>
108	107	<>	<aphaerese>
108	107	<elision3>	<elision3>
108	107	<>	<elision3>
108	107	<elision2>	<elision2>
108	107	<>	<elision2>
108	107	<elision1>	<elision1>
108	107	<>	<elision1>
108	8110	.	υ
108	8113	H	υ
108	8110	.	u
108	8127	H	u
108	114	.	κ
108	8131	H	κ
108	8134	H	k
108	8077	H	U
108	8080	H	K
108	8110	.	α
108	8137	H	α
108	8110	.	a
108	8142	H	a
108	7907	H	A
108	8146	H	λ
108	8148	H	l
108	8100	H	L
109	106	.	.
109	110	 	 
109	106	<~>	<~>
109	106	<split-s>	<split-s>
109	106	<split-h>	<split-h>
109	106	<name2>	<name2>
109	113	<aphaerese>	<aphaerese>
109	106	<>	<aphaerese>
109	106	<elision3>	<elision3>
109	106	<>	<elision3>
109	106	<elision2>	<elision2>
109	106	<>	<elision2>
109	106	<elision1>	<elision1>
109	106	<>	<elision1>
109	8112	.	υ
109	8149	H	υ
109	8112	.	u
109	8153	H	u
109	116	.	κ
109	8101	H	κ
109	8105	H	k
109	8079	H	U
109	8109	H	K
109	8112	.	α
109	8139	H	α
109	8112	.	a
109	8144	H	a
109	7910	H	A
109	8093	H	λ
109	8099	H	l
109	8094	H	L
110	107	.	.
110	108	 	 
110	107	<~>	<~>
110	107	<split-s>	<split-s>
110	107	<split-h>	<split-h>
110	107	<name2>	<name2>
110	111	<aphaerese>	<aphaerese>
110	107	<>	<aphaerese>
110	107	<elision3>	<elision3>
110	107	<>	<elision3>
110	107	<elision2>	<elision2>
110	107	<>	<elision2>
110	107	<elision1>	<elision1>
110	107	<>	<elision1>
110	8110	.	υ
110	8113	H	υ
110	8110	.	u
110	8127	H	u
110	114	.	κ
110	8131	H	κ
110	8134	H	k
110	8077	H	U
110	8080	H	K
110	8110	.	α
110	8137	H	α
110	8110	.	a
110	8142	H	a
110	7907	H	A
110	8146	H	λ
110	8148	H	l
110	8100	H	L
111	107	.	.
111	108	 	 
111	107	<~>	<~>
111	107	<split-s>	<split-s>
111	107	<split-h>	<split-h>
111	107	<name2>	<name2>
111	112	<>	<name>
111	111	<aphaerese>	<aphaerese>
111	111	<>	<aphaerese>
111	107	<elision3>	<elision3>
111	111	<>	<elision3>
111	107	<elision2>	<elision2>
111	111	<>	<elision2>
111	107	<elision1>	<elision1>
111	111	<>	<elision1>
111	107	.	υ
111	107	.	u
111	114	.	κ
111	7736	H	κ
111	8064	H	k
111	8077	H	U
111	8080	H	K
111	107	.	α
111	107	.	a
111	7907	H	A
111	8091	H	λ
111	8097	H	l
111	8100	H	L
112	106	.	.
112	110	 	 
112	106	<~>	<~>
112	106	<split-s>	<split-s>
112	106	<split-h>	<split-h>
112	106	<name2>	<name2>
112	113	<aphaerese>	<aphaerese>
112	113	<>	<aphaerese>
112	106	<elision3>	<elision3>
112	113	<>	<elision3>
112	106	<elision2>	<elision2>
112	113	<>	<elision2>
112	106	<elision1>	<elision1>
112	113	<>	<elision1>
112	106	.	υ
112	106	.	u
112	116	.	κ
112	8101	H	κ
112	8105	H	k
112	8079	H	U
112	8109	H	K
112	106	.	α
112	106	.	a
112	7910	H	A
112	8093	H	λ
112	8099	H	l
112	8094	H	L
113	107	.	.
113	108	 	 
113	107	<~>	<~>
113	107	<split-s>	<split-s>
113	107	<split-h>	<split-h>
113	107	<name2>	<name2>
113	111	<aphaerese>	<aphaerese>
113	111	<>	<aphaerese>
113	107	<elision3>	<elision3>
113	111	<>	<elision3>
113	107	<elision2>	<elision2>
113	111	<>	<elision2>
113	107	<elision1>	<elision1>
113	111	<>	<elision1>
113	107	.	υ
113	107	.	u
113	114	.	κ
113	7736	H	κ
113	8064	H	k
113	8077	H	U
113	8080	H	K
113	107	.	α
113	107	.	a
113	7907	H	A
113	8091	H	λ
113	8097	H	l
113	8100	H	L
114	115	<>	<name>
114	114	<>	<aphaerese>
114	117	<elision3>	<elision3>
114	114	<>	<elision3>
114	117	<elision2>	<elision2>
114	114	<>	<elision2>
114	117	<elision1>	<elision1>
114	114	<>	<elision1>
115	116	<>	<aphaerese>
115	119	<elision3>	<elision3>
115	116	<>	<elision3>
115	119	<elision2>	<elision2>
115	116	<>	<elision2>
115	119	<elision1>	<elision1>
115	116	<>	<elision1>
116	114	<>	<aphaerese>
116	117	<elision3>	<elision3>
116	114	<>	<elision3>
116	117	<elision2>	<elision2>
116	114	<>	<elision2>
116	117	<elision1>	<elision1>
116	114	<>	<elision1>
117	118	<>	<name>
117	117	<>	<aphaerese>
117	117	<>	<elision3>
117	117	<>	<elision2>
117	117	<>	<elision1>
117	120	H	κ
117	7716	H	k
117	7720	H	K
117	7724	H	λ
117	7727	H	l
117	7546	H	L
118	119	<>	<aphaerese>
118	119	<>	<elision3>
118	119	<>	<elision2>
118	119	<>	<elision1>
118	7730	H	κ
118	7734	H	k
118	7735	H	K
118	7726	H	λ
118	7729	H	l
118	7548	H	L
119	117	<>	<aphaerese>
119	117	<>	<elision3>
119	117	<>	<elision2>
119	117	<>	<elision1>
119	120	H	κ
119	7716	H	k
119	7720	H	K
119	7724	H	λ
119	7727	H	l
119	7546	H	L
120	121	<>	<name>
120	123	<>	<aphaerese>
120	123	<>	<elision3>
120	123	<>	<elision2>
120	123	<>	<elision1>
120	124	<kappa2K>	<>
120	7713	<kappa2L>	<>
121	122	<>	<aphaerese>
121	122	<>	<elision3>
121	122	<>	<elision2>
121	122	<>	<elision1>
121	125	<kappa2K>	<>
121	7547	<kappa2L>	<>
122	123	<>	<aphaerese>
122	123	<>	<elision3>
122	123	<>	<elision2>
122	123	<>	<elision1>
122	126	<kappa2K>	<>
122	7548	<kappa2L>	<>
123	121	<>	<name>
123	123	<>	<aphaerese>
123	123	<>	<elision3>
123	123	<>	<elision2>
123	123	<>	<elision1>
123	124	<kappa2K>	<>
123	7546	<kappa2L>	<>
124	125	<>	<name>
124	124	<>	<aphaerese>
124	124	<>	<elision3>
124	124	<>	<elision2>
124	124	<>	<elision1>
124	127	s	κ
124	7490	s	k
124	7523	s	K
124	127	s	λ
124	7538	s	l
124	7541	s	L
125	126	<>	<aphaerese>
125	126	<>	<elision3>
125	126	<>	<elision2>
125	126	<>	<elision1>
125	7483	s	κ
125	7492	s	k
125	7526	s	K
125	7483	s	λ
125	7540	s	l
125	7543	s	L
126	124	<>	<aphaerese>
126	124	<>	<elision3>
126	124	<>	<elision2>
126	124	<>	<elision1>
126	127	s	κ
126	7490	s	k
126	7523	s	K
126	127	s	λ
126	7538	s	l
126	7541	s	L
127	128	.	.
127	129	 	 
127	128	<~>	<~>
127	128	<split-s>	<split-s>
127	128	<split-h>	<split-h>
127	128	<name2>	<name2>
127	7482	<>	<name>
127	132	<aphaerese>	<aphaerese>
127	127	<>	<aphaerese>
127	127	<>	<elision3>
127	127	<>	<elision2>
127	127	<>	<elision1>
127	136	.	υ
127	6679	s	υ
127	136	.	u
127	6679	s	u
127	136	.	κ
127	7484	s	κ
127	7344	s	k
127	7365	s	U
127	7464	s	K
127	136	.	α
127	7420	s	α
127	136	.	a
127	7420	s	a
127	7423	s	A
127	136	.	λ
127	7484	s	λ
127	7429	s	l
127	7474	s	L
127	7274	<2s>	<>
128	128	.	.
128	129	 	 
128	128	<~>	<~>
128	128	<split-s>	<split-s>
128	128	<split-h>	<split-h>
128	128	<name2>	<name2>
128	7481	<>	<name>
128	132	<aphaerese>	<aphaerese>
128	128	<>	<aphaerese>
128	128	<elision3>	<elision3>
128	128	<>	<elision3>
128	128	<elision2>	<elision2>
128	128	<>	<elision2>
128	128	<elision1>	<elision1>
128	128	<>	<elision1>
128	136	.	υ
128	6679	s	υ
128	136	.	u
128	6679	s	u
128	7261	.	κ
128	7291	s	κ
128	7344	s	k
128	7365	s	U
128	7464	s	K
128	136	.	α
128	7420	s	α
128	136	.	a
128	7420	s	a
128	7423	s	A
128	7426	s	λ
128	7429	s	l
128	7474	s	L
128	6863	<2s>	<>
129	128	.	.
129	129	 	 
129	128	<~>	<~>
129	128	<split-s>	<split-s>
129	128	<split-h>	<split-h>
129	128	<name2>	<name2>
129	130	<>	<name>
129	132	<aphaerese>	<aphaerese>
129	135	<>	<aphaerese>
129	128	<elision3>	<elision3>
129	135	<>	<elision3>
129	128	<elision2>	<elision2>
129	135	<>	<elision2>
129	128	<elision1>	<elision1>
129	135	<>	<elision1>
129	136	.	υ
129	7444	s	υ
129	136	.	u
129	7444	s	u
129	7261	.	κ
129	7446	s	κ
129	7448	s	k
129	7450	s	U
129	7453	s	K
129	136	.	α
129	7456	s	α
129	136	.	a
129	7456	s	a
129	7457	s	A
129	7458	s	λ
129	7459	s	l
129	7460	s	L
129	6863	<2s>	<>
130	131	.	.
130	134	 	 
130	131	<~>	<~>
130	131	<split-s>	<split-s>
130	131	<split-h>	<split-h>
130	131	<name2>	<name2>
130	7463	<aphaerese>	<aphaerese>
130	7480	<>	<aphaerese>
130	131	<elision3>	<elision3>
130	7480	<>	<elision3>
130	131	<elision2>	<elision2>
130	7480	<>	<elision2>
130	131	<elision1>	<elision1>
130	7480	<>	<elision1>
130	138	.	υ
130	7257	s	υ
130	138	.	u
130	7257	s	u
130	7263	.	κ
130	7293	s	κ
130	7346	s	k
130	7367	s	U
130	7372	s	K
130	138	.	α
130	7422	s	α
130	138	.	a
130	7422	s	a
130	7425	s	A
130	7428	s	λ
130	7431	s	l
130	7434	s	L
130	6864	<2s>	<>
131	128	.	.
131	129	 	 
131	128	<~>	<~>
131	128	<split-s>	<split-s>
131	128	<split-h>	<split-h>
131	128	<name2>	<name2>
131	132	<aphaerese>	<aphaerese>
131	128	<>	<aphaerese>
131	128	<elision3>	<elision3>
131	128	<>	<elision3>
131	128	<elision2>	<elision2>
131	128	<>	<elision2>
131	128	<elision1>	<elision1>
131	128	<>	<elision1>
131	136	.	υ
131	6679	s	υ
131	136	.	u
131	6679	s	u
131	7261	.	κ
131	7291	s	κ
131	7344	s	k
131	7365	s	U
131	7464	s	K
131	136	.	α
131	7420	s	α
131	136	.	a
131	7420	s	a
131	7423	s	A
131	7426	s	λ
131	7429	s	l
131	7474	s	L
131	6862	<2s>	<>
132	128	.	.
132	129	 	 
132	128	<~>	<~>
132	128	<split-s>	<split-s>
132	128	<split-h>	<split-h>
132	128	<name2>	<name2>
132	133	<>	<name>
132	132	<aphaerese>	<aphaerese>
132	132	<>	<aphaerese>
132	128	<elision3>	<elision3>
132	132	<>	<elision3>
132	128	<elision2>	<elision2>
132	132	<>	<elision2>
132	128	<elision1>	<elision1>
132	132	<>	<elision1>
132	128	.	υ
132	128	.	u
132	7261	.	κ
132	7291	s	κ
132	7344	s	k
132	7365	s	U
132	7464	s	K
132	128	.	α
132	128	.	a
132	7423	s	A
132	7426	s	λ
132	7429	s	l
132	7474	s	L
132	6850	<2s>	<>
133	131	.	.
133	134	 	 
133	131	<~>	<~>
133	131	<split-s>	<split-s>
133	131	<split-h>	<split-h>
133	131	<name2>	<name2>
133	7463	<aphaerese>	<aphaerese>
133	7463	<>	<aphaerese>
133	131	<elision3>	<elision3>
133	7463	<>	<elision3>
133	131	<elision2>	<elision2>
133	7463	<>	<elision2>
133	131	<elision1>	<elision1>
133	7463	<>	<elision1>
133	131	.	υ
133	131	.	u
133	7263	.	κ
133	7293	s	κ
133	7346	s	k
133	7367	s	U
133	7466	s	K
133	131	.	α
133	131	.	a
133	7425	s	A
133	7428	s	λ
133	7431	s	l
133	7476	s	L
133	6851	<2s>	<>
134	128	.	.
134	129	 	 
134	128	<~>	<~>
134	128	<split-s>	<split-s>
134	128	<split-h>	<split-h>
134	128	<name2>	<name2>
134	132	<aphaerese>	<aphaerese>
134	135	<>	<aphaerese>
134	128	<elision3>	<elision3>
134	135	<>	<elision3>
134	128	<elision2>	<elision2>
134	135	<>	<elision2>
134	128	<elision1>	<elision1>
134	135	<>	<elision1>
134	136	.	υ
134	7444	s	υ
134	136	.	u
134	7444	s	u
134	7261	.	κ
134	7446	s	κ
134	7448	s	k
134	7450	s	U
134	7453	s	K
134	136	.	α
134	7456	s	α
134	136	.	a
134	7456	s	a
134	7457	s	A
134	7458	s	λ
134	7459	s	l
134	7460	s	L
134	6862	<2s>	<>
135	128	.	.
135	129	 	 
135	128	<~>	<~>
135	128	<split-s>	<split-s>
135	128	<split-h>	<split-h>
135	128	<name2>	<name2>
135	130	<>	<name>
135	132	<aphaerese>	<aphaerese>
135	135	<>	<aphaerese>
135	128	<elision3>	<elision3>
135	135	<>	<elision3>
135	128	<elision2>	<elision2>
135	135	<>	<elision2>
135	128	<elision1>	<elision1>
135	135	<>	<elision1>
135	136	.	υ
135	6679	s	υ
135	136	.	u
135	6679	s	u
135	7261	.	κ
135	7291	s	κ
135	7344	s	k
135	7365	s	U
135	7368	s	K
135	136	.	α
135	7420	s	α
135	136	.	a
135	7420	s	a
135	7423	s	A
135	7426	s	λ
135	7429	s	l
135	7432	s	L
135	6863	<2s>	<>
136	137	<>	<name>
136	136	<>	<aphaerese>
136	128	<elision3>	<elision3>
136	136	<>	<elision3>
136	128	<elision2>	<elision2>
136	136	<>	<elision2>
136	128	<elision1>	<elision1>
136	136	<>	<elision1>
136	140	<2s>	<>
137	138	<>	<aphaerese>
137	131	<elision3>	<elision3>
137	138	<>	<elision3>
137	131	<elision2>	<elision2>
137	138	<>	<elision2>
137	131	<elision1>	<elision1>
137	138	<>	<elision1>
137	141	<2s>	<>
138	136	<>	<aphaerese>
138	128	<elision3>	<elision3>
138	136	<>	<elision3>
138	128	<elision2>	<elision2>
138	136	<>	<elision2>
138	128	<elision1>	<elision1>
138	136	<>	<elision1>
138	139	<2s>	<>
139	140	<>	<aphaerese>
139	143	<elision3>	<elision3>
139	140	<>	<elision3>
139	143	<elision2>	<elision2>
139	140	<>	<elision2>
139	143	<elision1>	<elision1>
139	140	<>	<elision1>
139	6517	<K>	<>
140	141	<>	<name>
140	140	<>	<aphaerese>
140	143	<elision3>	<elision3>
140	140	<>	<elision3>
140	143	<elision2>	<elision2>
140	140	<>	<elision2>
140	143	<elision1>	<elision1>
140	140	<>	<elision1>
140	6518	<K>	<>
141	139	<>	<aphaerese>
141	142	<elision3>	<elision3>
141	139	<>	<elision3>
141	142	<elision2>	<elision2>
141	139	<>	<elision2>
141	142	<elision1>	<elision1>
141	139	<>	<elision1>
141	6516	<K>	<>
142	143	.	.
142	144	 	 
142	143	<~>	<~>
142	143	<split-s>	<split-s>
142	143	<split-h>	<split-h>
142	143	<name2>	<name2>
142	147	<aphaerese>	<aphaerese>
142	143	<>	<aphaerese>
142	143	<elision3>	<elision3>
142	143	<>	<elision3>
142	143	<elision2>	<elision2>
142	143	<>	<elision2>
142	143	<elision1>	<elision1>
142	143	<>	<elision1>
142	6469	.	υ
142	6513	H	υ
142	6469	.	u
142	6515	H	u
142	150	.	κ
142	6095	H	κ
142	6423	H	k
142	6436	H	U
142	6439	H	K
142	6469	.	α
142	6499	H	α
142	6469	.	a
142	6504	H	a
142	6266	H	A
142	6450	H	λ
142	6456	H	l
142	6459	H	L
143	143	.	.
143	144	 	 
143	143	<~>	<~>
143	143	<split-s>	<split-s>
143	143	<split-h>	<split-h>
143	143	<name2>	<name2>
143	145	<>	<name>
143	147	<aphaerese>	<aphaerese>
143	143	<>	<aphaerese>
143	143	<elision3>	<elision3>
143	143	<>	<elision3>
143	143	<elision2>	<elision2>
143	143	<>	<elision2>
143	143	<elision1>	<elision1>
143	143	<>	<elision1>
143	6469	.	υ
143	6513	H	υ
143	6469	.	u
143	6515	H	u
143	150	.	κ
143	6095	H	κ
143	6423	H	k
143	6436	H	U
143	6439	H	K
143	6469	.	α
143	6499	H	α
143	6469	.	a
143	6504	H	a
143	6266	H	A
143	6450	H	λ
143	6456	H	l
143	6459	H	L
144	143	.	.
144	144	 	 
144	143	<~>	<~>
144	143	<split-s>	<split-s>
144	143	<split-h>	<split-h>
144	143	<name2>	<name2>
144	145	<>	<name>
144	147	<aphaerese>	<aphaerese>
144	143	<>	<aphaerese>
144	143	<elision3>	<elision3>
144	143	<>	<elision3>
144	143	<elision2>	<elision2>
144	143	<>	<elision2>
144	143	<elision1>	<elision1>
144	143	<>	<elision1>
144	6469	.	υ
144	6472	H	υ
144	6469	.	u
144	6486	H	u
144	150	.	κ
144	6490	H	κ
144	6493	H	k
144	6436	H	U
144	6439	H	K
144	6469	.	α
144	6496	H	α
144	6469	.	a
144	6501	H	a
144	6266	H	A
144	6505	H	λ
144	6507	H	l
144	6459	H	L
145	142	.	.
145	146	 	 
145	142	<~>	<~>
145	142	<split-s>	<split-s>
145	142	<split-h>	<split-h>
145	142	<name2>	<name2>
145	149	<aphaerese>	<aphaerese>
145	142	<>	<aphaerese>
145	142	<elision3>	<elision3>
145	142	<>	<elision3>
145	142	<elision2>	<elision2>
145	142	<>	<elision2>
145	142	<elision1>	<elision1>
145	142	<>	<elision1>
145	6471	.	υ
145	6508	H	υ
145	6471	.	u
145	6512	H	u
145	152	.	κ
145	6460	H	κ
145	6464	H	k
145	6438	H	U
145	6468	H	K
145	6471	.	α
145	6498	H	α
145	6471	.	a
145	6503	H	a
145	6269	H	A
145	6452	H	λ
145	6458	H	l
145	6453	H	L
146	143	.	.
146	144	 	 
146	143	<~>	<~>
146	143	<split-s>	<split-s>
146	143	<split-h>	<split-h>
146	143	<name2>	<name2>
146	147	<aphaerese>	<aphaerese>
146	143	<>	<aphaerese>
146	143	<elision3>	<elision3>
146	143	<>	<elision3>
146	143	<elision2>	<elision2>
146	143	<>	<elision2>
146	143	<elision1>	<elision1>
146	143	<>	<elision1>
146	6469	.	υ
146	6472	H	υ
146	6469	.	u
146	6486	H	u
146	150	.	κ
146	6490	H	κ
146	6493	H	k
146	6436	H	U
146	6439	H	K
146	6469	.	α
146	6496	H	α
146	6469	.	a
146	6501	H	a
146	6266	H	A
146	6505	H	λ
146	6507	H	l
146	6459	H	L
147	143	.	.
147	144	 	 
147	143	<~>	<~>
147	143	<split-s>	<split-s>
147	143	<split-h>	<split-h>
147	143	<name2>	<name2>
147	148	<>	<name>
147	147	<aphaerese>	<aphaerese>
147	147	<>	<aphaerese>
147	143	<elision3>	<elision3>
147	147	<>	<elision3>
147	143	<elision2>	<elision2>
147	147	<>	<elision2>
147	143	<elision1>	<elision1>
147	147	<>	<elision1>
147	143	.	υ
147	143	.	u
147	150	.	κ
147	6095	H	κ
147	6423	H	k
147	6436	H	U
147	6439	H	K
147	143	.	α
147	143	.	a
147	6266	H	A
147	6450	H	λ
147	6456	H	l
147	6459	H	L
148	142	.	.
148	146	 	 
148	142	<~>	<~>
148	142	<split-s>	<split-s>
148	142	<split-h>	<split-h>
148	142	<name2>	<name2>
148	149	<aphaerese>	<aphaerese>
148	149	<>	<aphaerese>
148	142	<elision3>	<elision3>
148	149	<>	<elision3>
148	142	<elision2>	<elision2>
148	149	<>	<elision2>
148	142	<elision1>	<elision1>
148	149	<>	<elision1>
148	142	.	υ
148	142	.	u
148	152	.	κ
148	6460	H	κ
148	6464	H	k
148	6438	H	U
148	6468	H	K
148	142	.	α
148	142	.	a
148	6269	H	A
148	6452	H	λ
148	6458	H	l
148	6453	H	L
149	143	.	.
149	144	 	 
149	143	<~>	<~>
149	143	<split-s>	<split-s>
149	143	<split-h>	<split-h>
149	143	<name2>	<name2>
149	147	<aphaerese>	<aphaerese>
149	147	<>	<aphaerese>
149	143	<elision3>	<elision3>
149	147	<>	<elision3>
149	143	<elision2>	<elision2>
149	147	<>	<elision2>
149	143	<elision1>	<elision1>
149	147	<>	<elision1>
149	143	.	υ
149	143	.	u
149	150	.	κ
149	6095	H	κ
149	6423	H	k
149	6436	H	U
149	6439	H	K
149	143	.	α
149	143	.	a
149	6266	H	A
149	6450	H	λ
149	6456	H	l
149	6459	H	L
150	151	<>	<name>
150	150	<>	<aphaerese>
150	153	<elision3>	<elision3>
150	150	<>	<elision3>
150	153	<elision2>	<elision2>
150	150	<>	<elision2>
150	153	<elision1>	<elision1>
150	150	<>	<elision1>
151	152	<>	<aphaerese>
151	155	<elision3>	<elision3>
151	152	<>	<elision3>
151	155	<elision2>	<elision2>
151	152	<>	<elision2>
151	155	<elision1>	<elision1>
151	152	<>	<elision1>
152	150	<>	<aphaerese>
152	153	<elision3>	<elision3>
152	150	<>	<elision3>
152	153	<elision2>	<elision2>
152	150	<>	<elision2>
152	153	<elision1>	<elision1>
152	150	<>	<elision1>
153	154	<>	<name>
153	153	<>	<aphaerese>
153	153	<>	<elision3>
153	153	<>	<elision2>
153	153	<>	<elision1>
153	156	H	κ
153	6075	H	k
153	6079	H	K
153	6083	H	λ
153	6086	H	l
153	5905	H	L
154	155	<>	<aphaerese>
154	155	<>	<elision3>
154	155	<>	<elision2>
154	155	<>	<elision1>
154	6089	H	κ
154	6093	H	k
154	6094	H	K
154	6085	H	λ
154	6088	H	l
154	5907	H	L
155	153	<>	<aphaerese>
155	153	<>	<elision3>
155	153	<>	<elision2>
155	153	<>	<elision1>
155	156	H	κ
155	6075	H	k
155	6079	H	K
155	6083	H	λ
155	6086	H	l
155	5905	H	L
156	157	<>	<name>
156	159	<>	<aphaerese>
156	159	<>	<elision3>
156	159	<>	<elision2>
156	159	<>	<elision1>
156	160	<kappa2K>	<>
156	6072	<kappa2L>	<>
157	158	<>	<aphaerese>
157	158	<>	<elision3>
157	158	<>	<elision2>
157	158	<>	<elision1>
157	161	<kappa2K>	<>
157	5906	<kappa2L>	<>
158	159	<>	<aphaerese>
158	159	<>	<elision3>
158	159	<>	<elision2>
158	159	<>	<elision1>
158	162	<kappa2K>	<>
158	5907	<kappa2L>	<>
159	157	<>	<name>
159	159	<>	<aphaerese>
159	159	<>	<elision3>
159	159	<>	<elision2>
159	159	<>	<elision1>
159	160	<kappa2K>	<>
159	5905	<kappa2L>	<>
160	161	<>	<name>
160	160	<>	<aphaerese>
160	160	<>	<elision3>
160	160	<>	<elision2>
160	160	<>	<elision1>
160	163	s	κ
160	5849	s	k
160	5882	s	K
160	163	s	λ
160	5897	s	l
160	5900	s	L
161	162	<>	<aphaerese>
161	162	<>	<elision3>
161	162	<>	<elision2>
161	162	<>	<elision1>
161	5842	s	κ
161	5851	s	k
161	5885	s	K
161	5842	s	λ
161	5899	s	l
161	5902	s	L
162	160	<>	<aphaerese>
162	160	<>	<elision3>
162	160	<>	<elision2>
162	160	<>	<elision1>
162	163	s	κ
162	5849	s	k
162	5882	s	K
162	163	s	λ
162	5897	s	l
162	5900	s	L
163	164	.	.
163	165	 	 
163	164	<~>	<~>
163	164	<split-s>	<split-s>
163	164	<split-h>	<split-h>
163	164	<name2>	<name2>
163	5841	<>	<name>
163	168	<aphaerese>	<aphaerese>
163	163	<>	<aphaerese>
163	163	<>	<elision3>
163	163	<>	<elision2>
163	163	<>	<elision1>
163	172	.	υ
163	5038	s	υ
163	172	.	u
163	5038	s	u
163	172	.	κ
163	5843	s	κ
163	5703	s	k
163	5724	s	U
163	5823	s	K
163	172	.	α
163	5779	s	α
163	172	.	a
163	5779	s	a
163	5782	s	A
163	172	.	λ
163	5843	s	λ
163	5788	s	l
163	5833	s	L
163	5633	<2s>	<>
164	164	.	.
164	165	 	 
164	164	<~>	<~>
164	164	<split-s>	<split-s>
164	164	<split-h>	<split-h>
164	164	<name2>	<name2>
164	5840	<>	<name>
164	168	<aphaerese>	<aphaerese>
164	164	<>	<aphaerese>
164	164	<elision3>	<elision3>
164	164	<>	<elision3>
164	164	<elision2>	<elision2>
164	164	<>	<elision2>
164	164	<elision1>	<elision1>
164	164	<>	<elision1>
164	172	.	υ
164	5038	s	υ
164	172	.	u
164	5038	s	u
164	5620	.	κ
164	5650	s	κ
164	5703	s	k
164	5724	s	U
164	5823	s	K
164	172	.	α
164	5779	s	α
164	172	.	a
164	5779	s	a
164	5782	s	A
164	5785	s	λ
164	5788	s	l
164	5833	s	L
164	5222	<2s>	<>
165	164	.	.
165	165	 	 
165	164	<~>	<~>
165	164	<split-s>	<split-s>
165	164	<split-h>	<split-h>
165	164	<name2>	<name2>
165	166	<>	<name>
165	168	<aphaerese>	<aphaerese>
165	171	<>	<aphaerese>
165	164	<elision3>	<elision3>
165	171	<>	<elision3>
165	164	<elision2>	<elision2>
165	171	<>	<elision2>
165	164	<elision1>	<elision1>
165	171	<>	<elision1>
165	172	.	υ
165	5803	s	υ
165	172	.	u
165	5803	s	u
165	5620	.	κ
165	5805	s	κ
165	5807	s	k
165	5809	s	U
165	5812	s	K
165	172	.	α
165	5815	s	α
165	172	.	a
165	5815	s	a
165	5816	s	A
165	5817	s	λ
165	5818	s	l
165	5819	s	L
165	5222	<2s>	<>
166	167	.	.
166	170	 	 
166	167	<~>	<~>
166	167	<split-s>	<split-s>
166	167	<split-h>	<split-h>
166	167	<name2>	<name2>
166	5822	<aphaerese>	<aphaerese>
166	5839	<>	<aphaerese>
166	167	<elision3>	<elision3>
166	5839	<>	<elision3>
166	167	<elision2>	<elision2>
166	5839	<>	<elision2>
166	167	<elision1>	<elision1>
166	5839	<>	<elision1>
166	174	.	υ
166	5616	s	υ
166	174	.	u
166	5616	s	u
166	5622	.	κ
166	5652	s	κ
166	5705	s	k
166	5726	s	U
166	5731	s	K
166	174	.	α
166	5781	s	α
166	174	.	a
166	5781	s	a
166	5784	s	A
166	5787	s	λ
166	5790	s	l
166	5793	s	L
166	5223	<2s>	<>
167	164	.	.
167	165	 	 
167	164	<~>	<~>
167	164	<split-s>	<split-s>
167	164	<split-h>	<split-h>
167	164	<name2>	<name2>
167	168	<aphaerese>	<aphaerese>
167	164	<>	<aphaerese>
167	164	<elision3>	<elision3>
167	164	<>	<elision3>
167	164	<elision2>	<elision2>
167	164	<>	<elision2>
167	164	<elision1>	<elision1>
167	164	<>	<elision1>
167	172	.	υ
167	5038	s	υ
167	172	.	u
167	5038	s	u
167	5620	.	κ
167	5650	s	κ
167	5703	s	k
167	5724	s	U
167	5823	s	K
167	172	.	α
167	5779	s	α
167	172	.	a
167	5779	s	a
167	5782	s	A
167	5785	s	λ
167	5788	s	l
167	5833	s	L
167	5221	<2s>	<>
168	164	.	.
168	165	 	 
168	164	<~>	<~>
168	164	<split-s>	<split-s>
168	164	<split-h>	<split-h>
168	164	<name2>	<name2>
168	169	<>	<name>
168	168	<aphaerese>	<aphaerese>
168	168	<>	<aphaerese>
168	164	<elision3>	<elision3>
168	168	<>	<elision3>
168	164	<elision2>	<elision2>
168	168	<>	<elision2>
168	164	<elision1>	<elision1>
168	168	<>	<elision1>
168	164	.	υ
168	164	.	u
168	5620	.	κ
168	5650	s	κ
168	5703	s	k
168	5724	s	U
168	5823	s	K
168	164	.	α
168	164	.	a
168	5782	s	A
168	5785	s	λ
168	5788	s	l
168	5833	s	L
168	5209	<2s>	<>
169	167	.	.
169	170	 	 
169	167	<~>	<~>
169	167	<split-s>	<split-s>
169	167	<split-h>	<split-h>
169	167	<name2>	<name2>
169	5822	<aphaerese>	<aphaerese>
169	5822	<>	<aphaerese>
169	167	<elision3>	<elision3>
169	5822	<>	<elision3>
169	167	<elision2>	<elision2>
169	5822	<>	<elision2>
169	167	<elision1>	<elision1>
169	5822	<>	<elision1>
169	167	.	υ
169	167	.	u
169	5622	.	κ
169	5652	s	κ
169	5705	s	k
169	5726	s	U
169	5825	s	K
169	167	.	α
169	167	.	a
169	5784	s	A
169	5787	s	λ
169	5790	s	l
169	5835	s	L
169	5210	<2s>	<>
170	164	.	.
170	165	 	 
170	164	<~>	<~>
170	164	<split-s>	<split-s>
170	164	<split-h>	<split-h>
170	164	<name2>	<name2>
170	168	<aphaerese>	<aphaerese>
170	171	<>	<aphaerese>
170	164	<elision3>	<elision3>
170	171	<>	<elision3>
170	164	<elision2>	<elision2>
170	171	<>	<elision2>
170	164	<elision1>	<elision1>
170	171	<>	<elision1>
170	172	.	υ
170	5803	s	υ
170	172	.	u
170	5803	s	u
170	5620	.	κ
170	5805	s	κ
170	5807	s	k
170	5809	s	U
170	5812	s	K
170	172	.	α
170	5815	s	α
170	172	.	a
170	5815	s	a
170	5816	s	A
170	5817	s	λ
170	5818	s	l
170	5819	s	L
170	5221	<2s>	<>
171	164	.	.
171	165	 	 
171	164	<~>	<~>
171	164	<split-s>	<split-s>
171	164	<split-h>	<split-h>
171	164	<name2>	<name2>
171	166	<>	<name>
171	168	<aphaerese>	<aphaerese>
171	171	<>	<aphaerese>
171	164	<elision3>	<elision3>
171	171	<>	<elision3>
171	164	<elision2>	<elision2>
171	171	<>	<elision2>
171	164	<elision1>	<elision1>
171	171	<>	<elision1>
171	172	.	υ
171	5038	s	υ
171	172	.	u
171	5038	s	u
171	5620	.	κ
171	5650	s	κ
171	5703	s	k
171	5724	s	U
171	5727	s	K
171	172	.	α
171	5779	s	α
171	172	.	a
171	5779	s	a
171	5782	s	A
171	5785	s	λ
171	5788	s	l
171	5791	s	L
171	5222	<2s>	<>
172	173	<>	<name>
172	172	<>	<aphaerese>
172	164	<elision3>	<elision3>
172	172	<>	<elision3>
172	164	<elision2>	<elision2>
172	172	<>	<elision2>
172	164	<elision1>	<elision1>
172	172	<>	<elision1>
172	176	<2s>	<>
173	174	<>	<aphaerese>
173	167	<elision3>	<elision3>
173	174	<>	<elision3>
173	167	<elision2>	<elision2>
173	174	<>	<elision2>
173	167	<elision1>	<elision1>
173	174	<>	<elision1>
173	177	<2s>	<>
174	172	<>	<aphaerese>
174	164	<elision3>	<elision3>
174	172	<>	<elision3>
174	164	<elision2>	<elision2>
174	172	<>	<elision2>
174	164	<elision1>	<elision1>
174	172	<>	<elision1>
174	175	<2s>	<>
175	176	<>	<aphaerese>
175	179	<elision3>	<elision3>
175	176	<>	<elision3>
175	179	<elision2>	<elision2>
175	176	<>	<elision2>
175	179	<elision1>	<elision1>
175	176	<>	<elision1>
175	4876	<K>	<>
176	177	<>	<name>
176	176	<>	<aphaerese>
176	179	<elision3>	<elision3>
176	176	<>	<elision3>
176	179	<elision2>	<elision2>
176	176	<>	<elision2>
176	179	<elision1>	<elision1>
176	176	<>	<elision1>
176	4877	<K>	<>
177	175	<>	<aphaerese>
177	178	<elision3>	<elision3>
177	175	<>	<elision3>
177	178	<elision2>	<elision2>
177	175	<>	<elision2>
177	178	<elision1>	<elision1>
177	175	<>	<elision1>
177	4875	<K>	<>
178	179	.	.
178	180	 	 
178	179	<~>	<~>
178	179	<split-s>	<split-s>
178	179	<split-h>	<split-h>
178	179	<name2>	<name2>
178	183	<aphaerese>	<aphaerese>
178	179	<>	<aphaerese>
178	179	<elision3>	<elision3>
178	179	<>	<elision3>
178	179	<elision2>	<elision2>
178	179	<>	<elision2>
178	179	<elision1>	<elision1>
178	179	<>	<elision1>
178	4828	.	υ
178	4872	H	υ
178	4828	.	u
178	4874	H	u
178	186	.	κ
178	4454	H	κ
178	4782	H	k
178	4795	H	U
178	4798	H	K
178	4828	.	α
178	4858	H	α
178	4828	.	a
178	4863	H	a
178	4625	H	A
178	4809	H	λ
178	4815	H	l
178	4818	H	L
179	179	.	.
179	180	 	 
179	179	<~>	<~>
179	179	<split-s>	<split-s>
179	179	<split-h>	<split-h>
179	179	<name2>	<name2>
179	181	<>	<name>
179	183	<aphaerese>	<aphaerese>
179	179	<>	<aphaerese>
179	179	<elision3>	<elision3>
179	179	<>	<elision3>
179	179	<elision2>	<elision2>
179	179	<>	<elision2>
179	179	<elision1>	<elision1>
179	179	<>	<elision1>
179	4828	.	υ
179	4872	H	υ
179	4828	.	u
179	4874	H	u
179	186	.	κ
179	4454	H	κ
179	4782	H	k
179	4795	H	U
179	4798	H	K
179	4828	.	α
179	4858	H	α
179	4828	.	a
179	4863	H	a
179	4625	H	A
179	4809	H	λ
179	4815	H	l
179	4818	H	L
180	179	.	.
180	180	 	 
180	179	<~>	<~>
180	179	<split-s>	<split-s>
180	179	<split-h>	<split-h>
180	179	<name2>	<name2>
180	181	<>	<name>
180	183	<aphaerese>	<aphaerese>
180	179	<>	<aphaerese>
180	179	<elision3>	<elision3>
180	179	<>	<elision3>
180	179	<elision2>	<elision2>
180	179	<>	<elision2>
180	179	<elision1>	<elision1>
180	179	<>	<elision1>
180	4828	.	υ
180	4831	H	υ
180	4828	.	u
180	4845	H	u
180	186	.	κ
180	4849	H	κ
180	4852	H	k
180	4795	H	U
180	4798	H	K
180	4828	.	α
180	4855	H	α
180	4828	.	a
180	4860	H	a
180	4625	H	A
180	4864	H	λ
180	4866	H	l
180	4818	H	L
181	178	.	.
181	182	 	 
181	178	<~>	<~>
181	178	<split-s>	<split-s>
181	178	<split-h>	<split-h>
181	178	<name2>	<name2>
181	185	<aphaerese>	<aphaerese>
181	178	<>	<aphaerese>
181	178	<elision3>	<elision3>
181	178	<>	<elision3>
181	178	<elision2>	<elision2>
181	178	<>	<elision2>
181	178	<elision1>	<elision1>
181	178	<>	<elision1>
181	4830	.	υ
181	4867	H	υ
181	4830	.	u
181	4871	H	u
181	188	.	κ
181	4819	H	κ
181	4823	H	k
181	4797	H	U
181	4827	H	K
181	4830	.	α
181	4857	H	α
181	4830	.	a
181	4862	H	a
181	4628	H	A
181	4811	H	λ
181	4817	H	l
181	4812	H	L
182	179	.	.
182	180	 	 
182	179	<~>	<~>
182	179	<split-s>	<split-s>
182	179	<split-h>	<split-h>
182	179	<name2>	<name2>
182	183	<aphaerese>	<aphaerese>
182	179	<>	<aphaerese>
182	179	<elision3>	<elision3>
182	179	<>	<elision3>
182	179	<elision2>	<elision2>
182	179	<>	<elision2>
182	179	<elision1>	<elision1>
182	179	<>	<elision1>
182	4828	.	υ
182	4831	H	υ
182	4828	.	u
182	4845	H	u
182	186	.	κ
182	4849	H	κ
182	4852	H	k
182	4795	H	U
182	4798	H	K
182	4828	.	α
182	4855	H	α
182	4828	.	a
182	4860	H	a
182	4625	H	A
182	4864	H	λ
182	4866	H	l
182	4818	H	L
183	179	.	.
183	180	 	 
183	179	<~>	<~>
183	179	<split-s>	<split-s>
183	179	<split-h>	<split-h>
183	179	<name2>	<name2>
183	184	<>	<name>
183	183	<aphaerese>	<aphaerese>
183	183	<>	<aphaerese>
183	179	<elision3>	<elision3>
183	183	<>	<elision3>
183	179	<elision2>	<elision2>
183	183	<>	<elision2>
183	179	<elision1>	<elision1>
183	183	<>	<elision1>
183	179	.	υ
183	179	.	u
183	186	.	κ
183	4454	H	κ
183	4782	H	k
183	4795	H	U
183	4798	H	K
183	179	.	α
183	179	.	a
183	4625	H	A
183	4809	H	λ
183	4815	H	l
183	4818	H	L
184	178	.	.
184	182	 	 
184	178	<~>	<~>
184	178	<split-s>	<split-s>
184	178	<split-h>	<split-h>
184	178	<name2>	<name2>
184	185	<aphaerese>	<aphaerese>
184	185	<>	<aphaerese>
184	178	<elision3>	<elision3>
184	185	<>	<elision3>
184	178	<elision2>	<elision2>
184	185	<>	<elision2>
184	178	<elision1>	<elision1>
184	185	<>	<elision1>
184	178	.	υ
184	178	.	u
184	188	.	κ
184	4819	H	κ
184	4823	H	k
184	4797	H	U
184	4827	H	K
184	178	.	α
184	178	.	a
184	4628	H	A
184	4811	H	λ
184	4817	H	l
184	4812	H	L
185	179	.	.
185	180	 	 
185	179	<~>	<~>
185	179	<split-s>	<split-s>
185	179	<split-h>	<split-h>
185	179	<name2>	<name2>
185	183	<aphaerese>	<aphaerese>
185	183	<>	<aphaerese>
185	179	<elision3>	<elision3>
185	183	<>	<elision3>
185	179	<elision2>	<elision2>
185	183	<>	<elision2>
185	179	<elision1>	<elision1>
185	183	<>	<elision1>
185	179	.	υ
185	179	.	u
185	186	.	κ
185	4454	H	κ
185	4782	H	k
185	4795	H	U
185	4798	H	K
185	179	.	α
185	179	.	a
185	4625	H	A
185	4809	H	λ
185	4815	H	l
185	4818	H	L
186	187	<>	<name>
186	186	<>	<aphaerese>
186	189	<elision3>	<elision3>
186	186	<>	<elision3>
186	189	<elision2>	<elision2>
186	186	<>	<elision2>
186	189	<elision1>	<elision1>
186	186	<>	<elision1>
187	188	<>	<aphaerese>
187	191	<elision3>	<elision3>
187	188	<>	<elision3>
187	191	<elision2>	<elision2>
187	188	<>	<elision2>
187	191	<elision1>	<elision1>
187	188	<>	<elision1>
188	186	<>	<aphaerese>
188	189	<elision3>	<elision3>
188	186	<>	<elision3>
188	189	<elision2>	<elision2>
188	186	<>	<elision2>
188	189	<elision1>	<elision1>
188	186	<>	<elision1>
189	190	<>	<name>
189	189	<>	<aphaerese>
189	189	<>	<elision3>
189	189	<>	<elision2>
189	189	<>	<elision1>
189	192	H	κ
189	4434	H	k
189	4438	H	K
189	4442	H	λ
189	4445	H	l
189	4264	H	L
190	191	<>	<aphaerese>
190	191	<>	<elision3>
190	191	<>	<elision2>
190	191	<>	<elision1>
190	4448	H	κ
190	4452	H	k
190	4453	H	K
190	4444	H	λ
190	4447	H	l
190	4266	H	L
191	189	<>	<aphaerese>
191	189	<>	<elision3>
191	189	<>	<elision2>
191	189	<>	<elision1>
191	192	H	κ
191	4434	H	k
191	4438	H	K
191	4442	H	λ
191	4445	H	l
191	4264	H	L
192	193	<>	<name>
192	195	<>	<aphaerese>
192	195	<>	<elision3>
192	195	<>	<elision2>
192	195	<>	<elision1>
192	196	<kappa2K>	<>
192	4431	<kappa2L>	<>
193	194	<>	<aphaerese>
193	194	<>	<elision3>
193	194	<>	<elision2>
193	194	<>	<elision1>
193	197	<kappa2K>	<>
193	4265	<kappa2L>	<>
194	195	<>	<aphaerese>
194	195	<>	<elision3>
194	195	<>	<elision2>
194	195	<>	<elision1>
194	198	<kappa2K>	<>
194	4266	<kappa2L>	<>
195	193	<>	<name>
195	195	<>	<aphaerese>
195	195	<>	<elision3>
195	195	<>	<elision2>
195	195	<>	<elision1>
195	196	<kappa2K>	<>
195	4264	<kappa2L>	<>
196	197	<>	<name>
196	196	<>	<aphaerese>
196	196	<>	<elision3>
196	196	<>	<elision2>
196	196	<>	<elision1>
196	199	s	κ
196	4208	s	k
196	4241	s	K
196	199	s	λ
196	4256	s	l
196	4259	s	L
197	198	<>	<aphaerese>
197	198	<>	<elision3>
197	198	<>	<elision2>
197	198	<>	<elision1>
197	4201	s	κ
197	4210	s	k
197	4244	s	K
197	4201	s	λ
197	4258	s	l
197	4261	s	L
198	196	<>	<aphaerese>
198	196	<>	<elision3>
198	196	<>	<elision2>
198	196	<>	<elision1>
198	199	s	κ
198	4208	s	k
198	4241	s	K
198	199	s	λ
198	4256	s	l
198	4259	s	L
199	200	.	.
199	201	 	 
199	200	<~>	<~>
199	200	<split-s>	<split-s>
199	200	<split-h>	<split-h>
199	200	<name2>	<name2>
199	4200	<>	<name>
199	204	<aphaerese>	<aphaerese>
199	199	<>	<aphaerese>
199	199	<>	<elision3>
199	199	<>	<elision2>
199	199	<>	<elision1>
199	208	.	υ
199	3397	s	υ
199	208	.	u
199	3397	s	u
199	208	.	κ
199	4202	s	κ
199	4062	s	k
199	4083	s	U
199	4182	s	K
199	208	.	α
199	4138	s	α
199	208	.	a
199	4138	s	a
199	4141	s	A
199	208	.	λ
199	4202	s	λ
199	4147	s	l
199	4192	s	L
199	3992	<2s>	<>
200	200	.	.
200	201	 	 
200	200	<~>	<~>
200	200	<split-s>	<split-s>
200	200	<split-h>	<split-h>
200	200	<name2>	<name2>
200	4199	<>	<name>
200	204	<aphaerese>	<aphaerese>
200	200	<>	<aphaerese>
200	200	<elision3>	<elision3>
200	200	<>	<elision3>
200	200	<elision2>	<elision2>
200	200	<>	<elision2>
200	200	<elision1>	<elision1>
200	200	<>	<elision1>
200	208	.	υ
200	3397	s	υ
200	208	.	u
200	3397	s	u
200	3979	.	κ
200	4009	s	κ
200	4062	s	k
200	4083	s	U
200	4182	s	K
200	208	.	α
200	4138	s	α
200	208	.	a
200	4138	s	a
200	4141	s	A
200	4144	s	λ
200	4147	s	l
200	4192	s	L
200	3581	<2s>	<>
201	200	.	.
201	201	 	 
201	200	<~>	<~>
201	200	<split-s>	<split-s>
201	200	<split-h>	<split-h>
201	200	<name2>	<name2>
201	202	<>	<name>
201	204	<aphaerese>	<aphaerese>
201	207	<>	<aphaerese>
201	200	<elision3>	<elision3>
201	207	<>	<elision3>
201	200	<elision2>	<elision2>
201	207	<>	<elision2>
201	200	<elision1>	<elision1>
201	207	<>	<elision1>
201	208	.	υ
201	4162	s	υ
201	208	.	u
201	4162	s	u
201	3979	.	κ
201	4164	s	κ
201	4166	s	k
201	4168	s	U
201	4171	s	K
201	208	.	α
201	4174	s	α
201	208	.	a
201	4174	s	a
201	4175	s	A
201	4176	s	λ
201	4177	s	l
201	4178	s	L
201	3581	<2s>	<>
202	203	.	.
202	206	 	 
202	203	<~>	<~>
202	203	<split-s>	<split-s>
202	203	<split-h>	<split-h>
202	203	<name2>	<name2>
202	4181	<aphaerese>	<aphaerese>
202	4198	<>	<aphaerese>
202	203	<elision3>	<elision3>
202	4198	<>	<elision3>
202	203	<elision2>	<elision2>
202	4198	<>	<elision2>
202	203	<elision1>	<elision1>
202	4198	<>	<elision1>
202	210	.	υ
202	3975	s	υ
202	210	.	u
202	3975	s	u
202	3981	.	κ
202	4011	s	κ
202	4064	s	k
202	4085	s	U
202	4090	s	K
202	210	.	α
202	4140	s	α
202	210	.	a
202	4140	s	a
202	4143	s	A
202	4146	s	λ
202	4149	s	l
202	4152	s	L
202	3582	<2s>	<>
203	200	.	.
203	201	 	 
203	200	<~>	<~>
203	200	<split-s>	<split-s>
203	200	<split-h>	<split-h>
203	200	<name2>	<name2>
203	204	<aphaerese>	<aphaerese>
203	200	<>	<aphaerese>
203	200	<elision3>	<elision3>
203	200	<>	<elision3>
203	200	<elision2>	<elision2>
203	200	<>	<elision2>
203	200	<elision1>	<elision1>
203	200	<>	<elision1>
203	208	.	υ
203	3397	s	υ
203	208	.	u
203	3397	s	u
203	3979	.	κ
203	4009	s	κ
203	4062	s	k
203	4083	s	U
203	4182	s	K
203	208	.	α
203	4138	s	α
203	208	.	a
203	4138	s	a
203	4141	s	A
203	4144	s	λ
203	4147	s	l
203	4192	s	L
203	3580	<2s>	<>
204	200	.	.
204	201	 	 
204	200	<~>	<~>
204	200	<split-s>	<split-s>
204	200	<split-h>	<split-h>
204	200	<name2>	<name2>
204	205	<>	<name>
204	204	<aphaerese>	<aphaerese>
204	204	<>	<aphaerese>
204	200	<elision3>	<elision3>
204	204	<>	<elision3>
204	200	<elision2>	<elision2>
204	204	<>	<elision2>
204	200	<elision1>	<elision1>
204	204	<>	<elision1>
204	200	.	υ
204	200	.	u
204	3979	.	κ
204	4009	s	κ
204	4062	s	k
204	4083	s	U
204	4182	s	K
204	200	.	α
204	200	.	a
204	4141	s	A
204	4144	s	λ
204	4147	s	l
204	4192	s	L
204	3568	<2s>	<>
205	203	.	.
205	206	 	 
205	203	<~>	<~>
205	203	<split-s>	<split-s>
205	203	<split-h>	<split-h>
205	203	<name2>	<name2>
205	4181	<aphaerese>	<aphaerese>
205	4181	<>	<aphaerese>
205	203	<elision3>	<elision3>
205	4181	<>	<elision3>
205	203	<elision2>	<elision2>
205	4181	<>	<elision2>
205	203	<elision1>	<elision1>
205	4181	<>	<elision1>
205	203	.	υ
205	203	.	u
205	3981	.	κ
205	4011	s	κ
205	4064	s	k
205	4085	s	U
205	4184	s	K
205	203	.	α
205	203	.	a
205	4143	s	A
205	4146	s	λ
205	4149	s	l
205	4194	s	L
205	3569	<2s>	<>
206	200	.	.
206	201	 	 
206	200	<~>	<~>
206	200	<split-s>	<split-s>
206	200	<split-h>	<split-h>
206	200	<name2>	<name2>
206	204	<aphaerese>	<aphaerese>
206	207	<>	<aphaerese>
206	200	<elision3>	<elision3>
206	207	<>	<elision3>
206	200	<elision2>	<elision2>
206	207	<>	<elision2>
206	200	<elision1>	<elision1>
206	207	<>	<elision1>
206	208	.	υ
206	4162	s	υ
206	208	.	u
206	4162	s	u
206	3979	.	κ
206	4164	s	κ
206	4166	s	k
206	4168	s	U
206	4171	s	K
206	208	.	α
206	4174	s	α
206	208	.	a
206	4174	s	a
206	4175	s	A
206	4176	s	λ
206	4177	s	l
206	4178	s	L
206	3580	<2s>	<>
207	200	.	.
207	201	 	 
207	200	<~>	<~>
207	200	<split-s>	<split-s>
207	200	<split-h>	<split-h>
207	200	<name2>	<name2>
207	202	<>	<name>
207	204	<aphaerese>	<aphaerese>
207	207	<>	<aphaerese>
207	200	<elision3>	<elision3>
207	207	<>	<elision3>
207	200	<elision2>	<elision2>
207	207	<>	<elision2>
207	200	<elision1>	<elision1>
207	207	<>	<elision1>
207	208	.	υ
207	3397	s	υ
207	208	.	u
207	3397	s	u
207	3979	.	κ
207	4009	s	κ
207	4062	s	k
207	4083	s	U
207	4086	s	K
207	208	.	α
207	4138	s	α
207	208	.	a
207	4138	s	a
207	4141	s	A
207	4144	s	λ
207	4147	s	l
207	4150	s	L
207	3581	<2s>	<>
208	209	<>	<name>
208	208	<>	<aphaerese>
208	200	<elision3>	<elision3>
208	208	<>	<elision3>
208	200	<elision2>	<elision2>
208	208	<>	<elision2>
208	200	<elision1>	<elision1>
208	208	<>	<elision1>
208	212	<2s>	<>
209	210	<>	<aphaerese>
209	203	<elision3>	<elision3>
209	210	<>	<elision3>
209	203	<elision2>	<elision2>
209	210	<>	<elision2>
209	203	<elision1>	<elision1>
209	210	<>	<elision1>
209	213	<2s>	<>
210	208	<>	<aphaerese>
210	200	<elision3>	<elision3>
210	208	<>	<elision3>
210	200	<elision2>	<elision2>
210	208	<>	<elision2>
210	200	<elision1>	<elision1>
210	208	<>	<elision1>
210	211	<2s>	<>
211	212	<>	<aphaerese>
211	215	<elision3>	<elision3>
211	212	<>	<elision3>
211	215	<elision2>	<elision2>
211	212	<>	<elision2>
211	215	<elision1>	<elision1>
211	212	<>	<elision1>
211	3235	<K>	<>
212	213	<>	<name>
212	212	<>	<aphaerese>
212	215	<elision3>	<elision3>
212	212	<>	<elision3>
212	215	<elision2>	<elision2>
212	212	<>	<elision2>
212	215	<elision1>	<elision1>
212	212	<>	<elision1>
212	3236	<K>	<>
213	211	<>	<aphaerese>
213	214	<elision3>	<elision3>
213	211	<>	<elision3>
213	214	<elision2>	<elision2>
213	211	<>	<elision2>
213	214	<elision1>	<elision1>
213	211	<>	<elision1>
213	3234	<K>	<>
214	215	.	.
214	216	 	 
214	215	<~>	<~>
214	215	<split-s>	<split-s>
214	215	<split-h>	<split-h>
214	215	<name2>	<name2>
214	219	<aphaerese>	<aphaerese>
214	215	<>	<aphaerese>
214	215	<elision3>	<elision3>
214	215	<>	<elision3>
214	215	<elision2>	<elision2>
214	215	<>	<elision2>
214	215	<elision1>	<elision1>
214	215	<>	<elision1>
214	3187	.	υ
214	3231	H	υ
214	3187	.	u
214	3233	H	u
214	222	.	κ
214	2813	H	κ
214	3141	H	k
214	3154	H	U
214	3157	H	K
214	3187	.	α
214	3217	H	α
214	3187	.	a
214	3222	H	a
214	2984	H	A
214	3168	H	λ
214	3174	H	l
214	3177	H	L
215	215	.	.
215	216	 	 
215	215	<~>	<~>
215	215	<split-s>	<split-s>
215	215	<split-h>	<split-h>
215	215	<name2>	<name2>
215	217	<>	<name>
215	219	<aphaerese>	<aphaerese>
215	215	<>	<aphaerese>
215	215	<elision3>	<elision3>
215	215	<>	<elision3>
215	215	<elision2>	<elision2>
215	215	<>	<elision2>
215	215	<elision1>	<elision1>
215	215	<>	<elision1>
215	3187	.	υ
215	3231	H	υ
215	3187	.	u
215	3233	H	u
215	222	.	κ
215	2813	H	κ
215	3141	H	k
215	3154	H	U
215	3157	H	K
215	3187	.	α
215	3217	H	α
215	3187	.	a
215	3222	H	a
215	2984	H	A
215	3168	H	λ
215	3174	H	l
215	3177	H	L
216	215	.	.
216	216	 	 
216	215	<~>	<~>
216	215	<split-s>	<split-s>
216	215	<split-h>	<split-h>
216	215	<name2>	<name2>
216	217	<>	<name>
216	219	<aphaerese>	<aphaerese>
216	215	<>	<aphaerese>
216	215	<elision3>	<elision3>
216	215	<>	<elision3>
216	215	<elision2>	<elision2>
216	215	<>	<elision2>
216	215	<elision1>	<elision1>
216	215	<>	<elision1>
216	3187	.	υ
216	3190	H	υ
216	3187	.	u
216	3204	H	u
216	222	.	κ
216	3208	H	κ
216	3211	H	k
216	3154	H	U
216	3157	H	K
216	3187	.	α
216	3214	H	α
216	3187	.	a
216	3219	H	a
216	2984	H	A
216	3223	H	λ
216	3225	H	l
216	3177	H	L
217	214	.	.
217	218	 	 
217	214	<~>	<~>
217	214	<split-s>	<split-s>
217	214	<split-h>	<split-h>
217	214	<name2>	<name2>
217	221	<aphaerese>	<aphaerese>
217	214	<>	<aphaerese>
217	214	<elision3>	<elision3>
217	214	<>	<elision3>
217	214	<elision2>	<elision2>
217	214	<>	<elision2>
217	214	<elision1>	<elision1>
217	214	<>	<elision1>
217	3189	.	υ
217	3226	H	υ
217	3189	.	u
217	3230	H	u
217	224	.	κ
217	3178	H	κ
217	3182	H	k
217	3156	H	U
217	3186	H	K
217	3189	.	α
217	3216	H	α
217	3189	.	a
217	3221	H	a
217	2987	H	A
217	3170	H	λ
217	3176	H	l
217	3171	H	L
218	215	.	.
218	216	 	 
218	215	<~>	<~>
218	215	<split-s>	<split-s>
218	215	<split-h>	<split-h>
218	215	<name2>	<name2>
218	219	<aphaerese>	<aphaerese>
218	215	<>	<aphaerese>
218	215	<elision3>	<elision3>
218	215	<>	<elision3>
218	215	<elision2>	<elision2>
218	215	<>	<elision2>
218	215	<elision1>	<elision1>
218	215	<>	<elision1>
218	3187	.	υ
218	3190	H	υ
218	3187	.	u
218	3204	H	u
218	222	.	κ
218	3208	H	κ
218	3211	H	k
218	3154	H	U
218	3157	H	K
218	3187	.	α
218	3214	H	α
218	3187	.	a
218	3219	H	a
218	2984	H	A
218	3223	H	λ
218	3225	H	l
218	3177	H	L
219	215	.	.
219	216	 	 
219	215	<~>	<~>
219	215	<split-s>	<split-s>
219	215	<split-h>	<split-h>
219	215	<name2>	<name2>
219	220	<>	<name>
219	219	<aphaerese>	<aphaerese>
219	219	<>	<aphaerese>
219	215	<elision3>	<elision3>
219	219	<>	<elision3>
219	215	<elision2>	<elision2>
219	219	<>	<elision2>
219	215	<elision1>	<elision1>
219	219	<>	<elision1>
219	215	.	υ
219	215	.	u
219	222	.	κ
219	2813	H	κ
219	3141	H	k
219	3154	H	U
219	3157	H	K
219	215	.	α
219	215	.	a
219	2984	H	A
219	3168	H	λ
219	3174	H	l
219	3177	H	L
220	214	.	.
220	218	 	 
220	214	<~>	<~>
220	214	<split-s>	<split-s>
220	214	<split-h>	<split-h>
220	214	<name2>	<name2>
220	221	<aphaerese>	<aphaerese>
220	221	<>	<aphaerese>
220	214	<elision3>	<elision3>
220	221	<>	<elision3>
220	214	<elision2>	<elision2>
220	221	<>	<elision2>
220	214	<elision1>	<elision1>
220	221	<>	<elision1>
220	214	.	υ
220	214	.	u
220	224	.	κ
220	3178	H	κ
220	3182	H	k
220	3156	H	U
220	3186	H	K
220	214	.	α
220	214	.	a
220	2987	H	A
220	3170	H	λ
220	3176	H	l
220	3171	H	L
221	215	.	.
221	216	 	 
221	215	<~>	<~>
221	215	<split-s>	<split-s>
221	215	<split-h>	<split-h>
221	215	<name2>	<name2>
221	219	<aphaerese>	<aphaerese>
221	219	<>	<aphaerese>
221	215	<elision3>	<elision3>
221	219	<>	<elision3>
221	215	<elision2>	<elision2>
221	219	<>	<elision2>
221	215	<elision1>	<elision1>
221	219	<>	<elision1>
221	215	.	υ
221	215	.	u
221	222	.	κ
221	2813	H	κ
221	3141	H	k
221	3154	H	U
221	3157	H	K
221	215	.	α
221	215	.	a
221	2984	H	A
221	3168	H	λ
221	3174	H	l
221	3177	H	L
222	223	<>	<name>
222	222	<>	<aphaerese>
222	225	<elision3>	<elision3>
222	222	<>	<elision3>
222	225	<elision2>	<elision2>
222	222	<>	<elision2>
222	225	<elision1>	<elision1>
222	222	<>	<elision1>
223	224	<>	<aphaerese>
223	227	<elision3>	<elision3>
223	224	<>	<elision3>
223	227	<elision2>	<elision2>
223	224	<>	<elision2>
223	227	<elision1>	<elision1>
223	224	<>	<elision1>
224	222	<>	<aphaerese>
224	225	<elision3>	<elision3>
224	222	<>	<elision3>
224	225	<elision2>	<elision2>
224	222	<>	<elision2>
224	225	<elision1>	<elision1>
224	222	<>	<elision1>
225	226	<>	<name>
225	225	<>	<aphaerese>
225	225	<>	<elision3>
225	225	<>	<elision2>
225	225	<>	<elision1>
225	228	H	κ
225	2793	H	k
225	2797	H	K
225	2801	H	λ
225	2804	H	l
225	2623	H	L
226	227	<>	<aphaerese>
226	227	<>	<elision3>
226	227	<>	<elision2>
226	227	<>	<elision1>
226	2807	H	κ
226	2811	H	k
226	2812	H	K
226	2803	H	λ
226	2806	H	l
226	2625	H	L
227	225	<>	<aphaerese>
227	225	<>	<elision3>
227	225	<>	<elision2>
227	225	<>	<elision1>
227	228	H	κ
227	2793	H	k
227	2797	H	K
227	2801	H	λ
227	2804	H	l
227	2623	H	L
228	229	<>	<name>
228	231	<>	<aphaerese>
228	231	<>	<elision3>
228	231	<>	<elision2>
228	231	<>	<elision1>
228	232	<kappa2K>	<>
228	2790	<kappa2L>	<>
229	230	<>	<aphaerese>
229	230	<>	<elision3>
229	230	<>	<elision2>
229	230	<>	<elision1>
229	233	<kappa2K>	<>
229	2624	<kappa2L>	<>
230	231	<>	<aphaerese>
230	231	<>	<elision3>
230	231	<>	<elision2>
230	231	<>	<elision1>
230	234	<kappa2K>	<>
230	2625	<kappa2L>	<>
231	229	<>	<name>
231	231	<>	<aphaerese>
231	231	<>	<elision3>
231	231	<>	<elision2>
231	231	<>	<elision1>
231	232	<kappa2K>	<>
231	2623	<kappa2L>	<>
232	233	<>	<name>
232	232	<>	<aphaerese>
232	232	<>	<elision3>
232	232	<>	<elision2>
232	232	<>	<elision1>
232	235	s	κ
232	2567	s	k
232	2600	s	K
232	235	s	λ
232	2615	s	l
232	2618	s	L
233	234	<>	<aphaerese>
233	234	<>	<elision3>
233	234	<>	<elision2>
233	234	<>	<elision1>
233	2560	s	κ
233	2569	s	k
233	2603	s	K
233	2560	s	λ
233	2617	s	l
233	2620	s	L
234	232	<>	<aphaerese>
234	232	<>	<elision3>
234	232	<>	<elision2>
234	232	<>	<elision1>
234	235	s	κ
234	2567	s	k
234	2600	s	K
234	235	s	λ
234	2615	s	l
234	2618	s	L
235	236	.	.
235	237	 	 
235	236	<~>	<~>
235	236	<split-s>	<split-s>
235	236	<split-h>	<split-h>
235	236	<name2>	<name2>
235	2559	<>	<name>
235	240	<aphaerese>	<aphaerese>
235	235	<>	<aphaerese>
235	235	<>	<elision3>
235	235	<>	<elision2>
235	235	<>	<elision1>
235	244	.	υ
235	1756	s	υ
235	244	.	u
235	1756	s	u
235	244	.	κ
235	2561	s	κ
235	2421	s	k
235	2442	s	U
235	2541	s	K
235	244	.	α
235	2497	s	α
235	244	.	a
235	2497	s	a
235	2500	s	A
235	244	.	λ
235	2561	s	λ
235	2506	s	l
235	2551	s	L
235	2351	<2s>	<>
236	236	.	.
236	237	 	 
236	236	<~>	<~>
236	236	<split-s>	<split-s>
236	236	<split-h>	<split-h>
236	236	<name2>	<name2>
236	2558	<>	<name>
236	240	<aphaerese>	<aphaerese>
236	236	<>	<aphaerese>
236	236	<elision3>	<elision3>
236	236	<>	<elision3>
236	236	<elision2>	<elision2>
236	236	<>	<elision2>
236	236	<elision1>	<elision1>
236	236	<>	<elision1>
236	244	.	υ
236	1756	s	υ
236	244	.	u
236	1756	s	u
236	2338	.	κ
236	2368	s	κ
236	2421	s	k
236	2442	s	U
236	2541	s	K
236	244	.	α
236	2497	s	α
236	244	.	a
236	2497	s	a
236	2500	s	A
236	2503	s	λ
236	2506	s	l
236	2551	s	L
236	1940	<2s>	<>
237	236	.	.
237	237	 	 
237	236	<~>	<~>
237	236	<split-s>	<split-s>
237	236	<split-h>	<split-h>
237	236	<name2>	<name2>
237	238	<>	<name>
237	240	<aphaerese>	<aphaerese>
237	243	<>	<aphaerese>
237	236	<elision3>	<elision3>
237	243	<>	<elision3>
237	236	<elision2>	<elision2>
237	243	<>	<elision2>
237	236	<elision1>	<elision1>
237	243	<>	<elision1>
237	244	.	υ
237	2521	s	υ
237	244	.	u
237	2521	s	u
237	2338	.	κ
237	2523	s	κ
237	2525	s	k
237	2527	s	U
237	2530	s	K
237	244	.	α
237	2533	s	α
237	244	.	a
237	2533	s	a
237	2534	s	A
237	2535	s	λ
237	2536	s	l
237	2537	s	L
237	1940	<2s>	<>
238	239	.	.
238	242	 	 
238	239	<~>	<~>
238	239	<split-s>	<split-s>
238	239	<split-h>	<split-h>
238	239	<name2>	<name2>
238	2540	<aphaerese>	<aphaerese>
238	2557	<>	<aphaerese>
238	239	<elision3>	<elision3>
238	2557	<>	<elision3>
238	239	<elision2>	<elision2>
238	2557	<>	<elision2>
238	239	<elision1>	<elision1>
238	2557	<>	<elision1>
238	246	.	υ
238	2334	s	υ
238	246	.	u
238	2334	s	u
238	2340	.	κ
238	2370	s	κ
238	2423	s	k
238	2444	s	U
238	2449	s	K
238	246	.	α
238	2499	s	α
238	246	.	a
238	2499	s	a
238	2502	s	A
238	2505	s	λ
238	2508	s	l
238	2511	s	L
238	1941	<2s>	<>
239	236	.	.
239	237	 	 
239	236	<~>	<~>
239	236	<split-s>	<split-s>
239	236	<split-h>	<split-h>
239	236	<name2>	<name2>
239	240	<aphaerese>	<aphaerese>
239	236	<>	<aphaerese>
239	236	<elision3>	<elision3>
239	236	<>	<elision3>
239	236	<elision2>	<elision2>
239	236	<>	<elision2>
239	236	<elision1>	<elision1>
239	236	<>	<elision1>
239	244	.	υ
239	1756	s	υ
239	244	.	u
239	1756	s	u
239	2338	.	κ
239	2368	s	κ
239	2421	s	k
239	2442	s	U
239	2541	s	K
239	244	.	α
239	2497	s	α
239	244	.	a
239	2497	s	a
239	2500	s	A
239	2503	s	λ
239	2506	s	l
239	2551	s	L
239	1939	<2s>	<>
240	236	.	.
240	237	 	 
240	236	<~>	<~>
240	236	<split-s>	<split-s>
240	236	<split-h>	<split-h>
240	236	<name2>	<name2>
240	241	<>	<name>
240	240	<aphaerese>	<aphaerese>
240	240	<>	<aphaerese>
240	236	<elision3>	<elision3>
240	240	<>	<elision3>
240	236	<elision2>	<elision2>
240	240	<>	<elision2>
240	236	<elision1>	<elision1>
240	240	<>	<elision1>
240	236	.	υ
240	236	.	u
240	2338	.	κ
240	2368	s	κ
240	2421	s	k
240	2442	s	U
240	2541	s	K
240	236	.	α
240	236	.	a
240	2500	s	A
240	2503	s	λ
240	2506	s	l
240	2551	s	L
240	1927	<2s>	<>
241	239	.	.
241	242	 	 
241	239	<~>	<~>
241	239	<split-s>	<split-s>
241	239	<split-h>	<split-h>
241	239	<name2>	<name2>
241	2540	<aphaerese>	<aphaerese>
241	2540	<>	<aphaerese>
241	239	<elision3>	<elision3>
241	2540	<>	<elision3>
241	239	<elision2>	<elision2>
241	2540	<>	<elision2>
241	239	<elision1>	<elision1>
241	2540	<>	<elision1>
241	239	.	υ
241	239	.	u
241	2340	.	κ
241	2370	s	κ
241	2423	s	k
241	2444	s	U
241	2543	s	K
241	239	.	α
241	239	.	a
241	2502	s	A
241	2505	s	λ
241	2508	s	l
241	2553	s	L
241	1928	<2s>	<>
242	236	.	.
242	237	 	 
242	236	<~>	<~>
242	236	<split-s>	<split-s>
242	236	<split-h>	<split-h>
242	236	<name2>	<name2>
242	240	<aphaerese>	<aphaerese>
242	243	<>	<aphaerese>
242	236	<elision3>	<elision3>
242	243	<>	<elision3>
242	236	<elision2>	<elision2>
242	243	<>	<elision2>
242	236	<elision1>	<elision1>
242	243	<>	<elision1>
242	244	.	υ
242	2521	s	υ
242	244	.	u
242	2521	s	u
242	2338	.	κ
242	2523	s	κ
242	2525	s	k
242	2527	s	U
242	2530	s	K
242	244	.	α
242	2533	s	α
242	244	.	a
242	2533	s	a
242	2534	s	A
242	2535	s	λ
242	2536	s	l
242	2537	s	L
242	1939	<2s>	<>
243	236	.	.
243	237	 	 
243	236	<~>	<~>
243	236	<split-s>	<split-s>
243	236	<split-h>	<split-h>
243	236	<name2>	<name2>
243	238	<>	<name>
243	240	<aphaerese>	<aphaerese>
243	243	<>	<aphaerese>
243	236	<elision3>	<elision3>
243	243	<>	<elision3>
243	236	<elision2>	<elision2>
243	243	<>	<elision2>
243	236	<elision1>	<elision1>
243	243	<>	<elision1>
243	244	.	υ
243	1756	s	υ
243	244	.	u
243	1756	s	u
243	2338	.	κ
243	2368	s	κ
243	2421	s	k
243	2442	s	U
243	2445	s	K
243	244	.	α
243	2497	s	α
243	244	.	a
243	2497	s	a
243	2500	s	A
243	2503	s	λ
243	2506	s	l
243	2509	s	L
243	1940	<2s>	<>
244	245	<>	<name>
244	244	<>	<aphaerese>
244	236	<elision3>	<elision3>
244	244	<>	<elision3>
244	236	<elision2>	<elision2>
244	244	<>	<elision2>
244	236	<elision1>	<elision1>
244	244	<>	<elision1>
244	248	<2s>	<>
245	246	<>	<aphaerese>
245	239	<elision3>	<elision3>
245	246	<>	<elision3>
245	239	<elision2>	<elision2>
245	246	<>	<elision2>
245	239	<elision1>	<elision1>
245	246	<>	<elision1>
245	249	<2s>	<>
246	244	<>	<aphaerese>
246	236	<elision3>	<elision3>
246	244	<>	<elision3>
246	236	<elision2>	<elision2>
246	244	<>	<elision2>
246	236	<elision1>	<elision1>
246	244	<>	<elision1>
246	247	<2s>	<>
247	248	<>	<aphaerese>
247	251	<elision3>	<elision3>
247	248	<>	<elision3>
247	251	<elision2>	<elision2>
247	248	<>	<elision2>
247	251	<elision1>	<elision1>
247	248	<>	<elision1>
247	1594	<K>	<>
248	249	<>	<name>
248	248	<>	<aphaerese>
248	251	<elision3>	<elision3>
248	248	<>	<elision3>
248	251	<elision2>	<elision2>
248	248	<>	<elision2>
248	251	<elision1>	<elision1>
248	248	<>	<elision1>
248	1595	<K>	<>
249	247	<>	<aphaerese>
249	250	<elision3>	<elision3>
249	247	<>	<elision3>
249	250	<elision2>	<elision2>
249	247	<>	<elision2>
249	250	<elision1>	<elision1>
249	247	<>	<elision1>
249	1593	<K>	<>
250	251	.	.
250	252	 	 
250	251	<~>	<~>
250	251	<split-s>	<split-s>
250	251	<split-h>	<split-h>
250	251	<name2>	<name2>
250	255	<aphaerese>	<aphaerese>
250	251	<>	<aphaerese>
250	251	<elision3>	<elision3>
250	251	<>	<elision3>
250	251	<elision2>	<elision2>
250	251	<>	<elision2>
250	251	<elision1>	<elision1>
250	251	<>	<elision1>
250	1546	.	υ
250	1590	H	υ
250	1546	.	u
250	1592	H	u
250	258	.	κ
250	1172	H	κ
250	1500	H	k
250	1513	H	U
250	1516	H	K
250	1546	.	α
250	1576	H	α
250	1546	.	a
250	1581	H	a
250	1343	H	A
250	1527	H	λ
250	1533	H	l
250	1536	H	L
251	251	.	.
251	252	 	 
251	251	<~>	<~>
251	251	<split-s>	<split-s>
251	251	<split-h>	<split-h>
251	251	<name2>	<name2>
251	253	<>	<name>
251	255	<aphaerese>	<aphaerese>
251	251	<>	<aphaerese>
251	251	<elision3>	<elision3>
251	251	<>	<elision3>
251	251	<elision2>	<elision2>
251	251	<>	<elision2>
251	251	<elision1>	<elision1>
251	251	<>	<elision1>
251	1546	.	υ
251	1590	H	υ
251	1546	.	u
251	1592	H	u
251	258	.	κ
251	1172	H	κ
251	1500	H	k
251	1513	H	U
251	1516	H	K
251	1546	.	α
251	1576	H	α
251	1546	.	a
251	1581	H	a
251	1343	H	A
251	1527	H	λ
251	1533	H	l
251	1536	H	L
252	251	.	.
252	252	 	 
252	251	<~>	<~>
252	251	<split-s>	<split-s>
252	251	<split-h>	<split-h>
252	251	<name2>	<name2>
252	253	<>	<name>
252	255	<aphaerese>	<aphaerese>
252	251	<>	<aphaerese>
252	251	<elision3>	<elision3>
252	251	<>	<elision3>
252	251	<elision2>	<elision2>
252	251	<>	<elision2>
252	251	<elision1>	<elision1>
252	251	<>	<elision1>
252	1546	.	υ
252	1549	H	υ
252	1546	.	u
252	1563	H	u
252	258	.	κ
252	1567	H	κ
252	1570	H	k
252	1513	H	U
252	1516	H	K
252	1546	.	α
252	1573	H	α
252	1546	.	a
252	1578	H	a
252	1343	H	A
252	1582	H	λ
252	1584	H	l
252	1536	H	L
253	250	.	.
253	254	 	 
253	250	<~>	<~>
253	250	<split-s>	<split-s>
253	250	<split-h>	<split-h>
253	250	<name2>	<name2>
253	257	<aphaerese>	<aphaerese>
253	250	<>	<aphaerese>
253	250	<elision3>	<elision3>
253	250	<>	<elision3>
253	250	<elision2>	<elision2>
253	250	<>	<elision2>
253	250	<elision1>	<elision1>
253	250	<>	<elision1>
253	1548	.	υ
253	1585	H	υ
253	1548	.	u
253	1589	H	u
253	260	.	κ
253	1537	H	κ
253	1541	H	k
253	1515	H	U
253	1545	H	K
253	1548	.	α
253	1575	H	α
253	1548	.	a
253	1580	H	a
253	1346	H	A
253	1529	H	λ
253	1535	H	l
253	1530	H	L
254	251	.	.
254	252	 	 
254	251	<~>	<~>
254	251	<split-s>	<split-s>
254	251	<split-h>	<split-h>
254	251	<name2>	<name2>
254	255	<aphaerese>	<aphaerese>
254	251	<>	<aphaerese>
254	251	<elision3>	<elision3>
254	251	<>	<elision3>
254	251	<elision2>	<elision2>
254	251	<>	<elision2>
254	251	<elision1>	<elision1>
254	251	<>	<elision1>
254	1546	.	υ
254	1549	H	υ
254	1546	.	u
254	1563	H	u
254	258	.	κ
254	1567	H	κ
254	1570	H	k
254	1513	H	U
254	1516	H	K
254	1546	.	α
254	1573	H	α
254	1546	.	a
254	1578	H	a
254	1343	H	A
254	1582	H	λ
254	1584	H	l
254	1536	H	L
255	251	.	.
255	252	 	 
255	251	<~>	<~>
255	251	<split-s>	<split-s>
255	251	<split-h>	<split-h>
255	251	<name2>	<name2>
255	256	<>	<name>
255	255	<aphaerese>	<aphaerese>
255	255	<>	<aphaerese>
255	251	<elision3>	<elision3>
255	255	<>	<elision3>
255	251	<elision2>	<elision2>
255	255	<>	<elision2>
255	251	<elision1>	<elision1>
255	255	<>	<elision1>
255	251	.	υ
255	251	.	u
255	258	.	κ
255	1172	H	κ
255	1500	H	k
255	1513	H	U
255	1516	H	K
255	251	.	α
255	251	.	a
255	1343	H	A
255	1527	H	λ
255	1533	H	l
255	1536	H	L
256	250	.	.
256	254	 	 
256	250	<~>	<~>
256	250	<split-s>	<split-s>
256	250	<split-h>	<split-h>
256	250	<name2>	<name2>
256	257	<aphaerese>	<aphaerese>
256	257	<>	<aphaerese>
256	250	<elision3>	<elision3>
256	257	<>	<elision3>
256	250	<elision2>	<elision2>
256	257	<>	<elision2>
256	250	<elision1>	<elision1>
256	257	<>	<elision1>
256	250	.	υ
256	250	.	u
256	260	.	κ
256	1537	H	κ
256	1541	H	k
256	1515	H	U
256	1545	H	K
256	250	.	α
256	250	.	a
256	1346	H	A
256	1529	H	λ
256	1535	H	l
256	1530	H	L
257	251	.	.
257	252	 	 
257	251	<~>	<~>
257	251	<split-s>	<split-s>
257	251	<split-h>	<split-h>
257	251	<name2>	<name2>
257	255	<aphaerese>	<aphaerese>
257	255	<>	<aphaerese>
257	251	<elision3>	<elision3>
257	255	<>	<elision3>
257	251	<elision2>	<elision2>
257	255	<>	<elision2>
257	251	<elision1>	<elision1>
257	255	<>	<elision1>
257	251	.	υ
257	251	.	u
257	258	.	κ
257	1172	H	κ
257	1500	H	k
257	1513	H	U
257	1516	H	K
257	251	.	α
257	251	.	a
257	1343	H	A
257	1527	H	λ
257	1533	H	l
257	1536	H	L
258	259	<>	<name>
258	258	<>	<aphaerese>
258	261	<elision3>	<elision3>
258	258	<>	<elision3>
258	261	<elision2>	<elision2>
258	258	<>	<elision2>
258	261	<elision1>	<elision1>
258	258	<>	<elision1>
259	260	<>	<aphaerese>
259	263	<elision3>	<elision3>
259	260	<>	<elision3>
259	263	<elision2>	<elision2>
259	260	<>	<elision2>
259	263	<elision1>	<elision1>
259	260	<>	<elision1>
260	258	<>	<aphaerese>
260	261	<elision3>	<elision3>
260	258	<>	<elision3>
260	261	<elision2>	<elision2>
260	258	<>	<elision2>
260	261	<elision1>	<elision1>
260	258	<>	<elision1>
261	262	<>	<name>
261	261	<>	<aphaerese>
261	261	<>	<elision3>
261	261	<>	<elision2>
261	261	<>	<elision1>
261	264	H	κ
261	1152	H	k
261	1156	H	K
261	1160	H	λ
261	1163	H	l
261	982	H	L
262	263	<>	<aphaerese>
262	263	<>	<elision3>
262	263	<>	<elision2>
262	263	<>	<elision1>
262	1166	H	κ
262	1170	H	k
262	1171	H	K
262	1162	H	λ
262	1165	H	l
262	984	H	L
263	261	<>	<aphaerese>
263	261	<>	<elision3>
263	261	<>	<elision2>
263	261	<>	<elision1>
263	264	H	κ
263	1152	H	k
263	1156	H	K
263	1160	H	λ
263	1163	H	l
263	982	H	L
264	265	<>	<name>
264	267	<>	<aphaerese>
264	267	<>	<elision3>
264	267	<>	<elision2>
264	267	<>	<elision1>
264	268	<kappa2K>	<>
264	1149	<kappa2L>	<>
265	266	<>	<aphaerese>
265	266	<>	<elision3>
265	266	<>	<elision2>
265	266	<>	<elision1>
265	269	<kappa2K>	<>
265	983	<kappa2L>	<>
266	267	<>	<aphaerese>
266	267	<>	<elision3>
266	267	<>	<elision2>
266	267	<>	<elision1>
266	270	<kappa2K>	<>
266	984	<kappa2L>	<>
267	265	<>	<name>
267	267	<>	<aphaerese>
267	267	<>	<elision3>
267	267	<>	<elision2>
267	267	<>	<elision1>
267	268	<kappa2K>	<>
267	982	<kappa2L>	<>
268	269	<>	<name>
268	268	<>	<aphaerese>
268	268	<>	<elision3>
268	268	<>	<elision2>
268	268	<>	<elision1>
268	271	s	κ
268	926	s	k
268	959	s	K
268	271	s	λ
268	974	s	l
268	977	s	L
269	270	<>	<aphaerese>
269	270	<>	<elision3>
269	270	<>	<elision2>
269	270	<>	<elision1>
269	919	s	κ
269	928	s	k
269	962	s	K
269	919	s	λ
269	976	s	l
269	979	s	L
270	268	<>	<aphaerese>
270	268	<>	<elision3>
270	268	<>	<elision2>
270	268	<>	<elision1>
270	271	s	κ
270	926	s	k
270	959	s	K
270	271	s	λ
270	974	s	l
270	977	s	L
271	272	.	.
271	273	 	 
271	272	<~>	<~>
271	272	<split-s>	<split-s>
271	272	<split-h>	<split-h>
271	272	<name2>	<name2>
271	918	<>	<name>
271	276	<aphaerese>	<aphaerese>
271	271	<>	<aphaerese>
271	271	<>	<elision3>
271	271	<>	<elision2>
271	271	<>	<elision1>
271	280	.	υ
271	394	s	υ
271	280	.	u
271	394	s	u
271	280	.	κ
271	920	s	κ
271	780	s	k
271	801	s	U
271	900	s	K
271	280	.	α
271	856	s	α
271	280	.	a
271	856	s	a
271	859	s	A
271	280	.	λ
271	920	s	λ
271	865	s	l
271	910	s	L
271	710	<2s>	<>
272	272	.	.
272	273	 	 
272	272	<~>	<~>
272	272	<split-s>	<split-s>
272	272	<split-h>	<split-h>
272	272	<name2>	<name2>
272	917	<>	<name>
272	276	<aphaerese>	<aphaerese>
272	272	<>	<aphaerese>
272	272	<elision3>	<elision3>
272	272	<>	<elision3>
272	272	<elision2>	<elision2>
272	272	<>	<elision2>
272	272	<elision1>	<elision1>
272	272	<>	<elision1>
272	280	.	υ
272	394	s	υ
272	280	.	u
272	394	s	u
272	697	.	κ
272	727	s	κ
272	780	s	k
272	801	s	U
272	900	s	K
272	280	.	α
272	856	s	α
272	280	.	a
272	856	s	a
272	859	s	A
272	862	s	λ
272	865	s	l
272	910	s	L
272	435	<2s>	<>
273	272	.	.
273	273	 	 
273	272	<~>	<~>
273	272	<split-s>	<split-s>
273	272	<split-h>	<split-h>
273	272	<name2>	<name2>
273	274	<>	<name>
273	276	<aphaerese>	<aphaerese>
273	279	<>	<aphaerese>
273	272	<elision3>	<elision3>
273	279	<>	<elision3>
273	272	<elision2>	<elision2>
273	279	<>	<elision2>
273	272	<elision1>	<elision1>
273	279	<>	<elision1>
273	280	.	υ
273	880	s	υ
273	280	.	u
273	880	s	u
273	697	.	κ
273	882	s	κ
273	884	s	k
273	886	s	U
273	889	s	K
273	280	.	α
273	892	s	α
273	280	.	a
273	892	s	a
273	893	s	A
273	894	s	λ
273	895	s	l
273	896	s	L
273	435	<2s>	<>
274	275	.	.
274	278	 	 
274	275	<~>	<~>
274	275	<split-s>	<split-s>
274	275	<split-h>	<split-h>
274	275	<name2>	<name2>
274	899	<aphaerese>	<aphaerese>
274	916	<>	<aphaerese>
274	275	<elision3>	<elision3>
274	916	<>	<elision3>
274	275	<elision2>	<elision2>
274	916	<>	<elision2>
274	275	<elision1>	<elision1>
274	916	<>	<elision1>
274	282	.	υ
274	693	s	υ
274	282	.	u
274	693	s	u
274	699	.	κ
274	729	s	κ
274	782	s	k
274	803	s	U
274	808	s	K
274	282	.	α
274	858	s	α
274	282	.	a
274	858	s	a
274	861	s	A
274	864	s	λ
274	867	s	l
274	870	s	L
274	436	<2s>	<>
275	272	.	.
275	273	 	 
275	272	<~>	<~>
275	272	<split-s>	<split-s>
275	272	<split-h>	<split-h>
275	272	<name2>	<name2>
275	276	<aphaerese>	<aphaerese>
275	272	<>	<aphaerese>
275	272	<elision3>	<elision3>
275	272	<>	<elision3>
275	272	<elision2>	<elision2>
275	272	<>	<elision2>
275	272	<elision1>	<elision1>
275	272	<>	<elision1>
275	280	.	υ
275	394	s	υ
275	280	.	u
275	394	s	u
275	697	.	κ
275	727	s	κ
275	780	s	k
275	801	s	U
275	900	s	K
275	280	.	α
275	856	s	α
275	280	.	a
275	856	s	a
275	859	s	A
275	862	s	λ
275	865	s	l
275	910	s	L
275	434	<2s>	<>
276	272	.	.
276	273	 	 
276	272	<~>	<~>
276	272	<split-s>	<split-s>
276	272	<split-h>	<split-h>
276	272	<name2>	<name2>
276	277	<>	<name>
276	276	<aphaerese>	<aphaerese>
276	276	<>	<aphaerese>
276	272	<elision3>	<elision3>
276	276	<>	<elision3>
276	272	<elision2>	<elision2>
276	276	<>	<elision2>
276	272	<elision1>	<elision1>
276	276	<>	<elision1>
276	272	.	υ
276	272	.	u
276	697	.	κ
276	727	s	κ
276	780	s	k
276	801	s	U
276	900	s	K
276	272	.	α
276	272	.	a
276	859	s	A
276	862	s	λ
276	865	s	l
276	910	s	L
276	429	<2s>	<>
277	275	.	.
277	278	 	 
277	275	<~>	<~>
277	275	<split-s>	<split-s>
277	275	<split-h>	<split-h>
277	275	<name2>	<name2>
277	899	<aphaerese>	<aphaerese>
277	899	<>	<aphaerese>
277	275	<elision3>	<elision3>
277	899	<>	<elision3>
277	275	<elision2>	<elision2>
277	899	<>	<elision2>
277	275	<elision1>	<elision1>
277	899	<>	<elision1>
277	275	.	υ
277	275	.	u
277	699	.	κ
277	729	s	κ
277	782	s	k
277	803	s	U
277	902	s	K
277	275	.	α
277	275	.	a
277	861	s	A
277	864	s	λ
277	867	s	l
277	912	s	L
277	430	<2s>	<>
278	272	.	.
278	273	 	 
278	272	<~>	<~>
278	272	<split-s>	<split-s>
278	272	<split-h>	<split-h>
278	272	<name2>	<name2>
278	276	<aphaerese>	<aphaerese>
278	279	<>	<aphaerese>
278	272	<elision3>	<elision3>
278	279	<>	<elision3>
278	272	<elision2>	<elision2>
278	279	<>	<elision2>
278	272	<elision1>	<elision1>
278	279	<>	<elision1>
278	280	.	υ
278	880	s	υ
278	280	.	u
278	880	s	u
278	697	.	κ
278	882	s	κ
278	884	s	k
278	886	s	U
278	889	s	K
278	280	.	α
278	892	s	α
278	280	.	a
278	892	s	a
278	893	s	A
278	894	s	λ
278	895	s	l
278	896	s	L
278	434	<2s>	<>
279	272	.	.
279	273	 	 
279	272	<~>	<~>
279	272	<split-s>	<split-s>
279	272	<split-h>	<split-h>
279	272	<name2>	<name2>
279	274	<>	<name>
279	276	<aphaerese>	<aphaerese>
279	279	<>	<aphaerese>
279	272	<elision3>	<elision3>
279	279	<>	<elision3>
279	272	<elision2>	<elision2>
279	279	<>	<elision2>
279	272	<elision1>	<elision1>
279	279	<>	<elision1>
279	280	.	υ
279	394	s	υ
279	280	.	u
279	394	s	u
279	697	.	κ
279	727	s	κ
279	780	s	k
279	801	s	U
279	804	s	K
279	280	.	α
279	856	s	α
279	280	.	a
279	856	s	a
279	859	s	A
279	862	s	λ
279	865	s	l
279	868	s	L
279	435	<2s>	<>
280	281	<>	<name>
280	280	<>	<aphaerese>
280	272	<elision3>	<elision3>
280	280	<>	<elision3>
280	272	<elision2>	<elision2>
280	280	<>	<elision2>
280	272	<elision1>	<elision1>
280	280	<>	<elision1>
280	284	<2s>	<>
281	282	<>	<aphaerese>
281	275	<elision3>	<elision3>
281	282	<>	<elision3>
281	275	<elision2>	<elision2>
281	282	<>	<elision2>
281	275	<elision1>	<elision1>
281	282	<>	<elision1>
281	285	<2s>	<>
282	280	<>	<aphaerese>
282	272	<elision3>	<elision3>
282	280	<>	<elision3>
282	272	<elision2>	<elision2>
282	280	<>	<elision2>
282	272	<elision1>	<elision1>
282	280	<>	<elision1>
282	283	<2s>	<>
283	284	<>	<aphaerese>
283	284	<>	<elision3>
283	284	<>	<elision2>
283	284	<>	<elision1>
283	287	<K>	<>
284	285	<>	<name>
284	284	<>	<aphaerese>
284	284	<>	<elision3>
284	284	<>	<elision2>
284	284	<>	<elision1>
284	288	<K>	<>
285	283	<>	<aphaerese>
285	283	<>	<elision3>
285	283	<>	<elision2>
285	283	<>	<elision1>
285	286	<K>	<>
286	287	<>	<aphaerese>
286	291	<elision3>	<elision3>
286	287	<>	<elision3>
286	291	<elision2>	<elision2>
286	287	<>	<elision2>
286	291	<elision1>	<elision1>
286	287	<>	<elision1>
287	288	<>	<aphaerese>
287	289	<elision3>	<elision3>
287	288	<>	<elision3>
287	289	<elision2>	<elision2>
287	288	<>	<elision2>
287	289	<elision1>	<elision1>
287	288	<>	<elision1>
288	286	<>	<name>
288	288	<>	<aphaerese>
288	289	<elision3>	<elision3>
288	288	<>	<elision3>
288	289	<elision2>	<elision2>
288	288	<>	<elision2>
288	289	<elision1>	<elision1>
288	288	<>	<elision1>
289	289	.	.
289	289	<~>	<~>
289	289	<split-s>	<split-s>
289	289	<split-h>	<split-h>
289	289	<name2>	<name2>
289	290	<>	<name>
289	292	<aphaerese>	<aphaerese>
289	289	<>	<aphaerese>
289	289	<elision3>	<elision3>
289	289	<>	<elision3>
289	289	<elision2>	<elision2>
289	289	<>	<elision2>
289	289	<elision1>	<elision1>
289	289	<>	<elision1>
289	288	.	υ
289	376	H	υ
289	288	.	u
289	385	H	u
289	295	.	κ
289	334	H	κ
289	358	H	k
289	361	H	U
289	364	H	K
289	288	.	α
289	388	H	α
289	288	.	a
289	391	H	a
289	347	H	A
289	367	H	λ
289	373	H	l
289	371	H	L
290	291	.	.
290	291	<~>	<~>
290	291	<split-s>	<split-s>
290	291	<split-h>	<split-h>
290	291	<name2>	<name2>
290	294	<aphaerese>	<aphaerese>
290	291	<>	<aphaerese>
290	291	<elision3>	<elision3>
290	291	<>	<elision3>
290	291	<elision2>	<elision2>
290	291	<>	<elision2>
290	291	<elision1>	<elision1>
290	291	<>	<elision1>
290	287	.	υ
290	378	H	υ
290	287	.	u
290	387	H	u
290	297	.	κ
290	336	H	κ
290	360	H	k
290	363	H	U
290	366	H	K
290	287	.	α
290	390	H	α
290	287	.	a
290	393	H	a
290	346	H	A
290	369	H	λ
290	375	H	l
290	370	H	L
291	289	.	.
291	289	<~>	<~>
291	289	<split-s>	<split-s>
291	289	<split-h>	<split-h>
291	289	<name2>	<name2>
291	292	<aphaerese>	<aphaerese>
291	289	<>	<aphaerese>
291	289	<elision3>	<elision3>
291	289	<>	<elision3>
291	289	<elision2>	<elision2>
291	289	<>	<elision2>
291	289	<elision1>	<elision1>
291	289	<>	<elision1>
291	288	.	υ
291	376	H	υ
291	288	.	u
291	385	H	u
291	295	.	κ
291	334	H	κ
291	358	H	k
291	361	H	U
291	364	H	K
291	288	.	α
291	388	H	α
291	288	.	a
291	391	H	a
291	347	H	A
291	367	H	λ
291	373	H	l
291	371	H	L
292	289	.	.
292	289	<~>	<~>
292	289	<split-s>	<split-s>
292	289	<split-h>	<split-h>
292	289	<name2>	<name2>
292	293	<>	<name>
292	292	<aphaerese>	<aphaerese>
292	292	<>	<aphaerese>
292	289	<elision3>	<elision3>
292	292	<>	<elision3>
292	289	<elision2>	<elision2>
292	292	<>	<elision2>
292	289	<elision1>	<elision1>
292	292	<>	<elision1>
292	289	.	υ
292	289	.	u
292	295	.	κ
292	334	H	κ
292	358	H	k
292	361	H	U
292	364	H	K
292	289	.	α
292	289	.	a
292	347	H	A
292	367	H	λ
292	373	H	l
292	371	H	L
293	291	.	.
293	291	<~>	<~>
293	291	<split-s>	<split-s>
293	291	<split-h>	<split-h>
293	291	<name2>	<name2>
293	294	<aphaerese>	<aphaerese>
293	294	<>	<aphaerese>
293	291	<elision3>	<elision3>
293	294	<>	<elision3>
293	291	<elision2>	<elision2>
293	294	<>	<elision2>
293	291	<elision1>	<elision1>
293	294	<>	<elision1>
293	291	.	υ
293	291	.	u
293	297	.	κ
293	336	H	κ
293	360	H	k
293	363	H	U
293	366	H	K
293	291	.	α
293	291	.	a
293	346	H	A
293	369	H	λ
293	375	H	l
293	370	H	L
294	289	.	.
294	289	<~>	<~>
294	289	<split-s>	<split-s>
294	289	<split-h>	<split-h>
294	289	<name2>	<name2>
294	292	<aphaerese>	<aphaerese>
294	292	<>	<aphaerese>
294	289	<elision3>	<elision3>
294	292	<>	<elision3>
294	289	<elision2>	<elision2>
294	292	<>	<elision2>
294	289	<elision1>	<elision1>
294	292	<>	<elision1>
294	289	.	υ
294	289	.	u
294	295	.	κ
294	334	H	κ
294	358	H	k
294	361	H	U
294	364	H	K
294	289	.	α
294	289	.	a
294	347	H	A
294	367	H	λ
294	373	H	l
294	371	H	L
295	296	<>	<name>
295	295	<>	<aphaerese>
295	298	<elision3>	<elision3>
295	295	<>	<elision3>
295	298	<elision2>	<elision2>
295	295	<>	<elision2>
295	298	<elision1>	<elision1>
295	295	<>	<elision1>
296	297	<>	<aphaerese>
296	300	<elision3>	<elision3>
296	297	<>	<elision3>
296	300	<elision2>	<elision2>
296	297	<>	<elision2>
296	300	<elision1>	<elision1>
296	297	<>	<elision1>
297	295	<>	<aphaerese>
297	298	<elision3>	<elision3>
297	295	<>	<elision3>
297	298	<elision2>	<elision2>
297	295	<>	<elision2>
297	298	<elision1>	<elision1>
297	295	<>	<elision1>
298	299	<>	<name>
298	298	<>	<aphaerese>
298	298	<>	<elision3>
298	298	<>	<elision2>
298	298	<>	<elision1>
298	301	H	κ
298	322	H	k
298	325	H	K
298	328	H	λ
298	331	H	l
298	317	H	L
299	300	<>	<aphaerese>
299	300	<>	<elision3>
299	300	<>	<elision2>
299	300	<>	<elision1>
299	303	H	κ
299	324	H	k
299	327	H	K
299	330	H	λ
299	333	H	l
299	316	H	L
300	298	<>	<aphaerese>
300	298	<>	<elision3>
300	298	<>	<elision2>
300	298	<>	<elision1>
300	301	H	κ
300	322	H	k
300	325	H	K
300	328	H	λ
300	331	H	l
300	317	H	L
301	302	<>	<name>
301	301	<>	<aphaerese>
301	301	<>	<elision3>
301	301	<>	<elision2>
301	301	<>	<elision1>
301	305	<kappa2K>	<>
301	317	<kappa2L>	<>
302	303	<>	<aphaerese>
302	303	<>	<elision3>
302	303	<>	<elision2>
302	303	<>	<elision1>
302	306	<kappa2K>	<>
302	318	<kappa2L>	<>
303	301	<>	<aphaerese>
303	301	<>	<elision3>
303	301	<>	<elision2>
303	301	<>	<elision1>
303	304	<kappa2K>	<>
303	316	<kappa2L>	<>
304	305	<>	<aphaerese>
304	305	<>	<elision3>
304	305	<>	<elision2>
304	305	<>	<elision1>
304	308	s	κ
304	308	s	k
304	308	s	λ
304	308	s	l
305	306	<>	<name>
305	305	<>	<aphaerese>
305	305	<>	<elision3>
305	305	<>	<elision2>
305	305	<>	<elision1>
305	308	s	κ
305	308	s	k
305	308	s	λ
305	308	s	l
306	304	<>	<aphaerese>
306	304	<>	<elision3>
306	304	<>	<elision2>
306	304	<>	<elision1>
306	307	s	κ
306	307	s	k
306	307	s	λ
306	307	s	l
307	308	<>	<aphaerese>
307	308	<>	<elision3>
307	308	<>	<elision2>
307	308	<>	<elision1>
307	311	<2m>	<>
308	309	<>	<name>
308	308	<>	<aphaerese>
308	308	<>	<elision3>
308	308	<>	<elision2>
308	308	<>	<elision1>
308	312	<2m>	<>
309	307	<>	<aphaerese>
309	307	<>	<elision3>
309	307	<>	<elision2>
309	307	<>	<elision1>
309	310	<2m>	<>
310	311	<>	<aphaerese>
310	311	<>	<elision3>
310	311	<>	<elision2>
310	311	<>	<elision1>
310	314	<8h>	<>
311	312	<>	<aphaerese>
311	312	<>	<elision3>
311	312	<>	<elision2>
311	312	<>	<elision1>
311	315	<8h>	<>
312	310	<>	<name>
312	312	<>	<aphaerese>
312	312	<>	<elision3>
312	312	<>	<elision2>
312	312	<>	<elision1>
312	313	<8h>	<>
313	314	<>	<name>
313	313	<>	<aphaerese>
313	313	<>	<elision3>
313	313	<>	<elision2>
313	313	<>	<elision1>
313
314	315	<>	<aphaerese>
314	315	<>	<elision3>
314	315	<>	<elision2>
314	315	<>	<elision1>
314
315	313	<>	<aphaerese>
315	313	<>	<elision3>
315	313	<>	<elision2>
315	313	<>	<elision1>
315
316	317	<>	<aphaerese>
316	317	<>	<elision3>
316	317	<>	<elision2>
316	317	<>	<elision1>
316	320	s	κ
316	320	s	k
316	320	s	λ
316	320	s	l
317	318	<>	<name>
317	317	<>	<aphaerese>
317	317	<>	<elision3>
317	317	<>	<elision2>
317	317	<>	<elision1>
317	320	s	κ
317	320	s	k
317	320	s	λ
317	320	s	l
318	316	<>	<aphaerese>
318	316	<>	<elision3>
318	316	<>	<elision2>
318	316	<>	<elision1>
318	319	s	κ
318	319	s	k
318	319	s	λ
318	319	s	l
319	320	<>	<aphaerese>
319	320	<>	<elision3>
319	320	<>	<elision2>
319	320	<>	<elision1>
319	311	<w>	<>
320	321	<>	<name>
320	320	<>	<aphaerese>
320	320	<>	<elision3>
320	320	<>	<elision2>
320	320	<>	<elision1>
320	312	<w>	<>
321	319	<>	<aphaerese>
321	319	<>	<elision3>
321	319	<>	<elision2>
321	319	<>	<elision1>
321	310	<w>	<>
322	323	<>	<name>
322	322	<>	<aphaerese>
322	322	<>	<elision3>
322	322	<>	<elision2>
322	322	<>	<elision1>
322	305	<k2K>	<>
322	317	<k2L>	<>
323	324	<>	<aphaerese>
323	324	<>	<elision3>
323	324	<>	<elision2>
323	324	<>	<elision1>
323	306	<k2K>	<>
323	318	<k2L>	<>
324	322	<>	<aphaerese>
324	322	<>	<elision3>
324	322	<>	<elision2>
324	322	<>	<elision1>
324	304	<k2K>	<>
324	316	<k2L>	<>
325	326	<>	<name>
325	325	<>	<aphaerese>
325	325	<>	<elision3>
325	325	<>	<elision2>
325	325	<>	<elision1>
325	308	s	κ
325	308	s	k
325	308	s	λ
325	308	s	l
325	317	<K2L>	<>
326	327	<>	<aphaerese>
326	327	<>	<elision3>
326	327	<>	<elision2>
326	327	<>	<elision1>
326	307	s	κ
326	307	s	k
326	307	s	λ
326	307	s	l
326	318	<K2L>	<>
327	325	<>	<aphaerese>
327	325	<>	<elision3>
327	325	<>	<elision2>
327	325	<>	<elision1>
327	308	s	κ
327	308	s	k
327	308	s	λ
327	308	s	l
327	316	<K2L>	<>
328	329	<>	<name>
328	328	<>	<aphaerese>
328	328	<>	<elision3>
328	328	<>	<elision2>
328	328	<>	<elision1>
328	317	<lambda2L>	<>
329	330	<>	<aphaerese>
329	330	<>	<elision3>
329	330	<>	<elision2>
329	330	<>	<elision1>
329	318	<lambda2L>	<>
330	328	<>	<aphaerese>
330	328	<>	<elision3>
330	328	<>	<elision2>
330	328	<>	<elision1>
330	316	<lambda2L>	<>
331	332	<>	<name>
331	331	<>	<aphaerese>
331	331	<>	<elision3>
331	331	<>	<elision2>
331	331	<>	<elision1>
331	317	<l2L>	<>
332	333	<>	<aphaerese>
332	333	<>	<elision3>
332	333	<>	<elision2>
332	333	<>	<elision1>
332	318	<l2L>	<>
333	331	<>	<aphaerese>
333	331	<>	<elision3>
333	331	<>	<elision2>
333	331	<>	<elision1>
333	316	<l2L>	<>
334	335	<>	<name>
334	334	<>	<aphaerese>
334	334	<>	<elision3>
334	334	<>	<elision2>
334	334	<>	<elision1>
334	338	<kappa2K>	<>
334	347	<kappa2L>	<>
334	356	<lambda2L>	<>
335	336	<>	<aphaerese>
335	336	<>	<elision3>
335	336	<>	<elision2>
335	336	<>	<elision1>
335	339	<kappa2K>	<>
335	348	<kappa2L>	<>
335	357	<lambda2L>	<>
336	334	<>	<aphaerese>
336	334	<>	<elision3>
336	334	<>	<elision2>
336	334	<>	<elision1>
336	337	<kappa2K>	<>
336	346	<kappa2L>	<>
336	355	<lambda2L>	<>
337	338	.	.
337	338	<~>	<~>
337	338	<split-s>	<split-s>
337	338	<split-h>	<split-h>
337	338	<name2>	<name2>
337	341	<aphaerese>	<aphaerese>
337	338	<>	<aphaerese>
337	338	<elision3>	<elision3>
337	338	<>	<elision3>
337	338	<elision2>	<elision2>
337	338	<>	<elision2>
337	338	<elision1>	<elision1>
337	338	<>	<elision1>
337	344	.	υ
337	344	.	u
337	308	s	κ
337	308	s	k
337	344	.	α
337	344	.	a
337	308	s	λ
337	308	s	l
337	311	<1m>	<>
338	338	.	.
338	338	<~>	<~>
338	338	<split-s>	<split-s>
338	338	<split-h>	<split-h>
338	338	<name2>	<name2>
338	339	<>	<name>
338	341	<aphaerese>	<aphaerese>
338	338	<>	<aphaerese>
338	338	<elision3>	<elision3>
338	338	<>	<elision3>
338	338	<elision2>	<elision2>
338	338	<>	<elision2>
338	338	<elision1>	<elision1>
338	338	<>	<elision1>
338	344	.	υ
338	344	.	u
338	308	s	κ
338	308	s	k
338	344	.	α
338	344	.	a
338	308	s	λ
338	308	s	l
338	312	<1m>	<>
339	337	.	.
339	337	<~>	<~>
339	337	<split-s>	<split-s>
339	337	<split-h>	<split-h>
339	337	<name2>	<name2>
339	340	<aphaerese>	<aphaerese>
339	337	<>	<aphaerese>
339	337	<elision3>	<elision3>
339	337	<>	<elision3>
339	337	<elision2>	<elision2>
339	337	<>	<elision2>
339	337	<elision1>	<elision1>
339	337	<>	<elision1>
339	343	.	υ
339	343	.	u
339	307	s	κ
339	307	s	k
339	343	.	α
339	343	.	a
339	307	s	λ
339	307	s	l
339	310	<1m>	<>
340	338	.	.
340	338	<~>	<~>
340	338	<split-s>	<split-s>
340	338	<split-h>	<split-h>
340	338	<name2>	<name2>
340	341	<aphaerese>	<aphaerese>
340	341	<>	<aphaerese>
340	338	<elision3>	<elision3>
340	341	<>	<elision3>
340	338	<elision2>	<elision2>
340	341	<>	<elision2>
340	338	<elision1>	<elision1>
340	341	<>	<elision1>
340	338	.	υ
340	338	.	u
340	308	s	κ
340	308	s	k
340	338	.	α
340	338	.	a
340	308	s	λ
340	308	s	l
340	311	<1m>	<>
341	338	.	.
341	338	<~>	<~>
341	338	<split-s>	<split-s>
341	338	<split-h>	<split-h>
341	338	<name2>	<name2>
341	342	<>	<name>
341	341	<aphaerese>	<aphaerese>
341	341	<>	<aphaerese>
341	338	<elision3>	<elision3>
341	341	<>	<elision3>
341	338	<elision2>	<elision2>
341	341	<>	<elision2>
341	338	<elision1>	<elision1>
341	341	<>	<elision1>
341	338	.	υ
341	338	.	u
341	308	s	κ
341	308	s	k
341	338	.	α
341	338	.	a
341	308	s	λ
341	308	s	l
341	312	<1m>	<>
342	337	.	.
342	337	<~>	<~>
342	337	<split-s>	<split-s>
342	337	<split-h>	<split-h>
342	337	<name2>	<name2>
342	340	<aphaerese>	<aphaerese>
342	340	<>	<aphaerese>
342	337	<elision3>	<elision3>
342	340	<>	<elision3>
342	337	<elision2>	<elision2>
342	340	<>	<elision2>
342	337	<elision1>	<elision1>
342	340	<>	<elision1>
342	337	.	υ
342	337	.	u
342	307	s	κ
342	307	s	k
342	337	.	α
342	337	.	a
342	307	s	λ
342	307	s	l
342	310	<1m>	<>
343	344	<>	<aphaerese>
343	338	<elision3>	<elision3>
343	344	<>	<elision3>
343	338	<elision2>	<elision2>
343	344	<>	<elision2>
343	338	<elision1>	<elision1>
343	344	<>	<elision1>
344	345	<>	<name>
344	344	<>	<aphaerese>
344	338	<elision3>	<elision3>
344	344	<>	<elision3>
344	338	<elision2>	<elision2>
344	344	<>	<elision2>
344	338	<elision1>	<elision1>
344	344	<>	<elision1>
345	343	<>	<aphaerese>
345	337	<elision3>	<elision3>
345	343	<>	<elision3>
345	337	<elision2>	<elision2>
345	343	<>	<elision2>
345	337	<elision1>	<elision1>
345	343	<>	<elision1>
346	347	.	.
346	347	<~>	<~>
346	347	<split-s>	<split-s>
346	347	<split-h>	<split-h>
346	347	<name2>	<name2>
346	350	<aphaerese>	<aphaerese>
346	347	<>	<aphaerese>
346	347	<elision3>	<elision3>
346	347	<>	<elision3>
346	347	<elision2>	<elision2>
346	347	<>	<elision2>
346	347	<elision1>	<elision1>
346	347	<>	<elision1>
346	353	.	υ
346	353	.	u
346	320	s	κ
346	320	s	k
346	353	.	α
346	353	.	a
346	320	s	λ
346	320	s	l
346	311	<1m>	<>
347	347	.	.
347	347	<~>	<~>
347	347	<split-s>	<split-s>
347	347	<split-h>	<split-h>
347	347	<name2>	<name2>
347	348	<>	<name>
347	350	<aphaerese>	<aphaerese>
347	347	<>	<aphaerese>
347	347	<elision3>	<elision3>
347	347	<>	<elision3>
347	347	<elision2>	<elision2>
347	347	<>	<elision2>
347	347	<elision1>	<elision1>
347	347	<>	<elision1>
347	353	.	υ
347	353	.	u
347	320	s	κ
347	320	s	k
347	353	.	α
347	353	.	a
347	320	s	λ
347	320	s	l
347	312	<1m>	<>
348	346	.	.
348	346	<~>	<~>
348	346	<split-s>	<split-s>
348	346	<split-h>	<split-h>
348	346	<name2>	<name2>
348	349	<aphaerese>	<aphaerese>
348	346	<>	<aphaerese>
348	346	<elision3>	<elision3>
348	346	<>	<elision3>
348	346	<elision2>	<elision2>
348	346	<>	<elision2>
348	346	<elision1>	<elision1>
348	346	<>	<elision1>
348	352	.	υ
348	352	.	u
348	319	s	κ
348	319	s	k
348	352	.	α
348	352	.	a
348	319	s	λ
348	319	s	l
348	310	<1m>	<>
349	347	.	.
349	347	<~>	<~>
349	347	<split-s>	<split-s>
349	347	<split-h>	<split-h>
349	347	<name2>	<name2>
349	350	<aphaerese>	<aphaerese>
349	350	<>	<aphaerese>
349	347	<elision3>	<elision3>
349	350	<>	<elision3>
349	347	<elision2>	<elision2>
349	350	<>	<elision2>
349	347	<elision1>	<elision1>
349	350	<>	<elision1>
349	347	.	υ
349	347	.	u
349	320	s	κ
349	320	s	k
349	347	.	α
349	347	.	a
349	320	s	λ
349	320	s	l
349	311	<1m>	<>
350	347	.	.
350	347	<~>	<~>
350	347	<split-s>	<split-s>
350	347	<split-h>	<split-h>
350	347	<name2>	<name2>
350	351	<>	<name>
350	350	<aphaerese>	<aphaerese>
350	350	<>	<aphaerese>
350	347	<elision3>	<elision3>
350	350	<>	<elision3>
350	347	<elision2>	<elision2>
350	350	<>	<elision2>
350	347	<elision1>	<elision1>
350	350	<>	<elision1>
350	347	.	υ
350	347	.	u
350	320	s	κ
350	320	s	k
350	347	.	α
350	347	.	a
350	320	s	λ
350	320	s	l
350	312	<1m>	<>
351	346	.	.
351	346	<~>	<~>
351	346	<split-s>	<split-s>
351	346	<split-h>	<split-h>
351	346	<name2>	<name2>
351	349	<aphaerese>	<aphaerese>
351	349	<>	<aphaerese>
351	346	<elision3>	<elision3>
351	349	<>	<elision3>
351	346	<elision2>	<elision2>
351	349	<>	<elision2>
351	346	<elision1>	<elision1>
351	349	<>	<elision1>
351	346	.	υ
351	346	.	u
351	319	s	κ
351	319	s	k
351	346	.	α
351	346	.	a
351	319	s	λ
351	319	s	l
351	310	<1m>	<>
352	353	<>	<aphaerese>
352	347	<elision3>	<elision3>
352	353	<>	<elision3>
352	347	<elision2>	<elision2>
352	353	<>	<elision2>
352	347	<elision1>	<elision1>
352	353	<>	<elision1>
353	354	<>	<name>
353	353	<>	<aphaerese>
353	347	<elision3>	<elision3>
353	353	<>	<elision3>
353	347	<elision2>	<elision2>
353	353	<>	<elision2>
353	347	<elision1>	<elision1>
353	353	<>	<elision1>
354	352	<>	<aphaerese>
354	346	<elision3>	<elision3>
354	352	<>	<elision3>
354	346	<elision2>	<elision2>
354	352	<>	<elision2>
354	346	<elision1>	<elision1>
354	352	<>	<elision1>
355	356	<>	<aphaerese>
355	356	<>	<elision3>
355	356	<>	<elision2>
355	356	<>	<elision1>
355	353	.	κ
355	353	.	λ
356	357	<>	<name>
356	356	<>	<aphaerese>
356	356	<>	<elision3>
356	356	<>	<elision2>
356	356	<>	<elision1>
356	353	.	κ
356	353	.	λ
357	355	<>	<aphaerese>
357	355	<>	<elision3>
357	355	<>	<elision2>
357	355	<>	<elision1>
357	352	.	κ
357	352	.	λ
358	359	<>	<name>
358	358	<>	<aphaerese>
358	358	<>	<elision3>
358	358	<>	<elision2>
358	358	<>	<elision1>
358	338	<k2K>	<>
358	347	<k2L>	<>
358	356	<l2L>	<>
359	360	<>	<aphaerese>
359	360	<>	<elision3>
359	360	<>	<elision2>
359	360	<>	<elision1>
359	339	<k2K>	<>
359	348	<k2L>	<>
359	357	<l2L>	<>
360	358	<>	<aphaerese>
360	358	<>	<elision3>
360	358	<>	<elision2>
360	358	<>	<elision1>
360	337	<k2K>	<>
360	346	<k2L>	<>
360	355	<l2L>	<>
361	338	.	.
361	338	<~>	<~>
361	338	<split-s>	<split-s>
361	338	<split-h>	<split-h>
361	338	<name2>	<name2>
361	362	<>	<name>
361	341	<aphaerese>	<aphaerese>
361	361	<>	<aphaerese>
361	338	<elision3>	<elision3>
361	361	<>	<elision3>
361	338	<elision2>	<elision2>
361	361	<>	<elision2>
361	338	<elision1>	<elision1>
361	361	<>	<elision1>
361	344	.	υ
361	344	.	u
361	308	s	κ
361	308	s	k
361	344	.	α
361	344	.	a
361	308	s	λ
361	308	s	l
361	312	<1m>	<>
361	347	<U2L>	<>
362	337	.	.
362	337	<~>	<~>
362	337	<split-s>	<split-s>
362	337	<split-h>	<split-h>
362	337	<name2>	<name2>
362	340	<aphaerese>	<aphaerese>
362	363	<>	<aphaerese>
362	337	<elision3>	<elision3>
362	363	<>	<elision3>
362	337	<elision2>	<elision2>
362	363	<>	<elision2>
362	337	<elision1>	<elision1>
362	363	<>	<elision1>
362	343	.	υ
362	343	.	u
362	307	s	κ
362	307	s	k
362	343	.	α
362	343	.	a
362	307	s	λ
362	307	s	l
362	310	<1m>	<>
362	348	<U2L>	<>
363	338	.	.
363	338	<~>	<~>
363	338	<split-s>	<split-s>
363	338	<split-h>	<split-h>
363	338	<name2>	<name2>
363	341	<aphaerese>	<aphaerese>
363	361	<>	<aphaerese>
363	338	<elision3>	<elision3>
363	361	<>	<elision3>
363	338	<elision2>	<elision2>
363	361	<>	<elision2>
363	338	<elision1>	<elision1>
363	361	<>	<elision1>
363	344	.	υ
363	344	.	u
363	308	s	κ
363	308	s	k
363	344	.	α
363	344	.	a
363	308	s	λ
363	308	s	l
363	311	<1m>	<>
363	346	<U2L>	<>
364	338	.	.
364	338	<~>	<~>
364	338	<split-s>	<split-s>
364	338	<split-h>	<split-h>
364	338	<name2>	<name2>
364	365	<>	<name>
364	341	<aphaerese>	<aphaerese>
364	364	<>	<aphaerese>
364	338	<elision3>	<elision3>
364	364	<>	<elision3>
364	338	<elision2>	<elision2>
364	364	<>	<elision2>
364	338	<elision1>	<elision1>
364	364	<>	<elision1>
364	344	.	υ
364	344	.	u
364	353	.	κ
364	308	s	κ
364	308	s	k
364	344	.	α
364	344	.	a
364	353	.	λ
364	308	s	λ
364	308	s	l
364	312	<1m>	<>
364	347	<K2L>	<>
365	337	.	.
365	337	<~>	<~>
365	337	<split-s>	<split-s>
365	337	<split-h>	<split-h>
365	337	<name2>	<name2>
365	340	<aphaerese>	<aphaerese>
365	366	<>	<aphaerese>
365	337	<elision3>	<elision3>
365	366	<>	<elision3>
365	337	<elision2>	<elision2>
365	366	<>	<elision2>
365	337	<elision1>	<elision1>
365	366	<>	<elision1>
365	343	.	υ
365	343	.	u
365	352	.	κ
365	307	s	κ
365	307	s	k
365	343	.	α
365	343	.	a
365	352	.	λ
365	307	s	λ
365	307	s	l
365	310	<1m>	<>
365	348	<K2L>	<>
366	338	.	.
366	338	<~>	<~>
366	338	<split-s>	<split-s>
366	338	<split-h>	<split-h>
366	338	<name2>	<name2>
366	341	<aphaerese>	<aphaerese>
366	364	<>	<aphaerese>
366	338	<elision3>	<elision3>
366	364	<>	<elision3>
366	338	<elision2>	<elision2>
366	364	<>	<elision2>
366	338	<elision1>	<elision1>
366	364	<>	<elision1>
366	344	.	υ
366	344	.	u
366	353	.	κ
366	308	s	κ
366	308	s	k
366	344	.	α
366	344	.	a
366	353	.	λ
366	308	s	λ
366	308	s	l
366	311	<1m>	<>
366	346	<K2L>	<>
367	368	<>	<name>
367	367	<>	<aphaerese>
367	367	<>	<elision3>
367	367	<>	<elision2>
367	367	<>	<elision1>
367	371	<lambda2L>	<>
368	369	<>	<aphaerese>
368	369	<>	<elision3>
368	369	<>	<elision2>
368	369	<>	<elision1>
368	372	<lambda2L>	<>
369	367	<>	<aphaerese>
369	367	<>	<elision3>
369	367	<>	<elision2>
369	367	<>	<elision1>
369	370	<lambda2L>	<>
370	347	.	.
370	347	<~>	<~>
370	347	<split-s>	<split-s>
370	347	<split-h>	<split-h>
370	347	<name2>	<name2>
370	350	<aphaerese>	<aphaerese>
370	371	<>	<aphaerese>
370	347	<elision3>	<elision3>
370	371	<>	<elision3>
370	347	<elision2>	<elision2>
370	371	<>	<elision2>
370	347	<elision1>	<elision1>
370	371	<>	<elision1>
370	353	.	υ
370	353	.	u
370	353	.	κ
370	320	s	κ
370	320	s	k
370	353	.	α
370	353	.	a
370	353	.	λ
370	320	s	λ
370	320	s	l
370	311	<1m>	<>
371	347	.	.
371	347	<~>	<~>
371	347	<split-s>	<split-s>
371	347	<split-h>	<split-h>
371	347	<name2>	<name2>
371	372	<>	<name>
371	350	<aphaerese>	<aphaerese>
371	371	<>	<aphaerese>
371	347	<elision3>	<elision3>
371	371	<>	<elision3>
371	347	<elision2>	<elision2>
371	371	<>	<elision2>
371	347	<elision1>	<elision1>
371	371	<>	<elision1>
371	353	.	υ
371	353	.	u
371	353	.	κ
371	320	s	κ
371	320	s	k
371	353	.	α
371	353	.	a
371	353	.	λ
371	320	s	λ
371	320	s	l
371	312	<1m>	<>
372	346	.	.
372	346	<~>	<~>
372	346	<split-s>	<split-s>
372	346	<split-h>	<split-h>
372	346	<name2>	<name2>
372	349	<aphaerese>	<aphaerese>
372	370	<>	<aphaerese>
372	346	<elision3>	<elision3>
372	370	<>	<elision3>
372	346	<elision2>	<elision2>
372	370	<>	<elision2>
372	346	<elision1>	<elision1>
372	370	<>	<elision1>
372	352	.	υ
372	352	.	u
372	352	.	κ
372	319	s	κ
372	319	s	k
372	352	.	α
372	352	.	a
372	352	.	λ
372	319	s	λ
372	319	s	l
372	310	<1m>	<>
373	374	<>	<name>
373	373	<>	<aphaerese>
373	373	<>	<elision3>
373	373	<>	<elision2>
373	373	<>	<elision1>
373	371	<l2L>	<>
374	375	<>	<aphaerese>
374	375	<>	<elision3>
374	375	<>	<elision2>
374	375	<>	<elision1>
374	372	<l2L>	<>
375	373	<>	<aphaerese>
375	373	<>	<elision3>
375	373	<>	<elision2>
375	373	<>	<elision1>
375	370	<l2L>	<>
376	377	<>	<name>
376	376	<>	<aphaerese>
376	376	<>	<elision3>
376	376	<>	<elision2>
376	376	<>	<elision1>
376	380	<ypsilon2K>	<>
376	383	<ypsilon2L>	<>
377	378	<>	<aphaerese>
377	378	<>	<elision3>
377	378	<>	<elision2>
377	378	<>	<elision1>
377	381	<ypsilon2K>	<>
377	384	<ypsilon2L>	<>
378	376	<>	<aphaerese>
378	376	<>	<elision3>
378	376	<>	<elision2>
378	376	<>	<elision1>
378	379	<ypsilon2K>	<>
378	382	<ypsilon2L>	<>
379	338	.	.
379	338	<~>	<~>
379	338	<split-s>	<split-s>
379	338	<split-h>	<split-h>
379	338	<name2>	<name2>
379	341	<aphaerese>	<aphaerese>
379	380	<>	<aphaerese>
379	380	<>	<elision3>
379	380	<>	<elision2>
379	380	<>	<elision1>
379	344	.	υ
379	344	.	u
379	308	s	κ
379	308	s	k
379	344	.	α
379	344	.	a
379	308	s	λ
379	308	s	l
379	311	<1m>	<>
380	338	.	.
380	338	<~>	<~>
380	338	<split-s>	<split-s>
380	338	<split-h>	<split-h>
380	338	<name2>	<name2>
380	381	<>	<name>
380	341	<aphaerese>	<aphaerese>
380	380	<>	<aphaerese>
380	380	<>	<elision3>
380	380	<>	<elision2>
380	380	<>	<elision1>
380	344	.	υ
380	344	.	u
380	308	s	κ
380	308	s	k
380	344	.	α
380	344	.	a
380	308	s	λ
380	308	s	l
380	312	<1m>	<>
381	337	.	.
381	337	<~>	<~>
381	337	<split-s>	<split-s>
381	337	<split-h>	<split-h>
381	337	<name2>	<name2>
381	340	<aphaerese>	<aphaerese>
381	379	<>	<aphaerese>
381	379	<>	<elision3>
381	379	<>	<elision2>
381	379	<>	<elision1>
381	343	.	υ
381	343	.	u
381	307	s	κ
381	307	s	k
381	343	.	α
381	343	.	a
381	307	s	λ
381	307	s	l
381	310	<1m>	<>
382	347	.	.
382	347	<~>	<~>
382	347	<split-s>	<split-s>
382	347	<split-h>	<split-h>
382	347	<name2>	<name2>
382	350	<aphaerese>	<aphaerese>
382	383	<>	<aphaerese>
382	383	<>	<elision3>
382	383	<>	<elision2>
382	383	<>	<elision1>
382	353	.	υ
382	353	.	u
382	320	s	κ
382	320	s	k
382	353	.	α
382	353	.	a
382	320	s	λ
382	320	s	l
382	311	<1m>	<>
383	347	.	.
383	347	<~>	<~>
383	347	<split-s>	<split-s>
383	347	<split-h>	<split-h>
383	347	<name2>	<name2>
383	384	<>	<name>
383	350	<aphaerese>	<aphaerese>
383	383	<>	<aphaerese>
383	383	<>	<elision3>
383	383	<>	<elision2>
383	383	<>	<elision1>
383	353	.	υ
383	353	.	u
383	320	s	κ
383	320	s	k
383	353	.	α
383	353	.	a
383	320	s	λ
383	320	s	l
383	312	<1m>	<>
384	346	.	.
384	346	<~>	<~>
384	346	<split-s>	<split-s>
384	346	<split-h>	<split-h>
384	346	<name2>	<name2>
384	349	<aphaerese>	<aphaerese>
384	382	<>	<aphaerese>
384	382	<>	<elision3>
384	382	<>	<elision2>
384	382	<>	<elision1>
384	352	.	υ
384	352	.	u
384	319	s	κ
384	319	s	k
384	352	.	α
384	352	.	a
384	319	s	λ
384	319	s	l
384	310	<1m>	<>
385	386	<>	<name>
385	385	<>	<aphaerese>
385	385	<>	<elision3>
385	385	<>	<elision2>
385	385	<>	<elision1>
385	380	<u2K>	<>
385	383	<u2L>	<>
386	387	<>	<aphaerese>
386	387	<>	<elision3>
386	387	<>	<elision2>
386	387	<>	<elision1>
386	381	<u2K>	<>
386	384	<u2L>	<>
387	385	<>	<aphaerese>
387	385	<>	<elision3>
387	385	<>	<elision2>
387	385	<>	<elision1>
387	379	<u2K>	<>
387	382	<u2L>	<>
388	389	<>	<name>
388	388	<>	<aphaerese>
388	388	<>	<elision3>
388	388	<>	<elision2>
388	388	<>	<elision1>
388	383	<alpha2L>	<>
389	390	<>	<aphaerese>
389	390	<>	<elision3>
389	390	<>	<elision2>
389	390	<>	<elision1>
389	384	<alpha2L>	<>
390	388	<>	<aphaerese>
390	388	<>	<elision3>
390	388	<>	<elision2>
390	388	<>	<elision1>
390	382	<alpha2L>	<>
391	392	<>	<name>
391	391	<>	<aphaerese>
391	391	<>	<elision3>
391	391	<>	<elision2>
391	391	<>	<elision1>
391	383	<a2L>	<>
392	393	<>	<aphaerese>
392	393	<>	<elision3>
392	393	<>	<elision2>
392	393	<>	<elision1>
392	384	<a2L>	<>
393	391	<>	<aphaerese>
393	391	<>	<elision3>
393	391	<>	<elision2>
393	391	<>	<elision1>
393	382	<a2L>	<>
394	395	.	.
394	396	 	 
394	395	<~>	<~>
394	395	<split-s>	<split-s>
394	395	<split-h>	<split-h>
394	395	<name2>	<name2>
394	692	<>	<name>
394	399	<aphaerese>	<aphaerese>
394	394	<>	<aphaerese>
394	394	<>	<elision3>
394	394	<>	<elision2>
394	394	<>	<elision1>
394	403	.	υ
394	409	s	υ
394	403	.	u
394	409	s	u
394	445	.	κ
394	481	s	κ
394	523	s	k
394	532	s	U
394	667	s	K
394	403	.	α
394	409	s	α
394	403	.	a
394	409	s	a
394	622	s	A
394	523	s	λ
394	523	s	l
394	680	s	L
394	695	<split-h>	<>
395	395	.	.
395	396	 	 
395	395	<~>	<~>
395	395	<split-s>	<split-s>
395	395	<split-h>	<split-h>
395	395	<name2>	<name2>
395	691	<>	<name>
395	399	<aphaerese>	<aphaerese>
395	395	<>	<aphaerese>
395	395	<elision3>	<elision3>
395	395	<>	<elision3>
395	395	<elision2>	<elision2>
395	395	<>	<elision2>
395	395	<elision1>	<elision1>
395	395	<>	<elision1>
395	403	.	υ
395	409	s	υ
395	403	.	u
395	409	s	u
395	445	.	κ
395	481	s	κ
395	523	s	k
395	532	s	U
395	667	s	K
395	403	.	α
395	409	s	α
395	403	.	a
395	409	s	a
395	622	s	A
395	523	s	λ
395	523	s	l
395	680	s	L
395	641	<split-h>	<>
396	395	.	.
396	396	 	 
396	395	<~>	<~>
396	395	<split-s>	<split-s>
396	395	<split-h>	<split-h>
396	395	<name2>	<name2>
396	397	<>	<name>
396	399	<aphaerese>	<aphaerese>
396	402	<>	<aphaerese>
396	395	<elision3>	<elision3>
396	402	<>	<elision3>
396	395	<elision2>	<elision2>
396	402	<>	<elision2>
396	395	<elision1>	<elision1>
396	402	<>	<elision1>
396	403	.	υ
396	644	s	υ
396	403	.	u
396	644	s	u
396	445	.	κ
396	647	s	κ
396	650	s	k
396	653	s	U
396	657	s	K
396	403	.	α
396	644	s	α
396	403	.	a
396	644	s	a
396	661	s	A
396	650	s	λ
396	650	s	l
396	662	s	L
396	641	<split-h>	<>
397	398	.	.
397	401	 	 
397	398	<~>	<~>
397	398	<split-s>	<split-s>
397	398	<split-h>	<split-h>
397	398	<name2>	<name2>
397	666	<aphaerese>	<aphaerese>
397	690	<>	<aphaerese>
397	398	<elision3>	<elision3>
397	690	<>	<elision3>
397	398	<elision2>	<elision2>
397	690	<>	<elision2>
397	398	<elision1>	<elision1>
397	690	<>	<elision1>
397	405	.	υ
397	438	s	υ
397	405	.	u
397	438	s	u
397	447	.	κ
397	483	s	κ
397	525	s	k
397	534	s	U
397	540	s	K
397	405	.	α
397	438	s	α
397	405	.	a
397	438	s	a
397	624	s	A
397	525	s	λ
397	525	s	l
397	627	s	L
397	642	<split-h>	<>
398	395	.	.
398	396	 	 
398	395	<~>	<~>
398	395	<split-s>	<split-s>
398	395	<split-h>	<split-h>
398	395	<name2>	<name2>
398	399	<aphaerese>	<aphaerese>
398	395	<>	<aphaerese>
398	395	<elision3>	<elision3>
398	395	<>	<elision3>
398	395	<elision2>	<elision2>
398	395	<>	<elision2>
398	395	<elision1>	<elision1>
398	395	<>	<elision1>
398	403	.	υ
398	409	s	υ
398	403	.	u
398	409	s	u
398	445	.	κ
398	481	s	κ
398	523	s	k
398	532	s	U
398	667	s	K
398	403	.	α
398	409	s	α
398	403	.	a
398	409	s	a
398	622	s	A
398	523	s	λ
398	523	s	l
398	680	s	L
398	643	<split-h>	<>
399	395	.	.
399	396	 	 
399	395	<~>	<~>
399	395	<split-s>	<split-s>
399	395	<split-h>	<split-h>
399	395	<name2>	<name2>
399	400	<>	<name>
399	399	<aphaerese>	<aphaerese>
399	399	<>	<aphaerese>
399	395	<elision3>	<elision3>
399	399	<>	<elision3>
399	395	<elision2>	<elision2>
399	399	<>	<elision2>
399	395	<elision1>	<elision1>
399	399	<>	<elision1>
399	395	.	υ
399	395	.	u
399	445	.	κ
399	481	s	κ
399	523	s	k
399	532	s	U
399	667	s	K
399	395	.	α
399	395	.	a
399	622	s	A
399	523	s	λ
399	523	s	l
399	680	s	L
399	688	<split-h>	<>
400	398	.	.
400	401	 	 
400	398	<~>	<~>
400	398	<split-s>	<split-s>
400	398	<split-h>	<split-h>
400	398	<name2>	<name2>
400	666	<aphaerese>	<aphaerese>
400	666	<>	<aphaerese>
400	398	<elision3>	<elision3>
400	666	<>	<elision3>
400	398	<elision2>	<elision2>
400	666	<>	<elision2>
400	398	<elision1>	<elision1>
400	666	<>	<elision1>
400	398	.	υ
400	398	.	u
400	447	.	κ
400	483	s	κ
400	525	s	k
400	534	s	U
400	669	s	K
400	398	.	α
400	398	.	a
400	624	s	A
400	525	s	λ
400	525	s	l
400	682	s	L
400	689	<split-h>	<>
401	395	.	.
401	396	 	 
401	395	<~>	<~>
401	395	<split-s>	<split-s>
401	395	<split-h>	<split-h>
401	395	<name2>	<name2>
401	399	<aphaerese>	<aphaerese>
401	402	<>	<aphaerese>
401	395	<elision3>	<elision3>
401	402	<>	<elision3>
401	395	<elision2>	<elision2>
401	402	<>	<elision2>
401	395	<elision1>	<elision1>
401	402	<>	<elision1>
401	403	.	υ
401	644	s	υ
401	403	.	u
401	644	s	u
401	445	.	κ
401	647	s	κ
401	650	s	k
401	653	s	U
401	657	s	K
401	403	.	α
401	644	s	α
401	403	.	a
401	644	s	a
401	661	s	A
401	650	s	λ
401	650	s	l
401	662	s	L
401	643	<split-h>	<>
402	395	.	.
402	396	 	 
402	395	<~>	<~>
402	395	<split-s>	<split-s>
402	395	<split-h>	<split-h>
402	395	<name2>	<name2>
402	397	<>	<name>
402	399	<aphaerese>	<aphaerese>
402	402	<>	<aphaerese>
402	395	<elision3>	<elision3>
402	402	<>	<elision3>
402	395	<elision2>	<elision2>
402	402	<>	<elision2>
402	395	<elision1>	<elision1>
402	402	<>	<elision1>
402	403	.	υ
402	409	s	υ
402	403	.	u
402	409	s	u
402	445	.	κ
402	481	s	κ
402	523	s	k
402	532	s	U
402	535	s	K
402	403	.	α
402	409	s	α
402	403	.	a
402	409	s	a
402	622	s	A
402	523	s	λ
402	523	s	l
402	625	s	L
402	641	<split-h>	<>
403	404	<>	<name>
403	403	<>	<aphaerese>
403	395	<elision3>	<elision3>
403	403	<>	<elision3>
403	395	<elision2>	<elision2>
403	403	<>	<elision2>
403	395	<elision1>	<elision1>
403	403	<>	<elision1>
403	407	<split-h>	<>
404	405	<>	<aphaerese>
404	398	<elision3>	<elision3>
404	405	<>	<elision3>
404	398	<elision2>	<elision2>
404	405	<>	<elision2>
404	398	<elision1>	<elision1>
404	405	<>	<elision1>
404	408	<split-h>	<>
405	403	<>	<aphaerese>
405	395	<elision3>	<elision3>
405	403	<>	<elision3>
405	395	<elision2>	<elision2>
405	403	<>	<elision2>
405	395	<elision1>	<elision1>
405	403	<>	<elision1>
405	406	<split-h>	<>
406	407	<>	<aphaerese>
406	407	<>	<elision3>
406	407	<>	<elision2>
406	407	<>	<elision1>
406	283	<3s>	<>
407	408	<>	<name>
407	407	<>	<aphaerese>
407	407	<>	<elision3>
407	407	<>	<elision2>
407	407	<>	<elision1>
407	284	<3s>	<>
408	406	<>	<aphaerese>
408	406	<>	<elision3>
408	406	<>	<elision2>
408	406	<>	<elision1>
408	285	<3s>	<>
409	410	.	.
409	410	 	 
409	410	<~>	<~>
409	410	<split-s>	<split-s>
409	410	<split-h>	<split-h>
409	410	<name2>	<name2>
409	437	<>	<name>
409	413	<aphaerese>	<aphaerese>
409	409	<>	<aphaerese>
409	409	<>	<elision3>
409	409	<>	<elision2>
409	409	<>	<elision1>
409	431	.	υ
409	431	.	u
409	416	.	κ
409	431	.	α
409	431	.	a
409	440	<4s>	<>
410	410	.	.
410	410	 	 
410	410	<~>	<~>
410	410	<split-s>	<split-s>
410	410	<split-h>	<split-h>
410	410	<name2>	<name2>
410	411	<>	<name>
410	413	<aphaerese>	<aphaerese>
410	410	<>	<aphaerese>
410	410	<elision3>	<elision3>
410	410	<>	<elision3>
410	410	<elision2>	<elision2>
410	410	<>	<elision2>
410	410	<elision1>	<elision1>
410	410	<>	<elision1>
410	431	.	υ
410	431	.	u
410	416	.	κ
410	431	.	α
410	431	.	a
410	435	<4s>	<>
411	412	.	.
411	412	 	 
411	412	<~>	<~>
411	412	<split-s>	<split-s>
411	412	<split-h>	<split-h>
411	412	<name2>	<name2>
411	415	<aphaerese>	<aphaerese>
411	412	<>	<aphaerese>
411	412	<elision3>	<elision3>
411	412	<>	<elision3>
411	412	<elision2>	<elision2>
411	412	<>	<elision2>
411	412	<elision1>	<elision1>
411	412	<>	<elision1>
411	433	.	υ
411	433	.	u
411	418	.	κ
411	433	.	α
411	433	.	a
411	436	<4s>	<>
412	410	.	.
412	410	 	 
412	410	<~>	<~>
412	410	<split-s>	<split-s>
412	410	<split-h>	<split-h>
412	410	<name2>	<name2>
412	413	<aphaerese>	<aphaerese>
412	410	<>	<aphaerese>
412	410	<elision3>	<elision3>
412	410	<>	<elision3>
412	410	<elision2>	<elision2>
412	410	<>	<elision2>
412	410	<elision1>	<elision1>
412	410	<>	<elision1>
412	431	.	υ
412	431	.	u
412	416	.	κ
412	431	.	α
412	431	.	a
412	434	<4s>	<>
413	410	.	.
413	410	 	 
413	410	<~>	<~>
413	410	<split-s>	<split-s>
413	410	<split-h>	<split-h>
413	410	<name2>	<name2>
413	414	<>	<name>
413	413	<aphaerese>	<aphaerese>
413	413	<>	<aphaerese>
413	410	<elision3>	<elision3>
413	413	<>	<elision3>
413	410	<elision2>	<elision2>
413	413	<>	<elision2>
413	410	<elision1>	<elision1>
413	413	<>	<elision1>
413	410	.	υ
413	410	.	u
413	416	.	κ
413	410	.	α
413	410	.	a
413	429	<4s>	<>
414	412	.	.
414	412	 	 
414	412	<~>	<~>
414	412	<split-s>	<split-s>
414	412	<split-h>	<split-h>
414	412	<name2>	<name2>
414	415	<aphaerese>	<aphaerese>
414	415	<>	<aphaerese>
414	412	<elision3>	<elision3>
414	415	<>	<elision3>
414	412	<elision2>	<elision2>
414	415	<>	<elision2>
414	412	<elision1>	<elision1>
414	415	<>	<elision1>
414	412	.	υ
414	412	.	u
414	418	.	κ
414	412	.	α
414	412	.	a
414	430	<4s>	<>
415	410	.	.
415	410	 	 
415	410	<~>	<~>
415	410	<split-s>	<split-s>
415	410	<split-h>	<split-h>
415	410	<name2>	<name2>
415	413	<aphaerese>	<aphaerese>
415	413	<>	<aphaerese>
415	410	<elision3>	<elision3>
415	413	<>	<elision3>
415	410	<elision2>	<elision2>
415	413	<>	<elision2>
415	410	<elision1>	<elision1>
415	413	<>	<elision1>
415	410	.	υ
415	410	.	u
415	416	.	κ
415	410	.	α
415	410	.	a
415	428	<4s>	<>
416	417	<>	<name>
416	416	<>	<aphaerese>
416	419	<elision3>	<elision3>
416	416	<>	<elision3>
416	419	<elision2>	<elision2>
416	416	<>	<elision2>
416	419	<elision1>	<elision1>
416	416	<>	<elision1>
416	426	<4s>	<>
417	418	<>	<aphaerese>
417	421	<elision3>	<elision3>
417	418	<>	<elision3>
417	421	<elision2>	<elision2>
417	418	<>	<elision2>
417	421	<elision1>	<elision1>
417	418	<>	<elision1>
417	427	<4s>	<>
418	416	<>	<aphaerese>
418	419	<elision3>	<elision3>
418	416	<>	<elision3>
418	419	<elision2>	<elision2>
418	416	<>	<elision2>
418	419	<elision1>	<elision1>
418	416	<>	<elision1>
418	425	<4s>	<>
419	420	<>	<name>
419	419	<>	<aphaerese>
419	419	<>	<elision3>
419	419	<>	<elision2>
419	419	<>	<elision1>
419	423	<4s>	<>
420	421	<>	<aphaerese>
420	421	<>	<elision3>
420	421	<>	<elision2>
420	421	<>	<elision1>
420	424	<4s>	<>
421	419	<>	<aphaerese>
421	419	<>	<elision3>
421	419	<>	<elision2>
421	419	<>	<elision1>
421	422	<4s>	<>
422	423	<>	<aphaerese>
422	423	<>	<elision3>
422	423	<>	<elision2>
422	423	<>	<elision1>
422	300	<K>	<>
423	424	<>	<name>
423	423	<>	<aphaerese>
423	423	<>	<elision3>
423	423	<>	<elision2>
423	423	<>	<elision1>
423	298	<K>	<>
424	422	<>	<aphaerese>
424	422	<>	<elision3>
424	422	<>	<elision2>
424	422	<>	<elision1>
424	299	<K>	<>
425	426	<>	<aphaerese>
425	426	<>	<elision3>
425	426	<>	<elision2>
425	426	<>	<elision1>
425	297	<K>	<>
426	427	<>	<name>
426	426	<>	<aphaerese>
426	426	<>	<elision3>
426	426	<>	<elision2>
426	426	<>	<elision1>
426	295	<K>	<>
427	425	<>	<aphaerese>
427	425	<>	<elision3>
427	425	<>	<elision2>
427	425	<>	<elision1>
427	296	<K>	<>
428	429	<>	<aphaerese>
428	429	<>	<elision3>
428	429	<>	<elision2>
428	429	<>	<elision1>
428	294	<K>	<>
429	430	<>	<name>
429	429	<>	<aphaerese>
429	429	<>	<elision3>
429	429	<>	<elision2>
429	429	<>	<elision1>
429	292	<K>	<>
430	428	<>	<aphaerese>
430	428	<>	<elision3>
430	428	<>	<elision2>
430	428	<>	<elision1>
430	293	<K>	<>
431	432	<>	<name>
431	431	<>	<aphaerese>
431	410	<elision3>	<elision3>
431	431	<>	<elision3>
431	410	<elision2>	<elision2>
431	431	<>	<elision2>
431	410	<elision1>	<elision1>
431	431	<>	<elision1>
431	284	<4s>	<>
432	433	<>	<aphaerese>
432	412	<elision3>	<elision3>
432	433	<>	<elision3>
432	412	<elision2>	<elision2>
432	433	<>	<elision2>
432	412	<elision1>	<elision1>
432	433	<>	<elision1>
432	285	<4s>	<>
433	431	<>	<aphaerese>
433	410	<elision3>	<elision3>
433	431	<>	<elision3>
433	410	<elision2>	<elision2>
433	431	<>	<elision2>
433	410	<elision1>	<elision1>
433	431	<>	<elision1>
433	283	<4s>	<>
434	435	<>	<aphaerese>
434	435	<>	<elision3>
434	435	<>	<elision2>
434	435	<>	<elision1>
434	291	<K>	<>
435	436	<>	<name>
435	435	<>	<aphaerese>
435	435	<>	<elision3>
435	435	<>	<elision2>
435	435	<>	<elision1>
435	289	<K>	<>
436	434	<>	<aphaerese>
436	434	<>	<elision3>
436	434	<>	<elision2>
436	434	<>	<elision1>
436	290	<K>	<>
437	412	.	.
437	412	 	 
437	412	<~>	<~>
437	412	<split-s>	<split-s>
437	412	<split-h>	<split-h>
437	412	<name2>	<name2>
437	415	<aphaerese>	<aphaerese>
437	438	<>	<aphaerese>
437	438	<>	<elision3>
437	438	<>	<elision2>
437	438	<>	<elision1>
437	433	.	υ
437	433	.	u
437	418	.	κ
437	433	.	α
437	433	.	a
437	441	<4s>	<>
438	410	.	.
438	410	 	 
438	410	<~>	<~>
438	410	<split-s>	<split-s>
438	410	<split-h>	<split-h>
438	410	<name2>	<name2>
438	413	<aphaerese>	<aphaerese>
438	409	<>	<aphaerese>
438	409	<>	<elision3>
438	409	<>	<elision2>
438	409	<>	<elision1>
438	431	.	υ
438	431	.	u
438	416	.	κ
438	431	.	α
438	431	.	a
438	439	<4s>	<>
439	440	<>	<aphaerese>
439	440	<>	<elision3>
439	440	<>	<elision2>
439	440	<>	<elision1>
439	443	<K>	<>
440	441	<>	<name>
440	440	<>	<aphaerese>
440	440	<>	<elision3>
440	440	<>	<elision2>
440	440	<>	<elision1>
440	444	<K>	<>
441	439	<>	<aphaerese>
441	439	<>	<elision3>
441	439	<>	<elision2>
441	439	<>	<elision1>
441	442	<K>	<>
442	291	.	.
442	291	<~>	<~>
442	291	<split-s>	<split-s>
442	291	<split-h>	<split-h>
442	291	<name2>	<name2>
442	294	<aphaerese>	<aphaerese>
442	443	<>	<aphaerese>
442	443	<>	<elision3>
442	443	<>	<elision2>
442	443	<>	<elision1>
442	287	.	υ
442	378	H	υ
442	287	.	u
442	387	H	u
442	297	.	κ
442	336	H	κ
442	360	H	k
442	363	H	U
442	366	H	K
442	287	.	α
442	390	H	α
442	287	.	a
442	393	H	a
442	346	H	A
442	369	H	λ
442	375	H	l
442	370	H	L
443	289	.	.
443	289	<~>	<~>
443	289	<split-s>	<split-s>
443	289	<split-h>	<split-h>
443	289	<name2>	<name2>
443	292	<aphaerese>	<aphaerese>
443	444	<>	<aphaerese>
443	444	<>	<elision3>
443	444	<>	<elision2>
443	444	<>	<elision1>
443	288	.	υ
443	376	H	υ
443	288	.	u
443	385	H	u
443	295	.	κ
443	334	H	κ
443	358	H	k
443	361	H	U
443	364	H	K
443	288	.	α
443	388	H	α
443	288	.	a
443	391	H	a
443	347	H	A
443	367	H	λ
443	373	H	l
443	371	H	L
444	289	.	.
444	289	<~>	<~>
444	289	<split-s>	<split-s>
444	289	<split-h>	<split-h>
444	289	<name2>	<name2>
444	442	<>	<name>
444	292	<aphaerese>	<aphaerese>
444	444	<>	<aphaerese>
444	444	<>	<elision3>
444	444	<>	<elision2>
444	444	<>	<elision1>
444	288	.	υ
444	376	H	υ
444	288	.	u
444	385	H	u
444	295	.	κ
444	334	H	κ
444	358	H	k
444	361	H	U
444	364	H	K
444	288	.	α
444	388	H	α
444	288	.	a
444	391	H	a
444	347	H	A
444	367	H	λ
444	373	H	l
444	371	H	L
445	446	<>	<name>
445	445	<>	<aphaerese>
445	448	<elision3>	<elision3>
445	445	<>	<elision3>
445	448	<elision2>	<elision2>
445	445	<>	<elision2>
445	448	<elision1>	<elision1>
445	445	<>	<elision1>
445	479	<split-h>	<>
446	447	<>	<aphaerese>
446	450	<elision3>	<elision3>
446	447	<>	<elision3>
446	450	<elision2>	<elision2>
446	447	<>	<elision2>
446	450	<elision1>	<elision1>
446	447	<>	<elision1>
446	480	<split-h>	<>
447	445	<>	<aphaerese>
447	448	<elision3>	<elision3>
447	445	<>	<elision3>
447	448	<elision2>	<elision2>
447	445	<>	<elision2>
447	448	<elision1>	<elision1>
447	445	<>	<elision1>
447	478	<split-h>	<>
448	449	<>	<name>
448	448	<>	<aphaerese>
448	448	<>	<elision3>
448	448	<>	<elision2>
448	448	<>	<elision1>
448	451	s	κ
448	451	s	k
448	469	s	K
448	451	s	λ
448	451	s	l
448	472	s	L
448	476	<split-h>	<>
449	450	<>	<aphaerese>
449	450	<>	<elision3>
449	450	<>	<elision2>
449	450	<>	<elision1>
449	453	s	κ
449	453	s	k
449	471	s	K
449	453	s	λ
449	453	s	l
449	474	s	L
449	477	<split-h>	<>
450	448	<>	<aphaerese>
450	448	<>	<elision3>
450	448	<>	<elision2>
450	448	<>	<elision1>
450	451	s	κ
450	451	s	k
450	469	s	K
450	451	s	λ
450	451	s	l
450	472	s	L
450	475	<split-h>	<>
451	452	<>	<name>
451	451	<>	<aphaerese>
451	451	<>	<elision3>
451	451	<>	<elision2>
451	451	<>	<elision1>
451	455	<4s>	<>
452	453	<>	<aphaerese>
452	453	<>	<elision3>
452	453	<>	<elision2>
452	453	<>	<elision1>
452	456	<4s>	<>
453	451	<>	<aphaerese>
453	451	<>	<elision3>
453	451	<>	<elision2>
453	451	<>	<elision1>
453	454	<4s>	<>
454	455	<>	<aphaerese>
454	455	<>	<elision3>
454	455	<>	<elision2>
454	455	<>	<elision1>
454	458	<K>	<>
455	456	<>	<name>
455	455	<>	<aphaerese>
455	455	<>	<elision3>
455	455	<>	<elision2>
455	455	<>	<elision1>
455	459	<K>	<>
456	454	<>	<aphaerese>
456	454	<>	<elision3>
456	454	<>	<elision2>
456	454	<>	<elision1>
456	457	<K>	<>
457	458	<>	<aphaerese>
457	458	<>	<elision3>
457	458	<>	<elision2>
457	458	<>	<elision1>
457	462	H	κ
457	360	H	k
457	366	H	K
457	465	H	λ
457	375	H	l
457	370	H	L
458	459	<>	<aphaerese>
458	459	<>	<elision3>
458	459	<>	<elision2>
458	459	<>	<elision1>
458	460	H	κ
458	358	H	k
458	364	H	K
458	463	H	λ
458	373	H	l
458	371	H	L
459	457	<>	<name>
459	459	<>	<aphaerese>
459	459	<>	<elision3>
459	459	<>	<elision2>
459	459	<>	<elision1>
459	460	H	κ
459	358	H	k
459	364	H	K
459	463	H	λ
459	373	H	l
459	371	H	L
460	461	<>	<name>
460	460	<>	<aphaerese>
460	460	<>	<elision3>
460	460	<>	<elision2>
460	460	<>	<elision1>
460	380	<kappa2K>	<>
460	383	<kappa2L>	<>
460	356	<lambda2L>	<>
461	462	<>	<aphaerese>
461	462	<>	<elision3>
461	462	<>	<elision2>
461	462	<>	<elision1>
461	381	<kappa2K>	<>
461	384	<kappa2L>	<>
461	357	<lambda2L>	<>
462	460	<>	<aphaerese>
462	460	<>	<elision3>
462	460	<>	<elision2>
462	460	<>	<elision1>
462	379	<kappa2K>	<>
462	382	<kappa2L>	<>
462	355	<lambda2L>	<>
463	464	<>	<name>
463	463	<>	<aphaerese>
463	463	<>	<elision3>
463	463	<>	<elision2>
463	463	<>	<elision1>
463	467	<lambda2L>	<>
464	465	<>	<aphaerese>
464	465	<>	<elision3>
464	465	<>	<elision2>
464	465	<>	<elision1>
464	468	<lambda2L>	<>
465	463	<>	<aphaerese>
465	463	<>	<elision3>
465	463	<>	<elision2>
465	463	<>	<elision1>
465	466	<lambda2L>	<>
466	347	.	.
466	347	<~>	<~>
466	347	<split-s>	<split-s>
466	347	<split-h>	<split-h>
466	347	<name2>	<name2>
466	350	<aphaerese>	<aphaerese>
466	467	<>	<aphaerese>
466	467	<>	<elision3>
466	467	<>	<elision2>
466	467	<>	<elision1>
466	353	.	υ
466	353	.	u
466	353	.	κ
466	320	s	κ
466	320	s	k
466	353	.	α
466	353	.	a
466	353	.	λ
466	320	s	λ
466	320	s	l
466	311	<1m>	<>
467	347	.	.
467	347	<~>	<~>
467	347	<split-s>	<split-s>
467	347	<split-h>	<split-h>
467	347	<name2>	<name2>
467	468	<>	<name>
467	350	<aphaerese>	<aphaerese>
467	467	<>	<aphaerese>
467	467	<>	<elision3>
467	467	<>	<elision2>
467	467	<>	<elision1>
467	353	.	υ
467	353	.	u
467	353	.	κ
467	320	s	κ
467	320	s	k
467	353	.	α
467	353	.	a
467	353	.	λ
467	320	s	λ
467	320	s	l
467	312	<1m>	<>
468	346	.	.
468	346	<~>	<~>
468	346	<split-s>	<split-s>
468	346	<split-h>	<split-h>
468	346	<name2>	<name2>
468	349	<aphaerese>	<aphaerese>
468	466	<>	<aphaerese>
468	466	<>	<elision3>
468	466	<>	<elision2>
468	466	<>	<elision1>
468	352	.	υ
468	352	.	u
468	352	.	κ
468	319	s	κ
468	319	s	k
468	352	.	α
468	352	.	a
468	352	.	λ
468	319	s	λ
468	319	s	l
468	310	<1m>	<>
469	470	<>	<name>
469	469	<>	<aphaerese>
469	469	<>	<elision3>
469	469	<>	<elision2>
469	469	<>	<elision1>
469	451	<K2kl>	<>
470	471	<>	<aphaerese>
470	471	<>	<elision3>
470	471	<>	<elision2>
470	471	<>	<elision1>
470	452	<K2kl>	<>
471	469	<>	<aphaerese>
471	469	<>	<elision3>
471	469	<>	<elision2>
471	469	<>	<elision1>
471	453	<K2kl>	<>
472	473	<>	<name>
472	472	<>	<aphaerese>
472	472	<>	<elision3>
472	472	<>	<elision2>
472	472	<>	<elision1>
472	451	<L2kl>	<>
473	474	<>	<aphaerese>
473	474	<>	<elision3>
473	474	<>	<elision2>
473	474	<>	<elision1>
473	452	<L2kl>	<>
474	472	<>	<aphaerese>
474	472	<>	<elision3>
474	472	<>	<elision2>
474	472	<>	<elision1>
474	453	<L2kl>	<>
475	476	<>	<aphaerese>
475	476	<>	<elision3>
475	476	<>	<elision2>
475	476	<>	<elision1>
475	422	<3s>	<>
476	477	<>	<name>
476	476	<>	<aphaerese>
476	476	<>	<elision3>
476	476	<>	<elision2>
476	476	<>	<elision1>
476	423	<3s>	<>
477	475	<>	<aphaerese>
477	475	<>	<elision3>
477	475	<>	<elision2>
477	475	<>	<elision1>
477	424	<3s>	<>
478	479	<>	<aphaerese>
478	479	<>	<elision3>
478	479	<>	<elision2>
478	479	<>	<elision1>
478	425	<3s>	<>
479	480	<>	<name>
479	479	<>	<aphaerese>
479	479	<>	<elision3>
479	479	<>	<elision2>
479	479	<>	<elision1>
479	426	<3s>	<>
480	478	<>	<aphaerese>
480	478	<>	<elision3>
480	478	<>	<elision2>
480	478	<>	<elision1>
480	427	<3s>	<>
481	410	.	.
481	410	 	 
481	410	<~>	<~>
481	410	<split-s>	<split-s>
481	410	<split-h>	<split-h>
481	410	<name2>	<name2>
481	482	<>	<name>
481	413	<aphaerese>	<aphaerese>
481	481	<>	<aphaerese>
481	484	<elision3>	<elision3>
481	481	<>	<elision3>
481	484	<elision2>	<elision2>
481	481	<>	<elision2>
481	484	<elision1>	<elision1>
481	481	<>	<elision1>
481	431	.	υ
481	431	.	u
481	431	.	κ
481	431	.	α
481	431	.	a
481	431	.	λ
481	518	<4s>	<>
482	412	.	.
482	412	 	 
482	412	<~>	<~>
482	412	<split-s>	<split-s>
482	412	<split-h>	<split-h>
482	412	<name2>	<name2>
482	415	<aphaerese>	<aphaerese>
482	483	<>	<aphaerese>
482	486	<elision3>	<elision3>
482	483	<>	<elision3>
482	486	<elision2>	<elision2>
482	483	<>	<elision2>
482	486	<elision1>	<elision1>
482	483	<>	<elision1>
482	433	.	υ
482	433	.	u
482	433	.	κ
482	433	.	α
482	433	.	a
482	433	.	λ
482	519	<4s>	<>
483	410	.	.
483	410	 	 
483	410	<~>	<~>
483	410	<split-s>	<split-s>
483	410	<split-h>	<split-h>
483	410	<name2>	<name2>
483	413	<aphaerese>	<aphaerese>
483	481	<>	<aphaerese>
483	484	<elision3>	<elision3>
483	481	<>	<elision3>
483	484	<elision2>	<elision2>
483	481	<>	<elision2>
483	484	<elision1>	<elision1>
483	481	<>	<elision1>
483	431	.	υ
483	431	.	u
483	431	.	κ
483	431	.	α
483	431	.	a
483	431	.	λ
483	517	<4s>	<>
484	410	.	.
484	410	 	 
484	410	<~>	<~>
484	410	<split-s>	<split-s>
484	410	<split-h>	<split-h>
484	410	<name2>	<name2>
484	485	<>	<name>
484	413	<aphaerese>	<aphaerese>
484	484	<>	<aphaerese>
484	410	<elision3>	<elision3>
484	484	<>	<elision3>
484	410	<elision2>	<elision2>
484	484	<>	<elision2>
484	410	<elision1>	<elision1>
484	484	<>	<elision1>
484	431	.	υ
484	431	.	u
484	416	.	κ
484	431	.	α
484	431	.	a
484	488	<4s>	<>
485	412	.	.
485	412	 	 
485	412	<~>	<~>
485	412	<split-s>	<split-s>
485	412	<split-h>	<split-h>
485	412	<name2>	<name2>
485	415	<aphaerese>	<aphaerese>
485	486	<>	<aphaerese>
485	412	<elision3>	<elision3>
485	486	<>	<elision3>
485	412	<elision2>	<elision2>
485	486	<>	<elision2>
485	412	<elision1>	<elision1>
485	486	<>	<elision1>
485	433	.	υ
485	433	.	u
485	418	.	κ
485	433	.	α
485	433	.	a
485	489	<4s>	<>
486	410	.	.
486	410	 	 
486	410	<~>	<~>
486	410	<split-s>	<split-s>
486	410	<split-h>	<split-h>
486	410	<name2>	<name2>
486	413	<aphaerese>	<aphaerese>
486	484	<>	<aphaerese>
486	410	<elision3>	<elision3>
486	484	<>	<elision3>
486	410	<elision2>	<elision2>
486	484	<>	<elision2>
486	410	<elision1>	<elision1>
486	484	<>	<elision1>
486	431	.	υ
486	431	.	u
486	416	.	κ
486	431	.	α
486	431	.	a
486	487	<4s>	<>
487	488	<>	<aphaerese>
487	488	<>	<elision3>
487	488	<>	<elision2>
487	488	<>	<elision1>
487	491	<K>	<>
488	489	<>	<name>
488	488	<>	<aphaerese>
488	488	<>	<elision3>
488	488	<>	<elision2>
488	488	<>	<elision1>
488	492	<K>	<>
489	487	<>	<aphaerese>
489	487	<>	<elision3>
489	487	<>	<elision2>
489	487	<>	<elision1>
489	490	<K>	<>
490	291	.	.
490	291	<~>	<~>
490	291	<split-s>	<split-s>
490	291	<split-h>	<split-h>
490	291	<name2>	<name2>
490	294	<aphaerese>	<aphaerese>
490	491	<>	<aphaerese>
490	291	<elision3>	<elision3>
490	491	<>	<elision3>
490	291	<elision2>	<elision2>
490	491	<>	<elision2>
490	291	<elision1>	<elision1>
490	491	<>	<elision1>
490	287	.	υ
490	378	H	υ
490	287	.	u
490	387	H	u
490	297	.	κ
490	495	H	κ
490	504	H	k
490	363	H	U
490	507	H	K
490	287	.	α
490	390	H	α
490	287	.	a
490	393	H	a
490	346	H	A
490	510	H	λ
490	516	H	l
490	511	H	L
491	289	.	.
491	289	<~>	<~>
491	289	<split-s>	<split-s>
491	289	<split-h>	<split-h>
491	289	<name2>	<name2>
491	292	<aphaerese>	<aphaerese>
491	492	<>	<aphaerese>
491	289	<elision3>	<elision3>
491	492	<>	<elision3>
491	289	<elision2>	<elision2>
491	492	<>	<elision2>
491	289	<elision1>	<elision1>
491	492	<>	<elision1>
491	288	.	υ
491	376	H	υ
491	288	.	u
491	385	H	u
491	295	.	κ
491	493	H	κ
491	502	H	k
491	361	H	U
491	505	H	K
491	288	.	α
491	388	H	α
491	288	.	a
491	391	H	a
491	347	H	A
491	508	H	λ
491	514	H	l
491	512	H	L
492	289	.	.
492	289	<~>	<~>
492	289	<split-s>	<split-s>
492	289	<split-h>	<split-h>
492	289	<name2>	<name2>
492	490	<>	<name>
492	292	<aphaerese>	<aphaerese>
492	492	<>	<aphaerese>
492	289	<elision3>	<elision3>
492	492	<>	<elision3>
492	289	<elision2>	<elision2>
492	492	<>	<elision2>
492	289	<elision1>	<elision1>
492	492	<>	<elision1>
492	288	.	υ
492	376	H	υ
492	288	.	u
492	385	H	u
492	295	.	κ
492	493	H	κ
492	502	H	k
492	361	H	U
492	505	H	K
492	288	.	α
492	388	H	α
492	288	.	a
492	391	H	a
492	347	H	A
492	508	H	λ
492	514	H	l
492	512	H	L
493	494	<>	<name>
493	493	<>	<aphaerese>
493	493	<>	<elision3>
493	493	<>	<elision2>
493	493	<>	<elision1>
493	497	<kappa2K>	<>
493	500	<kappa2L>	<>
493	356	<lambda2L>	<>
494	495	<>	<aphaerese>
494	495	<>	<elision3>
494	495	<>	<elision2>
494	495	<>	<elision1>
494	498	<kappa2K>	<>
494	501	<kappa2L>	<>
494	357	<lambda2L>	<>
495	493	<>	<aphaerese>
495	493	<>	<elision3>
495	493	<>	<elision2>
495	493	<>	<elision1>
495	496	<kappa2K>	<>
495	499	<kappa2L>	<>
495	355	<lambda2L>	<>
496	338	.	.
496	338	<~>	<~>
496	338	<split-s>	<split-s>
496	338	<split-h>	<split-h>
496	338	<name2>	<name2>
496	341	<aphaerese>	<aphaerese>
496	497	<>	<aphaerese>
496	338	<elision3>	<elision3>
496	497	<>	<elision3>
496	338	<elision2>	<elision2>
496	497	<>	<elision2>
496	338	<elision1>	<elision1>
496	497	<>	<elision1>
496	344	.	υ
496	344	.	u
496	344	.	α
496	344	.	a
496	311	<1m>	<>
497	338	.	.
497	338	<~>	<~>
497	338	<split-s>	<split-s>
497	338	<split-h>	<split-h>
497	338	<name2>	<name2>
497	498	<>	<name>
497	341	<aphaerese>	<aphaerese>
497	497	<>	<aphaerese>
497	338	<elision3>	<elision3>
497	497	<>	<elision3>
497	338	<elision2>	<elision2>
497	497	<>	<elision2>
497	338	<elision1>	<elision1>
497	497	<>	<elision1>
497	344	.	υ
497	344	.	u
497	344	.	α
497	344	.	a
497	312	<1m>	<>
498	337	.	.
498	337	<~>	<~>
498	337	<split-s>	<split-s>
498	337	<split-h>	<split-h>
498	337	<name2>	<name2>
498	340	<aphaerese>	<aphaerese>
498	496	<>	<aphaerese>
498	337	<elision3>	<elision3>
498	496	<>	<elision3>
498	337	<elision2>	<elision2>
498	496	<>	<elision2>
498	337	<elision1>	<elision1>
498	496	<>	<elision1>
498	343	.	υ
498	343	.	u
498	343	.	α
498	343	.	a
498	310	<1m>	<>
499	347	.	.
499	347	<~>	<~>
499	347	<split-s>	<split-s>
499	347	<split-h>	<split-h>
499	347	<name2>	<name2>
499	350	<aphaerese>	<aphaerese>
499	500	<>	<aphaerese>
499	347	<elision3>	<elision3>
499	500	<>	<elision3>
499	347	<elision2>	<elision2>
499	500	<>	<elision2>
499	347	<elision1>	<elision1>
499	500	<>	<elision1>
499	353	.	υ
499	353	.	u
499	353	.	α
499	353	.	a
499	311	<1m>	<>
500	347	.	.
500	347	<~>	<~>
500	347	<split-s>	<split-s>
500	347	<split-h>	<split-h>
500	347	<name2>	<name2>
500	501	<>	<name>
500	350	<aphaerese>	<aphaerese>
500	500	<>	<aphaerese>
500	347	<elision3>	<elision3>
500	500	<>	<elision3>
500	347	<elision2>	<elision2>
500	500	<>	<elision2>
500	347	<elision1>	<elision1>
500	500	<>	<elision1>
500	353	.	υ
500	353	.	u
500	353	.	α
500	353	.	a
500	312	<1m>	<>
501	346	.	.
501	346	<~>	<~>
501	346	<split-s>	<split-s>
501	346	<split-h>	<split-h>
501	346	<name2>	<name2>
501	349	<aphaerese>	<aphaerese>
501	499	<>	<aphaerese>
501	346	<elision3>	<elision3>
501	499	<>	<elision3>
501	346	<elision2>	<elision2>
501	499	<>	<elision2>
501	346	<elision1>	<elision1>
501	499	<>	<elision1>
501	352	.	υ
501	352	.	u
501	352	.	α
501	352	.	a
501	310	<1m>	<>
502	503	<>	<name>
502	502	<>	<aphaerese>
502	502	<>	<elision3>
502	502	<>	<elision2>
502	502	<>	<elision1>
502	497	<k2K>	<>
502	500	<k2L>	<>
502	356	<l2L>	<>
503	504	<>	<aphaerese>
503	504	<>	<elision3>
503	504	<>	<elision2>
503	504	<>	<elision1>
503	498	<k2K>	<>
503	501	<k2L>	<>
503	357	<l2L>	<>
504	502	<>	<aphaerese>
504	502	<>	<elision3>
504	502	<>	<elision2>
504	502	<>	<elision1>
504	496	<k2K>	<>
504	499	<k2L>	<>
504	355	<l2L>	<>
505	338	.	.
505	338	<~>	<~>
505	338	<split-s>	<split-s>
505	338	<split-h>	<split-h>
505	338	<name2>	<name2>
505	506	<>	<name>
505	341	<aphaerese>	<aphaerese>
505	505	<>	<aphaerese>
505	338	<elision3>	<elision3>
505	505	<>	<elision3>
505	338	<elision2>	<elision2>
505	505	<>	<elision2>
505	338	<elision1>	<elision1>
505	505	<>	<elision1>
505	344	.	υ
505	344	.	u
505	353	.	κ
505	344	.	α
505	344	.	a
505	353	.	λ
505	312	<1m>	<>
505	500	<K2L>	<>
506	337	.	.
506	337	<~>	<~>
506	337	<split-s>	<split-s>
506	337	<split-h>	<split-h>
506	337	<name2>	<name2>
506	340	<aphaerese>	<aphaerese>
506	507	<>	<aphaerese>
506	337	<elision3>	<elision3>
506	507	<>	<elision3>
506	337	<elision2>	<elision2>
506	507	<>	<elision2>
506	337	<elision1>	<elision1>
506	507	<>	<elision1>
506	343	.	υ
506	343	.	u
506	352	.	κ
506	343	.	α
506	343	.	a
506	352	.	λ
506	310	<1m>	<>
506	501	<K2L>	<>
507	338	.	.
507	338	<~>	<~>
507	338	<split-s>	<split-s>
507	338	<split-h>	<split-h>
507	338	<name2>	<name2>
507	341	<aphaerese>	<aphaerese>
507	505	<>	<aphaerese>
507	338	<elision3>	<elision3>
507	505	<>	<elision3>
507	338	<elision2>	<elision2>
507	505	<>	<elision2>
507	338	<elision1>	<elision1>
507	505	<>	<elision1>
507	344	.	υ
507	344	.	u
507	353	.	κ
507	344	.	α
507	344	.	a
507	353	.	λ
507	311	<1m>	<>
507	499	<K2L>	<>
508	509	<>	<name>
508	508	<>	<aphaerese>
508	508	<>	<elision3>
508	508	<>	<elision2>
508	508	<>	<elision1>
508	512	<lambda2L>	<>
509	510	<>	<aphaerese>
509	510	<>	<elision3>
509	510	<>	<elision2>
509	510	<>	<elision1>
509	513	<lambda2L>	<>
510	508	<>	<aphaerese>
510	508	<>	<elision3>
510	508	<>	<elision2>
510	508	<>	<elision1>
510	511	<lambda2L>	<>
511	347	.	.
511	347	<~>	<~>
511	347	<split-s>	<split-s>
511	347	<split-h>	<split-h>
511	347	<name2>	<name2>
511	350	<aphaerese>	<aphaerese>
511	512	<>	<aphaerese>
511	347	<elision3>	<elision3>
511	512	<>	<elision3>
511	347	<elision2>	<elision2>
511	512	<>	<elision2>
511	347	<elision1>	<elision1>
511	512	<>	<elision1>
511	353	.	υ
511	353	.	u
511	353	.	κ
511	353	.	α
511	353	.	a
511	353	.	λ
511	311	<1m>	<>
512	347	.	.
512	347	<~>	<~>
512	347	<split-s>	<split-s>
512	347	<split-h>	<split-h>
512	347	<name2>	<name2>
512	513	<>	<name>
512	350	<aphaerese>	<aphaerese>
512	512	<>	<aphaerese>
512	347	<elision3>	<elision3>
512	512	<>	<elision3>
512	347	<elision2>	<elision2>
512	512	<>	<elision2>
512	347	<elision1>	<elision1>
512	512	<>	<elision1>
512	353	.	υ
512	353	.	u
512	353	.	κ
512	353	.	α
512	353	.	a
512	353	.	λ
512	312	<1m>	<>
513	346	.	.
513	346	<~>	<~>
513	346	<split-s>	<split-s>
513	346	<split-h>	<split-h>
513	346	<name2>	<name2>
513	349	<aphaerese>	<aphaerese>
513	511	<>	<aphaerese>
513	346	<elision3>	<elision3>
513	511	<>	<elision3>
513	346	<elision2>	<elision2>
513	511	<>	<elision2>
513	346	<elision1>	<elision1>
513	511	<>	<elision1>
513	352	.	υ
513	352	.	u
513	352	.	κ
513	352	.	α
513	352	.	a
513	352	.	λ
513	310	<1m>	<>
514	515	<>	<name>
514	514	<>	<aphaerese>
514	514	<>	<elision3>
514	514	<>	<elision2>
514	514	<>	<elision1>
514	512	<l2L>	<>
515	516	<>	<aphaerese>
515	516	<>	<elision3>
515	516	<>	<elision2>
515	516	<>	<elision1>
515	513	<l2L>	<>
516	514	<>	<aphaerese>
516	514	<>	<elision3>
516	514	<>	<elision2>
516	514	<>	<elision1>
516	511	<l2L>	<>
517	518	<>	<aphaerese>
517	518	<>	<elision3>
517	518	<>	<elision2>
517	518	<>	<elision1>
517	521	<K>	<>
518	519	<>	<name>
518	518	<>	<aphaerese>
518	518	<>	<elision3>
518	518	<>	<elision2>
518	518	<>	<elision1>
518	522	<K>	<>
519	517	<>	<aphaerese>
519	517	<>	<elision3>
519	517	<>	<elision2>
519	517	<>	<elision1>
519	520	<K>	<>
520	291	.	.
520	291	<~>	<~>
520	291	<split-s>	<split-s>
520	291	<split-h>	<split-h>
520	291	<name2>	<name2>
520	294	<aphaerese>	<aphaerese>
520	521	<>	<aphaerese>
520	491	<elision3>	<elision3>
520	521	<>	<elision3>
520	491	<elision2>	<elision2>
520	521	<>	<elision2>
520	491	<elision1>	<elision1>
520	521	<>	<elision1>
520	287	.	υ
520	378	H	υ
520	287	.	u
520	387	H	u
520	287	.	κ
520	462	H	κ
520	360	H	k
520	363	H	U
520	366	H	K
520	287	.	α
520	390	H	α
520	287	.	a
520	393	H	a
520	346	H	A
520	287	.	λ
520	465	H	λ
520	375	H	l
520	370	H	L
521	289	.	.
521	289	<~>	<~>
521	289	<split-s>	<split-s>
521	289	<split-h>	<split-h>
521	289	<name2>	<name2>
521	292	<aphaerese>	<aphaerese>
521	522	<>	<aphaerese>
521	492	<elision3>	<elision3>
521	522	<>	<elision3>
521	492	<elision2>	<elision2>
521	522	<>	<elision2>
521	492	<elision1>	<elision1>
521	522	<>	<elision1>
521	288	.	υ
521	376	H	υ
521	288	.	u
521	385	H	u
521	288	.	κ
521	460	H	κ
521	358	H	k
521	361	H	U
521	364	H	K
521	288	.	α
521	388	H	α
521	288	.	a
521	391	H	a
521	347	H	A
521	288	.	λ
521	463	H	λ
521	373	H	l
521	371	H	L
522	289	.	.
522	289	<~>	<~>
522	289	<split-s>	<split-s>
522	289	<split-h>	<split-h>
522	289	<name2>	<name2>
522	520	<>	<name>
522	292	<aphaerese>	<aphaerese>
522	522	<>	<aphaerese>
522	492	<elision3>	<elision3>
522	522	<>	<elision3>
522	492	<elision2>	<elision2>
522	522	<>	<elision2>
522	492	<elision1>	<elision1>
522	522	<>	<elision1>
522	288	.	υ
522	376	H	υ
522	288	.	u
522	385	H	u
522	288	.	κ
522	460	H	κ
522	358	H	k
522	361	H	U
522	364	H	K
522	288	.	α
522	388	H	α
522	288	.	a
522	391	H	a
522	347	H	A
522	288	.	λ
522	463	H	λ
522	373	H	l
522	371	H	L
523	410	.	.
523	410	 	 
523	410	<~>	<~>
523	410	<split-s>	<split-s>
523	410	<split-h>	<split-h>
523	410	<name2>	<name2>
523	524	<>	<name>
523	413	<aphaerese>	<aphaerese>
523	523	<>	<aphaerese>
523	410	<elision3>	<elision3>
523	523	<>	<elision3>
523	410	<elision2>	<elision2>
523	523	<>	<elision2>
523	410	<elision1>	<elision1>
523	523	<>	<elision1>
523	431	.	υ
523	431	.	u
523	431	.	κ
523	431	.	α
523	431	.	a
523	431	.	λ
523	527	<4s>	<>
524	412	.	.
524	412	 	 
524	412	<~>	<~>
524	412	<split-s>	<split-s>
524	412	<split-h>	<split-h>
524	412	<name2>	<name2>
524	415	<aphaerese>	<aphaerese>
524	525	<>	<aphaerese>
524	412	<elision3>	<elision3>
524	525	<>	<elision3>
524	412	<elision2>	<elision2>
524	525	<>	<elision2>
524	412	<elision1>	<elision1>
524	525	<>	<elision1>
524	433	.	υ
524	433	.	u
524	433	.	κ
524	433	.	α
524	433	.	a
524	433	.	λ
524	528	<4s>	<>
525	410	.	.
525	410	 	 
525	410	<~>	<~>
525	410	<split-s>	<split-s>
525	410	<split-h>	<split-h>
525	410	<name2>	<name2>
525	413	<aphaerese>	<aphaerese>
525	523	<>	<aphaerese>
525	410	<elision3>	<elision3>
525	523	<>	<elision3>
525	410	<elision2>	<elision2>
525	523	<>	<elision2>
525	410	<elision1>	<elision1>
525	523	<>	<elision1>
525	431	.	υ
525	431	.	u
525	431	.	κ
525	431	.	α
525	431	.	a
525	431	.	λ
525	526	<4s>	<>
526	527	<>	<aphaerese>
526	527	<>	<elision3>
526	527	<>	<elision2>
526	527	<>	<elision1>
526	530	<K>	<>
527	528	<>	<name>
527	527	<>	<aphaerese>
527	527	<>	<elision3>
527	527	<>	<elision2>
527	527	<>	<elision1>
527	531	<K>	<>
528	526	<>	<aphaerese>
528	526	<>	<elision3>
528	526	<>	<elision2>
528	526	<>	<elision1>
528	529	<K>	<>
529	291	.	.
529	291	<~>	<~>
529	291	<split-s>	<split-s>
529	291	<split-h>	<split-h>
529	291	<name2>	<name2>
529	294	<aphaerese>	<aphaerese>
529	530	<>	<aphaerese>
529	291	<elision3>	<elision3>
529	530	<>	<elision3>
529	291	<elision2>	<elision2>
529	530	<>	<elision2>
529	291	<elision1>	<elision1>
529	530	<>	<elision1>
529	287	.	υ
529	378	H	υ
529	287	.	u
529	387	H	u
529	287	.	κ
529	462	H	κ
529	360	H	k
529	363	H	U
529	366	H	K
529	287	.	α
529	390	H	α
529	287	.	a
529	393	H	a
529	346	H	A
529	287	.	λ
529	465	H	λ
529	375	H	l
529	370	H	L
530	289	.	.
530	289	<~>	<~>
530	289	<split-s>	<split-s>
530	289	<split-h>	<split-h>
530	289	<name2>	<name2>
530	292	<aphaerese>	<aphaerese>
530	531	<>	<aphaerese>
530	289	<elision3>	<elision3>
530	531	<>	<elision3>
530	289	<elision2>	<elision2>
530	531	<>	<elision2>
530	289	<elision1>	<elision1>
530	531	<>	<elision1>
530	288	.	υ
530	376	H	υ
530	288	.	u
530	385	H	u
530	288	.	κ
530	460	H	κ
530	358	H	k
530	361	H	U
530	364	H	K
530	288	.	α
530	388	H	α
530	288	.	a
530	391	H	a
530	347	H	A
530	288	.	λ
530	463	H	λ
530	373	H	l
530	371	H	L
531	289	.	.
531	289	<~>	<~>
531	289	<split-s>	<split-s>
531	289	<split-h>	<split-h>
531	289	<name2>	<name2>
531	529	<>	<name>
531	292	<aphaerese>	<aphaerese>
531	531	<>	<aphaerese>
531	289	<elision3>	<elision3>
531	531	<>	<elision3>
531	289	<elision2>	<elision2>
531	531	<>	<elision2>
531	289	<elision1>	<elision1>
531	531	<>	<elision1>
531	288	.	υ
531	376	H	υ
531	288	.	u
531	385	H	u
531	288	.	κ
531	460	H	κ
531	358	H	k
531	361	H	U
531	364	H	K
531	288	.	α
531	388	H	α
531	288	.	a
531	391	H	a
531	347	H	A
531	288	.	λ
531	463	H	λ
531	373	H	l
531	371	H	L
532	533	<>	<name>
532	532	<>	<aphaerese>
532	532	<>	<elision3>
532	532	<>	<elision2>
532	532	<>	<elision1>
532	410	<U2kl>	<>
533	534	<>	<aphaerese>
533	534	<>	<elision3>
533	534	<>	<elision2>
533	534	<>	<elision1>
533	411	<U2kl>	<>
534	532	<>	<aphaerese>
534	532	<>	<elision3>
534	532	<>	<elision2>
534	532	<>	<elision1>
534	412	<U2kl>	<>
535	536	<name>	<name>
535	539	<>	<name>
535	541	<>	<aphaerese>
535	541	<>	<elision3>
535	541	<>	<elision2>
535	541	<>	<elision1>
535	617	<4s>	<>
535	542	<A2kl>	<>
535	581	<L2kl>	<>
535	619	<K2kl>	<>
536	537	<4s>	<>
537	538	<K>	<>
538	366	H	k
538	370	H	l
539	540	<>	<aphaerese>
539	540	<>	<elision3>
539	540	<>	<elision2>
539	540	<>	<elision1>
539	543	<A2kl>	<>
539	582	<L2kl>	<>
539	609	<K2kl>	<>
540	541	<>	<aphaerese>
540	541	<>	<elision3>
540	541	<>	<elision2>
540	541	<>	<elision1>
540	544	<A2kl>	<>
540	583	<L2kl>	<>
540	610	<K2kl>	<>
541	539	<>	<name>
541	541	<>	<aphaerese>
541	541	<>	<elision3>
541	541	<>	<elision2>
541	541	<>	<elision1>
541	542	<A2kl>	<>
541	581	<L2kl>	<>
541	608	<K2kl>	<>
542	543	<>	<name>
542	542	<>	<aphaerese>
542	542	<>	<elision3>
542	542	<>	<elision2>
542	542	<>	<elision1>
542	545	.	κ
542	545	.	λ
542	576	<4s>	<>
543	544	<>	<aphaerese>
543	544	<>	<elision3>
543	544	<>	<elision2>
543	544	<>	<elision1>
543	547	.	κ
543	547	.	λ
543	577	<4s>	<>
544	542	<>	<aphaerese>
544	542	<>	<elision3>
544	542	<>	<elision2>
544	542	<>	<elision1>
544	545	.	κ
544	545	.	λ
544	575	<4s>	<>
545	546	<>	<name>
545	545	<>	<aphaerese>
545	548	<elision3>	<elision3>
545	545	<>	<elision3>
545	548	<elision2>	<elision2>
545	545	<>	<elision2>
545	548	<elision1>	<elision1>
545	545	<>	<elision1>
545	570	<4s>	<>
546	547	<>	<aphaerese>
546	550	<elision3>	<elision3>
546	547	<>	<elision3>
546	550	<elision2>	<elision2>
546	547	<>	<elision2>
546	550	<elision1>	<elision1>
546	547	<>	<elision1>
546	571	<4s>	<>
547	545	<>	<aphaerese>
547	548	<elision3>	<elision3>
547	545	<>	<elision3>
547	548	<elision2>	<elision2>
547	545	<>	<elision2>
547	548	<elision1>	<elision1>
547	545	<>	<elision1>
547	569	<4s>	<>
548	410	.	.
548	410	 	 
548	410	<~>	<~>
548	410	<split-s>	<split-s>
548	410	<split-h>	<split-h>
548	410	<name2>	<name2>
548	549	<>	<name>
548	413	<aphaerese>	<aphaerese>
548	548	<>	<aphaerese>
548	410	<elision3>	<elision3>
548	548	<>	<elision3>
548	410	<elision2>	<elision2>
548	548	<>	<elision2>
548	410	<elision1>	<elision1>
548	548	<>	<elision1>
548	431	.	υ
548	431	.	u
548	431	.	α
548	431	.	a
548	552	<4s>	<>
549	412	.	.
549	412	 	 
549	412	<~>	<~>
549	412	<split-s>	<split-s>
549	412	<split-h>	<split-h>
549	412	<name2>	<name2>
549	415	<aphaerese>	<aphaerese>
549	550	<>	<aphaerese>
549	412	<elision3>	<elision3>
549	550	<>	<elision3>
549	412	<elision2>	<elision2>
549	550	<>	<elision2>
549	412	<elision1>	<elision1>
549	550	<>	<elision1>
549	433	.	υ
549	433	.	u
549	433	.	α
549	433	.	a
549	553	<4s>	<>
550	410	.	.
550	410	 	 
550	410	<~>	<~>
550	410	<split-s>	<split-s>
550	410	<split-h>	<split-h>
550	410	<name2>	<name2>
550	413	<aphaerese>	<aphaerese>
550	548	<>	<aphaerese>
550	410	<elision3>	<elision3>
550	548	<>	<elision3>
550	410	<elision2>	<elision2>
550	548	<>	<elision2>
550	410	<elision1>	<elision1>
550	548	<>	<elision1>
550	431	.	υ
550	431	.	u
550	431	.	α
550	431	.	a
550	551	<4s>	<>
551	552	<>	<aphaerese>
551	552	<>	<elision3>
551	552	<>	<elision2>
551	552	<>	<elision1>
551	555	<K>	<>
552	553	<>	<name>
552	552	<>	<aphaerese>
552	552	<>	<elision3>
552	552	<>	<elision2>
552	552	<>	<elision1>
552	556	<K>	<>
553	551	<>	<aphaerese>
553	551	<>	<elision3>
553	551	<>	<elision2>
553	551	<>	<elision1>
553	554	<K>	<>
554	291	.	.
554	291	<~>	<~>
554	291	<split-s>	<split-s>
554	291	<split-h>	<split-h>
554	291	<name2>	<name2>
554	294	<aphaerese>	<aphaerese>
554	555	<>	<aphaerese>
554	291	<elision3>	<elision3>
554	555	<>	<elision3>
554	291	<elision2>	<elision2>
554	555	<>	<elision2>
554	291	<elision1>	<elision1>
554	555	<>	<elision1>
554	287	.	υ
554	378	H	υ
554	287	.	u
554	387	H	u
554	559	H	κ
554	568	H	k
554	363	H	U
554	560	H	K
554	287	.	α
554	390	H	α
554	287	.	a
554	393	H	a
554	346	H	A
554	559	H	λ
554	568	H	l
554	560	H	L
555	289	.	.
555	289	<~>	<~>
555	289	<split-s>	<split-s>
555	289	<split-h>	<split-h>
555	289	<name2>	<name2>
555	292	<aphaerese>	<aphaerese>
555	556	<>	<aphaerese>
555	289	<elision3>	<elision3>
555	556	<>	<elision3>
555	289	<elision2>	<elision2>
555	556	<>	<elision2>
555	289	<elision1>	<elision1>
555	556	<>	<elision1>
555	288	.	υ
555	376	H	υ
555	288	.	u
555	385	H	u
555	557	H	κ
555	566	H	k
555	361	H	U
555	561	H	K
555	288	.	α
555	388	H	α
555	288	.	a
555	391	H	a
555	347	H	A
555	557	H	λ
555	566	H	l
555	561	H	L
556	289	.	.
556	289	<~>	<~>
556	289	<split-s>	<split-s>
556	289	<split-h>	<split-h>
556	289	<name2>	<name2>
556	554	<>	<name>
556	292	<aphaerese>	<aphaerese>
556	556	<>	<aphaerese>
556	289	<elision3>	<elision3>
556	556	<>	<elision3>
556	289	<elision2>	<elision2>
556	556	<>	<elision2>
556	289	<elision1>	<elision1>
556	556	<>	<elision1>
556	288	.	υ
556	376	H	υ
556	288	.	u
556	385	H	u
556	557	H	κ
556	566	H	k
556	361	H	U
556	561	H	K
556	288	.	α
556	388	H	α
556	288	.	a
556	391	H	a
556	347	H	A
556	557	H	λ
556	566	H	l
556	561	H	L
557	558	<>	<name>
557	557	<>	<aphaerese>
557	557	<>	<elision3>
557	557	<>	<elision2>
557	557	<>	<elision1>
557	561	<lambda2L>	<>
558	559	<>	<aphaerese>
558	559	<>	<elision3>
558	559	<>	<elision2>
558	559	<>	<elision1>
558	562	<lambda2L>	<>
559	557	<>	<aphaerese>
559	557	<>	<elision3>
559	557	<>	<elision2>
559	557	<>	<elision1>
559	560	<lambda2L>	<>
560	561	<>	<aphaerese>
560	561	<>	<elision3>
560	561	<>	<elision2>
560	561	<>	<elision1>
560	564	.	κ
560	564	.	λ
561	562	<>	<name>
561	561	<>	<aphaerese>
561	561	<>	<elision3>
561	561	<>	<elision2>
561	561	<>	<elision1>
561	564	.	κ
561	564	.	λ
562	560	<>	<aphaerese>
562	560	<>	<elision3>
562	560	<>	<elision2>
562	560	<>	<elision1>
562	563	.	κ
562	563	.	λ
563	564	<>	<aphaerese>
563	317	<elision3>	<elision3>
563	564	<>	<elision3>
563	317	<elision2>	<elision2>
563	564	<>	<elision2>
563	317	<elision1>	<elision1>
563	564	<>	<elision1>
564	565	<>	<name>
564	564	<>	<aphaerese>
564	317	<elision3>	<elision3>
564	564	<>	<elision3>
564	317	<elision2>	<elision2>
564	564	<>	<elision2>
564	317	<elision1>	<elision1>
564	564	<>	<elision1>
565	563	<>	<aphaerese>
565	316	<elision3>	<elision3>
565	563	<>	<elision3>
565	316	<elision2>	<elision2>
565	563	<>	<elision2>
565	316	<elision1>	<elision1>
565	563	<>	<elision1>
566	567	<>	<name>
566	566	<>	<aphaerese>
566	566	<>	<elision3>
566	566	<>	<elision2>
566	566	<>	<elision1>
566	561	<l2L>	<>
567	568	<>	<aphaerese>
567	568	<>	<elision3>
567	568	<>	<elision2>
567	568	<>	<elision1>
567	562	<l2L>	<>
568	566	<>	<aphaerese>
568	566	<>	<elision3>
568	566	<>	<elision2>
568	566	<>	<elision1>
568	560	<l2L>	<>
569	570	<>	<aphaerese>
569	570	<>	<elision3>
569	570	<>	<elision2>
569	570	<>	<elision1>
569	573	<K>	<>
570	571	<>	<name>
570	570	<>	<aphaerese>
570	570	<>	<elision3>
570	570	<>	<elision2>
570	570	<>	<elision1>
570	574	<K>	<>
571	569	<>	<aphaerese>
571	569	<>	<elision3>
571	569	<>	<elision2>
571	569	<>	<elision1>
571	572	<K>	<>
572	573	<>	<aphaerese>
572	555	<elision3>	<elision3>
572	573	<>	<elision3>
572	555	<elision2>	<elision2>
572	573	<>	<elision2>
572	555	<elision1>	<elision1>
572	573	<>	<elision1>
573	574	<>	<aphaerese>
573	556	<elision3>	<elision3>
573	574	<>	<elision3>
573	556	<elision2>	<elision2>
573	574	<>	<elision2>
573	556	<elision1>	<elision1>
573	574	<>	<elision1>
574	572	<>	<name>
574	574	<>	<aphaerese>
574	556	<elision3>	<elision3>
574	574	<>	<elision3>
574	556	<elision2>	<elision2>
574	574	<>	<elision2>
574	556	<elision1>	<elision1>
574	574	<>	<elision1>
575	576	<>	<aphaerese>
575	576	<>	<elision3>
575	576	<>	<elision2>
575	576	<>	<elision1>
575	579	<K>	<>
576	577	<>	<name>
576	576	<>	<aphaerese>
576	576	<>	<elision3>
576	576	<>	<elision2>
576	576	<>	<elision1>
576	580	<K>	<>
577	575	<>	<aphaerese>
577	575	<>	<elision3>
577	575	<>	<elision2>
577	575	<>	<elision1>
577	578	<K>	<>
578	579	<>	<aphaerese>
578	579	<>	<elision3>
578	579	<>	<elision2>
578	579	<>	<elision1>
578	573	.	κ
578	573	.	λ
579	580	<>	<aphaerese>
579	580	<>	<elision3>
579	580	<>	<elision2>
579	580	<>	<elision1>
579	574	.	κ
579	574	.	λ
580	578	<>	<name>
580	580	<>	<aphaerese>
580	580	<>	<elision3>
580	580	<>	<elision2>
580	580	<>	<elision1>
580	574	.	κ
580	574	.	λ
581	582	<>	<name>
581	581	<>	<aphaerese>
581	581	<>	<elision3>
581	581	<>	<elision2>
581	581	<>	<elision1>
581	584	.	κ
581	584	.	λ
581	603	<4s>	<>
582	583	<>	<aphaerese>
582	583	<>	<elision3>
582	583	<>	<elision2>
582	583	<>	<elision1>
582	586	.	κ
582	586	.	λ
582	604	<4s>	<>
583	581	<>	<aphaerese>
583	581	<>	<elision3>
583	581	<>	<elision2>
583	581	<>	<elision1>
583	584	.	κ
583	584	.	λ
583	602	<4s>	<>
584	585	<>	<name>
584	584	<>	<aphaerese>
584	587	<elision3>	<elision3>
584	584	<>	<elision3>
584	587	<elision2>	<elision2>
584	584	<>	<elision2>
584	587	<elision1>	<elision1>
584	584	<>	<elision1>
584	597	<4s>	<>
585	586	<>	<aphaerese>
585	589	<elision3>	<elision3>
585	586	<>	<elision3>
585	589	<elision2>	<elision2>
585	586	<>	<elision2>
585	589	<elision1>	<elision1>
585	586	<>	<elision1>
585	598	<4s>	<>
586	584	<>	<aphaerese>
586	587	<elision3>	<elision3>
586	584	<>	<elision3>
586	587	<elision2>	<elision2>
586	584	<>	<elision2>
586	587	<elision1>	<elision1>
586	584	<>	<elision1>
586	596	<4s>	<>
587	588	<>	<name>
587	587	<>	<aphaerese>
587	587	<>	<elision3>
587	587	<>	<elision2>
587	587	<>	<elision1>
587	416	.	κ
587	591	<4s>	<>
588	589	<>	<aphaerese>
588	589	<>	<elision3>
588	589	<>	<elision2>
588	589	<>	<elision1>
588	418	.	κ
588	592	<4s>	<>
589	587	<>	<aphaerese>
589	587	<>	<elision3>
589	587	<>	<elision2>
589	587	<>	<elision1>
589	416	.	κ
589	590	<4s>	<>
590	591	<>	<aphaerese>
590	591	<>	<elision3>
590	591	<>	<elision2>
590	591	<>	<elision1>
590	594	<K>	<>
591	592	<>	<name>
591	591	<>	<aphaerese>
591	591	<>	<elision3>
591	591	<>	<elision2>
591	591	<>	<elision1>
591	595	<K>	<>
592	590	<>	<aphaerese>
592	590	<>	<elision3>
592	590	<>	<elision2>
592	590	<>	<elision1>
592	593	<K>	<>
593	594	<>	<aphaerese>
593	594	<>	<elision3>
593	594	<>	<elision2>
593	594	<>	<elision1>
593	297	.	κ
593	336	H	κ
593	360	H	k
593	366	H	K
593	369	H	λ
593	375	H	l
593	370	H	L
594	595	<>	<aphaerese>
594	595	<>	<elision3>
594	595	<>	<elision2>
594	595	<>	<elision1>
594	295	.	κ
594	334	H	κ
594	358	H	k
594	364	H	K
594	367	H	λ
594	373	H	l
594	371	H	L
595	593	<>	<name>
595	595	<>	<aphaerese>
595	595	<>	<elision3>
595	595	<>	<elision2>
595	595	<>	<elision1>
595	295	.	κ
595	334	H	κ
595	358	H	k
595	364	H	K
595	367	H	λ
595	373	H	l
595	371	H	L
596	597	<>	<aphaerese>
596	597	<>	<elision3>
596	597	<>	<elision2>
596	597	<>	<elision1>
596	600	<K>	<>
597	598	<>	<name>
597	597	<>	<aphaerese>
597	597	<>	<elision3>
597	597	<>	<elision2>
597	597	<>	<elision1>
597	601	<K>	<>
598	596	<>	<aphaerese>
598	596	<>	<elision3>
598	596	<>	<elision2>
598	596	<>	<elision1>
598	599	<K>	<>
599	600	<>	<aphaerese>
599	594	<elision3>	<elision3>
599	600	<>	<elision3>
599	594	<elision2>	<elision2>
599	600	<>	<elision2>
599	594	<elision1>	<elision1>
599	600	<>	<elision1>
600	601	<>	<aphaerese>
600	595	<elision3>	<elision3>
600	601	<>	<elision3>
600	595	<elision2>	<elision2>
600	601	<>	<elision2>
600	595	<elision1>	<elision1>
600	601	<>	<elision1>
601	599	<>	<name>
601	601	<>	<aphaerese>
601	595	<elision3>	<elision3>
601	601	<>	<elision3>
601	595	<elision2>	<elision2>
601	601	<>	<elision2>
601	595	<elision1>	<elision1>
601	601	<>	<elision1>
602	603	<>	<aphaerese>
602	603	<>	<elision3>
602	603	<>	<elision2>
602	603	<>	<elision1>
602	606	<K>	<>
603	604	<>	<name>
603	603	<>	<aphaerese>
603	603	<>	<elision3>
603	603	<>	<elision2>
603	603	<>	<elision1>
603	607	<K>	<>
604	602	<>	<aphaerese>
604	602	<>	<elision3>
604	602	<>	<elision2>
604	602	<>	<elision1>
604	605	<K>	<>
605	606	<>	<aphaerese>
605	606	<>	<elision3>
605	606	<>	<elision2>
605	606	<>	<elision1>
605	600	.	κ
605	600	.	λ
606	607	<>	<aphaerese>
606	607	<>	<elision3>
606	607	<>	<elision2>
606	607	<>	<elision1>
606	601	.	κ
606	601	.	λ
607	605	<>	<name>
607	607	<>	<aphaerese>
607	607	<>	<elision3>
607	607	<>	<elision2>
607	607	<>	<elision1>
607	601	.	κ
607	601	.	λ
608	410	.	.
608	410	 	 
608	410	<~>	<~>
608	410	<split-s>	<split-s>
608	410	<split-h>	<split-h>
608	410	<name2>	<name2>
608	609	<>	<name>
608	413	<aphaerese>	<aphaerese>
608	608	<>	<aphaerese>
608	410	<elision3>	<elision3>
608	608	<>	<elision3>
608	410	<elision2>	<elision2>
608	608	<>	<elision2>
608	410	<elision1>	<elision1>
608	608	<>	<elision1>
608	431	.	υ
608	431	.	u
608	431	.	α
608	431	.	a
608	612	<4s>	<>
609	412	.	.
609	412	 	 
609	412	<~>	<~>
609	412	<split-s>	<split-s>
609	412	<split-h>	<split-h>
609	412	<name2>	<name2>
609	415	<aphaerese>	<aphaerese>
609	610	<>	<aphaerese>
609	412	<elision3>	<elision3>
609	610	<>	<elision3>
609	412	<elision2>	<elision2>
609	610	<>	<elision2>
609	412	<elision1>	<elision1>
609	610	<>	<elision1>
609	433	.	υ
609	433	.	u
609	433	.	α
609	433	.	a
609	613	<4s>	<>
610	410	.	.
610	410	 	 
610	410	<~>	<~>
610	410	<split-s>	<split-s>
610	410	<split-h>	<split-h>
610	410	<name2>	<name2>
610	413	<aphaerese>	<aphaerese>
610	608	<>	<aphaerese>
610	410	<elision3>	<elision3>
610	608	<>	<elision3>
610	410	<elision2>	<elision2>
610	608	<>	<elision2>
610	410	<elision1>	<elision1>
610	608	<>	<elision1>
610	431	.	υ
610	431	.	u
610	431	.	α
610	431	.	a
610	611	<4s>	<>
611	612	<>	<aphaerese>
611	612	<>	<elision3>
611	612	<>	<elision2>
611	612	<>	<elision1>
611	615	<K>	<>
612	613	<>	<name>
612	612	<>	<aphaerese>
612	612	<>	<elision3>
612	612	<>	<elision2>
612	612	<>	<elision1>
612	616	<K>	<>
613	611	<>	<aphaerese>
613	611	<>	<elision3>
613	611	<>	<elision2>
613	611	<>	<elision1>
613	614	<K>	<>
614	291	.	.
614	291	<~>	<~>
614	291	<split-s>	<split-s>
614	291	<split-h>	<split-h>
614	291	<name2>	<name2>
614	294	<aphaerese>	<aphaerese>
614	615	<>	<aphaerese>
614	291	<elision3>	<elision3>
614	615	<>	<elision3>
614	291	<elision2>	<elision2>
614	615	<>	<elision2>
614	291	<elision1>	<elision1>
614	615	<>	<elision1>
614	287	.	υ
614	378	H	υ
614	287	.	u
614	387	H	u
614	462	H	κ
614	360	H	k
614	363	H	U
614	366	H	K
614	287	.	α
614	390	H	α
614	287	.	a
614	393	H	a
614	346	H	A
614	465	H	λ
614	375	H	l
614	370	H	L
615	289	.	.
615	289	<~>	<~>
615	289	<split-s>	<split-s>
615	289	<split-h>	<split-h>
615	289	<name2>	<name2>
615	292	<aphaerese>	<aphaerese>
615	616	<>	<aphaerese>
615	289	<elision3>	<elision3>
615	616	<>	<elision3>
615	289	<elision2>	<elision2>
615	616	<>	<elision2>
615	289	<elision1>	<elision1>
615	616	<>	<elision1>
615	288	.	υ
615	376	H	υ
615	288	.	u
615	385	H	u
615	460	H	κ
615	358	H	k
615	361	H	U
615	364	H	K
615	288	.	α
615	388	H	α
615	288	.	a
615	391	H	a
615	347	H	A
615	463	H	λ
615	373	H	l
615	371	H	L
616	289	.	.
616	289	<~>	<~>
616	289	<split-s>	<split-s>
616	289	<split-h>	<split-h>
616	289	<name2>	<name2>
616	614	<>	<name>
616	292	<aphaerese>	<aphaerese>
616	616	<>	<aphaerese>
616	289	<elision3>	<elision3>
616	616	<>	<elision3>
616	289	<elision2>	<elision2>
616	616	<>	<elision2>
616	289	<elision1>	<elision1>
616	616	<>	<elision1>
616	288	.	υ
616	376	H	υ
616	288	.	u
616	385	H	u
616	460	H	κ
616	358	H	k
616	361	H	U
616	364	H	K
616	288	.	α
616	388	H	α
616	288	.	a
616	391	H	a
616	347	H	A
616	463	H	λ
616	373	H	l
616	371	H	L
617	618	<K>	<>
618	538	<name>	<name>
619	410	.	.
619	410	 	 
619	410	<~>	<~>
619	410	<split-s>	<split-s>
619	410	<split-h>	<split-h>
619	410	<name2>	<name2>
619	536	<name2>	<name>
619	609	<>	<name>
619	413	<aphaerese>	<aphaerese>
619	608	<>	<aphaerese>
619	410	<elision3>	<elision3>
619	608	<>	<elision3>
619	410	<elision2>	<elision2>
619	608	<>	<elision2>
619	410	<elision1>	<elision1>
619	608	<>	<elision1>
619	431	.	υ
619	431	.	u
619	431	.	α
619	431	.	a
619	620	<4s>	<>
620	613	<>	<name>
620	612	<>	<aphaerese>
620	612	<>	<elision3>
620	612	<>	<elision2>
620	612	<>	<elision1>
620	621	<K>	<>
621	289	.	.
621	289	<~>	<~>
621	289	<split-s>	<split-s>
621	289	<split-h>	<split-h>
621	289	<name2>	<name2>
621	538	<name2>	<name>
621	614	<>	<name>
621	292	<aphaerese>	<aphaerese>
621	616	<>	<aphaerese>
621	289	<elision3>	<elision3>
621	616	<>	<elision3>
621	289	<elision2>	<elision2>
621	616	<>	<elision2>
621	289	<elision1>	<elision1>
621	616	<>	<elision1>
621	288	.	υ
621	376	H	υ
621	288	.	u
621	385	H	u
621	460	H	κ
621	358	H	k
621	361	H	U
621	364	H	K
621	288	.	α
621	388	H	α
621	288	.	a
621	391	H	a
621	347	H	A
621	463	H	λ
621	373	H	l
621	371	H	L
622	623	<>	<name>
622	622	<>	<aphaerese>
622	622	<>	<elision3>
622	622	<>	<elision2>
622	622	<>	<elision1>
622	410	<A2kl>	<>
623	624	<>	<aphaerese>
623	624	<>	<elision3>
623	624	<>	<elision2>
623	624	<>	<elision1>
623	411	<A2kl>	<>
624	622	<>	<aphaerese>
624	622	<>	<elision3>
624	622	<>	<elision2>
624	622	<>	<elision1>
624	412	<A2kl>	<>
625	536	<name>	<name>
625	626	<>	<name>
625	628	<>	<aphaerese>
625	628	<>	<elision3>
625	628	<>	<elision2>
625	628	<>	<elision1>
625	617	<4s>	<>
625	542	<A2kl>	<>
625	638	<L2kl>	<>
626	627	<>	<aphaerese>
626	627	<>	<elision3>
626	627	<>	<elision2>
626	627	<>	<elision1>
626	543	<A2kl>	<>
626	630	<L2kl>	<>
627	628	<>	<aphaerese>
627	628	<>	<elision3>
627	628	<>	<elision2>
627	628	<>	<elision1>
627	544	<A2kl>	<>
627	631	<L2kl>	<>
628	626	<>	<name>
628	628	<>	<aphaerese>
628	628	<>	<elision3>
628	628	<>	<elision2>
628	628	<>	<elision1>
628	542	<A2kl>	<>
628	629	<L2kl>	<>
629	410	.	.
629	410	 	 
629	410	<~>	<~>
629	410	<split-s>	<split-s>
629	410	<split-h>	<split-h>
629	410	<name2>	<name2>
629	630	<>	<name>
629	413	<aphaerese>	<aphaerese>
629	629	<>	<aphaerese>
629	410	<elision3>	<elision3>
629	629	<>	<elision3>
629	410	<elision2>	<elision2>
629	629	<>	<elision2>
629	410	<elision1>	<elision1>
629	629	<>	<elision1>
629	431	.	υ
629	431	.	u
629	584	.	κ
629	431	.	α
629	431	.	a
629	584	.	λ
629	633	<4s>	<>
630	412	.	.
630	412	 	 
630	412	<~>	<~>
630	412	<split-s>	<split-s>
630	412	<split-h>	<split-h>
630	412	<name2>	<name2>
630	415	<aphaerese>	<aphaerese>
630	631	<>	<aphaerese>
630	412	<elision3>	<elision3>
630	631	<>	<elision3>
630	412	<elision2>	<elision2>
630	631	<>	<elision2>
630	412	<elision1>	<elision1>
630	631	<>	<elision1>
630	433	.	υ
630	433	.	u
630	586	.	κ
630	433	.	α
630	433	.	a
630	586	.	λ
630	634	<4s>	<>
631	410	.	.
631	410	 	 
631	410	<~>	<~>
631	410	<split-s>	<split-s>
631	410	<split-h>	<split-h>
631	410	<name2>	<name2>
631	413	<aphaerese>	<aphaerese>
631	629	<>	<aphaerese>
631	410	<elision3>	<elision3>
631	629	<>	<elision3>
631	410	<elision2>	<elision2>
631	629	<>	<elision2>
631	410	<elision1>	<elision1>
631	629	<>	<elision1>
631	431	.	υ
631	431	.	u
631	584	.	κ
631	431	.	α
631	431	.	a
631	584	.	λ
631	632	<4s>	<>
632	633	<>	<aphaerese>
632	633	<>	<elision3>
632	633	<>	<elision2>
632	633	<>	<elision1>
632	636	<K>	<>
633	634	<>	<name>
633	633	<>	<aphaerese>
633	633	<>	<elision3>
633	633	<>	<elision2>
633	633	<>	<elision1>
633	637	<K>	<>
634	632	<>	<aphaerese>
634	632	<>	<elision3>
634	632	<>	<elision2>
634	632	<>	<elision1>
634	635	<K>	<>
635	291	.	.
635	291	<~>	<~>
635	291	<split-s>	<split-s>
635	291	<split-h>	<split-h>
635	291	<name2>	<name2>
635	294	<aphaerese>	<aphaerese>
635	636	<>	<aphaerese>
635	291	<elision3>	<elision3>
635	636	<>	<elision3>
635	291	<elision2>	<elision2>
635	636	<>	<elision2>
635	291	<elision1>	<elision1>
635	636	<>	<elision1>
635	287	.	υ
635	378	H	υ
635	287	.	u
635	387	H	u
635	600	.	κ
635	462	H	κ
635	360	H	k
635	363	H	U
635	366	H	K
635	287	.	α
635	390	H	α
635	287	.	a
635	393	H	a
635	346	H	A
635	600	.	λ
635	465	H	λ
635	375	H	l
635	370	H	L
636	289	.	.
636	289	<~>	<~>
636	289	<split-s>	<split-s>
636	289	<split-h>	<split-h>
636	289	<name2>	<name2>
636	292	<aphaerese>	<aphaerese>
636	637	<>	<aphaerese>
636	289	<elision3>	<elision3>
636	637	<>	<elision3>
636	289	<elision2>	<elision2>
636	637	<>	<elision2>
636	289	<elision1>	<elision1>
636	637	<>	<elision1>
636	288	.	υ
636	376	H	υ
636	288	.	u
636	385	H	u
636	601	.	κ
636	460	H	κ
636	358	H	k
636	361	H	U
636	364	H	K
636	288	.	α
636	388	H	α
636	288	.	a
636	391	H	a
636	347	H	A
636	601	.	λ
636	463	H	λ
636	373	H	l
636	371	H	L
637	289	.	.
637	289	<~>	<~>
637	289	<split-s>	<split-s>
637	289	<split-h>	<split-h>
637	289	<name2>	<name2>
637	635	<>	<name>
637	292	<aphaerese>	<aphaerese>
637	637	<>	<aphaerese>
637	289	<elision3>	<elision3>
637	637	<>	<elision3>
637	289	<elision2>	<elision2>
637	637	<>	<elision2>
637	289	<elision1>	<elision1>
637	637	<>	<elision1>
637	288	.	υ
637	376	H	υ
637	288	.	u
637	385	H	u
637	601	.	κ
637	460	H	κ
637	358	H	k
637	361	H	U
637	364	H	K
637	288	.	α
637	388	H	α
637	288	.	a
637	391	H	a
637	347	H	A
637	601	.	λ
637	463	H	λ
637	373	H	l
637	371	H	L
638	410	.	.
638	410	 	 
638	410	<~>	<~>
638	410	<split-s>	<split-s>
638	410	<split-h>	<split-h>
638	410	<name2>	<name2>
638	536	<name2>	<name>
638	630	<>	<name>
638	413	<aphaerese>	<aphaerese>
638	629	<>	<aphaerese>
638	410	<elision3>	<elision3>
638	629	<>	<elision3>
638	410	<elision2>	<elision2>
638	629	<>	<elision2>
638	410	<elision1>	<elision1>
638	629	<>	<elision1>
638	431	.	υ
638	431	.	u
638	584	.	κ
638	431	.	α
638	431	.	a
638	584	.	λ
638	639	<4s>	<>
639	634	<>	<name>
639	633	<>	<aphaerese>
639	633	<>	<elision3>
639	633	<>	<elision2>
639	633	<>	<elision1>
639	640	<K>	<>
640	289	.	.
640	289	<~>	<~>
640	289	<split-s>	<split-s>
640	289	<split-h>	<split-h>
640	289	<name2>	<name2>
640	538	<name2>	<name>
640	635	<>	<name>
640	292	<aphaerese>	<aphaerese>
640	637	<>	<aphaerese>
640	289	<elision3>	<elision3>
640	637	<>	<elision3>
640	289	<elision2>	<elision2>
640	637	<>	<elision2>
640	289	<elision1>	<elision1>
640	637	<>	<elision1>
640	288	.	υ
640	376	H	υ
640	288	.	u
640	385	H	u
640	601	.	κ
640	460	H	κ
640	358	H	k
640	361	H	U
640	364	H	K
640	288	.	α
640	388	H	α
640	288	.	a
640	391	H	a
640	347	H	A
640	601	.	λ
640	463	H	λ
640	373	H	l
640	371	H	L
641	642	<>	<name>
641	641	<>	<aphaerese>
641	641	<>	<elision3>
641	641	<>	<elision2>
641	641	<>	<elision1>
641	435	<3s>	<>
642	643	<>	<aphaerese>
642	643	<>	<elision3>
642	643	<>	<elision2>
642	643	<>	<elision1>
642	436	<3s>	<>
643	641	<>	<aphaerese>
643	641	<>	<elision3>
643	641	<>	<elision2>
643	641	<>	<elision1>
643	434	<3s>	<>
644	410	.	.
644	410	 	 
644	410	<~>	<~>
644	410	<split-s>	<split-s>
644	410	<split-h>	<split-h>
644	410	<name2>	<name2>
644	437	<>	<name>
644	413	<aphaerese>	<aphaerese>
644	409	<>	<aphaerese>
644	409	<>	<elision3>
644	409	<>	<elision2>
644	409	<>	<elision1>
644	431	.	υ
644	431	.	u
644	416	.	κ
644	431	.	α
644	431	.	a
644	645	<4s>	<>
645	441	<>	<name>
645	440	<>	<aphaerese>
645	440	<>	<elision3>
645	440	<>	<elision2>
645	440	<>	<elision1>
645	646	<K>	<>
646	289	.	.
646	289	<~>	<~>
646	289	<split-s>	<split-s>
646	289	<split-h>	<split-h>
646	289	<name2>	<name2>
646	442	<>	<name>
646	292	<aphaerese>	<aphaerese>
646	444	<>	<aphaerese>
646	444	<>	<elision3>
646	444	<>	<elision2>
646	444	<>	<elision1>
646	288	.	υ
646	288	.	u
646	295	.	κ
646	361	H	U
646	364	H	K
646	288	.	α
646	288	.	a
646	347	H	A
646	371	H	L
647	410	.	.
647	410	 	 
647	410	<~>	<~>
647	410	<split-s>	<split-s>
647	410	<split-h>	<split-h>
647	410	<name2>	<name2>
647	482	<>	<name>
647	413	<aphaerese>	<aphaerese>
647	481	<>	<aphaerese>
647	484	<elision3>	<elision3>
647	481	<>	<elision3>
647	484	<elision2>	<elision2>
647	481	<>	<elision2>
647	484	<elision1>	<elision1>
647	481	<>	<elision1>
647	431	.	υ
647	431	.	u
647	431	.	κ
647	431	.	α
647	431	.	a
647	431	.	λ
647	648	<4s>	<>
648	519	<>	<name>
648	518	<>	<aphaerese>
648	518	<>	<elision3>
648	518	<>	<elision2>
648	518	<>	<elision1>
648	649	<K>	<>
649	289	.	.
649	289	<~>	<~>
649	289	<split-s>	<split-s>
649	289	<split-h>	<split-h>
649	289	<name2>	<name2>
649	520	<>	<name>
649	292	<aphaerese>	<aphaerese>
649	522	<>	<aphaerese>
649	492	<elision3>	<elision3>
649	522	<>	<elision3>
649	492	<elision2>	<elision2>
649	522	<>	<elision2>
649	492	<elision1>	<elision1>
649	522	<>	<elision1>
649	288	.	υ
649	288	.	u
649	288	.	κ
649	361	H	U
649	364	H	K
649	288	.	α
649	288	.	a
649	347	H	A
649	288	.	λ
649	371	H	L
650	410	.	.
650	410	 	 
650	410	<~>	<~>
650	410	<split-s>	<split-s>
650	410	<split-h>	<split-h>
650	410	<name2>	<name2>
650	524	<>	<name>
650	413	<aphaerese>	<aphaerese>
650	523	<>	<aphaerese>
650	410	<elision3>	<elision3>
650	523	<>	<elision3>
650	410	<elision2>	<elision2>
650	523	<>	<elision2>
650	410	<elision1>	<elision1>
650	523	<>	<elision1>
650	431	.	υ
650	431	.	u
650	431	.	κ
650	431	.	α
650	431	.	a
650	431	.	λ
650	651	<4s>	<>
651	528	<>	<name>
651	527	<>	<aphaerese>
651	527	<>	<elision3>
651	527	<>	<elision2>
651	527	<>	<elision1>
651	652	<K>	<>
652	289	.	.
652	289	<~>	<~>
652	289	<split-s>	<split-s>
652	289	<split-h>	<split-h>
652	289	<name2>	<name2>
652	529	<>	<name>
652	292	<aphaerese>	<aphaerese>
652	531	<>	<aphaerese>
652	289	<elision3>	<elision3>
652	531	<>	<elision3>
652	289	<elision2>	<elision2>
652	531	<>	<elision2>
652	289	<elision1>	<elision1>
652	531	<>	<elision1>
652	288	.	υ
652	288	.	u
652	288	.	κ
652	361	H	U
652	364	H	K
652	288	.	α
652	288	.	a
652	347	H	A
652	288	.	λ
652	371	H	L
653	533	<>	<name>
653	532	<>	<aphaerese>
653	532	<>	<elision3>
653	532	<>	<elision2>
653	532	<>	<elision1>
653	654	<U2kl>	<>
654	410	.	.
654	410	 	 
654	410	<~>	<~>
654	410	<split-s>	<split-s>
654	410	<split-h>	<split-h>
654	410	<name2>	<name2>
654	411	<>	<name>
654	413	<aphaerese>	<aphaerese>
654	410	<>	<aphaerese>
654	410	<elision3>	<elision3>
654	410	<>	<elision3>
654	410	<elision2>	<elision2>
654	410	<>	<elision2>
654	410	<elision1>	<elision1>
654	410	<>	<elision1>
654	431	.	υ
654	431	.	u
654	416	.	κ
654	431	.	α
654	431	.	a
654	655	<4s>	<>
655	436	<>	<name>
655	435	<>	<aphaerese>
655	435	<>	<elision3>
655	435	<>	<elision2>
655	435	<>	<elision1>
655	656	<K>	<>
656	289	.	.
656	289	<~>	<~>
656	289	<split-s>	<split-s>
656	289	<split-h>	<split-h>
656	289	<name2>	<name2>
656	290	<>	<name>
656	292	<aphaerese>	<aphaerese>
656	289	<>	<aphaerese>
656	289	<elision3>	<elision3>
656	289	<>	<elision3>
656	289	<elision2>	<elision2>
656	289	<>	<elision2>
656	289	<elision1>	<elision1>
656	289	<>	<elision1>
656	288	.	υ
656	288	.	u
656	295	.	κ
656	361	H	U
656	364	H	K
656	288	.	α
656	288	.	a
656	347	H	A
656	371	H	L
657	536	<name>	<name>
657	539	<>	<name>
657	541	<>	<aphaerese>
657	541	<>	<elision3>
657	541	<>	<elision2>
657	541	<>	<elision1>
657	617	<4s>	<>
657	542	<A2kl>	<>
657	581	<L2kl>	<>
657	658	<K2kl>	<>
658	410	.	.
658	410	 	 
658	410	<~>	<~>
658	410	<split-s>	<split-s>
658	410	<split-h>	<split-h>
658	410	<name2>	<name2>
658	536	<name2>	<name>
658	609	<>	<name>
658	413	<aphaerese>	<aphaerese>
658	608	<>	<aphaerese>
658	410	<elision3>	<elision3>
658	608	<>	<elision3>
658	410	<elision2>	<elision2>
658	608	<>	<elision2>
658	410	<elision1>	<elision1>
658	608	<>	<elision1>
658	431	.	υ
658	431	.	u
658	431	.	α
658	431	.	a
658	659	<4s>	<>
659	613	<>	<name>
659	612	<>	<aphaerese>
659	612	<>	<elision3>
659	612	<>	<elision2>
659	612	<>	<elision1>
659	660	<K>	<>
660	289	.	.
660	289	<~>	<~>
660	289	<split-s>	<split-s>
660	289	<split-h>	<split-h>
660	289	<name2>	<name2>
660	538	<name2>	<name>
660	614	<>	<name>
660	292	<aphaerese>	<aphaerese>
660	616	<>	<aphaerese>
660	289	<elision3>	<elision3>
660	616	<>	<elision3>
660	289	<elision2>	<elision2>
660	616	<>	<elision2>
660	289	<elision1>	<elision1>
660	616	<>	<elision1>
660	288	.	υ
660	288	.	u
660	361	H	U
660	364	H	K
660	288	.	α
660	288	.	a
660	347	H	A
660	371	H	L
661	623	<>	<name>
661	622	<>	<aphaerese>
661	622	<>	<elision3>
661	622	<>	<elision2>
661	622	<>	<elision1>
661	654	<A2kl>	<>
662	536	<name>	<name>
662	626	<>	<name>
662	628	<>	<aphaerese>
662	628	<>	<elision3>
662	628	<>	<elision2>
662	628	<>	<elision1>
662	617	<4s>	<>
662	542	<A2kl>	<>
662	663	<L2kl>	<>
663	410	.	.
663	410	 	 
663	410	<~>	<~>
663	410	<split-s>	<split-s>
663	410	<split-h>	<split-h>
663	410	<name2>	<name2>
663	536	<name2>	<name>
663	630	<>	<name>
663	413	<aphaerese>	<aphaerese>
663	629	<>	<aphaerese>
663	410	<elision3>	<elision3>
663	629	<>	<elision3>
663	410	<elision2>	<elision2>
663	629	<>	<elision2>
663	410	<elision1>	<elision1>
663	629	<>	<elision1>
663	431	.	υ
663	431	.	u
663	584	.	κ
663	431	.	α
663	431	.	a
663	584	.	λ
663	664	<4s>	<>
664	634	<>	<name>
664	633	<>	<aphaerese>
664	633	<>	<elision3>
664	633	<>	<elision2>
664	633	<>	<elision1>
664	665	<K>	<>
665	289	.	.
665	289	<~>	<~>
665	289	<split-s>	<split-s>
665	289	<split-h>	<split-h>
665	289	<name2>	<name2>
665	538	<name2>	<name>
665	635	<>	<name>
665	292	<aphaerese>	<aphaerese>
665	637	<>	<aphaerese>
665	289	<elision3>	<elision3>
665	637	<>	<elision3>
665	289	<elision2>	<elision2>
665	637	<>	<elision2>
665	289	<elision1>	<elision1>
665	637	<>	<elision1>
665	288	.	υ
665	288	.	u
665	601	.	κ
665	361	H	U
665	364	H	K
665	288	.	α
665	288	.	a
665	347	H	A
665	601	.	λ
665	371	H	L
666	395	.	.
666	396	 	 
666	395	<~>	<~>
666	395	<split-s>	<split-s>
666	395	<split-h>	<split-h>
666	395	<name2>	<name2>
666	399	<aphaerese>	<aphaerese>
666	399	<>	<aphaerese>
666	395	<elision3>	<elision3>
666	399	<>	<elision3>
666	395	<elision2>	<elision2>
666	399	<>	<elision2>
666	395	<elision1>	<elision1>
666	399	<>	<elision1>
666	395	.	υ
666	395	.	u
666	445	.	κ
666	481	s	κ
666	523	s	k
666	532	s	U
666	667	s	K
666	395	.	α
666	395	.	a
666	622	s	A
666	523	s	λ
666	523	s	l
666	680	s	L
666	687	<split-h>	<>
667	536	<name>	<name>
667	668	<>	<name>
667	670	<>	<aphaerese>
667	670	<>	<elision3>
667	670	<>	<elision2>
667	670	<>	<elision1>
667	617	<4s>	<>
667	671	<L2kl>	<>
667	619	<K2kl>	<>
668	669	<>	<aphaerese>
668	669	<>	<elision3>
668	669	<>	<elision2>
668	669	<>	<elision1>
668	672	<L2kl>	<>
668	609	<K2kl>	<>
669	670	<>	<aphaerese>
669	670	<>	<elision3>
669	670	<>	<elision2>
669	670	<>	<elision1>
669	673	<L2kl>	<>
669	610	<K2kl>	<>
670	668	<>	<name>
670	670	<>	<aphaerese>
670	670	<>	<elision3>
670	670	<>	<elision2>
670	670	<>	<elision1>
670	671	<L2kl>	<>
670	608	<K2kl>	<>
671	672	<>	<name>
671	671	<>	<aphaerese>
671	671	<>	<elision3>
671	671	<>	<elision2>
671	671	<>	<elision1>
671	431	.	κ
671	431	.	λ
671	675	<4s>	<>
672	673	<>	<aphaerese>
672	673	<>	<elision3>
672	673	<>	<elision2>
672	673	<>	<elision1>
672	433	.	κ
672	433	.	λ
672	676	<4s>	<>
673	671	<>	<aphaerese>
673	671	<>	<elision3>
673	671	<>	<elision2>
673	671	<>	<elision1>
673	431	.	κ
673	431	.	λ
673	674	<4s>	<>
674	675	<>	<aphaerese>
674	675	<>	<elision3>
674	675	<>	<elision2>
674	675	<>	<elision1>
674	678	<K>	<>
675	676	<>	<name>
675	675	<>	<aphaerese>
675	675	<>	<elision3>
675	675	<>	<elision2>
675	675	<>	<elision1>
675	679	<K>	<>
676	674	<>	<aphaerese>
676	674	<>	<elision3>
676	674	<>	<elision2>
676	674	<>	<elision1>
676	677	<K>	<>
677	678	<>	<aphaerese>
677	678	<>	<elision3>
677	678	<>	<elision2>
677	678	<>	<elision1>
677	287	.	κ
677	287	.	λ
678	679	<>	<aphaerese>
678	679	<>	<elision3>
678	679	<>	<elision2>
678	679	<>	<elision1>
678	288	.	κ
678	288	.	λ
679	677	<>	<name>
679	679	<>	<aphaerese>
679	679	<>	<elision3>
679	679	<>	<elision2>
679	679	<>	<elision1>
679	288	.	κ
679	288	.	λ
680	536	<name>	<name>
680	681	<>	<name>
680	683	<>	<aphaerese>
680	683	<>	<elision3>
680	683	<>	<elision2>
680	683	<>	<elision1>
680	617	<4s>	<>
680	684	<L2kl>	<>
681	682	<>	<aphaerese>
681	682	<>	<elision3>
681	682	<>	<elision2>
681	682	<>	<elision1>
681	524	<L2kl>	<>
682	683	<>	<aphaerese>
682	683	<>	<elision3>
682	683	<>	<elision2>
682	683	<>	<elision1>
682	525	<L2kl>	<>
683	681	<>	<name>
683	683	<>	<aphaerese>
683	683	<>	<elision3>
683	683	<>	<elision2>
683	683	<>	<elision1>
683	523	<L2kl>	<>
684	410	.	.
684	410	 	 
684	410	<~>	<~>
684	410	<split-s>	<split-s>
684	410	<split-h>	<split-h>
684	410	<name2>	<name2>
684	536	<name2>	<name>
684	524	<>	<name>
684	413	<aphaerese>	<aphaerese>
684	523	<>	<aphaerese>
684	410	<elision3>	<elision3>
684	523	<>	<elision3>
684	410	<elision2>	<elision2>
684	523	<>	<elision2>
684	410	<elision1>	<elision1>
684	523	<>	<elision1>
684	431	.	υ
684	431	.	u
684	431	.	κ
684	431	.	α
684	431	.	a
684	431	.	λ
684	685	<4s>	<>
685	528	<>	<name>
685	527	<>	<aphaerese>
685	527	<>	<elision3>
685	527	<>	<elision2>
685	527	<>	<elision1>
685	686	<K>	<>
686	289	.	.
686	289	<~>	<~>
686	289	<split-s>	<split-s>
686	289	<split-h>	<split-h>
686	289	<name2>	<name2>
686	538	<name2>	<name>
686	529	<>	<name>
686	292	<aphaerese>	<aphaerese>
686	531	<>	<aphaerese>
686	289	<elision3>	<elision3>
686	531	<>	<elision3>
686	289	<elision2>	<elision2>
686	531	<>	<elision2>
686	289	<elision1>	<elision1>
686	531	<>	<elision1>
686	288	.	υ
686	376	H	υ
686	288	.	u
686	385	H	u
686	288	.	κ
686	460	H	κ
686	358	H	k
686	361	H	U
686	364	H	K
686	288	.	α
686	388	H	α
686	288	.	a
686	391	H	a
686	347	H	A
686	288	.	λ
686	463	H	λ
686	373	H	l
686	371	H	L
687	688	<>	<aphaerese>
687	688	<>	<elision3>
687	688	<>	<elision2>
687	688	<>	<elision1>
687	428	<3s>	<>
688	689	<>	<name>
688	688	<>	<aphaerese>
688	688	<>	<elision3>
688	688	<>	<elision2>
688	688	<>	<elision1>
688	429	<3s>	<>
689	687	<>	<aphaerese>
689	687	<>	<elision3>
689	687	<>	<elision2>
689	687	<>	<elision1>
689	430	<3s>	<>
690	395	.	.
690	396	 	 
690	395	<~>	<~>
690	395	<split-s>	<split-s>
690	395	<split-h>	<split-h>
690	395	<name2>	<name2>
690	399	<aphaerese>	<aphaerese>
690	402	<>	<aphaerese>
690	395	<elision3>	<elision3>
690	402	<>	<elision3>
690	395	<elision2>	<elision2>
690	402	<>	<elision2>
690	395	<elision1>	<elision1>
690	402	<>	<elision1>
690	403	.	υ
690	409	s	υ
690	403	.	u
690	409	s	u
690	445	.	κ
690	481	s	κ
690	523	s	k
690	532	s	U
690	535	s	K
690	403	.	α
690	409	s	α
690	403	.	a
690	409	s	a
690	622	s	A
690	523	s	λ
690	523	s	l
690	625	s	L
690	643	<split-h>	<>
691	398	.	.
691	401	 	 
691	398	<~>	<~>
691	398	<split-s>	<split-s>
691	398	<split-h>	<split-h>
691	398	<name2>	<name2>
691	666	<aphaerese>	<aphaerese>
691	398	<>	<aphaerese>
691	398	<elision3>	<elision3>
691	398	<>	<elision3>
691	398	<elision2>	<elision2>
691	398	<>	<elision2>
691	398	<elision1>	<elision1>
691	398	<>	<elision1>
691	405	.	υ
691	438	s	υ
691	405	.	u
691	438	s	u
691	447	.	κ
691	483	s	κ
691	525	s	k
691	534	s	U
691	669	s	K
691	405	.	α
691	438	s	α
691	405	.	a
691	438	s	a
691	624	s	A
691	525	s	λ
691	525	s	l
691	682	s	L
691	642	<split-h>	<>
692	398	.	.
692	401	 	 
692	398	<~>	<~>
692	398	<split-s>	<split-s>
692	398	<split-h>	<split-h>
692	398	<name2>	<name2>
692	666	<aphaerese>	<aphaerese>
692	693	<>	<aphaerese>
692	693	<>	<elision3>
692	693	<>	<elision2>
692	693	<>	<elision1>
692	405	.	υ
692	438	s	υ
692	405	.	u
692	438	s	u
692	447	.	κ
692	483	s	κ
692	525	s	k
692	534	s	U
692	669	s	K
692	405	.	α
692	438	s	α
692	405	.	a
692	438	s	a
692	624	s	A
692	525	s	λ
692	525	s	l
692	682	s	L
692	696	<split-h>	<>
693	395	.	.
693	396	 	 
693	395	<~>	<~>
693	395	<split-s>	<split-s>
693	395	<split-h>	<split-h>
693	395	<name2>	<name2>
693	399	<aphaerese>	<aphaerese>
693	394	<>	<aphaerese>
693	394	<>	<elision3>
693	394	<>	<elision2>
693	394	<>	<elision1>
693	403	.	υ
693	409	s	υ
693	403	.	u
693	409	s	u
693	445	.	κ
693	481	s	κ
693	523	s	k
693	532	s	U
693	667	s	K
693	403	.	α
693	409	s	α
693	403	.	a
693	409	s	a
693	622	s	A
693	523	s	λ
693	523	s	l
693	680	s	L
693	694	<split-h>	<>
694	695	<>	<aphaerese>
694	695	<>	<elision3>
694	695	<>	<elision2>
694	695	<>	<elision1>
694	439	<3s>	<>
695	696	<>	<name>
695	695	<>	<aphaerese>
695	695	<>	<elision3>
695	695	<>	<elision2>
695	695	<>	<elision1>
695	440	<3s>	<>
696	694	<>	<aphaerese>
696	694	<>	<elision3>
696	694	<>	<elision2>
696	694	<>	<elision1>
696	441	<3s>	<>
697	698	<>	<name>
697	697	<>	<aphaerese>
697	700	<elision3>	<elision3>
697	697	<>	<elision3>
697	700	<elision2>	<elision2>
697	697	<>	<elision2>
697	700	<elision1>	<elision1>
697	697	<>	<elision1>
697	426	<2s>	<>
698	699	<>	<aphaerese>
698	702	<elision3>	<elision3>
698	699	<>	<elision3>
698	702	<elision2>	<elision2>
698	699	<>	<elision2>
698	702	<elision1>	<elision1>
698	699	<>	<elision1>
698	427	<2s>	<>
699	697	<>	<aphaerese>
699	700	<elision3>	<elision3>
699	697	<>	<elision3>
699	700	<elision2>	<elision2>
699	697	<>	<elision2>
699	700	<elision1>	<elision1>
699	697	<>	<elision1>
699	425	<2s>	<>
700	701	<>	<name>
700	700	<>	<aphaerese>
700	700	<>	<elision3>
700	700	<>	<elision2>
700	700	<>	<elision1>
700	703	s	κ
700	703	s	k
700	718	s	K
700	703	s	λ
700	722	s	l
700	724	s	L
700	423	<2s>	<>
701	702	<>	<aphaerese>
701	702	<>	<elision3>
701	702	<>	<elision2>
701	702	<>	<elision1>
701	705	s	κ
701	705	s	k
701	720	s	K
701	705	s	λ
701	721	s	l
701	726	s	L
701	424	<2s>	<>
702	700	<>	<aphaerese>
702	700	<>	<elision3>
702	700	<>	<elision2>
702	700	<>	<elision1>
702	703	s	κ
702	703	s	k
702	718	s	K
702	703	s	λ
702	722	s	l
702	724	s	L
702	422	<2s>	<>
703	704	<>	<name>
703	703	<>	<aphaerese>
703	703	<>	<elision3>
703	703	<>	<elision2>
703	703	<>	<elision1>
703	706	s	κ
703	523	s	k
703	667	s	K
703	706	s	λ
703	523	s	l
703	680	s	L
703	716	<split-h>	<>
704	705	<>	<aphaerese>
704	705	<>	<elision3>
704	705	<>	<elision2>
704	705	<>	<elision1>
704	708	s	κ
704	525	s	k
704	669	s	K
704	708	s	λ
704	525	s	l
704	682	s	L
704	717	<split-h>	<>
705	703	<>	<aphaerese>
705	703	<>	<elision3>
705	703	<>	<elision2>
705	703	<>	<elision1>
705	706	s	κ
705	523	s	k
705	667	s	K
705	706	s	λ
705	523	s	l
705	680	s	L
705	715	<split-h>	<>
706	410	.	.
706	410	 	 
706	410	<~>	<~>
706	410	<split-s>	<split-s>
706	410	<split-h>	<split-h>
706	410	<name2>	<name2>
706	707	<>	<name>
706	413	<aphaerese>	<aphaerese>
706	706	<>	<aphaerese>
706	706	<>	<elision3>
706	706	<>	<elision2>
706	706	<>	<elision1>
706	431	.	υ
706	431	.	u
706	431	.	κ
706	431	.	α
706	431	.	a
706	431	.	λ
706	710	<4s>	<>
707	412	.	.
707	412	 	 
707	412	<~>	<~>
707	412	<split-s>	<split-s>
707	412	<split-h>	<split-h>
707	412	<name2>	<name2>
707	415	<aphaerese>	<aphaerese>
707	708	<>	<aphaerese>
707	708	<>	<elision3>
707	708	<>	<elision2>
707	708	<>	<elision1>
707	433	.	υ
707	433	.	u
707	433	.	κ
707	433	.	α
707	433	.	a
707	433	.	λ
707	711	<4s>	<>
708	410	.	.
708	410	 	 
708	410	<~>	<~>
708	410	<split-s>	<split-s>
708	410	<split-h>	<split-h>
708	410	<name2>	<name2>
708	413	<aphaerese>	<aphaerese>
708	706	<>	<aphaerese>
708	706	<>	<elision3>
708	706	<>	<elision2>
708	706	<>	<elision1>
708	431	.	υ
708	431	.	u
708	431	.	κ
708	431	.	α
708	431	.	a
708	431	.	λ
708	709	<4s>	<>
709	710	<>	<aphaerese>
709	710	<>	<elision3>
709	710	<>	<elision2>
709	710	<>	<elision1>
709	713	<K>	<>
710	711	<>	<name>
710	710	<>	<aphaerese>
710	710	<>	<elision3>
710	710	<>	<elision2>
710	710	<>	<elision1>
710	714	<K>	<>
711	709	<>	<aphaerese>
711	709	<>	<elision3>
711	709	<>	<elision2>
711	709	<>	<elision1>
711	712	<K>	<>
712	291	.	.
712	291	<~>	<~>
712	291	<split-s>	<split-s>
712	291	<split-h>	<split-h>
712	291	<name2>	<name2>
712	294	<aphaerese>	<aphaerese>
712	713	<>	<aphaerese>
712	713	<>	<elision3>
712	713	<>	<elision2>
712	713	<>	<elision1>
712	287	.	υ
712	378	H	υ
712	287	.	u
712	387	H	u
712	287	.	κ
712	462	H	κ
712	360	H	k
712	363	H	U
712	366	H	K
712	287	.	α
712	390	H	α
712	287	.	a
712	393	H	a
712	346	H	A
712	287	.	λ
712	465	H	λ
712	375	H	l
712	370	H	L
713	289	.	.
713	289	<~>	<~>
713	289	<split-s>	<split-s>
713	289	<split-h>	<split-h>
713	289	<name2>	<name2>
713	292	<aphaerese>	<aphaerese>
713	714	<>	<aphaerese>
713	714	<>	<elision3>
713	714	<>	<elision2>
713	714	<>	<elision1>
713	288	.	υ
713	376	H	υ
713	288	.	u
713	385	H	u
713	288	.	κ
713	460	H	κ
713	358	H	k
713	361	H	U
713	364	H	K
713	288	.	α
713	388	H	α
713	288	.	a
713	391	H	a
713	347	H	A
713	288	.	λ
713	463	H	λ
713	373	H	l
713	371	H	L
714	289	.	.
714	289	<~>	<~>
714	289	<split-s>	<split-s>
714	289	<split-h>	<split-h>
714	289	<name2>	<name2>
714	712	<>	<name>
714	292	<aphaerese>	<aphaerese>
714	714	<>	<aphaerese>
714	714	<>	<elision3>
714	714	<>	<elision2>
714	714	<>	<elision1>
714	288	.	υ
714	376	H	υ
714	288	.	u
714	385	H	u
714	288	.	κ
714	460	H	κ
714	358	H	k
714	361	H	U
714	364	H	K
714	288	.	α
714	388	H	α
714	288	.	a
714	391	H	a
714	347	H	A
714	288	.	λ
714	463	H	λ
714	373	H	l
714	371	H	L
715	716	<>	<aphaerese>
715	716	<>	<elision3>
715	716	<>	<elision2>
715	716	<>	<elision1>
715	454	<3s>	<>
716	717	<>	<name>
716	716	<>	<aphaerese>
716	716	<>	<elision3>
716	716	<>	<elision2>
716	716	<>	<elision1>
716	455	<3s>	<>
717	715	<>	<aphaerese>
717	715	<>	<elision3>
717	715	<>	<elision2>
717	715	<>	<elision1>
717	456	<3s>	<>
718	719	<>	<name>
718	718	<>	<aphaerese>
718	718	<>	<elision3>
718	718	<>	<elision2>
718	718	<>	<elision1>
718	722	<K2kl>	<>
719	720	<>	<aphaerese>
719	720	<>	<elision3>
719	720	<>	<elision2>
719	720	<>	<elision1>
719	723	<K2kl>	<>
720	718	<>	<aphaerese>
720	718	<>	<elision3>
720	718	<>	<elision2>
720	718	<>	<elision1>
720	721	<K2kl>	<>
721	722	<>	<aphaerese>
721	722	<>	<elision3>
721	722	<>	<elision2>
721	722	<>	<elision1>
721	715	<split-h>	<>
722	723	<>	<name>
722	722	<>	<aphaerese>
722	722	<>	<elision3>
722	722	<>	<elision2>
722	722	<>	<elision1>
722	716	<split-h>	<>
723	721	<>	<aphaerese>
723	721	<>	<elision3>
723	721	<>	<elision2>
723	721	<>	<elision1>
723	717	<split-h>	<>
724	725	<>	<name>
724	724	<>	<aphaerese>
724	724	<>	<elision3>
724	724	<>	<elision2>
724	724	<>	<elision1>
724	722	<L2kl>	<>
725	726	<>	<aphaerese>
725	726	<>	<elision3>
725	726	<>	<elision2>
725	726	<>	<elision1>
725	723	<L2kl>	<>
726	724	<>	<aphaerese>
726	724	<>	<elision3>
726	724	<>	<elision2>
726	724	<>	<elision1>
726	721	<L2kl>	<>
727	395	.	.
727	396	 	 
727	395	<~>	<~>
727	395	<split-s>	<split-s>
727	395	<split-h>	<split-h>
727	395	<name2>	<name2>
727	728	<>	<name>
727	399	<aphaerese>	<aphaerese>
727	727	<>	<aphaerese>
727	730	<elision3>	<elision3>
727	727	<>	<elision3>
727	730	<elision2>	<elision2>
727	727	<>	<elision2>
727	730	<elision1>	<elision1>
727	727	<>	<elision1>
727	403	.	υ
727	409	s	υ
727	403	.	u
727	409	s	u
727	403	.	κ
727	706	s	κ
727	523	s	k
727	532	s	U
727	667	s	K
727	403	.	α
727	409	s	α
727	403	.	a
727	409	s	a
727	622	s	A
727	403	.	λ
727	706	s	λ
727	523	s	l
727	680	s	L
727	778	<split-h>	<>
728	398	.	.
728	401	 	 
728	398	<~>	<~>
728	398	<split-s>	<split-s>
728	398	<split-h>	<split-h>
728	398	<name2>	<name2>
728	666	<aphaerese>	<aphaerese>
728	729	<>	<aphaerese>
728	732	<elision3>	<elision3>
728	729	<>	<elision3>
728	732	<elision2>	<elision2>
728	729	<>	<elision2>
728	732	<elision1>	<elision1>
728	729	<>	<elision1>
728	405	.	υ
728	438	s	υ
728	405	.	u
728	438	s	u
728	405	.	κ
728	708	s	κ
728	525	s	k
728	534	s	U
728	669	s	K
728	405	.	α
728	438	s	α
728	405	.	a
728	438	s	a
728	624	s	A
728	405	.	λ
728	708	s	λ
728	525	s	l
728	682	s	L
728	779	<split-h>	<>
729	395	.	.
729	396	 	 
729	395	<~>	<~>
729	395	<split-s>	<split-s>
729	395	<split-h>	<split-h>
729	395	<name2>	<name2>
729	399	<aphaerese>	<aphaerese>
729	727	<>	<aphaerese>
729	730	<elision3>	<elision3>
729	727	<>	<elision3>
729	730	<elision2>	<elision2>
729	727	<>	<elision2>
729	730	<elision1>	<elision1>
729	727	<>	<elision1>
729	403	.	υ
729	409	s	υ
729	403	.	u
729	409	s	u
729	403	.	κ
729	706	s	κ
729	523	s	k
729	532	s	U
729	667	s	K
729	403	.	α
729	409	s	α
729	403	.	a
729	409	s	a
729	622	s	A
729	403	.	λ
729	706	s	λ
729	523	s	l
729	680	s	L
729	777	<split-h>	<>
730	395	.	.
730	396	 	 
730	395	<~>	<~>
730	395	<split-s>	<split-s>
730	395	<split-h>	<split-h>
730	395	<name2>	<name2>
730	731	<>	<name>
730	399	<aphaerese>	<aphaerese>
730	730	<>	<aphaerese>
730	395	<elision3>	<elision3>
730	730	<>	<elision3>
730	395	<elision2>	<elision2>
730	730	<>	<elision2>
730	395	<elision1>	<elision1>
730	730	<>	<elision1>
730	403	.	υ
730	409	s	υ
730	403	.	u
730	409	s	u
730	445	.	κ
730	733	s	κ
730	742	s	k
730	532	s	U
730	751	s	K
730	403	.	α
730	409	s	α
730	403	.	a
730	409	s	a
730	622	s	A
730	742	s	λ
730	742	s	l
730	767	s	L
730	775	<split-h>	<>
731	398	.	.
731	401	 	 
731	398	<~>	<~>
731	398	<split-s>	<split-s>
731	398	<split-h>	<split-h>
731	398	<name2>	<name2>
731	666	<aphaerese>	<aphaerese>
731	732	<>	<aphaerese>
731	398	<elision3>	<elision3>
731	732	<>	<elision3>
731	398	<elision2>	<elision2>
731	732	<>	<elision2>
731	398	<elision1>	<elision1>
731	732	<>	<elision1>
731	405	.	υ
731	438	s	υ
731	405	.	u
731	438	s	u
731	447	.	κ
731	735	s	κ
731	744	s	k
731	534	s	U
731	753	s	K
731	405	.	α
731	438	s	α
731	405	.	a
731	438	s	a
731	624	s	A
731	744	s	λ
731	744	s	l
731	769	s	L
731	776	<split-h>	<>
732	395	.	.
732	396	 	 
732	395	<~>	<~>
732	395	<split-s>	<split-s>
732	395	<split-h>	<split-h>
732	395	<name2>	<name2>
732	399	<aphaerese>	<aphaerese>
732	730	<>	<aphaerese>
732	395	<elision3>	<elision3>
732	730	<>	<elision3>
732	395	<elision2>	<elision2>
732	730	<>	<elision2>
732	395	<elision1>	<elision1>
732	730	<>	<elision1>
732	403	.	υ
732	409	s	υ
732	403	.	u
732	409	s	u
732	445	.	κ
732	733	s	κ
732	742	s	k
732	532	s	U
732	751	s	K
732	403	.	α
732	409	s	α
732	403	.	a
732	409	s	a
732	622	s	A
732	742	s	λ
732	742	s	l
732	767	s	L
732	774	<split-h>	<>
733	410	.	.
733	410	 	 
733	410	<~>	<~>
733	410	<split-s>	<split-s>
733	410	<split-h>	<split-h>
733	410	<name2>	<name2>
733	734	<>	<name>
733	413	<aphaerese>	<aphaerese>
733	733	<>	<aphaerese>
733	484	<elision3>	<elision3>
733	733	<>	<elision3>
733	484	<elision2>	<elision2>
733	733	<>	<elision2>
733	484	<elision1>	<elision1>
733	733	<>	<elision1>
733	431	.	υ
733	431	.	u
733	431	.	κ
733	431	.	α
733	431	.	a
733	431	.	λ
733	737	<4s>	<>
734	412	.	.
734	412	 	 
734	412	<~>	<~>
734	412	<split-s>	<split-s>
734	412	<split-h>	<split-h>
734	412	<name2>	<name2>
734	415	<aphaerese>	<aphaerese>
734	735	<>	<aphaerese>
734	486	<elision3>	<elision3>
734	735	<>	<elision3>
734	486	<elision2>	<elision2>
734	735	<>	<elision2>
734	486	<elision1>	<elision1>
734	735	<>	<elision1>
734	433	.	υ
734	433	.	u
734	433	.	κ
734	433	.	α
734	433	.	a
734	433	.	λ
734	738	<4s>	<>
735	410	.	.
735	410	 	 
735	410	<~>	<~>
735	410	<split-s>	<split-s>
735	410	<split-h>	<split-h>
735	410	<name2>	<name2>
735	413	<aphaerese>	<aphaerese>
735	733	<>	<aphaerese>
735	484	<elision3>	<elision3>
735	733	<>	<elision3>
735	484	<elision2>	<elision2>
735	733	<>	<elision2>
735	484	<elision1>	<elision1>
735	733	<>	<elision1>
735	431	.	υ
735	431	.	u
735	431	.	κ
735	431	.	α
735	431	.	a
735	431	.	λ
735	736	<4s>	<>
736	737	<>	<aphaerese>
736	737	<>	<elision3>
736	737	<>	<elision2>
736	737	<>	<elision1>
736	740	<K>	<>
737	738	<>	<name>
737	737	<>	<aphaerese>
737	737	<>	<elision3>
737	737	<>	<elision2>
737	737	<>	<elision1>
737	741	<K>	<>
738	736	<>	<aphaerese>
738	736	<>	<elision3>
738	736	<>	<elision2>
738	736	<>	<elision1>
738	739	<K>	<>
739	291	.	.
739	291	<~>	<~>
739	291	<split-s>	<split-s>
739	291	<split-h>	<split-h>
739	291	<name2>	<name2>
739	294	<aphaerese>	<aphaerese>
739	740	<>	<aphaerese>
739	491	<elision3>	<elision3>
739	740	<>	<elision3>
739	491	<elision2>	<elision2>
739	740	<>	<elision2>
739	491	<elision1>	<elision1>
739	740	<>	<elision1>
739	287	.	υ
739	378	H	υ
739	287	.	u
739	387	H	u
739	287	.	κ
739	363	H	U
739	287	.	α
739	390	H	α
739	287	.	a
739	393	H	a
739	346	H	A
739	287	.	λ
740	289	.	.
740	289	<~>	<~>
740	289	<split-s>	<split-s>
740	289	<split-h>	<split-h>
740	289	<name2>	<name2>
740	292	<aphaerese>	<aphaerese>
740	741	<>	<aphaerese>
740	492	<elision3>	<elision3>
740	741	<>	<elision3>
740	492	<elision2>	<elision2>
740	741	<>	<elision2>
740	492	<elision1>	<elision1>
740	741	<>	<elision1>
740	288	.	υ
740	376	H	υ
740	288	.	u
740	385	H	u
740	288	.	κ
740	361	H	U
740	288	.	α
740	388	H	α
740	288	.	a
740	391	H	a
740	347	H	A
740	288	.	λ
741	289	.	.
741	289	<~>	<~>
741	289	<split-s>	<split-s>
741	289	<split-h>	<split-h>
741	289	<name2>	<name2>
741	739	<>	<name>
741	292	<aphaerese>	<aphaerese>
741	741	<>	<aphaerese>
741	492	<elision3>	<elision3>
741	741	<>	<elision3>
741	492	<elision2>	<elision2>
741	741	<>	<elision2>
741	492	<elision1>	<elision1>
741	741	<>	<elision1>
741	288	.	υ
741	376	H	υ
741	288	.	u
741	385	H	u
741	288	.	κ
741	361	H	U
741	288	.	α
741	388	H	α
741	288	.	a
741	391	H	a
741	347	H	A
741	288	.	λ
742	410	.	.
742	410	 	 
742	410	<~>	<~>
742	410	<split-s>	<split-s>
742	410	<split-h>	<split-h>
742	410	<name2>	<name2>
742	743	<>	<name>
742	413	<aphaerese>	<aphaerese>
742	742	<>	<aphaerese>
742	410	<elision3>	<elision3>
742	742	<>	<elision3>
742	410	<elision2>	<elision2>
742	742	<>	<elision2>
742	410	<elision1>	<elision1>
742	742	<>	<elision1>
742	431	.	υ
742	431	.	u
742	431	.	κ
742	431	.	α
742	431	.	a
742	431	.	λ
742	746	<4s>	<>
743	412	.	.
743	412	 	 
743	412	<~>	<~>
743	412	<split-s>	<split-s>
743	412	<split-h>	<split-h>
743	412	<name2>	<name2>
743	415	<aphaerese>	<aphaerese>
743	744	<>	<aphaerese>
743	412	<elision3>	<elision3>
743	744	<>	<elision3>
743	412	<elision2>	<elision2>
743	744	<>	<elision2>
743	412	<elision1>	<elision1>
743	744	<>	<elision1>
743	433	.	υ
743	433	.	u
743	433	.	κ
743	433	.	α
743	433	.	a
743	433	.	λ
743	747	<4s>	<>
744	410	.	.
744	410	 	 
744	410	<~>	<~>
744	410	<split-s>	<split-s>
744	410	<split-h>	<split-h>
744	410	<name2>	<name2>
744	413	<aphaerese>	<aphaerese>
744	742	<>	<aphaerese>
744	410	<elision3>	<elision3>
744	742	<>	<elision3>
744	410	<elision2>	<elision2>
744	742	<>	<elision2>
744	410	<elision1>	<elision1>
744	742	<>	<elision1>
744	431	.	υ
744	431	.	u
744	431	.	κ
744	431	.	α
744	431	.	a
744	431	.	λ
744	745	<4s>	<>
745	746	<>	<aphaerese>
745	746	<>	<elision3>
745	746	<>	<elision2>
745	746	<>	<elision1>
745	749	<K>	<>
746	747	<>	<name>
746	746	<>	<aphaerese>
746	746	<>	<elision3>
746	746	<>	<elision2>
746	746	<>	<elision1>
746	750	<K>	<>
747	745	<>	<aphaerese>
747	745	<>	<elision3>
747	745	<>	<elision2>
747	745	<>	<elision1>
747	748	<K>	<>
748	291	.	.
748	291	<~>	<~>
748	291	<split-s>	<split-s>
748	291	<split-h>	<split-h>
748	291	<name2>	<name2>
748	294	<aphaerese>	<aphaerese>
748	749	<>	<aphaerese>
748	291	<elision3>	<elision3>
748	749	<>	<elision3>
748	291	<elision2>	<elision2>
748	749	<>	<elision2>
748	291	<elision1>	<elision1>
748	749	<>	<elision1>
748	287	.	υ
748	378	H	υ
748	287	.	u
748	387	H	u
748	287	.	κ
748	363	H	U
748	287	.	α
748	390	H	α
748	287	.	a
748	393	H	a
748	346	H	A
748	287	.	λ
749	289	.	.
749	289	<~>	<~>
749	289	<split-s>	<split-s>
749	289	<split-h>	<split-h>
749	289	<name2>	<name2>
749	292	<aphaerese>	<aphaerese>
749	750	<>	<aphaerese>
749	289	<elision3>	<elision3>
749	750	<>	<elision3>
749	289	<elision2>	<elision2>
749	750	<>	<elision2>
749	289	<elision1>	<elision1>
749	750	<>	<elision1>
749	288	.	υ
749	376	H	υ
749	288	.	u
749	385	H	u
749	288	.	κ
749	361	H	U
749	288	.	α
749	388	H	α
749	288	.	a
749	391	H	a
749	347	H	A
749	288	.	λ
750	289	.	.
750	289	<~>	<~>
750	289	<split-s>	<split-s>
750	289	<split-h>	<split-h>
750	289	<name2>	<name2>
750	748	<>	<name>
750	292	<aphaerese>	<aphaerese>
750	750	<>	<aphaerese>
750	289	<elision3>	<elision3>
750	750	<>	<elision3>
750	289	<elision2>	<elision2>
750	750	<>	<elision2>
750	289	<elision1>	<elision1>
750	750	<>	<elision1>
750	288	.	υ
750	376	H	υ
750	288	.	u
750	385	H	u
750	288	.	κ
750	361	H	U
750	288	.	α
750	388	H	α
750	288	.	a
750	391	H	a
750	347	H	A
750	288	.	λ
751	536	<name>	<name>
751	752	<>	<name>
751	754	<>	<aphaerese>
751	754	<>	<elision3>
751	754	<>	<elision2>
751	754	<>	<elision1>
751	617	<4s>	<>
751	671	<L2kl>	<>
751	764	<K2kl>	<>
752	753	<>	<aphaerese>
752	753	<>	<elision3>
752	753	<>	<elision2>
752	753	<>	<elision1>
752	672	<L2kl>	<>
752	756	<K2kl>	<>
753	754	<>	<aphaerese>
753	754	<>	<elision3>
753	754	<>	<elision2>
753	754	<>	<elision1>
753	673	<L2kl>	<>
753	757	<K2kl>	<>
754	752	<>	<name>
754	754	<>	<aphaerese>
754	754	<>	<elision3>
754	754	<>	<elision2>
754	754	<>	<elision1>
754	671	<L2kl>	<>
754	755	<K2kl>	<>
755	410	.	.
755	410	 	 
755	410	<~>	<~>
755	410	<split-s>	<split-s>
755	410	<split-h>	<split-h>
755	410	<name2>	<name2>
755	756	<>	<name>
755	413	<aphaerese>	<aphaerese>
755	755	<>	<aphaerese>
755	410	<elision3>	<elision3>
755	755	<>	<elision3>
755	410	<elision2>	<elision2>
755	755	<>	<elision2>
755	410	<elision1>	<elision1>
755	755	<>	<elision1>
755	431	.	υ
755	431	.	u
755	431	.	α
755	431	.	a
755	759	<4s>	<>
756	412	.	.
756	412	 	 
756	412	<~>	<~>
756	412	<split-s>	<split-s>
756	412	<split-h>	<split-h>
756	412	<name2>	<name2>
756	415	<aphaerese>	<aphaerese>
756	757	<>	<aphaerese>
756	412	<elision3>	<elision3>
756	757	<>	<elision3>
756	412	<elision2>	<elision2>
756	757	<>	<elision2>
756	412	<elision1>	<elision1>
756	757	<>	<elision1>
756	433	.	υ
756	433	.	u
756	433	.	α
756	433	.	a
756	760	<4s>	<>
757	410	.	.
757	410	 	 
757	410	<~>	<~>
757	410	<split-s>	<split-s>
757	410	<split-h>	<split-h>
757	410	<name2>	<name2>
757	413	<aphaerese>	<aphaerese>
757	755	<>	<aphaerese>
757	410	<elision3>	<elision3>
757	755	<>	<elision3>
757	410	<elision2>	<elision2>
757	755	<>	<elision2>
757	410	<elision1>	<elision1>
757	755	<>	<elision1>
757	431	.	υ
757	431	.	u
757	431	.	α
757	431	.	a
757	758	<4s>	<>
758	759	<>	<aphaerese>
758	759	<>	<elision3>
758	759	<>	<elision2>
758	759	<>	<elision1>
758	762	<K>	<>
759	760	<>	<name>
759	759	<>	<aphaerese>
759	759	<>	<elision3>
759	759	<>	<elision2>
759	759	<>	<elision1>
759	763	<K>	<>
760	758	<>	<aphaerese>
760	758	<>	<elision3>
760	758	<>	<elision2>
760	758	<>	<elision1>
760	761	<K>	<>
761	291	.	.
761	291	<~>	<~>
761	291	<split-s>	<split-s>
761	291	<split-h>	<split-h>
761	291	<name2>	<name2>
761	294	<aphaerese>	<aphaerese>
761	762	<>	<aphaerese>
761	291	<elision3>	<elision3>
761	762	<>	<elision3>
761	291	<elision2>	<elision2>
761	762	<>	<elision2>
761	291	<elision1>	<elision1>
761	762	<>	<elision1>
761	287	.	υ
761	378	H	υ
761	287	.	u
761	387	H	u
761	363	H	U
761	287	.	α
761	390	H	α
761	287	.	a
761	393	H	a
761	346	H	A
762	289	.	.
762	289	<~>	<~>
762	289	<split-s>	<split-s>
762	289	<split-h>	<split-h>
762	289	<name2>	<name2>
762	292	<aphaerese>	<aphaerese>
762	763	<>	<aphaerese>
762	289	<elision3>	<elision3>
762	763	<>	<elision3>
762	289	<elision2>	<elision2>
762	763	<>	<elision2>
762	289	<elision1>	<elision1>
762	763	<>	<elision1>
762	288	.	υ
762	376	H	υ
762	288	.	u
762	385	H	u
762	361	H	U
762	288	.	α
762	388	H	α
762	288	.	a
762	391	H	a
762	347	H	A
763	289	.	.
763	289	<~>	<~>
763	289	<split-s>	<split-s>
763	289	<split-h>	<split-h>
763	289	<name2>	<name2>
763	761	<>	<name>
763	292	<aphaerese>	<aphaerese>
763	763	<>	<aphaerese>
763	289	<elision3>	<elision3>
763	763	<>	<elision3>
763	289	<elision2>	<elision2>
763	763	<>	<elision2>
763	289	<elision1>	<elision1>
763	763	<>	<elision1>
763	288	.	υ
763	376	H	υ
763	288	.	u
763	385	H	u
763	361	H	U
763	288	.	α
763	388	H	α
763	288	.	a
763	391	H	a
763	347	H	A
764	410	.	.
764	410	 	 
764	410	<~>	<~>
764	410	<split-s>	<split-s>
764	410	<split-h>	<split-h>
764	410	<name2>	<name2>
764	536	<name2>	<name>
764	756	<>	<name>
764	413	<aphaerese>	<aphaerese>
764	755	<>	<aphaerese>
764	410	<elision3>	<elision3>
764	755	<>	<elision3>
764	410	<elision2>	<elision2>
764	755	<>	<elision2>
764	410	<elision1>	<elision1>
764	755	<>	<elision1>
764	431	.	υ
764	431	.	u
764	431	.	α
764	431	.	a
764	765	<4s>	<>
765	760	<>	<name>
765	759	<>	<aphaerese>
765	759	<>	<elision3>
765	759	<>	<elision2>
765	759	<>	<elision1>
765	766	<K>	<>
766	289	.	.
766	289	<~>	<~>
766	289	<split-s>	<split-s>
766	289	<split-h>	<split-h>
766	289	<name2>	<name2>
766	538	<name2>	<name>
766	761	<>	<name>
766	292	<aphaerese>	<aphaerese>
766	763	<>	<aphaerese>
766	289	<elision3>	<elision3>
766	763	<>	<elision3>
766	289	<elision2>	<elision2>
766	763	<>	<elision2>
766	289	<elision1>	<elision1>
766	763	<>	<elision1>
766	288	.	υ
766	376	H	υ
766	288	.	u
766	385	H	u
766	361	H	U
766	288	.	α
766	388	H	α
766	288	.	a
766	391	H	a
766	347	H	A
767	536	<name>	<name>
767	768	<>	<name>
767	770	<>	<aphaerese>
767	770	<>	<elision3>
767	770	<>	<elision2>
767	770	<>	<elision1>
767	617	<4s>	<>
767	771	<L2kl>	<>
768	769	<>	<aphaerese>
768	769	<>	<elision3>
768	769	<>	<elision2>
768	769	<>	<elision1>
768	743	<L2kl>	<>
769	770	<>	<aphaerese>
769	770	<>	<elision3>
769	770	<>	<elision2>
769	770	<>	<elision1>
769	744	<L2kl>	<>
770	768	<>	<name>
770	770	<>	<aphaerese>
770	770	<>	<elision3>
770	770	<>	<elision2>
770	770	<>	<elision1>
770	742	<L2kl>	<>
771	410	.	.
771	410	 	 
771	410	<~>	<~>
771	410	<split-s>	<split-s>
771	410	<split-h>	<split-h>
771	410	<name2>	<name2>
771	536	<name2>	<name>
771	743	<>	<name>
771	413	<aphaerese>	<aphaerese>
771	742	<>	<aphaerese>
771	410	<elision3>	<elision3>
771	742	<>	<elision3>
771	410	<elision2>	<elision2>
771	742	<>	<elision2>
771	410	<elision1>	<elision1>
771	742	<>	<elision1>
771	431	.	υ
771	431	.	u
771	431	.	κ
771	431	.	α
771	431	.	a
771	431	.	λ
771	772	<4s>	<>
772	747	<>	<name>
772	746	<>	<aphaerese>
772	746	<>	<elision3>
772	746	<>	<elision2>
772	746	<>	<elision1>
772	773	<K>	<>
773	289	.	.
773	289	<~>	<~>
773	289	<split-s>	<split-s>
773	289	<split-h>	<split-h>
773	289	<name2>	<name2>
773	538	<name2>	<name>
773	748	<>	<name>
773	292	<aphaerese>	<aphaerese>
773	750	<>	<aphaerese>
773	289	<elision3>	<elision3>
773	750	<>	<elision3>
773	289	<elision2>	<elision2>
773	750	<>	<elision2>
773	289	<elision1>	<elision1>
773	750	<>	<elision1>
773	288	.	υ
773	376	H	υ
773	288	.	u
773	385	H	u
773	288	.	κ
773	361	H	U
773	288	.	α
773	388	H	α
773	288	.	a
773	391	H	a
773	347	H	A
773	288	.	λ
774	775	<>	<aphaerese>
774	775	<>	<elision3>
774	775	<>	<elision2>
774	775	<>	<elision1>
774	487	<3s>	<>
775	776	<>	<name>
775	775	<>	<aphaerese>
775	775	<>	<elision3>
775	775	<>	<elision2>
775	775	<>	<elision1>
775	488	<3s>	<>
776	774	<>	<aphaerese>
776	774	<>	<elision3>
776	774	<>	<elision2>
776	774	<>	<elision1>
776	489	<3s>	<>
777	778	<>	<aphaerese>
777	778	<>	<elision3>
777	778	<>	<elision2>
777	778	<>	<elision1>
777	517	<3s>	<>
778	779	<>	<name>
778	778	<>	<aphaerese>
778	778	<>	<elision3>
778	778	<>	<elision2>
778	778	<>	<elision1>
778	518	<3s>	<>
779	777	<>	<aphaerese>
779	777	<>	<elision3>
779	777	<>	<elision2>
779	777	<>	<elision1>
779	519	<3s>	<>
780	395	.	.
780	396	 	 
780	395	<~>	<~>
780	395	<split-s>	<split-s>
780	395	<split-h>	<split-h>
780	395	<name2>	<name2>
780	781	<>	<name>
780	399	<aphaerese>	<aphaerese>
780	780	<>	<aphaerese>
780	395	<elision3>	<elision3>
780	780	<>	<elision3>
780	395	<elision2>	<elision2>
780	780	<>	<elision2>
780	395	<elision1>	<elision1>
780	780	<>	<elision1>
780	403	.	υ
780	409	s	υ
780	403	.	u
780	409	s	u
780	783	.	κ
780	706	s	κ
780	523	s	k
780	532	s	U
780	667	s	K
780	403	.	α
780	409	s	α
780	403	.	a
780	409	s	a
780	622	s	A
780	783	.	λ
780	706	s	λ
780	523	s	l
780	680	s	L
780	799	<split-h>	<>
781	398	.	.
781	401	 	 
781	398	<~>	<~>
781	398	<split-s>	<split-s>
781	398	<split-h>	<split-h>
781	398	<name2>	<name2>
781	666	<aphaerese>	<aphaerese>
781	782	<>	<aphaerese>
781	398	<elision3>	<elision3>
781	782	<>	<elision3>
781	398	<elision2>	<elision2>
781	782	<>	<elision2>
781	398	<elision1>	<elision1>
781	782	<>	<elision1>
781	405	.	υ
781	438	s	υ
781	405	.	u
781	438	s	u
781	785	.	κ
781	708	s	κ
781	525	s	k
781	534	s	U
781	669	s	K
781	405	.	α
781	438	s	α
781	405	.	a
781	438	s	a
781	624	s	A
781	785	.	λ
781	708	s	λ
781	525	s	l
781	682	s	L
781	800	<split-h>	<>
782	395	.	.
782	396	 	 
782	395	<~>	<~>
782	395	<split-s>	<split-s>
782	395	<split-h>	<split-h>
782	395	<name2>	<name2>
782	399	<aphaerese>	<aphaerese>
782	780	<>	<aphaerese>
782	395	<elision3>	<elision3>
782	780	<>	<elision3>
782	395	<elision2>	<elision2>
782	780	<>	<elision2>
782	395	<elision1>	<elision1>
782	780	<>	<elision1>
782	403	.	υ
782	409	s	υ
782	403	.	u
782	409	s	u
782	783	.	κ
782	706	s	κ
782	523	s	k
782	532	s	U
782	667	s	K
782	403	.	α
782	409	s	α
782	403	.	a
782	409	s	a
782	622	s	A
782	783	.	λ
782	706	s	λ
782	523	s	l
782	680	s	L
782	798	<split-h>	<>
783	784	<>	<name>
783	783	<>	<aphaerese>
783	786	<elision3>	<elision3>
783	783	<>	<elision3>
783	786	<elision2>	<elision2>
783	783	<>	<elision2>
783	786	<elision1>	<elision1>
783	783	<>	<elision1>
783	407	<split-h>	<>
784	785	<>	<aphaerese>
784	788	<elision3>	<elision3>
784	785	<>	<elision3>
784	788	<elision2>	<elision2>
784	785	<>	<elision2>
784	788	<elision1>	<elision1>
784	785	<>	<elision1>
784	408	<split-h>	<>
785	783	<>	<aphaerese>
785	786	<elision3>	<elision3>
785	783	<>	<elision3>
785	786	<elision2>	<elision2>
785	783	<>	<elision2>
785	786	<elision1>	<elision1>
785	783	<>	<elision1>
785	406	<split-h>	<>
786	786	.	.
786	786	 	 
786	786	<~>	<~>
786	786	<split-s>	<split-s>
786	786	<split-h>	<split-h>
786	786	<name2>	<name2>
786	787	<>	<name>
786	789	<aphaerese>	<aphaerese>
786	786	<>	<aphaerese>
786	786	<elision3>	<elision3>
786	786	<>	<elision3>
786	786	<elision2>	<elision2>
786	786	<>	<elision2>
786	786	<elision1>	<elision1>
786	786	<>	<elision1>
786	783	.	υ
786	783	.	u
786	792	.	κ
786	783	.	α
786	783	.	a
786	641	<split-h>	<>
787	788	.	.
787	788	 	 
787	788	<~>	<~>
787	788	<split-s>	<split-s>
787	788	<split-h>	<split-h>
787	788	<name2>	<name2>
787	791	<aphaerese>	<aphaerese>
787	788	<>	<aphaerese>
787	788	<elision3>	<elision3>
787	788	<>	<elision3>
787	788	<elision2>	<elision2>
787	788	<>	<elision2>
787	788	<elision1>	<elision1>
787	788	<>	<elision1>
787	785	.	υ
787	785	.	u
787	794	.	κ
787	785	.	α
787	785	.	a
787	642	<split-h>	<>
788	786	.	.
788	786	 	 
788	786	<~>	<~>
788	786	<split-s>	<split-s>
788	786	<split-h>	<split-h>
788	786	<name2>	<name2>
788	789	<aphaerese>	<aphaerese>
788	786	<>	<aphaerese>
788	786	<elision3>	<elision3>
788	786	<>	<elision3>
788	786	<elision2>	<elision2>
788	786	<>	<elision2>
788	786	<elision1>	<elision1>
788	786	<>	<elision1>
788	783	.	υ
788	783	.	u
788	792	.	κ
788	783	.	α
788	783	.	a
788	643	<split-h>	<>
789	786	.	.
789	786	 	 
789	786	<~>	<~>
789	786	<split-s>	<split-s>
789	786	<split-h>	<split-h>
789	786	<name2>	<name2>
789	790	<>	<name>
789	789	<aphaerese>	<aphaerese>
789	789	<>	<aphaerese>
789	786	<elision3>	<elision3>
789	789	<>	<elision3>
789	786	<elision2>	<elision2>
789	789	<>	<elision2>
789	786	<elision1>	<elision1>
789	789	<>	<elision1>
789	786	.	υ
789	786	.	u
789	792	.	κ
789	786	.	α
789	786	.	a
789	688	<split-h>	<>
790	788	.	.
790	788	 	 
790	788	<~>	<~>
790	788	<split-s>	<split-s>
790	788	<split-h>	<split-h>
790	788	<name2>	<name2>
790	791	<aphaerese>	<aphaerese>
790	791	<>	<aphaerese>
790	788	<elision3>	<elision3>
790	791	<>	<elision3>
790	788	<elision2>	<elision2>
790	791	<>	<elision2>
790	788	<elision1>	<elision1>
790	791	<>	<elision1>
790	788	.	υ
790	788	.	u
790	794	.	κ
790	788	.	α
790	788	.	a
790	689	<split-h>	<>
791	786	.	.
791	786	 	 
791	786	<~>	<~>
791	786	<split-s>	<split-s>
791	786	<split-h>	<split-h>
791	786	<name2>	<name2>
791	789	<aphaerese>	<aphaerese>
791	789	<>	<aphaerese>
791	786	<elision3>	<elision3>
791	789	<>	<elision3>
791	786	<elision2>	<elision2>
791	789	<>	<elision2>
791	786	<elision1>	<elision1>
791	789	<>	<elision1>
791	786	.	υ
791	786	.	u
791	792	.	κ
791	786	.	α
791	786	.	a
791	687	<split-h>	<>
792	793	<>	<name>
792	792	<>	<aphaerese>
792	795	<elision3>	<elision3>
792	792	<>	<elision3>
792	795	<elision2>	<elision2>
792	792	<>	<elision2>
792	795	<elision1>	<elision1>
792	792	<>	<elision1>
792	479	<split-h>	<>
793	794	<>	<aphaerese>
793	797	<elision3>	<elision3>
793	794	<>	<elision3>
793	797	<elision2>	<elision2>
793	794	<>	<elision2>
793	797	<elision1>	<elision1>
793	794	<>	<elision1>
793	480	<split-h>	<>
794	792	<>	<aphaerese>
794	795	<elision3>	<elision3>
794	792	<>	<elision3>
794	795	<elision2>	<elision2>
794	792	<>	<elision2>
794	795	<elision1>	<elision1>
794	792	<>	<elision1>
794	478	<split-h>	<>
795	796	<>	<name>
795	795	<>	<aphaerese>
795	795	<>	<elision3>
795	795	<>	<elision2>
795	795	<>	<elision1>
795	476	<split-h>	<>
796	797	<>	<aphaerese>
796	797	<>	<elision3>
796	797	<>	<elision2>
796	797	<>	<elision1>
796	477	<split-h>	<>
797	795	<>	<aphaerese>
797	795	<>	<elision3>
797	795	<>	<elision2>
797	795	<>	<elision1>
797	475	<split-h>	<>
798	799	<>	<aphaerese>
798	799	<>	<elision3>
798	799	<>	<elision2>
798	799	<>	<elision1>
798	526	<3s>	<>
799	800	<>	<name>
799	799	<>	<aphaerese>
799	799	<>	<elision3>
799	799	<>	<elision2>
799	799	<>	<elision1>
799	527	<3s>	<>
800	798	<>	<aphaerese>
800	798	<>	<elision3>
800	798	<>	<elision2>
800	798	<>	<elision1>
800	528	<3s>	<>
801	802	<>	<name>
801	801	<>	<aphaerese>
801	801	<>	<elision3>
801	801	<>	<elision2>
801	801	<>	<elision1>
801	786	<U2kl>	<>
802	803	<>	<aphaerese>
802	803	<>	<elision3>
802	803	<>	<elision2>
802	803	<>	<elision1>
802	787	<U2kl>	<>
803	801	<>	<aphaerese>
803	801	<>	<elision3>
803	801	<>	<elision2>
803	801	<>	<elision1>
803	788	<U2kl>	<>
804	805	<name>	<name>
804	807	<>	<name>
804	809	<>	<aphaerese>
804	809	<>	<elision3>
804	809	<>	<elision2>
804	809	<>	<elision1>
804	852	<split-h>	<>
804	810	<A2kl>	<>
804	828	<L2kl>	<>
804	853	<K2kl>	<>
805	669	s	k
805	682	s	l
805	806	<split-h>	<>
806	537	<3s>	<>
807	808	<>	<aphaerese>
807	808	<>	<elision3>
807	808	<>	<elision2>
807	808	<>	<elision1>
807	811	<A2kl>	<>
807	829	<L2kl>	<>
807	847	<K2kl>	<>
808	809	<>	<aphaerese>
808	809	<>	<elision3>
808	809	<>	<elision2>
808	809	<>	<elision1>
808	812	<A2kl>	<>
808	830	<L2kl>	<>
808	848	<K2kl>	<>
809	807	<>	<name>
809	809	<>	<aphaerese>
809	809	<>	<elision3>
809	809	<>	<elision2>
809	809	<>	<elision1>
809	810	<A2kl>	<>
809	828	<L2kl>	<>
809	846	<K2kl>	<>
810	811	<>	<name>
810	810	<>	<aphaerese>
810	810	<>	<elision3>
810	810	<>	<elision2>
810	810	<>	<elision1>
810	813	.	κ
810	813	.	λ
810	826	<split-h>	<>
811	812	<>	<aphaerese>
811	812	<>	<elision3>
811	812	<>	<elision2>
811	812	<>	<elision1>
811	815	.	κ
811	815	.	λ
811	827	<split-h>	<>
812	810	<>	<aphaerese>
812	810	<>	<elision3>
812	810	<>	<elision2>
812	810	<>	<elision1>
812	813	.	κ
812	813	.	λ
812	825	<split-h>	<>
813	814	<>	<name>
813	813	<>	<aphaerese>
813	816	<elision3>	<elision3>
813	813	<>	<elision3>
813	816	<elision2>	<elision2>
813	813	<>	<elision2>
813	816	<elision1>	<elision1>
813	813	<>	<elision1>
813	823	<split-h>	<>
814	815	<>	<aphaerese>
814	818	<elision3>	<elision3>
814	815	<>	<elision3>
814	818	<elision2>	<elision2>
814	815	<>	<elision2>
814	818	<elision1>	<elision1>
814	815	<>	<elision1>
814	824	<split-h>	<>
815	813	<>	<aphaerese>
815	816	<elision3>	<elision3>
815	813	<>	<elision3>
815	816	<elision2>	<elision2>
815	813	<>	<elision2>
815	816	<elision1>	<elision1>
815	813	<>	<elision1>
815	822	<split-h>	<>
816	786	.	.
816	786	 	 
816	786	<~>	<~>
816	786	<split-s>	<split-s>
816	786	<split-h>	<split-h>
816	786	<name2>	<name2>
816	817	<>	<name>
816	789	<aphaerese>	<aphaerese>
816	816	<>	<aphaerese>
816	786	<elision3>	<elision3>
816	816	<>	<elision3>
816	786	<elision2>	<elision2>
816	816	<>	<elision2>
816	786	<elision1>	<elision1>
816	816	<>	<elision1>
816	783	.	υ
816	783	.	u
816	783	.	α
816	783	.	a
816	820	<split-h>	<>
817	788	.	.
817	788	 	 
817	788	<~>	<~>
817	788	<split-s>	<split-s>
817	788	<split-h>	<split-h>
817	788	<name2>	<name2>
817	791	<aphaerese>	<aphaerese>
817	818	<>	<aphaerese>
817	788	<elision3>	<elision3>
817	818	<>	<elision3>
817	788	<elision2>	<elision2>
817	818	<>	<elision2>
817	788	<elision1>	<elision1>
817	818	<>	<elision1>
817	785	.	υ
817	785	.	u
817	785	.	α
817	785	.	a
817	821	<split-h>	<>
818	786	.	.
818	786	 	 
818	786	<~>	<~>
818	786	<split-s>	<split-s>
818	786	<split-h>	<split-h>
818	786	<name2>	<name2>
818	789	<aphaerese>	<aphaerese>
818	816	<>	<aphaerese>
818	786	<elision3>	<elision3>
818	816	<>	<elision3>
818	786	<elision2>	<elision2>
818	816	<>	<elision2>
818	786	<elision1>	<elision1>
818	816	<>	<elision1>
818	783	.	υ
818	783	.	u
818	783	.	α
818	783	.	a
818	819	<split-h>	<>
819	820	<>	<aphaerese>
819	820	<>	<elision3>
819	820	<>	<elision2>
819	820	<>	<elision1>
819	551	<3s>	<>
820	821	<>	<name>
820	820	<>	<aphaerese>
820	820	<>	<elision3>
820	820	<>	<elision2>
820	820	<>	<elision1>
820	552	<3s>	<>
821	819	<>	<aphaerese>
821	819	<>	<elision3>
821	819	<>	<elision2>
821	819	<>	<elision1>
821	553	<3s>	<>
822	823	<>	<aphaerese>
822	823	<>	<elision3>
822	823	<>	<elision2>
822	823	<>	<elision1>
822	569	<3s>	<>
823	824	<>	<name>
823	823	<>	<aphaerese>
823	823	<>	<elision3>
823	823	<>	<elision2>
823	823	<>	<elision1>
823	570	<3s>	<>
824	822	<>	<aphaerese>
824	822	<>	<elision3>
824	822	<>	<elision2>
824	822	<>	<elision1>
824	571	<3s>	<>
825	826	<>	<aphaerese>
825	826	<>	<elision3>
825	826	<>	<elision2>
825	826	<>	<elision1>
825	575	<3s>	<>
826	827	<>	<name>
826	826	<>	<aphaerese>
826	826	<>	<elision3>
826	826	<>	<elision2>
826	826	<>	<elision1>
826	576	<3s>	<>
827	825	<>	<aphaerese>
827	825	<>	<elision3>
827	825	<>	<elision2>
827	825	<>	<elision1>
827	577	<3s>	<>
828	829	<>	<name>
828	828	<>	<aphaerese>
828	828	<>	<elision3>
828	828	<>	<elision2>
828	828	<>	<elision1>
828	831	.	κ
828	831	.	λ
828	844	<split-h>	<>
829	830	<>	<aphaerese>
829	830	<>	<elision3>
829	830	<>	<elision2>
829	830	<>	<elision1>
829	833	.	κ
829	833	.	λ
829	845	<split-h>	<>
830	828	<>	<aphaerese>
830	828	<>	<elision3>
830	828	<>	<elision2>
830	828	<>	<elision1>
830	831	.	κ
830	831	.	λ
830	843	<split-h>	<>
831	832	<>	<name>
831	831	<>	<aphaerese>
831	834	<elision3>	<elision3>
831	831	<>	<elision3>
831	834	<elision2>	<elision2>
831	831	<>	<elision2>
831	834	<elision1>	<elision1>
831	831	<>	<elision1>
831	841	<split-h>	<>
832	833	<>	<aphaerese>
832	836	<elision3>	<elision3>
832	833	<>	<elision3>
832	836	<elision2>	<elision2>
832	833	<>	<elision2>
832	836	<elision1>	<elision1>
832	833	<>	<elision1>
832	842	<split-h>	<>
833	831	<>	<aphaerese>
833	834	<elision3>	<elision3>
833	831	<>	<elision3>
833	834	<elision2>	<elision2>
833	831	<>	<elision2>
833	834	<elision1>	<elision1>
833	831	<>	<elision1>
833	840	<split-h>	<>
834	835	<>	<name>
834	834	<>	<aphaerese>
834	834	<>	<elision3>
834	834	<>	<elision2>
834	834	<>	<elision1>
834	792	.	κ
834	838	<split-h>	<>
835	836	<>	<aphaerese>
835	836	<>	<elision3>
835	836	<>	<elision2>
835	836	<>	<elision1>
835	794	.	κ
835	839	<split-h>	<>
836	834	<>	<aphaerese>
836	834	<>	<elision3>
836	834	<>	<elision2>
836	834	<>	<elision1>
836	792	.	κ
836	837	<split-h>	<>
837	838	<>	<aphaerese>
837	838	<>	<elision3>
837	838	<>	<elision2>
837	838	<>	<elision1>
837	590	<3s>	<>
838	839	<>	<name>
838	838	<>	<aphaerese>
838	838	<>	<elision3>
838	838	<>	<elision2>
838	838	<>	<elision1>
838	591	<3s>	<>
839	837	<>	<aphaerese>
839	837	<>	<elision3>
839	837	<>	<elision2>
839	837	<>	<elision1>
839	592	<3s>	<>
840	841	<>	<aphaerese>
840	841	<>	<elision3>
840	841	<>	<elision2>
840	841	<>	<elision1>
840	596	<3s>	<>
841	842	<>	<name>
841	841	<>	<aphaerese>
841	841	<>	<elision3>
841	841	<>	<elision2>
841	841	<>	<elision1>
841	597	<3s>	<>
842	840	<>	<aphaerese>
842	840	<>	<elision3>
842	840	<>	<elision2>
842	840	<>	<elision1>
842	598	<3s>	<>
843	844	<>	<aphaerese>
843	844	<>	<elision3>
843	844	<>	<elision2>
843	844	<>	<elision1>
843	602	<3s>	<>
844	845	<>	<name>
844	844	<>	<aphaerese>
844	844	<>	<elision3>
844	844	<>	<elision2>
844	844	<>	<elision1>
844	603	<3s>	<>
845	843	<>	<aphaerese>
845	843	<>	<elision3>
845	843	<>	<elision2>
845	843	<>	<elision1>
845	604	<3s>	<>
846	786	.	.
846	786	 	 
846	786	<~>	<~>
846	786	<split-s>	<split-s>
846	786	<split-h>	<split-h>
846	786	<name2>	<name2>
846	847	<>	<name>
846	789	<aphaerese>	<aphaerese>
846	846	<>	<aphaerese>
846	786	<elision3>	<elision3>
846	846	<>	<elision3>
846	786	<elision2>	<elision2>
846	846	<>	<elision2>
846	786	<elision1>	<elision1>
846	846	<>	<elision1>
846	783	.	υ
846	783	.	u
846	783	.	α
846	783	.	a
846	850	<split-h>	<>
847	788	.	.
847	788	 	 
847	788	<~>	<~>
847	788	<split-s>	<split-s>
847	788	<split-h>	<split-h>
847	788	<name2>	<name2>
847	791	<aphaerese>	<aphaerese>
847	848	<>	<aphaerese>
847	788	<elision3>	<elision3>
847	848	<>	<elision3>
847	788	<elision2>	<elision2>
847	848	<>	<elision2>
847	788	<elision1>	<elision1>
847	848	<>	<elision1>
847	785	.	υ
847	785	.	u
847	785	.	α
847	785	.	a
847	851	<split-h>	<>
848	786	.	.
848	786	 	 
848	786	<~>	<~>
848	786	<split-s>	<split-s>
848	786	<split-h>	<split-h>
848	786	<name2>	<name2>
848	789	<aphaerese>	<aphaerese>
848	846	<>	<aphaerese>
848	786	<elision3>	<elision3>
848	846	<>	<elision3>
848	786	<elision2>	<elision2>
848	846	<>	<elision2>
848	786	<elision1>	<elision1>
848	846	<>	<elision1>
848	783	.	υ
848	783	.	u
848	783	.	α
848	783	.	a
848	849	<split-h>	<>
849	850	<>	<aphaerese>
849	850	<>	<elision3>
849	850	<>	<elision2>
849	850	<>	<elision1>
849	611	<3s>	<>
850	851	<>	<name>
850	850	<>	<aphaerese>
850	850	<>	<elision3>
850	850	<>	<elision2>
850	850	<>	<elision1>
850	612	<3s>	<>
851	849	<>	<aphaerese>
851	849	<>	<elision3>
851	849	<>	<elision2>
851	849	<>	<elision1>
851	613	<3s>	<>
852	617	<3s>	<>
853	786	.	.
853	786	 	 
853	786	<~>	<~>
853	786	<split-s>	<split-s>
853	786	<split-h>	<split-h>
853	786	<name2>	<name2>
853	854	<name2>	<name>
853	847	<>	<name>
853	789	<aphaerese>	<aphaerese>
853	846	<>	<aphaerese>
853	786	<elision3>	<elision3>
853	846	<>	<elision3>
853	786	<elision2>	<elision2>
853	846	<>	<elision2>
853	786	<elision1>	<elision1>
853	846	<>	<elision1>
853	783	.	υ
853	783	.	u
853	783	.	α
853	783	.	a
853	855	<split-h>	<>
854	806	<split-h>	<>
855	851	<>	<name>
855	850	<>	<aphaerese>
855	850	<>	<elision3>
855	850	<>	<elision2>
855	850	<>	<elision1>
855	620	<3s>	<>
856	786	.	.
856	786	 	 
856	786	<~>	<~>
856	786	<split-s>	<split-s>
856	786	<split-h>	<split-h>
856	786	<name2>	<name2>
856	857	<>	<name>
856	789	<aphaerese>	<aphaerese>
856	856	<>	<aphaerese>
856	856	<>	<elision3>
856	856	<>	<elision2>
856	856	<>	<elision1>
856	783	.	υ
856	783	.	u
856	792	.	κ
856	783	.	α
856	783	.	a
856	695	<split-h>	<>
857	788	.	.
857	788	 	 
857	788	<~>	<~>
857	788	<split-s>	<split-s>
857	788	<split-h>	<split-h>
857	788	<name2>	<name2>
857	791	<aphaerese>	<aphaerese>
857	858	<>	<aphaerese>
857	858	<>	<elision3>
857	858	<>	<elision2>
857	858	<>	<elision1>
857	785	.	υ
857	785	.	u
857	794	.	κ
857	785	.	α
857	785	.	a
857	696	<split-h>	<>
858	786	.	.
858	786	 	 
858	786	<~>	<~>
858	786	<split-s>	<split-s>
858	786	<split-h>	<split-h>
858	786	<name2>	<name2>
858	789	<aphaerese>	<aphaerese>
858	856	<>	<aphaerese>
858	856	<>	<elision3>
858	856	<>	<elision2>
858	856	<>	<elision1>
858	783	.	υ
858	783	.	u
858	792	.	κ
858	783	.	α
858	783	.	a
858	694	<split-h>	<>
859	860	<>	<name>
859	859	<>	<aphaerese>
859	859	<>	<elision3>
859	859	<>	<elision2>
859	859	<>	<elision1>
859	786	<A2kl>	<>
860	861	<>	<aphaerese>
860	861	<>	<elision3>
860	861	<>	<elision2>
860	861	<>	<elision1>
860	787	<A2kl>	<>
861	859	<>	<aphaerese>
861	859	<>	<elision3>
861	859	<>	<elision2>
861	859	<>	<elision1>
861	788	<A2kl>	<>
862	395	.	.
862	396	 	 
862	395	<~>	<~>
862	395	<split-s>	<split-s>
862	395	<split-h>	<split-h>
862	395	<name2>	<name2>
862	863	<>	<name>
862	399	<aphaerese>	<aphaerese>
862	862	<>	<aphaerese>
862	395	<elision3>	<elision3>
862	862	<>	<elision3>
862	395	<elision2>	<elision2>
862	862	<>	<elision2>
862	395	<elision1>	<elision1>
862	862	<>	<elision1>
862	403	.	υ
862	409	s	υ
862	403	.	u
862	409	s	u
862	403	.	κ
862	706	s	κ
862	523	s	k
862	532	s	U
862	667	s	K
862	403	.	α
862	409	s	α
862	403	.	a
862	409	s	a
862	622	s	A
862	403	.	λ
862	706	s	λ
862	523	s	l
862	680	s	L
862	799	<split-h>	<>
863	398	.	.
863	401	 	 
863	398	<~>	<~>
863	398	<split-s>	<split-s>
863	398	<split-h>	<split-h>
863	398	<name2>	<name2>
863	666	<aphaerese>	<aphaerese>
863	864	<>	<aphaerese>
863	398	<elision3>	<elision3>
863	864	<>	<elision3>
863	398	<elision2>	<elision2>
863	864	<>	<elision2>
863	398	<elision1>	<elision1>
863	864	<>	<elision1>
863	405	.	υ
863	438	s	υ
863	405	.	u
863	438	s	u
863	405	.	κ
863	708	s	κ
863	525	s	k
863	534	s	U
863	669	s	K
863	405	.	α
863	438	s	α
863	405	.	a
863	438	s	a
863	624	s	A
863	405	.	λ
863	708	s	λ
863	525	s	l
863	682	s	L
863	800	<split-h>	<>
864	395	.	.
864	396	 	 
864	395	<~>	<~>
864	395	<split-s>	<split-s>
864	395	<split-h>	<split-h>
864	395	<name2>	<name2>
864	399	<aphaerese>	<aphaerese>
864	862	<>	<aphaerese>
864	395	<elision3>	<elision3>
864	862	<>	<elision3>
864	395	<elision2>	<elision2>
864	862	<>	<elision2>
864	395	<elision1>	<elision1>
864	862	<>	<elision1>
864	403	.	υ
864	409	s	υ
864	403	.	u
864	409	s	u
864	403	.	κ
864	706	s	κ
864	523	s	k
864	532	s	U
864	667	s	K
864	403	.	α
864	409	s	α
864	403	.	a
864	409	s	a
864	622	s	A
864	403	.	λ
864	706	s	λ
864	523	s	l
864	680	s	L
864	798	<split-h>	<>
865	786	.	.
865	786	 	 
865	786	<~>	<~>
865	786	<split-s>	<split-s>
865	786	<split-h>	<split-h>
865	786	<name2>	<name2>
865	866	<>	<name>
865	789	<aphaerese>	<aphaerese>
865	865	<>	<aphaerese>
865	786	<elision3>	<elision3>
865	865	<>	<elision3>
865	786	<elision2>	<elision2>
865	865	<>	<elision2>
865	786	<elision1>	<elision1>
865	865	<>	<elision1>
865	783	.	υ
865	783	.	u
865	783	.	κ
865	783	.	α
865	783	.	a
865	783	.	λ
865	799	<split-h>	<>
866	788	.	.
866	788	 	 
866	788	<~>	<~>
866	788	<split-s>	<split-s>
866	788	<split-h>	<split-h>
866	788	<name2>	<name2>
866	791	<aphaerese>	<aphaerese>
866	867	<>	<aphaerese>
866	788	<elision3>	<elision3>
866	867	<>	<elision3>
866	788	<elision2>	<elision2>
866	867	<>	<elision2>
866	788	<elision1>	<elision1>
866	867	<>	<elision1>
866	785	.	υ
866	785	.	u
866	785	.	κ
866	785	.	α
866	785	.	a
866	785	.	λ
866	800	<split-h>	<>
867	786	.	.
867	786	 	 
867	786	<~>	<~>
867	786	<split-s>	<split-s>
867	786	<split-h>	<split-h>
867	786	<name2>	<name2>
867	789	<aphaerese>	<aphaerese>
867	865	<>	<aphaerese>
867	786	<elision3>	<elision3>
867	865	<>	<elision3>
867	786	<elision2>	<elision2>
867	865	<>	<elision2>
867	786	<elision1>	<elision1>
867	865	<>	<elision1>
867	783	.	υ
867	783	.	u
867	783	.	κ
867	783	.	α
867	783	.	a
867	783	.	λ
867	798	<split-h>	<>
868	854	<name>	<name>
868	869	<>	<name>
868	871	<>	<aphaerese>
868	871	<>	<elision3>
868	871	<>	<elision2>
868	871	<>	<elision1>
868	852	<split-h>	<>
868	810	<A2kl>	<>
868	878	<L2kl>	<>
869	870	<>	<aphaerese>
869	870	<>	<elision3>
869	870	<>	<elision2>
869	870	<>	<elision1>
869	811	<A2kl>	<>
869	873	<L2kl>	<>
870	871	<>	<aphaerese>
870	871	<>	<elision3>
870	871	<>	<elision2>
870	871	<>	<elision1>
870	812	<A2kl>	<>
870	874	<L2kl>	<>
871	869	<>	<name>
871	871	<>	<aphaerese>
871	871	<>	<elision3>
871	871	<>	<elision2>
871	871	<>	<elision1>
871	810	<A2kl>	<>
871	872	<L2kl>	<>
872	786	.	.
872	786	 	 
872	786	<~>	<~>
872	786	<split-s>	<split-s>
872	786	<split-h>	<split-h>
872	786	<name2>	<name2>
872	873	<>	<name>
872	789	<aphaerese>	<aphaerese>
872	872	<>	<aphaerese>
872	786	<elision3>	<elision3>
872	872	<>	<elision3>
872	786	<elision2>	<elision2>
872	872	<>	<elision2>
872	786	<elision1>	<elision1>
872	872	<>	<elision1>
872	783	.	υ
872	783	.	u
872	831	.	κ
872	783	.	α
872	783	.	a
872	831	.	λ
872	876	<split-h>	<>
873	788	.	.
873	788	 	 
873	788	<~>	<~>
873	788	<split-s>	<split-s>
873	788	<split-h>	<split-h>
873	788	<name2>	<name2>
873	791	<aphaerese>	<aphaerese>
873	874	<>	<aphaerese>
873	788	<elision3>	<elision3>
873	874	<>	<elision3>
873	788	<elision2>	<elision2>
873	874	<>	<elision2>
873	788	<elision1>	<elision1>
873	874	<>	<elision1>
873	785	.	υ
873	785	.	u
873	833	.	κ
873	785	.	α
873	785	.	a
873	833	.	λ
873	877	<split-h>	<>
874	786	.	.
874	786	 	 
874	786	<~>	<~>
874	786	<split-s>	<split-s>
874	786	<split-h>	<split-h>
874	786	<name2>	<name2>
874	789	<aphaerese>	<aphaerese>
874	872	<>	<aphaerese>
874	786	<elision3>	<elision3>
874	872	<>	<elision3>
874	786	<elision2>	<elision2>
874	872	<>	<elision2>
874	786	<elision1>	<elision1>
874	872	<>	<elision1>
874	783	.	υ
874	783	.	u
874	831	.	κ
874	783	.	α
874	783	.	a
874	831	.	λ
874	875	<split-h>	<>
875	876	<>	<aphaerese>
875	876	<>	<elision3>
875	876	<>	<elision2>
875	876	<>	<elision1>
875	632	<3s>	<>
876	877	<>	<name>
876	876	<>	<aphaerese>
876	876	<>	<elision3>
876	876	<>	<elision2>
876	876	<>	<elision1>
876	633	<3s>	<>
877	875	<>	<aphaerese>
877	875	<>	<elision3>
877	875	<>	<elision2>
877	875	<>	<elision1>
877	634	<3s>	<>
878	786	.	.
878	786	 	 
878	786	<~>	<~>
878	786	<split-s>	<split-s>
878	786	<split-h>	<split-h>
878	786	<name2>	<name2>
878	854	<name2>	<name>
878	873	<>	<name>
878	789	<aphaerese>	<aphaerese>
878	872	<>	<aphaerese>
878	786	<elision3>	<elision3>
878	872	<>	<elision3>
878	786	<elision2>	<elision2>
878	872	<>	<elision2>
878	786	<elision1>	<elision1>
878	872	<>	<elision1>
878	783	.	υ
878	783	.	u
878	831	.	κ
878	783	.	α
878	783	.	a
878	831	.	λ
878	879	<split-h>	<>
879	877	<>	<name>
879	876	<>	<aphaerese>
879	876	<>	<elision3>
879	876	<>	<elision2>
879	876	<>	<elision1>
879	639	<3s>	<>
880	395	.	.
880	396	 	 
880	395	<~>	<~>
880	395	<split-s>	<split-s>
880	395	<split-h>	<split-h>
880	395	<name2>	<name2>
880	692	<>	<name>
880	399	<aphaerese>	<aphaerese>
880	394	<>	<aphaerese>
880	394	<>	<elision3>
880	394	<>	<elision2>
880	394	<>	<elision1>
880	403	.	υ
880	409	s	υ
880	403	.	u
880	409	s	u
880	445	.	κ
880	481	s	κ
880	523	s	k
880	532	s	U
880	667	s	K
880	403	.	α
880	409	s	α
880	403	.	a
880	409	s	a
880	622	s	A
880	523	s	λ
880	523	s	l
880	680	s	L
880	881	<split-h>	<>
881	696	<>	<name>
881	695	<>	<aphaerese>
881	695	<>	<elision3>
881	695	<>	<elision2>
881	695	<>	<elision1>
881	645	<3s>	<>
882	395	.	.
882	396	 	 
882	395	<~>	<~>
882	395	<split-s>	<split-s>
882	395	<split-h>	<split-h>
882	395	<name2>	<name2>
882	728	<>	<name>
882	399	<aphaerese>	<aphaerese>
882	727	<>	<aphaerese>
882	730	<elision3>	<elision3>
882	727	<>	<elision3>
882	730	<elision2>	<elision2>
882	727	<>	<elision2>
882	730	<elision1>	<elision1>
882	727	<>	<elision1>
882	403	.	υ
882	409	s	υ
882	403	.	u
882	409	s	u
882	403	.	κ
882	706	s	κ
882	523	s	k
882	532	s	U
882	667	s	K
882	403	.	α
882	409	s	α
882	403	.	a
882	409	s	a
882	622	s	A
882	403	.	λ
882	706	s	λ
882	523	s	l
882	680	s	L
882	883	<split-h>	<>
883	779	<>	<name>
883	778	<>	<aphaerese>
883	778	<>	<elision3>
883	778	<>	<elision2>
883	778	<>	<elision1>
883	648	<3s>	<>
884	395	.	.
884	396	 	 
884	395	<~>	<~>
884	395	<split-s>	<split-s>
884	395	<split-h>	<split-h>
884	395	<name2>	<name2>
884	781	<>	<name>
884	399	<aphaerese>	<aphaerese>
884	780	<>	<aphaerese>
884	395	<elision3>	<elision3>
884	780	<>	<elision3>
884	395	<elision2>	<elision2>
884	780	<>	<elision2>
884	395	<elision1>	<elision1>
884	780	<>	<elision1>
884	403	.	υ
884	409	s	υ
884	403	.	u
884	409	s	u
884	783	.	κ
884	706	s	κ
884	523	s	k
884	532	s	U
884	667	s	K
884	403	.	α
884	409	s	α
884	403	.	a
884	409	s	a
884	622	s	A
884	783	.	λ
884	706	s	λ
884	523	s	l
884	680	s	L
884	885	<split-h>	<>
885	800	<>	<name>
885	799	<>	<aphaerese>
885	799	<>	<elision3>
885	799	<>	<elision2>
885	799	<>	<elision1>
885	651	<3s>	<>
886	802	<>	<name>
886	801	<>	<aphaerese>
886	801	<>	<elision3>
886	801	<>	<elision2>
886	801	<>	<elision1>
886	887	<U2kl>	<>
887	786	.	.
887	786	 	 
887	786	<~>	<~>
887	786	<split-s>	<split-s>
887	786	<split-h>	<split-h>
887	786	<name2>	<name2>
887	787	<>	<name>
887	789	<aphaerese>	<aphaerese>
887	786	<>	<aphaerese>
887	786	<elision3>	<elision3>
887	786	<>	<elision3>
887	786	<elision2>	<elision2>
887	786	<>	<elision2>
887	786	<elision1>	<elision1>
887	786	<>	<elision1>
887	783	.	υ
887	783	.	u
887	792	.	κ
887	783	.	α
887	783	.	a
887	888	<split-h>	<>
888	642	<>	<name>
888	641	<>	<aphaerese>
888	641	<>	<elision3>
888	641	<>	<elision2>
888	641	<>	<elision1>
888	655	<3s>	<>
889	805	<name>	<name>
889	807	<>	<name>
889	809	<>	<aphaerese>
889	809	<>	<elision3>
889	809	<>	<elision2>
889	809	<>	<elision1>
889	852	<split-h>	<>
889	810	<A2kl>	<>
889	828	<L2kl>	<>
889	890	<K2kl>	<>
890	786	.	.
890	786	 	 
890	786	<~>	<~>
890	786	<split-s>	<split-s>
890	786	<split-h>	<split-h>
890	786	<name2>	<name2>
890	854	<name2>	<name>
890	847	<>	<name>
890	789	<aphaerese>	<aphaerese>
890	846	<>	<aphaerese>
890	786	<elision3>	<elision3>
890	846	<>	<elision3>
890	786	<elision2>	<elision2>
890	846	<>	<elision2>
890	786	<elision1>	<elision1>
890	846	<>	<elision1>
890	783	.	υ
890	783	.	u
890	783	.	α
890	783	.	a
890	891	<split-h>	<>
891	851	<>	<name>
891	850	<>	<aphaerese>
891	850	<>	<elision3>
891	850	<>	<elision2>
891	850	<>	<elision1>
891	659	<3s>	<>
892	786	.	.
892	786	 	 
892	786	<~>	<~>
892	786	<split-s>	<split-s>
892	786	<split-h>	<split-h>
892	786	<name2>	<name2>
892	857	<>	<name>
892	789	<aphaerese>	<aphaerese>
892	856	<>	<aphaerese>
892	856	<>	<elision3>
892	856	<>	<elision2>
892	856	<>	<elision1>
892	783	.	υ
892	783	.	u
892	792	.	κ
892	783	.	α
892	783	.	a
892	881	<split-h>	<>
893	860	<>	<name>
893	859	<>	<aphaerese>
893	859	<>	<elision3>
893	859	<>	<elision2>
893	859	<>	<elision1>
893	887	<A2kl>	<>
894	395	.	.
894	396	 	 
894	395	<~>	<~>
894	395	<split-s>	<split-s>
894	395	<split-h>	<split-h>
894	395	<name2>	<name2>
894	863	<>	<name>
894	399	<aphaerese>	<aphaerese>
894	862	<>	<aphaerese>
894	395	<elision3>	<elision3>
894	862	<>	<elision3>
894	395	<elision2>	<elision2>
894	862	<>	<elision2>
894	395	<elision1>	<elision1>
894	862	<>	<elision1>
894	403	.	υ
894	409	s	υ
894	403	.	u
894	409	s	u
894	403	.	κ
894	706	s	κ
894	523	s	k
894	532	s	U
894	667	s	K
894	403	.	α
894	409	s	α
894	403	.	a
894	409	s	a
894	622	s	A
894	403	.	λ
894	706	s	λ
894	523	s	l
894	680	s	L
894	885	<split-h>	<>
895	786	.	.
895	786	 	 
895	786	<~>	<~>
895	786	<split-s>	<split-s>
895	786	<split-h>	<split-h>
895	786	<name2>	<name2>
895	866	<>	<name>
895	789	<aphaerese>	<aphaerese>
895	865	<>	<aphaerese>
895	786	<elision3>	<elision3>
895	865	<>	<elision3>
895	786	<elision2>	<elision2>
895	865	<>	<elision2>
895	786	<elision1>	<elision1>
895	865	<>	<elision1>
895	783	.	υ
895	783	.	u
895	783	.	κ
895	783	.	α
895	783	.	a
895	783	.	λ
895	885	<split-h>	<>
896	854	<name>	<name>
896	869	<>	<name>
896	871	<>	<aphaerese>
896	871	<>	<elision3>
896	871	<>	<elision2>
896	871	<>	<elision1>
896	852	<split-h>	<>
896	810	<A2kl>	<>
896	897	<L2kl>	<>
897	786	.	.
897	786	 	 
897	786	<~>	<~>
897	786	<split-s>	<split-s>
897	786	<split-h>	<split-h>
897	786	<name2>	<name2>
897	854	<name2>	<name>
897	873	<>	<name>
897	789	<aphaerese>	<aphaerese>
897	872	<>	<aphaerese>
897	786	<elision3>	<elision3>
897	872	<>	<elision3>
897	786	<elision2>	<elision2>
897	872	<>	<elision2>
897	786	<elision1>	<elision1>
897	872	<>	<elision1>
897	783	.	υ
897	783	.	u
897	831	.	κ
897	783	.	α
897	783	.	a
897	831	.	λ
897	898	<split-h>	<>
898	877	<>	<name>
898	876	<>	<aphaerese>
898	876	<>	<elision3>
898	876	<>	<elision2>
898	876	<>	<elision1>
898	664	<3s>	<>
899	272	.	.
899	273	 	 
899	272	<~>	<~>
899	272	<split-s>	<split-s>
899	272	<split-h>	<split-h>
899	272	<name2>	<name2>
899	276	<aphaerese>	<aphaerese>
899	276	<>	<aphaerese>
899	272	<elision3>	<elision3>
899	276	<>	<elision3>
899	272	<elision2>	<elision2>
899	276	<>	<elision2>
899	272	<elision1>	<elision1>
899	276	<>	<elision1>
899	272	.	υ
899	272	.	u
899	697	.	κ
899	727	s	κ
899	780	s	k
899	801	s	U
899	900	s	K
899	272	.	α
899	272	.	a
899	859	s	A
899	862	s	λ
899	865	s	l
899	910	s	L
899	428	<2s>	<>
900	805	<name>	<name>
900	901	<>	<name>
900	903	<>	<aphaerese>
900	903	<>	<elision3>
900	903	<>	<elision2>
900	903	<>	<elision1>
900	852	<split-h>	<>
900	904	<L2kl>	<>
900	853	<K2kl>	<>
901	902	<>	<aphaerese>
901	902	<>	<elision3>
901	902	<>	<elision2>
901	902	<>	<elision1>
901	905	<L2kl>	<>
901	847	<K2kl>	<>
902	903	<>	<aphaerese>
902	903	<>	<elision3>
902	903	<>	<elision2>
902	903	<>	<elision1>
902	906	<L2kl>	<>
902	848	<K2kl>	<>
903	901	<>	<name>
903	903	<>	<aphaerese>
903	903	<>	<elision3>
903	903	<>	<elision2>
903	903	<>	<elision1>
903	904	<L2kl>	<>
903	846	<K2kl>	<>
904	905	<>	<name>
904	904	<>	<aphaerese>
904	904	<>	<elision3>
904	904	<>	<elision2>
904	904	<>	<elision1>
904	783	.	κ
904	783	.	λ
904	908	<split-h>	<>
905	906	<>	<aphaerese>
905	906	<>	<elision3>
905	906	<>	<elision2>
905	906	<>	<elision1>
905	785	.	κ
905	785	.	λ
905	909	<split-h>	<>
906	904	<>	<aphaerese>
906	904	<>	<elision3>
906	904	<>	<elision2>
906	904	<>	<elision1>
906	783	.	κ
906	783	.	λ
906	907	<split-h>	<>
907	908	<>	<aphaerese>
907	908	<>	<elision3>
907	908	<>	<elision2>
907	908	<>	<elision1>
907	674	<3s>	<>
908	909	<>	<name>
908	908	<>	<aphaerese>
908	908	<>	<elision3>
908	908	<>	<elision2>
908	908	<>	<elision1>
908	675	<3s>	<>
909	907	<>	<aphaerese>
909	907	<>	<elision3>
909	907	<>	<elision2>
909	907	<>	<elision1>
909	676	<3s>	<>
910	854	<name>	<name>
910	911	<>	<name>
910	913	<>	<aphaerese>
910	913	<>	<elision3>
910	913	<>	<elision2>
910	913	<>	<elision1>
910	852	<split-h>	<>
910	914	<L2kl>	<>
911	912	<>	<aphaerese>
911	912	<>	<elision3>
911	912	<>	<elision2>
911	912	<>	<elision1>
911	866	<L2kl>	<>
912	913	<>	<aphaerese>
912	913	<>	<elision3>
912	913	<>	<elision2>
912	913	<>	<elision1>
912	867	<L2kl>	<>
913	911	<>	<name>
913	913	<>	<aphaerese>
913	913	<>	<elision3>
913	913	<>	<elision2>
913	913	<>	<elision1>
913	865	<L2kl>	<>
914	786	.	.
914	786	 	 
914	786	<~>	<~>
914	786	<split-s>	<split-s>
914	786	<split-h>	<split-h>
914	786	<name2>	<name2>
914	854	<name2>	<name>
914	866	<>	<name>
914	789	<aphaerese>	<aphaerese>
914	865	<>	<aphaerese>
914	786	<elision3>	<elision3>
914	865	<>	<elision3>
914	786	<elision2>	<elision2>
914	865	<>	<elision2>
914	786	<elision1>	<elision1>
914	865	<>	<elision1>
914	783	.	υ
914	783	.	u
914	783	.	κ
914	783	.	α
914	783	.	a
914	783	.	λ
914	915	<split-h>	<>
915	800	<>	<name>
915	799	<>	<aphaerese>
915	799	<>	<elision3>
915	799	<>	<elision2>
915	799	<>	<elision1>
915	685	<3s>	<>
916	272	.	.
916	273	 	 
916	272	<~>	<~>
916	272	<split-s>	<split-s>
916	272	<split-h>	<split-h>
916	272	<name2>	<name2>
916	276	<aphaerese>	<aphaerese>
916	279	<>	<aphaerese>
916	272	<elision3>	<elision3>
916	279	<>	<elision3>
916	272	<elision2>	<elision2>
916	279	<>	<elision2>
916	272	<elision1>	<elision1>
916	279	<>	<elision1>
916	280	.	υ
916	394	s	υ
916	280	.	u
916	394	s	u
916	697	.	κ
916	727	s	κ
916	780	s	k
916	801	s	U
916	804	s	K
916	280	.	α
916	856	s	α
916	280	.	a
916	856	s	a
916	859	s	A
916	862	s	λ
916	865	s	l
916	868	s	L
916	434	<2s>	<>
917	275	.	.
917	278	 	 
917	275	<~>	<~>
917	275	<split-s>	<split-s>
917	275	<split-h>	<split-h>
917	275	<name2>	<name2>
917	899	<aphaerese>	<aphaerese>
917	275	<>	<aphaerese>
917	275	<elision3>	<elision3>
917	275	<>	<elision3>
917	275	<elision2>	<elision2>
917	275	<>	<elision2>
917	275	<elision1>	<elision1>
917	275	<>	<elision1>
917	282	.	υ
917	693	s	υ
917	282	.	u
917	693	s	u
917	699	.	κ
917	729	s	κ
917	782	s	k
917	803	s	U
917	902	s	K
917	282	.	α
917	858	s	α
917	282	.	a
917	858	s	a
917	861	s	A
917	864	s	λ
917	867	s	l
917	912	s	L
917	436	<2s>	<>
918	275	.	.
918	278	 	 
918	275	<~>	<~>
918	275	<split-s>	<split-s>
918	275	<split-h>	<split-h>
918	275	<name2>	<name2>
918	899	<aphaerese>	<aphaerese>
918	919	<>	<aphaerese>
918	919	<>	<elision3>
918	919	<>	<elision2>
918	919	<>	<elision1>
918	282	.	υ
918	693	s	υ
918	282	.	u
918	693	s	u
918	282	.	κ
918	922	s	κ
918	782	s	k
918	803	s	U
918	902	s	K
918	282	.	α
918	858	s	α
918	282	.	a
918	858	s	a
918	861	s	A
918	282	.	λ
918	922	s	λ
918	867	s	l
918	912	s	L
918	711	<2s>	<>
919	272	.	.
919	273	 	 
919	272	<~>	<~>
919	272	<split-s>	<split-s>
919	272	<split-h>	<split-h>
919	272	<name2>	<name2>
919	276	<aphaerese>	<aphaerese>
919	271	<>	<aphaerese>
919	271	<>	<elision3>
919	271	<>	<elision2>
919	271	<>	<elision1>
919	280	.	υ
919	394	s	υ
919	280	.	u
919	394	s	u
919	280	.	κ
919	920	s	κ
919	780	s	k
919	801	s	U
919	900	s	K
919	280	.	α
919	856	s	α
919	280	.	a
919	856	s	a
919	859	s	A
919	280	.	λ
919	920	s	λ
919	865	s	l
919	910	s	L
919	709	<2s>	<>
920	395	.	.
920	396	 	 
920	395	<~>	<~>
920	395	<split-s>	<split-s>
920	395	<split-h>	<split-h>
920	395	<name2>	<name2>
920	921	<>	<name>
920	399	<aphaerese>	<aphaerese>
920	920	<>	<aphaerese>
920	920	<>	<elision3>
920	920	<>	<elision2>
920	920	<>	<elision1>
920	403	.	υ
920	409	s	υ
920	403	.	u
920	409	s	u
920	403	.	κ
920	706	s	κ
920	523	s	k
920	532	s	U
920	667	s	K
920	403	.	α
920	409	s	α
920	403	.	a
920	409	s	a
920	622	s	A
920	403	.	λ
920	706	s	λ
920	523	s	l
920	680	s	L
920	924	<split-h>	<>
921	398	.	.
921	401	 	 
921	398	<~>	<~>
921	398	<split-s>	<split-s>
921	398	<split-h>	<split-h>
921	398	<name2>	<name2>
921	666	<aphaerese>	<aphaerese>
921	922	<>	<aphaerese>
921	922	<>	<elision3>
921	922	<>	<elision2>
921	922	<>	<elision1>
921	405	.	υ
921	438	s	υ
921	405	.	u
921	438	s	u
921	405	.	κ
921	708	s	κ
921	525	s	k
921	534	s	U
921	669	s	K
921	405	.	α
921	438	s	α
921	405	.	a
921	438	s	a
921	624	s	A
921	405	.	λ
921	708	s	λ
921	525	s	l
921	682	s	L
921	925	<split-h>	<>
922	395	.	.
922	396	 	 
922	395	<~>	<~>
922	395	<split-s>	<split-s>
922	395	<split-h>	<split-h>
922	395	<name2>	<name2>
922	399	<aphaerese>	<aphaerese>
922	920	<>	<aphaerese>
922	920	<>	<elision3>
922	920	<>	<elision2>
922	920	<>	<elision1>
922	403	.	υ
922	409	s	υ
922	403	.	u
922	409	s	u
922	403	.	κ
922	706	s	κ
922	523	s	k
922	532	s	U
922	667	s	K
922	403	.	α
922	409	s	α
922	403	.	a
922	409	s	a
922	622	s	A
922	403	.	λ
922	706	s	λ
922	523	s	l
922	680	s	L
922	923	<split-h>	<>
923	924	<>	<aphaerese>
923	924	<>	<elision3>
923	924	<>	<elision2>
923	924	<>	<elision1>
923	709	<3s>	<>
924	925	<>	<name>
924	924	<>	<aphaerese>
924	924	<>	<elision3>
924	924	<>	<elision2>
924	924	<>	<elision1>
924	710	<3s>	<>
925	923	<>	<aphaerese>
925	923	<>	<elision3>
925	923	<>	<elision2>
925	923	<>	<elision1>
925	711	<3s>	<>
926	272	.	.
926	273	 	 
926	272	<~>	<~>
926	272	<split-s>	<split-s>
926	272	<split-h>	<split-h>
926	272	<name2>	<name2>
926	927	<>	<name>
926	276	<aphaerese>	<aphaerese>
926	926	<>	<aphaerese>
926	272	<elision3>	<elision3>
926	926	<>	<elision3>
926	272	<elision2>	<elision2>
926	926	<>	<elision2>
926	272	<elision1>	<elision1>
926	926	<>	<elision1>
926	280	.	υ
926	394	s	υ
926	280	.	u
926	394	s	u
926	929	.	κ
926	920	s	κ
926	780	s	k
926	801	s	U
926	900	s	K
926	280	.	α
926	856	s	α
926	280	.	a
926	856	s	a
926	859	s	A
926	929	.	λ
926	920	s	λ
926	865	s	l
926	910	s	L
926	527	<2s>	<>
927	275	.	.
927	278	 	 
927	275	<~>	<~>
927	275	<split-s>	<split-s>
927	275	<split-h>	<split-h>
927	275	<name2>	<name2>
927	899	<aphaerese>	<aphaerese>
927	928	<>	<aphaerese>
927	275	<elision3>	<elision3>
927	928	<>	<elision3>
927	275	<elision2>	<elision2>
927	928	<>	<elision2>
927	275	<elision1>	<elision1>
927	928	<>	<elision1>
927	282	.	υ
927	693	s	υ
927	282	.	u
927	693	s	u
927	931	.	κ
927	922	s	κ
927	782	s	k
927	803	s	U
927	902	s	K
927	282	.	α
927	858	s	α
927	282	.	a
927	858	s	a
927	861	s	A
927	931	.	λ
927	922	s	λ
927	867	s	l
927	912	s	L
927	528	<2s>	<>
928	272	.	.
928	273	 	 
928	272	<~>	<~>
928	272	<split-s>	<split-s>
928	272	<split-h>	<split-h>
928	272	<name2>	<name2>
928	276	<aphaerese>	<aphaerese>
928	926	<>	<aphaerese>
928	272	<elision3>	<elision3>
928	926	<>	<elision3>
928	272	<elision2>	<elision2>
928	926	<>	<elision2>
928	272	<elision1>	<elision1>
928	926	<>	<elision1>
928	280	.	υ
928	394	s	υ
928	280	.	u
928	394	s	u
928	929	.	κ
928	920	s	κ
928	780	s	k
928	801	s	U
928	900	s	K
928	280	.	α
928	856	s	α
928	280	.	a
928	856	s	a
928	859	s	A
928	929	.	λ
928	920	s	λ
928	865	s	l
928	910	s	L
928	526	<2s>	<>
929	930	<>	<name>
929	929	<>	<aphaerese>
929	932	<elision3>	<elision3>
929	929	<>	<elision3>
929	932	<elision2>	<elision2>
929	929	<>	<elision2>
929	932	<elision1>	<elision1>
929	929	<>	<elision1>
929	284	<2s>	<>
930	931	<>	<aphaerese>
930	935	<elision3>	<elision3>
930	931	<>	<elision3>
930	935	<elision2>	<elision2>
930	931	<>	<elision2>
930	935	<elision1>	<elision1>
930	931	<>	<elision1>
930	285	<2s>	<>
931	929	<>	<aphaerese>
931	932	<elision3>	<elision3>
931	929	<>	<elision3>
931	932	<elision2>	<elision2>
931	929	<>	<elision2>
931	932	<elision1>	<elision1>
931	929	<>	<elision1>
931	283	<2s>	<>
932	932	.	.
932	933	 	 
932	932	<~>	<~>
932	932	<split-s>	<split-s>
932	932	<split-h>	<split-h>
932	932	<name2>	<name2>
932	958	<>	<name>
932	936	<aphaerese>	<aphaerese>
932	932	<>	<aphaerese>
932	932	<elision3>	<elision3>
932	932	<>	<elision3>
932	932	<elision2>	<elision2>
932	932	<>	<elision2>
932	932	<elision1>	<elision1>
932	932	<>	<elision1>
932	929	.	υ
932	856	s	υ
932	929	.	u
932	856	s	u
932	940	.	κ
932	946	s	κ
932	865	s	k
932	801	s	U
932	956	s	K
932	929	.	α
932	856	s	α
932	929	.	a
932	856	s	a
932	859	s	A
932	865	s	λ
932	865	s	l
932	910	s	L
932	435	<2s>	<>
933	932	.	.
933	933	 	 
933	932	<~>	<~>
933	932	<split-s>	<split-s>
933	932	<split-h>	<split-h>
933	932	<name2>	<name2>
933	934	<>	<name>
933	936	<aphaerese>	<aphaerese>
933	939	<>	<aphaerese>
933	932	<elision3>	<elision3>
933	939	<>	<elision3>
933	932	<elision2>	<elision2>
933	939	<>	<elision2>
933	932	<elision1>	<elision1>
933	939	<>	<elision1>
933	929	.	υ
933	892	s	υ
933	929	.	u
933	892	s	u
933	940	.	κ
933	953	s	κ
933	895	s	k
933	886	s	U
933	954	s	K
933	929	.	α
933	892	s	α
933	929	.	a
933	892	s	a
933	893	s	A
933	895	s	λ
933	895	s	l
933	896	s	L
933	435	<2s>	<>
934	935	.	.
934	938	 	 
934	935	<~>	<~>
934	935	<split-s>	<split-s>
934	935	<split-h>	<split-h>
934	935	<name2>	<name2>
934	955	<aphaerese>	<aphaerese>
934	957	<>	<aphaerese>
934	935	<elision3>	<elision3>
934	957	<>	<elision3>
934	935	<elision2>	<elision2>
934	957	<>	<elision2>
934	935	<elision1>	<elision1>
934	957	<>	<elision1>
934	931	.	υ
934	858	s	υ
934	931	.	u
934	858	s	u
934	942	.	κ
934	948	s	κ
934	867	s	k
934	803	s	U
934	808	s	K
934	931	.	α
934	858	s	α
934	931	.	a
934	858	s	a
934	861	s	A
934	867	s	λ
934	867	s	l
934	870	s	L
934	436	<2s>	<>
935	932	.	.
935	933	 	 
935	932	<~>	<~>
935	932	<split-s>	<split-s>
935	932	<split-h>	<split-h>
935	932	<name2>	<name2>
935	936	<aphaerese>	<aphaerese>
935	932	<>	<aphaerese>
935	932	<elision3>	<elision3>
935	932	<>	<elision3>
935	932	<elision2>	<elision2>
935	932	<>	<elision2>
935	932	<elision1>	<elision1>
935	932	<>	<elision1>
935	929	.	υ
935	856	s	υ
935	929	.	u
935	856	s	u
935	940	.	κ
935	946	s	κ
935	865	s	k
935	801	s	U
935	956	s	K
935	929	.	α
935	856	s	α
935	929	.	a
935	856	s	a
935	859	s	A
935	865	s	λ
935	865	s	l
935	910	s	L
935	434	<2s>	<>
936	932	.	.
936	933	 	 
936	932	<~>	<~>
936	932	<split-s>	<split-s>
936	932	<split-h>	<split-h>
936	932	<name2>	<name2>
936	937	<>	<name>
936	936	<aphaerese>	<aphaerese>
936	936	<>	<aphaerese>
936	932	<elision3>	<elision3>
936	936	<>	<elision3>
936	932	<elision2>	<elision2>
936	936	<>	<elision2>
936	932	<elision1>	<elision1>
936	936	<>	<elision1>
936	932	.	υ
936	932	.	u
936	940	.	κ
936	946	s	κ
936	865	s	k
936	801	s	U
936	956	s	K
936	932	.	α
936	932	.	a
936	859	s	A
936	865	s	λ
936	865	s	l
936	910	s	L
936	429	<2s>	<>
937	935	.	.
937	938	 	 
937	935	<~>	<~>
937	935	<split-s>	<split-s>
937	935	<split-h>	<split-h>
937	935	<name2>	<name2>
937	955	<aphaerese>	<aphaerese>
937	955	<>	<aphaerese>
937	935	<elision3>	<elision3>
937	955	<>	<elision3>
937	935	<elision2>	<elision2>
937	955	<>	<elision2>
937	935	<elision1>	<elision1>
937	955	<>	<elision1>
937	935	.	υ
937	935	.	u
937	942	.	κ
937	948	s	κ
937	867	s	k
937	803	s	U
937	902	s	K
937	935	.	α
937	935	.	a
937	861	s	A
937	867	s	λ
937	867	s	l
937	912	s	L
937	430	<2s>	<>
938	932	.	.
938	933	 	 
938	932	<~>	<~>
938	932	<split-s>	<split-s>
938	932	<split-h>	<split-h>
938	932	<name2>	<name2>
938	936	<aphaerese>	<aphaerese>
938	939	<>	<aphaerese>
938	932	<elision3>	<elision3>
938	939	<>	<elision3>
938	932	<elision2>	<elision2>
938	939	<>	<elision2>
938	932	<elision1>	<elision1>
938	939	<>	<elision1>
938	929	.	υ
938	892	s	υ
938	929	.	u
938	892	s	u
938	940	.	κ
938	953	s	κ
938	895	s	k
938	886	s	U
938	954	s	K
938	929	.	α
938	892	s	α
938	929	.	a
938	892	s	a
938	893	s	A
938	895	s	λ
938	895	s	l
938	896	s	L
938	434	<2s>	<>
939	932	.	.
939	933	 	 
939	932	<~>	<~>
939	932	<split-s>	<split-s>
939	932	<split-h>	<split-h>
939	932	<name2>	<name2>
939	934	<>	<name>
939	936	<aphaerese>	<aphaerese>
939	939	<>	<aphaerese>
939	932	<elision3>	<elision3>
939	939	<>	<elision3>
939	932	<elision2>	<elision2>
939	939	<>	<elision2>
939	932	<elision1>	<elision1>
939	939	<>	<elision1>
939	929	.	υ
939	856	s	υ
939	929	.	u
939	856	s	u
939	940	.	κ
939	946	s	κ
939	865	s	k
939	801	s	U
939	952	s	K
939	929	.	α
939	856	s	α
939	929	.	a
939	856	s	a
939	859	s	A
939	865	s	λ
939	865	s	l
939	868	s	L
939	435	<2s>	<>
940	941	<>	<name>
940	940	<>	<aphaerese>
940	943	<elision3>	<elision3>
940	940	<>	<elision3>
940	943	<elision2>	<elision2>
940	940	<>	<elision2>
940	943	<elision1>	<elision1>
940	940	<>	<elision1>
940	426	<2s>	<>
941	942	<>	<aphaerese>
941	945	<elision3>	<elision3>
941	942	<>	<elision3>
941	945	<elision2>	<elision2>
941	942	<>	<elision2>
941	945	<elision1>	<elision1>
941	942	<>	<elision1>
941	427	<2s>	<>
942	940	<>	<aphaerese>
942	943	<elision3>	<elision3>
942	940	<>	<elision3>
942	943	<elision2>	<elision2>
942	940	<>	<elision2>
942	943	<elision1>	<elision1>
942	940	<>	<elision1>
942	425	<2s>	<>
943	944	<>	<name>
943	943	<>	<aphaerese>
943	943	<>	<elision3>
943	943	<>	<elision2>
943	943	<>	<elision1>
943	722	s	κ
943	722	s	k
943	718	s	K
943	722	s	λ
943	722	s	l
943	724	s	L
943	423	<2s>	<>
944	945	<>	<aphaerese>
944	945	<>	<elision3>
944	945	<>	<elision2>
944	945	<>	<elision1>
944	721	s	κ
944	721	s	k
944	720	s	K
944	721	s	λ
944	721	s	l
944	726	s	L
944	424	<2s>	<>
945	943	<>	<aphaerese>
945	943	<>	<elision3>
945	943	<>	<elision2>
945	943	<>	<elision1>
945	722	s	κ
945	722	s	k
945	718	s	K
945	722	s	λ
945	722	s	l
945	724	s	L
945	422	<2s>	<>
946	786	.	.
946	786	 	 
946	786	<~>	<~>
946	786	<split-s>	<split-s>
946	786	<split-h>	<split-h>
946	786	<name2>	<name2>
946	947	<>	<name>
946	789	<aphaerese>	<aphaerese>
946	946	<>	<aphaerese>
946	949	<elision3>	<elision3>
946	946	<>	<elision3>
946	949	<elision2>	<elision2>
946	946	<>	<elision2>
946	949	<elision1>	<elision1>
946	946	<>	<elision1>
946	783	.	υ
946	783	.	u
946	783	.	κ
946	783	.	α
946	783	.	a
946	783	.	λ
946	778	<split-h>	<>
947	788	.	.
947	788	 	 
947	788	<~>	<~>
947	788	<split-s>	<split-s>
947	788	<split-h>	<split-h>
947	788	<name2>	<name2>
947	791	<aphaerese>	<aphaerese>
947	948	<>	<aphaerese>
947	951	<elision3>	<elision3>
947	948	<>	<elision3>
947	951	<elision2>	<elision2>
947	948	<>	<elision2>
947	951	<elision1>	<elision1>
947	948	<>	<elision1>
947	785	.	υ
947	785	.	u
947	785	.	κ
947	785	.	α
947	785	.	a
947	785	.	λ
947	779	<split-h>	<>
948	786	.	.
948	786	 	 
948	786	<~>	<~>
948	786	<split-s>	<split-s>
948	786	<split-h>	<split-h>
948	786	<name2>	<name2>
948	789	<aphaerese>	<aphaerese>
948	946	<>	<aphaerese>
948	949	<elision3>	<elision3>
948	946	<>	<elision3>
948	949	<elision2>	<elision2>
948	946	<>	<elision2>
948	949	<elision1>	<elision1>
948	946	<>	<elision1>
948	783	.	υ
948	783	.	u
948	783	.	κ
948	783	.	α
948	783	.	a
948	783	.	λ
948	777	<split-h>	<>
949	786	.	.
949	786	 	 
949	786	<~>	<~>
949	786	<split-s>	<split-s>
949	786	<split-h>	<split-h>
949	786	<name2>	<name2>
949	950	<>	<name>
949	789	<aphaerese>	<aphaerese>
949	949	<>	<aphaerese>
949	786	<elision3>	<elision3>
949	949	<>	<elision3>
949	786	<elision2>	<elision2>
949	949	<>	<elision2>
949	786	<elision1>	<elision1>
949	949	<>	<elision1>
949	783	.	υ
949	783	.	u
949	792	.	κ
949	783	.	α
949	783	.	a
949	775	<split-h>	<>
950	788	.	.
950	788	 	 
950	788	<~>	<~>
950	788	<split-s>	<split-s>
950	788	<split-h>	<split-h>
950	788	<name2>	<name2>
950	791	<aphaerese>	<aphaerese>
950	951	<>	<aphaerese>
950	788	<elision3>	<elision3>
950	951	<>	<elision3>
950	788	<elision2>	<elision2>
950	951	<>	<elision2>
950	788	<elision1>	<elision1>
950	951	<>	<elision1>
950	785	.	υ
950	785	.	u
950	794	.	κ
950	785	.	α
950	785	.	a
950	776	<split-h>	<>
951	786	.	.
951	786	 	 
951	786	<~>	<~>
951	786	<split-s>	<split-s>
951	786	<split-h>	<split-h>
951	786	<name2>	<name2>
951	789	<aphaerese>	<aphaerese>
951	949	<>	<aphaerese>
951	786	<elision3>	<elision3>
951	949	<>	<elision3>
951	786	<elision2>	<elision2>
951	949	<>	<elision2>
951	786	<elision1>	<elision1>
951	949	<>	<elision1>
951	783	.	υ
951	783	.	u
951	792	.	κ
951	783	.	α
951	783	.	a
951	774	<split-h>	<>
952	854	<name>	<name>
952	807	<>	<name>
952	809	<>	<aphaerese>
952	809	<>	<elision3>
952	809	<>	<elision2>
952	809	<>	<elision1>
952	852	<split-h>	<>
952	810	<A2kl>	<>
952	828	<L2kl>	<>
952	853	<K2kl>	<>
953	786	.	.
953	786	 	 
953	786	<~>	<~>
953	786	<split-s>	<split-s>
953	786	<split-h>	<split-h>
953	786	<name2>	<name2>
953	947	<>	<name>
953	789	<aphaerese>	<aphaerese>
953	946	<>	<aphaerese>
953	949	<elision3>	<elision3>
953	946	<>	<elision3>
953	949	<elision2>	<elision2>
953	946	<>	<elision2>
953	949	<elision1>	<elision1>
953	946	<>	<elision1>
953	783	.	υ
953	783	.	u
953	783	.	κ
953	783	.	α
953	783	.	a
953	783	.	λ
953	883	<split-h>	<>
954	854	<name>	<name>
954	807	<>	<name>
954	809	<>	<aphaerese>
954	809	<>	<elision3>
954	809	<>	<elision2>
954	809	<>	<elision1>
954	852	<split-h>	<>
954	810	<A2kl>	<>
954	828	<L2kl>	<>
954	890	<K2kl>	<>
955	932	.	.
955	933	 	 
955	932	<~>	<~>
955	932	<split-s>	<split-s>
955	932	<split-h>	<split-h>
955	932	<name2>	<name2>
955	936	<aphaerese>	<aphaerese>
955	936	<>	<aphaerese>
955	932	<elision3>	<elision3>
955	936	<>	<elision3>
955	932	<elision2>	<elision2>
955	936	<>	<elision2>
955	932	<elision1>	<elision1>
955	936	<>	<elision1>
955	932	.	υ
955	932	.	u
955	940	.	κ
955	946	s	κ
955	865	s	k
955	801	s	U
955	956	s	K
955	932	.	α
955	932	.	a
955	859	s	A
955	865	s	λ
955	865	s	l
955	910	s	L
955	428	<2s>	<>
956	854	<name>	<name>
956	901	<>	<name>
956	903	<>	<aphaerese>
956	903	<>	<elision3>
956	903	<>	<elision2>
956	903	<>	<elision1>
956	852	<split-h>	<>
956	904	<L2kl>	<>
956	853	<K2kl>	<>
957	932	.	.
957	933	 	 
957	932	<~>	<~>
957	932	<split-s>	<split-s>
957	932	<split-h>	<split-h>
957	932	<name2>	<name2>
957	936	<aphaerese>	<aphaerese>
957	939	<>	<aphaerese>
957	932	<elision3>	<elision3>
957	939	<>	<elision3>
957	932	<elision2>	<elision2>
957	939	<>	<elision2>
957	932	<elision1>	<elision1>
957	939	<>	<elision1>
957	929	.	υ
957	856	s	υ
957	929	.	u
957	856	s	u
957	940	.	κ
957	946	s	κ
957	865	s	k
957	801	s	U
957	952	s	K
957	929	.	α
957	856	s	α
957	929	.	a
957	856	s	a
957	859	s	A
957	865	s	λ
957	865	s	l
957	868	s	L
957	434	<2s>	<>
958	935	.	.
958	938	 	 
958	935	<~>	<~>
958	935	<split-s>	<split-s>
958	935	<split-h>	<split-h>
958	935	<name2>	<name2>
958	955	<aphaerese>	<aphaerese>
958	935	<>	<aphaerese>
958	935	<elision3>	<elision3>
958	935	<>	<elision3>
958	935	<elision2>	<elision2>
958	935	<>	<elision2>
958	935	<elision1>	<elision1>
958	935	<>	<elision1>
958	931	.	υ
958	858	s	υ
958	931	.	u
958	858	s	u
958	942	.	κ
958	948	s	κ
958	867	s	k
958	803	s	U
958	902	s	K
958	931	.	α
958	858	s	α
958	931	.	a
958	858	s	a
958	861	s	A
958	867	s	λ
958	867	s	l
958	912	s	L
958	436	<2s>	<>
959	960	<name>	<name>
959	961	<>	<name>
959	963	<>	<aphaerese>
959	963	<>	<elision3>
959	963	<>	<elision2>
959	963	<>	<elision1>
959	617	<2s>	<>
959	964	<L2kl>	<>
959	973	<K2kl>	<>
960	902	s	k
960	912	s	l
960	537	<2s>	<>
961	962	<>	<aphaerese>
961	962	<>	<elision3>
961	962	<>	<elision2>
961	962	<>	<elision1>
961	965	<L2kl>	<>
961	968	<K2kl>	<>
962	963	<>	<aphaerese>
962	963	<>	<elision3>
962	963	<>	<elision2>
962	963	<>	<elision1>
962	966	<L2kl>	<>
962	969	<K2kl>	<>
963	961	<>	<name>
963	963	<>	<aphaerese>
963	963	<>	<elision3>
963	963	<>	<elision2>
963	963	<>	<elision1>
963	964	<L2kl>	<>
963	967	<K2kl>	<>
964	965	<>	<name>
964	964	<>	<aphaerese>
964	964	<>	<elision3>
964	964	<>	<elision2>
964	964	<>	<elision1>
964	929	.	κ
964	929	.	λ
964	675	<2s>	<>
965	966	<>	<aphaerese>
965	966	<>	<elision3>
965	966	<>	<elision2>
965	966	<>	<elision1>
965	931	.	κ
965	931	.	λ
965	676	<2s>	<>
966	964	<>	<aphaerese>
966	964	<>	<elision3>
966	964	<>	<elision2>
966	964	<>	<elision1>
966	929	.	κ
966	929	.	λ
966	674	<2s>	<>
967	932	.	.
967	933	 	 
967	932	<~>	<~>
967	932	<split-s>	<split-s>
967	932	<split-h>	<split-h>
967	932	<name2>	<name2>
967	968	<>	<name>
967	936	<aphaerese>	<aphaerese>
967	967	<>	<aphaerese>
967	932	<elision3>	<elision3>
967	967	<>	<elision3>
967	932	<elision2>	<elision2>
967	967	<>	<elision2>
967	932	<elision1>	<elision1>
967	967	<>	<elision1>
967	929	.	υ
967	856	s	υ
967	929	.	u
967	856	s	u
967	970	s	κ
967	865	s	k
967	801	s	U
967	956	s	K
967	929	.	α
967	856	s	α
967	929	.	a
967	856	s	a
967	859	s	A
967	970	s	λ
967	865	s	l
967	910	s	L
967	612	<2s>	<>
968	935	.	.
968	938	 	 
968	935	<~>	<~>
968	935	<split-s>	<split-s>
968	935	<split-h>	<split-h>
968	935	<name2>	<name2>
968	955	<aphaerese>	<aphaerese>
968	969	<>	<aphaerese>
968	935	<elision3>	<elision3>
968	969	<>	<elision3>
968	935	<elision2>	<elision2>
968	969	<>	<elision2>
968	935	<elision1>	<elision1>
968	969	<>	<elision1>
968	931	.	υ
968	858	s	υ
968	931	.	u
968	858	s	u
968	972	s	κ
968	867	s	k
968	803	s	U
968	902	s	K
968	931	.	α
968	858	s	α
968	931	.	a
968	858	s	a
968	861	s	A
968	972	s	λ
968	867	s	l
968	912	s	L
968	613	<2s>	<>
969	932	.	.
969	933	 	 
969	932	<~>	<~>
969	932	<split-s>	<split-s>
969	932	<split-h>	<split-h>
969	932	<name2>	<name2>
969	936	<aphaerese>	<aphaerese>
969	967	<>	<aphaerese>
969	932	<elision3>	<elision3>
969	967	<>	<elision3>
969	932	<elision2>	<elision2>
969	967	<>	<elision2>
969	932	<elision1>	<elision1>
969	967	<>	<elision1>
969	929	.	υ
969	856	s	υ
969	929	.	u
969	856	s	u
969	970	s	κ
969	865	s	k
969	801	s	U
969	956	s	K
969	929	.	α
969	856	s	α
969	929	.	a
969	856	s	a
969	859	s	A
969	970	s	λ
969	865	s	l
969	910	s	L
969	611	<2s>	<>
970	786	.	.
970	786	 	 
970	786	<~>	<~>
970	786	<split-s>	<split-s>
970	786	<split-h>	<split-h>
970	786	<name2>	<name2>
970	971	<>	<name>
970	789	<aphaerese>	<aphaerese>
970	970	<>	<aphaerese>
970	970	<>	<elision3>
970	970	<>	<elision2>
970	970	<>	<elision1>
970	783	.	υ
970	783	.	u
970	783	.	κ
970	783	.	α
970	783	.	a
970	783	.	λ
970	924	<split-h>	<>
971	788	.	.
971	788	 	 
971	788	<~>	<~>
971	788	<split-s>	<split-s>
971	788	<split-h>	<split-h>
971	788	<name2>	<name2>
971	791	<aphaerese>	<aphaerese>
971	972	<>	<aphaerese>
971	972	<>	<elision3>
971	972	<>	<elision2>
971	972	<>	<elision1>
971	785	.	υ
971	785	.	u
971	785	.	κ
971	785	.	α
971	785	.	a
971	785	.	λ
971	925	<split-h>	<>
972	786	.	.
972	786	 	 
972	786	<~>	<~>
972	786	<split-s>	<split-s>
972	786	<split-h>	<split-h>
972	786	<name2>	<name2>
972	789	<aphaerese>	<aphaerese>
972	970	<>	<aphaerese>
972	970	<>	<elision3>
972	970	<>	<elision2>
972	970	<>	<elision1>
972	783	.	υ
972	783	.	u
972	783	.	κ
972	783	.	α
972	783	.	a
972	783	.	λ
972	923	<split-h>	<>
973	932	.	.
973	933	 	 
973	932	<~>	<~>
973	932	<split-s>	<split-s>
973	932	<split-h>	<split-h>
973	932	<name2>	<name2>
973	960	<name2>	<name>
973	968	<>	<name>
973	936	<aphaerese>	<aphaerese>
973	967	<>	<aphaerese>
973	932	<elision3>	<elision3>
973	967	<>	<elision3>
973	932	<elision2>	<elision2>
973	967	<>	<elision2>
973	932	<elision1>	<elision1>
973	967	<>	<elision1>
973	929	.	υ
973	856	s	υ
973	929	.	u
973	856	s	u
973	970	s	κ
973	865	s	k
973	801	s	U
973	956	s	K
973	929	.	α
973	856	s	α
973	929	.	a
973	856	s	a
973	859	s	A
973	970	s	λ
973	865	s	l
973	910	s	L
973	620	<2s>	<>
974	932	.	.
974	933	 	 
974	932	<~>	<~>
974	932	<split-s>	<split-s>
974	932	<split-h>	<split-h>
974	932	<name2>	<name2>
974	975	<>	<name>
974	936	<aphaerese>	<aphaerese>
974	974	<>	<aphaerese>
974	932	<elision3>	<elision3>
974	974	<>	<elision3>
974	932	<elision2>	<elision2>
974	974	<>	<elision2>
974	932	<elision1>	<elision1>
974	974	<>	<elision1>
974	929	.	υ
974	856	s	υ
974	929	.	u
974	856	s	u
974	929	.	κ
974	970	s	κ
974	865	s	k
974	801	s	U
974	956	s	K
974	929	.	α
974	856	s	α
974	929	.	a
974	856	s	a
974	859	s	A
974	929	.	λ
974	970	s	λ
974	865	s	l
974	910	s	L
974	527	<2s>	<>
975	935	.	.
975	938	 	 
975	935	<~>	<~>
975	935	<split-s>	<split-s>
975	935	<split-h>	<split-h>
975	935	<name2>	<name2>
975	955	<aphaerese>	<aphaerese>
975	976	<>	<aphaerese>
975	935	<elision3>	<elision3>
975	976	<>	<elision3>
975	935	<elision2>	<elision2>
975	976	<>	<elision2>
975	935	<elision1>	<elision1>
975	976	<>	<elision1>
975	931	.	υ
975	858	s	υ
975	931	.	u
975	858	s	u
975	931	.	κ
975	972	s	κ
975	867	s	k
975	803	s	U
975	902	s	K
975	931	.	α
975	858	s	α
975	931	.	a
975	858	s	a
975	861	s	A
975	931	.	λ
975	972	s	λ
975	867	s	l
975	912	s	L
975	528	<2s>	<>
976	932	.	.
976	933	 	 
976	932	<~>	<~>
976	932	<split-s>	<split-s>
976	932	<split-h>	<split-h>
976	932	<name2>	<name2>
976	936	<aphaerese>	<aphaerese>
976	974	<>	<aphaerese>
976	932	<elision3>	<elision3>
976	974	<>	<elision3>
976	932	<elision2>	<elision2>
976	974	<>	<elision2>
976	932	<elision1>	<elision1>
976	974	<>	<elision1>
976	929	.	υ
976	856	s	υ
976	929	.	u
976	856	s	u
976	929	.	κ
976	970	s	κ
976	865	s	k
976	801	s	U
976	956	s	K
976	929	.	α
976	856	s	α
976	929	.	a
976	856	s	a
976	859	s	A
976	929	.	λ
976	970	s	λ
976	865	s	l
976	910	s	L
976	526	<2s>	<>
977	960	<name>	<name>
977	978	<>	<name>
977	980	<>	<aphaerese>
977	980	<>	<elision3>
977	980	<>	<elision2>
977	980	<>	<elision1>
977	617	<2s>	<>
977	981	<L2kl>	<>
978	979	<>	<aphaerese>
978	979	<>	<elision3>
978	979	<>	<elision2>
978	979	<>	<elision1>
978	975	<L2kl>	<>
979	980	<>	<aphaerese>
979	980	<>	<elision3>
979	980	<>	<elision2>
979	980	<>	<elision1>
979	976	<L2kl>	<>
980	978	<>	<name>
980	980	<>	<aphaerese>
980	980	<>	<elision3>
980	980	<>	<elision2>
980	980	<>	<elision1>
980	974	<L2kl>	<>
981	932	.	.
981	933	 	 
981	932	<~>	<~>
981	932	<split-s>	<split-s>
981	932	<split-h>	<split-h>
981	932	<name2>	<name2>
981	960	<name2>	<name>
981	975	<>	<name>
981	936	<aphaerese>	<aphaerese>
981	974	<>	<aphaerese>
981	932	<elision3>	<elision3>
981	974	<>	<elision3>
981	932	<elision2>	<elision2>
981	974	<>	<elision2>
981	932	<elision1>	<elision1>
981	974	<>	<elision1>
981	929	.	υ
981	856	s	υ
981	929	.	u
981	856	s	u
981	929	.	κ
981	970	s	κ
981	865	s	k
981	801	s	U
981	956	s	K
981	929	.	α
981	856	s	α
981	929	.	a
981	856	s	a
981	859	s	A
981	929	.	λ
981	970	s	λ
981	865	s	l
981	910	s	L
981	685	<2s>	<>
982	983	<>	<name>
982	982	<>	<aphaerese>
982	982	<>	<elision3>
982	982	<>	<elision2>
982	982	<>	<elision1>
982	985	s	κ
982	1110	s	k
982	1128	s	K
982	985	s	λ
982	1141	s	l
982	1144	s	L
982	455	<1s>	<>
983	984	<>	<aphaerese>
983	984	<>	<elision3>
983	984	<>	<elision2>
983	984	<>	<elision1>
983	1106	s	κ
983	1112	s	k
983	1131	s	K
983	1106	s	λ
983	1143	s	l
983	1146	s	L
983	456	<1s>	<>
984	982	<>	<aphaerese>
984	982	<>	<elision3>
984	982	<>	<elision2>
984	982	<>	<elision1>
984	985	s	κ
984	1110	s	k
984	1128	s	K
984	985	s	λ
984	1141	s	l
984	1144	s	L
984	454	<1s>	<>
985	986	.	.
985	987	 	 
985	986	<~>	<~>
985	986	<split-s>	<split-s>
985	986	<split-h>	<split-h>
985	986	<name2>	<name2>
985	1105	<>	<name>
985	990	<aphaerese>	<aphaerese>
985	985	<>	<aphaerese>
985	985	<>	<elision3>
985	985	<>	<elision2>
985	985	<>	<elision1>
985	994	.	υ
985	997	s	υ
985	994	.	u
985	997	s	u
985	994	.	κ
985	1107	s	κ
985	1036	s	k
985	1039	s	U
985	1091	s	K
985	994	.	α
985	997	s	α
985	994	.	a
985	997	s	a
985	1069	s	A
985	994	.	λ
985	1107	s	λ
985	1036	s	l
985	1098	s	L
985	710	<2s>	<>
986	986	.	.
986	987	 	 
986	986	<~>	<~>
986	986	<split-s>	<split-s>
986	986	<split-h>	<split-h>
986	986	<name2>	<name2>
986	1104	<>	<name>
986	990	<aphaerese>	<aphaerese>
986	986	<>	<aphaerese>
986	986	<elision3>	<elision3>
986	986	<>	<elision3>
986	986	<elision2>	<elision2>
986	986	<>	<elision2>
986	986	<elision1>	<elision1>
986	986	<>	<elision1>
986	994	.	υ
986	997	s	υ
986	994	.	u
986	997	s	u
986	1015	.	κ
986	1030	s	κ
986	1036	s	k
986	1039	s	U
986	1091	s	K
986	994	.	α
986	997	s	α
986	994	.	a
986	997	s	a
986	1069	s	A
986	1036	s	λ
986	1036	s	l
986	1098	s	L
986	435	<2s>	<>
987	986	.	.
987	987	 	 
987	986	<~>	<~>
987	986	<split-s>	<split-s>
987	986	<split-h>	<split-h>
987	986	<name2>	<name2>
987	988	<>	<name>
987	990	<aphaerese>	<aphaerese>
987	993	<>	<aphaerese>
987	986	<elision3>	<elision3>
987	993	<>	<elision3>
987	986	<elision2>	<elision2>
987	993	<>	<elision2>
987	986	<elision1>	<elision1>
987	993	<>	<elision1>
987	994	.	υ
987	1080	s	υ
987	994	.	u
987	1080	s	u
987	1015	.	κ
987	1081	s	κ
987	1082	s	k
987	1083	s	U
987	1085	s	K
987	994	.	α
987	1080	s	α
987	994	.	a
987	1080	s	a
987	1087	s	A
987	1082	s	λ
987	1082	s	l
987	1088	s	L
987	435	<2s>	<>
988	989	.	.
988	992	 	 
988	989	<~>	<~>
988	989	<split-s>	<split-s>
988	989	<split-h>	<split-h>
988	989	<name2>	<name2>
988	1090	<aphaerese>	<aphaerese>
988	1103	<>	<aphaerese>
988	989	<elision3>	<elision3>
988	1103	<>	<elision3>
988	989	<elision2>	<elision2>
988	1103	<>	<elision2>
988	989	<elision1>	<elision1>
988	1103	<>	<elision1>
988	996	.	υ
988	1014	s	υ
988	996	.	u
988	1014	s	u
988	1017	.	κ
988	1032	s	κ
988	1038	s	k
988	1041	s	U
988	1045	s	K
988	996	.	α
988	1014	s	α
988	996	.	a
988	1014	s	a
988	1071	s	A
988	1038	s	λ
988	1038	s	l
988	1074	s	L
988	436	<2s>	<>
989	986	.	.
989	987	 	 
989	986	<~>	<~>
989	986	<split-s>	<split-s>
989	986	<split-h>	<split-h>
989	986	<name2>	<name2>
989	990	<aphaerese>	<aphaerese>
989	986	<>	<aphaerese>
989	986	<elision3>	<elision3>
989	986	<>	<elision3>
989	986	<elision2>	<elision2>
989	986	<>	<elision2>
989	986	<elision1>	<elision1>
989	986	<>	<elision1>
989	994	.	υ
989	997	s	υ
989	994	.	u
989	997	s	u
989	1015	.	κ
989	1030	s	κ
989	1036	s	k
989	1039	s	U
989	1091	s	K
989	994	.	α
989	997	s	α
989	994	.	a
989	997	s	a
989	1069	s	A
989	1036	s	λ
989	1036	s	l
989	1098	s	L
989	434	<2s>	<>
990	986	.	.
990	987	 	 
990	986	<~>	<~>
990	986	<split-s>	<split-s>
990	986	<split-h>	<split-h>
990	986	<name2>	<name2>
990	991	<>	<name>
990	990	<aphaerese>	<aphaerese>
990	990	<>	<aphaerese>
990	986	<elision3>	<elision3>
990	990	<>	<elision3>
990	986	<elision2>	<elision2>
990	990	<>	<elision2>
990	986	<elision1>	<elision1>
990	990	<>	<elision1>
990	986	.	υ
990	986	.	u
990	1015	.	κ
990	1030	s	κ
990	1036	s	k
990	1039	s	U
990	1091	s	K
990	986	.	α
990	986	.	a
990	1069	s	A
990	1036	s	λ
990	1036	s	l
990	1098	s	L
990	429	<2s>	<>
991	989	.	.
991	992	 	 
991	989	<~>	<~>
991	989	<split-s>	<split-s>
991	989	<split-h>	<split-h>
991	989	<name2>	<name2>
991	1090	<aphaerese>	<aphaerese>
991	1090	<>	<aphaerese>
991	989	<elision3>	<elision3>
991	1090	<>	<elision3>
991	989	<elision2>	<elision2>
991	1090	<>	<elision2>
991	989	<elision1>	<elision1>
991	1090	<>	<elision1>
991	989	.	υ
991	989	.	u
991	1017	.	κ
991	1032	s	κ
991	1038	s	k
991	1041	s	U
991	1093	s	K
991	989	.	α
991	989	.	a
991	1071	s	A
991	1038	s	λ
991	1038	s	l
991	1100	s	L
991	430	<2s>	<>
992	986	.	.
992	987	 	 
992	986	<~>	<~>
992	986	<split-s>	<split-s>
992	986	<split-h>	<split-h>
992	986	<name2>	<name2>
992	990	<aphaerese>	<aphaerese>
992	993	<>	<aphaerese>
992	986	<elision3>	<elision3>
992	993	<>	<elision3>
992	986	<elision2>	<elision2>
992	993	<>	<elision2>
992	986	<elision1>	<elision1>
992	993	<>	<elision1>
992	994	.	υ
992	1080	s	υ
992	994	.	u
992	1080	s	u
992	1015	.	κ
992	1081	s	κ
992	1082	s	k
992	1083	s	U
992	1085	s	K
992	994	.	α
992	1080	s	α
992	994	.	a
992	1080	s	a
992	1087	s	A
992	1082	s	λ
992	1082	s	l
992	1088	s	L
992	434	<2s>	<>
993	986	.	.
993	987	 	 
993	986	<~>	<~>
993	986	<split-s>	<split-s>
993	986	<split-h>	<split-h>
993	986	<name2>	<name2>
993	988	<>	<name>
993	990	<aphaerese>	<aphaerese>
993	993	<>	<aphaerese>
993	986	<elision3>	<elision3>
993	993	<>	<elision3>
993	986	<elision2>	<elision2>
993	993	<>	<elision2>
993	986	<elision1>	<elision1>
993	993	<>	<elision1>
993	994	.	υ
993	997	s	υ
993	994	.	u
993	997	s	u
993	1015	.	κ
993	1030	s	κ
993	1036	s	k
993	1039	s	U
993	1042	s	K
993	994	.	α
993	997	s	α
993	994	.	a
993	997	s	a
993	1069	s	A
993	1036	s	λ
993	1036	s	l
993	1072	s	L
993	435	<2s>	<>
994	995	<>	<name>
994	994	<>	<aphaerese>
994	986	<elision3>	<elision3>
994	994	<>	<elision3>
994	986	<elision2>	<elision2>
994	994	<>	<elision2>
994	986	<elision1>	<elision1>
994	994	<>	<elision1>
994	284	<2s>	<>
995	996	<>	<aphaerese>
995	989	<elision3>	<elision3>
995	996	<>	<elision3>
995	989	<elision2>	<elision2>
995	996	<>	<elision2>
995	989	<elision1>	<elision1>
995	996	<>	<elision1>
995	285	<2s>	<>
996	994	<>	<aphaerese>
996	986	<elision3>	<elision3>
996	994	<>	<elision3>
996	986	<elision2>	<elision2>
996	994	<>	<elision2>
996	986	<elision1>	<elision1>
996	994	<>	<elision1>
996	283	<2s>	<>
997	998	.	.
997	998	 	 
997	998	<~>	<~>
997	998	<split-s>	<split-s>
997	998	<split-h>	<split-h>
997	998	<name2>	<name2>
997	1013	<>	<name>
997	1001	<aphaerese>	<aphaerese>
997	997	<>	<aphaerese>
997	997	<>	<elision3>
997	997	<>	<elision2>
997	997	<>	<elision1>
997	1010	.	υ
997	1010	.	u
997	1004	.	κ
997	1010	.	α
997	1010	.	a
997	695	<split-s>	<>
998	998	.	.
998	998	 	 
998	998	<~>	<~>
998	998	<split-s>	<split-s>
998	998	<split-h>	<split-h>
998	998	<name2>	<name2>
998	999	<>	<name>
998	1001	<aphaerese>	<aphaerese>
998	998	<>	<aphaerese>
998	998	<elision3>	<elision3>
998	998	<>	<elision3>
998	998	<elision2>	<elision2>
998	998	<>	<elision2>
998	998	<elision1>	<elision1>
998	998	<>	<elision1>
998	1010	.	υ
998	1010	.	u
998	1004	.	κ
998	1010	.	α
998	1010	.	a
998	641	<split-s>	<>
999	1000	.	.
999	1000	 	 
999	1000	<~>	<~>
999	1000	<split-s>	<split-s>
999	1000	<split-h>	<split-h>
999	1000	<name2>	<name2>
999	1003	<aphaerese>	<aphaerese>
999	1000	<>	<aphaerese>
999	1000	<elision3>	<elision3>
999	1000	<>	<elision3>
999	1000	<elision2>	<elision2>
999	1000	<>	<elision2>
999	1000	<elision1>	<elision1>
999	1000	<>	<elision1>
999	1012	.	υ
999	1012	.	u
999	1006	.	κ
999	1012	.	α
999	1012	.	a
999	642	<split-s>	<>
1000	998	.	.
1000	998	 	 
1000	998	<~>	<~>
1000	998	<split-s>	<split-s>
1000	998	<split-h>	<split-h>
1000	998	<name2>	<name2>
1000	1001	<aphaerese>	<aphaerese>
1000	998	<>	<aphaerese>
1000	998	<elision3>	<elision3>
1000	998	<>	<elision3>
1000	998	<elision2>	<elision2>
1000	998	<>	<elision2>
1000	998	<elision1>	<elision1>
1000	998	<>	<elision1>
1000	1010	.	υ
1000	1010	.	u
1000	1004	.	κ
1000	1010	.	α
1000	1010	.	a
1000	643	<split-s>	<>
1001	998	.	.
1001	998	 	 
1001	998	<~>	<~>
1001	998	<split-s>	<split-s>
1001	998	<split-h>	<split-h>
1001	998	<name2>	<name2>
1001	1002	<>	<name>
1001	1001	<aphaerese>	<aphaerese>
1001	1001	<>	<aphaerese>
1001	998	<elision3>	<elision3>
1001	1001	<>	<elision3>
1001	998	<elision2>	<elision2>
1001	1001	<>	<elision2>
1001	998	<elision1>	<elision1>
1001	1001	<>	<elision1>
1001	998	.	υ
1001	998	.	u
1001	1004	.	κ
1001	998	.	α
1001	998	.	a
1001	688	<split-s>	<>
1002	1000	.	.
1002	1000	 	 
1002	1000	<~>	<~>
1002	1000	<split-s>	<split-s>
1002	1000	<split-h>	<split-h>
1002	1000	<name2>	<name2>
1002	1003	<aphaerese>	<aphaerese>
1002	1003	<>	<aphaerese>
1002	1000	<elision3>	<elision3>
1002	1003	<>	<elision3>
1002	1000	<elision2>	<elision2>
1002	1003	<>	<elision2>
1002	1000	<elision1>	<elision1>
1002	1003	<>	<elision1>
1002	1000	.	υ
1002	1000	.	u
1002	1006	.	κ
1002	1000	.	α
1002	1000	.	a
1002	689	<split-s>	<>
1003	998	.	.
1003	998	 	 
1003	998	<~>	<~>
1003	998	<split-s>	<split-s>
1003	998	<split-h>	<split-h>
1003	998	<name2>	<name2>
1003	1001	<aphaerese>	<aphaerese>
1003	1001	<>	<aphaerese>
1003	998	<elision3>	<elision3>
1003	1001	<>	<elision3>
1003	998	<elision2>	<elision2>
1003	1001	<>	<elision2>
1003	998	<elision1>	<elision1>
1003	1001	<>	<elision1>
1003	998	.	υ
1003	998	.	u
1003	1004	.	κ
1003	998	.	α
1003	998	.	a
1003	687	<split-s>	<>
1004	1005	<>	<name>
1004	1004	<>	<aphaerese>
1004	1007	<elision3>	<elision3>
1004	1004	<>	<elision3>
1004	1007	<elision2>	<elision2>
1004	1004	<>	<elision2>
1004	1007	<elision1>	<elision1>
1004	1004	<>	<elision1>
1004	479	<split-s>	<>
1005	1006	<>	<aphaerese>
1005	1009	<elision3>	<elision3>
1005	1006	<>	<elision3>
1005	1009	<elision2>	<elision2>
1005	1006	<>	<elision2>
1005	1009	<elision1>	<elision1>
1005	1006	<>	<elision1>
1005	480	<split-s>	<>
1006	1004	<>	<aphaerese>
1006	1007	<elision3>	<elision3>
1006	1004	<>	<elision3>
1006	1007	<elision2>	<elision2>
1006	1004	<>	<elision2>
1006	1007	<elision1>	<elision1>
1006	1004	<>	<elision1>
1006	478	<split-s>	<>
1007	1008	<>	<name>
1007	1007	<>	<aphaerese>
1007	1007	<>	<elision3>
1007	1007	<>	<elision2>
1007	1007	<>	<elision1>
1007	476	<split-s>	<>
1008	1009	<>	<aphaerese>
1008	1009	<>	<elision3>
1008	1009	<>	<elision2>
1008	1009	<>	<elision1>
1008	477	<split-s>	<>
1009	1007	<>	<aphaerese>
1009	1007	<>	<elision3>
1009	1007	<>	<elision2>
1009	1007	<>	<elision1>
1009	475	<split-s>	<>
1010	1011	<>	<name>
1010	1010	<>	<aphaerese>
1010	998	<elision3>	<elision3>
1010	1010	<>	<elision3>
1010	998	<elision2>	<elision2>
1010	1010	<>	<elision2>
1010	998	<elision1>	<elision1>
1010	1010	<>	<elision1>
1010	407	<split-s>	<>
1011	1012	<>	<aphaerese>
1011	1000	<elision3>	<elision3>
1011	1012	<>	<elision3>
1011	1000	<elision2>	<elision2>
1011	1012	<>	<elision2>
1011	1000	<elision1>	<elision1>
1011	1012	<>	<elision1>
1011	408	<split-s>	<>
1012	1010	<>	<aphaerese>
1012	998	<elision3>	<elision3>
1012	1010	<>	<elision3>
1012	998	<elision2>	<elision2>
1012	1010	<>	<elision2>
1012	998	<elision1>	<elision1>
1012	1010	<>	<elision1>
1012	406	<split-s>	<>
1013	1000	.	.
1013	1000	 	 
1013	1000	<~>	<~>
1013	1000	<split-s>	<split-s>
1013	1000	<split-h>	<split-h>
1013	1000	<name2>	<name2>
1013	1003	<aphaerese>	<aphaerese>
1013	1014	<>	<aphaerese>
1013	1014	<>	<elision3>
1013	1014	<>	<elision2>
1013	1014	<>	<elision1>
1013	1012	.	υ
1013	1012	.	u
1013	1006	.	κ
1013	1012	.	α
1013	1012	.	a
1013	696	<split-s>	<>
1014	998	.	.
1014	998	 	 
1014	998	<~>	<~>
1014	998	<split-s>	<split-s>
1014	998	<split-h>	<split-h>
1014	998	<name2>	<name2>
1014	1001	<aphaerese>	<aphaerese>
1014	997	<>	<aphaerese>
1014	997	<>	<elision3>
1014	997	<>	<elision2>
1014	997	<>	<elision1>
1014	1010	.	υ
1014	1010	.	u
1014	1004	.	κ
1014	1010	.	α
1014	1010	.	a
1014	694	<split-s>	<>
1015	1016	<>	<name>
1015	1015	<>	<aphaerese>
1015	1018	<elision3>	<elision3>
1015	1015	<>	<elision3>
1015	1018	<elision2>	<elision2>
1015	1015	<>	<elision2>
1015	1018	<elision1>	<elision1>
1015	1015	<>	<elision1>
1015	426	<2s>	<>
1016	1017	<>	<aphaerese>
1016	1020	<elision3>	<elision3>
1016	1017	<>	<elision3>
1016	1020	<elision2>	<elision2>
1016	1017	<>	<elision2>
1016	1020	<elision1>	<elision1>
1016	1017	<>	<elision1>
1016	427	<2s>	<>
1017	1015	<>	<aphaerese>
1017	1018	<elision3>	<elision3>
1017	1015	<>	<elision3>
1017	1018	<elision2>	<elision2>
1017	1015	<>	<elision2>
1017	1018	<elision1>	<elision1>
1017	1015	<>	<elision1>
1017	425	<2s>	<>
1018	1019	<>	<name>
1018	1018	<>	<aphaerese>
1018	1018	<>	<elision3>
1018	1018	<>	<elision2>
1018	1018	<>	<elision1>
1018	1021	s	κ
1018	1021	s	k
1018	1024	s	K
1018	1021	s	λ
1018	1021	s	l
1018	1027	s	L
1018	423	<2s>	<>
1019	1020	<>	<aphaerese>
1019	1020	<>	<elision3>
1019	1020	<>	<elision2>
1019	1020	<>	<elision1>
1019	1023	s	κ
1019	1023	s	k
1019	1026	s	K
1019	1023	s	λ
1019	1023	s	l
1019	1029	s	L
1019	424	<2s>	<>
1020	1018	<>	<aphaerese>
1020	1018	<>	<elision3>
1020	1018	<>	<elision2>
1020	1018	<>	<elision1>
1020	1021	s	κ
1020	1021	s	k
1020	1024	s	K
1020	1021	s	λ
1020	1021	s	l
1020	1027	s	L
1020	422	<2s>	<>
1021	1022	<>	<name>
1021	1021	<>	<aphaerese>
1021	1021	<>	<elision3>
1021	1021	<>	<elision2>
1021	1021	<>	<elision1>
1021	716	<split-s>	<>
1022	1023	<>	<aphaerese>
1022	1023	<>	<elision3>
1022	1023	<>	<elision2>
1022	1023	<>	<elision1>
1022	717	<split-s>	<>
1023	1021	<>	<aphaerese>
1023	1021	<>	<elision3>
1023	1021	<>	<elision2>
1023	1021	<>	<elision1>
1023	715	<split-s>	<>
1024	1025	<>	<name>
1024	1024	<>	<aphaerese>
1024	1024	<>	<elision3>
1024	1024	<>	<elision2>
1024	1024	<>	<elision1>
1024	1021	<K2kl>	<>
1025	1026	<>	<aphaerese>
1025	1026	<>	<elision3>
1025	1026	<>	<elision2>
1025	1026	<>	<elision1>
1025	1022	<K2kl>	<>
1026	1024	<>	<aphaerese>
1026	1024	<>	<elision3>
1026	1024	<>	<elision2>
1026	1024	<>	<elision1>
1026	1023	<K2kl>	<>
1027	1028	<>	<name>
1027	1027	<>	<aphaerese>
1027	1027	<>	<elision3>
1027	1027	<>	<elision2>
1027	1027	<>	<elision1>
1027	1021	<L2kl>	<>
1028	1029	<>	<aphaerese>
1028	1029	<>	<elision3>
1028	1029	<>	<elision2>
1028	1029	<>	<elision1>
1028	1022	<L2kl>	<>
1029	1027	<>	<aphaerese>
1029	1027	<>	<elision3>
1029	1027	<>	<elision2>
1029	1027	<>	<elision1>
1029	1023	<L2kl>	<>
1030	998	.	.
1030	998	 	 
1030	998	<~>	<~>
1030	998	<split-s>	<split-s>
1030	998	<split-h>	<split-h>
1030	998	<name2>	<name2>
1030	1031	<>	<name>
1030	1001	<aphaerese>	<aphaerese>
1030	1030	<>	<aphaerese>
1030	1033	<elision3>	<elision3>
1030	1030	<>	<elision3>
1030	1033	<elision2>	<elision2>
1030	1030	<>	<elision2>
1030	1033	<elision1>	<elision1>
1030	1030	<>	<elision1>
1030	1010	.	υ
1030	1010	.	u
1030	1010	.	κ
1030	1010	.	α
1030	1010	.	a
1030	1010	.	λ
1030	778	<split-s>	<>
1031	1000	.	.
1031	1000	 	 
1031	1000	<~>	<~>
1031	1000	<split-s>	<split-s>
1031	1000	<split-h>	<split-h>
1031	1000	<name2>	<name2>
1031	1003	<aphaerese>	<aphaerese>
1031	1032	<>	<aphaerese>
1031	1035	<elision3>	<elision3>
1031	1032	<>	<elision3>
1031	1035	<elision2>	<elision2>
1031	1032	<>	<elision2>
1031	1035	<elision1>	<elision1>
1031	1032	<>	<elision1>
1031	1012	.	υ
1031	1012	.	u
1031	1012	.	κ
1031	1012	.	α
1031	1012	.	a
1031	1012	.	λ
1031	779	<split-s>	<>
1032	998	.	.
1032	998	 	 
1032	998	<~>	<~>
1032	998	<split-s>	<split-s>
1032	998	<split-h>	<split-h>
1032	998	<name2>	<name2>
1032	1001	<aphaerese>	<aphaerese>
1032	1030	<>	<aphaerese>
1032	1033	<elision3>	<elision3>
1032	1030	<>	<elision3>
1032	1033	<elision2>	<elision2>
1032	1030	<>	<elision2>
1032	1033	<elision1>	<elision1>
1032	1030	<>	<elision1>
1032	1010	.	υ
1032	1010	.	u
1032	1010	.	κ
1032	1010	.	α
1032	1010	.	a
1032	1010	.	λ
1032	777	<split-s>	<>
1033	998	.	.
1033	998	 	 
1033	998	<~>	<~>
1033	998	<split-s>	<split-s>
1033	998	<split-h>	<split-h>
1033	998	<name2>	<name2>
1033	1034	<>	<name>
1033	1001	<aphaerese>	<aphaerese>
1033	1033	<>	<aphaerese>
1033	998	<elision3>	<elision3>
1033	1033	<>	<elision3>
1033	998	<elision2>	<elision2>
1033	1033	<>	<elision2>
1033	998	<elision1>	<elision1>
1033	1033	<>	<elision1>
1033	1010	.	υ
1033	1010	.	u
1033	1004	.	κ
1033	1010	.	α
1033	1010	.	a
1033	775	<split-s>	<>
1034	1000	.	.
1034	1000	 	 
1034	1000	<~>	<~>
1034	1000	<split-s>	<split-s>
1034	1000	<split-h>	<split-h>
1034	1000	<name2>	<name2>
1034	1003	<aphaerese>	<aphaerese>
1034	1035	<>	<aphaerese>
1034	1000	<elision3>	<elision3>
1034	1035	<>	<elision3>
1034	1000	<elision2>	<elision2>
1034	1035	<>	<elision2>
1034	1000	<elision1>	<elision1>
1034	1035	<>	<elision1>
1034	1012	.	υ
1034	1012	.	u
1034	1006	.	κ
1034	1012	.	α
1034	1012	.	a
1034	776	<split-s>	<>
1035	998	.	.
1035	998	 	 
1035	998	<~>	<~>
1035	998	<split-s>	<split-s>
1035	998	<split-h>	<split-h>
1035	998	<name2>	<name2>
1035	1001	<aphaerese>	<aphaerese>
1035	1033	<>	<aphaerese>
1035	998	<elision3>	<elision3>
1035	1033	<>	<elision3>
1035	998	<elision2>	<elision2>
1035	1033	<>	<elision2>
1035	998	<elision1>	<elision1>
1035	1033	<>	<elision1>
1035	1010	.	υ
1035	1010	.	u
1035	1004	.	κ
1035	1010	.	α
1035	1010	.	a
1035	774	<split-s>	<>
1036	998	.	.
1036	998	 	 
1036	998	<~>	<~>
1036	998	<split-s>	<split-s>
1036	998	<split-h>	<split-h>
1036	998	<name2>	<name2>
1036	1037	<>	<name>
1036	1001	<aphaerese>	<aphaerese>
1036	1036	<>	<aphaerese>
1036	998	<elision3>	<elision3>
1036	1036	<>	<elision3>
1036	998	<elision2>	<elision2>
1036	1036	<>	<elision2>
1036	998	<elision1>	<elision1>
1036	1036	<>	<elision1>
1036	1010	.	υ
1036	1010	.	u
1036	1010	.	κ
1036	1010	.	α
1036	1010	.	a
1036	1010	.	λ
1036	799	<split-s>	<>
1037	1000	.	.
1037	1000	 	 
1037	1000	<~>	<~>
1037	1000	<split-s>	<split-s>
1037	1000	<split-h>	<split-h>
1037	1000	<name2>	<name2>
1037	1003	<aphaerese>	<aphaerese>
1037	1038	<>	<aphaerese>
1037	1000	<elision3>	<elision3>
1037	1038	<>	<elision3>
1037	1000	<elision2>	<elision2>
1037	1038	<>	<elision2>
1037	1000	<elision1>	<elision1>
1037	1038	<>	<elision1>
1037	1012	.	υ
1037	1012	.	u
1037	1012	.	κ
1037	1012	.	α
1037	1012	.	a
1037	1012	.	λ
1037	800	<split-s>	<>
1038	998	.	.
1038	998	 	 
1038	998	<~>	<~>
1038	998	<split-s>	<split-s>
1038	998	<split-h>	<split-h>
1038	998	<name2>	<name2>
1038	1001	<aphaerese>	<aphaerese>
1038	1036	<>	<aphaerese>
1038	998	<elision3>	<elision3>
1038	1036	<>	<elision3>
1038	998	<elision2>	<elision2>
1038	1036	<>	<elision2>
1038	998	<elision1>	<elision1>
1038	1036	<>	<elision1>
1038	1010	.	υ
1038	1010	.	u
1038	1010	.	κ
1038	1010	.	α
1038	1010	.	a
1038	1010	.	λ
1038	798	<split-s>	<>
1039	1040	<>	<name>
1039	1039	<>	<aphaerese>
1039	1039	<>	<elision3>
1039	1039	<>	<elision2>
1039	1039	<>	<elision1>
1039	998	<U2kl>	<>
1040	1041	<>	<aphaerese>
1040	1041	<>	<elision3>
1040	1041	<>	<elision2>
1040	1041	<>	<elision1>
1040	999	<U2kl>	<>
1041	1039	<>	<aphaerese>
1041	1039	<>	<elision3>
1041	1039	<>	<elision2>
1041	1039	<>	<elision1>
1041	1000	<U2kl>	<>
1042	1043	<name>	<name>
1042	1044	<>	<name>
1042	1046	<>	<aphaerese>
1042	1046	<>	<elision3>
1042	1046	<>	<elision2>
1042	1046	<>	<elision1>
1042	852	<split-s>	<>
1042	1047	<A2kl>	<>
1042	1056	<L2kl>	<>
1042	1068	<K2kl>	<>
1043	806	<split-s>	<>
1044	1045	<>	<aphaerese>
1044	1045	<>	<elision3>
1044	1045	<>	<elision2>
1044	1045	<>	<elision1>
1044	1048	<A2kl>	<>
1044	1057	<L2kl>	<>
1044	1066	<K2kl>	<>
1045	1046	<>	<aphaerese>
1045	1046	<>	<elision3>
1045	1046	<>	<elision2>
1045	1046	<>	<elision1>
1045	1049	<A2kl>	<>
1045	1058	<L2kl>	<>
1045	1067	<K2kl>	<>
1046	1044	<>	<name>
1046	1046	<>	<aphaerese>
1046	1046	<>	<elision3>
1046	1046	<>	<elision2>
1046	1046	<>	<elision1>
1046	1047	<A2kl>	<>
1046	1056	<L2kl>	<>
1046	1065	<K2kl>	<>
1047	1048	<>	<name>
1047	1047	<>	<aphaerese>
1047	1047	<>	<elision3>
1047	1047	<>	<elision2>
1047	1047	<>	<elision1>
1047	1050	.	κ
1047	1050	.	λ
1047	826	<split-s>	<>
1048	1049	<>	<aphaerese>
1048	1049	<>	<elision3>
1048	1049	<>	<elision2>
1048	1049	<>	<elision1>
1048	1052	.	κ
1048	1052	.	λ
1048	827	<split-s>	<>
1049	1047	<>	<aphaerese>
1049	1047	<>	<elision3>
1049	1047	<>	<elision2>
1049	1047	<>	<elision1>
1049	1050	.	κ
1049	1050	.	λ
1049	825	<split-s>	<>
1050	1051	<>	<name>
1050	1050	<>	<aphaerese>
1050	1053	<elision3>	<elision3>
1050	1050	<>	<elision3>
1050	1053	<elision2>	<elision2>
1050	1050	<>	<elision2>
1050	1053	<elision1>	<elision1>
1050	1050	<>	<elision1>
1050	823	<split-s>	<>
1051	1052	<>	<aphaerese>
1051	1055	<elision3>	<elision3>
1051	1052	<>	<elision3>
1051	1055	<elision2>	<elision2>
1051	1052	<>	<elision2>
1051	1055	<elision1>	<elision1>
1051	1052	<>	<elision1>
1051	824	<split-s>	<>
1052	1050	<>	<aphaerese>
1052	1053	<elision3>	<elision3>
1052	1050	<>	<elision3>
1052	1053	<elision2>	<elision2>
1052	1050	<>	<elision2>
1052	1053	<elision1>	<elision1>
1052	1050	<>	<elision1>
1052	822	<split-s>	<>
1053	998	.	.
1053	998	 	 
1053	998	<~>	<~>
1053	998	<split-s>	<split-s>
1053	998	<split-h>	<split-h>
1053	998	<name2>	<name2>
1053	1054	<>	<name>
1053	1001	<aphaerese>	<aphaerese>
1053	1053	<>	<aphaerese>
1053	998	<elision3>	<elision3>
1053	1053	<>	<elision3>
1053	998	<elision2>	<elision2>
1053	1053	<>	<elision2>
1053	998	<elision1>	<elision1>
1053	1053	<>	<elision1>
1053	1010	.	υ
1053	1010	.	u
1053	1010	.	α
1053	1010	.	a
1053	820	<split-s>	<>
1054	1000	.	.
1054	1000	 	 
1054	1000	<~>	<~>
1054	1000	<split-s>	<split-s>
1054	1000	<split-h>	<split-h>
1054	1000	<name2>	<name2>
1054	1003	<aphaerese>	<aphaerese>
1054	1055	<>	<aphaerese>
1054	1000	<elision3>	<elision3>
1054	1055	<>	<elision3>
1054	1000	<elision2>	<elision2>
1054	1055	<>	<elision2>
1054	1000	<elision1>	<elision1>
1054	1055	<>	<elision1>
1054	1012	.	υ
1054	1012	.	u
1054	1012	.	α
1054	1012	.	a
1054	821	<split-s>	<>
1055	998	.	.
1055	998	 	 
1055	998	<~>	<~>
1055	998	<split-s>	<split-s>
1055	998	<split-h>	<split-h>
1055	998	<name2>	<name2>
1055	1001	<aphaerese>	<aphaerese>
1055	1053	<>	<aphaerese>
1055	998	<elision3>	<elision3>
1055	1053	<>	<elision3>
1055	998	<elision2>	<elision2>
1055	1053	<>	<elision2>
1055	998	<elision1>	<elision1>
1055	1053	<>	<elision1>
1055	1010	.	υ
1055	1010	.	u
1055	1010	.	α
1055	1010	.	a
1055	819	<split-s>	<>
1056	1057	<>	<name>
1056	1056	<>	<aphaerese>
1056	1056	<>	<elision3>
1056	1056	<>	<elision2>
1056	1056	<>	<elision1>
1056	1059	.	κ
1056	1059	.	λ
1056	844	<split-s>	<>
1057	1058	<>	<aphaerese>
1057	1058	<>	<elision3>
1057	1058	<>	<elision2>
1057	1058	<>	<elision1>
1057	1061	.	κ
1057	1061	.	λ
1057	845	<split-s>	<>
1058	1056	<>	<aphaerese>
1058	1056	<>	<elision3>
1058	1056	<>	<elision2>
1058	1056	<>	<elision1>
1058	1059	.	κ
1058	1059	.	λ
1058	843	<split-s>	<>
1059	1060	<>	<name>
1059	1059	<>	<aphaerese>
1059	1062	<elision3>	<elision3>
1059	1059	<>	<elision3>
1059	1062	<elision2>	<elision2>
1059	1059	<>	<elision2>
1059	1062	<elision1>	<elision1>
1059	1059	<>	<elision1>
1059	841	<split-s>	<>
1060	1061	<>	<aphaerese>
1060	1064	<elision3>	<elision3>
1060	1061	<>	<elision3>
1060	1064	<elision2>	<elision2>
1060	1061	<>	<elision2>
1060	1064	<elision1>	<elision1>
1060	1061	<>	<elision1>
1060	842	<split-s>	<>
1061	1059	<>	<aphaerese>
1061	1062	<elision3>	<elision3>
1061	1059	<>	<elision3>
1061	1062	<elision2>	<elision2>
1061	1059	<>	<elision2>
1061	1062	<elision1>	<elision1>
1061	1059	<>	<elision1>
1061	840	<split-s>	<>
1062	1063	<>	<name>
1062	1062	<>	<aphaerese>
1062	1062	<>	<elision3>
1062	1062	<>	<elision2>
1062	1062	<>	<elision1>
1062	1004	.	κ
1062	838	<split-s>	<>
1063	1064	<>	<aphaerese>
1063	1064	<>	<elision3>
1063	1064	<>	<elision2>
1063	1064	<>	<elision1>
1063	1006	.	κ
1063	839	<split-s>	<>
1064	1062	<>	<aphaerese>
1064	1062	<>	<elision3>
1064	1062	<>	<elision2>
1064	1062	<>	<elision1>
1064	1004	.	κ
1064	837	<split-s>	<>
1065	998	.	.
1065	998	 	 
1065	998	<~>	<~>
1065	998	<split-s>	<split-s>
1065	998	<split-h>	<split-h>
1065	998	<name2>	<name2>
1065	1066	<>	<name>
1065	1001	<aphaerese>	<aphaerese>
1065	1065	<>	<aphaerese>
1065	998	<elision3>	<elision3>
1065	1065	<>	<elision3>
1065	998	<elision2>	<elision2>
1065	1065	<>	<elision2>
1065	998	<elision1>	<elision1>
1065	1065	<>	<elision1>
1065	1010	.	υ
1065	1010	.	u
1065	1010	.	α
1065	1010	.	a
1065	850	<split-s>	<>
1066	1000	.	.
1066	1000	 	 
1066	1000	<~>	<~>
1066	1000	<split-s>	<split-s>
1066	1000	<split-h>	<split-h>
1066	1000	<name2>	<name2>
1066	1003	<aphaerese>	<aphaerese>
1066	1067	<>	<aphaerese>
1066	1000	<elision3>	<elision3>
1066	1067	<>	<elision3>
1066	1000	<elision2>	<elision2>
1066	1067	<>	<elision2>
1066	1000	<elision1>	<elision1>
1066	1067	<>	<elision1>
1066	1012	.	υ
1066	1012	.	u
1066	1012	.	α
1066	1012	.	a
1066	851	<split-s>	<>
1067	998	.	.
1067	998	 	 
1067	998	<~>	<~>
1067	998	<split-s>	<split-s>
1067	998	<split-h>	<split-h>
1067	998	<name2>	<name2>
1067	1001	<aphaerese>	<aphaerese>
1067	1065	<>	<aphaerese>
1067	998	<elision3>	<elision3>
1067	1065	<>	<elision3>
1067	998	<elision2>	<elision2>
1067	1065	<>	<elision2>
1067	998	<elision1>	<elision1>
1067	1065	<>	<elision1>
1067	1010	.	υ
1067	1010	.	u
1067	1010	.	α
1067	1010	.	a
1067	849	<split-s>	<>
1068	998	.	.
1068	998	 	 
1068	998	<~>	<~>
1068	998	<split-s>	<split-s>
1068	998	<split-h>	<split-h>
1068	998	<name2>	<name2>
1068	1043	<name2>	<name>
1068	1066	<>	<name>
1068	1001	<aphaerese>	<aphaerese>
1068	1065	<>	<aphaerese>
1068	998	<elision3>	<elision3>
1068	1065	<>	<elision3>
1068	998	<elision2>	<elision2>
1068	1065	<>	<elision2>
1068	998	<elision1>	<elision1>
1068	1065	<>	<elision1>
1068	1010	.	υ
1068	1010	.	u
1068	1010	.	α
1068	1010	.	a
1068	855	<split-s>	<>
1069	1070	<>	<name>
1069	1069	<>	<aphaerese>
1069	1069	<>	<elision3>
1069	1069	<>	<elision2>
1069	1069	<>	<elision1>
1069	998	<A2kl>	<>
1070	1071	<>	<aphaerese>
1070	1071	<>	<elision3>
1070	1071	<>	<elision2>
1070	1071	<>	<elision1>
1070	999	<A2kl>	<>
1071	1069	<>	<aphaerese>
1071	1069	<>	<elision3>
1071	1069	<>	<elision2>
1071	1069	<>	<elision1>
1071	1000	<A2kl>	<>
1072	1043	<name>	<name>
1072	1073	<>	<name>
1072	1075	<>	<aphaerese>
1072	1075	<>	<elision3>
1072	1075	<>	<elision2>
1072	1075	<>	<elision1>
1072	852	<split-s>	<>
1072	1047	<A2kl>	<>
1072	1079	<L2kl>	<>
1073	1074	<>	<aphaerese>
1073	1074	<>	<elision3>
1073	1074	<>	<elision2>
1073	1074	<>	<elision1>
1073	1048	<A2kl>	<>
1073	1077	<L2kl>	<>
1074	1075	<>	<aphaerese>
1074	1075	<>	<elision3>
1074	1075	<>	<elision2>
1074	1075	<>	<elision1>
1074	1049	<A2kl>	<>
1074	1078	<L2kl>	<>
1075	1073	<>	<name>
1075	1075	<>	<aphaerese>
1075	1075	<>	<elision3>
1075	1075	<>	<elision2>
1075	1075	<>	<elision1>
1075	1047	<A2kl>	<>
1075	1076	<L2kl>	<>
1076	998	.	.
1076	998	 	 
1076	998	<~>	<~>
1076	998	<split-s>	<split-s>
1076	998	<split-h>	<split-h>
1076	998	<name2>	<name2>
1076	1077	<>	<name>
1076	1001	<aphaerese>	<aphaerese>
1076	1076	<>	<aphaerese>
1076	998	<elision3>	<elision3>
1076	1076	<>	<elision3>
1076	998	<elision2>	<elision2>
1076	1076	<>	<elision2>
1076	998	<elision1>	<elision1>
1076	1076	<>	<elision1>
1076	1010	.	υ
1076	1010	.	u
1076	1059	.	κ
1076	1010	.	α
1076	1010	.	a
1076	1059	.	λ
1076	876	<split-s>	<>
1077	1000	.	.
1077	1000	 	 
1077	1000	<~>	<~>
1077	1000	<split-s>	<split-s>
1077	1000	<split-h>	<split-h>
1077	1000	<name2>	<name2>
1077	1003	<aphaerese>	<aphaerese>
1077	1078	<>	<aphaerese>
1077	1000	<elision3>	<elision3>
1077	1078	<>	<elision3>
1077	1000	<elision2>	<elision2>
1077	1078	<>	<elision2>
1077	1000	<elision1>	<elision1>
1077	1078	<>	<elision1>
1077	1012	.	υ
1077	1012	.	u
1077	1061	.	κ
1077	1012	.	α
1077	1012	.	a
1077	1061	.	λ
1077	877	<split-s>	<>
1078	998	.	.
1078	998	 	 
1078	998	<~>	<~>
1078	998	<split-s>	<split-s>
1078	998	<split-h>	<split-h>
1078	998	<name2>	<name2>
1078	1001	<aphaerese>	<aphaerese>
1078	1076	<>	<aphaerese>
1078	998	<elision3>	<elision3>
1078	1076	<>	<elision3>
1078	998	<elision2>	<elision2>
1078	1076	<>	<elision2>
1078	998	<elision1>	<elision1>
1078	1076	<>	<elision1>
1078	1010	.	υ
1078	1010	.	u
1078	1059	.	κ
1078	1010	.	α
1078	1010	.	a
1078	1059	.	λ
1078	875	<split-s>	<>
1079	998	.	.
1079	998	 	 
1079	998	<~>	<~>
1079	998	<split-s>	<split-s>
1079	998	<split-h>	<split-h>
1079	998	<name2>	<name2>
1079	1043	<name2>	<name>
1079	1077	<>	<name>
1079	1001	<aphaerese>	<aphaerese>
1079	1076	<>	<aphaerese>
1079	998	<elision3>	<elision3>
1079	1076	<>	<elision3>
1079	998	<elision2>	<elision2>
1079	1076	<>	<elision2>
1079	998	<elision1>	<elision1>
1079	1076	<>	<elision1>
1079	1010	.	υ
1079	1010	.	u
1079	1059	.	κ
1079	1010	.	α
1079	1010	.	a
1079	1059	.	λ
1079	879	<split-s>	<>
1080	998	.	.
1080	998	 	 
1080	998	<~>	<~>
1080	998	<split-s>	<split-s>
1080	998	<split-h>	<split-h>
1080	998	<name2>	<name2>
1080	1013	<>	<name>
1080	1001	<aphaerese>	<aphaerese>
1080	997	<>	<aphaerese>
1080	997	<>	<elision3>
1080	997	<>	<elision2>
1080	997	<>	<elision1>
1080	1010	.	υ
1080	1010	.	u
1080	1004	.	κ
1080	1010	.	α
1080	1010	.	a
1080	881	<split-s>	<>
1081	998	.	.
1081	998	 	 
1081	998	<~>	<~>
1081	998	<split-s>	<split-s>
1081	998	<split-h>	<split-h>
1081	998	<name2>	<name2>
1081	1031	<>	<name>
1081	1001	<aphaerese>	<aphaerese>
1081	1030	<>	<aphaerese>
1081	1033	<elision3>	<elision3>
1081	1030	<>	<elision3>
1081	1033	<elision2>	<elision2>
1081	1030	<>	<elision2>
1081	1033	<elision1>	<elision1>
1081	1030	<>	<elision1>
1081	1010	.	υ
1081	1010	.	u
1081	1010	.	κ
1081	1010	.	α
1081	1010	.	a
1081	1010	.	λ
1081	883	<split-s>	<>
1082	998	.	.
1082	998	 	 
1082	998	<~>	<~>
1082	998	<split-s>	<split-s>
1082	998	<split-h>	<split-h>
1082	998	<name2>	<name2>
1082	1037	<>	<name>
1082	1001	<aphaerese>	<aphaerese>
1082	1036	<>	<aphaerese>
1082	998	<elision3>	<elision3>
1082	1036	<>	<elision3>
1082	998	<elision2>	<elision2>
1082	1036	<>	<elision2>
1082	998	<elision1>	<elision1>
1082	1036	<>	<elision1>
1082	1010	.	υ
1082	1010	.	u
1082	1010	.	κ
1082	1010	.	α
1082	1010	.	a
1082	1010	.	λ
1082	885	<split-s>	<>
1083	1040	<>	<name>
1083	1039	<>	<aphaerese>
1083	1039	<>	<elision3>
1083	1039	<>	<elision2>
1083	1039	<>	<elision1>
1083	1084	<U2kl>	<>
1084	998	.	.
1084	998	 	 
1084	998	<~>	<~>
1084	998	<split-s>	<split-s>
1084	998	<split-h>	<split-h>
1084	998	<name2>	<name2>
1084	999	<>	<name>
1084	1001	<aphaerese>	<aphaerese>
1084	998	<>	<aphaerese>
1084	998	<elision3>	<elision3>
1084	998	<>	<elision3>
1084	998	<elision2>	<elision2>
1084	998	<>	<elision2>
1084	998	<elision1>	<elision1>
1084	998	<>	<elision1>
1084	1010	.	υ
1084	1010	.	u
1084	1004	.	κ
1084	1010	.	α
1084	1010	.	a
1084	888	<split-s>	<>
1085	1043	<name>	<name>
1085	1044	<>	<name>
1085	1046	<>	<aphaerese>
1085	1046	<>	<elision3>
1085	1046	<>	<elision2>
1085	1046	<>	<elision1>
1085	852	<split-s>	<>
1085	1047	<A2kl>	<>
1085	1056	<L2kl>	<>
1085	1086	<K2kl>	<>
1086	998	.	.
1086	998	 	 
1086	998	<~>	<~>
1086	998	<split-s>	<split-s>
1086	998	<split-h>	<split-h>
1086	998	<name2>	<name2>
1086	1043	<name2>	<name>
1086	1066	<>	<name>
1086	1001	<aphaerese>	<aphaerese>
1086	1065	<>	<aphaerese>
1086	998	<elision3>	<elision3>
1086	1065	<>	<elision3>
1086	998	<elision2>	<elision2>
1086	1065	<>	<elision2>
1086	998	<elision1>	<elision1>
1086	1065	<>	<elision1>
1086	1010	.	υ
1086	1010	.	u
1086	1010	.	α
1086	1010	.	a
1086	891	<split-s>	<>
1087	1070	<>	<name>
1087	1069	<>	<aphaerese>
1087	1069	<>	<elision3>
1087	1069	<>	<elision2>
1087	1069	<>	<elision1>
1087	1084	<A2kl>	<>
1088	1043	<name>	<name>
1088	1073	<>	<name>
1088	1075	<>	<aphaerese>
1088	1075	<>	<elision3>
1088	1075	<>	<elision2>
1088	1075	<>	<elision1>
1088	852	<split-s>	<>
1088	1047	<A2kl>	<>
1088	1089	<L2kl>	<>
1089	998	.	.
1089	998	 	 
1089	998	<~>	<~>
1089	998	<split-s>	<split-s>
1089	998	<split-h>	<split-h>
1089	998	<name2>	<name2>
1089	1043	<name2>	<name>
1089	1077	<>	<name>
1089	1001	<aphaerese>	<aphaerese>
1089	1076	<>	<aphaerese>
1089	998	<elision3>	<elision3>
1089	1076	<>	<elision3>
1089	998	<elision2>	<elision2>
1089	1076	<>	<elision2>
1089	998	<elision1>	<elision1>
1089	1076	<>	<elision1>
1089	1010	.	υ
1089	1010	.	u
1089	1059	.	κ
1089	1010	.	α
1089	1010	.	a
1089	1059	.	λ
1089	898	<split-s>	<>
1090	986	.	.
1090	987	 	 
1090	986	<~>	<~>
1090	986	<split-s>	<split-s>
1090	986	<split-h>	<split-h>
1090	986	<name2>	<name2>
1090	990	<aphaerese>	<aphaerese>
1090	990	<>	<aphaerese>
1090	986	<elision3>	<elision3>
1090	990	<>	<elision3>
1090	986	<elision2>	<elision2>
1090	990	<>	<elision2>
1090	986	<elision1>	<elision1>
1090	990	<>	<elision1>
1090	986	.	υ
1090	986	.	u
1090	1015	.	κ
1090	1030	s	κ
1090	1036	s	k
1090	1039	s	U
1090	1091	s	K
1090	986	.	α
1090	986	.	a
1090	1069	s	A
1090	1036	s	λ
1090	1036	s	l
1090	1098	s	L
1090	428	<2s>	<>
1091	1043	<name>	<name>
1091	1092	<>	<name>
1091	1094	<>	<aphaerese>
1091	1094	<>	<elision3>
1091	1094	<>	<elision2>
1091	1094	<>	<elision1>
1091	852	<split-s>	<>
1091	1095	<L2kl>	<>
1091	1068	<K2kl>	<>
1092	1093	<>	<aphaerese>
1092	1093	<>	<elision3>
1092	1093	<>	<elision2>
1092	1093	<>	<elision1>
1092	1096	<L2kl>	<>
1092	1066	<K2kl>	<>
1093	1094	<>	<aphaerese>
1093	1094	<>	<elision3>
1093	1094	<>	<elision2>
1093	1094	<>	<elision1>
1093	1097	<L2kl>	<>
1093	1067	<K2kl>	<>
1094	1092	<>	<name>
1094	1094	<>	<aphaerese>
1094	1094	<>	<elision3>
1094	1094	<>	<elision2>
1094	1094	<>	<elision1>
1094	1095	<L2kl>	<>
1094	1065	<K2kl>	<>
1095	1096	<>	<name>
1095	1095	<>	<aphaerese>
1095	1095	<>	<elision3>
1095	1095	<>	<elision2>
1095	1095	<>	<elision1>
1095	1010	.	κ
1095	1010	.	λ
1095	908	<split-s>	<>
1096	1097	<>	<aphaerese>
1096	1097	<>	<elision3>
1096	1097	<>	<elision2>
1096	1097	<>	<elision1>
1096	1012	.	κ
1096	1012	.	λ
1096	909	<split-s>	<>
1097	1095	<>	<aphaerese>
1097	1095	<>	<elision3>
1097	1095	<>	<elision2>
1097	1095	<>	<elision1>
1097	1010	.	κ
1097	1010	.	λ
1097	907	<split-s>	<>
1098	1043	<name>	<name>
1098	1099	<>	<name>
1098	1101	<>	<aphaerese>
1098	1101	<>	<elision3>
1098	1101	<>	<elision2>
1098	1101	<>	<elision1>
1098	852	<split-s>	<>
1098	1102	<L2kl>	<>
1099	1100	<>	<aphaerese>
1099	1100	<>	<elision3>
1099	1100	<>	<elision2>
1099	1100	<>	<elision1>
1099	1037	<L2kl>	<>
1100	1101	<>	<aphaerese>
1100	1101	<>	<elision3>
1100	1101	<>	<elision2>
1100	1101	<>	<elision1>
1100	1038	<L2kl>	<>
1101	1099	<>	<name>
1101	1101	<>	<aphaerese>
1101	1101	<>	<elision3>
1101	1101	<>	<elision2>
1101	1101	<>	<elision1>
1101	1036	<L2kl>	<>
1102	998	.	.
1102	998	 	 
1102	998	<~>	<~>
1102	998	<split-s>	<split-s>
1102	998	<split-h>	<split-h>
1102	998	<name2>	<name2>
1102	1043	<name2>	<name>
1102	1037	<>	<name>
1102	1001	<aphaerese>	<aphaerese>
1102	1036	<>	<aphaerese>
1102	998	<elision3>	<elision3>
1102	1036	<>	<elision3>
1102	998	<elision2>	<elision2>
1102	1036	<>	<elision2>
1102	998	<elision1>	<elision1>
1102	1036	<>	<elision1>
1102	1010	.	υ
1102	1010	.	u
1102	1010	.	κ
1102	1010	.	α
1102	1010	.	a
1102	1010	.	λ
1102	915	<split-s>	<>
1103	986	.	.
1103	987	 	 
1103	986	<~>	<~>
1103	986	<split-s>	<split-s>
1103	986	<split-h>	<split-h>
1103	986	<name2>	<name2>
1103	990	<aphaerese>	<aphaerese>
1103	993	<>	<aphaerese>
1103	986	<elision3>	<elision3>
1103	993	<>	<elision3>
1103	986	<elision2>	<elision2>
1103	993	<>	<elision2>
1103	986	<elision1>	<elision1>
1103	993	<>	<elision1>
1103	994	.	υ
1103	997	s	υ
1103	994	.	u
1103	997	s	u
1103	1015	.	κ
1103	1030	s	κ
1103	1036	s	k
1103	1039	s	U
1103	1042	s	K
1103	994	.	α
1103	997	s	α
1103	994	.	a
1103	997	s	a
1103	1069	s	A
1103	1036	s	λ
1103	1036	s	l
1103	1072	s	L
1103	434	<2s>	<>
1104	989	.	.
1104	992	 	 
1104	989	<~>	<~>
1104	989	<split-s>	<split-s>
1104	989	<split-h>	<split-h>
1104	989	<name2>	<name2>
1104	1090	<aphaerese>	<aphaerese>
1104	989	<>	<aphaerese>
1104	989	<elision3>	<elision3>
1104	989	<>	<elision3>
1104	989	<elision2>	<elision2>
1104	989	<>	<elision2>
1104	989	<elision1>	<elision1>
1104	989	<>	<elision1>
1104	996	.	υ
1104	1014	s	υ
1104	996	.	u
1104	1014	s	u
1104	1017	.	κ
1104	1032	s	κ
1104	1038	s	k
1104	1041	s	U
1104	1093	s	K
1104	996	.	α
1104	1014	s	α
1104	996	.	a
1104	1014	s	a
1104	1071	s	A
1104	1038	s	λ
1104	1038	s	l
1104	1100	s	L
1104	436	<2s>	<>
1105	989	.	.
1105	992	 	 
1105	989	<~>	<~>
1105	989	<split-s>	<split-s>
1105	989	<split-h>	<split-h>
1105	989	<name2>	<name2>
1105	1090	<aphaerese>	<aphaerese>
1105	1106	<>	<aphaerese>
1105	1106	<>	<elision3>
1105	1106	<>	<elision2>
1105	1106	<>	<elision1>
1105	996	.	υ
1105	1014	s	υ
1105	996	.	u
1105	1014	s	u
1105	996	.	κ
1105	1109	s	κ
1105	1038	s	k
1105	1041	s	U
1105	1093	s	K
1105	996	.	α
1105	1014	s	α
1105	996	.	a
1105	1014	s	a
1105	1071	s	A
1105	996	.	λ
1105	1109	s	λ
1105	1038	s	l
1105	1100	s	L
1105	711	<2s>	<>
1106	986	.	.
1106	987	 	 
1106	986	<~>	<~>
1106	986	<split-s>	<split-s>
1106	986	<split-h>	<split-h>
1106	986	<name2>	<name2>
1106	990	<aphaerese>	<aphaerese>
1106	985	<>	<aphaerese>
1106	985	<>	<elision3>
1106	985	<>	<elision2>
1106	985	<>	<elision1>
1106	994	.	υ
1106	997	s	υ
1106	994	.	u
1106	997	s	u
1106	994	.	κ
1106	1107	s	κ
1106	1036	s	k
1106	1039	s	U
1106	1091	s	K
1106	994	.	α
1106	997	s	α
1106	994	.	a
1106	997	s	a
1106	1069	s	A
1106	994	.	λ
1106	1107	s	λ
1106	1036	s	l
1106	1098	s	L
1106	709	<2s>	<>
1107	998	.	.
1107	998	 	 
1107	998	<~>	<~>
1107	998	<split-s>	<split-s>
1107	998	<split-h>	<split-h>
1107	998	<name2>	<name2>
1107	1108	<>	<name>
1107	1001	<aphaerese>	<aphaerese>
1107	1107	<>	<aphaerese>
1107	1107	<>	<elision3>
1107	1107	<>	<elision2>
1107	1107	<>	<elision1>
1107	1010	.	υ
1107	1010	.	u
1107	1010	.	κ
1107	1010	.	α
1107	1010	.	a
1107	1010	.	λ
1107	924	<split-s>	<>
1108	1000	.	.
1108	1000	 	 
1108	1000	<~>	<~>
1108	1000	<split-s>	<split-s>
1108	1000	<split-h>	<split-h>
1108	1000	<name2>	<name2>
1108	1003	<aphaerese>	<aphaerese>
1108	1109	<>	<aphaerese>
1108	1109	<>	<elision3>
1108	1109	<>	<elision2>
1108	1109	<>	<elision1>
1108	1012	.	υ
1108	1012	.	u
1108	1012	.	κ
1108	1012	.	α
1108	1012	.	a
1108	1012	.	λ
1108	925	<split-s>	<>
1109	998	.	.
1109	998	 	 
1109	998	<~>	<~>
1109	998	<split-s>	<split-s>
1109	998	<split-h>	<split-h>
1109	998	<name2>	<name2>
1109	1001	<aphaerese>	<aphaerese>
1109	1107	<>	<aphaerese>
1109	1107	<>	<elision3>
1109	1107	<>	<elision2>
1109	1107	<>	<elision1>
1109	1010	.	υ
1109	1010	.	u
1109	1010	.	κ
1109	1010	.	α
1109	1010	.	a
1109	1010	.	λ
1109	923	<split-s>	<>
1110	986	.	.
1110	987	 	 
1110	986	<~>	<~>
1110	986	<split-s>	<split-s>
1110	986	<split-h>	<split-h>
1110	986	<name2>	<name2>
1110	1111	<>	<name>
1110	990	<aphaerese>	<aphaerese>
1110	1110	<>	<aphaerese>
1110	986	<elision3>	<elision3>
1110	1110	<>	<elision3>
1110	986	<elision2>	<elision2>
1110	1110	<>	<elision2>
1110	986	<elision1>	<elision1>
1110	1110	<>	<elision1>
1110	994	.	υ
1110	997	s	υ
1110	994	.	u
1110	997	s	u
1110	1113	.	κ
1110	1107	s	κ
1110	1036	s	k
1110	1039	s	U
1110	1091	s	K
1110	994	.	α
1110	997	s	α
1110	994	.	a
1110	997	s	a
1110	1069	s	A
1110	1113	.	λ
1110	1107	s	λ
1110	1036	s	l
1110	1098	s	L
1110	527	<2s>	<>
1111	989	.	.
1111	992	 	 
1111	989	<~>	<~>
1111	989	<split-s>	<split-s>
1111	989	<split-h>	<split-h>
1111	989	<name2>	<name2>
1111	1090	<aphaerese>	<aphaerese>
1111	1112	<>	<aphaerese>
1111	989	<elision3>	<elision3>
1111	1112	<>	<elision3>
1111	989	<elision2>	<elision2>
1111	1112	<>	<elision2>
1111	989	<elision1>	<elision1>
1111	1112	<>	<elision1>
1111	996	.	υ
1111	1014	s	υ
1111	996	.	u
1111	1014	s	u
1111	1115	.	κ
1111	1109	s	κ
1111	1038	s	k
1111	1041	s	U
1111	1093	s	K
1111	996	.	α
1111	1014	s	α
1111	996	.	a
1111	1014	s	a
1111	1071	s	A
1111	1115	.	λ
1111	1109	s	λ
1111	1038	s	l
1111	1100	s	L
1111	528	<2s>	<>
1112	986	.	.
1112	987	 	 
1112	986	<~>	<~>
1112	986	<split-s>	<split-s>
1112	986	<split-h>	<split-h>
1112	986	<name2>	<name2>
1112	990	<aphaerese>	<aphaerese>
1112	1110	<>	<aphaerese>
1112	986	<elision3>	<elision3>
1112	1110	<>	<elision3>
1112	986	<elision2>	<elision2>
1112	1110	<>	<elision2>
1112	986	<elision1>	<elision1>
1112	1110	<>	<elision1>
1112	994	.	υ
1112	997	s	υ
1112	994	.	u
1112	997	s	u
1112	1113	.	κ
1112	1107	s	κ
1112	1036	s	k
1112	1039	s	U
1112	1091	s	K
1112	994	.	α
1112	997	s	α
1112	994	.	a
1112	997	s	a
1112	1069	s	A
1112	1113	.	λ
1112	1107	s	λ
1112	1036	s	l
1112	1098	s	L
1112	526	<2s>	<>
1113	1114	<>	<name>
1113	1113	<>	<aphaerese>
1113	1116	<elision3>	<elision3>
1113	1113	<>	<elision3>
1113	1116	<elision2>	<elision2>
1113	1113	<>	<elision2>
1113	1116	<elision1>	<elision1>
1113	1113	<>	<elision1>
1113	284	<2s>	<>
1114	1115	<>	<aphaerese>
1114	1118	<elision3>	<elision3>
1114	1115	<>	<elision3>
1114	1118	<elision2>	<elision2>
1114	1115	<>	<elision2>
1114	1118	<elision1>	<elision1>
1114	1115	<>	<elision1>
1114	285	<2s>	<>
1115	1113	<>	<aphaerese>
1115	1116	<elision3>	<elision3>
1115	1113	<>	<elision3>
1115	1116	<elision2>	<elision2>
1115	1113	<>	<elision2>
1115	1116	<elision1>	<elision1>
1115	1113	<>	<elision1>
1115	283	<2s>	<>
1116	1116	.	.
1116	1116	 	 
1116	1116	<~>	<~>
1116	1116	<split-s>	<split-s>
1116	1116	<split-h>	<split-h>
1116	1116	<name2>	<name2>
1116	1117	<>	<name>
1116	1119	<aphaerese>	<aphaerese>
1116	1116	<>	<aphaerese>
1116	1116	<elision3>	<elision3>
1116	1116	<>	<elision3>
1116	1116	<elision2>	<elision2>
1116	1116	<>	<elision2>
1116	1116	<elision1>	<elision1>
1116	1116	<>	<elision1>
1116	1113	.	υ
1116	1113	.	u
1116	1122	.	κ
1116	1113	.	α
1116	1113	.	a
1116	435	<2s>	<>
1117	1118	.	.
1117	1118	 	 
1117	1118	<~>	<~>
1117	1118	<split-s>	<split-s>
1117	1118	<split-h>	<split-h>
1117	1118	<name2>	<name2>
1117	1121	<aphaerese>	<aphaerese>
1117	1118	<>	<aphaerese>
1117	1118	<elision3>	<elision3>
1117	1118	<>	<elision3>
1117	1118	<elision2>	<elision2>
1117	1118	<>	<elision2>
1117	1118	<elision1>	<elision1>
1117	1118	<>	<elision1>
1117	1115	.	υ
1117	1115	.	u
1117	1124	.	κ
1117	1115	.	α
1117	1115	.	a
1117	436	<2s>	<>
1118	1116	.	.
1118	1116	 	 
1118	1116	<~>	<~>
1118	1116	<split-s>	<split-s>
1118	1116	<split-h>	<split-h>
1118	1116	<name2>	<name2>
1118	1119	<aphaerese>	<aphaerese>
1118	1116	<>	<aphaerese>
1118	1116	<elision3>	<elision3>
1118	1116	<>	<elision3>
1118	1116	<elision2>	<elision2>
1118	1116	<>	<elision2>
1118	1116	<elision1>	<elision1>
1118	1116	<>	<elision1>
1118	1113	.	υ
1118	1113	.	u
1118	1122	.	κ
1118	1113	.	α
1118	1113	.	a
1118	434	<2s>	<>
1119	1116	.	.
1119	1116	 	 
1119	1116	<~>	<~>
1119	1116	<split-s>	<split-s>
1119	1116	<split-h>	<split-h>
1119	1116	<name2>	<name2>
1119	1120	<>	<name>
1119	1119	<aphaerese>	<aphaerese>
1119	1119	<>	<aphaerese>
1119	1116	<elision3>	<elision3>
1119	1119	<>	<elision3>
1119	1116	<elision2>	<elision2>
1119	1119	<>	<elision2>
1119	1116	<elision1>	<elision1>
1119	1119	<>	<elision1>
1119	1116	.	υ
1119	1116	.	u
1119	1122	.	κ
1119	1116	.	α
1119	1116	.	a
1119	429	<2s>	<>
1120	1118	.	.
1120	1118	 	 
1120	1118	<~>	<~>
1120	1118	<split-s>	<split-s>
1120	1118	<split-h>	<split-h>
1120	1118	<name2>	<name2>
1120	1121	<aphaerese>	<aphaerese>
1120	1121	<>	<aphaerese>
1120	1118	<elision3>	<elision3>
1120	1121	<>	<elision3>
1120	1118	<elision2>	<elision2>
1120	1121	<>	<elision2>
1120	1118	<elision1>	<elision1>
1120	1121	<>	<elision1>
1120	1118	.	υ
1120	1118	.	u
1120	1124	.	κ
1120	1118	.	α
1120	1118	.	a
1120	430	<2s>	<>
1121	1116	.	.
1121	1116	 	 
1121	1116	<~>	<~>
1121	1116	<split-s>	<split-s>
1121	1116	<split-h>	<split-h>
1121	1116	<name2>	<name2>
1121	1119	<aphaerese>	<aphaerese>
1121	1119	<>	<aphaerese>
1121	1116	<elision3>	<elision3>
1121	1119	<>	<elision3>
1121	1116	<elision2>	<elision2>
1121	1119	<>	<elision2>
1121	1116	<elision1>	<elision1>
1121	1119	<>	<elision1>
1121	1116	.	υ
1121	1116	.	u
1121	1122	.	κ
1121	1116	.	α
1121	1116	.	a
1121	428	<2s>	<>
1122	1123	<>	<name>
1122	1122	<>	<aphaerese>
1122	1125	<elision3>	<elision3>
1122	1122	<>	<elision3>
1122	1125	<elision2>	<elision2>
1122	1122	<>	<elision2>
1122	1125	<elision1>	<elision1>
1122	1122	<>	<elision1>
1122	426	<2s>	<>
1123	1124	<>	<aphaerese>
1123	1127	<elision3>	<elision3>
1123	1124	<>	<elision3>
1123	1127	<elision2>	<elision2>
1123	1124	<>	<elision2>
1123	1127	<elision1>	<elision1>
1123	1124	<>	<elision1>
1123	427	<2s>	<>
1124	1122	<>	<aphaerese>
1124	1125	<elision3>	<elision3>
1124	1122	<>	<elision3>
1124	1125	<elision2>	<elision2>
1124	1122	<>	<elision2>
1124	1125	<elision1>	<elision1>
1124	1122	<>	<elision1>
1124	425	<2s>	<>
1125	1126	<>	<name>
1125	1125	<>	<aphaerese>
1125	1125	<>	<elision3>
1125	1125	<>	<elision2>
1125	1125	<>	<elision1>
1125	423	<2s>	<>
1126	1127	<>	<aphaerese>
1126	1127	<>	<elision3>
1126	1127	<>	<elision2>
1126	1127	<>	<elision1>
1126	424	<2s>	<>
1127	1125	<>	<aphaerese>
1127	1125	<>	<elision3>
1127	1125	<>	<elision2>
1127	1125	<>	<elision1>
1127	422	<2s>	<>
1128	1129	<name>	<name>
1128	1130	<>	<name>
1128	1132	<>	<aphaerese>
1128	1132	<>	<elision3>
1128	1132	<>	<elision2>
1128	1132	<>	<elision1>
1128	617	<2s>	<>
1128	1133	<L2kl>	<>
1128	1139	<K2kl>	<>
1129	1093	s	k
1129	1100	s	l
1129	537	<2s>	<>
1130	1131	<>	<aphaerese>
1130	1131	<>	<elision3>
1130	1131	<>	<elision2>
1130	1131	<>	<elision1>
1130	1134	<L2kl>	<>
1130	1137	<K2kl>	<>
1131	1132	<>	<aphaerese>
1131	1132	<>	<elision3>
1131	1132	<>	<elision2>
1131	1132	<>	<elision1>
1131	1135	<L2kl>	<>
1131	1138	<K2kl>	<>
1132	1130	<>	<name>
1132	1132	<>	<aphaerese>
1132	1132	<>	<elision3>
1132	1132	<>	<elision2>
1132	1132	<>	<elision1>
1132	1133	<L2kl>	<>
1132	1136	<K2kl>	<>
1133	1134	<>	<name>
1133	1133	<>	<aphaerese>
1133	1133	<>	<elision3>
1133	1133	<>	<elision2>
1133	1133	<>	<elision1>
1133	1113	.	κ
1133	1113	.	λ
1133	675	<2s>	<>
1134	1135	<>	<aphaerese>
1134	1135	<>	<elision3>
1134	1135	<>	<elision2>
1134	1135	<>	<elision1>
1134	1115	.	κ
1134	1115	.	λ
1134	676	<2s>	<>
1135	1133	<>	<aphaerese>
1135	1133	<>	<elision3>
1135	1133	<>	<elision2>
1135	1133	<>	<elision1>
1135	1113	.	κ
1135	1113	.	λ
1135	674	<2s>	<>
1136	1116	.	.
1136	1116	 	 
1136	1116	<~>	<~>
1136	1116	<split-s>	<split-s>
1136	1116	<split-h>	<split-h>
1136	1116	<name2>	<name2>
1136	1137	<>	<name>
1136	1119	<aphaerese>	<aphaerese>
1136	1136	<>	<aphaerese>
1136	1116	<elision3>	<elision3>
1136	1136	<>	<elision3>
1136	1116	<elision2>	<elision2>
1136	1136	<>	<elision2>
1136	1116	<elision1>	<elision1>
1136	1136	<>	<elision1>
1136	1113	.	υ
1136	1113	.	u
1136	1113	.	α
1136	1113	.	a
1136	612	<2s>	<>
1137	1118	.	.
1137	1118	 	 
1137	1118	<~>	<~>
1137	1118	<split-s>	<split-s>
1137	1118	<split-h>	<split-h>
1137	1118	<name2>	<name2>
1137	1121	<aphaerese>	<aphaerese>
1137	1138	<>	<aphaerese>
1137	1118	<elision3>	<elision3>
1137	1138	<>	<elision3>
1137	1118	<elision2>	<elision2>
1137	1138	<>	<elision2>
1137	1118	<elision1>	<elision1>
1137	1138	<>	<elision1>
1137	1115	.	υ
1137	1115	.	u
1137	1115	.	α
1137	1115	.	a
1137	613	<2s>	<>
1138	1116	.	.
1138	1116	 	 
1138	1116	<~>	<~>
1138	1116	<split-s>	<split-s>
1138	1116	<split-h>	<split-h>
1138	1116	<name2>	<name2>
1138	1119	<aphaerese>	<aphaerese>
1138	1136	<>	<aphaerese>
1138	1116	<elision3>	<elision3>
1138	1136	<>	<elision3>
1138	1116	<elision2>	<elision2>
1138	1136	<>	<elision2>
1138	1116	<elision1>	<elision1>
1138	1136	<>	<elision1>
1138	1113	.	υ
1138	1113	.	u
1138	1113	.	α
1138	1113	.	a
1138	611	<2s>	<>
1139	1116	.	.
1139	1116	 	 
1139	1116	<~>	<~>
1139	1116	<split-s>	<split-s>
1139	1116	<split-h>	<split-h>
1139	1116	<name2>	<name2>
1139	1140	<name2>	<name>
1139	1137	<>	<name>
1139	1119	<aphaerese>	<aphaerese>
1139	1136	<>	<aphaerese>
1139	1116	<elision3>	<elision3>
1139	1136	<>	<elision3>
1139	1116	<elision2>	<elision2>
1139	1136	<>	<elision2>
1139	1116	<elision1>	<elision1>
1139	1136	<>	<elision1>
1139	1113	.	υ
1139	1113	.	u
1139	1113	.	α
1139	1113	.	a
1139	620	<2s>	<>
1140	537	<2s>	<>
1141	1116	.	.
1141	1116	 	 
1141	1116	<~>	<~>
1141	1116	<split-s>	<split-s>
1141	1116	<split-h>	<split-h>
1141	1116	<name2>	<name2>
1141	1142	<>	<name>
1141	1119	<aphaerese>	<aphaerese>
1141	1141	<>	<aphaerese>
1141	1116	<elision3>	<elision3>
1141	1141	<>	<elision3>
1141	1116	<elision2>	<elision2>
1141	1141	<>	<elision2>
1141	1116	<elision1>	<elision1>
1141	1141	<>	<elision1>
1141	1113	.	υ
1141	1113	.	u
1141	1113	.	κ
1141	1113	.	α
1141	1113	.	a
1141	1113	.	λ
1141	527	<2s>	<>
1142	1118	.	.
1142	1118	 	 
1142	1118	<~>	<~>
1142	1118	<split-s>	<split-s>
1142	1118	<split-h>	<split-h>
1142	1118	<name2>	<name2>
1142	1121	<aphaerese>	<aphaerese>
1142	1143	<>	<aphaerese>
1142	1118	<elision3>	<elision3>
1142	1143	<>	<elision3>
1142	1118	<elision2>	<elision2>
1142	1143	<>	<elision2>
1142	1118	<elision1>	<elision1>
1142	1143	<>	<elision1>
1142	1115	.	υ
1142	1115	.	u
1142	1115	.	κ
1142	1115	.	α
1142	1115	.	a
1142	1115	.	λ
1142	528	<2s>	<>
1143	1116	.	.
1143	1116	 	 
1143	1116	<~>	<~>
1143	1116	<split-s>	<split-s>
1143	1116	<split-h>	<split-h>
1143	1116	<name2>	<name2>
1143	1119	<aphaerese>	<aphaerese>
1143	1141	<>	<aphaerese>
1143	1116	<elision3>	<elision3>
1143	1141	<>	<elision3>
1143	1116	<elision2>	<elision2>
1143	1141	<>	<elision2>
1143	1116	<elision1>	<elision1>
1143	1141	<>	<elision1>
1143	1113	.	υ
1143	1113	.	u
1143	1113	.	κ
1143	1113	.	α
1143	1113	.	a
1143	1113	.	λ
1143	526	<2s>	<>
1144	1140	<name>	<name>
1144	1145	<>	<name>
1144	1147	<>	<aphaerese>
1144	1147	<>	<elision3>
1144	1147	<>	<elision2>
1144	1147	<>	<elision1>
1144	617	<2s>	<>
1144	1148	<L2kl>	<>
1145	1146	<>	<aphaerese>
1145	1146	<>	<elision3>
1145	1146	<>	<elision2>
1145	1146	<>	<elision1>
1145	1142	<L2kl>	<>
1146	1147	<>	<aphaerese>
1146	1147	<>	<elision3>
1146	1147	<>	<elision2>
1146	1147	<>	<elision1>
1146	1143	<L2kl>	<>
1147	1145	<>	<name>
1147	1147	<>	<aphaerese>
1147	1147	<>	<elision3>
1147	1147	<>	<elision2>
1147	1147	<>	<elision1>
1147	1141	<L2kl>	<>
1148	1116	.	.
1148	1116	 	 
1148	1116	<~>	<~>
1148	1116	<split-s>	<split-s>
1148	1116	<split-h>	<split-h>
1148	1116	<name2>	<name2>
1148	1140	<name2>	<name>
1148	1142	<>	<name>
1148	1119	<aphaerese>	<aphaerese>
1148	1141	<>	<aphaerese>
1148	1116	<elision3>	<elision3>
1148	1141	<>	<elision3>
1148	1116	<elision2>	<elision2>
1148	1141	<>	<elision2>
1148	1116	<elision1>	<elision1>
1148	1141	<>	<elision1>
1148	1113	.	υ
1148	1113	.	u
1148	1113	.	κ
1148	1113	.	α
1148	1113	.	a
1148	1113	.	λ
1148	685	<2s>	<>
1149	983	<>	<name>
1149	982	<>	<aphaerese>
1149	982	<>	<elision3>
1149	982	<>	<elision2>
1149	982	<>	<elision1>
1149	985	s	κ
1149	1110	s	k
1149	1128	s	K
1149	985	s	λ
1149	1141	s	l
1149	1144	s	L
1149	1150	<1s>	<>
1150	456	<>	<name>
1150	455	<>	<aphaerese>
1150	455	<>	<elision3>
1150	455	<>	<elision2>
1150	455	<>	<elision1>
1150	1151	<K>	<>
1151	457	<>	<name>
1151	459	<>	<aphaerese>
1151	459	<>	<elision3>
1151	459	<>	<elision2>
1151	459	<>	<elision1>
1152	1153	<>	<name>
1152	1155	<>	<aphaerese>
1152	1155	<>	<elision3>
1152	1155	<>	<elision2>
1152	1155	<>	<elision1>
1152	268	<k2K>	<>
1152	1149	<k2L>	<>
1153	1154	<>	<aphaerese>
1153	1154	<>	<elision3>
1153	1154	<>	<elision2>
1153	1154	<>	<elision1>
1153	269	<k2K>	<>
1153	983	<k2L>	<>
1154	1155	<>	<aphaerese>
1154	1155	<>	<elision3>
1154	1155	<>	<elision2>
1154	1155	<>	<elision1>
1154	270	<k2K>	<>
1154	984	<k2L>	<>
1155	1153	<>	<name>
1155	1155	<>	<aphaerese>
1155	1155	<>	<elision3>
1155	1155	<>	<elision2>
1155	1155	<>	<elision1>
1155	268	<k2K>	<>
1155	982	<k2L>	<>
1156	1157	<>	<name>
1156	1159	<>	<aphaerese>
1156	1159	<>	<elision3>
1156	1159	<>	<elision2>
1156	1159	<>	<elision1>
1156	271	s	κ
1156	926	s	k
1156	959	s	K
1156	271	s	λ
1156	974	s	l
1156	977	s	L
1156	1149	<K2L>	<>
1157	1158	<>	<aphaerese>
1157	1158	<>	<elision3>
1157	1158	<>	<elision2>
1157	1158	<>	<elision1>
1157	919	s	κ
1157	928	s	k
1157	962	s	K
1157	919	s	λ
1157	976	s	l
1157	979	s	L
1157	983	<K2L>	<>
1158	1159	<>	<aphaerese>
1158	1159	<>	<elision3>
1158	1159	<>	<elision2>
1158	1159	<>	<elision1>
1158	271	s	κ
1158	926	s	k
1158	959	s	K
1158	271	s	λ
1158	974	s	l
1158	977	s	L
1158	984	<K2L>	<>
1159	1157	<>	<name>
1159	1159	<>	<aphaerese>
1159	1159	<>	<elision3>
1159	1159	<>	<elision2>
1159	1159	<>	<elision1>
1159	271	s	κ
1159	926	s	k
1159	959	s	K
1159	271	s	λ
1159	974	s	l
1159	977	s	L
1159	982	<K2L>	<>
1160	1161	<>	<name>
1160	1160	<>	<aphaerese>
1160	1160	<>	<elision3>
1160	1160	<>	<elision2>
1160	1160	<>	<elision1>
1160	982	<lambda2L>	<>
1161	1162	<>	<aphaerese>
1161	1162	<>	<elision3>
1161	1162	<>	<elision2>
1161	1162	<>	<elision1>
1161	983	<lambda2L>	<>
1162	1160	<>	<aphaerese>
1162	1160	<>	<elision3>
1162	1160	<>	<elision2>
1162	1160	<>	<elision1>
1162	984	<lambda2L>	<>
1163	1164	<>	<name>
1163	1163	<>	<aphaerese>
1163	1163	<>	<elision3>
1163	1163	<>	<elision2>
1163	1163	<>	<elision1>
1163	982	<l2L>	<>
1164	1165	<>	<aphaerese>
1164	1165	<>	<elision3>
1164	1165	<>	<elision2>
1164	1165	<>	<elision1>
1164	983	<l2L>	<>
1165	1163	<>	<aphaerese>
1165	1163	<>	<elision3>
1165	1163	<>	<elision2>
1165	1163	<>	<elision1>
1165	984	<l2L>	<>
1166	267	<>	<aphaerese>
1166	267	<>	<elision3>
1166	267	<>	<elision2>
1166	267	<>	<elision1>
1166	270	<kappa2K>	<>
1166	1167	<kappa2L>	<>
1167	982	<>	<aphaerese>
1167	982	<>	<elision3>
1167	982	<>	<elision2>
1167	982	<>	<elision1>
1167	985	s	κ
1167	1110	s	k
1167	1128	s	K
1167	985	s	λ
1167	1141	s	l
1167	1144	s	L
1167	1168	<1s>	<>
1168	455	<>	<aphaerese>
1168	455	<>	<elision3>
1168	455	<>	<elision2>
1168	455	<>	<elision1>
1168	1169	<K>	<>
1169	459	<>	<aphaerese>
1169	459	<>	<elision3>
1169	459	<>	<elision2>
1169	459	<>	<elision1>
1170	1155	<>	<aphaerese>
1170	1155	<>	<elision3>
1170	1155	<>	<elision2>
1170	1155	<>	<elision1>
1170	270	<k2K>	<>
1170	1167	<k2L>	<>
1171	1159	<>	<aphaerese>
1171	1159	<>	<elision3>
1171	1159	<>	<elision2>
1171	1159	<>	<elision1>
1171	271	s	κ
1171	926	s	k
1171	959	s	K
1171	271	s	λ
1171	974	s	l
1171	977	s	L
1171	1167	<K2L>	<>
1172	1173	<>	<name>
1172	1175	<>	<aphaerese>
1172	1175	<>	<elision3>
1172	1175	<>	<elision2>
1172	1175	<>	<elision1>
1172	1176	<kappa2K>	<>
1172	1497	<kappa2L>	<>
1172	1494	<lambda2L>	<>
1173	1174	<>	<aphaerese>
1173	1174	<>	<elision3>
1173	1174	<>	<elision2>
1173	1174	<>	<elision1>
1173	1312	<kappa2K>	<>
1173	1458	<kappa2L>	<>
1173	1495	<lambda2L>	<>
1174	1175	<>	<aphaerese>
1174	1175	<>	<elision3>
1174	1175	<>	<elision2>
1174	1175	<>	<elision1>
1174	1313	<kappa2K>	<>
1174	1459	<kappa2L>	<>
1174	1496	<lambda2L>	<>
1175	1173	<>	<name>
1175	1175	<>	<aphaerese>
1175	1175	<>	<elision3>
1175	1175	<>	<elision2>
1175	1175	<>	<elision1>
1175	1176	<kappa2K>	<>
1175	1342	<kappa2L>	<>
1175	1494	<lambda2L>	<>
1176	1177	.	.
1176	1178	 	 
1176	1177	<~>	<~>
1176	1177	<split-s>	<split-s>
1176	1177	<split-h>	<split-h>
1176	1177	<name2>	<name2>
1176	1312	<>	<name>
1176	1181	<aphaerese>	<aphaerese>
1176	1176	<>	<aphaerese>
1176	1314	<elision3>	<elision3>
1176	1176	<>	<elision3>
1176	1314	<elision2>	<elision2>
1176	1176	<>	<elision2>
1176	1314	<elision1>	<elision1>
1176	1176	<>	<elision1>
1176	1185	.	υ
1176	1188	s	υ
1176	1185	.	u
1176	1188	s	u
1176	271	s	κ
1176	926	s	k
1176	1251	s	U
1176	959	s	K
1176	1185	.	α
1176	1279	s	α
1176	1185	.	a
1176	1279	s	a
1176	1282	s	A
1176	271	s	λ
1176	974	s	l
1176	977	s	L
1177	1177	.	.
1177	1178	 	 
1177	1177	<~>	<~>
1177	1177	<split-s>	<split-s>
1177	1177	<split-h>	<split-h>
1177	1177	<name2>	<name2>
1177	1311	<>	<name>
1177	1181	<aphaerese>	<aphaerese>
1177	1177	<>	<aphaerese>
1177	1177	<elision3>	<elision3>
1177	1177	<>	<elision3>
1177	1177	<elision2>	<elision2>
1177	1177	<>	<elision2>
1177	1177	<elision1>	<elision1>
1177	1177	<>	<elision1>
1177	1185	.	υ
1177	1188	s	υ
1177	1185	.	u
1177	1188	s	u
1177	1191	.	κ
1177	1209	s	κ
1177	926	s	k
1177	1251	s	U
1177	959	s	K
1177	1185	.	α
1177	1279	s	α
1177	1185	.	a
1177	1279	s	a
1177	1282	s	A
1177	1285	s	λ
1177	974	s	l
1177	977	s	L
1178	1177	.	.
1178	1178	 	 
1178	1177	<~>	<~>
1178	1177	<split-s>	<split-s>
1178	1177	<split-h>	<split-h>
1178	1177	<name2>	<name2>
1178	1179	<>	<name>
1178	1181	<aphaerese>	<aphaerese>
1178	1184	<>	<aphaerese>
1178	1177	<elision3>	<elision3>
1178	1184	<>	<elision3>
1178	1177	<elision2>	<elision2>
1178	1184	<>	<elision2>
1178	1177	<elision1>	<elision1>
1178	1184	<>	<elision1>
1178	1185	.	υ
1178	1296	s	υ
1178	1185	.	u
1178	1296	s	u
1178	1191	.	κ
1178	1297	s	κ
1178	1298	s	k
1178	1299	s	U
1178	1301	s	K
1178	1185	.	α
1178	1303	s	α
1178	1185	.	a
1178	1303	s	a
1178	1304	s	A
1178	1305	s	λ
1178	1306	s	l
1178	1307	s	L
1179	1180	.	.
1179	1183	 	 
1179	1180	<~>	<~>
1179	1180	<split-s>	<split-s>
1179	1180	<split-h>	<split-h>
1179	1180	<name2>	<name2>
1179	1309	<aphaerese>	<aphaerese>
1179	1310	<>	<aphaerese>
1179	1180	<elision3>	<elision3>
1179	1310	<>	<elision3>
1179	1180	<elision2>	<elision2>
1179	1310	<>	<elision2>
1179	1180	<elision1>	<elision1>
1179	1310	<>	<elision1>
1179	1187	.	υ
1179	1190	s	υ
1179	1187	.	u
1179	1190	s	u
1179	1193	.	κ
1179	1211	s	κ
1179	928	s	k
1179	1253	s	U
1179	1256	s	K
1179	1187	.	α
1179	1281	s	α
1179	1187	.	a
1179	1281	s	a
1179	1284	s	A
1179	1287	s	λ
1179	976	s	l
1179	1290	s	L
1180	1177	.	.
1180	1178	 	 
1180	1177	<~>	<~>
1180	1177	<split-s>	<split-s>
1180	1177	<split-h>	<split-h>
1180	1177	<name2>	<name2>
1180	1181	<aphaerese>	<aphaerese>
1180	1177	<>	<aphaerese>
1180	1177	<elision3>	<elision3>
1180	1177	<>	<elision3>
1180	1177	<elision2>	<elision2>
1180	1177	<>	<elision2>
1180	1177	<elision1>	<elision1>
1180	1177	<>	<elision1>
1180	1185	.	υ
1180	1188	s	υ
1180	1185	.	u
1180	1188	s	u
1180	1191	.	κ
1180	1209	s	κ
1180	926	s	k
1180	1251	s	U
1180	959	s	K
1180	1185	.	α
1180	1279	s	α
1180	1185	.	a
1180	1279	s	a
1180	1282	s	A
1180	1285	s	λ
1180	974	s	l
1180	977	s	L
1181	1177	.	.
1181	1178	 	 
1181	1177	<~>	<~>
1181	1177	<split-s>	<split-s>
1181	1177	<split-h>	<split-h>
1181	1177	<name2>	<name2>
1181	1182	<>	<name>
1181	1181	<aphaerese>	<aphaerese>
1181	1181	<>	<aphaerese>
1181	1177	<elision3>	<elision3>
1181	1181	<>	<elision3>
1181	1177	<elision2>	<elision2>
1181	1181	<>	<elision2>
1181	1177	<elision1>	<elision1>
1181	1181	<>	<elision1>
1181	1177	.	υ
1181	1177	.	u
1181	1191	.	κ
1181	1209	s	κ
1181	926	s	k
1181	1251	s	U
1181	959	s	K
1181	1177	.	α
1181	1177	.	a
1181	1282	s	A
1181	1285	s	λ
1181	974	s	l
1181	977	s	L
1182	1180	.	.
1182	1183	 	 
1182	1180	<~>	<~>
1182	1180	<split-s>	<split-s>
1182	1180	<split-h>	<split-h>
1182	1180	<name2>	<name2>
1182	1309	<aphaerese>	<aphaerese>
1182	1309	<>	<aphaerese>
1182	1180	<elision3>	<elision3>
1182	1309	<>	<elision3>
1182	1180	<elision2>	<elision2>
1182	1309	<>	<elision2>
1182	1180	<elision1>	<elision1>
1182	1309	<>	<elision1>
1182	1180	.	υ
1182	1180	.	u
1182	1193	.	κ
1182	1211	s	κ
1182	928	s	k
1182	1253	s	U
1182	962	s	K
1182	1180	.	α
1182	1180	.	a
1182	1284	s	A
1182	1287	s	λ
1182	976	s	l
1182	979	s	L
1183	1177	.	.
1183	1178	 	 
1183	1177	<~>	<~>
1183	1177	<split-s>	<split-s>
1183	1177	<split-h>	<split-h>
1183	1177	<name2>	<name2>
1183	1181	<aphaerese>	<aphaerese>
1183	1184	<>	<aphaerese>
1183	1177	<elision3>	<elision3>
1183	1184	<>	<elision3>
1183	1177	<elision2>	<elision2>
1183	1184	<>	<elision2>
1183	1177	<elision1>	<elision1>
1183	1184	<>	<elision1>
1183	1185	.	υ
1183	1296	s	υ
1183	1185	.	u
1183	1296	s	u
1183	1191	.	κ
1183	1297	s	κ
1183	1298	s	k
1183	1299	s	U
1183	1301	s	K
1183	1185	.	α
1183	1303	s	α
1183	1185	.	a
1183	1303	s	a
1183	1304	s	A
1183	1305	s	λ
1183	1306	s	l
1183	1307	s	L
1184	1177	.	.
1184	1178	 	 
1184	1177	<~>	<~>
1184	1177	<split-s>	<split-s>
1184	1177	<split-h>	<split-h>
1184	1177	<name2>	<name2>
1184	1179	<>	<name>
1184	1181	<aphaerese>	<aphaerese>
1184	1184	<>	<aphaerese>
1184	1177	<elision3>	<elision3>
1184	1184	<>	<elision3>
1184	1177	<elision2>	<elision2>
1184	1184	<>	<elision2>
1184	1177	<elision1>	<elision1>
1184	1184	<>	<elision1>
1184	1185	.	υ
1184	1188	s	υ
1184	1185	.	u
1184	1188	s	u
1184	1191	.	κ
1184	1209	s	κ
1184	926	s	k
1184	1251	s	U
1184	1254	s	K
1184	1185	.	α
1184	1279	s	α
1184	1185	.	a
1184	1279	s	a
1184	1282	s	A
1184	1285	s	λ
1184	974	s	l
1184	1288	s	L
1185	1186	<>	<name>
1185	1185	<>	<aphaerese>
1185	1177	<elision3>	<elision3>
1185	1185	<>	<elision3>
1185	1177	<elision2>	<elision2>
1185	1185	<>	<elision2>
1185	1177	<elision1>	<elision1>
1185	1185	<>	<elision1>
1186	1187	<>	<aphaerese>
1186	1180	<elision3>	<elision3>
1186	1187	<>	<elision3>
1186	1180	<elision2>	<elision2>
1186	1187	<>	<elision2>
1186	1180	<elision1>	<elision1>
1186	1187	<>	<elision1>
1187	1185	<>	<aphaerese>
1187	1177	<elision3>	<elision3>
1187	1185	<>	<elision3>
1187	1177	<elision2>	<elision2>
1187	1185	<>	<elision2>
1187	1177	<elision1>	<elision1>
1187	1185	<>	<elision1>
1188	272	.	.
1188	273	 	 
1188	272	<~>	<~>
1188	272	<split-s>	<split-s>
1188	272	<split-h>	<split-h>
1188	272	<name2>	<name2>
1188	1189	<>	<name>
1188	276	<aphaerese>	<aphaerese>
1188	1188	<>	<aphaerese>
1188	1188	<>	<elision3>
1188	1188	<>	<elision2>
1188	1188	<>	<elision1>
1188	280	.	υ
1188	394	s	υ
1188	280	.	u
1188	394	s	u
1188	697	.	κ
1188	727	s	κ
1188	780	s	k
1188	801	s	U
1188	900	s	K
1188	280	.	α
1188	856	s	α
1188	280	.	a
1188	856	s	a
1188	859	s	A
1188	862	s	λ
1188	865	s	l
1188	910	s	L
1188	440	<2s>	<>
1189	275	.	.
1189	278	 	 
1189	275	<~>	<~>
1189	275	<split-s>	<split-s>
1189	275	<split-h>	<split-h>
1189	275	<name2>	<name2>
1189	899	<aphaerese>	<aphaerese>
1189	1190	<>	<aphaerese>
1189	1190	<>	<elision3>
1189	1190	<>	<elision2>
1189	1190	<>	<elision1>
1189	282	.	υ
1189	693	s	υ
1189	282	.	u
1189	693	s	u
1189	699	.	κ
1189	729	s	κ
1189	782	s	k
1189	803	s	U
1189	902	s	K
1189	282	.	α
1189	858	s	α
1189	282	.	a
1189	858	s	a
1189	861	s	A
1189	864	s	λ
1189	867	s	l
1189	912	s	L
1189	441	<2s>	<>
1190	272	.	.
1190	273	 	 
1190	272	<~>	<~>
1190	272	<split-s>	<split-s>
1190	272	<split-h>	<split-h>
1190	272	<name2>	<name2>
1190	276	<aphaerese>	<aphaerese>
1190	1188	<>	<aphaerese>
1190	1188	<>	<elision3>
1190	1188	<>	<elision2>
1190	1188	<>	<elision1>
1190	280	.	υ
1190	394	s	υ
1190	280	.	u
1190	394	s	u
1190	697	.	κ
1190	727	s	κ
1190	780	s	k
1190	801	s	U
1190	900	s	K
1190	280	.	α
1190	856	s	α
1190	280	.	a
1190	856	s	a
1190	859	s	A
1190	862	s	λ
1190	865	s	l
1190	910	s	L
1190	439	<2s>	<>
1191	1192	<>	<name>
1191	1191	<>	<aphaerese>
1191	1194	<elision3>	<elision3>
1191	1191	<>	<elision3>
1191	1194	<elision2>	<elision2>
1191	1191	<>	<elision2>
1191	1194	<elision1>	<elision1>
1191	1191	<>	<elision1>
1192	1193	<>	<aphaerese>
1192	1196	<elision3>	<elision3>
1192	1193	<>	<elision3>
1192	1196	<elision2>	<elision2>
1192	1193	<>	<elision2>
1192	1196	<elision1>	<elision1>
1192	1193	<>	<elision1>
1193	1191	<>	<aphaerese>
1193	1194	<elision3>	<elision3>
1193	1191	<>	<elision3>
1193	1194	<elision2>	<elision2>
1193	1191	<>	<elision2>
1193	1194	<elision1>	<elision1>
1193	1191	<>	<elision1>
1194	1195	<>	<name>
1194	1194	<>	<aphaerese>
1194	1194	<>	<elision3>
1194	1194	<>	<elision2>
1194	1194	<>	<elision1>
1194	1197	s	κ
1194	1197	s	k
1194	1200	s	K
1194	1197	s	λ
1194	1204	s	l
1194	1206	s	L
1195	1196	<>	<aphaerese>
1195	1196	<>	<elision3>
1195	1196	<>	<elision2>
1195	1196	<>	<elision1>
1195	1199	s	κ
1195	1199	s	k
1195	1202	s	K
1195	1199	s	λ
1195	1203	s	l
1195	1208	s	L
1196	1194	<>	<aphaerese>
1196	1194	<>	<elision3>
1196	1194	<>	<elision2>
1196	1194	<>	<elision1>
1196	1197	s	κ
1196	1197	s	k
1196	1200	s	K
1196	1197	s	λ
1196	1204	s	l
1196	1206	s	L
1197	1198	<>	<name>
1197	1197	<>	<aphaerese>
1197	1197	<>	<elision3>
1197	1197	<>	<elision2>
1197	1197	<>	<elision1>
1197	920	s	κ
1197	780	s	k
1197	900	s	K
1197	920	s	λ
1197	865	s	l
1197	910	s	L
1197	455	<2s>	<>
1198	1199	<>	<aphaerese>
1198	1199	<>	<elision3>
1198	1199	<>	<elision2>
1198	1199	<>	<elision1>
1198	922	s	κ
1198	782	s	k
1198	902	s	K
1198	922	s	λ
1198	867	s	l
1198	912	s	L
1198	456	<2s>	<>
1199	1197	<>	<aphaerese>
1199	1197	<>	<elision3>
1199	1197	<>	<elision2>
1199	1197	<>	<elision1>
1199	920	s	κ
1199	780	s	k
1199	900	s	K
1199	920	s	λ
1199	865	s	l
1199	910	s	L
1199	454	<2s>	<>
1200	1201	<>	<name>
1200	1200	<>	<aphaerese>
1200	1200	<>	<elision3>
1200	1200	<>	<elision2>
1200	1200	<>	<elision1>
1200	1204	<K2kl>	<>
1201	1202	<>	<aphaerese>
1201	1202	<>	<elision3>
1201	1202	<>	<elision2>
1201	1202	<>	<elision1>
1201	1205	<K2kl>	<>
1202	1200	<>	<aphaerese>
1202	1200	<>	<elision3>
1202	1200	<>	<elision2>
1202	1200	<>	<elision1>
1202	1203	<K2kl>	<>
1203	1204	<>	<aphaerese>
1203	1204	<>	<elision3>
1203	1204	<>	<elision2>
1203	1204	<>	<elision1>
1203	970	s	κ
1203	865	s	k
1203	956	s	K
1203	970	s	λ
1203	865	s	l
1203	910	s	L
1203	454	<2s>	<>
1204	1205	<>	<name>
1204	1204	<>	<aphaerese>
1204	1204	<>	<elision3>
1204	1204	<>	<elision2>
1204	1204	<>	<elision1>
1204	970	s	κ
1204	865	s	k
1204	956	s	K
1204	970	s	λ
1204	865	s	l
1204	910	s	L
1204	455	<2s>	<>
1205	1203	<>	<aphaerese>
1205	1203	<>	<elision3>
1205	1203	<>	<elision2>
1205	1203	<>	<elision1>
1205	972	s	κ
1205	867	s	k
1205	902	s	K
1205	972	s	λ
1205	867	s	l
1205	912	s	L
1205	456	<2s>	<>
1206	1207	<>	<name>
1206	1206	<>	<aphaerese>
1206	1206	<>	<elision3>
1206	1206	<>	<elision2>
1206	1206	<>	<elision1>
1206	1204	<L2kl>	<>
1207	1208	<>	<aphaerese>
1207	1208	<>	<elision3>
1207	1208	<>	<elision2>
1207	1208	<>	<elision1>
1207	1205	<L2kl>	<>
1208	1206	<>	<aphaerese>
1208	1206	<>	<elision3>
1208	1206	<>	<elision2>
1208	1206	<>	<elision1>
1208	1203	<L2kl>	<>
1209	272	.	.
1209	273	 	 
1209	272	<~>	<~>
1209	272	<split-s>	<split-s>
1209	272	<split-h>	<split-h>
1209	272	<name2>	<name2>
1209	1210	<>	<name>
1209	276	<aphaerese>	<aphaerese>
1209	1209	<>	<aphaerese>
1209	1212	<elision3>	<elision3>
1209	1209	<>	<elision3>
1209	1212	<elision2>	<elision2>
1209	1209	<>	<elision2>
1209	1212	<elision1>	<elision1>
1209	1209	<>	<elision1>
1209	280	.	υ
1209	394	s	υ
1209	280	.	u
1209	394	s	u
1209	280	.	κ
1209	920	s	κ
1209	780	s	k
1209	801	s	U
1209	900	s	K
1209	280	.	α
1209	856	s	α
1209	280	.	a
1209	856	s	a
1209	859	s	A
1209	280	.	λ
1209	920	s	λ
1209	865	s	l
1209	910	s	L
1209	518	<2s>	<>
1210	275	.	.
1210	278	 	 
1210	275	<~>	<~>
1210	275	<split-s>	<split-s>
1210	275	<split-h>	<split-h>
1210	275	<name2>	<name2>
1210	899	<aphaerese>	<aphaerese>
1210	1211	<>	<aphaerese>
1210	1214	<elision3>	<elision3>
1210	1211	<>	<elision3>
1210	1214	<elision2>	<elision2>
1210	1211	<>	<elision2>
1210	1214	<elision1>	<elision1>
1210	1211	<>	<elision1>
1210	282	.	υ
1210	693	s	υ
1210	282	.	u
1210	693	s	u
1210	282	.	κ
1210	922	s	κ
1210	782	s	k
1210	803	s	U
1210	902	s	K
1210	282	.	α
1210	858	s	α
1210	282	.	a
1210	858	s	a
1210	861	s	A
1210	282	.	λ
1210	922	s	λ
1210	867	s	l
1210	912	s	L
1210	519	<2s>	<>
1211	272	.	.
1211	273	 	 
1211	272	<~>	<~>
1211	272	<split-s>	<split-s>
1211	272	<split-h>	<split-h>
1211	272	<name2>	<name2>
1211	276	<aphaerese>	<aphaerese>
1211	1209	<>	<aphaerese>
1211	1212	<elision3>	<elision3>
1211	1209	<>	<elision3>
1211	1212	<elision2>	<elision2>
1211	1209	<>	<elision2>
1211	1212	<elision1>	<elision1>
1211	1209	<>	<elision1>
1211	280	.	υ
1211	394	s	υ
1211	280	.	u
1211	394	s	u
1211	280	.	κ
1211	920	s	κ
1211	780	s	k
1211	801	s	U
1211	900	s	K
1211	280	.	α
1211	856	s	α
1211	280	.	a
1211	856	s	a
1211	859	s	A
1211	280	.	λ
1211	920	s	λ
1211	865	s	l
1211	910	s	L
1211	517	<2s>	<>
1212	272	.	.
1212	273	 	 
1212	272	<~>	<~>
1212	272	<split-s>	<split-s>
1212	272	<split-h>	<split-h>
1212	272	<name2>	<name2>
1212	1213	<>	<name>
1212	276	<aphaerese>	<aphaerese>
1212	1212	<>	<aphaerese>
1212	272	<elision3>	<elision3>
1212	1212	<>	<elision3>
1212	272	<elision2>	<elision2>
1212	1212	<>	<elision2>
1212	272	<elision1>	<elision1>
1212	1212	<>	<elision1>
1212	280	.	υ
1212	394	s	υ
1212	280	.	u
1212	394	s	u
1212	697	.	κ
1212	1215	s	κ
1212	1221	s	k
1212	801	s	U
1212	1227	s	K
1212	280	.	α
1212	856	s	α
1212	280	.	a
1212	856	s	a
1212	859	s	A
1212	1239	s	λ
1212	1242	s	l
1212	1245	s	L
1212	488	<2s>	<>
1213	275	.	.
1213	278	 	 
1213	275	<~>	<~>
1213	275	<split-s>	<split-s>
1213	275	<split-h>	<split-h>
1213	275	<name2>	<name2>
1213	899	<aphaerese>	<aphaerese>
1213	1214	<>	<aphaerese>
1213	275	<elision3>	<elision3>
1213	1214	<>	<elision3>
1213	275	<elision2>	<elision2>
1213	1214	<>	<elision2>
1213	275	<elision1>	<elision1>
1213	1214	<>	<elision1>
1213	282	.	υ
1213	693	s	υ
1213	282	.	u
1213	693	s	u
1213	699	.	κ
1213	1217	s	κ
1213	1223	s	k
1213	803	s	U
1213	1229	s	K
1213	282	.	α
1213	858	s	α
1213	282	.	a
1213	858	s	a
1213	861	s	A
1213	1241	s	λ
1213	1244	s	l
1213	1247	s	L
1213	489	<2s>	<>
1214	272	.	.
1214	273	 	 
1214	272	<~>	<~>
1214	272	<split-s>	<split-s>
1214	272	<split-h>	<split-h>
1214	272	<name2>	<name2>
1214	276	<aphaerese>	<aphaerese>
1214	1212	<>	<aphaerese>
1214	272	<elision3>	<elision3>
1214	1212	<>	<elision3>
1214	272	<elision2>	<elision2>
1214	1212	<>	<elision2>
1214	272	<elision1>	<elision1>
1214	1212	<>	<elision1>
1214	280	.	υ
1214	394	s	υ
1214	280	.	u
1214	394	s	u
1214	697	.	κ
1214	1215	s	κ
1214	1221	s	k
1214	801	s	U
1214	1227	s	K
1214	280	.	α
1214	856	s	α
1214	280	.	a
1214	856	s	a
1214	859	s	A
1214	1239	s	λ
1214	1242	s	l
1214	1245	s	L
1214	487	<2s>	<>
1215	395	.	.
1215	396	 	 
1215	395	<~>	<~>
1215	395	<split-s>	<split-s>
1215	395	<split-h>	<split-h>
1215	395	<name2>	<name2>
1215	1216	<>	<name>
1215	399	<aphaerese>	<aphaerese>
1215	1215	<>	<aphaerese>
1215	730	<elision3>	<elision3>
1215	1215	<>	<elision3>
1215	730	<elision2>	<elision2>
1215	1215	<>	<elision2>
1215	730	<elision1>	<elision1>
1215	1215	<>	<elision1>
1215	403	.	υ
1215	409	s	υ
1215	403	.	u
1215	409	s	u
1215	403	.	κ
1215	532	s	U
1215	403	.	α
1215	409	s	α
1215	403	.	a
1215	409	s	a
1215	622	s	A
1215	403	.	λ
1215	1219	<split-h>	<>
1216	398	.	.
1216	401	 	 
1216	398	<~>	<~>
1216	398	<split-s>	<split-s>
1216	398	<split-h>	<split-h>
1216	398	<name2>	<name2>
1216	666	<aphaerese>	<aphaerese>
1216	1217	<>	<aphaerese>
1216	732	<elision3>	<elision3>
1216	1217	<>	<elision3>
1216	732	<elision2>	<elision2>
1216	1217	<>	<elision2>
1216	732	<elision1>	<elision1>
1216	1217	<>	<elision1>
1216	405	.	υ
1216	438	s	υ
1216	405	.	u
1216	438	s	u
1216	405	.	κ
1216	534	s	U
1216	405	.	α
1216	438	s	α
1216	405	.	a
1216	438	s	a
1216	624	s	A
1216	405	.	λ
1216	1220	<split-h>	<>
1217	395	.	.
1217	396	 	 
1217	395	<~>	<~>
1217	395	<split-s>	<split-s>
1217	395	<split-h>	<split-h>
1217	395	<name2>	<name2>
1217	399	<aphaerese>	<aphaerese>
1217	1215	<>	<aphaerese>
1217	730	<elision3>	<elision3>
1217	1215	<>	<elision3>
1217	730	<elision2>	<elision2>
1217	1215	<>	<elision2>
1217	730	<elision1>	<elision1>
1217	1215	<>	<elision1>
1217	403	.	υ
1217	409	s	υ
1217	403	.	u
1217	409	s	u
1217	403	.	κ
1217	532	s	U
1217	403	.	α
1217	409	s	α
1217	403	.	a
1217	409	s	a
1217	622	s	A
1217	403	.	λ
1217	1218	<split-h>	<>
1218	1219	<>	<aphaerese>
1218	1219	<>	<elision3>
1218	1219	<>	<elision2>
1218	1219	<>	<elision1>
1218	736	<3s>	<>
1219	1220	<>	<name>
1219	1219	<>	<aphaerese>
1219	1219	<>	<elision3>
1219	1219	<>	<elision2>
1219	1219	<>	<elision1>
1219	737	<3s>	<>
1220	1218	<>	<aphaerese>
1220	1218	<>	<elision3>
1220	1218	<>	<elision2>
1220	1218	<>	<elision1>
1220	738	<3s>	<>
1221	395	.	.
1221	396	 	 
1221	395	<~>	<~>
1221	395	<split-s>	<split-s>
1221	395	<split-h>	<split-h>
1221	395	<name2>	<name2>
1221	1222	<>	<name>
1221	399	<aphaerese>	<aphaerese>
1221	1221	<>	<aphaerese>
1221	395	<elision3>	<elision3>
1221	1221	<>	<elision3>
1221	395	<elision2>	<elision2>
1221	1221	<>	<elision2>
1221	395	<elision1>	<elision1>
1221	1221	<>	<elision1>
1221	403	.	υ
1221	409	s	υ
1221	403	.	u
1221	409	s	u
1221	783	.	κ
1221	532	s	U
1221	403	.	α
1221	409	s	α
1221	403	.	a
1221	409	s	a
1221	622	s	A
1221	783	.	λ
1221	1225	<split-h>	<>
1222	398	.	.
1222	401	 	 
1222	398	<~>	<~>
1222	398	<split-s>	<split-s>
1222	398	<split-h>	<split-h>
1222	398	<name2>	<name2>
1222	666	<aphaerese>	<aphaerese>
1222	1223	<>	<aphaerese>
1222	398	<elision3>	<elision3>
1222	1223	<>	<elision3>
1222	398	<elision2>	<elision2>
1222	1223	<>	<elision2>
1222	398	<elision1>	<elision1>
1222	1223	<>	<elision1>
1222	405	.	υ
1222	438	s	υ
1222	405	.	u
1222	438	s	u
1222	785	.	κ
1222	534	s	U
1222	405	.	α
1222	438	s	α
1222	405	.	a
1222	438	s	a
1222	624	s	A
1222	785	.	λ
1222	1226	<split-h>	<>
1223	395	.	.
1223	396	 	 
1223	395	<~>	<~>
1223	395	<split-s>	<split-s>
1223	395	<split-h>	<split-h>
1223	395	<name2>	<name2>
1223	399	<aphaerese>	<aphaerese>
1223	1221	<>	<aphaerese>
1223	395	<elision3>	<elision3>
1223	1221	<>	<elision3>
1223	395	<elision2>	<elision2>
1223	1221	<>	<elision2>
1223	395	<elision1>	<elision1>
1223	1221	<>	<elision1>
1223	403	.	υ
1223	409	s	υ
1223	403	.	u
1223	409	s	u
1223	783	.	κ
1223	532	s	U
1223	403	.	α
1223	409	s	α
1223	403	.	a
1223	409	s	a
1223	622	s	A
1223	783	.	λ
1223	1224	<split-h>	<>
1224	1225	<>	<aphaerese>
1224	1225	<>	<elision3>
1224	1225	<>	<elision2>
1224	1225	<>	<elision1>
1224	745	<3s>	<>
1225	1226	<>	<name>
1225	1225	<>	<aphaerese>
1225	1225	<>	<elision3>
1225	1225	<>	<elision2>
1225	1225	<>	<elision1>
1225	746	<3s>	<>
1226	1224	<>	<aphaerese>
1226	1224	<>	<elision3>
1226	1224	<>	<elision2>
1226	1224	<>	<elision1>
1226	747	<3s>	<>
1227	805	<name>	<name>
1227	1228	<>	<name>
1227	1230	<>	<aphaerese>
1227	1230	<>	<elision3>
1227	1230	<>	<elision2>
1227	1230	<>	<elision1>
1227	852	<split-h>	<>
1227	904	<L2kl>	<>
1227	1237	<K2kl>	<>
1228	1229	<>	<aphaerese>
1228	1229	<>	<elision3>
1228	1229	<>	<elision2>
1228	1229	<>	<elision1>
1228	905	<L2kl>	<>
1228	1232	<K2kl>	<>
1229	1230	<>	<aphaerese>
1229	1230	<>	<elision3>
1229	1230	<>	<elision2>
1229	1230	<>	<elision1>
1229	906	<L2kl>	<>
1229	1233	<K2kl>	<>
1230	1228	<>	<name>
1230	1230	<>	<aphaerese>
1230	1230	<>	<elision3>
1230	1230	<>	<elision2>
1230	1230	<>	<elision1>
1230	904	<L2kl>	<>
1230	1231	<K2kl>	<>
1231	786	.	.
1231	786	 	 
1231	786	<~>	<~>
1231	786	<split-s>	<split-s>
1231	786	<split-h>	<split-h>
1231	786	<name2>	<name2>
1231	1232	<>	<name>
1231	789	<aphaerese>	<aphaerese>
1231	1231	<>	<aphaerese>
1231	786	<elision3>	<elision3>
1231	1231	<>	<elision3>
1231	786	<elision2>	<elision2>
1231	1231	<>	<elision2>
1231	786	<elision1>	<elision1>
1231	1231	<>	<elision1>
1231	783	.	υ
1231	783	.	u
1231	783	.	α
1231	783	.	a
1231	1235	<split-h>	<>
1232	788	.	.
1232	788	 	 
1232	788	<~>	<~>
1232	788	<split-s>	<split-s>
1232	788	<split-h>	<split-h>
1232	788	<name2>	<name2>
1232	791	<aphaerese>	<aphaerese>
1232	1233	<>	<aphaerese>
1232	788	<elision3>	<elision3>
1232	1233	<>	<elision3>
1232	788	<elision2>	<elision2>
1232	1233	<>	<elision2>
1232	788	<elision1>	<elision1>
1232	1233	<>	<elision1>
1232	785	.	υ
1232	785	.	u
1232	785	.	α
1232	785	.	a
1232	1236	<split-h>	<>
1233	786	.	.
1233	786	 	 
1233	786	<~>	<~>
1233	786	<split-s>	<split-s>
1233	786	<split-h>	<split-h>
1233	786	<name2>	<name2>
1233	789	<aphaerese>	<aphaerese>
1233	1231	<>	<aphaerese>
1233	786	<elision3>	<elision3>
1233	1231	<>	<elision3>
1233	786	<elision2>	<elision2>
1233	1231	<>	<elision2>
1233	786	<elision1>	<elision1>
1233	1231	<>	<elision1>
1233	783	.	υ
1233	783	.	u
1233	783	.	α
1233	783	.	a
1233	1234	<split-h>	<>
1234	1235	<>	<aphaerese>
1234	1235	<>	<elision3>
1234	1235	<>	<elision2>
1234	1235	<>	<elision1>
1234	758	<3s>	<>
1235	1236	<>	<name>
1235	1235	<>	<aphaerese>
1235	1235	<>	<elision3>
1235	1235	<>	<elision2>
1235	1235	<>	<elision1>
1235	759	<3s>	<>
1236	1234	<>	<aphaerese>
1236	1234	<>	<elision3>
1236	1234	<>	<elision2>
1236	1234	<>	<elision1>
1236	760	<3s>	<>
1237	786	.	.
1237	786	 	 
1237	786	<~>	<~>
1237	786	<split-s>	<split-s>
1237	786	<split-h>	<split-h>
1237	786	<name2>	<name2>
1237	854	<name2>	<name>
1237	1232	<>	<name>
1237	789	<aphaerese>	<aphaerese>
1237	1231	<>	<aphaerese>
1237	786	<elision3>	<elision3>
1237	1231	<>	<elision3>
1237	786	<elision2>	<elision2>
1237	1231	<>	<elision2>
1237	786	<elision1>	<elision1>
1237	1231	<>	<elision1>
1237	783	.	υ
1237	783	.	u
1237	783	.	α
1237	783	.	a
1237	1238	<split-h>	<>
1238	1236	<>	<name>
1238	1235	<>	<aphaerese>
1238	1235	<>	<elision3>
1238	1235	<>	<elision2>
1238	1235	<>	<elision1>
1238	765	<3s>	<>
1239	395	.	.
1239	396	 	 
1239	395	<~>	<~>
1239	395	<split-s>	<split-s>
1239	395	<split-h>	<split-h>
1239	395	<name2>	<name2>
1239	1240	<>	<name>
1239	399	<aphaerese>	<aphaerese>
1239	1239	<>	<aphaerese>
1239	395	<elision3>	<elision3>
1239	1239	<>	<elision3>
1239	395	<elision2>	<elision2>
1239	1239	<>	<elision2>
1239	395	<elision1>	<elision1>
1239	1239	<>	<elision1>
1239	403	.	υ
1239	409	s	υ
1239	403	.	u
1239	409	s	u
1239	403	.	κ
1239	532	s	U
1239	403	.	α
1239	409	s	α
1239	403	.	a
1239	409	s	a
1239	622	s	A
1239	403	.	λ
1239	1225	<split-h>	<>
1240	398	.	.
1240	401	 	 
1240	398	<~>	<~>
1240	398	<split-s>	<split-s>
1240	398	<split-h>	<split-h>
1240	398	<name2>	<name2>
1240	666	<aphaerese>	<aphaerese>
1240	1241	<>	<aphaerese>
1240	398	<elision3>	<elision3>
1240	1241	<>	<elision3>
1240	398	<elision2>	<elision2>
1240	1241	<>	<elision2>
1240	398	<elision1>	<elision1>
1240	1241	<>	<elision1>
1240	405	.	υ
1240	438	s	υ
1240	405	.	u
1240	438	s	u
1240	405	.	κ
1240	534	s	U
1240	405	.	α
1240	438	s	α
1240	405	.	a
1240	438	s	a
1240	624	s	A
1240	405	.	λ
1240	1226	<split-h>	<>
1241	395	.	.
1241	396	 	 
1241	395	<~>	<~>
1241	395	<split-s>	<split-s>
1241	395	<split-h>	<split-h>
1241	395	<name2>	<name2>
1241	399	<aphaerese>	<aphaerese>
1241	1239	<>	<aphaerese>
1241	395	<elision3>	<elision3>
1241	1239	<>	<elision3>
1241	395	<elision2>	<elision2>
1241	1239	<>	<elision2>
1241	395	<elision1>	<elision1>
1241	1239	<>	<elision1>
1241	403	.	υ
1241	409	s	υ
1241	403	.	u
1241	409	s	u
1241	403	.	κ
1241	532	s	U
1241	403	.	α
1241	409	s	α
1241	403	.	a
1241	409	s	a
1241	622	s	A
1241	403	.	λ
1241	1224	<split-h>	<>
1242	786	.	.
1242	786	 	 
1242	786	<~>	<~>
1242	786	<split-s>	<split-s>
1242	786	<split-h>	<split-h>
1242	786	<name2>	<name2>
1242	1243	<>	<name>
1242	789	<aphaerese>	<aphaerese>
1242	1242	<>	<aphaerese>
1242	786	<elision3>	<elision3>
1242	1242	<>	<elision3>
1242	786	<elision2>	<elision2>
1242	1242	<>	<elision2>
1242	786	<elision1>	<elision1>
1242	1242	<>	<elision1>
1242	783	.	υ
1242	783	.	u
1242	783	.	κ
1242	783	.	α
1242	783	.	a
1242	783	.	λ
1242	1225	<split-h>	<>
1243	788	.	.
1243	788	 	 
1243	788	<~>	<~>
1243	788	<split-s>	<split-s>
1243	788	<split-h>	<split-h>
1243	788	<name2>	<name2>
1243	791	<aphaerese>	<aphaerese>
1243	1244	<>	<aphaerese>
1243	788	<elision3>	<elision3>
1243	1244	<>	<elision3>
1243	788	<elision2>	<elision2>
1243	1244	<>	<elision2>
1243	788	<elision1>	<elision1>
1243	1244	<>	<elision1>
1243	785	.	υ
1243	785	.	u
1243	785	.	κ
1243	785	.	α
1243	785	.	a
1243	785	.	λ
1243	1226	<split-h>	<>
1244	786	.	.
1244	786	 	 
1244	786	<~>	<~>
1244	786	<split-s>	<split-s>
1244	786	<split-h>	<split-h>
1244	786	<name2>	<name2>
1244	789	<aphaerese>	<aphaerese>
1244	1242	<>	<aphaerese>
1244	786	<elision3>	<elision3>
1244	1242	<>	<elision3>
1244	786	<elision2>	<elision2>
1244	1242	<>	<elision2>
1244	786	<elision1>	<elision1>
1244	1242	<>	<elision1>
1244	783	.	υ
1244	783	.	u
1244	783	.	κ
1244	783	.	α
1244	783	.	a
1244	783	.	λ
1244	1224	<split-h>	<>
1245	854	<name>	<name>
1245	1246	<>	<name>
1245	1248	<>	<aphaerese>
1245	1248	<>	<elision3>
1245	1248	<>	<elision2>
1245	1248	<>	<elision1>
1245	852	<split-h>	<>
1245	1249	<L2kl>	<>
1246	1247	<>	<aphaerese>
1246	1247	<>	<elision3>
1246	1247	<>	<elision2>
1246	1247	<>	<elision1>
1246	1243	<L2kl>	<>
1247	1248	<>	<aphaerese>
1247	1248	<>	<elision3>
1247	1248	<>	<elision2>
1247	1248	<>	<elision1>
1247	1244	<L2kl>	<>
1248	1246	<>	<name>
1248	1248	<>	<aphaerese>
1248	1248	<>	<elision3>
1248	1248	<>	<elision2>
1248	1248	<>	<elision1>
1248	1242	<L2kl>	<>
1249	786	.	.
1249	786	 	 
1249	786	<~>	<~>
1249	786	<split-s>	<split-s>
1249	786	<split-h>	<split-h>
1249	786	<name2>	<name2>
1249	854	<name2>	<name>
1249	1243	<>	<name>
1249	789	<aphaerese>	<aphaerese>
1249	1242	<>	<aphaerese>
1249	786	<elision3>	<elision3>
1249	1242	<>	<elision3>
1249	786	<elision2>	<elision2>
1249	1242	<>	<elision2>
1249	786	<elision1>	<elision1>
1249	1242	<>	<elision1>
1249	783	.	υ
1249	783	.	u
1249	783	.	κ
1249	783	.	α
1249	783	.	a
1249	783	.	λ
1249	1250	<split-h>	<>
1250	1226	<>	<name>
1250	1225	<>	<aphaerese>
1250	1225	<>	<elision3>
1250	1225	<>	<elision2>
1250	1225	<>	<elision1>
1250	772	<3s>	<>
1251	1252	<>	<name>
1251	1251	<>	<aphaerese>
1251	1251	<>	<elision3>
1251	1251	<>	<elision2>
1251	1251	<>	<elision1>
1251	932	<U2kl>	<>
1252	1253	<>	<aphaerese>
1252	1253	<>	<elision3>
1252	1253	<>	<elision2>
1252	1253	<>	<elision1>
1252	958	<U2kl>	<>
1253	1251	<>	<aphaerese>
1253	1251	<>	<elision3>
1253	1251	<>	<elision2>
1253	1251	<>	<elision1>
1253	935	<U2kl>	<>
1254	960	<name>	<name>
1254	1255	<>	<name>
1254	1257	<>	<aphaerese>
1254	1257	<>	<elision3>
1254	1257	<>	<elision2>
1254	1257	<>	<elision1>
1254	617	<2s>	<>
1254	1258	<A2kl>	<>
1254	1270	<L2kl>	<>
1254	973	<K2kl>	<>
1255	1256	<>	<aphaerese>
1255	1256	<>	<elision3>
1255	1256	<>	<elision2>
1255	1256	<>	<elision1>
1255	1259	<A2kl>	<>
1255	1271	<L2kl>	<>
1255	968	<K2kl>	<>
1256	1257	<>	<aphaerese>
1256	1257	<>	<elision3>
1256	1257	<>	<elision2>
1256	1257	<>	<elision1>
1256	1260	<A2kl>	<>
1256	1272	<L2kl>	<>
1256	969	<K2kl>	<>
1257	1255	<>	<name>
1257	1257	<>	<aphaerese>
1257	1257	<>	<elision3>
1257	1257	<>	<elision2>
1257	1257	<>	<elision1>
1257	1258	<A2kl>	<>
1257	1270	<L2kl>	<>
1257	967	<K2kl>	<>
1258	1259	<>	<name>
1258	1258	<>	<aphaerese>
1258	1258	<>	<elision3>
1258	1258	<>	<elision2>
1258	1258	<>	<elision1>
1258	1261	.	κ
1258	1261	.	λ
1258	576	<2s>	<>
1259	1260	<>	<aphaerese>
1259	1260	<>	<elision3>
1259	1260	<>	<elision2>
1259	1260	<>	<elision1>
1259	1263	.	κ
1259	1263	.	λ
1259	577	<2s>	<>
1260	1258	<>	<aphaerese>
1260	1258	<>	<elision3>
1260	1258	<>	<elision2>
1260	1258	<>	<elision1>
1260	1261	.	κ
1260	1261	.	λ
1260	575	<2s>	<>
1261	1262	<>	<name>
1261	1261	<>	<aphaerese>
1261	1264	<elision3>	<elision3>
1261	1261	<>	<elision3>
1261	1264	<elision2>	<elision2>
1261	1261	<>	<elision2>
1261	1264	<elision1>	<elision1>
1261	1261	<>	<elision1>
1261	570	<2s>	<>
1262	1263	<>	<aphaerese>
1262	1266	<elision3>	<elision3>
1262	1263	<>	<elision3>
1262	1266	<elision2>	<elision2>
1262	1263	<>	<elision2>
1262	1266	<elision1>	<elision1>
1262	1263	<>	<elision1>
1262	571	<2s>	<>
1263	1261	<>	<aphaerese>
1263	1264	<elision3>	<elision3>
1263	1261	<>	<elision3>
1263	1264	<elision2>	<elision2>
1263	1261	<>	<elision2>
1263	1264	<elision1>	<elision1>
1263	1261	<>	<elision1>
1263	569	<2s>	<>
1264	932	.	.
1264	933	 	 
1264	932	<~>	<~>
1264	932	<split-s>	<split-s>
1264	932	<split-h>	<split-h>
1264	932	<name2>	<name2>
1264	1265	<>	<name>
1264	936	<aphaerese>	<aphaerese>
1264	1264	<>	<aphaerese>
1264	932	<elision3>	<elision3>
1264	1264	<>	<elision3>
1264	932	<elision2>	<elision2>
1264	1264	<>	<elision2>
1264	932	<elision1>	<elision1>
1264	1264	<>	<elision1>
1264	929	.	υ
1264	856	s	υ
1264	929	.	u
1264	856	s	u
1264	828	s	κ
1264	828	s	k
1264	801	s	U
1264	1267	s	K
1264	929	.	α
1264	856	s	α
1264	929	.	a
1264	856	s	a
1264	859	s	A
1264	828	s	λ
1264	828	s	l
1264	1267	s	L
1264	552	<2s>	<>
1265	935	.	.
1265	938	 	 
1265	935	<~>	<~>
1265	935	<split-s>	<split-s>
1265	935	<split-h>	<split-h>
1265	935	<name2>	<name2>
1265	955	<aphaerese>	<aphaerese>
1265	1266	<>	<aphaerese>
1265	935	<elision3>	<elision3>
1265	1266	<>	<elision3>
1265	935	<elision2>	<elision2>
1265	1266	<>	<elision2>
1265	935	<elision1>	<elision1>
1265	1266	<>	<elision1>
1265	931	.	υ
1265	858	s	υ
1265	931	.	u
1265	858	s	u
1265	830	s	κ
1265	830	s	k
1265	803	s	U
1265	1269	s	K
1265	931	.	α
1265	858	s	α
1265	931	.	a
1265	858	s	a
1265	861	s	A
1265	830	s	λ
1265	830	s	l
1265	1269	s	L
1265	553	<2s>	<>
1266	932	.	.
1266	933	 	 
1266	932	<~>	<~>
1266	932	<split-s>	<split-s>
1266	932	<split-h>	<split-h>
1266	932	<name2>	<name2>
1266	936	<aphaerese>	<aphaerese>
1266	1264	<>	<aphaerese>
1266	932	<elision3>	<elision3>
1266	1264	<>	<elision3>
1266	932	<elision2>	<elision2>
1266	1264	<>	<elision2>
1266	932	<elision1>	<elision1>
1266	1264	<>	<elision1>
1266	929	.	υ
1266	856	s	υ
1266	929	.	u
1266	856	s	u
1266	828	s	κ
1266	828	s	k
1266	801	s	U
1266	1267	s	K
1266	929	.	α
1266	856	s	α
1266	929	.	a
1266	856	s	a
1266	859	s	A
1266	828	s	λ
1266	828	s	l
1266	1267	s	L
1266	551	<2s>	<>
1267	1268	<>	<name>
1267	1267	<>	<aphaerese>
1267	1267	<>	<elision3>
1267	1267	<>	<elision2>
1267	1267	<>	<elision1>
1267	828	<L2kl>	<>
1268	1269	<>	<aphaerese>
1268	1269	<>	<elision3>
1268	1269	<>	<elision2>
1268	1269	<>	<elision1>
1268	829	<L2kl>	<>
1269	1267	<>	<aphaerese>
1269	1267	<>	<elision3>
1269	1267	<>	<elision2>
1269	1267	<>	<elision1>
1269	830	<L2kl>	<>
1270	1271	<>	<name>
1270	1270	<>	<aphaerese>
1270	1270	<>	<elision3>
1270	1270	<>	<elision2>
1270	1270	<>	<elision1>
1270	1273	.	κ
1270	1273	.	λ
1270	603	<2s>	<>
1271	1272	<>	<aphaerese>
1271	1272	<>	<elision3>
1271	1272	<>	<elision2>
1271	1272	<>	<elision1>
1271	1275	.	κ
1271	1275	.	λ
1271	604	<2s>	<>
1272	1270	<>	<aphaerese>
1272	1270	<>	<elision3>
1272	1270	<>	<elision2>
1272	1270	<>	<elision1>
1272	1273	.	κ
1272	1273	.	λ
1272	602	<2s>	<>
1273	1274	<>	<name>
1273	1273	<>	<aphaerese>
1273	1276	<elision3>	<elision3>
1273	1273	<>	<elision3>
1273	1276	<elision2>	<elision2>
1273	1273	<>	<elision2>
1273	1276	<elision1>	<elision1>
1273	1273	<>	<elision1>
1273	597	<2s>	<>
1274	1275	<>	<aphaerese>
1274	1278	<elision3>	<elision3>
1274	1275	<>	<elision3>
1274	1278	<elision2>	<elision2>
1274	1275	<>	<elision2>
1274	1278	<elision1>	<elision1>
1274	1275	<>	<elision1>
1274	598	<2s>	<>
1275	1273	<>	<aphaerese>
1275	1276	<elision3>	<elision3>
1275	1273	<>	<elision3>
1275	1276	<elision2>	<elision2>
1275	1273	<>	<elision2>
1275	1276	<elision1>	<elision1>
1275	1273	<>	<elision1>
1275	596	<2s>	<>
1276	1277	<>	<name>
1276	1276	<>	<aphaerese>
1276	1276	<>	<elision3>
1276	1276	<>	<elision2>
1276	1276	<>	<elision1>
1276	940	.	κ
1276	946	s	κ
1276	865	s	k
1276	956	s	K
1276	865	s	λ
1276	865	s	l
1276	910	s	L
1276	591	<2s>	<>
1277	1278	<>	<aphaerese>
1277	1278	<>	<elision3>
1277	1278	<>	<elision2>
1277	1278	<>	<elision1>
1277	942	.	κ
1277	948	s	κ
1277	867	s	k
1277	902	s	K
1277	867	s	λ
1277	867	s	l
1277	912	s	L
1277	592	<2s>	<>
1278	1276	<>	<aphaerese>
1278	1276	<>	<elision3>
1278	1276	<>	<elision2>
1278	1276	<>	<elision1>
1278	940	.	κ
1278	946	s	κ
1278	865	s	k
1278	956	s	K
1278	865	s	λ
1278	865	s	l
1278	910	s	L
1278	590	<2s>	<>
1279	932	.	.
1279	933	 	 
1279	932	<~>	<~>
1279	932	<split-s>	<split-s>
1279	932	<split-h>	<split-h>
1279	932	<name2>	<name2>
1279	1280	<>	<name>
1279	936	<aphaerese>	<aphaerese>
1279	1279	<>	<aphaerese>
1279	1279	<>	<elision3>
1279	1279	<>	<elision2>
1279	1279	<>	<elision1>
1279	929	.	υ
1279	856	s	υ
1279	929	.	u
1279	856	s	u
1279	940	.	κ
1279	946	s	κ
1279	865	s	k
1279	801	s	U
1279	956	s	K
1279	929	.	α
1279	856	s	α
1279	929	.	a
1279	856	s	a
1279	859	s	A
1279	865	s	λ
1279	865	s	l
1279	910	s	L
1279	440	<2s>	<>
1280	935	.	.
1280	938	 	 
1280	935	<~>	<~>
1280	935	<split-s>	<split-s>
1280	935	<split-h>	<split-h>
1280	935	<name2>	<name2>
1280	955	<aphaerese>	<aphaerese>
1280	1281	<>	<aphaerese>
1280	1281	<>	<elision3>
1280	1281	<>	<elision2>
1280	1281	<>	<elision1>
1280	931	.	υ
1280	858	s	υ
1280	931	.	u
1280	858	s	u
1280	942	.	κ
1280	948	s	κ
1280	867	s	k
1280	803	s	U
1280	902	s	K
1280	931	.	α
1280	858	s	α
1280	931	.	a
1280	858	s	a
1280	861	s	A
1280	867	s	λ
1280	867	s	l
1280	912	s	L
1280	441	<2s>	<>
1281	932	.	.
1281	933	 	 
1281	932	<~>	<~>
1281	932	<split-s>	<split-s>
1281	932	<split-h>	<split-h>
1281	932	<name2>	<name2>
1281	936	<aphaerese>	<aphaerese>
1281	1279	<>	<aphaerese>
1281	1279	<>	<elision3>
1281	1279	<>	<elision2>
1281	1279	<>	<elision1>
1281	929	.	υ
1281	856	s	υ
1281	929	.	u
1281	856	s	u
1281	940	.	κ
1281	946	s	κ
1281	865	s	k
1281	801	s	U
1281	956	s	K
1281	929	.	α
1281	856	s	α
1281	929	.	a
1281	856	s	a
1281	859	s	A
1281	865	s	λ
1281	865	s	l
1281	910	s	L
1281	439	<2s>	<>
1282	1283	<>	<name>
1282	1282	<>	<aphaerese>
1282	1282	<>	<elision3>
1282	1282	<>	<elision2>
1282	1282	<>	<elision1>
1282	932	<A2kl>	<>
1283	1284	<>	<aphaerese>
1283	1284	<>	<elision3>
1283	1284	<>	<elision2>
1283	1284	<>	<elision1>
1283	958	<A2kl>	<>
1284	1282	<>	<aphaerese>
1284	1282	<>	<elision3>
1284	1282	<>	<elision2>
1284	1282	<>	<elision1>
1284	935	<A2kl>	<>
1285	272	.	.
1285	273	 	 
1285	272	<~>	<~>
1285	272	<split-s>	<split-s>
1285	272	<split-h>	<split-h>
1285	272	<name2>	<name2>
1285	1286	<>	<name>
1285	276	<aphaerese>	<aphaerese>
1285	1285	<>	<aphaerese>
1285	272	<elision3>	<elision3>
1285	1285	<>	<elision3>
1285	272	<elision2>	<elision2>
1285	1285	<>	<elision2>
1285	272	<elision1>	<elision1>
1285	1285	<>	<elision1>
1285	280	.	υ
1285	394	s	υ
1285	280	.	u
1285	394	s	u
1285	280	.	κ
1285	920	s	κ
1285	780	s	k
1285	801	s	U
1285	900	s	K
1285	280	.	α
1285	856	s	α
1285	280	.	a
1285	856	s	a
1285	859	s	A
1285	280	.	λ
1285	920	s	λ
1285	865	s	l
1285	910	s	L
1285	527	<2s>	<>
1286	275	.	.
1286	278	 	 
1286	275	<~>	<~>
1286	275	<split-s>	<split-s>
1286	275	<split-h>	<split-h>
1286	275	<name2>	<name2>
1286	899	<aphaerese>	<aphaerese>
1286	1287	<>	<aphaerese>
1286	275	<elision3>	<elision3>
1286	1287	<>	<elision3>
1286	275	<elision2>	<elision2>
1286	1287	<>	<elision2>
1286	275	<elision1>	<elision1>
1286	1287	<>	<elision1>
1286	282	.	υ
1286	693	s	υ
1286	282	.	u
1286	693	s	u
1286	282	.	κ
1286	922	s	κ
1286	782	s	k
1286	803	s	U
1286	902	s	K
1286	282	.	α
1286	858	s	α
1286	282	.	a
1286	858	s	a
1286	861	s	A
1286	282	.	λ
1286	922	s	λ
1286	867	s	l
1286	912	s	L
1286	528	<2s>	<>
1287	272	.	.
1287	273	 	 
1287	272	<~>	<~>
1287	272	<split-s>	<split-s>
1287	272	<split-h>	<split-h>
1287	272	<name2>	<name2>
1287	276	<aphaerese>	<aphaerese>
1287	1285	<>	<aphaerese>
1287	272	<elision3>	<elision3>
1287	1285	<>	<elision3>
1287	272	<elision2>	<elision2>
1287	1285	<>	<elision2>
1287	272	<elision1>	<elision1>
1287	1285	<>	<elision1>
1287	280	.	υ
1287	394	s	υ
1287	280	.	u
1287	394	s	u
1287	280	.	κ
1287	920	s	κ
1287	780	s	k
1287	801	s	U
1287	900	s	K
1287	280	.	α
1287	856	s	α
1287	280	.	a
1287	856	s	a
1287	859	s	A
1287	280	.	λ
1287	920	s	λ
1287	865	s	l
1287	910	s	L
1287	526	<2s>	<>
1288	960	<name>	<name>
1288	1289	<>	<name>
1288	1291	<>	<aphaerese>
1288	1291	<>	<elision3>
1288	1291	<>	<elision2>
1288	1291	<>	<elision1>
1288	617	<2s>	<>
1288	1258	<A2kl>	<>
1288	1295	<L2kl>	<>
1289	1290	<>	<aphaerese>
1289	1290	<>	<elision3>
1289	1290	<>	<elision2>
1289	1290	<>	<elision1>
1289	1259	<A2kl>	<>
1289	1293	<L2kl>	<>
1290	1291	<>	<aphaerese>
1290	1291	<>	<elision3>
1290	1291	<>	<elision2>
1290	1291	<>	<elision1>
1290	1260	<A2kl>	<>
1290	1294	<L2kl>	<>
1291	1289	<>	<name>
1291	1291	<>	<aphaerese>
1291	1291	<>	<elision3>
1291	1291	<>	<elision2>
1291	1291	<>	<elision1>
1291	1258	<A2kl>	<>
1291	1292	<L2kl>	<>
1292	932	.	.
1292	933	 	 
1292	932	<~>	<~>
1292	932	<split-s>	<split-s>
1292	932	<split-h>	<split-h>
1292	932	<name2>	<name2>
1292	1293	<>	<name>
1292	936	<aphaerese>	<aphaerese>
1292	1292	<>	<aphaerese>
1292	932	<elision3>	<elision3>
1292	1292	<>	<elision3>
1292	932	<elision2>	<elision2>
1292	1292	<>	<elision2>
1292	932	<elision1>	<elision1>
1292	1292	<>	<elision1>
1292	929	.	υ
1292	856	s	υ
1292	929	.	u
1292	856	s	u
1292	1273	.	κ
1292	970	s	κ
1292	865	s	k
1292	801	s	U
1292	956	s	K
1292	929	.	α
1292	856	s	α
1292	929	.	a
1292	856	s	a
1292	859	s	A
1292	1273	.	λ
1292	970	s	λ
1292	865	s	l
1292	910	s	L
1292	633	<2s>	<>
1293	935	.	.
1293	938	 	 
1293	935	<~>	<~>
1293	935	<split-s>	<split-s>
1293	935	<split-h>	<split-h>
1293	935	<name2>	<name2>
1293	955	<aphaerese>	<aphaerese>
1293	1294	<>	<aphaerese>
1293	935	<elision3>	<elision3>
1293	1294	<>	<elision3>
1293	935	<elision2>	<elision2>
1293	1294	<>	<elision2>
1293	935	<elision1>	<elision1>
1293	1294	<>	<elision1>
1293	931	.	υ
1293	858	s	υ
1293	931	.	u
1293	858	s	u
1293	1275	.	κ
1293	972	s	κ
1293	867	s	k
1293	803	s	U
1293	902	s	K
1293	931	.	α
1293	858	s	α
1293	931	.	a
1293	858	s	a
1293	861	s	A
1293	1275	.	λ
1293	972	s	λ
1293	867	s	l
1293	912	s	L
1293	634	<2s>	<>
1294	932	.	.
1294	933	 	 
1294	932	<~>	<~>
1294	932	<split-s>	<split-s>
1294	932	<split-h>	<split-h>
1294	932	<name2>	<name2>
1294	936	<aphaerese>	<aphaerese>
1294	1292	<>	<aphaerese>
1294	932	<elision3>	<elision3>
1294	1292	<>	<elision3>
1294	932	<elision2>	<elision2>
1294	1292	<>	<elision2>
1294	932	<elision1>	<elision1>
1294	1292	<>	<elision1>
1294	929	.	υ
1294	856	s	υ
1294	929	.	u
1294	856	s	u
1294	1273	.	κ
1294	970	s	κ
1294	865	s	k
1294	801	s	U
1294	956	s	K
1294	929	.	α
1294	856	s	α
1294	929	.	a
1294	856	s	a
1294	859	s	A
1294	1273	.	λ
1294	970	s	λ
1294	865	s	l
1294	910	s	L
1294	632	<2s>	<>
1295	932	.	.
1295	933	 	 
1295	932	<~>	<~>
1295	932	<split-s>	<split-s>
1295	932	<split-h>	<split-h>
1295	932	<name2>	<name2>
1295	960	<name2>	<name>
1295	1293	<>	<name>
1295	936	<aphaerese>	<aphaerese>
1295	1292	<>	<aphaerese>
1295	932	<elision3>	<elision3>
1295	1292	<>	<elision3>
1295	932	<elision2>	<elision2>
1295	1292	<>	<elision2>
1295	932	<elision1>	<elision1>
1295	1292	<>	<elision1>
1295	929	.	υ
1295	856	s	υ
1295	929	.	u
1295	856	s	u
1295	1273	.	κ
1295	970	s	κ
1295	865	s	k
1295	801	s	U
1295	956	s	K
1295	929	.	α
1295	856	s	α
1295	929	.	a
1295	856	s	a
1295	859	s	A
1295	1273	.	λ
1295	970	s	λ
1295	865	s	l
1295	910	s	L
1295	639	<2s>	<>
1296	272	.	.
1296	273	 	 
1296	272	<~>	<~>
1296	272	<split-s>	<split-s>
1296	272	<split-h>	<split-h>
1296	272	<name2>	<name2>
1296	1189	<>	<name>
1296	276	<aphaerese>	<aphaerese>
1296	1188	<>	<aphaerese>
1296	1188	<>	<elision3>
1296	1188	<>	<elision2>
1296	1188	<>	<elision1>
1296	280	.	υ
1296	394	s	υ
1296	280	.	u
1296	394	s	u
1296	697	.	κ
1296	727	s	κ
1296	780	s	k
1296	801	s	U
1296	900	s	K
1296	280	.	α
1296	856	s	α
1296	280	.	a
1296	856	s	a
1296	859	s	A
1296	862	s	λ
1296	865	s	l
1296	910	s	L
1296	645	<2s>	<>
1297	272	.	.
1297	273	 	 
1297	272	<~>	<~>
1297	272	<split-s>	<split-s>
1297	272	<split-h>	<split-h>
1297	272	<name2>	<name2>
1297	1210	<>	<name>
1297	276	<aphaerese>	<aphaerese>
1297	1209	<>	<aphaerese>
1297	1212	<elision3>	<elision3>
1297	1209	<>	<elision3>
1297	1212	<elision2>	<elision2>
1297	1209	<>	<elision2>
1297	1212	<elision1>	<elision1>
1297	1209	<>	<elision1>
1297	280	.	υ
1297	394	s	υ
1297	280	.	u
1297	394	s	u
1297	280	.	κ
1297	920	s	κ
1297	780	s	k
1297	801	s	U
1297	900	s	K
1297	280	.	α
1297	856	s	α
1297	280	.	a
1297	856	s	a
1297	859	s	A
1297	280	.	λ
1297	920	s	λ
1297	865	s	l
1297	910	s	L
1297	648	<2s>	<>
1298	272	.	.
1298	273	 	 
1298	272	<~>	<~>
1298	272	<split-s>	<split-s>
1298	272	<split-h>	<split-h>
1298	272	<name2>	<name2>
1298	927	<>	<name>
1298	276	<aphaerese>	<aphaerese>
1298	926	<>	<aphaerese>
1298	272	<elision3>	<elision3>
1298	926	<>	<elision3>
1298	272	<elision2>	<elision2>
1298	926	<>	<elision2>
1298	272	<elision1>	<elision1>
1298	926	<>	<elision1>
1298	280	.	υ
1298	394	s	υ
1298	280	.	u
1298	394	s	u
1298	929	.	κ
1298	920	s	κ
1298	780	s	k
1298	801	s	U
1298	900	s	K
1298	280	.	α
1298	856	s	α
1298	280	.	a
1298	856	s	a
1298	859	s	A
1298	929	.	λ
1298	920	s	λ
1298	865	s	l
1298	910	s	L
1298	651	<2s>	<>
1299	1252	<>	<name>
1299	1251	<>	<aphaerese>
1299	1251	<>	<elision3>
1299	1251	<>	<elision2>
1299	1251	<>	<elision1>
1299	1300	<U2kl>	<>
1300	932	.	.
1300	933	 	 
1300	932	<~>	<~>
1300	932	<split-s>	<split-s>
1300	932	<split-h>	<split-h>
1300	932	<name2>	<name2>
1300	958	<>	<name>
1300	936	<aphaerese>	<aphaerese>
1300	932	<>	<aphaerese>
1300	932	<elision3>	<elision3>
1300	932	<>	<elision3>
1300	932	<elision2>	<elision2>
1300	932	<>	<elision2>
1300	932	<elision1>	<elision1>
1300	932	<>	<elision1>
1300	929	.	υ
1300	856	s	υ
1300	929	.	u
1300	856	s	u
1300	940	.	κ
1300	946	s	κ
1300	865	s	k
1300	801	s	U
1300	956	s	K
1300	929	.	α
1300	856	s	α
1300	929	.	a
1300	856	s	a
1300	859	s	A
1300	865	s	λ
1300	865	s	l
1300	910	s	L
1300	655	<2s>	<>
1301	960	<name>	<name>
1301	1255	<>	<name>
1301	1257	<>	<aphaerese>
1301	1257	<>	<elision3>
1301	1257	<>	<elision2>
1301	1257	<>	<elision1>
1301	617	<2s>	<>
1301	1258	<A2kl>	<>
1301	1270	<L2kl>	<>
1301	1302	<K2kl>	<>
1302	932	.	.
1302	933	 	 
1302	932	<~>	<~>
1302	932	<split-s>	<split-s>
1302	932	<split-h>	<split-h>
1302	932	<name2>	<name2>
1302	960	<name2>	<name>
1302	968	<>	<name>
1302	936	<aphaerese>	<aphaerese>
1302	967	<>	<aphaerese>
1302	932	<elision3>	<elision3>
1302	967	<>	<elision3>
1302	932	<elision2>	<elision2>
1302	967	<>	<elision2>
1302	932	<elision1>	<elision1>
1302	967	<>	<elision1>
1302	929	.	υ
1302	856	s	υ
1302	929	.	u
1302	856	s	u
1302	970	s	κ
1302	865	s	k
1302	801	s	U
1302	956	s	K
1302	929	.	α
1302	856	s	α
1302	929	.	a
1302	856	s	a
1302	859	s	A
1302	970	s	λ
1302	865	s	l
1302	910	s	L
1302	659	<2s>	<>
1303	932	.	.
1303	933	 	 
1303	932	<~>	<~>
1303	932	<split-s>	<split-s>
1303	932	<split-h>	<split-h>
1303	932	<name2>	<name2>
1303	1280	<>	<name>
1303	936	<aphaerese>	<aphaerese>
1303	1279	<>	<aphaerese>
1303	1279	<>	<elision3>
1303	1279	<>	<elision2>
1303	1279	<>	<elision1>
1303	929	.	υ
1303	856	s	υ
1303	929	.	u
1303	856	s	u
1303	940	.	κ
1303	946	s	κ
1303	865	s	k
1303	801	s	U
1303	956	s	K
1303	929	.	α
1303	856	s	α
1303	929	.	a
1303	856	s	a
1303	859	s	A
1303	865	s	λ
1303	865	s	l
1303	910	s	L
1303	645	<2s>	<>
1304	1283	<>	<name>
1304	1282	<>	<aphaerese>
1304	1282	<>	<elision3>
1304	1282	<>	<elision2>
1304	1282	<>	<elision1>
1304	1300	<A2kl>	<>
1305	272	.	.
1305	273	 	 
1305	272	<~>	<~>
1305	272	<split-s>	<split-s>
1305	272	<split-h>	<split-h>
1305	272	<name2>	<name2>
1305	1286	<>	<name>
1305	276	<aphaerese>	<aphaerese>
1305	1285	<>	<aphaerese>
1305	272	<elision3>	<elision3>
1305	1285	<>	<elision3>
1305	272	<elision2>	<elision2>
1305	1285	<>	<elision2>
1305	272	<elision1>	<elision1>
1305	1285	<>	<elision1>
1305	280	.	υ
1305	394	s	υ
1305	280	.	u
1305	394	s	u
1305	280	.	κ
1305	920	s	κ
1305	780	s	k
1305	801	s	U
1305	900	s	K
1305	280	.	α
1305	856	s	α
1305	280	.	a
1305	856	s	a
1305	859	s	A
1305	280	.	λ
1305	920	s	λ
1305	865	s	l
1305	910	s	L
1305	651	<2s>	<>
1306	932	.	.
1306	933	 	 
1306	932	<~>	<~>
1306	932	<split-s>	<split-s>
1306	932	<split-h>	<split-h>
1306	932	<name2>	<name2>
1306	975	<>	<name>
1306	936	<aphaerese>	<aphaerese>
1306	974	<>	<aphaerese>
1306	932	<elision3>	<elision3>
1306	974	<>	<elision3>
1306	932	<elision2>	<elision2>
1306	974	<>	<elision2>
1306	932	<elision1>	<elision1>
1306	974	<>	<elision1>
1306	929	.	υ
1306	856	s	υ
1306	929	.	u
1306	856	s	u
1306	929	.	κ
1306	970	s	κ
1306	865	s	k
1306	801	s	U
1306	956	s	K
1306	929	.	α
1306	856	s	α
1306	929	.	a
1306	856	s	a
1306	859	s	A
1306	929	.	λ
1306	970	s	λ
1306	865	s	l
1306	910	s	L
1306	651	<2s>	<>
1307	960	<name>	<name>
1307	1289	<>	<name>
1307	1291	<>	<aphaerese>
1307	1291	<>	<elision3>
1307	1291	<>	<elision2>
1307	1291	<>	<elision1>
1307	617	<2s>	<>
1307	1258	<A2kl>	<>
1307	1308	<L2kl>	<>
1308	932	.	.
1308	933	 	 
1308	932	<~>	<~>
1308	932	<split-s>	<split-s>
1308	932	<split-h>	<split-h>
1308	932	<name2>	<name2>
1308	960	<name2>	<name>
1308	1293	<>	<name>
1308	936	<aphaerese>	<aphaerese>
1308	1292	<>	<aphaerese>
1308	932	<elision3>	<elision3>
1308	1292	<>	<elision3>
1308	932	<elision2>	<elision2>
1308	1292	<>	<elision2>
1308	932	<elision1>	<elision1>
1308	1292	<>	<elision1>
1308	929	.	υ
1308	856	s	υ
1308	929	.	u
1308	856	s	u
1308	1273	.	κ
1308	970	s	κ
1308	865	s	k
1308	801	s	U
1308	956	s	K
1308	929	.	α
1308	856	s	α
1308	929	.	a
1308	856	s	a
1308	859	s	A
1308	1273	.	λ
1308	970	s	λ
1308	865	s	l
1308	910	s	L
1308	664	<2s>	<>
1309	1177	.	.
1309	1178	 	 
1309	1177	<~>	<~>
1309	1177	<split-s>	<split-s>
1309	1177	<split-h>	<split-h>
1309	1177	<name2>	<name2>
1309	1181	<aphaerese>	<aphaerese>
1309	1181	<>	<aphaerese>
1309	1177	<elision3>	<elision3>
1309	1181	<>	<elision3>
1309	1177	<elision2>	<elision2>
1309	1181	<>	<elision2>
1309	1177	<elision1>	<elision1>
1309	1181	<>	<elision1>
1309	1177	.	υ
1309	1177	.	u
1309	1191	.	κ
1309	1209	s	κ
1309	926	s	k
1309	1251	s	U
1309	959	s	K
1309	1177	.	α
1309	1177	.	a
1309	1282	s	A
1309	1285	s	λ
1309	974	s	l
1309	977	s	L
1310	1177	.	.
1310	1178	 	 
1310	1177	<~>	<~>
1310	1177	<split-s>	<split-s>
1310	1177	<split-h>	<split-h>
1310	1177	<name2>	<name2>
1310	1181	<aphaerese>	<aphaerese>
1310	1184	<>	<aphaerese>
1310	1177	<elision3>	<elision3>
1310	1184	<>	<elision3>
1310	1177	<elision2>	<elision2>
1310	1184	<>	<elision2>
1310	1177	<elision1>	<elision1>
1310	1184	<>	<elision1>
1310	1185	.	υ
1310	1188	s	υ
1310	1185	.	u
1310	1188	s	u
1310	1191	.	κ
1310	1209	s	κ
1310	926	s	k
1310	1251	s	U
1310	1254	s	K
1310	1185	.	α
1310	1279	s	α
1310	1185	.	a
1310	1279	s	a
1310	1282	s	A
1310	1285	s	λ
1310	974	s	l
1310	1288	s	L
1311	1180	.	.
1311	1183	 	 
1311	1180	<~>	<~>
1311	1180	<split-s>	<split-s>
1311	1180	<split-h>	<split-h>
1311	1180	<name2>	<name2>
1311	1309	<aphaerese>	<aphaerese>
1311	1180	<>	<aphaerese>
1311	1180	<elision3>	<elision3>
1311	1180	<>	<elision3>
1311	1180	<elision2>	<elision2>
1311	1180	<>	<elision2>
1311	1180	<elision1>	<elision1>
1311	1180	<>	<elision1>
1311	1187	.	υ
1311	1190	s	υ
1311	1187	.	u
1311	1190	s	u
1311	1193	.	κ
1311	1211	s	κ
1311	928	s	k
1311	1253	s	U
1311	962	s	K
1311	1187	.	α
1311	1281	s	α
1311	1187	.	a
1311	1281	s	a
1311	1284	s	A
1311	1287	s	λ
1311	976	s	l
1311	979	s	L
1312	1180	.	.
1312	1183	 	 
1312	1180	<~>	<~>
1312	1180	<split-s>	<split-s>
1312	1180	<split-h>	<split-h>
1312	1180	<name2>	<name2>
1312	1309	<aphaerese>	<aphaerese>
1312	1313	<>	<aphaerese>
1312	1316	<elision3>	<elision3>
1312	1313	<>	<elision3>
1312	1316	<elision2>	<elision2>
1312	1313	<>	<elision2>
1312	1316	<elision1>	<elision1>
1312	1313	<>	<elision1>
1312	1187	.	υ
1312	1190	s	υ
1312	1187	.	u
1312	1190	s	u
1312	919	s	κ
1312	928	s	k
1312	1253	s	U
1312	962	s	K
1312	1187	.	α
1312	1281	s	α
1312	1187	.	a
1312	1281	s	a
1312	1284	s	A
1312	919	s	λ
1312	976	s	l
1312	979	s	L
1313	1177	.	.
1313	1178	 	 
1313	1177	<~>	<~>
1313	1177	<split-s>	<split-s>
1313	1177	<split-h>	<split-h>
1313	1177	<name2>	<name2>
1313	1181	<aphaerese>	<aphaerese>
1313	1176	<>	<aphaerese>
1313	1314	<elision3>	<elision3>
1313	1176	<>	<elision3>
1313	1314	<elision2>	<elision2>
1313	1176	<>	<elision2>
1313	1314	<elision1>	<elision1>
1313	1176	<>	<elision1>
1313	1185	.	υ
1313	1188	s	υ
1313	1185	.	u
1313	1188	s	u
1313	271	s	κ
1313	926	s	k
1313	1251	s	U
1313	959	s	K
1313	1185	.	α
1313	1279	s	α
1313	1185	.	a
1313	1279	s	a
1313	1282	s	A
1313	271	s	λ
1313	974	s	l
1313	977	s	L
1314	1177	.	.
1314	1178	 	 
1314	1177	<~>	<~>
1314	1177	<split-s>	<split-s>
1314	1177	<split-h>	<split-h>
1314	1177	<name2>	<name2>
1314	1315	<>	<name>
1314	1181	<aphaerese>	<aphaerese>
1314	1314	<>	<aphaerese>
1314	1177	<elision3>	<elision3>
1314	1314	<>	<elision3>
1314	1177	<elision2>	<elision2>
1314	1314	<>	<elision2>
1314	1177	<elision1>	<elision1>
1314	1314	<>	<elision1>
1314	1185	.	υ
1314	1188	s	υ
1314	1185	.	u
1314	1188	s	u
1314	1191	.	κ
1314	1317	s	κ
1314	1320	s	k
1314	1251	s	U
1314	1323	s	K
1314	1185	.	α
1314	1279	s	α
1314	1185	.	a
1314	1279	s	a
1314	1282	s	A
1314	1331	s	λ
1314	1334	s	l
1314	1337	s	L
1315	1180	.	.
1315	1183	 	 
1315	1180	<~>	<~>
1315	1180	<split-s>	<split-s>
1315	1180	<split-h>	<split-h>
1315	1180	<name2>	<name2>
1315	1309	<aphaerese>	<aphaerese>
1315	1316	<>	<aphaerese>
1315	1180	<elision3>	<elision3>
1315	1316	<>	<elision3>
1315	1180	<elision2>	<elision2>
1315	1316	<>	<elision2>
1315	1180	<elision1>	<elision1>
1315	1316	<>	<elision1>
1315	1187	.	υ
1315	1190	s	υ
1315	1187	.	u
1315	1190	s	u
1315	1193	.	κ
1315	1319	s	κ
1315	1322	s	k
1315	1253	s	U
1315	1325	s	K
1315	1187	.	α
1315	1281	s	α
1315	1187	.	a
1315	1281	s	a
1315	1284	s	A
1315	1333	s	λ
1315	1336	s	l
1315	1339	s	L
1316	1177	.	.
1316	1178	 	 
1316	1177	<~>	<~>
1316	1177	<split-s>	<split-s>
1316	1177	<split-h>	<split-h>
1316	1177	<name2>	<name2>
1316	1181	<aphaerese>	<aphaerese>
1316	1314	<>	<aphaerese>
1316	1177	<elision3>	<elision3>
1316	1314	<>	<elision3>
1316	1177	<elision2>	<elision2>
1316	1314	<>	<elision2>
1316	1177	<elision1>	<elision1>
1316	1314	<>	<elision1>
1316	1185	.	υ
1316	1188	s	υ
1316	1185	.	u
1316	1188	s	u
1316	1191	.	κ
1316	1317	s	κ
1316	1320	s	k
1316	1251	s	U
1316	1323	s	K
1316	1185	.	α
1316	1279	s	α
1316	1185	.	a
1316	1279	s	a
1316	1282	s	A
1316	1331	s	λ
1316	1334	s	l
1316	1337	s	L
1317	272	.	.
1317	273	 	 
1317	272	<~>	<~>
1317	272	<split-s>	<split-s>
1317	272	<split-h>	<split-h>
1317	272	<name2>	<name2>
1317	1318	<>	<name>
1317	276	<aphaerese>	<aphaerese>
1317	1317	<>	<aphaerese>
1317	1212	<elision3>	<elision3>
1317	1317	<>	<elision3>
1317	1212	<elision2>	<elision2>
1317	1317	<>	<elision2>
1317	1212	<elision1>	<elision1>
1317	1317	<>	<elision1>
1317	280	.	υ
1317	394	s	υ
1317	280	.	u
1317	394	s	u
1317	280	.	κ
1317	801	s	U
1317	280	.	α
1317	856	s	α
1317	280	.	a
1317	856	s	a
1317	859	s	A
1317	280	.	λ
1317	737	<2s>	<>
1318	275	.	.
1318	278	 	 
1318	275	<~>	<~>
1318	275	<split-s>	<split-s>
1318	275	<split-h>	<split-h>
1318	275	<name2>	<name2>
1318	899	<aphaerese>	<aphaerese>
1318	1319	<>	<aphaerese>
1318	1214	<elision3>	<elision3>
1318	1319	<>	<elision3>
1318	1214	<elision2>	<elision2>
1318	1319	<>	<elision2>
1318	1214	<elision1>	<elision1>
1318	1319	<>	<elision1>
1318	282	.	υ
1318	693	s	υ
1318	282	.	u
1318	693	s	u
1318	282	.	κ
1318	803	s	U
1318	282	.	α
1318	858	s	α
1318	282	.	a
1318	858	s	a
1318	861	s	A
1318	282	.	λ
1318	738	<2s>	<>
1319	272	.	.
1319	273	 	 
1319	272	<~>	<~>
1319	272	<split-s>	<split-s>
1319	272	<split-h>	<split-h>
1319	272	<name2>	<name2>
1319	276	<aphaerese>	<aphaerese>
1319	1317	<>	<aphaerese>
1319	1212	<elision3>	<elision3>
1319	1317	<>	<elision3>
1319	1212	<elision2>	<elision2>
1319	1317	<>	<elision2>
1319	1212	<elision1>	<elision1>
1319	1317	<>	<elision1>
1319	280	.	υ
1319	394	s	υ
1319	280	.	u
1319	394	s	u
1319	280	.	κ
1319	801	s	U
1319	280	.	α
1319	856	s	α
1319	280	.	a
1319	856	s	a
1319	859	s	A
1319	280	.	λ
1319	736	<2s>	<>
1320	272	.	.
1320	273	 	 
1320	272	<~>	<~>
1320	272	<split-s>	<split-s>
1320	272	<split-h>	<split-h>
1320	272	<name2>	<name2>
1320	1321	<>	<name>
1320	276	<aphaerese>	<aphaerese>
1320	1320	<>	<aphaerese>
1320	272	<elision3>	<elision3>
1320	1320	<>	<elision3>
1320	272	<elision2>	<elision2>
1320	1320	<>	<elision2>
1320	272	<elision1>	<elision1>
1320	1320	<>	<elision1>
1320	280	.	υ
1320	394	s	υ
1320	280	.	u
1320	394	s	u
1320	929	.	κ
1320	801	s	U
1320	280	.	α
1320	856	s	α
1320	280	.	a
1320	856	s	a
1320	859	s	A
1320	929	.	λ
1320	746	<2s>	<>
1321	275	.	.
1321	278	 	 
1321	275	<~>	<~>
1321	275	<split-s>	<split-s>
1321	275	<split-h>	<split-h>
1321	275	<name2>	<name2>
1321	899	<aphaerese>	<aphaerese>
1321	1322	<>	<aphaerese>
1321	275	<elision3>	<elision3>
1321	1322	<>	<elision3>
1321	275	<elision2>	<elision2>
1321	1322	<>	<elision2>
1321	275	<elision1>	<elision1>
1321	1322	<>	<elision1>
1321	282	.	υ
1321	693	s	υ
1321	282	.	u
1321	693	s	u
1321	931	.	κ
1321	803	s	U
1321	282	.	α
1321	858	s	α
1321	282	.	a
1321	858	s	a
1321	861	s	A
1321	931	.	λ
1321	747	<2s>	<>
1322	272	.	.
1322	273	 	 
1322	272	<~>	<~>
1322	272	<split-s>	<split-s>
1322	272	<split-h>	<split-h>
1322	272	<name2>	<name2>
1322	276	<aphaerese>	<aphaerese>
1322	1320	<>	<aphaerese>
1322	272	<elision3>	<elision3>
1322	1320	<>	<elision3>
1322	272	<elision2>	<elision2>
1322	1320	<>	<elision2>
1322	272	<elision1>	<elision1>
1322	1320	<>	<elision1>
1322	280	.	υ
1322	394	s	υ
1322	280	.	u
1322	394	s	u
1322	929	.	κ
1322	801	s	U
1322	280	.	α
1322	856	s	α
1322	280	.	a
1322	856	s	a
1322	859	s	A
1322	929	.	λ
1322	745	<2s>	<>
1323	960	<name>	<name>
1323	1324	<>	<name>
1323	1326	<>	<aphaerese>
1323	1326	<>	<elision3>
1323	1326	<>	<elision2>
1323	1326	<>	<elision1>
1323	617	<2s>	<>
1323	964	<L2kl>	<>
1323	1330	<K2kl>	<>
1324	1325	<>	<aphaerese>
1324	1325	<>	<elision3>
1324	1325	<>	<elision2>
1324	1325	<>	<elision1>
1324	965	<L2kl>	<>
1324	1328	<K2kl>	<>
1325	1326	<>	<aphaerese>
1325	1326	<>	<elision3>
1325	1326	<>	<elision2>
1325	1326	<>	<elision1>
1325	966	<L2kl>	<>
1325	1329	<K2kl>	<>
1326	1324	<>	<name>
1326	1326	<>	<aphaerese>
1326	1326	<>	<elision3>
1326	1326	<>	<elision2>
1326	1326	<>	<elision1>
1326	964	<L2kl>	<>
1326	1327	<K2kl>	<>
1327	932	.	.
1327	933	 	 
1327	932	<~>	<~>
1327	932	<split-s>	<split-s>
1327	932	<split-h>	<split-h>
1327	932	<name2>	<name2>
1327	1328	<>	<name>
1327	936	<aphaerese>	<aphaerese>
1327	1327	<>	<aphaerese>
1327	932	<elision3>	<elision3>
1327	1327	<>	<elision3>
1327	932	<elision2>	<elision2>
1327	1327	<>	<elision2>
1327	932	<elision1>	<elision1>
1327	1327	<>	<elision1>
1327	929	.	υ
1327	856	s	υ
1327	929	.	u
1327	856	s	u
1327	801	s	U
1327	929	.	α
1327	856	s	α
1327	929	.	a
1327	856	s	a
1327	859	s	A
1327	759	<2s>	<>
1328	935	.	.
1328	938	 	 
1328	935	<~>	<~>
1328	935	<split-s>	<split-s>
1328	935	<split-h>	<split-h>
1328	935	<name2>	<name2>
1328	955	<aphaerese>	<aphaerese>
1328	1329	<>	<aphaerese>
1328	935	<elision3>	<elision3>
1328	1329	<>	<elision3>
1328	935	<elision2>	<elision2>
1328	1329	<>	<elision2>
1328	935	<elision1>	<elision1>
1328	1329	<>	<elision1>
1328	931	.	υ
1328	858	s	υ
1328	931	.	u
1328	858	s	u
1328	803	s	U
1328	931	.	α
1328	858	s	α
1328	931	.	a
1328	858	s	a
1328	861	s	A
1328	760	<2s>	<>
1329	932	.	.
1329	933	 	 
1329	932	<~>	<~>
1329	932	<split-s>	<split-s>
1329	932	<split-h>	<split-h>
1329	932	<name2>	<name2>
1329	936	<aphaerese>	<aphaerese>
1329	1327	<>	<aphaerese>
1329	932	<elision3>	<elision3>
1329	1327	<>	<elision3>
1329	932	<elision2>	<elision2>
1329	1327	<>	<elision2>
1329	932	<elision1>	<elision1>
1329	1327	<>	<elision1>
1329	929	.	υ
1329	856	s	υ
1329	929	.	u
1329	856	s	u
1329	801	s	U
1329	929	.	α
1329	856	s	α
1329	929	.	a
1329	856	s	a
1329	859	s	A
1329	758	<2s>	<>
1330	932	.	.
1330	933	 	 
1330	932	<~>	<~>
1330	932	<split-s>	<split-s>
1330	932	<split-h>	<split-h>
1330	932	<name2>	<name2>
1330	960	<name2>	<name>
1330	1328	<>	<name>
1330	936	<aphaerese>	<aphaerese>
1330	1327	<>	<aphaerese>
1330	932	<elision3>	<elision3>
1330	1327	<>	<elision3>
1330	932	<elision2>	<elision2>
1330	1327	<>	<elision2>
1330	932	<elision1>	<elision1>
1330	1327	<>	<elision1>
1330	929	.	υ
1330	856	s	υ
1330	929	.	u
1330	856	s	u
1330	801	s	U
1330	929	.	α
1330	856	s	α
1330	929	.	a
1330	856	s	a
1330	859	s	A
1330	765	<2s>	<>
1331	272	.	.
1331	273	 	 
1331	272	<~>	<~>
1331	272	<split-s>	<split-s>
1331	272	<split-h>	<split-h>
1331	272	<name2>	<name2>
1331	1332	<>	<name>
1331	276	<aphaerese>	<aphaerese>
1331	1331	<>	<aphaerese>
1331	272	<elision3>	<elision3>
1331	1331	<>	<elision3>
1331	272	<elision2>	<elision2>
1331	1331	<>	<elision2>
1331	272	<elision1>	<elision1>
1331	1331	<>	<elision1>
1331	280	.	υ
1331	394	s	υ
1331	280	.	u
1331	394	s	u
1331	280	.	κ
1331	801	s	U
1331	280	.	α
1331	856	s	α
1331	280	.	a
1331	856	s	a
1331	859	s	A
1331	280	.	λ
1331	746	<2s>	<>
1332	275	.	.
1332	278	 	 
1332	275	<~>	<~>
1332	275	<split-s>	<split-s>
1332	275	<split-h>	<split-h>
1332	275	<name2>	<name2>
1332	899	<aphaerese>	<aphaerese>
1332	1333	<>	<aphaerese>
1332	275	<elision3>	<elision3>
1332	1333	<>	<elision3>
1332	275	<elision2>	<elision2>
1332	1333	<>	<elision2>
1332	275	<elision1>	<elision1>
1332	1333	<>	<elision1>
1332	282	.	υ
1332	693	s	υ
1332	282	.	u
1332	693	s	u
1332	282	.	κ
1332	803	s	U
1332	282	.	α
1332	858	s	α
1332	282	.	a
1332	858	s	a
1332	861	s	A
1332	282	.	λ
1332	747	<2s>	<>
1333	272	.	.
1333	273	 	 
1333	272	<~>	<~>
1333	272	<split-s>	<split-s>
1333	272	<split-h>	<split-h>
1333	272	<name2>	<name2>
1333	276	<aphaerese>	<aphaerese>
1333	1331	<>	<aphaerese>
1333	272	<elision3>	<elision3>
1333	1331	<>	<elision3>
1333	272	<elision2>	<elision2>
1333	1331	<>	<elision2>
1333	272	<elision1>	<elision1>
1333	1331	<>	<elision1>
1333	280	.	υ
1333	394	s	υ
1333	280	.	u
1333	394	s	u
1333	280	.	κ
1333	801	s	U
1333	280	.	α
1333	856	s	α
1333	280	.	a
1333	856	s	a
1333	859	s	A
1333	280	.	λ
1333	745	<2s>	<>
1334	932	.	.
1334	933	 	 
1334	932	<~>	<~>
1334	932	<split-s>	<split-s>
1334	932	<split-h>	<split-h>
1334	932	<name2>	<name2>
1334	1335	<>	<name>
1334	936	<aphaerese>	<aphaerese>
1334	1334	<>	<aphaerese>
1334	932	<elision3>	<elision3>
1334	1334	<>	<elision3>
1334	932	<elision2>	<elision2>
1334	1334	<>	<elision2>
1334	932	<elision1>	<elision1>
1334	1334	<>	<elision1>
1334	929	.	υ
1334	856	s	υ
1334	929	.	u
1334	856	s	u
1334	929	.	κ
1334	801	s	U
1334	929	.	α
1334	856	s	α
1334	929	.	a
1334	856	s	a
1334	859	s	A
1334	929	.	λ
1334	746	<2s>	<>
1335	935	.	.
1335	938	 	 
1335	935	<~>	<~>
1335	935	<split-s>	<split-s>
1335	935	<split-h>	<split-h>
1335	935	<name2>	<name2>
1335	955	<aphaerese>	<aphaerese>
1335	1336	<>	<aphaerese>
1335	935	<elision3>	<elision3>
1335	1336	<>	<elision3>
1335	935	<elision2>	<elision2>
1335	1336	<>	<elision2>
1335	935	<elision1>	<elision1>
1335	1336	<>	<elision1>
1335	931	.	υ
1335	858	s	υ
1335	931	.	u
1335	858	s	u
1335	931	.	κ
1335	803	s	U
1335	931	.	α
1335	858	s	α
1335	931	.	a
1335	858	s	a
1335	861	s	A
1335	931	.	λ
1335	747	<2s>	<>
1336	932	.	.
1336	933	 	 
1336	932	<~>	<~>
1336	932	<split-s>	<split-s>
1336	932	<split-h>	<split-h>
1336	932	<name2>	<name2>
1336	936	<aphaerese>	<aphaerese>
1336	1334	<>	<aphaerese>
1336	932	<elision3>	<elision3>
1336	1334	<>	<elision3>
1336	932	<elision2>	<elision2>
1336	1334	<>	<elision2>
1336	932	<elision1>	<elision1>
1336	1334	<>	<elision1>
1336	929	.	υ
1336	856	s	υ
1336	929	.	u
1336	856	s	u
1336	929	.	κ
1336	801	s	U
1336	929	.	α
1336	856	s	α
1336	929	.	a
1336	856	s	a
1336	859	s	A
1336	929	.	λ
1336	745	<2s>	<>
1337	960	<name>	<name>
1337	1338	<>	<name>
1337	1340	<>	<aphaerese>
1337	1340	<>	<elision3>
1337	1340	<>	<elision2>
1337	1340	<>	<elision1>
1337	617	<2s>	<>
1337	1341	<L2kl>	<>
1338	1339	<>	<aphaerese>
1338	1339	<>	<elision3>
1338	1339	<>	<elision2>
1338	1339	<>	<elision1>
1338	1335	<L2kl>	<>
1339	1340	<>	<aphaerese>
1339	1340	<>	<elision3>
1339	1340	<>	<elision2>
1339	1340	<>	<elision1>
1339	1336	<L2kl>	<>
1340	1338	<>	<name>
1340	1340	<>	<aphaerese>
1340	1340	<>	<elision3>
1340	1340	<>	<elision2>
1340	1340	<>	<elision1>
1340	1334	<L2kl>	<>
1341	932	.	.
1341	933	 	 
1341	932	<~>	<~>
1341	932	<split-s>	<split-s>
1341	932	<split-h>	<split-h>
1341	932	<name2>	<name2>
1341	960	<name2>	<name>
1341	1335	<>	<name>
1341	936	<aphaerese>	<aphaerese>
1341	1334	<>	<aphaerese>
1341	932	<elision3>	<elision3>
1341	1334	<>	<elision3>
1341	932	<elision2>	<elision2>
1341	1334	<>	<elision2>
1341	932	<elision1>	<elision1>
1341	1334	<>	<elision1>
1341	929	.	υ
1341	856	s	υ
1341	929	.	u
1341	856	s	u
1341	929	.	κ
1341	801	s	U
1341	929	.	α
1341	856	s	α
1341	929	.	a
1341	856	s	a
1341	859	s	A
1341	929	.	λ
1341	772	<2s>	<>
1342	1343	.	.
1342	1344	 	 
1342	1343	<~>	<~>
1342	1343	<split-s>	<split-s>
1342	1343	<split-h>	<split-h>
1342	1343	<name2>	<name2>
1342	1458	<>	<name>
1342	1347	<aphaerese>	<aphaerese>
1342	1342	<>	<aphaerese>
1342	1460	<elision3>	<elision3>
1342	1342	<>	<elision3>
1342	1460	<elision2>	<elision2>
1342	1342	<>	<elision2>
1342	1460	<elision1>	<elision1>
1342	1342	<>	<elision1>
1342	1351	.	υ
1342	1354	s	υ
1342	1351	.	u
1342	1354	s	u
1342	985	s	κ
1342	1110	s	k
1342	1400	s	U
1342	1128	s	K
1342	1351	.	α
1342	1425	s	α
1342	1351	.	a
1342	1425	s	a
1342	1428	s	A
1342	985	s	λ
1342	1141	s	l
1342	1144	s	L
1342	1489	<1s>	<>
1343	1343	.	.
1343	1344	 	 
1343	1343	<~>	<~>
1343	1343	<split-s>	<split-s>
1343	1343	<split-h>	<split-h>
1343	1343	<name2>	<name2>
1343	1457	<>	<name>
1343	1347	<aphaerese>	<aphaerese>
1343	1343	<>	<aphaerese>
1343	1343	<elision3>	<elision3>
1343	1343	<>	<elision3>
1343	1343	<elision2>	<elision2>
1343	1343	<>	<elision2>
1343	1343	<elision1>	<elision1>
1343	1343	<>	<elision1>
1343	1351	.	υ
1343	1354	s	υ
1343	1351	.	u
1343	1354	s	u
1343	1357	.	κ
1343	1375	s	κ
1343	1110	s	k
1343	1400	s	U
1343	1128	s	K
1343	1351	.	α
1343	1425	s	α
1343	1351	.	a
1343	1425	s	a
1343	1428	s	A
1343	1431	s	λ
1343	1141	s	l
1343	1144	s	L
1343	435	<1s>	<>
1344	1343	.	.
1344	1344	 	 
1344	1343	<~>	<~>
1344	1343	<split-s>	<split-s>
1344	1343	<split-h>	<split-h>
1344	1343	<name2>	<name2>
1344	1345	<>	<name>
1344	1347	<aphaerese>	<aphaerese>
1344	1350	<>	<aphaerese>
1344	1343	<elision3>	<elision3>
1344	1350	<>	<elision3>
1344	1343	<elision2>	<elision2>
1344	1350	<>	<elision2>
1344	1343	<elision1>	<elision1>
1344	1350	<>	<elision1>
1344	1351	.	υ
1344	1442	s	υ
1344	1351	.	u
1344	1442	s	u
1344	1357	.	κ
1344	1443	s	κ
1344	1444	s	k
1344	1445	s	U
1344	1447	s	K
1344	1351	.	α
1344	1449	s	α
1344	1351	.	a
1344	1449	s	a
1344	1450	s	A
1344	1451	s	λ
1344	1452	s	l
1344	1453	s	L
1344	435	<1s>	<>
1345	1346	.	.
1345	1349	 	 
1345	1346	<~>	<~>
1345	1346	<split-s>	<split-s>
1345	1346	<split-h>	<split-h>
1345	1346	<name2>	<name2>
1345	1455	<aphaerese>	<aphaerese>
1345	1456	<>	<aphaerese>
1345	1346	<elision3>	<elision3>
1345	1456	<>	<elision3>
1345	1346	<elision2>	<elision2>
1345	1456	<>	<elision2>
1345	1346	<elision1>	<elision1>
1345	1456	<>	<elision1>
1345	1353	.	υ
1345	1356	s	υ
1345	1353	.	u
1345	1356	s	u
1345	1359	.	κ
1345	1377	s	κ
1345	1112	s	k
1345	1402	s	U
1345	1405	s	K
1345	1353	.	α
1345	1427	s	α
1345	1353	.	a
1345	1427	s	a
1345	1430	s	A
1345	1433	s	λ
1345	1143	s	l
1345	1436	s	L
1345	436	<1s>	<>
1346	1343	.	.
1346	1344	 	 
1346	1343	<~>	<~>
1346	1343	<split-s>	<split-s>
1346	1343	<split-h>	<split-h>
1346	1343	<name2>	<name2>
1346	1347	<aphaerese>	<aphaerese>
1346	1343	<>	<aphaerese>
1346	1343	<elision3>	<elision3>
1346	1343	<>	<elision3>
1346	1343	<elision2>	<elision2>
1346	1343	<>	<elision2>
1346	1343	<elision1>	<elision1>
1346	1343	<>	<elision1>
1346	1351	.	υ
1346	1354	s	υ
1346	1351	.	u
1346	1354	s	u
1346	1357	.	κ
1346	1375	s	κ
1346	1110	s	k
1346	1400	s	U
1346	1128	s	K
1346	1351	.	α
1346	1425	s	α
1346	1351	.	a
1346	1425	s	a
1346	1428	s	A
1346	1431	s	λ
1346	1141	s	l
1346	1144	s	L
1346	434	<1s>	<>
1347	1343	.	.
1347	1344	 	 
1347	1343	<~>	<~>
1347	1343	<split-s>	<split-s>
1347	1343	<split-h>	<split-h>
1347	1343	<name2>	<name2>
1347	1348	<>	<name>
1347	1347	<aphaerese>	<aphaerese>
1347	1347	<>	<aphaerese>
1347	1343	<elision3>	<elision3>
1347	1347	<>	<elision3>
1347	1343	<elision2>	<elision2>
1347	1347	<>	<elision2>
1347	1343	<elision1>	<elision1>
1347	1347	<>	<elision1>
1347	1343	.	υ
1347	1343	.	u
1347	1357	.	κ
1347	1375	s	κ
1347	1110	s	k
1347	1400	s	U
1347	1128	s	K
1347	1343	.	α
1347	1343	.	a
1347	1428	s	A
1347	1431	s	λ
1347	1141	s	l
1347	1144	s	L
1347	429	<1s>	<>
1348	1346	.	.
1348	1349	 	 
1348	1346	<~>	<~>
1348	1346	<split-s>	<split-s>
1348	1346	<split-h>	<split-h>
1348	1346	<name2>	<name2>
1348	1455	<aphaerese>	<aphaerese>
1348	1455	<>	<aphaerese>
1348	1346	<elision3>	<elision3>
1348	1455	<>	<elision3>
1348	1346	<elision2>	<elision2>
1348	1455	<>	<elision2>
1348	1346	<elision1>	<elision1>
1348	1455	<>	<elision1>
1348	1346	.	υ
1348	1346	.	u
1348	1359	.	κ
1348	1377	s	κ
1348	1112	s	k
1348	1402	s	U
1348	1131	s	K
1348	1346	.	α
1348	1346	.	a
1348	1430	s	A
1348	1433	s	λ
1348	1143	s	l
1348	1146	s	L
1348	430	<1s>	<>
1349	1343	.	.
1349	1344	 	 
1349	1343	<~>	<~>
1349	1343	<split-s>	<split-s>
1349	1343	<split-h>	<split-h>
1349	1343	<name2>	<name2>
1349	1347	<aphaerese>	<aphaerese>
1349	1350	<>	<aphaerese>
1349	1343	<elision3>	<elision3>
1349	1350	<>	<elision3>
1349	1343	<elision2>	<elision2>
1349	1350	<>	<elision2>
1349	1343	<elision1>	<elision1>
1349	1350	<>	<elision1>
1349	1351	.	υ
1349	1442	s	υ
1349	1351	.	u
1349	1442	s	u
1349	1357	.	κ
1349	1443	s	κ
1349	1444	s	k
1349	1445	s	U
1349	1447	s	K
1349	1351	.	α
1349	1449	s	α
1349	1351	.	a
1349	1449	s	a
1349	1450	s	A
1349	1451	s	λ
1349	1452	s	l
1349	1453	s	L
1349	434	<1s>	<>
1350	1343	.	.
1350	1344	 	 
1350	1343	<~>	<~>
1350	1343	<split-s>	<split-s>
1350	1343	<split-h>	<split-h>
1350	1343	<name2>	<name2>
1350	1345	<>	<name>
1350	1347	<aphaerese>	<aphaerese>
1350	1350	<>	<aphaerese>
1350	1343	<elision3>	<elision3>
1350	1350	<>	<elision3>
1350	1343	<elision2>	<elision2>
1350	1350	<>	<elision2>
1350	1343	<elision1>	<elision1>
1350	1350	<>	<elision1>
1350	1351	.	υ
1350	1354	s	υ
1350	1351	.	u
1350	1354	s	u
1350	1357	.	κ
1350	1375	s	κ
1350	1110	s	k
1350	1400	s	U
1350	1403	s	K
1350	1351	.	α
1350	1425	s	α
1350	1351	.	a
1350	1425	s	a
1350	1428	s	A
1350	1431	s	λ
1350	1141	s	l
1350	1434	s	L
1350	435	<1s>	<>
1351	1352	<>	<name>
1351	1351	<>	<aphaerese>
1351	1343	<elision3>	<elision3>
1351	1351	<>	<elision3>
1351	1343	<elision2>	<elision2>
1351	1351	<>	<elision2>
1351	1343	<elision1>	<elision1>
1351	1351	<>	<elision1>
1351	284	<1s>	<>
1352	1353	<>	<aphaerese>
1352	1346	<elision3>	<elision3>
1352	1353	<>	<elision3>
1352	1346	<elision2>	<elision2>
1352	1353	<>	<elision2>
1352	1346	<elision1>	<elision1>
1352	1353	<>	<elision1>
1352	285	<1s>	<>
1353	1351	<>	<aphaerese>
1353	1343	<elision3>	<elision3>
1353	1351	<>	<elision3>
1353	1343	<elision2>	<elision2>
1353	1351	<>	<elision2>
1353	1343	<elision1>	<elision1>
1353	1351	<>	<elision1>
1353	283	<1s>	<>
1354	986	.	.
1354	987	 	 
1354	986	<~>	<~>
1354	986	<split-s>	<split-s>
1354	986	<split-h>	<split-h>
1354	986	<name2>	<name2>
1354	1355	<>	<name>
1354	990	<aphaerese>	<aphaerese>
1354	1354	<>	<aphaerese>
1354	1354	<>	<elision3>
1354	1354	<>	<elision2>
1354	1354	<>	<elision1>
1354	994	.	υ
1354	997	s	υ
1354	994	.	u
1354	997	s	u
1354	1015	.	κ
1354	1030	s	κ
1354	1036	s	k
1354	1039	s	U
1354	1091	s	K
1354	994	.	α
1354	997	s	α
1354	994	.	a
1354	997	s	a
1354	1069	s	A
1354	1036	s	λ
1354	1036	s	l
1354	1098	s	L
1354	440	<2s>	<>
1355	989	.	.
1355	992	 	 
1355	989	<~>	<~>
1355	989	<split-s>	<split-s>
1355	989	<split-h>	<split-h>
1355	989	<name2>	<name2>
1355	1090	<aphaerese>	<aphaerese>
1355	1356	<>	<aphaerese>
1355	1356	<>	<elision3>
1355	1356	<>	<elision2>
1355	1356	<>	<elision1>
1355	996	.	υ
1355	1014	s	υ
1355	996	.	u
1355	1014	s	u
1355	1017	.	κ
1355	1032	s	κ
1355	1038	s	k
1355	1041	s	U
1355	1093	s	K
1355	996	.	α
1355	1014	s	α
1355	996	.	a
1355	1014	s	a
1355	1071	s	A
1355	1038	s	λ
1355	1038	s	l
1355	1100	s	L
1355	441	<2s>	<>
1356	986	.	.
1356	987	 	 
1356	986	<~>	<~>
1356	986	<split-s>	<split-s>
1356	986	<split-h>	<split-h>
1356	986	<name2>	<name2>
1356	990	<aphaerese>	<aphaerese>
1356	1354	<>	<aphaerese>
1356	1354	<>	<elision3>
1356	1354	<>	<elision2>
1356	1354	<>	<elision1>
1356	994	.	υ
1356	997	s	υ
1356	994	.	u
1356	997	s	u
1356	1015	.	κ
1356	1030	s	κ
1356	1036	s	k
1356	1039	s	U
1356	1091	s	K
1356	994	.	α
1356	997	s	α
1356	994	.	a
1356	997	s	a
1356	1069	s	A
1356	1036	s	λ
1356	1036	s	l
1356	1098	s	L
1356	439	<2s>	<>
1357	1358	<>	<name>
1357	1357	<>	<aphaerese>
1357	1360	<elision3>	<elision3>
1357	1357	<>	<elision3>
1357	1360	<elision2>	<elision2>
1357	1357	<>	<elision2>
1357	1360	<elision1>	<elision1>
1357	1357	<>	<elision1>
1357	426	<1s>	<>
1358	1359	<>	<aphaerese>
1358	1362	<elision3>	<elision3>
1358	1359	<>	<elision3>
1358	1362	<elision2>	<elision2>
1358	1359	<>	<elision2>
1358	1362	<elision1>	<elision1>
1358	1359	<>	<elision1>
1358	427	<1s>	<>
1359	1357	<>	<aphaerese>
1359	1360	<elision3>	<elision3>
1359	1357	<>	<elision3>
1359	1360	<elision2>	<elision2>
1359	1357	<>	<elision2>
1359	1360	<elision1>	<elision1>
1359	1357	<>	<elision1>
1359	425	<1s>	<>
1360	1361	<>	<name>
1360	1360	<>	<aphaerese>
1360	1360	<>	<elision3>
1360	1360	<>	<elision2>
1360	1360	<>	<elision1>
1360	1363	s	κ
1360	1363	s	k
1360	1366	s	K
1360	1363	s	λ
1360	1370	s	l
1360	1372	s	L
1360	423	<1s>	<>
1361	1362	<>	<aphaerese>
1361	1362	<>	<elision3>
1361	1362	<>	<elision2>
1361	1362	<>	<elision1>
1361	1365	s	κ
1361	1365	s	k
1361	1368	s	K
1361	1365	s	λ
1361	1369	s	l
1361	1374	s	L
1361	424	<1s>	<>
1362	1360	<>	<aphaerese>
1362	1360	<>	<elision3>
1362	1360	<>	<elision2>
1362	1360	<>	<elision1>
1362	1363	s	κ
1362	1363	s	k
1362	1366	s	K
1362	1363	s	λ
1362	1370	s	l
1362	1372	s	L
1362	422	<1s>	<>
1363	1364	<>	<name>
1363	1363	<>	<aphaerese>
1363	1363	<>	<elision3>
1363	1363	<>	<elision2>
1363	1363	<>	<elision1>
1363	1107	s	κ
1363	1036	s	k
1363	1091	s	K
1363	1107	s	λ
1363	1036	s	l
1363	1098	s	L
1363	455	<2s>	<>
1364	1365	<>	<aphaerese>
1364	1365	<>	<elision3>
1364	1365	<>	<elision2>
1364	1365	<>	<elision1>
1364	1109	s	κ
1364	1038	s	k
1364	1093	s	K
1364	1109	s	λ
1364	1038	s	l
1364	1100	s	L
1364	456	<2s>	<>
1365	1363	<>	<aphaerese>
1365	1363	<>	<elision3>
1365	1363	<>	<elision2>
1365	1363	<>	<elision1>
1365	1107	s	κ
1365	1036	s	k
1365	1091	s	K
1365	1107	s	λ
1365	1036	s	l
1365	1098	s	L
1365	454	<2s>	<>
1366	1367	<>	<name>
1366	1366	<>	<aphaerese>
1366	1366	<>	<elision3>
1366	1366	<>	<elision2>
1366	1366	<>	<elision1>
1366	1370	<K2kl>	<>
1367	1368	<>	<aphaerese>
1367	1368	<>	<elision3>
1367	1368	<>	<elision2>
1367	1368	<>	<elision1>
1367	1371	<K2kl>	<>
1368	1366	<>	<aphaerese>
1368	1366	<>	<elision3>
1368	1366	<>	<elision2>
1368	1366	<>	<elision1>
1368	1369	<K2kl>	<>
1369	1370	<>	<aphaerese>
1369	1370	<>	<elision3>
1369	1370	<>	<elision2>
1369	1370	<>	<elision1>
1369	454	<2s>	<>
1370	1371	<>	<name>
1370	1370	<>	<aphaerese>
1370	1370	<>	<elision3>
1370	1370	<>	<elision2>
1370	1370	<>	<elision1>
1370	455	<2s>	<>
1371	1369	<>	<aphaerese>
1371	1369	<>	<elision3>
1371	1369	<>	<elision2>
1371	1369	<>	<elision1>
1371	456	<2s>	<>
1372	1373	<>	<name>
1372	1372	<>	<aphaerese>
1372	1372	<>	<elision3>
1372	1372	<>	<elision2>
1372	1372	<>	<elision1>
1372	1370	<L2kl>	<>
1373	1374	<>	<aphaerese>
1373	1374	<>	<elision3>
1373	1374	<>	<elision2>
1373	1374	<>	<elision1>
1373	1371	<L2kl>	<>
1374	1372	<>	<aphaerese>
1374	1372	<>	<elision3>
1374	1372	<>	<elision2>
1374	1372	<>	<elision1>
1374	1369	<L2kl>	<>
1375	986	.	.
1375	987	 	 
1375	986	<~>	<~>
1375	986	<split-s>	<split-s>
1375	986	<split-h>	<split-h>
1375	986	<name2>	<name2>
1375	1376	<>	<name>
1375	990	<aphaerese>	<aphaerese>
1375	1375	<>	<aphaerese>
1375	1378	<elision3>	<elision3>
1375	1375	<>	<elision3>
1375	1378	<elision2>	<elision2>
1375	1375	<>	<elision2>
1375	1378	<elision1>	<elision1>
1375	1375	<>	<elision1>
1375	994	.	υ
1375	997	s	υ
1375	994	.	u
1375	997	s	u
1375	994	.	κ
1375	1107	s	κ
1375	1036	s	k
1375	1039	s	U
1375	1091	s	K
1375	994	.	α
1375	997	s	α
1375	994	.	a
1375	997	s	a
1375	1069	s	A
1375	994	.	λ
1375	1107	s	λ
1375	1036	s	l
1375	1098	s	L
1375	518	<2s>	<>
1376	989	.	.
1376	992	 	 
1376	989	<~>	<~>
1376	989	<split-s>	<split-s>
1376	989	<split-h>	<split-h>
1376	989	<name2>	<name2>
1376	1090	<aphaerese>	<aphaerese>
1376	1377	<>	<aphaerese>
1376	1380	<elision3>	<elision3>
1376	1377	<>	<elision3>
1376	1380	<elision2>	<elision2>
1376	1377	<>	<elision2>
1376	1380	<elision1>	<elision1>
1376	1377	<>	<elision1>
1376	996	.	υ
1376	1014	s	υ
1376	996	.	u
1376	1014	s	u
1376	996	.	κ
1376	1109	s	κ
1376	1038	s	k
1376	1041	s	U
1376	1093	s	K
1376	996	.	α
1376	1014	s	α
1376	996	.	a
1376	1014	s	a
1376	1071	s	A
1376	996	.	λ
1376	1109	s	λ
1376	1038	s	l
1376	1100	s	L
1376	519	<2s>	<>
1377	986	.	.
1377	987	 	 
1377	986	<~>	<~>
1377	986	<split-s>	<split-s>
1377	986	<split-h>	<split-h>
1377	986	<name2>	<name2>
1377	990	<aphaerese>	<aphaerese>
1377	1375	<>	<aphaerese>
1377	1378	<elision3>	<elision3>
1377	1375	<>	<elision3>
1377	1378	<elision2>	<elision2>
1377	1375	<>	<elision2>
1377	1378	<elision1>	<elision1>
1377	1375	<>	<elision1>
1377	994	.	υ
1377	997	s	υ
1377	994	.	u
1377	997	s	u
1377	994	.	κ
1377	1107	s	κ
1377	1036	s	k
1377	1039	s	U
1377	1091	s	K
1377	994	.	α
1377	997	s	α
1377	994	.	a
1377	997	s	a
1377	1069	s	A
1377	994	.	λ
1377	1107	s	λ
1377	1036	s	l
1377	1098	s	L
1377	517	<2s>	<>
1378	986	.	.
1378	987	 	 
1378	986	<~>	<~>
1378	986	<split-s>	<split-s>
1378	986	<split-h>	<split-h>
1378	986	<name2>	<name2>
1378	1379	<>	<name>
1378	990	<aphaerese>	<aphaerese>
1378	1378	<>	<aphaerese>
1378	986	<elision3>	<elision3>
1378	1378	<>	<elision3>
1378	986	<elision2>	<elision2>
1378	1378	<>	<elision2>
1378	986	<elision1>	<elision1>
1378	1378	<>	<elision1>
1378	994	.	υ
1378	997	s	υ
1378	994	.	u
1378	997	s	u
1378	1015	.	κ
1378	1381	s	κ
1378	1384	s	k
1378	1039	s	U
1378	1387	s	K
1378	994	.	α
1378	997	s	α
1378	994	.	a
1378	997	s	a
1378	1069	s	A
1378	1384	s	λ
1378	1384	s	l
1378	1395	s	L
1378	488	<2s>	<>
1379	989	.	.
1379	992	 	 
1379	989	<~>	<~>
1379	989	<split-s>	<split-s>
1379	989	<split-h>	<split-h>
1379	989	<name2>	<name2>
1379	1090	<aphaerese>	<aphaerese>
1379	1380	<>	<aphaerese>
1379	989	<elision3>	<elision3>
1379	1380	<>	<elision3>
1379	989	<elision2>	<elision2>
1379	1380	<>	<elision2>
1379	989	<elision1>	<elision1>
1379	1380	<>	<elision1>
1379	996	.	υ
1379	1014	s	υ
1379	996	.	u
1379	1014	s	u
1379	1017	.	κ
1379	1383	s	κ
1379	1386	s	k
1379	1041	s	U
1379	1389	s	K
1379	996	.	α
1379	1014	s	α
1379	996	.	a
1379	1014	s	a
1379	1071	s	A
1379	1386	s	λ
1379	1386	s	l
1379	1397	s	L
1379	489	<2s>	<>
1380	986	.	.
1380	987	 	 
1380	986	<~>	<~>
1380	986	<split-s>	<split-s>
1380	986	<split-h>	<split-h>
1380	986	<name2>	<name2>
1380	990	<aphaerese>	<aphaerese>
1380	1378	<>	<aphaerese>
1380	986	<elision3>	<elision3>
1380	1378	<>	<elision3>
1380	986	<elision2>	<elision2>
1380	1378	<>	<elision2>
1380	986	<elision1>	<elision1>
1380	1378	<>	<elision1>
1380	994	.	υ
1380	997	s	υ
1380	994	.	u
1380	997	s	u
1380	1015	.	κ
1380	1381	s	κ
1380	1384	s	k
1380	1039	s	U
1380	1387	s	K
1380	994	.	α
1380	997	s	α
1380	994	.	a
1380	997	s	a
1380	1069	s	A
1380	1384	s	λ
1380	1384	s	l
1380	1395	s	L
1380	487	<2s>	<>
1381	998	.	.
1381	998	 	 
1381	998	<~>	<~>
1381	998	<split-s>	<split-s>
1381	998	<split-h>	<split-h>
1381	998	<name2>	<name2>
1381	1382	<>	<name>
1381	1001	<aphaerese>	<aphaerese>
1381	1381	<>	<aphaerese>
1381	1033	<elision3>	<elision3>
1381	1381	<>	<elision3>
1381	1033	<elision2>	<elision2>
1381	1381	<>	<elision2>
1381	1033	<elision1>	<elision1>
1381	1381	<>	<elision1>
1381	1010	.	υ
1381	1010	.	u
1381	1010	.	κ
1381	1010	.	α
1381	1010	.	a
1381	1010	.	λ
1381	1219	<split-s>	<>
1382	1000	.	.
1382	1000	 	 
1382	1000	<~>	<~>
1382	1000	<split-s>	<split-s>
1382	1000	<split-h>	<split-h>
1382	1000	<name2>	<name2>
1382	1003	<aphaerese>	<aphaerese>
1382	1383	<>	<aphaerese>
1382	1035	<elision3>	<elision3>
1382	1383	<>	<elision3>
1382	1035	<elision2>	<elision2>
1382	1383	<>	<elision2>
1382	1035	<elision1>	<elision1>
1382	1383	<>	<elision1>
1382	1012	.	υ
1382	1012	.	u
1382	1012	.	κ
1382	1012	.	α
1382	1012	.	a
1382	1012	.	λ
1382	1220	<split-s>	<>
1383	998	.	.
1383	998	 	 
1383	998	<~>	<~>
1383	998	<split-s>	<split-s>
1383	998	<split-h>	<split-h>
1383	998	<name2>	<name2>
1383	1001	<aphaerese>	<aphaerese>
1383	1381	<>	<aphaerese>
1383	1033	<elision3>	<elision3>
1383	1381	<>	<elision3>
1383	1033	<elision2>	<elision2>
1383	1381	<>	<elision2>
1383	1033	<elision1>	<elision1>
1383	1381	<>	<elision1>
1383	1010	.	υ
1383	1010	.	u
1383	1010	.	κ
1383	1010	.	α
1383	1010	.	a
1383	1010	.	λ
1383	1218	<split-s>	<>
1384	998	.	.
1384	998	 	 
1384	998	<~>	<~>
1384	998	<split-s>	<split-s>
1384	998	<split-h>	<split-h>
1384	998	<name2>	<name2>
1384	1385	<>	<name>
1384	1001	<aphaerese>	<aphaerese>
1384	1384	<>	<aphaerese>
1384	998	<elision3>	<elision3>
1384	1384	<>	<elision3>
1384	998	<elision2>	<elision2>
1384	1384	<>	<elision2>
1384	998	<elision1>	<elision1>
1384	1384	<>	<elision1>
1384	1010	.	υ
1384	1010	.	u
1384	1010	.	κ
1384	1010	.	α
1384	1010	.	a
1384	1010	.	λ
1384	1225	<split-s>	<>
1385	1000	.	.
1385	1000	 	 
1385	1000	<~>	<~>
1385	1000	<split-s>	<split-s>
1385	1000	<split-h>	<split-h>
1385	1000	<name2>	<name2>
1385	1003	<aphaerese>	<aphaerese>
1385	1386	<>	<aphaerese>
1385	1000	<elision3>	<elision3>
1385	1386	<>	<elision3>
1385	1000	<elision2>	<elision2>
1385	1386	<>	<elision2>
1385	1000	<elision1>	<elision1>
1385	1386	<>	<elision1>
1385	1012	.	υ
1385	1012	.	u
1385	1012	.	κ
1385	1012	.	α
1385	1012	.	a
1385	1012	.	λ
1385	1226	<split-s>	<>
1386	998	.	.
1386	998	 	 
1386	998	<~>	<~>
1386	998	<split-s>	<split-s>
1386	998	<split-h>	<split-h>
1386	998	<name2>	<name2>
1386	1001	<aphaerese>	<aphaerese>
1386	1384	<>	<aphaerese>
1386	998	<elision3>	<elision3>
1386	1384	<>	<elision3>
1386	998	<elision2>	<elision2>
1386	1384	<>	<elision2>
1386	998	<elision1>	<elision1>
1386	1384	<>	<elision1>
1386	1010	.	υ
1386	1010	.	u
1386	1010	.	κ
1386	1010	.	α
1386	1010	.	a
1386	1010	.	λ
1386	1224	<split-s>	<>
1387	1043	<name>	<name>
1387	1388	<>	<name>
1387	1390	<>	<aphaerese>
1387	1390	<>	<elision3>
1387	1390	<>	<elision2>
1387	1390	<>	<elision1>
1387	852	<split-s>	<>
1387	1095	<L2kl>	<>
1387	1394	<K2kl>	<>
1388	1389	<>	<aphaerese>
1388	1389	<>	<elision3>
1388	1389	<>	<elision2>
1388	1389	<>	<elision1>
1388	1096	<L2kl>	<>
1388	1392	<K2kl>	<>
1389	1390	<>	<aphaerese>
1389	1390	<>	<elision3>
1389	1390	<>	<elision2>
1389	1390	<>	<elision1>
1389	1097	<L2kl>	<>
1389	1393	<K2kl>	<>
1390	1388	<>	<name>
1390	1390	<>	<aphaerese>
1390	1390	<>	<elision3>
1390	1390	<>	<elision2>
1390	1390	<>	<elision1>
1390	1095	<L2kl>	<>
1390	1391	<K2kl>	<>
1391	998	.	.
1391	998	 	 
1391	998	<~>	<~>
1391	998	<split-s>	<split-s>
1391	998	<split-h>	<split-h>
1391	998	<name2>	<name2>
1391	1392	<>	<name>
1391	1001	<aphaerese>	<aphaerese>
1391	1391	<>	<aphaerese>
1391	998	<elision3>	<elision3>
1391	1391	<>	<elision3>
1391	998	<elision2>	<elision2>
1391	1391	<>	<elision2>
1391	998	<elision1>	<elision1>
1391	1391	<>	<elision1>
1391	1010	.	υ
1391	1010	.	u
1391	1010	.	α
1391	1010	.	a
1391	1235	<split-s>	<>
1392	1000	.	.
1392	1000	 	 
1392	1000	<~>	<~>
1392	1000	<split-s>	<split-s>
1392	1000	<split-h>	<split-h>
1392	1000	<name2>	<name2>
1392	1003	<aphaerese>	<aphaerese>
1392	1393	<>	<aphaerese>
1392	1000	<elision3>	<elision3>
1392	1393	<>	<elision3>
1392	1000	<elision2>	<elision2>
1392	1393	<>	<elision2>
1392	1000	<elision1>	<elision1>
1392	1393	<>	<elision1>
1392	1012	.	υ
1392	1012	.	u
1392	1012	.	α
1392	1012	.	a
1392	1236	<split-s>	<>
1393	998	.	.
1393	998	 	 
1393	998	<~>	<~>
1393	998	<split-s>	<split-s>
1393	998	<split-h>	<split-h>
1393	998	<name2>	<name2>
1393	1001	<aphaerese>	<aphaerese>
1393	1391	<>	<aphaerese>
1393	998	<elision3>	<elision3>
1393	1391	<>	<elision3>
1393	998	<elision2>	<elision2>
1393	1391	<>	<elision2>
1393	998	<elision1>	<elision1>
1393	1391	<>	<elision1>
1393	1010	.	υ
1393	1010	.	u
1393	1010	.	α
1393	1010	.	a
1393	1234	<split-s>	<>
1394	998	.	.
1394	998	 	 
1394	998	<~>	<~>
1394	998	<split-s>	<split-s>
1394	998	<split-h>	<split-h>
1394	998	<name2>	<name2>
1394	1043	<name2>	<name>
1394	1392	<>	<name>
1394	1001	<aphaerese>	<aphaerese>
1394	1391	<>	<aphaerese>
1394	998	<elision3>	<elision3>
1394	1391	<>	<elision3>
1394	998	<elision2>	<elision2>
1394	1391	<>	<elision2>
1394	998	<elision1>	<elision1>
1394	1391	<>	<elision1>
1394	1010	.	υ
1394	1010	.	u
1394	1010	.	α
1394	1010	.	a
1394	1238	<split-s>	<>
1395	1043	<name>	<name>
1395	1396	<>	<name>
1395	1398	<>	<aphaerese>
1395	1398	<>	<elision3>
1395	1398	<>	<elision2>
1395	1398	<>	<elision1>
1395	852	<split-s>	<>
1395	1399	<L2kl>	<>
1396	1397	<>	<aphaerese>
1396	1397	<>	<elision3>
1396	1397	<>	<elision2>
1396	1397	<>	<elision1>
1396	1385	<L2kl>	<>
1397	1398	<>	<aphaerese>
1397	1398	<>	<elision3>
1397	1398	<>	<elision2>
1397	1398	<>	<elision1>
1397	1386	<L2kl>	<>
1398	1396	<>	<name>
1398	1398	<>	<aphaerese>
1398	1398	<>	<elision3>
1398	1398	<>	<elision2>
1398	1398	<>	<elision1>
1398	1384	<L2kl>	<>
1399	998	.	.
1399	998	 	 
1399	998	<~>	<~>
1399	998	<split-s>	<split-s>
1399	998	<split-h>	<split-h>
1399	998	<name2>	<name2>
1399	1043	<name2>	<name>
1399	1385	<>	<name>
1399	1001	<aphaerese>	<aphaerese>
1399	1384	<>	<aphaerese>
1399	998	<elision3>	<elision3>
1399	1384	<>	<elision3>
1399	998	<elision2>	<elision2>
1399	1384	<>	<elision2>
1399	998	<elision1>	<elision1>
1399	1384	<>	<elision1>
1399	1010	.	υ
1399	1010	.	u
1399	1010	.	κ
1399	1010	.	α
1399	1010	.	a
1399	1010	.	λ
1399	1250	<split-s>	<>
1400	1401	<>	<name>
1400	1400	<>	<aphaerese>
1400	1400	<>	<elision3>
1400	1400	<>	<elision2>
1400	1400	<>	<elision1>
1400	1116	<U2kl>	<>
1401	1402	<>	<aphaerese>
1401	1402	<>	<elision3>
1401	1402	<>	<elision2>
1401	1402	<>	<elision1>
1401	1117	<U2kl>	<>
1402	1400	<>	<aphaerese>
1402	1400	<>	<elision3>
1402	1400	<>	<elision2>
1402	1400	<>	<elision1>
1402	1118	<U2kl>	<>
1403	1129	<name>	<name>
1403	1404	<>	<name>
1403	1406	<>	<aphaerese>
1403	1406	<>	<elision3>
1403	1406	<>	<elision2>
1403	1406	<>	<elision1>
1403	617	<2s>	<>
1403	1407	<A2kl>	<>
1403	1416	<L2kl>	<>
1403	1139	<K2kl>	<>
1404	1405	<>	<aphaerese>
1404	1405	<>	<elision3>
1404	1405	<>	<elision2>
1404	1405	<>	<elision1>
1404	1408	<A2kl>	<>
1404	1417	<L2kl>	<>
1404	1137	<K2kl>	<>
1405	1406	<>	<aphaerese>
1405	1406	<>	<elision3>
1405	1406	<>	<elision2>
1405	1406	<>	<elision1>
1405	1409	<A2kl>	<>
1405	1418	<L2kl>	<>
1405	1138	<K2kl>	<>
1406	1404	<>	<name>
1406	1406	<>	<aphaerese>
1406	1406	<>	<elision3>
1406	1406	<>	<elision2>
1406	1406	<>	<elision1>
1406	1407	<A2kl>	<>
1406	1416	<L2kl>	<>
1406	1136	<K2kl>	<>
1407	1408	<>	<name>
1407	1407	<>	<aphaerese>
1407	1407	<>	<elision3>
1407	1407	<>	<elision2>
1407	1407	<>	<elision1>
1407	1410	.	κ
1407	1410	.	λ
1407	576	<2s>	<>
1408	1409	<>	<aphaerese>
1408	1409	<>	<elision3>
1408	1409	<>	<elision2>
1408	1409	<>	<elision1>
1408	1412	.	κ
1408	1412	.	λ
1408	577	<2s>	<>
1409	1407	<>	<aphaerese>
1409	1407	<>	<elision3>
1409	1407	<>	<elision2>
1409	1407	<>	<elision1>
1409	1410	.	κ
1409	1410	.	λ
1409	575	<2s>	<>
1410	1411	<>	<name>
1410	1410	<>	<aphaerese>
1410	1413	<elision3>	<elision3>
1410	1410	<>	<elision3>
1410	1413	<elision2>	<elision2>
1410	1410	<>	<elision2>
1410	1413	<elision1>	<elision1>
1410	1410	<>	<elision1>
1410	570	<2s>	<>
1411	1412	<>	<aphaerese>
1411	1415	<elision3>	<elision3>
1411	1412	<>	<elision3>
1411	1415	<elision2>	<elision2>
1411	1412	<>	<elision2>
1411	1415	<elision1>	<elision1>
1411	1412	<>	<elision1>
1411	571	<2s>	<>
1412	1410	<>	<aphaerese>
1412	1413	<elision3>	<elision3>
1412	1410	<>	<elision3>
1412	1413	<elision2>	<elision2>
1412	1410	<>	<elision2>
1412	1413	<elision1>	<elision1>
1412	1410	<>	<elision1>
1412	569	<2s>	<>
1413	1116	.	.
1413	1116	 	 
1413	1116	<~>	<~>
1413	1116	<split-s>	<split-s>
1413	1116	<split-h>	<split-h>
1413	1116	<name2>	<name2>
1413	1414	<>	<name>
1413	1119	<aphaerese>	<aphaerese>
1413	1413	<>	<aphaerese>
1413	1116	<elision3>	<elision3>
1413	1413	<>	<elision3>
1413	1116	<elision2>	<elision2>
1413	1413	<>	<elision2>
1413	1116	<elision1>	<elision1>
1413	1413	<>	<elision1>
1413	1113	.	υ
1413	1113	.	u
1413	1113	.	α
1413	1113	.	a
1413	552	<2s>	<>
1414	1118	.	.
1414	1118	 	 
1414	1118	<~>	<~>
1414	1118	<split-s>	<split-s>
1414	1118	<split-h>	<split-h>
1414	1118	<name2>	<name2>
1414	1121	<aphaerese>	<aphaerese>
1414	1415	<>	<aphaerese>
1414	1118	<elision3>	<elision3>
1414	1415	<>	<elision3>
1414	1118	<elision2>	<elision2>
1414	1415	<>	<elision2>
1414	1118	<elision1>	<elision1>
1414	1415	<>	<elision1>
1414	1115	.	υ
1414	1115	.	u
1414	1115	.	α
1414	1115	.	a
1414	553	<2s>	<>
1415	1116	.	.
1415	1116	 	 
1415	1116	<~>	<~>
1415	1116	<split-s>	<split-s>
1415	1116	<split-h>	<split-h>
1415	1116	<name2>	<name2>
1415	1119	<aphaerese>	<aphaerese>
1415	1413	<>	<aphaerese>
1415	1116	<elision3>	<elision3>
1415	1413	<>	<elision3>
1415	1116	<elision2>	<elision2>
1415	1413	<>	<elision2>
1415	1116	<elision1>	<elision1>
1415	1413	<>	<elision1>
1415	1113	.	υ
1415	1113	.	u
1415	1113	.	α
1415	1113	.	a
1415	551	<2s>	<>
1416	1417	<>	<name>
1416	1416	<>	<aphaerese>
1416	1416	<>	<elision3>
1416	1416	<>	<elision2>
1416	1416	<>	<elision1>
1416	1419	.	κ
1416	1419	.	λ
1416	603	<2s>	<>
1417	1418	<>	<aphaerese>
1417	1418	<>	<elision3>
1417	1418	<>	<elision2>
1417	1418	<>	<elision1>
1417	1421	.	κ
1417	1421	.	λ
1417	604	<2s>	<>
1418	1416	<>	<aphaerese>
1418	1416	<>	<elision3>
1418	1416	<>	<elision2>
1418	1416	<>	<elision1>
1418	1419	.	κ
1418	1419	.	λ
1418	602	<2s>	<>
1419	1420	<>	<name>
1419	1419	<>	<aphaerese>
1419	1422	<elision3>	<elision3>
1419	1419	<>	<elision3>
1419	1422	<elision2>	<elision2>
1419	1419	<>	<elision2>
1419	1422	<elision1>	<elision1>
1419	1419	<>	<elision1>
1419	597	<2s>	<>
1420	1421	<>	<aphaerese>
1420	1424	<elision3>	<elision3>
1420	1421	<>	<elision3>
1420	1424	<elision2>	<elision2>
1420	1421	<>	<elision2>
1420	1424	<elision1>	<elision1>
1420	1421	<>	<elision1>
1420	598	<2s>	<>
1421	1419	<>	<aphaerese>
1421	1422	<elision3>	<elision3>
1421	1419	<>	<elision3>
1421	1422	<elision2>	<elision2>
1421	1419	<>	<elision2>
1421	1422	<elision1>	<elision1>
1421	1419	<>	<elision1>
1421	596	<2s>	<>
1422	1423	<>	<name>
1422	1422	<>	<aphaerese>
1422	1422	<>	<elision3>
1422	1422	<>	<elision2>
1422	1422	<>	<elision1>
1422	1122	.	κ
1422	591	<2s>	<>
1423	1424	<>	<aphaerese>
1423	1424	<>	<elision3>
1423	1424	<>	<elision2>
1423	1424	<>	<elision1>
1423	1124	.	κ
1423	592	<2s>	<>
1424	1422	<>	<aphaerese>
1424	1422	<>	<elision3>
1424	1422	<>	<elision2>
1424	1422	<>	<elision1>
1424	1122	.	κ
1424	590	<2s>	<>
1425	1116	.	.
1425	1116	 	 
1425	1116	<~>	<~>
1425	1116	<split-s>	<split-s>
1425	1116	<split-h>	<split-h>
1425	1116	<name2>	<name2>
1425	1426	<>	<name>
1425	1119	<aphaerese>	<aphaerese>
1425	1425	<>	<aphaerese>
1425	1425	<>	<elision3>
1425	1425	<>	<elision2>
1425	1425	<>	<elision1>
1425	1113	.	υ
1425	1113	.	u
1425	1122	.	κ
1425	1113	.	α
1425	1113	.	a
1425	440	<2s>	<>
1426	1118	.	.
1426	1118	 	 
1426	1118	<~>	<~>
1426	1118	<split-s>	<split-s>
1426	1118	<split-h>	<split-h>
1426	1118	<name2>	<name2>
1426	1121	<aphaerese>	<aphaerese>
1426	1427	<>	<aphaerese>
1426	1427	<>	<elision3>
1426	1427	<>	<elision2>
1426	1427	<>	<elision1>
1426	1115	.	υ
1426	1115	.	u
1426	1124	.	κ
1426	1115	.	α
1426	1115	.	a
1426	441	<2s>	<>
1427	1116	.	.
1427	1116	 	 
1427	1116	<~>	<~>
1427	1116	<split-s>	<split-s>
1427	1116	<split-h>	<split-h>
1427	1116	<name2>	<name2>
1427	1119	<aphaerese>	<aphaerese>
1427	1425	<>	<aphaerese>
1427	1425	<>	<elision3>
1427	1425	<>	<elision2>
1427	1425	<>	<elision1>
1427	1113	.	υ
1427	1113	.	u
1427	1122	.	κ
1427	1113	.	α
1427	1113	.	a
1427	439	<2s>	<>
1428	1429	<>	<name>
1428	1428	<>	<aphaerese>
1428	1428	<>	<elision3>
1428	1428	<>	<elision2>
1428	1428	<>	<elision1>
1428	1116	<A2kl>	<>
1429	1430	<>	<aphaerese>
1429	1430	<>	<elision3>
1429	1430	<>	<elision2>
1429	1430	<>	<elision1>
1429	1117	<A2kl>	<>
1430	1428	<>	<aphaerese>
1430	1428	<>	<elision3>
1430	1428	<>	<elision2>
1430	1428	<>	<elision1>
1430	1118	<A2kl>	<>
1431	986	.	.
1431	987	 	 
1431	986	<~>	<~>
1431	986	<split-s>	<split-s>
1431	986	<split-h>	<split-h>
1431	986	<name2>	<name2>
1431	1432	<>	<name>
1431	990	<aphaerese>	<aphaerese>
1431	1431	<>	<aphaerese>
1431	986	<elision3>	<elision3>
1431	1431	<>	<elision3>
1431	986	<elision2>	<elision2>
1431	1431	<>	<elision2>
1431	986	<elision1>	<elision1>
1431	1431	<>	<elision1>
1431	994	.	υ
1431	997	s	υ
1431	994	.	u
1431	997	s	u
1431	994	.	κ
1431	1107	s	κ
1431	1036	s	k
1431	1039	s	U
1431	1091	s	K
1431	994	.	α
1431	997	s	α
1431	994	.	a
1431	997	s	a
1431	1069	s	A
1431	994	.	λ
1431	1107	s	λ
1431	1036	s	l
1431	1098	s	L
1431	527	<2s>	<>
1432	989	.	.
1432	992	 	 
1432	989	<~>	<~>
1432	989	<split-s>	<split-s>
1432	989	<split-h>	<split-h>
1432	989	<name2>	<name2>
1432	1090	<aphaerese>	<aphaerese>
1432	1433	<>	<aphaerese>
1432	989	<elision3>	<elision3>
1432	1433	<>	<elision3>
1432	989	<elision2>	<elision2>
1432	1433	<>	<elision2>
1432	989	<elision1>	<elision1>
1432	1433	<>	<elision1>
1432	996	.	υ
1432	1014	s	υ
1432	996	.	u
1432	1014	s	u
1432	996	.	κ
1432	1109	s	κ
1432	1038	s	k
1432	1041	s	U
1432	1093	s	K
1432	996	.	α
1432	1014	s	α
1432	996	.	a
1432	1014	s	a
1432	1071	s	A
1432	996	.	λ
1432	1109	s	λ
1432	1038	s	l
1432	1100	s	L
1432	528	<2s>	<>
1433	986	.	.
1433	987	 	 
1433	986	<~>	<~>
1433	986	<split-s>	<split-s>
1433	986	<split-h>	<split-h>
1433	986	<name2>	<name2>
1433	990	<aphaerese>	<aphaerese>
1433	1431	<>	<aphaerese>
1433	986	<elision3>	<elision3>
1433	1431	<>	<elision3>
1433	986	<elision2>	<elision2>
1433	1431	<>	<elision2>
1433	986	<elision1>	<elision1>
1433	1431	<>	<elision1>
1433	994	.	υ
1433	997	s	υ
1433	994	.	u
1433	997	s	u
1433	994	.	κ
1433	1107	s	κ
1433	1036	s	k
1433	1039	s	U
1433	1091	s	K
1433	994	.	α
1433	997	s	α
1433	994	.	a
1433	997	s	a
1433	1069	s	A
1433	994	.	λ
1433	1107	s	λ
1433	1036	s	l
1433	1098	s	L
1433	526	<2s>	<>
1434	1140	<name>	<name>
1434	1435	<>	<name>
1434	1437	<>	<aphaerese>
1434	1437	<>	<elision3>
1434	1437	<>	<elision2>
1434	1437	<>	<elision1>
1434	617	<2s>	<>
1434	1407	<A2kl>	<>
1434	1441	<L2kl>	<>
1435	1436	<>	<aphaerese>
1435	1436	<>	<elision3>
1435	1436	<>	<elision2>
1435	1436	<>	<elision1>
1435	1408	<A2kl>	<>
1435	1439	<L2kl>	<>
1436	1437	<>	<aphaerese>
1436	1437	<>	<elision3>
1436	1437	<>	<elision2>
1436	1437	<>	<elision1>
1436	1409	<A2kl>	<>
1436	1440	<L2kl>	<>
1437	1435	<>	<name>
1437	1437	<>	<aphaerese>
1437	1437	<>	<elision3>
1437	1437	<>	<elision2>
1437	1437	<>	<elision1>
1437	1407	<A2kl>	<>
1437	1438	<L2kl>	<>
1438	1116	.	.
1438	1116	 	 
1438	1116	<~>	<~>
1438	1116	<split-s>	<split-s>
1438	1116	<split-h>	<split-h>
1438	1116	<name2>	<name2>
1438	1439	<>	<name>
1438	1119	<aphaerese>	<aphaerese>
1438	1438	<>	<aphaerese>
1438	1116	<elision3>	<elision3>
1438	1438	<>	<elision3>
1438	1116	<elision2>	<elision2>
1438	1438	<>	<elision2>
1438	1116	<elision1>	<elision1>
1438	1438	<>	<elision1>
1438	1113	.	υ
1438	1113	.	u
1438	1419	.	κ
1438	1113	.	α
1438	1113	.	a
1438	1419	.	λ
1438	633	<2s>	<>
1439	1118	.	.
1439	1118	 	 
1439	1118	<~>	<~>
1439	1118	<split-s>	<split-s>
1439	1118	<split-h>	<split-h>
1439	1118	<name2>	<name2>
1439	1121	<aphaerese>	<aphaerese>
1439	1440	<>	<aphaerese>
1439	1118	<elision3>	<elision3>
1439	1440	<>	<elision3>
1439	1118	<elision2>	<elision2>
1439	1440	<>	<elision2>
1439	1118	<elision1>	<elision1>
1439	1440	<>	<elision1>
1439	1115	.	υ
1439	1115	.	u
1439	1421	.	κ
1439	1115	.	α
1439	1115	.	a
1439	1421	.	λ
1439	634	<2s>	<>
1440	1116	.	.
1440	1116	 	 
1440	1116	<~>	<~>
1440	1116	<split-s>	<split-s>
1440	1116	<split-h>	<split-h>
1440	1116	<name2>	<name2>
1440	1119	<aphaerese>	<aphaerese>
1440	1438	<>	<aphaerese>
1440	1116	<elision3>	<elision3>
1440	1438	<>	<elision3>
1440	1116	<elision2>	<elision2>
1440	1438	<>	<elision2>
1440	1116	<elision1>	<elision1>
1440	1438	<>	<elision1>
1440	1113	.	υ
1440	1113	.	u
1440	1419	.	κ
1440	1113	.	α
1440	1113	.	a
1440	1419	.	λ
1440	632	<2s>	<>
1441	1116	.	.
1441	1116	 	 
1441	1116	<~>	<~>
1441	1116	<split-s>	<split-s>
1441	1116	<split-h>	<split-h>
1441	1116	<name2>	<name2>
1441	1140	<name2>	<name>
1441	1439	<>	<name>
1441	1119	<aphaerese>	<aphaerese>
1441	1438	<>	<aphaerese>
1441	1116	<elision3>	<elision3>
1441	1438	<>	<elision3>
1441	1116	<elision2>	<elision2>
1441	1438	<>	<elision2>
1441	1116	<elision1>	<elision1>
1441	1438	<>	<elision1>
1441	1113	.	υ
1441	1113	.	u
1441	1419	.	κ
1441	1113	.	α
1441	1113	.	a
1441	1419	.	λ
1441	639	<2s>	<>
1442	986	.	.
1442	987	 	 
1442	986	<~>	<~>
1442	986	<split-s>	<split-s>
1442	986	<split-h>	<split-h>
1442	986	<name2>	<name2>
1442	1355	<>	<name>
1442	990	<aphaerese>	<aphaerese>
1442	1354	<>	<aphaerese>
1442	1354	<>	<elision3>
1442	1354	<>	<elision2>
1442	1354	<>	<elision1>
1442	994	.	υ
1442	997	s	υ
1442	994	.	u
1442	997	s	u
1442	1015	.	κ
1442	1030	s	κ
1442	1036	s	k
1442	1039	s	U
1442	1091	s	K
1442	994	.	α
1442	997	s	α
1442	994	.	a
1442	997	s	a
1442	1069	s	A
1442	1036	s	λ
1442	1036	s	l
1442	1098	s	L
1442	645	<2s>	<>
1443	986	.	.
1443	987	 	 
1443	986	<~>	<~>
1443	986	<split-s>	<split-s>
1443	986	<split-h>	<split-h>
1443	986	<name2>	<name2>
1443	1376	<>	<name>
1443	990	<aphaerese>	<aphaerese>
1443	1375	<>	<aphaerese>
1443	1378	<elision3>	<elision3>
1443	1375	<>	<elision3>
1443	1378	<elision2>	<elision2>
1443	1375	<>	<elision2>
1443	1378	<elision1>	<elision1>
1443	1375	<>	<elision1>
1443	994	.	υ
1443	997	s	υ
1443	994	.	u
1443	997	s	u
1443	994	.	κ
1443	1107	s	κ
1443	1036	s	k
1443	1039	s	U
1443	1091	s	K
1443	994	.	α
1443	997	s	α
1443	994	.	a
1443	997	s	a
1443	1069	s	A
1443	994	.	λ
1443	1107	s	λ
1443	1036	s	l
1443	1098	s	L
1443	648	<2s>	<>
1444	986	.	.
1444	987	 	 
1444	986	<~>	<~>
1444	986	<split-s>	<split-s>
1444	986	<split-h>	<split-h>
1444	986	<name2>	<name2>
1444	1111	<>	<name>
1444	990	<aphaerese>	<aphaerese>
1444	1110	<>	<aphaerese>
1444	986	<elision3>	<elision3>
1444	1110	<>	<elision3>
1444	986	<elision2>	<elision2>
1444	1110	<>	<elision2>
1444	986	<elision1>	<elision1>
1444	1110	<>	<elision1>
1444	994	.	υ
1444	997	s	υ
1444	994	.	u
1444	997	s	u
1444	1113	.	κ
1444	1107	s	κ
1444	1036	s	k
1444	1039	s	U
1444	1091	s	K
1444	994	.	α
1444	997	s	α
1444	994	.	a
1444	997	s	a
1444	1069	s	A
1444	1113	.	λ
1444	1107	s	λ
1444	1036	s	l
1444	1098	s	L
1444	651	<2s>	<>
1445	1401	<>	<name>
1445	1400	<>	<aphaerese>
1445	1400	<>	<elision3>
1445	1400	<>	<elision2>
1445	1400	<>	<elision1>
1445	1446	<U2kl>	<>
1446	1116	.	.
1446	1116	 	 
1446	1116	<~>	<~>
1446	1116	<split-s>	<split-s>
1446	1116	<split-h>	<split-h>
1446	1116	<name2>	<name2>
1446	1117	<>	<name>
1446	1119	<aphaerese>	<aphaerese>
1446	1116	<>	<aphaerese>
1446	1116	<elision3>	<elision3>
1446	1116	<>	<elision3>
1446	1116	<elision2>	<elision2>
1446	1116	<>	<elision2>
1446	1116	<elision1>	<elision1>
1446	1116	<>	<elision1>
1446	1113	.	υ
1446	1113	.	u
1446	1122	.	κ
1446	1113	.	α
1446	1113	.	a
1446	655	<2s>	<>
1447	1129	<name>	<name>
1447	1404	<>	<name>
1447	1406	<>	<aphaerese>
1447	1406	<>	<elision3>
1447	1406	<>	<elision2>
1447	1406	<>	<elision1>
1447	617	<2s>	<>
1447	1407	<A2kl>	<>
1447	1416	<L2kl>	<>
1447	1448	<K2kl>	<>
1448	1116	.	.
1448	1116	 	 
1448	1116	<~>	<~>
1448	1116	<split-s>	<split-s>
1448	1116	<split-h>	<split-h>
1448	1116	<name2>	<name2>
1448	1140	<name2>	<name>
1448	1137	<>	<name>
1448	1119	<aphaerese>	<aphaerese>
1448	1136	<>	<aphaerese>
1448	1116	<elision3>	<elision3>
1448	1136	<>	<elision3>
1448	1116	<elision2>	<elision2>
1448	1136	<>	<elision2>
1448	1116	<elision1>	<elision1>
1448	1136	<>	<elision1>
1448	1113	.	υ
1448	1113	.	u
1448	1113	.	α
1448	1113	.	a
1448	659	<2s>	<>
1449	1116	.	.
1449	1116	 	 
1449	1116	<~>	<~>
1449	1116	<split-s>	<split-s>
1449	1116	<split-h>	<split-h>
1449	1116	<name2>	<name2>
1449	1426	<>	<name>
1449	1119	<aphaerese>	<aphaerese>
1449	1425	<>	<aphaerese>
1449	1425	<>	<elision3>
1449	1425	<>	<elision2>
1449	1425	<>	<elision1>
1449	1113	.	υ
1449	1113	.	u
1449	1122	.	κ
1449	1113	.	α
1449	1113	.	a
1449	645	<2s>	<>
1450	1429	<>	<name>
1450	1428	<>	<aphaerese>
1450	1428	<>	<elision3>
1450	1428	<>	<elision2>
1450	1428	<>	<elision1>
1450	1446	<A2kl>	<>
1451	986	.	.
1451	987	 	 
1451	986	<~>	<~>
1451	986	<split-s>	<split-s>
1451	986	<split-h>	<split-h>
1451	986	<name2>	<name2>
1451	1432	<>	<name>
1451	990	<aphaerese>	<aphaerese>
1451	1431	<>	<aphaerese>
1451	986	<elision3>	<elision3>
1451	1431	<>	<elision3>
1451	986	<elision2>	<elision2>
1451	1431	<>	<elision2>
1451	986	<elision1>	<elision1>
1451	1431	<>	<elision1>
1451	994	.	υ
1451	997	s	υ
1451	994	.	u
1451	997	s	u
1451	994	.	κ
1451	1107	s	κ
1451	1036	s	k
1451	1039	s	U
1451	1091	s	K
1451	994	.	α
1451	997	s	α
1451	994	.	a
1451	997	s	a
1451	1069	s	A
1451	994	.	λ
1451	1107	s	λ
1451	1036	s	l
1451	1098	s	L
1451	651	<2s>	<>
1452	1116	.	.
1452	1116	 	 
1452	1116	<~>	<~>
1452	1116	<split-s>	<split-s>
1452	1116	<split-h>	<split-h>
1452	1116	<name2>	<name2>
1452	1142	<>	<name>
1452	1119	<aphaerese>	<aphaerese>
1452	1141	<>	<aphaerese>
1452	1116	<elision3>	<elision3>
1452	1141	<>	<elision3>
1452	1116	<elision2>	<elision2>
1452	1141	<>	<elision2>
1452	1116	<elision1>	<elision1>
1452	1141	<>	<elision1>
1452	1113	.	υ
1452	1113	.	u
1452	1113	.	κ
1452	1113	.	α
1452	1113	.	a
1452	1113	.	λ
1452	651	<2s>	<>
1453	1140	<name>	<name>
1453	1435	<>	<name>
1453	1437	<>	<aphaerese>
1453	1437	<>	<elision3>
1453	1437	<>	<elision2>
1453	1437	<>	<elision1>
1453	617	<2s>	<>
1453	1407	<A2kl>	<>
1453	1454	<L2kl>	<>
1454	1116	.	.
1454	1116	 	 
1454	1116	<~>	<~>
1454	1116	<split-s>	<split-s>
1454	1116	<split-h>	<split-h>
1454	1116	<name2>	<name2>
1454	1140	<name2>	<name>
1454	1439	<>	<name>
1454	1119	<aphaerese>	<aphaerese>
1454	1438	<>	<aphaerese>
1454	1116	<elision3>	<elision3>
1454	1438	<>	<elision3>
1454	1116	<elision2>	<elision2>
1454	1438	<>	<elision2>
1454	1116	<elision1>	<elision1>
1454	1438	<>	<elision1>
1454	1113	.	υ
1454	1113	.	u
1454	1419	.	κ
1454	1113	.	α
1454	1113	.	a
1454	1419	.	λ
1454	664	<2s>	<>
1455	1343	.	.
1455	1344	 	 
1455	1343	<~>	<~>
1455	1343	<split-s>	<split-s>
1455	1343	<split-h>	<split-h>
1455	1343	<name2>	<name2>
1455	1347	<aphaerese>	<aphaerese>
1455	1347	<>	<aphaerese>
1455	1343	<elision3>	<elision3>
1455	1347	<>	<elision3>
1455	1343	<elision2>	<elision2>
1455	1347	<>	<elision2>
1455	1343	<elision1>	<elision1>
1455	1347	<>	<elision1>
1455	1343	.	υ
1455	1343	.	u
1455	1357	.	κ
1455	1375	s	κ
1455	1110	s	k
1455	1400	s	U
1455	1128	s	K
1455	1343	.	α
1455	1343	.	a
1455	1428	s	A
1455	1431	s	λ
1455	1141	s	l
1455	1144	s	L
1455	428	<1s>	<>
1456	1343	.	.
1456	1344	 	 
1456	1343	<~>	<~>
1456	1343	<split-s>	<split-s>
1456	1343	<split-h>	<split-h>
1456	1343	<name2>	<name2>
1456	1347	<aphaerese>	<aphaerese>
1456	1350	<>	<aphaerese>
1456	1343	<elision3>	<elision3>
1456	1350	<>	<elision3>
1456	1343	<elision2>	<elision2>
1456	1350	<>	<elision2>
1456	1343	<elision1>	<elision1>
1456	1350	<>	<elision1>
1456	1351	.	υ
1456	1354	s	υ
1456	1351	.	u
1456	1354	s	u
1456	1357	.	κ
1456	1375	s	κ
1456	1110	s	k
1456	1400	s	U
1456	1403	s	K
1456	1351	.	α
1456	1425	s	α
1456	1351	.	a
1456	1425	s	a
1456	1428	s	A
1456	1431	s	λ
1456	1141	s	l
1456	1434	s	L
1456	434	<1s>	<>
1457	1346	.	.
1457	1349	 	 
1457	1346	<~>	<~>
1457	1346	<split-s>	<split-s>
1457	1346	<split-h>	<split-h>
1457	1346	<name2>	<name2>
1457	1455	<aphaerese>	<aphaerese>
1457	1346	<>	<aphaerese>
1457	1346	<elision3>	<elision3>
1457	1346	<>	<elision3>
1457	1346	<elision2>	<elision2>
1457	1346	<>	<elision2>
1457	1346	<elision1>	<elision1>
1457	1346	<>	<elision1>
1457	1353	.	υ
1457	1356	s	υ
1457	1353	.	u
1457	1356	s	u
1457	1359	.	κ
1457	1377	s	κ
1457	1112	s	k
1457	1402	s	U
1457	1131	s	K
1457	1353	.	α
1457	1427	s	α
1457	1353	.	a
1457	1427	s	a
1457	1430	s	A
1457	1433	s	λ
1457	1143	s	l
1457	1146	s	L
1457	436	<1s>	<>
1458	1346	.	.
1458	1349	 	 
1458	1346	<~>	<~>
1458	1346	<split-s>	<split-s>
1458	1346	<split-h>	<split-h>
1458	1346	<name2>	<name2>
1458	1455	<aphaerese>	<aphaerese>
1458	1459	<>	<aphaerese>
1458	1462	<elision3>	<elision3>
1458	1459	<>	<elision3>
1458	1462	<elision2>	<elision2>
1458	1459	<>	<elision2>
1458	1462	<elision1>	<elision1>
1458	1459	<>	<elision1>
1458	1353	.	υ
1458	1356	s	υ
1458	1353	.	u
1458	1356	s	u
1458	1106	s	κ
1458	1112	s	k
1458	1402	s	U
1458	1131	s	K
1458	1353	.	α
1458	1427	s	α
1458	1353	.	a
1458	1427	s	a
1458	1430	s	A
1458	1106	s	λ
1458	1143	s	l
1458	1146	s	L
1458	1490	<1s>	<>
1459	1343	.	.
1459	1344	 	 
1459	1343	<~>	<~>
1459	1343	<split-s>	<split-s>
1459	1343	<split-h>	<split-h>
1459	1343	<name2>	<name2>
1459	1347	<aphaerese>	<aphaerese>
1459	1342	<>	<aphaerese>
1459	1460	<elision3>	<elision3>
1459	1342	<>	<elision3>
1459	1460	<elision2>	<elision2>
1459	1342	<>	<elision2>
1459	1460	<elision1>	<elision1>
1459	1342	<>	<elision1>
1459	1351	.	υ
1459	1354	s	υ
1459	1351	.	u
1459	1354	s	u
1459	985	s	κ
1459	1110	s	k
1459	1400	s	U
1459	1128	s	K
1459	1351	.	α
1459	1425	s	α
1459	1351	.	a
1459	1425	s	a
1459	1428	s	A
1459	985	s	λ
1459	1141	s	l
1459	1144	s	L
1459	1488	<1s>	<>
1460	1343	.	.
1460	1344	 	 
1460	1343	<~>	<~>
1460	1343	<split-s>	<split-s>
1460	1343	<split-h>	<split-h>
1460	1343	<name2>	<name2>
1460	1461	<>	<name>
1460	1347	<aphaerese>	<aphaerese>
1460	1460	<>	<aphaerese>
1460	1343	<elision3>	<elision3>
1460	1460	<>	<elision3>
1460	1343	<elision2>	<elision2>
1460	1460	<>	<elision2>
1460	1343	<elision1>	<elision1>
1460	1460	<>	<elision1>
1460	1351	.	υ
1460	1354	s	υ
1460	1351	.	u
1460	1354	s	u
1460	1357	.	κ
1460	1463	s	κ
1460	1466	s	k
1460	1400	s	U
1460	1469	s	K
1460	1351	.	α
1460	1425	s	α
1460	1351	.	a
1460	1425	s	a
1460	1428	s	A
1460	1477	s	λ
1460	1480	s	l
1460	1483	s	L
1460	488	<1s>	<>
1461	1346	.	.
1461	1349	 	 
1461	1346	<~>	<~>
1461	1346	<split-s>	<split-s>
1461	1346	<split-h>	<split-h>
1461	1346	<name2>	<name2>
1461	1455	<aphaerese>	<aphaerese>
1461	1462	<>	<aphaerese>
1461	1346	<elision3>	<elision3>
1461	1462	<>	<elision3>
1461	1346	<elision2>	<elision2>
1461	1462	<>	<elision2>
1461	1346	<elision1>	<elision1>
1461	1462	<>	<elision1>
1461	1353	.	υ
1461	1356	s	υ
1461	1353	.	u
1461	1356	s	u
1461	1359	.	κ
1461	1465	s	κ
1461	1468	s	k
1461	1402	s	U
1461	1471	s	K
1461	1353	.	α
1461	1427	s	α
1461	1353	.	a
1461	1427	s	a
1461	1430	s	A
1461	1479	s	λ
1461	1482	s	l
1461	1485	s	L
1461	489	<1s>	<>
1462	1343	.	.
1462	1344	 	 
1462	1343	<~>	<~>
1462	1343	<split-s>	<split-s>
1462	1343	<split-h>	<split-h>
1462	1343	<name2>	<name2>
1462	1347	<aphaerese>	<aphaerese>
1462	1460	<>	<aphaerese>
1462	1343	<elision3>	<elision3>
1462	1460	<>	<elision3>
1462	1343	<elision2>	<elision2>
1462	1460	<>	<elision2>
1462	1343	<elision1>	<elision1>
1462	1460	<>	<elision1>
1462	1351	.	υ
1462	1354	s	υ
1462	1351	.	u
1462	1354	s	u
1462	1357	.	κ
1462	1463	s	κ
1462	1466	s	k
1462	1400	s	U
1462	1469	s	K
1462	1351	.	α
1462	1425	s	α
1462	1351	.	a
1462	1425	s	a
1462	1428	s	A
1462	1477	s	λ
1462	1480	s	l
1462	1483	s	L
1462	487	<1s>	<>
1463	986	.	.
1463	987	 	 
1463	986	<~>	<~>
1463	986	<split-s>	<split-s>
1463	986	<split-h>	<split-h>
1463	986	<name2>	<name2>
1463	1464	<>	<name>
1463	990	<aphaerese>	<aphaerese>
1463	1463	<>	<aphaerese>
1463	1378	<elision3>	<elision3>
1463	1463	<>	<elision3>
1463	1378	<elision2>	<elision2>
1463	1463	<>	<elision2>
1463	1378	<elision1>	<elision1>
1463	1463	<>	<elision1>
1463	994	.	υ
1463	997	s	υ
1463	994	.	u
1463	997	s	u
1463	994	.	κ
1463	1039	s	U
1463	994	.	α
1463	997	s	α
1463	994	.	a
1463	997	s	a
1463	1069	s	A
1463	994	.	λ
1463	737	<2s>	<>
1464	989	.	.
1464	992	 	 
1464	989	<~>	<~>
1464	989	<split-s>	<split-s>
1464	989	<split-h>	<split-h>
1464	989	<name2>	<name2>
1464	1090	<aphaerese>	<aphaerese>
1464	1465	<>	<aphaerese>
1464	1380	<elision3>	<elision3>
1464	1465	<>	<elision3>
1464	1380	<elision2>	<elision2>
1464	1465	<>	<elision2>
1464	1380	<elision1>	<elision1>
1464	1465	<>	<elision1>
1464	996	.	υ
1464	1014	s	υ
1464	996	.	u
1464	1014	s	u
1464	996	.	κ
1464	1041	s	U
1464	996	.	α
1464	1014	s	α
1464	996	.	a
1464	1014	s	a
1464	1071	s	A
1464	996	.	λ
1464	738	<2s>	<>
1465	986	.	.
1465	987	 	 
1465	986	<~>	<~>
1465	986	<split-s>	<split-s>
1465	986	<split-h>	<split-h>
1465	986	<name2>	<name2>
1465	990	<aphaerese>	<aphaerese>
1465	1463	<>	<aphaerese>
1465	1378	<elision3>	<elision3>
1465	1463	<>	<elision3>
1465	1378	<elision2>	<elision2>
1465	1463	<>	<elision2>
1465	1378	<elision1>	<elision1>
1465	1463	<>	<elision1>
1465	994	.	υ
1465	997	s	υ
1465	994	.	u
1465	997	s	u
1465	994	.	κ
1465	1039	s	U
1465	994	.	α
1465	997	s	α
1465	994	.	a
1465	997	s	a
1465	1069	s	A
1465	994	.	λ
1465	736	<2s>	<>
1466	986	.	.
1466	987	 	 
1466	986	<~>	<~>
1466	986	<split-s>	<split-s>
1466	986	<split-h>	<split-h>
1466	986	<name2>	<name2>
1466	1467	<>	<name>
1466	990	<aphaerese>	<aphaerese>
1466	1466	<>	<aphaerese>
1466	986	<elision3>	<elision3>
1466	1466	<>	<elision3>
1466	986	<elision2>	<elision2>
1466	1466	<>	<elision2>
1466	986	<elision1>	<elision1>
1466	1466	<>	<elision1>
1466	994	.	υ
1466	997	s	υ
1466	994	.	u
1466	997	s	u
1466	1113	.	κ
1466	1039	s	U
1466	994	.	α
1466	997	s	α
1466	994	.	a
1466	997	s	a
1466	1069	s	A
1466	1113	.	λ
1466	746	<2s>	<>
1467	989	.	.
1467	992	 	 
1467	989	<~>	<~>
1467	989	<split-s>	<split-s>
1467	989	<split-h>	<split-h>
1467	989	<name2>	<name2>
1467	1090	<aphaerese>	<aphaerese>
1467	1468	<>	<aphaerese>
1467	989	<elision3>	<elision3>
1467	1468	<>	<elision3>
1467	989	<elision2>	<elision2>
1467	1468	<>	<elision2>
1467	989	<elision1>	<elision1>
1467	1468	<>	<elision1>
1467	996	.	υ
1467	1014	s	υ
1467	996	.	u
1467	1014	s	u
1467	1115	.	κ
1467	1041	s	U
1467	996	.	α
1467	1014	s	α
1467	996	.	a
1467	1014	s	a
1467	1071	s	A
1467	1115	.	λ
1467	747	<2s>	<>
1468	986	.	.
1468	987	 	 
1468	986	<~>	<~>
1468	986	<split-s>	<split-s>
1468	986	<split-h>	<split-h>
1468	986	<name2>	<name2>
1468	990	<aphaerese>	<aphaerese>
1468	1466	<>	<aphaerese>
1468	986	<elision3>	<elision3>
1468	1466	<>	<elision3>
1468	986	<elision2>	<elision2>
1468	1466	<>	<elision2>
1468	986	<elision1>	<elision1>
1468	1466	<>	<elision1>
1468	994	.	υ
1468	997	s	υ
1468	994	.	u
1468	997	s	u
1468	1113	.	κ
1468	1039	s	U
1468	994	.	α
1468	997	s	α
1468	994	.	a
1468	997	s	a
1468	1069	s	A
1468	1113	.	λ
1468	745	<2s>	<>
1469	1129	<name>	<name>
1469	1470	<>	<name>
1469	1472	<>	<aphaerese>
1469	1472	<>	<elision3>
1469	1472	<>	<elision2>
1469	1472	<>	<elision1>
1469	617	<2s>	<>
1469	1133	<L2kl>	<>
1469	1476	<K2kl>	<>
1470	1471	<>	<aphaerese>
1470	1471	<>	<elision3>
1470	1471	<>	<elision2>
1470	1471	<>	<elision1>
1470	1134	<L2kl>	<>
1470	1474	<K2kl>	<>
1471	1472	<>	<aphaerese>
1471	1472	<>	<elision3>
1471	1472	<>	<elision2>
1471	1472	<>	<elision1>
1471	1135	<L2kl>	<>
1471	1475	<K2kl>	<>
1472	1470	<>	<name>
1472	1472	<>	<aphaerese>
1472	1472	<>	<elision3>
1472	1472	<>	<elision2>
1472	1472	<>	<elision1>
1472	1133	<L2kl>	<>
1472	1473	<K2kl>	<>
1473	1116	.	.
1473	1116	 	 
1473	1116	<~>	<~>
1473	1116	<split-s>	<split-s>
1473	1116	<split-h>	<split-h>
1473	1116	<name2>	<name2>
1473	1474	<>	<name>
1473	1119	<aphaerese>	<aphaerese>
1473	1473	<>	<aphaerese>
1473	1116	<elision3>	<elision3>
1473	1473	<>	<elision3>
1473	1116	<elision2>	<elision2>
1473	1473	<>	<elision2>
1473	1116	<elision1>	<elision1>
1473	1473	<>	<elision1>
1473	1113	.	υ
1473	1113	.	u
1473	1113	.	α
1473	1113	.	a
1473	759	<2s>	<>
1474	1118	.	.
1474	1118	 	 
1474	1118	<~>	<~>
1474	1118	<split-s>	<split-s>
1474	1118	<split-h>	<split-h>
1474	1118	<name2>	<name2>
1474	1121	<aphaerese>	<aphaerese>
1474	1475	<>	<aphaerese>
1474	1118	<elision3>	<elision3>
1474	1475	<>	<elision3>
1474	1118	<elision2>	<elision2>
1474	1475	<>	<elision2>
1474	1118	<elision1>	<elision1>
1474	1475	<>	<elision1>
1474	1115	.	υ
1474	1115	.	u
1474	1115	.	α
1474	1115	.	a
1474	760	<2s>	<>
1475	1116	.	.
1475	1116	 	 
1475	1116	<~>	<~>
1475	1116	<split-s>	<split-s>
1475	1116	<split-h>	<split-h>
1475	1116	<name2>	<name2>
1475	1119	<aphaerese>	<aphaerese>
1475	1473	<>	<aphaerese>
1475	1116	<elision3>	<elision3>
1475	1473	<>	<elision3>
1475	1116	<elision2>	<elision2>
1475	1473	<>	<elision2>
1475	1116	<elision1>	<elision1>
1475	1473	<>	<elision1>
1475	1113	.	υ
1475	1113	.	u
1475	1113	.	α
1475	1113	.	a
1475	758	<2s>	<>
1476	1116	.	.
1476	1116	 	 
1476	1116	<~>	<~>
1476	1116	<split-s>	<split-s>
1476	1116	<split-h>	<split-h>
1476	1116	<name2>	<name2>
1476	1140	<name2>	<name>
1476	1474	<>	<name>
1476	1119	<aphaerese>	<aphaerese>
1476	1473	<>	<aphaerese>
1476	1116	<elision3>	<elision3>
1476	1473	<>	<elision3>
1476	1116	<elision2>	<elision2>
1476	1473	<>	<elision2>
1476	1116	<elision1>	<elision1>
1476	1473	<>	<elision1>
1476	1113	.	υ
1476	1113	.	u
1476	1113	.	α
1476	1113	.	a
1476	765	<2s>	<>
1477	986	.	.
1477	987	 	 
1477	986	<~>	<~>
1477	986	<split-s>	<split-s>
1477	986	<split-h>	<split-h>
1477	986	<name2>	<name2>
1477	1478	<>	<name>
1477	990	<aphaerese>	<aphaerese>
1477	1477	<>	<aphaerese>
1477	986	<elision3>	<elision3>
1477	1477	<>	<elision3>
1477	986	<elision2>	<elision2>
1477	1477	<>	<elision2>
1477	986	<elision1>	<elision1>
1477	1477	<>	<elision1>
1477	994	.	υ
1477	997	s	υ
1477	994	.	u
1477	997	s	u
1477	994	.	κ
1477	1039	s	U
1477	994	.	α
1477	997	s	α
1477	994	.	a
1477	997	s	a
1477	1069	s	A
1477	994	.	λ
1477	746	<2s>	<>
1478	989	.	.
1478	992	 	 
1478	989	<~>	<~>
1478	989	<split-s>	<split-s>
1478	989	<split-h>	<split-h>
1478	989	<name2>	<name2>
1478	1090	<aphaerese>	<aphaerese>
1478	1479	<>	<aphaerese>
1478	989	<elision3>	<elision3>
1478	1479	<>	<elision3>
1478	989	<elision2>	<elision2>
1478	1479	<>	<elision2>
1478	989	<elision1>	<elision1>
1478	1479	<>	<elision1>
1478	996	.	υ
1478	1014	s	υ
1478	996	.	u
1478	1014	s	u
1478	996	.	κ
1478	1041	s	U
1478	996	.	α
1478	1014	s	α
1478	996	.	a
1478	1014	s	a
1478	1071	s	A
1478	996	.	λ
1478	747	<2s>	<>
1479	986	.	.
1479	987	 	 
1479	986	<~>	<~>
1479	986	<split-s>	<split-s>
1479	986	<split-h>	<split-h>
1479	986	<name2>	<name2>
1479	990	<aphaerese>	<aphaerese>
1479	1477	<>	<aphaerese>
1479	986	<elision3>	<elision3>
1479	1477	<>	<elision3>
1479	986	<elision2>	<elision2>
1479	1477	<>	<elision2>
1479	986	<elision1>	<elision1>
1479	1477	<>	<elision1>
1479	994	.	υ
1479	997	s	υ
1479	994	.	u
1479	997	s	u
1479	994	.	κ
1479	1039	s	U
1479	994	.	α
1479	997	s	α
1479	994	.	a
1479	997	s	a
1479	1069	s	A
1479	994	.	λ
1479	745	<2s>	<>
1480	1116	.	.
1480	1116	 	 
1480	1116	<~>	<~>
1480	1116	<split-s>	<split-s>
1480	1116	<split-h>	<split-h>
1480	1116	<name2>	<name2>
1480	1481	<>	<name>
1480	1119	<aphaerese>	<aphaerese>
1480	1480	<>	<aphaerese>
1480	1116	<elision3>	<elision3>
1480	1480	<>	<elision3>
1480	1116	<elision2>	<elision2>
1480	1480	<>	<elision2>
1480	1116	<elision1>	<elision1>
1480	1480	<>	<elision1>
1480	1113	.	υ
1480	1113	.	u
1480	1113	.	κ
1480	1113	.	α
1480	1113	.	a
1480	1113	.	λ
1480	746	<2s>	<>
1481	1118	.	.
1481	1118	 	 
1481	1118	<~>	<~>
1481	1118	<split-s>	<split-s>
1481	1118	<split-h>	<split-h>
1481	1118	<name2>	<name2>
1481	1121	<aphaerese>	<aphaerese>
1481	1482	<>	<aphaerese>
1481	1118	<elision3>	<elision3>
1481	1482	<>	<elision3>
1481	1118	<elision2>	<elision2>
1481	1482	<>	<elision2>
1481	1118	<elision1>	<elision1>
1481	1482	<>	<elision1>
1481	1115	.	υ
1481	1115	.	u
1481	1115	.	κ
1481	1115	.	α
1481	1115	.	a
1481	1115	.	λ
1481	747	<2s>	<>
1482	1116	.	.
1482	1116	 	 
1482	1116	<~>	<~>
1482	1116	<split-s>	<split-s>
1482	1116	<split-h>	<split-h>
1482	1116	<name2>	<name2>
1482	1119	<aphaerese>	<aphaerese>
1482	1480	<>	<aphaerese>
1482	1116	<elision3>	<elision3>
1482	1480	<>	<elision3>
1482	1116	<elision2>	<elision2>
1482	1480	<>	<elision2>
1482	1116	<elision1>	<elision1>
1482	1480	<>	<elision1>
1482	1113	.	υ
1482	1113	.	u
1482	1113	.	κ
1482	1113	.	α
1482	1113	.	a
1482	1113	.	λ
1482	745	<2s>	<>
1483	1140	<name>	<name>
1483	1484	<>	<name>
1483	1486	<>	<aphaerese>
1483	1486	<>	<elision3>
1483	1486	<>	<elision2>
1483	1486	<>	<elision1>
1483	617	<2s>	<>
1483	1487	<L2kl>	<>
1484	1485	<>	<aphaerese>
1484	1485	<>	<elision3>
1484	1485	<>	<elision2>
1484	1485	<>	<elision1>
1484	1481	<L2kl>	<>
1485	1486	<>	<aphaerese>
1485	1486	<>	<elision3>
1485	1486	<>	<elision2>
1485	1486	<>	<elision1>
1485	1482	<L2kl>	<>
1486	1484	<>	<name>
1486	1486	<>	<aphaerese>
1486	1486	<>	<elision3>
1486	1486	<>	<elision2>
1486	1486	<>	<elision1>
1486	1480	<L2kl>	<>
1487	1116	.	.
1487	1116	 	 
1487	1116	<~>	<~>
1487	1116	<split-s>	<split-s>
1487	1116	<split-h>	<split-h>
1487	1116	<name2>	<name2>
1487	1140	<name2>	<name>
1487	1481	<>	<name>
1487	1119	<aphaerese>	<aphaerese>
1487	1480	<>	<aphaerese>
1487	1116	<elision3>	<elision3>
1487	1480	<>	<elision3>
1487	1116	<elision2>	<elision2>
1487	1480	<>	<elision2>
1487	1116	<elision1>	<elision1>
1487	1480	<>	<elision1>
1487	1113	.	υ
1487	1113	.	u
1487	1113	.	κ
1487	1113	.	α
1487	1113	.	a
1487	1113	.	λ
1487	772	<2s>	<>
1488	1489	<>	<aphaerese>
1488	1489	<>	<elision3>
1488	1489	<>	<elision2>
1488	1489	<>	<elision1>
1488	1492	<K>	<>
1489	1490	<>	<name>
1489	1489	<>	<aphaerese>
1489	1489	<>	<elision3>
1489	1489	<>	<elision2>
1489	1489	<>	<elision1>
1489	1493	<K>	<>
1490	1488	<>	<aphaerese>
1490	1488	<>	<elision3>
1490	1488	<>	<elision2>
1490	1488	<>	<elision1>
1490	1491	<K>	<>
1491	291	.	.
1491	291	<~>	<~>
1491	291	<split-s>	<split-s>
1491	291	<split-h>	<split-h>
1491	291	<name2>	<name2>
1491	294	<aphaerese>	<aphaerese>
1491	1492	<>	<aphaerese>
1491	491	<elision3>	<elision3>
1491	1492	<>	<elision3>
1491	491	<elision2>	<elision2>
1491	1492	<>	<elision2>
1491	491	<elision1>	<elision1>
1491	1492	<>	<elision1>
1491	287	.	υ
1491	378	H	υ
1491	287	.	u
1491	387	H	u
1491	462	H	κ
1491	360	H	k
1491	363	H	U
1491	366	H	K
1491	287	.	α
1491	390	H	α
1491	287	.	a
1491	393	H	a
1491	346	H	A
1491	465	H	λ
1491	375	H	l
1491	370	H	L
1492	289	.	.
1492	289	<~>	<~>
1492	289	<split-s>	<split-s>
1492	289	<split-h>	<split-h>
1492	289	<name2>	<name2>
1492	292	<aphaerese>	<aphaerese>
1492	1493	<>	<aphaerese>
1492	492	<elision3>	<elision3>
1492	1493	<>	<elision3>
1492	492	<elision2>	<elision2>
1492	1493	<>	<elision2>
1492	492	<elision1>	<elision1>
1492	1493	<>	<elision1>
1492	288	.	υ
1492	376	H	υ
1492	288	.	u
1492	385	H	u
1492	460	H	κ
1492	358	H	k
1492	361	H	U
1492	364	H	K
1492	288	.	α
1492	388	H	α
1492	288	.	a
1492	391	H	a
1492	347	H	A
1492	463	H	λ
1492	373	H	l
1492	371	H	L
1493	289	.	.
1493	289	<~>	<~>
1493	289	<split-s>	<split-s>
1493	289	<split-h>	<split-h>
1493	289	<name2>	<name2>
1493	1491	<>	<name>
1493	292	<aphaerese>	<aphaerese>
1493	1493	<>	<aphaerese>
1493	492	<elision3>	<elision3>
1493	1493	<>	<elision3>
1493	492	<elision2>	<elision2>
1493	1493	<>	<elision2>
1493	492	<elision1>	<elision1>
1493	1493	<>	<elision1>
1493	288	.	υ
1493	376	H	υ
1493	288	.	u
1493	385	H	u
1493	460	H	κ
1493	358	H	k
1493	361	H	U
1493	364	H	K
1493	288	.	α
1493	388	H	α
1493	288	.	a
1493	391	H	a
1493	347	H	A
1493	463	H	λ
1493	373	H	l
1493	371	H	L
1494	1495	<>	<name>
1494	1494	<>	<aphaerese>
1494	1494	<>	<elision3>
1494	1494	<>	<elision2>
1494	1494	<>	<elision1>
1494	1351	.	κ
1494	1351	.	λ
1494	675	<1s>	<>
1495	1496	<>	<aphaerese>
1495	1496	<>	<elision3>
1495	1496	<>	<elision2>
1495	1496	<>	<elision1>
1495	1353	.	κ
1495	1353	.	λ
1495	676	<1s>	<>
1496	1494	<>	<aphaerese>
1496	1494	<>	<elision3>
1496	1494	<>	<elision2>
1496	1494	<>	<elision1>
1496	1351	.	κ
1496	1351	.	λ
1496	674	<1s>	<>
1497	1343	.	.
1497	1344	 	 
1497	1343	<~>	<~>
1497	1343	<split-s>	<split-s>
1497	1343	<split-h>	<split-h>
1497	1343	<name2>	<name2>
1497	1458	<>	<name>
1497	1347	<aphaerese>	<aphaerese>
1497	1342	<>	<aphaerese>
1497	1460	<elision3>	<elision3>
1497	1342	<>	<elision3>
1497	1460	<elision2>	<elision2>
1497	1342	<>	<elision2>
1497	1460	<elision1>	<elision1>
1497	1342	<>	<elision1>
1497	1351	.	υ
1497	1354	s	υ
1497	1351	.	u
1497	1354	s	u
1497	985	s	κ
1497	1110	s	k
1497	1400	s	U
1497	1128	s	K
1497	1351	.	α
1497	1425	s	α
1497	1351	.	a
1497	1425	s	a
1497	1428	s	A
1497	985	s	λ
1497	1141	s	l
1497	1144	s	L
1497	1498	<1s>	<>
1498	1490	<>	<name>
1498	1489	<>	<aphaerese>
1498	1489	<>	<elision3>
1498	1489	<>	<elision2>
1498	1489	<>	<elision1>
1498	1499	<K>	<>
1499	289	.	.
1499	289	<~>	<~>
1499	289	<split-s>	<split-s>
1499	289	<split-h>	<split-h>
1499	289	<name2>	<name2>
1499	1491	<>	<name>
1499	292	<aphaerese>	<aphaerese>
1499	1493	<>	<aphaerese>
1499	492	<elision3>	<elision3>
1499	1493	<>	<elision3>
1499	492	<elision2>	<elision2>
1499	1493	<>	<elision2>
1499	492	<elision1>	<elision1>
1499	1493	<>	<elision1>
1499	288	.	υ
1499	288	.	u
1499	288	.	α
1499	288	.	a
1500	1501	<>	<name>
1500	1503	<>	<aphaerese>
1500	1503	<>	<elision3>
1500	1503	<>	<elision2>
1500	1503	<>	<elision1>
1500	1504	<k2K>	<>
1500	1510	<k2L>	<>
1500	1494	<l2L>	<>
1501	1502	<>	<aphaerese>
1501	1502	<>	<elision3>
1501	1502	<>	<elision2>
1501	1502	<>	<elision1>
1501	1505	<k2K>	<>
1501	1508	<k2L>	<>
1501	1495	<l2L>	<>
1502	1503	<>	<aphaerese>
1502	1503	<>	<elision3>
1502	1503	<>	<elision2>
1502	1503	<>	<elision1>
1502	1506	<k2K>	<>
1502	1509	<k2L>	<>
1502	1496	<l2L>	<>
1503	1501	<>	<name>
1503	1503	<>	<aphaerese>
1503	1503	<>	<elision3>
1503	1503	<>	<elision2>
1503	1503	<>	<elision1>
1503	1504	<k2K>	<>
1503	1507	<k2L>	<>
1503	1494	<l2L>	<>
1504	1177	.	.
1504	1178	 	 
1504	1177	<~>	<~>
1504	1177	<split-s>	<split-s>
1504	1177	<split-h>	<split-h>
1504	1177	<name2>	<name2>
1504	1505	<>	<name>
1504	1181	<aphaerese>	<aphaerese>
1504	1504	<>	<aphaerese>
1504	1177	<elision3>	<elision3>
1504	1504	<>	<elision3>
1504	1177	<elision2>	<elision2>
1504	1504	<>	<elision2>
1504	1177	<elision1>	<elision1>
1504	1504	<>	<elision1>
1504	1185	.	υ
1504	1188	s	υ
1504	1185	.	u
1504	1188	s	u
1504	271	s	κ
1504	926	s	k
1504	1251	s	U
1504	959	s	K
1504	1185	.	α
1504	1279	s	α
1504	1185	.	a
1504	1279	s	a
1504	1282	s	A
1504	271	s	λ
1504	974	s	l
1504	977	s	L
1505	1180	.	.
1505	1183	 	 
1505	1180	<~>	<~>
1505	1180	<split-s>	<split-s>
1505	1180	<split-h>	<split-h>
1505	1180	<name2>	<name2>
1505	1309	<aphaerese>	<aphaerese>
1505	1506	<>	<aphaerese>
1505	1180	<elision3>	<elision3>
1505	1506	<>	<elision3>
1505	1180	<elision2>	<elision2>
1505	1506	<>	<elision2>
1505	1180	<elision1>	<elision1>
1505	1506	<>	<elision1>
1505	1187	.	υ
1505	1190	s	υ
1505	1187	.	u
1505	1190	s	u
1505	919	s	κ
1505	928	s	k
1505	1253	s	U
1505	962	s	K
1505	1187	.	α
1505	1281	s	α
1505	1187	.	a
1505	1281	s	a
1505	1284	s	A
1505	919	s	λ
1505	976	s	l
1505	979	s	L
1506	1177	.	.
1506	1178	 	 
1506	1177	<~>	<~>
1506	1177	<split-s>	<split-s>
1506	1177	<split-h>	<split-h>
1506	1177	<name2>	<name2>
1506	1181	<aphaerese>	<aphaerese>
1506	1504	<>	<aphaerese>
1506	1177	<elision3>	<elision3>
1506	1504	<>	<elision3>
1506	1177	<elision2>	<elision2>
1506	1504	<>	<elision2>
1506	1177	<elision1>	<elision1>
1506	1504	<>	<elision1>
1506	1185	.	υ
1506	1188	s	υ
1506	1185	.	u
1506	1188	s	u
1506	271	s	κ
1506	926	s	k
1506	1251	s	U
1506	959	s	K
1506	1185	.	α
1506	1279	s	α
1506	1185	.	a
1506	1279	s	a
1506	1282	s	A
1506	271	s	λ
1506	974	s	l
1506	977	s	L
1507	1343	.	.
1507	1344	 	 
1507	1343	<~>	<~>
1507	1343	<split-s>	<split-s>
1507	1343	<split-h>	<split-h>
1507	1343	<name2>	<name2>
1507	1508	<>	<name>
1507	1347	<aphaerese>	<aphaerese>
1507	1507	<>	<aphaerese>
1507	1343	<elision3>	<elision3>
1507	1507	<>	<elision3>
1507	1343	<elision2>	<elision2>
1507	1507	<>	<elision2>
1507	1343	<elision1>	<elision1>
1507	1507	<>	<elision1>
1507	1351	.	υ
1507	1354	s	υ
1507	1351	.	u
1507	1354	s	u
1507	985	s	κ
1507	1110	s	k
1507	1400	s	U
1507	1128	s	K
1507	1351	.	α
1507	1425	s	α
1507	1351	.	a
1507	1425	s	a
1507	1428	s	A
1507	985	s	λ
1507	1141	s	l
1507	1144	s	L
1507	612	<1s>	<>
1508	1346	.	.
1508	1349	 	 
1508	1346	<~>	<~>
1508	1346	<split-s>	<split-s>
1508	1346	<split-h>	<split-h>
1508	1346	<name2>	<name2>
1508	1455	<aphaerese>	<aphaerese>
1508	1509	<>	<aphaerese>
1508	1346	<elision3>	<elision3>
1508	1509	<>	<elision3>
1508	1346	<elision2>	<elision2>
1508	1509	<>	<elision2>
1508	1346	<elision1>	<elision1>
1508	1509	<>	<elision1>
1508	1353	.	υ
1508	1356	s	υ
1508	1353	.	u
1508	1356	s	u
1508	1106	s	κ
1508	1112	s	k
1508	1402	s	U
1508	1131	s	K
1508	1353	.	α
1508	1427	s	α
1508	1353	.	a
1508	1427	s	a
1508	1430	s	A
1508	1106	s	λ
1508	1143	s	l
1508	1146	s	L
1508	613	<1s>	<>
1509	1343	.	.
1509	1344	 	 
1509	1343	<~>	<~>
1509	1343	<split-s>	<split-s>
1509	1343	<split-h>	<split-h>
1509	1343	<name2>	<name2>
1509	1347	<aphaerese>	<aphaerese>
1509	1507	<>	<aphaerese>
1509	1343	<elision3>	<elision3>
1509	1507	<>	<elision3>
1509	1343	<elision2>	<elision2>
1509	1507	<>	<elision2>
1509	1343	<elision1>	<elision1>
1509	1507	<>	<elision1>
1509	1351	.	υ
1509	1354	s	υ
1509	1351	.	u
1509	1354	s	u
1509	985	s	κ
1509	1110	s	k
1509	1400	s	U
1509	1128	s	K
1509	1351	.	α
1509	1425	s	α
1509	1351	.	a
1509	1425	s	a
1509	1428	s	A
1509	985	s	λ
1509	1141	s	l
1509	1144	s	L
1509	611	<1s>	<>
1510	1343	.	.
1510	1344	 	 
1510	1343	<~>	<~>
1510	1343	<split-s>	<split-s>
1510	1343	<split-h>	<split-h>
1510	1343	<name2>	<name2>
1510	1508	<>	<name>
1510	1347	<aphaerese>	<aphaerese>
1510	1507	<>	<aphaerese>
1510	1343	<elision3>	<elision3>
1510	1507	<>	<elision3>
1510	1343	<elision2>	<elision2>
1510	1507	<>	<elision2>
1510	1343	<elision1>	<elision1>
1510	1507	<>	<elision1>
1510	1351	.	υ
1510	1354	s	υ
1510	1351	.	u
1510	1354	s	u
1510	985	s	κ
1510	1110	s	k
1510	1400	s	U
1510	1128	s	K
1510	1351	.	α
1510	1425	s	α
1510	1351	.	a
1510	1425	s	a
1510	1428	s	A
1510	985	s	λ
1510	1141	s	l
1510	1144	s	L
1510	1511	<1s>	<>
1511	613	<>	<name>
1511	612	<>	<aphaerese>
1511	612	<>	<elision3>
1511	612	<>	<elision2>
1511	612	<>	<elision1>
1511	1512	<K>	<>
1512	289	.	.
1512	289	<~>	<~>
1512	289	<split-s>	<split-s>
1512	289	<split-h>	<split-h>
1512	289	<name2>	<name2>
1512	614	<>	<name>
1512	292	<aphaerese>	<aphaerese>
1512	616	<>	<aphaerese>
1512	289	<elision3>	<elision3>
1512	616	<>	<elision3>
1512	289	<elision2>	<elision2>
1512	616	<>	<elision2>
1512	289	<elision1>	<elision1>
1512	616	<>	<elision1>
1512	288	.	υ
1512	288	.	u
1512	288	.	α
1512	288	.	a
1513	1177	.	.
1513	1178	 	 
1513	1177	<~>	<~>
1513	1177	<split-s>	<split-s>
1513	1177	<split-h>	<split-h>
1513	1177	<name2>	<name2>
1513	1514	<>	<name>
1513	1181	<aphaerese>	<aphaerese>
1513	1513	<>	<aphaerese>
1513	1177	<elision3>	<elision3>
1513	1513	<>	<elision3>
1513	1177	<elision2>	<elision2>
1513	1513	<>	<elision2>
1513	1177	<elision1>	<elision1>
1513	1513	<>	<elision1>
1513	1185	.	υ
1513	1188	s	υ
1513	1185	.	u
1513	1188	s	u
1513	1191	.	κ
1513	1209	s	κ
1513	926	s	k
1513	1251	s	U
1513	959	s	K
1513	1185	.	α
1513	1279	s	α
1513	1185	.	a
1513	1279	s	a
1513	1282	s	A
1513	1285	s	λ
1513	974	s	l
1513	977	s	L
1513	1343	<U2L>	<>
1514	1180	.	.
1514	1183	 	 
1514	1180	<~>	<~>
1514	1180	<split-s>	<split-s>
1514	1180	<split-h>	<split-h>
1514	1180	<name2>	<name2>
1514	1309	<aphaerese>	<aphaerese>
1514	1515	<>	<aphaerese>
1514	1180	<elision3>	<elision3>
1514	1515	<>	<elision3>
1514	1180	<elision2>	<elision2>
1514	1515	<>	<elision2>
1514	1180	<elision1>	<elision1>
1514	1515	<>	<elision1>
1514	1187	.	υ
1514	1190	s	υ
1514	1187	.	u
1514	1190	s	u
1514	1193	.	κ
1514	1211	s	κ
1514	928	s	k
1514	1253	s	U
1514	962	s	K
1514	1187	.	α
1514	1281	s	α
1514	1187	.	a
1514	1281	s	a
1514	1284	s	A
1514	1287	s	λ
1514	976	s	l
1514	979	s	L
1514	1457	<U2L>	<>
1515	1177	.	.
1515	1178	 	 
1515	1177	<~>	<~>
1515	1177	<split-s>	<split-s>
1515	1177	<split-h>	<split-h>
1515	1177	<name2>	<name2>
1515	1181	<aphaerese>	<aphaerese>
1515	1513	<>	<aphaerese>
1515	1177	<elision3>	<elision3>
1515	1513	<>	<elision3>
1515	1177	<elision2>	<elision2>
1515	1513	<>	<elision2>
1515	1177	<elision1>	<elision1>
1515	1513	<>	<elision1>
1515	1185	.	υ
1515	1188	s	υ
1515	1185	.	u
1515	1188	s	u
1515	1191	.	κ
1515	1209	s	κ
1515	926	s	k
1515	1251	s	U
1515	959	s	K
1515	1185	.	α
1515	1279	s	α
1515	1185	.	a
1515	1279	s	a
1515	1282	s	A
1515	1285	s	λ
1515	974	s	l
1515	977	s	L
1515	1346	<U2L>	<>
1516	1177	.	.
1516	1178	 	 
1516	1177	<~>	<~>
1516	1177	<split-s>	<split-s>
1516	1177	<split-h>	<split-h>
1516	1177	<name2>	<name2>
1516	1517	<name2>	<name>
1516	1518	<>	<name>
1516	1181	<aphaerese>	<aphaerese>
1516	1520	<>	<aphaerese>
1516	1177	<elision3>	<elision3>
1516	1520	<>	<elision3>
1516	1177	<elision2>	<elision2>
1516	1520	<>	<elision2>
1516	1177	<elision1>	<elision1>
1516	1520	<>	<elision1>
1516	1185	.	υ
1516	1188	s	υ
1516	1185	.	u
1516	1188	s	u
1516	1351	.	κ
1516	271	s	κ
1516	926	s	k
1516	1251	s	U
1516	959	s	K
1516	1185	.	α
1516	1279	s	α
1516	1185	.	a
1516	1279	s	a
1516	1282	s	A
1516	1351	.	λ
1516	271	s	λ
1516	974	s	l
1516	977	s	L
1516	675	<1s>	<>
1516	1521	<k2K>	<>
1516	1522	<k2L>	<>
1516	1524	<K2L>	<>
1517	962	s	k
1517	979	s	l
1518	1180	.	.
1518	1183	 	 
1518	1180	<~>	<~>
1518	1180	<split-s>	<split-s>
1518	1180	<split-h>	<split-h>
1518	1180	<name2>	<name2>
1518	1309	<aphaerese>	<aphaerese>
1518	1519	<>	<aphaerese>
1518	1180	<elision3>	<elision3>
1518	1519	<>	<elision3>
1518	1180	<elision2>	<elision2>
1518	1519	<>	<elision2>
1518	1180	<elision1>	<elision1>
1518	1519	<>	<elision1>
1518	1187	.	υ
1518	1190	s	υ
1518	1187	.	u
1518	1190	s	u
1518	1353	.	κ
1518	919	s	κ
1518	928	s	k
1518	1253	s	U
1518	962	s	K
1518	1187	.	α
1518	1281	s	α
1518	1187	.	a
1518	1281	s	a
1518	1284	s	A
1518	1353	.	λ
1518	919	s	λ
1518	976	s	l
1518	979	s	L
1518	676	<1s>	<>
1518	1508	<K2L>	<>
1519	1177	.	.
1519	1178	 	 
1519	1177	<~>	<~>
1519	1177	<split-s>	<split-s>
1519	1177	<split-h>	<split-h>
1519	1177	<name2>	<name2>
1519	1181	<aphaerese>	<aphaerese>
1519	1520	<>	<aphaerese>
1519	1177	<elision3>	<elision3>
1519	1520	<>	<elision3>
1519	1177	<elision2>	<elision2>
1519	1520	<>	<elision2>
1519	1177	<elision1>	<elision1>
1519	1520	<>	<elision1>
1519	1185	.	υ
1519	1188	s	υ
1519	1185	.	u
1519	1188	s	u
1519	1351	.	κ
1519	271	s	κ
1519	926	s	k
1519	1251	s	U
1519	959	s	K
1519	1185	.	α
1519	1279	s	α
1519	1185	.	a
1519	1279	s	a
1519	1282	s	A
1519	1351	.	λ
1519	271	s	λ
1519	974	s	l
1519	977	s	L
1519	674	<1s>	<>
1519	1509	<K2L>	<>
1520	1177	.	.
1520	1178	 	 
1520	1177	<~>	<~>
1520	1177	<split-s>	<split-s>
1520	1177	<split-h>	<split-h>
1520	1177	<name2>	<name2>
1520	1518	<>	<name>
1520	1181	<aphaerese>	<aphaerese>
1520	1520	<>	<aphaerese>
1520	1177	<elision3>	<elision3>
1520	1520	<>	<elision3>
1520	1177	<elision2>	<elision2>
1520	1520	<>	<elision2>
1520	1177	<elision1>	<elision1>
1520	1520	<>	<elision1>
1520	1185	.	υ
1520	1188	s	υ
1520	1185	.	u
1520	1188	s	u
1520	1351	.	κ
1520	271	s	κ
1520	926	s	k
1520	1251	s	U
1520	959	s	K
1520	1185	.	α
1520	1279	s	α
1520	1185	.	a
1520	1279	s	a
1520	1282	s	A
1520	1351	.	λ
1520	271	s	λ
1520	974	s	l
1520	977	s	L
1520	675	<1s>	<>
1520	1507	<K2L>	<>
1521	1517	<name>	<name>
1522	1523	<name>	<name>
1522	617	<1s>	<>
1523	1131	s	k
1523	1146	s	l
1523	537	<1s>	<>
1524	1343	.	.
1524	1344	 	 
1524	1343	<~>	<~>
1524	1343	<split-s>	<split-s>
1524	1343	<split-h>	<split-h>
1524	1343	<name2>	<name2>
1524	1523	<name2>	<name>
1524	1508	<>	<name>
1524	1347	<aphaerese>	<aphaerese>
1524	1507	<>	<aphaerese>
1524	1343	<elision3>	<elision3>
1524	1507	<>	<elision3>
1524	1343	<elision2>	<elision2>
1524	1507	<>	<elision2>
1524	1343	<elision1>	<elision1>
1524	1507	<>	<elision1>
1524	1351	.	υ
1524	1354	s	υ
1524	1351	.	u
1524	1354	s	u
1524	985	s	κ
1524	1110	s	k
1524	1400	s	U
1524	1128	s	K
1524	1351	.	α
1524	1425	s	α
1524	1351	.	a
1524	1425	s	a
1524	1428	s	A
1524	985	s	λ
1524	1141	s	l
1524	1144	s	L
1524	1525	<1s>	<>
1525	613	<>	<name>
1525	612	<>	<aphaerese>
1525	612	<>	<elision3>
1525	612	<>	<elision2>
1525	612	<>	<elision1>
1525	1526	<K>	<>
1526	289	.	.
1526	289	<~>	<~>
1526	289	<split-s>	<split-s>
1526	289	<split-h>	<split-h>
1526	289	<name2>	<name2>
1526	538	<name2>	<name>
1526	614	<>	<name>
1526	292	<aphaerese>	<aphaerese>
1526	616	<>	<aphaerese>
1526	289	<elision3>	<elision3>
1526	616	<>	<elision3>
1526	289	<elision2>	<elision2>
1526	616	<>	<elision2>
1526	289	<elision1>	<elision1>
1526	616	<>	<elision1>
1526	288	.	υ
1526	288	.	u
1526	288	.	α
1526	288	.	a
1527	1528	<>	<name>
1527	1527	<>	<aphaerese>
1527	1527	<>	<elision3>
1527	1527	<>	<elision2>
1527	1527	<>	<elision1>
1527	1531	<lambda2L>	<>
1528	1529	<>	<aphaerese>
1528	1529	<>	<elision3>
1528	1529	<>	<elision2>
1528	1529	<>	<elision1>
1528	1532	<lambda2L>	<>
1529	1527	<>	<aphaerese>
1529	1527	<>	<elision3>
1529	1527	<>	<elision2>
1529	1527	<>	<elision1>
1529	1530	<lambda2L>	<>
1530	1343	.	.
1530	1344	 	 
1530	1343	<~>	<~>
1530	1343	<split-s>	<split-s>
1530	1343	<split-h>	<split-h>
1530	1343	<name2>	<name2>
1530	1347	<aphaerese>	<aphaerese>
1530	1531	<>	<aphaerese>
1530	1343	<elision3>	<elision3>
1530	1531	<>	<elision3>
1530	1343	<elision2>	<elision2>
1530	1531	<>	<elision2>
1530	1343	<elision1>	<elision1>
1530	1531	<>	<elision1>
1530	1351	.	υ
1530	1354	s	υ
1530	1351	.	u
1530	1354	s	u
1530	1351	.	κ
1530	985	s	κ
1530	1110	s	k
1530	1400	s	U
1530	1128	s	K
1530	1351	.	α
1530	1425	s	α
1530	1351	.	a
1530	1425	s	a
1530	1428	s	A
1530	1351	.	λ
1530	985	s	λ
1530	1141	s	l
1530	1144	s	L
1530	526	<1s>	<>
1531	1343	.	.
1531	1344	 	 
1531	1343	<~>	<~>
1531	1343	<split-s>	<split-s>
1531	1343	<split-h>	<split-h>
1531	1343	<name2>	<name2>
1531	1532	<>	<name>
1531	1347	<aphaerese>	<aphaerese>
1531	1531	<>	<aphaerese>
1531	1343	<elision3>	<elision3>
1531	1531	<>	<elision3>
1531	1343	<elision2>	<elision2>
1531	1531	<>	<elision2>
1531	1343	<elision1>	<elision1>
1531	1531	<>	<elision1>
1531	1351	.	υ
1531	1354	s	υ
1531	1351	.	u
1531	1354	s	u
1531	1351	.	κ
1531	985	s	κ
1531	1110	s	k
1531	1400	s	U
1531	1128	s	K
1531	1351	.	α
1531	1425	s	α
1531	1351	.	a
1531	1425	s	a
1531	1428	s	A
1531	1351	.	λ
1531	985	s	λ
1531	1141	s	l
1531	1144	s	L
1531	527	<1s>	<>
1532	1346	.	.
1532	1349	 	 
1532	1346	<~>	<~>
1532	1346	<split-s>	<split-s>
1532	1346	<split-h>	<split-h>
1532	1346	<name2>	<name2>
1532	1455	<aphaerese>	<aphaerese>
1532	1530	<>	<aphaerese>
1532	1346	<elision3>	<elision3>
1532	1530	<>	<elision3>
1532	1346	<elision2>	<elision2>
1532	1530	<>	<elision2>
1532	1346	<elision1>	<elision1>
1532	1530	<>	<elision1>
1532	1353	.	υ
1532	1356	s	υ
1532	1353	.	u
1532	1356	s	u
1532	1353	.	κ
1532	1106	s	κ
1532	1112	s	k
1532	1402	s	U
1532	1131	s	K
1532	1353	.	α
1532	1427	s	α
1532	1353	.	a
1532	1427	s	a
1532	1430	s	A
1532	1353	.	λ
1532	1106	s	λ
1532	1143	s	l
1532	1146	s	L
1532	528	<1s>	<>
1533	1534	<>	<name>
1533	1533	<>	<aphaerese>
1533	1533	<>	<elision3>
1533	1533	<>	<elision2>
1533	1533	<>	<elision1>
1533	1531	<l2L>	<>
1534	1535	<>	<aphaerese>
1534	1535	<>	<elision3>
1534	1535	<>	<elision2>
1534	1535	<>	<elision1>
1534	1532	<l2L>	<>
1535	1533	<>	<aphaerese>
1535	1533	<>	<elision3>
1535	1533	<>	<elision2>
1535	1533	<>	<elision1>
1535	1530	<l2L>	<>
1536	1343	.	.
1536	1344	 	 
1536	1343	<~>	<~>
1536	1343	<split-s>	<split-s>
1536	1343	<split-h>	<split-h>
1536	1343	<name2>	<name2>
1536	1523	<name2>	<name>
1536	1532	<>	<name>
1536	1347	<aphaerese>	<aphaerese>
1536	1531	<>	<aphaerese>
1536	1343	<elision3>	<elision3>
1536	1531	<>	<elision3>
1536	1343	<elision2>	<elision2>
1536	1531	<>	<elision2>
1536	1343	<elision1>	<elision1>
1536	1531	<>	<elision1>
1536	1351	.	υ
1536	1354	s	υ
1536	1351	.	u
1536	1354	s	u
1536	1351	.	κ
1536	985	s	κ
1536	1110	s	k
1536	1400	s	U
1536	1128	s	K
1536	1351	.	α
1536	1425	s	α
1536	1351	.	a
1536	1425	s	a
1536	1428	s	A
1536	1351	.	λ
1536	985	s	λ
1536	1141	s	l
1536	1144	s	L
1536	685	<1s>	<>
1536	1522	<l2L>	<>
1537	1175	<>	<aphaerese>
1537	1175	<>	<elision3>
1537	1175	<>	<elision2>
1537	1175	<>	<elision1>
1537	1313	<kappa2K>	<>
1537	1538	<kappa2L>	<>
1537	1496	<lambda2L>	<>
1538	1343	.	.
1538	1344	 	 
1538	1343	<~>	<~>
1538	1343	<split-s>	<split-s>
1538	1343	<split-h>	<split-h>
1538	1343	<name2>	<name2>
1538	1347	<aphaerese>	<aphaerese>
1538	1342	<>	<aphaerese>
1538	1460	<elision3>	<elision3>
1538	1342	<>	<elision3>
1538	1460	<elision2>	<elision2>
1538	1342	<>	<elision2>
1538	1460	<elision1>	<elision1>
1538	1342	<>	<elision1>
1538	1351	.	υ
1538	1354	s	υ
1538	1351	.	u
1538	1354	s	u
1538	985	s	κ
1538	1110	s	k
1538	1400	s	U
1538	1128	s	K
1538	1351	.	α
1538	1425	s	α
1538	1351	.	a
1538	1425	s	a
1538	1428	s	A
1538	985	s	λ
1538	1141	s	l
1538	1144	s	L
1538	1539	<1s>	<>
1539	1489	<>	<aphaerese>
1539	1489	<>	<elision3>
1539	1489	<>	<elision2>
1539	1489	<>	<elision1>
1539	1540	<K>	<>
1540	289	.	.
1540	289	<~>	<~>
1540	289	<split-s>	<split-s>
1540	289	<split-h>	<split-h>
1540	289	<name2>	<name2>
1540	292	<aphaerese>	<aphaerese>
1540	1493	<>	<aphaerese>
1540	492	<elision3>	<elision3>
1540	1493	<>	<elision3>
1540	492	<elision2>	<elision2>
1540	1493	<>	<elision2>
1540	492	<elision1>	<elision1>
1540	1493	<>	<elision1>
1540	288	.	υ
1540	288	.	u
1540	288	.	α
1540	288	.	a
1541	1503	<>	<aphaerese>
1541	1503	<>	<elision3>
1541	1503	<>	<elision2>
1541	1503	<>	<elision1>
1541	1506	<k2K>	<>
1541	1542	<k2L>	<>
1541	1496	<l2L>	<>
1542	1343	.	.
1542	1344	 	 
1542	1343	<~>	<~>
1542	1343	<split-s>	<split-s>
1542	1343	<split-h>	<split-h>
1542	1343	<name2>	<name2>
1542	1347	<aphaerese>	<aphaerese>
1542	1507	<>	<aphaerese>
1542	1343	<elision3>	<elision3>
1542	1507	<>	<elision3>
1542	1343	<elision2>	<elision2>
1542	1507	<>	<elision2>
1542	1343	<elision1>	<elision1>
1542	1507	<>	<elision1>
1542	1351	.	υ
1542	1354	s	υ
1542	1351	.	u
1542	1354	s	u
1542	985	s	κ
1542	1110	s	k
1542	1400	s	U
1542	1128	s	K
1542	1351	.	α
1542	1425	s	α
1542	1351	.	a
1542	1425	s	a
1542	1428	s	A
1542	985	s	λ
1542	1141	s	l
1542	1144	s	L
1542	1543	<1s>	<>
1543	612	<>	<aphaerese>
1543	612	<>	<elision3>
1543	612	<>	<elision2>
1543	612	<>	<elision1>
1543	1544	<K>	<>
1544	289	.	.
1544	289	<~>	<~>
1544	289	<split-s>	<split-s>
1544	289	<split-h>	<split-h>
1544	289	<name2>	<name2>
1544	292	<aphaerese>	<aphaerese>
1544	616	<>	<aphaerese>
1544	289	<elision3>	<elision3>
1544	616	<>	<elision3>
1544	289	<elision2>	<elision2>
1544	616	<>	<elision2>
1544	289	<elision1>	<elision1>
1544	616	<>	<elision1>
1544	288	.	υ
1544	288	.	u
1544	288	.	α
1544	288	.	a
1545	1177	.	.
1545	1178	 	 
1545	1177	<~>	<~>
1545	1177	<split-s>	<split-s>
1545	1177	<split-h>	<split-h>
1545	1177	<name2>	<name2>
1545	1181	<aphaerese>	<aphaerese>
1545	1520	<>	<aphaerese>
1545	1177	<elision3>	<elision3>
1545	1520	<>	<elision3>
1545	1177	<elision2>	<elision2>
1545	1520	<>	<elision2>
1545	1177	<elision1>	<elision1>
1545	1520	<>	<elision1>
1545	1185	.	υ
1545	1188	s	υ
1545	1185	.	u
1545	1188	s	u
1545	1351	.	κ
1545	271	s	κ
1545	926	s	k
1545	1251	s	U
1545	959	s	K
1545	1185	.	α
1545	1279	s	α
1545	1185	.	a
1545	1279	s	a
1545	1282	s	A
1545	1351	.	λ
1545	271	s	λ
1545	974	s	l
1545	977	s	L
1545	674	<1s>	<>
1545	1542	<K2L>	<>
1546	1547	<>	<name>
1546	1546	<>	<aphaerese>
1546	251	<elision3>	<elision3>
1546	1546	<>	<elision3>
1546	251	<elision2>	<elision2>
1546	1546	<>	<elision2>
1546	251	<elision1>	<elision1>
1546	1546	<>	<elision1>
1547	1548	<>	<aphaerese>
1547	250	<elision3>	<elision3>
1547	1548	<>	<elision3>
1547	250	<elision2>	<elision2>
1547	1548	<>	<elision2>
1547	250	<elision1>	<elision1>
1547	1548	<>	<elision1>
1548	1546	<>	<aphaerese>
1548	251	<elision3>	<elision3>
1548	1546	<>	<elision3>
1548	251	<elision2>	<elision2>
1548	1546	<>	<elision2>
1548	251	<elision1>	<elision1>
1548	1546	<>	<elision1>
1549	1550	<>	<name>
1549	1552	<>	<aphaerese>
1549	1552	<>	<elision3>
1549	1552	<>	<elision2>
1549	1552	<>	<elision1>
1549	1559	<ypsilon2K>	<>
1549	1560	<ypsilon2L>	<>
1550	1551	<>	<aphaerese>
1550	1551	<>	<elision3>
1550	1551	<>	<elision2>
1550	1551	<>	<elision1>
1550	1554	<ypsilon2K>	<>
1550	1557	<ypsilon2L>	<>
1551	1552	<>	<aphaerese>
1551	1552	<>	<elision3>
1551	1552	<>	<elision2>
1551	1552	<>	<elision1>
1551	1555	<ypsilon2K>	<>
1551	1558	<ypsilon2L>	<>
1552	1550	<>	<name>
1552	1552	<>	<aphaerese>
1552	1552	<>	<elision3>
1552	1552	<>	<elision2>
1552	1552	<>	<elision1>
1552	1553	<ypsilon2K>	<>
1552	1556	<ypsilon2L>	<>
1553	1177	.	.
1553	1178	 	 
1553	1177	<~>	<~>
1553	1177	<split-s>	<split-s>
1553	1177	<split-h>	<split-h>
1553	1177	<name2>	<name2>
1553	1554	<>	<name>
1553	1181	<aphaerese>	<aphaerese>
1553	1553	<>	<aphaerese>
1553	1553	<>	<elision3>
1553	1553	<>	<elision2>
1553	1553	<>	<elision1>
1553	1185	.	υ
1553	1188	s	υ
1553	1185	.	u
1553	1188	s	u
1553	1191	.	κ
1553	1209	s	κ
1553	926	s	k
1553	1251	s	U
1553	959	s	K
1553	1185	.	α
1553	1279	s	α
1553	1185	.	a
1553	1279	s	a
1553	1282	s	A
1553	1285	s	λ
1553	974	s	l
1553	977	s	L
1554	1180	.	.
1554	1183	 	 
1554	1180	<~>	<~>
1554	1180	<split-s>	<split-s>
1554	1180	<split-h>	<split-h>
1554	1180	<name2>	<name2>
1554	1309	<aphaerese>	<aphaerese>
1554	1555	<>	<aphaerese>
1554	1555	<>	<elision3>
1554	1555	<>	<elision2>
1554	1555	<>	<elision1>
1554	1187	.	υ
1554	1190	s	υ
1554	1187	.	u
1554	1190	s	u
1554	1193	.	κ
1554	1211	s	κ
1554	928	s	k
1554	1253	s	U
1554	962	s	K
1554	1187	.	α
1554	1281	s	α
1554	1187	.	a
1554	1281	s	a
1554	1284	s	A
1554	1287	s	λ
1554	976	s	l
1554	979	s	L
1555	1177	.	.
1555	1178	 	 
1555	1177	<~>	<~>
1555	1177	<split-s>	<split-s>
1555	1177	<split-h>	<split-h>
1555	1177	<name2>	<name2>
1555	1181	<aphaerese>	<aphaerese>
1555	1553	<>	<aphaerese>
1555	1553	<>	<elision3>
1555	1553	<>	<elision2>
1555	1553	<>	<elision1>
1555	1185	.	υ
1555	1188	s	υ
1555	1185	.	u
1555	1188	s	u
1555	1191	.	κ
1555	1209	s	κ
1555	926	s	k
1555	1251	s	U
1555	959	s	K
1555	1185	.	α
1555	1279	s	α
1555	1185	.	a
1555	1279	s	a
1555	1282	s	A
1555	1285	s	λ
1555	974	s	l
1555	977	s	L
1556	1343	.	.
1556	1344	 	 
1556	1343	<~>	<~>
1556	1343	<split-s>	<split-s>
1556	1343	<split-h>	<split-h>
1556	1343	<name2>	<name2>
1556	1557	<>	<name>
1556	1347	<aphaerese>	<aphaerese>
1556	1556	<>	<aphaerese>
1556	1556	<>	<elision3>
1556	1556	<>	<elision2>
1556	1556	<>	<elision1>
1556	1351	.	υ
1556	1354	s	υ
1556	1351	.	u
1556	1354	s	u
1556	1357	.	κ
1556	1375	s	κ
1556	1110	s	k
1556	1400	s	U
1556	1128	s	K
1556	1351	.	α
1556	1425	s	α
1556	1351	.	a
1556	1425	s	a
1556	1428	s	A
1556	1431	s	λ
1556	1141	s	l
1556	1144	s	L
1556	440	<1s>	<>
1557	1346	.	.
1557	1349	 	 
1557	1346	<~>	<~>
1557	1346	<split-s>	<split-s>
1557	1346	<split-h>	<split-h>
1557	1346	<name2>	<name2>
1557	1455	<aphaerese>	<aphaerese>
1557	1558	<>	<aphaerese>
1557	1558	<>	<elision3>
1557	1558	<>	<elision2>
1557	1558	<>	<elision1>
1557	1353	.	υ
1557	1356	s	υ
1557	1353	.	u
1557	1356	s	u
1557	1359	.	κ
1557	1377	s	κ
1557	1112	s	k
1557	1402	s	U
1557	1131	s	K
1557	1353	.	α
1557	1427	s	α
1557	1353	.	a
1557	1427	s	a
1557	1430	s	A
1557	1433	s	λ
1557	1143	s	l
1557	1146	s	L
1557	441	<1s>	<>
1558	1343	.	.
1558	1344	 	 
1558	1343	<~>	<~>
1558	1343	<split-s>	<split-s>
1558	1343	<split-h>	<split-h>
1558	1343	<name2>	<name2>
1558	1347	<aphaerese>	<aphaerese>
1558	1556	<>	<aphaerese>
1558	1556	<>	<elision3>
1558	1556	<>	<elision2>
1558	1556	<>	<elision1>
1558	1351	.	υ
1558	1354	s	υ
1558	1351	.	u
1558	1354	s	u
1558	1357	.	κ
1558	1375	s	κ
1558	1110	s	k
1558	1400	s	U
1558	1128	s	K
1558	1351	.	α
1558	1425	s	α
1558	1351	.	a
1558	1425	s	a
1558	1428	s	A
1558	1431	s	λ
1558	1141	s	l
1558	1144	s	L
1558	439	<1s>	<>
1559	1177	.	.
1559	1178	 	 
1559	1177	<~>	<~>
1559	1177	<split-s>	<split-s>
1559	1177	<split-h>	<split-h>
1559	1177	<name2>	<name2>
1559	1554	<>	<name>
1559	1181	<aphaerese>	<aphaerese>
1559	1553	<>	<aphaerese>
1559	1553	<>	<elision3>
1559	1553	<>	<elision2>
1559	1553	<>	<elision1>
1559	1185	.	υ
1559	1188	s	υ
1559	1185	.	u
1559	1188	s	u
1559	1191	.	κ
1559	1209	s	κ
1559	926	s	k
1559	1185	.	α
1559	1279	s	α
1559	1185	.	a
1559	1279	s	a
1559	1285	s	λ
1559	974	s	l
1560	1343	.	.
1560	1344	 	 
1560	1343	<~>	<~>
1560	1343	<split-s>	<split-s>
1560	1343	<split-h>	<split-h>
1560	1343	<name2>	<name2>
1560	1557	<>	<name>
1560	1347	<aphaerese>	<aphaerese>
1560	1556	<>	<aphaerese>
1560	1556	<>	<elision3>
1560	1556	<>	<elision2>
1560	1556	<>	<elision1>
1560	1351	.	υ
1560	1354	s	υ
1560	1351	.	u
1560	1354	s	u
1560	1357	.	κ
1560	1375	s	κ
1560	1110	s	k
1560	1351	.	α
1560	1425	s	α
1560	1351	.	a
1560	1425	s	a
1560	1431	s	λ
1560	1141	s	l
1560	1561	<1s>	<>
1561	441	<>	<name>
1561	440	<>	<aphaerese>
1561	440	<>	<elision3>
1561	440	<>	<elision2>
1561	440	<>	<elision1>
1561	1562	<K>	<>
1562	289	.	.
1562	289	<~>	<~>
1562	289	<split-s>	<split-s>
1562	289	<split-h>	<split-h>
1562	289	<name2>	<name2>
1562	442	<>	<name>
1562	292	<aphaerese>	<aphaerese>
1562	444	<>	<aphaerese>
1562	444	<>	<elision3>
1562	444	<>	<elision2>
1562	444	<>	<elision1>
1562	288	.	υ
1562	288	.	u
1562	295	.	κ
1562	288	.	α
1562	288	.	a
1563	1564	<>	<name>
1563	1566	<>	<aphaerese>
1563	1566	<>	<elision3>
1563	1566	<>	<elision2>
1563	1566	<>	<elision1>
1563	1559	<u2K>	<>
1563	1560	<u2L>	<>
1564	1565	<>	<aphaerese>
1564	1565	<>	<elision3>
1564	1565	<>	<elision2>
1564	1565	<>	<elision1>
1564	1554	<u2K>	<>
1564	1557	<u2L>	<>
1565	1566	<>	<aphaerese>
1565	1566	<>	<elision3>
1565	1566	<>	<elision2>
1565	1566	<>	<elision1>
1565	1555	<u2K>	<>
1565	1558	<u2L>	<>
1566	1564	<>	<name>
1566	1566	<>	<aphaerese>
1566	1566	<>	<elision3>
1566	1566	<>	<elision2>
1566	1566	<>	<elision1>
1566	1553	<u2K>	<>
1566	1556	<u2L>	<>
1567	1173	<>	<name>
1567	1175	<>	<aphaerese>
1567	1175	<>	<elision3>
1567	1175	<>	<elision2>
1567	1175	<>	<elision1>
1567	1568	<kappa2K>	<>
1567	1569	<kappa2L>	<>
1567	1494	<lambda2L>	<>
1568	1177	.	.
1568	1178	 	 
1568	1177	<~>	<~>
1568	1177	<split-s>	<split-s>
1568	1177	<split-h>	<split-h>
1568	1177	<name2>	<name2>
1568	1312	<>	<name>
1568	1181	<aphaerese>	<aphaerese>
1568	1176	<>	<aphaerese>
1568	1314	<elision3>	<elision3>
1568	1176	<>	<elision3>
1568	1314	<elision2>	<elision2>
1568	1176	<>	<elision2>
1568	1314	<elision1>	<elision1>
1568	1176	<>	<elision1>
1568	1185	.	υ
1568	1188	s	υ
1568	1185	.	u
1568	1188	s	u
1568	271	s	κ
1568	926	s	k
1568	1185	.	α
1568	1279	s	α
1568	1185	.	a
1568	1279	s	a
1568	271	s	λ
1568	974	s	l
1569	1343	.	.
1569	1344	 	 
1569	1343	<~>	<~>
1569	1343	<split-s>	<split-s>
1569	1343	<split-h>	<split-h>
1569	1343	<name2>	<name2>
1569	1458	<>	<name>
1569	1347	<aphaerese>	<aphaerese>
1569	1342	<>	<aphaerese>
1569	1460	<elision3>	<elision3>
1569	1342	<>	<elision3>
1569	1460	<elision2>	<elision2>
1569	1342	<>	<elision2>
1569	1460	<elision1>	<elision1>
1569	1342	<>	<elision1>
1569	1351	.	υ
1569	1354	s	υ
1569	1351	.	u
1569	1354	s	u
1569	985	s	κ
1569	1110	s	k
1569	1351	.	α
1569	1425	s	α
1569	1351	.	a
1569	1425	s	a
1569	985	s	λ
1569	1141	s	l
1569	1498	<1s>	<>
1570	1501	<>	<name>
1570	1503	<>	<aphaerese>
1570	1503	<>	<elision3>
1570	1503	<>	<elision2>
1570	1503	<>	<elision1>
1570	1571	<k2K>	<>
1570	1572	<k2L>	<>
1570	1494	<l2L>	<>
1571	1177	.	.
1571	1178	 	 
1571	1177	<~>	<~>
1571	1177	<split-s>	<split-s>
1571	1177	<split-h>	<split-h>
1571	1177	<name2>	<name2>
1571	1505	<>	<name>
1571	1181	<aphaerese>	<aphaerese>
1571	1504	<>	<aphaerese>
1571	1177	<elision3>	<elision3>
1571	1504	<>	<elision3>
1571	1177	<elision2>	<elision2>
1571	1504	<>	<elision2>
1571	1177	<elision1>	<elision1>
1571	1504	<>	<elision1>
1571	1185	.	υ
1571	1188	s	υ
1571	1185	.	u
1571	1188	s	u
1571	271	s	κ
1571	926	s	k
1571	1185	.	α
1571	1279	s	α
1571	1185	.	a
1571	1279	s	a
1571	271	s	λ
1571	974	s	l
1572	1343	.	.
1572	1344	 	 
1572	1343	<~>	<~>
1572	1343	<split-s>	<split-s>
1572	1343	<split-h>	<split-h>
1572	1343	<name2>	<name2>
1572	1508	<>	<name>
1572	1347	<aphaerese>	<aphaerese>
1572	1507	<>	<aphaerese>
1572	1343	<elision3>	<elision3>
1572	1507	<>	<elision3>
1572	1343	<elision2>	<elision2>
1572	1507	<>	<elision2>
1572	1343	<elision1>	<elision1>
1572	1507	<>	<elision1>
1572	1351	.	υ
1572	1354	s	υ
1572	1351	.	u
1572	1354	s	u
1572	985	s	κ
1572	1110	s	k
1572	1351	.	α
1572	1425	s	α
1572	1351	.	a
1572	1425	s	a
1572	985	s	λ
1572	1141	s	l
1572	1511	<1s>	<>
1573	1574	<>	<name>
1573	1576	<>	<aphaerese>
1573	1576	<>	<elision3>
1573	1576	<>	<elision2>
1573	1576	<>	<elision1>
1573	1577	<alpha2L>	<>
1574	1575	<>	<aphaerese>
1574	1575	<>	<elision3>
1574	1575	<>	<elision2>
1574	1575	<>	<elision1>
1574	1557	<alpha2L>	<>
1575	1576	<>	<aphaerese>
1575	1576	<>	<elision3>
1575	1576	<>	<elision2>
1575	1576	<>	<elision1>
1575	1558	<alpha2L>	<>
1576	1574	<>	<name>
1576	1576	<>	<aphaerese>
1576	1576	<>	<elision3>
1576	1576	<>	<elision2>
1576	1576	<>	<elision1>
1576	1556	<alpha2L>	<>
1577	1343	.	.
1577	1344	 	 
1577	1343	<~>	<~>
1577	1343	<split-s>	<split-s>
1577	1343	<split-h>	<split-h>
1577	1343	<name2>	<name2>
1577	1557	<>	<name>
1577	1347	<aphaerese>	<aphaerese>
1577	1556	<>	<aphaerese>
1577	1556	<>	<elision3>
1577	1556	<>	<elision2>
1577	1556	<>	<elision1>
1577	1351	.	υ
1577	1354	s	υ
1577	1351	.	u
1577	1354	s	u
1577	1357	.	κ
1577	1375	s	κ
1577	1110	s	k
1577	1351	.	α
1577	1425	s	α
1577	1351	.	a
1577	1425	s	a
1577	1431	s	λ
1577	1141	s	l
1577	440	<1s>	<>
1578	1579	<>	<name>
1578	1581	<>	<aphaerese>
1578	1581	<>	<elision3>
1578	1581	<>	<elision2>
1578	1581	<>	<elision1>
1578	1577	<a2L>	<>
1579	1580	<>	<aphaerese>
1579	1580	<>	<elision3>
1579	1580	<>	<elision2>
1579	1580	<>	<elision1>
1579	1557	<a2L>	<>
1580	1581	<>	<aphaerese>
1580	1581	<>	<elision3>
1580	1581	<>	<elision2>
1580	1581	<>	<elision1>
1580	1558	<a2L>	<>
1581	1579	<>	<name>
1581	1581	<>	<aphaerese>
1581	1581	<>	<elision3>
1581	1581	<>	<elision2>
1581	1581	<>	<elision1>
1581	1556	<a2L>	<>
1582	1528	<>	<name>
1582	1527	<>	<aphaerese>
1582	1527	<>	<elision3>
1582	1527	<>	<elision2>
1582	1527	<>	<elision1>
1582	1583	<lambda2L>	<>
1583	1343	.	.
1583	1344	 	 
1583	1343	<~>	<~>
1583	1343	<split-s>	<split-s>
1583	1343	<split-h>	<split-h>
1583	1343	<name2>	<name2>
1583	1532	<>	<name>
1583	1347	<aphaerese>	<aphaerese>
1583	1531	<>	<aphaerese>
1583	1343	<elision3>	<elision3>
1583	1531	<>	<elision3>
1583	1343	<elision2>	<elision2>
1583	1531	<>	<elision2>
1583	1343	<elision1>	<elision1>
1583	1531	<>	<elision1>
1583	1351	.	υ
1583	1354	s	υ
1583	1351	.	u
1583	1354	s	u
1583	1351	.	κ
1583	985	s	κ
1583	1110	s	k
1583	1351	.	α
1583	1425	s	α
1583	1351	.	a
1583	1425	s	a
1583	1351	.	λ
1583	985	s	λ
1583	1141	s	l
1583	527	<1s>	<>
1584	1534	<>	<name>
1584	1533	<>	<aphaerese>
1584	1533	<>	<elision3>
1584	1533	<>	<elision2>
1584	1533	<>	<elision1>
1584	1583	<l2L>	<>
1585	1552	<>	<aphaerese>
1585	1552	<>	<elision3>
1585	1552	<>	<elision2>
1585	1552	<>	<elision1>
1585	1555	<ypsilon2K>	<>
1585	1586	<ypsilon2L>	<>
1586	1343	.	.
1586	1344	 	 
1586	1343	<~>	<~>
1586	1343	<split-s>	<split-s>
1586	1343	<split-h>	<split-h>
1586	1343	<name2>	<name2>
1586	1347	<aphaerese>	<aphaerese>
1586	1556	<>	<aphaerese>
1586	1556	<>	<elision3>
1586	1556	<>	<elision2>
1586	1556	<>	<elision1>
1586	1351	.	υ
1586	1354	s	υ
1586	1351	.	u
1586	1354	s	u
1586	1357	.	κ
1586	1375	s	κ
1586	1110	s	k
1586	1400	s	U
1586	1128	s	K
1586	1351	.	α
1586	1425	s	α
1586	1351	.	a
1586	1425	s	a
1586	1428	s	A
1586	1431	s	λ
1586	1141	s	l
1586	1144	s	L
1586	1587	<1s>	<>
1587	440	<>	<aphaerese>
1587	440	<>	<elision3>
1587	440	<>	<elision2>
1587	440	<>	<elision1>
1587	1588	<K>	<>
1588	289	.	.
1588	289	<~>	<~>
1588	289	<split-s>	<split-s>
1588	289	<split-h>	<split-h>
1588	289	<name2>	<name2>
1588	292	<aphaerese>	<aphaerese>
1588	444	<>	<aphaerese>
1588	444	<>	<elision3>
1588	444	<>	<elision2>
1588	444	<>	<elision1>
1588	288	.	υ
1588	288	.	u
1588	295	.	κ
1588	288	.	α
1588	288	.	a
1589	1566	<>	<aphaerese>
1589	1566	<>	<elision3>
1589	1566	<>	<elision2>
1589	1566	<>	<elision1>
1589	1555	<u2K>	<>
1589	1586	<u2L>	<>
1590	1550	<>	<name>
1590	1552	<>	<aphaerese>
1590	1552	<>	<elision3>
1590	1552	<>	<elision2>
1590	1552	<>	<elision1>
1590	1553	<ypsilon2K>	<>
1590	1591	<ypsilon2L>	<>
1591	1343	.	.
1591	1344	 	 
1591	1343	<~>	<~>
1591	1343	<split-s>	<split-s>
1591	1343	<split-h>	<split-h>
1591	1343	<name2>	<name2>
1591	1557	<>	<name>
1591	1347	<aphaerese>	<aphaerese>
1591	1556	<>	<aphaerese>
1591	1556	<>	<elision3>
1591	1556	<>	<elision2>
1591	1556	<>	<elision1>
1591	1351	.	υ
1591	1354	s	υ
1591	1351	.	u
1591	1354	s	u
1591	1357	.	κ
1591	1375	s	κ
1591	1110	s	k
1591	1400	s	U
1591	1128	s	K
1591	1351	.	α
1591	1425	s	α
1591	1351	.	a
1591	1425	s	a
1591	1428	s	A
1591	1431	s	λ
1591	1141	s	l
1591	1144	s	L
1591	1561	<1s>	<>
1592	1564	<>	<name>
1592	1566	<>	<aphaerese>
1592	1566	<>	<elision3>
1592	1566	<>	<elision2>
1592	1566	<>	<elision1>
1592	1553	<u2K>	<>
1592	1591	<u2L>	<>
1593	1594	<>	<aphaerese>
1593	1598	<elision3>	<elision3>
1593	1594	<>	<elision3>
1593	1598	<elision2>	<elision2>
1593	1594	<>	<elision2>
1593	1598	<elision1>	<elision1>
1593	1594	<>	<elision1>
1594	1595	<>	<aphaerese>
1594	1596	<elision3>	<elision3>
1594	1595	<>	<elision3>
1594	1596	<elision2>	<elision2>
1594	1595	<>	<elision2>
1594	1596	<elision1>	<elision1>
1594	1595	<>	<elision1>
1595	1593	<>	<name>
1595	1595	<>	<aphaerese>
1595	1596	<elision3>	<elision3>
1595	1595	<>	<elision3>
1595	1596	<elision2>	<elision2>
1595	1595	<>	<elision2>
1595	1596	<elision1>	<elision1>
1595	1595	<>	<elision1>
1596	1596	.	.
1596	1596	<~>	<~>
1596	1596	<split-s>	<split-s>
1596	1596	<split-h>	<split-h>
1596	1596	<name2>	<name2>
1596	1597	<>	<name>
1596	1599	<aphaerese>	<aphaerese>
1596	1596	<>	<aphaerese>
1596	1596	<elision3>	<elision3>
1596	1596	<>	<elision3>
1596	1596	<elision2>	<elision2>
1596	1596	<>	<elision2>
1596	1596	<elision1>	<elision1>
1596	1596	<>	<elision1>
1596	1595	.	υ
1596	1738	H	υ
1596	1595	.	u
1596	1747	H	u
1596	1602	.	κ
1596	1653	H	κ
1596	1707	H	k
1596	1716	H	U
1596	1719	H	K
1596	1595	.	α
1596	1750	H	α
1596	1595	.	a
1596	1753	H	a
1596	1687	H	A
1596	1728	H	λ
1596	1734	H	l
1596	1737	H	L
1597	1598	.	.
1597	1598	<~>	<~>
1597	1598	<split-s>	<split-s>
1597	1598	<split-h>	<split-h>
1597	1598	<name2>	<name2>
1597	1601	<aphaerese>	<aphaerese>
1597	1598	<>	<aphaerese>
1597	1598	<elision3>	<elision3>
1597	1598	<>	<elision3>
1597	1598	<elision2>	<elision2>
1597	1598	<>	<elision2>
1597	1598	<elision1>	<elision1>
1597	1598	<>	<elision1>
1597	1594	.	υ
1597	1740	H	υ
1597	1594	.	u
1597	1749	H	u
1597	1604	.	κ
1597	1655	H	κ
1597	1709	H	k
1597	1718	H	U
1597	1722	H	K
1597	1594	.	α
1597	1752	H	α
1597	1594	.	a
1597	1755	H	a
1597	1689	H	A
1597	1730	H	λ
1597	1736	H	l
1597	1731	H	L
1598	1596	.	.
1598	1596	<~>	<~>
1598	1596	<split-s>	<split-s>
1598	1596	<split-h>	<split-h>
1598	1596	<name2>	<name2>
1598	1599	<aphaerese>	<aphaerese>
1598	1596	<>	<aphaerese>
1598	1596	<elision3>	<elision3>
1598	1596	<>	<elision3>
1598	1596	<elision2>	<elision2>
1598	1596	<>	<elision2>
1598	1596	<elision1>	<elision1>
1598	1596	<>	<elision1>
1598	1595	.	υ
1598	1738	H	υ
1598	1595	.	u
1598	1747	H	u
1598	1602	.	κ
1598	1653	H	κ
1598	1707	H	k
1598	1716	H	U
1598	1719	H	K
1598	1595	.	α
1598	1750	H	α
1598	1595	.	a
1598	1753	H	a
1598	1687	H	A
1598	1728	H	λ
1598	1734	H	l
1598	1737	H	L
1599	1596	.	.
1599	1596	<~>	<~>
1599	1596	<split-s>	<split-s>
1599	1596	<split-h>	<split-h>
1599	1596	<name2>	<name2>
1599	1600	<>	<name>
1599	1599	<aphaerese>	<aphaerese>
1599	1599	<>	<aphaerese>
1599	1596	<elision3>	<elision3>
1599	1599	<>	<elision3>
1599	1596	<elision2>	<elision2>
1599	1599	<>	<elision2>
1599	1596	<elision1>	<elision1>
1599	1599	<>	<elision1>
1599	1596	.	υ
1599	1596	.	u
1599	1602	.	κ
1599	1653	H	κ
1599	1707	H	k
1599	1716	H	U
1599	1719	H	K
1599	1596	.	α
1599	1596	.	a
1599	1687	H	A
1599	1728	H	λ
1599	1734	H	l
1599	1737	H	L
1600	1598	.	.
1600	1598	<~>	<~>
1600	1598	<split-s>	<split-s>
1600	1598	<split-h>	<split-h>
1600	1598	<name2>	<name2>
1600	1601	<aphaerese>	<aphaerese>
1600	1601	<>	<aphaerese>
1600	1598	<elision3>	<elision3>
1600	1601	<>	<elision3>
1600	1598	<elision2>	<elision2>
1600	1601	<>	<elision2>
1600	1598	<elision1>	<elision1>
1600	1601	<>	<elision1>
1600	1598	.	υ
1600	1598	.	u
1600	1604	.	κ
1600	1655	H	κ
1600	1709	H	k
1600	1718	H	U
1600	1722	H	K
1600	1598	.	α
1600	1598	.	a
1600	1689	H	A
1600	1730	H	λ
1600	1736	H	l
1600	1731	H	L
1601	1596	.	.
1601	1596	<~>	<~>
1601	1596	<split-s>	<split-s>
1601	1596	<split-h>	<split-h>
1601	1596	<name2>	<name2>
1601	1599	<aphaerese>	<aphaerese>
1601	1599	<>	<aphaerese>
1601	1596	<elision3>	<elision3>
1601	1599	<>	<elision3>
1601	1596	<elision2>	<elision2>
1601	1599	<>	<elision2>
1601	1596	<elision1>	<elision1>
1601	1599	<>	<elision1>
1601	1596	.	υ
1601	1596	.	u
1601	1602	.	κ
1601	1653	H	κ
1601	1707	H	k
1601	1716	H	U
1601	1719	H	K
1601	1596	.	α
1601	1596	.	a
1601	1687	H	A
1601	1728	H	λ
1601	1734	H	l
1601	1737	H	L
1602	1603	<>	<name>
1602	1602	<>	<aphaerese>
1602	1605	<elision3>	<elision3>
1602	1602	<>	<elision3>
1602	1605	<elision2>	<elision2>
1602	1602	<>	<elision2>
1602	1605	<elision1>	<elision1>
1602	1602	<>	<elision1>
1603	1604	<>	<aphaerese>
1603	1607	<elision3>	<elision3>
1603	1604	<>	<elision3>
1603	1607	<elision2>	<elision2>
1603	1604	<>	<elision2>
1603	1607	<elision1>	<elision1>
1603	1604	<>	<elision1>
1604	1602	<>	<aphaerese>
1604	1605	<elision3>	<elision3>
1604	1602	<>	<elision3>
1604	1605	<elision2>	<elision2>
1604	1602	<>	<elision2>
1604	1605	<elision1>	<elision1>
1604	1602	<>	<elision1>
1605	1606	<>	<name>
1605	1605	<>	<aphaerese>
1605	1605	<>	<elision3>
1605	1605	<>	<elision2>
1605	1605	<>	<elision1>
1605	1608	H	κ
1605	1641	H	k
1605	1644	H	K
1605	1647	H	λ
1605	1650	H	l
1605	1633	H	L
1606	1607	<>	<aphaerese>
1606	1607	<>	<elision3>
1606	1607	<>	<elision2>
1606	1607	<>	<elision1>
1606	1610	H	κ
1606	1643	H	k
1606	1646	H	K
1606	1649	H	λ
1606	1652	H	l
1606	1632	H	L
1607	1605	<>	<aphaerese>
1607	1605	<>	<elision3>
1607	1605	<>	<elision2>
1607	1605	<>	<elision1>
1607	1608	H	κ
1607	1641	H	k
1607	1644	H	K
1607	1647	H	λ
1607	1650	H	l
1607	1633	H	L
1608	1609	<>	<name>
1608	1608	<>	<aphaerese>
1608	1608	<>	<elision3>
1608	1608	<>	<elision2>
1608	1608	<>	<elision1>
1608	1612	<kappa2K>	<>
1608	1633	<kappa2L>	<>
1609	1610	<>	<aphaerese>
1609	1610	<>	<elision3>
1609	1610	<>	<elision2>
1609	1610	<>	<elision1>
1609	1613	<kappa2K>	<>
1609	1634	<kappa2L>	<>
1610	1608	<>	<aphaerese>
1610	1608	<>	<elision3>
1610	1608	<>	<elision2>
1610	1608	<>	<elision1>
1610	1611	<kappa2K>	<>
1610	1632	<kappa2L>	<>
1611	1612	<>	<aphaerese>
1611	1612	<>	<elision3>
1611	1612	<>	<elision2>
1611	1612	<>	<elision1>
1611	1615	s	κ
1611	1615	s	k
1611	1624	s	K
1611	1615	s	λ
1611	1615	s	l
1611	1630	s	L
1612	1613	<>	<name>
1612	1612	<>	<aphaerese>
1612	1612	<>	<elision3>
1612	1612	<>	<elision2>
1612	1612	<>	<elision1>
1612	1615	s	κ
1612	1615	s	k
1612	1624	s	K
1612	1615	s	λ
1612	1615	s	l
1612	1630	s	L
1613	1611	<>	<aphaerese>
1613	1611	<>	<elision3>
1613	1611	<>	<elision2>
1613	1611	<>	<elision1>
1613	1614	s	κ
1613	1614	s	k
1613	1623	s	K
1613	1614	s	λ
1613	1614	s	l
1613	1629	s	L
1614	1615	<>	<aphaerese>
1614	1615	<>	<elision3>
1614	1615	<>	<elision2>
1614	1615	<>	<elision1>
1614	1618	H	κ
1614	1618	H	k
1614	1618	H	K
1614	1618	H	λ
1614	1618	H	l
1614	1618	H	L
1614	1621	<2m>	<>
1615	1616	<>	<name>
1615	1615	<>	<aphaerese>
1615	1615	<>	<elision3>
1615	1615	<>	<elision2>
1615	1615	<>	<elision1>
1615	1618	H	κ
1615	1618	H	k
1615	1618	H	K
1615	1618	H	λ
1615	1618	H	l
1615	1618	H	L
1615	1622	<2m>	<>
1616	1614	<>	<aphaerese>
1616	1614	<>	<elision3>
1616	1614	<>	<elision2>
1616	1614	<>	<elision1>
1616	1617	H	κ
1616	1617	H	k
1616	1617	H	K
1616	1617	H	λ
1616	1617	H	l
1616	1617	H	L
1616	1620	<2m>	<>
1617	1618	<>	<aphaerese>
1617	1618	<>	<elision3>
1617	1618	<>	<elision2>
1617	1618	<>	<elision1>
1617	311	<3k>	<>
1618	1619	<>	<name>
1618	1618	<>	<aphaerese>
1618	1618	<>	<elision3>
1618	1618	<>	<elision2>
1618	1618	<>	<elision1>
1618	312	<3k>	<>
1619	1617	<>	<aphaerese>
1619	1617	<>	<elision3>
1619	1617	<>	<elision2>
1619	1617	<>	<elision1>
1619	310	<3k>	<>
1620	1621	<>	<aphaerese>
1620	1621	<>	<elision3>
1620	1621	<>	<elision2>
1620	1621	<>	<elision1>
1620	314	<7h>	<>
1621	1622	<>	<aphaerese>
1621	1622	<>	<elision3>
1621	1622	<>	<elision2>
1621	1622	<>	<elision1>
1621	315	<7h>	<>
1622	1620	<>	<name>
1622	1622	<>	<aphaerese>
1622	1622	<>	<elision3>
1622	1622	<>	<elision2>
1622	1622	<>	<elision1>
1622	313	<7h>	<>
1623	1624	<>	<aphaerese>
1623	1624	<>	<elision3>
1623	1624	<>	<elision2>
1623	1624	<>	<elision1>
1623	1627	<K2kl>	<>
1624	1625	<>	<name>
1624	1624	<>	<aphaerese>
1624	1624	<>	<elision3>
1624	1624	<>	<elision2>
1624	1624	<>	<elision1>
1624	1628	<K2kl>	<>
1625	1623	<>	<aphaerese>
1625	1623	<>	<elision3>
1625	1623	<>	<elision2>
1625	1623	<>	<elision1>
1625	1626	<K2kl>	<>
1626	1627	<>	<aphaerese>
1626	1627	<>	<elision3>
1626	1627	<>	<elision2>
1626	1627	<>	<elision1>
1626	1617	H	κ
1626	1617	H	k
1626	1617	H	K
1626	1617	H	λ
1626	1617	H	l
1626	1617	H	L
1627	1628	<>	<aphaerese>
1627	1628	<>	<elision3>
1627	1628	<>	<elision2>
1627	1628	<>	<elision1>
1627	1618	H	κ
1627	1618	H	k
1627	1618	H	K
1627	1618	H	λ
1627	1618	H	l
1627	1618	H	L
1628	1626	<>	<name>
1628	1628	<>	<aphaerese>
1628	1628	<>	<elision3>
1628	1628	<>	<elision2>
1628	1628	<>	<elision1>
1628	1618	H	κ
1628	1618	H	k
1628	1618	H	K
1628	1618	H	λ
1628	1618	H	l
1628	1618	H	L
1629	1630	<>	<aphaerese>
1629	1630	<>	<elision3>
1629	1630	<>	<elision2>
1629	1630	<>	<elision1>
1629	1627	<L2kl>	<>
1630	1631	<>	<name>
1630	1630	<>	<aphaerese>
1630	1630	<>	<elision3>
1630	1630	<>	<elision2>
1630	1630	<>	<elision1>
1630	1628	<L2kl>	<>
1631	1629	<>	<aphaerese>
1631	1629	<>	<elision3>
1631	1629	<>	<elision2>
1631	1629	<>	<elision1>
1631	1626	<L2kl>	<>
1632	1633	<>	<aphaerese>
1632	1633	<>	<elision3>
1632	1633	<>	<elision2>
1632	1633	<>	<elision1>
1632	1636	s	κ
1632	1639	H	κ
1632	1636	s	k
1632	1639	H	k
1632	1624	s	K
1632	1639	H	K
1632	1636	s	λ
1632	1639	H	λ
1632	1636	s	l
1632	1639	H	l
1632	1630	s	L
1632	1639	H	L
1633	1634	<>	<name>
1633	1633	<>	<aphaerese>
1633	1633	<>	<elision3>
1633	1633	<>	<elision2>
1633	1633	<>	<elision1>
1633	1636	s	κ
1633	1639	H	κ
1633	1636	s	k
1633	1639	H	k
1633	1624	s	K
1633	1639	H	K
1633	1636	s	λ
1633	1639	H	λ
1633	1636	s	l
1633	1639	H	l
1633	1630	s	L
1633	1639	H	L
1634	1632	<>	<aphaerese>
1634	1632	<>	<elision3>
1634	1632	<>	<elision2>
1634	1632	<>	<elision1>
1634	1635	s	κ
1634	1638	H	κ
1634	1635	s	k
1634	1638	H	k
1634	1623	s	K
1634	1638	H	K
1634	1635	s	λ
1634	1638	H	λ
1634	1635	s	l
1634	1638	H	l
1634	1629	s	L
1634	1638	H	L
1635	1636	<>	<aphaerese>
1635	1636	<>	<elision3>
1635	1636	<>	<elision2>
1635	1636	<>	<elision1>
1635	1618	H	κ
1635	1618	H	k
1635	1618	H	K
1635	1618	H	λ
1635	1618	H	l
1635	1618	H	L
1635	1621	<w>	<>
1636	1637	<>	<name>
1636	1636	<>	<aphaerese>
1636	1636	<>	<elision3>
1636	1636	<>	<elision2>
1636	1636	<>	<elision1>
1636	1618	H	κ
1636	1618	H	k
1636	1618	H	K
1636	1618	H	λ
1636	1618	H	l
1636	1618	H	L
1636	1622	<w>	<>
1637	1635	<>	<aphaerese>
1637	1635	<>	<elision3>
1637	1635	<>	<elision2>
1637	1635	<>	<elision1>
1637	1617	H	κ
1637	1617	H	k
1637	1617	H	K
1637	1617	H	λ
1637	1617	H	l
1637	1617	H	L
1637	1620	<w>	<>
1638	1639	<>	<aphaerese>
1638	1639	<>	<elision3>
1638	1639	<>	<elision2>
1638	1639	<>	<elision1>
1638	311	<2k>	<>
1639	1640	<>	<name>
1639	1639	<>	<aphaerese>
1639	1639	<>	<elision3>
1639	1639	<>	<elision2>
1639	1639	<>	<elision1>
1639	312	<2k>	<>
1640	1638	<>	<aphaerese>
1640	1638	<>	<elision3>
1640	1638	<>	<elision2>
1640	1638	<>	<elision1>
1640	310	<2k>	<>
1641	1642	<>	<name>
1641	1641	<>	<aphaerese>
1641	1641	<>	<elision3>
1641	1641	<>	<elision2>
1641	1641	<>	<elision1>
1641	1612	<k2K>	<>
1641	1633	<k2L>	<>
1642	1643	<>	<aphaerese>
1642	1643	<>	<elision3>
1642	1643	<>	<elision2>
1642	1643	<>	<elision1>
1642	1613	<k2K>	<>
1642	1634	<k2L>	<>
1643	1641	<>	<aphaerese>
1643	1641	<>	<elision3>
1643	1641	<>	<elision2>
1643	1641	<>	<elision1>
1643	1611	<k2K>	<>
1643	1632	<k2L>	<>
1644	1645	<>	<name>
1644	1644	<>	<aphaerese>
1644	1644	<>	<elision3>
1644	1644	<>	<elision2>
1644	1644	<>	<elision1>
1644	1615	s	κ
1644	1615	s	k
1644	1624	s	K
1644	1615	s	λ
1644	1615	s	l
1644	1630	s	L
1644	1633	<K2L>	<>
1645	1646	<>	<aphaerese>
1645	1646	<>	<elision3>
1645	1646	<>	<elision2>
1645	1646	<>	<elision1>
1645	1614	s	κ
1645	1614	s	k
1645	1623	s	K
1645	1614	s	λ
1645	1614	s	l
1645	1629	s	L
1645	1634	<K2L>	<>
1646	1644	<>	<aphaerese>
1646	1644	<>	<elision3>
1646	1644	<>	<elision2>
1646	1644	<>	<elision1>
1646	1615	s	κ
1646	1615	s	k
1646	1624	s	K
1646	1615	s	λ
1646	1615	s	l
1646	1630	s	L
1646	1632	<K2L>	<>
1647	1648	<>	<name>
1647	1647	<>	<aphaerese>
1647	1647	<>	<elision3>
1647	1647	<>	<elision2>
1647	1647	<>	<elision1>
1647	1633	<lambda2L>	<>
1648	1649	<>	<aphaerese>
1648	1649	<>	<elision3>
1648	1649	<>	<elision2>
1648	1649	<>	<elision1>
1648	1634	<lambda2L>	<>
1649	1647	<>	<aphaerese>
1649	1647	<>	<elision3>
1649	1647	<>	<elision2>
1649	1647	<>	<elision1>
1649	1632	<lambda2L>	<>
1650	1651	<>	<name>
1650	1650	<>	<aphaerese>
1650	1650	<>	<elision3>
1650	1650	<>	<elision2>
1650	1650	<>	<elision1>
1650	1633	<l2L>	<>
1651	1652	<>	<aphaerese>
1651	1652	<>	<elision3>
1651	1652	<>	<elision2>
1651	1652	<>	<elision1>
1651	1634	<l2L>	<>
1652	1650	<>	<aphaerese>
1652	1650	<>	<elision3>
1652	1650	<>	<elision2>
1652	1650	<>	<elision1>
1652	1632	<l2L>	<>
1653	1654	<>	<name>
1653	1653	<>	<aphaerese>
1653	1653	<>	<elision3>
1653	1653	<>	<elision2>
1653	1653	<>	<elision1>
1653	1678	<kappa2K>	<>
1653	1696	<kappa2L>	<>
1653	1705	<lambda2L>	<>
1654	1655	<>	<aphaerese>
1654	1655	<>	<elision3>
1654	1655	<>	<elision2>
1654	1655	<>	<elision1>
1654	1679	<kappa2K>	<>
1654	1697	<kappa2L>	<>
1654	1706	<lambda2L>	<>
1655	1653	<>	<aphaerese>
1655	1653	<>	<elision3>
1655	1653	<>	<elision2>
1655	1653	<>	<elision1>
1655	1656	<kappa2K>	<>
1655	1686	<kappa2L>	<>
1655	1704	<lambda2L>	<>
1656	1657	.	.
1656	1657	<~>	<~>
1656	1657	<split-s>	<split-s>
1656	1657	<split-h>	<split-h>
1656	1657	<name2>	<name2>
1656	1660	<aphaerese>	<aphaerese>
1656	1678	<>	<aphaerese>
1656	1681	<elision3>	<elision3>
1656	1678	<>	<elision3>
1656	1681	<elision2>	<elision2>
1656	1678	<>	<elision2>
1656	1681	<elision1>	<elision1>
1656	1678	<>	<elision1>
1656	1675	.	υ
1656	1628	s	υ
1656	1675	.	u
1656	1628	s	u
1656	1615	s	κ
1656	1615	s	k
1656	1669	s	U
1656	1624	s	K
1656	1675	.	α
1656	1628	s	α
1656	1675	.	a
1656	1628	s	a
1656	1672	s	A
1656	1615	s	λ
1656	1615	s	l
1656	1630	s	L
1656	1621	<1m>	<>
1657	1657	.	.
1657	1657	<~>	<~>
1657	1657	<split-s>	<split-s>
1657	1657	<split-h>	<split-h>
1657	1657	<name2>	<name2>
1657	1658	<>	<name>
1657	1660	<aphaerese>	<aphaerese>
1657	1657	<>	<aphaerese>
1657	1657	<elision3>	<elision3>
1657	1657	<>	<elision3>
1657	1657	<elision2>	<elision2>
1657	1657	<>	<elision2>
1657	1657	<elision1>	<elision1>
1657	1657	<>	<elision1>
1657	1675	.	υ
1657	1628	s	υ
1657	1675	.	u
1657	1628	s	u
1657	1663	.	κ
1657	1615	s	κ
1657	1615	s	k
1657	1669	s	U
1657	1624	s	K
1657	1675	.	α
1657	1628	s	α
1657	1675	.	a
1657	1628	s	a
1657	1672	s	A
1657	1615	s	λ
1657	1615	s	l
1657	1630	s	L
1657	1622	<1m>	<>
1658	1659	.	.
1658	1659	<~>	<~>
1658	1659	<split-s>	<split-s>
1658	1659	<split-h>	<split-h>
1658	1659	<name2>	<name2>
1658	1662	<aphaerese>	<aphaerese>
1658	1659	<>	<aphaerese>
1658	1659	<elision3>	<elision3>
1658	1659	<>	<elision3>
1658	1659	<elision2>	<elision2>
1658	1659	<>	<elision2>
1658	1659	<elision1>	<elision1>
1658	1659	<>	<elision1>
1658	1677	.	υ
1658	1627	s	υ
1658	1677	.	u
1658	1627	s	u
1658	1665	.	κ
1658	1614	s	κ
1658	1614	s	k
1658	1671	s	U
1658	1623	s	K
1658	1677	.	α
1658	1627	s	α
1658	1677	.	a
1658	1627	s	a
1658	1674	s	A
1658	1614	s	λ
1658	1614	s	l
1658	1629	s	L
1658	1620	<1m>	<>
1659	1657	.	.
1659	1657	<~>	<~>
1659	1657	<split-s>	<split-s>
1659	1657	<split-h>	<split-h>
1659	1657	<name2>	<name2>
1659	1660	<aphaerese>	<aphaerese>
1659	1657	<>	<aphaerese>
1659	1657	<elision3>	<elision3>
1659	1657	<>	<elision3>
1659	1657	<elision2>	<elision2>
1659	1657	<>	<elision2>
1659	1657	<elision1>	<elision1>
1659	1657	<>	<elision1>
1659	1675	.	υ
1659	1628	s	υ
1659	1675	.	u
1659	1628	s	u
1659	1663	.	κ
1659	1615	s	κ
1659	1615	s	k
1659	1669	s	U
1659	1624	s	K
1659	1675	.	α
1659	1628	s	α
1659	1675	.	a
1659	1628	s	a
1659	1672	s	A
1659	1615	s	λ
1659	1615	s	l
1659	1630	s	L
1659	1621	<1m>	<>
1660	1657	.	.
1660	1657	<~>	<~>
1660	1657	<split-s>	<split-s>
1660	1657	<split-h>	<split-h>
1660	1657	<name2>	<name2>
1660	1661	<>	<name>
1660	1660	<aphaerese>	<aphaerese>
1660	1660	<>	<aphaerese>
1660	1657	<elision3>	<elision3>
1660	1660	<>	<elision3>
1660	1657	<elision2>	<elision2>
1660	1660	<>	<elision2>
1660	1657	<elision1>	<elision1>
1660	1660	<>	<elision1>
1660	1657	.	υ
1660	1657	.	u
1660	1663	.	κ
1660	1615	s	κ
1660	1615	s	k
1660	1669	s	U
1660	1624	s	K
1660	1657	.	α
1660	1657	.	a
1660	1672	s	A
1660	1615	s	λ
1660	1615	s	l
1660	1630	s	L
1660	1622	<1m>	<>
1661	1659	.	.
1661	1659	<~>	<~>
1661	1659	<split-s>	<split-s>
1661	1659	<split-h>	<split-h>
1661	1659	<name2>	<name2>
1661	1662	<aphaerese>	<aphaerese>
1661	1662	<>	<aphaerese>
1661	1659	<elision3>	<elision3>
1661	1662	<>	<elision3>
1661	1659	<elision2>	<elision2>
1661	1662	<>	<elision2>
1661	1659	<elision1>	<elision1>
1661	1662	<>	<elision1>
1661	1659	.	υ
1661	1659	.	u
1661	1665	.	κ
1661	1614	s	κ
1661	1614	s	k
1661	1671	s	U
1661	1623	s	K
1661	1659	.	α
1661	1659	.	a
1661	1674	s	A
1661	1614	s	λ
1661	1614	s	l
1661	1629	s	L
1661	1620	<1m>	<>
1662	1657	.	.
1662	1657	<~>	<~>
1662	1657	<split-s>	<split-s>
1662	1657	<split-h>	<split-h>
1662	1657	<name2>	<name2>
1662	1660	<aphaerese>	<aphaerese>
1662	1660	<>	<aphaerese>
1662	1657	<elision3>	<elision3>
1662	1660	<>	<elision3>
1662	1657	<elision2>	<elision2>
1662	1660	<>	<elision2>
1662	1657	<elision1>	<elision1>
1662	1660	<>	<elision1>
1662	1657	.	υ
1662	1657	.	u
1662	1663	.	κ
1662	1615	s	κ
1662	1615	s	k
1662	1669	s	U
1662	1624	s	K
1662	1657	.	α
1662	1657	.	a
1662	1672	s	A
1662	1615	s	λ
1662	1615	s	l
1662	1630	s	L
1662	1621	<1m>	<>
1663	1664	<>	<name>
1663	1663	<>	<aphaerese>
1663	1666	<elision3>	<elision3>
1663	1663	<>	<elision3>
1663	1666	<elision2>	<elision2>
1663	1663	<>	<elision2>
1663	1666	<elision1>	<elision1>
1663	1663	<>	<elision1>
1664	1665	<>	<aphaerese>
1664	1668	<elision3>	<elision3>
1664	1665	<>	<elision3>
1664	1668	<elision2>	<elision2>
1664	1665	<>	<elision2>
1664	1668	<elision1>	<elision1>
1664	1665	<>	<elision1>
1665	1663	<>	<aphaerese>
1665	1666	<elision3>	<elision3>
1665	1663	<>	<elision3>
1665	1666	<elision2>	<elision2>
1665	1663	<>	<elision2>
1665	1666	<elision1>	<elision1>
1665	1663	<>	<elision1>
1666	1667	<>	<name>
1666	1666	<>	<aphaerese>
1666	1666	<>	<elision3>
1666	1666	<>	<elision2>
1666	1666	<>	<elision1>
1666	1628	s	κ
1666	1628	s	k
1666	1624	s	K
1666	1628	s	λ
1666	1628	s	l
1666	1630	s	L
1667	1668	<>	<aphaerese>
1667	1668	<>	<elision3>
1667	1668	<>	<elision2>
1667	1668	<>	<elision1>
1667	1627	s	κ
1667	1627	s	k
1667	1623	s	K
1667	1627	s	λ
1667	1627	s	l
1667	1629	s	L
1668	1666	<>	<aphaerese>
1668	1666	<>	<elision3>
1668	1666	<>	<elision2>
1668	1666	<>	<elision1>
1668	1628	s	κ
1668	1628	s	k
1668	1624	s	K
1668	1628	s	λ
1668	1628	s	l
1668	1630	s	L
1669	1670	<>	<name>
1669	1669	<>	<aphaerese>
1669	1669	<>	<elision3>
1669	1669	<>	<elision2>
1669	1669	<>	<elision1>
1669	1628	<U2kl>	<>
1670	1671	<>	<aphaerese>
1670	1671	<>	<elision3>
1670	1671	<>	<elision2>
1670	1671	<>	<elision1>
1670	1626	<U2kl>	<>
1671	1669	<>	<aphaerese>
1671	1669	<>	<elision3>
1671	1669	<>	<elision2>
1671	1669	<>	<elision1>
1671	1627	<U2kl>	<>
1672	1673	<>	<name>
1672	1672	<>	<aphaerese>
1672	1672	<>	<elision3>
1672	1672	<>	<elision2>
1672	1672	<>	<elision1>
1672	1628	<A2kl>	<>
1673	1674	<>	<aphaerese>
1673	1674	<>	<elision3>
1673	1674	<>	<elision2>
1673	1674	<>	<elision1>
1673	1626	<A2kl>	<>
1674	1672	<>	<aphaerese>
1674	1672	<>	<elision3>
1674	1672	<>	<elision2>
1674	1672	<>	<elision1>
1674	1627	<A2kl>	<>
1675	1676	<>	<name>
1675	1675	<>	<aphaerese>
1675	1657	<elision3>	<elision3>
1675	1675	<>	<elision3>
1675	1657	<elision2>	<elision2>
1675	1675	<>	<elision2>
1675	1657	<elision1>	<elision1>
1675	1675	<>	<elision1>
1676	1677	<>	<aphaerese>
1676	1659	<elision3>	<elision3>
1676	1677	<>	<elision3>
1676	1659	<elision2>	<elision2>
1676	1677	<>	<elision2>
1676	1659	<elision1>	<elision1>
1676	1677	<>	<elision1>
1677	1675	<>	<aphaerese>
1677	1657	<elision3>	<elision3>
1677	1675	<>	<elision3>
1677	1657	<elision2>	<elision2>
1677	1675	<>	<elision2>
1677	1657	<elision1>	<elision1>
1677	1675	<>	<elision1>
1678	1657	.	.
1678	1657	<~>	<~>
1678	1657	<split-s>	<split-s>
1678	1657	<split-h>	<split-h>
1678	1657	<name2>	<name2>
1678	1679	<>	<name>
1678	1660	<aphaerese>	<aphaerese>
1678	1678	<>	<aphaerese>
1678	1681	<elision3>	<elision3>
1678	1678	<>	<elision3>
1678	1681	<elision2>	<elision2>
1678	1678	<>	<elision2>
1678	1681	<elision1>	<elision1>
1678	1678	<>	<elision1>
1678	1675	.	υ
1678	1628	s	υ
1678	1675	.	u
1678	1628	s	u
1678	1615	s	κ
1678	1615	s	k
1678	1669	s	U
1678	1624	s	K
1678	1675	.	α
1678	1628	s	α
1678	1675	.	a
1678	1628	s	a
1678	1672	s	A
1678	1615	s	λ
1678	1615	s	l
1678	1630	s	L
1678	1622	<1m>	<>
1679	1659	.	.
1679	1659	<~>	<~>
1679	1659	<split-s>	<split-s>
1679	1659	<split-h>	<split-h>
1679	1659	<name2>	<name2>
1679	1662	<aphaerese>	<aphaerese>
1679	1656	<>	<aphaerese>
1679	1680	<elision3>	<elision3>
1679	1656	<>	<elision3>
1679	1680	<elision2>	<elision2>
1679	1656	<>	<elision2>
1679	1680	<elision1>	<elision1>
1679	1656	<>	<elision1>
1679	1677	.	υ
1679	1627	s	υ
1679	1677	.	u
1679	1627	s	u
1679	1614	s	κ
1679	1614	s	k
1679	1671	s	U
1679	1623	s	K
1679	1677	.	α
1679	1627	s	α
1679	1677	.	a
1679	1627	s	a
1679	1674	s	A
1679	1614	s	λ
1679	1614	s	l
1679	1629	s	L
1679	1620	<1m>	<>
1680	1657	.	.
1680	1657	<~>	<~>
1680	1657	<split-s>	<split-s>
1680	1657	<split-h>	<split-h>
1680	1657	<name2>	<name2>
1680	1660	<aphaerese>	<aphaerese>
1680	1681	<>	<aphaerese>
1680	1657	<elision3>	<elision3>
1680	1681	<>	<elision3>
1680	1657	<elision2>	<elision2>
1680	1681	<>	<elision2>
1680	1657	<elision1>	<elision1>
1680	1681	<>	<elision1>
1680	1675	.	υ
1680	1628	s	υ
1680	1675	.	u
1680	1628	s	u
1680	1663	.	κ
1680	1684	s	κ
1680	1684	s	k
1680	1669	s	U
1680	1675	.	α
1680	1628	s	α
1680	1675	.	a
1680	1628	s	a
1680	1672	s	A
1680	1684	s	λ
1680	1684	s	l
1680	1621	<1m>	<>
1681	1657	.	.
1681	1657	<~>	<~>
1681	1657	<split-s>	<split-s>
1681	1657	<split-h>	<split-h>
1681	1657	<name2>	<name2>
1681	1682	<>	<name>
1681	1660	<aphaerese>	<aphaerese>
1681	1681	<>	<aphaerese>
1681	1657	<elision3>	<elision3>
1681	1681	<>	<elision3>
1681	1657	<elision2>	<elision2>
1681	1681	<>	<elision2>
1681	1657	<elision1>	<elision1>
1681	1681	<>	<elision1>
1681	1675	.	υ
1681	1628	s	υ
1681	1675	.	u
1681	1628	s	u
1681	1663	.	κ
1681	1684	s	κ
1681	1684	s	k
1681	1669	s	U
1681	1675	.	α
1681	1628	s	α
1681	1675	.	a
1681	1628	s	a
1681	1672	s	A
1681	1684	s	λ
1681	1684	s	l
1681	1622	<1m>	<>
1682	1659	.	.
1682	1659	<~>	<~>
1682	1659	<split-s>	<split-s>
1682	1659	<split-h>	<split-h>
1682	1659	<name2>	<name2>
1682	1662	<aphaerese>	<aphaerese>
1682	1680	<>	<aphaerese>
1682	1659	<elision3>	<elision3>
1682	1680	<>	<elision3>
1682	1659	<elision2>	<elision2>
1682	1680	<>	<elision2>
1682	1659	<elision1>	<elision1>
1682	1680	<>	<elision1>
1682	1677	.	υ
1682	1627	s	υ
1682	1677	.	u
1682	1627	s	u
1682	1665	.	κ
1682	1683	s	κ
1682	1683	s	k
1682	1671	s	U
1682	1677	.	α
1682	1627	s	α
1682	1677	.	a
1682	1627	s	a
1682	1674	s	A
1682	1683	s	λ
1682	1683	s	l
1682	1620	<1m>	<>
1683	1684	<>	<aphaerese>
1683	1684	<>	<elision3>
1683	1684	<>	<elision2>
1683	1684	<>	<elision1>
1683	1621	<2m>	<>
1684	1685	<>	<name>
1684	1684	<>	<aphaerese>
1684	1684	<>	<elision3>
1684	1684	<>	<elision2>
1684	1684	<>	<elision1>
1684	1622	<2m>	<>
1685	1683	<>	<aphaerese>
1685	1683	<>	<elision3>
1685	1683	<>	<elision2>
1685	1683	<>	<elision1>
1685	1620	<2m>	<>
1686	1687	.	.
1686	1687	<~>	<~>
1686	1687	<split-s>	<split-s>
1686	1687	<split-h>	<split-h>
1686	1687	<name2>	<name2>
1686	1690	<aphaerese>	<aphaerese>
1686	1696	<>	<aphaerese>
1686	1699	<elision3>	<elision3>
1686	1696	<>	<elision3>
1686	1699	<elision2>	<elision2>
1686	1696	<>	<elision2>
1686	1699	<elision1>	<elision1>
1686	1696	<>	<elision1>
1686	1693	.	υ
1686	1628	s	υ
1686	1693	.	u
1686	1628	s	u
1686	1636	s	κ
1686	1639	H	κ
1686	1636	s	k
1686	1639	H	k
1686	1669	s	U
1686	1624	s	K
1686	1639	H	K
1686	1693	.	α
1686	1628	s	α
1686	1693	.	a
1686	1628	s	a
1686	1672	s	A
1686	1636	s	λ
1686	1639	H	λ
1686	1636	s	l
1686	1639	H	l
1686	1630	s	L
1686	1639	H	L
1686	1621	<1m>	<>
1687	1687	.	.
1687	1687	<~>	<~>
1687	1687	<split-s>	<split-s>
1687	1687	<split-h>	<split-h>
1687	1687	<name2>	<name2>
1687	1688	<>	<name>
1687	1690	<aphaerese>	<aphaerese>
1687	1687	<>	<aphaerese>
1687	1687	<elision3>	<elision3>
1687	1687	<>	<elision3>
1687	1687	<elision2>	<elision2>
1687	1687	<>	<elision2>
1687	1687	<elision1>	<elision1>
1687	1687	<>	<elision1>
1687	1693	.	υ
1687	1628	s	υ
1687	1693	.	u
1687	1628	s	u
1687	1663	.	κ
1687	1636	s	κ
1687	1639	H	κ
1687	1636	s	k
1687	1639	H	k
1687	1669	s	U
1687	1624	s	K
1687	1639	H	K
1687	1693	.	α
1687	1628	s	α
1687	1693	.	a
1687	1628	s	a
1687	1672	s	A
1687	1636	s	λ
1687	1639	H	λ
1687	1636	s	l
1687	1639	H	l
1687	1630	s	L
1687	1639	H	L
1687	1622	<1m>	<>
1688	1689	.	.
1688	1689	<~>	<~>
1688	1689	<split-s>	<split-s>
1688	1689	<split-h>	<split-h>
1688	1689	<name2>	<name2>
1688	1692	<aphaerese>	<aphaerese>
1688	1689	<>	<aphaerese>
1688	1689	<elision3>	<elision3>
1688	1689	<>	<elision3>
1688	1689	<elision2>	<elision2>
1688	1689	<>	<elision2>
1688	1689	<elision1>	<elision1>
1688	1689	<>	<elision1>
1688	1695	.	υ
1688	1627	s	υ
1688	1695	.	u
1688	1627	s	u
1688	1665	.	κ
1688	1635	s	κ
1688	1638	H	κ
1688	1635	s	k
1688	1638	H	k
1688	1671	s	U
1688	1623	s	K
1688	1638	H	K
1688	1695	.	α
1688	1627	s	α
1688	1695	.	a
1688	1627	s	a
1688	1674	s	A
1688	1635	s	λ
1688	1638	H	λ
1688	1635	s	l
1688	1638	H	l
1688	1629	s	L
1688	1638	H	L
1688	1620	<1m>	<>
1689	1687	.	.
1689	1687	<~>	<~>
1689	1687	<split-s>	<split-s>
1689	1687	<split-h>	<split-h>
1689	1687	<name2>	<name2>
1689	1690	<aphaerese>	<aphaerese>
1689	1687	<>	<aphaerese>
1689	1687	<elision3>	<elision3>
1689	1687	<>	<elision3>
1689	1687	<elision2>	<elision2>
1689	1687	<>	<elision2>
1689	1687	<elision1>	<elision1>
1689	1687	<>	<elision1>
1689	1693	.	υ
1689	1628	s	υ
1689	1693	.	u
1689	1628	s	u
1689	1663	.	κ
1689	1636	s	κ
1689	1639	H	κ
1689	1636	s	k
1689	1639	H	k
1689	1669	s	U
1689	1624	s	K
1689	1639	H	K
1689	1693	.	α
1689	1628	s	α
1689	1693	.	a
1689	1628	s	a
1689	1672	s	A
1689	1636	s	λ
1689	1639	H	λ
1689	1636	s	l
1689	1639	H	l
1689	1630	s	L
1689	1639	H	L
1689	1621	<1m>	<>
1690	1687	.	.
1690	1687	<~>	<~>
1690	1687	<split-s>	<split-s>
1690	1687	<split-h>	<split-h>
1690	1687	<name2>	<name2>
1690	1691	<>	<name>
1690	1690	<aphaerese>	<aphaerese>
1690	1690	<>	<aphaerese>
1690	1687	<elision3>	<elision3>
1690	1690	<>	<elision3>
1690	1687	<elision2>	<elision2>
1690	1690	<>	<elision2>
1690	1687	<elision1>	<elision1>
1690	1690	<>	<elision1>
1690	1687	.	υ
1690	1687	.	u
1690	1663	.	κ
1690	1636	s	κ
1690	1639	H	κ
1690	1636	s	k
1690	1639	H	k
1690	1669	s	U
1690	1624	s	K
1690	1639	H	K
1690	1687	.	α
1690	1687	.	a
1690	1672	s	A
1690	1636	s	λ
1690	1639	H	λ
1690	1636	s	l
1690	1639	H	l
1690	1630	s	L
1690	1639	H	L
1690	1622	<1m>	<>
1691	1689	.	.
1691	1689	<~>	<~>
1691	1689	<split-s>	<split-s>
1691	1689	<split-h>	<split-h>
1691	1689	<name2>	<name2>
1691	1692	<aphaerese>	<aphaerese>
1691	1692	<>	<aphaerese>
1691	1689	<elision3>	<elision3>
1691	1692	<>	<elision3>
1691	1689	<elision2>	<elision2>
1691	1692	<>	<elision2>
1691	1689	<elision1>	<elision1>
1691	1692	<>	<elision1>
1691	1689	.	υ
1691	1689	.	u
1691	1665	.	κ
1691	1635	s	κ
1691	1638	H	κ
1691	1635	s	k
1691	1638	H	k
1691	1671	s	U
1691	1623	s	K
1691	1638	H	K
1691	1689	.	α
1691	1689	.	a
1691	1674	s	A
1691	1635	s	λ
1691	1638	H	λ
1691	1635	s	l
1691	1638	H	l
1691	1629	s	L
1691	1638	H	L
1691	1620	<1m>	<>
1692	1687	.	.
1692	1687	<~>	<~>
1692	1687	<split-s>	<split-s>
1692	1687	<split-h>	<split-h>
1692	1687	<name2>	<name2>
1692	1690	<aphaerese>	<aphaerese>
1692	1690	<>	<aphaerese>
1692	1687	<elision3>	<elision3>
1692	1690	<>	<elision3>
1692	1687	<elision2>	<elision2>
1692	1690	<>	<elision2>
1692	1687	<elision1>	<elision1>
1692	1690	<>	<elision1>
1692	1687	.	υ
1692	1687	.	u
1692	1663	.	κ
1692	1636	s	κ
1692	1639	H	κ
1692	1636	s	k
1692	1639	H	k
1692	1669	s	U
1692	1624	s	K
1692	1639	H	K
1692	1687	.	α
1692	1687	.	a
1692	1672	s	A
1692	1636	s	λ
1692	1639	H	λ
1692	1636	s	l
1692	1639	H	l
1692	1630	s	L
1692	1639	H	L
1692	1621	<1m>	<>
1693	1694	<>	<name>
1693	1693	<>	<aphaerese>
1693	1687	<elision3>	<elision3>
1693	1693	<>	<elision3>
1693	1687	<elision2>	<elision2>
1693	1693	<>	<elision2>
1693	1687	<elision1>	<elision1>
1693	1693	<>	<elision1>
1694	1695	<>	<aphaerese>
1694	1689	<elision3>	<elision3>
1694	1695	<>	<elision3>
1694	1689	<elision2>	<elision2>
1694	1695	<>	<elision2>
1694	1689	<elision1>	<elision1>
1694	1695	<>	<elision1>
1695	1693	<>	<aphaerese>
1695	1687	<elision3>	<elision3>
1695	1693	<>	<elision3>
1695	1687	<elision2>	<elision2>
1695	1693	<>	<elision2>
1695	1687	<elision1>	<elision1>
1695	1693	<>	<elision1>
1696	1687	.	.
1696	1687	<~>	<~>
1696	1687	<split-s>	<split-s>
1696	1687	<split-h>	<split-h>
1696	1687	<name2>	<name2>
1696	1697	<>	<name>
1696	1690	<aphaerese>	<aphaerese>
1696	1696	<>	<aphaerese>
1696	1699	<elision3>	<elision3>
1696	1696	<>	<elision3>
1696	1699	<elision2>	<elision2>
1696	1696	<>	<elision2>
1696	1699	<elision1>	<elision1>
1696	1696	<>	<elision1>
1696	1693	.	υ
1696	1628	s	υ
1696	1693	.	u
1696	1628	s	u
1696	1636	s	κ
1696	1639	H	κ
1696	1636	s	k
1696	1639	H	k
1696	1669	s	U
1696	1624	s	K
1696	1639	H	K
1696	1693	.	α
1696	1628	s	α
1696	1693	.	a
1696	1628	s	a
1696	1672	s	A
1696	1636	s	λ
1696	1639	H	λ
1696	1636	s	l
1696	1639	H	l
1696	1630	s	L
1696	1639	H	L
1696	1622	<1m>	<>
1697	1689	.	.
1697	1689	<~>	<~>
1697	1689	<split-s>	<split-s>
1697	1689	<split-h>	<split-h>
1697	1689	<name2>	<name2>
1697	1692	<aphaerese>	<aphaerese>
1697	1686	<>	<aphaerese>
1697	1698	<elision3>	<elision3>
1697	1686	<>	<elision3>
1697	1698	<elision2>	<elision2>
1697	1686	<>	<elision2>
1697	1698	<elision1>	<elision1>
1697	1686	<>	<elision1>
1697	1695	.	υ
1697	1627	s	υ
1697	1695	.	u
1697	1627	s	u
1697	1635	s	κ
1697	1638	H	κ
1697	1635	s	k
1697	1638	H	k
1697	1671	s	U
1697	1623	s	K
1697	1638	H	K
1697	1695	.	α
1697	1627	s	α
1697	1695	.	a
1697	1627	s	a
1697	1674	s	A
1697	1635	s	λ
1697	1638	H	λ
1697	1635	s	l
1697	1638	H	l
1697	1629	s	L
1697	1638	H	L
1697	1620	<1m>	<>
1698	1687	.	.
1698	1687	<~>	<~>
1698	1687	<split-s>	<split-s>
1698	1687	<split-h>	<split-h>
1698	1687	<name2>	<name2>
1698	1690	<aphaerese>	<aphaerese>
1698	1699	<>	<aphaerese>
1698	1687	<elision3>	<elision3>
1698	1699	<>	<elision3>
1698	1687	<elision2>	<elision2>
1698	1699	<>	<elision2>
1698	1687	<elision1>	<elision1>
1698	1699	<>	<elision1>
1698	1693	.	υ
1698	1628	s	υ
1698	1693	.	u
1698	1628	s	u
1698	1663	.	κ
1698	1702	s	κ
1698	1639	H	κ
1698	1702	s	k
1698	1639	H	k
1698	1669	s	U
1698	1639	H	K
1698	1693	.	α
1698	1628	s	α
1698	1693	.	a
1698	1628	s	a
1698	1672	s	A
1698	1702	s	λ
1698	1639	H	λ
1698	1702	s	l
1698	1639	H	l
1698	1639	H	L
1698	1621	<1m>	<>
1699	1687	.	.
1699	1687	<~>	<~>
1699	1687	<split-s>	<split-s>
1699	1687	<split-h>	<split-h>
1699	1687	<name2>	<name2>
1699	1700	<>	<name>
1699	1690	<aphaerese>	<aphaerese>
1699	1699	<>	<aphaerese>
1699	1687	<elision3>	<elision3>
1699	1699	<>	<elision3>
1699	1687	<elision2>	<elision2>
1699	1699	<>	<elision2>
1699	1687	<elision1>	<elision1>
1699	1699	<>	<elision1>
1699	1693	.	υ
1699	1628	s	υ
1699	1693	.	u
1699	1628	s	u
1699	1663	.	κ
1699	1702	s	κ
1699	1639	H	κ
1699	1702	s	k
1699	1639	H	k
1699	1669	s	U
1699	1639	H	K
1699	1693	.	α
1699	1628	s	α
1699	1693	.	a
1699	1628	s	a
1699	1672	s	A
1699	1702	s	λ
1699	1639	H	λ
1699	1702	s	l
1699	1639	H	l
1699	1639	H	L
1699	1622	<1m>	<>
1700	1689	.	.
1700	1689	<~>	<~>
1700	1689	<split-s>	<split-s>
1700	1689	<split-h>	<split-h>
1700	1689	<name2>	<name2>
1700	1692	<aphaerese>	<aphaerese>
1700	1698	<>	<aphaerese>
1700	1689	<elision3>	<elision3>
1700	1698	<>	<elision3>
1700	1689	<elision2>	<elision2>
1700	1698	<>	<elision2>
1700	1689	<elision1>	<elision1>
1700	1698	<>	<elision1>
1700	1695	.	υ
1700	1627	s	υ
1700	1695	.	u
1700	1627	s	u
1700	1665	.	κ
1700	1701	s	κ
1700	1638	H	κ
1700	1701	s	k
1700	1638	H	k
1700	1671	s	U
1700	1638	H	K
1700	1695	.	α
1700	1627	s	α
1700	1695	.	a
1700	1627	s	a
1700	1674	s	A
1700	1701	s	λ
1700	1638	H	λ
1700	1701	s	l
1700	1638	H	l
1700	1638	H	L
1700	1620	<1m>	<>
1701	1702	<>	<aphaerese>
1701	1702	<>	<elision3>
1701	1702	<>	<elision2>
1701	1702	<>	<elision1>
1701	1621	<w>	<>
1702	1703	<>	<name>
1702	1702	<>	<aphaerese>
1702	1702	<>	<elision3>
1702	1702	<>	<elision2>
1702	1702	<>	<elision1>
1702	1622	<w>	<>
1703	1701	<>	<aphaerese>
1703	1701	<>	<elision3>
1703	1701	<>	<elision2>
1703	1701	<>	<elision1>
1703	1620	<w>	<>
1704	1705	<>	<aphaerese>
1704	1705	<>	<elision3>
1704	1705	<>	<elision2>
1704	1705	<>	<elision1>
1704	1693	.	κ
1704	1693	.	λ
1705	1706	<>	<name>
1705	1705	<>	<aphaerese>
1705	1705	<>	<elision3>
1705	1705	<>	<elision2>
1705	1705	<>	<elision1>
1705	1693	.	κ
1705	1693	.	λ
1706	1704	<>	<aphaerese>
1706	1704	<>	<elision3>
1706	1704	<>	<elision2>
1706	1704	<>	<elision1>
1706	1695	.	κ
1706	1695	.	λ
1707	1708	<>	<name>
1707	1707	<>	<aphaerese>
1707	1707	<>	<elision3>
1707	1707	<>	<elision2>
1707	1707	<>	<elision1>
1707	1711	<k2K>	<>
1707	1714	<k2L>	<>
1707	1705	<l2L>	<>
1708	1709	<>	<aphaerese>
1708	1709	<>	<elision3>
1708	1709	<>	<elision2>
1708	1709	<>	<elision1>
1708	1712	<k2K>	<>
1708	1715	<k2L>	<>
1708	1706	<l2L>	<>
1709	1707	<>	<aphaerese>
1709	1707	<>	<elision3>
1709	1707	<>	<elision2>
1709	1707	<>	<elision1>
1709	1710	<k2K>	<>
1709	1713	<k2L>	<>
1709	1704	<l2L>	<>
1710	1657	.	.
1710	1657	<~>	<~>
1710	1657	<split-s>	<split-s>
1710	1657	<split-h>	<split-h>
1710	1657	<name2>	<name2>
1710	1660	<aphaerese>	<aphaerese>
1710	1711	<>	<aphaerese>
1710	1657	<elision3>	<elision3>
1710	1711	<>	<elision3>
1710	1657	<elision2>	<elision2>
1710	1711	<>	<elision2>
1710	1657	<elision1>	<elision1>
1710	1711	<>	<elision1>
1710	1675	.	υ
1710	1628	s	υ
1710	1675	.	u
1710	1628	s	u
1710	1615	s	κ
1710	1615	s	k
1710	1669	s	U
1710	1624	s	K
1710	1675	.	α
1710	1628	s	α
1710	1675	.	a
1710	1628	s	a
1710	1672	s	A
1710	1615	s	λ
1710	1615	s	l
1710	1630	s	L
1710	1621	<1m>	<>
1711	1657	.	.
1711	1657	<~>	<~>
1711	1657	<split-s>	<split-s>
1711	1657	<split-h>	<split-h>
1711	1657	<name2>	<name2>
1711	1712	<>	<name>
1711	1660	<aphaerese>	<aphaerese>
1711	1711	<>	<aphaerese>
1711	1657	<elision3>	<elision3>
1711	1711	<>	<elision3>
1711	1657	<elision2>	<elision2>
1711	1711	<>	<elision2>
1711	1657	<elision1>	<elision1>
1711	1711	<>	<elision1>
1711	1675	.	υ
1711	1628	s	υ
1711	1675	.	u
1711	1628	s	u
1711	1615	s	κ
1711	1615	s	k
1711	1669	s	U
1711	1624	s	K
1711	1675	.	α
1711	1628	s	α
1711	1675	.	a
1711	1628	s	a
1711	1672	s	A
1711	1615	s	λ
1711	1615	s	l
1711	1630	s	L
1711	1622	<1m>	<>
1712	1659	.	.
1712	1659	<~>	<~>
1712	1659	<split-s>	<split-s>
1712	1659	<split-h>	<split-h>
1712	1659	<name2>	<name2>
1712	1662	<aphaerese>	<aphaerese>
1712	1710	<>	<aphaerese>
1712	1659	<elision3>	<elision3>
1712	1710	<>	<elision3>
1712	1659	<elision2>	<elision2>
1712	1710	<>	<elision2>
1712	1659	<elision1>	<elision1>
1712	1710	<>	<elision1>
1712	1677	.	υ
1712	1627	s	υ
1712	1677	.	u
1712	1627	s	u
1712	1614	s	κ
1712	1614	s	k
1712	1671	s	U
1712	1623	s	K
1712	1677	.	α
1712	1627	s	α
1712	1677	.	a
1712	1627	s	a
1712	1674	s	A
1712	1614	s	λ
1712	1614	s	l
1712	1629	s	L
1712	1620	<1m>	<>
1713	1687	.	.
1713	1687	<~>	<~>
1713	1687	<split-s>	<split-s>
1713	1687	<split-h>	<split-h>
1713	1687	<name2>	<name2>
1713	1690	<aphaerese>	<aphaerese>
1713	1714	<>	<aphaerese>
1713	1687	<elision3>	<elision3>
1713	1714	<>	<elision3>
1713	1687	<elision2>	<elision2>
1713	1714	<>	<elision2>
1713	1687	<elision1>	<elision1>
1713	1714	<>	<elision1>
1713	1693	.	υ
1713	1628	s	υ
1713	1693	.	u
1713	1628	s	u
1713	1636	s	κ
1713	1639	H	κ
1713	1636	s	k
1713	1639	H	k
1713	1669	s	U
1713	1624	s	K
1713	1639	H	K
1713	1693	.	α
1713	1628	s	α
1713	1693	.	a
1713	1628	s	a
1713	1672	s	A
1713	1636	s	λ
1713	1639	H	λ
1713	1636	s	l
1713	1639	H	l
1713	1630	s	L
1713	1639	H	L
1713	1621	<1m>	<>
1714	1687	.	.
1714	1687	<~>	<~>
1714	1687	<split-s>	<split-s>
1714	1687	<split-h>	<split-h>
1714	1687	<name2>	<name2>
1714	1715	<>	<name>
1714	1690	<aphaerese>	<aphaerese>
1714	1714	<>	<aphaerese>
1714	1687	<elision3>	<elision3>
1714	1714	<>	<elision3>
1714	1687	<elision2>	<elision2>
1714	1714	<>	<elision2>
1714	1687	<elision1>	<elision1>
1714	1714	<>	<elision1>
1714	1693	.	υ
1714	1628	s	υ
1714	1693	.	u
1714	1628	s	u
1714	1636	s	κ
1714	1639	H	κ
1714	1636	s	k
1714	1639	H	k
1714	1669	s	U
1714	1624	s	K
1714	1639	H	K
1714	1693	.	α
1714	1628	s	α
1714	1693	.	a
1714	1628	s	a
1714	1672	s	A
1714	1636	s	λ
1714	1639	H	λ
1714	1636	s	l
1714	1639	H	l
1714	1630	s	L
1714	1639	H	L
1714	1622	<1m>	<>
1715	1689	.	.
1715	1689	<~>	<~>
1715	1689	<split-s>	<split-s>
1715	1689	<split-h>	<split-h>
1715	1689	<name2>	<name2>
1715	1692	<aphaerese>	<aphaerese>
1715	1713	<>	<aphaerese>
1715	1689	<elision3>	<elision3>
1715	1713	<>	<elision3>
1715	1689	<elision2>	<elision2>
1715	1713	<>	<elision2>
1715	1689	<elision1>	<elision1>
1715	1713	<>	<elision1>
1715	1695	.	υ
1715	1627	s	υ
1715	1695	.	u
1715	1627	s	u
1715	1635	s	κ
1715	1638	H	κ
1715	1635	s	k
1715	1638	H	k
1715	1671	s	U
1715	1623	s	K
1715	1638	H	K
1715	1695	.	α
1715	1627	s	α
1715	1695	.	a
1715	1627	s	a
1715	1674	s	A
1715	1635	s	λ
1715	1638	H	λ
1715	1635	s	l
1715	1638	H	l
1715	1629	s	L
1715	1638	H	L
1715	1620	<1m>	<>
1716	1657	.	.
1716	1657	<~>	<~>
1716	1657	<split-s>	<split-s>
1716	1657	<split-h>	<split-h>
1716	1657	<name2>	<name2>
1716	1717	<>	<name>
1716	1660	<aphaerese>	<aphaerese>
1716	1716	<>	<aphaerese>
1716	1657	<elision3>	<elision3>
1716	1716	<>	<elision3>
1716	1657	<elision2>	<elision2>
1716	1716	<>	<elision2>
1716	1657	<elision1>	<elision1>
1716	1716	<>	<elision1>
1716	1675	.	υ
1716	1628	s	υ
1716	1675	.	u
1716	1628	s	u
1716	1663	.	κ
1716	1615	s	κ
1716	1615	s	k
1716	1669	s	U
1716	1624	s	K
1716	1675	.	α
1716	1628	s	α
1716	1675	.	a
1716	1628	s	a
1716	1672	s	A
1716	1615	s	λ
1716	1615	s	l
1716	1630	s	L
1716	1622	<1m>	<>
1716	1687	<U2L>	<>
1717	1659	.	.
1717	1659	<~>	<~>
1717	1659	<split-s>	<split-s>
1717	1659	<split-h>	<split-h>
1717	1659	<name2>	<name2>
1717	1662	<aphaerese>	<aphaerese>
1717	1718	<>	<aphaerese>
1717	1659	<elision3>	<elision3>
1717	1718	<>	<elision3>
1717	1659	<elision2>	<elision2>
1717	1718	<>	<elision2>
1717	1659	<elision1>	<elision1>
1717	1718	<>	<elision1>
1717	1677	.	υ
1717	1627	s	υ
1717	1677	.	u
1717	1627	s	u
1717	1665	.	κ
1717	1614	s	κ
1717	1614	s	k
1717	1671	s	U
1717	1623	s	K
1717	1677	.	α
1717	1627	s	α
1717	1677	.	a
1717	1627	s	a
1717	1674	s	A
1717	1614	s	λ
1717	1614	s	l
1717	1629	s	L
1717	1620	<1m>	<>
1717	1688	<U2L>	<>
1718	1657	.	.
1718	1657	<~>	<~>
1718	1657	<split-s>	<split-s>
1718	1657	<split-h>	<split-h>
1718	1657	<name2>	<name2>
1718	1660	<aphaerese>	<aphaerese>
1718	1716	<>	<aphaerese>
1718	1657	<elision3>	<elision3>
1718	1716	<>	<elision3>
1718	1657	<elision2>	<elision2>
1718	1716	<>	<elision2>
1718	1657	<elision1>	<elision1>
1718	1716	<>	<elision1>
1718	1675	.	υ
1718	1628	s	υ
1718	1675	.	u
1718	1628	s	u
1718	1663	.	κ
1718	1615	s	κ
1718	1615	s	k
1718	1669	s	U
1718	1624	s	K
1718	1675	.	α
1718	1628	s	α
1718	1675	.	a
1718	1628	s	a
1718	1672	s	A
1718	1615	s	λ
1718	1615	s	l
1718	1630	s	L
1718	1621	<1m>	<>
1718	1689	<U2L>	<>
1719	1657	.	.
1719	1657	<~>	<~>
1719	1657	<split-s>	<split-s>
1719	1657	<split-h>	<split-h>
1719	1657	<name2>	<name2>
1719	1720	<name2>	<name>
1719	1721	<>	<name>
1719	1660	<aphaerese>	<aphaerese>
1719	1723	<>	<aphaerese>
1719	1657	<elision3>	<elision3>
1719	1723	<>	<elision3>
1719	1657	<elision2>	<elision2>
1719	1723	<>	<elision2>
1719	1657	<elision1>	<elision1>
1719	1723	<>	<elision1>
1719	1675	.	υ
1719	1628	s	υ
1719	1675	.	u
1719	1628	s	u
1719	1693	.	κ
1719	1615	s	κ
1719	1615	s	k
1719	1669	s	U
1719	1624	s	K
1719	1675	.	α
1719	1628	s	α
1719	1675	.	a
1719	1628	s	a
1719	1672	s	A
1719	1693	.	λ
1719	1615	s	λ
1719	1615	s	l
1719	1630	s	L
1719	1622	<1m>	<>
1719	1724	<k2K>	<>
1719	1725	<k2L>	<>
1719	1727	<K2L>	<>
1720	1623	s	k
1720	1629	s	l
1721	1659	.	.
1721	1659	<~>	<~>
1721	1659	<split-s>	<split-s>
1721	1659	<split-h>	<split-h>
1721	1659	<name2>	<name2>
1721	1662	<aphaerese>	<aphaerese>
1721	1722	<>	<aphaerese>
1721	1659	<elision3>	<elision3>
1721	1722	<>	<elision3>
1721	1659	<elision2>	<elision2>
1721	1722	<>	<elision2>
1721	1659	<elision1>	<elision1>
1721	1722	<>	<elision1>
1721	1677	.	υ
1721	1627	s	υ
1721	1677	.	u
1721	1627	s	u
1721	1695	.	κ
1721	1614	s	κ
1721	1614	s	k
1721	1671	s	U
1721	1623	s	K
1721	1677	.	α
1721	1627	s	α
1721	1677	.	a
1721	1627	s	a
1721	1674	s	A
1721	1695	.	λ
1721	1614	s	λ
1721	1614	s	l
1721	1629	s	L
1721	1620	<1m>	<>
1721	1715	<K2L>	<>
1722	1657	.	.
1722	1657	<~>	<~>
1722	1657	<split-s>	<split-s>
1722	1657	<split-h>	<split-h>
1722	1657	<name2>	<name2>
1722	1660	<aphaerese>	<aphaerese>
1722	1723	<>	<aphaerese>
1722	1657	<elision3>	<elision3>
1722	1723	<>	<elision3>
1722	1657	<elision2>	<elision2>
1722	1723	<>	<elision2>
1722	1657	<elision1>	<elision1>
1722	1723	<>	<elision1>
1722	1675	.	υ
1722	1628	s	υ
1722	1675	.	u
1722	1628	s	u
1722	1693	.	κ
1722	1615	s	κ
1722	1615	s	k
1722	1669	s	U
1722	1624	s	K
1722	1675	.	α
1722	1628	s	α
1722	1675	.	a
1722	1628	s	a
1722	1672	s	A
1722	1693	.	λ
1722	1615	s	λ
1722	1615	s	l
1722	1630	s	L
1722	1621	<1m>	<>
1722	1713	<K2L>	<>
1723	1657	.	.
1723	1657	<~>	<~>
1723	1657	<split-s>	<split-s>
1723	1657	<split-h>	<split-h>
1723	1657	<name2>	<name2>
1723	1721	<>	<name>
1723	1660	<aphaerese>	<aphaerese>
1723	1723	<>	<aphaerese>
1723	1657	<elision3>	<elision3>
1723	1723	<>	<elision3>
1723	1657	<elision2>	<elision2>
1723	1723	<>	<elision2>
1723	1657	<elision1>	<elision1>
1723	1723	<>	<elision1>
1723	1675	.	υ
1723	1628	s	υ
1723	1675	.	u
1723	1628	s	u
1723	1693	.	κ
1723	1615	s	κ
1723	1615	s	k
1723	1669	s	U
1723	1624	s	K
1723	1675	.	α
1723	1628	s	α
1723	1675	.	a
1723	1628	s	a
1723	1672	s	A
1723	1693	.	λ
1723	1615	s	λ
1723	1615	s	l
1723	1630	s	L
1723	1622	<1m>	<>
1723	1714	<K2L>	<>
1724	1720	<name>	<name>
1725	1726	<name>	<name>
1726	1623	s	k
1726	1638	H	k
1726	1629	s	l
1726	1638	H	l
1727	1687	.	.
1727	1687	<~>	<~>
1727	1687	<split-s>	<split-s>
1727	1687	<split-h>	<split-h>
1727	1687	<name2>	<name2>
1727	1726	<name2>	<name>
1727	1715	<>	<name>
1727	1690	<aphaerese>	<aphaerese>
1727	1714	<>	<aphaerese>
1727	1687	<elision3>	<elision3>
1727	1714	<>	<elision3>
1727	1687	<elision2>	<elision2>
1727	1714	<>	<elision2>
1727	1687	<elision1>	<elision1>
1727	1714	<>	<elision1>
1727	1693	.	υ
1727	1628	s	υ
1727	1693	.	u
1727	1628	s	u
1727	1636	s	κ
1727	1639	H	κ
1727	1636	s	k
1727	1639	H	k
1727	1669	s	U
1727	1624	s	K
1727	1639	H	K
1727	1693	.	α
1727	1628	s	α
1727	1693	.	a
1727	1628	s	a
1727	1672	s	A
1727	1636	s	λ
1727	1639	H	λ
1727	1636	s	l
1727	1639	H	l
1727	1630	s	L
1727	1639	H	L
1727	1622	<1m>	<>
1728	1729	<>	<name>
1728	1728	<>	<aphaerese>
1728	1728	<>	<elision3>
1728	1728	<>	<elision2>
1728	1728	<>	<elision1>
1728	1732	<lambda2L>	<>
1729	1730	<>	<aphaerese>
1729	1730	<>	<elision3>
1729	1730	<>	<elision2>
1729	1730	<>	<elision1>
1729	1733	<lambda2L>	<>
1730	1728	<>	<aphaerese>
1730	1728	<>	<elision3>
1730	1728	<>	<elision2>
1730	1728	<>	<elision1>
1730	1731	<lambda2L>	<>
1731	1687	.	.
1731	1687	<~>	<~>
1731	1687	<split-s>	<split-s>
1731	1687	<split-h>	<split-h>
1731	1687	<name2>	<name2>
1731	1690	<aphaerese>	<aphaerese>
1731	1732	<>	<aphaerese>
1731	1687	<elision3>	<elision3>
1731	1732	<>	<elision3>
1731	1687	<elision2>	<elision2>
1731	1732	<>	<elision2>
1731	1687	<elision1>	<elision1>
1731	1732	<>	<elision1>
1731	1693	.	υ
1731	1628	s	υ
1731	1693	.	u
1731	1628	s	u
1731	1693	.	κ
1731	1636	s	κ
1731	1639	H	κ
1731	1636	s	k
1731	1639	H	k
1731	1669	s	U
1731	1624	s	K
1731	1639	H	K
1731	1693	.	α
1731	1628	s	α
1731	1693	.	a
1731	1628	s	a
1731	1672	s	A
1731	1693	.	λ
1731	1636	s	λ
1731	1639	H	λ
1731	1636	s	l
1731	1639	H	l
1731	1630	s	L
1731	1639	H	L
1731	1621	<1m>	<>
1732	1687	.	.
1732	1687	<~>	<~>
1732	1687	<split-s>	<split-s>
1732	1687	<split-h>	<split-h>
1732	1687	<name2>	<name2>
1732	1733	<>	<name>
1732	1690	<aphaerese>	<aphaerese>
1732	1732	<>	<aphaerese>
1732	1687	<elision3>	<elision3>
1732	1732	<>	<elision3>
1732	1687	<elision2>	<elision2>
1732	1732	<>	<elision2>
1732	1687	<elision1>	<elision1>
1732	1732	<>	<elision1>
1732	1693	.	υ
1732	1628	s	υ
1732	1693	.	u
1732	1628	s	u
1732	1693	.	κ
1732	1636	s	κ
1732	1639	H	κ
1732	1636	s	k
1732	1639	H	k
1732	1669	s	U
1732	1624	s	K
1732	1639	H	K
1732	1693	.	α
1732	1628	s	α
1732	1693	.	a
1732	1628	s	a
1732	1672	s	A
1732	1693	.	λ
1732	1636	s	λ
1732	1639	H	λ
1732	1636	s	l
1732	1639	H	l
1732	1630	s	L
1732	1639	H	L
1732	1622	<1m>	<>
1733	1689	.	.
1733	1689	<~>	<~>
1733	1689	<split-s>	<split-s>
1733	1689	<split-h>	<split-h>
1733	1689	<name2>	<name2>
1733	1692	<aphaerese>	<aphaerese>
1733	1731	<>	<aphaerese>
1733	1689	<elision3>	<elision3>
1733	1731	<>	<elision3>
1733	1689	<elision2>	<elision2>
1733	1731	<>	<elision2>
1733	1689	<elision1>	<elision1>
1733	1731	<>	<elision1>
1733	1695	.	υ
1733	1627	s	υ
1733	1695	.	u
1733	1627	s	u
1733	1695	.	κ
1733	1635	s	κ
1733	1638	H	κ
1733	1635	s	k
1733	1638	H	k
1733	1671	s	U
1733	1623	s	K
1733	1638	H	K
1733	1695	.	α
1733	1627	s	α
1733	1695	.	a
1733	1627	s	a
1733	1674	s	A
1733	1695	.	λ
1733	1635	s	λ
1733	1638	H	λ
1733	1635	s	l
1733	1638	H	l
1733	1629	s	L
1733	1638	H	L
1733	1620	<1m>	<>
1734	1735	<>	<name>
1734	1734	<>	<aphaerese>
1734	1734	<>	<elision3>
1734	1734	<>	<elision2>
1734	1734	<>	<elision1>
1734	1732	<l2L>	<>
1735	1736	<>	<aphaerese>
1735	1736	<>	<elision3>
1735	1736	<>	<elision2>
1735	1736	<>	<elision1>
1735	1733	<l2L>	<>
1736	1734	<>	<aphaerese>
1736	1734	<>	<elision3>
1736	1734	<>	<elision2>
1736	1734	<>	<elision1>
1736	1731	<l2L>	<>
1737	1687	.	.
1737	1687	<~>	<~>
1737	1687	<split-s>	<split-s>
1737	1687	<split-h>	<split-h>
1737	1687	<name2>	<name2>
1737	1726	<name2>	<name>
1737	1733	<>	<name>
1737	1690	<aphaerese>	<aphaerese>
1737	1732	<>	<aphaerese>
1737	1687	<elision3>	<elision3>
1737	1732	<>	<elision3>
1737	1687	<elision2>	<elision2>
1737	1732	<>	<elision2>
1737	1687	<elision1>	<elision1>
1737	1732	<>	<elision1>
1737	1693	.	υ
1737	1628	s	υ
1737	1693	.	u
1737	1628	s	u
1737	1693	.	κ
1737	1636	s	κ
1737	1639	H	κ
1737	1636	s	k
1737	1639	H	k
1737	1669	s	U
1737	1624	s	K
1737	1639	H	K
1737	1693	.	α
1737	1628	s	α
1737	1693	.	a
1737	1628	s	a
1737	1672	s	A
1737	1693	.	λ
1737	1636	s	λ
1737	1639	H	λ
1737	1636	s	l
1737	1639	H	l
1737	1630	s	L
1737	1639	H	L
1737	1622	<1m>	<>
1737	1725	<l2L>	<>
1738	1739	<>	<name>
1738	1738	<>	<aphaerese>
1738	1738	<>	<elision3>
1738	1738	<>	<elision2>
1738	1738	<>	<elision1>
1738	1742	<ypsilon2K>	<>
1738	1745	<ypsilon2L>	<>
1739	1740	<>	<aphaerese>
1739	1740	<>	<elision3>
1739	1740	<>	<elision2>
1739	1740	<>	<elision1>
1739	1743	<ypsilon2K>	<>
1739	1746	<ypsilon2L>	<>
1740	1738	<>	<aphaerese>
1740	1738	<>	<elision3>
1740	1738	<>	<elision2>
1740	1738	<>	<elision1>
1740	1741	<ypsilon2K>	<>
1740	1744	<ypsilon2L>	<>
1741	1657	.	.
1741	1657	<~>	<~>
1741	1657	<split-s>	<split-s>
1741	1657	<split-h>	<split-h>
1741	1657	<name2>	<name2>
1741	1660	<aphaerese>	<aphaerese>
1741	1742	<>	<aphaerese>
1741	1742	<>	<elision3>
1741	1742	<>	<elision2>
1741	1742	<>	<elision1>
1741	1675	.	υ
1741	1628	s	υ
1741	1675	.	u
1741	1628	s	u
1741	1663	.	κ
1741	1615	s	κ
1741	1615	s	k
1741	1669	s	U
1741	1624	s	K
1741	1675	.	α
1741	1628	s	α
1741	1675	.	a
1741	1628	s	a
1741	1672	s	A
1741	1615	s	λ
1741	1615	s	l
1741	1630	s	L
1741	1621	<1m>	<>
1742	1657	.	.
1742	1657	<~>	<~>
1742	1657	<split-s>	<split-s>
1742	1657	<split-h>	<split-h>
1742	1657	<name2>	<name2>
1742	1743	<>	<name>
1742	1660	<aphaerese>	<aphaerese>
1742	1742	<>	<aphaerese>
1742	1742	<>	<elision3>
1742	1742	<>	<elision2>
1742	1742	<>	<elision1>
1742	1675	.	υ
1742	1628	s	υ
1742	1675	.	u
1742	1628	s	u
1742	1663	.	κ
1742	1615	s	κ
1742	1615	s	k
1742	1669	s	U
1742	1624	s	K
1742	1675	.	α
1742	1628	s	α
1742	1675	.	a
1742	1628	s	a
1742	1672	s	A
1742	1615	s	λ
1742	1615	s	l
1742	1630	s	L
1742	1622	<1m>	<>
1743	1659	.	.
1743	1659	<~>	<~>
1743	1659	<split-s>	<split-s>
1743	1659	<split-h>	<split-h>
1743	1659	<name2>	<name2>
1743	1662	<aphaerese>	<aphaerese>
1743	1741	<>	<aphaerese>
1743	1741	<>	<elision3>
1743	1741	<>	<elision2>
1743	1741	<>	<elision1>
1743	1677	.	υ
1743	1627	s	υ
1743	1677	.	u
1743	1627	s	u
1743	1665	.	κ
1743	1614	s	κ
1743	1614	s	k
1743	1671	s	U
1743	1623	s	K
1743	1677	.	α
1743	1627	s	α
1743	1677	.	a
1743	1627	s	a
1743	1674	s	A
1743	1614	s	λ
1743	1614	s	l
1743	1629	s	L
1743	1620	<1m>	<>
1744	1687	.	.
1744	1687	<~>	<~>
1744	1687	<split-s>	<split-s>
1744	1687	<split-h>	<split-h>
1744	1687	<name2>	<name2>
1744	1690	<aphaerese>	<aphaerese>
1744	1745	<>	<aphaerese>
1744	1745	<>	<elision3>
1744	1745	<>	<elision2>
1744	1745	<>	<elision1>
1744	1693	.	υ
1744	1628	s	υ
1744	1693	.	u
1744	1628	s	u
1744	1663	.	κ
1744	1636	s	κ
1744	1639	H	κ
1744	1636	s	k
1744	1639	H	k
1744	1669	s	U
1744	1624	s	K
1744	1639	H	K
1744	1693	.	α
1744	1628	s	α
1744	1693	.	a
1744	1628	s	a
1744	1672	s	A
1744	1636	s	λ
1744	1639	H	λ
1744	1636	s	l
1744	1639	H	l
1744	1630	s	L
1744	1639	H	L
1744	1621	<1m>	<>
1745	1687	.	.
1745	1687	<~>	<~>
1745	1687	<split-s>	<split-s>
1745	1687	<split-h>	<split-h>
1745	1687	<name2>	<name2>
1745	1746	<>	<name>
1745	1690	<aphaerese>	<aphaerese>
1745	1745	<>	<aphaerese>
1745	1745	<>	<elision3>
1745	1745	<>	<elision2>
1745	1745	<>	<elision1>
1745	1693	.	υ
1745	1628	s	υ
1745	1693	.	u
1745	1628	s	u
1745	1663	.	κ
1745	1636	s	κ
1745	1639	H	κ
1745	1636	s	k
1745	1639	H	k
1745	1669	s	U
1745	1624	s	K
1745	1639	H	K
1745	1693	.	α
1745	1628	s	α
1745	1693	.	a
1745	1628	s	a
1745	1672	s	A
1745	1636	s	λ
1745	1639	H	λ
1745	1636	s	l
1745	1639	H	l
1745	1630	s	L
1745	1639	H	L
1745	1622	<1m>	<>
1746	1689	.	.
1746	1689	<~>	<~>
1746	1689	<split-s>	<split-s>
1746	1689	<split-h>	<split-h>
1746	1689	<name2>	<name2>
1746	1692	<aphaerese>	<aphaerese>
1746	1744	<>	<aphaerese>
1746	1744	<>	<elision3>
1746	1744	<>	<elision2>
1746	1744	<>	<elision1>
1746	1695	.	υ
1746	1627	s	υ
1746	1695	.	u
1746	1627	s	u
1746	1665	.	κ
1746	1635	s	κ
1746	1638	H	κ
1746	1635	s	k
1746	1638	H	k
1746	1671	s	U
1746	1623	s	K
1746	1638	H	K
1746	1695	.	α
1746	1627	s	α
1746	1695	.	a
1746	1627	s	a
1746	1674	s	A
1746	1635	s	λ
1746	1638	H	λ
1746	1635	s	l
1746	1638	H	l
1746	1629	s	L
1746	1638	H	L
1746	1620	<1m>	<>
1747	1748	<>	<name>
1747	1747	<>	<aphaerese>
1747	1747	<>	<elision3>
1747	1747	<>	<elision2>
1747	1747	<>	<elision1>
1747	1742	<u2K>	<>
1747	1745	<u2L>	<>
1748	1749	<>	<aphaerese>
1748	1749	<>	<elision3>
1748	1749	<>	<elision2>
1748	1749	<>	<elision1>
1748	1743	<u2K>	<>
1748	1746	<u2L>	<>
1749	1747	<>	<aphaerese>
1749	1747	<>	<elision3>
1749	1747	<>	<elision2>
1749	1747	<>	<elision1>
1749	1741	<u2K>	<>
1749	1744	<u2L>	<>
1750	1751	<>	<name>
1750	1750	<>	<aphaerese>
1750	1750	<>	<elision3>
1750	1750	<>	<elision2>
1750	1750	<>	<elision1>
1750	1745	<alpha2L>	<>
1751	1752	<>	<aphaerese>
1751	1752	<>	<elision3>
1751	1752	<>	<elision2>
1751	1752	<>	<elision1>
1751	1746	<alpha2L>	<>
1752	1750	<>	<aphaerese>
1752	1750	<>	<elision3>
1752	1750	<>	<elision2>
1752	1750	<>	<elision1>
1752	1744	<alpha2L>	<>
1753	1754	<>	<name>
1753	1753	<>	<aphaerese>
1753	1753	<>	<elision3>
1753	1753	<>	<elision2>
1753	1753	<>	<elision1>
1753	1745	<a2L>	<>
1754	1755	<>	<aphaerese>
1754	1755	<>	<elision3>
1754	1755	<>	<elision2>
1754	1755	<>	<elision1>
1754	1746	<a2L>	<>
1755	1753	<>	<aphaerese>
1755	1753	<>	<elision3>
1755	1753	<>	<elision2>
1755	1753	<>	<elision1>
1755	1744	<a2L>	<>
1756	1757	.	.
1756	1758	 	 
1756	1757	<~>	<~>
1756	1757	<split-s>	<split-s>
1756	1757	<split-h>	<split-h>
1756	1757	<name2>	<name2>
1756	2333	<>	<name>
1756	1761	<aphaerese>	<aphaerese>
1756	1756	<>	<aphaerese>
1756	1756	<>	<elision3>
1756	1756	<>	<elision2>
1756	1756	<>	<elision1>
1756	1765	.	υ
1756	1771	s	υ
1756	1765	.	u
1756	1771	s	u
1756	1950	.	κ
1756	2021	s	κ
1756	2133	s	k
1756	2142	s	U
1756	2308	s	K
1756	1765	.	α
1756	1771	s	α
1756	1765	.	a
1756	1771	s	a
1756	2263	s	A
1756	2133	s	λ
1756	2133	s	l
1756	2321	s	L
1756	2336	<split-h>	<>
1757	1757	.	.
1757	1758	 	 
1757	1757	<~>	<~>
1757	1757	<split-s>	<split-s>
1757	1757	<split-h>	<split-h>
1757	1757	<name2>	<name2>
1757	2332	<>	<name>
1757	1761	<aphaerese>	<aphaerese>
1757	1757	<>	<aphaerese>
1757	1757	<elision3>	<elision3>
1757	1757	<>	<elision3>
1757	1757	<elision2>	<elision2>
1757	1757	<>	<elision2>
1757	1757	<elision1>	<elision1>
1757	1757	<>	<elision1>
1757	1765	.	υ
1757	1771	s	υ
1757	1765	.	u
1757	1771	s	u
1757	1950	.	κ
1757	2021	s	κ
1757	2133	s	k
1757	2142	s	U
1757	2308	s	K
1757	1765	.	α
1757	1771	s	α
1757	1765	.	a
1757	1771	s	a
1757	2263	s	A
1757	2133	s	λ
1757	2133	s	l
1757	2321	s	L
1757	2282	<split-h>	<>
1758	1757	.	.
1758	1758	 	 
1758	1757	<~>	<~>
1758	1757	<split-s>	<split-s>
1758	1757	<split-h>	<split-h>
1758	1757	<name2>	<name2>
1758	1759	<>	<name>
1758	1761	<aphaerese>	<aphaerese>
1758	1764	<>	<aphaerese>
1758	1757	<elision3>	<elision3>
1758	1764	<>	<elision3>
1758	1757	<elision2>	<elision2>
1758	1764	<>	<elision2>
1758	1757	<elision1>	<elision1>
1758	1764	<>	<elision1>
1758	1765	.	υ
1758	2285	s	υ
1758	1765	.	u
1758	2285	s	u
1758	1950	.	κ
1758	2288	s	κ
1758	2291	s	k
1758	2294	s	U
1758	2298	s	K
1758	1765	.	α
1758	2285	s	α
1758	1765	.	a
1758	2285	s	a
1758	2302	s	A
1758	2291	s	λ
1758	2291	s	l
1758	2303	s	L
1758	2282	<split-h>	<>
1759	1760	.	.
1759	1763	 	 
1759	1760	<~>	<~>
1759	1760	<split-s>	<split-s>
1759	1760	<split-h>	<split-h>
1759	1760	<name2>	<name2>
1759	2307	<aphaerese>	<aphaerese>
1759	2331	<>	<aphaerese>
1759	1760	<elision3>	<elision3>
1759	2331	<>	<elision3>
1759	1760	<elision2>	<elision2>
1759	2331	<>	<elision2>
1759	1760	<elision1>	<elision1>
1759	2331	<>	<elision1>
1759	1767	.	υ
1759	1943	s	υ
1759	1767	.	u
1759	1943	s	u
1759	1952	.	κ
1759	2023	s	κ
1759	2135	s	k
1759	2144	s	U
1759	2150	s	K
1759	1767	.	α
1759	1943	s	α
1759	1767	.	a
1759	1943	s	a
1759	2265	s	A
1759	2135	s	λ
1759	2135	s	l
1759	2268	s	L
1759	2283	<split-h>	<>
1760	1757	.	.
1760	1758	 	 
1760	1757	<~>	<~>
1760	1757	<split-s>	<split-s>
1760	1757	<split-h>	<split-h>
1760	1757	<name2>	<name2>
1760	1761	<aphaerese>	<aphaerese>
1760	1757	<>	<aphaerese>
1760	1757	<elision3>	<elision3>
1760	1757	<>	<elision3>
1760	1757	<elision2>	<elision2>
1760	1757	<>	<elision2>
1760	1757	<elision1>	<elision1>
1760	1757	<>	<elision1>
1760	1765	.	υ
1760	1771	s	υ
1760	1765	.	u
1760	1771	s	u
1760	1950	.	κ
1760	2021	s	κ
1760	2133	s	k
1760	2142	s	U
1760	2308	s	K
1760	1765	.	α
1760	1771	s	α
1760	1765	.	a
1760	1771	s	a
1760	2263	s	A
1760	2133	s	λ
1760	2133	s	l
1760	2321	s	L
1760	2284	<split-h>	<>
1761	1757	.	.
1761	1758	 	 
1761	1757	<~>	<~>
1761	1757	<split-s>	<split-s>
1761	1757	<split-h>	<split-h>
1761	1757	<name2>	<name2>
1761	1762	<>	<name>
1761	1761	<aphaerese>	<aphaerese>
1761	1761	<>	<aphaerese>
1761	1757	<elision3>	<elision3>
1761	1761	<>	<elision3>
1761	1757	<elision2>	<elision2>
1761	1761	<>	<elision2>
1761	1757	<elision1>	<elision1>
1761	1761	<>	<elision1>
1761	1757	.	υ
1761	1757	.	u
1761	1950	.	κ
1761	2021	s	κ
1761	2133	s	k
1761	2142	s	U
1761	2308	s	K
1761	1757	.	α
1761	1757	.	a
1761	2263	s	A
1761	2133	s	λ
1761	2133	s	l
1761	2321	s	L
1761	2329	<split-h>	<>
1762	1760	.	.
1762	1763	 	 
1762	1760	<~>	<~>
1762	1760	<split-s>	<split-s>
1762	1760	<split-h>	<split-h>
1762	1760	<name2>	<name2>
1762	2307	<aphaerese>	<aphaerese>
1762	2307	<>	<aphaerese>
1762	1760	<elision3>	<elision3>
1762	2307	<>	<elision3>
1762	1760	<elision2>	<elision2>
1762	2307	<>	<elision2>
1762	1760	<elision1>	<elision1>
1762	2307	<>	<elision1>
1762	1760	.	υ
1762	1760	.	u
1762	1952	.	κ
1762	2023	s	κ
1762	2135	s	k
1762	2144	s	U
1762	2310	s	K
1762	1760	.	α
1762	1760	.	a
1762	2265	s	A
1762	2135	s	λ
1762	2135	s	l
1762	2323	s	L
1762	2330	<split-h>	<>
1763	1757	.	.
1763	1758	 	 
1763	1757	<~>	<~>
1763	1757	<split-s>	<split-s>
1763	1757	<split-h>	<split-h>
1763	1757	<name2>	<name2>
1763	1761	<aphaerese>	<aphaerese>
1763	1764	<>	<aphaerese>
1763	1757	<elision3>	<elision3>
1763	1764	<>	<elision3>
1763	1757	<elision2>	<elision2>
1763	1764	<>	<elision2>
1763	1757	<elision1>	<elision1>
1763	1764	<>	<elision1>
1763	1765	.	υ
1763	2285	s	υ
1763	1765	.	u
1763	2285	s	u
1763	1950	.	κ
1763	2288	s	κ
1763	2291	s	k
1763	2294	s	U
1763	2298	s	K
1763	1765	.	α
1763	2285	s	α
1763	1765	.	a
1763	2285	s	a
1763	2302	s	A
1763	2291	s	λ
1763	2291	s	l
1763	2303	s	L
1763	2284	<split-h>	<>
1764	1757	.	.
1764	1758	 	 
1764	1757	<~>	<~>
1764	1757	<split-s>	<split-s>
1764	1757	<split-h>	<split-h>
1764	1757	<name2>	<name2>
1764	1759	<>	<name>
1764	1761	<aphaerese>	<aphaerese>
1764	1764	<>	<aphaerese>
1764	1757	<elision3>	<elision3>
1764	1764	<>	<elision3>
1764	1757	<elision2>	<elision2>
1764	1764	<>	<elision2>
1764	1757	<elision1>	<elision1>
1764	1764	<>	<elision1>
1764	1765	.	υ
1764	1771	s	υ
1764	1765	.	u
1764	1771	s	u
1764	1950	.	κ
1764	2021	s	κ
1764	2133	s	k
1764	2142	s	U
1764	2145	s	K
1764	1765	.	α
1764	1771	s	α
1764	1765	.	a
1764	1771	s	a
1764	2263	s	A
1764	2133	s	λ
1764	2133	s	l
1764	2266	s	L
1764	2282	<split-h>	<>
1765	1766	<>	<name>
1765	1765	<>	<aphaerese>
1765	1757	<elision3>	<elision3>
1765	1765	<>	<elision3>
1765	1757	<elision2>	<elision2>
1765	1765	<>	<elision2>
1765	1757	<elision1>	<elision1>
1765	1765	<>	<elision1>
1765	1769	<split-h>	<>
1766	1767	<>	<aphaerese>
1766	1760	<elision3>	<elision3>
1766	1767	<>	<elision3>
1766	1760	<elision2>	<elision2>
1766	1767	<>	<elision2>
1766	1760	<elision1>	<elision1>
1766	1767	<>	<elision1>
1766	1770	<split-h>	<>
1767	1765	<>	<aphaerese>
1767	1757	<elision3>	<elision3>
1767	1765	<>	<elision3>
1767	1757	<elision2>	<elision2>
1767	1765	<>	<elision2>
1767	1757	<elision1>	<elision1>
1767	1765	<>	<elision1>
1767	1768	<split-h>	<>
1768	1769	<>	<aphaerese>
1768	1769	<>	<elision3>
1768	1769	<>	<elision2>
1768	1769	<>	<elision1>
1768	247	<3s>	<>
1769	1770	<>	<name>
1769	1769	<>	<aphaerese>
1769	1769	<>	<elision3>
1769	1769	<>	<elision2>
1769	1769	<>	<elision1>
1769	248	<3s>	<>
1770	1768	<>	<aphaerese>
1770	1768	<>	<elision3>
1770	1768	<>	<elision2>
1770	1768	<>	<elision1>
1770	249	<3s>	<>
1771	1772	.	.
1771	1772	 	 
1771	1772	<~>	<~>
1771	1772	<split-s>	<split-s>
1771	1772	<split-h>	<split-h>
1771	1772	<name2>	<name2>
1771	1942	<>	<name>
1771	1775	<aphaerese>	<aphaerese>
1771	1771	<>	<aphaerese>
1771	1771	<>	<elision3>
1771	1771	<>	<elision2>
1771	1771	<>	<elision1>
1771	1936	.	υ
1771	1936	.	u
1771	1778	.	κ
1771	1936	.	α
1771	1936	.	a
1771	1945	<4s>	<>
1772	1772	.	.
1772	1772	 	 
1772	1772	<~>	<~>
1772	1772	<split-s>	<split-s>
1772	1772	<split-h>	<split-h>
1772	1772	<name2>	<name2>
1772	1773	<>	<name>
1772	1775	<aphaerese>	<aphaerese>
1772	1772	<>	<aphaerese>
1772	1772	<elision3>	<elision3>
1772	1772	<>	<elision3>
1772	1772	<elision2>	<elision2>
1772	1772	<>	<elision2>
1772	1772	<elision1>	<elision1>
1772	1772	<>	<elision1>
1772	1936	.	υ
1772	1936	.	u
1772	1778	.	κ
1772	1936	.	α
1772	1936	.	a
1772	1940	<4s>	<>
1773	1774	.	.
1773	1774	 	 
1773	1774	<~>	<~>
1773	1774	<split-s>	<split-s>
1773	1774	<split-h>	<split-h>
1773	1774	<name2>	<name2>
1773	1777	<aphaerese>	<aphaerese>
1773	1774	<>	<aphaerese>
1773	1774	<elision3>	<elision3>
1773	1774	<>	<elision3>
1773	1774	<elision2>	<elision2>
1773	1774	<>	<elision2>
1773	1774	<elision1>	<elision1>
1773	1774	<>	<elision1>
1773	1938	.	υ
1773	1938	.	u
1773	1780	.	κ
1773	1938	.	α
1773	1938	.	a
1773	1941	<4s>	<>
1774	1772	.	.
1774	1772	 	 
1774	1772	<~>	<~>
1774	1772	<split-s>	<split-s>
1774	1772	<split-h>	<split-h>
1774	1772	<name2>	<name2>
1774	1775	<aphaerese>	<aphaerese>
1774	1772	<>	<aphaerese>
1774	1772	<elision3>	<elision3>
1774	1772	<>	<elision3>
1774	1772	<elision2>	<elision2>
1774	1772	<>	<elision2>
1774	1772	<elision1>	<elision1>
1774	1772	<>	<elision1>
1774	1936	.	υ
1774	1936	.	u
1774	1778	.	κ
1774	1936	.	α
1774	1936	.	a
1774	1939	<4s>	<>
1775	1772	.	.
1775	1772	 	 
1775	1772	<~>	<~>
1775	1772	<split-s>	<split-s>
1775	1772	<split-h>	<split-h>
1775	1772	<name2>	<name2>
1775	1776	<>	<name>
1775	1775	<aphaerese>	<aphaerese>
1775	1775	<>	<aphaerese>
1775	1772	<elision3>	<elision3>
1775	1775	<>	<elision3>
1775	1772	<elision2>	<elision2>
1775	1775	<>	<elision2>
1775	1772	<elision1>	<elision1>
1775	1775	<>	<elision1>
1775	1772	.	υ
1775	1772	.	u
1775	1778	.	κ
1775	1772	.	α
1775	1772	.	a
1775	1927	<4s>	<>
1776	1774	.	.
1776	1774	 	 
1776	1774	<~>	<~>
1776	1774	<split-s>	<split-s>
1776	1774	<split-h>	<split-h>
1776	1774	<name2>	<name2>
1776	1777	<aphaerese>	<aphaerese>
1776	1777	<>	<aphaerese>
1776	1774	<elision3>	<elision3>
1776	1777	<>	<elision3>
1776	1774	<elision2>	<elision2>
1776	1777	<>	<elision2>
1776	1774	<elision1>	<elision1>
1776	1777	<>	<elision1>
1776	1774	.	υ
1776	1774	.	u
1776	1780	.	κ
1776	1774	.	α
1776	1774	.	a
1776	1928	<4s>	<>
1777	1772	.	.
1777	1772	 	 
1777	1772	<~>	<~>
1777	1772	<split-s>	<split-s>
1777	1772	<split-h>	<split-h>
1777	1772	<name2>	<name2>
1777	1775	<aphaerese>	<aphaerese>
1777	1775	<>	<aphaerese>
1777	1772	<elision3>	<elision3>
1777	1775	<>	<elision3>
1777	1772	<elision2>	<elision2>
1777	1775	<>	<elision2>
1777	1772	<elision1>	<elision1>
1777	1775	<>	<elision1>
1777	1772	.	υ
1777	1772	.	u
1777	1778	.	κ
1777	1772	.	α
1777	1772	.	a
1777	1926	<4s>	<>
1778	1779	<>	<name>
1778	1778	<>	<aphaerese>
1778	1781	<elision3>	<elision3>
1778	1778	<>	<elision3>
1778	1781	<elision2>	<elision2>
1778	1778	<>	<elision2>
1778	1781	<elision1>	<elision1>
1778	1778	<>	<elision1>
1778	1924	<4s>	<>
1779	1780	<>	<aphaerese>
1779	1783	<elision3>	<elision3>
1779	1780	<>	<elision3>
1779	1783	<elision2>	<elision2>
1779	1780	<>	<elision2>
1779	1783	<elision1>	<elision1>
1779	1780	<>	<elision1>
1779	1925	<4s>	<>
1780	1778	<>	<aphaerese>
1780	1781	<elision3>	<elision3>
1780	1778	<>	<elision3>
1780	1781	<elision2>	<elision2>
1780	1778	<>	<elision2>
1780	1781	<elision1>	<elision1>
1780	1778	<>	<elision1>
1780	1923	<4s>	<>
1781	1782	<>	<name>
1781	1781	<>	<aphaerese>
1781	1781	<>	<elision3>
1781	1781	<>	<elision2>
1781	1781	<>	<elision1>
1781	1785	<4s>	<>
1782	1783	<>	<aphaerese>
1782	1783	<>	<elision3>
1782	1783	<>	<elision2>
1782	1783	<>	<elision1>
1782	1786	<4s>	<>
1783	1781	<>	<aphaerese>
1783	1781	<>	<elision3>
1783	1781	<>	<elision2>
1783	1781	<>	<elision1>
1783	1784	<4s>	<>
1784	1785	<>	<aphaerese>
1784	1785	<>	<elision3>
1784	1785	<>	<elision2>
1784	1785	<>	<elision1>
1784	264	H	κ
1784	1152	H	k
1784	1156	H	K
1784	1160	H	λ
1784	1788	H	l
1784	1917	H	L
1784	1607	<K>	<>
1785	1786	<>	<name>
1785	1785	<>	<aphaerese>
1785	1785	<>	<elision3>
1785	1785	<>	<elision2>
1785	1785	<>	<elision1>
1785	264	H	κ
1785	1152	H	k
1785	1156	H	K
1785	1160	H	λ
1785	1788	H	l
1785	1917	H	L
1785	1605	<K>	<>
1786	1784	<>	<aphaerese>
1786	1784	<>	<elision3>
1786	1784	<>	<elision2>
1786	1784	<>	<elision1>
1786	1166	H	κ
1786	1170	H	k
1786	1171	H	K
1786	1162	H	λ
1786	1787	H	l
1786	1916	H	L
1786	1606	<K>	<>
1787	1788	<>	<aphaerese>
1787	1788	<>	<elision3>
1787	1788	<>	<elision2>
1787	1788	<>	<elision1>
1787	1791	<~>	<>
1787	984	<l2L>	<>
1788	1789	<>	<name>
1788	1788	<>	<aphaerese>
1788	1788	<>	<elision3>
1788	1788	<>	<elision2>
1788	1788	<>	<elision1>
1788	1792	<~>	<>
1788	982	<l2L>	<>
1789	1787	<>	<aphaerese>
1789	1787	<>	<elision3>
1789	1787	<>	<elision2>
1789	1787	<>	<elision1>
1789	1790	<~>	<>
1789	983	<l2L>	<>
1790	1791	<>	<aphaerese>
1790	1791	<>	<elision3>
1790	1791	<>	<elision2>
1790	1791	<>	<elision1>
1790	1795	h	K
1790	1911	h	L
1791	1792	<>	<aphaerese>
1791	1792	<>	<elision3>
1791	1792	<>	<elision2>
1791	1792	<>	<elision1>
1791	1793	h	K
1791	1908	h	L
1792	1790	<>	<name>
1792	1792	<>	<aphaerese>
1792	1792	<>	<elision3>
1792	1792	<>	<elision2>
1792	1792	<>	<elision1>
1792	1793	h	K
1792	1908	h	L
1793	1794	<>	<name>
1793	1793	<>	<aphaerese>
1793	1793	<>	<elision3>
1793	1793	<>	<elision2>
1793	1793	<>	<elision1>
1793	1796	.	κ
1793	1796	.	λ
1794	1795	<>	<aphaerese>
1794	1795	<>	<elision3>
1794	1795	<>	<elision2>
1794	1795	<>	<elision1>
1794	1798	.	κ
1794	1798	.	λ
1795	1793	<>	<aphaerese>
1795	1793	<>	<elision3>
1795	1793	<>	<elision2>
1795	1793	<>	<elision1>
1795	1796	.	κ
1795	1796	.	λ
1796	1797	<>	<name>
1796	1796	<>	<aphaerese>
1796	1799	<elision3>	<elision3>
1796	1796	<>	<elision3>
1796	1799	<elision2>	<elision2>
1796	1796	<>	<elision2>
1796	1799	<elision1>	<elision1>
1796	1796	<>	<elision1>
1797	1798	<>	<aphaerese>
1797	1802	<elision3>	<elision3>
1797	1798	<>	<elision3>
1797	1802	<elision2>	<elision2>
1797	1798	<>	<elision2>
1797	1802	<elision1>	<elision1>
1797	1798	<>	<elision1>
1798	1796	<>	<aphaerese>
1798	1799	<elision3>	<elision3>
1798	1796	<>	<elision3>
1798	1799	<elision2>	<elision2>
1798	1796	<>	<elision2>
1798	1799	<elision1>	<elision1>
1798	1796	<>	<elision1>
1799	1799	.	.
1799	1800	 	 
1799	1799	<~>	<~>
1799	1799	<split-s>	<split-s>
1799	1799	<split-h>	<split-h>
1799	1799	<name2>	<name2>
1799	1907	<>	<name>
1799	1803	<aphaerese>	<aphaerese>
1799	1799	<>	<aphaerese>
1799	1799	<elision3>	<elision3>
1799	1799	<>	<elision3>
1799	1799	<elision2>	<elision2>
1799	1799	<>	<elision2>
1799	1799	<elision1>	<elision1>
1799	1799	<>	<elision1>
1799	1796	.	υ
1799	1807	s	υ
1799	1796	.	u
1799	1807	s	u
1799	1822	.	κ
1799	1834	s	κ
1799	1840	s	k
1799	1843	s	U
1799	1894	s	K
1799	1796	.	α
1799	1807	s	α
1799	1796	.	a
1799	1807	s	a
1799	1872	s	A
1799	1840	s	λ
1799	1840	s	l
1799	1901	s	L
1800	1799	.	.
1800	1800	 	 
1800	1799	<~>	<~>
1800	1799	<split-s>	<split-s>
1800	1799	<split-h>	<split-h>
1800	1799	<name2>	<name2>
1800	1801	<>	<name>
1800	1803	<aphaerese>	<aphaerese>
1800	1806	<>	<aphaerese>
1800	1799	<elision3>	<elision3>
1800	1806	<>	<elision3>
1800	1799	<elision2>	<elision2>
1800	1806	<>	<elision2>
1800	1799	<elision1>	<elision1>
1800	1806	<>	<elision1>
1800	1796	.	υ
1800	1883	s	υ
1800	1796	.	u
1800	1883	s	u
1800	1822	.	κ
1800	1884	s	κ
1800	1885	s	k
1800	1886	s	U
1800	1888	s	K
1800	1796	.	α
1800	1883	s	α
1800	1796	.	a
1800	1883	s	a
1800	1890	s	A
1800	1885	s	λ
1800	1885	s	l
1800	1891	s	L
1801	1802	.	.
1801	1805	 	 
1801	1802	<~>	<~>
1801	1802	<split-s>	<split-s>
1801	1802	<split-h>	<split-h>
1801	1802	<name2>	<name2>
1801	1893	<aphaerese>	<aphaerese>
1801	1906	<>	<aphaerese>
1801	1802	<elision3>	<elision3>
1801	1906	<>	<elision3>
1801	1802	<elision2>	<elision2>
1801	1906	<>	<elision2>
1801	1802	<elision1>	<elision1>
1801	1906	<>	<elision1>
1801	1798	.	υ
1801	1821	s	υ
1801	1798	.	u
1801	1821	s	u
1801	1824	.	κ
1801	1836	s	κ
1801	1842	s	k
1801	1845	s	U
1801	1848	s	K
1801	1798	.	α
1801	1821	s	α
1801	1798	.	a
1801	1821	s	a
1801	1874	s	A
1801	1842	s	λ
1801	1842	s	l
1801	1877	s	L
1802	1799	.	.
1802	1800	 	 
1802	1799	<~>	<~>
1802	1799	<split-s>	<split-s>
1802	1799	<split-h>	<split-h>
1802	1799	<name2>	<name2>
1802	1803	<aphaerese>	<aphaerese>
1802	1799	<>	<aphaerese>
1802	1799	<elision3>	<elision3>
1802	1799	<>	<elision3>
1802	1799	<elision2>	<elision2>
1802	1799	<>	<elision2>
1802	1799	<elision1>	<elision1>
1802	1799	<>	<elision1>
1802	1796	.	υ
1802	1807	s	υ
1802	1796	.	u
1802	1807	s	u
1802	1822	.	κ
1802	1834	s	κ
1802	1840	s	k
1802	1843	s	U
1802	1894	s	K
1802	1796	.	α
1802	1807	s	α
1802	1796	.	a
1802	1807	s	a
1802	1872	s	A
1802	1840	s	λ
1802	1840	s	l
1802	1901	s	L
1803	1799	.	.
1803	1800	 	 
1803	1799	<~>	<~>
1803	1799	<split-s>	<split-s>
1803	1799	<split-h>	<split-h>
1803	1799	<name2>	<name2>
1803	1804	<>	<name>
1803	1803	<aphaerese>	<aphaerese>
1803	1803	<>	<aphaerese>
1803	1799	<elision3>	<elision3>
1803	1803	<>	<elision3>
1803	1799	<elision2>	<elision2>
1803	1803	<>	<elision2>
1803	1799	<elision1>	<elision1>
1803	1803	<>	<elision1>
1803	1799	.	υ
1803	1799	.	u
1803	1822	.	κ
1803	1834	s	κ
1803	1840	s	k
1803	1843	s	U
1803	1894	s	K
1803	1799	.	α
1803	1799	.	a
1803	1872	s	A
1803	1840	s	λ
1803	1840	s	l
1803	1901	s	L
1804	1802	.	.
1804	1805	 	 
1804	1802	<~>	<~>
1804	1802	<split-s>	<split-s>
1804	1802	<split-h>	<split-h>
1804	1802	<name2>	<name2>
1804	1893	<aphaerese>	<aphaerese>
1804	1893	<>	<aphaerese>
1804	1802	<elision3>	<elision3>
1804	1893	<>	<elision3>
1804	1802	<elision2>	<elision2>
1804	1893	<>	<elision2>
1804	1802	<elision1>	<elision1>
1804	1893	<>	<elision1>
1804	1802	.	υ
1804	1802	.	u
1804	1824	.	κ
1804	1836	s	κ
1804	1842	s	k
1804	1845	s	U
1804	1896	s	K
1804	1802	.	α
1804	1802	.	a
1804	1874	s	A
1804	1842	s	λ
1804	1842	s	l
1804	1903	s	L
1805	1799	.	.
1805	1800	 	 
1805	1799	<~>	<~>
1805	1799	<split-s>	<split-s>
1805	1799	<split-h>	<split-h>
1805	1799	<name2>	<name2>
1805	1803	<aphaerese>	<aphaerese>
1805	1806	<>	<aphaerese>
1805	1799	<elision3>	<elision3>
1805	1806	<>	<elision3>
1805	1799	<elision2>	<elision2>
1805	1806	<>	<elision2>
1805	1799	<elision1>	<elision1>
1805	1806	<>	<elision1>
1805	1796	.	υ
1805	1883	s	υ
1805	1796	.	u
1805	1883	s	u
1805	1822	.	κ
1805	1884	s	κ
1805	1885	s	k
1805	1886	s	U
1805	1888	s	K
1805	1796	.	α
1805	1883	s	α
1805	1796	.	a
1805	1883	s	a
1805	1890	s	A
1805	1885	s	λ
1805	1885	s	l
1805	1891	s	L
1806	1799	.	.
1806	1800	 	 
1806	1799	<~>	<~>
1806	1799	<split-s>	<split-s>
1806	1799	<split-h>	<split-h>
1806	1799	<name2>	<name2>
1806	1801	<>	<name>
1806	1803	<aphaerese>	<aphaerese>
1806	1806	<>	<aphaerese>
1806	1799	<elision3>	<elision3>
1806	1806	<>	<elision3>
1806	1799	<elision2>	<elision2>
1806	1806	<>	<elision2>
1806	1799	<elision1>	<elision1>
1806	1806	<>	<elision1>
1806	1796	.	υ
1806	1807	s	υ
1806	1796	.	u
1806	1807	s	u
1806	1822	.	κ
1806	1834	s	κ
1806	1840	s	k
1806	1843	s	U
1806	1846	s	K
1806	1796	.	α
1806	1807	s	α
1806	1796	.	a
1806	1807	s	a
1806	1872	s	A
1806	1840	s	λ
1806	1840	s	l
1806	1875	s	L
1807	1808	.	.
1807	1808	 	 
1807	1808	<~>	<~>
1807	1808	<split-s>	<split-s>
1807	1808	<split-h>	<split-h>
1807	1808	<name2>	<name2>
1807	1820	<>	<name>
1807	1811	<aphaerese>	<aphaerese>
1807	1807	<>	<aphaerese>
1807	1807	<>	<elision3>
1807	1807	<>	<elision2>
1807	1807	<>	<elision1>
1807	1817	.	υ
1807	1817	.	u
1807	1814	.	κ
1807	1817	.	α
1807	1817	.	a
1807	440	<3s>	<>
1808	1808	.	.
1808	1808	 	 
1808	1808	<~>	<~>
1808	1808	<split-s>	<split-s>
1808	1808	<split-h>	<split-h>
1808	1808	<name2>	<name2>
1808	1809	<>	<name>
1808	1811	<aphaerese>	<aphaerese>
1808	1808	<>	<aphaerese>
1808	1808	<elision3>	<elision3>
1808	1808	<>	<elision3>
1808	1808	<elision2>	<elision2>
1808	1808	<>	<elision2>
1808	1808	<elision1>	<elision1>
1808	1808	<>	<elision1>
1808	1817	.	υ
1808	1817	.	u
1808	1814	.	κ
1808	1817	.	α
1808	1817	.	a
1808	435	<3s>	<>
1809	1810	.	.
1809	1810	 	 
1809	1810	<~>	<~>
1809	1810	<split-s>	<split-s>
1809	1810	<split-h>	<split-h>
1809	1810	<name2>	<name2>
1809	1813	<aphaerese>	<aphaerese>
1809	1810	<>	<aphaerese>
1809	1810	<elision3>	<elision3>
1809	1810	<>	<elision3>
1809	1810	<elision2>	<elision2>
1809	1810	<>	<elision2>
1809	1810	<elision1>	<elision1>
1809	1810	<>	<elision1>
1809	1819	.	υ
1809	1819	.	u
1809	1816	.	κ
1809	1819	.	α
1809	1819	.	a
1809	436	<3s>	<>
1810	1808	.	.
1810	1808	 	 
1810	1808	<~>	<~>
1810	1808	<split-s>	<split-s>
1810	1808	<split-h>	<split-h>
1810	1808	<name2>	<name2>
1810	1811	<aphaerese>	<aphaerese>
1810	1808	<>	<aphaerese>
1810	1808	<elision3>	<elision3>
1810	1808	<>	<elision3>
1810	1808	<elision2>	<elision2>
1810	1808	<>	<elision2>
1810	1808	<elision1>	<elision1>
1810	1808	<>	<elision1>
1810	1817	.	υ
1810	1817	.	u
1810	1814	.	κ
1810	1817	.	α
1810	1817	.	a
1810	434	<3s>	<>
1811	1808	.	.
1811	1808	 	 
1811	1808	<~>	<~>
1811	1808	<split-s>	<split-s>
1811	1808	<split-h>	<split-h>
1811	1808	<name2>	<name2>
1811	1812	<>	<name>
1811	1811	<aphaerese>	<aphaerese>
1811	1811	<>	<aphaerese>
1811	1808	<elision3>	<elision3>
1811	1811	<>	<elision3>
1811	1808	<elision2>	<elision2>
1811	1811	<>	<elision2>
1811	1808	<elision1>	<elision1>
1811	1811	<>	<elision1>
1811	1808	.	υ
1811	1808	.	u
1811	1814	.	κ
1811	1808	.	α
1811	1808	.	a
1811	429	<3s>	<>
1812	1810	.	.
1812	1810	 	 
1812	1810	<~>	<~>
1812	1810	<split-s>	<split-s>
1812	1810	<split-h>	<split-h>
1812	1810	<name2>	<name2>
1812	1813	<aphaerese>	<aphaerese>
1812	1813	<>	<aphaerese>
1812	1810	<elision3>	<elision3>
1812	1813	<>	<elision3>
1812	1810	<elision2>	<elision2>
1812	1813	<>	<elision2>
1812	1810	<elision1>	<elision1>
1812	1813	<>	<elision1>
1812	1810	.	υ
1812	1810	.	u
1812	1816	.	κ
1812	1810	.	α
1812	1810	.	a
1812	430	<3s>	<>
1813	1808	.	.
1813	1808	 	 
1813	1808	<~>	<~>
1813	1808	<split-s>	<split-s>
1813	1808	<split-h>	<split-h>
1813	1808	<name2>	<name2>
1813	1811	<aphaerese>	<aphaerese>
1813	1811	<>	<aphaerese>
1813	1808	<elision3>	<elision3>
1813	1811	<>	<elision3>
1813	1808	<elision2>	<elision2>
1813	1811	<>	<elision2>
1813	1808	<elision1>	<elision1>
1813	1811	<>	<elision1>
1813	1808	.	υ
1813	1808	.	u
1813	1814	.	κ
1813	1808	.	α
1813	1808	.	a
1813	428	<3s>	<>
1814	1815	<>	<name>
1814	1814	<>	<aphaerese>
1814	476	<elision3>	<elision3>
1814	1814	<>	<elision3>
1814	476	<elision2>	<elision2>
1814	1814	<>	<elision2>
1814	476	<elision1>	<elision1>
1814	1814	<>	<elision1>
1814	426	<3s>	<>
1815	1816	<>	<aphaerese>
1815	475	<elision3>	<elision3>
1815	1816	<>	<elision3>
1815	475	<elision2>	<elision2>
1815	1816	<>	<elision2>
1815	475	<elision1>	<elision1>
1815	1816	<>	<elision1>
1815	427	<3s>	<>
1816	1814	<>	<aphaerese>
1816	476	<elision3>	<elision3>
1816	1814	<>	<elision3>
1816	476	<elision2>	<elision2>
1816	1814	<>	<elision2>
1816	476	<elision1>	<elision1>
1816	1814	<>	<elision1>
1816	425	<3s>	<>
1817	1818	<>	<name>
1817	1817	<>	<aphaerese>
1817	1808	<elision3>	<elision3>
1817	1817	<>	<elision3>
1817	1808	<elision2>	<elision2>
1817	1817	<>	<elision2>
1817	1808	<elision1>	<elision1>
1817	1817	<>	<elision1>
1817	284	<3s>	<>
1818	1819	<>	<aphaerese>
1818	1810	<elision3>	<elision3>
1818	1819	<>	<elision3>
1818	1810	<elision2>	<elision2>
1818	1819	<>	<elision2>
1818	1810	<elision1>	<elision1>
1818	1819	<>	<elision1>
1818	285	<3s>	<>
1819	1817	<>	<aphaerese>
1819	1808	<elision3>	<elision3>
1819	1817	<>	<elision3>
1819	1808	<elision2>	<elision2>
1819	1817	<>	<elision2>
1819	1808	<elision1>	<elision1>
1819	1817	<>	<elision1>
1819	283	<3s>	<>
1820	1810	.	.
1820	1810	 	 
1820	1810	<~>	<~>
1820	1810	<split-s>	<split-s>
1820	1810	<split-h>	<split-h>
1820	1810	<name2>	<name2>
1820	1813	<aphaerese>	<aphaerese>
1820	1821	<>	<aphaerese>
1820	1821	<>	<elision3>
1820	1821	<>	<elision2>
1820	1821	<>	<elision1>
1820	1819	.	υ
1820	1819	.	u
1820	1816	.	κ
1820	1819	.	α
1820	1819	.	a
1820	441	<3s>	<>
1821	1808	.	.
1821	1808	 	 
1821	1808	<~>	<~>
1821	1808	<split-s>	<split-s>
1821	1808	<split-h>	<split-h>
1821	1808	<name2>	<name2>
1821	1811	<aphaerese>	<aphaerese>
1821	1807	<>	<aphaerese>
1821	1807	<>	<elision3>
1821	1807	<>	<elision2>
1821	1807	<>	<elision1>
1821	1817	.	υ
1821	1817	.	u
1821	1814	.	κ
1821	1817	.	α
1821	1817	.	a
1821	439	<3s>	<>
1822	1823	<>	<name>
1822	1822	<>	<aphaerese>
1822	1825	<elision3>	<elision3>
1822	1822	<>	<elision3>
1822	1825	<elision2>	<elision2>
1822	1822	<>	<elision2>
1822	1825	<elision1>	<elision1>
1822	1822	<>	<elision1>
1823	1824	<>	<aphaerese>
1823	1827	<elision3>	<elision3>
1823	1824	<>	<elision3>
1823	1827	<elision2>	<elision2>
1823	1824	<>	<elision2>
1823	1827	<elision1>	<elision1>
1823	1824	<>	<elision1>
1824	1822	<>	<aphaerese>
1824	1825	<elision3>	<elision3>
1824	1822	<>	<elision3>
1824	1825	<elision2>	<elision2>
1824	1822	<>	<elision2>
1824	1825	<elision1>	<elision1>
1824	1822	<>	<elision1>
1825	1826	<>	<name>
1825	1825	<>	<aphaerese>
1825	1825	<>	<elision3>
1825	1825	<>	<elision2>
1825	1825	<>	<elision1>
1825	716	s	κ
1825	716	s	k
1825	1828	s	K
1825	716	s	λ
1825	716	s	l
1825	1831	s	L
1826	1827	<>	<aphaerese>
1826	1827	<>	<elision3>
1826	1827	<>	<elision2>
1826	1827	<>	<elision1>
1826	715	s	κ
1826	715	s	k
1826	1830	s	K
1826	715	s	λ
1826	715	s	l
1826	1833	s	L
1827	1825	<>	<aphaerese>
1827	1825	<>	<elision3>
1827	1825	<>	<elision2>
1827	1825	<>	<elision1>
1827	716	s	κ
1827	716	s	k
1827	1828	s	K
1827	716	s	λ
1827	716	s	l
1827	1831	s	L
1828	1829	<>	<name>
1828	1828	<>	<aphaerese>
1828	1828	<>	<elision3>
1828	1828	<>	<elision2>
1828	1828	<>	<elision1>
1828	716	<K2kl>	<>
1829	1830	<>	<aphaerese>
1829	1830	<>	<elision3>
1829	1830	<>	<elision2>
1829	1830	<>	<elision1>
1829	717	<K2kl>	<>
1830	1828	<>	<aphaerese>
1830	1828	<>	<elision3>
1830	1828	<>	<elision2>
1830	1828	<>	<elision1>
1830	715	<K2kl>	<>
1831	1832	<>	<name>
1831	1831	<>	<aphaerese>
1831	1831	<>	<elision3>
1831	1831	<>	<elision2>
1831	1831	<>	<elision1>
1831	716	<L2kl>	<>
1832	1833	<>	<aphaerese>
1832	1833	<>	<elision3>
1832	1833	<>	<elision2>
1832	1833	<>	<elision1>
1832	717	<L2kl>	<>
1833	1831	<>	<aphaerese>
1833	1831	<>	<elision3>
1833	1831	<>	<elision2>
1833	1831	<>	<elision1>
1833	715	<L2kl>	<>
1834	1808	.	.
1834	1808	 	 
1834	1808	<~>	<~>
1834	1808	<split-s>	<split-s>
1834	1808	<split-h>	<split-h>
1834	1808	<name2>	<name2>
1834	1835	<>	<name>
1834	1811	<aphaerese>	<aphaerese>
1834	1834	<>	<aphaerese>
1834	1837	<elision3>	<elision3>
1834	1834	<>	<elision3>
1834	1837	<elision2>	<elision2>
1834	1834	<>	<elision2>
1834	1837	<elision1>	<elision1>
1834	1834	<>	<elision1>
1834	1817	.	υ
1834	1817	.	u
1834	1817	.	κ
1834	1817	.	α
1834	1817	.	a
1834	1817	.	λ
1834	518	<3s>	<>
1835	1810	.	.
1835	1810	 	 
1835	1810	<~>	<~>
1835	1810	<split-s>	<split-s>
1835	1810	<split-h>	<split-h>
1835	1810	<name2>	<name2>
1835	1813	<aphaerese>	<aphaerese>
1835	1836	<>	<aphaerese>
1835	1839	<elision3>	<elision3>
1835	1836	<>	<elision3>
1835	1839	<elision2>	<elision2>
1835	1836	<>	<elision2>
1835	1839	<elision1>	<elision1>
1835	1836	<>	<elision1>
1835	1819	.	υ
1835	1819	.	u
1835	1819	.	κ
1835	1819	.	α
1835	1819	.	a
1835	1819	.	λ
1835	519	<3s>	<>
1836	1808	.	.
1836	1808	 	 
1836	1808	<~>	<~>
1836	1808	<split-s>	<split-s>
1836	1808	<split-h>	<split-h>
1836	1808	<name2>	<name2>
1836	1811	<aphaerese>	<aphaerese>
1836	1834	<>	<aphaerese>
1836	1837	<elision3>	<elision3>
1836	1834	<>	<elision3>
1836	1837	<elision2>	<elision2>
1836	1834	<>	<elision2>
1836	1837	<elision1>	<elision1>
1836	1834	<>	<elision1>
1836	1817	.	υ
1836	1817	.	u
1836	1817	.	κ
1836	1817	.	α
1836	1817	.	a
1836	1817	.	λ
1836	517	<3s>	<>
1837	1808	.	.
1837	1808	 	 
1837	1808	<~>	<~>
1837	1808	<split-s>	<split-s>
1837	1808	<split-h>	<split-h>
1837	1808	<name2>	<name2>
1837	1838	<>	<name>
1837	1811	<aphaerese>	<aphaerese>
1837	1837	<>	<aphaerese>
1837	1808	<elision3>	<elision3>
1837	1837	<>	<elision3>
1837	1808	<elision2>	<elision2>
1837	1837	<>	<elision2>
1837	1808	<elision1>	<elision1>
1837	1837	<>	<elision1>
1837	1817	.	υ
1837	1817	.	u
1837	1814	.	κ
1837	1817	.	α
1837	1817	.	a
1837	488	<3s>	<>
1838	1810	.	.
1838	1810	 	 
1838	1810	<~>	<~>
1838	1810	<split-s>	<split-s>
1838	1810	<split-h>	<split-h>
1838	1810	<name2>	<name2>
1838	1813	<aphaerese>	<aphaerese>
1838	1839	<>	<aphaerese>
1838	1810	<elision3>	<elision3>
1838	1839	<>	<elision3>
1838	1810	<elision2>	<elision2>
1838	1839	<>	<elision2>
1838	1810	<elision1>	<elision1>
1838	1839	<>	<elision1>
1838	1819	.	υ
1838	1819	.	u
1838	1816	.	κ
1838	1819	.	α
1838	1819	.	a
1838	489	<3s>	<>
1839	1808	.	.
1839	1808	 	 
1839	1808	<~>	<~>
1839	1808	<split-s>	<split-s>
1839	1808	<split-h>	<split-h>
1839	1808	<name2>	<name2>
1839	1811	<aphaerese>	<aphaerese>
1839	1837	<>	<aphaerese>
1839	1808	<elision3>	<elision3>
1839	1837	<>	<elision3>
1839	1808	<elision2>	<elision2>
1839	1837	<>	<elision2>
1839	1808	<elision1>	<elision1>
1839	1837	<>	<elision1>
1839	1817	.	υ
1839	1817	.	u
1839	1814	.	κ
1839	1817	.	α
1839	1817	.	a
1839	487	<3s>	<>
1840	1808	.	.
1840	1808	 	 
1840	1808	<~>	<~>
1840	1808	<split-s>	<split-s>
1840	1808	<split-h>	<split-h>
1840	1808	<name2>	<name2>
1840	1841	<>	<name>
1840	1811	<aphaerese>	<aphaerese>
1840	1840	<>	<aphaerese>
1840	1808	<elision3>	<elision3>
1840	1840	<>	<elision3>
1840	1808	<elision2>	<elision2>
1840	1840	<>	<elision2>
1840	1808	<elision1>	<elision1>
1840	1840	<>	<elision1>
1840	1817	.	υ
1840	1817	.	u
1840	1817	.	κ
1840	1817	.	α
1840	1817	.	a
1840	1817	.	λ
1840	527	<3s>	<>
1841	1810	.	.
1841	1810	 	 
1841	1810	<~>	<~>
1841	1810	<split-s>	<split-s>
1841	1810	<split-h>	<split-h>
1841	1810	<name2>	<name2>
1841	1813	<aphaerese>	<aphaerese>
1841	1842	<>	<aphaerese>
1841	1810	<elision3>	<elision3>
1841	1842	<>	<elision3>
1841	1810	<elision2>	<elision2>
1841	1842	<>	<elision2>
1841	1810	<elision1>	<elision1>
1841	1842	<>	<elision1>
1841	1819	.	υ
1841	1819	.	u
1841	1819	.	κ
1841	1819	.	α
1841	1819	.	a
1841	1819	.	λ
1841	528	<3s>	<>
1842	1808	.	.
1842	1808	 	 
1842	1808	<~>	<~>
1842	1808	<split-s>	<split-s>
1842	1808	<split-h>	<split-h>
1842	1808	<name2>	<name2>
1842	1811	<aphaerese>	<aphaerese>
1842	1840	<>	<aphaerese>
1842	1808	<elision3>	<elision3>
1842	1840	<>	<elision3>
1842	1808	<elision2>	<elision2>
1842	1840	<>	<elision2>
1842	1808	<elision1>	<elision1>
1842	1840	<>	<elision1>
1842	1817	.	υ
1842	1817	.	u
1842	1817	.	κ
1842	1817	.	α
1842	1817	.	a
1842	1817	.	λ
1842	526	<3s>	<>
1843	1844	<>	<name>
1843	1843	<>	<aphaerese>
1843	1843	<>	<elision3>
1843	1843	<>	<elision2>
1843	1843	<>	<elision1>
1843	1808	<U2kl>	<>
1844	1845	<>	<aphaerese>
1844	1845	<>	<elision3>
1844	1845	<>	<elision2>
1844	1845	<>	<elision1>
1844	1809	<U2kl>	<>
1845	1843	<>	<aphaerese>
1845	1843	<>	<elision3>
1845	1843	<>	<elision2>
1845	1843	<>	<elision1>
1845	1810	<U2kl>	<>
1846	806	<name>	<name>
1846	1847	<>	<name>
1846	1849	<>	<aphaerese>
1846	1849	<>	<elision3>
1846	1849	<>	<elision2>
1846	1849	<>	<elision1>
1846	617	<3s>	<>
1846	1850	<A2kl>	<>
1846	1859	<L2kl>	<>
1846	1871	<K2kl>	<>
1847	1848	<>	<aphaerese>
1847	1848	<>	<elision3>
1847	1848	<>	<elision2>
1847	1848	<>	<elision1>
1847	1851	<A2kl>	<>
1847	1860	<L2kl>	<>
1847	1869	<K2kl>	<>
1848	1849	<>	<aphaerese>
1848	1849	<>	<elision3>
1848	1849	<>	<elision2>
1848	1849	<>	<elision1>
1848	1852	<A2kl>	<>
1848	1861	<L2kl>	<>
1848	1870	<K2kl>	<>
1849	1847	<>	<name>
1849	1849	<>	<aphaerese>
1849	1849	<>	<elision3>
1849	1849	<>	<elision2>
1849	1849	<>	<elision1>
1849	1850	<A2kl>	<>
1849	1859	<L2kl>	<>
1849	1868	<K2kl>	<>
1850	1851	<>	<name>
1850	1850	<>	<aphaerese>
1850	1850	<>	<elision3>
1850	1850	<>	<elision2>
1850	1850	<>	<elision1>
1850	1853	.	κ
1850	1853	.	λ
1850	576	<3s>	<>
1851	1852	<>	<aphaerese>
1851	1852	<>	<elision3>
1851	1852	<>	<elision2>
1851	1852	<>	<elision1>
1851	1855	.	κ
1851	1855	.	λ
1851	577	<3s>	<>
1852	1850	<>	<aphaerese>
1852	1850	<>	<elision3>
1852	1850	<>	<elision2>
1852	1850	<>	<elision1>
1852	1853	.	κ
1852	1853	.	λ
1852	575	<3s>	<>
1853	1854	<>	<name>
1853	1853	<>	<aphaerese>
1853	1856	<elision3>	<elision3>
1853	1853	<>	<elision3>
1853	1856	<elision2>	<elision2>
1853	1853	<>	<elision2>
1853	1856	<elision1>	<elision1>
1853	1853	<>	<elision1>
1853	570	<3s>	<>
1854	1855	<>	<aphaerese>
1854	1858	<elision3>	<elision3>
1854	1855	<>	<elision3>
1854	1858	<elision2>	<elision2>
1854	1855	<>	<elision2>
1854	1858	<elision1>	<elision1>
1854	1855	<>	<elision1>
1854	571	<3s>	<>
1855	1853	<>	<aphaerese>
1855	1856	<elision3>	<elision3>
1855	1853	<>	<elision3>
1855	1856	<elision2>	<elision2>
1855	1853	<>	<elision2>
1855	1856	<elision1>	<elision1>
1855	1853	<>	<elision1>
1855	569	<3s>	<>
1856	1808	.	.
1856	1808	 	 
1856	1808	<~>	<~>
1856	1808	<split-s>	<split-s>
1856	1808	<split-h>	<split-h>
1856	1808	<name2>	<name2>
1856	1857	<>	<name>
1856	1811	<aphaerese>	<aphaerese>
1856	1856	<>	<aphaerese>
1856	1808	<elision3>	<elision3>
1856	1856	<>	<elision3>
1856	1808	<elision2>	<elision2>
1856	1856	<>	<elision2>
1856	1808	<elision1>	<elision1>
1856	1856	<>	<elision1>
1856	1817	.	υ
1856	1817	.	u
1856	1817	.	α
1856	1817	.	a
1856	552	<3s>	<>
1857	1810	.	.
1857	1810	 	 
1857	1810	<~>	<~>
1857	1810	<split-s>	<split-s>
1857	1810	<split-h>	<split-h>
1857	1810	<name2>	<name2>
1857	1813	<aphaerese>	<aphaerese>
1857	1858	<>	<aphaerese>
1857	1810	<elision3>	<elision3>
1857	1858	<>	<elision3>
1857	1810	<elision2>	<elision2>
1857	1858	<>	<elision2>
1857	1810	<elision1>	<elision1>
1857	1858	<>	<elision1>
1857	1819	.	υ
1857	1819	.	u
1857	1819	.	α
1857	1819	.	a
1857	553	<3s>	<>
1858	1808	.	.
1858	1808	 	 
1858	1808	<~>	<~>
1858	1808	<split-s>	<split-s>
1858	1808	<split-h>	<split-h>
1858	1808	<name2>	<name2>
1858	1811	<aphaerese>	<aphaerese>
1858	1856	<>	<aphaerese>
1858	1808	<elision3>	<elision3>
1858	1856	<>	<elision3>
1858	1808	<elision2>	<elision2>
1858	1856	<>	<elision2>
1858	1808	<elision1>	<elision1>
1858	1856	<>	<elision1>
1858	1817	.	υ
1858	1817	.	u
1858	1817	.	α
1858	1817	.	a
1858	551	<3s>	<>
1859	1860	<>	<name>
1859	1859	<>	<aphaerese>
1859	1859	<>	<elision3>
1859	1859	<>	<elision2>
1859	1859	<>	<elision1>
1859	1862	.	κ
1859	1862	.	λ
1859	603	<3s>	<>
1860	1861	<>	<aphaerese>
1860	1861	<>	<elision3>
1860	1861	<>	<elision2>
1860	1861	<>	<elision1>
1860	1864	.	κ
1860	1864	.	λ
1860	604	<3s>	<>
1861	1859	<>	<aphaerese>
1861	1859	<>	<elision3>
1861	1859	<>	<elision2>
1861	1859	<>	<elision1>
1861	1862	.	κ
1861	1862	.	λ
1861	602	<3s>	<>
1862	1863	<>	<name>
1862	1862	<>	<aphaerese>
1862	1865	<elision3>	<elision3>
1862	1862	<>	<elision3>
1862	1865	<elision2>	<elision2>
1862	1862	<>	<elision2>
1862	1865	<elision1>	<elision1>
1862	1862	<>	<elision1>
1862	597	<3s>	<>
1863	1864	<>	<aphaerese>
1863	1867	<elision3>	<elision3>
1863	1864	<>	<elision3>
1863	1867	<elision2>	<elision2>
1863	1864	<>	<elision2>
1863	1867	<elision1>	<elision1>
1863	1864	<>	<elision1>
1863	598	<3s>	<>
1864	1862	<>	<aphaerese>
1864	1865	<elision3>	<elision3>
1864	1862	<>	<elision3>
1864	1865	<elision2>	<elision2>
1864	1862	<>	<elision2>
1864	1865	<elision1>	<elision1>
1864	1862	<>	<elision1>
1864	596	<3s>	<>
1865	1866	<>	<name>
1865	1865	<>	<aphaerese>
1865	1865	<>	<elision3>
1865	1865	<>	<elision2>
1865	1865	<>	<elision1>
1865	1814	.	κ
1865	591	<3s>	<>
1866	1867	<>	<aphaerese>
1866	1867	<>	<elision3>
1866	1867	<>	<elision2>
1866	1867	<>	<elision1>
1866	1816	.	κ
1866	592	<3s>	<>
1867	1865	<>	<aphaerese>
1867	1865	<>	<elision3>
1867	1865	<>	<elision2>
1867	1865	<>	<elision1>
1867	1814	.	κ
1867	590	<3s>	<>
1868	1808	.	.
1868	1808	 	 
1868	1808	<~>	<~>
1868	1808	<split-s>	<split-s>
1868	1808	<split-h>	<split-h>
1868	1808	<name2>	<name2>
1868	1869	<>	<name>
1868	1811	<aphaerese>	<aphaerese>
1868	1868	<>	<aphaerese>
1868	1808	<elision3>	<elision3>
1868	1868	<>	<elision3>
1868	1808	<elision2>	<elision2>
1868	1868	<>	<elision2>
1868	1808	<elision1>	<elision1>
1868	1868	<>	<elision1>
1868	1817	.	υ
1868	1817	.	u
1868	1817	.	α
1868	1817	.	a
1868	612	<3s>	<>
1869	1810	.	.
1869	1810	 	 
1869	1810	<~>	<~>
1869	1810	<split-s>	<split-s>
1869	1810	<split-h>	<split-h>
1869	1810	<name2>	<name2>
1869	1813	<aphaerese>	<aphaerese>
1869	1870	<>	<aphaerese>
1869	1810	<elision3>	<elision3>
1869	1870	<>	<elision3>
1869	1810	<elision2>	<elision2>
1869	1870	<>	<elision2>
1869	1810	<elision1>	<elision1>
1869	1870	<>	<elision1>
1869	1819	.	υ
1869	1819	.	u
1869	1819	.	α
1869	1819	.	a
1869	613	<3s>	<>
1870	1808	.	.
1870	1808	 	 
1870	1808	<~>	<~>
1870	1808	<split-s>	<split-s>
1870	1808	<split-h>	<split-h>
1870	1808	<name2>	<name2>
1870	1811	<aphaerese>	<aphaerese>
1870	1868	<>	<aphaerese>
1870	1808	<elision3>	<elision3>
1870	1868	<>	<elision3>
1870	1808	<elision2>	<elision2>
1870	1868	<>	<elision2>
1870	1808	<elision1>	<elision1>
1870	1868	<>	<elision1>
1870	1817	.	υ
1870	1817	.	u
1870	1817	.	α
1870	1817	.	a
1870	611	<3s>	<>
1871	1808	.	.
1871	1808	 	 
1871	1808	<~>	<~>
1871	1808	<split-s>	<split-s>
1871	1808	<split-h>	<split-h>
1871	1808	<name2>	<name2>
1871	806	<name2>	<name>
1871	1869	<>	<name>
1871	1811	<aphaerese>	<aphaerese>
1871	1868	<>	<aphaerese>
1871	1808	<elision3>	<elision3>
1871	1868	<>	<elision3>
1871	1808	<elision2>	<elision2>
1871	1868	<>	<elision2>
1871	1808	<elision1>	<elision1>
1871	1868	<>	<elision1>
1871	1817	.	υ
1871	1817	.	u
1871	1817	.	α
1871	1817	.	a
1871	620	<3s>	<>
1872	1873	<>	<name>
1872	1872	<>	<aphaerese>
1872	1872	<>	<elision3>
1872	1872	<>	<elision2>
1872	1872	<>	<elision1>
1872	1808	<A2kl>	<>
1873	1874	<>	<aphaerese>
1873	1874	<>	<elision3>
1873	1874	<>	<elision2>
1873	1874	<>	<elision1>
1873	1809	<A2kl>	<>
1874	1872	<>	<aphaerese>
1874	1872	<>	<elision3>
1874	1872	<>	<elision2>
1874	1872	<>	<elision1>
1874	1810	<A2kl>	<>
1875	806	<name>	<name>
1875	1876	<>	<name>
1875	1878	<>	<aphaerese>
1875	1878	<>	<elision3>
1875	1878	<>	<elision2>
1875	1878	<>	<elision1>
1875	617	<3s>	<>
1875	1850	<A2kl>	<>
1875	1882	<L2kl>	<>
1876	1877	<>	<aphaerese>
1876	1877	<>	<elision3>
1876	1877	<>	<elision2>
1876	1877	<>	<elision1>
1876	1851	<A2kl>	<>
1876	1880	<L2kl>	<>
1877	1878	<>	<aphaerese>
1877	1878	<>	<elision3>
1877	1878	<>	<elision2>
1877	1878	<>	<elision1>
1877	1852	<A2kl>	<>
1877	1881	<L2kl>	<>
1878	1876	<>	<name>
1878	1878	<>	<aphaerese>
1878	1878	<>	<elision3>
1878	1878	<>	<elision2>
1878	1878	<>	<elision1>
1878	1850	<A2kl>	<>
1878	1879	<L2kl>	<>
1879	1808	.	.
1879	1808	 	 
1879	1808	<~>	<~>
1879	1808	<split-s>	<split-s>
1879	1808	<split-h>	<split-h>
1879	1808	<name2>	<name2>
1879	1880	<>	<name>
1879	1811	<aphaerese>	<aphaerese>
1879	1879	<>	<aphaerese>
1879	1808	<elision3>	<elision3>
1879	1879	<>	<elision3>
1879	1808	<elision2>	<elision2>
1879	1879	<>	<elision2>
1879	1808	<elision1>	<elision1>
1879	1879	<>	<elision1>
1879	1817	.	υ
1879	1817	.	u
1879	1862	.	κ
1879	1817	.	α
1879	1817	.	a
1879	1862	.	λ
1879	633	<3s>	<>
1880	1810	.	.
1880	1810	 	 
1880	1810	<~>	<~>
1880	1810	<split-s>	<split-s>
1880	1810	<split-h>	<split-h>
1880	1810	<name2>	<name2>
1880	1813	<aphaerese>	<aphaerese>
1880	1881	<>	<aphaerese>
1880	1810	<elision3>	<elision3>
1880	1881	<>	<elision3>
1880	1810	<elision2>	<elision2>
1880	1881	<>	<elision2>
1880	1810	<elision1>	<elision1>
1880	1881	<>	<elision1>
1880	1819	.	υ
1880	1819	.	u
1880	1864	.	κ
1880	1819	.	α
1880	1819	.	a
1880	1864	.	λ
1880	634	<3s>	<>
1881	1808	.	.
1881	1808	 	 
1881	1808	<~>	<~>
1881	1808	<split-s>	<split-s>
1881	1808	<split-h>	<split-h>
1881	1808	<name2>	<name2>
1881	1811	<aphaerese>	<aphaerese>
1881	1879	<>	<aphaerese>
1881	1808	<elision3>	<elision3>
1881	1879	<>	<elision3>
1881	1808	<elision2>	<elision2>
1881	1879	<>	<elision2>
1881	1808	<elision1>	<elision1>
1881	1879	<>	<elision1>
1881	1817	.	υ
1881	1817	.	u
1881	1862	.	κ
1881	1817	.	α
1881	1817	.	a
1881	1862	.	λ
1881	632	<3s>	<>
1882	1808	.	.
1882	1808	 	 
1882	1808	<~>	<~>
1882	1808	<split-s>	<split-s>
1882	1808	<split-h>	<split-h>
1882	1808	<name2>	<name2>
1882	806	<name2>	<name>
1882	1880	<>	<name>
1882	1811	<aphaerese>	<aphaerese>
1882	1879	<>	<aphaerese>
1882	1808	<elision3>	<elision3>
1882	1879	<>	<elision3>
1882	1808	<elision2>	<elision2>
1882	1879	<>	<elision2>
1882	1808	<elision1>	<elision1>
1882	1879	<>	<elision1>
1882	1817	.	υ
1882	1817	.	u
1882	1862	.	κ
1882	1817	.	α
1882	1817	.	a
1882	1862	.	λ
1882	639	<3s>	<>
1883	1808	.	.
1883	1808	 	 
1883	1808	<~>	<~>
1883	1808	<split-s>	<split-s>
1883	1808	<split-h>	<split-h>
1883	1808	<name2>	<name2>
1883	1820	<>	<name>
1883	1811	<aphaerese>	<aphaerese>
1883	1807	<>	<aphaerese>
1883	1807	<>	<elision3>
1883	1807	<>	<elision2>
1883	1807	<>	<elision1>
1883	1817	.	υ
1883	1817	.	u
1883	1814	.	κ
1883	1817	.	α
1883	1817	.	a
1883	645	<3s>	<>
1884	1808	.	.
1884	1808	 	 
1884	1808	<~>	<~>
1884	1808	<split-s>	<split-s>
1884	1808	<split-h>	<split-h>
1884	1808	<name2>	<name2>
1884	1835	<>	<name>
1884	1811	<aphaerese>	<aphaerese>
1884	1834	<>	<aphaerese>
1884	1837	<elision3>	<elision3>
1884	1834	<>	<elision3>
1884	1837	<elision2>	<elision2>
1884	1834	<>	<elision2>
1884	1837	<elision1>	<elision1>
1884	1834	<>	<elision1>
1884	1817	.	υ
1884	1817	.	u
1884	1817	.	κ
1884	1817	.	α
1884	1817	.	a
1884	1817	.	λ
1884	648	<3s>	<>
1885	1808	.	.
1885	1808	 	 
1885	1808	<~>	<~>
1885	1808	<split-s>	<split-s>
1885	1808	<split-h>	<split-h>
1885	1808	<name2>	<name2>
1885	1841	<>	<name>
1885	1811	<aphaerese>	<aphaerese>
1885	1840	<>	<aphaerese>
1885	1808	<elision3>	<elision3>
1885	1840	<>	<elision3>
1885	1808	<elision2>	<elision2>
1885	1840	<>	<elision2>
1885	1808	<elision1>	<elision1>
1885	1840	<>	<elision1>
1885	1817	.	υ
1885	1817	.	u
1885	1817	.	κ
1885	1817	.	α
1885	1817	.	a
1885	1817	.	λ
1885	651	<3s>	<>
1886	1844	<>	<name>
1886	1843	<>	<aphaerese>
1886	1843	<>	<elision3>
1886	1843	<>	<elision2>
1886	1843	<>	<elision1>
1886	1887	<U2kl>	<>
1887	1808	.	.
1887	1808	 	 
1887	1808	<~>	<~>
1887	1808	<split-s>	<split-s>
1887	1808	<split-h>	<split-h>
1887	1808	<name2>	<name2>
1887	1809	<>	<name>
1887	1811	<aphaerese>	<aphaerese>
1887	1808	<>	<aphaerese>
1887	1808	<elision3>	<elision3>
1887	1808	<>	<elision3>
1887	1808	<elision2>	<elision2>
1887	1808	<>	<elision2>
1887	1808	<elision1>	<elision1>
1887	1808	<>	<elision1>
1887	1817	.	υ
1887	1817	.	u
1887	1814	.	κ
1887	1817	.	α
1887	1817	.	a
1887	655	<3s>	<>
1888	806	<name>	<name>
1888	1847	<>	<name>
1888	1849	<>	<aphaerese>
1888	1849	<>	<elision3>
1888	1849	<>	<elision2>
1888	1849	<>	<elision1>
1888	617	<3s>	<>
1888	1850	<A2kl>	<>
1888	1859	<L2kl>	<>
1888	1889	<K2kl>	<>
1889	1808	.	.
1889	1808	 	 
1889	1808	<~>	<~>
1889	1808	<split-s>	<split-s>
1889	1808	<split-h>	<split-h>
1889	1808	<name2>	<name2>
1889	806	<name2>	<name>
1889	1869	<>	<name>
1889	1811	<aphaerese>	<aphaerese>
1889	1868	<>	<aphaerese>
1889	1808	<elision3>	<elision3>
1889	1868	<>	<elision3>
1889	1808	<elision2>	<elision2>
1889	1868	<>	<elision2>
1889	1808	<elision1>	<elision1>
1889	1868	<>	<elision1>
1889	1817	.	υ
1889	1817	.	u
1889	1817	.	α
1889	1817	.	a
1889	659	<3s>	<>
1890	1873	<>	<name>
1890	1872	<>	<aphaerese>
1890	1872	<>	<elision3>
1890	1872	<>	<elision2>
1890	1872	<>	<elision1>
1890	1887	<A2kl>	<>
1891	806	<name>	<name>
1891	1876	<>	<name>
1891	1878	<>	<aphaerese>
1891	1878	<>	<elision3>
1891	1878	<>	<elision2>
1891	1878	<>	<elision1>
1891	617	<3s>	<>
1891	1850	<A2kl>	<>
1891	1892	<L2kl>	<>
1892	1808	.	.
1892	1808	 	 
1892	1808	<~>	<~>
1892	1808	<split-s>	<split-s>
1892	1808	<split-h>	<split-h>
1892	1808	<name2>	<name2>
1892	806	<name2>	<name>
1892	1880	<>	<name>
1892	1811	<aphaerese>	<aphaerese>
1892	1879	<>	<aphaerese>
1892	1808	<elision3>	<elision3>
1892	1879	<>	<elision3>
1892	1808	<elision2>	<elision2>
1892	1879	<>	<elision2>
1892	1808	<elision1>	<elision1>
1892	1879	<>	<elision1>
1892	1817	.	υ
1892	1817	.	u
1892	1862	.	κ
1892	1817	.	α
1892	1817	.	a
1892	1862	.	λ
1892	664	<3s>	<>
1893	1799	.	.
1893	1800	 	 
1893	1799	<~>	<~>
1893	1799	<split-s>	<split-s>
1893	1799	<split-h>	<split-h>
1893	1799	<name2>	<name2>
1893	1803	<aphaerese>	<aphaerese>
1893	1803	<>	<aphaerese>
1893	1799	<elision3>	<elision3>
1893	1803	<>	<elision3>
1893	1799	<elision2>	<elision2>
1893	1803	<>	<elision2>
1893	1799	<elision1>	<elision1>
1893	1803	<>	<elision1>
1893	1799	.	υ
1893	1799	.	u
1893	1822	.	κ
1893	1834	s	κ
1893	1840	s	k
1893	1843	s	U
1893	1894	s	K
1893	1799	.	α
1893	1799	.	a
1893	1872	s	A
1893	1840	s	λ
1893	1840	s	l
1893	1901	s	L
1894	806	<name>	<name>
1894	1895	<>	<name>
1894	1897	<>	<aphaerese>
1894	1897	<>	<elision3>
1894	1897	<>	<elision2>
1894	1897	<>	<elision1>
1894	617	<3s>	<>
1894	1898	<L2kl>	<>
1894	1871	<K2kl>	<>
1895	1896	<>	<aphaerese>
1895	1896	<>	<elision3>
1895	1896	<>	<elision2>
1895	1896	<>	<elision1>
1895	1899	<L2kl>	<>
1895	1869	<K2kl>	<>
1896	1897	<>	<aphaerese>
1896	1897	<>	<elision3>
1896	1897	<>	<elision2>
1896	1897	<>	<elision1>
1896	1900	<L2kl>	<>
1896	1870	<K2kl>	<>
1897	1895	<>	<name>
1897	1897	<>	<aphaerese>
1897	1897	<>	<elision3>
1897	1897	<>	<elision2>
1897	1897	<>	<elision1>
1897	1898	<L2kl>	<>
1897	1868	<K2kl>	<>
1898	1899	<>	<name>
1898	1898	<>	<aphaerese>
1898	1898	<>	<elision3>
1898	1898	<>	<elision2>
1898	1898	<>	<elision1>
1898	1817	.	κ
1898	1817	.	λ
1898	675	<3s>	<>
1899	1900	<>	<aphaerese>
1899	1900	<>	<elision3>
1899	1900	<>	<elision2>
1899	1900	<>	<elision1>
1899	1819	.	κ
1899	1819	.	λ
1899	676	<3s>	<>
1900	1898	<>	<aphaerese>
1900	1898	<>	<elision3>
1900	1898	<>	<elision2>
1900	1898	<>	<elision1>
1900	1817	.	κ
1900	1817	.	λ
1900	674	<3s>	<>
1901	806	<name>	<name>
1901	1902	<>	<name>
1901	1904	<>	<aphaerese>
1901	1904	<>	<elision3>
1901	1904	<>	<elision2>
1901	1904	<>	<elision1>
1901	617	<3s>	<>
1901	1905	<L2kl>	<>
1902	1903	<>	<aphaerese>
1902	1903	<>	<elision3>
1902	1903	<>	<elision2>
1902	1903	<>	<elision1>
1902	1841	<L2kl>	<>
1903	1904	<>	<aphaerese>
1903	1904	<>	<elision3>
1903	1904	<>	<elision2>
1903	1904	<>	<elision1>
1903	1842	<L2kl>	<>
1904	1902	<>	<name>
1904	1904	<>	<aphaerese>
1904	1904	<>	<elision3>
1904	1904	<>	<elision2>
1904	1904	<>	<elision1>
1904	1840	<L2kl>	<>
1905	1808	.	.
1905	1808	 	 
1905	1808	<~>	<~>
1905	1808	<split-s>	<split-s>
1905	1808	<split-h>	<split-h>
1905	1808	<name2>	<name2>
1905	806	<name2>	<name>
1905	1841	<>	<name>
1905	1811	<aphaerese>	<aphaerese>
1905	1840	<>	<aphaerese>
1905	1808	<elision3>	<elision3>
1905	1840	<>	<elision3>
1905	1808	<elision2>	<elision2>
1905	1840	<>	<elision2>
1905	1808	<elision1>	<elision1>
1905	1840	<>	<elision1>
1905	1817	.	υ
1905	1817	.	u
1905	1817	.	κ
1905	1817	.	α
1905	1817	.	a
1905	1817	.	λ
1905	685	<3s>	<>
1906	1799	.	.
1906	1800	 	 
1906	1799	<~>	<~>
1906	1799	<split-s>	<split-s>
1906	1799	<split-h>	<split-h>
1906	1799	<name2>	<name2>
1906	1803	<aphaerese>	<aphaerese>
1906	1806	<>	<aphaerese>
1906	1799	<elision3>	<elision3>
1906	1806	<>	<elision3>
1906	1799	<elision2>	<elision2>
1906	1806	<>	<elision2>
1906	1799	<elision1>	<elision1>
1906	1806	<>	<elision1>
1906	1796	.	υ
1906	1807	s	υ
1906	1796	.	u
1906	1807	s	u
1906	1822	.	κ
1906	1834	s	κ
1906	1840	s	k
1906	1843	s	U
1906	1846	s	K
1906	1796	.	α
1906	1807	s	α
1906	1796	.	a
1906	1807	s	a
1906	1872	s	A
1906	1840	s	λ
1906	1840	s	l
1906	1875	s	L
1907	1802	.	.
1907	1805	 	 
1907	1802	<~>	<~>
1907	1802	<split-s>	<split-s>
1907	1802	<split-h>	<split-h>
1907	1802	<name2>	<name2>
1907	1893	<aphaerese>	<aphaerese>
1907	1802	<>	<aphaerese>
1907	1802	<elision3>	<elision3>
1907	1802	<>	<elision3>
1907	1802	<elision2>	<elision2>
1907	1802	<>	<elision2>
1907	1802	<elision1>	<elision1>
1907	1802	<>	<elision1>
1907	1798	.	υ
1907	1821	s	υ
1907	1798	.	u
1907	1821	s	u
1907	1824	.	κ
1907	1836	s	κ
1907	1842	s	k
1907	1845	s	U
1907	1896	s	K
1907	1798	.	α
1907	1821	s	α
1907	1798	.	a
1907	1821	s	a
1907	1874	s	A
1907	1842	s	λ
1907	1842	s	l
1907	1903	s	L
1908	1799	.	.
1908	1800	 	 
1908	1799	<~>	<~>
1908	1799	<split-s>	<split-s>
1908	1799	<split-h>	<split-h>
1908	1799	<name2>	<name2>
1908	1909	<name2>	<name>
1908	1910	<>	<name>
1908	1803	<aphaerese>	<aphaerese>
1908	1912	<>	<aphaerese>
1908	1799	<elision3>	<elision3>
1908	1912	<>	<elision3>
1908	1799	<elision2>	<elision2>
1908	1912	<>	<elision2>
1908	1799	<elision1>	<elision1>
1908	1912	<>	<elision1>
1908	1796	.	υ
1908	1807	s	υ
1908	1796	.	u
1908	1807	s	u
1908	1796	.	κ
1908	1913	s	κ
1908	1840	s	k
1908	1843	s	U
1908	1894	s	K
1908	1796	.	α
1908	1807	s	α
1908	1796	.	a
1908	1807	s	a
1908	1872	s	A
1908	1796	.	λ
1908	1913	s	λ
1908	1840	s	l
1908	1901	s	L
1909	1896	s	k
1909	1903	s	l
1910	1802	.	.
1910	1805	 	 
1910	1802	<~>	<~>
1910	1802	<split-s>	<split-s>
1910	1802	<split-h>	<split-h>
1910	1802	<name2>	<name2>
1910	1893	<aphaerese>	<aphaerese>
1910	1911	<>	<aphaerese>
1910	1802	<elision3>	<elision3>
1910	1911	<>	<elision3>
1910	1802	<elision2>	<elision2>
1910	1911	<>	<elision2>
1910	1802	<elision1>	<elision1>
1910	1911	<>	<elision1>
1910	1798	.	υ
1910	1821	s	υ
1910	1798	.	u
1910	1821	s	u
1910	1798	.	κ
1910	1915	s	κ
1910	1842	s	k
1910	1845	s	U
1910	1896	s	K
1910	1798	.	α
1910	1821	s	α
1910	1798	.	a
1910	1821	s	a
1910	1874	s	A
1910	1798	.	λ
1910	1915	s	λ
1910	1842	s	l
1910	1903	s	L
1911	1799	.	.
1911	1800	 	 
1911	1799	<~>	<~>
1911	1799	<split-s>	<split-s>
1911	1799	<split-h>	<split-h>
1911	1799	<name2>	<name2>
1911	1803	<aphaerese>	<aphaerese>
1911	1912	<>	<aphaerese>
1911	1799	<elision3>	<elision3>
1911	1912	<>	<elision3>
1911	1799	<elision2>	<elision2>
1911	1912	<>	<elision2>
1911	1799	<elision1>	<elision1>
1911	1912	<>	<elision1>
1911	1796	.	υ
1911	1807	s	υ
1911	1796	.	u
1911	1807	s	u
1911	1796	.	κ
1911	1913	s	κ
1911	1840	s	k
1911	1843	s	U
1911	1894	s	K
1911	1796	.	α
1911	1807	s	α
1911	1796	.	a
1911	1807	s	a
1911	1872	s	A
1911	1796	.	λ
1911	1913	s	λ
1911	1840	s	l
1911	1901	s	L
1912	1799	.	.
1912	1800	 	 
1912	1799	<~>	<~>
1912	1799	<split-s>	<split-s>
1912	1799	<split-h>	<split-h>
1912	1799	<name2>	<name2>
1912	1910	<>	<name>
1912	1803	<aphaerese>	<aphaerese>
1912	1912	<>	<aphaerese>
1912	1799	<elision3>	<elision3>
1912	1912	<>	<elision3>
1912	1799	<elision2>	<elision2>
1912	1912	<>	<elision2>
1912	1799	<elision1>	<elision1>
1912	1912	<>	<elision1>
1912	1796	.	υ
1912	1807	s	υ
1912	1796	.	u
1912	1807	s	u
1912	1796	.	κ
1912	1913	s	κ
1912	1840	s	k
1912	1843	s	U
1912	1894	s	K
1912	1796	.	α
1912	1807	s	α
1912	1796	.	a
1912	1807	s	a
1912	1872	s	A
1912	1796	.	λ
1912	1913	s	λ
1912	1840	s	l
1912	1901	s	L
1913	1808	.	.
1913	1808	 	 
1913	1808	<~>	<~>
1913	1808	<split-s>	<split-s>
1913	1808	<split-h>	<split-h>
1913	1808	<name2>	<name2>
1913	1914	<>	<name>
1913	1811	<aphaerese>	<aphaerese>
1913	1913	<>	<aphaerese>
1913	1913	<>	<elision3>
1913	1913	<>	<elision2>
1913	1913	<>	<elision1>
1913	1817	.	υ
1913	1817	.	u
1913	1817	.	κ
1913	1817	.	α
1913	1817	.	a
1913	1817	.	λ
1913	710	<3s>	<>
1914	1810	.	.
1914	1810	 	 
1914	1810	<~>	<~>
1914	1810	<split-s>	<split-s>
1914	1810	<split-h>	<split-h>
1914	1810	<name2>	<name2>
1914	1813	<aphaerese>	<aphaerese>
1914	1915	<>	<aphaerese>
1914	1915	<>	<elision3>
1914	1915	<>	<elision2>
1914	1915	<>	<elision1>
1914	1819	.	υ
1914	1819	.	u
1914	1819	.	κ
1914	1819	.	α
1914	1819	.	a
1914	1819	.	λ
1914	711	<3s>	<>
1915	1808	.	.
1915	1808	 	 
1915	1808	<~>	<~>
1915	1808	<split-s>	<split-s>
1915	1808	<split-h>	<split-h>
1915	1808	<name2>	<name2>
1915	1811	<aphaerese>	<aphaerese>
1915	1913	<>	<aphaerese>
1915	1913	<>	<elision3>
1915	1913	<>	<elision2>
1915	1913	<>	<elision1>
1915	1817	.	υ
1915	1817	.	u
1915	1817	.	κ
1915	1817	.	α
1915	1817	.	a
1915	1817	.	λ
1915	709	<3s>	<>
1916	1917	<>	<aphaerese>
1916	1917	<>	<elision3>
1916	1917	<>	<elision2>
1916	1917	<>	<elision1>
1916	985	s	κ
1916	1110	s	k
1916	1128	s	K
1916	985	s	λ
1916	1141	s	l
1916	1144	s	L
1916	454	<1s>	<>
1916	1920	<~>	<>
1917	1918	<>	<name>
1917	1917	<>	<aphaerese>
1917	1917	<>	<elision3>
1917	1917	<>	<elision2>
1917	1917	<>	<elision1>
1917	985	s	κ
1917	1110	s	k
1917	1128	s	K
1917	985	s	λ
1917	1141	s	l
1917	1144	s	L
1917	455	<1s>	<>
1917	1921	<~>	<>
1918	1916	<>	<aphaerese>
1918	1916	<>	<elision3>
1918	1916	<>	<elision2>
1918	1916	<>	<elision1>
1918	1106	s	κ
1918	1112	s	k
1918	1131	s	K
1918	1106	s	λ
1918	1143	s	l
1918	1146	s	L
1918	456	<1s>	<>
1918	1919	<~>	<>
1919	1920	<>	<aphaerese>
1919	1920	<>	<elision3>
1919	1920	<>	<elision2>
1919	1920	<>	<elision1>
1919	1795	h	k
1919	1795	h	K
1919	1911	h	l
1919	1911	h	L
1920	1921	<>	<aphaerese>
1920	1921	<>	<elision3>
1920	1921	<>	<elision2>
1920	1921	<>	<elision1>
1920	1793	h	k
1920	1793	h	K
1920	1912	h	l
1920	1922	h	L
1921	1919	<>	<name>
1921	1921	<>	<aphaerese>
1921	1921	<>	<elision3>
1921	1921	<>	<elision2>
1921	1921	<>	<elision1>
1921	1793	h	k
1921	1793	h	K
1921	1912	h	l
1921	1922	h	L
1922	1799	.	.
1922	1800	 	 
1922	1799	<~>	<~>
1922	1799	<split-s>	<split-s>
1922	1799	<split-h>	<split-h>
1922	1799	<name2>	<name2>
1922	1909	<name2>	<name>
1922	1909	<name>	<name>
1922	1910	<>	<name>
1922	1803	<aphaerese>	<aphaerese>
1922	1912	<>	<aphaerese>
1922	1799	<elision3>	<elision3>
1922	1912	<>	<elision3>
1922	1799	<elision2>	<elision2>
1922	1912	<>	<elision2>
1922	1799	<elision1>	<elision1>
1922	1912	<>	<elision1>
1922	1796	.	υ
1922	1807	s	υ
1922	1796	.	u
1922	1807	s	u
1922	1796	.	κ
1922	1913	s	κ
1922	1840	s	k
1922	1843	s	U
1922	1894	s	K
1922	1796	.	α
1922	1807	s	α
1922	1796	.	a
1922	1807	s	a
1922	1872	s	A
1922	1796	.	λ
1922	1913	s	λ
1922	1840	s	l
1922	1901	s	L
1923	1924	<>	<aphaerese>
1923	261	<elision3>	<elision3>
1923	1924	<>	<elision3>
1923	261	<elision2>	<elision2>
1923	1924	<>	<elision2>
1923	261	<elision1>	<elision1>
1923	1924	<>	<elision1>
1923	1604	<K>	<>
1924	1925	<>	<name>
1924	1924	<>	<aphaerese>
1924	261	<elision3>	<elision3>
1924	1924	<>	<elision3>
1924	261	<elision2>	<elision2>
1924	1924	<>	<elision2>
1924	261	<elision1>	<elision1>
1924	1924	<>	<elision1>
1924	1602	<K>	<>
1925	1923	<>	<aphaerese>
1925	263	<elision3>	<elision3>
1925	1923	<>	<elision3>
1925	263	<elision2>	<elision2>
1925	1923	<>	<elision2>
1925	263	<elision1>	<elision1>
1925	1923	<>	<elision1>
1925	1603	<K>	<>
1926	251	.	.
1926	252	 	 
1926	251	<~>	<~>
1926	251	<split-s>	<split-s>
1926	251	<split-h>	<split-h>
1926	251	<name2>	<name2>
1926	255	<aphaerese>	<aphaerese>
1926	1927	<>	<aphaerese>
1926	251	<elision3>	<elision3>
1926	1927	<>	<elision3>
1926	251	<elision2>	<elision2>
1926	1927	<>	<elision2>
1926	251	<elision1>	<elision1>
1926	1927	<>	<elision1>
1926	251	.	υ
1926	251	.	u
1926	258	.	κ
1926	1172	H	κ
1926	1500	H	k
1926	1513	H	U
1926	1516	H	K
1926	251	.	α
1926	251	.	a
1926	1343	H	A
1926	1527	H	λ
1926	1930	H	l
1926	1935	H	L
1926	1601	<K>	<>
1927	251	.	.
1927	252	 	 
1927	251	<~>	<~>
1927	251	<split-s>	<split-s>
1927	251	<split-h>	<split-h>
1927	251	<name2>	<name2>
1927	1928	<>	<name>
1927	255	<aphaerese>	<aphaerese>
1927	1927	<>	<aphaerese>
1927	251	<elision3>	<elision3>
1927	1927	<>	<elision3>
1927	251	<elision2>	<elision2>
1927	1927	<>	<elision2>
1927	251	<elision1>	<elision1>
1927	1927	<>	<elision1>
1927	251	.	υ
1927	251	.	u
1927	258	.	κ
1927	1172	H	κ
1927	1500	H	k
1927	1513	H	U
1927	1516	H	K
1927	251	.	α
1927	251	.	a
1927	1343	H	A
1927	1527	H	λ
1927	1930	H	l
1927	1935	H	L
1927	1599	<K>	<>
1928	250	.	.
1928	254	 	 
1928	250	<~>	<~>
1928	250	<split-s>	<split-s>
1928	250	<split-h>	<split-h>
1928	250	<name2>	<name2>
1928	257	<aphaerese>	<aphaerese>
1928	1926	<>	<aphaerese>
1928	250	<elision3>	<elision3>
1928	1926	<>	<elision3>
1928	250	<elision2>	<elision2>
1928	1926	<>	<elision2>
1928	250	<elision1>	<elision1>
1928	1926	<>	<elision1>
1928	250	.	υ
1928	250	.	u
1928	260	.	κ
1928	1537	H	κ
1928	1541	H	k
1928	1515	H	U
1928	1545	H	K
1928	250	.	α
1928	250	.	a
1928	1346	H	A
1928	1529	H	λ
1928	1929	H	l
1928	1932	H	L
1928	1600	<K>	<>
1929	1930	<>	<aphaerese>
1929	1930	<>	<elision3>
1929	1930	<>	<elision2>
1929	1930	<>	<elision1>
1929	1791	<~>	<>
1929	1530	<l2L>	<>
1930	1931	<>	<name>
1930	1930	<>	<aphaerese>
1930	1930	<>	<elision3>
1930	1930	<>	<elision2>
1930	1930	<>	<elision1>
1930	1792	<~>	<>
1930	1531	<l2L>	<>
1931	1929	<>	<aphaerese>
1931	1929	<>	<elision3>
1931	1929	<>	<elision2>
1931	1929	<>	<elision1>
1931	1790	<~>	<>
1931	1532	<l2L>	<>
1932	1343	.	.
1932	1344	 	 
1932	1343	<~>	<~>
1932	1343	<split-s>	<split-s>
1932	1343	<split-h>	<split-h>
1932	1343	<name2>	<name2>
1932	1347	<aphaerese>	<aphaerese>
1932	1933	<>	<aphaerese>
1932	1343	<elision3>	<elision3>
1932	1933	<>	<elision3>
1932	1343	<elision2>	<elision2>
1932	1933	<>	<elision2>
1932	1343	<elision1>	<elision1>
1932	1933	<>	<elision1>
1932	1351	.	υ
1932	1354	s	υ
1932	1351	.	u
1932	1354	s	u
1932	1351	.	κ
1932	985	s	κ
1932	1110	s	k
1932	1400	s	U
1932	1128	s	K
1932	1351	.	α
1932	1425	s	α
1932	1351	.	a
1932	1425	s	a
1932	1428	s	A
1932	1351	.	λ
1932	985	s	λ
1932	1141	s	l
1932	1144	s	L
1932	526	<1s>	<>
1932	1920	<~>	<>
1933	1343	.	.
1933	1344	 	 
1933	1343	<~>	<~>
1933	1343	<split-s>	<split-s>
1933	1343	<split-h>	<split-h>
1933	1343	<name2>	<name2>
1933	1934	<>	<name>
1933	1347	<aphaerese>	<aphaerese>
1933	1933	<>	<aphaerese>
1933	1343	<elision3>	<elision3>
1933	1933	<>	<elision3>
1933	1343	<elision2>	<elision2>
1933	1933	<>	<elision2>
1933	1343	<elision1>	<elision1>
1933	1933	<>	<elision1>
1933	1351	.	υ
1933	1354	s	υ
1933	1351	.	u
1933	1354	s	u
1933	1351	.	κ
1933	985	s	κ
1933	1110	s	k
1933	1400	s	U
1933	1128	s	K
1933	1351	.	α
1933	1425	s	α
1933	1351	.	a
1933	1425	s	a
1933	1428	s	A
1933	1351	.	λ
1933	985	s	λ
1933	1141	s	l
1933	1144	s	L
1933	527	<1s>	<>
1933	1921	<~>	<>
1934	1346	.	.
1934	1349	 	 
1934	1346	<~>	<~>
1934	1346	<split-s>	<split-s>
1934	1346	<split-h>	<split-h>
1934	1346	<name2>	<name2>
1934	1455	<aphaerese>	<aphaerese>
1934	1932	<>	<aphaerese>
1934	1346	<elision3>	<elision3>
1934	1932	<>	<elision3>
1934	1346	<elision2>	<elision2>
1934	1932	<>	<elision2>
1934	1346	<elision1>	<elision1>
1934	1932	<>	<elision1>
1934	1353	.	υ
1934	1356	s	υ
1934	1353	.	u
1934	1356	s	u
1934	1353	.	κ
1934	1106	s	κ
1934	1112	s	k
1934	1402	s	U
1934	1131	s	K
1934	1353	.	α
1934	1427	s	α
1934	1353	.	a
1934	1427	s	a
1934	1430	s	A
1934	1353	.	λ
1934	1106	s	λ
1934	1143	s	l
1934	1146	s	L
1934	528	<1s>	<>
1934	1919	<~>	<>
1935	1343	.	.
1935	1344	 	 
1935	1343	<~>	<~>
1935	1343	<split-s>	<split-s>
1935	1343	<split-h>	<split-h>
1935	1343	<name2>	<name2>
1935	1523	<name2>	<name>
1935	1934	<>	<name>
1935	1347	<aphaerese>	<aphaerese>
1935	1933	<>	<aphaerese>
1935	1343	<elision3>	<elision3>
1935	1933	<>	<elision3>
1935	1343	<elision2>	<elision2>
1935	1933	<>	<elision2>
1935	1343	<elision1>	<elision1>
1935	1933	<>	<elision1>
1935	1351	.	υ
1935	1354	s	υ
1935	1351	.	u
1935	1354	s	u
1935	1351	.	κ
1935	985	s	κ
1935	1110	s	k
1935	1400	s	U
1935	1128	s	K
1935	1351	.	α
1935	1425	s	α
1935	1351	.	a
1935	1425	s	a
1935	1428	s	A
1935	1351	.	λ
1935	985	s	λ
1935	1141	s	l
1935	1144	s	L
1935	685	<1s>	<>
1935	1921	<~>	<>
1935	1522	<l2L>	<>
1936	1937	<>	<name>
1936	1936	<>	<aphaerese>
1936	1772	<elision3>	<elision3>
1936	1936	<>	<elision3>
1936	1772	<elision2>	<elision2>
1936	1936	<>	<elision2>
1936	1772	<elision1>	<elision1>
1936	1936	<>	<elision1>
1936	248	<4s>	<>
1937	1938	<>	<aphaerese>
1937	1774	<elision3>	<elision3>
1937	1938	<>	<elision3>
1937	1774	<elision2>	<elision2>
1937	1938	<>	<elision2>
1937	1774	<elision1>	<elision1>
1937	1938	<>	<elision1>
1937	249	<4s>	<>
1938	1936	<>	<aphaerese>
1938	1772	<elision3>	<elision3>
1938	1936	<>	<elision3>
1938	1772	<elision2>	<elision2>
1938	1936	<>	<elision2>
1938	1772	<elision1>	<elision1>
1938	1936	<>	<elision1>
1938	247	<4s>	<>
1939	251	.	.
1939	252	 	 
1939	251	<~>	<~>
1939	251	<split-s>	<split-s>
1939	251	<split-h>	<split-h>
1939	251	<name2>	<name2>
1939	255	<aphaerese>	<aphaerese>
1939	1940	<>	<aphaerese>
1939	251	<elision3>	<elision3>
1939	1940	<>	<elision3>
1939	251	<elision2>	<elision2>
1939	1940	<>	<elision2>
1939	251	<elision1>	<elision1>
1939	1940	<>	<elision1>
1939	1546	.	υ
1939	1590	H	υ
1939	1546	.	u
1939	1592	H	u
1939	258	.	κ
1939	1172	H	κ
1939	1500	H	k
1939	1513	H	U
1939	1516	H	K
1939	1546	.	α
1939	1576	H	α
1939	1546	.	a
1939	1581	H	a
1939	1343	H	A
1939	1527	H	λ
1939	1930	H	l
1939	1935	H	L
1939	1598	<K>	<>
1940	251	.	.
1940	252	 	 
1940	251	<~>	<~>
1940	251	<split-s>	<split-s>
1940	251	<split-h>	<split-h>
1940	251	<name2>	<name2>
1940	1941	<>	<name>
1940	255	<aphaerese>	<aphaerese>
1940	1940	<>	<aphaerese>
1940	251	<elision3>	<elision3>
1940	1940	<>	<elision3>
1940	251	<elision2>	<elision2>
1940	1940	<>	<elision2>
1940	251	<elision1>	<elision1>
1940	1940	<>	<elision1>
1940	1546	.	υ
1940	1590	H	υ
1940	1546	.	u
1940	1592	H	u
1940	258	.	κ
1940	1172	H	κ
1940	1500	H	k
1940	1513	H	U
1940	1516	H	K
1940	1546	.	α
1940	1576	H	α
1940	1546	.	a
1940	1581	H	a
1940	1343	H	A
1940	1527	H	λ
1940	1930	H	l
1940	1935	H	L
1940	1596	<K>	<>
1941	250	.	.
1941	254	 	 
1941	250	<~>	<~>
1941	250	<split-s>	<split-s>
1941	250	<split-h>	<split-h>
1941	250	<name2>	<name2>
1941	257	<aphaerese>	<aphaerese>
1941	1939	<>	<aphaerese>
1941	250	<elision3>	<elision3>
1941	1939	<>	<elision3>
1941	250	<elision2>	<elision2>
1941	1939	<>	<elision2>
1941	250	<elision1>	<elision1>
1941	1939	<>	<elision1>
1941	1548	.	υ
1941	1585	H	υ
1941	1548	.	u
1941	1589	H	u
1941	260	.	κ
1941	1537	H	κ
1941	1541	H	k
1941	1515	H	U
1941	1545	H	K
1941	1548	.	α
1941	1575	H	α
1941	1548	.	a
1941	1580	H	a
1941	1346	H	A
1941	1529	H	λ
1941	1929	H	l
1941	1932	H	L
1941	1597	<K>	<>
1942	1774	.	.
1942	1774	 	 
1942	1774	<~>	<~>
1942	1774	<split-s>	<split-s>
1942	1774	<split-h>	<split-h>
1942	1774	<name2>	<name2>
1942	1777	<aphaerese>	<aphaerese>
1942	1943	<>	<aphaerese>
1942	1943	<>	<elision3>
1942	1943	<>	<elision2>
1942	1943	<>	<elision1>
1942	1938	.	υ
1942	1938	.	u
1942	1780	.	κ
1942	1938	.	α
1942	1938	.	a
1942	1946	<4s>	<>
1943	1772	.	.
1943	1772	 	 
1943	1772	<~>	<~>
1943	1772	<split-s>	<split-s>
1943	1772	<split-h>	<split-h>
1943	1772	<name2>	<name2>
1943	1775	<aphaerese>	<aphaerese>
1943	1771	<>	<aphaerese>
1943	1771	<>	<elision3>
1943	1771	<>	<elision2>
1943	1771	<>	<elision1>
1943	1936	.	υ
1943	1936	.	u
1943	1778	.	κ
1943	1936	.	α
1943	1936	.	a
1943	1944	<4s>	<>
1944	251	.	.
1944	252	 	 
1944	251	<~>	<~>
1944	251	<split-s>	<split-s>
1944	251	<split-h>	<split-h>
1944	251	<name2>	<name2>
1944	255	<aphaerese>	<aphaerese>
1944	1945	<>	<aphaerese>
1944	1945	<>	<elision3>
1944	1945	<>	<elision2>
1944	1945	<>	<elision1>
1944	1546	.	υ
1944	1590	H	υ
1944	1546	.	u
1944	1592	H	u
1944	258	.	κ
1944	1172	H	κ
1944	1500	H	k
1944	1513	H	U
1944	1516	H	K
1944	1546	.	α
1944	1576	H	α
1944	1546	.	a
1944	1581	H	a
1944	1343	H	A
1944	1527	H	λ
1944	1930	H	l
1944	1935	H	L
1944	1948	<K>	<>
1945	251	.	.
1945	252	 	 
1945	251	<~>	<~>
1945	251	<split-s>	<split-s>
1945	251	<split-h>	<split-h>
1945	251	<name2>	<name2>
1945	1946	<>	<name>
1945	255	<aphaerese>	<aphaerese>
1945	1945	<>	<aphaerese>
1945	1945	<>	<elision3>
1945	1945	<>	<elision2>
1945	1945	<>	<elision1>
1945	1546	.	υ
1945	1590	H	υ
1945	1546	.	u
1945	1592	H	u
1945	258	.	κ
1945	1172	H	κ
1945	1500	H	k
1945	1513	H	U
1945	1516	H	K
1945	1546	.	α
1945	1576	H	α
1945	1546	.	a
1945	1581	H	a
1945	1343	H	A
1945	1527	H	λ
1945	1930	H	l
1945	1935	H	L
1945	1949	<K>	<>
1946	250	.	.
1946	254	 	 
1946	250	<~>	<~>
1946	250	<split-s>	<split-s>
1946	250	<split-h>	<split-h>
1946	250	<name2>	<name2>
1946	257	<aphaerese>	<aphaerese>
1946	1944	<>	<aphaerese>
1946	1944	<>	<elision3>
1946	1944	<>	<elision2>
1946	1944	<>	<elision1>
1946	1548	.	υ
1946	1585	H	υ
1946	1548	.	u
1946	1589	H	u
1946	260	.	κ
1946	1537	H	κ
1946	1541	H	k
1946	1515	H	U
1946	1545	H	K
1946	1548	.	α
1946	1575	H	α
1946	1548	.	a
1946	1580	H	a
1946	1346	H	A
1946	1529	H	λ
1946	1929	H	l
1946	1932	H	L
1946	1947	<K>	<>
1947	1598	.	.
1947	1598	<~>	<~>
1947	1598	<split-s>	<split-s>
1947	1598	<split-h>	<split-h>
1947	1598	<name2>	<name2>
1947	1601	<aphaerese>	<aphaerese>
1947	1948	<>	<aphaerese>
1947	1948	<>	<elision3>
1947	1948	<>	<elision2>
1947	1948	<>	<elision1>
1947	1594	.	υ
1947	1740	H	υ
1947	1594	.	u
1947	1749	H	u
1947	1604	.	κ
1947	1655	H	κ
1947	1709	H	k
1947	1718	H	U
1947	1722	H	K
1947	1594	.	α
1947	1752	H	α
1947	1594	.	a
1947	1755	H	a
1947	1689	H	A
1947	1730	H	λ
1947	1736	H	l
1947	1731	H	L
1948	1596	.	.
1948	1596	<~>	<~>
1948	1596	<split-s>	<split-s>
1948	1596	<split-h>	<split-h>
1948	1596	<name2>	<name2>
1948	1599	<aphaerese>	<aphaerese>
1948	1949	<>	<aphaerese>
1948	1949	<>	<elision3>
1948	1949	<>	<elision2>
1948	1949	<>	<elision1>
1948	1595	.	υ
1948	1738	H	υ
1948	1595	.	u
1948	1747	H	u
1948	1602	.	κ
1948	1653	H	κ
1948	1707	H	k
1948	1716	H	U
1948	1719	H	K
1948	1595	.	α
1948	1750	H	α
1948	1595	.	a
1948	1753	H	a
1948	1687	H	A
1948	1728	H	λ
1948	1734	H	l
1948	1737	H	L
1949	1596	.	.
1949	1596	<~>	<~>
1949	1596	<split-s>	<split-s>
1949	1596	<split-h>	<split-h>
1949	1596	<name2>	<name2>
1949	1947	<>	<name>
1949	1599	<aphaerese>	<aphaerese>
1949	1949	<>	<aphaerese>
1949	1949	<>	<elision3>
1949	1949	<>	<elision2>
1949	1949	<>	<elision1>
1949	1595	.	υ
1949	1738	H	υ
1949	1595	.	u
1949	1747	H	u
1949	1602	.	κ
1949	1653	H	κ
1949	1707	H	k
1949	1716	H	U
1949	1719	H	K
1949	1595	.	α
1949	1750	H	α
1949	1595	.	a
1949	1753	H	a
1949	1687	H	A
1949	1728	H	λ
1949	1734	H	l
1949	1737	H	L
1950	1951	<>	<name>
1950	1950	<>	<aphaerese>
1950	1953	<elision3>	<elision3>
1950	1950	<>	<elision3>
1950	1953	<elision2>	<elision2>
1950	1950	<>	<elision2>
1950	1953	<elision1>	<elision1>
1950	1950	<>	<elision1>
1950	2019	<split-h>	<>
1951	1952	<>	<aphaerese>
1951	1955	<elision3>	<elision3>
1951	1952	<>	<elision3>
1951	1955	<elision2>	<elision2>
1951	1952	<>	<elision2>
1951	1955	<elision1>	<elision1>
1951	1952	<>	<elision1>
1951	2020	<split-h>	<>
1952	1950	<>	<aphaerese>
1952	1953	<elision3>	<elision3>
1952	1950	<>	<elision3>
1952	1953	<elision2>	<elision2>
1952	1950	<>	<elision2>
1952	1953	<elision1>	<elision1>
1952	1950	<>	<elision1>
1952	2018	<split-h>	<>
1953	1954	<>	<name>
1953	1953	<>	<aphaerese>
1953	1953	<>	<elision3>
1953	1953	<>	<elision2>
1953	1953	<>	<elision1>
1953	1956	s	κ
1953	1956	s	k
1953	2009	s	K
1953	1956	s	λ
1953	1956	s	l
1953	2012	s	L
1953	2016	<split-h>	<>
1954	1955	<>	<aphaerese>
1954	1955	<>	<elision3>
1954	1955	<>	<elision2>
1954	1955	<>	<elision1>
1954	1958	s	κ
1954	1958	s	k
1954	2011	s	K
1954	1958	s	λ
1954	1958	s	l
1954	2014	s	L
1954	2017	<split-h>	<>
1955	1953	<>	<aphaerese>
1955	1953	<>	<elision3>
1955	1953	<>	<elision2>
1955	1953	<>	<elision1>
1955	1956	s	κ
1955	1956	s	k
1955	2009	s	K
1955	1956	s	λ
1955	1956	s	l
1955	2012	s	L
1955	2015	<split-h>	<>
1956	1957	<>	<name>
1956	1956	<>	<aphaerese>
1956	1956	<>	<elision3>
1956	1956	<>	<elision2>
1956	1956	<>	<elision1>
1956	1960	<4s>	<>
1957	1958	<>	<aphaerese>
1957	1958	<>	<elision3>
1957	1958	<>	<elision2>
1957	1958	<>	<elision1>
1957	1961	<4s>	<>
1958	1956	<>	<aphaerese>
1958	1956	<>	<elision3>
1958	1956	<>	<elision2>
1958	1956	<>	<elision1>
1958	1959	<4s>	<>
1959	1960	<>	<aphaerese>
1959	1960	<>	<elision3>
1959	1960	<>	<elision2>
1959	1960	<>	<elision1>
1959	2005	H	κ
1959	1500	H	k
1959	1516	H	K
1959	1982	H	λ
1959	1930	H	l
1959	1935	H	L
1959	1988	<K>	<>
1960	1961	<>	<name>
1960	1960	<>	<aphaerese>
1960	1960	<>	<elision3>
1960	1960	<>	<elision2>
1960	1960	<>	<elision1>
1960	2005	H	κ
1960	1500	H	k
1960	1516	H	K
1960	1982	H	λ
1960	1930	H	l
1960	1935	H	L
1960	1989	<K>	<>
1961	1959	<>	<aphaerese>
1961	1959	<>	<elision3>
1961	1959	<>	<elision2>
1961	1959	<>	<elision1>
1961	1962	H	κ
1961	1541	H	k
1961	1545	H	K
1961	1981	H	λ
1961	1929	H	l
1961	1932	H	L
1961	1987	<K>	<>
1962	1963	<>	<aphaerese>
1962	1963	<>	<elision3>
1962	1963	<>	<elision2>
1962	1963	<>	<elision1>
1962	1966	<kappa2K>	<>
1962	1978	<kappa2L>	<>
1962	1496	<lambda2L>	<>
1963	1964	<>	<name>
1963	1963	<>	<aphaerese>
1963	1963	<>	<elision3>
1963	1963	<>	<elision2>
1963	1963	<>	<elision1>
1963	1967	<kappa2K>	<>
1963	1970	<kappa2L>	<>
1963	1494	<lambda2L>	<>
1964	1965	<>	<aphaerese>
1964	1965	<>	<elision3>
1964	1965	<>	<elision2>
1964	1965	<>	<elision1>
1964	1968	<kappa2K>	<>
1964	1971	<kappa2L>	<>
1964	1495	<lambda2L>	<>
1965	1963	<>	<aphaerese>
1965	1963	<>	<elision3>
1965	1963	<>	<elision2>
1965	1963	<>	<elision1>
1965	1966	<kappa2K>	<>
1965	1969	<kappa2L>	<>
1965	1496	<lambda2L>	<>
1966	1177	.	.
1966	1178	 	 
1966	1177	<~>	<~>
1966	1177	<split-s>	<split-s>
1966	1177	<split-h>	<split-h>
1966	1177	<name2>	<name2>
1966	1181	<aphaerese>	<aphaerese>
1966	1967	<>	<aphaerese>
1966	1967	<>	<elision3>
1966	1967	<>	<elision2>
1966	1967	<>	<elision1>
1966	1185	.	υ
1966	1188	s	υ
1966	1185	.	u
1966	1188	s	u
1966	271	s	κ
1966	926	s	k
1966	1251	s	U
1966	959	s	K
1966	1185	.	α
1966	1279	s	α
1966	1185	.	a
1966	1279	s	a
1966	1282	s	A
1966	271	s	λ
1966	974	s	l
1966	977	s	L
1967	1177	.	.
1967	1178	 	 
1967	1177	<~>	<~>
1967	1177	<split-s>	<split-s>
1967	1177	<split-h>	<split-h>
1967	1177	<name2>	<name2>
1967	1968	<>	<name>
1967	1181	<aphaerese>	<aphaerese>
1967	1967	<>	<aphaerese>
1967	1967	<>	<elision3>
1967	1967	<>	<elision2>
1967	1967	<>	<elision1>
1967	1185	.	υ
1967	1188	s	υ
1967	1185	.	u
1967	1188	s	u
1967	271	s	κ
1967	926	s	k
1967	1251	s	U
1967	959	s	K
1967	1185	.	α
1967	1279	s	α
1967	1185	.	a
1967	1279	s	a
1967	1282	s	A
1967	271	s	λ
1967	974	s	l
1967	977	s	L
1968	1180	.	.
1968	1183	 	 
1968	1180	<~>	<~>
1968	1180	<split-s>	<split-s>
1968	1180	<split-h>	<split-h>
1968	1180	<name2>	<name2>
1968	1309	<aphaerese>	<aphaerese>
1968	1966	<>	<aphaerese>
1968	1966	<>	<elision3>
1968	1966	<>	<elision2>
1968	1966	<>	<elision1>
1968	1187	.	υ
1968	1190	s	υ
1968	1187	.	u
1968	1190	s	u
1968	919	s	κ
1968	928	s	k
1968	1253	s	U
1968	962	s	K
1968	1187	.	α
1968	1281	s	α
1968	1187	.	a
1968	1281	s	a
1968	1284	s	A
1968	919	s	λ
1968	976	s	l
1968	979	s	L
1969	1343	.	.
1969	1344	 	 
1969	1343	<~>	<~>
1969	1343	<split-s>	<split-s>
1969	1343	<split-h>	<split-h>
1969	1343	<name2>	<name2>
1969	1347	<aphaerese>	<aphaerese>
1969	1970	<>	<aphaerese>
1969	1970	<>	<elision3>
1969	1970	<>	<elision2>
1969	1970	<>	<elision1>
1969	1351	.	υ
1969	1354	s	υ
1969	1351	.	u
1969	1354	s	u
1969	985	s	κ
1969	1110	s	k
1969	1400	s	U
1969	1128	s	K
1969	1351	.	α
1969	1425	s	α
1969	1351	.	a
1969	1425	s	a
1969	1428	s	A
1969	985	s	λ
1969	1141	s	l
1969	1144	s	L
1969	1973	<1s>	<>
1970	1343	.	.
1970	1344	 	 
1970	1343	<~>	<~>
1970	1343	<split-s>	<split-s>
1970	1343	<split-h>	<split-h>
1970	1343	<name2>	<name2>
1970	1971	<>	<name>
1970	1347	<aphaerese>	<aphaerese>
1970	1970	<>	<aphaerese>
1970	1970	<>	<elision3>
1970	1970	<>	<elision2>
1970	1970	<>	<elision1>
1970	1351	.	υ
1970	1354	s	υ
1970	1351	.	u
1970	1354	s	u
1970	985	s	κ
1970	1110	s	k
1970	1400	s	U
1970	1128	s	K
1970	1351	.	α
1970	1425	s	α
1970	1351	.	a
1970	1425	s	a
1970	1428	s	A
1970	985	s	λ
1970	1141	s	l
1970	1144	s	L
1970	1974	<1s>	<>
1971	1346	.	.
1971	1349	 	 
1971	1346	<~>	<~>
1971	1346	<split-s>	<split-s>
1971	1346	<split-h>	<split-h>
1971	1346	<name2>	<name2>
1971	1455	<aphaerese>	<aphaerese>
1971	1969	<>	<aphaerese>
1971	1969	<>	<elision3>
1971	1969	<>	<elision2>
1971	1969	<>	<elision1>
1971	1353	.	υ
1971	1356	s	υ
1971	1353	.	u
1971	1356	s	u
1971	1106	s	κ
1971	1112	s	k
1971	1402	s	U
1971	1131	s	K
1971	1353	.	α
1971	1427	s	α
1971	1353	.	a
1971	1427	s	a
1971	1430	s	A
1971	1106	s	λ
1971	1143	s	l
1971	1146	s	L
1971	1972	<1s>	<>
1972	1973	<>	<aphaerese>
1972	1973	<>	<elision3>
1972	1973	<>	<elision2>
1972	1973	<>	<elision1>
1972	1976	<K>	<>
1973	1974	<>	<aphaerese>
1973	1974	<>	<elision3>
1973	1974	<>	<elision2>
1973	1974	<>	<elision1>
1973	1977	<K>	<>
1974	1972	<>	<name>
1974	1974	<>	<aphaerese>
1974	1974	<>	<elision3>
1974	1974	<>	<elision2>
1974	1974	<>	<elision1>
1974	1975	<K>	<>
1975	289	.	.
1975	289	<~>	<~>
1975	289	<split-s>	<split-s>
1975	289	<split-h>	<split-h>
1975	289	<name2>	<name2>
1975	1976	<>	<name>
1975	292	<aphaerese>	<aphaerese>
1975	1975	<>	<aphaerese>
1975	1975	<>	<elision3>
1975	1975	<>	<elision2>
1975	1975	<>	<elision1>
1975	288	.	υ
1975	376	H	υ
1975	288	.	u
1975	385	H	u
1975	460	H	κ
1975	358	H	k
1975	361	H	U
1975	364	H	K
1975	288	.	α
1975	388	H	α
1975	288	.	a
1975	391	H	a
1975	347	H	A
1975	463	H	λ
1975	373	H	l
1975	371	H	L
1976	291	.	.
1976	291	<~>	<~>
1976	291	<split-s>	<split-s>
1976	291	<split-h>	<split-h>
1976	291	<name2>	<name2>
1976	294	<aphaerese>	<aphaerese>
1976	1977	<>	<aphaerese>
1976	1977	<>	<elision3>
1976	1977	<>	<elision2>
1976	1977	<>	<elision1>
1976	287	.	υ
1976	378	H	υ
1976	287	.	u
1976	387	H	u
1976	462	H	κ
1976	360	H	k
1976	363	H	U
1976	366	H	K
1976	287	.	α
1976	390	H	α
1976	287	.	a
1976	393	H	a
1976	346	H	A
1976	465	H	λ
1976	375	H	l
1976	370	H	L
1977	289	.	.
1977	289	<~>	<~>
1977	289	<split-s>	<split-s>
1977	289	<split-h>	<split-h>
1977	289	<name2>	<name2>
1977	292	<aphaerese>	<aphaerese>
1977	1975	<>	<aphaerese>
1977	1975	<>	<elision3>
1977	1975	<>	<elision2>
1977	1975	<>	<elision1>
1977	288	.	υ
1977	376	H	υ
1977	288	.	u
1977	385	H	u
1977	460	H	κ
1977	358	H	k
1977	361	H	U
1977	364	H	K
1977	288	.	α
1977	388	H	α
1977	288	.	a
1977	391	H	a
1977	347	H	A
1977	463	H	λ
1977	373	H	l
1977	371	H	L
1978	1343	.	.
1978	1344	 	 
1978	1343	<~>	<~>
1978	1343	<split-s>	<split-s>
1978	1343	<split-h>	<split-h>
1978	1343	<name2>	<name2>
1978	1347	<aphaerese>	<aphaerese>
1978	1970	<>	<aphaerese>
1978	1970	<>	<elision3>
1978	1970	<>	<elision2>
1978	1970	<>	<elision1>
1978	1351	.	υ
1978	1354	s	υ
1978	1351	.	u
1978	1354	s	u
1978	985	s	κ
1978	1110	s	k
1978	1400	s	U
1978	1128	s	K
1978	1351	.	α
1978	1425	s	α
1978	1351	.	a
1978	1425	s	a
1978	1428	s	A
1978	985	s	λ
1978	1141	s	l
1978	1144	s	L
1978	1979	<1s>	<>
1979	1974	<>	<aphaerese>
1979	1974	<>	<elision3>
1979	1974	<>	<elision2>
1979	1974	<>	<elision1>
1979	1980	<K>	<>
1980	289	.	.
1980	289	<~>	<~>
1980	289	<split-s>	<split-s>
1980	289	<split-h>	<split-h>
1980	289	<name2>	<name2>
1980	292	<aphaerese>	<aphaerese>
1980	1975	<>	<aphaerese>
1980	1975	<>	<elision3>
1980	1975	<>	<elision2>
1980	1975	<>	<elision1>
1980	288	.	υ
1980	288	.	u
1980	288	.	α
1980	288	.	a
1981	1982	<>	<aphaerese>
1981	1982	<>	<elision3>
1981	1982	<>	<elision2>
1981	1982	<>	<elision1>
1981	1985	<lambda2L>	<>
1982	1983	<>	<name>
1982	1982	<>	<aphaerese>
1982	1982	<>	<elision3>
1982	1982	<>	<elision2>
1982	1982	<>	<elision1>
1982	1986	<lambda2L>	<>
1983	1981	<>	<aphaerese>
1983	1981	<>	<elision3>
1983	1981	<>	<elision2>
1983	1981	<>	<elision1>
1983	1984	<lambda2L>	<>
1984	1346	.	.
1984	1349	 	 
1984	1346	<~>	<~>
1984	1346	<split-s>	<split-s>
1984	1346	<split-h>	<split-h>
1984	1346	<name2>	<name2>
1984	1455	<aphaerese>	<aphaerese>
1984	1985	<>	<aphaerese>
1984	1985	<>	<elision3>
1984	1985	<>	<elision2>
1984	1985	<>	<elision1>
1984	1353	.	υ
1984	1356	s	υ
1984	1353	.	u
1984	1356	s	u
1984	1353	.	κ
1984	1106	s	κ
1984	1112	s	k
1984	1402	s	U
1984	1131	s	K
1984	1353	.	α
1984	1427	s	α
1984	1353	.	a
1984	1427	s	a
1984	1430	s	A
1984	1353	.	λ
1984	1106	s	λ
1984	1143	s	l
1984	1146	s	L
1984	711	<1s>	<>
1985	1343	.	.
1985	1344	 	 
1985	1343	<~>	<~>
1985	1343	<split-s>	<split-s>
1985	1343	<split-h>	<split-h>
1985	1343	<name2>	<name2>
1985	1347	<aphaerese>	<aphaerese>
1985	1986	<>	<aphaerese>
1985	1986	<>	<elision3>
1985	1986	<>	<elision2>
1985	1986	<>	<elision1>
1985	1351	.	υ
1985	1354	s	υ
1985	1351	.	u
1985	1354	s	u
1985	1351	.	κ
1985	985	s	κ
1985	1110	s	k
1985	1400	s	U
1985	1128	s	K
1985	1351	.	α
1985	1425	s	α
1985	1351	.	a
1985	1425	s	a
1985	1428	s	A
1985	1351	.	λ
1985	985	s	λ
1985	1141	s	l
1985	1144	s	L
1985	709	<1s>	<>
1986	1343	.	.
1986	1344	 	 
1986	1343	<~>	<~>
1986	1343	<split-s>	<split-s>
1986	1343	<split-h>	<split-h>
1986	1343	<name2>	<name2>
1986	1984	<>	<name>
1986	1347	<aphaerese>	<aphaerese>
1986	1986	<>	<aphaerese>
1986	1986	<>	<elision3>
1986	1986	<>	<elision2>
1986	1986	<>	<elision1>
1986	1351	.	υ
1986	1354	s	υ
1986	1351	.	u
1986	1354	s	u
1986	1351	.	κ
1986	985	s	κ
1986	1110	s	k
1986	1400	s	U
1986	1128	s	K
1986	1351	.	α
1986	1425	s	α
1986	1351	.	a
1986	1425	s	a
1986	1428	s	A
1986	1351	.	λ
1986	985	s	λ
1986	1141	s	l
1986	1144	s	L
1986	710	<1s>	<>
1987	1988	<>	<aphaerese>
1987	1988	<>	<elision3>
1987	1988	<>	<elision2>
1987	1988	<>	<elision1>
1987	1992	H	κ
1987	1709	H	k
1987	1722	H	K
1987	2001	H	λ
1987	1736	H	l
1987	1731	H	L
1988	1989	<>	<aphaerese>
1988	1989	<>	<elision3>
1988	1989	<>	<elision2>
1988	1989	<>	<elision1>
1988	1990	H	κ
1988	1707	H	k
1988	1719	H	K
1988	1999	H	λ
1988	1734	H	l
1988	1737	H	L
1989	1987	<>	<name>
1989	1989	<>	<aphaerese>
1989	1989	<>	<elision3>
1989	1989	<>	<elision2>
1989	1989	<>	<elision1>
1989	1990	H	κ
1989	1707	H	k
1989	1719	H	K
1989	1999	H	λ
1989	1734	H	l
1989	1737	H	L
1990	1991	<>	<name>
1990	1990	<>	<aphaerese>
1990	1990	<>	<elision3>
1990	1990	<>	<elision2>
1990	1990	<>	<elision1>
1990	1994	<kappa2K>	<>
1990	1997	<kappa2L>	<>
1990	1705	<lambda2L>	<>
1991	1992	<>	<aphaerese>
1991	1992	<>	<elision3>
1991	1992	<>	<elision2>
1991	1992	<>	<elision1>
1991	1995	<kappa2K>	<>
1991	1998	<kappa2L>	<>
1991	1706	<lambda2L>	<>
1992	1990	<>	<aphaerese>
1992	1990	<>	<elision3>
1992	1990	<>	<elision2>
1992	1990	<>	<elision1>
1992	1993	<kappa2K>	<>
1992	1996	<kappa2L>	<>
1992	1704	<lambda2L>	<>
1993	1657	.	.
1993	1657	<~>	<~>
1993	1657	<split-s>	<split-s>
1993	1657	<split-h>	<split-h>
1993	1657	<name2>	<name2>
1993	1660	<aphaerese>	<aphaerese>
1993	1994	<>	<aphaerese>
1993	1994	<>	<elision3>
1993	1994	<>	<elision2>
1993	1994	<>	<elision1>
1993	1675	.	υ
1993	1628	s	υ
1993	1675	.	u
1993	1628	s	u
1993	1615	s	κ
1993	1615	s	k
1993	1669	s	U
1993	1624	s	K
1993	1675	.	α
1993	1628	s	α
1993	1675	.	a
1993	1628	s	a
1993	1672	s	A
1993	1615	s	λ
1993	1615	s	l
1993	1630	s	L
1993	1621	<1m>	<>
1994	1657	.	.
1994	1657	<~>	<~>
1994	1657	<split-s>	<split-s>
1994	1657	<split-h>	<split-h>
1994	1657	<name2>	<name2>
1994	1995	<>	<name>
1994	1660	<aphaerese>	<aphaerese>
1994	1994	<>	<aphaerese>
1994	1994	<>	<elision3>
1994	1994	<>	<elision2>
1994	1994	<>	<elision1>
1994	1675	.	υ
1994	1628	s	υ
1994	1675	.	u
1994	1628	s	u
1994	1615	s	κ
1994	1615	s	k
1994	1669	s	U
1994	1624	s	K
1994	1675	.	α
1994	1628	s	α
1994	1675	.	a
1994	1628	s	a
1994	1672	s	A
1994	1615	s	λ
1994	1615	s	l
1994	1630	s	L
1994	1622	<1m>	<>
1995	1659	.	.
1995	1659	<~>	<~>
1995	1659	<split-s>	<split-s>
1995	1659	<split-h>	<split-h>
1995	1659	<name2>	<name2>
1995	1662	<aphaerese>	<aphaerese>
1995	1993	<>	<aphaerese>
1995	1993	<>	<elision3>
1995	1993	<>	<elision2>
1995	1993	<>	<elision1>
1995	1677	.	υ
1995	1627	s	υ
1995	1677	.	u
1995	1627	s	u
1995	1614	s	κ
1995	1614	s	k
1995	1671	s	U
1995	1623	s	K
1995	1677	.	α
1995	1627	s	α
1995	1677	.	a
1995	1627	s	a
1995	1674	s	A
1995	1614	s	λ
1995	1614	s	l
1995	1629	s	L
1995	1620	<1m>	<>
1996	1687	.	.
1996	1687	<~>	<~>
1996	1687	<split-s>	<split-s>
1996	1687	<split-h>	<split-h>
1996	1687	<name2>	<name2>
1996	1690	<aphaerese>	<aphaerese>
1996	1997	<>	<aphaerese>
1996	1997	<>	<elision3>
1996	1997	<>	<elision2>
1996	1997	<>	<elision1>
1996	1693	.	υ
1996	1628	s	υ
1996	1693	.	u
1996	1628	s	u
1996	1636	s	κ
1996	1639	H	κ
1996	1636	s	k
1996	1639	H	k
1996	1669	s	U
1996	1624	s	K
1996	1639	H	K
1996	1693	.	α
1996	1628	s	α
1996	1693	.	a
1996	1628	s	a
1996	1672	s	A
1996	1636	s	λ
1996	1639	H	λ
1996	1636	s	l
1996	1639	H	l
1996	1630	s	L
1996	1639	H	L
1996	1621	<1m>	<>
1997	1687	.	.
1997	1687	<~>	<~>
1997	1687	<split-s>	<split-s>
1997	1687	<split-h>	<split-h>
1997	1687	<name2>	<name2>
1997	1998	<>	<name>
1997	1690	<aphaerese>	<aphaerese>
1997	1997	<>	<aphaerese>
1997	1997	<>	<elision3>
1997	1997	<>	<elision2>
1997	1997	<>	<elision1>
1997	1693	.	υ
1997	1628	s	υ
1997	1693	.	u
1997	1628	s	u
1997	1636	s	κ
1997	1639	H	κ
1997	1636	s	k
1997	1639	H	k
1997	1669	s	U
1997	1624	s	K
1997	1639	H	K
1997	1693	.	α
1997	1628	s	α
1997	1693	.	a
1997	1628	s	a
1997	1672	s	A
1997	1636	s	λ
1997	1639	H	λ
1997	1636	s	l
1997	1639	H	l
1997	1630	s	L
1997	1639	H	L
1997	1622	<1m>	<>
1998	1689	.	.
1998	1689	<~>	<~>
1998	1689	<split-s>	<split-s>
1998	1689	<split-h>	<split-h>
1998	1689	<name2>	<name2>
1998	1692	<aphaerese>	<aphaerese>
1998	1996	<>	<aphaerese>
1998	1996	<>	<elision3>
1998	1996	<>	<elision2>
1998	1996	<>	<elision1>
1998	1695	.	υ
1998	1627	s	υ
1998	1695	.	u
1998	1627	s	u
1998	1635	s	κ
1998	1638	H	κ
1998	1635	s	k
1998	1638	H	k
1998	1671	s	U
1998	1623	s	K
1998	1638	H	K
1998	1695	.	α
1998	1627	s	α
1998	1695	.	a
1998	1627	s	a
1998	1674	s	A
1998	1635	s	λ
1998	1638	H	λ
1998	1635	s	l
1998	1638	H	l
1998	1629	s	L
1998	1638	H	L
1998	1620	<1m>	<>
1999	2000	<>	<name>
1999	1999	<>	<aphaerese>
1999	1999	<>	<elision3>
1999	1999	<>	<elision2>
1999	1999	<>	<elision1>
1999	2003	<lambda2L>	<>
2000	2001	<>	<aphaerese>
2000	2001	<>	<elision3>
2000	2001	<>	<elision2>
2000	2001	<>	<elision1>
2000	2004	<lambda2L>	<>
2001	1999	<>	<aphaerese>
2001	1999	<>	<elision3>
2001	1999	<>	<elision2>
2001	1999	<>	<elision1>
2001	2002	<lambda2L>	<>
2002	1687	.	.
2002	1687	<~>	<~>
2002	1687	<split-s>	<split-s>
2002	1687	<split-h>	<split-h>
2002	1687	<name2>	<name2>
2002	1690	<aphaerese>	<aphaerese>
2002	2003	<>	<aphaerese>
2002	2003	<>	<elision3>
2002	2003	<>	<elision2>
2002	2003	<>	<elision1>
2002	1693	.	υ
2002	1628	s	υ
2002	1693	.	u
2002	1628	s	u
2002	1693	.	κ
2002	1636	s	κ
2002	1639	H	κ
2002	1636	s	k
2002	1639	H	k
2002	1669	s	U
2002	1624	s	K
2002	1639	H	K
2002	1693	.	α
2002	1628	s	α
2002	1693	.	a
2002	1628	s	a
2002	1672	s	A
2002	1693	.	λ
2002	1636	s	λ
2002	1639	H	λ
2002	1636	s	l
2002	1639	H	l
2002	1630	s	L
2002	1639	H	L
2002	1621	<1m>	<>
2003	1687	.	.
2003	1687	<~>	<~>
2003	1687	<split-s>	<split-s>
2003	1687	<split-h>	<split-h>
2003	1687	<name2>	<name2>
2003	2004	<>	<name>
2003	1690	<aphaerese>	<aphaerese>
2003	2003	<>	<aphaerese>
2003	2003	<>	<elision3>
2003	2003	<>	<elision2>
2003	2003	<>	<elision1>
2003	1693	.	υ
2003	1628	s	υ
2003	1693	.	u
2003	1628	s	u
2003	1693	.	κ
2003	1636	s	κ
2003	1639	H	κ
2003	1636	s	k
2003	1639	H	k
2003	1669	s	U
2003	1624	s	K
2003	1639	H	K
2003	1693	.	α
2003	1628	s	α
2003	1693	.	a
2003	1628	s	a
2003	1672	s	A
2003	1693	.	λ
2003	1636	s	λ
2003	1639	H	λ
2003	1636	s	l
2003	1639	H	l
2003	1630	s	L
2003	1639	H	L
2003	1622	<1m>	<>
2004	1689	.	.
2004	1689	<~>	<~>
2004	1689	<split-s>	<split-s>
2004	1689	<split-h>	<split-h>
2004	1689	<name2>	<name2>
2004	1692	<aphaerese>	<aphaerese>
2004	2002	<>	<aphaerese>
2004	2002	<>	<elision3>
2004	2002	<>	<elision2>
2004	2002	<>	<elision1>
2004	1695	.	υ
2004	1627	s	υ
2004	1695	.	u
2004	1627	s	u
2004	1695	.	κ
2004	1635	s	κ
2004	1638	H	κ
2004	1635	s	k
2004	1638	H	k
2004	1671	s	U
2004	1623	s	K
2004	1638	H	K
2004	1695	.	α
2004	1627	s	α
2004	1695	.	a
2004	1627	s	a
2004	1674	s	A
2004	1695	.	λ
2004	1635	s	λ
2004	1638	H	λ
2004	1635	s	l
2004	1638	H	l
2004	1629	s	L
2004	1638	H	L
2004	1620	<1m>	<>
2005	1964	<>	<name>
2005	1963	<>	<aphaerese>
2005	1963	<>	<elision3>
2005	1963	<>	<elision2>
2005	1963	<>	<elision1>
2005	1967	<kappa2K>	<>
2005	2006	<kappa2L>	<>
2005	1494	<lambda2L>	<>
2006	1343	.	.
2006	1344	 	 
2006	1343	<~>	<~>
2006	1343	<split-s>	<split-s>
2006	1343	<split-h>	<split-h>
2006	1343	<name2>	<name2>
2006	1971	<>	<name>
2006	1347	<aphaerese>	<aphaerese>
2006	1970	<>	<aphaerese>
2006	1970	<>	<elision3>
2006	1970	<>	<elision2>
2006	1970	<>	<elision1>
2006	1351	.	υ
2006	1354	s	υ
2006	1351	.	u
2006	1354	s	u
2006	985	s	κ
2006	1110	s	k
2006	1400	s	U
2006	1128	s	K
2006	1351	.	α
2006	1425	s	α
2006	1351	.	a
2006	1425	s	a
2006	1428	s	A
2006	985	s	λ
2006	1141	s	l
2006	1144	s	L
2006	2007	<1s>	<>
2007	1972	<>	<name>
2007	1974	<>	<aphaerese>
2007	1974	<>	<elision3>
2007	1974	<>	<elision2>
2007	1974	<>	<elision1>
2007	2008	<K>	<>
2008	289	.	.
2008	289	<~>	<~>
2008	289	<split-s>	<split-s>
2008	289	<split-h>	<split-h>
2008	289	<name2>	<name2>
2008	1976	<>	<name>
2008	292	<aphaerese>	<aphaerese>
2008	1975	<>	<aphaerese>
2008	1975	<>	<elision3>
2008	1975	<>	<elision2>
2008	1975	<>	<elision1>
2008	288	.	υ
2008	288	.	u
2008	288	.	α
2008	288	.	a
2009	2010	<>	<name>
2009	2009	<>	<aphaerese>
2009	2009	<>	<elision3>
2009	2009	<>	<elision2>
2009	2009	<>	<elision1>
2009	1956	<K2kl>	<>
2010	2011	<>	<aphaerese>
2010	2011	<>	<elision3>
2010	2011	<>	<elision2>
2010	2011	<>	<elision1>
2010	1957	<K2kl>	<>
2011	2009	<>	<aphaerese>
2011	2009	<>	<elision3>
2011	2009	<>	<elision2>
2011	2009	<>	<elision1>
2011	1958	<K2kl>	<>
2012	2013	<>	<name>
2012	2012	<>	<aphaerese>
2012	2012	<>	<elision3>
2012	2012	<>	<elision2>
2012	2012	<>	<elision1>
2012	1956	<L2kl>	<>
2013	2014	<>	<aphaerese>
2013	2014	<>	<elision3>
2013	2014	<>	<elision2>
2013	2014	<>	<elision1>
2013	1957	<L2kl>	<>
2014	2012	<>	<aphaerese>
2014	2012	<>	<elision3>
2014	2012	<>	<elision2>
2014	2012	<>	<elision1>
2014	1958	<L2kl>	<>
2015	2016	<>	<aphaerese>
2015	2016	<>	<elision3>
2015	2016	<>	<elision2>
2015	2016	<>	<elision1>
2015	1784	<3s>	<>
2016	2017	<>	<name>
2016	2016	<>	<aphaerese>
2016	2016	<>	<elision3>
2016	2016	<>	<elision2>
2016	2016	<>	<elision1>
2016	1785	<3s>	<>
2017	2015	<>	<aphaerese>
2017	2015	<>	<elision3>
2017	2015	<>	<elision2>
2017	2015	<>	<elision1>
2017	1786	<3s>	<>
2018	2019	<>	<aphaerese>
2018	2019	<>	<elision3>
2018	2019	<>	<elision2>
2018	2019	<>	<elision1>
2018	1923	<3s>	<>
2019	2020	<>	<name>
2019	2019	<>	<aphaerese>
2019	2019	<>	<elision3>
2019	2019	<>	<elision2>
2019	2019	<>	<elision1>
2019	1924	<3s>	<>
2020	2018	<>	<aphaerese>
2020	2018	<>	<elision3>
2020	2018	<>	<elision2>
2020	2018	<>	<elision1>
2020	1925	<3s>	<>
2021	1772	.	.
2021	1772	 	 
2021	1772	<~>	<~>
2021	1772	<split-s>	<split-s>
2021	1772	<split-h>	<split-h>
2021	1772	<name2>	<name2>
2021	2022	<>	<name>
2021	1775	<aphaerese>	<aphaerese>
2021	2021	<>	<aphaerese>
2021	2024	<elision3>	<elision3>
2021	2021	<>	<elision3>
2021	2024	<elision2>	<elision2>
2021	2021	<>	<elision2>
2021	2024	<elision1>	<elision1>
2021	2021	<>	<elision1>
2021	1936	.	υ
2021	1936	.	u
2021	1936	.	κ
2021	1936	.	α
2021	1936	.	a
2021	1936	.	λ
2021	2125	<4s>	<>
2022	1774	.	.
2022	1774	 	 
2022	1774	<~>	<~>
2022	1774	<split-s>	<split-s>
2022	1774	<split-h>	<split-h>
2022	1774	<name2>	<name2>
2022	1777	<aphaerese>	<aphaerese>
2022	2023	<>	<aphaerese>
2022	2026	<elision3>	<elision3>
2022	2023	<>	<elision3>
2022	2026	<elision2>	<elision2>
2022	2023	<>	<elision2>
2022	2026	<elision1>	<elision1>
2022	2023	<>	<elision1>
2022	1938	.	υ
2022	1938	.	u
2022	1938	.	κ
2022	1938	.	α
2022	1938	.	a
2022	1938	.	λ
2022	2126	<4s>	<>
2023	1772	.	.
2023	1772	 	 
2023	1772	<~>	<~>
2023	1772	<split-s>	<split-s>
2023	1772	<split-h>	<split-h>
2023	1772	<name2>	<name2>
2023	1775	<aphaerese>	<aphaerese>
2023	2021	<>	<aphaerese>
2023	2024	<elision3>	<elision3>
2023	2021	<>	<elision3>
2023	2024	<elision2>	<elision2>
2023	2021	<>	<elision2>
2023	2024	<elision1>	<elision1>
2023	2021	<>	<elision1>
2023	1936	.	υ
2023	1936	.	u
2023	1936	.	κ
2023	1936	.	α
2023	1936	.	a
2023	1936	.	λ
2023	2124	<4s>	<>
2024	1772	.	.
2024	1772	 	 
2024	1772	<~>	<~>
2024	1772	<split-s>	<split-s>
2024	1772	<split-h>	<split-h>
2024	1772	<name2>	<name2>
2024	2025	<>	<name>
2024	1775	<aphaerese>	<aphaerese>
2024	2024	<>	<aphaerese>
2024	1772	<elision3>	<elision3>
2024	2024	<>	<elision3>
2024	1772	<elision2>	<elision2>
2024	2024	<>	<elision2>
2024	1772	<elision1>	<elision1>
2024	2024	<>	<elision1>
2024	1936	.	υ
2024	1936	.	u
2024	1778	.	κ
2024	1936	.	α
2024	1936	.	a
2024	2028	<4s>	<>
2025	1774	.	.
2025	1774	 	 
2025	1774	<~>	<~>
2025	1774	<split-s>	<split-s>
2025	1774	<split-h>	<split-h>
2025	1774	<name2>	<name2>
2025	1777	<aphaerese>	<aphaerese>
2025	2026	<>	<aphaerese>
2025	1774	<elision3>	<elision3>
2025	2026	<>	<elision3>
2025	1774	<elision2>	<elision2>
2025	2026	<>	<elision2>
2025	1774	<elision1>	<elision1>
2025	2026	<>	<elision1>
2025	1938	.	υ
2025	1938	.	u
2025	1780	.	κ
2025	1938	.	α
2025	1938	.	a
2025	2029	<4s>	<>
2026	1772	.	.
2026	1772	 	 
2026	1772	<~>	<~>
2026	1772	<split-s>	<split-s>
2026	1772	<split-h>	<split-h>
2026	1772	<name2>	<name2>
2026	1775	<aphaerese>	<aphaerese>
2026	2024	<>	<aphaerese>
2026	1772	<elision3>	<elision3>
2026	2024	<>	<elision3>
2026	1772	<elision2>	<elision2>
2026	2024	<>	<elision2>
2026	1772	<elision1>	<elision1>
2026	2024	<>	<elision1>
2026	1936	.	υ
2026	1936	.	u
2026	1778	.	κ
2026	1936	.	α
2026	1936	.	a
2026	2027	<4s>	<>
2027	251	.	.
2027	252	 	 
2027	251	<~>	<~>
2027	251	<split-s>	<split-s>
2027	251	<split-h>	<split-h>
2027	251	<name2>	<name2>
2027	255	<aphaerese>	<aphaerese>
2027	2028	<>	<aphaerese>
2027	251	<elision3>	<elision3>
2027	2028	<>	<elision3>
2027	251	<elision2>	<elision2>
2027	2028	<>	<elision2>
2027	251	<elision1>	<elision1>
2027	2028	<>	<elision1>
2027	1546	.	υ
2027	1590	H	υ
2027	1546	.	u
2027	1592	H	u
2027	258	.	κ
2027	2111	H	κ
2027	2115	H	k
2027	1513	H	U
2027	2119	H	K
2027	1546	.	α
2027	1576	H	α
2027	1546	.	a
2027	1581	H	a
2027	1343	H	A
2027	2067	H	λ
2027	2073	H	l
2027	2123	H	L
2027	2076	<K>	<>
2028	251	.	.
2028	252	 	 
2028	251	<~>	<~>
2028	251	<split-s>	<split-s>
2028	251	<split-h>	<split-h>
2028	251	<name2>	<name2>
2028	2029	<>	<name>
2028	255	<aphaerese>	<aphaerese>
2028	2028	<>	<aphaerese>
2028	251	<elision3>	<elision3>
2028	2028	<>	<elision3>
2028	251	<elision2>	<elision2>
2028	2028	<>	<elision2>
2028	251	<elision1>	<elision1>
2028	2028	<>	<elision1>
2028	1546	.	υ
2028	1590	H	υ
2028	1546	.	u
2028	1592	H	u
2028	258	.	κ
2028	2111	H	κ
2028	2115	H	k
2028	1513	H	U
2028	2119	H	K
2028	1546	.	α
2028	1576	H	α
2028	1546	.	a
2028	1581	H	a
2028	1343	H	A
2028	2067	H	λ
2028	2073	H	l
2028	2123	H	L
2028	2077	<K>	<>
2029	250	.	.
2029	254	 	 
2029	250	<~>	<~>
2029	250	<split-s>	<split-s>
2029	250	<split-h>	<split-h>
2029	250	<name2>	<name2>
2029	257	<aphaerese>	<aphaerese>
2029	2027	<>	<aphaerese>
2029	250	<elision3>	<elision3>
2029	2027	<>	<elision3>
2029	250	<elision2>	<elision2>
2029	2027	<>	<elision2>
2029	250	<elision1>	<elision1>
2029	2027	<>	<elision1>
2029	1548	.	υ
2029	1585	H	υ
2029	1548	.	u
2029	1589	H	u
2029	260	.	κ
2029	2030	H	κ
2029	2049	H	k
2029	1515	H	U
2029	2062	H	K
2029	1548	.	α
2029	1575	H	α
2029	1548	.	a
2029	1580	H	a
2029	1346	H	A
2029	2066	H	λ
2029	2072	H	l
2029	2070	H	L
2029	2075	<K>	<>
2030	2031	<>	<aphaerese>
2030	2031	<>	<elision3>
2030	2031	<>	<elision2>
2030	2031	<>	<elision1>
2030	2034	<kappa2K>	<>
2030	2046	<kappa2L>	<>
2030	1496	<lambda2L>	<>
2031	2032	<>	<name>
2031	2031	<>	<aphaerese>
2031	2031	<>	<elision3>
2031	2031	<>	<elision2>
2031	2031	<>	<elision1>
2031	2035	<kappa2K>	<>
2031	2038	<kappa2L>	<>
2031	1494	<lambda2L>	<>
2032	2033	<>	<aphaerese>
2032	2033	<>	<elision3>
2032	2033	<>	<elision2>
2032	2033	<>	<elision1>
2032	2036	<kappa2K>	<>
2032	2039	<kappa2L>	<>
2032	1495	<lambda2L>	<>
2033	2031	<>	<aphaerese>
2033	2031	<>	<elision3>
2033	2031	<>	<elision2>
2033	2031	<>	<elision1>
2033	2034	<kappa2K>	<>
2033	2037	<kappa2L>	<>
2033	1496	<lambda2L>	<>
2034	1177	.	.
2034	1178	 	 
2034	1177	<~>	<~>
2034	1177	<split-s>	<split-s>
2034	1177	<split-h>	<split-h>
2034	1177	<name2>	<name2>
2034	1181	<aphaerese>	<aphaerese>
2034	2035	<>	<aphaerese>
2034	1314	<elision3>	<elision3>
2034	2035	<>	<elision3>
2034	1314	<elision2>	<elision2>
2034	2035	<>	<elision2>
2034	1314	<elision1>	<elision1>
2034	2035	<>	<elision1>
2034	1185	.	υ
2034	1188	s	υ
2034	1185	.	u
2034	1188	s	u
2034	1251	s	U
2034	1185	.	α
2034	1279	s	α
2034	1185	.	a
2034	1279	s	a
2034	1282	s	A
2035	1177	.	.
2035	1178	 	 
2035	1177	<~>	<~>
2035	1177	<split-s>	<split-s>
2035	1177	<split-h>	<split-h>
2035	1177	<name2>	<name2>
2035	2036	<>	<name>
2035	1181	<aphaerese>	<aphaerese>
2035	2035	<>	<aphaerese>
2035	1314	<elision3>	<elision3>
2035	2035	<>	<elision3>
2035	1314	<elision2>	<elision2>
2035	2035	<>	<elision2>
2035	1314	<elision1>	<elision1>
2035	2035	<>	<elision1>
2035	1185	.	υ
2035	1188	s	υ
2035	1185	.	u
2035	1188	s	u
2035	1251	s	U
2035	1185	.	α
2035	1279	s	α
2035	1185	.	a
2035	1279	s	a
2035	1282	s	A
2036	1180	.	.
2036	1183	 	 
2036	1180	<~>	<~>
2036	1180	<split-s>	<split-s>
2036	1180	<split-h>	<split-h>
2036	1180	<name2>	<name2>
2036	1309	<aphaerese>	<aphaerese>
2036	2034	<>	<aphaerese>
2036	1316	<elision3>	<elision3>
2036	2034	<>	<elision3>
2036	1316	<elision2>	<elision2>
2036	2034	<>	<elision2>
2036	1316	<elision1>	<elision1>
2036	2034	<>	<elision1>
2036	1187	.	υ
2036	1190	s	υ
2036	1187	.	u
2036	1190	s	u
2036	1253	s	U
2036	1187	.	α
2036	1281	s	α
2036	1187	.	a
2036	1281	s	a
2036	1284	s	A
2037	1343	.	.
2037	1344	 	 
2037	1343	<~>	<~>
2037	1343	<split-s>	<split-s>
2037	1343	<split-h>	<split-h>
2037	1343	<name2>	<name2>
2037	1347	<aphaerese>	<aphaerese>
2037	2038	<>	<aphaerese>
2037	1460	<elision3>	<elision3>
2037	2038	<>	<elision3>
2037	1460	<elision2>	<elision2>
2037	2038	<>	<elision2>
2037	1460	<elision1>	<elision1>
2037	2038	<>	<elision1>
2037	1351	.	υ
2037	1354	s	υ
2037	1351	.	u
2037	1354	s	u
2037	1400	s	U
2037	1351	.	α
2037	1425	s	α
2037	1351	.	a
2037	1425	s	a
2037	1428	s	A
2037	2041	<1s>	<>
2038	1343	.	.
2038	1344	 	 
2038	1343	<~>	<~>
2038	1343	<split-s>	<split-s>
2038	1343	<split-h>	<split-h>
2038	1343	<name2>	<name2>
2038	2039	<>	<name>
2038	1347	<aphaerese>	<aphaerese>
2038	2038	<>	<aphaerese>
2038	1460	<elision3>	<elision3>
2038	2038	<>	<elision3>
2038	1460	<elision2>	<elision2>
2038	2038	<>	<elision2>
2038	1460	<elision1>	<elision1>
2038	2038	<>	<elision1>
2038	1351	.	υ
2038	1354	s	υ
2038	1351	.	u
2038	1354	s	u
2038	1400	s	U
2038	1351	.	α
2038	1425	s	α
2038	1351	.	a
2038	1425	s	a
2038	1428	s	A
2038	2042	<1s>	<>
2039	1346	.	.
2039	1349	 	 
2039	1346	<~>	<~>
2039	1346	<split-s>	<split-s>
2039	1346	<split-h>	<split-h>
2039	1346	<name2>	<name2>
2039	1455	<aphaerese>	<aphaerese>
2039	2037	<>	<aphaerese>
2039	1462	<elision3>	<elision3>
2039	2037	<>	<elision3>
2039	1462	<elision2>	<elision2>
2039	2037	<>	<elision2>
2039	1462	<elision1>	<elision1>
2039	2037	<>	<elision1>
2039	1353	.	υ
2039	1356	s	υ
2039	1353	.	u
2039	1356	s	u
2039	1402	s	U
2039	1353	.	α
2039	1427	s	α
2039	1353	.	a
2039	1427	s	a
2039	1430	s	A
2039	2040	<1s>	<>
2040	2041	<>	<aphaerese>
2040	2041	<>	<elision3>
2040	2041	<>	<elision2>
2040	2041	<>	<elision1>
2040	2044	<K>	<>
2041	2042	<>	<aphaerese>
2041	2042	<>	<elision3>
2041	2042	<>	<elision2>
2041	2042	<>	<elision1>
2041	2045	<K>	<>
2042	2040	<>	<name>
2042	2042	<>	<aphaerese>
2042	2042	<>	<elision3>
2042	2042	<>	<elision2>
2042	2042	<>	<elision1>
2042	2043	<K>	<>
2043	289	.	.
2043	289	<~>	<~>
2043	289	<split-s>	<split-s>
2043	289	<split-h>	<split-h>
2043	289	<name2>	<name2>
2043	2044	<>	<name>
2043	292	<aphaerese>	<aphaerese>
2043	2043	<>	<aphaerese>
2043	492	<elision3>	<elision3>
2043	2043	<>	<elision3>
2043	492	<elision2>	<elision2>
2043	2043	<>	<elision2>
2043	492	<elision1>	<elision1>
2043	2043	<>	<elision1>
2043	288	.	υ
2043	376	H	υ
2043	288	.	u
2043	385	H	u
2043	361	H	U
2043	288	.	α
2043	388	H	α
2043	288	.	a
2043	391	H	a
2043	347	H	A
2044	291	.	.
2044	291	<~>	<~>
2044	291	<split-s>	<split-s>
2044	291	<split-h>	<split-h>
2044	291	<name2>	<name2>
2044	294	<aphaerese>	<aphaerese>
2044	2045	<>	<aphaerese>
2044	491	<elision3>	<elision3>
2044	2045	<>	<elision3>
2044	491	<elision2>	<elision2>
2044	2045	<>	<elision2>
2044	491	<elision1>	<elision1>
2044	2045	<>	<elision1>
2044	287	.	υ
2044	378	H	υ
2044	287	.	u
2044	387	H	u
2044	363	H	U
2044	287	.	α
2044	390	H	α
2044	287	.	a
2044	393	H	a
2044	346	H	A
2045	289	.	.
2045	289	<~>	<~>
2045	289	<split-s>	<split-s>
2045	289	<split-h>	<split-h>
2045	289	<name2>	<name2>
2045	292	<aphaerese>	<aphaerese>
2045	2043	<>	<aphaerese>
2045	492	<elision3>	<elision3>
2045	2043	<>	<elision3>
2045	492	<elision2>	<elision2>
2045	2043	<>	<elision2>
2045	492	<elision1>	<elision1>
2045	2043	<>	<elision1>
2045	288	.	υ
2045	376	H	υ
2045	288	.	u
2045	385	H	u
2045	361	H	U
2045	288	.	α
2045	388	H	α
2045	288	.	a
2045	391	H	a
2045	347	H	A
2046	1343	.	.
2046	1344	 	 
2046	1343	<~>	<~>
2046	1343	<split-s>	<split-s>
2046	1343	<split-h>	<split-h>
2046	1343	<name2>	<name2>
2046	1347	<aphaerese>	<aphaerese>
2046	2038	<>	<aphaerese>
2046	1460	<elision3>	<elision3>
2046	2038	<>	<elision3>
2046	1460	<elision2>	<elision2>
2046	2038	<>	<elision2>
2046	1460	<elision1>	<elision1>
2046	2038	<>	<elision1>
2046	1351	.	υ
2046	1354	s	υ
2046	1351	.	u
2046	1354	s	u
2046	1400	s	U
2046	1351	.	α
2046	1425	s	α
2046	1351	.	a
2046	1425	s	a
2046	1428	s	A
2046	2047	<1s>	<>
2047	2042	<>	<aphaerese>
2047	2042	<>	<elision3>
2047	2042	<>	<elision2>
2047	2042	<>	<elision1>
2047	2048	<K>	<>
2048	289	.	.
2048	289	<~>	<~>
2048	289	<split-s>	<split-s>
2048	289	<split-h>	<split-h>
2048	289	<name2>	<name2>
2048	292	<aphaerese>	<aphaerese>
2048	2043	<>	<aphaerese>
2048	492	<elision3>	<elision3>
2048	2043	<>	<elision3>
2048	492	<elision2>	<elision2>
2048	2043	<>	<elision2>
2048	492	<elision1>	<elision1>
2048	2043	<>	<elision1>
2048	288	.	υ
2048	288	.	u
2048	288	.	α
2048	288	.	a
2049	2050	<>	<aphaerese>
2049	2050	<>	<elision3>
2049	2050	<>	<elision2>
2049	2050	<>	<elision1>
2049	2053	<k2K>	<>
2049	2059	<k2L>	<>
2049	1496	<l2L>	<>
2050	2051	<>	<name>
2050	2050	<>	<aphaerese>
2050	2050	<>	<elision3>
2050	2050	<>	<elision2>
2050	2050	<>	<elision1>
2050	2054	<k2K>	<>
2050	2057	<k2L>	<>
2050	1494	<l2L>	<>
2051	2052	<>	<aphaerese>
2051	2052	<>	<elision3>
2051	2052	<>	<elision2>
2051	2052	<>	<elision1>
2051	2055	<k2K>	<>
2051	2058	<k2L>	<>
2051	1495	<l2L>	<>
2052	2050	<>	<aphaerese>
2052	2050	<>	<elision3>
2052	2050	<>	<elision2>
2052	2050	<>	<elision1>
2052	2053	<k2K>	<>
2052	2056	<k2L>	<>
2052	1496	<l2L>	<>
2053	1177	.	.
2053	1178	 	 
2053	1177	<~>	<~>
2053	1177	<split-s>	<split-s>
2053	1177	<split-h>	<split-h>
2053	1177	<name2>	<name2>
2053	1181	<aphaerese>	<aphaerese>
2053	2054	<>	<aphaerese>
2053	1177	<elision3>	<elision3>
2053	2054	<>	<elision3>
2053	1177	<elision2>	<elision2>
2053	2054	<>	<elision2>
2053	1177	<elision1>	<elision1>
2053	2054	<>	<elision1>
2053	1185	.	υ
2053	1188	s	υ
2053	1185	.	u
2053	1188	s	u
2053	1251	s	U
2053	1185	.	α
2053	1279	s	α
2053	1185	.	a
2053	1279	s	a
2053	1282	s	A
2054	1177	.	.
2054	1178	 	 
2054	1177	<~>	<~>
2054	1177	<split-s>	<split-s>
2054	1177	<split-h>	<split-h>
2054	1177	<name2>	<name2>
2054	2055	<>	<name>
2054	1181	<aphaerese>	<aphaerese>
2054	2054	<>	<aphaerese>
2054	1177	<elision3>	<elision3>
2054	2054	<>	<elision3>
2054	1177	<elision2>	<elision2>
2054	2054	<>	<elision2>
2054	1177	<elision1>	<elision1>
2054	2054	<>	<elision1>
2054	1185	.	υ
2054	1188	s	υ
2054	1185	.	u
2054	1188	s	u
2054	1251	s	U
2054	1185	.	α
2054	1279	s	α
2054	1185	.	a
2054	1279	s	a
2054	1282	s	A
2055	1180	.	.
2055	1183	 	 
2055	1180	<~>	<~>
2055	1180	<split-s>	<split-s>
2055	1180	<split-h>	<split-h>
2055	1180	<name2>	<name2>
2055	1309	<aphaerese>	<aphaerese>
2055	2053	<>	<aphaerese>
2055	1180	<elision3>	<elision3>
2055	2053	<>	<elision3>
2055	1180	<elision2>	<elision2>
2055	2053	<>	<elision2>
2055	1180	<elision1>	<elision1>
2055	2053	<>	<elision1>
2055	1187	.	υ
2055	1190	s	υ
2055	1187	.	u
2055	1190	s	u
2055	1253	s	U
2055	1187	.	α
2055	1281	s	α
2055	1187	.	a
2055	1281	s	a
2055	1284	s	A
2056	1343	.	.
2056	1344	 	 
2056	1343	<~>	<~>
2056	1343	<split-s>	<split-s>
2056	1343	<split-h>	<split-h>
2056	1343	<name2>	<name2>
2056	1347	<aphaerese>	<aphaerese>
2056	2057	<>	<aphaerese>
2056	1343	<elision3>	<elision3>
2056	2057	<>	<elision3>
2056	1343	<elision2>	<elision2>
2056	2057	<>	<elision2>
2056	1343	<elision1>	<elision1>
2056	2057	<>	<elision1>
2056	1351	.	υ
2056	1354	s	υ
2056	1351	.	u
2056	1354	s	u
2056	1400	s	U
2056	1351	.	α
2056	1425	s	α
2056	1351	.	a
2056	1425	s	a
2056	1428	s	A
2056	758	<1s>	<>
2057	1343	.	.
2057	1344	 	 
2057	1343	<~>	<~>
2057	1343	<split-s>	<split-s>
2057	1343	<split-h>	<split-h>
2057	1343	<name2>	<name2>
2057	2058	<>	<name>
2057	1347	<aphaerese>	<aphaerese>
2057	2057	<>	<aphaerese>
2057	1343	<elision3>	<elision3>
2057	2057	<>	<elision3>
2057	1343	<elision2>	<elision2>
2057	2057	<>	<elision2>
2057	1343	<elision1>	<elision1>
2057	2057	<>	<elision1>
2057	1351	.	υ
2057	1354	s	υ
2057	1351	.	u
2057	1354	s	u
2057	1400	s	U
2057	1351	.	α
2057	1425	s	α
2057	1351	.	a
2057	1425	s	a
2057	1428	s	A
2057	759	<1s>	<>
2058	1346	.	.
2058	1349	 	 
2058	1346	<~>	<~>
2058	1346	<split-s>	<split-s>
2058	1346	<split-h>	<split-h>
2058	1346	<name2>	<name2>
2058	1455	<aphaerese>	<aphaerese>
2058	2056	<>	<aphaerese>
2058	1346	<elision3>	<elision3>
2058	2056	<>	<elision3>
2058	1346	<elision2>	<elision2>
2058	2056	<>	<elision2>
2058	1346	<elision1>	<elision1>
2058	2056	<>	<elision1>
2058	1353	.	υ
2058	1356	s	υ
2058	1353	.	u
2058	1356	s	u
2058	1402	s	U
2058	1353	.	α
2058	1427	s	α
2058	1353	.	a
2058	1427	s	a
2058	1430	s	A
2058	760	<1s>	<>
2059	1343	.	.
2059	1344	 	 
2059	1343	<~>	<~>
2059	1343	<split-s>	<split-s>
2059	1343	<split-h>	<split-h>
2059	1343	<name2>	<name2>
2059	1347	<aphaerese>	<aphaerese>
2059	2057	<>	<aphaerese>
2059	1343	<elision3>	<elision3>
2059	2057	<>	<elision3>
2059	1343	<elision2>	<elision2>
2059	2057	<>	<elision2>
2059	1343	<elision1>	<elision1>
2059	2057	<>	<elision1>
2059	1351	.	υ
2059	1354	s	υ
2059	1351	.	u
2059	1354	s	u
2059	1400	s	U
2059	1351	.	α
2059	1425	s	α
2059	1351	.	a
2059	1425	s	a
2059	1428	s	A
2059	2060	<1s>	<>
2060	759	<>	<aphaerese>
2060	759	<>	<elision3>
2060	759	<>	<elision2>
2060	759	<>	<elision1>
2060	2061	<K>	<>
2061	289	.	.
2061	289	<~>	<~>
2061	289	<split-s>	<split-s>
2061	289	<split-h>	<split-h>
2061	289	<name2>	<name2>
2061	292	<aphaerese>	<aphaerese>
2061	763	<>	<aphaerese>
2061	289	<elision3>	<elision3>
2061	763	<>	<elision3>
2061	289	<elision2>	<elision2>
2061	763	<>	<elision2>
2061	289	<elision1>	<elision1>
2061	763	<>	<elision1>
2061	288	.	υ
2061	288	.	u
2061	288	.	α
2061	288	.	a
2062	1177	.	.
2062	1178	 	 
2062	1177	<~>	<~>
2062	1177	<split-s>	<split-s>
2062	1177	<split-h>	<split-h>
2062	1177	<name2>	<name2>
2062	1181	<aphaerese>	<aphaerese>
2062	2063	<>	<aphaerese>
2062	1177	<elision3>	<elision3>
2062	2063	<>	<elision3>
2062	1177	<elision2>	<elision2>
2062	2063	<>	<elision2>
2062	1177	<elision1>	<elision1>
2062	2063	<>	<elision1>
2062	1185	.	υ
2062	1188	s	υ
2062	1185	.	u
2062	1188	s	u
2062	1351	.	κ
2062	1251	s	U
2062	1185	.	α
2062	1279	s	α
2062	1185	.	a
2062	1279	s	a
2062	1282	s	A
2062	1351	.	λ
2062	674	<1s>	<>
2062	2059	<K2L>	<>
2063	1177	.	.
2063	1178	 	 
2063	1177	<~>	<~>
2063	1177	<split-s>	<split-s>
2063	1177	<split-h>	<split-h>
2063	1177	<name2>	<name2>
2063	2064	<>	<name>
2063	1181	<aphaerese>	<aphaerese>
2063	2063	<>	<aphaerese>
2063	1177	<elision3>	<elision3>
2063	2063	<>	<elision3>
2063	1177	<elision2>	<elision2>
2063	2063	<>	<elision2>
2063	1177	<elision1>	<elision1>
2063	2063	<>	<elision1>
2063	1185	.	υ
2063	1188	s	υ
2063	1185	.	u
2063	1188	s	u
2063	1351	.	κ
2063	1251	s	U
2063	1185	.	α
2063	1279	s	α
2063	1185	.	a
2063	1279	s	a
2063	1282	s	A
2063	1351	.	λ
2063	675	<1s>	<>
2063	2057	<K2L>	<>
2064	1180	.	.
2064	1183	 	 
2064	1180	<~>	<~>
2064	1180	<split-s>	<split-s>
2064	1180	<split-h>	<split-h>
2064	1180	<name2>	<name2>
2064	1309	<aphaerese>	<aphaerese>
2064	2065	<>	<aphaerese>
2064	1180	<elision3>	<elision3>
2064	2065	<>	<elision3>
2064	1180	<elision2>	<elision2>
2064	2065	<>	<elision2>
2064	1180	<elision1>	<elision1>
2064	2065	<>	<elision1>
2064	1187	.	υ
2064	1190	s	υ
2064	1187	.	u
2064	1190	s	u
2064	1353	.	κ
2064	1253	s	U
2064	1187	.	α
2064	1281	s	α
2064	1187	.	a
2064	1281	s	a
2064	1284	s	A
2064	1353	.	λ
2064	676	<1s>	<>
2064	2058	<K2L>	<>
2065	1177	.	.
2065	1178	 	 
2065	1177	<~>	<~>
2065	1177	<split-s>	<split-s>
2065	1177	<split-h>	<split-h>
2065	1177	<name2>	<name2>
2065	1181	<aphaerese>	<aphaerese>
2065	2063	<>	<aphaerese>
2065	1177	<elision3>	<elision3>
2065	2063	<>	<elision3>
2065	1177	<elision2>	<elision2>
2065	2063	<>	<elision2>
2065	1177	<elision1>	<elision1>
2065	2063	<>	<elision1>
2065	1185	.	υ
2065	1188	s	υ
2065	1185	.	u
2065	1188	s	u
2065	1351	.	κ
2065	1251	s	U
2065	1185	.	α
2065	1279	s	α
2065	1185	.	a
2065	1279	s	a
2065	1282	s	A
2065	1351	.	λ
2065	674	<1s>	<>
2065	2056	<K2L>	<>
2066	2067	<>	<aphaerese>
2066	2067	<>	<elision3>
2066	2067	<>	<elision2>
2066	2067	<>	<elision1>
2066	2070	<lambda2L>	<>
2067	2068	<>	<name>
2067	2067	<>	<aphaerese>
2067	2067	<>	<elision3>
2067	2067	<>	<elision2>
2067	2067	<>	<elision1>
2067	2071	<lambda2L>	<>
2068	2066	<>	<aphaerese>
2068	2066	<>	<elision3>
2068	2066	<>	<elision2>
2068	2066	<>	<elision1>
2068	2069	<lambda2L>	<>
2069	1346	.	.
2069	1349	 	 
2069	1346	<~>	<~>
2069	1346	<split-s>	<split-s>
2069	1346	<split-h>	<split-h>
2069	1346	<name2>	<name2>
2069	1455	<aphaerese>	<aphaerese>
2069	2070	<>	<aphaerese>
2069	1346	<elision3>	<elision3>
2069	2070	<>	<elision3>
2069	1346	<elision2>	<elision2>
2069	2070	<>	<elision2>
2069	1346	<elision1>	<elision1>
2069	2070	<>	<elision1>
2069	1353	.	υ
2069	1356	s	υ
2069	1353	.	u
2069	1356	s	u
2069	1353	.	κ
2069	1402	s	U
2069	1353	.	α
2069	1427	s	α
2069	1353	.	a
2069	1427	s	a
2069	1430	s	A
2069	1353	.	λ
2069	747	<1s>	<>
2070	1343	.	.
2070	1344	 	 
2070	1343	<~>	<~>
2070	1343	<split-s>	<split-s>
2070	1343	<split-h>	<split-h>
2070	1343	<name2>	<name2>
2070	1347	<aphaerese>	<aphaerese>
2070	2071	<>	<aphaerese>
2070	1343	<elision3>	<elision3>
2070	2071	<>	<elision3>
2070	1343	<elision2>	<elision2>
2070	2071	<>	<elision2>
2070	1343	<elision1>	<elision1>
2070	2071	<>	<elision1>
2070	1351	.	υ
2070	1354	s	υ
2070	1351	.	u
2070	1354	s	u
2070	1351	.	κ
2070	1400	s	U
2070	1351	.	α
2070	1425	s	α
2070	1351	.	a
2070	1425	s	a
2070	1428	s	A
2070	1351	.	λ
2070	745	<1s>	<>
2071	1343	.	.
2071	1344	 	 
2071	1343	<~>	<~>
2071	1343	<split-s>	<split-s>
2071	1343	<split-h>	<split-h>
2071	1343	<name2>	<name2>
2071	2069	<>	<name>
2071	1347	<aphaerese>	<aphaerese>
2071	2071	<>	<aphaerese>
2071	1343	<elision3>	<elision3>
2071	2071	<>	<elision3>
2071	1343	<elision2>	<elision2>
2071	2071	<>	<elision2>
2071	1343	<elision1>	<elision1>
2071	2071	<>	<elision1>
2071	1351	.	υ
2071	1354	s	υ
2071	1351	.	u
2071	1354	s	u
2071	1351	.	κ
2071	1400	s	U
2071	1351	.	α
2071	1425	s	α
2071	1351	.	a
2071	1425	s	a
2071	1428	s	A
2071	1351	.	λ
2071	746	<1s>	<>
2072	2073	<>	<aphaerese>
2072	2073	<>	<elision3>
2072	2073	<>	<elision2>
2072	2073	<>	<elision1>
2072	2070	<l2L>	<>
2073	2074	<>	<name>
2073	2073	<>	<aphaerese>
2073	2073	<>	<elision3>
2073	2073	<>	<elision2>
2073	2073	<>	<elision1>
2073	2071	<l2L>	<>
2074	2072	<>	<aphaerese>
2074	2072	<>	<elision3>
2074	2072	<>	<elision2>
2074	2072	<>	<elision1>
2074	2069	<l2L>	<>
2075	1598	.	.
2075	1598	<~>	<~>
2075	1598	<split-s>	<split-s>
2075	1598	<split-h>	<split-h>
2075	1598	<name2>	<name2>
2075	1601	<aphaerese>	<aphaerese>
2075	2076	<>	<aphaerese>
2075	1598	<elision3>	<elision3>
2075	2076	<>	<elision3>
2075	1598	<elision2>	<elision2>
2075	2076	<>	<elision2>
2075	1598	<elision1>	<elision1>
2075	2076	<>	<elision1>
2075	1594	.	υ
2075	1740	H	υ
2075	1594	.	u
2075	1749	H	u
2075	1604	.	κ
2075	2080	H	κ
2075	2089	H	k
2075	1718	H	U
2075	2098	H	K
2075	1594	.	α
2075	1752	H	α
2075	1594	.	a
2075	1755	H	a
2075	1689	H	A
2075	2103	H	λ
2075	2109	H	l
2075	2104	H	L
2076	1596	.	.
2076	1596	<~>	<~>
2076	1596	<split-s>	<split-s>
2076	1596	<split-h>	<split-h>
2076	1596	<name2>	<name2>
2076	1599	<aphaerese>	<aphaerese>
2076	2077	<>	<aphaerese>
2076	1596	<elision3>	<elision3>
2076	2077	<>	<elision3>
2076	1596	<elision2>	<elision2>
2076	2077	<>	<elision2>
2076	1596	<elision1>	<elision1>
2076	2077	<>	<elision1>
2076	1595	.	υ
2076	1738	H	υ
2076	1595	.	u
2076	1747	H	u
2076	1602	.	κ
2076	2078	H	κ
2076	2087	H	k
2076	1716	H	U
2076	2096	H	K
2076	1595	.	α
2076	1750	H	α
2076	1595	.	a
2076	1753	H	a
2076	1687	H	A
2076	2101	H	λ
2076	2107	H	l
2076	2110	H	L
2077	1596	.	.
2077	1596	<~>	<~>
2077	1596	<split-s>	<split-s>
2077	1596	<split-h>	<split-h>
2077	1596	<name2>	<name2>
2077	2075	<>	<name>
2077	1599	<aphaerese>	<aphaerese>
2077	2077	<>	<aphaerese>
2077	1596	<elision3>	<elision3>
2077	2077	<>	<elision3>
2077	1596	<elision2>	<elision2>
2077	2077	<>	<elision2>
2077	1596	<elision1>	<elision1>
2077	2077	<>	<elision1>
2077	1595	.	υ
2077	1738	H	υ
2077	1595	.	u
2077	1747	H	u
2077	1602	.	κ
2077	2078	H	κ
2077	2087	H	k
2077	1716	H	U
2077	2096	H	K
2077	1595	.	α
2077	1750	H	α
2077	1595	.	a
2077	1753	H	a
2077	1687	H	A
2077	2101	H	λ
2077	2107	H	l
2077	2110	H	L
2078	2079	<>	<name>
2078	2078	<>	<aphaerese>
2078	2078	<>	<elision3>
2078	2078	<>	<elision2>
2078	2078	<>	<elision1>
2078	2082	<kappa2K>	<>
2078	2085	<kappa2L>	<>
2078	1705	<lambda2L>	<>
2079	2080	<>	<aphaerese>
2079	2080	<>	<elision3>
2079	2080	<>	<elision2>
2079	2080	<>	<elision1>
2079	2083	<kappa2K>	<>
2079	2086	<kappa2L>	<>
2079	1706	<lambda2L>	<>
2080	2078	<>	<aphaerese>
2080	2078	<>	<elision3>
2080	2078	<>	<elision2>
2080	2078	<>	<elision1>
2080	2081	<kappa2K>	<>
2080	2084	<kappa2L>	<>
2080	1704	<lambda2L>	<>
2081	1657	.	.
2081	1657	<~>	<~>
2081	1657	<split-s>	<split-s>
2081	1657	<split-h>	<split-h>
2081	1657	<name2>	<name2>
2081	1660	<aphaerese>	<aphaerese>
2081	2082	<>	<aphaerese>
2081	1681	<elision3>	<elision3>
2081	2082	<>	<elision3>
2081	1681	<elision2>	<elision2>
2081	2082	<>	<elision2>
2081	1681	<elision1>	<elision1>
2081	2082	<>	<elision1>
2081	1675	.	υ
2081	1628	s	υ
2081	1675	.	u
2081	1628	s	u
2081	1669	s	U
2081	1675	.	α
2081	1628	s	α
2081	1675	.	a
2081	1628	s	a
2081	1672	s	A
2081	1621	<1m>	<>
2082	1657	.	.
2082	1657	<~>	<~>
2082	1657	<split-s>	<split-s>
2082	1657	<split-h>	<split-h>
2082	1657	<name2>	<name2>
2082	2083	<>	<name>
2082	1660	<aphaerese>	<aphaerese>
2082	2082	<>	<aphaerese>
2082	1681	<elision3>	<elision3>
2082	2082	<>	<elision3>
2082	1681	<elision2>	<elision2>
2082	2082	<>	<elision2>
2082	1681	<elision1>	<elision1>
2082	2082	<>	<elision1>
2082	1675	.	υ
2082	1628	s	υ
2082	1675	.	u
2082	1628	s	u
2082	1669	s	U
2082	1675	.	α
2082	1628	s	α
2082	1675	.	a
2082	1628	s	a
2082	1672	s	A
2082	1622	<1m>	<>
2083	1659	.	.
2083	1659	<~>	<~>
2083	1659	<split-s>	<split-s>
2083	1659	<split-h>	<split-h>
2083	1659	<name2>	<name2>
2083	1662	<aphaerese>	<aphaerese>
2083	2081	<>	<aphaerese>
2083	1680	<elision3>	<elision3>
2083	2081	<>	<elision3>
2083	1680	<elision2>	<elision2>
2083	2081	<>	<elision2>
2083	1680	<elision1>	<elision1>
2083	2081	<>	<elision1>
2083	1677	.	υ
2083	1627	s	υ
2083	1677	.	u
2083	1627	s	u
2083	1671	s	U
2083	1677	.	α
2083	1627	s	α
2083	1677	.	a
2083	1627	s	a
2083	1674	s	A
2083	1620	<1m>	<>
2084	1687	.	.
2084	1687	<~>	<~>
2084	1687	<split-s>	<split-s>
2084	1687	<split-h>	<split-h>
2084	1687	<name2>	<name2>
2084	1690	<aphaerese>	<aphaerese>
2084	2085	<>	<aphaerese>
2084	1699	<elision3>	<elision3>
2084	2085	<>	<elision3>
2084	1699	<elision2>	<elision2>
2084	2085	<>	<elision2>
2084	1699	<elision1>	<elision1>
2084	2085	<>	<elision1>
2084	1693	.	υ
2084	1628	s	υ
2084	1693	.	u
2084	1628	s	u
2084	1669	s	U
2084	1693	.	α
2084	1628	s	α
2084	1693	.	a
2084	1628	s	a
2084	1672	s	A
2084	1621	<1m>	<>
2085	1687	.	.
2085	1687	<~>	<~>
2085	1687	<split-s>	<split-s>
2085	1687	<split-h>	<split-h>
2085	1687	<name2>	<name2>
2085	2086	<>	<name>
2085	1690	<aphaerese>	<aphaerese>
2085	2085	<>	<aphaerese>
2085	1699	<elision3>	<elision3>
2085	2085	<>	<elision3>
2085	1699	<elision2>	<elision2>
2085	2085	<>	<elision2>
2085	1699	<elision1>	<elision1>
2085	2085	<>	<elision1>
2085	1693	.	υ
2085	1628	s	υ
2085	1693	.	u
2085	1628	s	u
2085	1669	s	U
2085	1693	.	α
2085	1628	s	α
2085	1693	.	a
2085	1628	s	a
2085	1672	s	A
2085	1622	<1m>	<>
2086	1689	.	.
2086	1689	<~>	<~>
2086	1689	<split-s>	<split-s>
2086	1689	<split-h>	<split-h>
2086	1689	<name2>	<name2>
2086	1692	<aphaerese>	<aphaerese>
2086	2084	<>	<aphaerese>
2086	1698	<elision3>	<elision3>
2086	2084	<>	<elision3>
2086	1698	<elision2>	<elision2>
2086	2084	<>	<elision2>
2086	1698	<elision1>	<elision1>
2086	2084	<>	<elision1>
2086	1695	.	υ
2086	1627	s	υ
2086	1695	.	u
2086	1627	s	u
2086	1671	s	U
2086	1695	.	α
2086	1627	s	α
2086	1695	.	a
2086	1627	s	a
2086	1674	s	A
2086	1620	<1m>	<>
2087	2088	<>	<name>
2087	2087	<>	<aphaerese>
2087	2087	<>	<elision3>
2087	2087	<>	<elision2>
2087	2087	<>	<elision1>
2087	2091	<k2K>	<>
2087	2094	<k2L>	<>
2087	1705	<l2L>	<>
2088	2089	<>	<aphaerese>
2088	2089	<>	<elision3>
2088	2089	<>	<elision2>
2088	2089	<>	<elision1>
2088	2092	<k2K>	<>
2088	2095	<k2L>	<>
2088	1706	<l2L>	<>
2089	2087	<>	<aphaerese>
2089	2087	<>	<elision3>
2089	2087	<>	<elision2>
2089	2087	<>	<elision1>
2089	2090	<k2K>	<>
2089	2093	<k2L>	<>
2089	1704	<l2L>	<>
2090	1657	.	.
2090	1657	<~>	<~>
2090	1657	<split-s>	<split-s>
2090	1657	<split-h>	<split-h>
2090	1657	<name2>	<name2>
2090	1660	<aphaerese>	<aphaerese>
2090	2091	<>	<aphaerese>
2090	1657	<elision3>	<elision3>
2090	2091	<>	<elision3>
2090	1657	<elision2>	<elision2>
2090	2091	<>	<elision2>
2090	1657	<elision1>	<elision1>
2090	2091	<>	<elision1>
2090	1675	.	υ
2090	1628	s	υ
2090	1675	.	u
2090	1628	s	u
2090	1669	s	U
2090	1675	.	α
2090	1628	s	α
2090	1675	.	a
2090	1628	s	a
2090	1672	s	A
2090	1621	<1m>	<>
2091	1657	.	.
2091	1657	<~>	<~>
2091	1657	<split-s>	<split-s>
2091	1657	<split-h>	<split-h>
2091	1657	<name2>	<name2>
2091	2092	<>	<name>
2091	1660	<aphaerese>	<aphaerese>
2091	2091	<>	<aphaerese>
2091	1657	<elision3>	<elision3>
2091	2091	<>	<elision3>
2091	1657	<elision2>	<elision2>
2091	2091	<>	<elision2>
2091	1657	<elision1>	<elision1>
2091	2091	<>	<elision1>
2091	1675	.	υ
2091	1628	s	υ
2091	1675	.	u
2091	1628	s	u
2091	1669	s	U
2091	1675	.	α
2091	1628	s	α
2091	1675	.	a
2091	1628	s	a
2091	1672	s	A
2091	1622	<1m>	<>
2092	1659	.	.
2092	1659	<~>	<~>
2092	1659	<split-s>	<split-s>
2092	1659	<split-h>	<split-h>
2092	1659	<name2>	<name2>
2092	1662	<aphaerese>	<aphaerese>
2092	2090	<>	<aphaerese>
2092	1659	<elision3>	<elision3>
2092	2090	<>	<elision3>
2092	1659	<elision2>	<elision2>
2092	2090	<>	<elision2>
2092	1659	<elision1>	<elision1>
2092	2090	<>	<elision1>
2092	1677	.	υ
2092	1627	s	υ
2092	1677	.	u
2092	1627	s	u
2092	1671	s	U
2092	1677	.	α
2092	1627	s	α
2092	1677	.	a
2092	1627	s	a
2092	1674	s	A
2092	1620	<1m>	<>
2093	1687	.	.
2093	1687	<~>	<~>
2093	1687	<split-s>	<split-s>
2093	1687	<split-h>	<split-h>
2093	1687	<name2>	<name2>
2093	1690	<aphaerese>	<aphaerese>
2093	2094	<>	<aphaerese>
2093	1687	<elision3>	<elision3>
2093	2094	<>	<elision3>
2093	1687	<elision2>	<elision2>
2093	2094	<>	<elision2>
2093	1687	<elision1>	<elision1>
2093	2094	<>	<elision1>
2093	1693	.	υ
2093	1628	s	υ
2093	1693	.	u
2093	1628	s	u
2093	1669	s	U
2093	1693	.	α
2093	1628	s	α
2093	1693	.	a
2093	1628	s	a
2093	1672	s	A
2093	1621	<1m>	<>
2094	1687	.	.
2094	1687	<~>	<~>
2094	1687	<split-s>	<split-s>
2094	1687	<split-h>	<split-h>
2094	1687	<name2>	<name2>
2094	2095	<>	<name>
2094	1690	<aphaerese>	<aphaerese>
2094	2094	<>	<aphaerese>
2094	1687	<elision3>	<elision3>
2094	2094	<>	<elision3>
2094	1687	<elision2>	<elision2>
2094	2094	<>	<elision2>
2094	1687	<elision1>	<elision1>
2094	2094	<>	<elision1>
2094	1693	.	υ
2094	1628	s	υ
2094	1693	.	u
2094	1628	s	u
2094	1669	s	U
2094	1693	.	α
2094	1628	s	α
2094	1693	.	a
2094	1628	s	a
2094	1672	s	A
2094	1622	<1m>	<>
2095	1689	.	.
2095	1689	<~>	<~>
2095	1689	<split-s>	<split-s>
2095	1689	<split-h>	<split-h>
2095	1689	<name2>	<name2>
2095	1692	<aphaerese>	<aphaerese>
2095	2093	<>	<aphaerese>
2095	1689	<elision3>	<elision3>
2095	2093	<>	<elision3>
2095	1689	<elision2>	<elision2>
2095	2093	<>	<elision2>
2095	1689	<elision1>	<elision1>
2095	2093	<>	<elision1>
2095	1695	.	υ
2095	1627	s	υ
2095	1695	.	u
2095	1627	s	u
2095	1671	s	U
2095	1695	.	α
2095	1627	s	α
2095	1695	.	a
2095	1627	s	a
2095	1674	s	A
2095	1620	<1m>	<>
2096	1657	.	.
2096	1657	<~>	<~>
2096	1657	<split-s>	<split-s>
2096	1657	<split-h>	<split-h>
2096	1657	<name2>	<name2>
2096	1720	<name2>	<name>
2096	2097	<>	<name>
2096	1660	<aphaerese>	<aphaerese>
2096	2099	<>	<aphaerese>
2096	1657	<elision3>	<elision3>
2096	2099	<>	<elision3>
2096	1657	<elision2>	<elision2>
2096	2099	<>	<elision2>
2096	1657	<elision1>	<elision1>
2096	2099	<>	<elision1>
2096	1675	.	υ
2096	1628	s	υ
2096	1675	.	u
2096	1628	s	u
2096	1693	.	κ
2096	1669	s	U
2096	1675	.	α
2096	1628	s	α
2096	1675	.	a
2096	1628	s	a
2096	1672	s	A
2096	1693	.	λ
2096	1622	<1m>	<>
2096	1724	<k2K>	<>
2096	1725	<k2L>	<>
2096	2100	<K2L>	<>
2097	1659	.	.
2097	1659	<~>	<~>
2097	1659	<split-s>	<split-s>
2097	1659	<split-h>	<split-h>
2097	1659	<name2>	<name2>
2097	1662	<aphaerese>	<aphaerese>
2097	2098	<>	<aphaerese>
2097	1659	<elision3>	<elision3>
2097	2098	<>	<elision3>
2097	1659	<elision2>	<elision2>
2097	2098	<>	<elision2>
2097	1659	<elision1>	<elision1>
2097	2098	<>	<elision1>
2097	1677	.	υ
2097	1627	s	υ
2097	1677	.	u
2097	1627	s	u
2097	1695	.	κ
2097	1671	s	U
2097	1677	.	α
2097	1627	s	α
2097	1677	.	a
2097	1627	s	a
2097	1674	s	A
2097	1695	.	λ
2097	1620	<1m>	<>
2097	2095	<K2L>	<>
2098	1657	.	.
2098	1657	<~>	<~>
2098	1657	<split-s>	<split-s>
2098	1657	<split-h>	<split-h>
2098	1657	<name2>	<name2>
2098	1660	<aphaerese>	<aphaerese>
2098	2099	<>	<aphaerese>
2098	1657	<elision3>	<elision3>
2098	2099	<>	<elision3>
2098	1657	<elision2>	<elision2>
2098	2099	<>	<elision2>
2098	1657	<elision1>	<elision1>
2098	2099	<>	<elision1>
2098	1675	.	υ
2098	1628	s	υ
2098	1675	.	u
2098	1628	s	u
2098	1693	.	κ
2098	1669	s	U
2098	1675	.	α
2098	1628	s	α
2098	1675	.	a
2098	1628	s	a
2098	1672	s	A
2098	1693	.	λ
2098	1621	<1m>	<>
2098	2093	<K2L>	<>
2099	1657	.	.
2099	1657	<~>	<~>
2099	1657	<split-s>	<split-s>
2099	1657	<split-h>	<split-h>
2099	1657	<name2>	<name2>
2099	2097	<>	<name>
2099	1660	<aphaerese>	<aphaerese>
2099	2099	<>	<aphaerese>
2099	1657	<elision3>	<elision3>
2099	2099	<>	<elision3>
2099	1657	<elision2>	<elision2>
2099	2099	<>	<elision2>
2099	1657	<elision1>	<elision1>
2099	2099	<>	<elision1>
2099	1675	.	υ
2099	1628	s	υ
2099	1675	.	u
2099	1628	s	u
2099	1693	.	κ
2099	1669	s	U
2099	1675	.	α
2099	1628	s	α
2099	1675	.	a
2099	1628	s	a
2099	1672	s	A
2099	1693	.	λ
2099	1622	<1m>	<>
2099	2094	<K2L>	<>
2100	1687	.	.
2100	1687	<~>	<~>
2100	1687	<split-s>	<split-s>
2100	1687	<split-h>	<split-h>
2100	1687	<name2>	<name2>
2100	1726	<name2>	<name>
2100	2095	<>	<name>
2100	1690	<aphaerese>	<aphaerese>
2100	2094	<>	<aphaerese>
2100	1687	<elision3>	<elision3>
2100	2094	<>	<elision3>
2100	1687	<elision2>	<elision2>
2100	2094	<>	<elision2>
2100	1687	<elision1>	<elision1>
2100	2094	<>	<elision1>
2100	1693	.	υ
2100	1628	s	υ
2100	1693	.	u
2100	1628	s	u
2100	1669	s	U
2100	1693	.	α
2100	1628	s	α
2100	1693	.	a
2100	1628	s	a
2100	1672	s	A
2100	1622	<1m>	<>
2101	2102	<>	<name>
2101	2101	<>	<aphaerese>
2101	2101	<>	<elision3>
2101	2101	<>	<elision2>
2101	2101	<>	<elision1>
2101	2105	<lambda2L>	<>
2102	2103	<>	<aphaerese>
2102	2103	<>	<elision3>
2102	2103	<>	<elision2>
2102	2103	<>	<elision1>
2102	2106	<lambda2L>	<>
2103	2101	<>	<aphaerese>
2103	2101	<>	<elision3>
2103	2101	<>	<elision2>
2103	2101	<>	<elision1>
2103	2104	<lambda2L>	<>
2104	1687	.	.
2104	1687	<~>	<~>
2104	1687	<split-s>	<split-s>
2104	1687	<split-h>	<split-h>
2104	1687	<name2>	<name2>
2104	1690	<aphaerese>	<aphaerese>
2104	2105	<>	<aphaerese>
2104	1687	<elision3>	<elision3>
2104	2105	<>	<elision3>
2104	1687	<elision2>	<elision2>
2104	2105	<>	<elision2>
2104	1687	<elision1>	<elision1>
2104	2105	<>	<elision1>
2104	1693	.	υ
2104	1628	s	υ
2104	1693	.	u
2104	1628	s	u
2104	1693	.	κ
2104	1669	s	U
2104	1693	.	α
2104	1628	s	α
2104	1693	.	a
2104	1628	s	a
2104	1672	s	A
2104	1693	.	λ
2104	1621	<1m>	<>
2105	1687	.	.
2105	1687	<~>	<~>
2105	1687	<split-s>	<split-s>
2105	1687	<split-h>	<split-h>
2105	1687	<name2>	<name2>
2105	2106	<>	<name>
2105	1690	<aphaerese>	<aphaerese>
2105	2105	<>	<aphaerese>
2105	1687	<elision3>	<elision3>
2105	2105	<>	<elision3>
2105	1687	<elision2>	<elision2>
2105	2105	<>	<elision2>
2105	1687	<elision1>	<elision1>
2105	2105	<>	<elision1>
2105	1693	.	υ
2105	1628	s	υ
2105	1693	.	u
2105	1628	s	u
2105	1693	.	κ
2105	1669	s	U
2105	1693	.	α
2105	1628	s	α
2105	1693	.	a
2105	1628	s	a
2105	1672	s	A
2105	1693	.	λ
2105	1622	<1m>	<>
2106	1689	.	.
2106	1689	<~>	<~>
2106	1689	<split-s>	<split-s>
2106	1689	<split-h>	<split-h>
2106	1689	<name2>	<name2>
2106	1692	<aphaerese>	<aphaerese>
2106	2104	<>	<aphaerese>
2106	1689	<elision3>	<elision3>
2106	2104	<>	<elision3>
2106	1689	<elision2>	<elision2>
2106	2104	<>	<elision2>
2106	1689	<elision1>	<elision1>
2106	2104	<>	<elision1>
2106	1695	.	υ
2106	1627	s	υ
2106	1695	.	u
2106	1627	s	u
2106	1695	.	κ
2106	1671	s	U
2106	1695	.	α
2106	1627	s	α
2106	1695	.	a
2106	1627	s	a
2106	1674	s	A
2106	1695	.	λ
2106	1620	<1m>	<>
2107	2108	<>	<name>
2107	2107	<>	<aphaerese>
2107	2107	<>	<elision3>
2107	2107	<>	<elision2>
2107	2107	<>	<elision1>
2107	2105	<l2L>	<>
2108	2109	<>	<aphaerese>
2108	2109	<>	<elision3>
2108	2109	<>	<elision2>
2108	2109	<>	<elision1>
2108	2106	<l2L>	<>
2109	2107	<>	<aphaerese>
2109	2107	<>	<elision3>
2109	2107	<>	<elision2>
2109	2107	<>	<elision1>
2109	2104	<l2L>	<>
2110	1687	.	.
2110	1687	<~>	<~>
2110	1687	<split-s>	<split-s>
2110	1687	<split-h>	<split-h>
2110	1687	<name2>	<name2>
2110	1726	<name2>	<name>
2110	2106	<>	<name>
2110	1690	<aphaerese>	<aphaerese>
2110	2105	<>	<aphaerese>
2110	1687	<elision3>	<elision3>
2110	2105	<>	<elision3>
2110	1687	<elision2>	<elision2>
2110	2105	<>	<elision2>
2110	1687	<elision1>	<elision1>
2110	2105	<>	<elision1>
2110	1693	.	υ
2110	1628	s	υ
2110	1693	.	u
2110	1628	s	u
2110	1693	.	κ
2110	1669	s	U
2110	1693	.	α
2110	1628	s	α
2110	1693	.	a
2110	1628	s	a
2110	1672	s	A
2110	1693	.	λ
2110	1622	<1m>	<>
2110	1725	<l2L>	<>
2111	2032	<>	<name>
2111	2031	<>	<aphaerese>
2111	2031	<>	<elision3>
2111	2031	<>	<elision2>
2111	2031	<>	<elision1>
2111	2035	<kappa2K>	<>
2111	2112	<kappa2L>	<>
2111	1494	<lambda2L>	<>
2112	1343	.	.
2112	1344	 	 
2112	1343	<~>	<~>
2112	1343	<split-s>	<split-s>
2112	1343	<split-h>	<split-h>
2112	1343	<name2>	<name2>
2112	2039	<>	<name>
2112	1347	<aphaerese>	<aphaerese>
2112	2038	<>	<aphaerese>
2112	1460	<elision3>	<elision3>
2112	2038	<>	<elision3>
2112	1460	<elision2>	<elision2>
2112	2038	<>	<elision2>
2112	1460	<elision1>	<elision1>
2112	2038	<>	<elision1>
2112	1351	.	υ
2112	1354	s	υ
2112	1351	.	u
2112	1354	s	u
2112	1400	s	U
2112	1351	.	α
2112	1425	s	α
2112	1351	.	a
2112	1425	s	a
2112	1428	s	A
2112	2113	<1s>	<>
2113	2040	<>	<name>
2113	2042	<>	<aphaerese>
2113	2042	<>	<elision3>
2113	2042	<>	<elision2>
2113	2042	<>	<elision1>
2113	2114	<K>	<>
2114	289	.	.
2114	289	<~>	<~>
2114	289	<split-s>	<split-s>
2114	289	<split-h>	<split-h>
2114	289	<name2>	<name2>
2114	2044	<>	<name>
2114	292	<aphaerese>	<aphaerese>
2114	2043	<>	<aphaerese>
2114	492	<elision3>	<elision3>
2114	2043	<>	<elision3>
2114	492	<elision2>	<elision2>
2114	2043	<>	<elision2>
2114	492	<elision1>	<elision1>
2114	2043	<>	<elision1>
2114	288	.	υ
2114	288	.	u
2114	288	.	α
2114	288	.	a
2115	2051	<>	<name>
2115	2050	<>	<aphaerese>
2115	2050	<>	<elision3>
2115	2050	<>	<elision2>
2115	2050	<>	<elision1>
2115	2054	<k2K>	<>
2115	2116	<k2L>	<>
2115	1494	<l2L>	<>
2116	1343	.	.
2116	1344	 	 
2116	1343	<~>	<~>
2116	1343	<split-s>	<split-s>
2116	1343	<split-h>	<split-h>
2116	1343	<name2>	<name2>
2116	2058	<>	<name>
2116	1347	<aphaerese>	<aphaerese>
2116	2057	<>	<aphaerese>
2116	1343	<elision3>	<elision3>
2116	2057	<>	<elision3>
2116	1343	<elision2>	<elision2>
2116	2057	<>	<elision2>
2116	1343	<elision1>	<elision1>
2116	2057	<>	<elision1>
2116	1351	.	υ
2116	1354	s	υ
2116	1351	.	u
2116	1354	s	u
2116	1400	s	U
2116	1351	.	α
2116	1425	s	α
2116	1351	.	a
2116	1425	s	a
2116	1428	s	A
2116	2117	<1s>	<>
2117	760	<>	<name>
2117	759	<>	<aphaerese>
2117	759	<>	<elision3>
2117	759	<>	<elision2>
2117	759	<>	<elision1>
2117	2118	<K>	<>
2118	289	.	.
2118	289	<~>	<~>
2118	289	<split-s>	<split-s>
2118	289	<split-h>	<split-h>
2118	289	<name2>	<name2>
2118	761	<>	<name>
2118	292	<aphaerese>	<aphaerese>
2118	763	<>	<aphaerese>
2118	289	<elision3>	<elision3>
2118	763	<>	<elision3>
2118	289	<elision2>	<elision2>
2118	763	<>	<elision2>
2118	289	<elision1>	<elision1>
2118	763	<>	<elision1>
2118	288	.	υ
2118	288	.	u
2118	288	.	α
2118	288	.	a
2119	1177	.	.
2119	1178	 	 
2119	1177	<~>	<~>
2119	1177	<split-s>	<split-s>
2119	1177	<split-h>	<split-h>
2119	1177	<name2>	<name2>
2119	1517	<name2>	<name>
2119	2064	<>	<name>
2119	1181	<aphaerese>	<aphaerese>
2119	2063	<>	<aphaerese>
2119	1177	<elision3>	<elision3>
2119	2063	<>	<elision3>
2119	1177	<elision2>	<elision2>
2119	2063	<>	<elision2>
2119	1177	<elision1>	<elision1>
2119	2063	<>	<elision1>
2119	1185	.	υ
2119	1188	s	υ
2119	1185	.	u
2119	1188	s	u
2119	1351	.	κ
2119	1251	s	U
2119	1185	.	α
2119	1279	s	α
2119	1185	.	a
2119	1279	s	a
2119	1282	s	A
2119	1351	.	λ
2119	675	<1s>	<>
2119	1521	<k2K>	<>
2119	1522	<k2L>	<>
2119	2120	<K2L>	<>
2120	1343	.	.
2120	1344	 	 
2120	1343	<~>	<~>
2120	1343	<split-s>	<split-s>
2120	1343	<split-h>	<split-h>
2120	1343	<name2>	<name2>
2120	1523	<name2>	<name>
2120	2058	<>	<name>
2120	1347	<aphaerese>	<aphaerese>
2120	2057	<>	<aphaerese>
2120	1343	<elision3>	<elision3>
2120	2057	<>	<elision3>
2120	1343	<elision2>	<elision2>
2120	2057	<>	<elision2>
2120	1343	<elision1>	<elision1>
2120	2057	<>	<elision1>
2120	1351	.	υ
2120	1354	s	υ
2120	1351	.	u
2120	1354	s	u
2120	1400	s	U
2120	1351	.	α
2120	1425	s	α
2120	1351	.	a
2120	1425	s	a
2120	1428	s	A
2120	2121	<1s>	<>
2121	760	<>	<name>
2121	759	<>	<aphaerese>
2121	759	<>	<elision3>
2121	759	<>	<elision2>
2121	759	<>	<elision1>
2121	2122	<K>	<>
2122	289	.	.
2122	289	<~>	<~>
2122	289	<split-s>	<split-s>
2122	289	<split-h>	<split-h>
2122	289	<name2>	<name2>
2122	538	<name2>	<name>
2122	761	<>	<name>
2122	292	<aphaerese>	<aphaerese>
2122	763	<>	<aphaerese>
2122	289	<elision3>	<elision3>
2122	763	<>	<elision3>
2122	289	<elision2>	<elision2>
2122	763	<>	<elision2>
2122	289	<elision1>	<elision1>
2122	763	<>	<elision1>
2122	288	.	υ
2122	288	.	u
2122	288	.	α
2122	288	.	a
2123	1343	.	.
2123	1344	 	 
2123	1343	<~>	<~>
2123	1343	<split-s>	<split-s>
2123	1343	<split-h>	<split-h>
2123	1343	<name2>	<name2>
2123	1523	<name2>	<name>
2123	2069	<>	<name>
2123	1347	<aphaerese>	<aphaerese>
2123	2071	<>	<aphaerese>
2123	1343	<elision3>	<elision3>
2123	2071	<>	<elision3>
2123	1343	<elision2>	<elision2>
2123	2071	<>	<elision2>
2123	1343	<elision1>	<elision1>
2123	2071	<>	<elision1>
2123	1351	.	υ
2123	1354	s	υ
2123	1351	.	u
2123	1354	s	u
2123	1351	.	κ
2123	1400	s	U
2123	1351	.	α
2123	1425	s	α
2123	1351	.	a
2123	1425	s	a
2123	1428	s	A
2123	1351	.	λ
2123	772	<1s>	<>
2123	1522	<l2L>	<>
2124	251	.	.
2124	252	 	 
2124	251	<~>	<~>
2124	251	<split-s>	<split-s>
2124	251	<split-h>	<split-h>
2124	251	<name2>	<name2>
2124	255	<aphaerese>	<aphaerese>
2124	2125	<>	<aphaerese>
2124	2128	<elision3>	<elision3>
2124	2125	<>	<elision3>
2124	2128	<elision2>	<elision2>
2124	2125	<>	<elision2>
2124	2128	<elision1>	<elision1>
2124	2125	<>	<elision1>
2124	1546	.	υ
2124	1590	H	υ
2124	1546	.	u
2124	1592	H	u
2124	1546	.	κ
2124	2005	H	κ
2124	1500	H	k
2124	1513	H	U
2124	1516	H	K
2124	1546	.	α
2124	1576	H	α
2124	1546	.	a
2124	1581	H	a
2124	1343	H	A
2124	1546	.	λ
2124	1982	H	λ
2124	1930	H	l
2124	1935	H	L
2124	2131	<K>	<>
2125	251	.	.
2125	252	 	 
2125	251	<~>	<~>
2125	251	<split-s>	<split-s>
2125	251	<split-h>	<split-h>
2125	251	<name2>	<name2>
2125	2126	<>	<name>
2125	255	<aphaerese>	<aphaerese>
2125	2125	<>	<aphaerese>
2125	2128	<elision3>	<elision3>
2125	2125	<>	<elision3>
2125	2128	<elision2>	<elision2>
2125	2125	<>	<elision2>
2125	2128	<elision1>	<elision1>
2125	2125	<>	<elision1>
2125	1546	.	υ
2125	1590	H	υ
2125	1546	.	u
2125	1592	H	u
2125	1546	.	κ
2125	2005	H	κ
2125	1500	H	k
2125	1513	H	U
2125	1516	H	K
2125	1546	.	α
2125	1576	H	α
2125	1546	.	a
2125	1581	H	a
2125	1343	H	A
2125	1546	.	λ
2125	1982	H	λ
2125	1930	H	l
2125	1935	H	L
2125	2132	<K>	<>
2126	250	.	.
2126	254	 	 
2126	250	<~>	<~>
2126	250	<split-s>	<split-s>
2126	250	<split-h>	<split-h>
2126	250	<name2>	<name2>
2126	257	<aphaerese>	<aphaerese>
2126	2124	<>	<aphaerese>
2126	2127	<elision3>	<elision3>
2126	2124	<>	<elision3>
2126	2127	<elision2>	<elision2>
2126	2124	<>	<elision2>
2126	2127	<elision1>	<elision1>
2126	2124	<>	<elision1>
2126	1548	.	υ
2126	1585	H	υ
2126	1548	.	u
2126	1589	H	u
2126	1548	.	κ
2126	1962	H	κ
2126	1541	H	k
2126	1515	H	U
2126	1545	H	K
2126	1548	.	α
2126	1575	H	α
2126	1548	.	a
2126	1580	H	a
2126	1346	H	A
2126	1548	.	λ
2126	1981	H	λ
2126	1929	H	l
2126	1932	H	L
2126	2130	<K>	<>
2127	251	.	.
2127	252	 	 
2127	251	<~>	<~>
2127	251	<split-s>	<split-s>
2127	251	<split-h>	<split-h>
2127	251	<name2>	<name2>
2127	255	<aphaerese>	<aphaerese>
2127	2128	<>	<aphaerese>
2127	251	<elision3>	<elision3>
2127	2128	<>	<elision3>
2127	251	<elision2>	<elision2>
2127	2128	<>	<elision2>
2127	251	<elision1>	<elision1>
2127	2128	<>	<elision1>
2127	1546	.	υ
2127	1590	H	υ
2127	1546	.	u
2127	1592	H	u
2127	258	.	κ
2127	2111	H	κ
2127	2115	H	k
2127	1513	H	U
2127	2119	H	K
2127	1546	.	α
2127	1576	H	α
2127	1546	.	a
2127	1581	H	a
2127	1343	H	A
2127	2067	H	λ
2127	2073	H	l
2127	2123	H	L
2128	251	.	.
2128	252	 	 
2128	251	<~>	<~>
2128	251	<split-s>	<split-s>
2128	251	<split-h>	<split-h>
2128	251	<name2>	<name2>
2128	2129	<>	<name>
2128	255	<aphaerese>	<aphaerese>
2128	2128	<>	<aphaerese>
2128	251	<elision3>	<elision3>
2128	2128	<>	<elision3>
2128	251	<elision2>	<elision2>
2128	2128	<>	<elision2>
2128	251	<elision1>	<elision1>
2128	2128	<>	<elision1>
2128	1546	.	υ
2128	1590	H	υ
2128	1546	.	u
2128	1592	H	u
2128	258	.	κ
2128	2111	H	κ
2128	2115	H	k
2128	1513	H	U
2128	2119	H	K
2128	1546	.	α
2128	1576	H	α
2128	1546	.	a
2128	1581	H	a
2128	1343	H	A
2128	2067	H	λ
2128	2073	H	l
2128	2123	H	L
2129	250	.	.
2129	254	 	 
2129	250	<~>	<~>
2129	250	<split-s>	<split-s>
2129	250	<split-h>	<split-h>
2129	250	<name2>	<name2>
2129	257	<aphaerese>	<aphaerese>
2129	2127	<>	<aphaerese>
2129	250	<elision3>	<elision3>
2129	2127	<>	<elision3>
2129	250	<elision2>	<elision2>
2129	2127	<>	<elision2>
2129	250	<elision1>	<elision1>
2129	2127	<>	<elision1>
2129	1548	.	υ
2129	1585	H	υ
2129	1548	.	u
2129	1589	H	u
2129	260	.	κ
2129	2030	H	κ
2129	2049	H	k
2129	1515	H	U
2129	2062	H	K
2129	1548	.	α
2129	1575	H	α
2129	1548	.	a
2129	1580	H	a
2129	1346	H	A
2129	2066	H	λ
2129	2072	H	l
2129	2070	H	L
2130	1598	.	.
2130	1598	<~>	<~>
2130	1598	<split-s>	<split-s>
2130	1598	<split-h>	<split-h>
2130	1598	<name2>	<name2>
2130	1601	<aphaerese>	<aphaerese>
2130	2131	<>	<aphaerese>
2130	2076	<elision3>	<elision3>
2130	2131	<>	<elision3>
2130	2076	<elision2>	<elision2>
2130	2131	<>	<elision2>
2130	2076	<elision1>	<elision1>
2130	2131	<>	<elision1>
2130	1594	.	υ
2130	1740	H	υ
2130	1594	.	u
2130	1749	H	u
2130	1594	.	κ
2130	1992	H	κ
2130	1709	H	k
2130	1718	H	U
2130	1722	H	K
2130	1594	.	α
2130	1752	H	α
2130	1594	.	a
2130	1755	H	a
2130	1689	H	A
2130	1594	.	λ
2130	2001	H	λ
2130	1736	H	l
2130	1731	H	L
2131	1596	.	.
2131	1596	<~>	<~>
2131	1596	<split-s>	<split-s>
2131	1596	<split-h>	<split-h>
2131	1596	<name2>	<name2>
2131	1599	<aphaerese>	<aphaerese>
2131	2132	<>	<aphaerese>
2131	2077	<elision3>	<elision3>
2131	2132	<>	<elision3>
2131	2077	<elision2>	<elision2>
2131	2132	<>	<elision2>
2131	2077	<elision1>	<elision1>
2131	2132	<>	<elision1>
2131	1595	.	υ
2131	1738	H	υ
2131	1595	.	u
2131	1747	H	u
2131	1595	.	κ
2131	1990	H	κ
2131	1707	H	k
2131	1716	H	U
2131	1719	H	K
2131	1595	.	α
2131	1750	H	α
2131	1595	.	a
2131	1753	H	a
2131	1687	H	A
2131	1595	.	λ
2131	1999	H	λ
2131	1734	H	l
2131	1737	H	L
2132	1596	.	.
2132	1596	<~>	<~>
2132	1596	<split-s>	<split-s>
2132	1596	<split-h>	<split-h>
2132	1596	<name2>	<name2>
2132	2130	<>	<name>
2132	1599	<aphaerese>	<aphaerese>
2132	2132	<>	<aphaerese>
2132	2077	<elision3>	<elision3>
2132	2132	<>	<elision3>
2132	2077	<elision2>	<elision2>
2132	2132	<>	<elision2>
2132	2077	<elision1>	<elision1>
2132	2132	<>	<elision1>
2132	1595	.	υ
2132	1738	H	υ
2132	1595	.	u
2132	1747	H	u
2132	1595	.	κ
2132	1990	H	κ
2132	1707	H	k
2132	1716	H	U
2132	1719	H	K
2132	1595	.	α
2132	1750	H	α
2132	1595	.	a
2132	1753	H	a
2132	1687	H	A
2132	1595	.	λ
2132	1999	H	λ
2132	1734	H	l
2132	1737	H	L
2133	1772	.	.
2133	1772	 	 
2133	1772	<~>	<~>
2133	1772	<split-s>	<split-s>
2133	1772	<split-h>	<split-h>
2133	1772	<name2>	<name2>
2133	2134	<>	<name>
2133	1775	<aphaerese>	<aphaerese>
2133	2133	<>	<aphaerese>
2133	1772	<elision3>	<elision3>
2133	2133	<>	<elision3>
2133	1772	<elision2>	<elision2>
2133	2133	<>	<elision2>
2133	1772	<elision1>	<elision1>
2133	2133	<>	<elision1>
2133	1936	.	υ
2133	1936	.	u
2133	1936	.	κ
2133	1936	.	α
2133	1936	.	a
2133	1936	.	λ
2133	2137	<4s>	<>
2134	1774	.	.
2134	1774	 	 
2134	1774	<~>	<~>
2134	1774	<split-s>	<split-s>
2134	1774	<split-h>	<split-h>
2134	1774	<name2>	<name2>
2134	1777	<aphaerese>	<aphaerese>
2134	2135	<>	<aphaerese>
2134	1774	<elision3>	<elision3>
2134	2135	<>	<elision3>
2134	1774	<elision2>	<elision2>
2134	2135	<>	<elision2>
2134	1774	<elision1>	<elision1>
2134	2135	<>	<elision1>
2134	1938	.	υ
2134	1938	.	u
2134	1938	.	κ
2134	1938	.	α
2134	1938	.	a
2134	1938	.	λ
2134	2138	<4s>	<>
2135	1772	.	.
2135	1772	 	 
2135	1772	<~>	<~>
2135	1772	<split-s>	<split-s>
2135	1772	<split-h>	<split-h>
2135	1772	<name2>	<name2>
2135	1775	<aphaerese>	<aphaerese>
2135	2133	<>	<aphaerese>
2135	1772	<elision3>	<elision3>
2135	2133	<>	<elision3>
2135	1772	<elision2>	<elision2>
2135	2133	<>	<elision2>
2135	1772	<elision1>	<elision1>
2135	2133	<>	<elision1>
2135	1936	.	υ
2135	1936	.	u
2135	1936	.	κ
2135	1936	.	α
2135	1936	.	a
2135	1936	.	λ
2135	2136	<4s>	<>
2136	251	.	.
2136	252	 	 
2136	251	<~>	<~>
2136	251	<split-s>	<split-s>
2136	251	<split-h>	<split-h>
2136	251	<name2>	<name2>
2136	255	<aphaerese>	<aphaerese>
2136	2137	<>	<aphaerese>
2136	251	<elision3>	<elision3>
2136	2137	<>	<elision3>
2136	251	<elision2>	<elision2>
2136	2137	<>	<elision2>
2136	251	<elision1>	<elision1>
2136	2137	<>	<elision1>
2136	1546	.	υ
2136	1590	H	υ
2136	1546	.	u
2136	1592	H	u
2136	1546	.	κ
2136	2005	H	κ
2136	1500	H	k
2136	1513	H	U
2136	1516	H	K
2136	1546	.	α
2136	1576	H	α
2136	1546	.	a
2136	1581	H	a
2136	1343	H	A
2136	1546	.	λ
2136	1982	H	λ
2136	1930	H	l
2136	1935	H	L
2136	2140	<K>	<>
2137	251	.	.
2137	252	 	 
2137	251	<~>	<~>
2137	251	<split-s>	<split-s>
2137	251	<split-h>	<split-h>
2137	251	<name2>	<name2>
2137	2138	<>	<name>
2137	255	<aphaerese>	<aphaerese>
2137	2137	<>	<aphaerese>
2137	251	<elision3>	<elision3>
2137	2137	<>	<elision3>
2137	251	<elision2>	<elision2>
2137	2137	<>	<elision2>
2137	251	<elision1>	<elision1>
2137	2137	<>	<elision1>
2137	1546	.	υ
2137	1590	H	υ
2137	1546	.	u
2137	1592	H	u
2137	1546	.	κ
2137	2005	H	κ
2137	1500	H	k
2137	1513	H	U
2137	1516	H	K
2137	1546	.	α
2137	1576	H	α
2137	1546	.	a
2137	1581	H	a
2137	1343	H	A
2137	1546	.	λ
2137	1982	H	λ
2137	1930	H	l
2137	1935	H	L
2137	2141	<K>	<>
2138	250	.	.
2138	254	 	 
2138	250	<~>	<~>
2138	250	<split-s>	<split-s>
2138	250	<split-h>	<split-h>
2138	250	<name2>	<name2>
2138	257	<aphaerese>	<aphaerese>
2138	2136	<>	<aphaerese>
2138	250	<elision3>	<elision3>
2138	2136	<>	<elision3>
2138	250	<elision2>	<elision2>
2138	2136	<>	<elision2>
2138	250	<elision1>	<elision1>
2138	2136	<>	<elision1>
2138	1548	.	υ
2138	1585	H	υ
2138	1548	.	u
2138	1589	H	u
2138	1548	.	κ
2138	1962	H	κ
2138	1541	H	k
2138	1515	H	U
2138	1545	H	K
2138	1548	.	α
2138	1575	H	α
2138	1548	.	a
2138	1580	H	a
2138	1346	H	A
2138	1548	.	λ
2138	1981	H	λ
2138	1929	H	l
2138	1932	H	L
2138	2139	<K>	<>
2139	1598	.	.
2139	1598	<~>	<~>
2139	1598	<split-s>	<split-s>
2139	1598	<split-h>	<split-h>
2139	1598	<name2>	<name2>
2139	1601	<aphaerese>	<aphaerese>
2139	2140	<>	<aphaerese>
2139	1598	<elision3>	<elision3>
2139	2140	<>	<elision3>
2139	1598	<elision2>	<elision2>
2139	2140	<>	<elision2>
2139	1598	<elision1>	<elision1>
2139	2140	<>	<elision1>
2139	1594	.	υ
2139	1740	H	υ
2139	1594	.	u
2139	1749	H	u
2139	1594	.	κ
2139	1992	H	κ
2139	1709	H	k
2139	1718	H	U
2139	1722	H	K
2139	1594	.	α
2139	1752	H	α
2139	1594	.	a
2139	1755	H	a
2139	1689	H	A
2139	1594	.	λ
2139	2001	H	λ
2139	1736	H	l
2139	1731	H	L
2140	1596	.	.
2140	1596	<~>	<~>
2140	1596	<split-s>	<split-s>
2140	1596	<split-h>	<split-h>
2140	1596	<name2>	<name2>
2140	1599	<aphaerese>	<aphaerese>
2140	2141	<>	<aphaerese>
2140	1596	<elision3>	<elision3>
2140	2141	<>	<elision3>
2140	1596	<elision2>	<elision2>
2140	2141	<>	<elision2>
2140	1596	<elision1>	<elision1>
2140	2141	<>	<elision1>
2140	1595	.	υ
2140	1738	H	υ
2140	1595	.	u
2140	1747	H	u
2140	1595	.	κ
2140	1990	H	κ
2140	1707	H	k
2140	1716	H	U
2140	1719	H	K
2140	1595	.	α
2140	1750	H	α
2140	1595	.	a
2140	1753	H	a
2140	1687	H	A
2140	1595	.	λ
2140	1999	H	λ
2140	1734	H	l
2140	1737	H	L
2141	1596	.	.
2141	1596	<~>	<~>
2141	1596	<split-s>	<split-s>
2141	1596	<split-h>	<split-h>
2141	1596	<name2>	<name2>
2141	2139	<>	<name>
2141	1599	<aphaerese>	<aphaerese>
2141	2141	<>	<aphaerese>
2141	1596	<elision3>	<elision3>
2141	2141	<>	<elision3>
2141	1596	<elision2>	<elision2>
2141	2141	<>	<elision2>
2141	1596	<elision1>	<elision1>
2141	2141	<>	<elision1>
2141	1595	.	υ
2141	1738	H	υ
2141	1595	.	u
2141	1747	H	u
2141	1595	.	κ
2141	1990	H	κ
2141	1707	H	k
2141	1716	H	U
2141	1719	H	K
2141	1595	.	α
2141	1750	H	α
2141	1595	.	a
2141	1753	H	a
2141	1687	H	A
2141	1595	.	λ
2141	1999	H	λ
2141	1734	H	l
2141	1737	H	L
2142	2143	<>	<name>
2142	2142	<>	<aphaerese>
2142	2142	<>	<elision3>
2142	2142	<>	<elision2>
2142	2142	<>	<elision1>
2142	1772	<U2kl>	<>
2143	2144	<>	<aphaerese>
2143	2144	<>	<elision3>
2143	2144	<>	<elision2>
2143	2144	<>	<elision1>
2143	1773	<U2kl>	<>
2144	2142	<>	<aphaerese>
2144	2142	<>	<elision3>
2144	2142	<>	<elision2>
2144	2142	<>	<elision1>
2144	1774	<U2kl>	<>
2145	2146	<name>	<name>
2145	2149	<>	<name>
2145	2151	<>	<aphaerese>
2145	2151	<>	<elision3>
2145	2151	<>	<elision2>
2145	2151	<>	<elision1>
2145	2257	<4s>	<>
2145	2152	<A2kl>	<>
2145	2215	<L2kl>	<>
2145	2260	<K2kl>	<>
2146	2147	<4s>	<>
2147	1545	H	k
2147	1932	H	l
2147	2148	<K>	<>
2148	1722	H	k
2148	1731	H	l
2149	2150	<>	<aphaerese>
2149	2150	<>	<elision3>
2149	2150	<>	<elision2>
2149	2150	<>	<elision1>
2149	2153	<A2kl>	<>
2149	2216	<L2kl>	<>
2149	2249	<K2kl>	<>
2150	2151	<>	<aphaerese>
2150	2151	<>	<elision3>
2150	2151	<>	<elision2>
2150	2151	<>	<elision1>
2150	2154	<A2kl>	<>
2150	2217	<L2kl>	<>
2150	2250	<K2kl>	<>
2151	2149	<>	<name>
2151	2151	<>	<aphaerese>
2151	2151	<>	<elision3>
2151	2151	<>	<elision2>
2151	2151	<>	<elision1>
2151	2152	<A2kl>	<>
2151	2215	<L2kl>	<>
2151	2248	<K2kl>	<>
2152	2153	<>	<name>
2152	2152	<>	<aphaerese>
2152	2152	<>	<elision3>
2152	2152	<>	<elision2>
2152	2152	<>	<elision1>
2152	2155	.	κ
2152	2155	.	λ
2152	2207	<4s>	<>
2153	2154	<>	<aphaerese>
2153	2154	<>	<elision3>
2153	2154	<>	<elision2>
2153	2154	<>	<elision1>
2153	2157	.	κ
2153	2157	.	λ
2153	2208	<4s>	<>
2154	2152	<>	<aphaerese>
2154	2152	<>	<elision3>
2154	2152	<>	<elision2>
2154	2152	<>	<elision1>
2154	2155	.	κ
2154	2155	.	λ
2154	2206	<4s>	<>
2155	2156	<>	<name>
2155	2155	<>	<aphaerese>
2155	2158	<elision3>	<elision3>
2155	2155	<>	<elision3>
2155	2158	<elision2>	<elision2>
2155	2155	<>	<elision2>
2155	2158	<elision1>	<elision1>
2155	2155	<>	<elision1>
2155	2198	<4s>	<>
2156	2157	<>	<aphaerese>
2156	2160	<elision3>	<elision3>
2156	2157	<>	<elision3>
2156	2160	<elision2>	<elision2>
2156	2157	<>	<elision2>
2156	2160	<elision1>	<elision1>
2156	2157	<>	<elision1>
2156	2199	<4s>	<>
2157	2155	<>	<aphaerese>
2157	2158	<elision3>	<elision3>
2157	2155	<>	<elision3>
2157	2158	<elision2>	<elision2>
2157	2155	<>	<elision2>
2157	2158	<elision1>	<elision1>
2157	2155	<>	<elision1>
2157	2197	<4s>	<>
2158	1772	.	.
2158	1772	 	 
2158	1772	<~>	<~>
2158	1772	<split-s>	<split-s>
2158	1772	<split-h>	<split-h>
2158	1772	<name2>	<name2>
2158	2159	<>	<name>
2158	1775	<aphaerese>	<aphaerese>
2158	2158	<>	<aphaerese>
2158	1772	<elision3>	<elision3>
2158	2158	<>	<elision3>
2158	1772	<elision2>	<elision2>
2158	2158	<>	<elision2>
2158	1772	<elision1>	<elision1>
2158	2158	<>	<elision1>
2158	1936	.	υ
2158	1936	.	u
2158	1936	.	α
2158	1936	.	a
2158	2162	<4s>	<>
2159	1774	.	.
2159	1774	 	 
2159	1774	<~>	<~>
2159	1774	<split-s>	<split-s>
2159	1774	<split-h>	<split-h>
2159	1774	<name2>	<name2>
2159	1777	<aphaerese>	<aphaerese>
2159	2160	<>	<aphaerese>
2159	1774	<elision3>	<elision3>
2159	2160	<>	<elision3>
2159	1774	<elision2>	<elision2>
2159	2160	<>	<elision2>
2159	1774	<elision1>	<elision1>
2159	2160	<>	<elision1>
2159	1938	.	υ
2159	1938	.	u
2159	1938	.	α
2159	1938	.	a
2159	2163	<4s>	<>
2160	1772	.	.
2160	1772	 	 
2160	1772	<~>	<~>
2160	1772	<split-s>	<split-s>
2160	1772	<split-h>	<split-h>
2160	1772	<name2>	<name2>
2160	1775	<aphaerese>	<aphaerese>
2160	2158	<>	<aphaerese>
2160	1772	<elision3>	<elision3>
2160	2158	<>	<elision3>
2160	1772	<elision2>	<elision2>
2160	2158	<>	<elision2>
2160	1772	<elision1>	<elision1>
2160	2158	<>	<elision1>
2160	1936	.	υ
2160	1936	.	u
2160	1936	.	α
2160	1936	.	a
2160	2161	<4s>	<>
2161	251	.	.
2161	252	 	 
2161	251	<~>	<~>
2161	251	<split-s>	<split-s>
2161	251	<split-h>	<split-h>
2161	251	<name2>	<name2>
2161	255	<aphaerese>	<aphaerese>
2161	2162	<>	<aphaerese>
2161	251	<elision3>	<elision3>
2161	2162	<>	<elision3>
2161	251	<elision2>	<elision2>
2161	2162	<>	<elision2>
2161	251	<elision1>	<elision1>
2161	2162	<>	<elision1>
2161	1546	.	υ
2161	1590	H	υ
2161	1546	.	u
2161	1592	H	u
2161	2165	H	κ
2161	2177	H	k
2161	1513	H	U
2161	2169	H	K
2161	1546	.	α
2161	1576	H	α
2161	1546	.	a
2161	1581	H	a
2161	1343	H	A
2161	2165	H	λ
2161	2177	H	l
2161	2169	H	L
2161	2180	<K>	<>
2162	251	.	.
2162	252	 	 
2162	251	<~>	<~>
2162	251	<split-s>	<split-s>
2162	251	<split-h>	<split-h>
2162	251	<name2>	<name2>
2162	2163	<>	<name>
2162	255	<aphaerese>	<aphaerese>
2162	2162	<>	<aphaerese>
2162	251	<elision3>	<elision3>
2162	2162	<>	<elision3>
2162	251	<elision2>	<elision2>
2162	2162	<>	<elision2>
2162	251	<elision1>	<elision1>
2162	2162	<>	<elision1>
2162	1546	.	υ
2162	1590	H	υ
2162	1546	.	u
2162	1592	H	u
2162	2165	H	κ
2162	2177	H	k
2162	1513	H	U
2162	2169	H	K
2162	1546	.	α
2162	1576	H	α
2162	1546	.	a
2162	1581	H	a
2162	1343	H	A
2162	2165	H	λ
2162	2177	H	l
2162	2169	H	L
2162	2181	<K>	<>
2163	250	.	.
2163	254	 	 
2163	250	<~>	<~>
2163	250	<split-s>	<split-s>
2163	250	<split-h>	<split-h>
2163	250	<name2>	<name2>
2163	257	<aphaerese>	<aphaerese>
2163	2161	<>	<aphaerese>
2163	250	<elision3>	<elision3>
2163	2161	<>	<elision3>
2163	250	<elision2>	<elision2>
2163	2161	<>	<elision2>
2163	250	<elision1>	<elision1>
2163	2161	<>	<elision1>
2163	1548	.	υ
2163	1585	H	υ
2163	1548	.	u
2163	1589	H	u
2163	2164	H	κ
2163	2176	H	k
2163	1515	H	U
2163	2168	H	K
2163	1548	.	α
2163	1575	H	α
2163	1548	.	a
2163	1580	H	a
2163	1346	H	A
2163	2164	H	λ
2163	2176	H	l
2163	2168	H	L
2163	2179	<K>	<>
2164	2165	<>	<aphaerese>
2164	2165	<>	<elision3>
2164	2165	<>	<elision2>
2164	2165	<>	<elision1>
2164	2168	<lambda2L>	<>
2165	2166	<>	<name>
2165	2165	<>	<aphaerese>
2165	2165	<>	<elision3>
2165	2165	<>	<elision2>
2165	2165	<>	<elision1>
2165	2169	<lambda2L>	<>
2166	2164	<>	<aphaerese>
2166	2164	<>	<elision3>
2166	2164	<>	<elision2>
2166	2164	<>	<elision1>
2166	2167	<lambda2L>	<>
2167	2168	<>	<aphaerese>
2167	2168	<>	<elision3>
2167	2168	<>	<elision2>
2167	2168	<>	<elision1>
2167	2172	.	κ
2167	2172	.	λ
2167	604	<1s>	<>
2168	2169	<>	<aphaerese>
2168	2169	<>	<elision3>
2168	2169	<>	<elision2>
2168	2169	<>	<elision1>
2168	2170	.	κ
2168	2170	.	λ
2168	602	<1s>	<>
2169	2167	<>	<name>
2169	2169	<>	<aphaerese>
2169	2169	<>	<elision3>
2169	2169	<>	<elision2>
2169	2169	<>	<elision1>
2169	2170	.	κ
2169	2170	.	λ
2169	603	<1s>	<>
2170	2171	<>	<name>
2170	2170	<>	<aphaerese>
2170	2173	<elision3>	<elision3>
2170	2170	<>	<elision3>
2170	2173	<elision2>	<elision2>
2170	2170	<>	<elision2>
2170	2173	<elision1>	<elision1>
2170	2170	<>	<elision1>
2170	597	<1s>	<>
2171	2172	<>	<aphaerese>
2171	2175	<elision3>	<elision3>
2171	2172	<>	<elision3>
2171	2175	<elision2>	<elision2>
2171	2172	<>	<elision2>
2171	2175	<elision1>	<elision1>
2171	2172	<>	<elision1>
2171	598	<1s>	<>
2172	2170	<>	<aphaerese>
2172	2173	<elision3>	<elision3>
2172	2170	<>	<elision3>
2172	2173	<elision2>	<elision2>
2172	2170	<>	<elision2>
2172	2173	<elision1>	<elision1>
2172	2170	<>	<elision1>
2172	596	<1s>	<>
2173	2174	<>	<name>
2173	2173	<>	<aphaerese>
2173	2173	<>	<elision3>
2173	2173	<>	<elision2>
2173	2173	<>	<elision1>
2173	1357	.	κ
2173	1375	s	κ
2173	1110	s	k
2173	1128	s	K
2173	1431	s	λ
2173	1141	s	l
2173	1144	s	L
2173	591	<1s>	<>
2174	2175	<>	<aphaerese>
2174	2175	<>	<elision3>
2174	2175	<>	<elision2>
2174	2175	<>	<elision1>
2174	1359	.	κ
2174	1377	s	κ
2174	1112	s	k
2174	1131	s	K
2174	1433	s	λ
2174	1143	s	l
2174	1146	s	L
2174	592	<1s>	<>
2175	2173	<>	<aphaerese>
2175	2173	<>	<elision3>
2175	2173	<>	<elision2>
2175	2173	<>	<elision1>
2175	1357	.	κ
2175	1375	s	κ
2175	1110	s	k
2175	1128	s	K
2175	1431	s	λ
2175	1141	s	l
2175	1144	s	L
2175	590	<1s>	<>
2176	2177	<>	<aphaerese>
2176	2177	<>	<elision3>
2176	2177	<>	<elision2>
2176	2177	<>	<elision1>
2176	2168	<l2L>	<>
2177	2178	<>	<name>
2177	2177	<>	<aphaerese>
2177	2177	<>	<elision3>
2177	2177	<>	<elision2>
2177	2177	<>	<elision1>
2177	2169	<l2L>	<>
2178	2176	<>	<aphaerese>
2178	2176	<>	<elision3>
2178	2176	<>	<elision2>
2178	2176	<>	<elision1>
2178	2167	<l2L>	<>
2179	1598	.	.
2179	1598	<~>	<~>
2179	1598	<split-s>	<split-s>
2179	1598	<split-h>	<split-h>
2179	1598	<name2>	<name2>
2179	1601	<aphaerese>	<aphaerese>
2179	2180	<>	<aphaerese>
2179	1598	<elision3>	<elision3>
2179	2180	<>	<elision3>
2179	1598	<elision2>	<elision2>
2179	2180	<>	<elision2>
2179	1598	<elision1>	<elision1>
2179	2180	<>	<elision1>
2179	1594	.	υ
2179	1740	H	υ
2179	1594	.	u
2179	1749	H	u
2179	2184	H	κ
2179	2196	H	k
2179	1718	H	U
2179	2185	H	K
2179	1594	.	α
2179	1752	H	α
2179	1594	.	a
2179	1755	H	a
2179	1689	H	A
2179	2184	H	λ
2179	2196	H	l
2179	2185	H	L
2180	1596	.	.
2180	1596	<~>	<~>
2180	1596	<split-s>	<split-s>
2180	1596	<split-h>	<split-h>
2180	1596	<name2>	<name2>
2180	1599	<aphaerese>	<aphaerese>
2180	2181	<>	<aphaerese>
2180	1596	<elision3>	<elision3>
2180	2181	<>	<elision3>
2180	1596	<elision2>	<elision2>
2180	2181	<>	<elision2>
2180	1596	<elision1>	<elision1>
2180	2181	<>	<elision1>
2180	1595	.	υ
2180	1738	H	υ
2180	1595	.	u
2180	1747	H	u
2180	2182	H	κ
2180	2194	H	k
2180	1716	H	U
2180	2186	H	K
2180	1595	.	α
2180	1750	H	α
2180	1595	.	a
2180	1753	H	a
2180	1687	H	A
2180	2182	H	λ
2180	2194	H	l
2180	2186	H	L
2181	1596	.	.
2181	1596	<~>	<~>
2181	1596	<split-s>	<split-s>
2181	1596	<split-h>	<split-h>
2181	1596	<name2>	<name2>
2181	2179	<>	<name>
2181	1599	<aphaerese>	<aphaerese>
2181	2181	<>	<aphaerese>
2181	1596	<elision3>	<elision3>
2181	2181	<>	<elision3>
2181	1596	<elision2>	<elision2>
2181	2181	<>	<elision2>
2181	1596	<elision1>	<elision1>
2181	2181	<>	<elision1>
2181	1595	.	υ
2181	1738	H	υ
2181	1595	.	u
2181	1747	H	u
2181	2182	H	κ
2181	2194	H	k
2181	1716	H	U
2181	2186	H	K
2181	1595	.	α
2181	1750	H	α
2181	1595	.	a
2181	1753	H	a
2181	1687	H	A
2181	2182	H	λ
2181	2194	H	l
2181	2186	H	L
2182	2183	<>	<name>
2182	2182	<>	<aphaerese>
2182	2182	<>	<elision3>
2182	2182	<>	<elision2>
2182	2182	<>	<elision1>
2182	2186	<lambda2L>	<>
2183	2184	<>	<aphaerese>
2183	2184	<>	<elision3>
2183	2184	<>	<elision2>
2183	2184	<>	<elision1>
2183	2187	<lambda2L>	<>
2184	2182	<>	<aphaerese>
2184	2182	<>	<elision3>
2184	2182	<>	<elision2>
2184	2182	<>	<elision1>
2184	2185	<lambda2L>	<>
2185	2186	<>	<aphaerese>
2185	2186	<>	<elision3>
2185	2186	<>	<elision2>
2185	2186	<>	<elision1>
2185	2189	.	κ
2185	2189	.	λ
2186	2187	<>	<name>
2186	2186	<>	<aphaerese>
2186	2186	<>	<elision3>
2186	2186	<>	<elision2>
2186	2186	<>	<elision1>
2186	2189	.	κ
2186	2189	.	λ
2187	2185	<>	<aphaerese>
2187	2185	<>	<elision3>
2187	2185	<>	<elision2>
2187	2185	<>	<elision1>
2187	2188	.	κ
2187	2188	.	λ
2188	2189	<>	<aphaerese>
2188	2192	<elision3>	<elision3>
2188	2189	<>	<elision3>
2188	2192	<elision2>	<elision2>
2188	2189	<>	<elision2>
2188	2192	<elision1>	<elision1>
2188	2189	<>	<elision1>
2189	2190	<>	<name>
2189	2189	<>	<aphaerese>
2189	2192	<elision3>	<elision3>
2189	2189	<>	<elision3>
2189	2192	<elision2>	<elision2>
2189	2189	<>	<elision2>
2189	2192	<elision1>	<elision1>
2189	2189	<>	<elision1>
2190	2188	<>	<aphaerese>
2190	2191	<elision3>	<elision3>
2190	2188	<>	<elision3>
2190	2191	<elision2>	<elision2>
2190	2188	<>	<elision2>
2190	2191	<elision1>	<elision1>
2190	2188	<>	<elision1>
2191	2192	<>	<aphaerese>
2191	2192	<>	<elision3>
2191	2192	<>	<elision2>
2191	2192	<>	<elision1>
2191	1663	.	κ
2191	1636	s	κ
2191	1639	H	κ
2191	1636	s	k
2191	1639	H	k
2191	1624	s	K
2191	1639	H	K
2191	1636	s	λ
2191	1639	H	λ
2191	1636	s	l
2191	1639	H	l
2191	1630	s	L
2191	1639	H	L
2192	2193	<>	<name>
2192	2192	<>	<aphaerese>
2192	2192	<>	<elision3>
2192	2192	<>	<elision2>
2192	2192	<>	<elision1>
2192	1663	.	κ
2192	1636	s	κ
2192	1639	H	κ
2192	1636	s	k
2192	1639	H	k
2192	1624	s	K
2192	1639	H	K
2192	1636	s	λ
2192	1639	H	λ
2192	1636	s	l
2192	1639	H	l
2192	1630	s	L
2192	1639	H	L
2193	2191	<>	<aphaerese>
2193	2191	<>	<elision3>
2193	2191	<>	<elision2>
2193	2191	<>	<elision1>
2193	1665	.	κ
2193	1635	s	κ
2193	1638	H	κ
2193	1635	s	k
2193	1638	H	k
2193	1623	s	K
2193	1638	H	K
2193	1635	s	λ
2193	1638	H	λ
2193	1635	s	l
2193	1638	H	l
2193	1629	s	L
2193	1638	H	L
2194	2195	<>	<name>
2194	2194	<>	<aphaerese>
2194	2194	<>	<elision3>
2194	2194	<>	<elision2>
2194	2194	<>	<elision1>
2194	2186	<l2L>	<>
2195	2196	<>	<aphaerese>
2195	2196	<>	<elision3>
2195	2196	<>	<elision2>
2195	2196	<>	<elision1>
2195	2187	<l2L>	<>
2196	2194	<>	<aphaerese>
2196	2194	<>	<elision3>
2196	2194	<>	<elision2>
2196	2194	<>	<elision1>
2196	2185	<l2L>	<>
2197	2198	<>	<aphaerese>
2197	2201	<elision3>	<elision3>
2197	2198	<>	<elision3>
2197	2201	<elision2>	<elision2>
2197	2198	<>	<elision2>
2197	2201	<elision1>	<elision1>
2197	2198	<>	<elision1>
2197	2204	<K>	<>
2198	2199	<>	<name>
2198	2198	<>	<aphaerese>
2198	2201	<elision3>	<elision3>
2198	2198	<>	<elision3>
2198	2201	<elision2>	<elision2>
2198	2198	<>	<elision2>
2198	2201	<elision1>	<elision1>
2198	2198	<>	<elision1>
2198	2205	<K>	<>
2199	2197	<>	<aphaerese>
2199	2200	<elision3>	<elision3>
2199	2197	<>	<elision3>
2199	2200	<elision2>	<elision2>
2199	2197	<>	<elision2>
2199	2200	<elision1>	<elision1>
2199	2197	<>	<elision1>
2199	2203	<K>	<>
2200	251	.	.
2200	252	 	 
2200	251	<~>	<~>
2200	251	<split-s>	<split-s>
2200	251	<split-h>	<split-h>
2200	251	<name2>	<name2>
2200	255	<aphaerese>	<aphaerese>
2200	2201	<>	<aphaerese>
2200	251	<elision3>	<elision3>
2200	2201	<>	<elision3>
2200	251	<elision2>	<elision2>
2200	2201	<>	<elision2>
2200	251	<elision1>	<elision1>
2200	2201	<>	<elision1>
2200	1546	.	υ
2200	1590	H	υ
2200	1546	.	u
2200	1592	H	u
2200	2165	H	κ
2200	2177	H	k
2200	1513	H	U
2200	2169	H	K
2200	1546	.	α
2200	1576	H	α
2200	1546	.	a
2200	1581	H	a
2200	1343	H	A
2200	2165	H	λ
2200	2177	H	l
2200	2169	H	L
2201	251	.	.
2201	252	 	 
2201	251	<~>	<~>
2201	251	<split-s>	<split-s>
2201	251	<split-h>	<split-h>
2201	251	<name2>	<name2>
2201	2202	<>	<name>
2201	255	<aphaerese>	<aphaerese>
2201	2201	<>	<aphaerese>
2201	251	<elision3>	<elision3>
2201	2201	<>	<elision3>
2201	251	<elision2>	<elision2>
2201	2201	<>	<elision2>
2201	251	<elision1>	<elision1>
2201	2201	<>	<elision1>
2201	1546	.	υ
2201	1590	H	υ
2201	1546	.	u
2201	1592	H	u
2201	2165	H	κ
2201	2177	H	k
2201	1513	H	U
2201	2169	H	K
2201	1546	.	α
2201	1576	H	α
2201	1546	.	a
2201	1581	H	a
2201	1343	H	A
2201	2165	H	λ
2201	2177	H	l
2201	2169	H	L
2202	250	.	.
2202	254	 	 
2202	250	<~>	<~>
2202	250	<split-s>	<split-s>
2202	250	<split-h>	<split-h>
2202	250	<name2>	<name2>
2202	257	<aphaerese>	<aphaerese>
2202	2200	<>	<aphaerese>
2202	250	<elision3>	<elision3>
2202	2200	<>	<elision3>
2202	250	<elision2>	<elision2>
2202	2200	<>	<elision2>
2202	250	<elision1>	<elision1>
2202	2200	<>	<elision1>
2202	1548	.	υ
2202	1585	H	υ
2202	1548	.	u
2202	1589	H	u
2202	2164	H	κ
2202	2176	H	k
2202	1515	H	U
2202	2168	H	K
2202	1548	.	α
2202	1575	H	α
2202	1548	.	a
2202	1580	H	a
2202	1346	H	A
2202	2164	H	λ
2202	2176	H	l
2202	2168	H	L
2203	2204	<>	<aphaerese>
2203	2180	<elision3>	<elision3>
2203	2204	<>	<elision3>
2203	2180	<elision2>	<elision2>
2203	2204	<>	<elision2>
2203	2180	<elision1>	<elision1>
2203	2204	<>	<elision1>
2204	2205	<>	<aphaerese>
2204	2181	<elision3>	<elision3>
2204	2205	<>	<elision3>
2204	2181	<elision2>	<elision2>
2204	2205	<>	<elision2>
2204	2181	<elision1>	<elision1>
2204	2205	<>	<elision1>
2205	2203	<>	<name>
2205	2205	<>	<aphaerese>
2205	2181	<elision3>	<elision3>
2205	2205	<>	<elision3>
2205	2181	<elision2>	<elision2>
2205	2205	<>	<elision2>
2205	2181	<elision1>	<elision1>
2205	2205	<>	<elision1>
2206	2207	<>	<aphaerese>
2206	2207	<>	<elision3>
2206	2207	<>	<elision2>
2206	2207	<>	<elision1>
2206	2210	.	κ
2206	2210	.	λ
2206	2213	<K>	<>
2207	2208	<>	<name>
2207	2207	<>	<aphaerese>
2207	2207	<>	<elision3>
2207	2207	<>	<elision2>
2207	2207	<>	<elision1>
2207	2210	.	κ
2207	2210	.	λ
2207	2214	<K>	<>
2208	2206	<>	<aphaerese>
2208	2206	<>	<elision3>
2208	2206	<>	<elision2>
2208	2206	<>	<elision1>
2208	2209	.	κ
2208	2209	.	λ
2208	2212	<K>	<>
2209	2210	<>	<aphaerese>
2209	2201	<elision3>	<elision3>
2209	2210	<>	<elision3>
2209	2201	<elision2>	<elision2>
2209	2210	<>	<elision2>
2209	2201	<elision1>	<elision1>
2209	2210	<>	<elision1>
2210	2211	<>	<name>
2210	2210	<>	<aphaerese>
2210	2201	<elision3>	<elision3>
2210	2210	<>	<elision3>
2210	2201	<elision2>	<elision2>
2210	2210	<>	<elision2>
2210	2201	<elision1>	<elision1>
2210	2210	<>	<elision1>
2211	2209	<>	<aphaerese>
2211	2200	<elision3>	<elision3>
2211	2209	<>	<elision3>
2211	2200	<elision2>	<elision2>
2211	2209	<>	<elision2>
2211	2200	<elision1>	<elision1>
2211	2209	<>	<elision1>
2212	2213	<>	<aphaerese>
2212	2213	<>	<elision3>
2212	2213	<>	<elision2>
2212	2213	<>	<elision1>
2212	2204	.	κ
2212	2204	.	λ
2213	2214	<>	<aphaerese>
2213	2214	<>	<elision3>
2213	2214	<>	<elision2>
2213	2214	<>	<elision1>
2213	2205	.	κ
2213	2205	.	λ
2214	2212	<>	<name>
2214	2214	<>	<aphaerese>
2214	2214	<>	<elision3>
2214	2214	<>	<elision2>
2214	2214	<>	<elision1>
2214	2205	.	κ
2214	2205	.	λ
2215	2216	<>	<name>
2215	2215	<>	<aphaerese>
2215	2215	<>	<elision3>
2215	2215	<>	<elision2>
2215	2215	<>	<elision1>
2215	2218	.	κ
2215	2218	.	λ
2215	2240	<4s>	<>
2216	2217	<>	<aphaerese>
2216	2217	<>	<elision3>
2216	2217	<>	<elision2>
2216	2217	<>	<elision1>
2216	2220	.	κ
2216	2220	.	λ
2216	2241	<4s>	<>
2217	2215	<>	<aphaerese>
2217	2215	<>	<elision3>
2217	2215	<>	<elision2>
2217	2215	<>	<elision1>
2217	2218	.	κ
2217	2218	.	λ
2217	2239	<4s>	<>
2218	2219	<>	<name>
2218	2218	<>	<aphaerese>
2218	2221	<elision3>	<elision3>
2218	2218	<>	<elision3>
2218	2221	<elision2>	<elision2>
2218	2218	<>	<elision2>
2218	2221	<elision1>	<elision1>
2218	2218	<>	<elision1>
2218	2231	<4s>	<>
2219	2220	<>	<aphaerese>
2219	2223	<elision3>	<elision3>
2219	2220	<>	<elision3>
2219	2223	<elision2>	<elision2>
2219	2220	<>	<elision2>
2219	2223	<elision1>	<elision1>
2219	2220	<>	<elision1>
2219	2232	<4s>	<>
2220	2218	<>	<aphaerese>
2220	2221	<elision3>	<elision3>
2220	2218	<>	<elision3>
2220	2221	<elision2>	<elision2>
2220	2218	<>	<elision2>
2220	2221	<elision1>	<elision1>
2220	2218	<>	<elision1>
2220	2230	<4s>	<>
2221	2222	<>	<name>
2221	2221	<>	<aphaerese>
2221	2221	<>	<elision3>
2221	2221	<>	<elision2>
2221	2221	<>	<elision1>
2221	1778	.	κ
2221	2225	<4s>	<>
2222	2223	<>	<aphaerese>
2222	2223	<>	<elision3>
2222	2223	<>	<elision2>
2222	2223	<>	<elision1>
2222	1780	.	κ
2222	2226	<4s>	<>
2223	2221	<>	<aphaerese>
2223	2221	<>	<elision3>
2223	2221	<>	<elision2>
2223	2221	<>	<elision1>
2223	1778	.	κ
2223	2224	<4s>	<>
2224	2225	<>	<aphaerese>
2224	2225	<>	<elision3>
2224	2225	<>	<elision2>
2224	2225	<>	<elision1>
2224	258	.	κ
2224	1172	H	κ
2224	1500	H	k
2224	1516	H	K
2224	1527	H	λ
2224	1930	H	l
2224	1935	H	L
2224	2228	<K>	<>
2225	2226	<>	<name>
2225	2225	<>	<aphaerese>
2225	2225	<>	<elision3>
2225	2225	<>	<elision2>
2225	2225	<>	<elision1>
2225	258	.	κ
2225	1172	H	κ
2225	1500	H	k
2225	1516	H	K
2225	1527	H	λ
2225	1930	H	l
2225	1935	H	L
2225	2229	<K>	<>
2226	2224	<>	<aphaerese>
2226	2224	<>	<elision3>
2226	2224	<>	<elision2>
2226	2224	<>	<elision1>
2226	260	.	κ
2226	1537	H	κ
2226	1541	H	k
2226	1545	H	K
2226	1529	H	λ
2226	1929	H	l
2226	1932	H	L
2226	2227	<K>	<>
2227	2228	<>	<aphaerese>
2227	2228	<>	<elision3>
2227	2228	<>	<elision2>
2227	2228	<>	<elision1>
2227	1604	.	κ
2227	1655	H	κ
2227	1709	H	k
2227	1722	H	K
2227	1730	H	λ
2227	1736	H	l
2227	1731	H	L
2228	2229	<>	<aphaerese>
2228	2229	<>	<elision3>
2228	2229	<>	<elision2>
2228	2229	<>	<elision1>
2228	1602	.	κ
2228	1653	H	κ
2228	1707	H	k
2228	1719	H	K
2228	1728	H	λ
2228	1734	H	l
2228	1737	H	L
2229	2227	<>	<name>
2229	2229	<>	<aphaerese>
2229	2229	<>	<elision3>
2229	2229	<>	<elision2>
2229	2229	<>	<elision1>
2229	1602	.	κ
2229	1653	H	κ
2229	1707	H	k
2229	1719	H	K
2229	1728	H	λ
2229	1734	H	l
2229	1737	H	L
2230	2231	<>	<aphaerese>
2230	2234	<elision3>	<elision3>
2230	2231	<>	<elision3>
2230	2234	<elision2>	<elision2>
2230	2231	<>	<elision2>
2230	2234	<elision1>	<elision1>
2230	2231	<>	<elision1>
2230	2237	<K>	<>
2231	2232	<>	<name>
2231	2231	<>	<aphaerese>
2231	2234	<elision3>	<elision3>
2231	2231	<>	<elision3>
2231	2234	<elision2>	<elision2>
2231	2231	<>	<elision2>
2231	2234	<elision1>	<elision1>
2231	2231	<>	<elision1>
2231	2238	<K>	<>
2232	2230	<>	<aphaerese>
2232	2233	<elision3>	<elision3>
2232	2230	<>	<elision3>
2232	2233	<elision2>	<elision2>
2232	2230	<>	<elision2>
2232	2233	<elision1>	<elision1>
2232	2230	<>	<elision1>
2232	2236	<K>	<>
2233	2234	<>	<aphaerese>
2233	2234	<>	<elision3>
2233	2234	<>	<elision2>
2233	2234	<>	<elision1>
2233	258	.	κ
2233	1172	H	κ
2233	1500	H	k
2233	1516	H	K
2233	1527	H	λ
2233	1533	H	l
2233	1536	H	L
2234	2235	<>	<name>
2234	2234	<>	<aphaerese>
2234	2234	<>	<elision3>
2234	2234	<>	<elision2>
2234	2234	<>	<elision1>
2234	258	.	κ
2234	1172	H	κ
2234	1500	H	k
2234	1516	H	K
2234	1527	H	λ
2234	1533	H	l
2234	1536	H	L
2235	2233	<>	<aphaerese>
2235	2233	<>	<elision3>
2235	2233	<>	<elision2>
2235	2233	<>	<elision1>
2235	260	.	κ
2235	1537	H	κ
2235	1541	H	k
2235	1545	H	K
2235	1529	H	λ
2235	1535	H	l
2235	1530	H	L
2236	2237	<>	<aphaerese>
2236	2228	<elision3>	<elision3>
2236	2237	<>	<elision3>
2236	2228	<elision2>	<elision2>
2236	2237	<>	<elision2>
2236	2228	<elision1>	<elision1>
2236	2237	<>	<elision1>
2237	2238	<>	<aphaerese>
2237	2229	<elision3>	<elision3>
2237	2238	<>	<elision3>
2237	2229	<elision2>	<elision2>
2237	2238	<>	<elision2>
2237	2229	<elision1>	<elision1>
2237	2238	<>	<elision1>
2238	2236	<>	<name>
2238	2238	<>	<aphaerese>
2238	2229	<elision3>	<elision3>
2238	2238	<>	<elision3>
2238	2229	<elision2>	<elision2>
2238	2238	<>	<elision2>
2238	2229	<elision1>	<elision1>
2238	2238	<>	<elision1>
2239	2240	<>	<aphaerese>
2239	2240	<>	<elision3>
2239	2240	<>	<elision2>
2239	2240	<>	<elision1>
2239	2243	.	κ
2239	2243	.	λ
2239	2246	<K>	<>
2240	2241	<>	<name>
2240	2240	<>	<aphaerese>
2240	2240	<>	<elision3>
2240	2240	<>	<elision2>
2240	2240	<>	<elision1>
2240	2243	.	κ
2240	2243	.	λ
2240	2247	<K>	<>
2241	2239	<>	<aphaerese>
2241	2239	<>	<elision3>
2241	2239	<>	<elision2>
2241	2239	<>	<elision1>
2241	2242	.	κ
2241	2242	.	λ
2241	2245	<K>	<>
2242	2243	<>	<aphaerese>
2242	2234	<elision3>	<elision3>
2242	2243	<>	<elision3>
2242	2234	<elision2>	<elision2>
2242	2243	<>	<elision2>
2242	2234	<elision1>	<elision1>
2242	2243	<>	<elision1>
2243	2244	<>	<name>
2243	2243	<>	<aphaerese>
2243	2234	<elision3>	<elision3>
2243	2243	<>	<elision3>
2243	2234	<elision2>	<elision2>
2243	2243	<>	<elision2>
2243	2234	<elision1>	<elision1>
2243	2243	<>	<elision1>
2244	2242	<>	<aphaerese>
2244	2233	<elision3>	<elision3>
2244	2242	<>	<elision3>
2244	2233	<elision2>	<elision2>
2244	2242	<>	<elision2>
2244	2233	<elision1>	<elision1>
2244	2242	<>	<elision1>
2245	2246	<>	<aphaerese>
2245	2246	<>	<elision3>
2245	2246	<>	<elision2>
2245	2246	<>	<elision1>
2245	2237	.	κ
2245	2237	.	λ
2246	2247	<>	<aphaerese>
2246	2247	<>	<elision3>
2246	2247	<>	<elision2>
2246	2247	<>	<elision1>
2246	2238	.	κ
2246	2238	.	λ
2247	2245	<>	<name>
2247	2247	<>	<aphaerese>
2247	2247	<>	<elision3>
2247	2247	<>	<elision2>
2247	2247	<>	<elision1>
2247	2238	.	κ
2247	2238	.	λ
2248	1772	.	.
2248	1772	 	 
2248	1772	<~>	<~>
2248	1772	<split-s>	<split-s>
2248	1772	<split-h>	<split-h>
2248	1772	<name2>	<name2>
2248	2249	<>	<name>
2248	1775	<aphaerese>	<aphaerese>
2248	2248	<>	<aphaerese>
2248	1772	<elision3>	<elision3>
2248	2248	<>	<elision3>
2248	1772	<elision2>	<elision2>
2248	2248	<>	<elision2>
2248	1772	<elision1>	<elision1>
2248	2248	<>	<elision1>
2248	1936	.	υ
2248	1936	.	u
2248	1936	.	α
2248	1936	.	a
2248	2252	<4s>	<>
2249	1774	.	.
2249	1774	 	 
2249	1774	<~>	<~>
2249	1774	<split-s>	<split-s>
2249	1774	<split-h>	<split-h>
2249	1774	<name2>	<name2>
2249	1777	<aphaerese>	<aphaerese>
2249	2250	<>	<aphaerese>
2249	1774	<elision3>	<elision3>
2249	2250	<>	<elision3>
2249	1774	<elision2>	<elision2>
2249	2250	<>	<elision2>
2249	1774	<elision1>	<elision1>
2249	2250	<>	<elision1>
2249	1938	.	υ
2249	1938	.	u
2249	1938	.	α
2249	1938	.	a
2249	2253	<4s>	<>
2250	1772	.	.
2250	1772	 	 
2250	1772	<~>	<~>
2250	1772	<split-s>	<split-s>
2250	1772	<split-h>	<split-h>
2250	1772	<name2>	<name2>
2250	1775	<aphaerese>	<aphaerese>
2250	2248	<>	<aphaerese>
2250	1772	<elision3>	<elision3>
2250	2248	<>	<elision3>
2250	1772	<elision2>	<elision2>
2250	2248	<>	<elision2>
2250	1772	<elision1>	<elision1>
2250	2248	<>	<elision1>
2250	1936	.	υ
2250	1936	.	u
2250	1936	.	α
2250	1936	.	a
2250	2251	<4s>	<>
2251	251	.	.
2251	252	 	 
2251	251	<~>	<~>
2251	251	<split-s>	<split-s>
2251	251	<split-h>	<split-h>
2251	251	<name2>	<name2>
2251	255	<aphaerese>	<aphaerese>
2251	2252	<>	<aphaerese>
2251	251	<elision3>	<elision3>
2251	2252	<>	<elision3>
2251	251	<elision2>	<elision2>
2251	2252	<>	<elision2>
2251	251	<elision1>	<elision1>
2251	2252	<>	<elision1>
2251	1546	.	υ
2251	1590	H	υ
2251	1546	.	u
2251	1592	H	u
2251	2005	H	κ
2251	1500	H	k
2251	1513	H	U
2251	1516	H	K
2251	1546	.	α
2251	1576	H	α
2251	1546	.	a
2251	1581	H	a
2251	1343	H	A
2251	1982	H	λ
2251	1930	H	l
2251	1935	H	L
2251	2255	<K>	<>
2252	251	.	.
2252	252	 	 
2252	251	<~>	<~>
2252	251	<split-s>	<split-s>
2252	251	<split-h>	<split-h>
2252	251	<name2>	<name2>
2252	2253	<>	<name>
2252	255	<aphaerese>	<aphaerese>
2252	2252	<>	<aphaerese>
2252	251	<elision3>	<elision3>
2252	2252	<>	<elision3>
2252	251	<elision2>	<elision2>
2252	2252	<>	<elision2>
2252	251	<elision1>	<elision1>
2252	2252	<>	<elision1>
2252	1546	.	υ
2252	1590	H	υ
2252	1546	.	u
2252	1592	H	u
2252	2005	H	κ
2252	1500	H	k
2252	1513	H	U
2252	1516	H	K
2252	1546	.	α
2252	1576	H	α
2252	1546	.	a
2252	1581	H	a
2252	1343	H	A
2252	1982	H	λ
2252	1930	H	l
2252	1935	H	L
2252	2256	<K>	<>
2253	250	.	.
2253	254	 	 
2253	250	<~>	<~>
2253	250	<split-s>	<split-s>
2253	250	<split-h>	<split-h>
2253	250	<name2>	<name2>
2253	257	<aphaerese>	<aphaerese>
2253	2251	<>	<aphaerese>
2253	250	<elision3>	<elision3>
2253	2251	<>	<elision3>
2253	250	<elision2>	<elision2>
2253	2251	<>	<elision2>
2253	250	<elision1>	<elision1>
2253	2251	<>	<elision1>
2253	1548	.	υ
2253	1585	H	υ
2253	1548	.	u
2253	1589	H	u
2253	1962	H	κ
2253	1541	H	k
2253	1515	H	U
2253	1545	H	K
2253	1548	.	α
2253	1575	H	α
2253	1548	.	a
2253	1580	H	a
2253	1346	H	A
2253	1981	H	λ
2253	1929	H	l
2253	1932	H	L
2253	2254	<K>	<>
2254	1598	.	.
2254	1598	<~>	<~>
2254	1598	<split-s>	<split-s>
2254	1598	<split-h>	<split-h>
2254	1598	<name2>	<name2>
2254	1601	<aphaerese>	<aphaerese>
2254	2255	<>	<aphaerese>
2254	1598	<elision3>	<elision3>
2254	2255	<>	<elision3>
2254	1598	<elision2>	<elision2>
2254	2255	<>	<elision2>
2254	1598	<elision1>	<elision1>
2254	2255	<>	<elision1>
2254	1594	.	υ
2254	1740	H	υ
2254	1594	.	u
2254	1749	H	u
2254	1992	H	κ
2254	1709	H	k
2254	1718	H	U
2254	1722	H	K
2254	1594	.	α
2254	1752	H	α
2254	1594	.	a
2254	1755	H	a
2254	1689	H	A
2254	2001	H	λ
2254	1736	H	l
2254	1731	H	L
2255	1596	.	.
2255	1596	<~>	<~>
2255	1596	<split-s>	<split-s>
2255	1596	<split-h>	<split-h>
2255	1596	<name2>	<name2>
2255	1599	<aphaerese>	<aphaerese>
2255	2256	<>	<aphaerese>
2255	1596	<elision3>	<elision3>
2255	2256	<>	<elision3>
2255	1596	<elision2>	<elision2>
2255	2256	<>	<elision2>
2255	1596	<elision1>	<elision1>
2255	2256	<>	<elision1>
2255	1595	.	υ
2255	1738	H	υ
2255	1595	.	u
2255	1747	H	u
2255	1990	H	κ
2255	1707	H	k
2255	1716	H	U
2255	1719	H	K
2255	1595	.	α
2255	1750	H	α
2255	1595	.	a
2255	1753	H	a
2255	1687	H	A
2255	1999	H	λ
2255	1734	H	l
2255	1737	H	L
2256	1596	.	.
2256	1596	<~>	<~>
2256	1596	<split-s>	<split-s>
2256	1596	<split-h>	<split-h>
2256	1596	<name2>	<name2>
2256	2254	<>	<name>
2256	1599	<aphaerese>	<aphaerese>
2256	2256	<>	<aphaerese>
2256	1596	<elision3>	<elision3>
2256	2256	<>	<elision3>
2256	1596	<elision2>	<elision2>
2256	2256	<>	<elision2>
2256	1596	<elision1>	<elision1>
2256	2256	<>	<elision1>
2256	1595	.	υ
2256	1738	H	υ
2256	1595	.	u
2256	1747	H	u
2256	1990	H	κ
2256	1707	H	k
2256	1716	H	U
2256	1719	H	K
2256	1595	.	α
2256	1750	H	α
2256	1595	.	a
2256	1753	H	a
2256	1687	H	A
2256	1999	H	λ
2256	1734	H	l
2256	1737	H	L
2257	2258	<name>	<name>
2257	2259	<K>	<>
2258	1545	H	k
2258	1530	H	l
2259	2148	<name>	<name>
2260	1772	.	.
2260	1772	 	 
2260	1772	<~>	<~>
2260	1772	<split-s>	<split-s>
2260	1772	<split-h>	<split-h>
2260	1772	<name2>	<name2>
2260	2146	<name2>	<name>
2260	2249	<>	<name>
2260	1775	<aphaerese>	<aphaerese>
2260	2248	<>	<aphaerese>
2260	1772	<elision3>	<elision3>
2260	2248	<>	<elision3>
2260	1772	<elision2>	<elision2>
2260	2248	<>	<elision2>
2260	1772	<elision1>	<elision1>
2260	2248	<>	<elision1>
2260	1936	.	υ
2260	1936	.	u
2260	1936	.	α
2260	1936	.	a
2260	2261	<4s>	<>
2261	251	.	.
2261	252	 	 
2261	251	<~>	<~>
2261	251	<split-s>	<split-s>
2261	251	<split-h>	<split-h>
2261	251	<name2>	<name2>
2261	2258	<name2>	<name>
2261	2253	<>	<name>
2261	255	<aphaerese>	<aphaerese>
2261	2252	<>	<aphaerese>
2261	251	<elision3>	<elision3>
2261	2252	<>	<elision3>
2261	251	<elision2>	<elision2>
2261	2252	<>	<elision2>
2261	251	<elision1>	<elision1>
2261	2252	<>	<elision1>
2261	1546	.	υ
2261	1590	H	υ
2261	1546	.	u
2261	1592	H	u
2261	2005	H	κ
2261	1500	H	k
2261	1513	H	U
2261	1516	H	K
2261	1546	.	α
2261	1576	H	α
2261	1546	.	a
2261	1581	H	a
2261	1343	H	A
2261	1982	H	λ
2261	1930	H	l
2261	1935	H	L
2261	2262	<K>	<>
2262	1596	.	.
2262	1596	<~>	<~>
2262	1596	<split-s>	<split-s>
2262	1596	<split-h>	<split-h>
2262	1596	<name2>	<name2>
2262	2148	<name2>	<name>
2262	2254	<>	<name>
2262	1599	<aphaerese>	<aphaerese>
2262	2256	<>	<aphaerese>
2262	1596	<elision3>	<elision3>
2262	2256	<>	<elision3>
2262	1596	<elision2>	<elision2>
2262	2256	<>	<elision2>
2262	1596	<elision1>	<elision1>
2262	2256	<>	<elision1>
2262	1595	.	υ
2262	1738	H	υ
2262	1595	.	u
2262	1747	H	u
2262	1990	H	κ
2262	1707	H	k
2262	1716	H	U
2262	1719	H	K
2262	1595	.	α
2262	1750	H	α
2262	1595	.	a
2262	1753	H	a
2262	1687	H	A
2262	1999	H	λ
2262	1734	H	l
2262	1737	H	L
2263	2264	<>	<name>
2263	2263	<>	<aphaerese>
2263	2263	<>	<elision3>
2263	2263	<>	<elision2>
2263	2263	<>	<elision1>
2263	1772	<A2kl>	<>
2264	2265	<>	<aphaerese>
2264	2265	<>	<elision3>
2264	2265	<>	<elision2>
2264	2265	<>	<elision1>
2264	1773	<A2kl>	<>
2265	2263	<>	<aphaerese>
2265	2263	<>	<elision3>
2265	2263	<>	<elision2>
2265	2263	<>	<elision1>
2265	1774	<A2kl>	<>
2266	2146	<name>	<name>
2266	2267	<>	<name>
2266	2269	<>	<aphaerese>
2266	2269	<>	<elision3>
2266	2269	<>	<elision2>
2266	2269	<>	<elision1>
2266	2257	<4s>	<>
2266	2152	<A2kl>	<>
2266	2279	<L2kl>	<>
2267	2268	<>	<aphaerese>
2267	2268	<>	<elision3>
2267	2268	<>	<elision2>
2267	2268	<>	<elision1>
2267	2153	<A2kl>	<>
2267	2271	<L2kl>	<>
2268	2269	<>	<aphaerese>
2268	2269	<>	<elision3>
2268	2269	<>	<elision2>
2268	2269	<>	<elision1>
2268	2154	<A2kl>	<>
2268	2272	<L2kl>	<>
2269	2267	<>	<name>
2269	2269	<>	<aphaerese>
2269	2269	<>	<elision3>
2269	2269	<>	<elision2>
2269	2269	<>	<elision1>
2269	2152	<A2kl>	<>
2269	2270	<L2kl>	<>
2270	1772	.	.
2270	1772	 	 
2270	1772	<~>	<~>
2270	1772	<split-s>	<split-s>
2270	1772	<split-h>	<split-h>
2270	1772	<name2>	<name2>
2270	2271	<>	<name>
2270	1775	<aphaerese>	<aphaerese>
2270	2270	<>	<aphaerese>
2270	1772	<elision3>	<elision3>
2270	2270	<>	<elision3>
2270	1772	<elision2>	<elision2>
2270	2270	<>	<elision2>
2270	1772	<elision1>	<elision1>
2270	2270	<>	<elision1>
2270	1936	.	υ
2270	1936	.	u
2270	2218	.	κ
2270	1936	.	α
2270	1936	.	a
2270	2218	.	λ
2270	2274	<4s>	<>
2271	1774	.	.
2271	1774	 	 
2271	1774	<~>	<~>
2271	1774	<split-s>	<split-s>
2271	1774	<split-h>	<split-h>
2271	1774	<name2>	<name2>
2271	1777	<aphaerese>	<aphaerese>
2271	2272	<>	<aphaerese>
2271	1774	<elision3>	<elision3>
2271	2272	<>	<elision3>
2271	1774	<elision2>	<elision2>
2271	2272	<>	<elision2>
2271	1774	<elision1>	<elision1>
2271	2272	<>	<elision1>
2271	1938	.	υ
2271	1938	.	u
2271	2220	.	κ
2271	1938	.	α
2271	1938	.	a
2271	2220	.	λ
2271	2275	<4s>	<>
2272	1772	.	.
2272	1772	 	 
2272	1772	<~>	<~>
2272	1772	<split-s>	<split-s>
2272	1772	<split-h>	<split-h>
2272	1772	<name2>	<name2>
2272	1775	<aphaerese>	<aphaerese>
2272	2270	<>	<aphaerese>
2272	1772	<elision3>	<elision3>
2272	2270	<>	<elision3>
2272	1772	<elision2>	<elision2>
2272	2270	<>	<elision2>
2272	1772	<elision1>	<elision1>
2272	2270	<>	<elision1>
2272	1936	.	υ
2272	1936	.	u
2272	2218	.	κ
2272	1936	.	α
2272	1936	.	a
2272	2218	.	λ
2272	2273	<4s>	<>
2273	251	.	.
2273	252	 	 
2273	251	<~>	<~>
2273	251	<split-s>	<split-s>
2273	251	<split-h>	<split-h>
2273	251	<name2>	<name2>
2273	255	<aphaerese>	<aphaerese>
2273	2274	<>	<aphaerese>
2273	251	<elision3>	<elision3>
2273	2274	<>	<elision3>
2273	251	<elision2>	<elision2>
2273	2274	<>	<elision2>
2273	251	<elision1>	<elision1>
2273	2274	<>	<elision1>
2273	1546	.	υ
2273	1590	H	υ
2273	1546	.	u
2273	1592	H	u
2273	2243	.	κ
2273	2005	H	κ
2273	1500	H	k
2273	1513	H	U
2273	1516	H	K
2273	1546	.	α
2273	1576	H	α
2273	1546	.	a
2273	1581	H	a
2273	1343	H	A
2273	2243	.	λ
2273	1982	H	λ
2273	1930	H	l
2273	1935	H	L
2273	2277	<K>	<>
2274	251	.	.
2274	252	 	 
2274	251	<~>	<~>
2274	251	<split-s>	<split-s>
2274	251	<split-h>	<split-h>
2274	251	<name2>	<name2>
2274	2275	<>	<name>
2274	255	<aphaerese>	<aphaerese>
2274	2274	<>	<aphaerese>
2274	251	<elision3>	<elision3>
2274	2274	<>	<elision3>
2274	251	<elision2>	<elision2>
2274	2274	<>	<elision2>
2274	251	<elision1>	<elision1>
2274	2274	<>	<elision1>
2274	1546	.	υ
2274	1590	H	υ
2274	1546	.	u
2274	1592	H	u
2274	2243	.	κ
2274	2005	H	κ
2274	1500	H	k
2274	1513	H	U
2274	1516	H	K
2274	1546	.	α
2274	1576	H	α
2274	1546	.	a
2274	1581	H	a
2274	1343	H	A
2274	2243	.	λ
2274	1982	H	λ
2274	1930	H	l
2274	1935	H	L
2274	2278	<K>	<>
2275	250	.	.
2275	254	 	 
2275	250	<~>	<~>
2275	250	<split-s>	<split-s>
2275	250	<split-h>	<split-h>
2275	250	<name2>	<name2>
2275	257	<aphaerese>	<aphaerese>
2275	2273	<>	<aphaerese>
2275	250	<elision3>	<elision3>
2275	2273	<>	<elision3>
2275	250	<elision2>	<elision2>
2275	2273	<>	<elision2>
2275	250	<elision1>	<elision1>
2275	2273	<>	<elision1>
2275	1548	.	υ
2275	1585	H	υ
2275	1548	.	u
2275	1589	H	u
2275	2242	.	κ
2275	1962	H	κ
2275	1541	H	k
2275	1515	H	U
2275	1545	H	K
2275	1548	.	α
2275	1575	H	α
2275	1548	.	a
2275	1580	H	a
2275	1346	H	A
2275	2242	.	λ
2275	1981	H	λ
2275	1929	H	l
2275	1932	H	L
2275	2276	<K>	<>
2276	1598	.	.
2276	1598	<~>	<~>
2276	1598	<split-s>	<split-s>
2276	1598	<split-h>	<split-h>
2276	1598	<name2>	<name2>
2276	1601	<aphaerese>	<aphaerese>
2276	2277	<>	<aphaerese>
2276	1598	<elision3>	<elision3>
2276	2277	<>	<elision3>
2276	1598	<elision2>	<elision2>
2276	2277	<>	<elision2>
2276	1598	<elision1>	<elision1>
2276	2277	<>	<elision1>
2276	1594	.	υ
2276	1740	H	υ
2276	1594	.	u
2276	1749	H	u
2276	2237	.	κ
2276	1992	H	κ
2276	1709	H	k
2276	1718	H	U
2276	1722	H	K
2276	1594	.	α
2276	1752	H	α
2276	1594	.	a
2276	1755	H	a
2276	1689	H	A
2276	2237	.	λ
2276	2001	H	λ
2276	1736	H	l
2276	1731	H	L
2277	1596	.	.
2277	1596	<~>	<~>
2277	1596	<split-s>	<split-s>
2277	1596	<split-h>	<split-h>
2277	1596	<name2>	<name2>
2277	1599	<aphaerese>	<aphaerese>
2277	2278	<>	<aphaerese>
2277	1596	<elision3>	<elision3>
2277	2278	<>	<elision3>
2277	1596	<elision2>	<elision2>
2277	2278	<>	<elision2>
2277	1596	<elision1>	<elision1>
2277	2278	<>	<elision1>
2277	1595	.	υ
2277	1738	H	υ
2277	1595	.	u
2277	1747	H	u
2277	2238	.	κ
2277	1990	H	κ
2277	1707	H	k
2277	1716	H	U
2277	1719	H	K
2277	1595	.	α
2277	1750	H	α
2277	1595	.	a
2277	1753	H	a
2277	1687	H	A
2277	2238	.	λ
2277	1999	H	λ
2277	1734	H	l
2277	1737	H	L
2278	1596	.	.
2278	1596	<~>	<~>
2278	1596	<split-s>	<split-s>
2278	1596	<split-h>	<split-h>
2278	1596	<name2>	<name2>
2278	2276	<>	<name>
2278	1599	<aphaerese>	<aphaerese>
2278	2278	<>	<aphaerese>
2278	1596	<elision3>	<elision3>
2278	2278	<>	<elision3>
2278	1596	<elision2>	<elision2>
2278	2278	<>	<elision2>
2278	1596	<elision1>	<elision1>
2278	2278	<>	<elision1>
2278	1595	.	υ
2278	1738	H	υ
2278	1595	.	u
2278	1747	H	u
2278	2238	.	κ
2278	1990	H	κ
2278	1707	H	k
2278	1716	H	U
2278	1719	H	K
2278	1595	.	α
2278	1750	H	α
2278	1595	.	a
2278	1753	H	a
2278	1687	H	A
2278	2238	.	λ
2278	1999	H	λ
2278	1734	H	l
2278	1737	H	L
2279	1772	.	.
2279	1772	 	 
2279	1772	<~>	<~>
2279	1772	<split-s>	<split-s>
2279	1772	<split-h>	<split-h>
2279	1772	<name2>	<name2>
2279	2146	<name2>	<name>
2279	2271	<>	<name>
2279	1775	<aphaerese>	<aphaerese>
2279	2270	<>	<aphaerese>
2279	1772	<elision3>	<elision3>
2279	2270	<>	<elision3>
2279	1772	<elision2>	<elision2>
2279	2270	<>	<elision2>
2279	1772	<elision1>	<elision1>
2279	2270	<>	<elision1>
2279	1936	.	υ
2279	1936	.	u
2279	2218	.	κ
2279	1936	.	α
2279	1936	.	a
2279	2218	.	λ
2279	2280	<4s>	<>
2280	251	.	.
2280	252	 	 
2280	251	<~>	<~>
2280	251	<split-s>	<split-s>
2280	251	<split-h>	<split-h>
2280	251	<name2>	<name2>
2280	2258	<name2>	<name>
2280	2275	<>	<name>
2280	255	<aphaerese>	<aphaerese>
2280	2274	<>	<aphaerese>
2280	251	<elision3>	<elision3>
2280	2274	<>	<elision3>
2280	251	<elision2>	<elision2>
2280	2274	<>	<elision2>
2280	251	<elision1>	<elision1>
2280	2274	<>	<elision1>
2280	1546	.	υ
2280	1590	H	υ
2280	1546	.	u
2280	1592	H	u
2280	2243	.	κ
2280	2005	H	κ
2280	1500	H	k
2280	1513	H	U
2280	1516	H	K
2280	1546	.	α
2280	1576	H	α
2280	1546	.	a
2280	1581	H	a
2280	1343	H	A
2280	2243	.	λ
2280	1982	H	λ
2280	1930	H	l
2280	1935	H	L
2280	2281	<K>	<>
2281	1596	.	.
2281	1596	<~>	<~>
2281	1596	<split-s>	<split-s>
2281	1596	<split-h>	<split-h>
2281	1596	<name2>	<name2>
2281	2148	<name2>	<name>
2281	2276	<>	<name>
2281	1599	<aphaerese>	<aphaerese>
2281	2278	<>	<aphaerese>
2281	1596	<elision3>	<elision3>
2281	2278	<>	<elision3>
2281	1596	<elision2>	<elision2>
2281	2278	<>	<elision2>
2281	1596	<elision1>	<elision1>
2281	2278	<>	<elision1>
2281	1595	.	υ
2281	1738	H	υ
2281	1595	.	u
2281	1747	H	u
2281	2238	.	κ
2281	1990	H	κ
2281	1707	H	k
2281	1716	H	U
2281	1719	H	K
2281	1595	.	α
2281	1750	H	α
2281	1595	.	a
2281	1753	H	a
2281	1687	H	A
2281	2238	.	λ
2281	1999	H	λ
2281	1734	H	l
2281	1737	H	L
2282	2283	<>	<name>
2282	2282	<>	<aphaerese>
2282	2282	<>	<elision3>
2282	2282	<>	<elision2>
2282	2282	<>	<elision1>
2282	1940	<3s>	<>
2283	2284	<>	<aphaerese>
2283	2284	<>	<elision3>
2283	2284	<>	<elision2>
2283	2284	<>	<elision1>
2283	1941	<3s>	<>
2284	2282	<>	<aphaerese>
2284	2282	<>	<elision3>
2284	2282	<>	<elision2>
2284	2282	<>	<elision1>
2284	1939	<3s>	<>
2285	1772	.	.
2285	1772	 	 
2285	1772	<~>	<~>
2285	1772	<split-s>	<split-s>
2285	1772	<split-h>	<split-h>
2285	1772	<name2>	<name2>
2285	1942	<>	<name>
2285	1775	<aphaerese>	<aphaerese>
2285	1771	<>	<aphaerese>
2285	1771	<>	<elision3>
2285	1771	<>	<elision2>
2285	1771	<>	<elision1>
2285	1936	.	υ
2285	1936	.	u
2285	1778	.	κ
2285	1936	.	α
2285	1936	.	a
2285	2286	<4s>	<>
2286	251	.	.
2286	252	 	 
2286	251	<~>	<~>
2286	251	<split-s>	<split-s>
2286	251	<split-h>	<split-h>
2286	251	<name2>	<name2>
2286	1946	<>	<name>
2286	255	<aphaerese>	<aphaerese>
2286	1945	<>	<aphaerese>
2286	1945	<>	<elision3>
2286	1945	<>	<elision2>
2286	1945	<>	<elision1>
2286	1546	.	υ
2286	1546	.	u
2286	258	.	κ
2286	1513	H	U
2286	1516	H	K
2286	1546	.	α
2286	1546	.	a
2286	1343	H	A
2286	1935	H	L
2286	2287	<K>	<>
2287	1596	.	.
2287	1596	<~>	<~>
2287	1596	<split-s>	<split-s>
2287	1596	<split-h>	<split-h>
2287	1596	<name2>	<name2>
2287	1947	<>	<name>
2287	1599	<aphaerese>	<aphaerese>
2287	1949	<>	<aphaerese>
2287	1949	<>	<elision3>
2287	1949	<>	<elision2>
2287	1949	<>	<elision1>
2287	1595	.	υ
2287	1595	.	u
2287	1602	.	κ
2287	1716	H	U
2287	1719	H	K
2287	1595	.	α
2287	1595	.	a
2287	1687	H	A
2287	1737	H	L
2288	1772	.	.
2288	1772	 	 
2288	1772	<~>	<~>
2288	1772	<split-s>	<split-s>
2288	1772	<split-h>	<split-h>
2288	1772	<name2>	<name2>
2288	2022	<>	<name>
2288	1775	<aphaerese>	<aphaerese>
2288	2021	<>	<aphaerese>
2288	2024	<elision3>	<elision3>
2288	2021	<>	<elision3>
2288	2024	<elision2>	<elision2>
2288	2021	<>	<elision2>
2288	2024	<elision1>	<elision1>
2288	2021	<>	<elision1>
2288	1936	.	υ
2288	1936	.	u
2288	1936	.	κ
2288	1936	.	α
2288	1936	.	a
2288	1936	.	λ
2288	2289	<4s>	<>
2289	251	.	.
2289	252	 	 
2289	251	<~>	<~>
2289	251	<split-s>	<split-s>
2289	251	<split-h>	<split-h>
2289	251	<name2>	<name2>
2289	2126	<>	<name>
2289	255	<aphaerese>	<aphaerese>
2289	2125	<>	<aphaerese>
2289	2128	<elision3>	<elision3>
2289	2125	<>	<elision3>
2289	2128	<elision2>	<elision2>
2289	2125	<>	<elision2>
2289	2128	<elision1>	<elision1>
2289	2125	<>	<elision1>
2289	1546	.	υ
2289	1546	.	u
2289	1546	.	κ
2289	1513	H	U
2289	1516	H	K
2289	1546	.	α
2289	1546	.	a
2289	1343	H	A
2289	1546	.	λ
2289	1935	H	L
2289	2290	<K>	<>
2290	1596	.	.
2290	1596	<~>	<~>
2290	1596	<split-s>	<split-s>
2290	1596	<split-h>	<split-h>
2290	1596	<name2>	<name2>
2290	2130	<>	<name>
2290	1599	<aphaerese>	<aphaerese>
2290	2132	<>	<aphaerese>
2290	2077	<elision3>	<elision3>
2290	2132	<>	<elision3>
2290	2077	<elision2>	<elision2>
2290	2132	<>	<elision2>
2290	2077	<elision1>	<elision1>
2290	2132	<>	<elision1>
2290	1595	.	υ
2290	1595	.	u
2290	1595	.	κ
2290	1716	H	U
2290	1719	H	K
2290	1595	.	α
2290	1595	.	a
2290	1687	H	A
2290	1595	.	λ
2290	1737	H	L
2291	1772	.	.
2291	1772	 	 
2291	1772	<~>	<~>
2291	1772	<split-s>	<split-s>
2291	1772	<split-h>	<split-h>
2291	1772	<name2>	<name2>
2291	2134	<>	<name>
2291	1775	<aphaerese>	<aphaerese>
2291	2133	<>	<aphaerese>
2291	1772	<elision3>	<elision3>
2291	2133	<>	<elision3>
2291	1772	<elision2>	<elision2>
2291	2133	<>	<elision2>
2291	1772	<elision1>	<elision1>
2291	2133	<>	<elision1>
2291	1936	.	υ
2291	1936	.	u
2291	1936	.	κ
2291	1936	.	α
2291	1936	.	a
2291	1936	.	λ
2291	2292	<4s>	<>
2292	251	.	.
2292	252	 	 
2292	251	<~>	<~>
2292	251	<split-s>	<split-s>
2292	251	<split-h>	<split-h>
2292	251	<name2>	<name2>
2292	2138	<>	<name>
2292	255	<aphaerese>	<aphaerese>
2292	2137	<>	<aphaerese>
2292	251	<elision3>	<elision3>
2292	2137	<>	<elision3>
2292	251	<elision2>	<elision2>
2292	2137	<>	<elision2>
2292	251	<elision1>	<elision1>
2292	2137	<>	<elision1>
2292	1546	.	υ
2292	1546	.	u
2292	1546	.	κ
2292	1513	H	U
2292	1516	H	K
2292	1546	.	α
2292	1546	.	a
2292	1343	H	A
2292	1546	.	λ
2292	1935	H	L
2292	2293	<K>	<>
2293	1596	.	.
2293	1596	<~>	<~>
2293	1596	<split-s>	<split-s>
2293	1596	<split-h>	<split-h>
2293	1596	<name2>	<name2>
2293	2139	<>	<name>
2293	1599	<aphaerese>	<aphaerese>
2293	2141	<>	<aphaerese>
2293	1596	<elision3>	<elision3>
2293	2141	<>	<elision3>
2293	1596	<elision2>	<elision2>
2293	2141	<>	<elision2>
2293	1596	<elision1>	<elision1>
2293	2141	<>	<elision1>
2293	1595	.	υ
2293	1595	.	u
2293	1595	.	κ
2293	1716	H	U
2293	1719	H	K
2293	1595	.	α
2293	1595	.	a
2293	1687	H	A
2293	1595	.	λ
2293	1737	H	L
2294	2143	<>	<name>
2294	2142	<>	<aphaerese>
2294	2142	<>	<elision3>
2294	2142	<>	<elision2>
2294	2142	<>	<elision1>
2294	2295	<U2kl>	<>
2295	1772	.	.
2295	1772	 	 
2295	1772	<~>	<~>
2295	1772	<split-s>	<split-s>
2295	1772	<split-h>	<split-h>
2295	1772	<name2>	<name2>
2295	1773	<>	<name>
2295	1775	<aphaerese>	<aphaerese>
2295	1772	<>	<aphaerese>
2295	1772	<elision3>	<elision3>
2295	1772	<>	<elision3>
2295	1772	<elision2>	<elision2>
2295	1772	<>	<elision2>
2295	1772	<elision1>	<elision1>
2295	1772	<>	<elision1>
2295	1936	.	υ
2295	1936	.	u
2295	1778	.	κ
2295	1936	.	α
2295	1936	.	a
2295	2296	<4s>	<>
2296	251	.	.
2296	252	 	 
2296	251	<~>	<~>
2296	251	<split-s>	<split-s>
2296	251	<split-h>	<split-h>
2296	251	<name2>	<name2>
2296	1941	<>	<name>
2296	255	<aphaerese>	<aphaerese>
2296	1940	<>	<aphaerese>
2296	251	<elision3>	<elision3>
2296	1940	<>	<elision3>
2296	251	<elision2>	<elision2>
2296	1940	<>	<elision2>
2296	251	<elision1>	<elision1>
2296	1940	<>	<elision1>
2296	1546	.	υ
2296	1546	.	u
2296	258	.	κ
2296	1513	H	U
2296	1516	H	K
2296	1546	.	α
2296	1546	.	a
2296	1343	H	A
2296	1935	H	L
2296	2297	<K>	<>
2297	1596	.	.
2297	1596	<~>	<~>
2297	1596	<split-s>	<split-s>
2297	1596	<split-h>	<split-h>
2297	1596	<name2>	<name2>
2297	1597	<>	<name>
2297	1599	<aphaerese>	<aphaerese>
2297	1596	<>	<aphaerese>
2297	1596	<elision3>	<elision3>
2297	1596	<>	<elision3>
2297	1596	<elision2>	<elision2>
2297	1596	<>	<elision2>
2297	1596	<elision1>	<elision1>
2297	1596	<>	<elision1>
2297	1595	.	υ
2297	1595	.	u
2297	1602	.	κ
2297	1716	H	U
2297	1719	H	K
2297	1595	.	α
2297	1595	.	a
2297	1687	H	A
2297	1737	H	L
2298	2146	<name>	<name>
2298	2149	<>	<name>
2298	2151	<>	<aphaerese>
2298	2151	<>	<elision3>
2298	2151	<>	<elision2>
2298	2151	<>	<elision1>
2298	2257	<4s>	<>
2298	2152	<A2kl>	<>
2298	2215	<L2kl>	<>
2298	2299	<K2kl>	<>
2299	1772	.	.
2299	1772	 	 
2299	1772	<~>	<~>
2299	1772	<split-s>	<split-s>
2299	1772	<split-h>	<split-h>
2299	1772	<name2>	<name2>
2299	2146	<name2>	<name>
2299	2249	<>	<name>
2299	1775	<aphaerese>	<aphaerese>
2299	2248	<>	<aphaerese>
2299	1772	<elision3>	<elision3>
2299	2248	<>	<elision3>
2299	1772	<elision2>	<elision2>
2299	2248	<>	<elision2>
2299	1772	<elision1>	<elision1>
2299	2248	<>	<elision1>
2299	1936	.	υ
2299	1936	.	u
2299	1936	.	α
2299	1936	.	a
2299	2300	<4s>	<>
2300	251	.	.
2300	252	 	 
2300	251	<~>	<~>
2300	251	<split-s>	<split-s>
2300	251	<split-h>	<split-h>
2300	251	<name2>	<name2>
2300	2258	<name2>	<name>
2300	2253	<>	<name>
2300	255	<aphaerese>	<aphaerese>
2300	2252	<>	<aphaerese>
2300	251	<elision3>	<elision3>
2300	2252	<>	<elision3>
2300	251	<elision2>	<elision2>
2300	2252	<>	<elision2>
2300	251	<elision1>	<elision1>
2300	2252	<>	<elision1>
2300	1546	.	υ
2300	1546	.	u
2300	1513	H	U
2300	1516	H	K
2300	1546	.	α
2300	1546	.	a
2300	1343	H	A
2300	1935	H	L
2300	2301	<K>	<>
2301	1596	.	.
2301	1596	<~>	<~>
2301	1596	<split-s>	<split-s>
2301	1596	<split-h>	<split-h>
2301	1596	<name2>	<name2>
2301	2148	<name2>	<name>
2301	2254	<>	<name>
2301	1599	<aphaerese>	<aphaerese>
2301	2256	<>	<aphaerese>
2301	1596	<elision3>	<elision3>
2301	2256	<>	<elision3>
2301	1596	<elision2>	<elision2>
2301	2256	<>	<elision2>
2301	1596	<elision1>	<elision1>
2301	2256	<>	<elision1>
2301	1595	.	υ
2301	1595	.	u
2301	1716	H	U
2301	1719	H	K
2301	1595	.	α
2301	1595	.	a
2301	1687	H	A
2301	1737	H	L
2302	2264	<>	<name>
2302	2263	<>	<aphaerese>
2302	2263	<>	<elision3>
2302	2263	<>	<elision2>
2302	2263	<>	<elision1>
2302	2295	<A2kl>	<>
2303	2146	<name>	<name>
2303	2267	<>	<name>
2303	2269	<>	<aphaerese>
2303	2269	<>	<elision3>
2303	2269	<>	<elision2>
2303	2269	<>	<elision1>
2303	2257	<4s>	<>
2303	2152	<A2kl>	<>
2303	2304	<L2kl>	<>
2304	1772	.	.
2304	1772	 	 
2304	1772	<~>	<~>
2304	1772	<split-s>	<split-s>
2304	1772	<split-h>	<split-h>
2304	1772	<name2>	<name2>
2304	2146	<name2>	<name>
2304	2271	<>	<name>
2304	1775	<aphaerese>	<aphaerese>
2304	2270	<>	<aphaerese>
2304	1772	<elision3>	<elision3>
2304	2270	<>	<elision3>
2304	1772	<elision2>	<elision2>
2304	2270	<>	<elision2>
2304	1772	<elision1>	<elision1>
2304	2270	<>	<elision1>
2304	1936	.	υ
2304	1936	.	u
2304	2218	.	κ
2304	1936	.	α
2304	1936	.	a
2304	2218	.	λ
2304	2305	<4s>	<>
2305	251	.	.
2305	252	 	 
2305	251	<~>	<~>
2305	251	<split-s>	<split-s>
2305	251	<split-h>	<split-h>
2305	251	<name2>	<name2>
2305	2258	<name2>	<name>
2305	2275	<>	<name>
2305	255	<aphaerese>	<aphaerese>
2305	2274	<>	<aphaerese>
2305	251	<elision3>	<elision3>
2305	2274	<>	<elision3>
2305	251	<elision2>	<elision2>
2305	2274	<>	<elision2>
2305	251	<elision1>	<elision1>
2305	2274	<>	<elision1>
2305	1546	.	υ
2305	1546	.	u
2305	2243	.	κ
2305	1513	H	U
2305	1516	H	K
2305	1546	.	α
2305	1546	.	a
2305	1343	H	A
2305	2243	.	λ
2305	1935	H	L
2305	2306	<K>	<>
2306	1596	.	.
2306	1596	<~>	<~>
2306	1596	<split-s>	<split-s>
2306	1596	<split-h>	<split-h>
2306	1596	<name2>	<name2>
2306	2148	<name2>	<name>
2306	2276	<>	<name>
2306	1599	<aphaerese>	<aphaerese>
2306	2278	<>	<aphaerese>
2306	1596	<elision3>	<elision3>
2306	2278	<>	<elision3>
2306	1596	<elision2>	<elision2>
2306	2278	<>	<elision2>
2306	1596	<elision1>	<elision1>
2306	2278	<>	<elision1>
2306	1595	.	υ
2306	1595	.	u
2306	2238	.	κ
2306	1716	H	U
2306	1719	H	K
2306	1595	.	α
2306	1595	.	a
2306	1687	H	A
2306	2238	.	λ
2306	1737	H	L
2307	1757	.	.
2307	1758	 	 
2307	1757	<~>	<~>
2307	1757	<split-s>	<split-s>
2307	1757	<split-h>	<split-h>
2307	1757	<name2>	<name2>
2307	1761	<aphaerese>	<aphaerese>
2307	1761	<>	<aphaerese>
2307	1757	<elision3>	<elision3>
2307	1761	<>	<elision3>
2307	1757	<elision2>	<elision2>
2307	1761	<>	<elision2>
2307	1757	<elision1>	<elision1>
2307	1761	<>	<elision1>
2307	1757	.	υ
2307	1757	.	u
2307	1950	.	κ
2307	2021	s	κ
2307	2133	s	k
2307	2142	s	U
2307	2308	s	K
2307	1757	.	α
2307	1757	.	a
2307	2263	s	A
2307	2133	s	λ
2307	2133	s	l
2307	2321	s	L
2307	2328	<split-h>	<>
2308	2146	<name>	<name>
2308	2309	<>	<name>
2308	2311	<>	<aphaerese>
2308	2311	<>	<elision3>
2308	2311	<>	<elision2>
2308	2311	<>	<elision1>
2308	2257	<4s>	<>
2308	2312	<L2kl>	<>
2308	2260	<K2kl>	<>
2309	2310	<>	<aphaerese>
2309	2310	<>	<elision3>
2309	2310	<>	<elision2>
2309	2310	<>	<elision1>
2309	2313	<L2kl>	<>
2309	2249	<K2kl>	<>
2310	2311	<>	<aphaerese>
2310	2311	<>	<elision3>
2310	2311	<>	<elision2>
2310	2311	<>	<elision1>
2310	2314	<L2kl>	<>
2310	2250	<K2kl>	<>
2311	2309	<>	<name>
2311	2311	<>	<aphaerese>
2311	2311	<>	<elision3>
2311	2311	<>	<elision2>
2311	2311	<>	<elision1>
2311	2312	<L2kl>	<>
2311	2248	<K2kl>	<>
2312	2313	<>	<name>
2312	2312	<>	<aphaerese>
2312	2312	<>	<elision3>
2312	2312	<>	<elision2>
2312	2312	<>	<elision1>
2312	1936	.	κ
2312	1936	.	λ
2312	2316	<4s>	<>
2313	2314	<>	<aphaerese>
2313	2314	<>	<elision3>
2313	2314	<>	<elision2>
2313	2314	<>	<elision1>
2313	1938	.	κ
2313	1938	.	λ
2313	2317	<4s>	<>
2314	2312	<>	<aphaerese>
2314	2312	<>	<elision3>
2314	2312	<>	<elision2>
2314	2312	<>	<elision1>
2314	1936	.	κ
2314	1936	.	λ
2314	2315	<4s>	<>
2315	2316	<>	<aphaerese>
2315	2316	<>	<elision3>
2315	2316	<>	<elision2>
2315	2316	<>	<elision1>
2315	1546	.	κ
2315	1546	.	λ
2315	2319	<K>	<>
2316	2317	<>	<name>
2316	2316	<>	<aphaerese>
2316	2316	<>	<elision3>
2316	2316	<>	<elision2>
2316	2316	<>	<elision1>
2316	1546	.	κ
2316	1546	.	λ
2316	2320	<K>	<>
2317	2315	<>	<aphaerese>
2317	2315	<>	<elision3>
2317	2315	<>	<elision2>
2317	2315	<>	<elision1>
2317	1548	.	κ
2317	1548	.	λ
2317	2318	<K>	<>
2318	2319	<>	<aphaerese>
2318	2319	<>	<elision3>
2318	2319	<>	<elision2>
2318	2319	<>	<elision1>
2318	1594	.	κ
2318	1594	.	λ
2319	2320	<>	<aphaerese>
2319	2320	<>	<elision3>
2319	2320	<>	<elision2>
2319	2320	<>	<elision1>
2319	1595	.	κ
2319	1595	.	λ
2320	2318	<>	<name>
2320	2320	<>	<aphaerese>
2320	2320	<>	<elision3>
2320	2320	<>	<elision2>
2320	2320	<>	<elision1>
2320	1595	.	κ
2320	1595	.	λ
2321	2146	<name>	<name>
2321	2322	<>	<name>
2321	2324	<>	<aphaerese>
2321	2324	<>	<elision3>
2321	2324	<>	<elision2>
2321	2324	<>	<elision1>
2321	2257	<4s>	<>
2321	2325	<L2kl>	<>
2322	2323	<>	<aphaerese>
2322	2323	<>	<elision3>
2322	2323	<>	<elision2>
2322	2323	<>	<elision1>
2322	2134	<L2kl>	<>
2323	2324	<>	<aphaerese>
2323	2324	<>	<elision3>
2323	2324	<>	<elision2>
2323	2324	<>	<elision1>
2323	2135	<L2kl>	<>
2324	2322	<>	<name>
2324	2324	<>	<aphaerese>
2324	2324	<>	<elision3>
2324	2324	<>	<elision2>
2324	2324	<>	<elision1>
2324	2133	<L2kl>	<>
2325	1772	.	.
2325	1772	 	 
2325	1772	<~>	<~>
2325	1772	<split-s>	<split-s>
2325	1772	<split-h>	<split-h>
2325	1772	<name2>	<name2>
2325	2146	<name2>	<name>
2325	2134	<>	<name>
2325	1775	<aphaerese>	<aphaerese>
2325	2133	<>	<aphaerese>
2325	1772	<elision3>	<elision3>
2325	2133	<>	<elision3>
2325	1772	<elision2>	<elision2>
2325	2133	<>	<elision2>
2325	1772	<elision1>	<elision1>
2325	2133	<>	<elision1>
2325	1936	.	υ
2325	1936	.	u
2325	1936	.	κ
2325	1936	.	α
2325	1936	.	a
2325	1936	.	λ
2325	2326	<4s>	<>
2326	251	.	.
2326	252	 	 
2326	251	<~>	<~>
2326	251	<split-s>	<split-s>
2326	251	<split-h>	<split-h>
2326	251	<name2>	<name2>
2326	2258	<name2>	<name>
2326	2138	<>	<name>
2326	255	<aphaerese>	<aphaerese>
2326	2137	<>	<aphaerese>
2326	251	<elision3>	<elision3>
2326	2137	<>	<elision3>
2326	251	<elision2>	<elision2>
2326	2137	<>	<elision2>
2326	251	<elision1>	<elision1>
2326	2137	<>	<elision1>
2326	1546	.	υ
2326	1590	H	υ
2326	1546	.	u
2326	1592	H	u
2326	1546	.	κ
2326	2005	H	κ
2326	1500	H	k
2326	1513	H	U
2326	1516	H	K
2326	1546	.	α
2326	1576	H	α
2326	1546	.	a
2326	1581	H	a
2326	1343	H	A
2326	1546	.	λ
2326	1982	H	λ
2326	1930	H	l
2326	1935	H	L
2326	2327	<K>	<>
2327	1596	.	.
2327	1596	<~>	<~>
2327	1596	<split-s>	<split-s>
2327	1596	<split-h>	<split-h>
2327	1596	<name2>	<name2>
2327	2148	<name2>	<name>
2327	2139	<>	<name>
2327	1599	<aphaerese>	<aphaerese>
2327	2141	<>	<aphaerese>
2327	1596	<elision3>	<elision3>
2327	2141	<>	<elision3>
2327	1596	<elision2>	<elision2>
2327	2141	<>	<elision2>
2327	1596	<elision1>	<elision1>
2327	2141	<>	<elision1>
2327	1595	.	υ
2327	1738	H	υ
2327	1595	.	u
2327	1747	H	u
2327	1595	.	κ
2327	1990	H	κ
2327	1707	H	k
2327	1716	H	U
2327	1719	H	K
2327	1595	.	α
2327	1750	H	α
2327	1595	.	a
2327	1753	H	a
2327	1687	H	A
2327	1595	.	λ
2327	1999	H	λ
2327	1734	H	l
2327	1737	H	L
2328	2329	<>	<aphaerese>
2328	2329	<>	<elision3>
2328	2329	<>	<elision2>
2328	2329	<>	<elision1>
2328	1926	<3s>	<>
2329	2330	<>	<name>
2329	2329	<>	<aphaerese>
2329	2329	<>	<elision3>
2329	2329	<>	<elision2>
2329	2329	<>	<elision1>
2329	1927	<3s>	<>
2330	2328	<>	<aphaerese>
2330	2328	<>	<elision3>
2330	2328	<>	<elision2>
2330	2328	<>	<elision1>
2330	1928	<3s>	<>
2331	1757	.	.
2331	1758	 	 
2331	1757	<~>	<~>
2331	1757	<split-s>	<split-s>
2331	1757	<split-h>	<split-h>
2331	1757	<name2>	<name2>
2331	1761	<aphaerese>	<aphaerese>
2331	1764	<>	<aphaerese>
2331	1757	<elision3>	<elision3>
2331	1764	<>	<elision3>
2331	1757	<elision2>	<elision2>
2331	1764	<>	<elision2>
2331	1757	<elision1>	<elision1>
2331	1764	<>	<elision1>
2331	1765	.	υ
2331	1771	s	υ
2331	1765	.	u
2331	1771	s	u
2331	1950	.	κ
2331	2021	s	κ
2331	2133	s	k
2331	2142	s	U
2331	2145	s	K
2331	1765	.	α
2331	1771	s	α
2331	1765	.	a
2331	1771	s	a
2331	2263	s	A
2331	2133	s	λ
2331	2133	s	l
2331	2266	s	L
2331	2284	<split-h>	<>
2332	1760	.	.
2332	1763	 	 
2332	1760	<~>	<~>
2332	1760	<split-s>	<split-s>
2332	1760	<split-h>	<split-h>
2332	1760	<name2>	<name2>
2332	2307	<aphaerese>	<aphaerese>
2332	1760	<>	<aphaerese>
2332	1760	<elision3>	<elision3>
2332	1760	<>	<elision3>
2332	1760	<elision2>	<elision2>
2332	1760	<>	<elision2>
2332	1760	<elision1>	<elision1>
2332	1760	<>	<elision1>
2332	1767	.	υ
2332	1943	s	υ
2332	1767	.	u
2332	1943	s	u
2332	1952	.	κ
2332	2023	s	κ
2332	2135	s	k
2332	2144	s	U
2332	2310	s	K
2332	1767	.	α
2332	1943	s	α
2332	1767	.	a
2332	1943	s	a
2332	2265	s	A
2332	2135	s	λ
2332	2135	s	l
2332	2323	s	L
2332	2283	<split-h>	<>
2333	1760	.	.
2333	1763	 	 
2333	1760	<~>	<~>
2333	1760	<split-s>	<split-s>
2333	1760	<split-h>	<split-h>
2333	1760	<name2>	<name2>
2333	2307	<aphaerese>	<aphaerese>
2333	2334	<>	<aphaerese>
2333	2334	<>	<elision3>
2333	2334	<>	<elision2>
2333	2334	<>	<elision1>
2333	1767	.	υ
2333	1943	s	υ
2333	1767	.	u
2333	1943	s	u
2333	1952	.	κ
2333	2023	s	κ
2333	2135	s	k
2333	2144	s	U
2333	2310	s	K
2333	1767	.	α
2333	1943	s	α
2333	1767	.	a
2333	1943	s	a
2333	2265	s	A
2333	2135	s	λ
2333	2135	s	l
2333	2323	s	L
2333	2337	<split-h>	<>
2334	1757	.	.
2334	1758	 	 
2334	1757	<~>	<~>
2334	1757	<split-s>	<split-s>
2334	1757	<split-h>	<split-h>
2334	1757	<name2>	<name2>
2334	1761	<aphaerese>	<aphaerese>
2334	1756	<>	<aphaerese>
2334	1756	<>	<elision3>
2334	1756	<>	<elision2>
2334	1756	<>	<elision1>
2334	1765	.	υ
2334	1771	s	υ
2334	1765	.	u
2334	1771	s	u
2334	1950	.	κ
2334	2021	s	κ
2334	2133	s	k
2334	2142	s	U
2334	2308	s	K
2334	1765	.	α
2334	1771	s	α
2334	1765	.	a
2334	1771	s	a
2334	2263	s	A
2334	2133	s	λ
2334	2133	s	l
2334	2321	s	L
2334	2335	<split-h>	<>
2335	2336	<>	<aphaerese>
2335	2336	<>	<elision3>
2335	2336	<>	<elision2>
2335	2336	<>	<elision1>
2335	1944	<3s>	<>
2336	2337	<>	<name>
2336	2336	<>	<aphaerese>
2336	2336	<>	<elision3>
2336	2336	<>	<elision2>
2336	2336	<>	<elision1>
2336	1945	<3s>	<>
2337	2335	<>	<aphaerese>
2337	2335	<>	<elision3>
2337	2335	<>	<elision2>
2337	2335	<>	<elision1>
2337	1946	<3s>	<>
2338	2339	<>	<name>
2338	2338	<>	<aphaerese>
2338	2341	<elision3>	<elision3>
2338	2338	<>	<elision3>
2338	2341	<elision2>	<elision2>
2338	2338	<>	<elision2>
2338	2341	<elision1>	<elision1>
2338	2338	<>	<elision1>
2338	1924	<2s>	<>
2339	2340	<>	<aphaerese>
2339	2343	<elision3>	<elision3>
2339	2340	<>	<elision3>
2339	2343	<elision2>	<elision2>
2339	2340	<>	<elision2>
2339	2343	<elision1>	<elision1>
2339	2340	<>	<elision1>
2339	1925	<2s>	<>
2340	2338	<>	<aphaerese>
2340	2341	<elision3>	<elision3>
2340	2338	<>	<elision3>
2340	2341	<elision2>	<elision2>
2340	2338	<>	<elision2>
2340	2341	<elision1>	<elision1>
2340	2338	<>	<elision1>
2340	1923	<2s>	<>
2341	2342	<>	<name>
2341	2341	<>	<aphaerese>
2341	2341	<>	<elision3>
2341	2341	<>	<elision2>
2341	2341	<>	<elision1>
2341	2344	s	κ
2341	2344	s	k
2341	2359	s	K
2341	2344	s	λ
2341	2363	s	l
2341	2365	s	L
2341	1785	<2s>	<>
2342	2343	<>	<aphaerese>
2342	2343	<>	<elision3>
2342	2343	<>	<elision2>
2342	2343	<>	<elision1>
2342	2346	s	κ
2342	2346	s	k
2342	2361	s	K
2342	2346	s	λ
2342	2362	s	l
2342	2367	s	L
2342	1786	<2s>	<>
2343	2341	<>	<aphaerese>
2343	2341	<>	<elision3>
2343	2341	<>	<elision2>
2343	2341	<>	<elision1>
2343	2344	s	κ
2343	2344	s	k
2343	2359	s	K
2343	2344	s	λ
2343	2363	s	l
2343	2365	s	L
2343	1784	<2s>	<>
2344	2345	<>	<name>
2344	2344	<>	<aphaerese>
2344	2344	<>	<elision3>
2344	2344	<>	<elision2>
2344	2344	<>	<elision1>
2344	2347	s	κ
2344	2133	s	k
2344	2308	s	K
2344	2347	s	λ
2344	2133	s	l
2344	2321	s	L
2344	2357	<split-h>	<>
2345	2346	<>	<aphaerese>
2345	2346	<>	<elision3>
2345	2346	<>	<elision2>
2345	2346	<>	<elision1>
2345	2349	s	κ
2345	2135	s	k
2345	2310	s	K
2345	2349	s	λ
2345	2135	s	l
2345	2323	s	L
2345	2358	<split-h>	<>
2346	2344	<>	<aphaerese>
2346	2344	<>	<elision3>
2346	2344	<>	<elision2>
2346	2344	<>	<elision1>
2346	2347	s	κ
2346	2133	s	k
2346	2308	s	K
2346	2347	s	λ
2346	2133	s	l
2346	2321	s	L
2346	2356	<split-h>	<>
2347	1772	.	.
2347	1772	 	 
2347	1772	<~>	<~>
2347	1772	<split-s>	<split-s>
2347	1772	<split-h>	<split-h>
2347	1772	<name2>	<name2>
2347	2348	<>	<name>
2347	1775	<aphaerese>	<aphaerese>
2347	2347	<>	<aphaerese>
2347	2347	<>	<elision3>
2347	2347	<>	<elision2>
2347	2347	<>	<elision1>
2347	1936	.	υ
2347	1936	.	u
2347	1936	.	κ
2347	1936	.	α
2347	1936	.	a
2347	1936	.	λ
2347	2351	<4s>	<>
2348	1774	.	.
2348	1774	 	 
2348	1774	<~>	<~>
2348	1774	<split-s>	<split-s>
2348	1774	<split-h>	<split-h>
2348	1774	<name2>	<name2>
2348	1777	<aphaerese>	<aphaerese>
2348	2349	<>	<aphaerese>
2348	2349	<>	<elision3>
2348	2349	<>	<elision2>
2348	2349	<>	<elision1>
2348	1938	.	υ
2348	1938	.	u
2348	1938	.	κ
2348	1938	.	α
2348	1938	.	a
2348	1938	.	λ
2348	2352	<4s>	<>
2349	1772	.	.
2349	1772	 	 
2349	1772	<~>	<~>
2349	1772	<split-s>	<split-s>
2349	1772	<split-h>	<split-h>
2349	1772	<name2>	<name2>
2349	1775	<aphaerese>	<aphaerese>
2349	2347	<>	<aphaerese>
2349	2347	<>	<elision3>
2349	2347	<>	<elision2>
2349	2347	<>	<elision1>
2349	1936	.	υ
2349	1936	.	u
2349	1936	.	κ
2349	1936	.	α
2349	1936	.	a
2349	1936	.	λ
2349	2350	<4s>	<>
2350	251	.	.
2350	252	 	 
2350	251	<~>	<~>
2350	251	<split-s>	<split-s>
2350	251	<split-h>	<split-h>
2350	251	<name2>	<name2>
2350	255	<aphaerese>	<aphaerese>
2350	2351	<>	<aphaerese>
2350	2351	<>	<elision3>
2350	2351	<>	<elision2>
2350	2351	<>	<elision1>
2350	1546	.	υ
2350	1590	H	υ
2350	1546	.	u
2350	1592	H	u
2350	1546	.	κ
2350	2005	H	κ
2350	1500	H	k
2350	1513	H	U
2350	1516	H	K
2350	1546	.	α
2350	1576	H	α
2350	1546	.	a
2350	1581	H	a
2350	1343	H	A
2350	1546	.	λ
2350	1982	H	λ
2350	1930	H	l
2350	1935	H	L
2350	2354	<K>	<>
2351	251	.	.
2351	252	 	 
2351	251	<~>	<~>
2351	251	<split-s>	<split-s>
2351	251	<split-h>	<split-h>
2351	251	<name2>	<name2>
2351	2352	<>	<name>
2351	255	<aphaerese>	<aphaerese>
2351	2351	<>	<aphaerese>
2351	2351	<>	<elision3>
2351	2351	<>	<elision2>
2351	2351	<>	<elision1>
2351	1546	.	υ
2351	1590	H	υ
2351	1546	.	u
2351	1592	H	u
2351	1546	.	κ
2351	2005	H	κ
2351	1500	H	k
2351	1513	H	U
2351	1516	H	K
2351	1546	.	α
2351	1576	H	α
2351	1546	.	a
2351	1581	H	a
2351	1343	H	A
2351	1546	.	λ
2351	1982	H	λ
2351	1930	H	l
2351	1935	H	L
2351	2355	<K>	<>
2352	250	.	.
2352	254	 	 
2352	250	<~>	<~>
2352	250	<split-s>	<split-s>
2352	250	<split-h>	<split-h>
2352	250	<name2>	<name2>
2352	257	<aphaerese>	<aphaerese>
2352	2350	<>	<aphaerese>
2352	2350	<>	<elision3>
2352	2350	<>	<elision2>
2352	2350	<>	<elision1>
2352	1548	.	υ
2352	1585	H	υ
2352	1548	.	u
2352	1589	H	u
2352	1548	.	κ
2352	1962	H	κ
2352	1541	H	k
2352	1515	H	U
2352	1545	H	K
2352	1548	.	α
2352	1575	H	α
2352	1548	.	a
2352	1580	H	a
2352	1346	H	A
2352	1548	.	λ
2352	1981	H	λ
2352	1929	H	l
2352	1932	H	L
2352	2353	<K>	<>
2353	1598	.	.
2353	1598	<~>	<~>
2353	1598	<split-s>	<split-s>
2353	1598	<split-h>	<split-h>
2353	1598	<name2>	<name2>
2353	1601	<aphaerese>	<aphaerese>
2353	2354	<>	<aphaerese>
2353	2354	<>	<elision3>
2353	2354	<>	<elision2>
2353	2354	<>	<elision1>
2353	1594	.	υ
2353	1740	H	υ
2353	1594	.	u
2353	1749	H	u
2353	1594	.	κ
2353	1992	H	κ
2353	1709	H	k
2353	1718	H	U
2353	1722	H	K
2353	1594	.	α
2353	1752	H	α
2353	1594	.	a
2353	1755	H	a
2353	1689	H	A
2353	1594	.	λ
2353	2001	H	λ
2353	1736	H	l
2353	1731	H	L
2354	1596	.	.
2354	1596	<~>	<~>
2354	1596	<split-s>	<split-s>
2354	1596	<split-h>	<split-h>
2354	1596	<name2>	<name2>
2354	1599	<aphaerese>	<aphaerese>
2354	2355	<>	<aphaerese>
2354	2355	<>	<elision3>
2354	2355	<>	<elision2>
2354	2355	<>	<elision1>
2354	1595	.	υ
2354	1738	H	υ
2354	1595	.	u
2354	1747	H	u
2354	1595	.	κ
2354	1990	H	κ
2354	1707	H	k
2354	1716	H	U
2354	1719	H	K
2354	1595	.	α
2354	1750	H	α
2354	1595	.	a
2354	1753	H	a
2354	1687	H	A
2354	1595	.	λ
2354	1999	H	λ
2354	1734	H	l
2354	1737	H	L
2355	1596	.	.
2355	1596	<~>	<~>
2355	1596	<split-s>	<split-s>
2355	1596	<split-h>	<split-h>
2355	1596	<name2>	<name2>
2355	2353	<>	<name>
2355	1599	<aphaerese>	<aphaerese>
2355	2355	<>	<aphaerese>
2355	2355	<>	<elision3>
2355	2355	<>	<elision2>
2355	2355	<>	<elision1>
2355	1595	.	υ
2355	1738	H	υ
2355	1595	.	u
2355	1747	H	u
2355	1595	.	κ
2355	1990	H	κ
2355	1707	H	k
2355	1716	H	U
2355	1719	H	K
2355	1595	.	α
2355	1750	H	α
2355	1595	.	a
2355	1753	H	a
2355	1687	H	A
2355	1595	.	λ
2355	1999	H	λ
2355	1734	H	l
2355	1737	H	L
2356	2357	<>	<aphaerese>
2356	2357	<>	<elision3>
2356	2357	<>	<elision2>
2356	2357	<>	<elision1>
2356	1959	<3s>	<>
2357	2358	<>	<name>
2357	2357	<>	<aphaerese>
2357	2357	<>	<elision3>
2357	2357	<>	<elision2>
2357	2357	<>	<elision1>
2357	1960	<3s>	<>
2358	2356	<>	<aphaerese>
2358	2356	<>	<elision3>
2358	2356	<>	<elision2>
2358	2356	<>	<elision1>
2358	1961	<3s>	<>
2359	2360	<>	<name>
2359	2359	<>	<aphaerese>
2359	2359	<>	<elision3>
2359	2359	<>	<elision2>
2359	2359	<>	<elision1>
2359	2363	<K2kl>	<>
2360	2361	<>	<aphaerese>
2360	2361	<>	<elision3>
2360	2361	<>	<elision2>
2360	2361	<>	<elision1>
2360	2364	<K2kl>	<>
2361	2359	<>	<aphaerese>
2361	2359	<>	<elision3>
2361	2359	<>	<elision2>
2361	2359	<>	<elision1>
2361	2362	<K2kl>	<>
2362	2363	<>	<aphaerese>
2362	2363	<>	<elision3>
2362	2363	<>	<elision2>
2362	2363	<>	<elision1>
2362	2356	<split-h>	<>
2363	2364	<>	<name>
2363	2363	<>	<aphaerese>
2363	2363	<>	<elision3>
2363	2363	<>	<elision2>
2363	2363	<>	<elision1>
2363	2357	<split-h>	<>
2364	2362	<>	<aphaerese>
2364	2362	<>	<elision3>
2364	2362	<>	<elision2>
2364	2362	<>	<elision1>
2364	2358	<split-h>	<>
2365	2366	<>	<name>
2365	2365	<>	<aphaerese>
2365	2365	<>	<elision3>
2365	2365	<>	<elision2>
2365	2365	<>	<elision1>
2365	2363	<L2kl>	<>
2366	2367	<>	<aphaerese>
2366	2367	<>	<elision3>
2366	2367	<>	<elision2>
2366	2367	<>	<elision1>
2366	2364	<L2kl>	<>
2367	2365	<>	<aphaerese>
2367	2365	<>	<elision3>
2367	2365	<>	<elision2>
2367	2365	<>	<elision1>
2367	2362	<L2kl>	<>
2368	1757	.	.
2368	1758	 	 
2368	1757	<~>	<~>
2368	1757	<split-s>	<split-s>
2368	1757	<split-h>	<split-h>
2368	1757	<name2>	<name2>
2368	2369	<>	<name>
2368	1761	<aphaerese>	<aphaerese>
2368	2368	<>	<aphaerese>
2368	2371	<elision3>	<elision3>
2368	2368	<>	<elision3>
2368	2371	<elision2>	<elision2>
2368	2368	<>	<elision2>
2368	2371	<elision1>	<elision1>
2368	2368	<>	<elision1>
2368	1765	.	υ
2368	1771	s	υ
2368	1765	.	u
2368	1771	s	u
2368	1765	.	κ
2368	2347	s	κ
2368	2133	s	k
2368	2142	s	U
2368	2308	s	K
2368	1765	.	α
2368	1771	s	α
2368	1765	.	a
2368	1771	s	a
2368	2263	s	A
2368	1765	.	λ
2368	2347	s	λ
2368	2133	s	l
2368	2321	s	L
2368	2419	<split-h>	<>
2369	1760	.	.
2369	1763	 	 
2369	1760	<~>	<~>
2369	1760	<split-s>	<split-s>
2369	1760	<split-h>	<split-h>
2369	1760	<name2>	<name2>
2369	2307	<aphaerese>	<aphaerese>
2369	2370	<>	<aphaerese>
2369	2373	<elision3>	<elision3>
2369	2370	<>	<elision3>
2369	2373	<elision2>	<elision2>
2369	2370	<>	<elision2>
2369	2373	<elision1>	<elision1>
2369	2370	<>	<elision1>
2369	1767	.	υ
2369	1943	s	υ
2369	1767	.	u
2369	1943	s	u
2369	1767	.	κ
2369	2349	s	κ
2369	2135	s	k
2369	2144	s	U
2369	2310	s	K
2369	1767	.	α
2369	1943	s	α
2369	1767	.	a
2369	1943	s	a
2369	2265	s	A
2369	1767	.	λ
2369	2349	s	λ
2369	2135	s	l
2369	2323	s	L
2369	2420	<split-h>	<>
2370	1757	.	.
2370	1758	 	 
2370	1757	<~>	<~>
2370	1757	<split-s>	<split-s>
2370	1757	<split-h>	<split-h>
2370	1757	<name2>	<name2>
2370	1761	<aphaerese>	<aphaerese>
2370	2368	<>	<aphaerese>
2370	2371	<elision3>	<elision3>
2370	2368	<>	<elision3>
2370	2371	<elision2>	<elision2>
2370	2368	<>	<elision2>
2370	2371	<elision1>	<elision1>
2370	2368	<>	<elision1>
2370	1765	.	υ
2370	1771	s	υ
2370	1765	.	u
2370	1771	s	u
2370	1765	.	κ
2370	2347	s	κ
2370	2133	s	k
2370	2142	s	U
2370	2308	s	K
2370	1765	.	α
2370	1771	s	α
2370	1765	.	a
2370	1771	s	a
2370	2263	s	A
2370	1765	.	λ
2370	2347	s	λ
2370	2133	s	l
2370	2321	s	L
2370	2418	<split-h>	<>
2371	1757	.	.
2371	1758	 	 
2371	1757	<~>	<~>
2371	1757	<split-s>	<split-s>
2371	1757	<split-h>	<split-h>
2371	1757	<name2>	<name2>
2371	2372	<>	<name>
2371	1761	<aphaerese>	<aphaerese>
2371	2371	<>	<aphaerese>
2371	1757	<elision3>	<elision3>
2371	2371	<>	<elision3>
2371	1757	<elision2>	<elision2>
2371	2371	<>	<elision2>
2371	1757	<elision1>	<elision1>
2371	2371	<>	<elision1>
2371	1765	.	υ
2371	1771	s	υ
2371	1765	.	u
2371	1771	s	u
2371	1950	.	κ
2371	2374	s	κ
2371	2383	s	k
2371	2142	s	U
2371	2392	s	K
2371	1765	.	α
2371	1771	s	α
2371	1765	.	a
2371	1771	s	a
2371	2263	s	A
2371	2383	s	λ
2371	2383	s	l
2371	2408	s	L
2371	2416	<split-h>	<>
2372	1760	.	.
2372	1763	 	 
2372	1760	<~>	<~>
2372	1760	<split-s>	<split-s>
2372	1760	<split-h>	<split-h>
2372	1760	<name2>	<name2>
2372	2307	<aphaerese>	<aphaerese>
2372	2373	<>	<aphaerese>
2372	1760	<elision3>	<elision3>
2372	2373	<>	<elision3>
2372	1760	<elision2>	<elision2>
2372	2373	<>	<elision2>
2372	1760	<elision1>	<elision1>
2372	2373	<>	<elision1>
2372	1767	.	υ
2372	1943	s	υ
2372	1767	.	u
2372	1943	s	u
2372	1952	.	κ
2372	2376	s	κ
2372	2385	s	k
2372	2144	s	U
2372	2394	s	K
2372	1767	.	α
2372	1943	s	α
2372	1767	.	a
2372	1943	s	a
2372	2265	s	A
2372	2385	s	λ
2372	2385	s	l
2372	2410	s	L
2372	2417	<split-h>	<>
2373	1757	.	.
2373	1758	 	 
2373	1757	<~>	<~>
2373	1757	<split-s>	<split-s>
2373	1757	<split-h>	<split-h>
2373	1757	<name2>	<name2>
2373	1761	<aphaerese>	<aphaerese>
2373	2371	<>	<aphaerese>
2373	1757	<elision3>	<elision3>
2373	2371	<>	<elision3>
2373	1757	<elision2>	<elision2>
2373	2371	<>	<elision2>
2373	1757	<elision1>	<elision1>
2373	2371	<>	<elision1>
2373	1765	.	υ
2373	1771	s	υ
2373	1765	.	u
2373	1771	s	u
2373	1950	.	κ
2373	2374	s	κ
2373	2383	s	k
2373	2142	s	U
2373	2392	s	K
2373	1765	.	α
2373	1771	s	α
2373	1765	.	a
2373	1771	s	a
2373	2263	s	A
2373	2383	s	λ
2373	2383	s	l
2373	2408	s	L
2373	2415	<split-h>	<>
2374	1772	.	.
2374	1772	 	 
2374	1772	<~>	<~>
2374	1772	<split-s>	<split-s>
2374	1772	<split-h>	<split-h>
2374	1772	<name2>	<name2>
2374	2375	<>	<name>
2374	1775	<aphaerese>	<aphaerese>
2374	2374	<>	<aphaerese>
2374	2024	<elision3>	<elision3>
2374	2374	<>	<elision3>
2374	2024	<elision2>	<elision2>
2374	2374	<>	<elision2>
2374	2024	<elision1>	<elision1>
2374	2374	<>	<elision1>
2374	1936	.	υ
2374	1936	.	u
2374	1936	.	κ
2374	1936	.	α
2374	1936	.	a
2374	1936	.	λ
2374	2378	<4s>	<>
2375	1774	.	.
2375	1774	 	 
2375	1774	<~>	<~>
2375	1774	<split-s>	<split-s>
2375	1774	<split-h>	<split-h>
2375	1774	<name2>	<name2>
2375	1777	<aphaerese>	<aphaerese>
2375	2376	<>	<aphaerese>
2375	2026	<elision3>	<elision3>
2375	2376	<>	<elision3>
2375	2026	<elision2>	<elision2>
2375	2376	<>	<elision2>
2375	2026	<elision1>	<elision1>
2375	2376	<>	<elision1>
2375	1938	.	υ
2375	1938	.	u
2375	1938	.	κ
2375	1938	.	α
2375	1938	.	a
2375	1938	.	λ
2375	2379	<4s>	<>
2376	1772	.	.
2376	1772	 	 
2376	1772	<~>	<~>
2376	1772	<split-s>	<split-s>
2376	1772	<split-h>	<split-h>
2376	1772	<name2>	<name2>
2376	1775	<aphaerese>	<aphaerese>
2376	2374	<>	<aphaerese>
2376	2024	<elision3>	<elision3>
2376	2374	<>	<elision3>
2376	2024	<elision2>	<elision2>
2376	2374	<>	<elision2>
2376	2024	<elision1>	<elision1>
2376	2374	<>	<elision1>
2376	1936	.	υ
2376	1936	.	u
2376	1936	.	κ
2376	1936	.	α
2376	1936	.	a
2376	1936	.	λ
2376	2377	<4s>	<>
2377	251	.	.
2377	252	 	 
2377	251	<~>	<~>
2377	251	<split-s>	<split-s>
2377	251	<split-h>	<split-h>
2377	251	<name2>	<name2>
2377	255	<aphaerese>	<aphaerese>
2377	2378	<>	<aphaerese>
2377	2128	<elision3>	<elision3>
2377	2378	<>	<elision3>
2377	2128	<elision2>	<elision2>
2377	2378	<>	<elision2>
2377	2128	<elision1>	<elision1>
2377	2378	<>	<elision1>
2377	1546	.	υ
2377	1590	H	υ
2377	1546	.	u
2377	1592	H	u
2377	1546	.	κ
2377	1513	H	U
2377	1546	.	α
2377	1576	H	α
2377	1546	.	a
2377	1581	H	a
2377	1343	H	A
2377	1546	.	λ
2377	2381	<K>	<>
2378	251	.	.
2378	252	 	 
2378	251	<~>	<~>
2378	251	<split-s>	<split-s>
2378	251	<split-h>	<split-h>
2378	251	<name2>	<name2>
2378	2379	<>	<name>
2378	255	<aphaerese>	<aphaerese>
2378	2378	<>	<aphaerese>
2378	2128	<elision3>	<elision3>
2378	2378	<>	<elision3>
2378	2128	<elision2>	<elision2>
2378	2378	<>	<elision2>
2378	2128	<elision1>	<elision1>
2378	2378	<>	<elision1>
2378	1546	.	υ
2378	1590	H	υ
2378	1546	.	u
2378	1592	H	u
2378	1546	.	κ
2378	1513	H	U
2378	1546	.	α
2378	1576	H	α
2378	1546	.	a
2378	1581	H	a
2378	1343	H	A
2378	1546	.	λ
2378	2382	<K>	<>
2379	250	.	.
2379	254	 	 
2379	250	<~>	<~>
2379	250	<split-s>	<split-s>
2379	250	<split-h>	<split-h>
2379	250	<name2>	<name2>
2379	257	<aphaerese>	<aphaerese>
2379	2377	<>	<aphaerese>
2379	2127	<elision3>	<elision3>
2379	2377	<>	<elision3>
2379	2127	<elision2>	<elision2>
2379	2377	<>	<elision2>
2379	2127	<elision1>	<elision1>
2379	2377	<>	<elision1>
2379	1548	.	υ
2379	1585	H	υ
2379	1548	.	u
2379	1589	H	u
2379	1548	.	κ
2379	1515	H	U
2379	1548	.	α
2379	1575	H	α
2379	1548	.	a
2379	1580	H	a
2379	1346	H	A
2379	1548	.	λ
2379	2380	<K>	<>
2380	1598	.	.
2380	1598	<~>	<~>
2380	1598	<split-s>	<split-s>
2380	1598	<split-h>	<split-h>
2380	1598	<name2>	<name2>
2380	1601	<aphaerese>	<aphaerese>
2380	2381	<>	<aphaerese>
2380	2076	<elision3>	<elision3>
2380	2381	<>	<elision3>
2380	2076	<elision2>	<elision2>
2380	2381	<>	<elision2>
2380	2076	<elision1>	<elision1>
2380	2381	<>	<elision1>
2380	1594	.	υ
2380	1740	H	υ
2380	1594	.	u
2380	1749	H	u
2380	1594	.	κ
2380	1718	H	U
2380	1594	.	α
2380	1752	H	α
2380	1594	.	a
2380	1755	H	a
2380	1689	H	A
2380	1594	.	λ
2381	1596	.	.
2381	1596	<~>	<~>
2381	1596	<split-s>	<split-s>
2381	1596	<split-h>	<split-h>
2381	1596	<name2>	<name2>
2381	1599	<aphaerese>	<aphaerese>
2381	2382	<>	<aphaerese>
2381	2077	<elision3>	<elision3>
2381	2382	<>	<elision3>
2381	2077	<elision2>	<elision2>
2381	2382	<>	<elision2>
2381	2077	<elision1>	<elision1>
2381	2382	<>	<elision1>
2381	1595	.	υ
2381	1738	H	υ
2381	1595	.	u
2381	1747	H	u
2381	1595	.	κ
2381	1716	H	U
2381	1595	.	α
2381	1750	H	α
2381	1595	.	a
2381	1753	H	a
2381	1687	H	A
2381	1595	.	λ
2382	1596	.	.
2382	1596	<~>	<~>
2382	1596	<split-s>	<split-s>
2382	1596	<split-h>	<split-h>
2382	1596	<name2>	<name2>
2382	2380	<>	<name>
2382	1599	<aphaerese>	<aphaerese>
2382	2382	<>	<aphaerese>
2382	2077	<elision3>	<elision3>
2382	2382	<>	<elision3>
2382	2077	<elision2>	<elision2>
2382	2382	<>	<elision2>
2382	2077	<elision1>	<elision1>
2382	2382	<>	<elision1>
2382	1595	.	υ
2382	1738	H	υ
2382	1595	.	u
2382	1747	H	u
2382	1595	.	κ
2382	1716	H	U
2382	1595	.	α
2382	1750	H	α
2382	1595	.	a
2382	1753	H	a
2382	1687	H	A
2382	1595	.	λ
2383	1772	.	.
2383	1772	 	 
2383	1772	<~>	<~>
2383	1772	<split-s>	<split-s>
2383	1772	<split-h>	<split-h>
2383	1772	<name2>	<name2>
2383	2384	<>	<name>
2383	1775	<aphaerese>	<aphaerese>
2383	2383	<>	<aphaerese>
2383	1772	<elision3>	<elision3>
2383	2383	<>	<elision3>
2383	1772	<elision2>	<elision2>
2383	2383	<>	<elision2>
2383	1772	<elision1>	<elision1>
2383	2383	<>	<elision1>
2383	1936	.	υ
2383	1936	.	u
2383	1936	.	κ
2383	1936	.	α
2383	1936	.	a
2383	1936	.	λ
2383	2387	<4s>	<>
2384	1774	.	.
2384	1774	 	 
2384	1774	<~>	<~>
2384	1774	<split-s>	<split-s>
2384	1774	<split-h>	<split-h>
2384	1774	<name2>	<name2>
2384	1777	<aphaerese>	<aphaerese>
2384	2385	<>	<aphaerese>
2384	1774	<elision3>	<elision3>
2384	2385	<>	<elision3>
2384	1774	<elision2>	<elision2>
2384	2385	<>	<elision2>
2384	1774	<elision1>	<elision1>
2384	2385	<>	<elision1>
2384	1938	.	υ
2384	1938	.	u
2384	1938	.	κ
2384	1938	.	α
2384	1938	.	a
2384	1938	.	λ
2384	2388	<4s>	<>
2385	1772	.	.
2385	1772	 	 
2385	1772	<~>	<~>
2385	1772	<split-s>	<split-s>
2385	1772	<split-h>	<split-h>
2385	1772	<name2>	<name2>
2385	1775	<aphaerese>	<aphaerese>
2385	2383	<>	<aphaerese>
2385	1772	<elision3>	<elision3>
2385	2383	<>	<elision3>
2385	1772	<elision2>	<elision2>
2385	2383	<>	<elision2>
2385	1772	<elision1>	<elision1>
2385	2383	<>	<elision1>
2385	1936	.	υ
2385	1936	.	u
2385	1936	.	κ
2385	1936	.	α
2385	1936	.	a
2385	1936	.	λ
2385	2386	<4s>	<>
2386	251	.	.
2386	252	 	 
2386	251	<~>	<~>
2386	251	<split-s>	<split-s>
2386	251	<split-h>	<split-h>
2386	251	<name2>	<name2>
2386	255	<aphaerese>	<aphaerese>
2386	2387	<>	<aphaerese>
2386	251	<elision3>	<elision3>
2386	2387	<>	<elision3>
2386	251	<elision2>	<elision2>
2386	2387	<>	<elision2>
2386	251	<elision1>	<elision1>
2386	2387	<>	<elision1>
2386	1546	.	υ
2386	1590	H	υ
2386	1546	.	u
2386	1592	H	u
2386	1546	.	κ
2386	1513	H	U
2386	1546	.	α
2386	1576	H	α
2386	1546	.	a
2386	1581	H	a
2386	1343	H	A
2386	1546	.	λ
2386	2390	<K>	<>
2387	251	.	.
2387	252	 	 
2387	251	<~>	<~>
2387	251	<split-s>	<split-s>
2387	251	<split-h>	<split-h>
2387	251	<name2>	<name2>
2387	2388	<>	<name>
2387	255	<aphaerese>	<aphaerese>
2387	2387	<>	<aphaerese>
2387	251	<elision3>	<elision3>
2387	2387	<>	<elision3>
2387	251	<elision2>	<elision2>
2387	2387	<>	<elision2>
2387	251	<elision1>	<elision1>
2387	2387	<>	<elision1>
2387	1546	.	υ
2387	1590	H	υ
2387	1546	.	u
2387	1592	H	u
2387	1546	.	κ
2387	1513	H	U
2387	1546	.	α
2387	1576	H	α
2387	1546	.	a
2387	1581	H	a
2387	1343	H	A
2387	1546	.	λ
2387	2391	<K>	<>
2388	250	.	.
2388	254	 	 
2388	250	<~>	<~>
2388	250	<split-s>	<split-s>
2388	250	<split-h>	<split-h>
2388	250	<name2>	<name2>
2388	257	<aphaerese>	<aphaerese>
2388	2386	<>	<aphaerese>
2388	250	<elision3>	<elision3>
2388	2386	<>	<elision3>
2388	250	<elision2>	<elision2>
2388	2386	<>	<elision2>
2388	250	<elision1>	<elision1>
2388	2386	<>	<elision1>
2388	1548	.	υ
2388	1585	H	υ
2388	1548	.	u
2388	1589	H	u
2388	1548	.	κ
2388	1515	H	U
2388	1548	.	α
2388	1575	H	α
2388	1548	.	a
2388	1580	H	a
2388	1346	H	A
2388	1548	.	λ
2388	2389	<K>	<>
2389	1598	.	.
2389	1598	<~>	<~>
2389	1598	<split-s>	<split-s>
2389	1598	<split-h>	<split-h>
2389	1598	<name2>	<name2>
2389	1601	<aphaerese>	<aphaerese>
2389	2390	<>	<aphaerese>
2389	1598	<elision3>	<elision3>
2389	2390	<>	<elision3>
2389	1598	<elision2>	<elision2>
2389	2390	<>	<elision2>
2389	1598	<elision1>	<elision1>
2389	2390	<>	<elision1>
2389	1594	.	υ
2389	1740	H	υ
2389	1594	.	u
2389	1749	H	u
2389	1594	.	κ
2389	1718	H	U
2389	1594	.	α
2389	1752	H	α
2389	1594	.	a
2389	1755	H	a
2389	1689	H	A
2389	1594	.	λ
2390	1596	.	.
2390	1596	<~>	<~>
2390	1596	<split-s>	<split-s>
2390	1596	<split-h>	<split-h>
2390	1596	<name2>	<name2>
2390	1599	<aphaerese>	<aphaerese>
2390	2391	<>	<aphaerese>
2390	1596	<elision3>	<elision3>
2390	2391	<>	<elision3>
2390	1596	<elision2>	<elision2>
2390	2391	<>	<elision2>
2390	1596	<elision1>	<elision1>
2390	2391	<>	<elision1>
2390	1595	.	υ
2390	1738	H	υ
2390	1595	.	u
2390	1747	H	u
2390	1595	.	κ
2390	1716	H	U
2390	1595	.	α
2390	1750	H	α
2390	1595	.	a
2390	1753	H	a
2390	1687	H	A
2390	1595	.	λ
2391	1596	.	.
2391	1596	<~>	<~>
2391	1596	<split-s>	<split-s>
2391	1596	<split-h>	<split-h>
2391	1596	<name2>	<name2>
2391	2389	<>	<name>
2391	1599	<aphaerese>	<aphaerese>
2391	2391	<>	<aphaerese>
2391	1596	<elision3>	<elision3>
2391	2391	<>	<elision3>
2391	1596	<elision2>	<elision2>
2391	2391	<>	<elision2>
2391	1596	<elision1>	<elision1>
2391	2391	<>	<elision1>
2391	1595	.	υ
2391	1738	H	υ
2391	1595	.	u
2391	1747	H	u
2391	1595	.	κ
2391	1716	H	U
2391	1595	.	α
2391	1750	H	α
2391	1595	.	a
2391	1753	H	a
2391	1687	H	A
2391	1595	.	λ
2392	2146	<name>	<name>
2392	2393	<>	<name>
2392	2395	<>	<aphaerese>
2392	2395	<>	<elision3>
2392	2395	<>	<elision2>
2392	2395	<>	<elision1>
2392	2257	<4s>	<>
2392	2312	<L2kl>	<>
2392	2405	<K2kl>	<>
2393	2394	<>	<aphaerese>
2393	2394	<>	<elision3>
2393	2394	<>	<elision2>
2393	2394	<>	<elision1>
2393	2313	<L2kl>	<>
2393	2397	<K2kl>	<>
2394	2395	<>	<aphaerese>
2394	2395	<>	<elision3>
2394	2395	<>	<elision2>
2394	2395	<>	<elision1>
2394	2314	<L2kl>	<>
2394	2398	<K2kl>	<>
2395	2393	<>	<name>
2395	2395	<>	<aphaerese>
2395	2395	<>	<elision3>
2395	2395	<>	<elision2>
2395	2395	<>	<elision1>
2395	2312	<L2kl>	<>
2395	2396	<K2kl>	<>
2396	1772	.	.
2396	1772	 	 
2396	1772	<~>	<~>
2396	1772	<split-s>	<split-s>
2396	1772	<split-h>	<split-h>
2396	1772	<name2>	<name2>
2396	2397	<>	<name>
2396	1775	<aphaerese>	<aphaerese>
2396	2396	<>	<aphaerese>
2396	1772	<elision3>	<elision3>
2396	2396	<>	<elision3>
2396	1772	<elision2>	<elision2>
2396	2396	<>	<elision2>
2396	1772	<elision1>	<elision1>
2396	2396	<>	<elision1>
2396	1936	.	υ
2396	1936	.	u
2396	1936	.	α
2396	1936	.	a
2396	2400	<4s>	<>
2397	1774	.	.
2397	1774	 	 
2397	1774	<~>	<~>
2397	1774	<split-s>	<split-s>
2397	1774	<split-h>	<split-h>
2397	1774	<name2>	<name2>
2397	1777	<aphaerese>	<aphaerese>
2397	2398	<>	<aphaerese>
2397	1774	<elision3>	<elision3>
2397	2398	<>	<elision3>
2397	1774	<elision2>	<elision2>
2397	2398	<>	<elision2>
2397	1774	<elision1>	<elision1>
2397	2398	<>	<elision1>
2397	1938	.	υ
2397	1938	.	u
2397	1938	.	α
2397	1938	.	a
2397	2401	<4s>	<>
2398	1772	.	.
2398	1772	 	 
2398	1772	<~>	<~>
2398	1772	<split-s>	<split-s>
2398	1772	<split-h>	<split-h>
2398	1772	<name2>	<name2>
2398	1775	<aphaerese>	<aphaerese>
2398	2396	<>	<aphaerese>
2398	1772	<elision3>	<elision3>
2398	2396	<>	<elision3>
2398	1772	<elision2>	<elision2>
2398	2396	<>	<elision2>
2398	1772	<elision1>	<elision1>
2398	2396	<>	<elision1>
2398	1936	.	υ
2398	1936	.	u
2398	1936	.	α
2398	1936	.	a
2398	2399	<4s>	<>
2399	251	.	.
2399	252	 	 
2399	251	<~>	<~>
2399	251	<split-s>	<split-s>
2399	251	<split-h>	<split-h>
2399	251	<name2>	<name2>
2399	255	<aphaerese>	<aphaerese>
2399	2400	<>	<aphaerese>
2399	251	<elision3>	<elision3>
2399	2400	<>	<elision3>
2399	251	<elision2>	<elision2>
2399	2400	<>	<elision2>
2399	251	<elision1>	<elision1>
2399	2400	<>	<elision1>
2399	1546	.	υ
2399	1590	H	υ
2399	1546	.	u
2399	1592	H	u
2399	1513	H	U
2399	1546	.	α
2399	1576	H	α
2399	1546	.	a
2399	1581	H	a
2399	1343	H	A
2399	2403	<K>	<>
2400	251	.	.
2400	252	 	 
2400	251	<~>	<~>
2400	251	<split-s>	<split-s>
2400	251	<split-h>	<split-h>
2400	251	<name2>	<name2>
2400	2401	<>	<name>
2400	255	<aphaerese>	<aphaerese>
2400	2400	<>	<aphaerese>
2400	251	<elision3>	<elision3>
2400	2400	<>	<elision3>
2400	251	<elision2>	<elision2>
2400	2400	<>	<elision2>
2400	251	<elision1>	<elision1>
2400	2400	<>	<elision1>
2400	1546	.	υ
2400	1590	H	υ
2400	1546	.	u
2400	1592	H	u
2400	1513	H	U
2400	1546	.	α
2400	1576	H	α
2400	1546	.	a
2400	1581	H	a
2400	1343	H	A
2400	2404	<K>	<>
2401	250	.	.
2401	254	 	 
2401	250	<~>	<~>
2401	250	<split-s>	<split-s>
2401	250	<split-h>	<split-h>
2401	250	<name2>	<name2>
2401	257	<aphaerese>	<aphaerese>
2401	2399	<>	<aphaerese>
2401	250	<elision3>	<elision3>
2401	2399	<>	<elision3>
2401	250	<elision2>	<elision2>
2401	2399	<>	<elision2>
2401	250	<elision1>	<elision1>
2401	2399	<>	<elision1>
2401	1548	.	υ
2401	1585	H	υ
2401	1548	.	u
2401	1589	H	u
2401	1515	H	U
2401	1548	.	α
2401	1575	H	α
2401	1548	.	a
2401	1580	H	a
2401	1346	H	A
2401	2402	<K>	<>
2402	1598	.	.
2402	1598	<~>	<~>
2402	1598	<split-s>	<split-s>
2402	1598	<split-h>	<split-h>
2402	1598	<name2>	<name2>
2402	1601	<aphaerese>	<aphaerese>
2402	2403	<>	<aphaerese>
2402	1598	<elision3>	<elision3>
2402	2403	<>	<elision3>
2402	1598	<elision2>	<elision2>
2402	2403	<>	<elision2>
2402	1598	<elision1>	<elision1>
2402	2403	<>	<elision1>
2402	1594	.	υ
2402	1740	H	υ
2402	1594	.	u
2402	1749	H	u
2402	1718	H	U
2402	1594	.	α
2402	1752	H	α
2402	1594	.	a
2402	1755	H	a
2402	1689	H	A
2403	1596	.	.
2403	1596	<~>	<~>
2403	1596	<split-s>	<split-s>
2403	1596	<split-h>	<split-h>
2403	1596	<name2>	<name2>
2403	1599	<aphaerese>	<aphaerese>
2403	2404	<>	<aphaerese>
2403	1596	<elision3>	<elision3>
2403	2404	<>	<elision3>
2403	1596	<elision2>	<elision2>
2403	2404	<>	<elision2>
2403	1596	<elision1>	<elision1>
2403	2404	<>	<elision1>
2403	1595	.	υ
2403	1738	H	υ
2403	1595	.	u
2403	1747	H	u
2403	1716	H	U
2403	1595	.	α
2403	1750	H	α
2403	1595	.	a
2403	1753	H	a
2403	1687	H	A
2404	1596	.	.
2404	1596	<~>	<~>
2404	1596	<split-s>	<split-s>
2404	1596	<split-h>	<split-h>
2404	1596	<name2>	<name2>
2404	2402	<>	<name>
2404	1599	<aphaerese>	<aphaerese>
2404	2404	<>	<aphaerese>
2404	1596	<elision3>	<elision3>
2404	2404	<>	<elision3>
2404	1596	<elision2>	<elision2>
2404	2404	<>	<elision2>
2404	1596	<elision1>	<elision1>
2404	2404	<>	<elision1>
2404	1595	.	υ
2404	1738	H	υ
2404	1595	.	u
2404	1747	H	u
2404	1716	H	U
2404	1595	.	α
2404	1750	H	α
2404	1595	.	a
2404	1753	H	a
2404	1687	H	A
2405	1772	.	.
2405	1772	 	 
2405	1772	<~>	<~>
2405	1772	<split-s>	<split-s>
2405	1772	<split-h>	<split-h>
2405	1772	<name2>	<name2>
2405	2146	<name2>	<name>
2405	2397	<>	<name>
2405	1775	<aphaerese>	<aphaerese>
2405	2396	<>	<aphaerese>
2405	1772	<elision3>	<elision3>
2405	2396	<>	<elision3>
2405	1772	<elision2>	<elision2>
2405	2396	<>	<elision2>
2405	1772	<elision1>	<elision1>
2405	2396	<>	<elision1>
2405	1936	.	υ
2405	1936	.	u
2405	1936	.	α
2405	1936	.	a
2405	2406	<4s>	<>
2406	251	.	.
2406	252	 	 
2406	251	<~>	<~>
2406	251	<split-s>	<split-s>
2406	251	<split-h>	<split-h>
2406	251	<name2>	<name2>
2406	2258	<name2>	<name>
2406	2401	<>	<name>
2406	255	<aphaerese>	<aphaerese>
2406	2400	<>	<aphaerese>
2406	251	<elision3>	<elision3>
2406	2400	<>	<elision3>
2406	251	<elision2>	<elision2>
2406	2400	<>	<elision2>
2406	251	<elision1>	<elision1>
2406	2400	<>	<elision1>
2406	1546	.	υ
2406	1590	H	υ
2406	1546	.	u
2406	1592	H	u
2406	1513	H	U
2406	1546	.	α
2406	1576	H	α
2406	1546	.	a
2406	1581	H	a
2406	1343	H	A
2406	2407	<K>	<>
2407	1596	.	.
2407	1596	<~>	<~>
2407	1596	<split-s>	<split-s>
2407	1596	<split-h>	<split-h>
2407	1596	<name2>	<name2>
2407	2148	<name2>	<name>
2407	2402	<>	<name>
2407	1599	<aphaerese>	<aphaerese>
2407	2404	<>	<aphaerese>
2407	1596	<elision3>	<elision3>
2407	2404	<>	<elision3>
2407	1596	<elision2>	<elision2>
2407	2404	<>	<elision2>
2407	1596	<elision1>	<elision1>
2407	2404	<>	<elision1>
2407	1595	.	υ
2407	1738	H	υ
2407	1595	.	u
2407	1747	H	u
2407	1716	H	U
2407	1595	.	α
2407	1750	H	α
2407	1595	.	a
2407	1753	H	a
2407	1687	H	A
2408	2146	<name>	<name>
2408	2409	<>	<name>
2408	2411	<>	<aphaerese>
2408	2411	<>	<elision3>
2408	2411	<>	<elision2>
2408	2411	<>	<elision1>
2408	2257	<4s>	<>
2408	2412	<L2kl>	<>
2409	2410	<>	<aphaerese>
2409	2410	<>	<elision3>
2409	2410	<>	<elision2>
2409	2410	<>	<elision1>
2409	2384	<L2kl>	<>
2410	2411	<>	<aphaerese>
2410	2411	<>	<elision3>
2410	2411	<>	<elision2>
2410	2411	<>	<elision1>
2410	2385	<L2kl>	<>
2411	2409	<>	<name>
2411	2411	<>	<aphaerese>
2411	2411	<>	<elision3>
2411	2411	<>	<elision2>
2411	2411	<>	<elision1>
2411	2383	<L2kl>	<>
2412	1772	.	.
2412	1772	 	 
2412	1772	<~>	<~>
2412	1772	<split-s>	<split-s>
2412	1772	<split-h>	<split-h>
2412	1772	<name2>	<name2>
2412	2146	<name2>	<name>
2412	2384	<>	<name>
2412	1775	<aphaerese>	<aphaerese>
2412	2383	<>	<aphaerese>
2412	1772	<elision3>	<elision3>
2412	2383	<>	<elision3>
2412	1772	<elision2>	<elision2>
2412	2383	<>	<elision2>
2412	1772	<elision1>	<elision1>
2412	2383	<>	<elision1>
2412	1936	.	υ
2412	1936	.	u
2412	1936	.	κ
2412	1936	.	α
2412	1936	.	a
2412	1936	.	λ
2412	2413	<4s>	<>
2413	251	.	.
2413	252	 	 
2413	251	<~>	<~>
2413	251	<split-s>	<split-s>
2413	251	<split-h>	<split-h>
2413	251	<name2>	<name2>
2413	2258	<name2>	<name>
2413	2388	<>	<name>
2413	255	<aphaerese>	<aphaerese>
2413	2387	<>	<aphaerese>
2413	251	<elision3>	<elision3>
2413	2387	<>	<elision3>
2413	251	<elision2>	<elision2>
2413	2387	<>	<elision2>
2413	251	<elision1>	<elision1>
2413	2387	<>	<elision1>
2413	1546	.	υ
2413	1590	H	υ
2413	1546	.	u
2413	1592	H	u
2413	1546	.	κ
2413	1513	H	U
2413	1546	.	α
2413	1576	H	α
2413	1546	.	a
2413	1581	H	a
2413	1343	H	A
2413	1546	.	λ
2413	2414	<K>	<>
2414	1596	.	.
2414	1596	<~>	<~>
2414	1596	<split-s>	<split-s>
2414	1596	<split-h>	<split-h>
2414	1596	<name2>	<name2>
2414	2148	<name2>	<name>
2414	2389	<>	<name>
2414	1599	<aphaerese>	<aphaerese>
2414	2391	<>	<aphaerese>
2414	1596	<elision3>	<elision3>
2414	2391	<>	<elision3>
2414	1596	<elision2>	<elision2>
2414	2391	<>	<elision2>
2414	1596	<elision1>	<elision1>
2414	2391	<>	<elision1>
2414	1595	.	υ
2414	1738	H	υ
2414	1595	.	u
2414	1747	H	u
2414	1595	.	κ
2414	1716	H	U
2414	1595	.	α
2414	1750	H	α
2414	1595	.	a
2414	1753	H	a
2414	1687	H	A
2414	1595	.	λ
2415	2416	<>	<aphaerese>
2415	2416	<>	<elision3>
2415	2416	<>	<elision2>
2415	2416	<>	<elision1>
2415	2027	<3s>	<>
2416	2417	<>	<name>
2416	2416	<>	<aphaerese>
2416	2416	<>	<elision3>
2416	2416	<>	<elision2>
2416	2416	<>	<elision1>
2416	2028	<3s>	<>
2417	2415	<>	<aphaerese>
2417	2415	<>	<elision3>
2417	2415	<>	<elision2>
2417	2415	<>	<elision1>
2417	2029	<3s>	<>
2418	2419	<>	<aphaerese>
2418	2419	<>	<elision3>
2418	2419	<>	<elision2>
2418	2419	<>	<elision1>
2418	2124	<3s>	<>
2419	2420	<>	<name>
2419	2419	<>	<aphaerese>
2419	2419	<>	<elision3>
2419	2419	<>	<elision2>
2419	2419	<>	<elision1>
2419	2125	<3s>	<>
2420	2418	<>	<aphaerese>
2420	2418	<>	<elision3>
2420	2418	<>	<elision2>
2420	2418	<>	<elision1>
2420	2126	<3s>	<>
2421	1757	.	.
2421	1758	 	 
2421	1757	<~>	<~>
2421	1757	<split-s>	<split-s>
2421	1757	<split-h>	<split-h>
2421	1757	<name2>	<name2>
2421	2422	<>	<name>
2421	1761	<aphaerese>	<aphaerese>
2421	2421	<>	<aphaerese>
2421	1757	<elision3>	<elision3>
2421	2421	<>	<elision3>
2421	1757	<elision2>	<elision2>
2421	2421	<>	<elision2>
2421	1757	<elision1>	<elision1>
2421	2421	<>	<elision1>
2421	1765	.	υ
2421	1771	s	υ
2421	1765	.	u
2421	1771	s	u
2421	2424	.	κ
2421	2347	s	κ
2421	2133	s	k
2421	2142	s	U
2421	2308	s	K
2421	1765	.	α
2421	1771	s	α
2421	1765	.	a
2421	1771	s	a
2421	2263	s	A
2421	2424	.	λ
2421	2347	s	λ
2421	2133	s	l
2421	2321	s	L
2421	2440	<split-h>	<>
2422	1760	.	.
2422	1763	 	 
2422	1760	<~>	<~>
2422	1760	<split-s>	<split-s>
2422	1760	<split-h>	<split-h>
2422	1760	<name2>	<name2>
2422	2307	<aphaerese>	<aphaerese>
2422	2423	<>	<aphaerese>
2422	1760	<elision3>	<elision3>
2422	2423	<>	<elision3>
2422	1760	<elision2>	<elision2>
2422	2423	<>	<elision2>
2422	1760	<elision1>	<elision1>
2422	2423	<>	<elision1>
2422	1767	.	υ
2422	1943	s	υ
2422	1767	.	u
2422	1943	s	u
2422	2426	.	κ
2422	2349	s	κ
2422	2135	s	k
2422	2144	s	U
2422	2310	s	K
2422	1767	.	α
2422	1943	s	α
2422	1767	.	a
2422	1943	s	a
2422	2265	s	A
2422	2426	.	λ
2422	2349	s	λ
2422	2135	s	l
2422	2323	s	L
2422	2441	<split-h>	<>
2423	1757	.	.
2423	1758	 	 
2423	1757	<~>	<~>
2423	1757	<split-s>	<split-s>
2423	1757	<split-h>	<split-h>
2423	1757	<name2>	<name2>
2423	1761	<aphaerese>	<aphaerese>
2423	2421	<>	<aphaerese>
2423	1757	<elision3>	<elision3>
2423	2421	<>	<elision3>
2423	1757	<elision2>	<elision2>
2423	2421	<>	<elision2>
2423	1757	<elision1>	<elision1>
2423	2421	<>	<elision1>
2423	1765	.	υ
2423	1771	s	υ
2423	1765	.	u
2423	1771	s	u
2423	2424	.	κ
2423	2347	s	κ
2423	2133	s	k
2423	2142	s	U
2423	2308	s	K
2423	1765	.	α
2423	1771	s	α
2423	1765	.	a
2423	1771	s	a
2423	2263	s	A
2423	2424	.	λ
2423	2347	s	λ
2423	2133	s	l
2423	2321	s	L
2423	2439	<split-h>	<>
2424	2425	<>	<name>
2424	2424	<>	<aphaerese>
2424	2427	<elision3>	<elision3>
2424	2424	<>	<elision3>
2424	2427	<elision2>	<elision2>
2424	2424	<>	<elision2>
2424	2427	<elision1>	<elision1>
2424	2424	<>	<elision1>
2424	1769	<split-h>	<>
2425	2426	<>	<aphaerese>
2425	2429	<elision3>	<elision3>
2425	2426	<>	<elision3>
2425	2429	<elision2>	<elision2>
2425	2426	<>	<elision2>
2425	2429	<elision1>	<elision1>
2425	2426	<>	<elision1>
2425	1770	<split-h>	<>
2426	2424	<>	<aphaerese>
2426	2427	<elision3>	<elision3>
2426	2424	<>	<elision3>
2426	2427	<elision2>	<elision2>
2426	2424	<>	<elision2>
2426	2427	<elision1>	<elision1>
2426	2424	<>	<elision1>
2426	1768	<split-h>	<>
2427	2427	.	.
2427	2427	 	 
2427	2427	<~>	<~>
2427	2427	<split-s>	<split-s>
2427	2427	<split-h>	<split-h>
2427	2427	<name2>	<name2>
2427	2428	<>	<name>
2427	2430	<aphaerese>	<aphaerese>
2427	2427	<>	<aphaerese>
2427	2427	<elision3>	<elision3>
2427	2427	<>	<elision3>
2427	2427	<elision2>	<elision2>
2427	2427	<>	<elision2>
2427	2427	<elision1>	<elision1>
2427	2427	<>	<elision1>
2427	2424	.	υ
2427	2424	.	u
2427	2433	.	κ
2427	2424	.	α
2427	2424	.	a
2427	2282	<split-h>	<>
2428	2429	.	.
2428	2429	 	 
2428	2429	<~>	<~>
2428	2429	<split-s>	<split-s>
2428	2429	<split-h>	<split-h>
2428	2429	<name2>	<name2>
2428	2432	<aphaerese>	<aphaerese>
2428	2429	<>	<aphaerese>
2428	2429	<elision3>	<elision3>
2428	2429	<>	<elision3>
2428	2429	<elision2>	<elision2>
2428	2429	<>	<elision2>
2428	2429	<elision1>	<elision1>
2428	2429	<>	<elision1>
2428	2426	.	υ
2428	2426	.	u
2428	2435	.	κ
2428	2426	.	α
2428	2426	.	a
2428	2283	<split-h>	<>
2429	2427	.	.
2429	2427	 	 
2429	2427	<~>	<~>
2429	2427	<split-s>	<split-s>
2429	2427	<split-h>	<split-h>
2429	2427	<name2>	<name2>
2429	2430	<aphaerese>	<aphaerese>
2429	2427	<>	<aphaerese>
2429	2427	<elision3>	<elision3>
2429	2427	<>	<elision3>
2429	2427	<elision2>	<elision2>
2429	2427	<>	<elision2>
2429	2427	<elision1>	<elision1>
2429	2427	<>	<elision1>
2429	2424	.	υ
2429	2424	.	u
2429	2433	.	κ
2429	2424	.	α
2429	2424	.	a
2429	2284	<split-h>	<>
2430	2427	.	.
2430	2427	 	 
2430	2427	<~>	<~>
2430	2427	<split-s>	<split-s>
2430	2427	<split-h>	<split-h>
2430	2427	<name2>	<name2>
2430	2431	<>	<name>
2430	2430	<aphaerese>	<aphaerese>
2430	2430	<>	<aphaerese>
2430	2427	<elision3>	<elision3>
2430	2430	<>	<elision3>
2430	2427	<elision2>	<elision2>
2430	2430	<>	<elision2>
2430	2427	<elision1>	<elision1>
2430	2430	<>	<elision1>
2430	2427	.	υ
2430	2427	.	u
2430	2433	.	κ
2430	2427	.	α
2430	2427	.	a
2430	2329	<split-h>	<>
2431	2429	.	.
2431	2429	 	 
2431	2429	<~>	<~>
2431	2429	<split-s>	<split-s>
2431	2429	<split-h>	<split-h>
2431	2429	<name2>	<name2>
2431	2432	<aphaerese>	<aphaerese>
2431	2432	<>	<aphaerese>
2431	2429	<elision3>	<elision3>
2431	2432	<>	<elision3>
2431	2429	<elision2>	<elision2>
2431	2432	<>	<elision2>
2431	2429	<elision1>	<elision1>
2431	2432	<>	<elision1>
2431	2429	.	υ
2431	2429	.	u
2431	2435	.	κ
2431	2429	.	α
2431	2429	.	a
2431	2330	<split-h>	<>
2432	2427	.	.
2432	2427	 	 
2432	2427	<~>	<~>
2432	2427	<split-s>	<split-s>
2432	2427	<split-h>	<split-h>
2432	2427	<name2>	<name2>
2432	2430	<aphaerese>	<aphaerese>
2432	2430	<>	<aphaerese>
2432	2427	<elision3>	<elision3>
2432	2430	<>	<elision3>
2432	2427	<elision2>	<elision2>
2432	2430	<>	<elision2>
2432	2427	<elision1>	<elision1>
2432	2430	<>	<elision1>
2432	2427	.	υ
2432	2427	.	u
2432	2433	.	κ
2432	2427	.	α
2432	2427	.	a
2432	2328	<split-h>	<>
2433	2434	<>	<name>
2433	2433	<>	<aphaerese>
2433	2436	<elision3>	<elision3>
2433	2433	<>	<elision3>
2433	2436	<elision2>	<elision2>
2433	2433	<>	<elision2>
2433	2436	<elision1>	<elision1>
2433	2433	<>	<elision1>
2433	2019	<split-h>	<>
2434	2435	<>	<aphaerese>
2434	2438	<elision3>	<elision3>
2434	2435	<>	<elision3>
2434	2438	<elision2>	<elision2>
2434	2435	<>	<elision2>
2434	2438	<elision1>	<elision1>
2434	2435	<>	<elision1>
2434	2020	<split-h>	<>
2435	2433	<>	<aphaerese>
2435	2436	<elision3>	<elision3>
2435	2433	<>	<elision3>
2435	2436	<elision2>	<elision2>
2435	2433	<>	<elision2>
2435	2436	<elision1>	<elision1>
2435	2433	<>	<elision1>
2435	2018	<split-h>	<>
2436	2437	<>	<name>
2436	2436	<>	<aphaerese>
2436	2436	<>	<elision3>
2436	2436	<>	<elision2>
2436	2436	<>	<elision1>
2436	2016	<split-h>	<>
2437	2438	<>	<aphaerese>
2437	2438	<>	<elision3>
2437	2438	<>	<elision2>
2437	2438	<>	<elision1>
2437	2017	<split-h>	<>
2438	2436	<>	<aphaerese>
2438	2436	<>	<elision3>
2438	2436	<>	<elision2>
2438	2436	<>	<elision1>
2438	2015	<split-h>	<>
2439	2440	<>	<aphaerese>
2439	2440	<>	<elision3>
2439	2440	<>	<elision2>
2439	2440	<>	<elision1>
2439	2136	<3s>	<>
2440	2441	<>	<name>
2440	2440	<>	<aphaerese>
2440	2440	<>	<elision3>
2440	2440	<>	<elision2>
2440	2440	<>	<elision1>
2440	2137	<3s>	<>
2441	2439	<>	<aphaerese>
2441	2439	<>	<elision3>
2441	2439	<>	<elision2>
2441	2439	<>	<elision1>
2441	2138	<3s>	<>
2442	2443	<>	<name>
2442	2442	<>	<aphaerese>
2442	2442	<>	<elision3>
2442	2442	<>	<elision2>
2442	2442	<>	<elision1>
2442	2427	<U2kl>	<>
2443	2444	<>	<aphaerese>
2443	2444	<>	<elision3>
2443	2444	<>	<elision2>
2443	2444	<>	<elision1>
2443	2428	<U2kl>	<>
2444	2442	<>	<aphaerese>
2444	2442	<>	<elision3>
2444	2442	<>	<elision2>
2444	2442	<>	<elision1>
2444	2429	<U2kl>	<>
2445	2446	<name>	<name>
2445	2448	<>	<name>
2445	2450	<>	<aphaerese>
2445	2450	<>	<elision3>
2445	2450	<>	<elision2>
2445	2450	<>	<elision1>
2445	2493	<split-h>	<>
2445	2451	<A2kl>	<>
2445	2469	<L2kl>	<>
2445	2494	<K2kl>	<>
2446	2310	s	k
2446	2323	s	l
2446	2447	<split-h>	<>
2447	2147	<3s>	<>
2448	2449	<>	<aphaerese>
2448	2449	<>	<elision3>
2448	2449	<>	<elision2>
2448	2449	<>	<elision1>
2448	2452	<A2kl>	<>
2448	2470	<L2kl>	<>
2448	2488	<K2kl>	<>
2449	2450	<>	<aphaerese>
2449	2450	<>	<elision3>
2449	2450	<>	<elision2>
2449	2450	<>	<elision1>
2449	2453	<A2kl>	<>
2449	2471	<L2kl>	<>
2449	2489	<K2kl>	<>
2450	2448	<>	<name>
2450	2450	<>	<aphaerese>
2450	2450	<>	<elision3>
2450	2450	<>	<elision2>
2450	2450	<>	<elision1>
2450	2451	<A2kl>	<>
2450	2469	<L2kl>	<>
2450	2487	<K2kl>	<>
2451	2452	<>	<name>
2451	2451	<>	<aphaerese>
2451	2451	<>	<elision3>
2451	2451	<>	<elision2>
2451	2451	<>	<elision1>
2451	2454	.	κ
2451	2454	.	λ
2451	2467	<split-h>	<>
2452	2453	<>	<aphaerese>
2452	2453	<>	<elision3>
2452	2453	<>	<elision2>
2452	2453	<>	<elision1>
2452	2456	.	κ
2452	2456	.	λ
2452	2468	<split-h>	<>
2453	2451	<>	<aphaerese>
2453	2451	<>	<elision3>
2453	2451	<>	<elision2>
2453	2451	<>	<elision1>
2453	2454	.	κ
2453	2454	.	λ
2453	2466	<split-h>	<>
2454	2455	<>	<name>
2454	2454	<>	<aphaerese>
2454	2457	<elision3>	<elision3>
2454	2454	<>	<elision3>
2454	2457	<elision2>	<elision2>
2454	2454	<>	<elision2>
2454	2457	<elision1>	<elision1>
2454	2454	<>	<elision1>
2454	2464	<split-h>	<>
2455	2456	<>	<aphaerese>
2455	2459	<elision3>	<elision3>
2455	2456	<>	<elision3>
2455	2459	<elision2>	<elision2>
2455	2456	<>	<elision2>
2455	2459	<elision1>	<elision1>
2455	2456	<>	<elision1>
2455	2465	<split-h>	<>
2456	2454	<>	<aphaerese>
2456	2457	<elision3>	<elision3>
2456	2454	<>	<elision3>
2456	2457	<elision2>	<elision2>
2456	2454	<>	<elision2>
2456	2457	<elision1>	<elision1>
2456	2454	<>	<elision1>
2456	2463	<split-h>	<>
2457	2427	.	.
2457	2427	 	 
2457	2427	<~>	<~>
2457	2427	<split-s>	<split-s>
2457	2427	<split-h>	<split-h>
2457	2427	<name2>	<name2>
2457	2458	<>	<name>
2457	2430	<aphaerese>	<aphaerese>
2457	2457	<>	<aphaerese>
2457	2427	<elision3>	<elision3>
2457	2457	<>	<elision3>
2457	2427	<elision2>	<elision2>
2457	2457	<>	<elision2>
2457	2427	<elision1>	<elision1>
2457	2457	<>	<elision1>
2457	2424	.	υ
2457	2424	.	u
2457	2424	.	α
2457	2424	.	a
2457	2461	<split-h>	<>
2458	2429	.	.
2458	2429	 	 
2458	2429	<~>	<~>
2458	2429	<split-s>	<split-s>
2458	2429	<split-h>	<split-h>
2458	2429	<name2>	<name2>
2458	2432	<aphaerese>	<aphaerese>
2458	2459	<>	<aphaerese>
2458	2429	<elision3>	<elision3>
2458	2459	<>	<elision3>
2458	2429	<elision2>	<elision2>
2458	2459	<>	<elision2>
2458	2429	<elision1>	<elision1>
2458	2459	<>	<elision1>
2458	2426	.	υ
2458	2426	.	u
2458	2426	.	α
2458	2426	.	a
2458	2462	<split-h>	<>
2459	2427	.	.
2459	2427	 	 
2459	2427	<~>	<~>
2459	2427	<split-s>	<split-s>
2459	2427	<split-h>	<split-h>
2459	2427	<name2>	<name2>
2459	2430	<aphaerese>	<aphaerese>
2459	2457	<>	<aphaerese>
2459	2427	<elision3>	<elision3>
2459	2457	<>	<elision3>
2459	2427	<elision2>	<elision2>
2459	2457	<>	<elision2>
2459	2427	<elision1>	<elision1>
2459	2457	<>	<elision1>
2459	2424	.	υ
2459	2424	.	u
2459	2424	.	α
2459	2424	.	a
2459	2460	<split-h>	<>
2460	2461	<>	<aphaerese>
2460	2461	<>	<elision3>
2460	2461	<>	<elision2>
2460	2461	<>	<elision1>
2460	2161	<3s>	<>
2461	2462	<>	<name>
2461	2461	<>	<aphaerese>
2461	2461	<>	<elision3>
2461	2461	<>	<elision2>
2461	2461	<>	<elision1>
2461	2162	<3s>	<>
2462	2460	<>	<aphaerese>
2462	2460	<>	<elision3>
2462	2460	<>	<elision2>
2462	2460	<>	<elision1>
2462	2163	<3s>	<>
2463	2464	<>	<aphaerese>
2463	2464	<>	<elision3>
2463	2464	<>	<elision2>
2463	2464	<>	<elision1>
2463	2197	<3s>	<>
2464	2465	<>	<name>
2464	2464	<>	<aphaerese>
2464	2464	<>	<elision3>
2464	2464	<>	<elision2>
2464	2464	<>	<elision1>
2464	2198	<3s>	<>
2465	2463	<>	<aphaerese>
2465	2463	<>	<elision3>
2465	2463	<>	<elision2>
2465	2463	<>	<elision1>
2465	2199	<3s>	<>
2466	2467	<>	<aphaerese>
2466	2467	<>	<elision3>
2466	2467	<>	<elision2>
2466	2467	<>	<elision1>
2466	2206	<3s>	<>
2467	2468	<>	<name>
2467	2467	<>	<aphaerese>
2467	2467	<>	<elision3>
2467	2467	<>	<elision2>
2467	2467	<>	<elision1>
2467	2207	<3s>	<>
2468	2466	<>	<aphaerese>
2468	2466	<>	<elision3>
2468	2466	<>	<elision2>
2468	2466	<>	<elision1>
2468	2208	<3s>	<>
2469	2470	<>	<name>
2469	2469	<>	<aphaerese>
2469	2469	<>	<elision3>
2469	2469	<>	<elision2>
2469	2469	<>	<elision1>
2469	2472	.	κ
2469	2472	.	λ
2469	2485	<split-h>	<>
2470	2471	<>	<aphaerese>
2470	2471	<>	<elision3>
2470	2471	<>	<elision2>
2470	2471	<>	<elision1>
2470	2474	.	κ
2470	2474	.	λ
2470	2486	<split-h>	<>
2471	2469	<>	<aphaerese>
2471	2469	<>	<elision3>
2471	2469	<>	<elision2>
2471	2469	<>	<elision1>
2471	2472	.	κ
2471	2472	.	λ
2471	2484	<split-h>	<>
2472	2473	<>	<name>
2472	2472	<>	<aphaerese>
2472	2475	<elision3>	<elision3>
2472	2472	<>	<elision3>
2472	2475	<elision2>	<elision2>
2472	2472	<>	<elision2>
2472	2475	<elision1>	<elision1>
2472	2472	<>	<elision1>
2472	2482	<split-h>	<>
2473	2474	<>	<aphaerese>
2473	2477	<elision3>	<elision3>
2473	2474	<>	<elision3>
2473	2477	<elision2>	<elision2>
2473	2474	<>	<elision2>
2473	2477	<elision1>	<elision1>
2473	2474	<>	<elision1>
2473	2483	<split-h>	<>
2474	2472	<>	<aphaerese>
2474	2475	<elision3>	<elision3>
2474	2472	<>	<elision3>
2474	2475	<elision2>	<elision2>
2474	2472	<>	<elision2>
2474	2475	<elision1>	<elision1>
2474	2472	<>	<elision1>
2474	2481	<split-h>	<>
2475	2476	<>	<name>
2475	2475	<>	<aphaerese>
2475	2475	<>	<elision3>
2475	2475	<>	<elision2>
2475	2475	<>	<elision1>
2475	2433	.	κ
2475	2479	<split-h>	<>
2476	2477	<>	<aphaerese>
2476	2477	<>	<elision3>
2476	2477	<>	<elision2>
2476	2477	<>	<elision1>
2476	2435	.	κ
2476	2480	<split-h>	<>
2477	2475	<>	<aphaerese>
2477	2475	<>	<elision3>
2477	2475	<>	<elision2>
2477	2475	<>	<elision1>
2477	2433	.	κ
2477	2478	<split-h>	<>
2478	2479	<>	<aphaerese>
2478	2479	<>	<elision3>
2478	2479	<>	<elision2>
2478	2479	<>	<elision1>
2478	2224	<3s>	<>
2479	2480	<>	<name>
2479	2479	<>	<aphaerese>
2479	2479	<>	<elision3>
2479	2479	<>	<elision2>
2479	2479	<>	<elision1>
2479	2225	<3s>	<>
2480	2478	<>	<aphaerese>
2480	2478	<>	<elision3>
2480	2478	<>	<elision2>
2480	2478	<>	<elision1>
2480	2226	<3s>	<>
2481	2482	<>	<aphaerese>
2481	2482	<>	<elision3>
2481	2482	<>	<elision2>
2481	2482	<>	<elision1>
2481	2230	<3s>	<>
2482	2483	<>	<name>
2482	2482	<>	<aphaerese>
2482	2482	<>	<elision3>
2482	2482	<>	<elision2>
2482	2482	<>	<elision1>
2482	2231	<3s>	<>
2483	2481	<>	<aphaerese>
2483	2481	<>	<elision3>
2483	2481	<>	<elision2>
2483	2481	<>	<elision1>
2483	2232	<3s>	<>
2484	2485	<>	<aphaerese>
2484	2485	<>	<elision3>
2484	2485	<>	<elision2>
2484	2485	<>	<elision1>
2484	2239	<3s>	<>
2485	2486	<>	<name>
2485	2485	<>	<aphaerese>
2485	2485	<>	<elision3>
2485	2485	<>	<elision2>
2485	2485	<>	<elision1>
2485	2240	<3s>	<>
2486	2484	<>	<aphaerese>
2486	2484	<>	<elision3>
2486	2484	<>	<elision2>
2486	2484	<>	<elision1>
2486	2241	<3s>	<>
2487	2427	.	.
2487	2427	 	 
2487	2427	<~>	<~>
2487	2427	<split-s>	<split-s>
2487	2427	<split-h>	<split-h>
2487	2427	<name2>	<name2>
2487	2488	<>	<name>
2487	2430	<aphaerese>	<aphaerese>
2487	2487	<>	<aphaerese>
2487	2427	<elision3>	<elision3>
2487	2487	<>	<elision3>
2487	2427	<elision2>	<elision2>
2487	2487	<>	<elision2>
2487	2427	<elision1>	<elision1>
2487	2487	<>	<elision1>
2487	2424	.	υ
2487	2424	.	u
2487	2424	.	α
2487	2424	.	a
2487	2491	<split-h>	<>
2488	2429	.	.
2488	2429	 	 
2488	2429	<~>	<~>
2488	2429	<split-s>	<split-s>
2488	2429	<split-h>	<split-h>
2488	2429	<name2>	<name2>
2488	2432	<aphaerese>	<aphaerese>
2488	2489	<>	<aphaerese>
2488	2429	<elision3>	<elision3>
2488	2489	<>	<elision3>
2488	2429	<elision2>	<elision2>
2488	2489	<>	<elision2>
2488	2429	<elision1>	<elision1>
2488	2489	<>	<elision1>
2488	2426	.	υ
2488	2426	.	u
2488	2426	.	α
2488	2426	.	a
2488	2492	<split-h>	<>
2489	2427	.	.
2489	2427	 	 
2489	2427	<~>	<~>
2489	2427	<split-s>	<split-s>
2489	2427	<split-h>	<split-h>
2489	2427	<name2>	<name2>
2489	2430	<aphaerese>	<aphaerese>
2489	2487	<>	<aphaerese>
2489	2427	<elision3>	<elision3>
2489	2487	<>	<elision3>
2489	2427	<elision2>	<elision2>
2489	2487	<>	<elision2>
2489	2427	<elision1>	<elision1>
2489	2487	<>	<elision1>
2489	2424	.	υ
2489	2424	.	u
2489	2424	.	α
2489	2424	.	a
2489	2490	<split-h>	<>
2490	2491	<>	<aphaerese>
2490	2491	<>	<elision3>
2490	2491	<>	<elision2>
2490	2491	<>	<elision1>
2490	2251	<3s>	<>
2491	2492	<>	<name>
2491	2491	<>	<aphaerese>
2491	2491	<>	<elision3>
2491	2491	<>	<elision2>
2491	2491	<>	<elision1>
2491	2252	<3s>	<>
2492	2490	<>	<aphaerese>
2492	2490	<>	<elision3>
2492	2490	<>	<elision2>
2492	2490	<>	<elision1>
2492	2253	<3s>	<>
2493	2257	<3s>	<>
2494	2427	.	.
2494	2427	 	 
2494	2427	<~>	<~>
2494	2427	<split-s>	<split-s>
2494	2427	<split-h>	<split-h>
2494	2427	<name2>	<name2>
2494	2495	<name2>	<name>
2494	2488	<>	<name>
2494	2430	<aphaerese>	<aphaerese>
2494	2487	<>	<aphaerese>
2494	2427	<elision3>	<elision3>
2494	2487	<>	<elision3>
2494	2427	<elision2>	<elision2>
2494	2487	<>	<elision2>
2494	2427	<elision1>	<elision1>
2494	2487	<>	<elision1>
2494	2424	.	υ
2494	2424	.	u
2494	2424	.	α
2494	2424	.	a
2494	2496	<split-h>	<>
2495	2447	<split-h>	<>
2496	2492	<>	<name>
2496	2491	<>	<aphaerese>
2496	2491	<>	<elision3>
2496	2491	<>	<elision2>
2496	2491	<>	<elision1>
2496	2261	<3s>	<>
2497	2427	.	.
2497	2427	 	 
2497	2427	<~>	<~>
2497	2427	<split-s>	<split-s>
2497	2427	<split-h>	<split-h>
2497	2427	<name2>	<name2>
2497	2498	<>	<name>
2497	2430	<aphaerese>	<aphaerese>
2497	2497	<>	<aphaerese>
2497	2497	<>	<elision3>
2497	2497	<>	<elision2>
2497	2497	<>	<elision1>
2497	2424	.	υ
2497	2424	.	u
2497	2433	.	κ
2497	2424	.	α
2497	2424	.	a
2497	2336	<split-h>	<>
2498	2429	.	.
2498	2429	 	 
2498	2429	<~>	<~>
2498	2429	<split-s>	<split-s>
2498	2429	<split-h>	<split-h>
2498	2429	<name2>	<name2>
2498	2432	<aphaerese>	<aphaerese>
2498	2499	<>	<aphaerese>
2498	2499	<>	<elision3>
2498	2499	<>	<elision2>
2498	2499	<>	<elision1>
2498	2426	.	υ
2498	2426	.	u
2498	2435	.	κ
2498	2426	.	α
2498	2426	.	a
2498	2337	<split-h>	<>
2499	2427	.	.
2499	2427	 	 
2499	2427	<~>	<~>
2499	2427	<split-s>	<split-s>
2499	2427	<split-h>	<split-h>
2499	2427	<name2>	<name2>
2499	2430	<aphaerese>	<aphaerese>
2499	2497	<>	<aphaerese>
2499	2497	<>	<elision3>
2499	2497	<>	<elision2>
2499	2497	<>	<elision1>
2499	2424	.	υ
2499	2424	.	u
2499	2433	.	κ
2499	2424	.	α
2499	2424	.	a
2499	2335	<split-h>	<>
2500	2501	<>	<name>
2500	2500	<>	<aphaerese>
2500	2500	<>	<elision3>
2500	2500	<>	<elision2>
2500	2500	<>	<elision1>
2500	2427	<A2kl>	<>
2501	2502	<>	<aphaerese>
2501	2502	<>	<elision3>
2501	2502	<>	<elision2>
2501	2502	<>	<elision1>
2501	2428	<A2kl>	<>
2502	2500	<>	<aphaerese>
2502	2500	<>	<elision3>
2502	2500	<>	<elision2>
2502	2500	<>	<elision1>
2502	2429	<A2kl>	<>
2503	1757	.	.
2503	1758	 	 
2503	1757	<~>	<~>
2503	1757	<split-s>	<split-s>
2503	1757	<split-h>	<split-h>
2503	1757	<name2>	<name2>
2503	2504	<>	<name>
2503	1761	<aphaerese>	<aphaerese>
2503	2503	<>	<aphaerese>
2503	1757	<elision3>	<elision3>
2503	2503	<>	<elision3>
2503	1757	<elision2>	<elision2>
2503	2503	<>	<elision2>
2503	1757	<elision1>	<elision1>
2503	2503	<>	<elision1>
2503	1765	.	υ
2503	1771	s	υ
2503	1765	.	u
2503	1771	s	u
2503	1765	.	κ
2503	2347	s	κ
2503	2133	s	k
2503	2142	s	U
2503	2308	s	K
2503	1765	.	α
2503	1771	s	α
2503	1765	.	a
2503	1771	s	a
2503	2263	s	A
2503	1765	.	λ
2503	2347	s	λ
2503	2133	s	l
2503	2321	s	L
2503	2440	<split-h>	<>
2504	1760	.	.
2504	1763	 	 
2504	1760	<~>	<~>
2504	1760	<split-s>	<split-s>
2504	1760	<split-h>	<split-h>
2504	1760	<name2>	<name2>
2504	2307	<aphaerese>	<aphaerese>
2504	2505	<>	<aphaerese>
2504	1760	<elision3>	<elision3>
2504	2505	<>	<elision3>
2504	1760	<elision2>	<elision2>
2504	2505	<>	<elision2>
2504	1760	<elision1>	<elision1>
2504	2505	<>	<elision1>
2504	1767	.	υ
2504	1943	s	υ
2504	1767	.	u
2504	1943	s	u
2504	1767	.	κ
2504	2349	s	κ
2504	2135	s	k
2504	2144	s	U
2504	2310	s	K
2504	1767	.	α
2504	1943	s	α
2504	1767	.	a
2504	1943	s	a
2504	2265	s	A
2504	1767	.	λ
2504	2349	s	λ
2504	2135	s	l
2504	2323	s	L
2504	2441	<split-h>	<>
2505	1757	.	.
2505	1758	 	 
2505	1757	<~>	<~>
2505	1757	<split-s>	<split-s>
2505	1757	<split-h>	<split-h>
2505	1757	<name2>	<name2>
2505	1761	<aphaerese>	<aphaerese>
2505	2503	<>	<aphaerese>
2505	1757	<elision3>	<elision3>
2505	2503	<>	<elision3>
2505	1757	<elision2>	<elision2>
2505	2503	<>	<elision2>
2505	1757	<elision1>	<elision1>
2505	2503	<>	<elision1>
2505	1765	.	υ
2505	1771	s	υ
2505	1765	.	u
2505	1771	s	u
2505	1765	.	κ
2505	2347	s	κ
2505	2133	s	k
2505	2142	s	U
2505	2308	s	K
2505	1765	.	α
2505	1771	s	α
2505	1765	.	a
2505	1771	s	a
2505	2263	s	A
2505	1765	.	λ
2505	2347	s	λ
2505	2133	s	l
2505	2321	s	L
2505	2439	<split-h>	<>
2506	2427	.	.
2506	2427	 	 
2506	2427	<~>	<~>
2506	2427	<split-s>	<split-s>
2506	2427	<split-h>	<split-h>
2506	2427	<name2>	<name2>
2506	2507	<>	<name>
2506	2430	<aphaerese>	<aphaerese>
2506	2506	<>	<aphaerese>
2506	2427	<elision3>	<elision3>
2506	2506	<>	<elision3>
2506	2427	<elision2>	<elision2>
2506	2506	<>	<elision2>
2506	2427	<elision1>	<elision1>
2506	2506	<>	<elision1>
2506	2424	.	υ
2506	2424	.	u
2506	2424	.	κ
2506	2424	.	α
2506	2424	.	a
2506	2424	.	λ
2506	2440	<split-h>	<>
2507	2429	.	.
2507	2429	 	 
2507	2429	<~>	<~>
2507	2429	<split-s>	<split-s>
2507	2429	<split-h>	<split-h>
2507	2429	<name2>	<name2>
2507	2432	<aphaerese>	<aphaerese>
2507	2508	<>	<aphaerese>
2507	2429	<elision3>	<elision3>
2507	2508	<>	<elision3>
2507	2429	<elision2>	<elision2>
2507	2508	<>	<elision2>
2507	2429	<elision1>	<elision1>
2507	2508	<>	<elision1>
2507	2426	.	υ
2507	2426	.	u
2507	2426	.	κ
2507	2426	.	α
2507	2426	.	a
2507	2426	.	λ
2507	2441	<split-h>	<>
2508	2427	.	.
2508	2427	 	 
2508	2427	<~>	<~>
2508	2427	<split-s>	<split-s>
2508	2427	<split-h>	<split-h>
2508	2427	<name2>	<name2>
2508	2430	<aphaerese>	<aphaerese>
2508	2506	<>	<aphaerese>
2508	2427	<elision3>	<elision3>
2508	2506	<>	<elision3>
2508	2427	<elision2>	<elision2>
2508	2506	<>	<elision2>
2508	2427	<elision1>	<elision1>
2508	2506	<>	<elision1>
2508	2424	.	υ
2508	2424	.	u
2508	2424	.	κ
2508	2424	.	α
2508	2424	.	a
2508	2424	.	λ
2508	2439	<split-h>	<>
2509	2495	<name>	<name>
2509	2510	<>	<name>
2509	2512	<>	<aphaerese>
2509	2512	<>	<elision3>
2509	2512	<>	<elision2>
2509	2512	<>	<elision1>
2509	2493	<split-h>	<>
2509	2451	<A2kl>	<>
2509	2519	<L2kl>	<>
2510	2511	<>	<aphaerese>
2510	2511	<>	<elision3>
2510	2511	<>	<elision2>
2510	2511	<>	<elision1>
2510	2452	<A2kl>	<>
2510	2514	<L2kl>	<>
2511	2512	<>	<aphaerese>
2511	2512	<>	<elision3>
2511	2512	<>	<elision2>
2511	2512	<>	<elision1>
2511	2453	<A2kl>	<>
2511	2515	<L2kl>	<>
2512	2510	<>	<name>
2512	2512	<>	<aphaerese>
2512	2512	<>	<elision3>
2512	2512	<>	<elision2>
2512	2512	<>	<elision1>
2512	2451	<A2kl>	<>
2512	2513	<L2kl>	<>
2513	2427	.	.
2513	2427	 	 
2513	2427	<~>	<~>
2513	2427	<split-s>	<split-s>
2513	2427	<split-h>	<split-h>
2513	2427	<name2>	<name2>
2513	2514	<>	<name>
2513	2430	<aphaerese>	<aphaerese>
2513	2513	<>	<aphaerese>
2513	2427	<elision3>	<elision3>
2513	2513	<>	<elision3>
2513	2427	<elision2>	<elision2>
2513	2513	<>	<elision2>
2513	2427	<elision1>	<elision1>
2513	2513	<>	<elision1>
2513	2424	.	υ
2513	2424	.	u
2513	2472	.	κ
2513	2424	.	α
2513	2424	.	a
2513	2472	.	λ
2513	2517	<split-h>	<>
2514	2429	.	.
2514	2429	 	 
2514	2429	<~>	<~>
2514	2429	<split-s>	<split-s>
2514	2429	<split-h>	<split-h>
2514	2429	<name2>	<name2>
2514	2432	<aphaerese>	<aphaerese>
2514	2515	<>	<aphaerese>
2514	2429	<elision3>	<elision3>
2514	2515	<>	<elision3>
2514	2429	<elision2>	<elision2>
2514	2515	<>	<elision2>
2514	2429	<elision1>	<elision1>
2514	2515	<>	<elision1>
2514	2426	.	υ
2514	2426	.	u
2514	2474	.	κ
2514	2426	.	α
2514	2426	.	a
2514	2474	.	λ
2514	2518	<split-h>	<>
2515	2427	.	.
2515	2427	 	 
2515	2427	<~>	<~>
2515	2427	<split-s>	<split-s>
2515	2427	<split-h>	<split-h>
2515	2427	<name2>	<name2>
2515	2430	<aphaerese>	<aphaerese>
2515	2513	<>	<aphaerese>
2515	2427	<elision3>	<elision3>
2515	2513	<>	<elision3>
2515	2427	<elision2>	<elision2>
2515	2513	<>	<elision2>
2515	2427	<elision1>	<elision1>
2515	2513	<>	<elision1>
2515	2424	.	υ
2515	2424	.	u
2515	2472	.	κ
2515	2424	.	α
2515	2424	.	a
2515	2472	.	λ
2515	2516	<split-h>	<>
2516	2517	<>	<aphaerese>
2516	2517	<>	<elision3>
2516	2517	<>	<elision2>
2516	2517	<>	<elision1>
2516	2273	<3s>	<>
2517	2518	<>	<name>
2517	2517	<>	<aphaerese>
2517	2517	<>	<elision3>
2517	2517	<>	<elision2>
2517	2517	<>	<elision1>
2517	2274	<3s>	<>
2518	2516	<>	<aphaerese>
2518	2516	<>	<elision3>
2518	2516	<>	<elision2>
2518	2516	<>	<elision1>
2518	2275	<3s>	<>
2519	2427	.	.
2519	2427	 	 
2519	2427	<~>	<~>
2519	2427	<split-s>	<split-s>
2519	2427	<split-h>	<split-h>
2519	2427	<name2>	<name2>
2519	2495	<name2>	<name>
2519	2514	<>	<name>
2519	2430	<aphaerese>	<aphaerese>
2519	2513	<>	<aphaerese>
2519	2427	<elision3>	<elision3>
2519	2513	<>	<elision3>
2519	2427	<elision2>	<elision2>
2519	2513	<>	<elision2>
2519	2427	<elision1>	<elision1>
2519	2513	<>	<elision1>
2519	2424	.	υ
2519	2424	.	u
2519	2472	.	κ
2519	2424	.	α
2519	2424	.	a
2519	2472	.	λ
2519	2520	<split-h>	<>
2520	2518	<>	<name>
2520	2517	<>	<aphaerese>
2520	2517	<>	<elision3>
2520	2517	<>	<elision2>
2520	2517	<>	<elision1>
2520	2280	<3s>	<>
2521	1757	.	.
2521	1758	 	 
2521	1757	<~>	<~>
2521	1757	<split-s>	<split-s>
2521	1757	<split-h>	<split-h>
2521	1757	<name2>	<name2>
2521	2333	<>	<name>
2521	1761	<aphaerese>	<aphaerese>
2521	1756	<>	<aphaerese>
2521	1756	<>	<elision3>
2521	1756	<>	<elision2>
2521	1756	<>	<elision1>
2521	1765	.	υ
2521	1771	s	υ
2521	1765	.	u
2521	1771	s	u
2521	1950	.	κ
2521	2021	s	κ
2521	2133	s	k
2521	2142	s	U
2521	2308	s	K
2521	1765	.	α
2521	1771	s	α
2521	1765	.	a
2521	1771	s	a
2521	2263	s	A
2521	2133	s	λ
2521	2133	s	l
2521	2321	s	L
2521	2522	<split-h>	<>
2522	2337	<>	<name>
2522	2336	<>	<aphaerese>
2522	2336	<>	<elision3>
2522	2336	<>	<elision2>
2522	2336	<>	<elision1>
2522	2286	<3s>	<>
2523	1757	.	.
2523	1758	 	 
2523	1757	<~>	<~>
2523	1757	<split-s>	<split-s>
2523	1757	<split-h>	<split-h>
2523	1757	<name2>	<name2>
2523	2369	<>	<name>
2523	1761	<aphaerese>	<aphaerese>
2523	2368	<>	<aphaerese>
2523	2371	<elision3>	<elision3>
2523	2368	<>	<elision3>
2523	2371	<elision2>	<elision2>
2523	2368	<>	<elision2>
2523	2371	<elision1>	<elision1>
2523	2368	<>	<elision1>
2523	1765	.	υ
2523	1771	s	υ
2523	1765	.	u
2523	1771	s	u
2523	1765	.	κ
2523	2347	s	κ
2523	2133	s	k
2523	2142	s	U
2523	2308	s	K
2523	1765	.	α
2523	1771	s	α
2523	1765	.	a
2523	1771	s	a
2523	2263	s	A
2523	1765	.	λ
2523	2347	s	λ
2523	2133	s	l
2523	2321	s	L
2523	2524	<split-h>	<>
2524	2420	<>	<name>
2524	2419	<>	<aphaerese>
2524	2419	<>	<elision3>
2524	2419	<>	<elision2>
2524	2419	<>	<elision1>
2524	2289	<3s>	<>
2525	1757	.	.
2525	1758	 	 
2525	1757	<~>	<~>
2525	1757	<split-s>	<split-s>
2525	1757	<split-h>	<split-h>
2525	1757	<name2>	<name2>
2525	2422	<>	<name>
2525	1761	<aphaerese>	<aphaerese>
2525	2421	<>	<aphaerese>
2525	1757	<elision3>	<elision3>
2525	2421	<>	<elision3>
2525	1757	<elision2>	<elision2>
2525	2421	<>	<elision2>
2525	1757	<elision1>	<elision1>
2525	2421	<>	<elision1>
2525	1765	.	υ
2525	1771	s	υ
2525	1765	.	u
2525	1771	s	u
2525	2424	.	κ
2525	2347	s	κ
2525	2133	s	k
2525	2142	s	U
2525	2308	s	K
2525	1765	.	α
2525	1771	s	α
2525	1765	.	a
2525	1771	s	a
2525	2263	s	A
2525	2424	.	λ
2525	2347	s	λ
2525	2133	s	l
2525	2321	s	L
2525	2526	<split-h>	<>
2526	2441	<>	<name>
2526	2440	<>	<aphaerese>
2526	2440	<>	<elision3>
2526	2440	<>	<elision2>
2526	2440	<>	<elision1>
2526	2292	<3s>	<>
2527	2443	<>	<name>
2527	2442	<>	<aphaerese>
2527	2442	<>	<elision3>
2527	2442	<>	<elision2>
2527	2442	<>	<elision1>
2527	2528	<U2kl>	<>
2528	2427	.	.
2528	2427	 	 
2528	2427	<~>	<~>
2528	2427	<split-s>	<split-s>
2528	2427	<split-h>	<split-h>
2528	2427	<name2>	<name2>
2528	2428	<>	<name>
2528	2430	<aphaerese>	<aphaerese>
2528	2427	<>	<aphaerese>
2528	2427	<elision3>	<elision3>
2528	2427	<>	<elision3>
2528	2427	<elision2>	<elision2>
2528	2427	<>	<elision2>
2528	2427	<elision1>	<elision1>
2528	2427	<>	<elision1>
2528	2424	.	υ
2528	2424	.	u
2528	2433	.	κ
2528	2424	.	α
2528	2424	.	a
2528	2529	<split-h>	<>
2529	2283	<>	<name>
2529	2282	<>	<aphaerese>
2529	2282	<>	<elision3>
2529	2282	<>	<elision2>
2529	2282	<>	<elision1>
2529	2296	<3s>	<>
2530	2446	<name>	<name>
2530	2448	<>	<name>
2530	2450	<>	<aphaerese>
2530	2450	<>	<elision3>
2530	2450	<>	<elision2>
2530	2450	<>	<elision1>
2530	2493	<split-h>	<>
2530	2451	<A2kl>	<>
2530	2469	<L2kl>	<>
2530	2531	<K2kl>	<>
2531	2427	.	.
2531	2427	 	 
2531	2427	<~>	<~>
2531	2427	<split-s>	<split-s>
2531	2427	<split-h>	<split-h>
2531	2427	<name2>	<name2>
2531	2495	<name2>	<name>
2531	2488	<>	<name>
2531	2430	<aphaerese>	<aphaerese>
2531	2487	<>	<aphaerese>
2531	2427	<elision3>	<elision3>
2531	2487	<>	<elision3>
2531	2427	<elision2>	<elision2>
2531	2487	<>	<elision2>
2531	2427	<elision1>	<elision1>
2531	2487	<>	<elision1>
2531	2424	.	υ
2531	2424	.	u
2531	2424	.	α
2531	2424	.	a
2531	2532	<split-h>	<>
2532	2492	<>	<name>
2532	2491	<>	<aphaerese>
2532	2491	<>	<elision3>
2532	2491	<>	<elision2>
2532	2491	<>	<elision1>
2532	2300	<3s>	<>
2533	2427	.	.
2533	2427	 	 
2533	2427	<~>	<~>
2533	2427	<split-s>	<split-s>
2533	2427	<split-h>	<split-h>
2533	2427	<name2>	<name2>
2533	2498	<>	<name>
2533	2430	<aphaerese>	<aphaerese>
2533	2497	<>	<aphaerese>
2533	2497	<>	<elision3>
2533	2497	<>	<elision2>
2533	2497	<>	<elision1>
2533	2424	.	υ
2533	2424	.	u
2533	2433	.	κ
2533	2424	.	α
2533	2424	.	a
2533	2522	<split-h>	<>
2534	2501	<>	<name>
2534	2500	<>	<aphaerese>
2534	2500	<>	<elision3>
2534	2500	<>	<elision2>
2534	2500	<>	<elision1>
2534	2528	<A2kl>	<>
2535	1757	.	.
2535	1758	 	 
2535	1757	<~>	<~>
2535	1757	<split-s>	<split-s>
2535	1757	<split-h>	<split-h>
2535	1757	<name2>	<name2>
2535	2504	<>	<name>
2535	1761	<aphaerese>	<aphaerese>
2535	2503	<>	<aphaerese>
2535	1757	<elision3>	<elision3>
2535	2503	<>	<elision3>
2535	1757	<elision2>	<elision2>
2535	2503	<>	<elision2>
2535	1757	<elision1>	<elision1>
2535	2503	<>	<elision1>
2535	1765	.	υ
2535	1771	s	υ
2535	1765	.	u
2535	1771	s	u
2535	1765	.	κ
2535	2347	s	κ
2535	2133	s	k
2535	2142	s	U
2535	2308	s	K
2535	1765	.	α
2535	1771	s	α
2535	1765	.	a
2535	1771	s	a
2535	2263	s	A
2535	1765	.	λ
2535	2347	s	λ
2535	2133	s	l
2535	2321	s	L
2535	2526	<split-h>	<>
2536	2427	.	.
2536	2427	 	 
2536	2427	<~>	<~>
2536	2427	<split-s>	<split-s>
2536	2427	<split-h>	<split-h>
2536	2427	<name2>	<name2>
2536	2507	<>	<name>
2536	2430	<aphaerese>	<aphaerese>
2536	2506	<>	<aphaerese>
2536	2427	<elision3>	<elision3>
2536	2506	<>	<elision3>
2536	2427	<elision2>	<elision2>
2536	2506	<>	<elision2>
2536	2427	<elision1>	<elision1>
2536	2506	<>	<elision1>
2536	2424	.	υ
2536	2424	.	u
2536	2424	.	κ
2536	2424	.	α
2536	2424	.	a
2536	2424	.	λ
2536	2526	<split-h>	<>
2537	2495	<name>	<name>
2537	2510	<>	<name>
2537	2512	<>	<aphaerese>
2537	2512	<>	<elision3>
2537	2512	<>	<elision2>
2537	2512	<>	<elision1>
2537	2493	<split-h>	<>
2537	2451	<A2kl>	<>
2537	2538	<L2kl>	<>
2538	2427	.	.
2538	2427	 	 
2538	2427	<~>	<~>
2538	2427	<split-s>	<split-s>
2538	2427	<split-h>	<split-h>
2538	2427	<name2>	<name2>
2538	2495	<name2>	<name>
2538	2514	<>	<name>
2538	2430	<aphaerese>	<aphaerese>
2538	2513	<>	<aphaerese>
2538	2427	<elision3>	<elision3>
2538	2513	<>	<elision3>
2538	2427	<elision2>	<elision2>
2538	2513	<>	<elision2>
2538	2427	<elision1>	<elision1>
2538	2513	<>	<elision1>
2538	2424	.	υ
2538	2424	.	u
2538	2472	.	κ
2538	2424	.	α
2538	2424	.	a
2538	2472	.	λ
2538	2539	<split-h>	<>
2539	2518	<>	<name>
2539	2517	<>	<aphaerese>
2539	2517	<>	<elision3>
2539	2517	<>	<elision2>
2539	2517	<>	<elision1>
2539	2305	<3s>	<>
2540	236	.	.
2540	237	 	 
2540	236	<~>	<~>
2540	236	<split-s>	<split-s>
2540	236	<split-h>	<split-h>
2540	236	<name2>	<name2>
2540	240	<aphaerese>	<aphaerese>
2540	240	<>	<aphaerese>
2540	236	<elision3>	<elision3>
2540	240	<>	<elision3>
2540	236	<elision2>	<elision2>
2540	240	<>	<elision2>
2540	236	<elision1>	<elision1>
2540	240	<>	<elision1>
2540	236	.	υ
2540	236	.	u
2540	2338	.	κ
2540	2368	s	κ
2540	2421	s	k
2540	2442	s	U
2540	2541	s	K
2540	236	.	α
2540	236	.	a
2540	2500	s	A
2540	2503	s	λ
2540	2506	s	l
2540	2551	s	L
2540	1926	<2s>	<>
2541	2446	<name>	<name>
2541	2542	<>	<name>
2541	2544	<>	<aphaerese>
2541	2544	<>	<elision3>
2541	2544	<>	<elision2>
2541	2544	<>	<elision1>
2541	2493	<split-h>	<>
2541	2545	<L2kl>	<>
2541	2494	<K2kl>	<>
2542	2543	<>	<aphaerese>
2542	2543	<>	<elision3>
2542	2543	<>	<elision2>
2542	2543	<>	<elision1>
2542	2546	<L2kl>	<>
2542	2488	<K2kl>	<>
2543	2544	<>	<aphaerese>
2543	2544	<>	<elision3>
2543	2544	<>	<elision2>
2543	2544	<>	<elision1>
2543	2547	<L2kl>	<>
2543	2489	<K2kl>	<>
2544	2542	<>	<name>
2544	2544	<>	<aphaerese>
2544	2544	<>	<elision3>
2544	2544	<>	<elision2>
2544	2544	<>	<elision1>
2544	2545	<L2kl>	<>
2544	2487	<K2kl>	<>
2545	2546	<>	<name>
2545	2545	<>	<aphaerese>
2545	2545	<>	<elision3>
2545	2545	<>	<elision2>
2545	2545	<>	<elision1>
2545	2424	.	κ
2545	2424	.	λ
2545	2549	<split-h>	<>
2546	2547	<>	<aphaerese>
2546	2547	<>	<elision3>
2546	2547	<>	<elision2>
2546	2547	<>	<elision1>
2546	2426	.	κ
2546	2426	.	λ
2546	2550	<split-h>	<>
2547	2545	<>	<aphaerese>
2547	2545	<>	<elision3>
2547	2545	<>	<elision2>
2547	2545	<>	<elision1>
2547	2424	.	κ
2547	2424	.	λ
2547	2548	<split-h>	<>
2548	2549	<>	<aphaerese>
2548	2549	<>	<elision3>
2548	2549	<>	<elision2>
2548	2549	<>	<elision1>
2548	2315	<3s>	<>
2549	2550	<>	<name>
2549	2549	<>	<aphaerese>
2549	2549	<>	<elision3>
2549	2549	<>	<elision2>
2549	2549	<>	<elision1>
2549	2316	<3s>	<>
2550	2548	<>	<aphaerese>
2550	2548	<>	<elision3>
2550	2548	<>	<elision2>
2550	2548	<>	<elision1>
2550	2317	<3s>	<>
2551	2495	<name>	<name>
2551	2552	<>	<name>
2551	2554	<>	<aphaerese>
2551	2554	<>	<elision3>
2551	2554	<>	<elision2>
2551	2554	<>	<elision1>
2551	2493	<split-h>	<>
2551	2555	<L2kl>	<>
2552	2553	<>	<aphaerese>
2552	2553	<>	<elision3>
2552	2553	<>	<elision2>
2552	2553	<>	<elision1>
2552	2507	<L2kl>	<>
2553	2554	<>	<aphaerese>
2553	2554	<>	<elision3>
2553	2554	<>	<elision2>
2553	2554	<>	<elision1>
2553	2508	<L2kl>	<>
2554	2552	<>	<name>
2554	2554	<>	<aphaerese>
2554	2554	<>	<elision3>
2554	2554	<>	<elision2>
2554	2554	<>	<elision1>
2554	2506	<L2kl>	<>
2555	2427	.	.
2555	2427	 	 
2555	2427	<~>	<~>
2555	2427	<split-s>	<split-s>
2555	2427	<split-h>	<split-h>
2555	2427	<name2>	<name2>
2555	2495	<name2>	<name>
2555	2507	<>	<name>
2555	2430	<aphaerese>	<aphaerese>
2555	2506	<>	<aphaerese>
2555	2427	<elision3>	<elision3>
2555	2506	<>	<elision3>
2555	2427	<elision2>	<elision2>
2555	2506	<>	<elision2>
2555	2427	<elision1>	<elision1>
2555	2506	<>	<elision1>
2555	2424	.	υ
2555	2424	.	u
2555	2424	.	κ
2555	2424	.	α
2555	2424	.	a
2555	2424	.	λ
2555	2556	<split-h>	<>
2556	2441	<>	<name>
2556	2440	<>	<aphaerese>
2556	2440	<>	<elision3>
2556	2440	<>	<elision2>
2556	2440	<>	<elision1>
2556	2326	<3s>	<>
2557	236	.	.
2557	237	 	 
2557	236	<~>	<~>
2557	236	<split-s>	<split-s>
2557	236	<split-h>	<split-h>
2557	236	<name2>	<name2>
2557	240	<aphaerese>	<aphaerese>
2557	243	<>	<aphaerese>
2557	236	<elision3>	<elision3>
2557	243	<>	<elision3>
2557	236	<elision2>	<elision2>
2557	243	<>	<elision2>
2557	236	<elision1>	<elision1>
2557	243	<>	<elision1>
2557	244	.	υ
2557	1756	s	υ
2557	244	.	u
2557	1756	s	u
2557	2338	.	κ
2557	2368	s	κ
2557	2421	s	k
2557	2442	s	U
2557	2445	s	K
2557	244	.	α
2557	2497	s	α
2557	244	.	a
2557	2497	s	a
2557	2500	s	A
2557	2503	s	λ
2557	2506	s	l
2557	2509	s	L
2557	1939	<2s>	<>
2558	239	.	.
2558	242	 	 
2558	239	<~>	<~>
2558	239	<split-s>	<split-s>
2558	239	<split-h>	<split-h>
2558	239	<name2>	<name2>
2558	2540	<aphaerese>	<aphaerese>
2558	239	<>	<aphaerese>
2558	239	<elision3>	<elision3>
2558	239	<>	<elision3>
2558	239	<elision2>	<elision2>
2558	239	<>	<elision2>
2558	239	<elision1>	<elision1>
2558	239	<>	<elision1>
2558	246	.	υ
2558	2334	s	υ
2558	246	.	u
2558	2334	s	u
2558	2340	.	κ
2558	2370	s	κ
2558	2423	s	k
2558	2444	s	U
2558	2543	s	K
2558	246	.	α
2558	2499	s	α
2558	246	.	a
2558	2499	s	a
2558	2502	s	A
2558	2505	s	λ
2558	2508	s	l
2558	2553	s	L
2558	1941	<2s>	<>
2559	239	.	.
2559	242	 	 
2559	239	<~>	<~>
2559	239	<split-s>	<split-s>
2559	239	<split-h>	<split-h>
2559	239	<name2>	<name2>
2559	2540	<aphaerese>	<aphaerese>
2559	2560	<>	<aphaerese>
2559	2560	<>	<elision3>
2559	2560	<>	<elision2>
2559	2560	<>	<elision1>
2559	246	.	υ
2559	2334	s	υ
2559	246	.	u
2559	2334	s	u
2559	246	.	κ
2559	2563	s	κ
2559	2423	s	k
2559	2444	s	U
2559	2543	s	K
2559	246	.	α
2559	2499	s	α
2559	246	.	a
2559	2499	s	a
2559	2502	s	A
2559	246	.	λ
2559	2563	s	λ
2559	2508	s	l
2559	2553	s	L
2559	2352	<2s>	<>
2560	236	.	.
2560	237	 	 
2560	236	<~>	<~>
2560	236	<split-s>	<split-s>
2560	236	<split-h>	<split-h>
2560	236	<name2>	<name2>
2560	240	<aphaerese>	<aphaerese>
2560	235	<>	<aphaerese>
2560	235	<>	<elision3>
2560	235	<>	<elision2>
2560	235	<>	<elision1>
2560	244	.	υ
2560	1756	s	υ
2560	244	.	u
2560	1756	s	u
2560	244	.	κ
2560	2561	s	κ
2560	2421	s	k
2560	2442	s	U
2560	2541	s	K
2560	244	.	α
2560	2497	s	α
2560	244	.	a
2560	2497	s	a
2560	2500	s	A
2560	244	.	λ
2560	2561	s	λ
2560	2506	s	l
2560	2551	s	L
2560	2350	<2s>	<>
2561	1757	.	.
2561	1758	 	 
2561	1757	<~>	<~>
2561	1757	<split-s>	<split-s>
2561	1757	<split-h>	<split-h>
2561	1757	<name2>	<name2>
2561	2562	<>	<name>
2561	1761	<aphaerese>	<aphaerese>
2561	2561	<>	<aphaerese>
2561	2561	<>	<elision3>
2561	2561	<>	<elision2>
2561	2561	<>	<elision1>
2561	1765	.	υ
2561	1771	s	υ
2561	1765	.	u
2561	1771	s	u
2561	1765	.	κ
2561	2347	s	κ
2561	2133	s	k
2561	2142	s	U
2561	2308	s	K
2561	1765	.	α
2561	1771	s	α
2561	1765	.	a
2561	1771	s	a
2561	2263	s	A
2561	1765	.	λ
2561	2347	s	λ
2561	2133	s	l
2561	2321	s	L
2561	2565	<split-h>	<>
2562	1760	.	.
2562	1763	 	 
2562	1760	<~>	<~>
2562	1760	<split-s>	<split-s>
2562	1760	<split-h>	<split-h>
2562	1760	<name2>	<name2>
2562	2307	<aphaerese>	<aphaerese>
2562	2563	<>	<aphaerese>
2562	2563	<>	<elision3>
2562	2563	<>	<elision2>
2562	2563	<>	<elision1>
2562	1767	.	υ
2562	1943	s	υ
2562	1767	.	u
2562	1943	s	u
2562	1767	.	κ
2562	2349	s	κ
2562	2135	s	k
2562	2144	s	U
2562	2310	s	K
2562	1767	.	α
2562	1943	s	α
2562	1767	.	a
2562	1943	s	a
2562	2265	s	A
2562	1767	.	λ
2562	2349	s	λ
2562	2135	s	l
2562	2323	s	L
2562	2566	<split-h>	<>
2563	1757	.	.
2563	1758	 	 
2563	1757	<~>	<~>
2563	1757	<split-s>	<split-s>
2563	1757	<split-h>	<split-h>
2563	1757	<name2>	<name2>
2563	1761	<aphaerese>	<aphaerese>
2563	2561	<>	<aphaerese>
2563	2561	<>	<elision3>
2563	2561	<>	<elision2>
2563	2561	<>	<elision1>
2563	1765	.	υ
2563	1771	s	υ
2563	1765	.	u
2563	1771	s	u
2563	1765	.	κ
2563	2347	s	κ
2563	2133	s	k
2563	2142	s	U
2563	2308	s	K
2563	1765	.	α
2563	1771	s	α
2563	1765	.	a
2563	1771	s	a
2563	2263	s	A
2563	1765	.	λ
2563	2347	s	λ
2563	2133	s	l
2563	2321	s	L
2563	2564	<split-h>	<>
2564	2565	<>	<aphaerese>
2564	2565	<>	<elision3>
2564	2565	<>	<elision2>
2564	2565	<>	<elision1>
2564	2350	<3s>	<>
2565	2566	<>	<name>
2565	2565	<>	<aphaerese>
2565	2565	<>	<elision3>
2565	2565	<>	<elision2>
2565	2565	<>	<elision1>
2565	2351	<3s>	<>
2566	2564	<>	<aphaerese>
2566	2564	<>	<elision3>
2566	2564	<>	<elision2>
2566	2564	<>	<elision1>
2566	2352	<3s>	<>
2567	236	.	.
2567	237	 	 
2567	236	<~>	<~>
2567	236	<split-s>	<split-s>
2567	236	<split-h>	<split-h>
2567	236	<name2>	<name2>
2567	2568	<>	<name>
2567	240	<aphaerese>	<aphaerese>
2567	2567	<>	<aphaerese>
2567	236	<elision3>	<elision3>
2567	2567	<>	<elision3>
2567	236	<elision2>	<elision2>
2567	2567	<>	<elision2>
2567	236	<elision1>	<elision1>
2567	2567	<>	<elision1>
2567	244	.	υ
2567	1756	s	υ
2567	244	.	u
2567	1756	s	u
2567	2570	.	κ
2567	2561	s	κ
2567	2421	s	k
2567	2442	s	U
2567	2541	s	K
2567	244	.	α
2567	2497	s	α
2567	244	.	a
2567	2497	s	a
2567	2500	s	A
2567	2570	.	λ
2567	2561	s	λ
2567	2506	s	l
2567	2551	s	L
2567	2137	<2s>	<>
2568	239	.	.
2568	242	 	 
2568	239	<~>	<~>
2568	239	<split-s>	<split-s>
2568	239	<split-h>	<split-h>
2568	239	<name2>	<name2>
2568	2540	<aphaerese>	<aphaerese>
2568	2569	<>	<aphaerese>
2568	239	<elision3>	<elision3>
2568	2569	<>	<elision3>
2568	239	<elision2>	<elision2>
2568	2569	<>	<elision2>
2568	239	<elision1>	<elision1>
2568	2569	<>	<elision1>
2568	246	.	υ
2568	2334	s	υ
2568	246	.	u
2568	2334	s	u
2568	2572	.	κ
2568	2563	s	κ
2568	2423	s	k
2568	2444	s	U
2568	2543	s	K
2568	246	.	α
2568	2499	s	α
2568	246	.	a
2568	2499	s	a
2568	2502	s	A
2568	2572	.	λ
2568	2563	s	λ
2568	2508	s	l
2568	2553	s	L
2568	2138	<2s>	<>
2569	236	.	.
2569	237	 	 
2569	236	<~>	<~>
2569	236	<split-s>	<split-s>
2569	236	<split-h>	<split-h>
2569	236	<name2>	<name2>
2569	240	<aphaerese>	<aphaerese>
2569	2567	<>	<aphaerese>
2569	236	<elision3>	<elision3>
2569	2567	<>	<elision3>
2569	236	<elision2>	<elision2>
2569	2567	<>	<elision2>
2569	236	<elision1>	<elision1>
2569	2567	<>	<elision1>
2569	244	.	υ
2569	1756	s	υ
2569	244	.	u
2569	1756	s	u
2569	2570	.	κ
2569	2561	s	κ
2569	2421	s	k
2569	2442	s	U
2569	2541	s	K
2569	244	.	α
2569	2497	s	α
2569	244	.	a
2569	2497	s	a
2569	2500	s	A
2569	2570	.	λ
2569	2561	s	λ
2569	2506	s	l
2569	2551	s	L
2569	2136	<2s>	<>
2570	2571	<>	<name>
2570	2570	<>	<aphaerese>
2570	2573	<elision3>	<elision3>
2570	2570	<>	<elision3>
2570	2573	<elision2>	<elision2>
2570	2570	<>	<elision2>
2570	2573	<elision1>	<elision1>
2570	2570	<>	<elision1>
2570	248	<2s>	<>
2571	2572	<>	<aphaerese>
2571	2576	<elision3>	<elision3>
2571	2572	<>	<elision3>
2571	2576	<elision2>	<elision2>
2571	2572	<>	<elision2>
2571	2576	<elision1>	<elision1>
2571	2572	<>	<elision1>
2571	249	<2s>	<>
2572	2570	<>	<aphaerese>
2572	2573	<elision3>	<elision3>
2572	2570	<>	<elision3>
2572	2573	<elision2>	<elision2>
2572	2570	<>	<elision2>
2572	2573	<elision1>	<elision1>
2572	2570	<>	<elision1>
2572	247	<2s>	<>
2573	2573	.	.
2573	2574	 	 
2573	2573	<~>	<~>
2573	2573	<split-s>	<split-s>
2573	2573	<split-h>	<split-h>
2573	2573	<name2>	<name2>
2573	2599	<>	<name>
2573	2577	<aphaerese>	<aphaerese>
2573	2573	<>	<aphaerese>
2573	2573	<elision3>	<elision3>
2573	2573	<>	<elision3>
2573	2573	<elision2>	<elision2>
2573	2573	<>	<elision2>
2573	2573	<elision1>	<elision1>
2573	2573	<>	<elision1>
2573	2570	.	υ
2573	2497	s	υ
2573	2570	.	u
2573	2497	s	u
2573	2581	.	κ
2573	2587	s	κ
2573	2506	s	k
2573	2442	s	U
2573	2597	s	K
2573	2570	.	α
2573	2497	s	α
2573	2570	.	a
2573	2497	s	a
2573	2500	s	A
2573	2506	s	λ
2573	2506	s	l
2573	2551	s	L
2573	1940	<2s>	<>
2574	2573	.	.
2574	2574	 	 
2574	2573	<~>	<~>
2574	2573	<split-s>	<split-s>
2574	2573	<split-h>	<split-h>
2574	2573	<name2>	<name2>
2574	2575	<>	<name>
2574	2577	<aphaerese>	<aphaerese>
2574	2580	<>	<aphaerese>
2574	2573	<elision3>	<elision3>
2574	2580	<>	<elision3>
2574	2573	<elision2>	<elision2>
2574	2580	<>	<elision2>
2574	2573	<elision1>	<elision1>
2574	2580	<>	<elision1>
2574	2570	.	υ
2574	2533	s	υ
2574	2570	.	u
2574	2533	s	u
2574	2581	.	κ
2574	2594	s	κ
2574	2536	s	k
2574	2527	s	U
2574	2595	s	K
2574	2570	.	α
2574	2533	s	α
2574	2570	.	a
2574	2533	s	a
2574	2534	s	A
2574	2536	s	λ
2574	2536	s	l
2574	2537	s	L
2574	1940	<2s>	<>
2575	2576	.	.
2575	2579	 	 
2575	2576	<~>	<~>
2575	2576	<split-s>	<split-s>
2575	2576	<split-h>	<split-h>
2575	2576	<name2>	<name2>
2575	2596	<aphaerese>	<aphaerese>
2575	2598	<>	<aphaerese>
2575	2576	<elision3>	<elision3>
2575	2598	<>	<elision3>
2575	2576	<elision2>	<elision2>
2575	2598	<>	<elision2>
2575	2576	<elision1>	<elision1>
2575	2598	<>	<elision1>
2575	2572	.	υ
2575	2499	s	υ
2575	2572	.	u
2575	2499	s	u
2575	2583	.	κ
2575	2589	s	κ
2575	2508	s	k
2575	2444	s	U
2575	2449	s	K
2575	2572	.	α
2575	2499	s	α
2575	2572	.	a
2575	2499	s	a
2575	2502	s	A
2575	2508	s	λ
2575	2508	s	l
2575	2511	s	L
2575	1941	<2s>	<>
2576	2573	.	.
2576	2574	 	 
2576	2573	<~>	<~>
2576	2573	<split-s>	<split-s>
2576	2573	<split-h>	<split-h>
2576	2573	<name2>	<name2>
2576	2577	<aphaerese>	<aphaerese>
2576	2573	<>	<aphaerese>
2576	2573	<elision3>	<elision3>
2576	2573	<>	<elision3>
2576	2573	<elision2>	<elision2>
2576	2573	<>	<elision2>
2576	2573	<elision1>	<elision1>
2576	2573	<>	<elision1>
2576	2570	.	υ
2576	2497	s	υ
2576	2570	.	u
2576	2497	s	u
2576	2581	.	κ
2576	2587	s	κ
2576	2506	s	k
2576	2442	s	U
2576	2597	s	K
2576	2570	.	α
2576	2497	s	α
2576	2570	.	a
2576	2497	s	a
2576	2500	s	A
2576	2506	s	λ
2576	2506	s	l
2576	2551	s	L
2576	1939	<2s>	<>
2577	2573	.	.
2577	2574	 	 
2577	2573	<~>	<~>
2577	2573	<split-s>	<split-s>
2577	2573	<split-h>	<split-h>
2577	2573	<name2>	<name2>
2577	2578	<>	<name>
2577	2577	<aphaerese>	<aphaerese>
2577	2577	<>	<aphaerese>
2577	2573	<elision3>	<elision3>
2577	2577	<>	<elision3>
2577	2573	<elision2>	<elision2>
2577	2577	<>	<elision2>
2577	2573	<elision1>	<elision1>
2577	2577	<>	<elision1>
2577	2573	.	υ
2577	2573	.	u
2577	2581	.	κ
2577	2587	s	κ
2577	2506	s	k
2577	2442	s	U
2577	2597	s	K
2577	2573	.	α
2577	2573	.	a
2577	2500	s	A
2577	2506	s	λ
2577	2506	s	l
2577	2551	s	L
2577	1927	<2s>	<>
2578	2576	.	.
2578	2579	 	 
2578	2576	<~>	<~>
2578	2576	<split-s>	<split-s>
2578	2576	<split-h>	<split-h>
2578	2576	<name2>	<name2>
2578	2596	<aphaerese>	<aphaerese>
2578	2596	<>	<aphaerese>
2578	2576	<elision3>	<elision3>
2578	2596	<>	<elision3>
2578	2576	<elision2>	<elision2>
2578	2596	<>	<elision2>
2578	2576	<elision1>	<elision1>
2578	2596	<>	<elision1>
2578	2576	.	υ
2578	2576	.	u
2578	2583	.	κ
2578	2589	s	κ
2578	2508	s	k
2578	2444	s	U
2578	2543	s	K
2578	2576	.	α
2578	2576	.	a
2578	2502	s	A
2578	2508	s	λ
2578	2508	s	l
2578	2553	s	L
2578	1928	<2s>	<>
2579	2573	.	.
2579	2574	 	 
2579	2573	<~>	<~>
2579	2573	<split-s>	<split-s>
2579	2573	<split-h>	<split-h>
2579	2573	<name2>	<name2>
2579	2577	<aphaerese>	<aphaerese>
2579	2580	<>	<aphaerese>
2579	2573	<elision3>	<elision3>
2579	2580	<>	<elision3>
2579	2573	<elision2>	<elision2>
2579	2580	<>	<elision2>
2579	2573	<elision1>	<elision1>
2579	2580	<>	<elision1>
2579	2570	.	υ
2579	2533	s	υ
2579	2570	.	u
2579	2533	s	u
2579	2581	.	κ
2579	2594	s	κ
2579	2536	s	k
2579	2527	s	U
2579	2595	s	K
2579	2570	.	α
2579	2533	s	α
2579	2570	.	a
2579	2533	s	a
2579	2534	s	A
2579	2536	s	λ
2579	2536	s	l
2579	2537	s	L
2579	1939	<2s>	<>
2580	2573	.	.
2580	2574	 	 
2580	2573	<~>	<~>
2580	2573	<split-s>	<split-s>
2580	2573	<split-h>	<split-h>
2580	2573	<name2>	<name2>
2580	2575	<>	<name>
2580	2577	<aphaerese>	<aphaerese>
2580	2580	<>	<aphaerese>
2580	2573	<elision3>	<elision3>
2580	2580	<>	<elision3>
2580	2573	<elision2>	<elision2>
2580	2580	<>	<elision2>
2580	2573	<elision1>	<elision1>
2580	2580	<>	<elision1>
2580	2570	.	υ
2580	2497	s	υ
2580	2570	.	u
2580	2497	s	u
2580	2581	.	κ
2580	2587	s	κ
2580	2506	s	k
2580	2442	s	U
2580	2593	s	K
2580	2570	.	α
2580	2497	s	α
2580	2570	.	a
2580	2497	s	a
2580	2500	s	A
2580	2506	s	λ
2580	2506	s	l
2580	2509	s	L
2580	1940	<2s>	<>
2581	2582	<>	<name>
2581	2581	<>	<aphaerese>
2581	2584	<elision3>	<elision3>
2581	2581	<>	<elision3>
2581	2584	<elision2>	<elision2>
2581	2581	<>	<elision2>
2581	2584	<elision1>	<elision1>
2581	2581	<>	<elision1>
2581	1924	<2s>	<>
2582	2583	<>	<aphaerese>
2582	2586	<elision3>	<elision3>
2582	2583	<>	<elision3>
2582	2586	<elision2>	<elision2>
2582	2583	<>	<elision2>
2582	2586	<elision1>	<elision1>
2582	2583	<>	<elision1>
2582	1925	<2s>	<>
2583	2581	<>	<aphaerese>
2583	2584	<elision3>	<elision3>
2583	2581	<>	<elision3>
2583	2584	<elision2>	<elision2>
2583	2581	<>	<elision2>
2583	2584	<elision1>	<elision1>
2583	2581	<>	<elision1>
2583	1923	<2s>	<>
2584	2585	<>	<name>
2584	2584	<>	<aphaerese>
2584	2584	<>	<elision3>
2584	2584	<>	<elision2>
2584	2584	<>	<elision1>
2584	2363	s	κ
2584	2363	s	k
2584	2359	s	K
2584	2363	s	λ
2584	2363	s	l
2584	2365	s	L
2584	1785	<2s>	<>
2585	2586	<>	<aphaerese>
2585	2586	<>	<elision3>
2585	2586	<>	<elision2>
2585	2586	<>	<elision1>
2585	2362	s	κ
2585	2362	s	k
2585	2361	s	K
2585	2362	s	λ
2585	2362	s	l
2585	2367	s	L
2585	1786	<2s>	<>
2586	2584	<>	<aphaerese>
2586	2584	<>	<elision3>
2586	2584	<>	<elision2>
2586	2584	<>	<elision1>
2586	2363	s	κ
2586	2363	s	k
2586	2359	s	K
2586	2363	s	λ
2586	2363	s	l
2586	2365	s	L
2586	1784	<2s>	<>
2587	2427	.	.
2587	2427	 	 
2587	2427	<~>	<~>
2587	2427	<split-s>	<split-s>
2587	2427	<split-h>	<split-h>
2587	2427	<name2>	<name2>
2587	2588	<>	<name>
2587	2430	<aphaerese>	<aphaerese>
2587	2587	<>	<aphaerese>
2587	2590	<elision3>	<elision3>
2587	2587	<>	<elision3>
2587	2590	<elision2>	<elision2>
2587	2587	<>	<elision2>
2587	2590	<elision1>	<elision1>
2587	2587	<>	<elision1>
2587	2424	.	υ
2587	2424	.	u
2587	2424	.	κ
2587	2424	.	α
2587	2424	.	a
2587	2424	.	λ
2587	2419	<split-h>	<>
2588	2429	.	.
2588	2429	 	 
2588	2429	<~>	<~>
2588	2429	<split-s>	<split-s>
2588	2429	<split-h>	<split-h>
2588	2429	<name2>	<name2>
2588	2432	<aphaerese>	<aphaerese>
2588	2589	<>	<aphaerese>
2588	2592	<elision3>	<elision3>
2588	2589	<>	<elision3>
2588	2592	<elision2>	<elision2>
2588	2589	<>	<elision2>
2588	2592	<elision1>	<elision1>
2588	2589	<>	<elision1>
2588	2426	.	υ
2588	2426	.	u
2588	2426	.	κ
2588	2426	.	α
2588	2426	.	a
2588	2426	.	λ
2588	2420	<split-h>	<>
2589	2427	.	.
2589	2427	 	 
2589	2427	<~>	<~>
2589	2427	<split-s>	<split-s>
2589	2427	<split-h>	<split-h>
2589	2427	<name2>	<name2>
2589	2430	<aphaerese>	<aphaerese>
2589	2587	<>	<aphaerese>
2589	2590	<elision3>	<elision3>
2589	2587	<>	<elision3>
2589	2590	<elision2>	<elision2>
2589	2587	<>	<elision2>
2589	2590	<elision1>	<elision1>
2589	2587	<>	<elision1>
2589	2424	.	υ
2589	2424	.	u
2589	2424	.	κ
2589	2424	.	α
2589	2424	.	a
2589	2424	.	λ
2589	2418	<split-h>	<>
2590	2427	.	.
2590	2427	 	 
2590	2427	<~>	<~>
2590	2427	<split-s>	<split-s>
2590	2427	<split-h>	<split-h>
2590	2427	<name2>	<name2>
2590	2591	<>	<name>
2590	2430	<aphaerese>	<aphaerese>
2590	2590	<>	<aphaerese>
2590	2427	<elision3>	<elision3>
2590	2590	<>	<elision3>
2590	2427	<elision2>	<elision2>
2590	2590	<>	<elision2>
2590	2427	<elision1>	<elision1>
2590	2590	<>	<elision1>
2590	2424	.	υ
2590	2424	.	u
2590	2433	.	κ
2590	2424	.	α
2590	2424	.	a
2590	2416	<split-h>	<>
2591	2429	.	.
2591	2429	 	 
2591	2429	<~>	<~>
2591	2429	<split-s>	<split-s>
2591	2429	<split-h>	<split-h>
2591	2429	<name2>	<name2>
2591	2432	<aphaerese>	<aphaerese>
2591	2592	<>	<aphaerese>
2591	2429	<elision3>	<elision3>
2591	2592	<>	<elision3>
2591	2429	<elision2>	<elision2>
2591	2592	<>	<elision2>
2591	2429	<elision1>	<elision1>
2591	2592	<>	<elision1>
2591	2426	.	υ
2591	2426	.	u
2591	2435	.	κ
2591	2426	.	α
2591	2426	.	a
2591	2417	<split-h>	<>
2592	2427	.	.
2592	2427	 	 
2592	2427	<~>	<~>
2592	2427	<split-s>	<split-s>
2592	2427	<split-h>	<split-h>
2592	2427	<name2>	<name2>
2592	2430	<aphaerese>	<aphaerese>
2592	2590	<>	<aphaerese>
2592	2427	<elision3>	<elision3>
2592	2590	<>	<elision3>
2592	2427	<elision2>	<elision2>
2592	2590	<>	<elision2>
2592	2427	<elision1>	<elision1>
2592	2590	<>	<elision1>
2592	2424	.	υ
2592	2424	.	u
2592	2433	.	κ
2592	2424	.	α
2592	2424	.	a
2592	2415	<split-h>	<>
2593	2495	<name>	<name>
2593	2448	<>	<name>
2593	2450	<>	<aphaerese>
2593	2450	<>	<elision3>
2593	2450	<>	<elision2>
2593	2450	<>	<elision1>
2593	2493	<split-h>	<>
2593	2451	<A2kl>	<>
2593	2469	<L2kl>	<>
2593	2494	<K2kl>	<>
2594	2427	.	.
2594	2427	 	 
2594	2427	<~>	<~>
2594	2427	<split-s>	<split-s>
2594	2427	<split-h>	<split-h>
2594	2427	<name2>	<name2>
2594	2588	<>	<name>
2594	2430	<aphaerese>	<aphaerese>
2594	2587	<>	<aphaerese>
2594	2590	<elision3>	<elision3>
2594	2587	<>	<elision3>
2594	2590	<elision2>	<elision2>
2594	2587	<>	<elision2>
2594	2590	<elision1>	<elision1>
2594	2587	<>	<elision1>
2594	2424	.	υ
2594	2424	.	u
2594	2424	.	κ
2594	2424	.	α
2594	2424	.	a
2594	2424	.	λ
2594	2524	<split-h>	<>
2595	2495	<name>	<name>
2595	2448	<>	<name>
2595	2450	<>	<aphaerese>
2595	2450	<>	<elision3>
2595	2450	<>	<elision2>
2595	2450	<>	<elision1>
2595	2493	<split-h>	<>
2595	2451	<A2kl>	<>
2595	2469	<L2kl>	<>
2595	2531	<K2kl>	<>
2596	2573	.	.
2596	2574	 	 
2596	2573	<~>	<~>
2596	2573	<split-s>	<split-s>
2596	2573	<split-h>	<split-h>
2596	2573	<name2>	<name2>
2596	2577	<aphaerese>	<aphaerese>
2596	2577	<>	<aphaerese>
2596	2573	<elision3>	<elision3>
2596	2577	<>	<elision3>
2596	2573	<elision2>	<elision2>
2596	2577	<>	<elision2>
2596	2573	<elision1>	<elision1>
2596	2577	<>	<elision1>
2596	2573	.	υ
2596	2573	.	u
2596	2581	.	κ
2596	2587	s	κ
2596	2506	s	k
2596	2442	s	U
2596	2597	s	K
2596	2573	.	α
2596	2573	.	a
2596	2500	s	A
2596	2506	s	λ
2596	2506	s	l
2596	2551	s	L
2596	1926	<2s>	<>
2597	2495	<name>	<name>
2597	2542	<>	<name>
2597	2544	<>	<aphaerese>
2597	2544	<>	<elision3>
2597	2544	<>	<elision2>
2597	2544	<>	<elision1>
2597	2493	<split-h>	<>
2597	2545	<L2kl>	<>
2597	2494	<K2kl>	<>
2598	2573	.	.
2598	2574	 	 
2598	2573	<~>	<~>
2598	2573	<split-s>	<split-s>
2598	2573	<split-h>	<split-h>
2598	2573	<name2>	<name2>
2598	2577	<aphaerese>	<aphaerese>
2598	2580	<>	<aphaerese>
2598	2573	<elision3>	<elision3>
2598	2580	<>	<elision3>
2598	2573	<elision2>	<elision2>
2598	2580	<>	<elision2>
2598	2573	<elision1>	<elision1>
2598	2580	<>	<elision1>
2598	2570	.	υ
2598	2497	s	υ
2598	2570	.	u
2598	2497	s	u
2598	2581	.	κ
2598	2587	s	κ
2598	2506	s	k
2598	2442	s	U
2598	2593	s	K
2598	2570	.	α
2598	2497	s	α
2598	2570	.	a
2598	2497	s	a
2598	2500	s	A
2598	2506	s	λ
2598	2506	s	l
2598	2509	s	L
2598	1939	<2s>	<>
2599	2576	.	.
2599	2579	 	 
2599	2576	<~>	<~>
2599	2576	<split-s>	<split-s>
2599	2576	<split-h>	<split-h>
2599	2576	<name2>	<name2>
2599	2596	<aphaerese>	<aphaerese>
2599	2576	<>	<aphaerese>
2599	2576	<elision3>	<elision3>
2599	2576	<>	<elision3>
2599	2576	<elision2>	<elision2>
2599	2576	<>	<elision2>
2599	2576	<elision1>	<elision1>
2599	2576	<>	<elision1>
2599	2572	.	υ
2599	2499	s	υ
2599	2572	.	u
2599	2499	s	u
2599	2583	.	κ
2599	2589	s	κ
2599	2508	s	k
2599	2444	s	U
2599	2543	s	K
2599	2572	.	α
2599	2499	s	α
2599	2572	.	a
2599	2499	s	a
2599	2502	s	A
2599	2508	s	λ
2599	2508	s	l
2599	2553	s	L
2599	1941	<2s>	<>
2600	2601	<name>	<name>
2600	2602	<>	<name>
2600	2604	<>	<aphaerese>
2600	2604	<>	<elision3>
2600	2604	<>	<elision2>
2600	2604	<>	<elision1>
2600	2257	<2s>	<>
2600	2605	<L2kl>	<>
2600	2614	<K2kl>	<>
2601	2543	s	k
2601	2553	s	l
2601	2147	<2s>	<>
2602	2603	<>	<aphaerese>
2602	2603	<>	<elision3>
2602	2603	<>	<elision2>
2602	2603	<>	<elision1>
2602	2606	<L2kl>	<>
2602	2609	<K2kl>	<>
2603	2604	<>	<aphaerese>
2603	2604	<>	<elision3>
2603	2604	<>	<elision2>
2603	2604	<>	<elision1>
2603	2607	<L2kl>	<>
2603	2610	<K2kl>	<>
2604	2602	<>	<name>
2604	2604	<>	<aphaerese>
2604	2604	<>	<elision3>
2604	2604	<>	<elision2>
2604	2604	<>	<elision1>
2604	2605	<L2kl>	<>
2604	2608	<K2kl>	<>
2605	2606	<>	<name>
2605	2605	<>	<aphaerese>
2605	2605	<>	<elision3>
2605	2605	<>	<elision2>
2605	2605	<>	<elision1>
2605	2570	.	κ
2605	2570	.	λ
2605	2316	<2s>	<>
2606	2607	<>	<aphaerese>
2606	2607	<>	<elision3>
2606	2607	<>	<elision2>
2606	2607	<>	<elision1>
2606	2572	.	κ
2606	2572	.	λ
2606	2317	<2s>	<>
2607	2605	<>	<aphaerese>
2607	2605	<>	<elision3>
2607	2605	<>	<elision2>
2607	2605	<>	<elision1>
2607	2570	.	κ
2607	2570	.	λ
2607	2315	<2s>	<>
2608	2573	.	.
2608	2574	 	 
2608	2573	<~>	<~>
2608	2573	<split-s>	<split-s>
2608	2573	<split-h>	<split-h>
2608	2573	<name2>	<name2>
2608	2609	<>	<name>
2608	2577	<aphaerese>	<aphaerese>
2608	2608	<>	<aphaerese>
2608	2573	<elision3>	<elision3>
2608	2608	<>	<elision3>
2608	2573	<elision2>	<elision2>
2608	2608	<>	<elision2>
2608	2573	<elision1>	<elision1>
2608	2608	<>	<elision1>
2608	2570	.	υ
2608	2497	s	υ
2608	2570	.	u
2608	2497	s	u
2608	2611	s	κ
2608	2506	s	k
2608	2442	s	U
2608	2597	s	K
2608	2570	.	α
2608	2497	s	α
2608	2570	.	a
2608	2497	s	a
2608	2500	s	A
2608	2611	s	λ
2608	2506	s	l
2608	2551	s	L
2608	2252	<2s>	<>
2609	2576	.	.
2609	2579	 	 
2609	2576	<~>	<~>
2609	2576	<split-s>	<split-s>
2609	2576	<split-h>	<split-h>
2609	2576	<name2>	<name2>
2609	2596	<aphaerese>	<aphaerese>
2609	2610	<>	<aphaerese>
2609	2576	<elision3>	<elision3>
2609	2610	<>	<elision3>
2609	2576	<elision2>	<elision2>
2609	2610	<>	<elision2>
2609	2576	<elision1>	<elision1>
2609	2610	<>	<elision1>
2609	2572	.	υ
2609	2499	s	υ
2609	2572	.	u
2609	2499	s	u
2609	2613	s	κ
2609	2508	s	k
2609	2444	s	U
2609	2543	s	K
2609	2572	.	α
2609	2499	s	α
2609	2572	.	a
2609	2499	s	a
2609	2502	s	A
2609	2613	s	λ
2609	2508	s	l
2609	2553	s	L
2609	2253	<2s>	<>
2610	2573	.	.
2610	2574	 	 
2610	2573	<~>	<~>
2610	2573	<split-s>	<split-s>
2610	2573	<split-h>	<split-h>
2610	2573	<name2>	<name2>
2610	2577	<aphaerese>	<aphaerese>
2610	2608	<>	<aphaerese>
2610	2573	<elision3>	<elision3>
2610	2608	<>	<elision3>
2610	2573	<elision2>	<elision2>
2610	2608	<>	<elision2>
2610	2573	<elision1>	<elision1>
2610	2608	<>	<elision1>
2610	2570	.	υ
2610	2497	s	υ
2610	2570	.	u
2610	2497	s	u
2610	2611	s	κ
2610	2506	s	k
2610	2442	s	U
2610	2597	s	K
2610	2570	.	α
2610	2497	s	α
2610	2570	.	a
2610	2497	s	a
2610	2500	s	A
2610	2611	s	λ
2610	2506	s	l
2610	2551	s	L
2610	2251	<2s>	<>
2611	2427	.	.
2611	2427	 	 
2611	2427	<~>	<~>
2611	2427	<split-s>	<split-s>
2611	2427	<split-h>	<split-h>
2611	2427	<name2>	<name2>
2611	2612	<>	<name>
2611	2430	<aphaerese>	<aphaerese>
2611	2611	<>	<aphaerese>
2611	2611	<>	<elision3>
2611	2611	<>	<elision2>
2611	2611	<>	<elision1>
2611	2424	.	υ
2611	2424	.	u
2611	2424	.	κ
2611	2424	.	α
2611	2424	.	a
2611	2424	.	λ
2611	2565	<split-h>	<>
2612	2429	.	.
2612	2429	 	 
2612	2429	<~>	<~>
2612	2429	<split-s>	<split-s>
2612	2429	<split-h>	<split-h>
2612	2429	<name2>	<name2>
2612	2432	<aphaerese>	<aphaerese>
2612	2613	<>	<aphaerese>
2612	2613	<>	<elision3>
2612	2613	<>	<elision2>
2612	2613	<>	<elision1>
2612	2426	.	υ
2612	2426	.	u
2612	2426	.	κ
2612	2426	.	α
2612	2426	.	a
2612	2426	.	λ
2612	2566	<split-h>	<>
2613	2427	.	.
2613	2427	 	 
2613	2427	<~>	<~>
2613	2427	<split-s>	<split-s>
2613	2427	<split-h>	<split-h>
2613	2427	<name2>	<name2>
2613	2430	<aphaerese>	<aphaerese>
2613	2611	<>	<aphaerese>
2613	2611	<>	<elision3>
2613	2611	<>	<elision2>
2613	2611	<>	<elision1>
2613	2424	.	υ
2613	2424	.	u
2613	2424	.	κ
2613	2424	.	α
2613	2424	.	a
2613	2424	.	λ
2613	2564	<split-h>	<>
2614	2573	.	.
2614	2574	 	 
2614	2573	<~>	<~>
2614	2573	<split-s>	<split-s>
2614	2573	<split-h>	<split-h>
2614	2573	<name2>	<name2>
2614	2601	<name2>	<name>
2614	2609	<>	<name>
2614	2577	<aphaerese>	<aphaerese>
2614	2608	<>	<aphaerese>
2614	2573	<elision3>	<elision3>
2614	2608	<>	<elision3>
2614	2573	<elision2>	<elision2>
2614	2608	<>	<elision2>
2614	2573	<elision1>	<elision1>
2614	2608	<>	<elision1>
2614	2570	.	υ
2614	2497	s	υ
2614	2570	.	u
2614	2497	s	u
2614	2611	s	κ
2614	2506	s	k
2614	2442	s	U
2614	2597	s	K
2614	2570	.	α
2614	2497	s	α
2614	2570	.	a
2614	2497	s	a
2614	2500	s	A
2614	2611	s	λ
2614	2506	s	l
2614	2551	s	L
2614	2261	<2s>	<>
2615	2573	.	.
2615	2574	 	 
2615	2573	<~>	<~>
2615	2573	<split-s>	<split-s>
2615	2573	<split-h>	<split-h>
2615	2573	<name2>	<name2>
2615	2616	<>	<name>
2615	2577	<aphaerese>	<aphaerese>
2615	2615	<>	<aphaerese>
2615	2573	<elision3>	<elision3>
2615	2615	<>	<elision3>
2615	2573	<elision2>	<elision2>
2615	2615	<>	<elision2>
2615	2573	<elision1>	<elision1>
2615	2615	<>	<elision1>
2615	2570	.	υ
2615	2497	s	υ
2615	2570	.	u
2615	2497	s	u
2615	2570	.	κ
2615	2611	s	κ
2615	2506	s	k
2615	2442	s	U
2615	2597	s	K
2615	2570	.	α
2615	2497	s	α
2615	2570	.	a
2615	2497	s	a
2615	2500	s	A
2615	2570	.	λ
2615	2611	s	λ
2615	2506	s	l
2615	2551	s	L
2615	2137	<2s>	<>
2616	2576	.	.
2616	2579	 	 
2616	2576	<~>	<~>
2616	2576	<split-s>	<split-s>
2616	2576	<split-h>	<split-h>
2616	2576	<name2>	<name2>
2616	2596	<aphaerese>	<aphaerese>
2616	2617	<>	<aphaerese>
2616	2576	<elision3>	<elision3>
2616	2617	<>	<elision3>
2616	2576	<elision2>	<elision2>
2616	2617	<>	<elision2>
2616	2576	<elision1>	<elision1>
2616	2617	<>	<elision1>
2616	2572	.	υ
2616	2499	s	υ
2616	2572	.	u
2616	2499	s	u
2616	2572	.	κ
2616	2613	s	κ
2616	2508	s	k
2616	2444	s	U
2616	2543	s	K
2616	2572	.	α
2616	2499	s	α
2616	2572	.	a
2616	2499	s	a
2616	2502	s	A
2616	2572	.	λ
2616	2613	s	λ
2616	2508	s	l
2616	2553	s	L
2616	2138	<2s>	<>
2617	2573	.	.
2617	2574	 	 
2617	2573	<~>	<~>
2617	2573	<split-s>	<split-s>
2617	2573	<split-h>	<split-h>
2617	2573	<name2>	<name2>
2617	2577	<aphaerese>	<aphaerese>
2617	2615	<>	<aphaerese>
2617	2573	<elision3>	<elision3>
2617	2615	<>	<elision3>
2617	2573	<elision2>	<elision2>
2617	2615	<>	<elision2>
2617	2573	<elision1>	<elision1>
2617	2615	<>	<elision1>
2617	2570	.	υ
2617	2497	s	υ
2617	2570	.	u
2617	2497	s	u
2617	2570	.	κ
2617	2611	s	κ
2617	2506	s	k
2617	2442	s	U
2617	2597	s	K
2617	2570	.	α
2617	2497	s	α
2617	2570	.	a
2617	2497	s	a
2617	2500	s	A
2617	2570	.	λ
2617	2611	s	λ
2617	2506	s	l
2617	2551	s	L
2617	2136	<2s>	<>
2618	2601	<name>	<name>
2618	2619	<>	<name>
2618	2621	<>	<aphaerese>
2618	2621	<>	<elision3>
2618	2621	<>	<elision2>
2618	2621	<>	<elision1>
2618	2257	<2s>	<>
2618	2622	<L2kl>	<>
2619	2620	<>	<aphaerese>
2619	2620	<>	<elision3>
2619	2620	<>	<elision2>
2619	2620	<>	<elision1>
2619	2616	<L2kl>	<>
2620	2621	<>	<aphaerese>
2620	2621	<>	<elision3>
2620	2621	<>	<elision2>
2620	2621	<>	<elision1>
2620	2617	<L2kl>	<>
2621	2619	<>	<name>
2621	2621	<>	<aphaerese>
2621	2621	<>	<elision3>
2621	2621	<>	<elision2>
2621	2621	<>	<elision1>
2621	2615	<L2kl>	<>
2622	2573	.	.
2622	2574	 	 
2622	2573	<~>	<~>
2622	2573	<split-s>	<split-s>
2622	2573	<split-h>	<split-h>
2622	2573	<name2>	<name2>
2622	2601	<name2>	<name>
2622	2616	<>	<name>
2622	2577	<aphaerese>	<aphaerese>
2622	2615	<>	<aphaerese>
2622	2573	<elision3>	<elision3>
2622	2615	<>	<elision3>
2622	2573	<elision2>	<elision2>
2622	2615	<>	<elision2>
2622	2573	<elision1>	<elision1>
2622	2615	<>	<elision1>
2622	2570	.	υ
2622	2497	s	υ
2622	2570	.	u
2622	2497	s	u
2622	2570	.	κ
2622	2611	s	κ
2622	2506	s	k
2622	2442	s	U
2622	2597	s	K
2622	2570	.	α
2622	2497	s	α
2622	2570	.	a
2622	2497	s	a
2622	2500	s	A
2622	2570	.	λ
2622	2611	s	λ
2622	2506	s	l
2622	2551	s	L
2622	2326	<2s>	<>
2623	2624	<>	<name>
2623	2623	<>	<aphaerese>
2623	2623	<>	<elision3>
2623	2623	<>	<elision2>
2623	2623	<>	<elision1>
2623	2626	s	κ
2623	2751	s	k
2623	2769	s	K
2623	2626	s	λ
2623	2782	s	l
2623	2785	s	L
2623	1960	<1s>	<>
2624	2625	<>	<aphaerese>
2624	2625	<>	<elision3>
2624	2625	<>	<elision2>
2624	2625	<>	<elision1>
2624	2747	s	κ
2624	2753	s	k
2624	2772	s	K
2624	2747	s	λ
2624	2784	s	l
2624	2787	s	L
2624	1961	<1s>	<>
2625	2623	<>	<aphaerese>
2625	2623	<>	<elision3>
2625	2623	<>	<elision2>
2625	2623	<>	<elision1>
2625	2626	s	κ
2625	2751	s	k
2625	2769	s	K
2625	2626	s	λ
2625	2782	s	l
2625	2785	s	L
2625	1959	<1s>	<>
2626	2627	.	.
2626	2628	 	 
2626	2627	<~>	<~>
2626	2627	<split-s>	<split-s>
2626	2627	<split-h>	<split-h>
2626	2627	<name2>	<name2>
2626	2746	<>	<name>
2626	2631	<aphaerese>	<aphaerese>
2626	2626	<>	<aphaerese>
2626	2626	<>	<elision3>
2626	2626	<>	<elision2>
2626	2626	<>	<elision1>
2626	2635	.	υ
2626	2638	s	υ
2626	2635	.	u
2626	2638	s	u
2626	2635	.	κ
2626	2748	s	κ
2626	2677	s	k
2626	2680	s	U
2626	2732	s	K
2626	2635	.	α
2626	2638	s	α
2626	2635	.	a
2626	2638	s	a
2626	2710	s	A
2626	2635	.	λ
2626	2748	s	λ
2626	2677	s	l
2626	2739	s	L
2626	2351	<2s>	<>
2627	2627	.	.
2627	2628	 	 
2627	2627	<~>	<~>
2627	2627	<split-s>	<split-s>
2627	2627	<split-h>	<split-h>
2627	2627	<name2>	<name2>
2627	2745	<>	<name>
2627	2631	<aphaerese>	<aphaerese>
2627	2627	<>	<aphaerese>
2627	2627	<elision3>	<elision3>
2627	2627	<>	<elision3>
2627	2627	<elision2>	<elision2>
2627	2627	<>	<elision2>
2627	2627	<elision1>	<elision1>
2627	2627	<>	<elision1>
2627	2635	.	υ
2627	2638	s	υ
2627	2635	.	u
2627	2638	s	u
2627	2656	.	κ
2627	2671	s	κ
2627	2677	s	k
2627	2680	s	U
2627	2732	s	K
2627	2635	.	α
2627	2638	s	α
2627	2635	.	a
2627	2638	s	a
2627	2710	s	A
2627	2677	s	λ
2627	2677	s	l
2627	2739	s	L
2627	1940	<2s>	<>
2628	2627	.	.
2628	2628	 	 
2628	2627	<~>	<~>
2628	2627	<split-s>	<split-s>
2628	2627	<split-h>	<split-h>
2628	2627	<name2>	<name2>
2628	2629	<>	<name>
2628	2631	<aphaerese>	<aphaerese>
2628	2634	<>	<aphaerese>
2628	2627	<elision3>	<elision3>
2628	2634	<>	<elision3>
2628	2627	<elision2>	<elision2>
2628	2634	<>	<elision2>
2628	2627	<elision1>	<elision1>
2628	2634	<>	<elision1>
2628	2635	.	υ
2628	2721	s	υ
2628	2635	.	u
2628	2721	s	u
2628	2656	.	κ
2628	2722	s	κ
2628	2723	s	k
2628	2724	s	U
2628	2726	s	K
2628	2635	.	α
2628	2721	s	α
2628	2635	.	a
2628	2721	s	a
2628	2728	s	A
2628	2723	s	λ
2628	2723	s	l
2628	2729	s	L
2628	1940	<2s>	<>
2629	2630	.	.
2629	2633	 	 
2629	2630	<~>	<~>
2629	2630	<split-s>	<split-s>
2629	2630	<split-h>	<split-h>
2629	2630	<name2>	<name2>
2629	2731	<aphaerese>	<aphaerese>
2629	2744	<>	<aphaerese>
2629	2630	<elision3>	<elision3>
2629	2744	<>	<elision3>
2629	2630	<elision2>	<elision2>
2629	2744	<>	<elision2>
2629	2630	<elision1>	<elision1>
2629	2744	<>	<elision1>
2629	2637	.	υ
2629	2655	s	υ
2629	2637	.	u
2629	2655	s	u
2629	2658	.	κ
2629	2673	s	κ
2629	2679	s	k
2629	2682	s	U
2629	2686	s	K
2629	2637	.	α
2629	2655	s	α
2629	2637	.	a
2629	2655	s	a
2629	2712	s	A
2629	2679	s	λ
2629	2679	s	l
2629	2715	s	L
2629	1941	<2s>	<>
2630	2627	.	.
2630	2628	 	 
2630	2627	<~>	<~>
2630	2627	<split-s>	<split-s>
2630	2627	<split-h>	<split-h>
2630	2627	<name2>	<name2>
2630	2631	<aphaerese>	<aphaerese>
2630	2627	<>	<aphaerese>
2630	2627	<elision3>	<elision3>
2630	2627	<>	<elision3>
2630	2627	<elision2>	<elision2>
2630	2627	<>	<elision2>
2630	2627	<elision1>	<elision1>
2630	2627	<>	<elision1>
2630	2635	.	υ
2630	2638	s	υ
2630	2635	.	u
2630	2638	s	u
2630	2656	.	κ
2630	2671	s	κ
2630	2677	s	k
2630	2680	s	U
2630	2732	s	K
2630	2635	.	α
2630	2638	s	α
2630	2635	.	a
2630	2638	s	a
2630	2710	s	A
2630	2677	s	λ
2630	2677	s	l
2630	2739	s	L
2630	1939	<2s>	<>
2631	2627	.	.
2631	2628	 	 
2631	2627	<~>	<~>
2631	2627	<split-s>	<split-s>
2631	2627	<split-h>	<split-h>
2631	2627	<name2>	<name2>
2631	2632	<>	<name>
2631	2631	<aphaerese>	<aphaerese>
2631	2631	<>	<aphaerese>
2631	2627	<elision3>	<elision3>
2631	2631	<>	<elision3>
2631	2627	<elision2>	<elision2>
2631	2631	<>	<elision2>
2631	2627	<elision1>	<elision1>
2631	2631	<>	<elision1>
2631	2627	.	υ
2631	2627	.	u
2631	2656	.	κ
2631	2671	s	κ
2631	2677	s	k
2631	2680	s	U
2631	2732	s	K
2631	2627	.	α
2631	2627	.	a
2631	2710	s	A
2631	2677	s	λ
2631	2677	s	l
2631	2739	s	L
2631	1927	<2s>	<>
2632	2630	.	.
2632	2633	 	 
2632	2630	<~>	<~>
2632	2630	<split-s>	<split-s>
2632	2630	<split-h>	<split-h>
2632	2630	<name2>	<name2>
2632	2731	<aphaerese>	<aphaerese>
2632	2731	<>	<aphaerese>
2632	2630	<elision3>	<elision3>
2632	2731	<>	<elision3>
2632	2630	<elision2>	<elision2>
2632	2731	<>	<elision2>
2632	2630	<elision1>	<elision1>
2632	2731	<>	<elision1>
2632	2630	.	υ
2632	2630	.	u
2632	2658	.	κ
2632	2673	s	κ
2632	2679	s	k
2632	2682	s	U
2632	2734	s	K
2632	2630	.	α
2632	2630	.	a
2632	2712	s	A
2632	2679	s	λ
2632	2679	s	l
2632	2741	s	L
2632	1928	<2s>	<>
2633	2627	.	.
2633	2628	 	 
2633	2627	<~>	<~>
2633	2627	<split-s>	<split-s>
2633	2627	<split-h>	<split-h>
2633	2627	<name2>	<name2>
2633	2631	<aphaerese>	<aphaerese>
2633	2634	<>	<aphaerese>
2633	2627	<elision3>	<elision3>
2633	2634	<>	<elision3>
2633	2627	<elision2>	<elision2>
2633	2634	<>	<elision2>
2633	2627	<elision1>	<elision1>
2633	2634	<>	<elision1>
2633	2635	.	υ
2633	2721	s	υ
2633	2635	.	u
2633	2721	s	u
2633	2656	.	κ
2633	2722	s	κ
2633	2723	s	k
2633	2724	s	U
2633	2726	s	K
2633	2635	.	α
2633	2721	s	α
2633	2635	.	a
2633	2721	s	a
2633	2728	s	A
2633	2723	s	λ
2633	2723	s	l
2633	2729	s	L
2633	1939	<2s>	<>
2634	2627	.	.
2634	2628	 	 
2634	2627	<~>	<~>
2634	2627	<split-s>	<split-s>
2634	2627	<split-h>	<split-h>
2634	2627	<name2>	<name2>
2634	2629	<>	<name>
2634	2631	<aphaerese>	<aphaerese>
2634	2634	<>	<aphaerese>
2634	2627	<elision3>	<elision3>
2634	2634	<>	<elision3>
2634	2627	<elision2>	<elision2>
2634	2634	<>	<elision2>
2634	2627	<elision1>	<elision1>
2634	2634	<>	<elision1>
2634	2635	.	υ
2634	2638	s	υ
2634	2635	.	u
2634	2638	s	u
2634	2656	.	κ
2634	2671	s	κ
2634	2677	s	k
2634	2680	s	U
2634	2683	s	K
2634	2635	.	α
2634	2638	s	α
2634	2635	.	a
2634	2638	s	a
2634	2710	s	A
2634	2677	s	λ
2634	2677	s	l
2634	2713	s	L
2634	1940	<2s>	<>
2635	2636	<>	<name>
2635	2635	<>	<aphaerese>
2635	2627	<elision3>	<elision3>
2635	2635	<>	<elision3>
2635	2627	<elision2>	<elision2>
2635	2635	<>	<elision2>
2635	2627	<elision1>	<elision1>
2635	2635	<>	<elision1>
2635	248	<2s>	<>
2636	2637	<>	<aphaerese>
2636	2630	<elision3>	<elision3>
2636	2637	<>	<elision3>
2636	2630	<elision2>	<elision2>
2636	2637	<>	<elision2>
2636	2630	<elision1>	<elision1>
2636	2637	<>	<elision1>
2636	249	<2s>	<>
2637	2635	<>	<aphaerese>
2637	2627	<elision3>	<elision3>
2637	2635	<>	<elision3>
2637	2627	<elision2>	<elision2>
2637	2635	<>	<elision2>
2637	2627	<elision1>	<elision1>
2637	2635	<>	<elision1>
2637	247	<2s>	<>
2638	2639	.	.
2638	2639	 	 
2638	2639	<~>	<~>
2638	2639	<split-s>	<split-s>
2638	2639	<split-h>	<split-h>
2638	2639	<name2>	<name2>
2638	2654	<>	<name>
2638	2642	<aphaerese>	<aphaerese>
2638	2638	<>	<aphaerese>
2638	2638	<>	<elision3>
2638	2638	<>	<elision2>
2638	2638	<>	<elision1>
2638	2651	.	υ
2638	2651	.	u
2638	2645	.	κ
2638	2651	.	α
2638	2651	.	a
2638	2336	<split-s>	<>
2639	2639	.	.
2639	2639	 	 
2639	2639	<~>	<~>
2639	2639	<split-s>	<split-s>
2639	2639	<split-h>	<split-h>
2639	2639	<name2>	<name2>
2639	2640	<>	<name>
2639	2642	<aphaerese>	<aphaerese>
2639	2639	<>	<aphaerese>
2639	2639	<elision3>	<elision3>
2639	2639	<>	<elision3>
2639	2639	<elision2>	<elision2>
2639	2639	<>	<elision2>
2639	2639	<elision1>	<elision1>
2639	2639	<>	<elision1>
2639	2651	.	υ
2639	2651	.	u
2639	2645	.	κ
2639	2651	.	α
2639	2651	.	a
2639	2282	<split-s>	<>
2640	2641	.	.
2640	2641	 	 
2640	2641	<~>	<~>
2640	2641	<split-s>	<split-s>
2640	2641	<split-h>	<split-h>
2640	2641	<name2>	<name2>
2640	2644	<aphaerese>	<aphaerese>
2640	2641	<>	<aphaerese>
2640	2641	<elision3>	<elision3>
2640	2641	<>	<elision3>
2640	2641	<elision2>	<elision2>
2640	2641	<>	<elision2>
2640	2641	<elision1>	<elision1>
2640	2641	<>	<elision1>
2640	2653	.	υ
2640	2653	.	u
2640	2647	.	κ
2640	2653	.	α
2640	2653	.	a
2640	2283	<split-s>	<>
2641	2639	.	.
2641	2639	 	 
2641	2639	<~>	<~>
2641	2639	<split-s>	<split-s>
2641	2639	<split-h>	<split-h>
2641	2639	<name2>	<name2>
2641	2642	<aphaerese>	<aphaerese>
2641	2639	<>	<aphaerese>
2641	2639	<elision3>	<elision3>
2641	2639	<>	<elision3>
2641	2639	<elision2>	<elision2>
2641	2639	<>	<elision2>
2641	2639	<elision1>	<elision1>
2641	2639	<>	<elision1>
2641	2651	.	υ
2641	2651	.	u
2641	2645	.	κ
2641	2651	.	α
2641	2651	.	a
2641	2284	<split-s>	<>
2642	2639	.	.
2642	2639	 	 
2642	2639	<~>	<~>
2642	2639	<split-s>	<split-s>
2642	2639	<split-h>	<split-h>
2642	2639	<name2>	<name2>
2642	2643	<>	<name>
2642	2642	<aphaerese>	<aphaerese>
2642	2642	<>	<aphaerese>
2642	2639	<elision3>	<elision3>
2642	2642	<>	<elision3>
2642	2639	<elision2>	<elision2>
2642	2642	<>	<elision2>
2642	2639	<elision1>	<elision1>
2642	2642	<>	<elision1>
2642	2639	.	υ
2642	2639	.	u
2642	2645	.	κ
2642	2639	.	α
2642	2639	.	a
2642	2329	<split-s>	<>
2643	2641	.	.
2643	2641	 	 
2643	2641	<~>	<~>
2643	2641	<split-s>	<split-s>
2643	2641	<split-h>	<split-h>
2643	2641	<name2>	<name2>
2643	2644	<aphaerese>	<aphaerese>
2643	2644	<>	<aphaerese>
2643	2641	<elision3>	<elision3>
2643	2644	<>	<elision3>
2643	2641	<elision2>	<elision2>
2643	2644	<>	<elision2>
2643	2641	<elision1>	<elision1>
2643	2644	<>	<elision1>
2643	2641	.	υ
2643	2641	.	u
2643	2647	.	κ
2643	2641	.	α
2643	2641	.	a
2643	2330	<split-s>	<>
2644	2639	.	.
2644	2639	 	 
2644	2639	<~>	<~>
2644	2639	<split-s>	<split-s>
2644	2639	<split-h>	<split-h>
2644	2639	<name2>	<name2>
2644	2642	<aphaerese>	<aphaerese>
2644	2642	<>	<aphaerese>
2644	2639	<elision3>	<elision3>
2644	2642	<>	<elision3>
2644	2639	<elision2>	<elision2>
2644	2642	<>	<elision2>
2644	2639	<elision1>	<elision1>
2644	2642	<>	<elision1>
2644	2639	.	υ
2644	2639	.	u
2644	2645	.	κ
2644	2639	.	α
2644	2639	.	a
2644	2328	<split-s>	<>
2645	2646	<>	<name>
2645	2645	<>	<aphaerese>
2645	2648	<elision3>	<elision3>
2645	2645	<>	<elision3>
2645	2648	<elision2>	<elision2>
2645	2645	<>	<elision2>
2645	2648	<elision1>	<elision1>
2645	2645	<>	<elision1>
2645	2019	<split-s>	<>
2646	2647	<>	<aphaerese>
2646	2650	<elision3>	<elision3>
2646	2647	<>	<elision3>
2646	2650	<elision2>	<elision2>
2646	2647	<>	<elision2>
2646	2650	<elision1>	<elision1>
2646	2647	<>	<elision1>
2646	2020	<split-s>	<>
2647	2645	<>	<aphaerese>
2647	2648	<elision3>	<elision3>
2647	2645	<>	<elision3>
2647	2648	<elision2>	<elision2>
2647	2645	<>	<elision2>
2647	2648	<elision1>	<elision1>
2647	2645	<>	<elision1>
2647	2018	<split-s>	<>
2648	2649	<>	<name>
2648	2648	<>	<aphaerese>
2648	2648	<>	<elision3>
2648	2648	<>	<elision2>
2648	2648	<>	<elision1>
2648	2016	<split-s>	<>
2649	2650	<>	<aphaerese>
2649	2650	<>	<elision3>
2649	2650	<>	<elision2>
2649	2650	<>	<elision1>
2649	2017	<split-s>	<>
2650	2648	<>	<aphaerese>
2650	2648	<>	<elision3>
2650	2648	<>	<elision2>
2650	2648	<>	<elision1>
2650	2015	<split-s>	<>
2651	2652	<>	<name>
2651	2651	<>	<aphaerese>
2651	2639	<elision3>	<elision3>
2651	2651	<>	<elision3>
2651	2639	<elision2>	<elision2>
2651	2651	<>	<elision2>
2651	2639	<elision1>	<elision1>
2651	2651	<>	<elision1>
2651	1769	<split-s>	<>
2652	2653	<>	<aphaerese>
2652	2641	<elision3>	<elision3>
2652	2653	<>	<elision3>
2652	2641	<elision2>	<elision2>
2652	2653	<>	<elision2>
2652	2641	<elision1>	<elision1>
2652	2653	<>	<elision1>
2652	1770	<split-s>	<>
2653	2651	<>	<aphaerese>
2653	2639	<elision3>	<elision3>
2653	2651	<>	<elision3>
2653	2639	<elision2>	<elision2>
2653	2651	<>	<elision2>
2653	2639	<elision1>	<elision1>
2653	2651	<>	<elision1>
2653	1768	<split-s>	<>
2654	2641	.	.
2654	2641	 	 
2654	2641	<~>	<~>
2654	2641	<split-s>	<split-s>
2654	2641	<split-h>	<split-h>
2654	2641	<name2>	<name2>
2654	2644	<aphaerese>	<aphaerese>
2654	2655	<>	<aphaerese>
2654	2655	<>	<elision3>
2654	2655	<>	<elision2>
2654	2655	<>	<elision1>
2654	2653	.	υ
2654	2653	.	u
2654	2647	.	κ
2654	2653	.	α
2654	2653	.	a
2654	2337	<split-s>	<>
2655	2639	.	.
2655	2639	 	 
2655	2639	<~>	<~>
2655	2639	<split-s>	<split-s>
2655	2639	<split-h>	<split-h>
2655	2639	<name2>	<name2>
2655	2642	<aphaerese>	<aphaerese>
2655	2638	<>	<aphaerese>
2655	2638	<>	<elision3>
2655	2638	<>	<elision2>
2655	2638	<>	<elision1>
2655	2651	.	υ
2655	2651	.	u
2655	2645	.	κ
2655	2651	.	α
2655	2651	.	a
2655	2335	<split-s>	<>
2656	2657	<>	<name>
2656	2656	<>	<aphaerese>
2656	2659	<elision3>	<elision3>
2656	2656	<>	<elision3>
2656	2659	<elision2>	<elision2>
2656	2656	<>	<elision2>
2656	2659	<elision1>	<elision1>
2656	2656	<>	<elision1>
2656	1924	<2s>	<>
2657	2658	<>	<aphaerese>
2657	2661	<elision3>	<elision3>
2657	2658	<>	<elision3>
2657	2661	<elision2>	<elision2>
2657	2658	<>	<elision2>
2657	2661	<elision1>	<elision1>
2657	2658	<>	<elision1>
2657	1925	<2s>	<>
2658	2656	<>	<aphaerese>
2658	2659	<elision3>	<elision3>
2658	2656	<>	<elision3>
2658	2659	<elision2>	<elision2>
2658	2656	<>	<elision2>
2658	2659	<elision1>	<elision1>
2658	2656	<>	<elision1>
2658	1923	<2s>	<>
2659	2660	<>	<name>
2659	2659	<>	<aphaerese>
2659	2659	<>	<elision3>
2659	2659	<>	<elision2>
2659	2659	<>	<elision1>
2659	2662	s	κ
2659	2662	s	k
2659	2665	s	K
2659	2662	s	λ
2659	2662	s	l
2659	2668	s	L
2659	1785	<2s>	<>
2660	2661	<>	<aphaerese>
2660	2661	<>	<elision3>
2660	2661	<>	<elision2>
2660	2661	<>	<elision1>
2660	2664	s	κ
2660	2664	s	k
2660	2667	s	K
2660	2664	s	λ
2660	2664	s	l
2660	2670	s	L
2660	1786	<2s>	<>
2661	2659	<>	<aphaerese>
2661	2659	<>	<elision3>
2661	2659	<>	<elision2>
2661	2659	<>	<elision1>
2661	2662	s	κ
2661	2662	s	k
2661	2665	s	K
2661	2662	s	λ
2661	2662	s	l
2661	2668	s	L
2661	1784	<2s>	<>
2662	2663	<>	<name>
2662	2662	<>	<aphaerese>
2662	2662	<>	<elision3>
2662	2662	<>	<elision2>
2662	2662	<>	<elision1>
2662	2357	<split-s>	<>
2663	2664	<>	<aphaerese>
2663	2664	<>	<elision3>
2663	2664	<>	<elision2>
2663	2664	<>	<elision1>
2663	2358	<split-s>	<>
2664	2662	<>	<aphaerese>
2664	2662	<>	<elision3>
2664	2662	<>	<elision2>
2664	2662	<>	<elision1>
2664	2356	<split-s>	<>
2665	2666	<>	<name>
2665	2665	<>	<aphaerese>
2665	2665	<>	<elision3>
2665	2665	<>	<elision2>
2665	2665	<>	<elision1>
2665	2662	<K2kl>	<>
2666	2667	<>	<aphaerese>
2666	2667	<>	<elision3>
2666	2667	<>	<elision2>
2666	2667	<>	<elision1>
2666	2663	<K2kl>	<>
2667	2665	<>	<aphaerese>
2667	2665	<>	<elision3>
2667	2665	<>	<elision2>
2667	2665	<>	<elision1>
2667	2664	<K2kl>	<>
2668	2669	<>	<name>
2668	2668	<>	<aphaerese>
2668	2668	<>	<elision3>
2668	2668	<>	<elision2>
2668	2668	<>	<elision1>
2668	2662	<L2kl>	<>
2669	2670	<>	<aphaerese>
2669	2670	<>	<elision3>
2669	2670	<>	<elision2>
2669	2670	<>	<elision1>
2669	2663	<L2kl>	<>
2670	2668	<>	<aphaerese>
2670	2668	<>	<elision3>
2670	2668	<>	<elision2>
2670	2668	<>	<elision1>
2670	2664	<L2kl>	<>
2671	2639	.	.
2671	2639	 	 
2671	2639	<~>	<~>
2671	2639	<split-s>	<split-s>
2671	2639	<split-h>	<split-h>
2671	2639	<name2>	<name2>
2671	2672	<>	<name>
2671	2642	<aphaerese>	<aphaerese>
2671	2671	<>	<aphaerese>
2671	2674	<elision3>	<elision3>
2671	2671	<>	<elision3>
2671	2674	<elision2>	<elision2>
2671	2671	<>	<elision2>
2671	2674	<elision1>	<elision1>
2671	2671	<>	<elision1>
2671	2651	.	υ
2671	2651	.	u
2671	2651	.	κ
2671	2651	.	α
2671	2651	.	a
2671	2651	.	λ
2671	2419	<split-s>	<>
2672	2641	.	.
2672	2641	 	 
2672	2641	<~>	<~>
2672	2641	<split-s>	<split-s>
2672	2641	<split-h>	<split-h>
2672	2641	<name2>	<name2>
2672	2644	<aphaerese>	<aphaerese>
2672	2673	<>	<aphaerese>
2672	2676	<elision3>	<elision3>
2672	2673	<>	<elision3>
2672	2676	<elision2>	<elision2>
2672	2673	<>	<elision2>
2672	2676	<elision1>	<elision1>
2672	2673	<>	<elision1>
2672	2653	.	υ
2672	2653	.	u
2672	2653	.	κ
2672	2653	.	α
2672	2653	.	a
2672	2653	.	λ
2672	2420	<split-s>	<>
2673	2639	.	.
2673	2639	 	 
2673	2639	<~>	<~>
2673	2639	<split-s>	<split-s>
2673	2639	<split-h>	<split-h>
2673	2639	<name2>	<name2>
2673	2642	<aphaerese>	<aphaerese>
2673	2671	<>	<aphaerese>
2673	2674	<elision3>	<elision3>
2673	2671	<>	<elision3>
2673	2674	<elision2>	<elision2>
2673	2671	<>	<elision2>
2673	2674	<elision1>	<elision1>
2673	2671	<>	<elision1>
2673	2651	.	υ
2673	2651	.	u
2673	2651	.	κ
2673	2651	.	α
2673	2651	.	a
2673	2651	.	λ
2673	2418	<split-s>	<>
2674	2639	.	.
2674	2639	 	 
2674	2639	<~>	<~>
2674	2639	<split-s>	<split-s>
2674	2639	<split-h>	<split-h>
2674	2639	<name2>	<name2>
2674	2675	<>	<name>
2674	2642	<aphaerese>	<aphaerese>
2674	2674	<>	<aphaerese>
2674	2639	<elision3>	<elision3>
2674	2674	<>	<elision3>
2674	2639	<elision2>	<elision2>
2674	2674	<>	<elision2>
2674	2639	<elision1>	<elision1>
2674	2674	<>	<elision1>
2674	2651	.	υ
2674	2651	.	u
2674	2645	.	κ
2674	2651	.	α
2674	2651	.	a
2674	2416	<split-s>	<>
2675	2641	.	.
2675	2641	 	 
2675	2641	<~>	<~>
2675	2641	<split-s>	<split-s>
2675	2641	<split-h>	<split-h>
2675	2641	<name2>	<name2>
2675	2644	<aphaerese>	<aphaerese>
2675	2676	<>	<aphaerese>
2675	2641	<elision3>	<elision3>
2675	2676	<>	<elision3>
2675	2641	<elision2>	<elision2>
2675	2676	<>	<elision2>
2675	2641	<elision1>	<elision1>
2675	2676	<>	<elision1>
2675	2653	.	υ
2675	2653	.	u
2675	2647	.	κ
2675	2653	.	α
2675	2653	.	a
2675	2417	<split-s>	<>
2676	2639	.	.
2676	2639	 	 
2676	2639	<~>	<~>
2676	2639	<split-s>	<split-s>
2676	2639	<split-h>	<split-h>
2676	2639	<name2>	<name2>
2676	2642	<aphaerese>	<aphaerese>
2676	2674	<>	<aphaerese>
2676	2639	<elision3>	<elision3>
2676	2674	<>	<elision3>
2676	2639	<elision2>	<elision2>
2676	2674	<>	<elision2>
2676	2639	<elision1>	<elision1>
2676	2674	<>	<elision1>
2676	2651	.	υ
2676	2651	.	u
2676	2645	.	κ
2676	2651	.	α
2676	2651	.	a
2676	2415	<split-s>	<>
2677	2639	.	.
2677	2639	 	 
2677	2639	<~>	<~>
2677	2639	<split-s>	<split-s>
2677	2639	<split-h>	<split-h>
2677	2639	<name2>	<name2>
2677	2678	<>	<name>
2677	2642	<aphaerese>	<aphaerese>
2677	2677	<>	<aphaerese>
2677	2639	<elision3>	<elision3>
2677	2677	<>	<elision3>
2677	2639	<elision2>	<elision2>
2677	2677	<>	<elision2>
2677	2639	<elision1>	<elision1>
2677	2677	<>	<elision1>
2677	2651	.	υ
2677	2651	.	u
2677	2651	.	κ
2677	2651	.	α
2677	2651	.	a
2677	2651	.	λ
2677	2440	<split-s>	<>
2678	2641	.	.
2678	2641	 	 
2678	2641	<~>	<~>
2678	2641	<split-s>	<split-s>
2678	2641	<split-h>	<split-h>
2678	2641	<name2>	<name2>
2678	2644	<aphaerese>	<aphaerese>
2678	2679	<>	<aphaerese>
2678	2641	<elision3>	<elision3>
2678	2679	<>	<elision3>
2678	2641	<elision2>	<elision2>
2678	2679	<>	<elision2>
2678	2641	<elision1>	<elision1>
2678	2679	<>	<elision1>
2678	2653	.	υ
2678	2653	.	u
2678	2653	.	κ
2678	2653	.	α
2678	2653	.	a
2678	2653	.	λ
2678	2441	<split-s>	<>
2679	2639	.	.
2679	2639	 	 
2679	2639	<~>	<~>
2679	2639	<split-s>	<split-s>
2679	2639	<split-h>	<split-h>
2679	2639	<name2>	<name2>
2679	2642	<aphaerese>	<aphaerese>
2679	2677	<>	<aphaerese>
2679	2639	<elision3>	<elision3>
2679	2677	<>	<elision3>
2679	2639	<elision2>	<elision2>
2679	2677	<>	<elision2>
2679	2639	<elision1>	<elision1>
2679	2677	<>	<elision1>
2679	2651	.	υ
2679	2651	.	u
2679	2651	.	κ
2679	2651	.	α
2679	2651	.	a
2679	2651	.	λ
2679	2439	<split-s>	<>
2680	2681	<>	<name>
2680	2680	<>	<aphaerese>
2680	2680	<>	<elision3>
2680	2680	<>	<elision2>
2680	2680	<>	<elision1>
2680	2639	<U2kl>	<>
2681	2682	<>	<aphaerese>
2681	2682	<>	<elision3>
2681	2682	<>	<elision2>
2681	2682	<>	<elision1>
2681	2640	<U2kl>	<>
2682	2680	<>	<aphaerese>
2682	2680	<>	<elision3>
2682	2680	<>	<elision2>
2682	2680	<>	<elision1>
2682	2641	<U2kl>	<>
2683	2684	<name>	<name>
2683	2685	<>	<name>
2683	2687	<>	<aphaerese>
2683	2687	<>	<elision3>
2683	2687	<>	<elision2>
2683	2687	<>	<elision1>
2683	2493	<split-s>	<>
2683	2688	<A2kl>	<>
2683	2697	<L2kl>	<>
2683	2709	<K2kl>	<>
2684	2447	<split-s>	<>
2685	2686	<>	<aphaerese>
2685	2686	<>	<elision3>
2685	2686	<>	<elision2>
2685	2686	<>	<elision1>
2685	2689	<A2kl>	<>
2685	2698	<L2kl>	<>
2685	2707	<K2kl>	<>
2686	2687	<>	<aphaerese>
2686	2687	<>	<elision3>
2686	2687	<>	<elision2>
2686	2687	<>	<elision1>
2686	2690	<A2kl>	<>
2686	2699	<L2kl>	<>
2686	2708	<K2kl>	<>
2687	2685	<>	<name>
2687	2687	<>	<aphaerese>
2687	2687	<>	<elision3>
2687	2687	<>	<elision2>
2687	2687	<>	<elision1>
2687	2688	<A2kl>	<>
2687	2697	<L2kl>	<>
2687	2706	<K2kl>	<>
2688	2689	<>	<name>
2688	2688	<>	<aphaerese>
2688	2688	<>	<elision3>
2688	2688	<>	<elision2>
2688	2688	<>	<elision1>
2688	2691	.	κ
2688	2691	.	λ
2688	2467	<split-s>	<>
2689	2690	<>	<aphaerese>
2689	2690	<>	<elision3>
2689	2690	<>	<elision2>
2689	2690	<>	<elision1>
2689	2693	.	κ
2689	2693	.	λ
2689	2468	<split-s>	<>
2690	2688	<>	<aphaerese>
2690	2688	<>	<elision3>
2690	2688	<>	<elision2>
2690	2688	<>	<elision1>
2690	2691	.	κ
2690	2691	.	λ
2690	2466	<split-s>	<>
2691	2692	<>	<name>
2691	2691	<>	<aphaerese>
2691	2694	<elision3>	<elision3>
2691	2691	<>	<elision3>
2691	2694	<elision2>	<elision2>
2691	2691	<>	<elision2>
2691	2694	<elision1>	<elision1>
2691	2691	<>	<elision1>
2691	2464	<split-s>	<>
2692	2693	<>	<aphaerese>
2692	2696	<elision3>	<elision3>
2692	2693	<>	<elision3>
2692	2696	<elision2>	<elision2>
2692	2693	<>	<elision2>
2692	2696	<elision1>	<elision1>
2692	2693	<>	<elision1>
2692	2465	<split-s>	<>
2693	2691	<>	<aphaerese>
2693	2694	<elision3>	<elision3>
2693	2691	<>	<elision3>
2693	2694	<elision2>	<elision2>
2693	2691	<>	<elision2>
2693	2694	<elision1>	<elision1>
2693	2691	<>	<elision1>
2693	2463	<split-s>	<>
2694	2639	.	.
2694	2639	 	 
2694	2639	<~>	<~>
2694	2639	<split-s>	<split-s>
2694	2639	<split-h>	<split-h>
2694	2639	<name2>	<name2>
2694	2695	<>	<name>
2694	2642	<aphaerese>	<aphaerese>
2694	2694	<>	<aphaerese>
2694	2639	<elision3>	<elision3>
2694	2694	<>	<elision3>
2694	2639	<elision2>	<elision2>
2694	2694	<>	<elision2>
2694	2639	<elision1>	<elision1>
2694	2694	<>	<elision1>
2694	2651	.	υ
2694	2651	.	u
2694	2651	.	α
2694	2651	.	a
2694	2461	<split-s>	<>
2695	2641	.	.
2695	2641	 	 
2695	2641	<~>	<~>
2695	2641	<split-s>	<split-s>
2695	2641	<split-h>	<split-h>
2695	2641	<name2>	<name2>
2695	2644	<aphaerese>	<aphaerese>
2695	2696	<>	<aphaerese>
2695	2641	<elision3>	<elision3>
2695	2696	<>	<elision3>
2695	2641	<elision2>	<elision2>
2695	2696	<>	<elision2>
2695	2641	<elision1>	<elision1>
2695	2696	<>	<elision1>
2695	2653	.	υ
2695	2653	.	u
2695	2653	.	α
2695	2653	.	a
2695	2462	<split-s>	<>
2696	2639	.	.
2696	2639	 	 
2696	2639	<~>	<~>
2696	2639	<split-s>	<split-s>
2696	2639	<split-h>	<split-h>
2696	2639	<name2>	<name2>
2696	2642	<aphaerese>	<aphaerese>
2696	2694	<>	<aphaerese>
2696	2639	<elision3>	<elision3>
2696	2694	<>	<elision3>
2696	2639	<elision2>	<elision2>
2696	2694	<>	<elision2>
2696	2639	<elision1>	<elision1>
2696	2694	<>	<elision1>
2696	2651	.	υ
2696	2651	.	u
2696	2651	.	α
2696	2651	.	a
2696	2460	<split-s>	<>
2697	2698	<>	<name>
2697	2697	<>	<aphaerese>
2697	2697	<>	<elision3>
2697	2697	<>	<elision2>
2697	2697	<>	<elision1>
2697	2700	.	κ
2697	2700	.	λ
2697	2485	<split-s>	<>
2698	2699	<>	<aphaerese>
2698	2699	<>	<elision3>
2698	2699	<>	<elision2>
2698	2699	<>	<elision1>
2698	2702	.	κ
2698	2702	.	λ
2698	2486	<split-s>	<>
2699	2697	<>	<aphaerese>
2699	2697	<>	<elision3>
2699	2697	<>	<elision2>
2699	2697	<>	<elision1>
2699	2700	.	κ
2699	2700	.	λ
2699	2484	<split-s>	<>
2700	2701	<>	<name>
2700	2700	<>	<aphaerese>
2700	2703	<elision3>	<elision3>
2700	2700	<>	<elision3>
2700	2703	<elision2>	<elision2>
2700	2700	<>	<elision2>
2700	2703	<elision1>	<elision1>
2700	2700	<>	<elision1>
2700	2482	<split-s>	<>
2701	2702	<>	<aphaerese>
2701	2705	<elision3>	<elision3>
2701	2702	<>	<elision3>
2701	2705	<elision2>	<elision2>
2701	2702	<>	<elision2>
2701	2705	<elision1>	<elision1>
2701	2702	<>	<elision1>
2701	2483	<split-s>	<>
2702	2700	<>	<aphaerese>
2702	2703	<elision3>	<elision3>
2702	2700	<>	<elision3>
2702	2703	<elision2>	<elision2>
2702	2700	<>	<elision2>
2702	2703	<elision1>	<elision1>
2702	2700	<>	<elision1>
2702	2481	<split-s>	<>
2703	2704	<>	<name>
2703	2703	<>	<aphaerese>
2703	2703	<>	<elision3>
2703	2703	<>	<elision2>
2703	2703	<>	<elision1>
2703	2645	.	κ
2703	2479	<split-s>	<>
2704	2705	<>	<aphaerese>
2704	2705	<>	<elision3>
2704	2705	<>	<elision2>
2704	2705	<>	<elision1>
2704	2647	.	κ
2704	2480	<split-s>	<>
2705	2703	<>	<aphaerese>
2705	2703	<>	<elision3>
2705	2703	<>	<elision2>
2705	2703	<>	<elision1>
2705	2645	.	κ
2705	2478	<split-s>	<>
2706	2639	.	.
2706	2639	 	 
2706	2639	<~>	<~>
2706	2639	<split-s>	<split-s>
2706	2639	<split-h>	<split-h>
2706	2639	<name2>	<name2>
2706	2707	<>	<name>
2706	2642	<aphaerese>	<aphaerese>
2706	2706	<>	<aphaerese>
2706	2639	<elision3>	<elision3>
2706	2706	<>	<elision3>
2706	2639	<elision2>	<elision2>
2706	2706	<>	<elision2>
2706	2639	<elision1>	<elision1>
2706	2706	<>	<elision1>
2706	2651	.	υ
2706	2651	.	u
2706	2651	.	α
2706	2651	.	a
2706	2491	<split-s>	<>
2707	2641	.	.
2707	2641	 	 
2707	2641	<~>	<~>
2707	2641	<split-s>	<split-s>
2707	2641	<split-h>	<split-h>
2707	2641	<name2>	<name2>
2707	2644	<aphaerese>	<aphaerese>
2707	2708	<>	<aphaerese>
2707	2641	<elision3>	<elision3>
2707	2708	<>	<elision3>
2707	2641	<elision2>	<elision2>
2707	2708	<>	<elision2>
2707	2641	<elision1>	<elision1>
2707	2708	<>	<elision1>
2707	2653	.	υ
2707	2653	.	u
2707	2653	.	α
2707	2653	.	a
2707	2492	<split-s>	<>
2708	2639	.	.
2708	2639	 	 
2708	2639	<~>	<~>
2708	2639	<split-s>	<split-s>
2708	2639	<split-h>	<split-h>
2708	2639	<name2>	<name2>
2708	2642	<aphaerese>	<aphaerese>
2708	2706	<>	<aphaerese>
2708	2639	<elision3>	<elision3>
2708	2706	<>	<elision3>
2708	2639	<elision2>	<elision2>
2708	2706	<>	<elision2>
2708	2639	<elision1>	<elision1>
2708	2706	<>	<elision1>
2708	2651	.	υ
2708	2651	.	u
2708	2651	.	α
2708	2651	.	a
2708	2490	<split-s>	<>
2709	2639	.	.
2709	2639	 	 
2709	2639	<~>	<~>
2709	2639	<split-s>	<split-s>
2709	2639	<split-h>	<split-h>
2709	2639	<name2>	<name2>
2709	2684	<name2>	<name>
2709	2707	<>	<name>
2709	2642	<aphaerese>	<aphaerese>
2709	2706	<>	<aphaerese>
2709	2639	<elision3>	<elision3>
2709	2706	<>	<elision3>
2709	2639	<elision2>	<elision2>
2709	2706	<>	<elision2>
2709	2639	<elision1>	<elision1>
2709	2706	<>	<elision1>
2709	2651	.	υ
2709	2651	.	u
2709	2651	.	α
2709	2651	.	a
2709	2496	<split-s>	<>
2710	2711	<>	<name>
2710	2710	<>	<aphaerese>
2710	2710	<>	<elision3>
2710	2710	<>	<elision2>
2710	2710	<>	<elision1>
2710	2639	<A2kl>	<>
2711	2712	<>	<aphaerese>
2711	2712	<>	<elision3>
2711	2712	<>	<elision2>
2711	2712	<>	<elision1>
2711	2640	<A2kl>	<>
2712	2710	<>	<aphaerese>
2712	2710	<>	<elision3>
2712	2710	<>	<elision2>
2712	2710	<>	<elision1>
2712	2641	<A2kl>	<>
2713	2684	<name>	<name>
2713	2714	<>	<name>
2713	2716	<>	<aphaerese>
2713	2716	<>	<elision3>
2713	2716	<>	<elision2>
2713	2716	<>	<elision1>
2713	2493	<split-s>	<>
2713	2688	<A2kl>	<>
2713	2720	<L2kl>	<>
2714	2715	<>	<aphaerese>
2714	2715	<>	<elision3>
2714	2715	<>	<elision2>
2714	2715	<>	<elision1>
2714	2689	<A2kl>	<>
2714	2718	<L2kl>	<>
2715	2716	<>	<aphaerese>
2715	2716	<>	<elision3>
2715	2716	<>	<elision2>
2715	2716	<>	<elision1>
2715	2690	<A2kl>	<>
2715	2719	<L2kl>	<>
2716	2714	<>	<name>
2716	2716	<>	<aphaerese>
2716	2716	<>	<elision3>
2716	2716	<>	<elision2>
2716	2716	<>	<elision1>
2716	2688	<A2kl>	<>
2716	2717	<L2kl>	<>
2717	2639	.	.
2717	2639	 	 
2717	2639	<~>	<~>
2717	2639	<split-s>	<split-s>
2717	2639	<split-h>	<split-h>
2717	2639	<name2>	<name2>
2717	2718	<>	<name>
2717	2642	<aphaerese>	<aphaerese>
2717	2717	<>	<aphaerese>
2717	2639	<elision3>	<elision3>
2717	2717	<>	<elision3>
2717	2639	<elision2>	<elision2>
2717	2717	<>	<elision2>
2717	2639	<elision1>	<elision1>
2717	2717	<>	<elision1>
2717	2651	.	υ
2717	2651	.	u
2717	2700	.	κ
2717	2651	.	α
2717	2651	.	a
2717	2700	.	λ
2717	2517	<split-s>	<>
2718	2641	.	.
2718	2641	 	 
2718	2641	<~>	<~>
2718	2641	<split-s>	<split-s>
2718	2641	<split-h>	<split-h>
2718	2641	<name2>	<name2>
2718	2644	<aphaerese>	<aphaerese>
2718	2719	<>	<aphaerese>
2718	2641	<elision3>	<elision3>
2718	2719	<>	<elision3>
2718	2641	<elision2>	<elision2>
2718	2719	<>	<elision2>
2718	2641	<elision1>	<elision1>
2718	2719	<>	<elision1>
2718	2653	.	υ
2718	2653	.	u
2718	2702	.	κ
2718	2653	.	α
2718	2653	.	a
2718	2702	.	λ
2718	2518	<split-s>	<>
2719	2639	.	.
2719	2639	 	 
2719	2639	<~>	<~>
2719	2639	<split-s>	<split-s>
2719	2639	<split-h>	<split-h>
2719	2639	<name2>	<name2>
2719	2642	<aphaerese>	<aphaerese>
2719	2717	<>	<aphaerese>
2719	2639	<elision3>	<elision3>
2719	2717	<>	<elision3>
2719	2639	<elision2>	<elision2>
2719	2717	<>	<elision2>
2719	2639	<elision1>	<elision1>
2719	2717	<>	<elision1>
2719	2651	.	υ
2719	2651	.	u
2719	2700	.	κ
2719	2651	.	α
2719	2651	.	a
2719	2700	.	λ
2719	2516	<split-s>	<>
2720	2639	.	.
2720	2639	 	 
2720	2639	<~>	<~>
2720	2639	<split-s>	<split-s>
2720	2639	<split-h>	<split-h>
2720	2639	<name2>	<name2>
2720	2684	<name2>	<name>
2720	2718	<>	<name>
2720	2642	<aphaerese>	<aphaerese>
2720	2717	<>	<aphaerese>
2720	2639	<elision3>	<elision3>
2720	2717	<>	<elision3>
2720	2639	<elision2>	<elision2>
2720	2717	<>	<elision2>
2720	2639	<elision1>	<elision1>
2720	2717	<>	<elision1>
2720	2651	.	υ
2720	2651	.	u
2720	2700	.	κ
2720	2651	.	α
2720	2651	.	a
2720	2700	.	λ
2720	2520	<split-s>	<>
2721	2639	.	.
2721	2639	 	 
2721	2639	<~>	<~>
2721	2639	<split-s>	<split-s>
2721	2639	<split-h>	<split-h>
2721	2639	<name2>	<name2>
2721	2654	<>	<name>
2721	2642	<aphaerese>	<aphaerese>
2721	2638	<>	<aphaerese>
2721	2638	<>	<elision3>
2721	2638	<>	<elision2>
2721	2638	<>	<elision1>
2721	2651	.	υ
2721	2651	.	u
2721	2645	.	κ
2721	2651	.	α
2721	2651	.	a
2721	2522	<split-s>	<>
2722	2639	.	.
2722	2639	 	 
2722	2639	<~>	<~>
2722	2639	<split-s>	<split-s>
2722	2639	<split-h>	<split-h>
2722	2639	<name2>	<name2>
2722	2672	<>	<name>
2722	2642	<aphaerese>	<aphaerese>
2722	2671	<>	<aphaerese>
2722	2674	<elision3>	<elision3>
2722	2671	<>	<elision3>
2722	2674	<elision2>	<elision2>
2722	2671	<>	<elision2>
2722	2674	<elision1>	<elision1>
2722	2671	<>	<elision1>
2722	2651	.	υ
2722	2651	.	u
2722	2651	.	κ
2722	2651	.	α
2722	2651	.	a
2722	2651	.	λ
2722	2524	<split-s>	<>
2723	2639	.	.
2723	2639	 	 
2723	2639	<~>	<~>
2723	2639	<split-s>	<split-s>
2723	2639	<split-h>	<split-h>
2723	2639	<name2>	<name2>
2723	2678	<>	<name>
2723	2642	<aphaerese>	<aphaerese>
2723	2677	<>	<aphaerese>
2723	2639	<elision3>	<elision3>
2723	2677	<>	<elision3>
2723	2639	<elision2>	<elision2>
2723	2677	<>	<elision2>
2723	2639	<elision1>	<elision1>
2723	2677	<>	<elision1>
2723	2651	.	υ
2723	2651	.	u
2723	2651	.	κ
2723	2651	.	α
2723	2651	.	a
2723	2651	.	λ
2723	2526	<split-s>	<>
2724	2681	<>	<name>
2724	2680	<>	<aphaerese>
2724	2680	<>	<elision3>
2724	2680	<>	<elision2>
2724	2680	<>	<elision1>
2724	2725	<U2kl>	<>
2725	2639	.	.
2725	2639	 	 
2725	2639	<~>	<~>
2725	2639	<split-s>	<split-s>
2725	2639	<split-h>	<split-h>
2725	2639	<name2>	<name2>
2725	2640	<>	<name>
2725	2642	<aphaerese>	<aphaerese>
2725	2639	<>	<aphaerese>
2725	2639	<elision3>	<elision3>
2725	2639	<>	<elision3>
2725	2639	<elision2>	<elision2>
2725	2639	<>	<elision2>
2725	2639	<elision1>	<elision1>
2725	2639	<>	<elision1>
2725	2651	.	υ
2725	2651	.	u
2725	2645	.	κ
2725	2651	.	α
2725	2651	.	a
2725	2529	<split-s>	<>
2726	2684	<name>	<name>
2726	2685	<>	<name>
2726	2687	<>	<aphaerese>
2726	2687	<>	<elision3>
2726	2687	<>	<elision2>
2726	2687	<>	<elision1>
2726	2493	<split-s>	<>
2726	2688	<A2kl>	<>
2726	2697	<L2kl>	<>
2726	2727	<K2kl>	<>
2727	2639	.	.
2727	2639	 	 
2727	2639	<~>	<~>
2727	2639	<split-s>	<split-s>
2727	2639	<split-h>	<split-h>
2727	2639	<name2>	<name2>
2727	2684	<name2>	<name>
2727	2707	<>	<name>
2727	2642	<aphaerese>	<aphaerese>
2727	2706	<>	<aphaerese>
2727	2639	<elision3>	<elision3>
2727	2706	<>	<elision3>
2727	2639	<elision2>	<elision2>
2727	2706	<>	<elision2>
2727	2639	<elision1>	<elision1>
2727	2706	<>	<elision1>
2727	2651	.	υ
2727	2651	.	u
2727	2651	.	α
2727	2651	.	a
2727	2532	<split-s>	<>
2728	2711	<>	<name>
2728	2710	<>	<aphaerese>
2728	2710	<>	<elision3>
2728	2710	<>	<elision2>
2728	2710	<>	<elision1>
2728	2725	<A2kl>	<>
2729	2684	<name>	<name>
2729	2714	<>	<name>
2729	2716	<>	<aphaerese>
2729	2716	<>	<elision3>
2729	2716	<>	<elision2>
2729	2716	<>	<elision1>
2729	2493	<split-s>	<>
2729	2688	<A2kl>	<>
2729	2730	<L2kl>	<>
2730	2639	.	.
2730	2639	 	 
2730	2639	<~>	<~>
2730	2639	<split-s>	<split-s>
2730	2639	<split-h>	<split-h>
2730	2639	<name2>	<name2>
2730	2684	<name2>	<name>
2730	2718	<>	<name>
2730	2642	<aphaerese>	<aphaerese>
2730	2717	<>	<aphaerese>
2730	2639	<elision3>	<elision3>
2730	2717	<>	<elision3>
2730	2639	<elision2>	<elision2>
2730	2717	<>	<elision2>
2730	2639	<elision1>	<elision1>
2730	2717	<>	<elision1>
2730	2651	.	υ
2730	2651	.	u
2730	2700	.	κ
2730	2651	.	α
2730	2651	.	a
2730	2700	.	λ
2730	2539	<split-s>	<>
2731	2627	.	.
2731	2628	 	 
2731	2627	<~>	<~>
2731	2627	<split-s>	<split-s>
2731	2627	<split-h>	<split-h>
2731	2627	<name2>	<name2>
2731	2631	<aphaerese>	<aphaerese>
2731	2631	<>	<aphaerese>
2731	2627	<elision3>	<elision3>
2731	2631	<>	<elision3>
2731	2627	<elision2>	<elision2>
2731	2631	<>	<elision2>
2731	2627	<elision1>	<elision1>
2731	2631	<>	<elision1>
2731	2627	.	υ
2731	2627	.	u
2731	2656	.	κ
2731	2671	s	κ
2731	2677	s	k
2731	2680	s	U
2731	2732	s	K
2731	2627	.	α
2731	2627	.	a
2731	2710	s	A
2731	2677	s	λ
2731	2677	s	l
2731	2739	s	L
2731	1926	<2s>	<>
2732	2684	<name>	<name>
2732	2733	<>	<name>
2732	2735	<>	<aphaerese>
2732	2735	<>	<elision3>
2732	2735	<>	<elision2>
2732	2735	<>	<elision1>
2732	2493	<split-s>	<>
2732	2736	<L2kl>	<>
2732	2709	<K2kl>	<>
2733	2734	<>	<aphaerese>
2733	2734	<>	<elision3>
2733	2734	<>	<elision2>
2733	2734	<>	<elision1>
2733	2737	<L2kl>	<>
2733	2707	<K2kl>	<>
2734	2735	<>	<aphaerese>
2734	2735	<>	<elision3>
2734	2735	<>	<elision2>
2734	2735	<>	<elision1>
2734	2738	<L2kl>	<>
2734	2708	<K2kl>	<>
2735	2733	<>	<name>
2735	2735	<>	<aphaerese>
2735	2735	<>	<elision3>
2735	2735	<>	<elision2>
2735	2735	<>	<elision1>
2735	2736	<L2kl>	<>
2735	2706	<K2kl>	<>
2736	2737	<>	<name>
2736	2736	<>	<aphaerese>
2736	2736	<>	<elision3>
2736	2736	<>	<elision2>
2736	2736	<>	<elision1>
2736	2651	.	κ
2736	2651	.	λ
2736	2549	<split-s>	<>
2737	2738	<>	<aphaerese>
2737	2738	<>	<elision3>
2737	2738	<>	<elision2>
2737	2738	<>	<elision1>
2737	2653	.	κ
2737	2653	.	λ
2737	2550	<split-s>	<>
2738	2736	<>	<aphaerese>
2738	2736	<>	<elision3>
2738	2736	<>	<elision2>
2738	2736	<>	<elision1>
2738	2651	.	κ
2738	2651	.	λ
2738	2548	<split-s>	<>
2739	2684	<name>	<name>
2739	2740	<>	<name>
2739	2742	<>	<aphaerese>
2739	2742	<>	<elision3>
2739	2742	<>	<elision2>
2739	2742	<>	<elision1>
2739	2493	<split-s>	<>
2739	2743	<L2kl>	<>
2740	2741	<>	<aphaerese>
2740	2741	<>	<elision3>
2740	2741	<>	<elision2>
2740	2741	<>	<elision1>
2740	2678	<L2kl>	<>
2741	2742	<>	<aphaerese>
2741	2742	<>	<elision3>
2741	2742	<>	<elision2>
2741	2742	<>	<elision1>
2741	2679	<L2kl>	<>
2742	2740	<>	<name>
2742	2742	<>	<aphaerese>
2742	2742	<>	<elision3>
2742	2742	<>	<elision2>
2742	2742	<>	<elision1>
2742	2677	<L2kl>	<>
2743	2639	.	.
2743	2639	 	 
2743	2639	<~>	<~>
2743	2639	<split-s>	<split-s>
2743	2639	<split-h>	<split-h>
2743	2639	<name2>	<name2>
2743	2684	<name2>	<name>
2743	2678	<>	<name>
2743	2642	<aphaerese>	<aphaerese>
2743	2677	<>	<aphaerese>
2743	2639	<elision3>	<elision3>
2743	2677	<>	<elision3>
2743	2639	<elision2>	<elision2>
2743	2677	<>	<elision2>
2743	2639	<elision1>	<elision1>
2743	2677	<>	<elision1>
2743	2651	.	υ
2743	2651	.	u
2743	2651	.	κ
2743	2651	.	α
2743	2651	.	a
2743	2651	.	λ
2743	2556	<split-s>	<>
2744	2627	.	.
2744	2628	 	 
2744	2627	<~>	<~>
2744	2627	<split-s>	<split-s>
2744	2627	<split-h>	<split-h>
2744	2627	<name2>	<name2>
2744	2631	<aphaerese>	<aphaerese>
2744	2634	<>	<aphaerese>
2744	2627	<elision3>	<elision3>
2744	2634	<>	<elision3>
2744	2627	<elision2>	<elision2>
2744	2634	<>	<elision2>
2744	2627	<elision1>	<elision1>
2744	2634	<>	<elision1>
2744	2635	.	υ
2744	2638	s	υ
2744	2635	.	u
2744	2638	s	u
2744	2656	.	κ
2744	2671	s	κ
2744	2677	s	k
2744	2680	s	U
2744	2683	s	K
2744	2635	.	α
2744	2638	s	α
2744	2635	.	a
2744	2638	s	a
2744	2710	s	A
2744	2677	s	λ
2744	2677	s	l
2744	2713	s	L
2744	1939	<2s>	<>
2745	2630	.	.
2745	2633	 	 
2745	2630	<~>	<~>
2745	2630	<split-s>	<split-s>
2745	2630	<split-h>	<split-h>
2745	2630	<name2>	<name2>
2745	2731	<aphaerese>	<aphaerese>
2745	2630	<>	<aphaerese>
2745	2630	<elision3>	<elision3>
2745	2630	<>	<elision3>
2745	2630	<elision2>	<elision2>
2745	2630	<>	<elision2>
2745	2630	<elision1>	<elision1>
2745	2630	<>	<elision1>
2745	2637	.	υ
2745	2655	s	υ
2745	2637	.	u
2745	2655	s	u
2745	2658	.	κ
2745	2673	s	κ
2745	2679	s	k
2745	2682	s	U
2745	2734	s	K
2745	2637	.	α
2745	2655	s	α
2745	2637	.	a
2745	2655	s	a
2745	2712	s	A
2745	2679	s	λ
2745	2679	s	l
2745	2741	s	L
2745	1941	<2s>	<>
2746	2630	.	.
2746	2633	 	 
2746	2630	<~>	<~>
2746	2630	<split-s>	<split-s>
2746	2630	<split-h>	<split-h>
2746	2630	<name2>	<name2>
2746	2731	<aphaerese>	<aphaerese>
2746	2747	<>	<aphaerese>
2746	2747	<>	<elision3>
2746	2747	<>	<elision2>
2746	2747	<>	<elision1>
2746	2637	.	υ
2746	2655	s	υ
2746	2637	.	u
2746	2655	s	u
2746	2637	.	κ
2746	2750	s	κ
2746	2679	s	k
2746	2682	s	U
2746	2734	s	K
2746	2637	.	α
2746	2655	s	α
2746	2637	.	a
2746	2655	s	a
2746	2712	s	A
2746	2637	.	λ
2746	2750	s	λ
2746	2679	s	l
2746	2741	s	L
2746	2352	<2s>	<>
2747	2627	.	.
2747	2628	 	 
2747	2627	<~>	<~>
2747	2627	<split-s>	<split-s>
2747	2627	<split-h>	<split-h>
2747	2627	<name2>	<name2>
2747	2631	<aphaerese>	<aphaerese>
2747	2626	<>	<aphaerese>
2747	2626	<>	<elision3>
2747	2626	<>	<elision2>
2747	2626	<>	<elision1>
2747	2635	.	υ
2747	2638	s	υ
2747	2635	.	u
2747	2638	s	u
2747	2635	.	κ
2747	2748	s	κ
2747	2677	s	k
2747	2680	s	U
2747	2732	s	K
2747	2635	.	α
2747	2638	s	α
2747	2635	.	a
2747	2638	s	a
2747	2710	s	A
2747	2635	.	λ
2747	2748	s	λ
2747	2677	s	l
2747	2739	s	L
2747	2350	<2s>	<>
2748	2639	.	.
2748	2639	 	 
2748	2639	<~>	<~>
2748	2639	<split-s>	<split-s>
2748	2639	<split-h>	<split-h>
2748	2639	<name2>	<name2>
2748	2749	<>	<name>
2748	2642	<aphaerese>	<aphaerese>
2748	2748	<>	<aphaerese>
2748	2748	<>	<elision3>
2748	2748	<>	<elision2>
2748	2748	<>	<elision1>
2748	2651	.	υ
2748	2651	.	u
2748	2651	.	κ
2748	2651	.	α
2748	2651	.	a
2748	2651	.	λ
2748	2565	<split-s>	<>
2749	2641	.	.
2749	2641	 	 
2749	2641	<~>	<~>
2749	2641	<split-s>	<split-s>
2749	2641	<split-h>	<split-h>
2749	2641	<name2>	<name2>
2749	2644	<aphaerese>	<aphaerese>
2749	2750	<>	<aphaerese>
2749	2750	<>	<elision3>
2749	2750	<>	<elision2>
2749	2750	<>	<elision1>
2749	2653	.	υ
2749	2653	.	u
2749	2653	.	κ
2749	2653	.	α
2749	2653	.	a
2749	2653	.	λ
2749	2566	<split-s>	<>
2750	2639	.	.
2750	2639	 	 
2750	2639	<~>	<~>
2750	2639	<split-s>	<split-s>
2750	2639	<split-h>	<split-h>
2750	2639	<name2>	<name2>
2750	2642	<aphaerese>	<aphaerese>
2750	2748	<>	<aphaerese>
2750	2748	<>	<elision3>
2750	2748	<>	<elision2>
2750	2748	<>	<elision1>
2750	2651	.	υ
2750	2651	.	u
2750	2651	.	κ
2750	2651	.	α
2750	2651	.	a
2750	2651	.	λ
2750	2564	<split-s>	<>
2751	2627	.	.
2751	2628	 	 
2751	2627	<~>	<~>
2751	2627	<split-s>	<split-s>
2751	2627	<split-h>	<split-h>
2751	2627	<name2>	<name2>
2751	2752	<>	<name>
2751	2631	<aphaerese>	<aphaerese>
2751	2751	<>	<aphaerese>
2751	2627	<elision3>	<elision3>
2751	2751	<>	<elision3>
2751	2627	<elision2>	<elision2>
2751	2751	<>	<elision2>
2751	2627	<elision1>	<elision1>
2751	2751	<>	<elision1>
2751	2635	.	υ
2751	2638	s	υ
2751	2635	.	u
2751	2638	s	u
2751	2754	.	κ
2751	2748	s	κ
2751	2677	s	k
2751	2680	s	U
2751	2732	s	K
2751	2635	.	α
2751	2638	s	α
2751	2635	.	a
2751	2638	s	a
2751	2710	s	A
2751	2754	.	λ
2751	2748	s	λ
2751	2677	s	l
2751	2739	s	L
2751	2137	<2s>	<>
2752	2630	.	.
2752	2633	 	 
2752	2630	<~>	<~>
2752	2630	<split-s>	<split-s>
2752	2630	<split-h>	<split-h>
2752	2630	<name2>	<name2>
2752	2731	<aphaerese>	<aphaerese>
2752	2753	<>	<aphaerese>
2752	2630	<elision3>	<elision3>
2752	2753	<>	<elision3>
2752	2630	<elision2>	<elision2>
2752	2753	<>	<elision2>
2752	2630	<elision1>	<elision1>
2752	2753	<>	<elision1>
2752	2637	.	υ
2752	2655	s	υ
2752	2637	.	u
2752	2655	s	u
2752	2756	.	κ
2752	2750	s	κ
2752	2679	s	k
2752	2682	s	U
2752	2734	s	K
2752	2637	.	α
2752	2655	s	α
2752	2637	.	a
2752	2655	s	a
2752	2712	s	A
2752	2756	.	λ
2752	2750	s	λ
2752	2679	s	l
2752	2741	s	L
2752	2138	<2s>	<>
2753	2627	.	.
2753	2628	 	 
2753	2627	<~>	<~>
2753	2627	<split-s>	<split-s>
2753	2627	<split-h>	<split-h>
2753	2627	<name2>	<name2>
2753	2631	<aphaerese>	<aphaerese>
2753	2751	<>	<aphaerese>
2753	2627	<elision3>	<elision3>
2753	2751	<>	<elision3>
2753	2627	<elision2>	<elision2>
2753	2751	<>	<elision2>
2753	2627	<elision1>	<elision1>
2753	2751	<>	<elision1>
2753	2635	.	υ
2753	2638	s	υ
2753	2635	.	u
2753	2638	s	u
2753	2754	.	κ
2753	2748	s	κ
2753	2677	s	k
2753	2680	s	U
2753	2732	s	K
2753	2635	.	α
2753	2638	s	α
2753	2635	.	a
2753	2638	s	a
2753	2710	s	A
2753	2754	.	λ
2753	2748	s	λ
2753	2677	s	l
2753	2739	s	L
2753	2136	<2s>	<>
2754	2755	<>	<name>
2754	2754	<>	<aphaerese>
2754	2757	<elision3>	<elision3>
2754	2754	<>	<elision3>
2754	2757	<elision2>	<elision2>
2754	2754	<>	<elision2>
2754	2757	<elision1>	<elision1>
2754	2754	<>	<elision1>
2754	248	<2s>	<>
2755	2756	<>	<aphaerese>
2755	2759	<elision3>	<elision3>
2755	2756	<>	<elision3>
2755	2759	<elision2>	<elision2>
2755	2756	<>	<elision2>
2755	2759	<elision1>	<elision1>
2755	2756	<>	<elision1>
2755	249	<2s>	<>
2756	2754	<>	<aphaerese>
2756	2757	<elision3>	<elision3>
2756	2754	<>	<elision3>
2756	2757	<elision2>	<elision2>
2756	2754	<>	<elision2>
2756	2757	<elision1>	<elision1>
2756	2754	<>	<elision1>
2756	247	<2s>	<>
2757	2757	.	.
2757	2757	 	 
2757	2757	<~>	<~>
2757	2757	<split-s>	<split-s>
2757	2757	<split-h>	<split-h>
2757	2757	<name2>	<name2>
2757	2758	<>	<name>
2757	2760	<aphaerese>	<aphaerese>
2757	2757	<>	<aphaerese>
2757	2757	<elision3>	<elision3>
2757	2757	<>	<elision3>
2757	2757	<elision2>	<elision2>
2757	2757	<>	<elision2>
2757	2757	<elision1>	<elision1>
2757	2757	<>	<elision1>
2757	2754	.	υ
2757	2754	.	u
2757	2763	.	κ
2757	2754	.	α
2757	2754	.	a
2757	1940	<2s>	<>
2758	2759	.	.
2758	2759	 	 
2758	2759	<~>	<~>
2758	2759	<split-s>	<split-s>
2758	2759	<split-h>	<split-h>
2758	2759	<name2>	<name2>
2758	2762	<aphaerese>	<aphaerese>
2758	2759	<>	<aphaerese>
2758	2759	<elision3>	<elision3>
2758	2759	<>	<elision3>
2758	2759	<elision2>	<elision2>
2758	2759	<>	<elision2>
2758	2759	<elision1>	<elision1>
2758	2759	<>	<elision1>
2758	2756	.	υ
2758	2756	.	u
2758	2765	.	κ
2758	2756	.	α
2758	2756	.	a
2758	1941	<2s>	<>
2759	2757	.	.
2759	2757	 	 
2759	2757	<~>	<~>
2759	2757	<split-s>	<split-s>
2759	2757	<split-h>	<split-h>
2759	2757	<name2>	<name2>
2759	2760	<aphaerese>	<aphaerese>
2759	2757	<>	<aphaerese>
2759	2757	<elision3>	<elision3>
2759	2757	<>	<elision3>
2759	2757	<elision2>	<elision2>
2759	2757	<>	<elision2>
2759	2757	<elision1>	<elision1>
2759	2757	<>	<elision1>
2759	2754	.	υ
2759	2754	.	u
2759	2763	.	κ
2759	2754	.	α
2759	2754	.	a
2759	1939	<2s>	<>
2760	2757	.	.
2760	2757	 	 
2760	2757	<~>	<~>
2760	2757	<split-s>	<split-s>
2760	2757	<split-h>	<split-h>
2760	2757	<name2>	<name2>
2760	2761	<>	<name>
2760	2760	<aphaerese>	<aphaerese>
2760	2760	<>	<aphaerese>
2760	2757	<elision3>	<elision3>
2760	2760	<>	<elision3>
2760	2757	<elision2>	<elision2>
2760	2760	<>	<elision2>
2760	2757	<elision1>	<elision1>
2760	2760	<>	<elision1>
2760	2757	.	υ
2760	2757	.	u
2760	2763	.	κ
2760	2757	.	α
2760	2757	.	a
2760	1927	<2s>	<>
2761	2759	.	.
2761	2759	 	 
2761	2759	<~>	<~>
2761	2759	<split-s>	<split-s>
2761	2759	<split-h>	<split-h>
2761	2759	<name2>	<name2>
2761	2762	<aphaerese>	<aphaerese>
2761	2762	<>	<aphaerese>
2761	2759	<elision3>	<elision3>
2761	2762	<>	<elision3>
2761	2759	<elision2>	<elision2>
2761	2762	<>	<elision2>
2761	2759	<elision1>	<elision1>
2761	2762	<>	<elision1>
2761	2759	.	υ
2761	2759	.	u
2761	2765	.	κ
2761	2759	.	α
2761	2759	.	a
2761	1928	<2s>	<>
2762	2757	.	.
2762	2757	 	 
2762	2757	<~>	<~>
2762	2757	<split-s>	<split-s>
2762	2757	<split-h>	<split-h>
2762	2757	<name2>	<name2>
2762	2760	<aphaerese>	<aphaerese>
2762	2760	<>	<aphaerese>
2762	2757	<elision3>	<elision3>
2762	2760	<>	<elision3>
2762	2757	<elision2>	<elision2>
2762	2760	<>	<elision2>
2762	2757	<elision1>	<elision1>
2762	2760	<>	<elision1>
2762	2757	.	υ
2762	2757	.	u
2762	2763	.	κ
2762	2757	.	α
2762	2757	.	a
2762	1926	<2s>	<>
2763	2764	<>	<name>
2763	2763	<>	<aphaerese>
2763	2766	<elision3>	<elision3>
2763	2763	<>	<elision3>
2763	2766	<elision2>	<elision2>
2763	2763	<>	<elision2>
2763	2766	<elision1>	<elision1>
2763	2763	<>	<elision1>
2763	1924	<2s>	<>
2764	2765	<>	<aphaerese>
2764	2768	<elision3>	<elision3>
2764	2765	<>	<elision3>
2764	2768	<elision2>	<elision2>
2764	2765	<>	<elision2>
2764	2768	<elision1>	<elision1>
2764	2765	<>	<elision1>
2764	1925	<2s>	<>
2765	2763	<>	<aphaerese>
2765	2766	<elision3>	<elision3>
2765	2763	<>	<elision3>
2765	2766	<elision2>	<elision2>
2765	2763	<>	<elision2>
2765	2766	<elision1>	<elision1>
2765	2763	<>	<elision1>
2765	1923	<2s>	<>
2766	2767	<>	<name>
2766	2766	<>	<aphaerese>
2766	2766	<>	<elision3>
2766	2766	<>	<elision2>
2766	2766	<>	<elision1>
2766	1785	<2s>	<>
2767	2768	<>	<aphaerese>
2767	2768	<>	<elision3>
2767	2768	<>	<elision2>
2767	2768	<>	<elision1>
2767	1786	<2s>	<>
2768	2766	<>	<aphaerese>
2768	2766	<>	<elision3>
2768	2766	<>	<elision2>
2768	2766	<>	<elision1>
2768	1784	<2s>	<>
2769	2770	<name>	<name>
2769	2771	<>	<name>
2769	2773	<>	<aphaerese>
2769	2773	<>	<elision3>
2769	2773	<>	<elision2>
2769	2773	<>	<elision1>
2769	2257	<2s>	<>
2769	2774	<L2kl>	<>
2769	2780	<K2kl>	<>
2770	2734	s	k
2770	2741	s	l
2770	2147	<2s>	<>
2771	2772	<>	<aphaerese>
2771	2772	<>	<elision3>
2771	2772	<>	<elision2>
2771	2772	<>	<elision1>
2771	2775	<L2kl>	<>
2771	2778	<K2kl>	<>
2772	2773	<>	<aphaerese>
2772	2773	<>	<elision3>
2772	2773	<>	<elision2>
2772	2773	<>	<elision1>
2772	2776	<L2kl>	<>
2772	2779	<K2kl>	<>
2773	2771	<>	<name>
2773	2773	<>	<aphaerese>
2773	2773	<>	<elision3>
2773	2773	<>	<elision2>
2773	2773	<>	<elision1>
2773	2774	<L2kl>	<>
2773	2777	<K2kl>	<>
2774	2775	<>	<name>
2774	2774	<>	<aphaerese>
2774	2774	<>	<elision3>
2774	2774	<>	<elision2>
2774	2774	<>	<elision1>
2774	2754	.	κ
2774	2754	.	λ
2774	2316	<2s>	<>
2775	2776	<>	<aphaerese>
2775	2776	<>	<elision3>
2775	2776	<>	<elision2>
2775	2776	<>	<elision1>
2775	2756	.	κ
2775	2756	.	λ
2775	2317	<2s>	<>
2776	2774	<>	<aphaerese>
2776	2774	<>	<elision3>
2776	2774	<>	<elision2>
2776	2774	<>	<elision1>
2776	2754	.	κ
2776	2754	.	λ
2776	2315	<2s>	<>
2777	2757	.	.
2777	2757	 	 
2777	2757	<~>	<~>
2777	2757	<split-s>	<split-s>
2777	2757	<split-h>	<split-h>
2777	2757	<name2>	<name2>
2777	2778	<>	<name>
2777	2760	<aphaerese>	<aphaerese>
2777	2777	<>	<aphaerese>
2777	2757	<elision3>	<elision3>
2777	2777	<>	<elision3>
2777	2757	<elision2>	<elision2>
2777	2777	<>	<elision2>
2777	2757	<elision1>	<elision1>
2777	2777	<>	<elision1>
2777	2754	.	υ
2777	2754	.	u
2777	2754	.	α
2777	2754	.	a
2777	2252	<2s>	<>
2778	2759	.	.
2778	2759	 	 
2778	2759	<~>	<~>
2778	2759	<split-s>	<split-s>
2778	2759	<split-h>	<split-h>
2778	2759	<name2>	<name2>
2778	2762	<aphaerese>	<aphaerese>
2778	2779	<>	<aphaerese>
2778	2759	<elision3>	<elision3>
2778	2779	<>	<elision3>
2778	2759	<elision2>	<elision2>
2778	2779	<>	<elision2>
2778	2759	<elision1>	<elision1>
2778	2779	<>	<elision1>
2778	2756	.	υ
2778	2756	.	u
2778	2756	.	α
2778	2756	.	a
2778	2253	<2s>	<>
2779	2757	.	.
2779	2757	 	 
2779	2757	<~>	<~>
2779	2757	<split-s>	<split-s>
2779	2757	<split-h>	<split-h>
2779	2757	<name2>	<name2>
2779	2760	<aphaerese>	<aphaerese>
2779	2777	<>	<aphaerese>
2779	2757	<elision3>	<elision3>
2779	2777	<>	<elision3>
2779	2757	<elision2>	<elision2>
2779	2777	<>	<elision2>
2779	2757	<elision1>	<elision1>
2779	2777	<>	<elision1>
2779	2754	.	υ
2779	2754	.	u
2779	2754	.	α
2779	2754	.	a
2779	2251	<2s>	<>
2780	2757	.	.
2780	2757	 	 
2780	2757	<~>	<~>
2780	2757	<split-s>	<split-s>
2780	2757	<split-h>	<split-h>
2780	2757	<name2>	<name2>
2780	2781	<name2>	<name>
2780	2778	<>	<name>
2780	2760	<aphaerese>	<aphaerese>
2780	2777	<>	<aphaerese>
2780	2757	<elision3>	<elision3>
2780	2777	<>	<elision3>
2780	2757	<elision2>	<elision2>
2780	2777	<>	<elision2>
2780	2757	<elision1>	<elision1>
2780	2777	<>	<elision1>
2780	2754	.	υ
2780	2754	.	u
2780	2754	.	α
2780	2754	.	a
2780	2261	<2s>	<>
2781	2147	<2s>	<>
2782	2757	.	.
2782	2757	 	 
2782	2757	<~>	<~>
2782	2757	<split-s>	<split-s>
2782	2757	<split-h>	<split-h>
2782	2757	<name2>	<name2>
2782	2783	<>	<name>
2782	2760	<aphaerese>	<aphaerese>
2782	2782	<>	<aphaerese>
2782	2757	<elision3>	<elision3>
2782	2782	<>	<elision3>
2782	2757	<elision2>	<elision2>
2782	2782	<>	<elision2>
2782	2757	<elision1>	<elision1>
2782	2782	<>	<elision1>
2782	2754	.	υ
2782	2754	.	u
2782	2754	.	κ
2782	2754	.	α
2782	2754	.	a
2782	2754	.	λ
2782	2137	<2s>	<>
2783	2759	.	.
2783	2759	 	 
2783	2759	<~>	<~>
2783	2759	<split-s>	<split-s>
2783	2759	<split-h>	<split-h>
2783	2759	<name2>	<name2>
2783	2762	<aphaerese>	<aphaerese>
2783	2784	<>	<aphaerese>
2783	2759	<elision3>	<elision3>
2783	2784	<>	<elision3>
2783	2759	<elision2>	<elision2>
2783	2784	<>	<elision2>
2783	2759	<elision1>	<elision1>
2783	2784	<>	<elision1>
2783	2756	.	υ
2783	2756	.	u
2783	2756	.	κ
2783	2756	.	α
2783	2756	.	a
2783	2756	.	λ
2783	2138	<2s>	<>
2784	2757	.	.
2784	2757	 	 
2784	2757	<~>	<~>
2784	2757	<split-s>	<split-s>
2784	2757	<split-h>	<split-h>
2784	2757	<name2>	<name2>
2784	2760	<aphaerese>	<aphaerese>
2784	2782	<>	<aphaerese>
2784	2757	<elision3>	<elision3>
2784	2782	<>	<elision3>
2784	2757	<elision2>	<elision2>
2784	2782	<>	<elision2>
2784	2757	<elision1>	<elision1>
2784	2782	<>	<elision1>
2784	2754	.	υ
2784	2754	.	u
2784	2754	.	κ
2784	2754	.	α
2784	2754	.	a
2784	2754	.	λ
2784	2136	<2s>	<>
2785	2781	<name>	<name>
2785	2786	<>	<name>
2785	2788	<>	<aphaerese>
2785	2788	<>	<elision3>
2785	2788	<>	<elision2>
2785	2788	<>	<elision1>
2785	2257	<2s>	<>
2785	2789	<L2kl>	<>
2786	2787	<>	<aphaerese>
2786	2787	<>	<elision3>
2786	2787	<>	<elision2>
2786	2787	<>	<elision1>
2786	2783	<L2kl>	<>
2787	2788	<>	<aphaerese>
2787	2788	<>	<elision3>
2787	2788	<>	<elision2>
2787	2788	<>	<elision1>
2787	2784	<L2kl>	<>
2788	2786	<>	<name>
2788	2788	<>	<aphaerese>
2788	2788	<>	<elision3>
2788	2788	<>	<elision2>
2788	2788	<>	<elision1>
2788	2782	<L2kl>	<>
2789	2757	.	.
2789	2757	 	 
2789	2757	<~>	<~>
2789	2757	<split-s>	<split-s>
2789	2757	<split-h>	<split-h>
2789	2757	<name2>	<name2>
2789	2781	<name2>	<name>
2789	2783	<>	<name>
2789	2760	<aphaerese>	<aphaerese>
2789	2782	<>	<aphaerese>
2789	2757	<elision3>	<elision3>
2789	2782	<>	<elision3>
2789	2757	<elision2>	<elision2>
2789	2782	<>	<elision2>
2789	2757	<elision1>	<elision1>
2789	2782	<>	<elision1>
2789	2754	.	υ
2789	2754	.	u
2789	2754	.	κ
2789	2754	.	α
2789	2754	.	a
2789	2754	.	λ
2789	2326	<2s>	<>
2790	2624	<>	<name>
2790	2623	<>	<aphaerese>
2790	2623	<>	<elision3>
2790	2623	<>	<elision2>
2790	2623	<>	<elision1>
2790	2626	s	κ
2790	2751	s	k
2790	2769	s	K
2790	2626	s	λ
2790	2782	s	l
2790	2785	s	L
2790	2791	<1s>	<>
2791	1961	<>	<name>
2791	1960	<>	<aphaerese>
2791	1960	<>	<elision3>
2791	1960	<>	<elision2>
2791	1960	<>	<elision1>
2791	2792	<K>	<>
2792	1987	<>	<name>
2792	1989	<>	<aphaerese>
2792	1989	<>	<elision3>
2792	1989	<>	<elision2>
2792	1989	<>	<elision1>
2793	2794	<>	<name>
2793	2796	<>	<aphaerese>
2793	2796	<>	<elision3>
2793	2796	<>	<elision2>
2793	2796	<>	<elision1>
2793	232	<k2K>	<>
2793	2790	<k2L>	<>
2794	2795	<>	<aphaerese>
2794	2795	<>	<elision3>
2794	2795	<>	<elision2>
2794	2795	<>	<elision1>
2794	233	<k2K>	<>
2794	2624	<k2L>	<>
2795	2796	<>	<aphaerese>
2795	2796	<>	<elision3>
2795	2796	<>	<elision2>
2795	2796	<>	<elision1>
2795	234	<k2K>	<>
2795	2625	<k2L>	<>
2796	2794	<>	<name>
2796	2796	<>	<aphaerese>
2796	2796	<>	<elision3>
2796	2796	<>	<elision2>
2796	2796	<>	<elision1>
2796	232	<k2K>	<>
2796	2623	<k2L>	<>
2797	2798	<>	<name>
2797	2800	<>	<aphaerese>
2797	2800	<>	<elision3>
2797	2800	<>	<elision2>
2797	2800	<>	<elision1>
2797	235	s	κ
2797	2567	s	k
2797	2600	s	K
2797	235	s	λ
2797	2615	s	l
2797	2618	s	L
2797	2790	<K2L>	<>
2798	2799	<>	<aphaerese>
2798	2799	<>	<elision3>
2798	2799	<>	<elision2>
2798	2799	<>	<elision1>
2798	2560	s	κ
2798	2569	s	k
2798	2603	s	K
2798	2560	s	λ
2798	2617	s	l
2798	2620	s	L
2798	2624	<K2L>	<>
2799	2800	<>	<aphaerese>
2799	2800	<>	<elision3>
2799	2800	<>	<elision2>
2799	2800	<>	<elision1>
2799	235	s	κ
2799	2567	s	k
2799	2600	s	K
2799	235	s	λ
2799	2615	s	l
2799	2618	s	L
2799	2625	<K2L>	<>
2800	2798	<>	<name>
2800	2800	<>	<aphaerese>
2800	2800	<>	<elision3>
2800	2800	<>	<elision2>
2800	2800	<>	<elision1>
2800	235	s	κ
2800	2567	s	k
2800	2600	s	K
2800	235	s	λ
2800	2615	s	l
2800	2618	s	L
2800	2623	<K2L>	<>
2801	2802	<>	<name>
2801	2801	<>	<aphaerese>
2801	2801	<>	<elision3>
2801	2801	<>	<elision2>
2801	2801	<>	<elision1>
2801	2623	<lambda2L>	<>
2802	2803	<>	<aphaerese>
2802	2803	<>	<elision3>
2802	2803	<>	<elision2>
2802	2803	<>	<elision1>
2802	2624	<lambda2L>	<>
2803	2801	<>	<aphaerese>
2803	2801	<>	<elision3>
2803	2801	<>	<elision2>
2803	2801	<>	<elision1>
2803	2625	<lambda2L>	<>
2804	2805	<>	<name>
2804	2804	<>	<aphaerese>
2804	2804	<>	<elision3>
2804	2804	<>	<elision2>
2804	2804	<>	<elision1>
2804	2623	<l2L>	<>
2805	2806	<>	<aphaerese>
2805	2806	<>	<elision3>
2805	2806	<>	<elision2>
2805	2806	<>	<elision1>
2805	2624	<l2L>	<>
2806	2804	<>	<aphaerese>
2806	2804	<>	<elision3>
2806	2804	<>	<elision2>
2806	2804	<>	<elision1>
2806	2625	<l2L>	<>
2807	231	<>	<aphaerese>
2807	231	<>	<elision3>
2807	231	<>	<elision2>
2807	231	<>	<elision1>
2807	234	<kappa2K>	<>
2807	2808	<kappa2L>	<>
2808	2623	<>	<aphaerese>
2808	2623	<>	<elision3>
2808	2623	<>	<elision2>
2808	2623	<>	<elision1>
2808	2626	s	κ
2808	2751	s	k
2808	2769	s	K
2808	2626	s	λ
2808	2782	s	l
2808	2785	s	L
2808	2809	<1s>	<>
2809	1960	<>	<aphaerese>
2809	1960	<>	<elision3>
2809	1960	<>	<elision2>
2809	1960	<>	<elision1>
2809	2810	<K>	<>
2810	1989	<>	<aphaerese>
2810	1989	<>	<elision3>
2810	1989	<>	<elision2>
2810	1989	<>	<elision1>
2811	2796	<>	<aphaerese>
2811	2796	<>	<elision3>
2811	2796	<>	<elision2>
2811	2796	<>	<elision1>
2811	234	<k2K>	<>
2811	2808	<k2L>	<>
2812	2800	<>	<aphaerese>
2812	2800	<>	<elision3>
2812	2800	<>	<elision2>
2812	2800	<>	<elision1>
2812	235	s	κ
2812	2567	s	k
2812	2600	s	K
2812	235	s	λ
2812	2615	s	l
2812	2618	s	L
2812	2808	<K2L>	<>
2813	2814	<>	<name>
2813	2816	<>	<aphaerese>
2813	2816	<>	<elision3>
2813	2816	<>	<elision2>
2813	2816	<>	<elision1>
2813	2817	<kappa2K>	<>
2813	3138	<kappa2L>	<>
2813	3135	<lambda2L>	<>
2814	2815	<>	<aphaerese>
2814	2815	<>	<elision3>
2814	2815	<>	<elision2>
2814	2815	<>	<elision1>
2814	2953	<kappa2K>	<>
2814	3099	<kappa2L>	<>
2814	3136	<lambda2L>	<>
2815	2816	<>	<aphaerese>
2815	2816	<>	<elision3>
2815	2816	<>	<elision2>
2815	2816	<>	<elision1>
2815	2954	<kappa2K>	<>
2815	3100	<kappa2L>	<>
2815	3137	<lambda2L>	<>
2816	2814	<>	<name>
2816	2816	<>	<aphaerese>
2816	2816	<>	<elision3>
2816	2816	<>	<elision2>
2816	2816	<>	<elision1>
2816	2817	<kappa2K>	<>
2816	2983	<kappa2L>	<>
2816	3135	<lambda2L>	<>
2817	2818	.	.
2817	2819	 	 
2817	2818	<~>	<~>
2817	2818	<split-s>	<split-s>
2817	2818	<split-h>	<split-h>
2817	2818	<name2>	<name2>
2817	2953	<>	<name>
2817	2822	<aphaerese>	<aphaerese>
2817	2817	<>	<aphaerese>
2817	2955	<elision3>	<elision3>
2817	2817	<>	<elision3>
2817	2955	<elision2>	<elision2>
2817	2817	<>	<elision2>
2817	2955	<elision1>	<elision1>
2817	2817	<>	<elision1>
2817	2826	.	υ
2817	2829	s	υ
2817	2826	.	u
2817	2829	s	u
2817	235	s	κ
2817	2567	s	k
2817	2892	s	U
2817	2600	s	K
2817	2826	.	α
2817	2920	s	α
2817	2826	.	a
2817	2920	s	a
2817	2923	s	A
2817	235	s	λ
2817	2615	s	l
2817	2618	s	L
2818	2818	.	.
2818	2819	 	 
2818	2818	<~>	<~>
2818	2818	<split-s>	<split-s>
2818	2818	<split-h>	<split-h>
2818	2818	<name2>	<name2>
2818	2952	<>	<name>
2818	2822	<aphaerese>	<aphaerese>
2818	2818	<>	<aphaerese>
2818	2818	<elision3>	<elision3>
2818	2818	<>	<elision3>
2818	2818	<elision2>	<elision2>
2818	2818	<>	<elision2>
2818	2818	<elision1>	<elision1>
2818	2818	<>	<elision1>
2818	2826	.	υ
2818	2829	s	υ
2818	2826	.	u
2818	2829	s	u
2818	2832	.	κ
2818	2850	s	κ
2818	2567	s	k
2818	2892	s	U
2818	2600	s	K
2818	2826	.	α
2818	2920	s	α
2818	2826	.	a
2818	2920	s	a
2818	2923	s	A
2818	2926	s	λ
2818	2615	s	l
2818	2618	s	L
2819	2818	.	.
2819	2819	 	 
2819	2818	<~>	<~>
2819	2818	<split-s>	<split-s>
2819	2818	<split-h>	<split-h>
2819	2818	<name2>	<name2>
2819	2820	<>	<name>
2819	2822	<aphaerese>	<aphaerese>
2819	2825	<>	<aphaerese>
2819	2818	<elision3>	<elision3>
2819	2825	<>	<elision3>
2819	2818	<elision2>	<elision2>
2819	2825	<>	<elision2>
2819	2818	<elision1>	<elision1>
2819	2825	<>	<elision1>
2819	2826	.	υ
2819	2937	s	υ
2819	2826	.	u
2819	2937	s	u
2819	2832	.	κ
2819	2938	s	κ
2819	2939	s	k
2819	2940	s	U
2819	2942	s	K
2819	2826	.	α
2819	2944	s	α
2819	2826	.	a
2819	2944	s	a
2819	2945	s	A
2819	2946	s	λ
2819	2947	s	l
2819	2948	s	L
2820	2821	.	.
2820	2824	 	 
2820	2821	<~>	<~>
2820	2821	<split-s>	<split-s>
2820	2821	<split-h>	<split-h>
2820	2821	<name2>	<name2>
2820	2950	<aphaerese>	<aphaerese>
2820	2951	<>	<aphaerese>
2820	2821	<elision3>	<elision3>
2820	2951	<>	<elision3>
2820	2821	<elision2>	<elision2>
2820	2951	<>	<elision2>
2820	2821	<elision1>	<elision1>
2820	2951	<>	<elision1>
2820	2828	.	υ
2820	2831	s	υ
2820	2828	.	u
2820	2831	s	u
2820	2834	.	κ
2820	2852	s	κ
2820	2569	s	k
2820	2894	s	U
2820	2897	s	K
2820	2828	.	α
2820	2922	s	α
2820	2828	.	a
2820	2922	s	a
2820	2925	s	A
2820	2928	s	λ
2820	2617	s	l
2820	2931	s	L
2821	2818	.	.
2821	2819	 	 
2821	2818	<~>	<~>
2821	2818	<split-s>	<split-s>
2821	2818	<split-h>	<split-h>
2821	2818	<name2>	<name2>
2821	2822	<aphaerese>	<aphaerese>
2821	2818	<>	<aphaerese>
2821	2818	<elision3>	<elision3>
2821	2818	<>	<elision3>
2821	2818	<elision2>	<elision2>
2821	2818	<>	<elision2>
2821	2818	<elision1>	<elision1>
2821	2818	<>	<elision1>
2821	2826	.	υ
2821	2829	s	υ
2821	2826	.	u
2821	2829	s	u
2821	2832	.	κ
2821	2850	s	κ
2821	2567	s	k
2821	2892	s	U
2821	2600	s	K
2821	2826	.	α
2821	2920	s	α
2821	2826	.	a
2821	2920	s	a
2821	2923	s	A
2821	2926	s	λ
2821	2615	s	l
2821	2618	s	L
2822	2818	.	.
2822	2819	 	 
2822	2818	<~>	<~>
2822	2818	<split-s>	<split-s>
2822	2818	<split-h>	<split-h>
2822	2818	<name2>	<name2>
2822	2823	<>	<name>
2822	2822	<aphaerese>	<aphaerese>
2822	2822	<>	<aphaerese>
2822	2818	<elision3>	<elision3>
2822	2822	<>	<elision3>
2822	2818	<elision2>	<elision2>
2822	2822	<>	<elision2>
2822	2818	<elision1>	<elision1>
2822	2822	<>	<elision1>
2822	2818	.	υ
2822	2818	.	u
2822	2832	.	κ
2822	2850	s	κ
2822	2567	s	k
2822	2892	s	U
2822	2600	s	K
2822	2818	.	α
2822	2818	.	a
2822	2923	s	A
2822	2926	s	λ
2822	2615	s	l
2822	2618	s	L
2823	2821	.	.
2823	2824	 	 
2823	2821	<~>	<~>
2823	2821	<split-s>	<split-s>
2823	2821	<split-h>	<split-h>
2823	2821	<name2>	<name2>
2823	2950	<aphaerese>	<aphaerese>
2823	2950	<>	<aphaerese>
2823	2821	<elision3>	<elision3>
2823	2950	<>	<elision3>
2823	2821	<elision2>	<elision2>
2823	2950	<>	<elision2>
2823	2821	<elision1>	<elision1>
2823	2950	<>	<elision1>
2823	2821	.	υ
2823	2821	.	u
2823	2834	.	κ
2823	2852	s	κ
2823	2569	s	k
2823	2894	s	U
2823	2603	s	K
2823	2821	.	α
2823	2821	.	a
2823	2925	s	A
2823	2928	s	λ
2823	2617	s	l
2823	2620	s	L
2824	2818	.	.
2824	2819	 	 
2824	2818	<~>	<~>
2824	2818	<split-s>	<split-s>
2824	2818	<split-h>	<split-h>
2824	2818	<name2>	<name2>
2824	2822	<aphaerese>	<aphaerese>
2824	2825	<>	<aphaerese>
2824	2818	<elision3>	<elision3>
2824	2825	<>	<elision3>
2824	2818	<elision2>	<elision2>
2824	2825	<>	<elision2>
2824	2818	<elision1>	<elision1>
2824	2825	<>	<elision1>
2824	2826	.	υ
2824	2937	s	υ
2824	2826	.	u
2824	2937	s	u
2824	2832	.	κ
2824	2938	s	κ
2824	2939	s	k
2824	2940	s	U
2824	2942	s	K
2824	2826	.	α
2824	2944	s	α
2824	2826	.	a
2824	2944	s	a
2824	2945	s	A
2824	2946	s	λ
2824	2947	s	l
2824	2948	s	L
2825	2818	.	.
2825	2819	 	 
2825	2818	<~>	<~>
2825	2818	<split-s>	<split-s>
2825	2818	<split-h>	<split-h>
2825	2818	<name2>	<name2>
2825	2820	<>	<name>
2825	2822	<aphaerese>	<aphaerese>
2825	2825	<>	<aphaerese>
2825	2818	<elision3>	<elision3>
2825	2825	<>	<elision3>
2825	2818	<elision2>	<elision2>
2825	2825	<>	<elision2>
2825	2818	<elision1>	<elision1>
2825	2825	<>	<elision1>
2825	2826	.	υ
2825	2829	s	υ
2825	2826	.	u
2825	2829	s	u
2825	2832	.	κ
2825	2850	s	κ
2825	2567	s	k
2825	2892	s	U
2825	2895	s	K
2825	2826	.	α
2825	2920	s	α
2825	2826	.	a
2825	2920	s	a
2825	2923	s	A
2825	2926	s	λ
2825	2615	s	l
2825	2929	s	L
2826	2827	<>	<name>
2826	2826	<>	<aphaerese>
2826	2818	<elision3>	<elision3>
2826	2826	<>	<elision3>
2826	2818	<elision2>	<elision2>
2826	2826	<>	<elision2>
2826	2818	<elision1>	<elision1>
2826	2826	<>	<elision1>
2827	2828	<>	<aphaerese>
2827	2821	<elision3>	<elision3>
2827	2828	<>	<elision3>
2827	2821	<elision2>	<elision2>
2827	2828	<>	<elision2>
2827	2821	<elision1>	<elision1>
2827	2828	<>	<elision1>
2828	2826	<>	<aphaerese>
2828	2818	<elision3>	<elision3>
2828	2826	<>	<elision3>
2828	2818	<elision2>	<elision2>
2828	2826	<>	<elision2>
2828	2818	<elision1>	<elision1>
2828	2826	<>	<elision1>
2829	236	.	.
2829	237	 	 
2829	236	<~>	<~>
2829	236	<split-s>	<split-s>
2829	236	<split-h>	<split-h>
2829	236	<name2>	<name2>
2829	2830	<>	<name>
2829	240	<aphaerese>	<aphaerese>
2829	2829	<>	<aphaerese>
2829	2829	<>	<elision3>
2829	2829	<>	<elision2>
2829	2829	<>	<elision1>
2829	244	.	υ
2829	1756	s	υ
2829	244	.	u
2829	1756	s	u
2829	2338	.	κ
2829	2368	s	κ
2829	2421	s	k
2829	2442	s	U
2829	2541	s	K
2829	244	.	α
2829	2497	s	α
2829	244	.	a
2829	2497	s	a
2829	2500	s	A
2829	2503	s	λ
2829	2506	s	l
2829	2551	s	L
2829	1945	<2s>	<>
2830	239	.	.
2830	242	 	 
2830	239	<~>	<~>
2830	239	<split-s>	<split-s>
2830	239	<split-h>	<split-h>
2830	239	<name2>	<name2>
2830	2540	<aphaerese>	<aphaerese>
2830	2831	<>	<aphaerese>
2830	2831	<>	<elision3>
2830	2831	<>	<elision2>
2830	2831	<>	<elision1>
2830	246	.	υ
2830	2334	s	υ
2830	246	.	u
2830	2334	s	u
2830	2340	.	κ
2830	2370	s	κ
2830	2423	s	k
2830	2444	s	U
2830	2543	s	K
2830	246	.	α
2830	2499	s	α
2830	246	.	a
2830	2499	s	a
2830	2502	s	A
2830	2505	s	λ
2830	2508	s	l
2830	2553	s	L
2830	1946	<2s>	<>
2831	236	.	.
2831	237	 	 
2831	236	<~>	<~>
2831	236	<split-s>	<split-s>
2831	236	<split-h>	<split-h>
2831	236	<name2>	<name2>
2831	240	<aphaerese>	<aphaerese>
2831	2829	<>	<aphaerese>
2831	2829	<>	<elision3>
2831	2829	<>	<elision2>
2831	2829	<>	<elision1>
2831	244	.	υ
2831	1756	s	υ
2831	244	.	u
2831	1756	s	u
2831	2338	.	κ
2831	2368	s	κ
2831	2421	s	k
2831	2442	s	U
2831	2541	s	K
2831	244	.	α
2831	2497	s	α
2831	244	.	a
2831	2497	s	a
2831	2500	s	A
2831	2503	s	λ
2831	2506	s	l
2831	2551	s	L
2831	1944	<2s>	<>
2832	2833	<>	<name>
2832	2832	<>	<aphaerese>
2832	2835	<elision3>	<elision3>
2832	2832	<>	<elision3>
2832	2835	<elision2>	<elision2>
2832	2832	<>	<elision2>
2832	2835	<elision1>	<elision1>
2832	2832	<>	<elision1>
2833	2834	<>	<aphaerese>
2833	2837	<elision3>	<elision3>
2833	2834	<>	<elision3>
2833	2837	<elision2>	<elision2>
2833	2834	<>	<elision2>
2833	2837	<elision1>	<elision1>
2833	2834	<>	<elision1>
2834	2832	<>	<aphaerese>
2834	2835	<elision3>	<elision3>
2834	2832	<>	<elision3>
2834	2835	<elision2>	<elision2>
2834	2832	<>	<elision2>
2834	2835	<elision1>	<elision1>
2834	2832	<>	<elision1>
2835	2836	<>	<name>
2835	2835	<>	<aphaerese>
2835	2835	<>	<elision3>
2835	2835	<>	<elision2>
2835	2835	<>	<elision1>
2835	2838	s	κ
2835	2838	s	k
2835	2841	s	K
2835	2838	s	λ
2835	2845	s	l
2835	2847	s	L
2836	2837	<>	<aphaerese>
2836	2837	<>	<elision3>
2836	2837	<>	<elision2>
2836	2837	<>	<elision1>
2836	2840	s	κ
2836	2840	s	k
2836	2843	s	K
2836	2840	s	λ
2836	2844	s	l
2836	2849	s	L
2837	2835	<>	<aphaerese>
2837	2835	<>	<elision3>
2837	2835	<>	<elision2>
2837	2835	<>	<elision1>
2837	2838	s	κ
2837	2838	s	k
2837	2841	s	K
2837	2838	s	λ
2837	2845	s	l
2837	2847	s	L
2838	2839	<>	<name>
2838	2838	<>	<aphaerese>
2838	2838	<>	<elision3>
2838	2838	<>	<elision2>
2838	2838	<>	<elision1>
2838	2561	s	κ
2838	2421	s	k
2838	2541	s	K
2838	2561	s	λ
2838	2506	s	l
2838	2551	s	L
2838	1960	<2s>	<>
2839	2840	<>	<aphaerese>
2839	2840	<>	<elision3>
2839	2840	<>	<elision2>
2839	2840	<>	<elision1>
2839	2563	s	κ
2839	2423	s	k
2839	2543	s	K
2839	2563	s	λ
2839	2508	s	l
2839	2553	s	L
2839	1961	<2s>	<>
2840	2838	<>	<aphaerese>
2840	2838	<>	<elision3>
2840	2838	<>	<elision2>
2840	2838	<>	<elision1>
2840	2561	s	κ
2840	2421	s	k
2840	2541	s	K
2840	2561	s	λ
2840	2506	s	l
2840	2551	s	L
2840	1959	<2s>	<>
2841	2842	<>	<name>
2841	2841	<>	<aphaerese>
2841	2841	<>	<elision3>
2841	2841	<>	<elision2>
2841	2841	<>	<elision1>
2841	2845	<K2kl>	<>
2842	2843	<>	<aphaerese>
2842	2843	<>	<elision3>
2842	2843	<>	<elision2>
2842	2843	<>	<elision1>
2842	2846	<K2kl>	<>
2843	2841	<>	<aphaerese>
2843	2841	<>	<elision3>
2843	2841	<>	<elision2>
2843	2841	<>	<elision1>
2843	2844	<K2kl>	<>
2844	2845	<>	<aphaerese>
2844	2845	<>	<elision3>
2844	2845	<>	<elision2>
2844	2845	<>	<elision1>
2844	2611	s	κ
2844	2506	s	k
2844	2597	s	K
2844	2611	s	λ
2844	2506	s	l
2844	2551	s	L
2844	1959	<2s>	<>
2845	2846	<>	<name>
2845	2845	<>	<aphaerese>
2845	2845	<>	<elision3>
2845	2845	<>	<elision2>
2845	2845	<>	<elision1>
2845	2611	s	κ
2845	2506	s	k
2845	2597	s	K
2845	2611	s	λ
2845	2506	s	l
2845	2551	s	L
2845	1960	<2s>	<>
2846	2844	<>	<aphaerese>
2846	2844	<>	<elision3>
2846	2844	<>	<elision2>
2846	2844	<>	<elision1>
2846	2613	s	κ
2846	2508	s	k
2846	2543	s	K
2846	2613	s	λ
2846	2508	s	l
2846	2553	s	L
2846	1961	<2s>	<>
2847	2848	<>	<name>
2847	2847	<>	<aphaerese>
2847	2847	<>	<elision3>
2847	2847	<>	<elision2>
2847	2847	<>	<elision1>
2847	2845	<L2kl>	<>
2848	2849	<>	<aphaerese>
2848	2849	<>	<elision3>
2848	2849	<>	<elision2>
2848	2849	<>	<elision1>
2848	2846	<L2kl>	<>
2849	2847	<>	<aphaerese>
2849	2847	<>	<elision3>
2849	2847	<>	<elision2>
2849	2847	<>	<elision1>
2849	2844	<L2kl>	<>
2850	236	.	.
2850	237	 	 
2850	236	<~>	<~>
2850	236	<split-s>	<split-s>
2850	236	<split-h>	<split-h>
2850	236	<name2>	<name2>
2850	2851	<>	<name>
2850	240	<aphaerese>	<aphaerese>
2850	2850	<>	<aphaerese>
2850	2853	<elision3>	<elision3>
2850	2850	<>	<elision3>
2850	2853	<elision2>	<elision2>
2850	2850	<>	<elision2>
2850	2853	<elision1>	<elision1>
2850	2850	<>	<elision1>
2850	244	.	υ
2850	1756	s	υ
2850	244	.	u
2850	1756	s	u
2850	244	.	κ
2850	2561	s	κ
2850	2421	s	k
2850	2442	s	U
2850	2541	s	K
2850	244	.	α
2850	2497	s	α
2850	244	.	a
2850	2497	s	a
2850	2500	s	A
2850	244	.	λ
2850	2561	s	λ
2850	2506	s	l
2850	2551	s	L
2850	2125	<2s>	<>
2851	239	.	.
2851	242	 	 
2851	239	<~>	<~>
2851	239	<split-s>	<split-s>
2851	239	<split-h>	<split-h>
2851	239	<name2>	<name2>
2851	2540	<aphaerese>	<aphaerese>
2851	2852	<>	<aphaerese>
2851	2855	<elision3>	<elision3>
2851	2852	<>	<elision3>
2851	2855	<elision2>	<elision2>
2851	2852	<>	<elision2>
2851	2855	<elision1>	<elision1>
2851	2852	<>	<elision1>
2851	246	.	υ
2851	2334	s	υ
2851	246	.	u
2851	2334	s	u
2851	246	.	κ
2851	2563	s	κ
2851	2423	s	k
2851	2444	s	U
2851	2543	s	K
2851	246	.	α
2851	2499	s	α
2851	246	.	a
2851	2499	s	a
2851	2502	s	A
2851	246	.	λ
2851	2563	s	λ
2851	2508	s	l
2851	2553	s	L
2851	2126	<2s>	<>
2852	236	.	.
2852	237	 	 
2852	236	<~>	<~>
2852	236	<split-s>	<split-s>
2852	236	<split-h>	<split-h>
2852	236	<name2>	<name2>
2852	240	<aphaerese>	<aphaerese>
2852	2850	<>	<aphaerese>
2852	2853	<elision3>	<elision3>
2852	2850	<>	<elision3>
2852	2853	<elision2>	<elision2>
2852	2850	<>	<elision2>
2852	2853	<elision1>	<elision1>
2852	2850	<>	<elision1>
2852	244	.	υ
2852	1756	s	υ
2852	244	.	u
2852	1756	s	u
2852	244	.	κ
2852	2561	s	κ
2852	2421	s	k
2852	2442	s	U
2852	2541	s	K
2852	244	.	α
2852	2497	s	α
2852	244	.	a
2852	2497	s	a
2852	2500	s	A
2852	244	.	λ
2852	2561	s	λ
2852	2506	s	l
2852	2551	s	L
2852	2124	<2s>	<>
2853	236	.	.
2853	237	 	 
2853	236	<~>	<~>
2853	236	<split-s>	<split-s>
2853	236	<split-h>	<split-h>
2853	236	<name2>	<name2>
2853	2854	<>	<name>
2853	240	<aphaerese>	<aphaerese>
2853	2853	<>	<aphaerese>
2853	236	<elision3>	<elision3>
2853	2853	<>	<elision3>
2853	236	<elision2>	<elision2>
2853	2853	<>	<elision2>
2853	236	<elision1>	<elision1>
2853	2853	<>	<elision1>
2853	244	.	υ
2853	1756	s	υ
2853	244	.	u
2853	1756	s	u
2853	2338	.	κ
2853	2856	s	κ
2853	2862	s	k
2853	2442	s	U
2853	2868	s	K
2853	244	.	α
2853	2497	s	α
2853	244	.	a
2853	2497	s	a
2853	2500	s	A
2853	2880	s	λ
2853	2883	s	l
2853	2886	s	L
2853	2028	<2s>	<>
2854	239	.	.
2854	242	 	 
2854	239	<~>	<~>
2854	239	<split-s>	<split-s>
2854	239	<split-h>	<split-h>
2854	239	<name2>	<name2>
2854	2540	<aphaerese>	<aphaerese>
2854	2855	<>	<aphaerese>
2854	239	<elision3>	<elision3>
2854	2855	<>	<elision3>
2854	239	<elision2>	<elision2>
2854	2855	<>	<elision2>
2854	239	<elision1>	<elision1>
2854	2855	<>	<elision1>
2854	246	.	υ
2854	2334	s	υ
2854	246	.	u
2854	2334	s	u
2854	2340	.	κ
2854	2858	s	κ
2854	2864	s	k
2854	2444	s	U
2854	2870	s	K
2854	246	.	α
2854	2499	s	α
2854	246	.	a
2854	2499	s	a
2854	2502	s	A
2854	2882	s	λ
2854	2885	s	l
2854	2888	s	L
2854	2029	<2s>	<>
2855	236	.	.
2855	237	 	 
2855	236	<~>	<~>
2855	236	<split-s>	<split-s>
2855	236	<split-h>	<split-h>
2855	236	<name2>	<name2>
2855	240	<aphaerese>	<aphaerese>
2855	2853	<>	<aphaerese>
2855	236	<elision3>	<elision3>
2855	2853	<>	<elision3>
2855	236	<elision2>	<elision2>
2855	2853	<>	<elision2>
2855	236	<elision1>	<elision1>
2855	2853	<>	<elision1>
2855	244	.	υ
2855	1756	s	υ
2855	244	.	u
2855	1756	s	u
2855	2338	.	κ
2855	2856	s	κ
2855	2862	s	k
2855	2442	s	U
2855	2868	s	K
2855	244	.	α
2855	2497	s	α
2855	244	.	a
2855	2497	s	a
2855	2500	s	A
2855	2880	s	λ
2855	2883	s	l
2855	2886	s	L
2855	2027	<2s>	<>
2856	1757	.	.
2856	1758	 	 
2856	1757	<~>	<~>
2856	1757	<split-s>	<split-s>
2856	1757	<split-h>	<split-h>
2856	1757	<name2>	<name2>
2856	2857	<>	<name>
2856	1761	<aphaerese>	<aphaerese>
2856	2856	<>	<aphaerese>
2856	2371	<elision3>	<elision3>
2856	2856	<>	<elision3>
2856	2371	<elision2>	<elision2>
2856	2856	<>	<elision2>
2856	2371	<elision1>	<elision1>
2856	2856	<>	<elision1>
2856	1765	.	υ
2856	1771	s	υ
2856	1765	.	u
2856	1771	s	u
2856	1765	.	κ
2856	2142	s	U
2856	1765	.	α
2856	1771	s	α
2856	1765	.	a
2856	1771	s	a
2856	2263	s	A
2856	1765	.	λ
2856	2860	<split-h>	<>
2857	1760	.	.
2857	1763	 	 
2857	1760	<~>	<~>
2857	1760	<split-s>	<split-s>
2857	1760	<split-h>	<split-h>
2857	1760	<name2>	<name2>
2857	2307	<aphaerese>	<aphaerese>
2857	2858	<>	<aphaerese>
2857	2373	<elision3>	<elision3>
2857	2858	<>	<elision3>
2857	2373	<elision2>	<elision2>
2857	2858	<>	<elision2>
2857	2373	<elision1>	<elision1>
2857	2858	<>	<elision1>
2857	1767	.	υ
2857	1943	s	υ
2857	1767	.	u
2857	1943	s	u
2857	1767	.	κ
2857	2144	s	U
2857	1767	.	α
2857	1943	s	α
2857	1767	.	a
2857	1943	s	a
2857	2265	s	A
2857	1767	.	λ
2857	2861	<split-h>	<>
2858	1757	.	.
2858	1758	 	 
2858	1757	<~>	<~>
2858	1757	<split-s>	<split-s>
2858	1757	<split-h>	<split-h>
2858	1757	<name2>	<name2>
2858	1761	<aphaerese>	<aphaerese>
2858	2856	<>	<aphaerese>
2858	2371	<elision3>	<elision3>
2858	2856	<>	<elision3>
2858	2371	<elision2>	<elision2>
2858	2856	<>	<elision2>
2858	2371	<elision1>	<elision1>
2858	2856	<>	<elision1>
2858	1765	.	υ
2858	1771	s	υ
2858	1765	.	u
2858	1771	s	u
2858	1765	.	κ
2858	2142	s	U
2858	1765	.	α
2858	1771	s	α
2858	1765	.	a
2858	1771	s	a
2858	2263	s	A
2858	1765	.	λ
2858	2859	<split-h>	<>
2859	2860	<>	<aphaerese>
2859	2860	<>	<elision3>
2859	2860	<>	<elision2>
2859	2860	<>	<elision1>
2859	2377	<3s>	<>
2860	2861	<>	<name>
2860	2860	<>	<aphaerese>
2860	2860	<>	<elision3>
2860	2860	<>	<elision2>
2860	2860	<>	<elision1>
2860	2378	<3s>	<>
2861	2859	<>	<aphaerese>
2861	2859	<>	<elision3>
2861	2859	<>	<elision2>
2861	2859	<>	<elision1>
2861	2379	<3s>	<>
2862	1757	.	.
2862	1758	 	 
2862	1757	<~>	<~>
2862	1757	<split-s>	<split-s>
2862	1757	<split-h>	<split-h>
2862	1757	<name2>	<name2>
2862	2863	<>	<name>
2862	1761	<aphaerese>	<aphaerese>
2862	2862	<>	<aphaerese>
2862	1757	<elision3>	<elision3>
2862	2862	<>	<elision3>
2862	1757	<elision2>	<elision2>
2862	2862	<>	<elision2>
2862	1757	<elision1>	<elision1>
2862	2862	<>	<elision1>
2862	1765	.	υ
2862	1771	s	υ
2862	1765	.	u
2862	1771	s	u
2862	2424	.	κ
2862	2142	s	U
2862	1765	.	α
2862	1771	s	α
2862	1765	.	a
2862	1771	s	a
2862	2263	s	A
2862	2424	.	λ
2862	2866	<split-h>	<>
2863	1760	.	.
2863	1763	 	 
2863	1760	<~>	<~>
2863	1760	<split-s>	<split-s>
2863	1760	<split-h>	<split-h>
2863	1760	<name2>	<name2>
2863	2307	<aphaerese>	<aphaerese>
2863	2864	<>	<aphaerese>
2863	1760	<elision3>	<elision3>
2863	2864	<>	<elision3>
2863	1760	<elision2>	<elision2>
2863	2864	<>	<elision2>
2863	1760	<elision1>	<elision1>
2863	2864	<>	<elision1>
2863	1767	.	υ
2863	1943	s	υ
2863	1767	.	u
2863	1943	s	u
2863	2426	.	κ
2863	2144	s	U
2863	1767	.	α
2863	1943	s	α
2863	1767	.	a
2863	1943	s	a
2863	2265	s	A
2863	2426	.	λ
2863	2867	<split-h>	<>
2864	1757	.	.
2864	1758	 	 
2864	1757	<~>	<~>
2864	1757	<split-s>	<split-s>
2864	1757	<split-h>	<split-h>
2864	1757	<name2>	<name2>
2864	1761	<aphaerese>	<aphaerese>
2864	2862	<>	<aphaerese>
2864	1757	<elision3>	<elision3>
2864	2862	<>	<elision3>
2864	1757	<elision2>	<elision2>
2864	2862	<>	<elision2>
2864	1757	<elision1>	<elision1>
2864	2862	<>	<elision1>
2864	1765	.	υ
2864	1771	s	υ
2864	1765	.	u
2864	1771	s	u
2864	2424	.	κ
2864	2142	s	U
2864	1765	.	α
2864	1771	s	α
2864	1765	.	a
2864	1771	s	a
2864	2263	s	A
2864	2424	.	λ
2864	2865	<split-h>	<>
2865	2866	<>	<aphaerese>
2865	2866	<>	<elision3>
2865	2866	<>	<elision2>
2865	2866	<>	<elision1>
2865	2386	<3s>	<>
2866	2867	<>	<name>
2866	2866	<>	<aphaerese>
2866	2866	<>	<elision3>
2866	2866	<>	<elision2>
2866	2866	<>	<elision1>
2866	2387	<3s>	<>
2867	2865	<>	<aphaerese>
2867	2865	<>	<elision3>
2867	2865	<>	<elision2>
2867	2865	<>	<elision1>
2867	2388	<3s>	<>
2868	2446	<name>	<name>
2868	2869	<>	<name>
2868	2871	<>	<aphaerese>
2868	2871	<>	<elision3>
2868	2871	<>	<elision2>
2868	2871	<>	<elision1>
2868	2493	<split-h>	<>
2868	2545	<L2kl>	<>
2868	2878	<K2kl>	<>
2869	2870	<>	<aphaerese>
2869	2870	<>	<elision3>
2869	2870	<>	<elision2>
2869	2870	<>	<elision1>
2869	2546	<L2kl>	<>
2869	2873	<K2kl>	<>
2870	2871	<>	<aphaerese>
2870	2871	<>	<elision3>
2870	2871	<>	<elision2>
2870	2871	<>	<elision1>
2870	2547	<L2kl>	<>
2870	2874	<K2kl>	<>
2871	2869	<>	<name>
2871	2871	<>	<aphaerese>
2871	2871	<>	<elision3>
2871	2871	<>	<elision2>
2871	2871	<>	<elision1>
2871	2545	<L2kl>	<>
2871	2872	<K2kl>	<>
2872	2427	.	.
2872	2427	 	 
2872	2427	<~>	<~>
2872	2427	<split-s>	<split-s>
2872	2427	<split-h>	<split-h>
2872	2427	<name2>	<name2>
2872	2873	<>	<name>
2872	2430	<aphaerese>	<aphaerese>
2872	2872	<>	<aphaerese>
2872	2427	<elision3>	<elision3>
2872	2872	<>	<elision3>
2872	2427	<elision2>	<elision2>
2872	2872	<>	<elision2>
2872	2427	<elision1>	<elision1>
2872	2872	<>	<elision1>
2872	2424	.	υ
2872	2424	.	u
2872	2424	.	α
2872	2424	.	a
2872	2876	<split-h>	<>
2873	2429	.	.
2873	2429	 	 
2873	2429	<~>	<~>
2873	2429	<split-s>	<split-s>
2873	2429	<split-h>	<split-h>
2873	2429	<name2>	<name2>
2873	2432	<aphaerese>	<aphaerese>
2873	2874	<>	<aphaerese>
2873	2429	<elision3>	<elision3>
2873	2874	<>	<elision3>
2873	2429	<elision2>	<elision2>
2873	2874	<>	<elision2>
2873	2429	<elision1>	<elision1>
2873	2874	<>	<elision1>
2873	2426	.	υ
2873	2426	.	u
2873	2426	.	α
2873	2426	.	a
2873	2877	<split-h>	<>
2874	2427	.	.
2874	2427	 	 
2874	2427	<~>	<~>
2874	2427	<split-s>	<split-s>
2874	2427	<split-h>	<split-h>
2874	2427	<name2>	<name2>
2874	2430	<aphaerese>	<aphaerese>
2874	2872	<>	<aphaerese>
2874	2427	<elision3>	<elision3>
2874	2872	<>	<elision3>
2874	2427	<elision2>	<elision2>
2874	2872	<>	<elision2>
2874	2427	<elision1>	<elision1>
2874	2872	<>	<elision1>
2874	2424	.	υ
2874	2424	.	u
2874	2424	.	α
2874	2424	.	a
2874	2875	<split-h>	<>
2875	2876	<>	<aphaerese>
2875	2876	<>	<elision3>
2875	2876	<>	<elision2>
2875	2876	<>	<elision1>
2875	2399	<3s>	<>
2876	2877	<>	<name>
2876	2876	<>	<aphaerese>
2876	2876	<>	<elision3>
2876	2876	<>	<elision2>
2876	2876	<>	<elision1>
2876	2400	<3s>	<>
2877	2875	<>	<aphaerese>
2877	2875	<>	<elision3>
2877	2875	<>	<elision2>
2877	2875	<>	<elision1>
2877	2401	<3s>	<>
2878	2427	.	.
2878	2427	 	 
2878	2427	<~>	<~>
2878	2427	<split-s>	<split-s>
2878	2427	<split-h>	<split-h>
2878	2427	<name2>	<name2>
2878	2495	<name2>	<name>
2878	2873	<>	<name>
2878	2430	<aphaerese>	<aphaerese>
2878	2872	<>	<aphaerese>
2878	2427	<elision3>	<elision3>
2878	2872	<>	<elision3>
2878	2427	<elision2>	<elision2>
2878	2872	<>	<elision2>
2878	2427	<elision1>	<elision1>
2878	2872	<>	<elision1>
2878	2424	.	υ
2878	2424	.	u
2878	2424	.	α
2878	2424	.	a
2878	2879	<split-h>	<>
2879	2877	<>	<name>
2879	2876	<>	<aphaerese>
2879	2876	<>	<elision3>
2879	2876	<>	<elision2>
2879	2876	<>	<elision1>
2879	2406	<3s>	<>
2880	1757	.	.
2880	1758	 	 
2880	1757	<~>	<~>
2880	1757	<split-s>	<split-s>
2880	1757	<split-h>	<split-h>
2880	1757	<name2>	<name2>
2880	2881	<>	<name>
2880	1761	<aphaerese>	<aphaerese>
2880	2880	<>	<aphaerese>
2880	1757	<elision3>	<elision3>
2880	2880	<>	<elision3>
2880	1757	<elision2>	<elision2>
2880	2880	<>	<elision2>
2880	1757	<elision1>	<elision1>
2880	2880	<>	<elision1>
2880	1765	.	υ
2880	1771	s	υ
2880	1765	.	u
2880	1771	s	u
2880	1765	.	κ
2880	2142	s	U
2880	1765	.	α
2880	1771	s	α
2880	1765	.	a
2880	1771	s	a
2880	2263	s	A
2880	1765	.	λ
2880	2866	<split-h>	<>
2881	1760	.	.
2881	1763	 	 
2881	1760	<~>	<~>
2881	1760	<split-s>	<split-s>
2881	1760	<split-h>	<split-h>
2881	1760	<name2>	<name2>
2881	2307	<aphaerese>	<aphaerese>
2881	2882	<>	<aphaerese>
2881	1760	<elision3>	<elision3>
2881	2882	<>	<elision3>
2881	1760	<elision2>	<elision2>
2881	2882	<>	<elision2>
2881	1760	<elision1>	<elision1>
2881	2882	<>	<elision1>
2881	1767	.	υ
2881	1943	s	υ
2881	1767	.	u
2881	1943	s	u
2881	1767	.	κ
2881	2144	s	U
2881	1767	.	α
2881	1943	s	α
2881	1767	.	a
2881	1943	s	a
2881	2265	s	A
2881	1767	.	λ
2881	2867	<split-h>	<>
2882	1757	.	.
2882	1758	 	 
2882	1757	<~>	<~>
2882	1757	<split-s>	<split-s>
2882	1757	<split-h>	<split-h>
2882	1757	<name2>	<name2>
2882	1761	<aphaerese>	<aphaerese>
2882	2880	<>	<aphaerese>
2882	1757	<elision3>	<elision3>
2882	2880	<>	<elision3>
2882	1757	<elision2>	<elision2>
2882	2880	<>	<elision2>
2882	1757	<elision1>	<elision1>
2882	2880	<>	<elision1>
2882	1765	.	υ
2882	1771	s	υ
2882	1765	.	u
2882	1771	s	u
2882	1765	.	κ
2882	2142	s	U
2882	1765	.	α
2882	1771	s	α
2882	1765	.	a
2882	1771	s	a
2882	2263	s	A
2882	1765	.	λ
2882	2865	<split-h>	<>
2883	2427	.	.
2883	2427	 	 
2883	2427	<~>	<~>
2883	2427	<split-s>	<split-s>
2883	2427	<split-h>	<split-h>
2883	2427	<name2>	<name2>
2883	2884	<>	<name>
2883	2430	<aphaerese>	<aphaerese>
2883	2883	<>	<aphaerese>
2883	2427	<elision3>	<elision3>
2883	2883	<>	<elision3>
2883	2427	<elision2>	<elision2>
2883	2883	<>	<elision2>
2883	2427	<elision1>	<elision1>
2883	2883	<>	<elision1>
2883	2424	.	υ
2883	2424	.	u
2883	2424	.	κ
2883	2424	.	α
2883	2424	.	a
2883	2424	.	λ
2883	2866	<split-h>	<>
2884	2429	.	.
2884	2429	 	 
2884	2429	<~>	<~>
2884	2429	<split-s>	<split-s>
2884	2429	<split-h>	<split-h>
2884	2429	<name2>	<name2>
2884	2432	<aphaerese>	<aphaerese>
2884	2885	<>	<aphaerese>
2884	2429	<elision3>	<elision3>
2884	2885	<>	<elision3>
2884	2429	<elision2>	<elision2>
2884	2885	<>	<elision2>
2884	2429	<elision1>	<elision1>
2884	2885	<>	<elision1>
2884	2426	.	υ
2884	2426	.	u
2884	2426	.	κ
2884	2426	.	α
2884	2426	.	a
2884	2426	.	λ
2884	2867	<split-h>	<>
2885	2427	.	.
2885	2427	 	 
2885	2427	<~>	<~>
2885	2427	<split-s>	<split-s>
2885	2427	<split-h>	<split-h>
2885	2427	<name2>	<name2>
2885	2430	<aphaerese>	<aphaerese>
2885	2883	<>	<aphaerese>
2885	2427	<elision3>	<elision3>
2885	2883	<>	<elision3>
2885	2427	<elision2>	<elision2>
2885	2883	<>	<elision2>
2885	2427	<elision1>	<elision1>
2885	2883	<>	<elision1>
2885	2424	.	υ
2885	2424	.	u
2885	2424	.	κ
2885	2424	.	α
2885	2424	.	a
2885	2424	.	λ
2885	2865	<split-h>	<>
2886	2495	<name>	<name>
2886	2887	<>	<name>
2886	2889	<>	<aphaerese>
2886	2889	<>	<elision3>
2886	2889	<>	<elision2>
2886	2889	<>	<elision1>
2886	2493	<split-h>	<>
2886	2890	<L2kl>	<>
2887	2888	<>	<aphaerese>
2887	2888	<>	<elision3>
2887	2888	<>	<elision2>
2887	2888	<>	<elision1>
2887	2884	<L2kl>	<>
2888	2889	<>	<aphaerese>
2888	2889	<>	<elision3>
2888	2889	<>	<elision2>
2888	2889	<>	<elision1>
2888	2885	<L2kl>	<>
2889	2887	<>	<name>
2889	2889	<>	<aphaerese>
2889	2889	<>	<elision3>
2889	2889	<>	<elision2>
2889	2889	<>	<elision1>
2889	2883	<L2kl>	<>
2890	2427	.	.
2890	2427	 	 
2890	2427	<~>	<~>
2890	2427	<split-s>	<split-s>
2890	2427	<split-h>	<split-h>
2890	2427	<name2>	<name2>
2890	2495	<name2>	<name>
2890	2884	<>	<name>
2890	2430	<aphaerese>	<aphaerese>
2890	2883	<>	<aphaerese>
2890	2427	<elision3>	<elision3>
2890	2883	<>	<elision3>
2890	2427	<elision2>	<elision2>
2890	2883	<>	<elision2>
2890	2427	<elision1>	<elision1>
2890	2883	<>	<elision1>
2890	2424	.	υ
2890	2424	.	u
2890	2424	.	κ
2890	2424	.	α
2890	2424	.	a
2890	2424	.	λ
2890	2891	<split-h>	<>
2891	2867	<>	<name>
2891	2866	<>	<aphaerese>
2891	2866	<>	<elision3>
2891	2866	<>	<elision2>
2891	2866	<>	<elision1>
2891	2413	<3s>	<>
2892	2893	<>	<name>
2892	2892	<>	<aphaerese>
2892	2892	<>	<elision3>
2892	2892	<>	<elision2>
2892	2892	<>	<elision1>
2892	2573	<U2kl>	<>
2893	2894	<>	<aphaerese>
2893	2894	<>	<elision3>
2893	2894	<>	<elision2>
2893	2894	<>	<elision1>
2893	2599	<U2kl>	<>
2894	2892	<>	<aphaerese>
2894	2892	<>	<elision3>
2894	2892	<>	<elision2>
2894	2892	<>	<elision1>
2894	2576	<U2kl>	<>
2895	2601	<name>	<name>
2895	2896	<>	<name>
2895	2898	<>	<aphaerese>
2895	2898	<>	<elision3>
2895	2898	<>	<elision2>
2895	2898	<>	<elision1>
2895	2257	<2s>	<>
2895	2899	<A2kl>	<>
2895	2911	<L2kl>	<>
2895	2614	<K2kl>	<>
2896	2897	<>	<aphaerese>
2896	2897	<>	<elision3>
2896	2897	<>	<elision2>
2896	2897	<>	<elision1>
2896	2900	<A2kl>	<>
2896	2912	<L2kl>	<>
2896	2609	<K2kl>	<>
2897	2898	<>	<aphaerese>
2897	2898	<>	<elision3>
2897	2898	<>	<elision2>
2897	2898	<>	<elision1>
2897	2901	<A2kl>	<>
2897	2913	<L2kl>	<>
2897	2610	<K2kl>	<>
2898	2896	<>	<name>
2898	2898	<>	<aphaerese>
2898	2898	<>	<elision3>
2898	2898	<>	<elision2>
2898	2898	<>	<elision1>
2898	2899	<A2kl>	<>
2898	2911	<L2kl>	<>
2898	2608	<K2kl>	<>
2899	2900	<>	<name>
2899	2899	<>	<aphaerese>
2899	2899	<>	<elision3>
2899	2899	<>	<elision2>
2899	2899	<>	<elision1>
2899	2902	.	κ
2899	2902	.	λ
2899	2207	<2s>	<>
2900	2901	<>	<aphaerese>
2900	2901	<>	<elision3>
2900	2901	<>	<elision2>
2900	2901	<>	<elision1>
2900	2904	.	κ
2900	2904	.	λ
2900	2208	<2s>	<>
2901	2899	<>	<aphaerese>
2901	2899	<>	<elision3>
2901	2899	<>	<elision2>
2901	2899	<>	<elision1>
2901	2902	.	κ
2901	2902	.	λ
2901	2206	<2s>	<>
2902	2903	<>	<name>
2902	2902	<>	<aphaerese>
2902	2905	<elision3>	<elision3>
2902	2902	<>	<elision3>
2902	2905	<elision2>	<elision2>
2902	2902	<>	<elision2>
2902	2905	<elision1>	<elision1>
2902	2902	<>	<elision1>
2902	2198	<2s>	<>
2903	2904	<>	<aphaerese>
2903	2907	<elision3>	<elision3>
2903	2904	<>	<elision3>
2903	2907	<elision2>	<elision2>
2903	2904	<>	<elision2>
2903	2907	<elision1>	<elision1>
2903	2904	<>	<elision1>
2903	2199	<2s>	<>
2904	2902	<>	<aphaerese>
2904	2905	<elision3>	<elision3>
2904	2902	<>	<elision3>
2904	2905	<elision2>	<elision2>
2904	2902	<>	<elision2>
2904	2905	<elision1>	<elision1>
2904	2902	<>	<elision1>
2904	2197	<2s>	<>
2905	2573	.	.
2905	2574	 	 
2905	2573	<~>	<~>
2905	2573	<split-s>	<split-s>
2905	2573	<split-h>	<split-h>
2905	2573	<name2>	<name2>
2905	2906	<>	<name>
2905	2577	<aphaerese>	<aphaerese>
2905	2905	<>	<aphaerese>
2905	2573	<elision3>	<elision3>
2905	2905	<>	<elision3>
2905	2573	<elision2>	<elision2>
2905	2905	<>	<elision2>
2905	2573	<elision1>	<elision1>
2905	2905	<>	<elision1>
2905	2570	.	υ
2905	2497	s	υ
2905	2570	.	u
2905	2497	s	u
2905	2469	s	κ
2905	2469	s	k
2905	2442	s	U
2905	2908	s	K
2905	2570	.	α
2905	2497	s	α
2905	2570	.	a
2905	2497	s	a
2905	2500	s	A
2905	2469	s	λ
2905	2469	s	l
2905	2908	s	L
2905	2162	<2s>	<>
2906	2576	.	.
2906	2579	 	 
2906	2576	<~>	<~>
2906	2576	<split-s>	<split-s>
2906	2576	<split-h>	<split-h>
2906	2576	<name2>	<name2>
2906	2596	<aphaerese>	<aphaerese>
2906	2907	<>	<aphaerese>
2906	2576	<elision3>	<elision3>
2906	2907	<>	<elision3>
2906	2576	<elision2>	<elision2>
2906	2907	<>	<elision2>
2906	2576	<elision1>	<elision1>
2906	2907	<>	<elision1>
2906	2572	.	υ
2906	2499	s	υ
2906	2572	.	u
2906	2499	s	u
2906	2471	s	κ
2906	2471	s	k
2906	2444	s	U
2906	2910	s	K
2906	2572	.	α
2906	2499	s	α
2906	2572	.	a
2906	2499	s	a
2906	2502	s	A
2906	2471	s	λ
2906	2471	s	l
2906	2910	s	L
2906	2163	<2s>	<>
2907	2573	.	.
2907	2574	 	 
2907	2573	<~>	<~>
2907	2573	<split-s>	<split-s>
2907	2573	<split-h>	<split-h>
2907	2573	<name2>	<name2>
2907	2577	<aphaerese>	<aphaerese>
2907	2905	<>	<aphaerese>
2907	2573	<elision3>	<elision3>
2907	2905	<>	<elision3>
2907	2573	<elision2>	<elision2>
2907	2905	<>	<elision2>
2907	2573	<elision1>	<elision1>
2907	2905	<>	<elision1>
2907	2570	.	υ
2907	2497	s	υ
2907	2570	.	u
2907	2497	s	u
2907	2469	s	κ
2907	2469	s	k
2907	2442	s	U
2907	2908	s	K
2907	2570	.	α
2907	2497	s	α
2907	2570	.	a
2907	2497	s	a
2907	2500	s	A
2907	2469	s	λ
2907	2469	s	l
2907	2908	s	L
2907	2161	<2s>	<>
2908	2909	<>	<name>
2908	2908	<>	<aphaerese>
2908	2908	<>	<elision3>
2908	2908	<>	<elision2>
2908	2908	<>	<elision1>
2908	2469	<L2kl>	<>
2909	2910	<>	<aphaerese>
2909	2910	<>	<elision3>
2909	2910	<>	<elision2>
2909	2910	<>	<elision1>
2909	2470	<L2kl>	<>
2910	2908	<>	<aphaerese>
2910	2908	<>	<elision3>
2910	2908	<>	<elision2>
2910	2908	<>	<elision1>
2910	2471	<L2kl>	<>
2911	2912	<>	<name>
2911	2911	<>	<aphaerese>
2911	2911	<>	<elision3>
2911	2911	<>	<elision2>
2911	2911	<>	<elision1>
2911	2914	.	κ
2911	2914	.	λ
2911	2240	<2s>	<>
2912	2913	<>	<aphaerese>
2912	2913	<>	<elision3>
2912	2913	<>	<elision2>
2912	2913	<>	<elision1>
2912	2916	.	κ
2912	2916	.	λ
2912	2241	<2s>	<>
2913	2911	<>	<aphaerese>
2913	2911	<>	<elision3>
2913	2911	<>	<elision2>
2913	2911	<>	<elision1>
2913	2914	.	κ
2913	2914	.	λ
2913	2239	<2s>	<>
2914	2915	<>	<name>
2914	2914	<>	<aphaerese>
2914	2917	<elision3>	<elision3>
2914	2914	<>	<elision3>
2914	2917	<elision2>	<elision2>
2914	2914	<>	<elision2>
2914	2917	<elision1>	<elision1>
2914	2914	<>	<elision1>
2914	2231	<2s>	<>
2915	2916	<>	<aphaerese>
2915	2919	<elision3>	<elision3>
2915	2916	<>	<elision3>
2915	2919	<elision2>	<elision2>
2915	2916	<>	<elision2>
2915	2919	<elision1>	<elision1>
2915	2916	<>	<elision1>
2915	2232	<2s>	<>
2916	2914	<>	<aphaerese>
2916	2917	<elision3>	<elision3>
2916	2914	<>	<elision3>
2916	2917	<elision2>	<elision2>
2916	2914	<>	<elision2>
2916	2917	<elision1>	<elision1>
2916	2914	<>	<elision1>
2916	2230	<2s>	<>
2917	2918	<>	<name>
2917	2917	<>	<aphaerese>
2917	2917	<>	<elision3>
2917	2917	<>	<elision2>
2917	2917	<>	<elision1>
2917	2581	.	κ
2917	2587	s	κ
2917	2506	s	k
2917	2597	s	K
2917	2506	s	λ
2917	2506	s	l
2917	2551	s	L
2917	2225	<2s>	<>
2918	2919	<>	<aphaerese>
2918	2919	<>	<elision3>
2918	2919	<>	<elision2>
2918	2919	<>	<elision1>
2918	2583	.	κ
2918	2589	s	κ
2918	2508	s	k
2918	2543	s	K
2918	2508	s	λ
2918	2508	s	l
2918	2553	s	L
2918	2226	<2s>	<>
2919	2917	<>	<aphaerese>
2919	2917	<>	<elision3>
2919	2917	<>	<elision2>
2919	2917	<>	<elision1>
2919	2581	.	κ
2919	2587	s	κ
2919	2506	s	k
2919	2597	s	K
2919	2506	s	λ
2919	2506	s	l
2919	2551	s	L
2919	2224	<2s>	<>
2920	2573	.	.
2920	2574	 	 
2920	2573	<~>	<~>
2920	2573	<split-s>	<split-s>
2920	2573	<split-h>	<split-h>
2920	2573	<name2>	<name2>
2920	2921	<>	<name>
2920	2577	<aphaerese>	<aphaerese>
2920	2920	<>	<aphaerese>
2920	2920	<>	<elision3>
2920	2920	<>	<elision2>
2920	2920	<>	<elision1>
2920	2570	.	υ
2920	2497	s	υ
2920	2570	.	u
2920	2497	s	u
2920	2581	.	κ
2920	2587	s	κ
2920	2506	s	k
2920	2442	s	U
2920	2597	s	K
2920	2570	.	α
2920	2497	s	α
2920	2570	.	a
2920	2497	s	a
2920	2500	s	A
2920	2506	s	λ
2920	2506	s	l
2920	2551	s	L
2920	1945	<2s>	<>
2921	2576	.	.
2921	2579	 	 
2921	2576	<~>	<~>
2921	2576	<split-s>	<split-s>
2921	2576	<split-h>	<split-h>
2921	2576	<name2>	<name2>
2921	2596	<aphaerese>	<aphaerese>
2921	2922	<>	<aphaerese>
2921	2922	<>	<elision3>
2921	2922	<>	<elision2>
2921	2922	<>	<elision1>
2921	2572	.	υ
2921	2499	s	υ
2921	2572	.	u
2921	2499	s	u
2921	2583	.	κ
2921	2589	s	κ
2921	2508	s	k
2921	2444	s	U
2921	2543	s	K
2921	2572	.	α
2921	2499	s	α
2921	2572	.	a
2921	2499	s	a
2921	2502	s	A
2921	2508	s	λ
2921	2508	s	l
2921	2553	s	L
2921	1946	<2s>	<>
2922	2573	.	.
2922	2574	 	 
2922	2573	<~>	<~>
2922	2573	<split-s>	<split-s>
2922	2573	<split-h>	<split-h>
2922	2573	<name2>	<name2>
2922	2577	<aphaerese>	<aphaerese>
2922	2920	<>	<aphaerese>
2922	2920	<>	<elision3>
2922	2920	<>	<elision2>
2922	2920	<>	<elision1>
2922	2570	.	υ
2922	2497	s	υ
2922	2570	.	u
2922	2497	s	u
2922	2581	.	κ
2922	2587	s	κ
2922	2506	s	k
2922	2442	s	U
2922	2597	s	K
2922	2570	.	α
2922	2497	s	α
2922	2570	.	a
2922	2497	s	a
2922	2500	s	A
2922	2506	s	λ
2922	2506	s	l
2922	2551	s	L
2922	1944	<2s>	<>
2923	2924	<>	<name>
2923	2923	<>	<aphaerese>
2923	2923	<>	<elision3>
2923	2923	<>	<elision2>
2923	2923	<>	<elision1>
2923	2573	<A2kl>	<>
2924	2925	<>	<aphaerese>
2924	2925	<>	<elision3>
2924	2925	<>	<elision2>
2924	2925	<>	<elision1>
2924	2599	<A2kl>	<>
2925	2923	<>	<aphaerese>
2925	2923	<>	<elision3>
2925	2923	<>	<elision2>
2925	2923	<>	<elision1>
2925	2576	<A2kl>	<>
2926	236	.	.
2926	237	 	 
2926	236	<~>	<~>
2926	236	<split-s>	<split-s>
2926	236	<split-h>	<split-h>
2926	236	<name2>	<name2>
2926	2927	<>	<name>
2926	240	<aphaerese>	<aphaerese>
2926	2926	<>	<aphaerese>
2926	236	<elision3>	<elision3>
2926	2926	<>	<elision3>
2926	236	<elision2>	<elision2>
2926	2926	<>	<elision2>
2926	236	<elision1>	<elision1>
2926	2926	<>	<elision1>
2926	244	.	υ
2926	1756	s	υ
2926	244	.	u
2926	1756	s	u
2926	244	.	κ
2926	2561	s	κ
2926	2421	s	k
2926	2442	s	U
2926	2541	s	K
2926	244	.	α
2926	2497	s	α
2926	244	.	a
2926	2497	s	a
2926	2500	s	A
2926	244	.	λ
2926	2561	s	λ
2926	2506	s	l
2926	2551	s	L
2926	2137	<2s>	<>
2927	239	.	.
2927	242	 	 
2927	239	<~>	<~>
2927	239	<split-s>	<split-s>
2927	239	<split-h>	<split-h>
2927	239	<name2>	<name2>
2927	2540	<aphaerese>	<aphaerese>
2927	2928	<>	<aphaerese>
2927	239	<elision3>	<elision3>
2927	2928	<>	<elision3>
2927	239	<elision2>	<elision2>
2927	2928	<>	<elision2>
2927	239	<elision1>	<elision1>
2927	2928	<>	<elision1>
2927	246	.	υ
2927	2334	s	υ
2927	246	.	u
2927	2334	s	u
2927	246	.	κ
2927	2563	s	κ
2927	2423	s	k
2927	2444	s	U
2927	2543	s	K
2927	246	.	α
2927	2499	s	α
2927	246	.	a
2927	2499	s	a
2927	2502	s	A
2927	246	.	λ
2927	2563	s	λ
2927	2508	s	l
2927	2553	s	L
2927	2138	<2s>	<>
2928	236	.	.
2928	237	 	 
2928	236	<~>	<~>
2928	236	<split-s>	<split-s>
2928	236	<split-h>	<split-h>
2928	236	<name2>	<name2>
2928	240	<aphaerese>	<aphaerese>
2928	2926	<>	<aphaerese>
2928	236	<elision3>	<elision3>
2928	2926	<>	<elision3>
2928	236	<elision2>	<elision2>
2928	2926	<>	<elision2>
2928	236	<elision1>	<elision1>
2928	2926	<>	<elision1>
2928	244	.	υ
2928	1756	s	υ
2928	244	.	u
2928	1756	s	u
2928	244	.	κ
2928	2561	s	κ
2928	2421	s	k
2928	2442	s	U
2928	2541	s	K
2928	244	.	α
2928	2497	s	α
2928	244	.	a
2928	2497	s	a
2928	2500	s	A
2928	244	.	λ
2928	2561	s	λ
2928	2506	s	l
2928	2551	s	L
2928	2136	<2s>	<>
2929	2601	<name>	<name>
2929	2930	<>	<name>
2929	2932	<>	<aphaerese>
2929	2932	<>	<elision3>
2929	2932	<>	<elision2>
2929	2932	<>	<elision1>
2929	2257	<2s>	<>
2929	2899	<A2kl>	<>
2929	2936	<L2kl>	<>
2930	2931	<>	<aphaerese>
2930	2931	<>	<elision3>
2930	2931	<>	<elision2>
2930	2931	<>	<elision1>
2930	2900	<A2kl>	<>
2930	2934	<L2kl>	<>
2931	2932	<>	<aphaerese>
2931	2932	<>	<elision3>
2931	2932	<>	<elision2>
2931	2932	<>	<elision1>
2931	2901	<A2kl>	<>
2931	2935	<L2kl>	<>
2932	2930	<>	<name>
2932	2932	<>	<aphaerese>
2932	2932	<>	<elision3>
2932	2932	<>	<elision2>
2932	2932	<>	<elision1>
2932	2899	<A2kl>	<>
2932	2933	<L2kl>	<>
2933	2573	.	.
2933	2574	 	 
2933	2573	<~>	<~>
2933	2573	<split-s>	<split-s>
2933	2573	<split-h>	<split-h>
2933	2573	<name2>	<name2>
2933	2934	<>	<name>
2933	2577	<aphaerese>	<aphaerese>
2933	2933	<>	<aphaerese>
2933	2573	<elision3>	<elision3>
2933	2933	<>	<elision3>
2933	2573	<elision2>	<elision2>
2933	2933	<>	<elision2>
2933	2573	<elision1>	<elision1>
2933	2933	<>	<elision1>
2933	2570	.	υ
2933	2497	s	υ
2933	2570	.	u
2933	2497	s	u
2933	2914	.	κ
2933	2611	s	κ
2933	2506	s	k
2933	2442	s	U
2933	2597	s	K
2933	2570	.	α
2933	2497	s	α
2933	2570	.	a
2933	2497	s	a
2933	2500	s	A
2933	2914	.	λ
2933	2611	s	λ
2933	2506	s	l
2933	2551	s	L
2933	2274	<2s>	<>
2934	2576	.	.
2934	2579	 	 
2934	2576	<~>	<~>
2934	2576	<split-s>	<split-s>
2934	2576	<split-h>	<split-h>
2934	2576	<name2>	<name2>
2934	2596	<aphaerese>	<aphaerese>
2934	2935	<>	<aphaerese>
2934	2576	<elision3>	<elision3>
2934	2935	<>	<elision3>
2934	2576	<elision2>	<elision2>
2934	2935	<>	<elision2>
2934	2576	<elision1>	<elision1>
2934	2935	<>	<elision1>
2934	2572	.	υ
2934	2499	s	υ
2934	2572	.	u
2934	2499	s	u
2934	2916	.	κ
2934	2613	s	κ
2934	2508	s	k
2934	2444	s	U
2934	2543	s	K
2934	2572	.	α
2934	2499	s	α
2934	2572	.	a
2934	2499	s	a
2934	2502	s	A
2934	2916	.	λ
2934	2613	s	λ
2934	2508	s	l
2934	2553	s	L
2934	2275	<2s>	<>
2935	2573	.	.
2935	2574	 	 
2935	2573	<~>	<~>
2935	2573	<split-s>	<split-s>
2935	2573	<split-h>	<split-h>
2935	2573	<name2>	<name2>
2935	2577	<aphaerese>	<aphaerese>
2935	2933	<>	<aphaerese>
2935	2573	<elision3>	<elision3>
2935	2933	<>	<elision3>
2935	2573	<elision2>	<elision2>
2935	2933	<>	<elision2>
2935	2573	<elision1>	<elision1>
2935	2933	<>	<elision1>
2935	2570	.	υ
2935	2497	s	υ
2935	2570	.	u
2935	2497	s	u
2935	2914	.	κ
2935	2611	s	κ
2935	2506	s	k
2935	2442	s	U
2935	2597	s	K
2935	2570	.	α
2935	2497	s	α
2935	2570	.	a
2935	2497	s	a
2935	2500	s	A
2935	2914	.	λ
2935	2611	s	λ
2935	2506	s	l
2935	2551	s	L
2935	2273	<2s>	<>
2936	2573	.	.
2936	2574	 	 
2936	2573	<~>	<~>
2936	2573	<split-s>	<split-s>
2936	2573	<split-h>	<split-h>
2936	2573	<name2>	<name2>
2936	2601	<name2>	<name>
2936	2934	<>	<name>
2936	2577	<aphaerese>	<aphaerese>
2936	2933	<>	<aphaerese>
2936	2573	<elision3>	<elision3>
2936	2933	<>	<elision3>
2936	2573	<elision2>	<elision2>
2936	2933	<>	<elision2>
2936	2573	<elision1>	<elision1>
2936	2933	<>	<elision1>
2936	2570	.	υ
2936	2497	s	υ
2936	2570	.	u
2936	2497	s	u
2936	2914	.	κ
2936	2611	s	κ
2936	2506	s	k
2936	2442	s	U
2936	2597	s	K
2936	2570	.	α
2936	2497	s	α
2936	2570	.	a
2936	2497	s	a
2936	2500	s	A
2936	2914	.	λ
2936	2611	s	λ
2936	2506	s	l
2936	2551	s	L
2936	2280	<2s>	<>
2937	236	.	.
2937	237	 	 
2937	236	<~>	<~>
2937	236	<split-s>	<split-s>
2937	236	<split-h>	<split-h>
2937	236	<name2>	<name2>
2937	2830	<>	<name>
2937	240	<aphaerese>	<aphaerese>
2937	2829	<>	<aphaerese>
2937	2829	<>	<elision3>
2937	2829	<>	<elision2>
2937	2829	<>	<elision1>
2937	244	.	υ
2937	1756	s	υ
2937	244	.	u
2937	1756	s	u
2937	2338	.	κ
2937	2368	s	κ
2937	2421	s	k
2937	2442	s	U
2937	2541	s	K
2937	244	.	α
2937	2497	s	α
2937	244	.	a
2937	2497	s	a
2937	2500	s	A
2937	2503	s	λ
2937	2506	s	l
2937	2551	s	L
2937	2286	<2s>	<>
2938	236	.	.
2938	237	 	 
2938	236	<~>	<~>
2938	236	<split-s>	<split-s>
2938	236	<split-h>	<split-h>
2938	236	<name2>	<name2>
2938	2851	<>	<name>
2938	240	<aphaerese>	<aphaerese>
2938	2850	<>	<aphaerese>
2938	2853	<elision3>	<elision3>
2938	2850	<>	<elision3>
2938	2853	<elision2>	<elision2>
2938	2850	<>	<elision2>
2938	2853	<elision1>	<elision1>
2938	2850	<>	<elision1>
2938	244	.	υ
2938	1756	s	υ
2938	244	.	u
2938	1756	s	u
2938	244	.	κ
2938	2561	s	κ
2938	2421	s	k
2938	2442	s	U
2938	2541	s	K
2938	244	.	α
2938	2497	s	α
2938	244	.	a
2938	2497	s	a
2938	2500	s	A
2938	244	.	λ
2938	2561	s	λ
2938	2506	s	l
2938	2551	s	L
2938	2289	<2s>	<>
2939	236	.	.
2939	237	 	 
2939	236	<~>	<~>
2939	236	<split-s>	<split-s>
2939	236	<split-h>	<split-h>
2939	236	<name2>	<name2>
2939	2568	<>	<name>
2939	240	<aphaerese>	<aphaerese>
2939	2567	<>	<aphaerese>
2939	236	<elision3>	<elision3>
2939	2567	<>	<elision3>
2939	236	<elision2>	<elision2>
2939	2567	<>	<elision2>
2939	236	<elision1>	<elision1>
2939	2567	<>	<elision1>
2939	244	.	υ
2939	1756	s	υ
2939	244	.	u
2939	1756	s	u
2939	2570	.	κ
2939	2561	s	κ
2939	2421	s	k
2939	2442	s	U
2939	2541	s	K
2939	244	.	α
2939	2497	s	α
2939	244	.	a
2939	2497	s	a
2939	2500	s	A
2939	2570	.	λ
2939	2561	s	λ
2939	2506	s	l
2939	2551	s	L
2939	2292	<2s>	<>
2940	2893	<>	<name>
2940	2892	<>	<aphaerese>
2940	2892	<>	<elision3>
2940	2892	<>	<elision2>
2940	2892	<>	<elision1>
2940	2941	<U2kl>	<>
2941	2573	.	.
2941	2574	 	 
2941	2573	<~>	<~>
2941	2573	<split-s>	<split-s>
2941	2573	<split-h>	<split-h>
2941	2573	<name2>	<name2>
2941	2599	<>	<name>
2941	2577	<aphaerese>	<aphaerese>
2941	2573	<>	<aphaerese>
2941	2573	<elision3>	<elision3>
2941	2573	<>	<elision3>
2941	2573	<elision2>	<elision2>
2941	2573	<>	<elision2>
2941	2573	<elision1>	<elision1>
2941	2573	<>	<elision1>
2941	2570	.	υ
2941	2497	s	υ
2941	2570	.	u
2941	2497	s	u
2941	2581	.	κ
2941	2587	s	κ
2941	2506	s	k
2941	2442	s	U
2941	2597	s	K
2941	2570	.	α
2941	2497	s	α
2941	2570	.	a
2941	2497	s	a
2941	2500	s	A
2941	2506	s	λ
2941	2506	s	l
2941	2551	s	L
2941	2296	<2s>	<>
2942	2601	<name>	<name>
2942	2896	<>	<name>
2942	2898	<>	<aphaerese>
2942	2898	<>	<elision3>
2942	2898	<>	<elision2>
2942	2898	<>	<elision1>
2942	2257	<2s>	<>
2942	2899	<A2kl>	<>
2942	2911	<L2kl>	<>
2942	2943	<K2kl>	<>
2943	2573	.	.
2943	2574	 	 
2943	2573	<~>	<~>
2943	2573	<split-s>	<split-s>
2943	2573	<split-h>	<split-h>
2943	2573	<name2>	<name2>
2943	2601	<name2>	<name>
2943	2609	<>	<name>
2943	2577	<aphaerese>	<aphaerese>
2943	2608	<>	<aphaerese>
2943	2573	<elision3>	<elision3>
2943	2608	<>	<elision3>
2943	2573	<elision2>	<elision2>
2943	2608	<>	<elision2>
2943	2573	<elision1>	<elision1>
2943	2608	<>	<elision1>
2943	2570	.	υ
2943	2497	s	υ
2943	2570	.	u
2943	2497	s	u
2943	2611	s	κ
2943	2506	s	k
2943	2442	s	U
2943	2597	s	K
2943	2570	.	α
2943	2497	s	α
2943	2570	.	a
2943	2497	s	a
2943	2500	s	A
2943	2611	s	λ
2943	2506	s	l
2943	2551	s	L
2943	2300	<2s>	<>
2944	2573	.	.
2944	2574	 	 
2944	2573	<~>	<~>
2944	2573	<split-s>	<split-s>
2944	2573	<split-h>	<split-h>
2944	2573	<name2>	<name2>
2944	2921	<>	<name>
2944	2577	<aphaerese>	<aphaerese>
2944	2920	<>	<aphaerese>
2944	2920	<>	<elision3>
2944	2920	<>	<elision2>
2944	2920	<>	<elision1>
2944	2570	.	υ
2944	2497	s	υ
2944	2570	.	u
2944	2497	s	u
2944	2581	.	κ
2944	2587	s	κ
2944	2506	s	k
2944	2442	s	U
2944	2597	s	K
2944	2570	.	α
2944	2497	s	α
2944	2570	.	a
2944	2497	s	a
2944	2500	s	A
2944	2506	s	λ
2944	2506	s	l
2944	2551	s	L
2944	2286	<2s>	<>
2945	2924	<>	<name>
2945	2923	<>	<aphaerese>
2945	2923	<>	<elision3>
2945	2923	<>	<elision2>
2945	2923	<>	<elision1>
2945	2941	<A2kl>	<>
2946	236	.	.
2946	237	 	 
2946	236	<~>	<~>
2946	236	<split-s>	<split-s>
2946	236	<split-h>	<split-h>
2946	236	<name2>	<name2>
2946	2927	<>	<name>
2946	240	<aphaerese>	<aphaerese>
2946	2926	<>	<aphaerese>
2946	236	<elision3>	<elision3>
2946	2926	<>	<elision3>
2946	236	<elision2>	<elision2>
2946	2926	<>	<elision2>
2946	236	<elision1>	<elision1>
2946	2926	<>	<elision1>
2946	244	.	υ
2946	1756	s	υ
2946	244	.	u
2946	1756	s	u
2946	244	.	κ
2946	2561	s	κ
2946	2421	s	k
2946	2442	s	U
2946	2541	s	K
2946	244	.	α
2946	2497	s	α
2946	244	.	a
2946	2497	s	a
2946	2500	s	A
2946	244	.	λ
2946	2561	s	λ
2946	2506	s	l
2946	2551	s	L
2946	2292	<2s>	<>
2947	2573	.	.
2947	2574	 	 
2947	2573	<~>	<~>
2947	2573	<split-s>	<split-s>
2947	2573	<split-h>	<split-h>
2947	2573	<name2>	<name2>
2947	2616	<>	<name>
2947	2577	<aphaerese>	<aphaerese>
2947	2615	<>	<aphaerese>
2947	2573	<elision3>	<elision3>
2947	2615	<>	<elision3>
2947	2573	<elision2>	<elision2>
2947	2615	<>	<elision2>
2947	2573	<elision1>	<elision1>
2947	2615	<>	<elision1>
2947	2570	.	υ
2947	2497	s	υ
2947	2570	.	u
2947	2497	s	u
2947	2570	.	κ
2947	2611	s	κ
2947	2506	s	k
2947	2442	s	U
2947	2597	s	K
2947	2570	.	α
2947	2497	s	α
2947	2570	.	a
2947	2497	s	a
2947	2500	s	A
2947	2570	.	λ
2947	2611	s	λ
2947	2506	s	l
2947	2551	s	L
2947	2292	<2s>	<>
2948	2601	<name>	<name>
2948	2930	<>	<name>
2948	2932	<>	<aphaerese>
2948	2932	<>	<elision3>
2948	2932	<>	<elision2>
2948	2932	<>	<elision1>
2948	2257	<2s>	<>
2948	2899	<A2kl>	<>
2948	2949	<L2kl>	<>
2949	2573	.	.
2949	2574	 	 
2949	2573	<~>	<~>
2949	2573	<split-s>	<split-s>
2949	2573	<split-h>	<split-h>
2949	2573	<name2>	<name2>
2949	2601	<name2>	<name>
2949	2934	<>	<name>
2949	2577	<aphaerese>	<aphaerese>
2949	2933	<>	<aphaerese>
2949	2573	<elision3>	<elision3>
2949	2933	<>	<elision3>
2949	2573	<elision2>	<elision2>
2949	2933	<>	<elision2>
2949	2573	<elision1>	<elision1>
2949	2933	<>	<elision1>
2949	2570	.	υ
2949	2497	s	υ
2949	2570	.	u
2949	2497	s	u
2949	2914	.	κ
2949	2611	s	κ
2949	2506	s	k
2949	2442	s	U
2949	2597	s	K
2949	2570	.	α
2949	2497	s	α
2949	2570	.	a
2949	2497	s	a
2949	2500	s	A
2949	2914	.	λ
2949	2611	s	λ
2949	2506	s	l
2949	2551	s	L
2949	2305	<2s>	<>
2950	2818	.	.
2950	2819	 	 
2950	2818	<~>	<~>
2950	2818	<split-s>	<split-s>
2950	2818	<split-h>	<split-h>
2950	2818	<name2>	<name2>
2950	2822	<aphaerese>	<aphaerese>
2950	2822	<>	<aphaerese>
2950	2818	<elision3>	<elision3>
2950	2822	<>	<elision3>
2950	2818	<elision2>	<elision2>
2950	2822	<>	<elision2>
2950	2818	<elision1>	<elision1>
2950	2822	<>	<elision1>
2950	2818	.	υ
2950	2818	.	u
2950	2832	.	κ
2950	2850	s	κ
2950	2567	s	k
2950	2892	s	U
2950	2600	s	K
2950	2818	.	α
2950	2818	.	a
2950	2923	s	A
2950	2926	s	λ
2950	2615	s	l
2950	2618	s	L
2951	2818	.	.
2951	2819	 	 
2951	2818	<~>	<~>
2951	2818	<split-s>	<split-s>
2951	2818	<split-h>	<split-h>
2951	2818	<name2>	<name2>
2951	2822	<aphaerese>	<aphaerese>
2951	2825	<>	<aphaerese>
2951	2818	<elision3>	<elision3>
2951	2825	<>	<elision3>
2951	2818	<elision2>	<elision2>
2951	2825	<>	<elision2>
2951	2818	<elision1>	<elision1>
2951	2825	<>	<elision1>
2951	2826	.	υ
2951	2829	s	υ
2951	2826	.	u
2951	2829	s	u
2951	2832	.	κ
2951	2850	s	κ
2951	2567	s	k
2951	2892	s	U
2951	2895	s	K
2951	2826	.	α
2951	2920	s	α
2951	2826	.	a
2951	2920	s	a
2951	2923	s	A
2951	2926	s	λ
2951	2615	s	l
2951	2929	s	L
2952	2821	.	.
2952	2824	 	 
2952	2821	<~>	<~>
2952	2821	<split-s>	<split-s>
2952	2821	<split-h>	<split-h>
2952	2821	<name2>	<name2>
2952	2950	<aphaerese>	<aphaerese>
2952	2821	<>	<aphaerese>
2952	2821	<elision3>	<elision3>
2952	2821	<>	<elision3>
2952	2821	<elision2>	<elision2>
2952	2821	<>	<elision2>
2952	2821	<elision1>	<elision1>
2952	2821	<>	<elision1>
2952	2828	.	υ
2952	2831	s	υ
2952	2828	.	u
2952	2831	s	u
2952	2834	.	κ
2952	2852	s	κ
2952	2569	s	k
2952	2894	s	U
2952	2603	s	K
2952	2828	.	α
2952	2922	s	α
2952	2828	.	a
2952	2922	s	a
2952	2925	s	A
2952	2928	s	λ
2952	2617	s	l
2952	2620	s	L
2953	2821	.	.
2953	2824	 	 
2953	2821	<~>	<~>
2953	2821	<split-s>	<split-s>
2953	2821	<split-h>	<split-h>
2953	2821	<name2>	<name2>
2953	2950	<aphaerese>	<aphaerese>
2953	2954	<>	<aphaerese>
2953	2957	<elision3>	<elision3>
2953	2954	<>	<elision3>
2953	2957	<elision2>	<elision2>
2953	2954	<>	<elision2>
2953	2957	<elision1>	<elision1>
2953	2954	<>	<elision1>
2953	2828	.	υ
2953	2831	s	υ
2953	2828	.	u
2953	2831	s	u
2953	2560	s	κ
2953	2569	s	k
2953	2894	s	U
2953	2603	s	K
2953	2828	.	α
2953	2922	s	α
2953	2828	.	a
2953	2922	s	a
2953	2925	s	A
2953	2560	s	λ
2953	2617	s	l
2953	2620	s	L
2954	2818	.	.
2954	2819	 	 
2954	2818	<~>	<~>
2954	2818	<split-s>	<split-s>
2954	2818	<split-h>	<split-h>
2954	2818	<name2>	<name2>
2954	2822	<aphaerese>	<aphaerese>
2954	2817	<>	<aphaerese>
2954	2955	<elision3>	<elision3>
2954	2817	<>	<elision3>
2954	2955	<elision2>	<elision2>
2954	2817	<>	<elision2>
2954	2955	<elision1>	<elision1>
2954	2817	<>	<elision1>
2954	2826	.	υ
2954	2829	s	υ
2954	2826	.	u
2954	2829	s	u
2954	235	s	κ
2954	2567	s	k
2954	2892	s	U
2954	2600	s	K
2954	2826	.	α
2954	2920	s	α
2954	2826	.	a
2954	2920	s	a
2954	2923	s	A
2954	235	s	λ
2954	2615	s	l
2954	2618	s	L
2955	2818	.	.
2955	2819	 	 
2955	2818	<~>	<~>
2955	2818	<split-s>	<split-s>
2955	2818	<split-h>	<split-h>
2955	2818	<name2>	<name2>
2955	2956	<>	<name>
2955	2822	<aphaerese>	<aphaerese>
2955	2955	<>	<aphaerese>
2955	2818	<elision3>	<elision3>
2955	2955	<>	<elision3>
2955	2818	<elision2>	<elision2>
2955	2955	<>	<elision2>
2955	2818	<elision1>	<elision1>
2955	2955	<>	<elision1>
2955	2826	.	υ
2955	2829	s	υ
2955	2826	.	u
2955	2829	s	u
2955	2832	.	κ
2955	2958	s	κ
2955	2961	s	k
2955	2892	s	U
2955	2964	s	K
2955	2826	.	α
2955	2920	s	α
2955	2826	.	a
2955	2920	s	a
2955	2923	s	A
2955	2972	s	λ
2955	2975	s	l
2955	2978	s	L
2956	2821	.	.
2956	2824	 	 
2956	2821	<~>	<~>
2956	2821	<split-s>	<split-s>
2956	2821	<split-h>	<split-h>
2956	2821	<name2>	<name2>
2956	2950	<aphaerese>	<aphaerese>
2956	2957	<>	<aphaerese>
2956	2821	<elision3>	<elision3>
2956	2957	<>	<elision3>
2956	2821	<elision2>	<elision2>
2956	2957	<>	<elision2>
2956	2821	<elision1>	<elision1>
2956	2957	<>	<elision1>
2956	2828	.	υ
2956	2831	s	υ
2956	2828	.	u
2956	2831	s	u
2956	2834	.	κ
2956	2960	s	κ
2956	2963	s	k
2956	2894	s	U
2956	2966	s	K
2956	2828	.	α
2956	2922	s	α
2956	2828	.	a
2956	2922	s	a
2956	2925	s	A
2956	2974	s	λ
2956	2977	s	l
2956	2980	s	L
2957	2818	.	.
2957	2819	 	 
2957	2818	<~>	<~>
2957	2818	<split-s>	<split-s>
2957	2818	<split-h>	<split-h>
2957	2818	<name2>	<name2>
2957	2822	<aphaerese>	<aphaerese>
2957	2955	<>	<aphaerese>
2957	2818	<elision3>	<elision3>
2957	2955	<>	<elision3>
2957	2818	<elision2>	<elision2>
2957	2955	<>	<elision2>
2957	2818	<elision1>	<elision1>
2957	2955	<>	<elision1>
2957	2826	.	υ
2957	2829	s	υ
2957	2826	.	u
2957	2829	s	u
2957	2832	.	κ
2957	2958	s	κ
2957	2961	s	k
2957	2892	s	U
2957	2964	s	K
2957	2826	.	α
2957	2920	s	α
2957	2826	.	a
2957	2920	s	a
2957	2923	s	A
2957	2972	s	λ
2957	2975	s	l
2957	2978	s	L
2958	236	.	.
2958	237	 	 
2958	236	<~>	<~>
2958	236	<split-s>	<split-s>
2958	236	<split-h>	<split-h>
2958	236	<name2>	<name2>
2958	2959	<>	<name>
2958	240	<aphaerese>	<aphaerese>
2958	2958	<>	<aphaerese>
2958	2853	<elision3>	<elision3>
2958	2958	<>	<elision3>
2958	2853	<elision2>	<elision2>
2958	2958	<>	<elision2>
2958	2853	<elision1>	<elision1>
2958	2958	<>	<elision1>
2958	244	.	υ
2958	1756	s	υ
2958	244	.	u
2958	1756	s	u
2958	244	.	κ
2958	2442	s	U
2958	244	.	α
2958	2497	s	α
2958	244	.	a
2958	2497	s	a
2958	2500	s	A
2958	244	.	λ
2958	2378	<2s>	<>
2959	239	.	.
2959	242	 	 
2959	239	<~>	<~>
2959	239	<split-s>	<split-s>
2959	239	<split-h>	<split-h>
2959	239	<name2>	<name2>
2959	2540	<aphaerese>	<aphaerese>
2959	2960	<>	<aphaerese>
2959	2855	<elision3>	<elision3>
2959	2960	<>	<elision3>
2959	2855	<elision2>	<elision2>
2959	2960	<>	<elision2>
2959	2855	<elision1>	<elision1>
2959	2960	<>	<elision1>
2959	246	.	υ
2959	2334	s	υ
2959	246	.	u
2959	2334	s	u
2959	246	.	κ
2959	2444	s	U
2959	246	.	α
2959	2499	s	α
2959	246	.	a
2959	2499	s	a
2959	2502	s	A
2959	246	.	λ
2959	2379	<2s>	<>
2960	236	.	.
2960	237	 	 
2960	236	<~>	<~>
2960	236	<split-s>	<split-s>
2960	236	<split-h>	<split-h>
2960	236	<name2>	<name2>
2960	240	<aphaerese>	<aphaerese>
2960	2958	<>	<aphaerese>
2960	2853	<elision3>	<elision3>
2960	2958	<>	<elision3>
2960	2853	<elision2>	<elision2>
2960	2958	<>	<elision2>
2960	2853	<elision1>	<elision1>
2960	2958	<>	<elision1>
2960	244	.	υ
2960	1756	s	υ
2960	244	.	u
2960	1756	s	u
2960	244	.	κ
2960	2442	s	U
2960	244	.	α
2960	2497	s	α
2960	244	.	a
2960	2497	s	a
2960	2500	s	A
2960	244	.	λ
2960	2377	<2s>	<>
2961	236	.	.
2961	237	 	 
2961	236	<~>	<~>
2961	236	<split-s>	<split-s>
2961	236	<split-h>	<split-h>
2961	236	<name2>	<name2>
2961	2962	<>	<name>
2961	240	<aphaerese>	<aphaerese>
2961	2961	<>	<aphaerese>
2961	236	<elision3>	<elision3>
2961	2961	<>	<elision3>
2961	236	<elision2>	<elision2>
2961	2961	<>	<elision2>
2961	236	<elision1>	<elision1>
2961	2961	<>	<elision1>
2961	244	.	υ
2961	1756	s	υ
2961	244	.	u
2961	1756	s	u
2961	2570	.	κ
2961	2442	s	U
2961	244	.	α
2961	2497	s	α
2961	244	.	a
2961	2497	s	a
2961	2500	s	A
2961	2570	.	λ
2961	2387	<2s>	<>
2962	239	.	.
2962	242	 	 
2962	239	<~>	<~>
2962	239	<split-s>	<split-s>
2962	239	<split-h>	<split-h>
2962	239	<name2>	<name2>
2962	2540	<aphaerese>	<aphaerese>
2962	2963	<>	<aphaerese>
2962	239	<elision3>	<elision3>
2962	2963	<>	<elision3>
2962	239	<elision2>	<elision2>
2962	2963	<>	<elision2>
2962	239	<elision1>	<elision1>
2962	2963	<>	<elision1>
2962	246	.	υ
2962	2334	s	υ
2962	246	.	u
2962	2334	s	u
2962	2572	.	κ
2962	2444	s	U
2962	246	.	α
2962	2499	s	α
2962	246	.	a
2962	2499	s	a
2962	2502	s	A
2962	2572	.	λ
2962	2388	<2s>	<>
2963	236	.	.
2963	237	 	 
2963	236	<~>	<~>
2963	236	<split-s>	<split-s>
2963	236	<split-h>	<split-h>
2963	236	<name2>	<name2>
2963	240	<aphaerese>	<aphaerese>
2963	2961	<>	<aphaerese>
2963	236	<elision3>	<elision3>
2963	2961	<>	<elision3>
2963	236	<elision2>	<elision2>
2963	2961	<>	<elision2>
2963	236	<elision1>	<elision1>
2963	2961	<>	<elision1>
2963	244	.	υ
2963	1756	s	υ
2963	244	.	u
2963	1756	s	u
2963	2570	.	κ
2963	2442	s	U
2963	244	.	α
2963	2497	s	α
2963	244	.	a
2963	2497	s	a
2963	2500	s	A
2963	2570	.	λ
2963	2386	<2s>	<>
2964	2601	<name>	<name>
2964	2965	<>	<name>
2964	2967	<>	<aphaerese>
2964	2967	<>	<elision3>
2964	2967	<>	<elision2>
2964	2967	<>	<elision1>
2964	2257	<2s>	<>
2964	2605	<L2kl>	<>
2964	2971	<K2kl>	<>
2965	2966	<>	<aphaerese>
2965	2966	<>	<elision3>
2965	2966	<>	<elision2>
2965	2966	<>	<elision1>
2965	2606	<L2kl>	<>
2965	2969	<K2kl>	<>
2966	2967	<>	<aphaerese>
2966	2967	<>	<elision3>
2966	2967	<>	<elision2>
2966	2967	<>	<elision1>
2966	2607	<L2kl>	<>
2966	2970	<K2kl>	<>
2967	2965	<>	<name>
2967	2967	<>	<aphaerese>
2967	2967	<>	<elision3>
2967	2967	<>	<elision2>
2967	2967	<>	<elision1>
2967	2605	<L2kl>	<>
2967	2968	<K2kl>	<>
2968	2573	.	.
2968	2574	 	 
2968	2573	<~>	<~>
2968	2573	<split-s>	<split-s>
2968	2573	<split-h>	<split-h>
2968	2573	<name2>	<name2>
2968	2969	<>	<name>
2968	2577	<aphaerese>	<aphaerese>
2968	2968	<>	<aphaerese>
2968	2573	<elision3>	<elision3>
2968	2968	<>	<elision3>
2968	2573	<elision2>	<elision2>
2968	2968	<>	<elision2>
2968	2573	<elision1>	<elision1>
2968	2968	<>	<elision1>
2968	2570	.	υ
2968	2497	s	υ
2968	2570	.	u
2968	2497	s	u
2968	2442	s	U
2968	2570	.	α
2968	2497	s	α
2968	2570	.	a
2968	2497	s	a
2968	2500	s	A
2968	2400	<2s>	<>
2969	2576	.	.
2969	2579	 	 
2969	2576	<~>	<~>
2969	2576	<split-s>	<split-s>
2969	2576	<split-h>	<split-h>
2969	2576	<name2>	<name2>
2969	2596	<aphaerese>	<aphaerese>
2969	2970	<>	<aphaerese>
2969	2576	<elision3>	<elision3>
2969	2970	<>	<elision3>
2969	2576	<elision2>	<elision2>
2969	2970	<>	<elision2>
2969	2576	<elision1>	<elision1>
2969	2970	<>	<elision1>
2969	2572	.	υ
2969	2499	s	υ
2969	2572	.	u
2969	2499	s	u
2969	2444	s	U
2969	2572	.	α
2969	2499	s	α
2969	2572	.	a
2969	2499	s	a
2969	2502	s	A
2969	2401	<2s>	<>
2970	2573	.	.
2970	2574	 	 
2970	2573	<~>	<~>
2970	2573	<split-s>	<split-s>
2970	2573	<split-h>	<split-h>
2970	2573	<name2>	<name2>
2970	2577	<aphaerese>	<aphaerese>
2970	2968	<>	<aphaerese>
2970	2573	<elision3>	<elision3>
2970	2968	<>	<elision3>
2970	2573	<elision2>	<elision2>
2970	2968	<>	<elision2>
2970	2573	<elision1>	<elision1>
2970	2968	<>	<elision1>
2970	2570	.	υ
2970	2497	s	υ
2970	2570	.	u
2970	2497	s	u
2970	2442	s	U
2970	2570	.	α
2970	2497	s	α
2970	2570	.	a
2970	2497	s	a
2970	2500	s	A
2970	2399	<2s>	<>
2971	2573	.	.
2971	2574	 	 
2971	2573	<~>	<~>
2971	2573	<split-s>	<split-s>
2971	2573	<split-h>	<split-h>
2971	2573	<name2>	<name2>
2971	2601	<name2>	<name>
2971	2969	<>	<name>
2971	2577	<aphaerese>	<aphaerese>
2971	2968	<>	<aphaerese>
2971	2573	<elision3>	<elision3>
2971	2968	<>	<elision3>
2971	2573	<elision2>	<elision2>
2971	2968	<>	<elision2>
2971	2573	<elision1>	<elision1>
2971	2968	<>	<elision1>
2971	2570	.	υ
2971	2497	s	υ
2971	2570	.	u
2971	2497	s	u
2971	2442	s	U
2971	2570	.	α
2971	2497	s	α
2971	2570	.	a
2971	2497	s	a
2971	2500	s	A
2971	2406	<2s>	<>
2972	236	.	.
2972	237	 	 
2972	236	<~>	<~>
2972	236	<split-s>	<split-s>
2972	236	<split-h>	<split-h>
2972	236	<name2>	<name2>
2972	2973	<>	<name>
2972	240	<aphaerese>	<aphaerese>
2972	2972	<>	<aphaerese>
2972	236	<elision3>	<elision3>
2972	2972	<>	<elision3>
2972	236	<elision2>	<elision2>
2972	2972	<>	<elision2>
2972	236	<elision1>	<elision1>
2972	2972	<>	<elision1>
2972	244	.	υ
2972	1756	s	υ
2972	244	.	u
2972	1756	s	u
2972	244	.	κ
2972	2442	s	U
2972	244	.	α
2972	2497	s	α
2972	244	.	a
2972	2497	s	a
2972	2500	s	A
2972	244	.	λ
2972	2387	<2s>	<>
2973	239	.	.
2973	242	 	 
2973	239	<~>	<~>
2973	239	<split-s>	<split-s>
2973	239	<split-h>	<split-h>
2973	239	<name2>	<name2>
2973	2540	<aphaerese>	<aphaerese>
2973	2974	<>	<aphaerese>
2973	239	<elision3>	<elision3>
2973	2974	<>	<elision3>
2973	239	<elision2>	<elision2>
2973	2974	<>	<elision2>
2973	239	<elision1>	<elision1>
2973	2974	<>	<elision1>
2973	246	.	υ
2973	2334	s	υ
2973	246	.	u
2973	2334	s	u
2973	246	.	κ
2973	2444	s	U
2973	246	.	α
2973	2499	s	α
2973	246	.	a
2973	2499	s	a
2973	2502	s	A
2973	246	.	λ
2973	2388	<2s>	<>
2974	236	.	.
2974	237	 	 
2974	236	<~>	<~>
2974	236	<split-s>	<split-s>
2974	236	<split-h>	<split-h>
2974	236	<name2>	<name2>
2974	240	<aphaerese>	<aphaerese>
2974	2972	<>	<aphaerese>
2974	236	<elision3>	<elision3>
2974	2972	<>	<elision3>
2974	236	<elision2>	<elision2>
2974	2972	<>	<elision2>
2974	236	<elision1>	<elision1>
2974	2972	<>	<elision1>
2974	244	.	υ
2974	1756	s	υ
2974	244	.	u
2974	1756	s	u
2974	244	.	κ
2974	2442	s	U
2974	244	.	α
2974	2497	s	α
2974	244	.	a
2974	2497	s	a
2974	2500	s	A
2974	244	.	λ
2974	2386	<2s>	<>
2975	2573	.	.
2975	2574	 	 
2975	2573	<~>	<~>
2975	2573	<split-s>	<split-s>
2975	2573	<split-h>	<split-h>
2975	2573	<name2>	<name2>
2975	2976	<>	<name>
2975	2577	<aphaerese>	<aphaerese>
2975	2975	<>	<aphaerese>
2975	2573	<elision3>	<elision3>
2975	2975	<>	<elision3>
2975	2573	<elision2>	<elision2>
2975	2975	<>	<elision2>
2975	2573	<elision1>	<elision1>
2975	2975	<>	<elision1>
2975	2570	.	υ
2975	2497	s	υ
2975	2570	.	u
2975	2497	s	u
2975	2570	.	κ
2975	2442	s	U
2975	2570	.	α
2975	2497	s	α
2975	2570	.	a
2975	2497	s	a
2975	2500	s	A
2975	2570	.	λ
2975	2387	<2s>	<>
2976	2576	.	.
2976	2579	 	 
2976	2576	<~>	<~>
2976	2576	<split-s>	<split-s>
2976	2576	<split-h>	<split-h>
2976	2576	<name2>	<name2>
2976	2596	<aphaerese>	<aphaerese>
2976	2977	<>	<aphaerese>
2976	2576	<elision3>	<elision3>
2976	2977	<>	<elision3>
2976	2576	<elision2>	<elision2>
2976	2977	<>	<elision2>
2976	2576	<elision1>	<elision1>
2976	2977	<>	<elision1>
2976	2572	.	υ
2976	2499	s	υ
2976	2572	.	u
2976	2499	s	u
2976	2572	.	κ
2976	2444	s	U
2976	2572	.	α
2976	2499	s	α
2976	2572	.	a
2976	2499	s	a
2976	2502	s	A
2976	2572	.	λ
2976	2388	<2s>	<>
2977	2573	.	.
2977	2574	 	 
2977	2573	<~>	<~>
2977	2573	<split-s>	<split-s>
2977	2573	<split-h>	<split-h>
2977	2573	<name2>	<name2>
2977	2577	<aphaerese>	<aphaerese>
2977	2975	<>	<aphaerese>
2977	2573	<elision3>	<elision3>
2977	2975	<>	<elision3>
2977	2573	<elision2>	<elision2>
2977	2975	<>	<elision2>
2977	2573	<elision1>	<elision1>
2977	2975	<>	<elision1>
2977	2570	.	υ
2977	2497	s	υ
2977	2570	.	u
2977	2497	s	u
2977	2570	.	κ
2977	2442	s	U
2977	2570	.	α
2977	2497	s	α
2977	2570	.	a
2977	2497	s	a
2977	2500	s	A
2977	2570	.	λ
2977	2386	<2s>	<>
2978	2601	<name>	<name>
2978	2979	<>	<name>
2978	2981	<>	<aphaerese>
2978	2981	<>	<elision3>
2978	2981	<>	<elision2>
2978	2981	<>	<elision1>
2978	2257	<2s>	<>
2978	2982	<L2kl>	<>
2979	2980	<>	<aphaerese>
2979	2980	<>	<elision3>
2979	2980	<>	<elision2>
2979	2980	<>	<elision1>
2979	2976	<L2kl>	<>
2980	2981	<>	<aphaerese>
2980	2981	<>	<elision3>
2980	2981	<>	<elision2>
2980	2981	<>	<elision1>
2980	2977	<L2kl>	<>
2981	2979	<>	<name>
2981	2981	<>	<aphaerese>
2981	2981	<>	<elision3>
2981	2981	<>	<elision2>
2981	2981	<>	<elision1>
2981	2975	<L2kl>	<>
2982	2573	.	.
2982	2574	 	 
2982	2573	<~>	<~>
2982	2573	<split-s>	<split-s>
2982	2573	<split-h>	<split-h>
2982	2573	<name2>	<name2>
2982	2601	<name2>	<name>
2982	2976	<>	<name>
2982	2577	<aphaerese>	<aphaerese>
2982	2975	<>	<aphaerese>
2982	2573	<elision3>	<elision3>
2982	2975	<>	<elision3>
2982	2573	<elision2>	<elision2>
2982	2975	<>	<elision2>
2982	2573	<elision1>	<elision1>
2982	2975	<>	<elision1>
2982	2570	.	υ
2982	2497	s	υ
2982	2570	.	u
2982	2497	s	u
2982	2570	.	κ
2982	2442	s	U
2982	2570	.	α
2982	2497	s	α
2982	2570	.	a
2982	2497	s	a
2982	2500	s	A
2982	2570	.	λ
2982	2413	<2s>	<>
2983	2984	.	.
2983	2985	 	 
2983	2984	<~>	<~>
2983	2984	<split-s>	<split-s>
2983	2984	<split-h>	<split-h>
2983	2984	<name2>	<name2>
2983	3099	<>	<name>
2983	2988	<aphaerese>	<aphaerese>
2983	2983	<>	<aphaerese>
2983	3101	<elision3>	<elision3>
2983	2983	<>	<elision3>
2983	3101	<elision2>	<elision2>
2983	2983	<>	<elision2>
2983	3101	<elision1>	<elision1>
2983	2983	<>	<elision1>
2983	2992	.	υ
2983	2995	s	υ
2983	2992	.	u
2983	2995	s	u
2983	2626	s	κ
2983	2751	s	k
2983	3041	s	U
2983	2769	s	K
2983	2992	.	α
2983	3066	s	α
2983	2992	.	a
2983	3066	s	a
2983	3069	s	A
2983	2626	s	λ
2983	2782	s	l
2983	2785	s	L
2983	3130	<1s>	<>
2984	2984	.	.
2984	2985	 	 
2984	2984	<~>	<~>
2984	2984	<split-s>	<split-s>
2984	2984	<split-h>	<split-h>
2984	2984	<name2>	<name2>
2984	3098	<>	<name>
2984	2988	<aphaerese>	<aphaerese>
2984	2984	<>	<aphaerese>
2984	2984	<elision3>	<elision3>
2984	2984	<>	<elision3>
2984	2984	<elision2>	<elision2>
2984	2984	<>	<elision2>
2984	2984	<elision1>	<elision1>
2984	2984	<>	<elision1>
2984	2992	.	υ
2984	2995	s	υ
2984	2992	.	u
2984	2995	s	u
2984	2998	.	κ
2984	3016	s	κ
2984	2751	s	k
2984	3041	s	U
2984	2769	s	K
2984	2992	.	α
2984	3066	s	α
2984	2992	.	a
2984	3066	s	a
2984	3069	s	A
2984	3072	s	λ
2984	2782	s	l
2984	2785	s	L
2984	1940	<1s>	<>
2985	2984	.	.
2985	2985	 	 
2985	2984	<~>	<~>
2985	2984	<split-s>	<split-s>
2985	2984	<split-h>	<split-h>
2985	2984	<name2>	<name2>
2985	2986	<>	<name>
2985	2988	<aphaerese>	<aphaerese>
2985	2991	<>	<aphaerese>
2985	2984	<elision3>	<elision3>
2985	2991	<>	<elision3>
2985	2984	<elision2>	<elision2>
2985	2991	<>	<elision2>
2985	2984	<elision1>	<elision1>
2985	2991	<>	<elision1>
2985	2992	.	υ
2985	3083	s	υ
2985	2992	.	u
2985	3083	s	u
2985	2998	.	κ
2985	3084	s	κ
2985	3085	s	k
2985	3086	s	U
2985	3088	s	K
2985	2992	.	α
2985	3090	s	α
2985	2992	.	a
2985	3090	s	a
2985	3091	s	A
2985	3092	s	λ
2985	3093	s	l
2985	3094	s	L
2985	1940	<1s>	<>
2986	2987	.	.
2986	2990	 	 
2986	2987	<~>	<~>
2986	2987	<split-s>	<split-s>
2986	2987	<split-h>	<split-h>
2986	2987	<name2>	<name2>
2986	3096	<aphaerese>	<aphaerese>
2986	3097	<>	<aphaerese>
2986	2987	<elision3>	<elision3>
2986	3097	<>	<elision3>
2986	2987	<elision2>	<elision2>
2986	3097	<>	<elision2>
2986	2987	<elision1>	<elision1>
2986	3097	<>	<elision1>
2986	2994	.	υ
2986	2997	s	υ
2986	2994	.	u
2986	2997	s	u
2986	3000	.	κ
2986	3018	s	κ
2986	2753	s	k
2986	3043	s	U
2986	3046	s	K
2986	2994	.	α
2986	3068	s	α
2986	2994	.	a
2986	3068	s	a
2986	3071	s	A
2986	3074	s	λ
2986	2784	s	l
2986	3077	s	L
2986	1941	<1s>	<>
2987	2984	.	.
2987	2985	 	 
2987	2984	<~>	<~>
2987	2984	<split-s>	<split-s>
2987	2984	<split-h>	<split-h>
2987	2984	<name2>	<name2>
2987	2988	<aphaerese>	<aphaerese>
2987	2984	<>	<aphaerese>
2987	2984	<elision3>	<elision3>
2987	2984	<>	<elision3>
2987	2984	<elision2>	<elision2>
2987	2984	<>	<elision2>
2987	2984	<elision1>	<elision1>
2987	2984	<>	<elision1>
2987	2992	.	υ
2987	2995	s	υ
2987	2992	.	u
2987	2995	s	u
2987	2998	.	κ
2987	3016	s	κ
2987	2751	s	k
2987	3041	s	U
2987	2769	s	K
2987	2992	.	α
2987	3066	s	α
2987	2992	.	a
2987	3066	s	a
2987	3069	s	A
2987	3072	s	λ
2987	2782	s	l
2987	2785	s	L
2987	1939	<1s>	<>
2988	2984	.	.
2988	2985	 	 
2988	2984	<~>	<~>
2988	2984	<split-s>	<split-s>
2988	2984	<split-h>	<split-h>
2988	2984	<name2>	<name2>
2988	2989	<>	<name>
2988	2988	<aphaerese>	<aphaerese>
2988	2988	<>	<aphaerese>
2988	2984	<elision3>	<elision3>
2988	2988	<>	<elision3>
2988	2984	<elision2>	<elision2>
2988	2988	<>	<elision2>
2988	2984	<elision1>	<elision1>
2988	2988	<>	<elision1>
2988	2984	.	υ
2988	2984	.	u
2988	2998	.	κ
2988	3016	s	κ
2988	2751	s	k
2988	3041	s	U
2988	2769	s	K
2988	2984	.	α
2988	2984	.	a
2988	3069	s	A
2988	3072	s	λ
2988	2782	s	l
2988	2785	s	L
2988	1927	<1s>	<>
2989	2987	.	.
2989	2990	 	 
2989	2987	<~>	<~>
2989	2987	<split-s>	<split-s>
2989	2987	<split-h>	<split-h>
2989	2987	<name2>	<name2>
2989	3096	<aphaerese>	<aphaerese>
2989	3096	<>	<aphaerese>
2989	2987	<elision3>	<elision3>
2989	3096	<>	<elision3>
2989	2987	<elision2>	<elision2>
2989	3096	<>	<elision2>
2989	2987	<elision1>	<elision1>
2989	3096	<>	<elision1>
2989	2987	.	υ
2989	2987	.	u
2989	3000	.	κ
2989	3018	s	κ
2989	2753	s	k
2989	3043	s	U
2989	2772	s	K
2989	2987	.	α
2989	2987	.	a
2989	3071	s	A
2989	3074	s	λ
2989	2784	s	l
2989	2787	s	L
2989	1928	<1s>	<>
2990	2984	.	.
2990	2985	 	 
2990	2984	<~>	<~>
2990	2984	<split-s>	<split-s>
2990	2984	<split-h>	<split-h>
2990	2984	<name2>	<name2>
2990	2988	<aphaerese>	<aphaerese>
2990	2991	<>	<aphaerese>
2990	2984	<elision3>	<elision3>
2990	2991	<>	<elision3>
2990	2984	<elision2>	<elision2>
2990	2991	<>	<elision2>
2990	2984	<elision1>	<elision1>
2990	2991	<>	<elision1>
2990	2992	.	υ
2990	3083	s	υ
2990	2992	.	u
2990	3083	s	u
2990	2998	.	κ
2990	3084	s	κ
2990	3085	s	k
2990	3086	s	U
2990	3088	s	K
2990	2992	.	α
2990	3090	s	α
2990	2992	.	a
2990	3090	s	a
2990	3091	s	A
2990	3092	s	λ
2990	3093	s	l
2990	3094	s	L
2990	1939	<1s>	<>
2991	2984	.	.
2991	2985	 	 
2991	2984	<~>	<~>
2991	2984	<split-s>	<split-s>
2991	2984	<split-h>	<split-h>
2991	2984	<name2>	<name2>
2991	2986	<>	<name>
2991	2988	<aphaerese>	<aphaerese>
2991	2991	<>	<aphaerese>
2991	2984	<elision3>	<elision3>
2991	2991	<>	<elision3>
2991	2984	<elision2>	<elision2>
2991	2991	<>	<elision2>
2991	2984	<elision1>	<elision1>
2991	2991	<>	<elision1>
2991	2992	.	υ
2991	2995	s	υ
2991	2992	.	u
2991	2995	s	u
2991	2998	.	κ
2991	3016	s	κ
2991	2751	s	k
2991	3041	s	U
2991	3044	s	K
2991	2992	.	α
2991	3066	s	α
2991	2992	.	a
2991	3066	s	a
2991	3069	s	A
2991	3072	s	λ
2991	2782	s	l
2991	3075	s	L
2991	1940	<1s>	<>
2992	2993	<>	<name>
2992	2992	<>	<aphaerese>
2992	2984	<elision3>	<elision3>
2992	2992	<>	<elision3>
2992	2984	<elision2>	<elision2>
2992	2992	<>	<elision2>
2992	2984	<elision1>	<elision1>
2992	2992	<>	<elision1>
2992	248	<1s>	<>
2993	2994	<>	<aphaerese>
2993	2987	<elision3>	<elision3>
2993	2994	<>	<elision3>
2993	2987	<elision2>	<elision2>
2993	2994	<>	<elision2>
2993	2987	<elision1>	<elision1>
2993	2994	<>	<elision1>
2993	249	<1s>	<>
2994	2992	<>	<aphaerese>
2994	2984	<elision3>	<elision3>
2994	2992	<>	<elision3>
2994	2984	<elision2>	<elision2>
2994	2992	<>	<elision2>
2994	2984	<elision1>	<elision1>
2994	2992	<>	<elision1>
2994	247	<1s>	<>
2995	2627	.	.
2995	2628	 	 
2995	2627	<~>	<~>
2995	2627	<split-s>	<split-s>
2995	2627	<split-h>	<split-h>
2995	2627	<name2>	<name2>
2995	2996	<>	<name>
2995	2631	<aphaerese>	<aphaerese>
2995	2995	<>	<aphaerese>
2995	2995	<>	<elision3>
2995	2995	<>	<elision2>
2995	2995	<>	<elision1>
2995	2635	.	υ
2995	2638	s	υ
2995	2635	.	u
2995	2638	s	u
2995	2656	.	κ
2995	2671	s	κ
2995	2677	s	k
2995	2680	s	U
2995	2732	s	K
2995	2635	.	α
2995	2638	s	α
2995	2635	.	a
2995	2638	s	a
2995	2710	s	A
2995	2677	s	λ
2995	2677	s	l
2995	2739	s	L
2995	1945	<2s>	<>
2996	2630	.	.
2996	2633	 	 
2996	2630	<~>	<~>
2996	2630	<split-s>	<split-s>
2996	2630	<split-h>	<split-h>
2996	2630	<name2>	<name2>
2996	2731	<aphaerese>	<aphaerese>
2996	2997	<>	<aphaerese>
2996	2997	<>	<elision3>
2996	2997	<>	<elision2>
2996	2997	<>	<elision1>
2996	2637	.	υ
2996	2655	s	υ
2996	2637	.	u
2996	2655	s	u
2996	2658	.	κ
2996	2673	s	κ
2996	2679	s	k
2996	2682	s	U
2996	2734	s	K
2996	2637	.	α
2996	2655	s	α
2996	2637	.	a
2996	2655	s	a
2996	2712	s	A
2996	2679	s	λ
2996	2679	s	l
2996	2741	s	L
2996	1946	<2s>	<>
2997	2627	.	.
2997	2628	 	 
2997	2627	<~>	<~>
2997	2627	<split-s>	<split-s>
2997	2627	<split-h>	<split-h>
2997	2627	<name2>	<name2>
2997	2631	<aphaerese>	<aphaerese>
2997	2995	<>	<aphaerese>
2997	2995	<>	<elision3>
2997	2995	<>	<elision2>
2997	2995	<>	<elision1>
2997	2635	.	υ
2997	2638	s	υ
2997	2635	.	u
2997	2638	s	u
2997	2656	.	κ
2997	2671	s	κ
2997	2677	s	k
2997	2680	s	U
2997	2732	s	K
2997	2635	.	α
2997	2638	s	α
2997	2635	.	a
2997	2638	s	a
2997	2710	s	A
2997	2677	s	λ
2997	2677	s	l
2997	2739	s	L
2997	1944	<2s>	<>
2998	2999	<>	<name>
2998	2998	<>	<aphaerese>
2998	3001	<elision3>	<elision3>
2998	2998	<>	<elision3>
2998	3001	<elision2>	<elision2>
2998	2998	<>	<elision2>
2998	3001	<elision1>	<elision1>
2998	2998	<>	<elision1>
2998	1924	<1s>	<>
2999	3000	<>	<aphaerese>
2999	3003	<elision3>	<elision3>
2999	3000	<>	<elision3>
2999	3003	<elision2>	<elision2>
2999	3000	<>	<elision2>
2999	3003	<elision1>	<elision1>
2999	3000	<>	<elision1>
2999	1925	<1s>	<>
3000	2998	<>	<aphaerese>
3000	3001	<elision3>	<elision3>
3000	2998	<>	<elision3>
3000	3001	<elision2>	<elision2>
3000	2998	<>	<elision2>
3000	3001	<elision1>	<elision1>
3000	2998	<>	<elision1>
3000	1923	<1s>	<>
3001	3002	<>	<name>
3001	3001	<>	<aphaerese>
3001	3001	<>	<elision3>
3001	3001	<>	<elision2>
3001	3001	<>	<elision1>
3001	3004	s	κ
3001	3004	s	k
3001	3007	s	K
3001	3004	s	λ
3001	3011	s	l
3001	3013	s	L
3001	1785	<1s>	<>
3002	3003	<>	<aphaerese>
3002	3003	<>	<elision3>
3002	3003	<>	<elision2>
3002	3003	<>	<elision1>
3002	3006	s	κ
3002	3006	s	k
3002	3009	s	K
3002	3006	s	λ
3002	3010	s	l
3002	3015	s	L
3002	1786	<1s>	<>
3003	3001	<>	<aphaerese>
3003	3001	<>	<elision3>
3003	3001	<>	<elision2>
3003	3001	<>	<elision1>
3003	3004	s	κ
3003	3004	s	k
3003	3007	s	K
3003	3004	s	λ
3003	3011	s	l
3003	3013	s	L
3003	1784	<1s>	<>
3004	3005	<>	<name>
3004	3004	<>	<aphaerese>
3004	3004	<>	<elision3>
3004	3004	<>	<elision2>
3004	3004	<>	<elision1>
3004	2748	s	κ
3004	2677	s	k
3004	2732	s	K
3004	2748	s	λ
3004	2677	s	l
3004	2739	s	L
3004	1960	<2s>	<>
3005	3006	<>	<aphaerese>
3005	3006	<>	<elision3>
3005	3006	<>	<elision2>
3005	3006	<>	<elision1>
3005	2750	s	κ
3005	2679	s	k
3005	2734	s	K
3005	2750	s	λ
3005	2679	s	l
3005	2741	s	L
3005	1961	<2s>	<>
3006	3004	<>	<aphaerese>
3006	3004	<>	<elision3>
3006	3004	<>	<elision2>
3006	3004	<>	<elision1>
3006	2748	s	κ
3006	2677	s	k
3006	2732	s	K
3006	2748	s	λ
3006	2677	s	l
3006	2739	s	L
3006	1959	<2s>	<>
3007	3008	<>	<name>
3007	3007	<>	<aphaerese>
3007	3007	<>	<elision3>
3007	3007	<>	<elision2>
3007	3007	<>	<elision1>
3007	3011	<K2kl>	<>
3008	3009	<>	<aphaerese>
3008	3009	<>	<elision3>
3008	3009	<>	<elision2>
3008	3009	<>	<elision1>
3008	3012	<K2kl>	<>
3009	3007	<>	<aphaerese>
3009	3007	<>	<elision3>
3009	3007	<>	<elision2>
3009	3007	<>	<elision1>
3009	3010	<K2kl>	<>
3010	3011	<>	<aphaerese>
3010	3011	<>	<elision3>
3010	3011	<>	<elision2>
3010	3011	<>	<elision1>
3010	1959	<2s>	<>
3011	3012	<>	<name>
3011	3011	<>	<aphaerese>
3011	3011	<>	<elision3>
3011	3011	<>	<elision2>
3011	3011	<>	<elision1>
3011	1960	<2s>	<>
3012	3010	<>	<aphaerese>
3012	3010	<>	<elision3>
3012	3010	<>	<elision2>
3012	3010	<>	<elision1>
3012	1961	<2s>	<>
3013	3014	<>	<name>
3013	3013	<>	<aphaerese>
3013	3013	<>	<elision3>
3013	3013	<>	<elision2>
3013	3013	<>	<elision1>
3013	3011	<L2kl>	<>
3014	3015	<>	<aphaerese>
3014	3015	<>	<elision3>
3014	3015	<>	<elision2>
3014	3015	<>	<elision1>
3014	3012	<L2kl>	<>
3015	3013	<>	<aphaerese>
3015	3013	<>	<elision3>
3015	3013	<>	<elision2>
3015	3013	<>	<elision1>
3015	3010	<L2kl>	<>
3016	2627	.	.
3016	2628	 	 
3016	2627	<~>	<~>
3016	2627	<split-s>	<split-s>
3016	2627	<split-h>	<split-h>
3016	2627	<name2>	<name2>
3016	3017	<>	<name>
3016	2631	<aphaerese>	<aphaerese>
3016	3016	<>	<aphaerese>
3016	3019	<elision3>	<elision3>
3016	3016	<>	<elision3>
3016	3019	<elision2>	<elision2>
3016	3016	<>	<elision2>
3016	3019	<elision1>	<elision1>
3016	3016	<>	<elision1>
3016	2635	.	υ
3016	2638	s	υ
3016	2635	.	u
3016	2638	s	u
3016	2635	.	κ
3016	2748	s	κ
3016	2677	s	k
3016	2680	s	U
3016	2732	s	K
3016	2635	.	α
3016	2638	s	α
3016	2635	.	a
3016	2638	s	a
3016	2710	s	A
3016	2635	.	λ
3016	2748	s	λ
3016	2677	s	l
3016	2739	s	L
3016	2125	<2s>	<>
3017	2630	.	.
3017	2633	 	 
3017	2630	<~>	<~>
3017	2630	<split-s>	<split-s>
3017	2630	<split-h>	<split-h>
3017	2630	<name2>	<name2>
3017	2731	<aphaerese>	<aphaerese>
3017	3018	<>	<aphaerese>
3017	3021	<elision3>	<elision3>
3017	3018	<>	<elision3>
3017	3021	<elision2>	<elision2>
3017	3018	<>	<elision2>
3017	3021	<elision1>	<elision1>
3017	3018	<>	<elision1>
3017	2637	.	υ
3017	2655	s	υ
3017	2637	.	u
3017	2655	s	u
3017	2637	.	κ
3017	2750	s	κ
3017	2679	s	k
3017	2682	s	U
3017	2734	s	K
3017	2637	.	α
3017	2655	s	α
3017	2637	.	a
3017	2655	s	a
3017	2712	s	A
3017	2637	.	λ
3017	2750	s	λ
3017	2679	s	l
3017	2741	s	L
3017	2126	<2s>	<>
3018	2627	.	.
3018	2628	 	 
3018	2627	<~>	<~>
3018	2627	<split-s>	<split-s>
3018	2627	<split-h>	<split-h>
3018	2627	<name2>	<name2>
3018	2631	<aphaerese>	<aphaerese>
3018	3016	<>	<aphaerese>
3018	3019	<elision3>	<elision3>
3018	3016	<>	<elision3>
3018	3019	<elision2>	<elision2>
3018	3016	<>	<elision2>
3018	3019	<elision1>	<elision1>
3018	3016	<>	<elision1>
3018	2635	.	υ
3018	2638	s	υ
3018	2635	.	u
3018	2638	s	u
3018	2635	.	κ
3018	2748	s	κ
3018	2677	s	k
3018	2680	s	U
3018	2732	s	K
3018	2635	.	α
3018	2638	s	α
3018	2635	.	a
3018	2638	s	a
3018	2710	s	A
3018	2635	.	λ
3018	2748	s	λ
3018	2677	s	l
3018	2739	s	L
3018	2124	<2s>	<>
3019	2627	.	.
3019	2628	 	 
3019	2627	<~>	<~>
3019	2627	<split-s>	<split-s>
3019	2627	<split-h>	<split-h>
3019	2627	<name2>	<name2>
3019	3020	<>	<name>
3019	2631	<aphaerese>	<aphaerese>
3019	3019	<>	<aphaerese>
3019	2627	<elision3>	<elision3>
3019	3019	<>	<elision3>
3019	2627	<elision2>	<elision2>
3019	3019	<>	<elision2>
3019	2627	<elision1>	<elision1>
3019	3019	<>	<elision1>
3019	2635	.	υ
3019	2638	s	υ
3019	2635	.	u
3019	2638	s	u
3019	2656	.	κ
3019	3022	s	κ
3019	3025	s	k
3019	2680	s	U
3019	3028	s	K
3019	2635	.	α
3019	2638	s	α
3019	2635	.	a
3019	2638	s	a
3019	2710	s	A
3019	3025	s	λ
3019	3025	s	l
3019	3036	s	L
3019	2028	<2s>	<>
3020	2630	.	.
3020	2633	 	 
3020	2630	<~>	<~>
3020	2630	<split-s>	<split-s>
3020	2630	<split-h>	<split-h>
3020	2630	<name2>	<name2>
3020	2731	<aphaerese>	<aphaerese>
3020	3021	<>	<aphaerese>
3020	2630	<elision3>	<elision3>
3020	3021	<>	<elision3>
3020	2630	<elision2>	<elision2>
3020	3021	<>	<elision2>
3020	2630	<elision1>	<elision1>
3020	3021	<>	<elision1>
3020	2637	.	υ
3020	2655	s	υ
3020	2637	.	u
3020	2655	s	u
3020	2658	.	κ
3020	3024	s	κ
3020	3027	s	k
3020	2682	s	U
3020	3030	s	K
3020	2637	.	α
3020	2655	s	α
3020	2637	.	a
3020	2655	s	a
3020	2712	s	A
3020	3027	s	λ
3020	3027	s	l
3020	3038	s	L
3020	2029	<2s>	<>
3021	2627	.	.
3021	2628	 	 
3021	2627	<~>	<~>
3021	2627	<split-s>	<split-s>
3021	2627	<split-h>	<split-h>
3021	2627	<name2>	<name2>
3021	2631	<aphaerese>	<aphaerese>
3021	3019	<>	<aphaerese>
3021	2627	<elision3>	<elision3>
3021	3019	<>	<elision3>
3021	2627	<elision2>	<elision2>
3021	3019	<>	<elision2>
3021	2627	<elision1>	<elision1>
3021	3019	<>	<elision1>
3021	2635	.	υ
3021	2638	s	υ
3021	2635	.	u
3021	2638	s	u
3021	2656	.	κ
3021	3022	s	κ
3021	3025	s	k
3021	2680	s	U
3021	3028	s	K
3021	2635	.	α
3021	2638	s	α
3021	2635	.	a
3021	2638	s	a
3021	2710	s	A
3021	3025	s	λ
3021	3025	s	l
3021	3036	s	L
3021	2027	<2s>	<>
3022	2639	.	.
3022	2639	 	 
3022	2639	<~>	<~>
3022	2639	<split-s>	<split-s>
3022	2639	<split-h>	<split-h>
3022	2639	<name2>	<name2>
3022	3023	<>	<name>
3022	2642	<aphaerese>	<aphaerese>
3022	3022	<>	<aphaerese>
3022	2674	<elision3>	<elision3>
3022	3022	<>	<elision3>
3022	2674	<elision2>	<elision2>
3022	3022	<>	<elision2>
3022	2674	<elision1>	<elision1>
3022	3022	<>	<elision1>
3022	2651	.	υ
3022	2651	.	u
3022	2651	.	κ
3022	2651	.	α
3022	2651	.	a
3022	2651	.	λ
3022	2860	<split-s>	<>
3023	2641	.	.
3023	2641	 	 
3023	2641	<~>	<~>
3023	2641	<split-s>	<split-s>
3023	2641	<split-h>	<split-h>
3023	2641	<name2>	<name2>
3023	2644	<aphaerese>	<aphaerese>
3023	3024	<>	<aphaerese>
3023	2676	<elision3>	<elision3>
3023	3024	<>	<elision3>
3023	2676	<elision2>	<elision2>
3023	3024	<>	<elision2>
3023	2676	<elision1>	<elision1>
3023	3024	<>	<elision1>
3023	2653	.	υ
3023	2653	.	u
3023	2653	.	κ
3023	2653	.	α
3023	2653	.	a
3023	2653	.	λ
3023	2861	<split-s>	<>
3024	2639	.	.
3024	2639	 	 
3024	2639	<~>	<~>
3024	2639	<split-s>	<split-s>
3024	2639	<split-h>	<split-h>
3024	2639	<name2>	<name2>
3024	2642	<aphaerese>	<aphaerese>
3024	3022	<>	<aphaerese>
3024	2674	<elision3>	<elision3>
3024	3022	<>	<elision3>
3024	2674	<elision2>	<elision2>
3024	3022	<>	<elision2>
3024	2674	<elision1>	<elision1>
3024	3022	<>	<elision1>
3024	2651	.	υ
3024	2651	.	u
3024	2651	.	κ
3024	2651	.	α
3024	2651	.	a
3024	2651	.	λ
3024	2859	<split-s>	<>
3025	2639	.	.
3025	2639	 	 
3025	2639	<~>	<~>
3025	2639	<split-s>	<split-s>
3025	2639	<split-h>	<split-h>
3025	2639	<name2>	<name2>
3025	3026	<>	<name>
3025	2642	<aphaerese>	<aphaerese>
3025	3025	<>	<aphaerese>
3025	2639	<elision3>	<elision3>
3025	3025	<>	<elision3>
3025	2639	<elision2>	<elision2>
3025	3025	<>	<elision2>
3025	2639	<elision1>	<elision1>
3025	3025	<>	<elision1>
3025	2651	.	υ
3025	2651	.	u
3025	2651	.	κ
3025	2651	.	α
3025	2651	.	a
3025	2651	.	λ
3025	2866	<split-s>	<>
3026	2641	.	.
3026	2641	 	 
3026	2641	<~>	<~>
3026	2641	<split-s>	<split-s>
3026	2641	<split-h>	<split-h>
3026	2641	<name2>	<name2>
3026	2644	<aphaerese>	<aphaerese>
3026	3027	<>	<aphaerese>
3026	2641	<elision3>	<elision3>
3026	3027	<>	<elision3>
3026	2641	<elision2>	<elision2>
3026	3027	<>	<elision2>
3026	2641	<elision1>	<elision1>
3026	3027	<>	<elision1>
3026	2653	.	υ
3026	2653	.	u
3026	2653	.	κ
3026	2653	.	α
3026	2653	.	a
3026	2653	.	λ
3026	2867	<split-s>	<>
3027	2639	.	.
3027	2639	 	 
3027	2639	<~>	<~>
3027	2639	<split-s>	<split-s>
3027	2639	<split-h>	<split-h>
3027	2639	<name2>	<name2>
3027	2642	<aphaerese>	<aphaerese>
3027	3025	<>	<aphaerese>
3027	2639	<elision3>	<elision3>
3027	3025	<>	<elision3>
3027	2639	<elision2>	<elision2>
3027	3025	<>	<elision2>
3027	2639	<elision1>	<elision1>
3027	3025	<>	<elision1>
3027	2651	.	υ
3027	2651	.	u
3027	2651	.	κ
3027	2651	.	α
3027	2651	.	a
3027	2651	.	λ
3027	2865	<split-s>	<>
3028	2684	<name>	<name>
3028	3029	<>	<name>
3028	3031	<>	<aphaerese>
3028	3031	<>	<elision3>
3028	3031	<>	<elision2>
3028	3031	<>	<elision1>
3028	2493	<split-s>	<>
3028	2736	<L2kl>	<>
3028	3035	<K2kl>	<>
3029	3030	<>	<aphaerese>
3029	3030	<>	<elision3>
3029	3030	<>	<elision2>
3029	3030	<>	<elision1>
3029	2737	<L2kl>	<>
3029	3033	<K2kl>	<>
3030	3031	<>	<aphaerese>
3030	3031	<>	<elision3>
3030	3031	<>	<elision2>
3030	3031	<>	<elision1>
3030	2738	<L2kl>	<>
3030	3034	<K2kl>	<>
3031	3029	<>	<name>
3031	3031	<>	<aphaerese>
3031	3031	<>	<elision3>
3031	3031	<>	<elision2>
3031	3031	<>	<elision1>
3031	2736	<L2kl>	<>
3031	3032	<K2kl>	<>
3032	2639	.	.
3032	2639	 	 
3032	2639	<~>	<~>
3032	2639	<split-s>	<split-s>
3032	2639	<split-h>	<split-h>
3032	2639	<name2>	<name2>
3032	3033	<>	<name>
3032	2642	<aphaerese>	<aphaerese>
3032	3032	<>	<aphaerese>
3032	2639	<elision3>	<elision3>
3032	3032	<>	<elision3>
3032	2639	<elision2>	<elision2>
3032	3032	<>	<elision2>
3032	2639	<elision1>	<elision1>
3032	3032	<>	<elision1>
3032	2651	.	υ
3032	2651	.	u
3032	2651	.	α
3032	2651	.	a
3032	2876	<split-s>	<>
3033	2641	.	.
3033	2641	 	 
3033	2641	<~>	<~>
3033	2641	<split-s>	<split-s>
3033	2641	<split-h>	<split-h>
3033	2641	<name2>	<name2>
3033	2644	<aphaerese>	<aphaerese>
3033	3034	<>	<aphaerese>
3033	2641	<elision3>	<elision3>
3033	3034	<>	<elision3>
3033	2641	<elision2>	<elision2>
3033	3034	<>	<elision2>
3033	2641	<elision1>	<elision1>
3033	3034	<>	<elision1>
3033	2653	.	υ
3033	2653	.	u
3033	2653	.	α
3033	2653	.	a
3033	2877	<split-s>	<>
3034	2639	.	.
3034	2639	 	 
3034	2639	<~>	<~>
3034	2639	<split-s>	<split-s>
3034	2639	<split-h>	<split-h>
3034	2639	<name2>	<name2>
3034	2642	<aphaerese>	<aphaerese>
3034	3032	<>	<aphaerese>
3034	2639	<elision3>	<elision3>
3034	3032	<>	<elision3>
3034	2639	<elision2>	<elision2>
3034	3032	<>	<elision2>
3034	2639	<elision1>	<elision1>
3034	3032	<>	<elision1>
3034	2651	.	υ
3034	2651	.	u
3034	2651	.	α
3034	2651	.	a
3034	2875	<split-s>	<>
3035	2639	.	.
3035	2639	 	 
3035	2639	<~>	<~>
3035	2639	<split-s>	<split-s>
3035	2639	<split-h>	<split-h>
3035	2639	<name2>	<name2>
3035	2684	<name2>	<name>
3035	3033	<>	<name>
3035	2642	<aphaerese>	<aphaerese>
3035	3032	<>	<aphaerese>
3035	2639	<elision3>	<elision3>
3035	3032	<>	<elision3>
3035	2639	<elision2>	<elision2>
3035	3032	<>	<elision2>
3035	2639	<elision1>	<elision1>
3035	3032	<>	<elision1>
3035	2651	.	υ
3035	2651	.	u
3035	2651	.	α
3035	2651	.	a
3035	2879	<split-s>	<>
3036	2684	<name>	<name>
3036	3037	<>	<name>
3036	3039	<>	<aphaerese>
3036	3039	<>	<elision3>
3036	3039	<>	<elision2>
3036	3039	<>	<elision1>
3036	2493	<split-s>	<>
3036	3040	<L2kl>	<>
3037	3038	<>	<aphaerese>
3037	3038	<>	<elision3>
3037	3038	<>	<elision2>
3037	3038	<>	<elision1>
3037	3026	<L2kl>	<>
3038	3039	<>	<aphaerese>
3038	3039	<>	<elision3>
3038	3039	<>	<elision2>
3038	3039	<>	<elision1>
3038	3027	<L2kl>	<>
3039	3037	<>	<name>
3039	3039	<>	<aphaerese>
3039	3039	<>	<elision3>
3039	3039	<>	<elision2>
3039	3039	<>	<elision1>
3039	3025	<L2kl>	<>
3040	2639	.	.
3040	2639	 	 
3040	2639	<~>	<~>
3040	2639	<split-s>	<split-s>
3040	2639	<split-h>	<split-h>
3040	2639	<name2>	<name2>
3040	2684	<name2>	<name>
3040	3026	<>	<name>
3040	2642	<aphaerese>	<aphaerese>
3040	3025	<>	<aphaerese>
3040	2639	<elision3>	<elision3>
3040	3025	<>	<elision3>
3040	2639	<elision2>	<elision2>
3040	3025	<>	<elision2>
3040	2639	<elision1>	<elision1>
3040	3025	<>	<elision1>
3040	2651	.	υ
3040	2651	.	u
3040	2651	.	κ
3040	2651	.	α
3040	2651	.	a
3040	2651	.	λ
3040	2891	<split-s>	<>
3041	3042	<>	<name>
3041	3041	<>	<aphaerese>
3041	3041	<>	<elision3>
3041	3041	<>	<elision2>
3041	3041	<>	<elision1>
3041	2757	<U2kl>	<>
3042	3043	<>	<aphaerese>
3042	3043	<>	<elision3>
3042	3043	<>	<elision2>
3042	3043	<>	<elision1>
3042	2758	<U2kl>	<>
3043	3041	<>	<aphaerese>
3043	3041	<>	<elision3>
3043	3041	<>	<elision2>
3043	3041	<>	<elision1>
3043	2759	<U2kl>	<>
3044	2770	<name>	<name>
3044	3045	<>	<name>
3044	3047	<>	<aphaerese>
3044	3047	<>	<elision3>
3044	3047	<>	<elision2>
3044	3047	<>	<elision1>
3044	2257	<2s>	<>
3044	3048	<A2kl>	<>
3044	3057	<L2kl>	<>
3044	2780	<K2kl>	<>
3045	3046	<>	<aphaerese>
3045	3046	<>	<elision3>
3045	3046	<>	<elision2>
3045	3046	<>	<elision1>
3045	3049	<A2kl>	<>
3045	3058	<L2kl>	<>
3045	2778	<K2kl>	<>
3046	3047	<>	<aphaerese>
3046	3047	<>	<elision3>
3046	3047	<>	<elision2>
3046	3047	<>	<elision1>
3046	3050	<A2kl>	<>
3046	3059	<L2kl>	<>
3046	2779	<K2kl>	<>
3047	3045	<>	<name>
3047	3047	<>	<aphaerese>
3047	3047	<>	<elision3>
3047	3047	<>	<elision2>
3047	3047	<>	<elision1>
3047	3048	<A2kl>	<>
3047	3057	<L2kl>	<>
3047	2777	<K2kl>	<>
3048	3049	<>	<name>
3048	3048	<>	<aphaerese>
3048	3048	<>	<elision3>
3048	3048	<>	<elision2>
3048	3048	<>	<elision1>
3048	3051	.	κ
3048	3051	.	λ
3048	2207	<2s>	<>
3049	3050	<>	<aphaerese>
3049	3050	<>	<elision3>
3049	3050	<>	<elision2>
3049	3050	<>	<elision1>
3049	3053	.	κ
3049	3053	.	λ
3049	2208	<2s>	<>
3050	3048	<>	<aphaerese>
3050	3048	<>	<elision3>
3050	3048	<>	<elision2>
3050	3048	<>	<elision1>
3050	3051	.	κ
3050	3051	.	λ
3050	2206	<2s>	<>
3051	3052	<>	<name>
3051	3051	<>	<aphaerese>
3051	3054	<elision3>	<elision3>
3051	3051	<>	<elision3>
3051	3054	<elision2>	<elision2>
3051	3051	<>	<elision2>
3051	3054	<elision1>	<elision1>
3051	3051	<>	<elision1>
3051	2198	<2s>	<>
3052	3053	<>	<aphaerese>
3052	3056	<elision3>	<elision3>
3052	3053	<>	<elision3>
3052	3056	<elision2>	<elision2>
3052	3053	<>	<elision2>
3052	3056	<elision1>	<elision1>
3052	3053	<>	<elision1>
3052	2199	<2s>	<>
3053	3051	<>	<aphaerese>
3053	3054	<elision3>	<elision3>
3053	3051	<>	<elision3>
3053	3054	<elision2>	<elision2>
3053	3051	<>	<elision2>
3053	3054	<elision1>	<elision1>
3053	3051	<>	<elision1>
3053	2197	<2s>	<>
3054	2757	.	.
3054	2757	 	 
3054	2757	<~>	<~>
3054	2757	<split-s>	<split-s>
3054	2757	<split-h>	<split-h>
3054	2757	<name2>	<name2>
3054	3055	<>	<name>
3054	2760	<aphaerese>	<aphaerese>
3054	3054	<>	<aphaerese>
3054	2757	<elision3>	<elision3>
3054	3054	<>	<elision3>
3054	2757	<elision2>	<elision2>
3054	3054	<>	<elision2>
3054	2757	<elision1>	<elision1>
3054	3054	<>	<elision1>
3054	2754	.	υ
3054	2754	.	u
3054	2754	.	α
3054	2754	.	a
3054	2162	<2s>	<>
3055	2759	.	.
3055	2759	 	 
3055	2759	<~>	<~>
3055	2759	<split-s>	<split-s>
3055	2759	<split-h>	<split-h>
3055	2759	<name2>	<name2>
3055	2762	<aphaerese>	<aphaerese>
3055	3056	<>	<aphaerese>
3055	2759	<elision3>	<elision3>
3055	3056	<>	<elision3>
3055	2759	<elision2>	<elision2>
3055	3056	<>	<elision2>
3055	2759	<elision1>	<elision1>
3055	3056	<>	<elision1>
3055	2756	.	υ
3055	2756	.	u
3055	2756	.	α
3055	2756	.	a
3055	2163	<2s>	<>
3056	2757	.	.
3056	2757	 	 
3056	2757	<~>	<~>
3056	2757	<split-s>	<split-s>
3056	2757	<split-h>	<split-h>
3056	2757	<name2>	<name2>
3056	2760	<aphaerese>	<aphaerese>
3056	3054	<>	<aphaerese>
3056	2757	<elision3>	<elision3>
3056	3054	<>	<elision3>
3056	2757	<elision2>	<elision2>
3056	3054	<>	<elision2>
3056	2757	<elision1>	<elision1>
3056	3054	<>	<elision1>
3056	2754	.	υ
3056	2754	.	u
3056	2754	.	α
3056	2754	.	a
3056	2161	<2s>	<>
3057	3058	<>	<name>
3057	3057	<>	<aphaerese>
3057	3057	<>	<elision3>
3057	3057	<>	<elision2>
3057	3057	<>	<elision1>
3057	3060	.	κ
3057	3060	.	λ
3057	2240	<2s>	<>
3058	3059	<>	<aphaerese>
3058	3059	<>	<elision3>
3058	3059	<>	<elision2>
3058	3059	<>	<elision1>
3058	3062	.	κ
3058	3062	.	λ
3058	2241	<2s>	<>
3059	3057	<>	<aphaerese>
3059	3057	<>	<elision3>
3059	3057	<>	<elision2>
3059	3057	<>	<elision1>
3059	3060	.	κ
3059	3060	.	λ
3059	2239	<2s>	<>
3060	3061	<>	<name>
3060	3060	<>	<aphaerese>
3060	3063	<elision3>	<elision3>
3060	3060	<>	<elision3>
3060	3063	<elision2>	<elision2>
3060	3060	<>	<elision2>
3060	3063	<elision1>	<elision1>
3060	3060	<>	<elision1>
3060	2231	<2s>	<>
3061	3062	<>	<aphaerese>
3061	3065	<elision3>	<elision3>
3061	3062	<>	<elision3>
3061	3065	<elision2>	<elision2>
3061	3062	<>	<elision2>
3061	3065	<elision1>	<elision1>
3061	3062	<>	<elision1>
3061	2232	<2s>	<>
3062	3060	<>	<aphaerese>
3062	3063	<elision3>	<elision3>
3062	3060	<>	<elision3>
3062	3063	<elision2>	<elision2>
3062	3060	<>	<elision2>
3062	3063	<elision1>	<elision1>
3062	3060	<>	<elision1>
3062	2230	<2s>	<>
3063	3064	<>	<name>
3063	3063	<>	<aphaerese>
3063	3063	<>	<elision3>
3063	3063	<>	<elision2>
3063	3063	<>	<elision1>
3063	2763	.	κ
3063	2225	<2s>	<>
3064	3065	<>	<aphaerese>
3064	3065	<>	<elision3>
3064	3065	<>	<elision2>
3064	3065	<>	<elision1>
3064	2765	.	κ
3064	2226	<2s>	<>
3065	3063	<>	<aphaerese>
3065	3063	<>	<elision3>
3065	3063	<>	<elision2>
3065	3063	<>	<elision1>
3065	2763	.	κ
3065	2224	<2s>	<>
3066	2757	.	.
3066	2757	 	 
3066	2757	<~>	<~>
3066	2757	<split-s>	<split-s>
3066	2757	<split-h>	<split-h>
3066	2757	<name2>	<name2>
3066	3067	<>	<name>
3066	2760	<aphaerese>	<aphaerese>
3066	3066	<>	<aphaerese>
3066	3066	<>	<elision3>
3066	3066	<>	<elision2>
3066	3066	<>	<elision1>
3066	2754	.	υ
3066	2754	.	u
3066	2763	.	κ
3066	2754	.	α
3066	2754	.	a
3066	1945	<2s>	<>
3067	2759	.	.
3067	2759	 	 
3067	2759	<~>	<~>
3067	2759	<split-s>	<split-s>
3067	2759	<split-h>	<split-h>
3067	2759	<name2>	<name2>
3067	2762	<aphaerese>	<aphaerese>
3067	3068	<>	<aphaerese>
3067	3068	<>	<elision3>
3067	3068	<>	<elision2>
3067	3068	<>	<elision1>
3067	2756	.	υ
3067	2756	.	u
3067	2765	.	κ
3067	2756	.	α
3067	2756	.	a
3067	1946	<2s>	<>
3068	2757	.	.
3068	2757	 	 
3068	2757	<~>	<~>
3068	2757	<split-s>	<split-s>
3068	2757	<split-h>	<split-h>
3068	2757	<name2>	<name2>
3068	2760	<aphaerese>	<aphaerese>
3068	3066	<>	<aphaerese>
3068	3066	<>	<elision3>
3068	3066	<>	<elision2>
3068	3066	<>	<elision1>
3068	2754	.	υ
3068	2754	.	u
3068	2763	.	κ
3068	2754	.	α
3068	2754	.	a
3068	1944	<2s>	<>
3069	3070	<>	<name>
3069	3069	<>	<aphaerese>
3069	3069	<>	<elision3>
3069	3069	<>	<elision2>
3069	3069	<>	<elision1>
3069	2757	<A2kl>	<>
3070	3071	<>	<aphaerese>
3070	3071	<>	<elision3>
3070	3071	<>	<elision2>
3070	3071	<>	<elision1>
3070	2758	<A2kl>	<>
3071	3069	<>	<aphaerese>
3071	3069	<>	<elision3>
3071	3069	<>	<elision2>
3071	3069	<>	<elision1>
3071	2759	<A2kl>	<>
3072	2627	.	.
3072	2628	 	 
3072	2627	<~>	<~>
3072	2627	<split-s>	<split-s>
3072	2627	<split-h>	<split-h>
3072	2627	<name2>	<name2>
3072	3073	<>	<name>
3072	2631	<aphaerese>	<aphaerese>
3072	3072	<>	<aphaerese>
3072	2627	<elision3>	<elision3>
3072	3072	<>	<elision3>
3072	2627	<elision2>	<elision2>
3072	3072	<>	<elision2>
3072	2627	<elision1>	<elision1>
3072	3072	<>	<elision1>
3072	2635	.	υ
3072	2638	s	υ
3072	2635	.	u
3072	2638	s	u
3072	2635	.	κ
3072	2748	s	κ
3072	2677	s	k
3072	2680	s	U
3072	2732	s	K
3072	2635	.	α
3072	2638	s	α
3072	2635	.	a
3072	2638	s	a
3072	2710	s	A
3072	2635	.	λ
3072	2748	s	λ
3072	2677	s	l
3072	2739	s	L
3072	2137	<2s>	<>
3073	2630	.	.
3073	2633	 	 
3073	2630	<~>	<~>
3073	2630	<split-s>	<split-s>
3073	2630	<split-h>	<split-h>
3073	2630	<name2>	<name2>
3073	2731	<aphaerese>	<aphaerese>
3073	3074	<>	<aphaerese>
3073	2630	<elision3>	<elision3>
3073	3074	<>	<elision3>
3073	2630	<elision2>	<elision2>
3073	3074	<>	<elision2>
3073	2630	<elision1>	<elision1>
3073	3074	<>	<elision1>
3073	2637	.	υ
3073	2655	s	υ
3073	2637	.	u
3073	2655	s	u
3073	2637	.	κ
3073	2750	s	κ
3073	2679	s	k
3073	2682	s	U
3073	2734	s	K
3073	2637	.	α
3073	2655	s	α
3073	2637	.	a
3073	2655	s	a
3073	2712	s	A
3073	2637	.	λ
3073	2750	s	λ
3073	2679	s	l
3073	2741	s	L
3073	2138	<2s>	<>
3074	2627	.	.
3074	2628	 	 
3074	2627	<~>	<~>
3074	2627	<split-s>	<split-s>
3074	2627	<split-h>	<split-h>
3074	2627	<name2>	<name2>
3074	2631	<aphaerese>	<aphaerese>
3074	3072	<>	<aphaerese>
3074	2627	<elision3>	<elision3>
3074	3072	<>	<elision3>
3074	2627	<elision2>	<elision2>
3074	3072	<>	<elision2>
3074	2627	<elision1>	<elision1>
3074	3072	<>	<elision1>
3074	2635	.	υ
3074	2638	s	υ
3074	2635	.	u
3074	2638	s	u
3074	2635	.	κ
3074	2748	s	κ
3074	2677	s	k
3074	2680	s	U
3074	2732	s	K
3074	2635	.	α
3074	2638	s	α
3074	2635	.	a
3074	2638	s	a
3074	2710	s	A
3074	2635	.	λ
3074	2748	s	λ
3074	2677	s	l
3074	2739	s	L
3074	2136	<2s>	<>
3075	2781	<name>	<name>
3075	3076	<>	<name>
3075	3078	<>	<aphaerese>
3075	3078	<>	<elision3>
3075	3078	<>	<elision2>
3075	3078	<>	<elision1>
3075	2257	<2s>	<>
3075	3048	<A2kl>	<>
3075	3082	<L2kl>	<>
3076	3077	<>	<aphaerese>
3076	3077	<>	<elision3>
3076	3077	<>	<elision2>
3076	3077	<>	<elision1>
3076	3049	<A2kl>	<>
3076	3080	<L2kl>	<>
3077	3078	<>	<aphaerese>
3077	3078	<>	<elision3>
3077	3078	<>	<elision2>
3077	3078	<>	<elision1>
3077	3050	<A2kl>	<>
3077	3081	<L2kl>	<>
3078	3076	<>	<name>
3078	3078	<>	<aphaerese>
3078	3078	<>	<elision3>
3078	3078	<>	<elision2>
3078	3078	<>	<elision1>
3078	3048	<A2kl>	<>
3078	3079	<L2kl>	<>
3079	2757	.	.
3079	2757	 	 
3079	2757	<~>	<~>
3079	2757	<split-s>	<split-s>
3079	2757	<split-h>	<split-h>
3079	2757	<name2>	<name2>
3079	3080	<>	<name>
3079	2760	<aphaerese>	<aphaerese>
3079	3079	<>	<aphaerese>
3079	2757	<elision3>	<elision3>
3079	3079	<>	<elision3>
3079	2757	<elision2>	<elision2>
3079	3079	<>	<elision2>
3079	2757	<elision1>	<elision1>
3079	3079	<>	<elision1>
3079	2754	.	υ
3079	2754	.	u
3079	3060	.	κ
3079	2754	.	α
3079	2754	.	a
3079	3060	.	λ
3079	2274	<2s>	<>
3080	2759	.	.
3080	2759	 	 
3080	2759	<~>	<~>
3080	2759	<split-s>	<split-s>
3080	2759	<split-h>	<split-h>
3080	2759	<name2>	<name2>
3080	2762	<aphaerese>	<aphaerese>
3080	3081	<>	<aphaerese>
3080	2759	<elision3>	<elision3>
3080	3081	<>	<elision3>
3080	2759	<elision2>	<elision2>
3080	3081	<>	<elision2>
3080	2759	<elision1>	<elision1>
3080	3081	<>	<elision1>
3080	2756	.	υ
3080	2756	.	u
3080	3062	.	κ
3080	2756	.	α
3080	2756	.	a
3080	3062	.	λ
3080	2275	<2s>	<>
3081	2757	.	.
3081	2757	 	 
3081	2757	<~>	<~>
3081	2757	<split-s>	<split-s>
3081	2757	<split-h>	<split-h>
3081	2757	<name2>	<name2>
3081	2760	<aphaerese>	<aphaerese>
3081	3079	<>	<aphaerese>
3081	2757	<elision3>	<elision3>
3081	3079	<>	<elision3>
3081	2757	<elision2>	<elision2>
3081	3079	<>	<elision2>
3081	2757	<elision1>	<elision1>
3081	3079	<>	<elision1>
3081	2754	.	υ
3081	2754	.	u
3081	3060	.	κ
3081	2754	.	α
3081	2754	.	a
3081	3060	.	λ
3081	2273	<2s>	<>
3082	2757	.	.
3082	2757	 	 
3082	2757	<~>	<~>
3082	2757	<split-s>	<split-s>
3082	2757	<split-h>	<split-h>
3082	2757	<name2>	<name2>
3082	2781	<name2>	<name>
3082	3080	<>	<name>
3082	2760	<aphaerese>	<aphaerese>
3082	3079	<>	<aphaerese>
3082	2757	<elision3>	<elision3>
3082	3079	<>	<elision3>
3082	2757	<elision2>	<elision2>
3082	3079	<>	<elision2>
3082	2757	<elision1>	<elision1>
3082	3079	<>	<elision1>
3082	2754	.	υ
3082	2754	.	u
3082	3060	.	κ
3082	2754	.	α
3082	2754	.	a
3082	3060	.	λ
3082	2280	<2s>	<>
3083	2627	.	.
3083	2628	 	 
3083	2627	<~>	<~>
3083	2627	<split-s>	<split-s>
3083	2627	<split-h>	<split-h>
3083	2627	<name2>	<name2>
3083	2996	<>	<name>
3083	2631	<aphaerese>	<aphaerese>
3083	2995	<>	<aphaerese>
3083	2995	<>	<elision3>
3083	2995	<>	<elision2>
3083	2995	<>	<elision1>
3083	2635	.	υ
3083	2638	s	υ
3083	2635	.	u
3083	2638	s	u
3083	2656	.	κ
3083	2671	s	κ
3083	2677	s	k
3083	2680	s	U
3083	2732	s	K
3083	2635	.	α
3083	2638	s	α
3083	2635	.	a
3083	2638	s	a
3083	2710	s	A
3083	2677	s	λ
3083	2677	s	l
3083	2739	s	L
3083	2286	<2s>	<>
3084	2627	.	.
3084	2628	 	 
3084	2627	<~>	<~>
3084	2627	<split-s>	<split-s>
3084	2627	<split-h>	<split-h>
3084	2627	<name2>	<name2>
3084	3017	<>	<name>
3084	2631	<aphaerese>	<aphaerese>
3084	3016	<>	<aphaerese>
3084	3019	<elision3>	<elision3>
3084	3016	<>	<elision3>
3084	3019	<elision2>	<elision2>
3084	3016	<>	<elision2>
3084	3019	<elision1>	<elision1>
3084	3016	<>	<elision1>
3084	2635	.	υ
3084	2638	s	υ
3084	2635	.	u
3084	2638	s	u
3084	2635	.	κ
3084	2748	s	κ
3084	2677	s	k
3084	2680	s	U
3084	2732	s	K
3084	2635	.	α
3084	2638	s	α
3084	2635	.	a
3084	2638	s	a
3084	2710	s	A
3084	2635	.	λ
3084	2748	s	λ
3084	2677	s	l
3084	2739	s	L
3084	2289	<2s>	<>
3085	2627	.	.
3085	2628	 	 
3085	2627	<~>	<~>
3085	2627	<split-s>	<split-s>
3085	2627	<split-h>	<split-h>
3085	2627	<name2>	<name2>
3085	2752	<>	<name>
3085	2631	<aphaerese>	<aphaerese>
3085	2751	<>	<aphaerese>
3085	2627	<elision3>	<elision3>
3085	2751	<>	<elision3>
3085	2627	<elision2>	<elision2>
3085	2751	<>	<elision2>
3085	2627	<elision1>	<elision1>
3085	2751	<>	<elision1>
3085	2635	.	υ
3085	2638	s	υ
3085	2635	.	u
3085	2638	s	u
3085	2754	.	κ
3085	2748	s	κ
3085	2677	s	k
3085	2680	s	U
3085	2732	s	K
3085	2635	.	α
3085	2638	s	α
3085	2635	.	a
3085	2638	s	a
3085	2710	s	A
3085	2754	.	λ
3085	2748	s	λ
3085	2677	s	l
3085	2739	s	L
3085	2292	<2s>	<>
3086	3042	<>	<name>
3086	3041	<>	<aphaerese>
3086	3041	<>	<elision3>
3086	3041	<>	<elision2>
3086	3041	<>	<elision1>
3086	3087	<U2kl>	<>
3087	2757	.	.
3087	2757	 	 
3087	2757	<~>	<~>
3087	2757	<split-s>	<split-s>
3087	2757	<split-h>	<split-h>
3087	2757	<name2>	<name2>
3087	2758	<>	<name>
3087	2760	<aphaerese>	<aphaerese>
3087	2757	<>	<aphaerese>
3087	2757	<elision3>	<elision3>
3087	2757	<>	<elision3>
3087	2757	<elision2>	<elision2>
3087	2757	<>	<elision2>
3087	2757	<elision1>	<elision1>
3087	2757	<>	<elision1>
3087	2754	.	υ
3087	2754	.	u
3087	2763	.	κ
3087	2754	.	α
3087	2754	.	a
3087	2296	<2s>	<>
3088	2770	<name>	<name>
3088	3045	<>	<name>
3088	3047	<>	<aphaerese>
3088	3047	<>	<elision3>
3088	3047	<>	<elision2>
3088	3047	<>	<elision1>
3088	2257	<2s>	<>
3088	3048	<A2kl>	<>
3088	3057	<L2kl>	<>
3088	3089	<K2kl>	<>
3089	2757	.	.
3089	2757	 	 
3089	2757	<~>	<~>
3089	2757	<split-s>	<split-s>
3089	2757	<split-h>	<split-h>
3089	2757	<name2>	<name2>
3089	2781	<name2>	<name>
3089	2778	<>	<name>
3089	2760	<aphaerese>	<aphaerese>
3089	2777	<>	<aphaerese>
3089	2757	<elision3>	<elision3>
3089	2777	<>	<elision3>
3089	2757	<elision2>	<elision2>
3089	2777	<>	<elision2>
3089	2757	<elision1>	<elision1>
3089	2777	<>	<elision1>
3089	2754	.	υ
3089	2754	.	u
3089	2754	.	α
3089	2754	.	a
3089	2300	<2s>	<>
3090	2757	.	.
3090	2757	 	 
3090	2757	<~>	<~>
3090	2757	<split-s>	<split-s>
3090	2757	<split-h>	<split-h>
3090	2757	<name2>	<name2>
3090	3067	<>	<name>
3090	2760	<aphaerese>	<aphaerese>
3090	3066	<>	<aphaerese>
3090	3066	<>	<elision3>
3090	3066	<>	<elision2>
3090	3066	<>	<elision1>
3090	2754	.	υ
3090	2754	.	u
3090	2763	.	κ
3090	2754	.	α
3090	2754	.	a
3090	2286	<2s>	<>
3091	3070	<>	<name>
3091	3069	<>	<aphaerese>
3091	3069	<>	<elision3>
3091	3069	<>	<elision2>
3091	3069	<>	<elision1>
3091	3087	<A2kl>	<>
3092	2627	.	.
3092	2628	 	 
3092	2627	<~>	<~>
3092	2627	<split-s>	<split-s>
3092	2627	<split-h>	<split-h>
3092	2627	<name2>	<name2>
3092	3073	<>	<name>
3092	2631	<aphaerese>	<aphaerese>
3092	3072	<>	<aphaerese>
3092	2627	<elision3>	<elision3>
3092	3072	<>	<elision3>
3092	2627	<elision2>	<elision2>
3092	3072	<>	<elision2>
3092	2627	<elision1>	<elision1>
3092	3072	<>	<elision1>
3092	2635	.	υ
3092	2638	s	υ
3092	2635	.	u
3092	2638	s	u
3092	2635	.	κ
3092	2748	s	κ
3092	2677	s	k
3092	2680	s	U
3092	2732	s	K
3092	2635	.	α
3092	2638	s	α
3092	2635	.	a
3092	2638	s	a
3092	2710	s	A
3092	2635	.	λ
3092	2748	s	λ
3092	2677	s	l
3092	2739	s	L
3092	2292	<2s>	<>
3093	2757	.	.
3093	2757	 	 
3093	2757	<~>	<~>
3093	2757	<split-s>	<split-s>
3093	2757	<split-h>	<split-h>
3093	2757	<name2>	<name2>
3093	2783	<>	<name>
3093	2760	<aphaerese>	<aphaerese>
3093	2782	<>	<aphaerese>
3093	2757	<elision3>	<elision3>
3093	2782	<>	<elision3>
3093	2757	<elision2>	<elision2>
3093	2782	<>	<elision2>
3093	2757	<elision1>	<elision1>
3093	2782	<>	<elision1>
3093	2754	.	υ
3093	2754	.	u
3093	2754	.	κ
3093	2754	.	α
3093	2754	.	a
3093	2754	.	λ
3093	2292	<2s>	<>
3094	2781	<name>	<name>
3094	3076	<>	<name>
3094	3078	<>	<aphaerese>
3094	3078	<>	<elision3>
3094	3078	<>	<elision2>
3094	3078	<>	<elision1>
3094	2257	<2s>	<>
3094	3048	<A2kl>	<>
3094	3095	<L2kl>	<>
3095	2757	.	.
3095	2757	 	 
3095	2757	<~>	<~>
3095	2757	<split-s>	<split-s>
3095	2757	<split-h>	<split-h>
3095	2757	<name2>	<name2>
3095	2781	<name2>	<name>
3095	3080	<>	<name>
3095	2760	<aphaerese>	<aphaerese>
3095	3079	<>	<aphaerese>
3095	2757	<elision3>	<elision3>
3095	3079	<>	<elision3>
3095	2757	<elision2>	<elision2>
3095	3079	<>	<elision2>
3095	2757	<elision1>	<elision1>
3095	3079	<>	<elision1>
3095	2754	.	υ
3095	2754	.	u
3095	3060	.	κ
3095	2754	.	α
3095	2754	.	a
3095	3060	.	λ
3095	2305	<2s>	<>
3096	2984	.	.
3096	2985	 	 
3096	2984	<~>	<~>
3096	2984	<split-s>	<split-s>
3096	2984	<split-h>	<split-h>
3096	2984	<name2>	<name2>
3096	2988	<aphaerese>	<aphaerese>
3096	2988	<>	<aphaerese>
3096	2984	<elision3>	<elision3>
3096	2988	<>	<elision3>
3096	2984	<elision2>	<elision2>
3096	2988	<>	<elision2>
3096	2984	<elision1>	<elision1>
3096	2988	<>	<elision1>
3096	2984	.	υ
3096	2984	.	u
3096	2998	.	κ
3096	3016	s	κ
3096	2751	s	k
3096	3041	s	U
3096	2769	s	K
3096	2984	.	α
3096	2984	.	a
3096	3069	s	A
3096	3072	s	λ
3096	2782	s	l
3096	2785	s	L
3096	1926	<1s>	<>
3097	2984	.	.
3097	2985	 	 
3097	2984	<~>	<~>
3097	2984	<split-s>	<split-s>
3097	2984	<split-h>	<split-h>
3097	2984	<name2>	<name2>
3097	2988	<aphaerese>	<aphaerese>
3097	2991	<>	<aphaerese>
3097	2984	<elision3>	<elision3>
3097	2991	<>	<elision3>
3097	2984	<elision2>	<elision2>
3097	2991	<>	<elision2>
3097	2984	<elision1>	<elision1>
3097	2991	<>	<elision1>
3097	2992	.	υ
3097	2995	s	υ
3097	2992	.	u
3097	2995	s	u
3097	2998	.	κ
3097	3016	s	κ
3097	2751	s	k
3097	3041	s	U
3097	3044	s	K
3097	2992	.	α
3097	3066	s	α
3097	2992	.	a
3097	3066	s	a
3097	3069	s	A
3097	3072	s	λ
3097	2782	s	l
3097	3075	s	L
3097	1939	<1s>	<>
3098	2987	.	.
3098	2990	 	 
3098	2987	<~>	<~>
3098	2987	<split-s>	<split-s>
3098	2987	<split-h>	<split-h>
3098	2987	<name2>	<name2>
3098	3096	<aphaerese>	<aphaerese>
3098	2987	<>	<aphaerese>
3098	2987	<elision3>	<elision3>
3098	2987	<>	<elision3>
3098	2987	<elision2>	<elision2>
3098	2987	<>	<elision2>
3098	2987	<elision1>	<elision1>
3098	2987	<>	<elision1>
3098	2994	.	υ
3098	2997	s	υ
3098	2994	.	u
3098	2997	s	u
3098	3000	.	κ
3098	3018	s	κ
3098	2753	s	k
3098	3043	s	U
3098	2772	s	K
3098	2994	.	α
3098	3068	s	α
3098	2994	.	a
3098	3068	s	a
3098	3071	s	A
3098	3074	s	λ
3098	2784	s	l
3098	2787	s	L
3098	1941	<1s>	<>
3099	2987	.	.
3099	2990	 	 
3099	2987	<~>	<~>
3099	2987	<split-s>	<split-s>
3099	2987	<split-h>	<split-h>
3099	2987	<name2>	<name2>
3099	3096	<aphaerese>	<aphaerese>
3099	3100	<>	<aphaerese>
3099	3103	<elision3>	<elision3>
3099	3100	<>	<elision3>
3099	3103	<elision2>	<elision2>
3099	3100	<>	<elision2>
3099	3103	<elision1>	<elision1>
3099	3100	<>	<elision1>
3099	2994	.	υ
3099	2997	s	υ
3099	2994	.	u
3099	2997	s	u
3099	2747	s	κ
3099	2753	s	k
3099	3043	s	U
3099	2772	s	K
3099	2994	.	α
3099	3068	s	α
3099	2994	.	a
3099	3068	s	a
3099	3071	s	A
3099	2747	s	λ
3099	2784	s	l
3099	2787	s	L
3099	3131	<1s>	<>
3100	2984	.	.
3100	2985	 	 
3100	2984	<~>	<~>
3100	2984	<split-s>	<split-s>
3100	2984	<split-h>	<split-h>
3100	2984	<name2>	<name2>
3100	2988	<aphaerese>	<aphaerese>
3100	2983	<>	<aphaerese>
3100	3101	<elision3>	<elision3>
3100	2983	<>	<elision3>
3100	3101	<elision2>	<elision2>
3100	2983	<>	<elision2>
3100	3101	<elision1>	<elision1>
3100	2983	<>	<elision1>
3100	2992	.	υ
3100	2995	s	υ
3100	2992	.	u
3100	2995	s	u
3100	2626	s	κ
3100	2751	s	k
3100	3041	s	U
3100	2769	s	K
3100	2992	.	α
3100	3066	s	α
3100	2992	.	a
3100	3066	s	a
3100	3069	s	A
3100	2626	s	λ
3100	2782	s	l
3100	2785	s	L
3100	3129	<1s>	<>
3101	2984	.	.
3101	2985	 	 
3101	2984	<~>	<~>
3101	2984	<split-s>	<split-s>
3101	2984	<split-h>	<split-h>
3101	2984	<name2>	<name2>
3101	3102	<>	<name>
3101	2988	<aphaerese>	<aphaerese>
3101	3101	<>	<aphaerese>
3101	2984	<elision3>	<elision3>
3101	3101	<>	<elision3>
3101	2984	<elision2>	<elision2>
3101	3101	<>	<elision2>
3101	2984	<elision1>	<elision1>
3101	3101	<>	<elision1>
3101	2992	.	υ
3101	2995	s	υ
3101	2992	.	u
3101	2995	s	u
3101	2998	.	κ
3101	3104	s	κ
3101	3107	s	k
3101	3041	s	U
3101	3110	s	K
3101	2992	.	α
3101	3066	s	α
3101	2992	.	a
3101	3066	s	a
3101	3069	s	A
3101	3118	s	λ
3101	3121	s	l
3101	3124	s	L
3101	2028	<1s>	<>
3102	2987	.	.
3102	2990	 	 
3102	2987	<~>	<~>
3102	2987	<split-s>	<split-s>
3102	2987	<split-h>	<split-h>
3102	2987	<name2>	<name2>
3102	3096	<aphaerese>	<aphaerese>
3102	3103	<>	<aphaerese>
3102	2987	<elision3>	<elision3>
3102	3103	<>	<elision3>
3102	2987	<elision2>	<elision2>
3102	3103	<>	<elision2>
3102	2987	<elision1>	<elision1>
3102	3103	<>	<elision1>
3102	2994	.	υ
3102	2997	s	υ
3102	2994	.	u
3102	2997	s	u
3102	3000	.	κ
3102	3106	s	κ
3102	3109	s	k
3102	3043	s	U
3102	3112	s	K
3102	2994	.	α
3102	3068	s	α
3102	2994	.	a
3102	3068	s	a
3102	3071	s	A
3102	3120	s	λ
3102	3123	s	l
3102	3126	s	L
3102	2029	<1s>	<>
3103	2984	.	.
3103	2985	 	 
3103	2984	<~>	<~>
3103	2984	<split-s>	<split-s>
3103	2984	<split-h>	<split-h>
3103	2984	<name2>	<name2>
3103	2988	<aphaerese>	<aphaerese>
3103	3101	<>	<aphaerese>
3103	2984	<elision3>	<elision3>
3103	3101	<>	<elision3>
3103	2984	<elision2>	<elision2>
3103	3101	<>	<elision2>
3103	2984	<elision1>	<elision1>
3103	3101	<>	<elision1>
3103	2992	.	υ
3103	2995	s	υ
3103	2992	.	u
3103	2995	s	u
3103	2998	.	κ
3103	3104	s	κ
3103	3107	s	k
3103	3041	s	U
3103	3110	s	K
3103	2992	.	α
3103	3066	s	α
3103	2992	.	a
3103	3066	s	a
3103	3069	s	A
3103	3118	s	λ
3103	3121	s	l
3103	3124	s	L
3103	2027	<1s>	<>
3104	2627	.	.
3104	2628	 	 
3104	2627	<~>	<~>
3104	2627	<split-s>	<split-s>
3104	2627	<split-h>	<split-h>
3104	2627	<name2>	<name2>
3104	3105	<>	<name>
3104	2631	<aphaerese>	<aphaerese>
3104	3104	<>	<aphaerese>
3104	3019	<elision3>	<elision3>
3104	3104	<>	<elision3>
3104	3019	<elision2>	<elision2>
3104	3104	<>	<elision2>
3104	3019	<elision1>	<elision1>
3104	3104	<>	<elision1>
3104	2635	.	υ
3104	2638	s	υ
3104	2635	.	u
3104	2638	s	u
3104	2635	.	κ
3104	2680	s	U
3104	2635	.	α
3104	2638	s	α
3104	2635	.	a
3104	2638	s	a
3104	2710	s	A
3104	2635	.	λ
3104	2378	<2s>	<>
3105	2630	.	.
3105	2633	 	 
3105	2630	<~>	<~>
3105	2630	<split-s>	<split-s>
3105	2630	<split-h>	<split-h>
3105	2630	<name2>	<name2>
3105	2731	<aphaerese>	<aphaerese>
3105	3106	<>	<aphaerese>
3105	3021	<elision3>	<elision3>
3105	3106	<>	<elision3>
3105	3021	<elision2>	<elision2>
3105	3106	<>	<elision2>
3105	3021	<elision1>	<elision1>
3105	3106	<>	<elision1>
3105	2637	.	υ
3105	2655	s	υ
3105	2637	.	u
3105	2655	s	u
3105	2637	.	κ
3105	2682	s	U
3105	2637	.	α
3105	2655	s	α
3105	2637	.	a
3105	2655	s	a
3105	2712	s	A
3105	2637	.	λ
3105	2379	<2s>	<>
3106	2627	.	.
3106	2628	 	 
3106	2627	<~>	<~>
3106	2627	<split-s>	<split-s>
3106	2627	<split-h>	<split-h>
3106	2627	<name2>	<name2>
3106	2631	<aphaerese>	<aphaerese>
3106	3104	<>	<aphaerese>
3106	3019	<elision3>	<elision3>
3106	3104	<>	<elision3>
3106	3019	<elision2>	<elision2>
3106	3104	<>	<elision2>
3106	3019	<elision1>	<elision1>
3106	3104	<>	<elision1>
3106	2635	.	υ
3106	2638	s	υ
3106	2635	.	u
3106	2638	s	u
3106	2635	.	κ
3106	2680	s	U
3106	2635	.	α
3106	2638	s	α
3106	2635	.	a
3106	2638	s	a
3106	2710	s	A
3106	2635	.	λ
3106	2377	<2s>	<>
3107	2627	.	.
3107	2628	 	 
3107	2627	<~>	<~>
3107	2627	<split-s>	<split-s>
3107	2627	<split-h>	<split-h>
3107	2627	<name2>	<name2>
3107	3108	<>	<name>
3107	2631	<aphaerese>	<aphaerese>
3107	3107	<>	<aphaerese>
3107	2627	<elision3>	<elision3>
3107	3107	<>	<elision3>
3107	2627	<elision2>	<elision2>
3107	3107	<>	<elision2>
3107	2627	<elision1>	<elision1>
3107	3107	<>	<elision1>
3107	2635	.	υ
3107	2638	s	υ
3107	2635	.	u
3107	2638	s	u
3107	2754	.	κ
3107	2680	s	U
3107	2635	.	α
3107	2638	s	α
3107	2635	.	a
3107	2638	s	a
3107	2710	s	A
3107	2754	.	λ
3107	2387	<2s>	<>
3108	2630	.	.
3108	2633	 	 
3108	2630	<~>	<~>
3108	2630	<split-s>	<split-s>
3108	2630	<split-h>	<split-h>
3108	2630	<name2>	<name2>
3108	2731	<aphaerese>	<aphaerese>
3108	3109	<>	<aphaerese>
3108	2630	<elision3>	<elision3>
3108	3109	<>	<elision3>
3108	2630	<elision2>	<elision2>
3108	3109	<>	<elision2>
3108	2630	<elision1>	<elision1>
3108	3109	<>	<elision1>
3108	2637	.	υ
3108	2655	s	υ
3108	2637	.	u
3108	2655	s	u
3108	2756	.	κ
3108	2682	s	U
3108	2637	.	α
3108	2655	s	α
3108	2637	.	a
3108	2655	s	a
3108	2712	s	A
3108	2756	.	λ
3108	2388	<2s>	<>
3109	2627	.	.
3109	2628	 	 
3109	2627	<~>	<~>
3109	2627	<split-s>	<split-s>
3109	2627	<split-h>	<split-h>
3109	2627	<name2>	<name2>
3109	2631	<aphaerese>	<aphaerese>
3109	3107	<>	<aphaerese>
3109	2627	<elision3>	<elision3>
3109	3107	<>	<elision3>
3109	2627	<elision2>	<elision2>
3109	3107	<>	<elision2>
3109	2627	<elision1>	<elision1>
3109	3107	<>	<elision1>
3109	2635	.	υ
3109	2638	s	υ
3109	2635	.	u
3109	2638	s	u
3109	2754	.	κ
3109	2680	s	U
3109	2635	.	α
3109	2638	s	α
3109	2635	.	a
3109	2638	s	a
3109	2710	s	A
3109	2754	.	λ
3109	2386	<2s>	<>
3110	2770	<name>	<name>
3110	3111	<>	<name>
3110	3113	<>	<aphaerese>
3110	3113	<>	<elision3>
3110	3113	<>	<elision2>
3110	3113	<>	<elision1>
3110	2257	<2s>	<>
3110	2774	<L2kl>	<>
3110	3117	<K2kl>	<>
3111	3112	<>	<aphaerese>
3111	3112	<>	<elision3>
3111	3112	<>	<elision2>
3111	3112	<>	<elision1>
3111	2775	<L2kl>	<>
3111	3115	<K2kl>	<>
3112	3113	<>	<aphaerese>
3112	3113	<>	<elision3>
3112	3113	<>	<elision2>
3112	3113	<>	<elision1>
3112	2776	<L2kl>	<>
3112	3116	<K2kl>	<>
3113	3111	<>	<name>
3113	3113	<>	<aphaerese>
3113	3113	<>	<elision3>
3113	3113	<>	<elision2>
3113	3113	<>	<elision1>
3113	2774	<L2kl>	<>
3113	3114	<K2kl>	<>
3114	2757	.	.
3114	2757	 	 
3114	2757	<~>	<~>
3114	2757	<split-s>	<split-s>
3114	2757	<split-h>	<split-h>
3114	2757	<name2>	<name2>
3114	3115	<>	<name>
3114	2760	<aphaerese>	<aphaerese>
3114	3114	<>	<aphaerese>
3114	2757	<elision3>	<elision3>
3114	3114	<>	<elision3>
3114	2757	<elision2>	<elision2>
3114	3114	<>	<elision2>
3114	2757	<elision1>	<elision1>
3114	3114	<>	<elision1>
3114	2754	.	υ
3114	2754	.	u
3114	2754	.	α
3114	2754	.	a
3114	2400	<2s>	<>
3115	2759	.	.
3115	2759	 	 
3115	2759	<~>	<~>
3115	2759	<split-s>	<split-s>
3115	2759	<split-h>	<split-h>
3115	2759	<name2>	<name2>
3115	2762	<aphaerese>	<aphaerese>
3115	3116	<>	<aphaerese>
3115	2759	<elision3>	<elision3>
3115	3116	<>	<elision3>
3115	2759	<elision2>	<elision2>
3115	3116	<>	<elision2>
3115	2759	<elision1>	<elision1>
3115	3116	<>	<elision1>
3115	2756	.	υ
3115	2756	.	u
3115	2756	.	α
3115	2756	.	a
3115	2401	<2s>	<>
3116	2757	.	.
3116	2757	 	 
3116	2757	<~>	<~>
3116	2757	<split-s>	<split-s>
3116	2757	<split-h>	<split-h>
3116	2757	<name2>	<name2>
3116	2760	<aphaerese>	<aphaerese>
3116	3114	<>	<aphaerese>
3116	2757	<elision3>	<elision3>
3116	3114	<>	<elision3>
3116	2757	<elision2>	<elision2>
3116	3114	<>	<elision2>
3116	2757	<elision1>	<elision1>
3116	3114	<>	<elision1>
3116	2754	.	υ
3116	2754	.	u
3116	2754	.	α
3116	2754	.	a
3116	2399	<2s>	<>
3117	2757	.	.
3117	2757	 	 
3117	2757	<~>	<~>
3117	2757	<split-s>	<split-s>
3117	2757	<split-h>	<split-h>
3117	2757	<name2>	<name2>
3117	2781	<name2>	<name>
3117	3115	<>	<name>
3117	2760	<aphaerese>	<aphaerese>
3117	3114	<>	<aphaerese>
3117	2757	<elision3>	<elision3>
3117	3114	<>	<elision3>
3117	2757	<elision2>	<elision2>
3117	3114	<>	<elision2>
3117	2757	<elision1>	<elision1>
3117	3114	<>	<elision1>
3117	2754	.	υ
3117	2754	.	u
3117	2754	.	α
3117	2754	.	a
3117	2406	<2s>	<>
3118	2627	.	.
3118	2628	 	 
3118	2627	<~>	<~>
3118	2627	<split-s>	<split-s>
3118	2627	<split-h>	<split-h>
3118	2627	<name2>	<name2>
3118	3119	<>	<name>
3118	2631	<aphaerese>	<aphaerese>
3118	3118	<>	<aphaerese>
3118	2627	<elision3>	<elision3>
3118	3118	<>	<elision3>
3118	2627	<elision2>	<elision2>
3118	3118	<>	<elision2>
3118	2627	<elision1>	<elision1>
3118	3118	<>	<elision1>
3118	2635	.	υ
3118	2638	s	υ
3118	2635	.	u
3118	2638	s	u
3118	2635	.	κ
3118	2680	s	U
3118	2635	.	α
3118	2638	s	α
3118	2635	.	a
3118	2638	s	a
3118	2710	s	A
3118	2635	.	λ
3118	2387	<2s>	<>
3119	2630	.	.
3119	2633	 	 
3119	2630	<~>	<~>
3119	2630	<split-s>	<split-s>
3119	2630	<split-h>	<split-h>
3119	2630	<name2>	<name2>
3119	2731	<aphaerese>	<aphaerese>
3119	3120	<>	<aphaerese>
3119	2630	<elision3>	<elision3>
3119	3120	<>	<elision3>
3119	2630	<elision2>	<elision2>
3119	3120	<>	<elision2>
3119	2630	<elision1>	<elision1>
3119	3120	<>	<elision1>
3119	2637	.	υ
3119	2655	s	υ
3119	2637	.	u
3119	2655	s	u
3119	2637	.	κ
3119	2682	s	U
3119	2637	.	α
3119	2655	s	α
3119	2637	.	a
3119	2655	s	a
3119	2712	s	A
3119	2637	.	λ
3119	2388	<2s>	<>
3120	2627	.	.
3120	2628	 	 
3120	2627	<~>	<~>
3120	2627	<split-s>	<split-s>
3120	2627	<split-h>	<split-h>
3120	2627	<name2>	<name2>
3120	2631	<aphaerese>	<aphaerese>
3120	3118	<>	<aphaerese>
3120	2627	<elision3>	<elision3>
3120	3118	<>	<elision3>
3120	2627	<elision2>	<elision2>
3120	3118	<>	<elision2>
3120	2627	<elision1>	<elision1>
3120	3118	<>	<elision1>
3120	2635	.	υ
3120	2638	s	υ
3120	2635	.	u
3120	2638	s	u
3120	2635	.	κ
3120	2680	s	U
3120	2635	.	α
3120	2638	s	α
3120	2635	.	a
3120	2638	s	a
3120	2710	s	A
3120	2635	.	λ
3120	2386	<2s>	<>
3121	2757	.	.
3121	2757	 	 
3121	2757	<~>	<~>
3121	2757	<split-s>	<split-s>
3121	2757	<split-h>	<split-h>
3121	2757	<name2>	<name2>
3121	3122	<>	<name>
3121	2760	<aphaerese>	<aphaerese>
3121	3121	<>	<aphaerese>
3121	2757	<elision3>	<elision3>
3121	3121	<>	<elision3>
3121	2757	<elision2>	<elision2>
3121	3121	<>	<elision2>
3121	2757	<elision1>	<elision1>
3121	3121	<>	<elision1>
3121	2754	.	υ
3121	2754	.	u
3121	2754	.	κ
3121	2754	.	α
3121	2754	.	a
3121	2754	.	λ
3121	2387	<2s>	<>
3122	2759	.	.
3122	2759	 	 
3122	2759	<~>	<~>
3122	2759	<split-s>	<split-s>
3122	2759	<split-h>	<split-h>
3122	2759	<name2>	<name2>
3122	2762	<aphaerese>	<aphaerese>
3122	3123	<>	<aphaerese>
3122	2759	<elision3>	<elision3>
3122	3123	<>	<elision3>
3122	2759	<elision2>	<elision2>
3122	3123	<>	<elision2>
3122	2759	<elision1>	<elision1>
3122	3123	<>	<elision1>
3122	2756	.	υ
3122	2756	.	u
3122	2756	.	κ
3122	2756	.	α
3122	2756	.	a
3122	2756	.	λ
3122	2388	<2s>	<>
3123	2757	.	.
3123	2757	 	 
3123	2757	<~>	<~>
3123	2757	<split-s>	<split-s>
3123	2757	<split-h>	<split-h>
3123	2757	<name2>	<name2>
3123	2760	<aphaerese>	<aphaerese>
3123	3121	<>	<aphaerese>
3123	2757	<elision3>	<elision3>
3123	3121	<>	<elision3>
3123	2757	<elision2>	<elision2>
3123	3121	<>	<elision2>
3123	2757	<elision1>	<elision1>
3123	3121	<>	<elision1>
3123	2754	.	υ
3123	2754	.	u
3123	2754	.	κ
3123	2754	.	α
3123	2754	.	a
3123	2754	.	λ
3123	2386	<2s>	<>
3124	2781	<name>	<name>
3124	3125	<>	<name>
3124	3127	<>	<aphaerese>
3124	3127	<>	<elision3>
3124	3127	<>	<elision2>
3124	3127	<>	<elision1>
3124	2257	<2s>	<>
3124	3128	<L2kl>	<>
3125	3126	<>	<aphaerese>
3125	3126	<>	<elision3>
3125	3126	<>	<elision2>
3125	3126	<>	<elision1>
3125	3122	<L2kl>	<>
3126	3127	<>	<aphaerese>
3126	3127	<>	<elision3>
3126	3127	<>	<elision2>
3126	3127	<>	<elision1>
3126	3123	<L2kl>	<>
3127	3125	<>	<name>
3127	3127	<>	<aphaerese>
3127	3127	<>	<elision3>
3127	3127	<>	<elision2>
3127	3127	<>	<elision1>
3127	3121	<L2kl>	<>
3128	2757	.	.
3128	2757	 	 
3128	2757	<~>	<~>
3128	2757	<split-s>	<split-s>
3128	2757	<split-h>	<split-h>
3128	2757	<name2>	<name2>
3128	2781	<name2>	<name>
3128	3122	<>	<name>
3128	2760	<aphaerese>	<aphaerese>
3128	3121	<>	<aphaerese>
3128	2757	<elision3>	<elision3>
3128	3121	<>	<elision3>
3128	2757	<elision2>	<elision2>
3128	3121	<>	<elision2>
3128	2757	<elision1>	<elision1>
3128	3121	<>	<elision1>
3128	2754	.	υ
3128	2754	.	u
3128	2754	.	κ
3128	2754	.	α
3128	2754	.	a
3128	2754	.	λ
3128	2413	<2s>	<>
3129	251	.	.
3129	252	 	 
3129	251	<~>	<~>
3129	251	<split-s>	<split-s>
3129	251	<split-h>	<split-h>
3129	251	<name2>	<name2>
3129	255	<aphaerese>	<aphaerese>
3129	3130	<>	<aphaerese>
3129	2128	<elision3>	<elision3>
3129	3130	<>	<elision3>
3129	2128	<elision2>	<elision2>
3129	3130	<>	<elision2>
3129	2128	<elision1>	<elision1>
3129	3130	<>	<elision1>
3129	1546	.	υ
3129	1590	H	υ
3129	1546	.	u
3129	1592	H	u
3129	2005	H	κ
3129	1500	H	k
3129	1513	H	U
3129	1516	H	K
3129	1546	.	α
3129	1576	H	α
3129	1546	.	a
3129	1581	H	a
3129	1343	H	A
3129	1982	H	λ
3129	1930	H	l
3129	1935	H	L
3129	3133	<K>	<>
3130	251	.	.
3130	252	 	 
3130	251	<~>	<~>
3130	251	<split-s>	<split-s>
3130	251	<split-h>	<split-h>
3130	251	<name2>	<name2>
3130	3131	<>	<name>
3130	255	<aphaerese>	<aphaerese>
3130	3130	<>	<aphaerese>
3130	2128	<elision3>	<elision3>
3130	3130	<>	<elision3>
3130	2128	<elision2>	<elision2>
3130	3130	<>	<elision2>
3130	2128	<elision1>	<elision1>
3130	3130	<>	<elision1>
3130	1546	.	υ
3130	1590	H	υ
3130	1546	.	u
3130	1592	H	u
3130	2005	H	κ
3130	1500	H	k
3130	1513	H	U
3130	1516	H	K
3130	1546	.	α
3130	1576	H	α
3130	1546	.	a
3130	1581	H	a
3130	1343	H	A
3130	1982	H	λ
3130	1930	H	l
3130	1935	H	L
3130	3134	<K>	<>
3131	250	.	.
3131	254	 	 
3131	250	<~>	<~>
3131	250	<split-s>	<split-s>
3131	250	<split-h>	<split-h>
3131	250	<name2>	<name2>
3131	257	<aphaerese>	<aphaerese>
3131	3129	<>	<aphaerese>
3131	2127	<elision3>	<elision3>
3131	3129	<>	<elision3>
3131	2127	<elision2>	<elision2>
3131	3129	<>	<elision2>
3131	2127	<elision1>	<elision1>
3131	3129	<>	<elision1>
3131	1548	.	υ
3131	1585	H	υ
3131	1548	.	u
3131	1589	H	u
3131	1962	H	κ
3131	1541	H	k
3131	1515	H	U
3131	1545	H	K
3131	1548	.	α
3131	1575	H	α
3131	1548	.	a
3131	1580	H	a
3131	1346	H	A
3131	1981	H	λ
3131	1929	H	l
3131	1932	H	L
3131	3132	<K>	<>
3132	1598	.	.
3132	1598	<~>	<~>
3132	1598	<split-s>	<split-s>
3132	1598	<split-h>	<split-h>
3132	1598	<name2>	<name2>
3132	1601	<aphaerese>	<aphaerese>
3132	3133	<>	<aphaerese>
3132	2076	<elision3>	<elision3>
3132	3133	<>	<elision3>
3132	2076	<elision2>	<elision2>
3132	3133	<>	<elision2>
3132	2076	<elision1>	<elision1>
3132	3133	<>	<elision1>
3132	1594	.	υ
3132	1740	H	υ
3132	1594	.	u
3132	1749	H	u
3132	1992	H	κ
3132	1709	H	k
3132	1718	H	U
3132	1722	H	K
3132	1594	.	α
3132	1752	H	α
3132	1594	.	a
3132	1755	H	a
3132	1689	H	A
3132	2001	H	λ
3132	1736	H	l
3132	1731	H	L
3133	1596	.	.
3133	1596	<~>	<~>
3133	1596	<split-s>	<split-s>
3133	1596	<split-h>	<split-h>
3133	1596	<name2>	<name2>
3133	1599	<aphaerese>	<aphaerese>
3133	3134	<>	<aphaerese>
3133	2077	<elision3>	<elision3>
3133	3134	<>	<elision3>
3133	2077	<elision2>	<elision2>
3133	3134	<>	<elision2>
3133	2077	<elision1>	<elision1>
3133	3134	<>	<elision1>
3133	1595	.	υ
3133	1738	H	υ
3133	1595	.	u
3133	1747	H	u
3133	1990	H	κ
3133	1707	H	k
3133	1716	H	U
3133	1719	H	K
3133	1595	.	α
3133	1750	H	α
3133	1595	.	a
3133	1753	H	a
3133	1687	H	A
3133	1999	H	λ
3133	1734	H	l
3133	1737	H	L
3134	1596	.	.
3134	1596	<~>	<~>
3134	1596	<split-s>	<split-s>
3134	1596	<split-h>	<split-h>
3134	1596	<name2>	<name2>
3134	3132	<>	<name>
3134	1599	<aphaerese>	<aphaerese>
3134	3134	<>	<aphaerese>
3134	2077	<elision3>	<elision3>
3134	3134	<>	<elision3>
3134	2077	<elision2>	<elision2>
3134	3134	<>	<elision2>
3134	2077	<elision1>	<elision1>
3134	3134	<>	<elision1>
3134	1595	.	υ
3134	1738	H	υ
3134	1595	.	u
3134	1747	H	u
3134	1990	H	κ
3134	1707	H	k
3134	1716	H	U
3134	1719	H	K
3134	1595	.	α
3134	1750	H	α
3134	1595	.	a
3134	1753	H	a
3134	1687	H	A
3134	1999	H	λ
3134	1734	H	l
3134	1737	H	L
3135	3136	<>	<name>
3135	3135	<>	<aphaerese>
3135	3135	<>	<elision3>
3135	3135	<>	<elision2>
3135	3135	<>	<elision1>
3135	2992	.	κ
3135	2992	.	λ
3135	2316	<1s>	<>
3136	3137	<>	<aphaerese>
3136	3137	<>	<elision3>
3136	3137	<>	<elision2>
3136	3137	<>	<elision1>
3136	2994	.	κ
3136	2994	.	λ
3136	2317	<1s>	<>
3137	3135	<>	<aphaerese>
3137	3135	<>	<elision3>
3137	3135	<>	<elision2>
3137	3135	<>	<elision1>
3137	2992	.	κ
3137	2992	.	λ
3137	2315	<1s>	<>
3138	2984	.	.
3138	2985	 	 
3138	2984	<~>	<~>
3138	2984	<split-s>	<split-s>
3138	2984	<split-h>	<split-h>
3138	2984	<name2>	<name2>
3138	3099	<>	<name>
3138	2988	<aphaerese>	<aphaerese>
3138	2983	<>	<aphaerese>
3138	3101	<elision3>	<elision3>
3138	2983	<>	<elision3>
3138	3101	<elision2>	<elision2>
3138	2983	<>	<elision2>
3138	3101	<elision1>	<elision1>
3138	2983	<>	<elision1>
3138	2992	.	υ
3138	2995	s	υ
3138	2992	.	u
3138	2995	s	u
3138	2626	s	κ
3138	2751	s	k
3138	3041	s	U
3138	2769	s	K
3138	2992	.	α
3138	3066	s	α
3138	2992	.	a
3138	3066	s	a
3138	3069	s	A
3138	2626	s	λ
3138	2782	s	l
3138	2785	s	L
3138	3139	<1s>	<>
3139	251	.	.
3139	252	 	 
3139	251	<~>	<~>
3139	251	<split-s>	<split-s>
3139	251	<split-h>	<split-h>
3139	251	<name2>	<name2>
3139	3131	<>	<name>
3139	255	<aphaerese>	<aphaerese>
3139	3130	<>	<aphaerese>
3139	2128	<elision3>	<elision3>
3139	3130	<>	<elision3>
3139	2128	<elision2>	<elision2>
3139	3130	<>	<elision2>
3139	2128	<elision1>	<elision1>
3139	3130	<>	<elision1>
3139	1546	.	υ
3139	1546	.	u
3139	1546	.	α
3139	1546	.	a
3139	3140	<K>	<>
3140	1596	.	.
3140	1596	<~>	<~>
3140	1596	<split-s>	<split-s>
3140	1596	<split-h>	<split-h>
3140	1596	<name2>	<name2>
3140	3132	<>	<name>
3140	1599	<aphaerese>	<aphaerese>
3140	3134	<>	<aphaerese>
3140	2077	<elision3>	<elision3>
3140	3134	<>	<elision3>
3140	2077	<elision2>	<elision2>
3140	3134	<>	<elision2>
3140	2077	<elision1>	<elision1>
3140	3134	<>	<elision1>
3140	1595	.	υ
3140	1595	.	u
3140	1595	.	α
3140	1595	.	a
3141	3142	<>	<name>
3141	3144	<>	<aphaerese>
3141	3144	<>	<elision3>
3141	3144	<>	<elision2>
3141	3144	<>	<elision1>
3141	3145	<k2K>	<>
3141	3151	<k2L>	<>
3141	3135	<l2L>	<>
3142	3143	<>	<aphaerese>
3142	3143	<>	<elision3>
3142	3143	<>	<elision2>
3142	3143	<>	<elision1>
3142	3146	<k2K>	<>
3142	3149	<k2L>	<>
3142	3136	<l2L>	<>
3143	3144	<>	<aphaerese>
3143	3144	<>	<elision3>
3143	3144	<>	<elision2>
3143	3144	<>	<elision1>
3143	3147	<k2K>	<>
3143	3150	<k2L>	<>
3143	3137	<l2L>	<>
3144	3142	<>	<name>
3144	3144	<>	<aphaerese>
3144	3144	<>	<elision3>
3144	3144	<>	<elision2>
3144	3144	<>	<elision1>
3144	3145	<k2K>	<>
3144	3148	<k2L>	<>
3144	3135	<l2L>	<>
3145	2818	.	.
3145	2819	 	 
3145	2818	<~>	<~>
3145	2818	<split-s>	<split-s>
3145	2818	<split-h>	<split-h>
3145	2818	<name2>	<name2>
3145	3146	<>	<name>
3145	2822	<aphaerese>	<aphaerese>
3145	3145	<>	<aphaerese>
3145	2818	<elision3>	<elision3>
3145	3145	<>	<elision3>
3145	2818	<elision2>	<elision2>
3145	3145	<>	<elision2>
3145	2818	<elision1>	<elision1>
3145	3145	<>	<elision1>
3145	2826	.	υ
3145	2829	s	υ
3145	2826	.	u
3145	2829	s	u
3145	235	s	κ
3145	2567	s	k
3145	2892	s	U
3145	2600	s	K
3145	2826	.	α
3145	2920	s	α
3145	2826	.	a
3145	2920	s	a
3145	2923	s	A
3145	235	s	λ
3145	2615	s	l
3145	2618	s	L
3146	2821	.	.
3146	2824	 	 
3146	2821	<~>	<~>
3146	2821	<split-s>	<split-s>
3146	2821	<split-h>	<split-h>
3146	2821	<name2>	<name2>
3146	2950	<aphaerese>	<aphaerese>
3146	3147	<>	<aphaerese>
3146	2821	<elision3>	<elision3>
3146	3147	<>	<elision3>
3146	2821	<elision2>	<elision2>
3146	3147	<>	<elision2>
3146	2821	<elision1>	<elision1>
3146	3147	<>	<elision1>
3146	2828	.	υ
3146	2831	s	υ
3146	2828	.	u
3146	2831	s	u
3146	2560	s	κ
3146	2569	s	k
3146	2894	s	U
3146	2603	s	K
3146	2828	.	α
3146	2922	s	α
3146	2828	.	a
3146	2922	s	a
3146	2925	s	A
3146	2560	s	λ
3146	2617	s	l
3146	2620	s	L
3147	2818	.	.
3147	2819	 	 
3147	2818	<~>	<~>
3147	2818	<split-s>	<split-s>
3147	2818	<split-h>	<split-h>
3147	2818	<name2>	<name2>
3147	2822	<aphaerese>	<aphaerese>
3147	3145	<>	<aphaerese>
3147	2818	<elision3>	<elision3>
3147	3145	<>	<elision3>
3147	2818	<elision2>	<elision2>
3147	3145	<>	<elision2>
3147	2818	<elision1>	<elision1>
3147	3145	<>	<elision1>
3147	2826	.	υ
3147	2829	s	υ
3147	2826	.	u
3147	2829	s	u
3147	235	s	κ
3147	2567	s	k
3147	2892	s	U
3147	2600	s	K
3147	2826	.	α
3147	2920	s	α
3147	2826	.	a
3147	2920	s	a
3147	2923	s	A
3147	235	s	λ
3147	2615	s	l
3147	2618	s	L
3148	2984	.	.
3148	2985	 	 
3148	2984	<~>	<~>
3148	2984	<split-s>	<split-s>
3148	2984	<split-h>	<split-h>
3148	2984	<name2>	<name2>
3148	3149	<>	<name>
3148	2988	<aphaerese>	<aphaerese>
3148	3148	<>	<aphaerese>
3148	2984	<elision3>	<elision3>
3148	3148	<>	<elision3>
3148	2984	<elision2>	<elision2>
3148	3148	<>	<elision2>
3148	2984	<elision1>	<elision1>
3148	3148	<>	<elision1>
3148	2992	.	υ
3148	2995	s	υ
3148	2992	.	u
3148	2995	s	u
3148	2626	s	κ
3148	2751	s	k
3148	3041	s	U
3148	2769	s	K
3148	2992	.	α
3148	3066	s	α
3148	2992	.	a
3148	3066	s	a
3148	3069	s	A
3148	2626	s	λ
3148	2782	s	l
3148	2785	s	L
3148	2252	<1s>	<>
3149	2987	.	.
3149	2990	 	 
3149	2987	<~>	<~>
3149	2987	<split-s>	<split-s>
3149	2987	<split-h>	<split-h>
3149	2987	<name2>	<name2>
3149	3096	<aphaerese>	<aphaerese>
3149	3150	<>	<aphaerese>
3149	2987	<elision3>	<elision3>
3149	3150	<>	<elision3>
3149	2987	<elision2>	<elision2>
3149	3150	<>	<elision2>
3149	2987	<elision1>	<elision1>
3149	3150	<>	<elision1>
3149	2994	.	υ
3149	2997	s	υ
3149	2994	.	u
3149	2997	s	u
3149	2747	s	κ
3149	2753	s	k
3149	3043	s	U
3149	2772	s	K
3149	2994	.	α
3149	3068	s	α
3149	2994	.	a
3149	3068	s	a
3149	3071	s	A
3149	2747	s	λ
3149	2784	s	l
3149	2787	s	L
3149	2253	<1s>	<>
3150	2984	.	.
3150	2985	 	 
3150	2984	<~>	<~>
3150	2984	<split-s>	<split-s>
3150	2984	<split-h>	<split-h>
3150	2984	<name2>	<name2>
3150	2988	<aphaerese>	<aphaerese>
3150	3148	<>	<aphaerese>
3150	2984	<elision3>	<elision3>
3150	3148	<>	<elision3>
3150	2984	<elision2>	<elision2>
3150	3148	<>	<elision2>
3150	2984	<elision1>	<elision1>
3150	3148	<>	<elision1>
3150	2992	.	υ
3150	2995	s	υ
3150	2992	.	u
3150	2995	s	u
3150	2626	s	κ
3150	2751	s	k
3150	3041	s	U
3150	2769	s	K
3150	2992	.	α
3150	3066	s	α
3150	2992	.	a
3150	3066	s	a
3150	3069	s	A
3150	2626	s	λ
3150	2782	s	l
3150	2785	s	L
3150	2251	<1s>	<>
3151	2984	.	.
3151	2985	 	 
3151	2984	<~>	<~>
3151	2984	<split-s>	<split-s>
3151	2984	<split-h>	<split-h>
3151	2984	<name2>	<name2>
3151	3149	<>	<name>
3151	2988	<aphaerese>	<aphaerese>
3151	3148	<>	<aphaerese>
3151	2984	<elision3>	<elision3>
3151	3148	<>	<elision3>
3151	2984	<elision2>	<elision2>
3151	3148	<>	<elision2>
3151	2984	<elision1>	<elision1>
3151	3148	<>	<elision1>
3151	2992	.	υ
3151	2995	s	υ
3151	2992	.	u
3151	2995	s	u
3151	2626	s	κ
3151	2751	s	k
3151	3041	s	U
3151	2769	s	K
3151	2992	.	α
3151	3066	s	α
3151	2992	.	a
3151	3066	s	a
3151	3069	s	A
3151	2626	s	λ
3151	2782	s	l
3151	2785	s	L
3151	3152	<1s>	<>
3152	251	.	.
3152	252	 	 
3152	251	<~>	<~>
3152	251	<split-s>	<split-s>
3152	251	<split-h>	<split-h>
3152	251	<name2>	<name2>
3152	2253	<>	<name>
3152	255	<aphaerese>	<aphaerese>
3152	2252	<>	<aphaerese>
3152	251	<elision3>	<elision3>
3152	2252	<>	<elision3>
3152	251	<elision2>	<elision2>
3152	2252	<>	<elision2>
3152	251	<elision1>	<elision1>
3152	2252	<>	<elision1>
3152	1546	.	υ
3152	1546	.	u
3152	1546	.	α
3152	1546	.	a
3152	3153	<K>	<>
3153	1596	.	.
3153	1596	<~>	<~>
3153	1596	<split-s>	<split-s>
3153	1596	<split-h>	<split-h>
3153	1596	<name2>	<name2>
3153	2254	<>	<name>
3153	1599	<aphaerese>	<aphaerese>
3153	2256	<>	<aphaerese>
3153	1596	<elision3>	<elision3>
3153	2256	<>	<elision3>
3153	1596	<elision2>	<elision2>
3153	2256	<>	<elision2>
3153	1596	<elision1>	<elision1>
3153	2256	<>	<elision1>
3153	1595	.	υ
3153	1595	.	u
3153	1595	.	α
3153	1595	.	a
3154	2818	.	.
3154	2819	 	 
3154	2818	<~>	<~>
3154	2818	<split-s>	<split-s>
3154	2818	<split-h>	<split-h>
3154	2818	<name2>	<name2>
3154	3155	<>	<name>
3154	2822	<aphaerese>	<aphaerese>
3154	3154	<>	<aphaerese>
3154	2818	<elision3>	<elision3>
3154	3154	<>	<elision3>
3154	2818	<elision2>	<elision2>
3154	3154	<>	<elision2>
3154	2818	<elision1>	<elision1>
3154	3154	<>	<elision1>
3154	2826	.	υ
3154	2829	s	υ
3154	2826	.	u
3154	2829	s	u
3154	2832	.	κ
3154	2850	s	κ
3154	2567	s	k
3154	2892	s	U
3154	2600	s	K
3154	2826	.	α
3154	2920	s	α
3154	2826	.	a
3154	2920	s	a
3154	2923	s	A
3154	2926	s	λ
3154	2615	s	l
3154	2618	s	L
3154	2984	<U2L>	<>
3155	2821	.	.
3155	2824	 	 
3155	2821	<~>	<~>
3155	2821	<split-s>	<split-s>
3155	2821	<split-h>	<split-h>
3155	2821	<name2>	<name2>
3155	2950	<aphaerese>	<aphaerese>
3155	3156	<>	<aphaerese>
3155	2821	<elision3>	<elision3>
3155	3156	<>	<elision3>
3155	2821	<elision2>	<elision2>
3155	3156	<>	<elision2>
3155	2821	<elision1>	<elision1>
3155	3156	<>	<elision1>
3155	2828	.	υ
3155	2831	s	υ
3155	2828	.	u
3155	2831	s	u
3155	2834	.	κ
3155	2852	s	κ
3155	2569	s	k
3155	2894	s	U
3155	2603	s	K
3155	2828	.	α
3155	2922	s	α
3155	2828	.	a
3155	2922	s	a
3155	2925	s	A
3155	2928	s	λ
3155	2617	s	l
3155	2620	s	L
3155	3098	<U2L>	<>
3156	2818	.	.
3156	2819	 	 
3156	2818	<~>	<~>
3156	2818	<split-s>	<split-s>
3156	2818	<split-h>	<split-h>
3156	2818	<name2>	<name2>
3156	2822	<aphaerese>	<aphaerese>
3156	3154	<>	<aphaerese>
3156	2818	<elision3>	<elision3>
3156	3154	<>	<elision3>
3156	2818	<elision2>	<elision2>
3156	3154	<>	<elision2>
3156	2818	<elision1>	<elision1>
3156	3154	<>	<elision1>
3156	2826	.	υ
3156	2829	s	υ
3156	2826	.	u
3156	2829	s	u
3156	2832	.	κ
3156	2850	s	κ
3156	2567	s	k
3156	2892	s	U
3156	2600	s	K
3156	2826	.	α
3156	2920	s	α
3156	2826	.	a
3156	2920	s	a
3156	2923	s	A
3156	2926	s	λ
3156	2615	s	l
3156	2618	s	L
3156	2987	<U2L>	<>
3157	2818	.	.
3157	2819	 	 
3157	2818	<~>	<~>
3157	2818	<split-s>	<split-s>
3157	2818	<split-h>	<split-h>
3157	2818	<name2>	<name2>
3157	3158	<name2>	<name>
3157	3159	<>	<name>
3157	2822	<aphaerese>	<aphaerese>
3157	3161	<>	<aphaerese>
3157	2818	<elision3>	<elision3>
3157	3161	<>	<elision3>
3157	2818	<elision2>	<elision2>
3157	3161	<>	<elision2>
3157	2818	<elision1>	<elision1>
3157	3161	<>	<elision1>
3157	2826	.	υ
3157	2829	s	υ
3157	2826	.	u
3157	2829	s	u
3157	2992	.	κ
3157	235	s	κ
3157	2567	s	k
3157	2892	s	U
3157	2600	s	K
3157	2826	.	α
3157	2920	s	α
3157	2826	.	a
3157	2920	s	a
3157	2923	s	A
3157	2992	.	λ
3157	235	s	λ
3157	2615	s	l
3157	2618	s	L
3157	2316	<1s>	<>
3157	3162	<k2K>	<>
3157	3163	<k2L>	<>
3157	3165	<K2L>	<>
3158	2603	s	k
3158	2620	s	l
3159	2821	.	.
3159	2824	 	 
3159	2821	<~>	<~>
3159	2821	<split-s>	<split-s>
3159	2821	<split-h>	<split-h>
3159	2821	<name2>	<name2>
3159	2950	<aphaerese>	<aphaerese>
3159	3160	<>	<aphaerese>
3159	2821	<elision3>	<elision3>
3159	3160	<>	<elision3>
3159	2821	<elision2>	<elision2>
3159	3160	<>	<elision2>
3159	2821	<elision1>	<elision1>
3159	3160	<>	<elision1>
3159	2828	.	υ
3159	2831	s	υ
3159	2828	.	u
3159	2831	s	u
3159	2994	.	κ
3159	2560	s	κ
3159	2569	s	k
3159	2894	s	U
3159	2603	s	K
3159	2828	.	α
3159	2922	s	α
3159	2828	.	a
3159	2922	s	a
3159	2925	s	A
3159	2994	.	λ
3159	2560	s	λ
3159	2617	s	l
3159	2620	s	L
3159	2317	<1s>	<>
3159	3149	<K2L>	<>
3160	2818	.	.
3160	2819	 	 
3160	2818	<~>	<~>
3160	2818	<split-s>	<split-s>
3160	2818	<split-h>	<split-h>
3160	2818	<name2>	<name2>
3160	2822	<aphaerese>	<aphaerese>
3160	3161	<>	<aphaerese>
3160	2818	<elision3>	<elision3>
3160	3161	<>	<elision3>
3160	2818	<elision2>	<elision2>
3160	3161	<>	<elision2>
3160	2818	<elision1>	<elision1>
3160	3161	<>	<elision1>
3160	2826	.	υ
3160	2829	s	υ
3160	2826	.	u
3160	2829	s	u
3160	2992	.	κ
3160	235	s	κ
3160	2567	s	k
3160	2892	s	U
3160	2600	s	K
3160	2826	.	α
3160	2920	s	α
3160	2826	.	a
3160	2920	s	a
3160	2923	s	A
3160	2992	.	λ
3160	235	s	λ
3160	2615	s	l
3160	2618	s	L
3160	2315	<1s>	<>
3160	3150	<K2L>	<>
3161	2818	.	.
3161	2819	 	 
3161	2818	<~>	<~>
3161	2818	<split-s>	<split-s>
3161	2818	<split-h>	<split-h>
3161	2818	<name2>	<name2>
3161	3159	<>	<name>
3161	2822	<aphaerese>	<aphaerese>
3161	3161	<>	<aphaerese>
3161	2818	<elision3>	<elision3>
3161	3161	<>	<elision3>
3161	2818	<elision2>	<elision2>
3161	3161	<>	<elision2>
3161	2818	<elision1>	<elision1>
3161	3161	<>	<elision1>
3161	2826	.	υ
3161	2829	s	υ
3161	2826	.	u
3161	2829	s	u
3161	2992	.	κ
3161	235	s	κ
3161	2567	s	k
3161	2892	s	U
3161	2600	s	K
3161	2826	.	α
3161	2920	s	α
3161	2826	.	a
3161	2920	s	a
3161	2923	s	A
3161	2992	.	λ
3161	235	s	λ
3161	2615	s	l
3161	2618	s	L
3161	2316	<1s>	<>
3161	3148	<K2L>	<>
3162	3158	<name>	<name>
3163	3164	<name>	<name>
3163	2257	<1s>	<>
3164	2772	s	k
3164	2787	s	l
3164	2147	<1s>	<>
3165	2984	.	.
3165	2985	 	 
3165	2984	<~>	<~>
3165	2984	<split-s>	<split-s>
3165	2984	<split-h>	<split-h>
3165	2984	<name2>	<name2>
3165	3164	<name2>	<name>
3165	3149	<>	<name>
3165	2988	<aphaerese>	<aphaerese>
3165	3148	<>	<aphaerese>
3165	2984	<elision3>	<elision3>
3165	3148	<>	<elision3>
3165	2984	<elision2>	<elision2>
3165	3148	<>	<elision2>
3165	2984	<elision1>	<elision1>
3165	3148	<>	<elision1>
3165	2992	.	υ
3165	2995	s	υ
3165	2992	.	u
3165	2995	s	u
3165	2626	s	κ
3165	2751	s	k
3165	3041	s	U
3165	2769	s	K
3165	2992	.	α
3165	3066	s	α
3165	2992	.	a
3165	3066	s	a
3165	3069	s	A
3165	2626	s	λ
3165	2782	s	l
3165	2785	s	L
3165	3166	<1s>	<>
3166	251	.	.
3166	252	 	 
3166	251	<~>	<~>
3166	251	<split-s>	<split-s>
3166	251	<split-h>	<split-h>
3166	251	<name2>	<name2>
3166	2258	<name2>	<name>
3166	2253	<>	<name>
3166	255	<aphaerese>	<aphaerese>
3166	2252	<>	<aphaerese>
3166	251	<elision3>	<elision3>
3166	2252	<>	<elision3>
3166	251	<elision2>	<elision2>
3166	2252	<>	<elision2>
3166	251	<elision1>	<elision1>
3166	2252	<>	<elision1>
3166	1546	.	υ
3166	1546	.	u
3166	1546	.	α
3166	1546	.	a
3166	3167	<K>	<>
3167	1596	.	.
3167	1596	<~>	<~>
3167	1596	<split-s>	<split-s>
3167	1596	<split-h>	<split-h>
3167	1596	<name2>	<name2>
3167	2148	<name2>	<name>
3167	2254	<>	<name>
3167	1599	<aphaerese>	<aphaerese>
3167	2256	<>	<aphaerese>
3167	1596	<elision3>	<elision3>
3167	2256	<>	<elision3>
3167	1596	<elision2>	<elision2>
3167	2256	<>	<elision2>
3167	1596	<elision1>	<elision1>
3167	2256	<>	<elision1>
3167	1595	.	υ
3167	1595	.	u
3167	1595	.	α
3167	1595	.	a
3168	3169	<>	<name>
3168	3168	<>	<aphaerese>
3168	3168	<>	<elision3>
3168	3168	<>	<elision2>
3168	3168	<>	<elision1>
3168	3172	<lambda2L>	<>
3169	3170	<>	<aphaerese>
3169	3170	<>	<elision3>
3169	3170	<>	<elision2>
3169	3170	<>	<elision1>
3169	3173	<lambda2L>	<>
3170	3168	<>	<aphaerese>
3170	3168	<>	<elision3>
3170	3168	<>	<elision2>
3170	3168	<>	<elision1>
3170	3171	<lambda2L>	<>
3171	2984	.	.
3171	2985	 	 
3171	2984	<~>	<~>
3171	2984	<split-s>	<split-s>
3171	2984	<split-h>	<split-h>
3171	2984	<name2>	<name2>
3171	2988	<aphaerese>	<aphaerese>
3171	3172	<>	<aphaerese>
3171	2984	<elision3>	<elision3>
3171	3172	<>	<elision3>
3171	2984	<elision2>	<elision2>
3171	3172	<>	<elision2>
3171	2984	<elision1>	<elision1>
3171	3172	<>	<elision1>
3171	2992	.	υ
3171	2995	s	υ
3171	2992	.	u
3171	2995	s	u
3171	2992	.	κ
3171	2626	s	κ
3171	2751	s	k
3171	3041	s	U
3171	2769	s	K
3171	2992	.	α
3171	3066	s	α
3171	2992	.	a
3171	3066	s	a
3171	3069	s	A
3171	2992	.	λ
3171	2626	s	λ
3171	2782	s	l
3171	2785	s	L
3171	2136	<1s>	<>
3172	2984	.	.
3172	2985	 	 
3172	2984	<~>	<~>
3172	2984	<split-s>	<split-s>
3172	2984	<split-h>	<split-h>
3172	2984	<name2>	<name2>
3172	3173	<>	<name>
3172	2988	<aphaerese>	<aphaerese>
3172	3172	<>	<aphaerese>
3172	2984	<elision3>	<elision3>
3172	3172	<>	<elision3>
3172	2984	<elision2>	<elision2>
3172	3172	<>	<elision2>
3172	2984	<elision1>	<elision1>
3172	3172	<>	<elision1>
3172	2992	.	υ
3172	2995	s	υ
3172	2992	.	u
3172	2995	s	u
3172	2992	.	κ
3172	2626	s	κ
3172	2751	s	k
3172	3041	s	U
3172	2769	s	K
3172	2992	.	α
3172	3066	s	α
3172	2992	.	a
3172	3066	s	a
3172	3069	s	A
3172	2992	.	λ
3172	2626	s	λ
3172	2782	s	l
3172	2785	s	L
3172	2137	<1s>	<>
3173	2987	.	.
3173	2990	 	 
3173	2987	<~>	<~>
3173	2987	<split-s>	<split-s>
3173	2987	<split-h>	<split-h>
3173	2987	<name2>	<name2>
3173	3096	<aphaerese>	<aphaerese>
3173	3171	<>	<aphaerese>
3173	2987	<elision3>	<elision3>
3173	3171	<>	<elision3>
3173	2987	<elision2>	<elision2>
3173	3171	<>	<elision2>
3173	2987	<elision1>	<elision1>
3173	3171	<>	<elision1>
3173	2994	.	υ
3173	2997	s	υ
3173	2994	.	u
3173	2997	s	u
3173	2994	.	κ
3173	2747	s	κ
3173	2753	s	k
3173	3043	s	U
3173	2772	s	K
3173	2994	.	α
3173	3068	s	α
3173	2994	.	a
3173	3068	s	a
3173	3071	s	A
3173	2994	.	λ
3173	2747	s	λ
3173	2784	s	l
3173	2787	s	L
3173	2138	<1s>	<>
3174	3175	<>	<name>
3174	3174	<>	<aphaerese>
3174	3174	<>	<elision3>
3174	3174	<>	<elision2>
3174	3174	<>	<elision1>
3174	3172	<l2L>	<>
3175	3176	<>	<aphaerese>
3175	3176	<>	<elision3>
3175	3176	<>	<elision2>
3175	3176	<>	<elision1>
3175	3173	<l2L>	<>
3176	3174	<>	<aphaerese>
3176	3174	<>	<elision3>
3176	3174	<>	<elision2>
3176	3174	<>	<elision1>
3176	3171	<l2L>	<>
3177	2984	.	.
3177	2985	 	 
3177	2984	<~>	<~>
3177	2984	<split-s>	<split-s>
3177	2984	<split-h>	<split-h>
3177	2984	<name2>	<name2>
3177	3164	<name2>	<name>
3177	3173	<>	<name>
3177	2988	<aphaerese>	<aphaerese>
3177	3172	<>	<aphaerese>
3177	2984	<elision3>	<elision3>
3177	3172	<>	<elision3>
3177	2984	<elision2>	<elision2>
3177	3172	<>	<elision2>
3177	2984	<elision1>	<elision1>
3177	3172	<>	<elision1>
3177	2992	.	υ
3177	2995	s	υ
3177	2992	.	u
3177	2995	s	u
3177	2992	.	κ
3177	2626	s	κ
3177	2751	s	k
3177	3041	s	U
3177	2769	s	K
3177	2992	.	α
3177	3066	s	α
3177	2992	.	a
3177	3066	s	a
3177	3069	s	A
3177	2992	.	λ
3177	2626	s	λ
3177	2782	s	l
3177	2785	s	L
3177	2326	<1s>	<>
3177	3163	<l2L>	<>
3178	2816	<>	<aphaerese>
3178	2816	<>	<elision3>
3178	2816	<>	<elision2>
3178	2816	<>	<elision1>
3178	2954	<kappa2K>	<>
3178	3179	<kappa2L>	<>
3178	3137	<lambda2L>	<>
3179	2984	.	.
3179	2985	 	 
3179	2984	<~>	<~>
3179	2984	<split-s>	<split-s>
3179	2984	<split-h>	<split-h>
3179	2984	<name2>	<name2>
3179	2988	<aphaerese>	<aphaerese>
3179	2983	<>	<aphaerese>
3179	3101	<elision3>	<elision3>
3179	2983	<>	<elision3>
3179	3101	<elision2>	<elision2>
3179	2983	<>	<elision2>
3179	3101	<elision1>	<elision1>
3179	2983	<>	<elision1>
3179	2992	.	υ
3179	2995	s	υ
3179	2992	.	u
3179	2995	s	u
3179	2626	s	κ
3179	2751	s	k
3179	3041	s	U
3179	2769	s	K
3179	2992	.	α
3179	3066	s	α
3179	2992	.	a
3179	3066	s	a
3179	3069	s	A
3179	2626	s	λ
3179	2782	s	l
3179	2785	s	L
3179	3180	<1s>	<>
3180	251	.	.
3180	252	 	 
3180	251	<~>	<~>
3180	251	<split-s>	<split-s>
3180	251	<split-h>	<split-h>
3180	251	<name2>	<name2>
3180	255	<aphaerese>	<aphaerese>
3180	3130	<>	<aphaerese>
3180	2128	<elision3>	<elision3>
3180	3130	<>	<elision3>
3180	2128	<elision2>	<elision2>
3180	3130	<>	<elision2>
3180	2128	<elision1>	<elision1>
3180	3130	<>	<elision1>
3180	1546	.	υ
3180	1546	.	u
3180	1546	.	α
3180	1546	.	a
3180	3181	<K>	<>
3181	1596	.	.
3181	1596	<~>	<~>
3181	1596	<split-s>	<split-s>
3181	1596	<split-h>	<split-h>
3181	1596	<name2>	<name2>
3181	1599	<aphaerese>	<aphaerese>
3181	3134	<>	<aphaerese>
3181	2077	<elision3>	<elision3>
3181	3134	<>	<elision3>
3181	2077	<elision2>	<elision2>
3181	3134	<>	<elision2>
3181	2077	<elision1>	<elision1>
3181	3134	<>	<elision1>
3181	1595	.	υ
3181	1595	.	u
3181	1595	.	α
3181	1595	.	a
3182	3144	<>	<aphaerese>
3182	3144	<>	<elision3>
3182	3144	<>	<elision2>
3182	3144	<>	<elision1>
3182	3147	<k2K>	<>
3182	3183	<k2L>	<>
3182	3137	<l2L>	<>
3183	2984	.	.
3183	2985	 	 
3183	2984	<~>	<~>
3183	2984	<split-s>	<split-s>
3183	2984	<split-h>	<split-h>
3183	2984	<name2>	<name2>
3183	2988	<aphaerese>	<aphaerese>
3183	3148	<>	<aphaerese>
3183	2984	<elision3>	<elision3>
3183	3148	<>	<elision3>
3183	2984	<elision2>	<elision2>
3183	3148	<>	<elision2>
3183	2984	<elision1>	<elision1>
3183	3148	<>	<elision1>
3183	2992	.	υ
3183	2995	s	υ
3183	2992	.	u
3183	2995	s	u
3183	2626	s	κ
3183	2751	s	k
3183	3041	s	U
3183	2769	s	K
3183	2992	.	α
3183	3066	s	α
3183	2992	.	a
3183	3066	s	a
3183	3069	s	A
3183	2626	s	λ
3183	2782	s	l
3183	2785	s	L
3183	3184	<1s>	<>
3184	251	.	.
3184	252	 	 
3184	251	<~>	<~>
3184	251	<split-s>	<split-s>
3184	251	<split-h>	<split-h>
3184	251	<name2>	<name2>
3184	255	<aphaerese>	<aphaerese>
3184	2252	<>	<aphaerese>
3184	251	<elision3>	<elision3>
3184	2252	<>	<elision3>
3184	251	<elision2>	<elision2>
3184	2252	<>	<elision2>
3184	251	<elision1>	<elision1>
3184	2252	<>	<elision1>
3184	1546	.	υ
3184	1546	.	u
3184	1546	.	α
3184	1546	.	a
3184	3185	<K>	<>
3185	1596	.	.
3185	1596	<~>	<~>
3185	1596	<split-s>	<split-s>
3185	1596	<split-h>	<split-h>
3185	1596	<name2>	<name2>
3185	1599	<aphaerese>	<aphaerese>
3185	2256	<>	<aphaerese>
3185	1596	<elision3>	<elision3>
3185	2256	<>	<elision3>
3185	1596	<elision2>	<elision2>
3185	2256	<>	<elision2>
3185	1596	<elision1>	<elision1>
3185	2256	<>	<elision1>
3185	1595	.	υ
3185	1595	.	u
3185	1595	.	α
3185	1595	.	a
3186	2818	.	.
3186	2819	 	 
3186	2818	<~>	<~>
3186	2818	<split-s>	<split-s>
3186	2818	<split-h>	<split-h>
3186	2818	<name2>	<name2>
3186	2822	<aphaerese>	<aphaerese>
3186	3161	<>	<aphaerese>
3186	2818	<elision3>	<elision3>
3186	3161	<>	<elision3>
3186	2818	<elision2>	<elision2>
3186	3161	<>	<elision2>
3186	2818	<elision1>	<elision1>
3186	3161	<>	<elision1>
3186	2826	.	υ
3186	2829	s	υ
3186	2826	.	u
3186	2829	s	u
3186	2992	.	κ
3186	235	s	κ
3186	2567	s	k
3186	2892	s	U
3186	2600	s	K
3186	2826	.	α
3186	2920	s	α
3186	2826	.	a
3186	2920	s	a
3186	2923	s	A
3186	2992	.	λ
3186	235	s	λ
3186	2615	s	l
3186	2618	s	L
3186	2315	<1s>	<>
3186	3183	<K2L>	<>
3187	3188	<>	<name>
3187	3187	<>	<aphaerese>
3187	215	<elision3>	<elision3>
3187	3187	<>	<elision3>
3187	215	<elision2>	<elision2>
3187	3187	<>	<elision2>
3187	215	<elision1>	<elision1>
3187	3187	<>	<elision1>
3188	3189	<>	<aphaerese>
3188	214	<elision3>	<elision3>
3188	3189	<>	<elision3>
3188	214	<elision2>	<elision2>
3188	3189	<>	<elision2>
3188	214	<elision1>	<elision1>
3188	3189	<>	<elision1>
3189	3187	<>	<aphaerese>
3189	215	<elision3>	<elision3>
3189	3187	<>	<elision3>
3189	215	<elision2>	<elision2>
3189	3187	<>	<elision2>
3189	215	<elision1>	<elision1>
3189	3187	<>	<elision1>
3190	3191	<>	<name>
3190	3193	<>	<aphaerese>
3190	3193	<>	<elision3>
3190	3193	<>	<elision2>
3190	3193	<>	<elision1>
3190	3200	<ypsilon2K>	<>
3190	3201	<ypsilon2L>	<>
3191	3192	<>	<aphaerese>
3191	3192	<>	<elision3>
3191	3192	<>	<elision2>
3191	3192	<>	<elision1>
3191	3195	<ypsilon2K>	<>
3191	3198	<ypsilon2L>	<>
3192	3193	<>	<aphaerese>
3192	3193	<>	<elision3>
3192	3193	<>	<elision2>
3192	3193	<>	<elision1>
3192	3196	<ypsilon2K>	<>
3192	3199	<ypsilon2L>	<>
3193	3191	<>	<name>
3193	3193	<>	<aphaerese>
3193	3193	<>	<elision3>
3193	3193	<>	<elision2>
3193	3193	<>	<elision1>
3193	3194	<ypsilon2K>	<>
3193	3197	<ypsilon2L>	<>
3194	2818	.	.
3194	2819	 	 
3194	2818	<~>	<~>
3194	2818	<split-s>	<split-s>
3194	2818	<split-h>	<split-h>
3194	2818	<name2>	<name2>
3194	3195	<>	<name>
3194	2822	<aphaerese>	<aphaerese>
3194	3194	<>	<aphaerese>
3194	3194	<>	<elision3>
3194	3194	<>	<elision2>
3194	3194	<>	<elision1>
3194	2826	.	υ
3194	2829	s	υ
3194	2826	.	u
3194	2829	s	u
3194	2832	.	κ
3194	2850	s	κ
3194	2567	s	k
3194	2892	s	U
3194	2600	s	K
3194	2826	.	α
3194	2920	s	α
3194	2826	.	a
3194	2920	s	a
3194	2923	s	A
3194	2926	s	λ
3194	2615	s	l
3194	2618	s	L
3195	2821	.	.
3195	2824	 	 
3195	2821	<~>	<~>
3195	2821	<split-s>	<split-s>
3195	2821	<split-h>	<split-h>
3195	2821	<name2>	<name2>
3195	2950	<aphaerese>	<aphaerese>
3195	3196	<>	<aphaerese>
3195	3196	<>	<elision3>
3195	3196	<>	<elision2>
3195	3196	<>	<elision1>
3195	2828	.	υ
3195	2831	s	υ
3195	2828	.	u
3195	2831	s	u
3195	2834	.	κ
3195	2852	s	κ
3195	2569	s	k
3195	2894	s	U
3195	2603	s	K
3195	2828	.	α
3195	2922	s	α
3195	2828	.	a
3195	2922	s	a
3195	2925	s	A
3195	2928	s	λ
3195	2617	s	l
3195	2620	s	L
3196	2818	.	.
3196	2819	 	 
3196	2818	<~>	<~>
3196	2818	<split-s>	<split-s>
3196	2818	<split-h>	<split-h>
3196	2818	<name2>	<name2>
3196	2822	<aphaerese>	<aphaerese>
3196	3194	<>	<aphaerese>
3196	3194	<>	<elision3>
3196	3194	<>	<elision2>
3196	3194	<>	<elision1>
3196	2826	.	υ
3196	2829	s	υ
3196	2826	.	u
3196	2829	s	u
3196	2832	.	κ
3196	2850	s	κ
3196	2567	s	k
3196	2892	s	U
3196	2600	s	K
3196	2826	.	α
3196	2920	s	α
3196	2826	.	a
3196	2920	s	a
3196	2923	s	A
3196	2926	s	λ
3196	2615	s	l
3196	2618	s	L
3197	2984	.	.
3197	2985	 	 
3197	2984	<~>	<~>
3197	2984	<split-s>	<split-s>
3197	2984	<split-h>	<split-h>
3197	2984	<name2>	<name2>
3197	3198	<>	<name>
3197	2988	<aphaerese>	<aphaerese>
3197	3197	<>	<aphaerese>
3197	3197	<>	<elision3>
3197	3197	<>	<elision2>
3197	3197	<>	<elision1>
3197	2992	.	υ
3197	2995	s	υ
3197	2992	.	u
3197	2995	s	u
3197	2998	.	κ
3197	3016	s	κ
3197	2751	s	k
3197	3041	s	U
3197	2769	s	K
3197	2992	.	α
3197	3066	s	α
3197	2992	.	a
3197	3066	s	a
3197	3069	s	A
3197	3072	s	λ
3197	2782	s	l
3197	2785	s	L
3197	1945	<1s>	<>
3198	2987	.	.
3198	2990	 	 
3198	2987	<~>	<~>
3198	2987	<split-s>	<split-s>
3198	2987	<split-h>	<split-h>
3198	2987	<name2>	<name2>
3198	3096	<aphaerese>	<aphaerese>
3198	3199	<>	<aphaerese>
3198	3199	<>	<elision3>
3198	3199	<>	<elision2>
3198	3199	<>	<elision1>
3198	2994	.	υ
3198	2997	s	υ
3198	2994	.	u
3198	2997	s	u
3198	3000	.	κ
3198	3018	s	κ
3198	2753	s	k
3198	3043	s	U
3198	2772	s	K
3198	2994	.	α
3198	3068	s	α
3198	2994	.	a
3198	3068	s	a
3198	3071	s	A
3198	3074	s	λ
3198	2784	s	l
3198	2787	s	L
3198	1946	<1s>	<>
3199	2984	.	.
3199	2985	 	 
3199	2984	<~>	<~>
3199	2984	<split-s>	<split-s>
3199	2984	<split-h>	<split-h>
3199	2984	<name2>	<name2>
3199	2988	<aphaerese>	<aphaerese>
3199	3197	<>	<aphaerese>
3199	3197	<>	<elision3>
3199	3197	<>	<elision2>
3199	3197	<>	<elision1>
3199	2992	.	υ
3199	2995	s	υ
3199	2992	.	u
3199	2995	s	u
3199	2998	.	κ
3199	3016	s	κ
3199	2751	s	k
3199	3041	s	U
3199	2769	s	K
3199	2992	.	α
3199	3066	s	α
3199	2992	.	a
3199	3066	s	a
3199	3069	s	A
3199	3072	s	λ
3199	2782	s	l
3199	2785	s	L
3199	1944	<1s>	<>
3200	2818	.	.
3200	2819	 	 
3200	2818	<~>	<~>
3200	2818	<split-s>	<split-s>
3200	2818	<split-h>	<split-h>
3200	2818	<name2>	<name2>
3200	3195	<>	<name>
3200	2822	<aphaerese>	<aphaerese>
3200	3194	<>	<aphaerese>
3200	3194	<>	<elision3>
3200	3194	<>	<elision2>
3200	3194	<>	<elision1>
3200	2826	.	υ
3200	2829	s	υ
3200	2826	.	u
3200	2829	s	u
3200	2832	.	κ
3200	2850	s	κ
3200	2567	s	k
3200	2826	.	α
3200	2920	s	α
3200	2826	.	a
3200	2920	s	a
3200	2926	s	λ
3200	2615	s	l
3201	2984	.	.
3201	2985	 	 
3201	2984	<~>	<~>
3201	2984	<split-s>	<split-s>
3201	2984	<split-h>	<split-h>
3201	2984	<name2>	<name2>
3201	3198	<>	<name>
3201	2988	<aphaerese>	<aphaerese>
3201	3197	<>	<aphaerese>
3201	3197	<>	<elision3>
3201	3197	<>	<elision2>
3201	3197	<>	<elision1>
3201	2992	.	υ
3201	2995	s	υ
3201	2992	.	u
3201	2995	s	u
3201	2998	.	κ
3201	3016	s	κ
3201	2751	s	k
3201	2992	.	α
3201	3066	s	α
3201	2992	.	a
3201	3066	s	a
3201	3072	s	λ
3201	2782	s	l
3201	3202	<1s>	<>
3202	251	.	.
3202	252	 	 
3202	251	<~>	<~>
3202	251	<split-s>	<split-s>
3202	251	<split-h>	<split-h>
3202	251	<name2>	<name2>
3202	1946	<>	<name>
3202	255	<aphaerese>	<aphaerese>
3202	1945	<>	<aphaerese>
3202	1945	<>	<elision3>
3202	1945	<>	<elision2>
3202	1945	<>	<elision1>
3202	1546	.	υ
3202	1546	.	u
3202	258	.	κ
3202	1546	.	α
3202	1546	.	a
3202	3203	<K>	<>
3203	1596	.	.
3203	1596	<~>	<~>
3203	1596	<split-s>	<split-s>
3203	1596	<split-h>	<split-h>
3203	1596	<name2>	<name2>
3203	1947	<>	<name>
3203	1599	<aphaerese>	<aphaerese>
3203	1949	<>	<aphaerese>
3203	1949	<>	<elision3>
3203	1949	<>	<elision2>
3203	1949	<>	<elision1>
3203	1595	.	υ
3203	1595	.	u
3203	1602	.	κ
3203	1595	.	α
3203	1595	.	a
3204	3205	<>	<name>
3204	3207	<>	<aphaerese>
3204	3207	<>	<elision3>
3204	3207	<>	<elision2>
3204	3207	<>	<elision1>
3204	3200	<u2K>	<>
3204	3201	<u2L>	<>
3205	3206	<>	<aphaerese>
3205	3206	<>	<elision3>
3205	3206	<>	<elision2>
3205	3206	<>	<elision1>
3205	3195	<u2K>	<>
3205	3198	<u2L>	<>
3206	3207	<>	<aphaerese>
3206	3207	<>	<elision3>
3206	3207	<>	<elision2>
3206	3207	<>	<elision1>
3206	3196	<u2K>	<>
3206	3199	<u2L>	<>
3207	3205	<>	<name>
3207	3207	<>	<aphaerese>
3207	3207	<>	<elision3>
3207	3207	<>	<elision2>
3207	3207	<>	<elision1>
3207	3194	<u2K>	<>
3207	3197	<u2L>	<>
3208	2814	<>	<name>
3208	2816	<>	<aphaerese>
3208	2816	<>	<elision3>
3208	2816	<>	<elision2>
3208	2816	<>	<elision1>
3208	3209	<kappa2K>	<>
3208	3210	<kappa2L>	<>
3208	3135	<lambda2L>	<>
3209	2818	.	.
3209	2819	 	 
3209	2818	<~>	<~>
3209	2818	<split-s>	<split-s>
3209	2818	<split-h>	<split-h>
3209	2818	<name2>	<name2>
3209	2953	<>	<name>
3209	2822	<aphaerese>	<aphaerese>
3209	2817	<>	<aphaerese>
3209	2955	<elision3>	<elision3>
3209	2817	<>	<elision3>
3209	2955	<elision2>	<elision2>
3209	2817	<>	<elision2>
3209	2955	<elision1>	<elision1>
3209	2817	<>	<elision1>
3209	2826	.	υ
3209	2829	s	υ
3209	2826	.	u
3209	2829	s	u
3209	235	s	κ
3209	2567	s	k
3209	2826	.	α
3209	2920	s	α
3209	2826	.	a
3209	2920	s	a
3209	235	s	λ
3209	2615	s	l
3210	2984	.	.
3210	2985	 	 
3210	2984	<~>	<~>
3210	2984	<split-s>	<split-s>
3210	2984	<split-h>	<split-h>
3210	2984	<name2>	<name2>
3210	3099	<>	<name>
3210	2988	<aphaerese>	<aphaerese>
3210	2983	<>	<aphaerese>
3210	3101	<elision3>	<elision3>
3210	2983	<>	<elision3>
3210	3101	<elision2>	<elision2>
3210	2983	<>	<elision2>
3210	3101	<elision1>	<elision1>
3210	2983	<>	<elision1>
3210	2992	.	υ
3210	2995	s	υ
3210	2992	.	u
3210	2995	s	u
3210	2626	s	κ
3210	2751	s	k
3210	2992	.	α
3210	3066	s	α
3210	2992	.	a
3210	3066	s	a
3210	2626	s	λ
3210	2782	s	l
3210	3139	<1s>	<>
3211	3142	<>	<name>
3211	3144	<>	<aphaerese>
3211	3144	<>	<elision3>
3211	3144	<>	<elision2>
3211	3144	<>	<elision1>
3211	3212	<k2K>	<>
3211	3213	<k2L>	<>
3211	3135	<l2L>	<>
3212	2818	.	.
3212	2819	 	 
3212	2818	<~>	<~>
3212	2818	<split-s>	<split-s>
3212	2818	<split-h>	<split-h>
3212	2818	<name2>	<name2>
3212	3146	<>	<name>
3212	2822	<aphaerese>	<aphaerese>
3212	3145	<>	<aphaerese>
3212	2818	<elision3>	<elision3>
3212	3145	<>	<elision3>
3212	2818	<elision2>	<elision2>
3212	3145	<>	<elision2>
3212	2818	<elision1>	<elision1>
3212	3145	<>	<elision1>
3212	2826	.	υ
3212	2829	s	υ
3212	2826	.	u
3212	2829	s	u
3212	235	s	κ
3212	2567	s	k
3212	2826	.	α
3212	2920	s	α
3212	2826	.	a
3212	2920	s	a
3212	235	s	λ
3212	2615	s	l
3213	2984	.	.
3213	2985	 	 
3213	2984	<~>	<~>
3213	2984	<split-s>	<split-s>
3213	2984	<split-h>	<split-h>
3213	2984	<name2>	<name2>
3213	3149	<>	<name>
3213	2988	<aphaerese>	<aphaerese>
3213	3148	<>	<aphaerese>
3213	2984	<elision3>	<elision3>
3213	3148	<>	<elision3>
3213	2984	<elision2>	<elision2>
3213	3148	<>	<elision2>
3213	2984	<elision1>	<elision1>
3213	3148	<>	<elision1>
3213	2992	.	υ
3213	2995	s	υ
3213	2992	.	u
3213	2995	s	u
3213	2626	s	κ
3213	2751	s	k
3213	2992	.	α
3213	3066	s	α
3213	2992	.	a
3213	3066	s	a
3213	2626	s	λ
3213	2782	s	l
3213	3152	<1s>	<>
3214	3215	<>	<name>
3214	3217	<>	<aphaerese>
3214	3217	<>	<elision3>
3214	3217	<>	<elision2>
3214	3217	<>	<elision1>
3214	3218	<alpha2L>	<>
3215	3216	<>	<aphaerese>
3215	3216	<>	<elision3>
3215	3216	<>	<elision2>
3215	3216	<>	<elision1>
3215	3198	<alpha2L>	<>
3216	3217	<>	<aphaerese>
3216	3217	<>	<elision3>
3216	3217	<>	<elision2>
3216	3217	<>	<elision1>
3216	3199	<alpha2L>	<>
3217	3215	<>	<name>
3217	3217	<>	<aphaerese>
3217	3217	<>	<elision3>
3217	3217	<>	<elision2>
3217	3217	<>	<elision1>
3217	3197	<alpha2L>	<>
3218	2984	.	.
3218	2985	 	 
3218	2984	<~>	<~>
3218	2984	<split-s>	<split-s>
3218	2984	<split-h>	<split-h>
3218	2984	<name2>	<name2>
3218	3198	<>	<name>
3218	2988	<aphaerese>	<aphaerese>
3218	3197	<>	<aphaerese>
3218	3197	<>	<elision3>
3218	3197	<>	<elision2>
3218	3197	<>	<elision1>
3218	2992	.	υ
3218	2995	s	υ
3218	2992	.	u
3218	2995	s	u
3218	2998	.	κ
3218	3016	s	κ
3218	2751	s	k
3218	2992	.	α
3218	3066	s	α
3218	2992	.	a
3218	3066	s	a
3218	3072	s	λ
3218	2782	s	l
3218	1945	<1s>	<>
3219	3220	<>	<name>
3219	3222	<>	<aphaerese>
3219	3222	<>	<elision3>
3219	3222	<>	<elision2>
3219	3222	<>	<elision1>
3219	3218	<a2L>	<>
3220	3221	<>	<aphaerese>
3220	3221	<>	<elision3>
3220	3221	<>	<elision2>
3220	3221	<>	<elision1>
3220	3198	<a2L>	<>
3221	3222	<>	<aphaerese>
3221	3222	<>	<elision3>
3221	3222	<>	<elision2>
3221	3222	<>	<elision1>
3221	3199	<a2L>	<>
3222	3220	<>	<name>
3222	3222	<>	<aphaerese>
3222	3222	<>	<elision3>
3222	3222	<>	<elision2>
3222	3222	<>	<elision1>
3222	3197	<a2L>	<>
3223	3169	<>	<name>
3223	3168	<>	<aphaerese>
3223	3168	<>	<elision3>
3223	3168	<>	<elision2>
3223	3168	<>	<elision1>
3223	3224	<lambda2L>	<>
3224	2984	.	.
3224	2985	 	 
3224	2984	<~>	<~>
3224	2984	<split-s>	<split-s>
3224	2984	<split-h>	<split-h>
3224	2984	<name2>	<name2>
3224	3173	<>	<name>
3224	2988	<aphaerese>	<aphaerese>
3224	3172	<>	<aphaerese>
3224	2984	<elision3>	<elision3>
3224	3172	<>	<elision3>
3224	2984	<elision2>	<elision2>
3224	3172	<>	<elision2>
3224	2984	<elision1>	<elision1>
3224	3172	<>	<elision1>
3224	2992	.	υ
3224	2995	s	υ
3224	2992	.	u
3224	2995	s	u
3224	2992	.	κ
3224	2626	s	κ
3224	2751	s	k
3224	2992	.	α
3224	3066	s	α
3224	2992	.	a
3224	3066	s	a
3224	2992	.	λ
3224	2626	s	λ
3224	2782	s	l
3224	2137	<1s>	<>
3225	3175	<>	<name>
3225	3174	<>	<aphaerese>
3225	3174	<>	<elision3>
3225	3174	<>	<elision2>
3225	3174	<>	<elision1>
3225	3224	<l2L>	<>
3226	3193	<>	<aphaerese>
3226	3193	<>	<elision3>
3226	3193	<>	<elision2>
3226	3193	<>	<elision1>
3226	3196	<ypsilon2K>	<>
3226	3227	<ypsilon2L>	<>
3227	2984	.	.
3227	2985	 	 
3227	2984	<~>	<~>
3227	2984	<split-s>	<split-s>
3227	2984	<split-h>	<split-h>
3227	2984	<name2>	<name2>
3227	2988	<aphaerese>	<aphaerese>
3227	3197	<>	<aphaerese>
3227	3197	<>	<elision3>
3227	3197	<>	<elision2>
3227	3197	<>	<elision1>
3227	2992	.	υ
3227	2995	s	υ
3227	2992	.	u
3227	2995	s	u
3227	2998	.	κ
3227	3016	s	κ
3227	2751	s	k
3227	3041	s	U
3227	2769	s	K
3227	2992	.	α
3227	3066	s	α
3227	2992	.	a
3227	3066	s	a
3227	3069	s	A
3227	3072	s	λ
3227	2782	s	l
3227	2785	s	L
3227	3228	<1s>	<>
3228	251	.	.
3228	252	 	 
3228	251	<~>	<~>
3228	251	<split-s>	<split-s>
3228	251	<split-h>	<split-h>
3228	251	<name2>	<name2>
3228	255	<aphaerese>	<aphaerese>
3228	1945	<>	<aphaerese>
3228	1945	<>	<elision3>
3228	1945	<>	<elision2>
3228	1945	<>	<elision1>
3228	1546	.	υ
3228	1546	.	u
3228	258	.	κ
3228	1546	.	α
3228	1546	.	a
3228	3229	<K>	<>
3229	1596	.	.
3229	1596	<~>	<~>
3229	1596	<split-s>	<split-s>
3229	1596	<split-h>	<split-h>
3229	1596	<name2>	<name2>
3229	1599	<aphaerese>	<aphaerese>
3229	1949	<>	<aphaerese>
3229	1949	<>	<elision3>
3229	1949	<>	<elision2>
3229	1949	<>	<elision1>
3229	1595	.	υ
3229	1595	.	u
3229	1602	.	κ
3229	1595	.	α
3229	1595	.	a
3230	3207	<>	<aphaerese>
3230	3207	<>	<elision3>
3230	3207	<>	<elision2>
3230	3207	<>	<elision1>
3230	3196	<u2K>	<>
3230	3227	<u2L>	<>
3231	3191	<>	<name>
3231	3193	<>	<aphaerese>
3231	3193	<>	<elision3>
3231	3193	<>	<elision2>
3231	3193	<>	<elision1>
3231	3194	<ypsilon2K>	<>
3231	3232	<ypsilon2L>	<>
3232	2984	.	.
3232	2985	 	 
3232	2984	<~>	<~>
3232	2984	<split-s>	<split-s>
3232	2984	<split-h>	<split-h>
3232	2984	<name2>	<name2>
3232	3198	<>	<name>
3232	2988	<aphaerese>	<aphaerese>
3232	3197	<>	<aphaerese>
3232	3197	<>	<elision3>
3232	3197	<>	<elision2>
3232	3197	<>	<elision1>
3232	2992	.	υ
3232	2995	s	υ
3232	2992	.	u
3232	2995	s	u
3232	2998	.	κ
3232	3016	s	κ
3232	2751	s	k
3232	3041	s	U
3232	2769	s	K
3232	2992	.	α
3232	3066	s	α
3232	2992	.	a
3232	3066	s	a
3232	3069	s	A
3232	3072	s	λ
3232	2782	s	l
3232	2785	s	L
3232	3202	<1s>	<>
3233	3205	<>	<name>
3233	3207	<>	<aphaerese>
3233	3207	<>	<elision3>
3233	3207	<>	<elision2>
3233	3207	<>	<elision1>
3233	3194	<u2K>	<>
3233	3232	<u2L>	<>
3234	3235	<>	<aphaerese>
3234	3239	<elision3>	<elision3>
3234	3235	<>	<elision3>
3234	3239	<elision2>	<elision2>
3234	3235	<>	<elision2>
3234	3239	<elision1>	<elision1>
3234	3235	<>	<elision1>
3235	3236	<>	<aphaerese>
3235	3237	<elision3>	<elision3>
3235	3236	<>	<elision3>
3235	3237	<elision2>	<elision2>
3235	3236	<>	<elision2>
3235	3237	<elision1>	<elision1>
3235	3236	<>	<elision1>
3236	3234	<>	<name>
3236	3236	<>	<aphaerese>
3236	3237	<elision3>	<elision3>
3236	3236	<>	<elision3>
3236	3237	<elision2>	<elision2>
3236	3236	<>	<elision2>
3236	3237	<elision1>	<elision1>
3236	3236	<>	<elision1>
3237	3237	.	.
3237	3237	<~>	<~>
3237	3237	<split-s>	<split-s>
3237	3237	<split-h>	<split-h>
3237	3237	<name2>	<name2>
3237	3238	<>	<name>
3237	3240	<aphaerese>	<aphaerese>
3237	3237	<>	<aphaerese>
3237	3237	<elision3>	<elision3>
3237	3237	<>	<elision3>
3237	3237	<elision2>	<elision2>
3237	3237	<>	<elision2>
3237	3237	<elision1>	<elision1>
3237	3237	<>	<elision1>
3237	3236	.	υ
3237	3379	H	υ
3237	3236	.	u
3237	3388	H	u
3237	3243	.	κ
3237	3294	H	κ
3237	3348	H	k
3237	3357	H	U
3237	3360	H	K
3237	3236	.	α
3237	3391	H	α
3237	3236	.	a
3237	3394	H	a
3237	3328	H	A
3237	3369	H	λ
3237	3375	H	l
3237	3378	H	L
3238	3239	.	.
3238	3239	<~>	<~>
3238	3239	<split-s>	<split-s>
3238	3239	<split-h>	<split-h>
3238	3239	<name2>	<name2>
3238	3242	<aphaerese>	<aphaerese>
3238	3239	<>	<aphaerese>
3238	3239	<elision3>	<elision3>
3238	3239	<>	<elision3>
3238	3239	<elision2>	<elision2>
3238	3239	<>	<elision2>
3238	3239	<elision1>	<elision1>
3238	3239	<>	<elision1>
3238	3235	.	υ
3238	3381	H	υ
3238	3235	.	u
3238	3390	H	u
3238	3245	.	κ
3238	3296	H	κ
3238	3350	H	k
3238	3359	H	U
3238	3363	H	K
3238	3235	.	α
3238	3393	H	α
3238	3235	.	a
3238	3396	H	a
3238	3330	H	A
3238	3371	H	λ
3238	3377	H	l
3238	3372	H	L
3239	3237	.	.
3239	3237	<~>	<~>
3239	3237	<split-s>	<split-s>
3239	3237	<split-h>	<split-h>
3239	3237	<name2>	<name2>
3239	3240	<aphaerese>	<aphaerese>
3239	3237	<>	<aphaerese>
3239	3237	<elision3>	<elision3>
3239	3237	<>	<elision3>
3239	3237	<elision2>	<elision2>
3239	3237	<>	<elision2>
3239	3237	<elision1>	<elision1>
3239	3237	<>	<elision1>
3239	3236	.	υ
3239	3379	H	υ
3239	3236	.	u
3239	3388	H	u
3239	3243	.	κ
3239	3294	H	κ
3239	3348	H	k
3239	3357	H	U
3239	3360	H	K
3239	3236	.	α
3239	3391	H	α
3239	3236	.	a
3239	3394	H	a
3239	3328	H	A
3239	3369	H	λ
3239	3375	H	l
3239	3378	H	L
3240	3237	.	.
3240	3237	<~>	<~>
3240	3237	<split-s>	<split-s>
3240	3237	<split-h>	<split-h>
3240	3237	<name2>	<name2>
3240	3241	<>	<name>
3240	3240	<aphaerese>	<aphaerese>
3240	3240	<>	<aphaerese>
3240	3237	<elision3>	<elision3>
3240	3240	<>	<elision3>
3240	3237	<elision2>	<elision2>
3240	3240	<>	<elision2>
3240	3237	<elision1>	<elision1>
3240	3240	<>	<elision1>
3240	3237	.	υ
3240	3237	.	u
3240	3243	.	κ
3240	3294	H	κ
3240	3348	H	k
3240	3357	H	U
3240	3360	H	K
3240	3237	.	α
3240	3237	.	a
3240	3328	H	A
3240	3369	H	λ
3240	3375	H	l
3240	3378	H	L
3241	3239	.	.
3241	3239	<~>	<~>
3241	3239	<split-s>	<split-s>
3241	3239	<split-h>	<split-h>
3241	3239	<name2>	<name2>
3241	3242	<aphaerese>	<aphaerese>
3241	3242	<>	<aphaerese>
3241	3239	<elision3>	<elision3>
3241	3242	<>	<elision3>
3241	3239	<elision2>	<elision2>
3241	3242	<>	<elision2>
3241	3239	<elision1>	<elision1>
3241	3242	<>	<elision1>
3241	3239	.	υ
3241	3239	.	u
3241	3245	.	κ
3241	3296	H	κ
3241	3350	H	k
3241	3359	H	U
3241	3363	H	K
3241	3239	.	α
3241	3239	.	a
3241	3330	H	A
3241	3371	H	λ
3241	3377	H	l
3241	3372	H	L
3242	3237	.	.
3242	3237	<~>	<~>
3242	3237	<split-s>	<split-s>
3242	3237	<split-h>	<split-h>
3242	3237	<name2>	<name2>
3242	3240	<aphaerese>	<aphaerese>
3242	3240	<>	<aphaerese>
3242	3237	<elision3>	<elision3>
3242	3240	<>	<elision3>
3242	3237	<elision2>	<elision2>
3242	3240	<>	<elision2>
3242	3237	<elision1>	<elision1>
3242	3240	<>	<elision1>
3242	3237	.	υ
3242	3237	.	u
3242	3243	.	κ
3242	3294	H	κ
3242	3348	H	k
3242	3357	H	U
3242	3360	H	K
3242	3237	.	α
3242	3237	.	a
3242	3328	H	A
3242	3369	H	λ
3242	3375	H	l
3242	3378	H	L
3243	3244	<>	<name>
3243	3243	<>	<aphaerese>
3243	3246	<elision3>	<elision3>
3243	3243	<>	<elision3>
3243	3246	<elision2>	<elision2>
3243	3243	<>	<elision2>
3243	3246	<elision1>	<elision1>
3243	3243	<>	<elision1>
3244	3245	<>	<aphaerese>
3244	3248	<elision3>	<elision3>
3244	3245	<>	<elision3>
3244	3248	<elision2>	<elision2>
3244	3245	<>	<elision2>
3244	3248	<elision1>	<elision1>
3244	3245	<>	<elision1>
3245	3243	<>	<aphaerese>
3245	3246	<elision3>	<elision3>
3245	3243	<>	<elision3>
3245	3246	<elision2>	<elision2>
3245	3243	<>	<elision2>
3245	3246	<elision1>	<elision1>
3245	3243	<>	<elision1>
3246	3247	<>	<name>
3246	3246	<>	<aphaerese>
3246	3246	<>	<elision3>
3246	3246	<>	<elision2>
3246	3246	<>	<elision1>
3246	3249	H	κ
3246	3282	H	k
3246	3285	H	K
3246	3288	H	λ
3246	3291	H	l
3246	3274	H	L
3247	3248	<>	<aphaerese>
3247	3248	<>	<elision3>
3247	3248	<>	<elision2>
3247	3248	<>	<elision1>
3247	3251	H	κ
3247	3284	H	k
3247	3287	H	K
3247	3290	H	λ
3247	3293	H	l
3247	3273	H	L
3248	3246	<>	<aphaerese>
3248	3246	<>	<elision3>
3248	3246	<>	<elision2>
3248	3246	<>	<elision1>
3248	3249	H	κ
3248	3282	H	k
3248	3285	H	K
3248	3288	H	λ
3248	3291	H	l
3248	3274	H	L
3249	3250	<>	<name>
3249	3249	<>	<aphaerese>
3249	3249	<>	<elision3>
3249	3249	<>	<elision2>
3249	3249	<>	<elision1>
3249	3253	<kappa2K>	<>
3249	3274	<kappa2L>	<>
3250	3251	<>	<aphaerese>
3250	3251	<>	<elision3>
3250	3251	<>	<elision2>
3250	3251	<>	<elision1>
3250	3254	<kappa2K>	<>
3250	3275	<kappa2L>	<>
3251	3249	<>	<aphaerese>
3251	3249	<>	<elision3>
3251	3249	<>	<elision2>
3251	3249	<>	<elision1>
3251	3252	<kappa2K>	<>
3251	3273	<kappa2L>	<>
3252	3253	<>	<aphaerese>
3252	3253	<>	<elision3>
3252	3253	<>	<elision2>
3252	3253	<>	<elision1>
3252	3256	s	κ
3252	3256	s	k
3252	3265	s	K
3252	3256	s	λ
3252	3256	s	l
3252	3271	s	L
3253	3254	<>	<name>
3253	3253	<>	<aphaerese>
3253	3253	<>	<elision3>
3253	3253	<>	<elision2>
3253	3253	<>	<elision1>
3253	3256	s	κ
3253	3256	s	k
3253	3265	s	K
3253	3256	s	λ
3253	3256	s	l
3253	3271	s	L
3254	3252	<>	<aphaerese>
3254	3252	<>	<elision3>
3254	3252	<>	<elision2>
3254	3252	<>	<elision1>
3254	3255	s	κ
3254	3255	s	k
3254	3264	s	K
3254	3255	s	λ
3254	3255	s	l
3254	3270	s	L
3255	3256	<>	<aphaerese>
3255	3256	<>	<elision3>
3255	3256	<>	<elision2>
3255	3256	<>	<elision1>
3255	3259	H	κ
3255	3259	H	k
3255	3259	H	K
3255	3259	H	λ
3255	3259	H	l
3255	3259	H	L
3255	3262	<2m>	<>
3256	3257	<>	<name>
3256	3256	<>	<aphaerese>
3256	3256	<>	<elision3>
3256	3256	<>	<elision2>
3256	3256	<>	<elision1>
3256	3259	H	κ
3256	3259	H	k
3256	3259	H	K
3256	3259	H	λ
3256	3259	H	l
3256	3259	H	L
3256	3263	<2m>	<>
3257	3255	<>	<aphaerese>
3257	3255	<>	<elision3>
3257	3255	<>	<elision2>
3257	3255	<>	<elision1>
3257	3258	H	κ
3257	3258	H	k
3257	3258	H	K
3257	3258	H	λ
3257	3258	H	l
3257	3258	H	L
3257	3261	<2m>	<>
3258	3259	<>	<aphaerese>
3258	3259	<>	<elision3>
3258	3259	<>	<elision2>
3258	3259	<>	<elision1>
3258	1621	<3k>	<>
3259	3260	<>	<name>
3259	3259	<>	<aphaerese>
3259	3259	<>	<elision3>
3259	3259	<>	<elision2>
3259	3259	<>	<elision1>
3259	1622	<3k>	<>
3260	3258	<>	<aphaerese>
3260	3258	<>	<elision3>
3260	3258	<>	<elision2>
3260	3258	<>	<elision1>
3260	1620	<3k>	<>
3261	3262	<>	<aphaerese>
3261	3262	<>	<elision3>
3261	3262	<>	<elision2>
3261	3262	<>	<elision1>
3261	314	<6h>	<>
3262	3263	<>	<aphaerese>
3262	3263	<>	<elision3>
3262	3263	<>	<elision2>
3262	3263	<>	<elision1>
3262	315	<6h>	<>
3263	3261	<>	<name>
3263	3263	<>	<aphaerese>
3263	3263	<>	<elision3>
3263	3263	<>	<elision2>
3263	3263	<>	<elision1>
3263	313	<6h>	<>
3264	3265	<>	<aphaerese>
3264	3265	<>	<elision3>
3264	3265	<>	<elision2>
3264	3265	<>	<elision1>
3264	3268	<K2kl>	<>
3265	3266	<>	<name>
3265	3265	<>	<aphaerese>
3265	3265	<>	<elision3>
3265	3265	<>	<elision2>
3265	3265	<>	<elision1>
3265	3269	<K2kl>	<>
3266	3264	<>	<aphaerese>
3266	3264	<>	<elision3>
3266	3264	<>	<elision2>
3266	3264	<>	<elision1>
3266	3267	<K2kl>	<>
3267	3268	<>	<aphaerese>
3267	3268	<>	<elision3>
3267	3268	<>	<elision2>
3267	3268	<>	<elision1>
3267	3258	H	κ
3267	3258	H	k
3267	3258	H	K
3267	3258	H	λ
3267	3258	H	l
3267	3258	H	L
3268	3269	<>	<aphaerese>
3268	3269	<>	<elision3>
3268	3269	<>	<elision2>
3268	3269	<>	<elision1>
3268	3259	H	κ
3268	3259	H	k
3268	3259	H	K
3268	3259	H	λ
3268	3259	H	l
3268	3259	H	L
3269	3267	<>	<name>
3269	3269	<>	<aphaerese>
3269	3269	<>	<elision3>
3269	3269	<>	<elision2>
3269	3269	<>	<elision1>
3269	3259	H	κ
3269	3259	H	k
3269	3259	H	K
3269	3259	H	λ
3269	3259	H	l
3269	3259	H	L
3270	3271	<>	<aphaerese>
3270	3271	<>	<elision3>
3270	3271	<>	<elision2>
3270	3271	<>	<elision1>
3270	3268	<L2kl>	<>
3271	3272	<>	<name>
3271	3271	<>	<aphaerese>
3271	3271	<>	<elision3>
3271	3271	<>	<elision2>
3271	3271	<>	<elision1>
3271	3269	<L2kl>	<>
3272	3270	<>	<aphaerese>
3272	3270	<>	<elision3>
3272	3270	<>	<elision2>
3272	3270	<>	<elision1>
3272	3267	<L2kl>	<>
3273	3274	<>	<aphaerese>
3273	3274	<>	<elision3>
3273	3274	<>	<elision2>
3273	3274	<>	<elision1>
3273	3277	s	κ
3273	3280	H	κ
3273	3277	s	k
3273	3280	H	k
3273	3265	s	K
3273	3280	H	K
3273	3277	s	λ
3273	3280	H	λ
3273	3277	s	l
3273	3280	H	l
3273	3271	s	L
3273	3280	H	L
3274	3275	<>	<name>
3274	3274	<>	<aphaerese>
3274	3274	<>	<elision3>
3274	3274	<>	<elision2>
3274	3274	<>	<elision1>
3274	3277	s	κ
3274	3280	H	κ
3274	3277	s	k
3274	3280	H	k
3274	3265	s	K
3274	3280	H	K
3274	3277	s	λ
3274	3280	H	λ
3274	3277	s	l
3274	3280	H	l
3274	3271	s	L
3274	3280	H	L
3275	3273	<>	<aphaerese>
3275	3273	<>	<elision3>
3275	3273	<>	<elision2>
3275	3273	<>	<elision1>
3275	3276	s	κ
3275	3279	H	κ
3275	3276	s	k
3275	3279	H	k
3275	3264	s	K
3275	3279	H	K
3275	3276	s	λ
3275	3279	H	λ
3275	3276	s	l
3275	3279	H	l
3275	3270	s	L
3275	3279	H	L
3276	3277	<>	<aphaerese>
3276	3277	<>	<elision3>
3276	3277	<>	<elision2>
3276	3277	<>	<elision1>
3276	3259	H	κ
3276	3259	H	k
3276	3259	H	K
3276	3259	H	λ
3276	3259	H	l
3276	3259	H	L
3276	3262	<w>	<>
3277	3278	<>	<name>
3277	3277	<>	<aphaerese>
3277	3277	<>	<elision3>
3277	3277	<>	<elision2>
3277	3277	<>	<elision1>
3277	3259	H	κ
3277	3259	H	k
3277	3259	H	K
3277	3259	H	λ
3277	3259	H	l
3277	3259	H	L
3277	3263	<w>	<>
3278	3276	<>	<aphaerese>
3278	3276	<>	<elision3>
3278	3276	<>	<elision2>
3278	3276	<>	<elision1>
3278	3258	H	κ
3278	3258	H	k
3278	3258	H	K
3278	3258	H	λ
3278	3258	H	l
3278	3258	H	L
3278	3261	<w>	<>
3279	3280	<>	<aphaerese>
3279	3280	<>	<elision3>
3279	3280	<>	<elision2>
3279	3280	<>	<elision1>
3279	1621	<2k>	<>
3280	3281	<>	<name>
3280	3280	<>	<aphaerese>
3280	3280	<>	<elision3>
3280	3280	<>	<elision2>
3280	3280	<>	<elision1>
3280	1622	<2k>	<>
3281	3279	<>	<aphaerese>
3281	3279	<>	<elision3>
3281	3279	<>	<elision2>
3281	3279	<>	<elision1>
3281	1620	<2k>	<>
3282	3283	<>	<name>
3282	3282	<>	<aphaerese>
3282	3282	<>	<elision3>
3282	3282	<>	<elision2>
3282	3282	<>	<elision1>
3282	3253	<k2K>	<>
3282	3274	<k2L>	<>
3283	3284	<>	<aphaerese>
3283	3284	<>	<elision3>
3283	3284	<>	<elision2>
3283	3284	<>	<elision1>
3283	3254	<k2K>	<>
3283	3275	<k2L>	<>
3284	3282	<>	<aphaerese>
3284	3282	<>	<elision3>
3284	3282	<>	<elision2>
3284	3282	<>	<elision1>
3284	3252	<k2K>	<>
3284	3273	<k2L>	<>
3285	3286	<>	<name>
3285	3285	<>	<aphaerese>
3285	3285	<>	<elision3>
3285	3285	<>	<elision2>
3285	3285	<>	<elision1>
3285	3256	s	κ
3285	3256	s	k
3285	3265	s	K
3285	3256	s	λ
3285	3256	s	l
3285	3271	s	L
3285	3274	<K2L>	<>
3286	3287	<>	<aphaerese>
3286	3287	<>	<elision3>
3286	3287	<>	<elision2>
3286	3287	<>	<elision1>
3286	3255	s	κ
3286	3255	s	k
3286	3264	s	K
3286	3255	s	λ
3286	3255	s	l
3286	3270	s	L
3286	3275	<K2L>	<>
3287	3285	<>	<aphaerese>
3287	3285	<>	<elision3>
3287	3285	<>	<elision2>
3287	3285	<>	<elision1>
3287	3256	s	κ
3287	3256	s	k
3287	3265	s	K
3287	3256	s	λ
3287	3256	s	l
3287	3271	s	L
3287	3273	<K2L>	<>
3288	3289	<>	<name>
3288	3288	<>	<aphaerese>
3288	3288	<>	<elision3>
3288	3288	<>	<elision2>
3288	3288	<>	<elision1>
3288	3274	<lambda2L>	<>
3289	3290	<>	<aphaerese>
3289	3290	<>	<elision3>
3289	3290	<>	<elision2>
3289	3290	<>	<elision1>
3289	3275	<lambda2L>	<>
3290	3288	<>	<aphaerese>
3290	3288	<>	<elision3>
3290	3288	<>	<elision2>
3290	3288	<>	<elision1>
3290	3273	<lambda2L>	<>
3291	3292	<>	<name>
3291	3291	<>	<aphaerese>
3291	3291	<>	<elision3>
3291	3291	<>	<elision2>
3291	3291	<>	<elision1>
3291	3274	<l2L>	<>
3292	3293	<>	<aphaerese>
3292	3293	<>	<elision3>
3292	3293	<>	<elision2>
3292	3293	<>	<elision1>
3292	3275	<l2L>	<>
3293	3291	<>	<aphaerese>
3293	3291	<>	<elision3>
3293	3291	<>	<elision2>
3293	3291	<>	<elision1>
3293	3273	<l2L>	<>
3294	3295	<>	<name>
3294	3294	<>	<aphaerese>
3294	3294	<>	<elision3>
3294	3294	<>	<elision2>
3294	3294	<>	<elision1>
3294	3319	<kappa2K>	<>
3294	3337	<kappa2L>	<>
3294	3346	<lambda2L>	<>
3295	3296	<>	<aphaerese>
3295	3296	<>	<elision3>
3295	3296	<>	<elision2>
3295	3296	<>	<elision1>
3295	3320	<kappa2K>	<>
3295	3338	<kappa2L>	<>
3295	3347	<lambda2L>	<>
3296	3294	<>	<aphaerese>
3296	3294	<>	<elision3>
3296	3294	<>	<elision2>
3296	3294	<>	<elision1>
3296	3297	<kappa2K>	<>
3296	3327	<kappa2L>	<>
3296	3345	<lambda2L>	<>
3297	3298	.	.
3297	3298	<~>	<~>
3297	3298	<split-s>	<split-s>
3297	3298	<split-h>	<split-h>
3297	3298	<name2>	<name2>
3297	3301	<aphaerese>	<aphaerese>
3297	3319	<>	<aphaerese>
3297	3322	<elision3>	<elision3>
3297	3319	<>	<elision3>
3297	3322	<elision2>	<elision2>
3297	3319	<>	<elision2>
3297	3322	<elision1>	<elision1>
3297	3319	<>	<elision1>
3297	3316	.	υ
3297	3269	s	υ
3297	3316	.	u
3297	3269	s	u
3297	3256	s	κ
3297	3256	s	k
3297	3310	s	U
3297	3265	s	K
3297	3316	.	α
3297	3269	s	α
3297	3316	.	a
3297	3269	s	a
3297	3313	s	A
3297	3256	s	λ
3297	3256	s	l
3297	3271	s	L
3297	3262	<1m>	<>
3298	3298	.	.
3298	3298	<~>	<~>
3298	3298	<split-s>	<split-s>
3298	3298	<split-h>	<split-h>
3298	3298	<name2>	<name2>
3298	3299	<>	<name>
3298	3301	<aphaerese>	<aphaerese>
3298	3298	<>	<aphaerese>
3298	3298	<elision3>	<elision3>
3298	3298	<>	<elision3>
3298	3298	<elision2>	<elision2>
3298	3298	<>	<elision2>
3298	3298	<elision1>	<elision1>
3298	3298	<>	<elision1>
3298	3316	.	υ
3298	3269	s	υ
3298	3316	.	u
3298	3269	s	u
3298	3304	.	κ
3298	3256	s	κ
3298	3256	s	k
3298	3310	s	U
3298	3265	s	K
3298	3316	.	α
3298	3269	s	α
3298	3316	.	a
3298	3269	s	a
3298	3313	s	A
3298	3256	s	λ
3298	3256	s	l
3298	3271	s	L
3298	3263	<1m>	<>
3299	3300	.	.
3299	3300	<~>	<~>
3299	3300	<split-s>	<split-s>
3299	3300	<split-h>	<split-h>
3299	3300	<name2>	<name2>
3299	3303	<aphaerese>	<aphaerese>
3299	3300	<>	<aphaerese>
3299	3300	<elision3>	<elision3>
3299	3300	<>	<elision3>
3299	3300	<elision2>	<elision2>
3299	3300	<>	<elision2>
3299	3300	<elision1>	<elision1>
3299	3300	<>	<elision1>
3299	3318	.	υ
3299	3268	s	υ
3299	3318	.	u
3299	3268	s	u
3299	3306	.	κ
3299	3255	s	κ
3299	3255	s	k
3299	3312	s	U
3299	3264	s	K
3299	3318	.	α
3299	3268	s	α
3299	3318	.	a
3299	3268	s	a
3299	3315	s	A
3299	3255	s	λ
3299	3255	s	l
3299	3270	s	L
3299	3261	<1m>	<>
3300	3298	.	.
3300	3298	<~>	<~>
3300	3298	<split-s>	<split-s>
3300	3298	<split-h>	<split-h>
3300	3298	<name2>	<name2>
3300	3301	<aphaerese>	<aphaerese>
3300	3298	<>	<aphaerese>
3300	3298	<elision3>	<elision3>
3300	3298	<>	<elision3>
3300	3298	<elision2>	<elision2>
3300	3298	<>	<elision2>
3300	3298	<elision1>	<elision1>
3300	3298	<>	<elision1>
3300	3316	.	υ
3300	3269	s	υ
3300	3316	.	u
3300	3269	s	u
3300	3304	.	κ
3300	3256	s	κ
3300	3256	s	k
3300	3310	s	U
3300	3265	s	K
3300	3316	.	α
3300	3269	s	α
3300	3316	.	a
3300	3269	s	a
3300	3313	s	A
3300	3256	s	λ
3300	3256	s	l
3300	3271	s	L
3300	3262	<1m>	<>
3301	3298	.	.
3301	3298	<~>	<~>
3301	3298	<split-s>	<split-s>
3301	3298	<split-h>	<split-h>
3301	3298	<name2>	<name2>
3301	3302	<>	<name>
3301	3301	<aphaerese>	<aphaerese>
3301	3301	<>	<aphaerese>
3301	3298	<elision3>	<elision3>
3301	3301	<>	<elision3>
3301	3298	<elision2>	<elision2>
3301	3301	<>	<elision2>
3301	3298	<elision1>	<elision1>
3301	3301	<>	<elision1>
3301	3298	.	υ
3301	3298	.	u
3301	3304	.	κ
3301	3256	s	κ
3301	3256	s	k
3301	3310	s	U
3301	3265	s	K
3301	3298	.	α
3301	3298	.	a
3301	3313	s	A
3301	3256	s	λ
3301	3256	s	l
3301	3271	s	L
3301	3263	<1m>	<>
3302	3300	.	.
3302	3300	<~>	<~>
3302	3300	<split-s>	<split-s>
3302	3300	<split-h>	<split-h>
3302	3300	<name2>	<name2>
3302	3303	<aphaerese>	<aphaerese>
3302	3303	<>	<aphaerese>
3302	3300	<elision3>	<elision3>
3302	3303	<>	<elision3>
3302	3300	<elision2>	<elision2>
3302	3303	<>	<elision2>
3302	3300	<elision1>	<elision1>
3302	3303	<>	<elision1>
3302	3300	.	υ
3302	3300	.	u
3302	3306	.	κ
3302	3255	s	κ
3302	3255	s	k
3302	3312	s	U
3302	3264	s	K
3302	3300	.	α
3302	3300	.	a
3302	3315	s	A
3302	3255	s	λ
3302	3255	s	l
3302	3270	s	L
3302	3261	<1m>	<>
3303	3298	.	.
3303	3298	<~>	<~>
3303	3298	<split-s>	<split-s>
3303	3298	<split-h>	<split-h>
3303	3298	<name2>	<name2>
3303	3301	<aphaerese>	<aphaerese>
3303	3301	<>	<aphaerese>
3303	3298	<elision3>	<elision3>
3303	3301	<>	<elision3>
3303	3298	<elision2>	<elision2>
3303	3301	<>	<elision2>
3303	3298	<elision1>	<elision1>
3303	3301	<>	<elision1>
3303	3298	.	υ
3303	3298	.	u
3303	3304	.	κ
3303	3256	s	κ
3303	3256	s	k
3303	3310	s	U
3303	3265	s	K
3303	3298	.	α
3303	3298	.	a
3303	3313	s	A
3303	3256	s	λ
3303	3256	s	l
3303	3271	s	L
3303	3262	<1m>	<>
3304	3305	<>	<name>
3304	3304	<>	<aphaerese>
3304	3307	<elision3>	<elision3>
3304	3304	<>	<elision3>
3304	3307	<elision2>	<elision2>
3304	3304	<>	<elision2>
3304	3307	<elision1>	<elision1>
3304	3304	<>	<elision1>
3305	3306	<>	<aphaerese>
3305	3309	<elision3>	<elision3>
3305	3306	<>	<elision3>
3305	3309	<elision2>	<elision2>
3305	3306	<>	<elision2>
3305	3309	<elision1>	<elision1>
3305	3306	<>	<elision1>
3306	3304	<>	<aphaerese>
3306	3307	<elision3>	<elision3>
3306	3304	<>	<elision3>
3306	3307	<elision2>	<elision2>
3306	3304	<>	<elision2>
3306	3307	<elision1>	<elision1>
3306	3304	<>	<elision1>
3307	3308	<>	<name>
3307	3307	<>	<aphaerese>
3307	3307	<>	<elision3>
3307	3307	<>	<elision2>
3307	3307	<>	<elision1>
3307	3269	s	κ
3307	3269	s	k
3307	3265	s	K
3307	3269	s	λ
3307	3269	s	l
3307	3271	s	L
3308	3309	<>	<aphaerese>
3308	3309	<>	<elision3>
3308	3309	<>	<elision2>
3308	3309	<>	<elision1>
3308	3268	s	κ
3308	3268	s	k
3308	3264	s	K
3308	3268	s	λ
3308	3268	s	l
3308	3270	s	L
3309	3307	<>	<aphaerese>
3309	3307	<>	<elision3>
3309	3307	<>	<elision2>
3309	3307	<>	<elision1>
3309	3269	s	κ
3309	3269	s	k
3309	3265	s	K
3309	3269	s	λ
3309	3269	s	l
3309	3271	s	L
3310	3311	<>	<name>
3310	3310	<>	<aphaerese>
3310	3310	<>	<elision3>
3310	3310	<>	<elision2>
3310	3310	<>	<elision1>
3310	3269	<U2kl>	<>
3311	3312	<>	<aphaerese>
3311	3312	<>	<elision3>
3311	3312	<>	<elision2>
3311	3312	<>	<elision1>
3311	3267	<U2kl>	<>
3312	3310	<>	<aphaerese>
3312	3310	<>	<elision3>
3312	3310	<>	<elision2>
3312	3310	<>	<elision1>
3312	3268	<U2kl>	<>
3313	3314	<>	<name>
3313	3313	<>	<aphaerese>
3313	3313	<>	<elision3>
3313	3313	<>	<elision2>
3313	3313	<>	<elision1>
3313	3269	<A2kl>	<>
3314	3315	<>	<aphaerese>
3314	3315	<>	<elision3>
3314	3315	<>	<elision2>
3314	3315	<>	<elision1>
3314	3267	<A2kl>	<>
3315	3313	<>	<aphaerese>
3315	3313	<>	<elision3>
3315	3313	<>	<elision2>
3315	3313	<>	<elision1>
3315	3268	<A2kl>	<>
3316	3317	<>	<name>
3316	3316	<>	<aphaerese>
3316	3298	<elision3>	<elision3>
3316	3316	<>	<elision3>
3316	3298	<elision2>	<elision2>
3316	3316	<>	<elision2>
3316	3298	<elision1>	<elision1>
3316	3316	<>	<elision1>
3317	3318	<>	<aphaerese>
3317	3300	<elision3>	<elision3>
3317	3318	<>	<elision3>
3317	3300	<elision2>	<elision2>
3317	3318	<>	<elision2>
3317	3300	<elision1>	<elision1>
3317	3318	<>	<elision1>
3318	3316	<>	<aphaerese>
3318	3298	<elision3>	<elision3>
3318	3316	<>	<elision3>
3318	3298	<elision2>	<elision2>
3318	3316	<>	<elision2>
3318	3298	<elision1>	<elision1>
3318	3316	<>	<elision1>
3319	3298	.	.
3319	3298	<~>	<~>
3319	3298	<split-s>	<split-s>
3319	3298	<split-h>	<split-h>
3319	3298	<name2>	<name2>
3319	3320	<>	<name>
3319	3301	<aphaerese>	<aphaerese>
3319	3319	<>	<aphaerese>
3319	3322	<elision3>	<elision3>
3319	3319	<>	<elision3>
3319	3322	<elision2>	<elision2>
3319	3319	<>	<elision2>
3319	3322	<elision1>	<elision1>
3319	3319	<>	<elision1>
3319	3316	.	υ
3319	3269	s	υ
3319	3316	.	u
3319	3269	s	u
3319	3256	s	κ
3319	3256	s	k
3319	3310	s	U
3319	3265	s	K
3319	3316	.	α
3319	3269	s	α
3319	3316	.	a
3319	3269	s	a
3319	3313	s	A
3319	3256	s	λ
3319	3256	s	l
3319	3271	s	L
3319	3263	<1m>	<>
3320	3300	.	.
3320	3300	<~>	<~>
3320	3300	<split-s>	<split-s>
3320	3300	<split-h>	<split-h>
3320	3300	<name2>	<name2>
3320	3303	<aphaerese>	<aphaerese>
3320	3297	<>	<aphaerese>
3320	3321	<elision3>	<elision3>
3320	3297	<>	<elision3>
3320	3321	<elision2>	<elision2>
3320	3297	<>	<elision2>
3320	3321	<elision1>	<elision1>
3320	3297	<>	<elision1>
3320	3318	.	υ
3320	3268	s	υ
3320	3318	.	u
3320	3268	s	u
3320	3255	s	κ
3320	3255	s	k
3320	3312	s	U
3320	3264	s	K
3320	3318	.	α
3320	3268	s	α
3320	3318	.	a
3320	3268	s	a
3320	3315	s	A
3320	3255	s	λ
3320	3255	s	l
3320	3270	s	L
3320	3261	<1m>	<>
3321	3298	.	.
3321	3298	<~>	<~>
3321	3298	<split-s>	<split-s>
3321	3298	<split-h>	<split-h>
3321	3298	<name2>	<name2>
3321	3301	<aphaerese>	<aphaerese>
3321	3322	<>	<aphaerese>
3321	3298	<elision3>	<elision3>
3321	3322	<>	<elision3>
3321	3298	<elision2>	<elision2>
3321	3322	<>	<elision2>
3321	3298	<elision1>	<elision1>
3321	3322	<>	<elision1>
3321	3316	.	υ
3321	3269	s	υ
3321	3316	.	u
3321	3269	s	u
3321	3304	.	κ
3321	3325	s	κ
3321	3325	s	k
3321	3310	s	U
3321	3316	.	α
3321	3269	s	α
3321	3316	.	a
3321	3269	s	a
3321	3313	s	A
3321	3325	s	λ
3321	3325	s	l
3321	3262	<1m>	<>
3322	3298	.	.
3322	3298	<~>	<~>
3322	3298	<split-s>	<split-s>
3322	3298	<split-h>	<split-h>
3322	3298	<name2>	<name2>
3322	3323	<>	<name>
3322	3301	<aphaerese>	<aphaerese>
3322	3322	<>	<aphaerese>
3322	3298	<elision3>	<elision3>
3322	3322	<>	<elision3>
3322	3298	<elision2>	<elision2>
3322	3322	<>	<elision2>
3322	3298	<elision1>	<elision1>
3322	3322	<>	<elision1>
3322	3316	.	υ
3322	3269	s	υ
3322	3316	.	u
3322	3269	s	u
3322	3304	.	κ
3322	3325	s	κ
3322	3325	s	k
3322	3310	s	U
3322	3316	.	α
3322	3269	s	α
3322	3316	.	a
3322	3269	s	a
3322	3313	s	A
3322	3325	s	λ
3322	3325	s	l
3322	3263	<1m>	<>
3323	3300	.	.
3323	3300	<~>	<~>
3323	3300	<split-s>	<split-s>
3323	3300	<split-h>	<split-h>
3323	3300	<name2>	<name2>
3323	3303	<aphaerese>	<aphaerese>
3323	3321	<>	<aphaerese>
3323	3300	<elision3>	<elision3>
3323	3321	<>	<elision3>
3323	3300	<elision2>	<elision2>
3323	3321	<>	<elision2>
3323	3300	<elision1>	<elision1>
3323	3321	<>	<elision1>
3323	3318	.	υ
3323	3268	s	υ
3323	3318	.	u
3323	3268	s	u
3323	3306	.	κ
3323	3324	s	κ
3323	3324	s	k
3323	3312	s	U
3323	3318	.	α
3323	3268	s	α
3323	3318	.	a
3323	3268	s	a
3323	3315	s	A
3323	3324	s	λ
3323	3324	s	l
3323	3261	<1m>	<>
3324	3325	<>	<aphaerese>
3324	3325	<>	<elision3>
3324	3325	<>	<elision2>
3324	3325	<>	<elision1>
3324	3262	<2m>	<>
3325	3326	<>	<name>
3325	3325	<>	<aphaerese>
3325	3325	<>	<elision3>
3325	3325	<>	<elision2>
3325	3325	<>	<elision1>
3325	3263	<2m>	<>
3326	3324	<>	<aphaerese>
3326	3324	<>	<elision3>
3326	3324	<>	<elision2>
3326	3324	<>	<elision1>
3326	3261	<2m>	<>
3327	3328	.	.
3327	3328	<~>	<~>
3327	3328	<split-s>	<split-s>
3327	3328	<split-h>	<split-h>
3327	3328	<name2>	<name2>
3327	3331	<aphaerese>	<aphaerese>
3327	3337	<>	<aphaerese>
3327	3340	<elision3>	<elision3>
3327	3337	<>	<elision3>
3327	3340	<elision2>	<elision2>
3327	3337	<>	<elision2>
3327	3340	<elision1>	<elision1>
3327	3337	<>	<elision1>
3327	3334	.	υ
3327	3269	s	υ
3327	3334	.	u
3327	3269	s	u
3327	3277	s	κ
3327	3280	H	κ
3327	3277	s	k
3327	3280	H	k
3327	3310	s	U
3327	3265	s	K
3327	3280	H	K
3327	3334	.	α
3327	3269	s	α
3327	3334	.	a
3327	3269	s	a
3327	3313	s	A
3327	3277	s	λ
3327	3280	H	λ
3327	3277	s	l
3327	3280	H	l
3327	3271	s	L
3327	3280	H	L
3327	3262	<1m>	<>
3328	3328	.	.
3328	3328	<~>	<~>
3328	3328	<split-s>	<split-s>
3328	3328	<split-h>	<split-h>
3328	3328	<name2>	<name2>
3328	3329	<>	<name>
3328	3331	<aphaerese>	<aphaerese>
3328	3328	<>	<aphaerese>
3328	3328	<elision3>	<elision3>
3328	3328	<>	<elision3>
3328	3328	<elision2>	<elision2>
3328	3328	<>	<elision2>
3328	3328	<elision1>	<elision1>
3328	3328	<>	<elision1>
3328	3334	.	υ
3328	3269	s	υ
3328	3334	.	u
3328	3269	s	u
3328	3304	.	κ
3328	3277	s	κ
3328	3280	H	κ
3328	3277	s	k
3328	3280	H	k
3328	3310	s	U
3328	3265	s	K
3328	3280	H	K
3328	3334	.	α
3328	3269	s	α
3328	3334	.	a
3328	3269	s	a
3328	3313	s	A
3328	3277	s	λ
3328	3280	H	λ
3328	3277	s	l
3328	3280	H	l
3328	3271	s	L
3328	3280	H	L
3328	3263	<1m>	<>
3329	3330	.	.
3329	3330	<~>	<~>
3329	3330	<split-s>	<split-s>
3329	3330	<split-h>	<split-h>
3329	3330	<name2>	<name2>
3329	3333	<aphaerese>	<aphaerese>
3329	3330	<>	<aphaerese>
3329	3330	<elision3>	<elision3>
3329	3330	<>	<elision3>
3329	3330	<elision2>	<elision2>
3329	3330	<>	<elision2>
3329	3330	<elision1>	<elision1>
3329	3330	<>	<elision1>
3329	3336	.	υ
3329	3268	s	υ
3329	3336	.	u
3329	3268	s	u
3329	3306	.	κ
3329	3276	s	κ
3329	3279	H	κ
3329	3276	s	k
3329	3279	H	k
3329	3312	s	U
3329	3264	s	K
3329	3279	H	K
3329	3336	.	α
3329	3268	s	α
3329	3336	.	a
3329	3268	s	a
3329	3315	s	A
3329	3276	s	λ
3329	3279	H	λ
3329	3276	s	l
3329	3279	H	l
3329	3270	s	L
3329	3279	H	L
3329	3261	<1m>	<>
3330	3328	.	.
3330	3328	<~>	<~>
3330	3328	<split-s>	<split-s>
3330	3328	<split-h>	<split-h>
3330	3328	<name2>	<name2>
3330	3331	<aphaerese>	<aphaerese>
3330	3328	<>	<aphaerese>
3330	3328	<elision3>	<elision3>
3330	3328	<>	<elision3>
3330	3328	<elision2>	<elision2>
3330	3328	<>	<elision2>
3330	3328	<elision1>	<elision1>
3330	3328	<>	<elision1>
3330	3334	.	υ
3330	3269	s	υ
3330	3334	.	u
3330	3269	s	u
3330	3304	.	κ
3330	3277	s	κ
3330	3280	H	κ
3330	3277	s	k
3330	3280	H	k
3330	3310	s	U
3330	3265	s	K
3330	3280	H	K
3330	3334	.	α
3330	3269	s	α
3330	3334	.	a
3330	3269	s	a
3330	3313	s	A
3330	3277	s	λ
3330	3280	H	λ
3330	3277	s	l
3330	3280	H	l
3330	3271	s	L
3330	3280	H	L
3330	3262	<1m>	<>
3331	3328	.	.
3331	3328	<~>	<~>
3331	3328	<split-s>	<split-s>
3331	3328	<split-h>	<split-h>
3331	3328	<name2>	<name2>
3331	3332	<>	<name>
3331	3331	<aphaerese>	<aphaerese>
3331	3331	<>	<aphaerese>
3331	3328	<elision3>	<elision3>
3331	3331	<>	<elision3>
3331	3328	<elision2>	<elision2>
3331	3331	<>	<elision2>
3331	3328	<elision1>	<elision1>
3331	3331	<>	<elision1>
3331	3328	.	υ
3331	3328	.	u
3331	3304	.	κ
3331	3277	s	κ
3331	3280	H	κ
3331	3277	s	k
3331	3280	H	k
3331	3310	s	U
3331	3265	s	K
3331	3280	H	K
3331	3328	.	α
3331	3328	.	a
3331	3313	s	A
3331	3277	s	λ
3331	3280	H	λ
3331	3277	s	l
3331	3280	H	l
3331	3271	s	L
3331	3280	H	L
3331	3263	<1m>	<>
3332	3330	.	.
3332	3330	<~>	<~>
3332	3330	<split-s>	<split-s>
3332	3330	<split-h>	<split-h>
3332	3330	<name2>	<name2>
3332	3333	<aphaerese>	<aphaerese>
3332	3333	<>	<aphaerese>
3332	3330	<elision3>	<elision3>
3332	3333	<>	<elision3>
3332	3330	<elision2>	<elision2>
3332	3333	<>	<elision2>
3332	3330	<elision1>	<elision1>
3332	3333	<>	<elision1>
3332	3330	.	υ
3332	3330	.	u
3332	3306	.	κ
3332	3276	s	κ
3332	3279	H	κ
3332	3276	s	k
3332	3279	H	k
3332	3312	s	U
3332	3264	s	K
3332	3279	H	K
3332	3330	.	α
3332	3330	.	a
3332	3315	s	A
3332	3276	s	λ
3332	3279	H	λ
3332	3276	s	l
3332	3279	H	l
3332	3270	s	L
3332	3279	H	L
3332	3261	<1m>	<>
3333	3328	.	.
3333	3328	<~>	<~>
3333	3328	<split-s>	<split-s>
3333	3328	<split-h>	<split-h>
3333	3328	<name2>	<name2>
3333	3331	<aphaerese>	<aphaerese>
3333	3331	<>	<aphaerese>
3333	3328	<elision3>	<elision3>
3333	3331	<>	<elision3>
3333	3328	<elision2>	<elision2>
3333	3331	<>	<elision2>
3333	3328	<elision1>	<elision1>
3333	3331	<>	<elision1>
3333	3328	.	υ
3333	3328	.	u
3333	3304	.	κ
3333	3277	s	κ
3333	3280	H	κ
3333	3277	s	k
3333	3280	H	k
3333	3310	s	U
3333	3265	s	K
3333	3280	H	K
3333	3328	.	α
3333	3328	.	a
3333	3313	s	A
3333	3277	s	λ
3333	3280	H	λ
3333	3277	s	l
3333	3280	H	l
3333	3271	s	L
3333	3280	H	L
3333	3262	<1m>	<>
3334	3335	<>	<name>
3334	3334	<>	<aphaerese>
3334	3328	<elision3>	<elision3>
3334	3334	<>	<elision3>
3334	3328	<elision2>	<elision2>
3334	3334	<>	<elision2>
3334	3328	<elision1>	<elision1>
3334	3334	<>	<elision1>
3335	3336	<>	<aphaerese>
3335	3330	<elision3>	<elision3>
3335	3336	<>	<elision3>
3335	3330	<elision2>	<elision2>
3335	3336	<>	<elision2>
3335	3330	<elision1>	<elision1>
3335	3336	<>	<elision1>
3336	3334	<>	<aphaerese>
3336	3328	<elision3>	<elision3>
3336	3334	<>	<elision3>
3336	3328	<elision2>	<elision2>
3336	3334	<>	<elision2>
3336	3328	<elision1>	<elision1>
3336	3334	<>	<elision1>
3337	3328	.	.
3337	3328	<~>	<~>
3337	3328	<split-s>	<split-s>
3337	3328	<split-h>	<split-h>
3337	3328	<name2>	<name2>
3337	3338	<>	<name>
3337	3331	<aphaerese>	<aphaerese>
3337	3337	<>	<aphaerese>
3337	3340	<elision3>	<elision3>
3337	3337	<>	<elision3>
3337	3340	<elision2>	<elision2>
3337	3337	<>	<elision2>
3337	3340	<elision1>	<elision1>
3337	3337	<>	<elision1>
3337	3334	.	υ
3337	3269	s	υ
3337	3334	.	u
3337	3269	s	u
3337	3277	s	κ
3337	3280	H	κ
3337	3277	s	k
3337	3280	H	k
3337	3310	s	U
3337	3265	s	K
3337	3280	H	K
3337	3334	.	α
3337	3269	s	α
3337	3334	.	a
3337	3269	s	a
3337	3313	s	A
3337	3277	s	λ
3337	3280	H	λ
3337	3277	s	l
3337	3280	H	l
3337	3271	s	L
3337	3280	H	L
3337	3263	<1m>	<>
3338	3330	.	.
3338	3330	<~>	<~>
3338	3330	<split-s>	<split-s>
3338	3330	<split-h>	<split-h>
3338	3330	<name2>	<name2>
3338	3333	<aphaerese>	<aphaerese>
3338	3327	<>	<aphaerese>
3338	3339	<elision3>	<elision3>
3338	3327	<>	<elision3>
3338	3339	<elision2>	<elision2>
3338	3327	<>	<elision2>
3338	3339	<elision1>	<elision1>
3338	3327	<>	<elision1>
3338	3336	.	υ
3338	3268	s	υ
3338	3336	.	u
3338	3268	s	u
3338	3276	s	κ
3338	3279	H	κ
3338	3276	s	k
3338	3279	H	k
3338	3312	s	U
3338	3264	s	K
3338	3279	H	K
3338	3336	.	α
3338	3268	s	α
3338	3336	.	a
3338	3268	s	a
3338	3315	s	A
3338	3276	s	λ
3338	3279	H	λ
3338	3276	s	l
3338	3279	H	l
3338	3270	s	L
3338	3279	H	L
3338	3261	<1m>	<>
3339	3328	.	.
3339	3328	<~>	<~>
3339	3328	<split-s>	<split-s>
3339	3328	<split-h>	<split-h>
3339	3328	<name2>	<name2>
3339	3331	<aphaerese>	<aphaerese>
3339	3340	<>	<aphaerese>
3339	3328	<elision3>	<elision3>
3339	3340	<>	<elision3>
3339	3328	<elision2>	<elision2>
3339	3340	<>	<elision2>
3339	3328	<elision1>	<elision1>
3339	3340	<>	<elision1>
3339	3334	.	υ
3339	3269	s	υ
3339	3334	.	u
3339	3269	s	u
3339	3304	.	κ
3339	3343	s	κ
3339	3280	H	κ
3339	3343	s	k
3339	3280	H	k
3339	3310	s	U
3339	3280	H	K
3339	3334	.	α
3339	3269	s	α
3339	3334	.	a
3339	3269	s	a
3339	3313	s	A
3339	3343	s	λ
3339	3280	H	λ
3339	3343	s	l
3339	3280	H	l
3339	3280	H	L
3339	3262	<1m>	<>
3340	3328	.	.
3340	3328	<~>	<~>
3340	3328	<split-s>	<split-s>
3340	3328	<split-h>	<split-h>
3340	3328	<name2>	<name2>
3340	3341	<>	<name>
3340	3331	<aphaerese>	<aphaerese>
3340	3340	<>	<aphaerese>
3340	3328	<elision3>	<elision3>
3340	3340	<>	<elision3>
3340	3328	<elision2>	<elision2>
3340	3340	<>	<elision2>
3340	3328	<elision1>	<elision1>
3340	3340	<>	<elision1>
3340	3334	.	υ
3340	3269	s	υ
3340	3334	.	u
3340	3269	s	u
3340	3304	.	κ
3340	3343	s	κ
3340	3280	H	κ
3340	3343	s	k
3340	3280	H	k
3340	3310	s	U
3340	3280	H	K
3340	3334	.	α
3340	3269	s	α
3340	3334	.	a
3340	3269	s	a
3340	3313	s	A
3340	3343	s	λ
3340	3280	H	λ
3340	3343	s	l
3340	3280	H	l
3340	3280	H	L
3340	3263	<1m>	<>
3341	3330	.	.
3341	3330	<~>	<~>
3341	3330	<split-s>	<split-s>
3341	3330	<split-h>	<split-h>
3341	3330	<name2>	<name2>
3341	3333	<aphaerese>	<aphaerese>
3341	3339	<>	<aphaerese>
3341	3330	<elision3>	<elision3>
3341	3339	<>	<elision3>
3341	3330	<elision2>	<elision2>
3341	3339	<>	<elision2>
3341	3330	<elision1>	<elision1>
3341	3339	<>	<elision1>
3341	3336	.	υ
3341	3268	s	υ
3341	3336	.	u
3341	3268	s	u
3341	3306	.	κ
3341	3342	s	κ
3341	3279	H	κ
3341	3342	s	k
3341	3279	H	k
3341	3312	s	U
3341	3279	H	K
3341	3336	.	α
3341	3268	s	α
3341	3336	.	a
3341	3268	s	a
3341	3315	s	A
3341	3342	s	λ
3341	3279	H	λ
3341	3342	s	l
3341	3279	H	l
3341	3279	H	L
3341	3261	<1m>	<>
3342	3343	<>	<aphaerese>
3342	3343	<>	<elision3>
3342	3343	<>	<elision2>
3342	3343	<>	<elision1>
3342	3262	<w>	<>
3343	3344	<>	<name>
3343	3343	<>	<aphaerese>
3343	3343	<>	<elision3>
3343	3343	<>	<elision2>
3343	3343	<>	<elision1>
3343	3263	<w>	<>
3344	3342	<>	<aphaerese>
3344	3342	<>	<elision3>
3344	3342	<>	<elision2>
3344	3342	<>	<elision1>
3344	3261	<w>	<>
3345	3346	<>	<aphaerese>
3345	3346	<>	<elision3>
3345	3346	<>	<elision2>
3345	3346	<>	<elision1>
3345	3334	.	κ
3345	3334	.	λ
3346	3347	<>	<name>
3346	3346	<>	<aphaerese>
3346	3346	<>	<elision3>
3346	3346	<>	<elision2>
3346	3346	<>	<elision1>
3346	3334	.	κ
3346	3334	.	λ
3347	3345	<>	<aphaerese>
3347	3345	<>	<elision3>
3347	3345	<>	<elision2>
3347	3345	<>	<elision1>
3347	3336	.	κ
3347	3336	.	λ
3348	3349	<>	<name>
3348	3348	<>	<aphaerese>
3348	3348	<>	<elision3>
3348	3348	<>	<elision2>
3348	3348	<>	<elision1>
3348	3352	<k2K>	<>
3348	3355	<k2L>	<>
3348	3346	<l2L>	<>
3349	3350	<>	<aphaerese>
3349	3350	<>	<elision3>
3349	3350	<>	<elision2>
3349	3350	<>	<elision1>
3349	3353	<k2K>	<>
3349	3356	<k2L>	<>
3349	3347	<l2L>	<>
3350	3348	<>	<aphaerese>
3350	3348	<>	<elision3>
3350	3348	<>	<elision2>
3350	3348	<>	<elision1>
3350	3351	<k2K>	<>
3350	3354	<k2L>	<>
3350	3345	<l2L>	<>
3351	3298	.	.
3351	3298	<~>	<~>
3351	3298	<split-s>	<split-s>
3351	3298	<split-h>	<split-h>
3351	3298	<name2>	<name2>
3351	3301	<aphaerese>	<aphaerese>
3351	3352	<>	<aphaerese>
3351	3298	<elision3>	<elision3>
3351	3352	<>	<elision3>
3351	3298	<elision2>	<elision2>
3351	3352	<>	<elision2>
3351	3298	<elision1>	<elision1>
3351	3352	<>	<elision1>
3351	3316	.	υ
3351	3269	s	υ
3351	3316	.	u
3351	3269	s	u
3351	3256	s	κ
3351	3256	s	k
3351	3310	s	U
3351	3265	s	K
3351	3316	.	α
3351	3269	s	α
3351	3316	.	a
3351	3269	s	a
3351	3313	s	A
3351	3256	s	λ
3351	3256	s	l
3351	3271	s	L
3351	3262	<1m>	<>
3352	3298	.	.
3352	3298	<~>	<~>
3352	3298	<split-s>	<split-s>
3352	3298	<split-h>	<split-h>
3352	3298	<name2>	<name2>
3352	3353	<>	<name>
3352	3301	<aphaerese>	<aphaerese>
3352	3352	<>	<aphaerese>
3352	3298	<elision3>	<elision3>
3352	3352	<>	<elision3>
3352	3298	<elision2>	<elision2>
3352	3352	<>	<elision2>
3352	3298	<elision1>	<elision1>
3352	3352	<>	<elision1>
3352	3316	.	υ
3352	3269	s	υ
3352	3316	.	u
3352	3269	s	u
3352	3256	s	κ
3352	3256	s	k
3352	3310	s	U
3352	3265	s	K
3352	3316	.	α
3352	3269	s	α
3352	3316	.	a
3352	3269	s	a
3352	3313	s	A
3352	3256	s	λ
3352	3256	s	l
3352	3271	s	L
3352	3263	<1m>	<>
3353	3300	.	.
3353	3300	<~>	<~>
3353	3300	<split-s>	<split-s>
3353	3300	<split-h>	<split-h>
3353	3300	<name2>	<name2>
3353	3303	<aphaerese>	<aphaerese>
3353	3351	<>	<aphaerese>
3353	3300	<elision3>	<elision3>
3353	3351	<>	<elision3>
3353	3300	<elision2>	<elision2>
3353	3351	<>	<elision2>
3353	3300	<elision1>	<elision1>
3353	3351	<>	<elision1>
3353	3318	.	υ
3353	3268	s	υ
3353	3318	.	u
3353	3268	s	u
3353	3255	s	κ
3353	3255	s	k
3353	3312	s	U
3353	3264	s	K
3353	3318	.	α
3353	3268	s	α
3353	3318	.	a
3353	3268	s	a
3353	3315	s	A
3353	3255	s	λ
3353	3255	s	l
3353	3270	s	L
3353	3261	<1m>	<>
3354	3328	.	.
3354	3328	<~>	<~>
3354	3328	<split-s>	<split-s>
3354	3328	<split-h>	<split-h>
3354	3328	<name2>	<name2>
3354	3331	<aphaerese>	<aphaerese>
3354	3355	<>	<aphaerese>
3354	3328	<elision3>	<elision3>
3354	3355	<>	<elision3>
3354	3328	<elision2>	<elision2>
3354	3355	<>	<elision2>
3354	3328	<elision1>	<elision1>
3354	3355	<>	<elision1>
3354	3334	.	υ
3354	3269	s	υ
3354	3334	.	u
3354	3269	s	u
3354	3277	s	κ
3354	3280	H	κ
3354	3277	s	k
3354	3280	H	k
3354	3310	s	U
3354	3265	s	K
3354	3280	H	K
3354	3334	.	α
3354	3269	s	α
3354	3334	.	a
3354	3269	s	a
3354	3313	s	A
3354	3277	s	λ
3354	3280	H	λ
3354	3277	s	l
3354	3280	H	l
3354	3271	s	L
3354	3280	H	L
3354	3262	<1m>	<>
3355	3328	.	.
3355	3328	<~>	<~>
3355	3328	<split-s>	<split-s>
3355	3328	<split-h>	<split-h>
3355	3328	<name2>	<name2>
3355	3356	<>	<name>
3355	3331	<aphaerese>	<aphaerese>
3355	3355	<>	<aphaerese>
3355	3328	<elision3>	<elision3>
3355	3355	<>	<elision3>
3355	3328	<elision2>	<elision2>
3355	3355	<>	<elision2>
3355	3328	<elision1>	<elision1>
3355	3355	<>	<elision1>
3355	3334	.	υ
3355	3269	s	υ
3355	3334	.	u
3355	3269	s	u
3355	3277	s	κ
3355	3280	H	κ
3355	3277	s	k
3355	3280	H	k
3355	3310	s	U
3355	3265	s	K
3355	3280	H	K
3355	3334	.	α
3355	3269	s	α
3355	3334	.	a
3355	3269	s	a
3355	3313	s	A
3355	3277	s	λ
3355	3280	H	λ
3355	3277	s	l
3355	3280	H	l
3355	3271	s	L
3355	3280	H	L
3355	3263	<1m>	<>
3356	3330	.	.
3356	3330	<~>	<~>
3356	3330	<split-s>	<split-s>
3356	3330	<split-h>	<split-h>
3356	3330	<name2>	<name2>
3356	3333	<aphaerese>	<aphaerese>
3356	3354	<>	<aphaerese>
3356	3330	<elision3>	<elision3>
3356	3354	<>	<elision3>
3356	3330	<elision2>	<elision2>
3356	3354	<>	<elision2>
3356	3330	<elision1>	<elision1>
3356	3354	<>	<elision1>
3356	3336	.	υ
3356	3268	s	υ
3356	3336	.	u
3356	3268	s	u
3356	3276	s	κ
3356	3279	H	κ
3356	3276	s	k
3356	3279	H	k
3356	3312	s	U
3356	3264	s	K
3356	3279	H	K
3356	3336	.	α
3356	3268	s	α
3356	3336	.	a
3356	3268	s	a
3356	3315	s	A
3356	3276	s	λ
3356	3279	H	λ
3356	3276	s	l
3356	3279	H	l
3356	3270	s	L
3356	3279	H	L
3356	3261	<1m>	<>
3357	3298	.	.
3357	3298	<~>	<~>
3357	3298	<split-s>	<split-s>
3357	3298	<split-h>	<split-h>
3357	3298	<name2>	<name2>
3357	3358	<>	<name>
3357	3301	<aphaerese>	<aphaerese>
3357	3357	<>	<aphaerese>
3357	3298	<elision3>	<elision3>
3357	3357	<>	<elision3>
3357	3298	<elision2>	<elision2>
3357	3357	<>	<elision2>
3357	3298	<elision1>	<elision1>
3357	3357	<>	<elision1>
3357	3316	.	υ
3357	3269	s	υ
3357	3316	.	u
3357	3269	s	u
3357	3304	.	κ
3357	3256	s	κ
3357	3256	s	k
3357	3310	s	U
3357	3265	s	K
3357	3316	.	α
3357	3269	s	α
3357	3316	.	a
3357	3269	s	a
3357	3313	s	A
3357	3256	s	λ
3357	3256	s	l
3357	3271	s	L
3357	3263	<1m>	<>
3357	3328	<U2L>	<>
3358	3300	.	.
3358	3300	<~>	<~>
3358	3300	<split-s>	<split-s>
3358	3300	<split-h>	<split-h>
3358	3300	<name2>	<name2>
3358	3303	<aphaerese>	<aphaerese>
3358	3359	<>	<aphaerese>
3358	3300	<elision3>	<elision3>
3358	3359	<>	<elision3>
3358	3300	<elision2>	<elision2>
3358	3359	<>	<elision2>
3358	3300	<elision1>	<elision1>
3358	3359	<>	<elision1>
3358	3318	.	υ
3358	3268	s	υ
3358	3318	.	u
3358	3268	s	u
3358	3306	.	κ
3358	3255	s	κ
3358	3255	s	k
3358	3312	s	U
3358	3264	s	K
3358	3318	.	α
3358	3268	s	α
3358	3318	.	a
3358	3268	s	a
3358	3315	s	A
3358	3255	s	λ
3358	3255	s	l
3358	3270	s	L
3358	3261	<1m>	<>
3358	3329	<U2L>	<>
3359	3298	.	.
3359	3298	<~>	<~>
3359	3298	<split-s>	<split-s>
3359	3298	<split-h>	<split-h>
3359	3298	<name2>	<name2>
3359	3301	<aphaerese>	<aphaerese>
3359	3357	<>	<aphaerese>
3359	3298	<elision3>	<elision3>
3359	3357	<>	<elision3>
3359	3298	<elision2>	<elision2>
3359	3357	<>	<elision2>
3359	3298	<elision1>	<elision1>
3359	3357	<>	<elision1>
3359	3316	.	υ
3359	3269	s	υ
3359	3316	.	u
3359	3269	s	u
3359	3304	.	κ
3359	3256	s	κ
3359	3256	s	k
3359	3310	s	U
3359	3265	s	K
3359	3316	.	α
3359	3269	s	α
3359	3316	.	a
3359	3269	s	a
3359	3313	s	A
3359	3256	s	λ
3359	3256	s	l
3359	3271	s	L
3359	3262	<1m>	<>
3359	3330	<U2L>	<>
3360	3298	.	.
3360	3298	<~>	<~>
3360	3298	<split-s>	<split-s>
3360	3298	<split-h>	<split-h>
3360	3298	<name2>	<name2>
3360	3361	<name2>	<name>
3360	3362	<>	<name>
3360	3301	<aphaerese>	<aphaerese>
3360	3364	<>	<aphaerese>
3360	3298	<elision3>	<elision3>
3360	3364	<>	<elision3>
3360	3298	<elision2>	<elision2>
3360	3364	<>	<elision2>
3360	3298	<elision1>	<elision1>
3360	3364	<>	<elision1>
3360	3316	.	υ
3360	3269	s	υ
3360	3316	.	u
3360	3269	s	u
3360	3334	.	κ
3360	3256	s	κ
3360	3256	s	k
3360	3310	s	U
3360	3265	s	K
3360	3316	.	α
3360	3269	s	α
3360	3316	.	a
3360	3269	s	a
3360	3313	s	A
3360	3334	.	λ
3360	3256	s	λ
3360	3256	s	l
3360	3271	s	L
3360	3263	<1m>	<>
3360	3365	<k2K>	<>
3360	3366	<k2L>	<>
3360	3368	<K2L>	<>
3361	3264	s	k
3361	3270	s	l
3362	3300	.	.
3362	3300	<~>	<~>
3362	3300	<split-s>	<split-s>
3362	3300	<split-h>	<split-h>
3362	3300	<name2>	<name2>
3362	3303	<aphaerese>	<aphaerese>
3362	3363	<>	<aphaerese>
3362	3300	<elision3>	<elision3>
3362	3363	<>	<elision3>
3362	3300	<elision2>	<elision2>
3362	3363	<>	<elision2>
3362	3300	<elision1>	<elision1>
3362	3363	<>	<elision1>
3362	3318	.	υ
3362	3268	s	υ
3362	3318	.	u
3362	3268	s	u
3362	3336	.	κ
3362	3255	s	κ
3362	3255	s	k
3362	3312	s	U
3362	3264	s	K
3362	3318	.	α
3362	3268	s	α
3362	3318	.	a
3362	3268	s	a
3362	3315	s	A
3362	3336	.	λ
3362	3255	s	λ
3362	3255	s	l
3362	3270	s	L
3362	3261	<1m>	<>
3362	3356	<K2L>	<>
3363	3298	.	.
3363	3298	<~>	<~>
3363	3298	<split-s>	<split-s>
3363	3298	<split-h>	<split-h>
3363	3298	<name2>	<name2>
3363	3301	<aphaerese>	<aphaerese>
3363	3364	<>	<aphaerese>
3363	3298	<elision3>	<elision3>
3363	3364	<>	<elision3>
3363	3298	<elision2>	<elision2>
3363	3364	<>	<elision2>
3363	3298	<elision1>	<elision1>
3363	3364	<>	<elision1>
3363	3316	.	υ
3363	3269	s	υ
3363	3316	.	u
3363	3269	s	u
3363	3334	.	κ
3363	3256	s	κ
3363	3256	s	k
3363	3310	s	U
3363	3265	s	K
3363	3316	.	α
3363	3269	s	α
3363	3316	.	a
3363	3269	s	a
3363	3313	s	A
3363	3334	.	λ
3363	3256	s	λ
3363	3256	s	l
3363	3271	s	L
3363	3262	<1m>	<>
3363	3354	<K2L>	<>
3364	3298	.	.
3364	3298	<~>	<~>
3364	3298	<split-s>	<split-s>
3364	3298	<split-h>	<split-h>
3364	3298	<name2>	<name2>
3364	3362	<>	<name>
3364	3301	<aphaerese>	<aphaerese>
3364	3364	<>	<aphaerese>
3364	3298	<elision3>	<elision3>
3364	3364	<>	<elision3>
3364	3298	<elision2>	<elision2>
3364	3364	<>	<elision2>
3364	3298	<elision1>	<elision1>
3364	3364	<>	<elision1>
3364	3316	.	υ
3364	3269	s	υ
3364	3316	.	u
3364	3269	s	u
3364	3334	.	κ
3364	3256	s	κ
3364	3256	s	k
3364	3310	s	U
3364	3265	s	K
3364	3316	.	α
3364	3269	s	α
3364	3316	.	a
3364	3269	s	a
3364	3313	s	A
3364	3334	.	λ
3364	3256	s	λ
3364	3256	s	l
3364	3271	s	L
3364	3263	<1m>	<>
3364	3355	<K2L>	<>
3365	3361	<name>	<name>
3366	3367	<name>	<name>
3367	3264	s	k
3367	3279	H	k
3367	3270	s	l
3367	3279	H	l
3368	3328	.	.
3368	3328	<~>	<~>
3368	3328	<split-s>	<split-s>
3368	3328	<split-h>	<split-h>
3368	3328	<name2>	<name2>
3368	3367	<name2>	<name>
3368	3356	<>	<name>
3368	3331	<aphaerese>	<aphaerese>
3368	3355	<>	<aphaerese>
3368	3328	<elision3>	<elision3>
3368	3355	<>	<elision3>
3368	3328	<elision2>	<elision2>
3368	3355	<>	<elision2>
3368	3328	<elision1>	<elision1>
3368	3355	<>	<elision1>
3368	3334	.	υ
3368	3269	s	υ
3368	3334	.	u
3368	3269	s	u
3368	3277	s	κ
3368	3280	H	κ
3368	3277	s	k
3368	3280	H	k
3368	3310	s	U
3368	3265	s	K
3368	3280	H	K
3368	3334	.	α
3368	3269	s	α
3368	3334	.	a
3368	3269	s	a
3368	3313	s	A
3368	3277	s	λ
3368	3280	H	λ
3368	3277	s	l
3368	3280	H	l
3368	3271	s	L
3368	3280	H	L
3368	3263	<1m>	<>
3369	3370	<>	<name>
3369	3369	<>	<aphaerese>
3369	3369	<>	<elision3>
3369	3369	<>	<elision2>
3369	3369	<>	<elision1>
3369	3373	<lambda2L>	<>
3370	3371	<>	<aphaerese>
3370	3371	<>	<elision3>
3370	3371	<>	<elision2>
3370	3371	<>	<elision1>
3370	3374	<lambda2L>	<>
3371	3369	<>	<aphaerese>
3371	3369	<>	<elision3>
3371	3369	<>	<elision2>
3371	3369	<>	<elision1>
3371	3372	<lambda2L>	<>
3372	3328	.	.
3372	3328	<~>	<~>
3372	3328	<split-s>	<split-s>
3372	3328	<split-h>	<split-h>
3372	3328	<name2>	<name2>
3372	3331	<aphaerese>	<aphaerese>
3372	3373	<>	<aphaerese>
3372	3328	<elision3>	<elision3>
3372	3373	<>	<elision3>
3372	3328	<elision2>	<elision2>
3372	3373	<>	<elision2>
3372	3328	<elision1>	<elision1>
3372	3373	<>	<elision1>
3372	3334	.	υ
3372	3269	s	υ
3372	3334	.	u
3372	3269	s	u
3372	3334	.	κ
3372	3277	s	κ
3372	3280	H	κ
3372	3277	s	k
3372	3280	H	k
3372	3310	s	U
3372	3265	s	K
3372	3280	H	K
3372	3334	.	α
3372	3269	s	α
3372	3334	.	a
3372	3269	s	a
3372	3313	s	A
3372	3334	.	λ
3372	3277	s	λ
3372	3280	H	λ
3372	3277	s	l
3372	3280	H	l
3372	3271	s	L
3372	3280	H	L
3372	3262	<1m>	<>
3373	3328	.	.
3373	3328	<~>	<~>
3373	3328	<split-s>	<split-s>
3373	3328	<split-h>	<split-h>
3373	3328	<name2>	<name2>
3373	3374	<>	<name>
3373	3331	<aphaerese>	<aphaerese>
3373	3373	<>	<aphaerese>
3373	3328	<elision3>	<elision3>
3373	3373	<>	<elision3>
3373	3328	<elision2>	<elision2>
3373	3373	<>	<elision2>
3373	3328	<elision1>	<elision1>
3373	3373	<>	<elision1>
3373	3334	.	υ
3373	3269	s	υ
3373	3334	.	u
3373	3269	s	u
3373	3334	.	κ
3373	3277	s	κ
3373	3280	H	κ
3373	3277	s	k
3373	3280	H	k
3373	3310	s	U
3373	3265	s	K
3373	3280	H	K
3373	3334	.	α
3373	3269	s	α
3373	3334	.	a
3373	3269	s	a
3373	3313	s	A
3373	3334	.	λ
3373	3277	s	λ
3373	3280	H	λ
3373	3277	s	l
3373	3280	H	l
3373	3271	s	L
3373	3280	H	L
3373	3263	<1m>	<>
3374	3330	.	.
3374	3330	<~>	<~>
3374	3330	<split-s>	<split-s>
3374	3330	<split-h>	<split-h>
3374	3330	<name2>	<name2>
3374	3333	<aphaerese>	<aphaerese>
3374	3372	<>	<aphaerese>
3374	3330	<elision3>	<elision3>
3374	3372	<>	<elision3>
3374	3330	<elision2>	<elision2>
3374	3372	<>	<elision2>
3374	3330	<elision1>	<elision1>
3374	3372	<>	<elision1>
3374	3336	.	υ
3374	3268	s	υ
3374	3336	.	u
3374	3268	s	u
3374	3336	.	κ
3374	3276	s	κ
3374	3279	H	κ
3374	3276	s	k
3374	3279	H	k
3374	3312	s	U
3374	3264	s	K
3374	3279	H	K
3374	3336	.	α
3374	3268	s	α
3374	3336	.	a
3374	3268	s	a
3374	3315	s	A
3374	3336	.	λ
3374	3276	s	λ
3374	3279	H	λ
3374	3276	s	l
3374	3279	H	l
3374	3270	s	L
3374	3279	H	L
3374	3261	<1m>	<>
3375	3376	<>	<name>
3375	3375	<>	<aphaerese>
3375	3375	<>	<elision3>
3375	3375	<>	<elision2>
3375	3375	<>	<elision1>
3375	3373	<l2L>	<>
3376	3377	<>	<aphaerese>
3376	3377	<>	<elision3>
3376	3377	<>	<elision2>
3376	3377	<>	<elision1>
3376	3374	<l2L>	<>
3377	3375	<>	<aphaerese>
3377	3375	<>	<elision3>
3377	3375	<>	<elision2>
3377	3375	<>	<elision1>
3377	3372	<l2L>	<>
3378	3328	.	.
3378	3328	<~>	<~>
3378	3328	<split-s>	<split-s>
3378	3328	<split-h>	<split-h>
3378	3328	<name2>	<name2>
3378	3367	<name2>	<name>
3378	3374	<>	<name>
3378	3331	<aphaerese>	<aphaerese>
3378	3373	<>	<aphaerese>
3378	3328	<elision3>	<elision3>
3378	3373	<>	<elision3>
3378	3328	<elision2>	<elision2>
3378	3373	<>	<elision2>
3378	3328	<elision1>	<elision1>
3378	3373	<>	<elision1>
3378	3334	.	υ
3378	3269	s	υ
3378	3334	.	u
3378	3269	s	u
3378	3334	.	κ
3378	3277	s	κ
3378	3280	H	κ
3378	3277	s	k
3378	3280	H	k
3378	3310	s	U
3378	3265	s	K
3378	3280	H	K
3378	3334	.	α
3378	3269	s	α
3378	3334	.	a
3378	3269	s	a
3378	3313	s	A
3378	3334	.	λ
3378	3277	s	λ
3378	3280	H	λ
3378	3277	s	l
3378	3280	H	l
3378	3271	s	L
3378	3280	H	L
3378	3263	<1m>	<>
3378	3366	<l2L>	<>
3379	3380	<>	<name>
3379	3379	<>	<aphaerese>
3379	3379	<>	<elision3>
3379	3379	<>	<elision2>
3379	3379	<>	<elision1>
3379	3383	<ypsilon2K>	<>
3379	3386	<ypsilon2L>	<>
3380	3381	<>	<aphaerese>
3380	3381	<>	<elision3>
3380	3381	<>	<elision2>
3380	3381	<>	<elision1>
3380	3384	<ypsilon2K>	<>
3380	3387	<ypsilon2L>	<>
3381	3379	<>	<aphaerese>
3381	3379	<>	<elision3>
3381	3379	<>	<elision2>
3381	3379	<>	<elision1>
3381	3382	<ypsilon2K>	<>
3381	3385	<ypsilon2L>	<>
3382	3298	.	.
3382	3298	<~>	<~>
3382	3298	<split-s>	<split-s>
3382	3298	<split-h>	<split-h>
3382	3298	<name2>	<name2>
3382	3301	<aphaerese>	<aphaerese>
3382	3383	<>	<aphaerese>
3382	3383	<>	<elision3>
3382	3383	<>	<elision2>
3382	3383	<>	<elision1>
3382	3316	.	υ
3382	3269	s	υ
3382	3316	.	u
3382	3269	s	u
3382	3304	.	κ
3382	3256	s	κ
3382	3256	s	k
3382	3310	s	U
3382	3265	s	K
3382	3316	.	α
3382	3269	s	α
3382	3316	.	a
3382	3269	s	a
3382	3313	s	A
3382	3256	s	λ
3382	3256	s	l
3382	3271	s	L
3382	3262	<1m>	<>
3383	3298	.	.
3383	3298	<~>	<~>
3383	3298	<split-s>	<split-s>
3383	3298	<split-h>	<split-h>
3383	3298	<name2>	<name2>
3383	3384	<>	<name>
3383	3301	<aphaerese>	<aphaerese>
3383	3383	<>	<aphaerese>
3383	3383	<>	<elision3>
3383	3383	<>	<elision2>
3383	3383	<>	<elision1>
3383	3316	.	υ
3383	3269	s	υ
3383	3316	.	u
3383	3269	s	u
3383	3304	.	κ
3383	3256	s	κ
3383	3256	s	k
3383	3310	s	U
3383	3265	s	K
3383	3316	.	α
3383	3269	s	α
3383	3316	.	a
3383	3269	s	a
3383	3313	s	A
3383	3256	s	λ
3383	3256	s	l
3383	3271	s	L
3383	3263	<1m>	<>
3384	3300	.	.
3384	3300	<~>	<~>
3384	3300	<split-s>	<split-s>
3384	3300	<split-h>	<split-h>
3384	3300	<name2>	<name2>
3384	3303	<aphaerese>	<aphaerese>
3384	3382	<>	<aphaerese>
3384	3382	<>	<elision3>
3384	3382	<>	<elision2>
3384	3382	<>	<elision1>
3384	3318	.	υ
3384	3268	s	υ
3384	3318	.	u
3384	3268	s	u
3384	3306	.	κ
3384	3255	s	κ
3384	3255	s	k
3384	3312	s	U
3384	3264	s	K
3384	3318	.	α
3384	3268	s	α
3384	3318	.	a
3384	3268	s	a
3384	3315	s	A
3384	3255	s	λ
3384	3255	s	l
3384	3270	s	L
3384	3261	<1m>	<>
3385	3328	.	.
3385	3328	<~>	<~>
3385	3328	<split-s>	<split-s>
3385	3328	<split-h>	<split-h>
3385	3328	<name2>	<name2>
3385	3331	<aphaerese>	<aphaerese>
3385	3386	<>	<aphaerese>
3385	3386	<>	<elision3>
3385	3386	<>	<elision2>
3385	3386	<>	<elision1>
3385	3334	.	υ
3385	3269	s	υ
3385	3334	.	u
3385	3269	s	u
3385	3304	.	κ
3385	3277	s	κ
3385	3280	H	κ
3385	3277	s	k
3385	3280	H	k
3385	3310	s	U
3385	3265	s	K
3385	3280	H	K
3385	3334	.	α
3385	3269	s	α
3385	3334	.	a
3385	3269	s	a
3385	3313	s	A
3385	3277	s	λ
3385	3280	H	λ
3385	3277	s	l
3385	3280	H	l
3385	3271	s	L
3385	3280	H	L
3385	3262	<1m>	<>
3386	3328	.	.
3386	3328	<~>	<~>
3386	3328	<split-s>	<split-s>
3386	3328	<split-h>	<split-h>
3386	3328	<name2>	<name2>
3386	3387	<>	<name>
3386	3331	<aphaerese>	<aphaerese>
3386	3386	<>	<aphaerese>
3386	3386	<>	<elision3>
3386	3386	<>	<elision2>
3386	3386	<>	<elision1>
3386	3334	.	υ
3386	3269	s	υ
3386	3334	.	u
3386	3269	s	u
3386	3304	.	κ
3386	3277	s	κ
3386	3280	H	κ
3386	3277	s	k
3386	3280	H	k
3386	3310	s	U
3386	3265	s	K
3386	3280	H	K
3386	3334	.	α
3386	3269	s	α
3386	3334	.	a
3386	3269	s	a
3386	3313	s	A
3386	3277	s	λ
3386	3280	H	λ
3386	3277	s	l
3386	3280	H	l
3386	3271	s	L
3386	3280	H	L
3386	3263	<1m>	<>
3387	3330	.	.
3387	3330	<~>	<~>
3387	3330	<split-s>	<split-s>
3387	3330	<split-h>	<split-h>
3387	3330	<name2>	<name2>
3387	3333	<aphaerese>	<aphaerese>
3387	3385	<>	<aphaerese>
3387	3385	<>	<elision3>
3387	3385	<>	<elision2>
3387	3385	<>	<elision1>
3387	3336	.	υ
3387	3268	s	υ
3387	3336	.	u
3387	3268	s	u
3387	3306	.	κ
3387	3276	s	κ
3387	3279	H	κ
3387	3276	s	k
3387	3279	H	k
3387	3312	s	U
3387	3264	s	K
3387	3279	H	K
3387	3336	.	α
3387	3268	s	α
3387	3336	.	a
3387	3268	s	a
3387	3315	s	A
3387	3276	s	λ
3387	3279	H	λ
3387	3276	s	l
3387	3279	H	l
3387	3270	s	L
3387	3279	H	L
3387	3261	<1m>	<>
3388	3389	<>	<name>
3388	3388	<>	<aphaerese>
3388	3388	<>	<elision3>
3388	3388	<>	<elision2>
3388	3388	<>	<elision1>
3388	3383	<u2K>	<>
3388	3386	<u2L>	<>
3389	3390	<>	<aphaerese>
3389	3390	<>	<elision3>
3389	3390	<>	<elision2>
3389	3390	<>	<elision1>
3389	3384	<u2K>	<>
3389	3387	<u2L>	<>
3390	3388	<>	<aphaerese>
3390	3388	<>	<elision3>
3390	3388	<>	<elision2>
3390	3388	<>	<elision1>
3390	3382	<u2K>	<>
3390	3385	<u2L>	<>
3391	3392	<>	<name>
3391	3391	<>	<aphaerese>
3391	3391	<>	<elision3>
3391	3391	<>	<elision2>
3391	3391	<>	<elision1>
3391	3386	<alpha2L>	<>
3392	3393	<>	<aphaerese>
3392	3393	<>	<elision3>
3392	3393	<>	<elision2>
3392	3393	<>	<elision1>
3392	3387	<alpha2L>	<>
3393	3391	<>	<aphaerese>
3393	3391	<>	<elision3>
3393	3391	<>	<elision2>
3393	3391	<>	<elision1>
3393	3385	<alpha2L>	<>
3394	3395	<>	<name>
3394	3394	<>	<aphaerese>
3394	3394	<>	<elision3>
3394	3394	<>	<elision2>
3394	3394	<>	<elision1>
3394	3386	<a2L>	<>
3395	3396	<>	<aphaerese>
3395	3396	<>	<elision3>
3395	3396	<>	<elision2>
3395	3396	<>	<elision1>
3395	3387	<a2L>	<>
3396	3394	<>	<aphaerese>
3396	3394	<>	<elision3>
3396	3394	<>	<elision2>
3396	3394	<>	<elision1>
3396	3385	<a2L>	<>
3397	3398	.	.
3397	3399	 	 
3397	3398	<~>	<~>
3397	3398	<split-s>	<split-s>
3397	3398	<split-h>	<split-h>
3397	3398	<name2>	<name2>
3397	3974	<>	<name>
3397	3402	<aphaerese>	<aphaerese>
3397	3397	<>	<aphaerese>
3397	3397	<>	<elision3>
3397	3397	<>	<elision2>
3397	3397	<>	<elision1>
3397	3406	.	υ
3397	3412	s	υ
3397	3406	.	u
3397	3412	s	u
3397	3591	.	κ
3397	3662	s	κ
3397	3774	s	k
3397	3783	s	U
3397	3949	s	K
3397	3406	.	α
3397	3412	s	α
3397	3406	.	a
3397	3412	s	a
3397	3904	s	A
3397	3774	s	λ
3397	3774	s	l
3397	3962	s	L
3397	3977	<split-h>	<>
3398	3398	.	.
3398	3399	 	 
3398	3398	<~>	<~>
3398	3398	<split-s>	<split-s>
3398	3398	<split-h>	<split-h>
3398	3398	<name2>	<name2>
3398	3973	<>	<name>
3398	3402	<aphaerese>	<aphaerese>
3398	3398	<>	<aphaerese>
3398	3398	<elision3>	<elision3>
3398	3398	<>	<elision3>
3398	3398	<elision2>	<elision2>
3398	3398	<>	<elision2>
3398	3398	<elision1>	<elision1>
3398	3398	<>	<elision1>
3398	3406	.	υ
3398	3412	s	υ
3398	3406	.	u
3398	3412	s	u
3398	3591	.	κ
3398	3662	s	κ
3398	3774	s	k
3398	3783	s	U
3398	3949	s	K
3398	3406	.	α
3398	3412	s	α
3398	3406	.	a
3398	3412	s	a
3398	3904	s	A
3398	3774	s	λ
3398	3774	s	l
3398	3962	s	L
3398	3923	<split-h>	<>
3399	3398	.	.
3399	3399	 	 
3399	3398	<~>	<~>
3399	3398	<split-s>	<split-s>
3399	3398	<split-h>	<split-h>
3399	3398	<name2>	<name2>
3399	3400	<>	<name>
3399	3402	<aphaerese>	<aphaerese>
3399	3405	<>	<aphaerese>
3399	3398	<elision3>	<elision3>
3399	3405	<>	<elision3>
3399	3398	<elision2>	<elision2>
3399	3405	<>	<elision2>
3399	3398	<elision1>	<elision1>
3399	3405	<>	<elision1>
3399	3406	.	υ
3399	3926	s	υ
3399	3406	.	u
3399	3926	s	u
3399	3591	.	κ
3399	3929	s	κ
3399	3932	s	k
3399	3935	s	U
3399	3939	s	K
3399	3406	.	α
3399	3926	s	α
3399	3406	.	a
3399	3926	s	a
3399	3943	s	A
3399	3932	s	λ
3399	3932	s	l
3399	3944	s	L
3399	3923	<split-h>	<>
3400	3401	.	.
3400	3404	 	 
3400	3401	<~>	<~>
3400	3401	<split-s>	<split-s>
3400	3401	<split-h>	<split-h>
3400	3401	<name2>	<name2>
3400	3948	<aphaerese>	<aphaerese>
3400	3972	<>	<aphaerese>
3400	3401	<elision3>	<elision3>
3400	3972	<>	<elision3>
3400	3401	<elision2>	<elision2>
3400	3972	<>	<elision2>
3400	3401	<elision1>	<elision1>
3400	3972	<>	<elision1>
3400	3408	.	υ
3400	3584	s	υ
3400	3408	.	u
3400	3584	s	u
3400	3593	.	κ
3400	3664	s	κ
3400	3776	s	k
3400	3785	s	U
3400	3791	s	K
3400	3408	.	α
3400	3584	s	α
3400	3408	.	a
3400	3584	s	a
3400	3906	s	A
3400	3776	s	λ
3400	3776	s	l
3400	3909	s	L
3400	3924	<split-h>	<>
3401	3398	.	.
3401	3399	 	 
3401	3398	<~>	<~>
3401	3398	<split-s>	<split-s>
3401	3398	<split-h>	<split-h>
3401	3398	<name2>	<name2>
3401	3402	<aphaerese>	<aphaerese>
3401	3398	<>	<aphaerese>
3401	3398	<elision3>	<elision3>
3401	3398	<>	<elision3>
3401	3398	<elision2>	<elision2>
3401	3398	<>	<elision2>
3401	3398	<elision1>	<elision1>
3401	3398	<>	<elision1>
3401	3406	.	υ
3401	3412	s	υ
3401	3406	.	u
3401	3412	s	u
3401	3591	.	κ
3401	3662	s	κ
3401	3774	s	k
3401	3783	s	U
3401	3949	s	K
3401	3406	.	α
3401	3412	s	α
3401	3406	.	a
3401	3412	s	a
3401	3904	s	A
3401	3774	s	λ
3401	3774	s	l
3401	3962	s	L
3401	3925	<split-h>	<>
3402	3398	.	.
3402	3399	 	 
3402	3398	<~>	<~>
3402	3398	<split-s>	<split-s>
3402	3398	<split-h>	<split-h>
3402	3398	<name2>	<name2>
3402	3403	<>	<name>
3402	3402	<aphaerese>	<aphaerese>
3402	3402	<>	<aphaerese>
3402	3398	<elision3>	<elision3>
3402	3402	<>	<elision3>
3402	3398	<elision2>	<elision2>
3402	3402	<>	<elision2>
3402	3398	<elision1>	<elision1>
3402	3402	<>	<elision1>
3402	3398	.	υ
3402	3398	.	u
3402	3591	.	κ
3402	3662	s	κ
3402	3774	s	k
3402	3783	s	U
3402	3949	s	K
3402	3398	.	α
3402	3398	.	a
3402	3904	s	A
3402	3774	s	λ
3402	3774	s	l
3402	3962	s	L
3402	3970	<split-h>	<>
3403	3401	.	.
3403	3404	 	 
3403	3401	<~>	<~>
3403	3401	<split-s>	<split-s>
3403	3401	<split-h>	<split-h>
3403	3401	<name2>	<name2>
3403	3948	<aphaerese>	<aphaerese>
3403	3948	<>	<aphaerese>
3403	3401	<elision3>	<elision3>
3403	3948	<>	<elision3>
3403	3401	<elision2>	<elision2>
3403	3948	<>	<elision2>
3403	3401	<elision1>	<elision1>
3403	3948	<>	<elision1>
3403	3401	.	υ
3403	3401	.	u
3403	3593	.	κ
3403	3664	s	κ
3403	3776	s	k
3403	3785	s	U
3403	3951	s	K
3403	3401	.	α
3403	3401	.	a
3403	3906	s	A
3403	3776	s	λ
3403	3776	s	l
3403	3964	s	L
3403	3971	<split-h>	<>
3404	3398	.	.
3404	3399	 	 
3404	3398	<~>	<~>
3404	3398	<split-s>	<split-s>
3404	3398	<split-h>	<split-h>
3404	3398	<name2>	<name2>
3404	3402	<aphaerese>	<aphaerese>
3404	3405	<>	<aphaerese>
3404	3398	<elision3>	<elision3>
3404	3405	<>	<elision3>
3404	3398	<elision2>	<elision2>
3404	3405	<>	<elision2>
3404	3398	<elision1>	<elision1>
3404	3405	<>	<elision1>
3404	3406	.	υ
3404	3926	s	υ
3404	3406	.	u
3404	3926	s	u
3404	3591	.	κ
3404	3929	s	κ
3404	3932	s	k
3404	3935	s	U
3404	3939	s	K
3404	3406	.	α
3404	3926	s	α
3404	3406	.	a
3404	3926	s	a
3404	3943	s	A
3404	3932	s	λ
3404	3932	s	l
3404	3944	s	L
3404	3925	<split-h>	<>
3405	3398	.	.
3405	3399	 	 
3405	3398	<~>	<~>
3405	3398	<split-s>	<split-s>
3405	3398	<split-h>	<split-h>
3405	3398	<name2>	<name2>
3405	3400	<>	<name>
3405	3402	<aphaerese>	<aphaerese>
3405	3405	<>	<aphaerese>
3405	3398	<elision3>	<elision3>
3405	3405	<>	<elision3>
3405	3398	<elision2>	<elision2>
3405	3405	<>	<elision2>
3405	3398	<elision1>	<elision1>
3405	3405	<>	<elision1>
3405	3406	.	υ
3405	3412	s	υ
3405	3406	.	u
3405	3412	s	u
3405	3591	.	κ
3405	3662	s	κ
3405	3774	s	k
3405	3783	s	U
3405	3786	s	K
3405	3406	.	α
3405	3412	s	α
3405	3406	.	a
3405	3412	s	a
3405	3904	s	A
3405	3774	s	λ
3405	3774	s	l
3405	3907	s	L
3405	3923	<split-h>	<>
3406	3407	<>	<name>
3406	3406	<>	<aphaerese>
3406	3398	<elision3>	<elision3>
3406	3406	<>	<elision3>
3406	3398	<elision2>	<elision2>
3406	3406	<>	<elision2>
3406	3398	<elision1>	<elision1>
3406	3406	<>	<elision1>
3406	3410	<split-h>	<>
3407	3408	<>	<aphaerese>
3407	3401	<elision3>	<elision3>
3407	3408	<>	<elision3>
3407	3401	<elision2>	<elision2>
3407	3408	<>	<elision2>
3407	3401	<elision1>	<elision1>
3407	3408	<>	<elision1>
3407	3411	<split-h>	<>
3408	3406	<>	<aphaerese>
3408	3398	<elision3>	<elision3>
3408	3406	<>	<elision3>
3408	3398	<elision2>	<elision2>
3408	3406	<>	<elision2>
3408	3398	<elision1>	<elision1>
3408	3406	<>	<elision1>
3408	3409	<split-h>	<>
3409	3410	<>	<aphaerese>
3409	3410	<>	<elision3>
3409	3410	<>	<elision2>
3409	3410	<>	<elision1>
3409	211	<3s>	<>
3410	3411	<>	<name>
3410	3410	<>	<aphaerese>
3410	3410	<>	<elision3>
3410	3410	<>	<elision2>
3410	3410	<>	<elision1>
3410	212	<3s>	<>
3411	3409	<>	<aphaerese>
3411	3409	<>	<elision3>
3411	3409	<>	<elision2>
3411	3409	<>	<elision1>
3411	213	<3s>	<>
3412	3413	.	.
3412	3413	 	 
3412	3413	<~>	<~>
3412	3413	<split-s>	<split-s>
3412	3413	<split-h>	<split-h>
3412	3413	<name2>	<name2>
3412	3583	<>	<name>
3412	3416	<aphaerese>	<aphaerese>
3412	3412	<>	<aphaerese>
3412	3412	<>	<elision3>
3412	3412	<>	<elision2>
3412	3412	<>	<elision1>
3412	3577	.	υ
3412	3577	.	u
3412	3419	.	κ
3412	3577	.	α
3412	3577	.	a
3412	3586	<4s>	<>
3413	3413	.	.
3413	3413	 	 
3413	3413	<~>	<~>
3413	3413	<split-s>	<split-s>
3413	3413	<split-h>	<split-h>
3413	3413	<name2>	<name2>
3413	3414	<>	<name>
3413	3416	<aphaerese>	<aphaerese>
3413	3413	<>	<aphaerese>
3413	3413	<elision3>	<elision3>
3413	3413	<>	<elision3>
3413	3413	<elision2>	<elision2>
3413	3413	<>	<elision2>
3413	3413	<elision1>	<elision1>
3413	3413	<>	<elision1>
3413	3577	.	υ
3413	3577	.	u
3413	3419	.	κ
3413	3577	.	α
3413	3577	.	a
3413	3581	<4s>	<>
3414	3415	.	.
3414	3415	 	 
3414	3415	<~>	<~>
3414	3415	<split-s>	<split-s>
3414	3415	<split-h>	<split-h>
3414	3415	<name2>	<name2>
3414	3418	<aphaerese>	<aphaerese>
3414	3415	<>	<aphaerese>
3414	3415	<elision3>	<elision3>
3414	3415	<>	<elision3>
3414	3415	<elision2>	<elision2>
3414	3415	<>	<elision2>
3414	3415	<elision1>	<elision1>
3414	3415	<>	<elision1>
3414	3579	.	υ
3414	3579	.	u
3414	3421	.	κ
3414	3579	.	α
3414	3579	.	a
3414	3582	<4s>	<>
3415	3413	.	.
3415	3413	 	 
3415	3413	<~>	<~>
3415	3413	<split-s>	<split-s>
3415	3413	<split-h>	<split-h>
3415	3413	<name2>	<name2>
3415	3416	<aphaerese>	<aphaerese>
3415	3413	<>	<aphaerese>
3415	3413	<elision3>	<elision3>
3415	3413	<>	<elision3>
3415	3413	<elision2>	<elision2>
3415	3413	<>	<elision2>
3415	3413	<elision1>	<elision1>
3415	3413	<>	<elision1>
3415	3577	.	υ
3415	3577	.	u
3415	3419	.	κ
3415	3577	.	α
3415	3577	.	a
3415	3580	<4s>	<>
3416	3413	.	.
3416	3413	 	 
3416	3413	<~>	<~>
3416	3413	<split-s>	<split-s>
3416	3413	<split-h>	<split-h>
3416	3413	<name2>	<name2>
3416	3417	<>	<name>
3416	3416	<aphaerese>	<aphaerese>
3416	3416	<>	<aphaerese>
3416	3413	<elision3>	<elision3>
3416	3416	<>	<elision3>
3416	3413	<elision2>	<elision2>
3416	3416	<>	<elision2>
3416	3413	<elision1>	<elision1>
3416	3416	<>	<elision1>
3416	3413	.	υ
3416	3413	.	u
3416	3419	.	κ
3416	3413	.	α
3416	3413	.	a
3416	3568	<4s>	<>
3417	3415	.	.
3417	3415	 	 
3417	3415	<~>	<~>
3417	3415	<split-s>	<split-s>
3417	3415	<split-h>	<split-h>
3417	3415	<name2>	<name2>
3417	3418	<aphaerese>	<aphaerese>
3417	3418	<>	<aphaerese>
3417	3415	<elision3>	<elision3>
3417	3418	<>	<elision3>
3417	3415	<elision2>	<elision2>
3417	3418	<>	<elision2>
3417	3415	<elision1>	<elision1>
3417	3418	<>	<elision1>
3417	3415	.	υ
3417	3415	.	u
3417	3421	.	κ
3417	3415	.	α
3417	3415	.	a
3417	3569	<4s>	<>
3418	3413	.	.
3418	3413	 	 
3418	3413	<~>	<~>
3418	3413	<split-s>	<split-s>
3418	3413	<split-h>	<split-h>
3418	3413	<name2>	<name2>
3418	3416	<aphaerese>	<aphaerese>
3418	3416	<>	<aphaerese>
3418	3413	<elision3>	<elision3>
3418	3416	<>	<elision3>
3418	3413	<elision2>	<elision2>
3418	3416	<>	<elision2>
3418	3413	<elision1>	<elision1>
3418	3416	<>	<elision1>
3418	3413	.	υ
3418	3413	.	u
3418	3419	.	κ
3418	3413	.	α
3418	3413	.	a
3418	3567	<4s>	<>
3419	3420	<>	<name>
3419	3419	<>	<aphaerese>
3419	3422	<elision3>	<elision3>
3419	3419	<>	<elision3>
3419	3422	<elision2>	<elision2>
3419	3419	<>	<elision2>
3419	3422	<elision1>	<elision1>
3419	3419	<>	<elision1>
3419	3565	<4s>	<>
3420	3421	<>	<aphaerese>
3420	3424	<elision3>	<elision3>
3420	3421	<>	<elision3>
3420	3424	<elision2>	<elision2>
3420	3421	<>	<elision2>
3420	3424	<elision1>	<elision1>
3420	3421	<>	<elision1>
3420	3566	<4s>	<>
3421	3419	<>	<aphaerese>
3421	3422	<elision3>	<elision3>
3421	3419	<>	<elision3>
3421	3422	<elision2>	<elision2>
3421	3419	<>	<elision2>
3421	3422	<elision1>	<elision1>
3421	3419	<>	<elision1>
3421	3564	<4s>	<>
3422	3423	<>	<name>
3422	3422	<>	<aphaerese>
3422	3422	<>	<elision3>
3422	3422	<>	<elision2>
3422	3422	<>	<elision1>
3422	3426	<4s>	<>
3423	3424	<>	<aphaerese>
3423	3424	<>	<elision3>
3423	3424	<>	<elision2>
3423	3424	<>	<elision1>
3423	3427	<4s>	<>
3424	3422	<>	<aphaerese>
3424	3422	<>	<elision3>
3424	3422	<>	<elision2>
3424	3422	<>	<elision1>
3424	3425	<4s>	<>
3425	3426	<>	<aphaerese>
3425	3426	<>	<elision3>
3425	3426	<>	<elision2>
3425	3426	<>	<elision1>
3425	228	H	κ
3425	2793	H	k
3425	2797	H	K
3425	2801	H	λ
3425	3429	H	l
3425	3558	H	L
3425	3248	<K>	<>
3426	3427	<>	<name>
3426	3426	<>	<aphaerese>
3426	3426	<>	<elision3>
3426	3426	<>	<elision2>
3426	3426	<>	<elision1>
3426	228	H	κ
3426	2793	H	k
3426	2797	H	K
3426	2801	H	λ
3426	3429	H	l
3426	3558	H	L
3426	3246	<K>	<>
3427	3425	<>	<aphaerese>
3427	3425	<>	<elision3>
3427	3425	<>	<elision2>
3427	3425	<>	<elision1>
3427	2807	H	κ
3427	2811	H	k
3427	2812	H	K
3427	2803	H	λ
3427	3428	H	l
3427	3557	H	L
3427	3247	<K>	<>
3428	3429	<>	<aphaerese>
3428	3429	<>	<elision3>
3428	3429	<>	<elision2>
3428	3429	<>	<elision1>
3428	3432	<~>	<>
3428	2625	<l2L>	<>
3429	3430	<>	<name>
3429	3429	<>	<aphaerese>
3429	3429	<>	<elision3>
3429	3429	<>	<elision2>
3429	3429	<>	<elision1>
3429	3433	<~>	<>
3429	2623	<l2L>	<>
3430	3428	<>	<aphaerese>
3430	3428	<>	<elision3>
3430	3428	<>	<elision2>
3430	3428	<>	<elision1>
3430	3431	<~>	<>
3430	2624	<l2L>	<>
3431	3432	<>	<aphaerese>
3431	3432	<>	<elision3>
3431	3432	<>	<elision2>
3431	3432	<>	<elision1>
3431	3436	h	K
3431	3552	h	L
3432	3433	<>	<aphaerese>
3432	3433	<>	<elision3>
3432	3433	<>	<elision2>
3432	3433	<>	<elision1>
3432	3434	h	K
3432	3549	h	L
3433	3431	<>	<name>
3433	3433	<>	<aphaerese>
3433	3433	<>	<elision3>
3433	3433	<>	<elision2>
3433	3433	<>	<elision1>
3433	3434	h	K
3433	3549	h	L
3434	3435	<>	<name>
3434	3434	<>	<aphaerese>
3434	3434	<>	<elision3>
3434	3434	<>	<elision2>
3434	3434	<>	<elision1>
3434	3437	.	κ
3434	3437	.	λ
3435	3436	<>	<aphaerese>
3435	3436	<>	<elision3>
3435	3436	<>	<elision2>
3435	3436	<>	<elision1>
3435	3439	.	κ
3435	3439	.	λ
3436	3434	<>	<aphaerese>
3436	3434	<>	<elision3>
3436	3434	<>	<elision2>
3436	3434	<>	<elision1>
3436	3437	.	κ
3436	3437	.	λ
3437	3438	<>	<name>
3437	3437	<>	<aphaerese>
3437	3440	<elision3>	<elision3>
3437	3437	<>	<elision3>
3437	3440	<elision2>	<elision2>
3437	3437	<>	<elision2>
3437	3440	<elision1>	<elision1>
3437	3437	<>	<elision1>
3438	3439	<>	<aphaerese>
3438	3443	<elision3>	<elision3>
3438	3439	<>	<elision3>
3438	3443	<elision2>	<elision2>
3438	3439	<>	<elision2>
3438	3443	<elision1>	<elision1>
3438	3439	<>	<elision1>
3439	3437	<>	<aphaerese>
3439	3440	<elision3>	<elision3>
3439	3437	<>	<elision3>
3439	3440	<elision2>	<elision2>
3439	3437	<>	<elision2>
3439	3440	<elision1>	<elision1>
3439	3437	<>	<elision1>
3440	3440	.	.
3440	3441	 	 
3440	3440	<~>	<~>
3440	3440	<split-s>	<split-s>
3440	3440	<split-h>	<split-h>
3440	3440	<name2>	<name2>
3440	3548	<>	<name>
3440	3444	<aphaerese>	<aphaerese>
3440	3440	<>	<aphaerese>
3440	3440	<elision3>	<elision3>
3440	3440	<>	<elision3>
3440	3440	<elision2>	<elision2>
3440	3440	<>	<elision2>
3440	3440	<elision1>	<elision1>
3440	3440	<>	<elision1>
3440	3437	.	υ
3440	3448	s	υ
3440	3437	.	u
3440	3448	s	u
3440	3463	.	κ
3440	3475	s	κ
3440	3481	s	k
3440	3484	s	U
3440	3535	s	K
3440	3437	.	α
3440	3448	s	α
3440	3437	.	a
3440	3448	s	a
3440	3513	s	A
3440	3481	s	λ
3440	3481	s	l
3440	3542	s	L
3441	3440	.	.
3441	3441	 	 
3441	3440	<~>	<~>
3441	3440	<split-s>	<split-s>
3441	3440	<split-h>	<split-h>
3441	3440	<name2>	<name2>
3441	3442	<>	<name>
3441	3444	<aphaerese>	<aphaerese>
3441	3447	<>	<aphaerese>
3441	3440	<elision3>	<elision3>
3441	3447	<>	<elision3>
3441	3440	<elision2>	<elision2>
3441	3447	<>	<elision2>
3441	3440	<elision1>	<elision1>
3441	3447	<>	<elision1>
3441	3437	.	υ
3441	3524	s	υ
3441	3437	.	u
3441	3524	s	u
3441	3463	.	κ
3441	3525	s	κ
3441	3526	s	k
3441	3527	s	U
3441	3529	s	K
3441	3437	.	α
3441	3524	s	α
3441	3437	.	a
3441	3524	s	a
3441	3531	s	A
3441	3526	s	λ
3441	3526	s	l
3441	3532	s	L
3442	3443	.	.
3442	3446	 	 
3442	3443	<~>	<~>
3442	3443	<split-s>	<split-s>
3442	3443	<split-h>	<split-h>
3442	3443	<name2>	<name2>
3442	3534	<aphaerese>	<aphaerese>
3442	3547	<>	<aphaerese>
3442	3443	<elision3>	<elision3>
3442	3547	<>	<elision3>
3442	3443	<elision2>	<elision2>
3442	3547	<>	<elision2>
3442	3443	<elision1>	<elision1>
3442	3547	<>	<elision1>
3442	3439	.	υ
3442	3462	s	υ
3442	3439	.	u
3442	3462	s	u
3442	3465	.	κ
3442	3477	s	κ
3442	3483	s	k
3442	3486	s	U
3442	3489	s	K
3442	3439	.	α
3442	3462	s	α
3442	3439	.	a
3442	3462	s	a
3442	3515	s	A
3442	3483	s	λ
3442	3483	s	l
3442	3518	s	L
3443	3440	.	.
3443	3441	 	 
3443	3440	<~>	<~>
3443	3440	<split-s>	<split-s>
3443	3440	<split-h>	<split-h>
3443	3440	<name2>	<name2>
3443	3444	<aphaerese>	<aphaerese>
3443	3440	<>	<aphaerese>
3443	3440	<elision3>	<elision3>
3443	3440	<>	<elision3>
3443	3440	<elision2>	<elision2>
3443	3440	<>	<elision2>
3443	3440	<elision1>	<elision1>
3443	3440	<>	<elision1>
3443	3437	.	υ
3443	3448	s	υ
3443	3437	.	u
3443	3448	s	u
3443	3463	.	κ
3443	3475	s	κ
3443	3481	s	k
3443	3484	s	U
3443	3535	s	K
3443	3437	.	α
3443	3448	s	α
3443	3437	.	a
3443	3448	s	a
3443	3513	s	A
3443	3481	s	λ
3443	3481	s	l
3443	3542	s	L
3444	3440	.	.
3444	3441	 	 
3444	3440	<~>	<~>
3444	3440	<split-s>	<split-s>
3444	3440	<split-h>	<split-h>
3444	3440	<name2>	<name2>
3444	3445	<>	<name>
3444	3444	<aphaerese>	<aphaerese>
3444	3444	<>	<aphaerese>
3444	3440	<elision3>	<elision3>
3444	3444	<>	<elision3>
3444	3440	<elision2>	<elision2>
3444	3444	<>	<elision2>
3444	3440	<elision1>	<elision1>
3444	3444	<>	<elision1>
3444	3440	.	υ
3444	3440	.	u
3444	3463	.	κ
3444	3475	s	κ
3444	3481	s	k
3444	3484	s	U
3444	3535	s	K
3444	3440	.	α
3444	3440	.	a
3444	3513	s	A
3444	3481	s	λ
3444	3481	s	l
3444	3542	s	L
3445	3443	.	.
3445	3446	 	 
3445	3443	<~>	<~>
3445	3443	<split-s>	<split-s>
3445	3443	<split-h>	<split-h>
3445	3443	<name2>	<name2>
3445	3534	<aphaerese>	<aphaerese>
3445	3534	<>	<aphaerese>
3445	3443	<elision3>	<elision3>
3445	3534	<>	<elision3>
3445	3443	<elision2>	<elision2>
3445	3534	<>	<elision2>
3445	3443	<elision1>	<elision1>
3445	3534	<>	<elision1>
3445	3443	.	υ
3445	3443	.	u
3445	3465	.	κ
3445	3477	s	κ
3445	3483	s	k
3445	3486	s	U
3445	3537	s	K
3445	3443	.	α
3445	3443	.	a
3445	3515	s	A
3445	3483	s	λ
3445	3483	s	l
3445	3544	s	L
3446	3440	.	.
3446	3441	 	 
3446	3440	<~>	<~>
3446	3440	<split-s>	<split-s>
3446	3440	<split-h>	<split-h>
3446	3440	<name2>	<name2>
3446	3444	<aphaerese>	<aphaerese>
3446	3447	<>	<aphaerese>
3446	3440	<elision3>	<elision3>
3446	3447	<>	<elision3>
3446	3440	<elision2>	<elision2>
3446	3447	<>	<elision2>
3446	3440	<elision1>	<elision1>
3446	3447	<>	<elision1>
3446	3437	.	υ
3446	3524	s	υ
3446	3437	.	u
3446	3524	s	u
3446	3463	.	κ
3446	3525	s	κ
3446	3526	s	k
3446	3527	s	U
3446	3529	s	K
3446	3437	.	α
3446	3524	s	α
3446	3437	.	a
3446	3524	s	a
3446	3531	s	A
3446	3526	s	λ
3446	3526	s	l
3446	3532	s	L
3447	3440	.	.
3447	3441	 	 
3447	3440	<~>	<~>
3447	3440	<split-s>	<split-s>
3447	3440	<split-h>	<split-h>
3447	3440	<name2>	<name2>
3447	3442	<>	<name>
3447	3444	<aphaerese>	<aphaerese>
3447	3447	<>	<aphaerese>
3447	3440	<elision3>	<elision3>
3447	3447	<>	<elision3>
3447	3440	<elision2>	<elision2>
3447	3447	<>	<elision2>
3447	3440	<elision1>	<elision1>
3447	3447	<>	<elision1>
3447	3437	.	υ
3447	3448	s	υ
3447	3437	.	u
3447	3448	s	u
3447	3463	.	κ
3447	3475	s	κ
3447	3481	s	k
3447	3484	s	U
3447	3487	s	K
3447	3437	.	α
3447	3448	s	α
3447	3437	.	a
3447	3448	s	a
3447	3513	s	A
3447	3481	s	λ
3447	3481	s	l
3447	3516	s	L
3448	3449	.	.
3448	3449	 	 
3448	3449	<~>	<~>
3448	3449	<split-s>	<split-s>
3448	3449	<split-h>	<split-h>
3448	3449	<name2>	<name2>
3448	3461	<>	<name>
3448	3452	<aphaerese>	<aphaerese>
3448	3448	<>	<aphaerese>
3448	3448	<>	<elision3>
3448	3448	<>	<elision2>
3448	3448	<>	<elision1>
3448	3458	.	υ
3448	3458	.	u
3448	3455	.	κ
3448	3458	.	α
3448	3458	.	a
3448	1945	<3s>	<>
3449	3449	.	.
3449	3449	 	 
3449	3449	<~>	<~>
3449	3449	<split-s>	<split-s>
3449	3449	<split-h>	<split-h>
3449	3449	<name2>	<name2>
3449	3450	<>	<name>
3449	3452	<aphaerese>	<aphaerese>
3449	3449	<>	<aphaerese>
3449	3449	<elision3>	<elision3>
3449	3449	<>	<elision3>
3449	3449	<elision2>	<elision2>
3449	3449	<>	<elision2>
3449	3449	<elision1>	<elision1>
3449	3449	<>	<elision1>
3449	3458	.	υ
3449	3458	.	u
3449	3455	.	κ
3449	3458	.	α
3449	3458	.	a
3449	1940	<3s>	<>
3450	3451	.	.
3450	3451	 	 
3450	3451	<~>	<~>
3450	3451	<split-s>	<split-s>
3450	3451	<split-h>	<split-h>
3450	3451	<name2>	<name2>
3450	3454	<aphaerese>	<aphaerese>
3450	3451	<>	<aphaerese>
3450	3451	<elision3>	<elision3>
3450	3451	<>	<elision3>
3450	3451	<elision2>	<elision2>
3450	3451	<>	<elision2>
3450	3451	<elision1>	<elision1>
3450	3451	<>	<elision1>
3450	3460	.	υ
3450	3460	.	u
3450	3457	.	κ
3450	3460	.	α
3450	3460	.	a
3450	1941	<3s>	<>
3451	3449	.	.
3451	3449	 	 
3451	3449	<~>	<~>
3451	3449	<split-s>	<split-s>
3451	3449	<split-h>	<split-h>
3451	3449	<name2>	<name2>
3451	3452	<aphaerese>	<aphaerese>
3451	3449	<>	<aphaerese>
3451	3449	<elision3>	<elision3>
3451	3449	<>	<elision3>
3451	3449	<elision2>	<elision2>
3451	3449	<>	<elision2>
3451	3449	<elision1>	<elision1>
3451	3449	<>	<elision1>
3451	3458	.	υ
3451	3458	.	u
3451	3455	.	κ
3451	3458	.	α
3451	3458	.	a
3451	1939	<3s>	<>
3452	3449	.	.
3452	3449	 	 
3452	3449	<~>	<~>
3452	3449	<split-s>	<split-s>
3452	3449	<split-h>	<split-h>
3452	3449	<name2>	<name2>
3452	3453	<>	<name>
3452	3452	<aphaerese>	<aphaerese>
3452	3452	<>	<aphaerese>
3452	3449	<elision3>	<elision3>
3452	3452	<>	<elision3>
3452	3449	<elision2>	<elision2>
3452	3452	<>	<elision2>
3452	3449	<elision1>	<elision1>
3452	3452	<>	<elision1>
3452	3449	.	υ
3452	3449	.	u
3452	3455	.	κ
3452	3449	.	α
3452	3449	.	a
3452	1927	<3s>	<>
3453	3451	.	.
3453	3451	 	 
3453	3451	<~>	<~>
3453	3451	<split-s>	<split-s>
3453	3451	<split-h>	<split-h>
3453	3451	<name2>	<name2>
3453	3454	<aphaerese>	<aphaerese>
3453	3454	<>	<aphaerese>
3453	3451	<elision3>	<elision3>
3453	3454	<>	<elision3>
3453	3451	<elision2>	<elision2>
3453	3454	<>	<elision2>
3453	3451	<elision1>	<elision1>
3453	3454	<>	<elision1>
3453	3451	.	υ
3453	3451	.	u
3453	3457	.	κ
3453	3451	.	α
3453	3451	.	a
3453	1928	<3s>	<>
3454	3449	.	.
3454	3449	 	 
3454	3449	<~>	<~>
3454	3449	<split-s>	<split-s>
3454	3449	<split-h>	<split-h>
3454	3449	<name2>	<name2>
3454	3452	<aphaerese>	<aphaerese>
3454	3452	<>	<aphaerese>
3454	3449	<elision3>	<elision3>
3454	3452	<>	<elision3>
3454	3449	<elision2>	<elision2>
3454	3452	<>	<elision2>
3454	3449	<elision1>	<elision1>
3454	3452	<>	<elision1>
3454	3449	.	υ
3454	3449	.	u
3454	3455	.	κ
3454	3449	.	α
3454	3449	.	a
3454	1926	<3s>	<>
3455	3456	<>	<name>
3455	3455	<>	<aphaerese>
3455	2016	<elision3>	<elision3>
3455	3455	<>	<elision3>
3455	2016	<elision2>	<elision2>
3455	3455	<>	<elision2>
3455	2016	<elision1>	<elision1>
3455	3455	<>	<elision1>
3455	1924	<3s>	<>
3456	3457	<>	<aphaerese>
3456	2015	<elision3>	<elision3>
3456	3457	<>	<elision3>
3456	2015	<elision2>	<elision2>
3456	3457	<>	<elision2>
3456	2015	<elision1>	<elision1>
3456	3457	<>	<elision1>
3456	1925	<3s>	<>
3457	3455	<>	<aphaerese>
3457	2016	<elision3>	<elision3>
3457	3455	<>	<elision3>
3457	2016	<elision2>	<elision2>
3457	3455	<>	<elision2>
3457	2016	<elision1>	<elision1>
3457	3455	<>	<elision1>
3457	1923	<3s>	<>
3458	3459	<>	<name>
3458	3458	<>	<aphaerese>
3458	3449	<elision3>	<elision3>
3458	3458	<>	<elision3>
3458	3449	<elision2>	<elision2>
3458	3458	<>	<elision2>
3458	3449	<elision1>	<elision1>
3458	3458	<>	<elision1>
3458	248	<3s>	<>
3459	3460	<>	<aphaerese>
3459	3451	<elision3>	<elision3>
3459	3460	<>	<elision3>
3459	3451	<elision2>	<elision2>
3459	3460	<>	<elision2>
3459	3451	<elision1>	<elision1>
3459	3460	<>	<elision1>
3459	249	<3s>	<>
3460	3458	<>	<aphaerese>
3460	3449	<elision3>	<elision3>
3460	3458	<>	<elision3>
3460	3449	<elision2>	<elision2>
3460	3458	<>	<elision2>
3460	3449	<elision1>	<elision1>
3460	3458	<>	<elision1>
3460	247	<3s>	<>
3461	3451	.	.
3461	3451	 	 
3461	3451	<~>	<~>
3461	3451	<split-s>	<split-s>
3461	3451	<split-h>	<split-h>
3461	3451	<name2>	<name2>
3461	3454	<aphaerese>	<aphaerese>
3461	3462	<>	<aphaerese>
3461	3462	<>	<elision3>
3461	3462	<>	<elision2>
3461	3462	<>	<elision1>
3461	3460	.	υ
3461	3460	.	u
3461	3457	.	κ
3461	3460	.	α
3461	3460	.	a
3461	1946	<3s>	<>
3462	3449	.	.
3462	3449	 	 
3462	3449	<~>	<~>
3462	3449	<split-s>	<split-s>
3462	3449	<split-h>	<split-h>
3462	3449	<name2>	<name2>
3462	3452	<aphaerese>	<aphaerese>
3462	3448	<>	<aphaerese>
3462	3448	<>	<elision3>
3462	3448	<>	<elision2>
3462	3448	<>	<elision1>
3462	3458	.	υ
3462	3458	.	u
3462	3455	.	κ
3462	3458	.	α
3462	3458	.	a
3462	1944	<3s>	<>
3463	3464	<>	<name>
3463	3463	<>	<aphaerese>
3463	3466	<elision3>	<elision3>
3463	3463	<>	<elision3>
3463	3466	<elision2>	<elision2>
3463	3463	<>	<elision2>
3463	3466	<elision1>	<elision1>
3463	3463	<>	<elision1>
3464	3465	<>	<aphaerese>
3464	3468	<elision3>	<elision3>
3464	3465	<>	<elision3>
3464	3468	<elision2>	<elision2>
3464	3465	<>	<elision2>
3464	3468	<elision1>	<elision1>
3464	3465	<>	<elision1>
3465	3463	<>	<aphaerese>
3465	3466	<elision3>	<elision3>
3465	3463	<>	<elision3>
3465	3466	<elision2>	<elision2>
3465	3463	<>	<elision2>
3465	3466	<elision1>	<elision1>
3465	3463	<>	<elision1>
3466	3467	<>	<name>
3466	3466	<>	<aphaerese>
3466	3466	<>	<elision3>
3466	3466	<>	<elision2>
3466	3466	<>	<elision1>
3466	2357	s	κ
3466	2357	s	k
3466	3469	s	K
3466	2357	s	λ
3466	2357	s	l
3466	3472	s	L
3467	3468	<>	<aphaerese>
3467	3468	<>	<elision3>
3467	3468	<>	<elision2>
3467	3468	<>	<elision1>
3467	2356	s	κ
3467	2356	s	k
3467	3471	s	K
3467	2356	s	λ
3467	2356	s	l
3467	3474	s	L
3468	3466	<>	<aphaerese>
3468	3466	<>	<elision3>
3468	3466	<>	<elision2>
3468	3466	<>	<elision1>
3468	2357	s	κ
3468	2357	s	k
3468	3469	s	K
3468	2357	s	λ
3468	2357	s	l
3468	3472	s	L
3469	3470	<>	<name>
3469	3469	<>	<aphaerese>
3469	3469	<>	<elision3>
3469	3469	<>	<elision2>
3469	3469	<>	<elision1>
3469	2357	<K2kl>	<>
3470	3471	<>	<aphaerese>
3470	3471	<>	<elision3>
3470	3471	<>	<elision2>
3470	3471	<>	<elision1>
3470	2358	<K2kl>	<>
3471	3469	<>	<aphaerese>
3471	3469	<>	<elision3>
3471	3469	<>	<elision2>
3471	3469	<>	<elision1>
3471	2356	<K2kl>	<>
3472	3473	<>	<name>
3472	3472	<>	<aphaerese>
3472	3472	<>	<elision3>
3472	3472	<>	<elision2>
3472	3472	<>	<elision1>
3472	2357	<L2kl>	<>
3473	3474	<>	<aphaerese>
3473	3474	<>	<elision3>
3473	3474	<>	<elision2>
3473	3474	<>	<elision1>
3473	2358	<L2kl>	<>
3474	3472	<>	<aphaerese>
3474	3472	<>	<elision3>
3474	3472	<>	<elision2>
3474	3472	<>	<elision1>
3474	2356	<L2kl>	<>
3475	3449	.	.
3475	3449	 	 
3475	3449	<~>	<~>
3475	3449	<split-s>	<split-s>
3475	3449	<split-h>	<split-h>
3475	3449	<name2>	<name2>
3475	3476	<>	<name>
3475	3452	<aphaerese>	<aphaerese>
3475	3475	<>	<aphaerese>
3475	3478	<elision3>	<elision3>
3475	3475	<>	<elision3>
3475	3478	<elision2>	<elision2>
3475	3475	<>	<elision2>
3475	3478	<elision1>	<elision1>
3475	3475	<>	<elision1>
3475	3458	.	υ
3475	3458	.	u
3475	3458	.	κ
3475	3458	.	α
3475	3458	.	a
3475	3458	.	λ
3475	2125	<3s>	<>
3476	3451	.	.
3476	3451	 	 
3476	3451	<~>	<~>
3476	3451	<split-s>	<split-s>
3476	3451	<split-h>	<split-h>
3476	3451	<name2>	<name2>
3476	3454	<aphaerese>	<aphaerese>
3476	3477	<>	<aphaerese>
3476	3480	<elision3>	<elision3>
3476	3477	<>	<elision3>
3476	3480	<elision2>	<elision2>
3476	3477	<>	<elision2>
3476	3480	<elision1>	<elision1>
3476	3477	<>	<elision1>
3476	3460	.	υ
3476	3460	.	u
3476	3460	.	κ
3476	3460	.	α
3476	3460	.	a
3476	3460	.	λ
3476	2126	<3s>	<>
3477	3449	.	.
3477	3449	 	 
3477	3449	<~>	<~>
3477	3449	<split-s>	<split-s>
3477	3449	<split-h>	<split-h>
3477	3449	<name2>	<name2>
3477	3452	<aphaerese>	<aphaerese>
3477	3475	<>	<aphaerese>
3477	3478	<elision3>	<elision3>
3477	3475	<>	<elision3>
3477	3478	<elision2>	<elision2>
3477	3475	<>	<elision2>
3477	3478	<elision1>	<elision1>
3477	3475	<>	<elision1>
3477	3458	.	υ
3477	3458	.	u
3477	3458	.	κ
3477	3458	.	α
3477	3458	.	a
3477	3458	.	λ
3477	2124	<3s>	<>
3478	3449	.	.
3478	3449	 	 
3478	3449	<~>	<~>
3478	3449	<split-s>	<split-s>
3478	3449	<split-h>	<split-h>
3478	3449	<name2>	<name2>
3478	3479	<>	<name>
3478	3452	<aphaerese>	<aphaerese>
3478	3478	<>	<aphaerese>
3478	3449	<elision3>	<elision3>
3478	3478	<>	<elision3>
3478	3449	<elision2>	<elision2>
3478	3478	<>	<elision2>
3478	3449	<elision1>	<elision1>
3478	3478	<>	<elision1>
3478	3458	.	υ
3478	3458	.	u
3478	3455	.	κ
3478	3458	.	α
3478	3458	.	a
3478	2028	<3s>	<>
3479	3451	.	.
3479	3451	 	 
3479	3451	<~>	<~>
3479	3451	<split-s>	<split-s>
3479	3451	<split-h>	<split-h>
3479	3451	<name2>	<name2>
3479	3454	<aphaerese>	<aphaerese>
3479	3480	<>	<aphaerese>
3479	3451	<elision3>	<elision3>
3479	3480	<>	<elision3>
3479	3451	<elision2>	<elision2>
3479	3480	<>	<elision2>
3479	3451	<elision1>	<elision1>
3479	3480	<>	<elision1>
3479	3460	.	υ
3479	3460	.	u
3479	3457	.	κ
3479	3460	.	α
3479	3460	.	a
3479	2029	<3s>	<>
3480	3449	.	.
3480	3449	 	 
3480	3449	<~>	<~>
3480	3449	<split-s>	<split-s>
3480	3449	<split-h>	<split-h>
3480	3449	<name2>	<name2>
3480	3452	<aphaerese>	<aphaerese>
3480	3478	<>	<aphaerese>
3480	3449	<elision3>	<elision3>
3480	3478	<>	<elision3>
3480	3449	<elision2>	<elision2>
3480	3478	<>	<elision2>
3480	3449	<elision1>	<elision1>
3480	3478	<>	<elision1>
3480	3458	.	υ
3480	3458	.	u
3480	3455	.	κ
3480	3458	.	α
3480	3458	.	a
3480	2027	<3s>	<>
3481	3449	.	.
3481	3449	 	 
3481	3449	<~>	<~>
3481	3449	<split-s>	<split-s>
3481	3449	<split-h>	<split-h>
3481	3449	<name2>	<name2>
3481	3482	<>	<name>
3481	3452	<aphaerese>	<aphaerese>
3481	3481	<>	<aphaerese>
3481	3449	<elision3>	<elision3>
3481	3481	<>	<elision3>
3481	3449	<elision2>	<elision2>
3481	3481	<>	<elision2>
3481	3449	<elision1>	<elision1>
3481	3481	<>	<elision1>
3481	3458	.	υ
3481	3458	.	u
3481	3458	.	κ
3481	3458	.	α
3481	3458	.	a
3481	3458	.	λ
3481	2137	<3s>	<>
3482	3451	.	.
3482	3451	 	 
3482	3451	<~>	<~>
3482	3451	<split-s>	<split-s>
3482	3451	<split-h>	<split-h>
3482	3451	<name2>	<name2>
3482	3454	<aphaerese>	<aphaerese>
3482	3483	<>	<aphaerese>
3482	3451	<elision3>	<elision3>
3482	3483	<>	<elision3>
3482	3451	<elision2>	<elision2>
3482	3483	<>	<elision2>
3482	3451	<elision1>	<elision1>
3482	3483	<>	<elision1>
3482	3460	.	υ
3482	3460	.	u
3482	3460	.	κ
3482	3460	.	α
3482	3460	.	a
3482	3460	.	λ
3482	2138	<3s>	<>
3483	3449	.	.
3483	3449	 	 
3483	3449	<~>	<~>
3483	3449	<split-s>	<split-s>
3483	3449	<split-h>	<split-h>
3483	3449	<name2>	<name2>
3483	3452	<aphaerese>	<aphaerese>
3483	3481	<>	<aphaerese>
3483	3449	<elision3>	<elision3>
3483	3481	<>	<elision3>
3483	3449	<elision2>	<elision2>
3483	3481	<>	<elision2>
3483	3449	<elision1>	<elision1>
3483	3481	<>	<elision1>
3483	3458	.	υ
3483	3458	.	u
3483	3458	.	κ
3483	3458	.	α
3483	3458	.	a
3483	3458	.	λ
3483	2136	<3s>	<>
3484	3485	<>	<name>
3484	3484	<>	<aphaerese>
3484	3484	<>	<elision3>
3484	3484	<>	<elision2>
3484	3484	<>	<elision1>
3484	3449	<U2kl>	<>
3485	3486	<>	<aphaerese>
3485	3486	<>	<elision3>
3485	3486	<>	<elision2>
3485	3486	<>	<elision1>
3485	3450	<U2kl>	<>
3486	3484	<>	<aphaerese>
3486	3484	<>	<elision3>
3486	3484	<>	<elision2>
3486	3484	<>	<elision1>
3486	3451	<U2kl>	<>
3487	2447	<name>	<name>
3487	3488	<>	<name>
3487	3490	<>	<aphaerese>
3487	3490	<>	<elision3>
3487	3490	<>	<elision2>
3487	3490	<>	<elision1>
3487	2257	<3s>	<>
3487	3491	<A2kl>	<>
3487	3500	<L2kl>	<>
3487	3512	<K2kl>	<>
3488	3489	<>	<aphaerese>
3488	3489	<>	<elision3>
3488	3489	<>	<elision2>
3488	3489	<>	<elision1>
3488	3492	<A2kl>	<>
3488	3501	<L2kl>	<>
3488	3510	<K2kl>	<>
3489	3490	<>	<aphaerese>
3489	3490	<>	<elision3>
3489	3490	<>	<elision2>
3489	3490	<>	<elision1>
3489	3493	<A2kl>	<>
3489	3502	<L2kl>	<>
3489	3511	<K2kl>	<>
3490	3488	<>	<name>
3490	3490	<>	<aphaerese>
3490	3490	<>	<elision3>
3490	3490	<>	<elision2>
3490	3490	<>	<elision1>
3490	3491	<A2kl>	<>
3490	3500	<L2kl>	<>
3490	3509	<K2kl>	<>
3491	3492	<>	<name>
3491	3491	<>	<aphaerese>
3491	3491	<>	<elision3>
3491	3491	<>	<elision2>
3491	3491	<>	<elision1>
3491	3494	.	κ
3491	3494	.	λ
3491	2207	<3s>	<>
3492	3493	<>	<aphaerese>
3492	3493	<>	<elision3>
3492	3493	<>	<elision2>
3492	3493	<>	<elision1>
3492	3496	.	κ
3492	3496	.	λ
3492	2208	<3s>	<>
3493	3491	<>	<aphaerese>
3493	3491	<>	<elision3>
3493	3491	<>	<elision2>
3493	3491	<>	<elision1>
3493	3494	.	κ
3493	3494	.	λ
3493	2206	<3s>	<>
3494	3495	<>	<name>
3494	3494	<>	<aphaerese>
3494	3497	<elision3>	<elision3>
3494	3494	<>	<elision3>
3494	3497	<elision2>	<elision2>
3494	3494	<>	<elision2>
3494	3497	<elision1>	<elision1>
3494	3494	<>	<elision1>
3494	2198	<3s>	<>
3495	3496	<>	<aphaerese>
3495	3499	<elision3>	<elision3>
3495	3496	<>	<elision3>
3495	3499	<elision2>	<elision2>
3495	3496	<>	<elision2>
3495	3499	<elision1>	<elision1>
3495	3496	<>	<elision1>
3495	2199	<3s>	<>
3496	3494	<>	<aphaerese>
3496	3497	<elision3>	<elision3>
3496	3494	<>	<elision3>
3496	3497	<elision2>	<elision2>
3496	3494	<>	<elision2>
3496	3497	<elision1>	<elision1>
3496	3494	<>	<elision1>
3496	2197	<3s>	<>
3497	3449	.	.
3497	3449	 	 
3497	3449	<~>	<~>
3497	3449	<split-s>	<split-s>
3497	3449	<split-h>	<split-h>
3497	3449	<name2>	<name2>
3497	3498	<>	<name>
3497	3452	<aphaerese>	<aphaerese>
3497	3497	<>	<aphaerese>
3497	3449	<elision3>	<elision3>
3497	3497	<>	<elision3>
3497	3449	<elision2>	<elision2>
3497	3497	<>	<elision2>
3497	3449	<elision1>	<elision1>
3497	3497	<>	<elision1>
3497	3458	.	υ
3497	3458	.	u
3497	3458	.	α
3497	3458	.	a
3497	2162	<3s>	<>
3498	3451	.	.
3498	3451	 	 
3498	3451	<~>	<~>
3498	3451	<split-s>	<split-s>
3498	3451	<split-h>	<split-h>
3498	3451	<name2>	<name2>
3498	3454	<aphaerese>	<aphaerese>
3498	3499	<>	<aphaerese>
3498	3451	<elision3>	<elision3>
3498	3499	<>	<elision3>
3498	3451	<elision2>	<elision2>
3498	3499	<>	<elision2>
3498	3451	<elision1>	<elision1>
3498	3499	<>	<elision1>
3498	3460	.	υ
3498	3460	.	u
3498	3460	.	α
3498	3460	.	a
3498	2163	<3s>	<>
3499	3449	.	.
3499	3449	 	 
3499	3449	<~>	<~>
3499	3449	<split-s>	<split-s>
3499	3449	<split-h>	<split-h>
3499	3449	<name2>	<name2>
3499	3452	<aphaerese>	<aphaerese>
3499	3497	<>	<aphaerese>
3499	3449	<elision3>	<elision3>
3499	3497	<>	<elision3>
3499	3449	<elision2>	<elision2>
3499	3497	<>	<elision2>
3499	3449	<elision1>	<elision1>
3499	3497	<>	<elision1>
3499	3458	.	υ
3499	3458	.	u
3499	3458	.	α
3499	3458	.	a
3499	2161	<3s>	<>
3500	3501	<>	<name>
3500	3500	<>	<aphaerese>
3500	3500	<>	<elision3>
3500	3500	<>	<elision2>
3500	3500	<>	<elision1>
3500	3503	.	κ
3500	3503	.	λ
3500	2240	<3s>	<>
3501	3502	<>	<aphaerese>
3501	3502	<>	<elision3>
3501	3502	<>	<elision2>
3501	3502	<>	<elision1>
3501	3505	.	κ
3501	3505	.	λ
3501	2241	<3s>	<>
3502	3500	<>	<aphaerese>
3502	3500	<>	<elision3>
3502	3500	<>	<elision2>
3502	3500	<>	<elision1>
3502	3503	.	κ
3502	3503	.	λ
3502	2239	<3s>	<>
3503	3504	<>	<name>
3503	3503	<>	<aphaerese>
3503	3506	<elision3>	<elision3>
3503	3503	<>	<elision3>
3503	3506	<elision2>	<elision2>
3503	3503	<>	<elision2>
3503	3506	<elision1>	<elision1>
3503	3503	<>	<elision1>
3503	2231	<3s>	<>
3504	3505	<>	<aphaerese>
3504	3508	<elision3>	<elision3>
3504	3505	<>	<elision3>
3504	3508	<elision2>	<elision2>
3504	3505	<>	<elision2>
3504	3508	<elision1>	<elision1>
3504	3505	<>	<elision1>
3504	2232	<3s>	<>
3505	3503	<>	<aphaerese>
3505	3506	<elision3>	<elision3>
3505	3503	<>	<elision3>
3505	3506	<elision2>	<elision2>
3505	3503	<>	<elision2>
3505	3506	<elision1>	<elision1>
3505	3503	<>	<elision1>
3505	2230	<3s>	<>
3506	3507	<>	<name>
3506	3506	<>	<aphaerese>
3506	3506	<>	<elision3>
3506	3506	<>	<elision2>
3506	3506	<>	<elision1>
3506	3455	.	κ
3506	2225	<3s>	<>
3507	3508	<>	<aphaerese>
3507	3508	<>	<elision3>
3507	3508	<>	<elision2>
3507	3508	<>	<elision1>
3507	3457	.	κ
3507	2226	<3s>	<>
3508	3506	<>	<aphaerese>
3508	3506	<>	<elision3>
3508	3506	<>	<elision2>
3508	3506	<>	<elision1>
3508	3455	.	κ
3508	2224	<3s>	<>
3509	3449	.	.
3509	3449	 	 
3509	3449	<~>	<~>
3509	3449	<split-s>	<split-s>
3509	3449	<split-h>	<split-h>
3509	3449	<name2>	<name2>
3509	3510	<>	<name>
3509	3452	<aphaerese>	<aphaerese>
3509	3509	<>	<aphaerese>
3509	3449	<elision3>	<elision3>
3509	3509	<>	<elision3>
3509	3449	<elision2>	<elision2>
3509	3509	<>	<elision2>
3509	3449	<elision1>	<elision1>
3509	3509	<>	<elision1>
3509	3458	.	υ
3509	3458	.	u
3509	3458	.	α
3509	3458	.	a
3509	2252	<3s>	<>
3510	3451	.	.
3510	3451	 	 
3510	3451	<~>	<~>
3510	3451	<split-s>	<split-s>
3510	3451	<split-h>	<split-h>
3510	3451	<name2>	<name2>
3510	3454	<aphaerese>	<aphaerese>
3510	3511	<>	<aphaerese>
3510	3451	<elision3>	<elision3>
3510	3511	<>	<elision3>
3510	3451	<elision2>	<elision2>
3510	3511	<>	<elision2>
3510	3451	<elision1>	<elision1>
3510	3511	<>	<elision1>
3510	3460	.	υ
3510	3460	.	u
3510	3460	.	α
3510	3460	.	a
3510	2253	<3s>	<>
3511	3449	.	.
3511	3449	 	 
3511	3449	<~>	<~>
3511	3449	<split-s>	<split-s>
3511	3449	<split-h>	<split-h>
3511	3449	<name2>	<name2>
3511	3452	<aphaerese>	<aphaerese>
3511	3509	<>	<aphaerese>
3511	3449	<elision3>	<elision3>
3511	3509	<>	<elision3>
3511	3449	<elision2>	<elision2>
3511	3509	<>	<elision2>
3511	3449	<elision1>	<elision1>
3511	3509	<>	<elision1>
3511	3458	.	υ
3511	3458	.	u
3511	3458	.	α
3511	3458	.	a
3511	2251	<3s>	<>
3512	3449	.	.
3512	3449	 	 
3512	3449	<~>	<~>
3512	3449	<split-s>	<split-s>
3512	3449	<split-h>	<split-h>
3512	3449	<name2>	<name2>
3512	2447	<name2>	<name>
3512	3510	<>	<name>
3512	3452	<aphaerese>	<aphaerese>
3512	3509	<>	<aphaerese>
3512	3449	<elision3>	<elision3>
3512	3509	<>	<elision3>
3512	3449	<elision2>	<elision2>
3512	3509	<>	<elision2>
3512	3449	<elision1>	<elision1>
3512	3509	<>	<elision1>
3512	3458	.	υ
3512	3458	.	u
3512	3458	.	α
3512	3458	.	a
3512	2261	<3s>	<>
3513	3514	<>	<name>
3513	3513	<>	<aphaerese>
3513	3513	<>	<elision3>
3513	3513	<>	<elision2>
3513	3513	<>	<elision1>
3513	3449	<A2kl>	<>
3514	3515	<>	<aphaerese>
3514	3515	<>	<elision3>
3514	3515	<>	<elision2>
3514	3515	<>	<elision1>
3514	3450	<A2kl>	<>
3515	3513	<>	<aphaerese>
3515	3513	<>	<elision3>
3515	3513	<>	<elision2>
3515	3513	<>	<elision1>
3515	3451	<A2kl>	<>
3516	2447	<name>	<name>
3516	3517	<>	<name>
3516	3519	<>	<aphaerese>
3516	3519	<>	<elision3>
3516	3519	<>	<elision2>
3516	3519	<>	<elision1>
3516	2257	<3s>	<>
3516	3491	<A2kl>	<>
3516	3523	<L2kl>	<>
3517	3518	<>	<aphaerese>
3517	3518	<>	<elision3>
3517	3518	<>	<elision2>
3517	3518	<>	<elision1>
3517	3492	<A2kl>	<>
3517	3521	<L2kl>	<>
3518	3519	<>	<aphaerese>
3518	3519	<>	<elision3>
3518	3519	<>	<elision2>
3518	3519	<>	<elision1>
3518	3493	<A2kl>	<>
3518	3522	<L2kl>	<>
3519	3517	<>	<name>
3519	3519	<>	<aphaerese>
3519	3519	<>	<elision3>
3519	3519	<>	<elision2>
3519	3519	<>	<elision1>
3519	3491	<A2kl>	<>
3519	3520	<L2kl>	<>
3520	3449	.	.
3520	3449	 	 
3520	3449	<~>	<~>
3520	3449	<split-s>	<split-s>
3520	3449	<split-h>	<split-h>
3520	3449	<name2>	<name2>
3520	3521	<>	<name>
3520	3452	<aphaerese>	<aphaerese>
3520	3520	<>	<aphaerese>
3520	3449	<elision3>	<elision3>
3520	3520	<>	<elision3>
3520	3449	<elision2>	<elision2>
3520	3520	<>	<elision2>
3520	3449	<elision1>	<elision1>
3520	3520	<>	<elision1>
3520	3458	.	υ
3520	3458	.	u
3520	3503	.	κ
3520	3458	.	α
3520	3458	.	a
3520	3503	.	λ
3520	2274	<3s>	<>
3521	3451	.	.
3521	3451	 	 
3521	3451	<~>	<~>
3521	3451	<split-s>	<split-s>
3521	3451	<split-h>	<split-h>
3521	3451	<name2>	<name2>
3521	3454	<aphaerese>	<aphaerese>
3521	3522	<>	<aphaerese>
3521	3451	<elision3>	<elision3>
3521	3522	<>	<elision3>
3521	3451	<elision2>	<elision2>
3521	3522	<>	<elision2>
3521	3451	<elision1>	<elision1>
3521	3522	<>	<elision1>
3521	3460	.	υ
3521	3460	.	u
3521	3505	.	κ
3521	3460	.	α
3521	3460	.	a
3521	3505	.	λ
3521	2275	<3s>	<>
3522	3449	.	.
3522	3449	 	 
3522	3449	<~>	<~>
3522	3449	<split-s>	<split-s>
3522	3449	<split-h>	<split-h>
3522	3449	<name2>	<name2>
3522	3452	<aphaerese>	<aphaerese>
3522	3520	<>	<aphaerese>
3522	3449	<elision3>	<elision3>
3522	3520	<>	<elision3>
3522	3449	<elision2>	<elision2>
3522	3520	<>	<elision2>
3522	3449	<elision1>	<elision1>
3522	3520	<>	<elision1>
3522	3458	.	υ
3522	3458	.	u
3522	3503	.	κ
3522	3458	.	α
3522	3458	.	a
3522	3503	.	λ
3522	2273	<3s>	<>
3523	3449	.	.
3523	3449	 	 
3523	3449	<~>	<~>
3523	3449	<split-s>	<split-s>
3523	3449	<split-h>	<split-h>
3523	3449	<name2>	<name2>
3523	2447	<name2>	<name>
3523	3521	<>	<name>
3523	3452	<aphaerese>	<aphaerese>
3523	3520	<>	<aphaerese>
3523	3449	<elision3>	<elision3>
3523	3520	<>	<elision3>
3523	3449	<elision2>	<elision2>
3523	3520	<>	<elision2>
3523	3449	<elision1>	<elision1>
3523	3520	<>	<elision1>
3523	3458	.	υ
3523	3458	.	u
3523	3503	.	κ
3523	3458	.	α
3523	3458	.	a
3523	3503	.	λ
3523	2280	<3s>	<>
3524	3449	.	.
3524	3449	 	 
3524	3449	<~>	<~>
3524	3449	<split-s>	<split-s>
3524	3449	<split-h>	<split-h>
3524	3449	<name2>	<name2>
3524	3461	<>	<name>
3524	3452	<aphaerese>	<aphaerese>
3524	3448	<>	<aphaerese>
3524	3448	<>	<elision3>
3524	3448	<>	<elision2>
3524	3448	<>	<elision1>
3524	3458	.	υ
3524	3458	.	u
3524	3455	.	κ
3524	3458	.	α
3524	3458	.	a
3524	2286	<3s>	<>
3525	3449	.	.
3525	3449	 	 
3525	3449	<~>	<~>
3525	3449	<split-s>	<split-s>
3525	3449	<split-h>	<split-h>
3525	3449	<name2>	<name2>
3525	3476	<>	<name>
3525	3452	<aphaerese>	<aphaerese>
3525	3475	<>	<aphaerese>
3525	3478	<elision3>	<elision3>
3525	3475	<>	<elision3>
3525	3478	<elision2>	<elision2>
3525	3475	<>	<elision2>
3525	3478	<elision1>	<elision1>
3525	3475	<>	<elision1>
3525	3458	.	υ
3525	3458	.	u
3525	3458	.	κ
3525	3458	.	α
3525	3458	.	a
3525	3458	.	λ
3525	2289	<3s>	<>
3526	3449	.	.
3526	3449	 	 
3526	3449	<~>	<~>
3526	3449	<split-s>	<split-s>
3526	3449	<split-h>	<split-h>
3526	3449	<name2>	<name2>
3526	3482	<>	<name>
3526	3452	<aphaerese>	<aphaerese>
3526	3481	<>	<aphaerese>
3526	3449	<elision3>	<elision3>
3526	3481	<>	<elision3>
3526	3449	<elision2>	<elision2>
3526	3481	<>	<elision2>
3526	3449	<elision1>	<elision1>
3526	3481	<>	<elision1>
3526	3458	.	υ
3526	3458	.	u
3526	3458	.	κ
3526	3458	.	α
3526	3458	.	a
3526	3458	.	λ
3526	2292	<3s>	<>
3527	3485	<>	<name>
3527	3484	<>	<aphaerese>
3527	3484	<>	<elision3>
3527	3484	<>	<elision2>
3527	3484	<>	<elision1>
3527	3528	<U2kl>	<>
3528	3449	.	.
3528	3449	 	 
3528	3449	<~>	<~>
3528	3449	<split-s>	<split-s>
3528	3449	<split-h>	<split-h>
3528	3449	<name2>	<name2>
3528	3450	<>	<name>
3528	3452	<aphaerese>	<aphaerese>
3528	3449	<>	<aphaerese>
3528	3449	<elision3>	<elision3>
3528	3449	<>	<elision3>
3528	3449	<elision2>	<elision2>
3528	3449	<>	<elision2>
3528	3449	<elision1>	<elision1>
3528	3449	<>	<elision1>
3528	3458	.	υ
3528	3458	.	u
3528	3455	.	κ
3528	3458	.	α
3528	3458	.	a
3528	2296	<3s>	<>
3529	2447	<name>	<name>
3529	3488	<>	<name>
3529	3490	<>	<aphaerese>
3529	3490	<>	<elision3>
3529	3490	<>	<elision2>
3529	3490	<>	<elision1>
3529	2257	<3s>	<>
3529	3491	<A2kl>	<>
3529	3500	<L2kl>	<>
3529	3530	<K2kl>	<>
3530	3449	.	.
3530	3449	 	 
3530	3449	<~>	<~>
3530	3449	<split-s>	<split-s>
3530	3449	<split-h>	<split-h>
3530	3449	<name2>	<name2>
3530	2447	<name2>	<name>
3530	3510	<>	<name>
3530	3452	<aphaerese>	<aphaerese>
3530	3509	<>	<aphaerese>
3530	3449	<elision3>	<elision3>
3530	3509	<>	<elision3>
3530	3449	<elision2>	<elision2>
3530	3509	<>	<elision2>
3530	3449	<elision1>	<elision1>
3530	3509	<>	<elision1>
3530	3458	.	υ
3530	3458	.	u
3530	3458	.	α
3530	3458	.	a
3530	2300	<3s>	<>
3531	3514	<>	<name>
3531	3513	<>	<aphaerese>
3531	3513	<>	<elision3>
3531	3513	<>	<elision2>
3531	3513	<>	<elision1>
3531	3528	<A2kl>	<>
3532	2447	<name>	<name>
3532	3517	<>	<name>
3532	3519	<>	<aphaerese>
3532	3519	<>	<elision3>
3532	3519	<>	<elision2>
3532	3519	<>	<elision1>
3532	2257	<3s>	<>
3532	3491	<A2kl>	<>
3532	3533	<L2kl>	<>
3533	3449	.	.
3533	3449	 	 
3533	3449	<~>	<~>
3533	3449	<split-s>	<split-s>
3533	3449	<split-h>	<split-h>
3533	3449	<name2>	<name2>
3533	2447	<name2>	<name>
3533	3521	<>	<name>
3533	3452	<aphaerese>	<aphaerese>
3533	3520	<>	<aphaerese>
3533	3449	<elision3>	<elision3>
3533	3520	<>	<elision3>
3533	3449	<elision2>	<elision2>
3533	3520	<>	<elision2>
3533	3449	<elision1>	<elision1>
3533	3520	<>	<elision1>
3533	3458	.	υ
3533	3458	.	u
3533	3503	.	κ
3533	3458	.	α
3533	3458	.	a
3533	3503	.	λ
3533	2305	<3s>	<>
3534	3440	.	.
3534	3441	 	 
3534	3440	<~>	<~>
3534	3440	<split-s>	<split-s>
3534	3440	<split-h>	<split-h>
3534	3440	<name2>	<name2>
3534	3444	<aphaerese>	<aphaerese>
3534	3444	<>	<aphaerese>
3534	3440	<elision3>	<elision3>
3534	3444	<>	<elision3>
3534	3440	<elision2>	<elision2>
3534	3444	<>	<elision2>
3534	3440	<elision1>	<elision1>
3534	3444	<>	<elision1>
3534	3440	.	υ
3534	3440	.	u
3534	3463	.	κ
3534	3475	s	κ
3534	3481	s	k
3534	3484	s	U
3534	3535	s	K
3534	3440	.	α
3534	3440	.	a
3534	3513	s	A
3534	3481	s	λ
3534	3481	s	l
3534	3542	s	L
3535	2447	<name>	<name>
3535	3536	<>	<name>
3535	3538	<>	<aphaerese>
3535	3538	<>	<elision3>
3535	3538	<>	<elision2>
3535	3538	<>	<elision1>
3535	2257	<3s>	<>
3535	3539	<L2kl>	<>
3535	3512	<K2kl>	<>
3536	3537	<>	<aphaerese>
3536	3537	<>	<elision3>
3536	3537	<>	<elision2>
3536	3537	<>	<elision1>
3536	3540	<L2kl>	<>
3536	3510	<K2kl>	<>
3537	3538	<>	<aphaerese>
3537	3538	<>	<elision3>
3537	3538	<>	<elision2>
3537	3538	<>	<elision1>
3537	3541	<L2kl>	<>
3537	3511	<K2kl>	<>
3538	3536	<>	<name>
3538	3538	<>	<aphaerese>
3538	3538	<>	<elision3>
3538	3538	<>	<elision2>
3538	3538	<>	<elision1>
3538	3539	<L2kl>	<>
3538	3509	<K2kl>	<>
3539	3540	<>	<name>
3539	3539	<>	<aphaerese>
3539	3539	<>	<elision3>
3539	3539	<>	<elision2>
3539	3539	<>	<elision1>
3539	3458	.	κ
3539	3458	.	λ
3539	2316	<3s>	<>
3540	3541	<>	<aphaerese>
3540	3541	<>	<elision3>
3540	3541	<>	<elision2>
3540	3541	<>	<elision1>
3540	3460	.	κ
3540	3460	.	λ
3540	2317	<3s>	<>
3541	3539	<>	<aphaerese>
3541	3539	<>	<elision3>
3541	3539	<>	<elision2>
3541	3539	<>	<elision1>
3541	3458	.	κ
3541	3458	.	λ
3541	2315	<3s>	<>
3542	2447	<name>	<name>
3542	3543	<>	<name>
3542	3545	<>	<aphaerese>
3542	3545	<>	<elision3>
3542	3545	<>	<elision2>
3542	3545	<>	<elision1>
3542	2257	<3s>	<>
3542	3546	<L2kl>	<>
3543	3544	<>	<aphaerese>
3543	3544	<>	<elision3>
3543	3544	<>	<elision2>
3543	3544	<>	<elision1>
3543	3482	<L2kl>	<>
3544	3545	<>	<aphaerese>
3544	3545	<>	<elision3>
3544	3545	<>	<elision2>
3544	3545	<>	<elision1>
3544	3483	<L2kl>	<>
3545	3543	<>	<name>
3545	3545	<>	<aphaerese>
3545	3545	<>	<elision3>
3545	3545	<>	<elision2>
3545	3545	<>	<elision1>
3545	3481	<L2kl>	<>
3546	3449	.	.
3546	3449	 	 
3546	3449	<~>	<~>
3546	3449	<split-s>	<split-s>
3546	3449	<split-h>	<split-h>
3546	3449	<name2>	<name2>
3546	2447	<name2>	<name>
3546	3482	<>	<name>
3546	3452	<aphaerese>	<aphaerese>
3546	3481	<>	<aphaerese>
3546	3449	<elision3>	<elision3>
3546	3481	<>	<elision3>
3546	3449	<elision2>	<elision2>
3546	3481	<>	<elision2>
3546	3449	<elision1>	<elision1>
3546	3481	<>	<elision1>
3546	3458	.	υ
3546	3458	.	u
3546	3458	.	κ
3546	3458	.	α
3546	3458	.	a
3546	3458	.	λ
3546	2326	<3s>	<>
3547	3440	.	.
3547	3441	 	 
3547	3440	<~>	<~>
3547	3440	<split-s>	<split-s>
3547	3440	<split-h>	<split-h>
3547	3440	<name2>	<name2>
3547	3444	<aphaerese>	<aphaerese>
3547	3447	<>	<aphaerese>
3547	3440	<elision3>	<elision3>
3547	3447	<>	<elision3>
3547	3440	<elision2>	<elision2>
3547	3447	<>	<elision2>
3547	3440	<elision1>	<elision1>
3547	3447	<>	<elision1>
3547	3437	.	υ
3547	3448	s	υ
3547	3437	.	u
3547	3448	s	u
3547	3463	.	κ
3547	3475	s	κ
3547	3481	s	k
3547	3484	s	U
3547	3487	s	K
3547	3437	.	α
3547	3448	s	α
3547	3437	.	a
3547	3448	s	a
3547	3513	s	A
3547	3481	s	λ
3547	3481	s	l
3547	3516	s	L
3548	3443	.	.
3548	3446	 	 
3548	3443	<~>	<~>
3548	3443	<split-s>	<split-s>
3548	3443	<split-h>	<split-h>
3548	3443	<name2>	<name2>
3548	3534	<aphaerese>	<aphaerese>
3548	3443	<>	<aphaerese>
3548	3443	<elision3>	<elision3>
3548	3443	<>	<elision3>
3548	3443	<elision2>	<elision2>
3548	3443	<>	<elision2>
3548	3443	<elision1>	<elision1>
3548	3443	<>	<elision1>
3548	3439	.	υ
3548	3462	s	υ
3548	3439	.	u
3548	3462	s	u
3548	3465	.	κ
3548	3477	s	κ
3548	3483	s	k
3548	3486	s	U
3548	3537	s	K
3548	3439	.	α
3548	3462	s	α
3548	3439	.	a
3548	3462	s	a
3548	3515	s	A
3548	3483	s	λ
3548	3483	s	l
3548	3544	s	L
3549	3440	.	.
3549	3441	 	 
3549	3440	<~>	<~>
3549	3440	<split-s>	<split-s>
3549	3440	<split-h>	<split-h>
3549	3440	<name2>	<name2>
3549	3550	<name2>	<name>
3549	3551	<>	<name>
3549	3444	<aphaerese>	<aphaerese>
3549	3553	<>	<aphaerese>
3549	3440	<elision3>	<elision3>
3549	3553	<>	<elision3>
3549	3440	<elision2>	<elision2>
3549	3553	<>	<elision2>
3549	3440	<elision1>	<elision1>
3549	3553	<>	<elision1>
3549	3437	.	υ
3549	3448	s	υ
3549	3437	.	u
3549	3448	s	u
3549	3437	.	κ
3549	3554	s	κ
3549	3481	s	k
3549	3484	s	U
3549	3535	s	K
3549	3437	.	α
3549	3448	s	α
3549	3437	.	a
3549	3448	s	a
3549	3513	s	A
3549	3437	.	λ
3549	3554	s	λ
3549	3481	s	l
3549	3542	s	L
3550	3537	s	k
3550	3544	s	l
3551	3443	.	.
3551	3446	 	 
3551	3443	<~>	<~>
3551	3443	<split-s>	<split-s>
3551	3443	<split-h>	<split-h>
3551	3443	<name2>	<name2>
3551	3534	<aphaerese>	<aphaerese>
3551	3552	<>	<aphaerese>
3551	3443	<elision3>	<elision3>
3551	3552	<>	<elision3>
3551	3443	<elision2>	<elision2>
3551	3552	<>	<elision2>
3551	3443	<elision1>	<elision1>
3551	3552	<>	<elision1>
3551	3439	.	υ
3551	3462	s	υ
3551	3439	.	u
3551	3462	s	u
3551	3439	.	κ
3551	3556	s	κ
3551	3483	s	k
3551	3486	s	U
3551	3537	s	K
3551	3439	.	α
3551	3462	s	α
3551	3439	.	a
3551	3462	s	a
3551	3515	s	A
3551	3439	.	λ
3551	3556	s	λ
3551	3483	s	l
3551	3544	s	L
3552	3440	.	.
3552	3441	 	 
3552	3440	<~>	<~>
3552	3440	<split-s>	<split-s>
3552	3440	<split-h>	<split-h>
3552	3440	<name2>	<name2>
3552	3444	<aphaerese>	<aphaerese>
3552	3553	<>	<aphaerese>
3552	3440	<elision3>	<elision3>
3552	3553	<>	<elision3>
3552	3440	<elision2>	<elision2>
3552	3553	<>	<elision2>
3552	3440	<elision1>	<elision1>
3552	3553	<>	<elision1>
3552	3437	.	υ
3552	3448	s	υ
3552	3437	.	u
3552	3448	s	u
3552	3437	.	κ
3552	3554	s	κ
3552	3481	s	k
3552	3484	s	U
3552	3535	s	K
3552	3437	.	α
3552	3448	s	α
3552	3437	.	a
3552	3448	s	a
3552	3513	s	A
3552	3437	.	λ
3552	3554	s	λ
3552	3481	s	l
3552	3542	s	L
3553	3440	.	.
3553	3441	 	 
3553	3440	<~>	<~>
3553	3440	<split-s>	<split-s>
3553	3440	<split-h>	<split-h>
3553	3440	<name2>	<name2>
3553	3551	<>	<name>
3553	3444	<aphaerese>	<aphaerese>
3553	3553	<>	<aphaerese>
3553	3440	<elision3>	<elision3>
3553	3553	<>	<elision3>
3553	3440	<elision2>	<elision2>
3553	3553	<>	<elision2>
3553	3440	<elision1>	<elision1>
3553	3553	<>	<elision1>
3553	3437	.	υ
3553	3448	s	υ
3553	3437	.	u
3553	3448	s	u
3553	3437	.	κ
3553	3554	s	κ
3553	3481	s	k
3553	3484	s	U
3553	3535	s	K
3553	3437	.	α
3553	3448	s	α
3553	3437	.	a
3553	3448	s	a
3553	3513	s	A
3553	3437	.	λ
3553	3554	s	λ
3553	3481	s	l
3553	3542	s	L
3554	3449	.	.
3554	3449	 	 
3554	3449	<~>	<~>
3554	3449	<split-s>	<split-s>
3554	3449	<split-h>	<split-h>
3554	3449	<name2>	<name2>
3554	3555	<>	<name>
3554	3452	<aphaerese>	<aphaerese>
3554	3554	<>	<aphaerese>
3554	3554	<>	<elision3>
3554	3554	<>	<elision2>
3554	3554	<>	<elision1>
3554	3458	.	υ
3554	3458	.	u
3554	3458	.	κ
3554	3458	.	α
3554	3458	.	a
3554	3458	.	λ
3554	2351	<3s>	<>
3555	3451	.	.
3555	3451	 	 
3555	3451	<~>	<~>
3555	3451	<split-s>	<split-s>
3555	3451	<split-h>	<split-h>
3555	3451	<name2>	<name2>
3555	3454	<aphaerese>	<aphaerese>
3555	3556	<>	<aphaerese>
3555	3556	<>	<elision3>
3555	3556	<>	<elision2>
3555	3556	<>	<elision1>
3555	3460	.	υ
3555	3460	.	u
3555	3460	.	κ
3555	3460	.	α
3555	3460	.	a
3555	3460	.	λ
3555	2352	<3s>	<>
3556	3449	.	.
3556	3449	 	 
3556	3449	<~>	<~>
3556	3449	<split-s>	<split-s>
3556	3449	<split-h>	<split-h>
3556	3449	<name2>	<name2>
3556	3452	<aphaerese>	<aphaerese>
3556	3554	<>	<aphaerese>
3556	3554	<>	<elision3>
3556	3554	<>	<elision2>
3556	3554	<>	<elision1>
3556	3458	.	υ
3556	3458	.	u
3556	3458	.	κ
3556	3458	.	α
3556	3458	.	a
3556	3458	.	λ
3556	2350	<3s>	<>
3557	3558	<>	<aphaerese>
3557	3558	<>	<elision3>
3557	3558	<>	<elision2>
3557	3558	<>	<elision1>
3557	2626	s	κ
3557	2751	s	k
3557	2769	s	K
3557	2626	s	λ
3557	2782	s	l
3557	2785	s	L
3557	1959	<1s>	<>
3557	3561	<~>	<>
3558	3559	<>	<name>
3558	3558	<>	<aphaerese>
3558	3558	<>	<elision3>
3558	3558	<>	<elision2>
3558	3558	<>	<elision1>
3558	2626	s	κ
3558	2751	s	k
3558	2769	s	K
3558	2626	s	λ
3558	2782	s	l
3558	2785	s	L
3558	1960	<1s>	<>
3558	3562	<~>	<>
3559	3557	<>	<aphaerese>
3559	3557	<>	<elision3>
3559	3557	<>	<elision2>
3559	3557	<>	<elision1>
3559	2747	s	κ
3559	2753	s	k
3559	2772	s	K
3559	2747	s	λ
3559	2784	s	l
3559	2787	s	L
3559	1961	<1s>	<>
3559	3560	<~>	<>
3560	3561	<>	<aphaerese>
3560	3561	<>	<elision3>
3560	3561	<>	<elision2>
3560	3561	<>	<elision1>
3560	3436	h	k
3560	3436	h	K
3560	3552	h	l
3560	3552	h	L
3561	3562	<>	<aphaerese>
3561	3562	<>	<elision3>
3561	3562	<>	<elision2>
3561	3562	<>	<elision1>
3561	3434	h	k
3561	3434	h	K
3561	3553	h	l
3561	3563	h	L
3562	3560	<>	<name>
3562	3562	<>	<aphaerese>
3562	3562	<>	<elision3>
3562	3562	<>	<elision2>
3562	3562	<>	<elision1>
3562	3434	h	k
3562	3434	h	K
3562	3553	h	l
3562	3563	h	L
3563	3440	.	.
3563	3441	 	 
3563	3440	<~>	<~>
3563	3440	<split-s>	<split-s>
3563	3440	<split-h>	<split-h>
3563	3440	<name2>	<name2>
3563	3550	<name2>	<name>
3563	3550	<name>	<name>
3563	3551	<>	<name>
3563	3444	<aphaerese>	<aphaerese>
3563	3553	<>	<aphaerese>
3563	3440	<elision3>	<elision3>
3563	3553	<>	<elision3>
3563	3440	<elision2>	<elision2>
3563	3553	<>	<elision2>
3563	3440	<elision1>	<elision1>
3563	3553	<>	<elision1>
3563	3437	.	υ
3563	3448	s	υ
3563	3437	.	u
3563	3448	s	u
3563	3437	.	κ
3563	3554	s	κ
3563	3481	s	k
3563	3484	s	U
3563	3535	s	K
3563	3437	.	α
3563	3448	s	α
3563	3437	.	a
3563	3448	s	a
3563	3513	s	A
3563	3437	.	λ
3563	3554	s	λ
3563	3481	s	l
3563	3542	s	L
3564	3565	<>	<aphaerese>
3564	225	<elision3>	<elision3>
3564	3565	<>	<elision3>
3564	225	<elision2>	<elision2>
3564	3565	<>	<elision2>
3564	225	<elision1>	<elision1>
3564	3565	<>	<elision1>
3564	3245	<K>	<>
3565	3566	<>	<name>
3565	3565	<>	<aphaerese>
3565	225	<elision3>	<elision3>
3565	3565	<>	<elision3>
3565	225	<elision2>	<elision2>
3565	3565	<>	<elision2>
3565	225	<elision1>	<elision1>
3565	3565	<>	<elision1>
3565	3243	<K>	<>
3566	3564	<>	<aphaerese>
3566	227	<elision3>	<elision3>
3566	3564	<>	<elision3>
3566	227	<elision2>	<elision2>
3566	3564	<>	<elision2>
3566	227	<elision1>	<elision1>
3566	3564	<>	<elision1>
3566	3244	<K>	<>
3567	215	.	.
3567	216	 	 
3567	215	<~>	<~>
3567	215	<split-s>	<split-s>
3567	215	<split-h>	<split-h>
3567	215	<name2>	<name2>
3567	219	<aphaerese>	<aphaerese>
3567	3568	<>	<aphaerese>
3567	215	<elision3>	<elision3>
3567	3568	<>	<elision3>
3567	215	<elision2>	<elision2>
3567	3568	<>	<elision2>
3567	215	<elision1>	<elision1>
3567	3568	<>	<elision1>
3567	215	.	υ
3567	215	.	u
3567	222	.	κ
3567	2813	H	κ
3567	3141	H	k
3567	3154	H	U
3567	3157	H	K
3567	215	.	α
3567	215	.	a
3567	2984	H	A
3567	3168	H	λ
3567	3571	H	l
3567	3576	H	L
3567	3242	<K>	<>
3568	215	.	.
3568	216	 	 
3568	215	<~>	<~>
3568	215	<split-s>	<split-s>
3568	215	<split-h>	<split-h>
3568	215	<name2>	<name2>
3568	3569	<>	<name>
3568	219	<aphaerese>	<aphaerese>
3568	3568	<>	<aphaerese>
3568	215	<elision3>	<elision3>
3568	3568	<>	<elision3>
3568	215	<elision2>	<elision2>
3568	3568	<>	<elision2>
3568	215	<elision1>	<elision1>
3568	3568	<>	<elision1>
3568	215	.	υ
3568	215	.	u
3568	222	.	κ
3568	2813	H	κ
3568	3141	H	k
3568	3154	H	U
3568	3157	H	K
3568	215	.	α
3568	215	.	a
3568	2984	H	A
3568	3168	H	λ
3568	3571	H	l
3568	3576	H	L
3568	3240	<K>	<>
3569	214	.	.
3569	218	 	 
3569	214	<~>	<~>
3569	214	<split-s>	<split-s>
3569	214	<split-h>	<split-h>
3569	214	<name2>	<name2>
3569	221	<aphaerese>	<aphaerese>
3569	3567	<>	<aphaerese>
3569	214	<elision3>	<elision3>
3569	3567	<>	<elision3>
3569	214	<elision2>	<elision2>
3569	3567	<>	<elision2>
3569	214	<elision1>	<elision1>
3569	3567	<>	<elision1>
3569	214	.	υ
3569	214	.	u
3569	224	.	κ
3569	3178	H	κ
3569	3182	H	k
3569	3156	H	U
3569	3186	H	K
3569	214	.	α
3569	214	.	a
3569	2987	H	A
3569	3170	H	λ
3569	3570	H	l
3569	3573	H	L
3569	3241	<K>	<>
3570	3571	<>	<aphaerese>
3570	3571	<>	<elision3>
3570	3571	<>	<elision2>
3570	3571	<>	<elision1>
3570	3432	<~>	<>
3570	3171	<l2L>	<>
3571	3572	<>	<name>
3571	3571	<>	<aphaerese>
3571	3571	<>	<elision3>
3571	3571	<>	<elision2>
3571	3571	<>	<elision1>
3571	3433	<~>	<>
3571	3172	<l2L>	<>
3572	3570	<>	<aphaerese>
3572	3570	<>	<elision3>
3572	3570	<>	<elision2>
3572	3570	<>	<elision1>
3572	3431	<~>	<>
3572	3173	<l2L>	<>
3573	2984	.	.
3573	2985	 	 
3573	2984	<~>	<~>
3573	2984	<split-s>	<split-s>
3573	2984	<split-h>	<split-h>
3573	2984	<name2>	<name2>
3573	2988	<aphaerese>	<aphaerese>
3573	3574	<>	<aphaerese>
3573	2984	<elision3>	<elision3>
3573	3574	<>	<elision3>
3573	2984	<elision2>	<elision2>
3573	3574	<>	<elision2>
3573	2984	<elision1>	<elision1>
3573	3574	<>	<elision1>
3573	2992	.	υ
3573	2995	s	υ
3573	2992	.	u
3573	2995	s	u
3573	2992	.	κ
3573	2626	s	κ
3573	2751	s	k
3573	3041	s	U
3573	2769	s	K
3573	2992	.	α
3573	3066	s	α
3573	2992	.	a
3573	3066	s	a
3573	3069	s	A
3573	2992	.	λ
3573	2626	s	λ
3573	2782	s	l
3573	2785	s	L
3573	2136	<1s>	<>
3573	3561	<~>	<>
3574	2984	.	.
3574	2985	 	 
3574	2984	<~>	<~>
3574	2984	<split-s>	<split-s>
3574	2984	<split-h>	<split-h>
3574	2984	<name2>	<name2>
3574	3575	<>	<name>
3574	2988	<aphaerese>	<aphaerese>
3574	3574	<>	<aphaerese>
3574	2984	<elision3>	<elision3>
3574	3574	<>	<elision3>
3574	2984	<elision2>	<elision2>
3574	3574	<>	<elision2>
3574	2984	<elision1>	<elision1>
3574	3574	<>	<elision1>
3574	2992	.	υ
3574	2995	s	υ
3574	2992	.	u
3574	2995	s	u
3574	2992	.	κ
3574	2626	s	κ
3574	2751	s	k
3574	3041	s	U
3574	2769	s	K
3574	2992	.	α
3574	3066	s	α
3574	2992	.	a
3574	3066	s	a
3574	3069	s	A
3574	2992	.	λ
3574	2626	s	λ
3574	2782	s	l
3574	2785	s	L
3574	2137	<1s>	<>
3574	3562	<~>	<>
3575	2987	.	.
3575	2990	 	 
3575	2987	<~>	<~>
3575	2987	<split-s>	<split-s>
3575	2987	<split-h>	<split-h>
3575	2987	<name2>	<name2>
3575	3096	<aphaerese>	<aphaerese>
3575	3573	<>	<aphaerese>
3575	2987	<elision3>	<elision3>
3575	3573	<>	<elision3>
3575	2987	<elision2>	<elision2>
3575	3573	<>	<elision2>
3575	2987	<elision1>	<elision1>
3575	3573	<>	<elision1>
3575	2994	.	υ
3575	2997	s	υ
3575	2994	.	u
3575	2997	s	u
3575	2994	.	κ
3575	2747	s	κ
3575	2753	s	k
3575	3043	s	U
3575	2772	s	K
3575	2994	.	α
3575	3068	s	α
3575	2994	.	a
3575	3068	s	a
3575	3071	s	A
3575	2994	.	λ
3575	2747	s	λ
3575	2784	s	l
3575	2787	s	L
3575	2138	<1s>	<>
3575	3560	<~>	<>
3576	2984	.	.
3576	2985	 	 
3576	2984	<~>	<~>
3576	2984	<split-s>	<split-s>
3576	2984	<split-h>	<split-h>
3576	2984	<name2>	<name2>
3576	3164	<name2>	<name>
3576	3575	<>	<name>
3576	2988	<aphaerese>	<aphaerese>
3576	3574	<>	<aphaerese>
3576	2984	<elision3>	<elision3>
3576	3574	<>	<elision3>
3576	2984	<elision2>	<elision2>
3576	3574	<>	<elision2>
3576	2984	<elision1>	<elision1>
3576	3574	<>	<elision1>
3576	2992	.	υ
3576	2995	s	υ
3576	2992	.	u
3576	2995	s	u
3576	2992	.	κ
3576	2626	s	κ
3576	2751	s	k
3576	3041	s	U
3576	2769	s	K
3576	2992	.	α
3576	3066	s	α
3576	2992	.	a
3576	3066	s	a
3576	3069	s	A
3576	2992	.	λ
3576	2626	s	λ
3576	2782	s	l
3576	2785	s	L
3576	2326	<1s>	<>
3576	3562	<~>	<>
3576	3163	<l2L>	<>
3577	3578	<>	<name>
3577	3577	<>	<aphaerese>
3577	3413	<elision3>	<elision3>
3577	3577	<>	<elision3>
3577	3413	<elision2>	<elision2>
3577	3577	<>	<elision2>
3577	3413	<elision1>	<elision1>
3577	3577	<>	<elision1>
3577	212	<4s>	<>
3578	3579	<>	<aphaerese>
3578	3415	<elision3>	<elision3>
3578	3579	<>	<elision3>
3578	3415	<elision2>	<elision2>
3578	3579	<>	<elision2>
3578	3415	<elision1>	<elision1>
3578	3579	<>	<elision1>
3578	213	<4s>	<>
3579	3577	<>	<aphaerese>
3579	3413	<elision3>	<elision3>
3579	3577	<>	<elision3>
3579	3413	<elision2>	<elision2>
3579	3577	<>	<elision2>
3579	3413	<elision1>	<elision1>
3579	3577	<>	<elision1>
3579	211	<4s>	<>
3580	215	.	.
3580	216	 	 
3580	215	<~>	<~>
3580	215	<split-s>	<split-s>
3580	215	<split-h>	<split-h>
3580	215	<name2>	<name2>
3580	219	<aphaerese>	<aphaerese>
3580	3581	<>	<aphaerese>
3580	215	<elision3>	<elision3>
3580	3581	<>	<elision3>
3580	215	<elision2>	<elision2>
3580	3581	<>	<elision2>
3580	215	<elision1>	<elision1>
3580	3581	<>	<elision1>
3580	3187	.	υ
3580	3231	H	υ
3580	3187	.	u
3580	3233	H	u
3580	222	.	κ
3580	2813	H	κ
3580	3141	H	k
3580	3154	H	U
3580	3157	H	K
3580	3187	.	α
3580	3217	H	α
3580	3187	.	a
3580	3222	H	a
3580	2984	H	A
3580	3168	H	λ
3580	3571	H	l
3580	3576	H	L
3580	3239	<K>	<>
3581	215	.	.
3581	216	 	 
3581	215	<~>	<~>
3581	215	<split-s>	<split-s>
3581	215	<split-h>	<split-h>
3581	215	<name2>	<name2>
3581	3582	<>	<name>
3581	219	<aphaerese>	<aphaerese>
3581	3581	<>	<aphaerese>
3581	215	<elision3>	<elision3>
3581	3581	<>	<elision3>
3581	215	<elision2>	<elision2>
3581	3581	<>	<elision2>
3581	215	<elision1>	<elision1>
3581	3581	<>	<elision1>
3581	3187	.	υ
3581	3231	H	υ
3581	3187	.	u
3581	3233	H	u
3581	222	.	κ
3581	2813	H	κ
3581	3141	H	k
3581	3154	H	U
3581	3157	H	K
3581	3187	.	α
3581	3217	H	α
3581	3187	.	a
3581	3222	H	a
3581	2984	H	A
3581	3168	H	λ
3581	3571	H	l
3581	3576	H	L
3581	3237	<K>	<>
3582	214	.	.
3582	218	 	 
3582	214	<~>	<~>
3582	214	<split-s>	<split-s>
3582	214	<split-h>	<split-h>
3582	214	<name2>	<name2>
3582	221	<aphaerese>	<aphaerese>
3582	3580	<>	<aphaerese>
3582	214	<elision3>	<elision3>
3582	3580	<>	<elision3>
3582	214	<elision2>	<elision2>
3582	3580	<>	<elision2>
3582	214	<elision1>	<elision1>
3582	3580	<>	<elision1>
3582	3189	.	υ
3582	3226	H	υ
3582	3189	.	u
3582	3230	H	u
3582	224	.	κ
3582	3178	H	κ
3582	3182	H	k
3582	3156	H	U
3582	3186	H	K
3582	3189	.	α
3582	3216	H	α
3582	3189	.	a
3582	3221	H	a
3582	2987	H	A
3582	3170	H	λ
3582	3570	H	l
3582	3573	H	L
3582	3238	<K>	<>
3583	3415	.	.
3583	3415	 	 
3583	3415	<~>	<~>
3583	3415	<split-s>	<split-s>
3583	3415	<split-h>	<split-h>
3583	3415	<name2>	<name2>
3583	3418	<aphaerese>	<aphaerese>
3583	3584	<>	<aphaerese>
3583	3584	<>	<elision3>
3583	3584	<>	<elision2>
3583	3584	<>	<elision1>
3583	3579	.	υ
3583	3579	.	u
3583	3421	.	κ
3583	3579	.	α
3583	3579	.	a
3583	3587	<4s>	<>
3584	3413	.	.
3584	3413	 	 
3584	3413	<~>	<~>
3584	3413	<split-s>	<split-s>
3584	3413	<split-h>	<split-h>
3584	3413	<name2>	<name2>
3584	3416	<aphaerese>	<aphaerese>
3584	3412	<>	<aphaerese>
3584	3412	<>	<elision3>
3584	3412	<>	<elision2>
3584	3412	<>	<elision1>
3584	3577	.	υ
3584	3577	.	u
3584	3419	.	κ
3584	3577	.	α
3584	3577	.	a
3584	3585	<4s>	<>
3585	215	.	.
3585	216	 	 
3585	215	<~>	<~>
3585	215	<split-s>	<split-s>
3585	215	<split-h>	<split-h>
3585	215	<name2>	<name2>
3585	219	<aphaerese>	<aphaerese>
3585	3586	<>	<aphaerese>
3585	3586	<>	<elision3>
3585	3586	<>	<elision2>
3585	3586	<>	<elision1>
3585	3187	.	υ
3585	3231	H	υ
3585	3187	.	u
3585	3233	H	u
3585	222	.	κ
3585	2813	H	κ
3585	3141	H	k
3585	3154	H	U
3585	3157	H	K
3585	3187	.	α
3585	3217	H	α
3585	3187	.	a
3585	3222	H	a
3585	2984	H	A
3585	3168	H	λ
3585	3571	H	l
3585	3576	H	L
3585	3589	<K>	<>
3586	215	.	.
3586	216	 	 
3586	215	<~>	<~>
3586	215	<split-s>	<split-s>
3586	215	<split-h>	<split-h>
3586	215	<name2>	<name2>
3586	3587	<>	<name>
3586	219	<aphaerese>	<aphaerese>
3586	3586	<>	<aphaerese>
3586	3586	<>	<elision3>
3586	3586	<>	<elision2>
3586	3586	<>	<elision1>
3586	3187	.	υ
3586	3231	H	υ
3586	3187	.	u
3586	3233	H	u
3586	222	.	κ
3586	2813	H	κ
3586	3141	H	k
3586	3154	H	U
3586	3157	H	K
3586	3187	.	α
3586	3217	H	α
3586	3187	.	a
3586	3222	H	a
3586	2984	H	A
3586	3168	H	λ
3586	3571	H	l
3586	3576	H	L
3586	3590	<K>	<>
3587	214	.	.
3587	218	 	 
3587	214	<~>	<~>
3587	214	<split-s>	<split-s>
3587	214	<split-h>	<split-h>
3587	214	<name2>	<name2>
3587	221	<aphaerese>	<aphaerese>
3587	3585	<>	<aphaerese>
3587	3585	<>	<elision3>
3587	3585	<>	<elision2>
3587	3585	<>	<elision1>
3587	3189	.	υ
3587	3226	H	υ
3587	3189	.	u
3587	3230	H	u
3587	224	.	κ
3587	3178	H	κ
3587	3182	H	k
3587	3156	H	U
3587	3186	H	K
3587	3189	.	α
3587	3216	H	α
3587	3189	.	a
3587	3221	H	a
3587	2987	H	A
3587	3170	H	λ
3587	3570	H	l
3587	3573	H	L
3587	3588	<K>	<>
3588	3239	.	.
3588	3239	<~>	<~>
3588	3239	<split-s>	<split-s>
3588	3239	<split-h>	<split-h>
3588	3239	<name2>	<name2>
3588	3242	<aphaerese>	<aphaerese>
3588	3589	<>	<aphaerese>
3588	3589	<>	<elision3>
3588	3589	<>	<elision2>
3588	3589	<>	<elision1>
3588	3235	.	υ
3588	3381	H	υ
3588	3235	.	u
3588	3390	H	u
3588	3245	.	κ
3588	3296	H	κ
3588	3350	H	k
3588	3359	H	U
3588	3363	H	K
3588	3235	.	α
3588	3393	H	α
3588	3235	.	a
3588	3396	H	a
3588	3330	H	A
3588	3371	H	λ
3588	3377	H	l
3588	3372	H	L
3589	3237	.	.
3589	3237	<~>	<~>
3589	3237	<split-s>	<split-s>
3589	3237	<split-h>	<split-h>
3589	3237	<name2>	<name2>
3589	3240	<aphaerese>	<aphaerese>
3589	3590	<>	<aphaerese>
3589	3590	<>	<elision3>
3589	3590	<>	<elision2>
3589	3590	<>	<elision1>
3589	3236	.	υ
3589	3379	H	υ
3589	3236	.	u
3589	3388	H	u
3589	3243	.	κ
3589	3294	H	κ
3589	3348	H	k
3589	3357	H	U
3589	3360	H	K
3589	3236	.	α
3589	3391	H	α
3589	3236	.	a
3589	3394	H	a
3589	3328	H	A
3589	3369	H	λ
3589	3375	H	l
3589	3378	H	L
3590	3237	.	.
3590	3237	<~>	<~>
3590	3237	<split-s>	<split-s>
3590	3237	<split-h>	<split-h>
3590	3237	<name2>	<name2>
3590	3588	<>	<name>
3590	3240	<aphaerese>	<aphaerese>
3590	3590	<>	<aphaerese>
3590	3590	<>	<elision3>
3590	3590	<>	<elision2>
3590	3590	<>	<elision1>
3590	3236	.	υ
3590	3379	H	υ
3590	3236	.	u
3590	3388	H	u
3590	3243	.	κ
3590	3294	H	κ
3590	3348	H	k
3590	3357	H	U
3590	3360	H	K
3590	3236	.	α
3590	3391	H	α
3590	3236	.	a
3590	3394	H	a
3590	3328	H	A
3590	3369	H	λ
3590	3375	H	l
3590	3378	H	L
3591	3592	<>	<name>
3591	3591	<>	<aphaerese>
3591	3594	<elision3>	<elision3>
3591	3591	<>	<elision3>
3591	3594	<elision2>	<elision2>
3591	3591	<>	<elision2>
3591	3594	<elision1>	<elision1>
3591	3591	<>	<elision1>
3591	3660	<split-h>	<>
3592	3593	<>	<aphaerese>
3592	3596	<elision3>	<elision3>
3592	3593	<>	<elision3>
3592	3596	<elision2>	<elision2>
3592	3593	<>	<elision2>
3592	3596	<elision1>	<elision1>
3592	3593	<>	<elision1>
3592	3661	<split-h>	<>
3593	3591	<>	<aphaerese>
3593	3594	<elision3>	<elision3>
3593	3591	<>	<elision3>
3593	3594	<elision2>	<elision2>
3593	3591	<>	<elision2>
3593	3594	<elision1>	<elision1>
3593	3591	<>	<elision1>
3593	3659	<split-h>	<>
3594	3595	<>	<name>
3594	3594	<>	<aphaerese>
3594	3594	<>	<elision3>
3594	3594	<>	<elision2>
3594	3594	<>	<elision1>
3594	3597	s	κ
3594	3597	s	k
3594	3650	s	K
3594	3597	s	λ
3594	3597	s	l
3594	3653	s	L
3594	3657	<split-h>	<>
3595	3596	<>	<aphaerese>
3595	3596	<>	<elision3>
3595	3596	<>	<elision2>
3595	3596	<>	<elision1>
3595	3599	s	κ
3595	3599	s	k
3595	3652	s	K
3595	3599	s	λ
3595	3599	s	l
3595	3655	s	L
3595	3658	<split-h>	<>
3596	3594	<>	<aphaerese>
3596	3594	<>	<elision3>
3596	3594	<>	<elision2>
3596	3594	<>	<elision1>
3596	3597	s	κ
3596	3597	s	k
3596	3650	s	K
3596	3597	s	λ
3596	3597	s	l
3596	3653	s	L
3596	3656	<split-h>	<>
3597	3598	<>	<name>
3597	3597	<>	<aphaerese>
3597	3597	<>	<elision3>
3597	3597	<>	<elision2>
3597	3597	<>	<elision1>
3597	3601	<4s>	<>
3598	3599	<>	<aphaerese>
3598	3599	<>	<elision3>
3598	3599	<>	<elision2>
3598	3599	<>	<elision1>
3598	3602	<4s>	<>
3599	3597	<>	<aphaerese>
3599	3597	<>	<elision3>
3599	3597	<>	<elision2>
3599	3597	<>	<elision1>
3599	3600	<4s>	<>
3600	3601	<>	<aphaerese>
3600	3601	<>	<elision3>
3600	3601	<>	<elision2>
3600	3601	<>	<elision1>
3600	3646	H	κ
3600	3141	H	k
3600	3157	H	K
3600	3623	H	λ
3600	3571	H	l
3600	3576	H	L
3600	3629	<K>	<>
3601	3602	<>	<name>
3601	3601	<>	<aphaerese>
3601	3601	<>	<elision3>
3601	3601	<>	<elision2>
3601	3601	<>	<elision1>
3601	3646	H	κ
3601	3141	H	k
3601	3157	H	K
3601	3623	H	λ
3601	3571	H	l
3601	3576	H	L
3601	3630	<K>	<>
3602	3600	<>	<aphaerese>
3602	3600	<>	<elision3>
3602	3600	<>	<elision2>
3602	3600	<>	<elision1>
3602	3603	H	κ
3602	3182	H	k
3602	3186	H	K
3602	3622	H	λ
3602	3570	H	l
3602	3573	H	L
3602	3628	<K>	<>
3603	3604	<>	<aphaerese>
3603	3604	<>	<elision3>
3603	3604	<>	<elision2>
3603	3604	<>	<elision1>
3603	3607	<kappa2K>	<>
3603	3619	<kappa2L>	<>
3603	3137	<lambda2L>	<>
3604	3605	<>	<name>
3604	3604	<>	<aphaerese>
3604	3604	<>	<elision3>
3604	3604	<>	<elision2>
3604	3604	<>	<elision1>
3604	3608	<kappa2K>	<>
3604	3611	<kappa2L>	<>
3604	3135	<lambda2L>	<>
3605	3606	<>	<aphaerese>
3605	3606	<>	<elision3>
3605	3606	<>	<elision2>
3605	3606	<>	<elision1>
3605	3609	<kappa2K>	<>
3605	3612	<kappa2L>	<>
3605	3136	<lambda2L>	<>
3606	3604	<>	<aphaerese>
3606	3604	<>	<elision3>
3606	3604	<>	<elision2>
3606	3604	<>	<elision1>
3606	3607	<kappa2K>	<>
3606	3610	<kappa2L>	<>
3606	3137	<lambda2L>	<>
3607	2818	.	.
3607	2819	 	 
3607	2818	<~>	<~>
3607	2818	<split-s>	<split-s>
3607	2818	<split-h>	<split-h>
3607	2818	<name2>	<name2>
3607	2822	<aphaerese>	<aphaerese>
3607	3608	<>	<aphaerese>
3607	3608	<>	<elision3>
3607	3608	<>	<elision2>
3607	3608	<>	<elision1>
3607	2826	.	υ
3607	2829	s	υ
3607	2826	.	u
3607	2829	s	u
3607	235	s	κ
3607	2567	s	k
3607	2892	s	U
3607	2600	s	K
3607	2826	.	α
3607	2920	s	α
3607	2826	.	a
3607	2920	s	a
3607	2923	s	A
3607	235	s	λ
3607	2615	s	l
3607	2618	s	L
3608	2818	.	.
3608	2819	 	 
3608	2818	<~>	<~>
3608	2818	<split-s>	<split-s>
3608	2818	<split-h>	<split-h>
3608	2818	<name2>	<name2>
3608	3609	<>	<name>
3608	2822	<aphaerese>	<aphaerese>
3608	3608	<>	<aphaerese>
3608	3608	<>	<elision3>
3608	3608	<>	<elision2>
3608	3608	<>	<elision1>
3608	2826	.	υ
3608	2829	s	υ
3608	2826	.	u
3608	2829	s	u
3608	235	s	κ
3608	2567	s	k
3608	2892	s	U
3608	2600	s	K
3608	2826	.	α
3608	2920	s	α
3608	2826	.	a
3608	2920	s	a
3608	2923	s	A
3608	235	s	λ
3608	2615	s	l
3608	2618	s	L
3609	2821	.	.
3609	2824	 	 
3609	2821	<~>	<~>
3609	2821	<split-s>	<split-s>
3609	2821	<split-h>	<split-h>
3609	2821	<name2>	<name2>
3609	2950	<aphaerese>	<aphaerese>
3609	3607	<>	<aphaerese>
3609	3607	<>	<elision3>
3609	3607	<>	<elision2>
3609	3607	<>	<elision1>
3609	2828	.	υ
3609	2831	s	υ
3609	2828	.	u
3609	2831	s	u
3609	2560	s	κ
3609	2569	s	k
3609	2894	s	U
3609	2603	s	K
3609	2828	.	α
3609	2922	s	α
3609	2828	.	a
3609	2922	s	a
3609	2925	s	A
3609	2560	s	λ
3609	2617	s	l
3609	2620	s	L
3610	2984	.	.
3610	2985	 	 
3610	2984	<~>	<~>
3610	2984	<split-s>	<split-s>
3610	2984	<split-h>	<split-h>
3610	2984	<name2>	<name2>
3610	2988	<aphaerese>	<aphaerese>
3610	3611	<>	<aphaerese>
3610	3611	<>	<elision3>
3610	3611	<>	<elision2>
3610	3611	<>	<elision1>
3610	2992	.	υ
3610	2995	s	υ
3610	2992	.	u
3610	2995	s	u
3610	2626	s	κ
3610	2751	s	k
3610	3041	s	U
3610	2769	s	K
3610	2992	.	α
3610	3066	s	α
3610	2992	.	a
3610	3066	s	a
3610	3069	s	A
3610	2626	s	λ
3610	2782	s	l
3610	2785	s	L
3610	3614	<1s>	<>
3611	2984	.	.
3611	2985	 	 
3611	2984	<~>	<~>
3611	2984	<split-s>	<split-s>
3611	2984	<split-h>	<split-h>
3611	2984	<name2>	<name2>
3611	3612	<>	<name>
3611	2988	<aphaerese>	<aphaerese>
3611	3611	<>	<aphaerese>
3611	3611	<>	<elision3>
3611	3611	<>	<elision2>
3611	3611	<>	<elision1>
3611	2992	.	υ
3611	2995	s	υ
3611	2992	.	u
3611	2995	s	u
3611	2626	s	κ
3611	2751	s	k
3611	3041	s	U
3611	2769	s	K
3611	2992	.	α
3611	3066	s	α
3611	2992	.	a
3611	3066	s	a
3611	3069	s	A
3611	2626	s	λ
3611	2782	s	l
3611	2785	s	L
3611	3615	<1s>	<>
3612	2987	.	.
3612	2990	 	 
3612	2987	<~>	<~>
3612	2987	<split-s>	<split-s>
3612	2987	<split-h>	<split-h>
3612	2987	<name2>	<name2>
3612	3096	<aphaerese>	<aphaerese>
3612	3610	<>	<aphaerese>
3612	3610	<>	<elision3>
3612	3610	<>	<elision2>
3612	3610	<>	<elision1>
3612	2994	.	υ
3612	2997	s	υ
3612	2994	.	u
3612	2997	s	u
3612	2747	s	κ
3612	2753	s	k
3612	3043	s	U
3612	2772	s	K
3612	2994	.	α
3612	3068	s	α
3612	2994	.	a
3612	3068	s	a
3612	3071	s	A
3612	2747	s	λ
3612	2784	s	l
3612	2787	s	L
3612	3613	<1s>	<>
3613	250	.	.
3613	254	 	 
3613	250	<~>	<~>
3613	250	<split-s>	<split-s>
3613	250	<split-h>	<split-h>
3613	250	<name2>	<name2>
3613	257	<aphaerese>	<aphaerese>
3613	3614	<>	<aphaerese>
3613	3614	<>	<elision3>
3613	3614	<>	<elision2>
3613	3614	<>	<elision1>
3613	1548	.	υ
3613	1585	H	υ
3613	1548	.	u
3613	1589	H	u
3613	1962	H	κ
3613	1541	H	k
3613	1515	H	U
3613	1545	H	K
3613	1548	.	α
3613	1575	H	α
3613	1548	.	a
3613	1580	H	a
3613	1346	H	A
3613	1981	H	λ
3613	1929	H	l
3613	1932	H	L
3613	3617	<K>	<>
3614	251	.	.
3614	252	 	 
3614	251	<~>	<~>
3614	251	<split-s>	<split-s>
3614	251	<split-h>	<split-h>
3614	251	<name2>	<name2>
3614	255	<aphaerese>	<aphaerese>
3614	3615	<>	<aphaerese>
3614	3615	<>	<elision3>
3614	3615	<>	<elision2>
3614	3615	<>	<elision1>
3614	1546	.	υ
3614	1590	H	υ
3614	1546	.	u
3614	1592	H	u
3614	2005	H	κ
3614	1500	H	k
3614	1513	H	U
3614	1516	H	K
3614	1546	.	α
3614	1576	H	α
3614	1546	.	a
3614	1581	H	a
3614	1343	H	A
3614	1982	H	λ
3614	1930	H	l
3614	1935	H	L
3614	3618	<K>	<>
3615	251	.	.
3615	252	 	 
3615	251	<~>	<~>
3615	251	<split-s>	<split-s>
3615	251	<split-h>	<split-h>
3615	251	<name2>	<name2>
3615	3613	<>	<name>
3615	255	<aphaerese>	<aphaerese>
3615	3615	<>	<aphaerese>
3615	3615	<>	<elision3>
3615	3615	<>	<elision2>
3615	3615	<>	<elision1>
3615	1546	.	υ
3615	1590	H	υ
3615	1546	.	u
3615	1592	H	u
3615	2005	H	κ
3615	1500	H	k
3615	1513	H	U
3615	1516	H	K
3615	1546	.	α
3615	1576	H	α
3615	1546	.	a
3615	1581	H	a
3615	1343	H	A
3615	1982	H	λ
3615	1930	H	l
3615	1935	H	L
3615	3616	<K>	<>
3616	1596	.	.
3616	1596	<~>	<~>
3616	1596	<split-s>	<split-s>
3616	1596	<split-h>	<split-h>
3616	1596	<name2>	<name2>
3616	3617	<>	<name>
3616	1599	<aphaerese>	<aphaerese>
3616	3616	<>	<aphaerese>
3616	3616	<>	<elision3>
3616	3616	<>	<elision2>
3616	3616	<>	<elision1>
3616	1595	.	υ
3616	1738	H	υ
3616	1595	.	u
3616	1747	H	u
3616	1990	H	κ
3616	1707	H	k
3616	1716	H	U
3616	1719	H	K
3616	1595	.	α
3616	1750	H	α
3616	1595	.	a
3616	1753	H	a
3616	1687	H	A
3616	1999	H	λ
3616	1734	H	l
3616	1737	H	L
3617	1598	.	.
3617	1598	<~>	<~>
3617	1598	<split-s>	<split-s>
3617	1598	<split-h>	<split-h>
3617	1598	<name2>	<name2>
3617	1601	<aphaerese>	<aphaerese>
3617	3618	<>	<aphaerese>
3617	3618	<>	<elision3>
3617	3618	<>	<elision2>
3617	3618	<>	<elision1>
3617	1594	.	υ
3617	1740	H	υ
3617	1594	.	u
3617	1749	H	u
3617	1992	H	κ
3617	1709	H	k
3617	1718	H	U
3617	1722	H	K
3617	1594	.	α
3617	1752	H	α
3617	1594	.	a
3617	1755	H	a
3617	1689	H	A
3617	2001	H	λ
3617	1736	H	l
3617	1731	H	L
3618	1596	.	.
3618	1596	<~>	<~>
3618	1596	<split-s>	<split-s>
3618	1596	<split-h>	<split-h>
3618	1596	<name2>	<name2>
3618	1599	<aphaerese>	<aphaerese>
3618	3616	<>	<aphaerese>
3618	3616	<>	<elision3>
3618	3616	<>	<elision2>
3618	3616	<>	<elision1>
3618	1595	.	υ
3618	1738	H	υ
3618	1595	.	u
3618	1747	H	u
3618	1990	H	κ
3618	1707	H	k
3618	1716	H	U
3618	1719	H	K
3618	1595	.	α
3618	1750	H	α
3618	1595	.	a
3618	1753	H	a
3618	1687	H	A
3618	1999	H	λ
3618	1734	H	l
3618	1737	H	L
3619	2984	.	.
3619	2985	 	 
3619	2984	<~>	<~>
3619	2984	<split-s>	<split-s>
3619	2984	<split-h>	<split-h>
3619	2984	<name2>	<name2>
3619	2988	<aphaerese>	<aphaerese>
3619	3611	<>	<aphaerese>
3619	3611	<>	<elision3>
3619	3611	<>	<elision2>
3619	3611	<>	<elision1>
3619	2992	.	υ
3619	2995	s	υ
3619	2992	.	u
3619	2995	s	u
3619	2626	s	κ
3619	2751	s	k
3619	3041	s	U
3619	2769	s	K
3619	2992	.	α
3619	3066	s	α
3619	2992	.	a
3619	3066	s	a
3619	3069	s	A
3619	2626	s	λ
3619	2782	s	l
3619	2785	s	L
3619	3620	<1s>	<>
3620	251	.	.
3620	252	 	 
3620	251	<~>	<~>
3620	251	<split-s>	<split-s>
3620	251	<split-h>	<split-h>
3620	251	<name2>	<name2>
3620	255	<aphaerese>	<aphaerese>
3620	3615	<>	<aphaerese>
3620	3615	<>	<elision3>
3620	3615	<>	<elision2>
3620	3615	<>	<elision1>
3620	1546	.	υ
3620	1546	.	u
3620	1546	.	α
3620	1546	.	a
3620	3621	<K>	<>
3621	1596	.	.
3621	1596	<~>	<~>
3621	1596	<split-s>	<split-s>
3621	1596	<split-h>	<split-h>
3621	1596	<name2>	<name2>
3621	1599	<aphaerese>	<aphaerese>
3621	3616	<>	<aphaerese>
3621	3616	<>	<elision3>
3621	3616	<>	<elision2>
3621	3616	<>	<elision1>
3621	1595	.	υ
3621	1595	.	u
3621	1595	.	α
3621	1595	.	a
3622	3623	<>	<aphaerese>
3622	3623	<>	<elision3>
3622	3623	<>	<elision2>
3622	3623	<>	<elision1>
3622	3626	<lambda2L>	<>
3623	3624	<>	<name>
3623	3623	<>	<aphaerese>
3623	3623	<>	<elision3>
3623	3623	<>	<elision2>
3623	3623	<>	<elision1>
3623	3627	<lambda2L>	<>
3624	3622	<>	<aphaerese>
3624	3622	<>	<elision3>
3624	3622	<>	<elision2>
3624	3622	<>	<elision1>
3624	3625	<lambda2L>	<>
3625	2987	.	.
3625	2990	 	 
3625	2987	<~>	<~>
3625	2987	<split-s>	<split-s>
3625	2987	<split-h>	<split-h>
3625	2987	<name2>	<name2>
3625	3096	<aphaerese>	<aphaerese>
3625	3626	<>	<aphaerese>
3625	3626	<>	<elision3>
3625	3626	<>	<elision2>
3625	3626	<>	<elision1>
3625	2994	.	υ
3625	2997	s	υ
3625	2994	.	u
3625	2997	s	u
3625	2994	.	κ
3625	2747	s	κ
3625	2753	s	k
3625	3043	s	U
3625	2772	s	K
3625	2994	.	α
3625	3068	s	α
3625	2994	.	a
3625	3068	s	a
3625	3071	s	A
3625	2994	.	λ
3625	2747	s	λ
3625	2784	s	l
3625	2787	s	L
3625	2352	<1s>	<>
3626	2984	.	.
3626	2985	 	 
3626	2984	<~>	<~>
3626	2984	<split-s>	<split-s>
3626	2984	<split-h>	<split-h>
3626	2984	<name2>	<name2>
3626	2988	<aphaerese>	<aphaerese>
3626	3627	<>	<aphaerese>
3626	3627	<>	<elision3>
3626	3627	<>	<elision2>
3626	3627	<>	<elision1>
3626	2992	.	υ
3626	2995	s	υ
3626	2992	.	u
3626	2995	s	u
3626	2992	.	κ
3626	2626	s	κ
3626	2751	s	k
3626	3041	s	U
3626	2769	s	K
3626	2992	.	α
3626	3066	s	α
3626	2992	.	a
3626	3066	s	a
3626	3069	s	A
3626	2992	.	λ
3626	2626	s	λ
3626	2782	s	l
3626	2785	s	L
3626	2350	<1s>	<>
3627	2984	.	.
3627	2985	 	 
3627	2984	<~>	<~>
3627	2984	<split-s>	<split-s>
3627	2984	<split-h>	<split-h>
3627	2984	<name2>	<name2>
3627	3625	<>	<name>
3627	2988	<aphaerese>	<aphaerese>
3627	3627	<>	<aphaerese>
3627	3627	<>	<elision3>
3627	3627	<>	<elision2>
3627	3627	<>	<elision1>
3627	2992	.	υ
3627	2995	s	υ
3627	2992	.	u
3627	2995	s	u
3627	2992	.	κ
3627	2626	s	κ
3627	2751	s	k
3627	3041	s	U
3627	2769	s	K
3627	2992	.	α
3627	3066	s	α
3627	2992	.	a
3627	3066	s	a
3627	3069	s	A
3627	2992	.	λ
3627	2626	s	λ
3627	2782	s	l
3627	2785	s	L
3627	2351	<1s>	<>
3628	3629	<>	<aphaerese>
3628	3629	<>	<elision3>
3628	3629	<>	<elision2>
3628	3629	<>	<elision1>
3628	3633	H	κ
3628	3350	H	k
3628	3363	H	K
3628	3642	H	λ
3628	3377	H	l
3628	3372	H	L
3629	3630	<>	<aphaerese>
3629	3630	<>	<elision3>
3629	3630	<>	<elision2>
3629	3630	<>	<elision1>
3629	3631	H	κ
3629	3348	H	k
3629	3360	H	K
3629	3640	H	λ
3629	3375	H	l
3629	3378	H	L
3630	3628	<>	<name>
3630	3630	<>	<aphaerese>
3630	3630	<>	<elision3>
3630	3630	<>	<elision2>
3630	3630	<>	<elision1>
3630	3631	H	κ
3630	3348	H	k
3630	3360	H	K
3630	3640	H	λ
3630	3375	H	l
3630	3378	H	L
3631	3632	<>	<name>
3631	3631	<>	<aphaerese>
3631	3631	<>	<elision3>
3631	3631	<>	<elision2>
3631	3631	<>	<elision1>
3631	3635	<kappa2K>	<>
3631	3638	<kappa2L>	<>
3631	3346	<lambda2L>	<>
3632	3633	<>	<aphaerese>
3632	3633	<>	<elision3>
3632	3633	<>	<elision2>
3632	3633	<>	<elision1>
3632	3636	<kappa2K>	<>
3632	3639	<kappa2L>	<>
3632	3347	<lambda2L>	<>
3633	3631	<>	<aphaerese>
3633	3631	<>	<elision3>
3633	3631	<>	<elision2>
3633	3631	<>	<elision1>
3633	3634	<kappa2K>	<>
3633	3637	<kappa2L>	<>
3633	3345	<lambda2L>	<>
3634	3298	.	.
3634	3298	<~>	<~>
3634	3298	<split-s>	<split-s>
3634	3298	<split-h>	<split-h>
3634	3298	<name2>	<name2>
3634	3301	<aphaerese>	<aphaerese>
3634	3635	<>	<aphaerese>
3634	3635	<>	<elision3>
3634	3635	<>	<elision2>
3634	3635	<>	<elision1>
3634	3316	.	υ
3634	3269	s	υ
3634	3316	.	u
3634	3269	s	u
3634	3256	s	κ
3634	3256	s	k
3634	3310	s	U
3634	3265	s	K
3634	3316	.	α
3634	3269	s	α
3634	3316	.	a
3634	3269	s	a
3634	3313	s	A
3634	3256	s	λ
3634	3256	s	l
3634	3271	s	L
3634	3262	<1m>	<>
3635	3298	.	.
3635	3298	<~>	<~>
3635	3298	<split-s>	<split-s>
3635	3298	<split-h>	<split-h>
3635	3298	<name2>	<name2>
3635	3636	<>	<name>
3635	3301	<aphaerese>	<aphaerese>
3635	3635	<>	<aphaerese>
3635	3635	<>	<elision3>
3635	3635	<>	<elision2>
3635	3635	<>	<elision1>
3635	3316	.	υ
3635	3269	s	υ
3635	3316	.	u
3635	3269	s	u
3635	3256	s	κ
3635	3256	s	k
3635	3310	s	U
3635	3265	s	K
3635	3316	.	α
3635	3269	s	α
3635	3316	.	a
3635	3269	s	a
3635	3313	s	A
3635	3256	s	λ
3635	3256	s	l
3635	3271	s	L
3635	3263	<1m>	<>
3636	3300	.	.
3636	3300	<~>	<~>
3636	3300	<split-s>	<split-s>
3636	3300	<split-h>	<split-h>
3636	3300	<name2>	<name2>
3636	3303	<aphaerese>	<aphaerese>
3636	3634	<>	<aphaerese>
3636	3634	<>	<elision3>
3636	3634	<>	<elision2>
3636	3634	<>	<elision1>
3636	3318	.	υ
3636	3268	s	υ
3636	3318	.	u
3636	3268	s	u
3636	3255	s	κ
3636	3255	s	k
3636	3312	s	U
3636	3264	s	K
3636	3318	.	α
3636	3268	s	α
3636	3318	.	a
3636	3268	s	a
3636	3315	s	A
3636	3255	s	λ
3636	3255	s	l
3636	3270	s	L
3636	3261	<1m>	<>
3637	3328	.	.
3637	3328	<~>	<~>
3637	3328	<split-s>	<split-s>
3637	3328	<split-h>	<split-h>
3637	3328	<name2>	<name2>
3637	3331	<aphaerese>	<aphaerese>
3637	3638	<>	<aphaerese>
3637	3638	<>	<elision3>
3637	3638	<>	<elision2>
3637	3638	<>	<elision1>
3637	3334	.	υ
3637	3269	s	υ
3637	3334	.	u
3637	3269	s	u
3637	3277	s	κ
3637	3280	H	κ
3637	3277	s	k
3637	3280	H	k
3637	3310	s	U
3637	3265	s	K
3637	3280	H	K
3637	3334	.	α
3637	3269	s	α
3637	3334	.	a
3637	3269	s	a
3637	3313	s	A
3637	3277	s	λ
3637	3280	H	λ
3637	3277	s	l
3637	3280	H	l
3637	3271	s	L
3637	3280	H	L
3637	3262	<1m>	<>
3638	3328	.	.
3638	3328	<~>	<~>
3638	3328	<split-s>	<split-s>
3638	3328	<split-h>	<split-h>
3638	3328	<name2>	<name2>
3638	3639	<>	<name>
3638	3331	<aphaerese>	<aphaerese>
3638	3638	<>	<aphaerese>
3638	3638	<>	<elision3>
3638	3638	<>	<elision2>
3638	3638	<>	<elision1>
3638	3334	.	υ
3638	3269	s	υ
3638	3334	.	u
3638	3269	s	u
3638	3277	s	κ
3638	3280	H	κ
3638	3277	s	k
3638	3280	H	k
3638	3310	s	U
3638	3265	s	K
3638	3280	H	K
3638	3334	.	α
3638	3269	s	α
3638	3334	.	a
3638	3269	s	a
3638	3313	s	A
3638	3277	s	λ
3638	3280	H	λ
3638	3277	s	l
3638	3280	H	l
3638	3271	s	L
3638	3280	H	L
3638	3263	<1m>	<>
3639	3330	.	.
3639	3330	<~>	<~>
3639	3330	<split-s>	<split-s>
3639	3330	<split-h>	<split-h>
3639	3330	<name2>	<name2>
3639	3333	<aphaerese>	<aphaerese>
3639	3637	<>	<aphaerese>
3639	3637	<>	<elision3>
3639	3637	<>	<elision2>
3639	3637	<>	<elision1>
3639	3336	.	υ
3639	3268	s	υ
3639	3336	.	u
3639	3268	s	u
3639	3276	s	κ
3639	3279	H	κ
3639	3276	s	k
3639	3279	H	k
3639	3312	s	U
3639	3264	s	K
3639	3279	H	K
3639	3336	.	α
3639	3268	s	α
3639	3336	.	a
3639	3268	s	a
3639	3315	s	A
3639	3276	s	λ
3639	3279	H	λ
3639	3276	s	l
3639	3279	H	l
3639	3270	s	L
3639	3279	H	L
3639	3261	<1m>	<>
3640	3641	<>	<name>
3640	3640	<>	<aphaerese>
3640	3640	<>	<elision3>
3640	3640	<>	<elision2>
3640	3640	<>	<elision1>
3640	3644	<lambda2L>	<>
3641	3642	<>	<aphaerese>
3641	3642	<>	<elision3>
3641	3642	<>	<elision2>
3641	3642	<>	<elision1>
3641	3645	<lambda2L>	<>
3642	3640	<>	<aphaerese>
3642	3640	<>	<elision3>
3642	3640	<>	<elision2>
3642	3640	<>	<elision1>
3642	3643	<lambda2L>	<>
3643	3328	.	.
3643	3328	<~>	<~>
3643	3328	<split-s>	<split-s>
3643	3328	<split-h>	<split-h>
3643	3328	<name2>	<name2>
3643	3331	<aphaerese>	<aphaerese>
3643	3644	<>	<aphaerese>
3643	3644	<>	<elision3>
3643	3644	<>	<elision2>
3643	3644	<>	<elision1>
3643	3334	.	υ
3643	3269	s	υ
3643	3334	.	u
3643	3269	s	u
3643	3334	.	κ
3643	3277	s	κ
3643	3280	H	κ
3643	3277	s	k
3643	3280	H	k
3643	3310	s	U
3643	3265	s	K
3643	3280	H	K
3643	3334	.	α
3643	3269	s	α
3643	3334	.	a
3643	3269	s	a
3643	3313	s	A
3643	3334	.	λ
3643	3277	s	λ
3643	3280	H	λ
3643	3277	s	l
3643	3280	H	l
3643	3271	s	L
3643	3280	H	L
3643	3262	<1m>	<>
3644	3328	.	.
3644	3328	<~>	<~>
3644	3328	<split-s>	<split-s>
3644	3328	<split-h>	<split-h>
3644	3328	<name2>	<name2>
3644	3645	<>	<name>
3644	3331	<aphaerese>	<aphaerese>
3644	3644	<>	<aphaerese>
3644	3644	<>	<elision3>
3644	3644	<>	<elision2>
3644	3644	<>	<elision1>
3644	3334	.	υ
3644	3269	s	υ
3644	3334	.	u
3644	3269	s	u
3644	3334	.	κ
3644	3277	s	κ
3644	3280	H	κ
3644	3277	s	k
3644	3280	H	k
3644	3310	s	U
3644	3265	s	K
3644	3280	H	K
3644	3334	.	α
3644	3269	s	α
3644	3334	.	a
3644	3269	s	a
3644	3313	s	A
3644	3334	.	λ
3644	3277	s	λ
3644	3280	H	λ
3644	3277	s	l
3644	3280	H	l
3644	3271	s	L
3644	3280	H	L
3644	3263	<1m>	<>
3645	3330	.	.
3645	3330	<~>	<~>
3645	3330	<split-s>	<split-s>
3645	3330	<split-h>	<split-h>
3645	3330	<name2>	<name2>
3645	3333	<aphaerese>	<aphaerese>
3645	3643	<>	<aphaerese>
3645	3643	<>	<elision3>
3645	3643	<>	<elision2>
3645	3643	<>	<elision1>
3645	3336	.	υ
3645	3268	s	υ
3645	3336	.	u
3645	3268	s	u
3645	3336	.	κ
3645	3276	s	κ
3645	3279	H	κ
3645	3276	s	k
3645	3279	H	k
3645	3312	s	U
3645	3264	s	K
3645	3279	H	K
3645	3336	.	α
3645	3268	s	α
3645	3336	.	a
3645	3268	s	a
3645	3315	s	A
3645	3336	.	λ
3645	3276	s	λ
3645	3279	H	λ
3645	3276	s	l
3645	3279	H	l
3645	3270	s	L
3645	3279	H	L
3645	3261	<1m>	<>
3646	3605	<>	<name>
3646	3604	<>	<aphaerese>
3646	3604	<>	<elision3>
3646	3604	<>	<elision2>
3646	3604	<>	<elision1>
3646	3608	<kappa2K>	<>
3646	3647	<kappa2L>	<>
3646	3135	<lambda2L>	<>
3647	2984	.	.
3647	2985	 	 
3647	2984	<~>	<~>
3647	2984	<split-s>	<split-s>
3647	2984	<split-h>	<split-h>
3647	2984	<name2>	<name2>
3647	3612	<>	<name>
3647	2988	<aphaerese>	<aphaerese>
3647	3611	<>	<aphaerese>
3647	3611	<>	<elision3>
3647	3611	<>	<elision2>
3647	3611	<>	<elision1>
3647	2992	.	υ
3647	2995	s	υ
3647	2992	.	u
3647	2995	s	u
3647	2626	s	κ
3647	2751	s	k
3647	3041	s	U
3647	2769	s	K
3647	2992	.	α
3647	3066	s	α
3647	2992	.	a
3647	3066	s	a
3647	3069	s	A
3647	2626	s	λ
3647	2782	s	l
3647	2785	s	L
3647	3648	<1s>	<>
3648	251	.	.
3648	252	 	 
3648	251	<~>	<~>
3648	251	<split-s>	<split-s>
3648	251	<split-h>	<split-h>
3648	251	<name2>	<name2>
3648	3613	<>	<name>
3648	255	<aphaerese>	<aphaerese>
3648	3615	<>	<aphaerese>
3648	3615	<>	<elision3>
3648	3615	<>	<elision2>
3648	3615	<>	<elision1>
3648	1546	.	υ
3648	1546	.	u
3648	1546	.	α
3648	1546	.	a
3648	3649	<K>	<>
3649	1596	.	.
3649	1596	<~>	<~>
3649	1596	<split-s>	<split-s>
3649	1596	<split-h>	<split-h>
3649	1596	<name2>	<name2>
3649	3617	<>	<name>
3649	1599	<aphaerese>	<aphaerese>
3649	3616	<>	<aphaerese>
3649	3616	<>	<elision3>
3649	3616	<>	<elision2>
3649	3616	<>	<elision1>
3649	1595	.	υ
3649	1595	.	u
3649	1595	.	α
3649	1595	.	a
3650	3651	<>	<name>
3650	3650	<>	<aphaerese>
3650	3650	<>	<elision3>
3650	3650	<>	<elision2>
3650	3650	<>	<elision1>
3650	3597	<K2kl>	<>
3651	3652	<>	<aphaerese>
3651	3652	<>	<elision3>
3651	3652	<>	<elision2>
3651	3652	<>	<elision1>
3651	3598	<K2kl>	<>
3652	3650	<>	<aphaerese>
3652	3650	<>	<elision3>
3652	3650	<>	<elision2>
3652	3650	<>	<elision1>
3652	3599	<K2kl>	<>
3653	3654	<>	<name>
3653	3653	<>	<aphaerese>
3653	3653	<>	<elision3>
3653	3653	<>	<elision2>
3653	3653	<>	<elision1>
3653	3597	<L2kl>	<>
3654	3655	<>	<aphaerese>
3654	3655	<>	<elision3>
3654	3655	<>	<elision2>
3654	3655	<>	<elision1>
3654	3598	<L2kl>	<>
3655	3653	<>	<aphaerese>
3655	3653	<>	<elision3>
3655	3653	<>	<elision2>
3655	3653	<>	<elision1>
3655	3599	<L2kl>	<>
3656	3657	<>	<aphaerese>
3656	3657	<>	<elision3>
3656	3657	<>	<elision2>
3656	3657	<>	<elision1>
3656	3425	<3s>	<>
3657	3658	<>	<name>
3657	3657	<>	<aphaerese>
3657	3657	<>	<elision3>
3657	3657	<>	<elision2>
3657	3657	<>	<elision1>
3657	3426	<3s>	<>
3658	3656	<>	<aphaerese>
3658	3656	<>	<elision3>
3658	3656	<>	<elision2>
3658	3656	<>	<elision1>
3658	3427	<3s>	<>
3659	3660	<>	<aphaerese>
3659	3660	<>	<elision3>
3659	3660	<>	<elision2>
3659	3660	<>	<elision1>
3659	3564	<3s>	<>
3660	3661	<>	<name>
3660	3660	<>	<aphaerese>
3660	3660	<>	<elision3>
3660	3660	<>	<elision2>
3660	3660	<>	<elision1>
3660	3565	<3s>	<>
3661	3659	<>	<aphaerese>
3661	3659	<>	<elision3>
3661	3659	<>	<elision2>
3661	3659	<>	<elision1>
3661	3566	<3s>	<>
3662	3413	.	.
3662	3413	 	 
3662	3413	<~>	<~>
3662	3413	<split-s>	<split-s>
3662	3413	<split-h>	<split-h>
3662	3413	<name2>	<name2>
3662	3663	<>	<name>
3662	3416	<aphaerese>	<aphaerese>
3662	3662	<>	<aphaerese>
3662	3665	<elision3>	<elision3>
3662	3662	<>	<elision3>
3662	3665	<elision2>	<elision2>
3662	3662	<>	<elision2>
3662	3665	<elision1>	<elision1>
3662	3662	<>	<elision1>
3662	3577	.	υ
3662	3577	.	u
3662	3577	.	κ
3662	3577	.	α
3662	3577	.	a
3662	3577	.	λ
3662	3766	<4s>	<>
3663	3415	.	.
3663	3415	 	 
3663	3415	<~>	<~>
3663	3415	<split-s>	<split-s>
3663	3415	<split-h>	<split-h>
3663	3415	<name2>	<name2>
3663	3418	<aphaerese>	<aphaerese>
3663	3664	<>	<aphaerese>
3663	3667	<elision3>	<elision3>
3663	3664	<>	<elision3>
3663	3667	<elision2>	<elision2>
3663	3664	<>	<elision2>
3663	3667	<elision1>	<elision1>
3663	3664	<>	<elision1>
3663	3579	.	υ
3663	3579	.	u
3663	3579	.	κ
3663	3579	.	α
3663	3579	.	a
3663	3579	.	λ
3663	3767	<4s>	<>
3664	3413	.	.
3664	3413	 	 
3664	3413	<~>	<~>
3664	3413	<split-s>	<split-s>
3664	3413	<split-h>	<split-h>
3664	3413	<name2>	<name2>
3664	3416	<aphaerese>	<aphaerese>
3664	3662	<>	<aphaerese>
3664	3665	<elision3>	<elision3>
3664	3662	<>	<elision3>
3664	3665	<elision2>	<elision2>
3664	3662	<>	<elision2>
3664	3665	<elision1>	<elision1>
3664	3662	<>	<elision1>
3664	3577	.	υ
3664	3577	.	u
3664	3577	.	κ
3664	3577	.	α
3664	3577	.	a
3664	3577	.	λ
3664	3765	<4s>	<>
3665	3413	.	.
3665	3413	 	 
3665	3413	<~>	<~>
3665	3413	<split-s>	<split-s>
3665	3413	<split-h>	<split-h>
3665	3413	<name2>	<name2>
3665	3666	<>	<name>
3665	3416	<aphaerese>	<aphaerese>
3665	3665	<>	<aphaerese>
3665	3413	<elision3>	<elision3>
3665	3665	<>	<elision3>
3665	3413	<elision2>	<elision2>
3665	3665	<>	<elision2>
3665	3413	<elision1>	<elision1>
3665	3665	<>	<elision1>
3665	3577	.	υ
3665	3577	.	u
3665	3419	.	κ
3665	3577	.	α
3665	3577	.	a
3665	3669	<4s>	<>
3666	3415	.	.
3666	3415	 	 
3666	3415	<~>	<~>
3666	3415	<split-s>	<split-s>
3666	3415	<split-h>	<split-h>
3666	3415	<name2>	<name2>
3666	3418	<aphaerese>	<aphaerese>
3666	3667	<>	<aphaerese>
3666	3415	<elision3>	<elision3>
3666	3667	<>	<elision3>
3666	3415	<elision2>	<elision2>
3666	3667	<>	<elision2>
3666	3415	<elision1>	<elision1>
3666	3667	<>	<elision1>
3666	3579	.	υ
3666	3579	.	u
3666	3421	.	κ
3666	3579	.	α
3666	3579	.	a
3666	3670	<4s>	<>
3667	3413	.	.
3667	3413	 	 
3667	3413	<~>	<~>
3667	3413	<split-s>	<split-s>
3667	3413	<split-h>	<split-h>
3667	3413	<name2>	<name2>
3667	3416	<aphaerese>	<aphaerese>
3667	3665	<>	<aphaerese>
3667	3413	<elision3>	<elision3>
3667	3665	<>	<elision3>
3667	3413	<elision2>	<elision2>
3667	3665	<>	<elision2>
3667	3413	<elision1>	<elision1>
3667	3665	<>	<elision1>
3667	3577	.	υ
3667	3577	.	u
3667	3419	.	κ
3667	3577	.	α
3667	3577	.	a
3667	3668	<4s>	<>
3668	215	.	.
3668	216	 	 
3668	215	<~>	<~>
3668	215	<split-s>	<split-s>
3668	215	<split-h>	<split-h>
3668	215	<name2>	<name2>
3668	219	<aphaerese>	<aphaerese>
3668	3669	<>	<aphaerese>
3668	215	<elision3>	<elision3>
3668	3669	<>	<elision3>
3668	215	<elision2>	<elision2>
3668	3669	<>	<elision2>
3668	215	<elision1>	<elision1>
3668	3669	<>	<elision1>
3668	3187	.	υ
3668	3231	H	υ
3668	3187	.	u
3668	3233	H	u
3668	222	.	κ
3668	3752	H	κ
3668	3756	H	k
3668	3154	H	U
3668	3760	H	K
3668	3187	.	α
3668	3217	H	α
3668	3187	.	a
3668	3222	H	a
3668	2984	H	A
3668	3708	H	λ
3668	3714	H	l
3668	3764	H	L
3668	3717	<K>	<>
3669	215	.	.
3669	216	 	 
3669	215	<~>	<~>
3669	215	<split-s>	<split-s>
3669	215	<split-h>	<split-h>
3669	215	<name2>	<name2>
3669	3670	<>	<name>
3669	219	<aphaerese>	<aphaerese>
3669	3669	<>	<aphaerese>
3669	215	<elision3>	<elision3>
3669	3669	<>	<elision3>
3669	215	<elision2>	<elision2>
3669	3669	<>	<elision2>
3669	215	<elision1>	<elision1>
3669	3669	<>	<elision1>
3669	3187	.	υ
3669	3231	H	υ
3669	3187	.	u
3669	3233	H	u
3669	222	.	κ
3669	3752	H	κ
3669	3756	H	k
3669	3154	H	U
3669	3760	H	K
3669	3187	.	α
3669	3217	H	α
3669	3187	.	a
3669	3222	H	a
3669	2984	H	A
3669	3708	H	λ
3669	3714	H	l
3669	3764	H	L
3669	3718	<K>	<>
3670	214	.	.
3670	218	 	 
3670	214	<~>	<~>
3670	214	<split-s>	<split-s>
3670	214	<split-h>	<split-h>
3670	214	<name2>	<name2>
3670	221	<aphaerese>	<aphaerese>
3670	3668	<>	<aphaerese>
3670	214	<elision3>	<elision3>
3670	3668	<>	<elision3>
3670	214	<elision2>	<elision2>
3670	3668	<>	<elision2>
3670	214	<elision1>	<elision1>
3670	3668	<>	<elision1>
3670	3189	.	υ
3670	3226	H	υ
3670	3189	.	u
3670	3230	H	u
3670	224	.	κ
3670	3671	H	κ
3670	3690	H	k
3670	3156	H	U
3670	3703	H	K
3670	3189	.	α
3670	3216	H	α
3670	3189	.	a
3670	3221	H	a
3670	2987	H	A
3670	3707	H	λ
3670	3713	H	l
3670	3711	H	L
3670	3716	<K>	<>
3671	3672	<>	<aphaerese>
3671	3672	<>	<elision3>
3671	3672	<>	<elision2>
3671	3672	<>	<elision1>
3671	3675	<kappa2K>	<>
3671	3687	<kappa2L>	<>
3671	3137	<lambda2L>	<>
3672	3673	<>	<name>
3672	3672	<>	<aphaerese>
3672	3672	<>	<elision3>
3672	3672	<>	<elision2>
3672	3672	<>	<elision1>
3672	3676	<kappa2K>	<>
3672	3679	<kappa2L>	<>
3672	3135	<lambda2L>	<>
3673	3674	<>	<aphaerese>
3673	3674	<>	<elision3>
3673	3674	<>	<elision2>
3673	3674	<>	<elision1>
3673	3677	<kappa2K>	<>
3673	3680	<kappa2L>	<>
3673	3136	<lambda2L>	<>
3674	3672	<>	<aphaerese>
3674	3672	<>	<elision3>
3674	3672	<>	<elision2>
3674	3672	<>	<elision1>
3674	3675	<kappa2K>	<>
3674	3678	<kappa2L>	<>
3674	3137	<lambda2L>	<>
3675	2818	.	.
3675	2819	 	 
3675	2818	<~>	<~>
3675	2818	<split-s>	<split-s>
3675	2818	<split-h>	<split-h>
3675	2818	<name2>	<name2>
3675	2822	<aphaerese>	<aphaerese>
3675	3676	<>	<aphaerese>
3675	2955	<elision3>	<elision3>
3675	3676	<>	<elision3>
3675	2955	<elision2>	<elision2>
3675	3676	<>	<elision2>
3675	2955	<elision1>	<elision1>
3675	3676	<>	<elision1>
3675	2826	.	υ
3675	2829	s	υ
3675	2826	.	u
3675	2829	s	u
3675	2892	s	U
3675	2826	.	α
3675	2920	s	α
3675	2826	.	a
3675	2920	s	a
3675	2923	s	A
3676	2818	.	.
3676	2819	 	 
3676	2818	<~>	<~>
3676	2818	<split-s>	<split-s>
3676	2818	<split-h>	<split-h>
3676	2818	<name2>	<name2>
3676	3677	<>	<name>
3676	2822	<aphaerese>	<aphaerese>
3676	3676	<>	<aphaerese>
3676	2955	<elision3>	<elision3>
3676	3676	<>	<elision3>
3676	2955	<elision2>	<elision2>
3676	3676	<>	<elision2>
3676	2955	<elision1>	<elision1>
3676	3676	<>	<elision1>
3676	2826	.	υ
3676	2829	s	υ
3676	2826	.	u
3676	2829	s	u
3676	2892	s	U
3676	2826	.	α
3676	2920	s	α
3676	2826	.	a
3676	2920	s	a
3676	2923	s	A
3677	2821	.	.
3677	2824	 	 
3677	2821	<~>	<~>
3677	2821	<split-s>	<split-s>
3677	2821	<split-h>	<split-h>
3677	2821	<name2>	<name2>
3677	2950	<aphaerese>	<aphaerese>
3677	3675	<>	<aphaerese>
3677	2957	<elision3>	<elision3>
3677	3675	<>	<elision3>
3677	2957	<elision2>	<elision2>
3677	3675	<>	<elision2>
3677	2957	<elision1>	<elision1>
3677	3675	<>	<elision1>
3677	2828	.	υ
3677	2831	s	υ
3677	2828	.	u
3677	2831	s	u
3677	2894	s	U
3677	2828	.	α
3677	2922	s	α
3677	2828	.	a
3677	2922	s	a
3677	2925	s	A
3678	2984	.	.
3678	2985	 	 
3678	2984	<~>	<~>
3678	2984	<split-s>	<split-s>
3678	2984	<split-h>	<split-h>
3678	2984	<name2>	<name2>
3678	2988	<aphaerese>	<aphaerese>
3678	3679	<>	<aphaerese>
3678	3101	<elision3>	<elision3>
3678	3679	<>	<elision3>
3678	3101	<elision2>	<elision2>
3678	3679	<>	<elision2>
3678	3101	<elision1>	<elision1>
3678	3679	<>	<elision1>
3678	2992	.	υ
3678	2995	s	υ
3678	2992	.	u
3678	2995	s	u
3678	3041	s	U
3678	2992	.	α
3678	3066	s	α
3678	2992	.	a
3678	3066	s	a
3678	3069	s	A
3678	3682	<1s>	<>
3679	2984	.	.
3679	2985	 	 
3679	2984	<~>	<~>
3679	2984	<split-s>	<split-s>
3679	2984	<split-h>	<split-h>
3679	2984	<name2>	<name2>
3679	3680	<>	<name>
3679	2988	<aphaerese>	<aphaerese>
3679	3679	<>	<aphaerese>
3679	3101	<elision3>	<elision3>
3679	3679	<>	<elision3>
3679	3101	<elision2>	<elision2>
3679	3679	<>	<elision2>
3679	3101	<elision1>	<elision1>
3679	3679	<>	<elision1>
3679	2992	.	υ
3679	2995	s	υ
3679	2992	.	u
3679	2995	s	u
3679	3041	s	U
3679	2992	.	α
3679	3066	s	α
3679	2992	.	a
3679	3066	s	a
3679	3069	s	A
3679	3683	<1s>	<>
3680	2987	.	.
3680	2990	 	 
3680	2987	<~>	<~>
3680	2987	<split-s>	<split-s>
3680	2987	<split-h>	<split-h>
3680	2987	<name2>	<name2>
3680	3096	<aphaerese>	<aphaerese>
3680	3678	<>	<aphaerese>
3680	3103	<elision3>	<elision3>
3680	3678	<>	<elision3>
3680	3103	<elision2>	<elision2>
3680	3678	<>	<elision2>
3680	3103	<elision1>	<elision1>
3680	3678	<>	<elision1>
3680	2994	.	υ
3680	2997	s	υ
3680	2994	.	u
3680	2997	s	u
3680	3043	s	U
3680	2994	.	α
3680	3068	s	α
3680	2994	.	a
3680	3068	s	a
3680	3071	s	A
3680	3681	<1s>	<>
3681	250	.	.
3681	254	 	 
3681	250	<~>	<~>
3681	250	<split-s>	<split-s>
3681	250	<split-h>	<split-h>
3681	250	<name2>	<name2>
3681	257	<aphaerese>	<aphaerese>
3681	3682	<>	<aphaerese>
3681	2127	<elision3>	<elision3>
3681	3682	<>	<elision3>
3681	2127	<elision2>	<elision2>
3681	3682	<>	<elision2>
3681	2127	<elision1>	<elision1>
3681	3682	<>	<elision1>
3681	1548	.	υ
3681	1585	H	υ
3681	1548	.	u
3681	1589	H	u
3681	1515	H	U
3681	1548	.	α
3681	1575	H	α
3681	1548	.	a
3681	1580	H	a
3681	1346	H	A
3681	3685	<K>	<>
3682	251	.	.
3682	252	 	 
3682	251	<~>	<~>
3682	251	<split-s>	<split-s>
3682	251	<split-h>	<split-h>
3682	251	<name2>	<name2>
3682	255	<aphaerese>	<aphaerese>
3682	3683	<>	<aphaerese>
3682	2128	<elision3>	<elision3>
3682	3683	<>	<elision3>
3682	2128	<elision2>	<elision2>
3682	3683	<>	<elision2>
3682	2128	<elision1>	<elision1>
3682	3683	<>	<elision1>
3682	1546	.	υ
3682	1590	H	υ
3682	1546	.	u
3682	1592	H	u
3682	1513	H	U
3682	1546	.	α
3682	1576	H	α
3682	1546	.	a
3682	1581	H	a
3682	1343	H	A
3682	3686	<K>	<>
3683	251	.	.
3683	252	 	 
3683	251	<~>	<~>
3683	251	<split-s>	<split-s>
3683	251	<split-h>	<split-h>
3683	251	<name2>	<name2>
3683	3681	<>	<name>
3683	255	<aphaerese>	<aphaerese>
3683	3683	<>	<aphaerese>
3683	2128	<elision3>	<elision3>
3683	3683	<>	<elision3>
3683	2128	<elision2>	<elision2>
3683	3683	<>	<elision2>
3683	2128	<elision1>	<elision1>
3683	3683	<>	<elision1>
3683	1546	.	υ
3683	1590	H	υ
3683	1546	.	u
3683	1592	H	u
3683	1513	H	U
3683	1546	.	α
3683	1576	H	α
3683	1546	.	a
3683	1581	H	a
3683	1343	H	A
3683	3684	<K>	<>
3684	1596	.	.
3684	1596	<~>	<~>
3684	1596	<split-s>	<split-s>
3684	1596	<split-h>	<split-h>
3684	1596	<name2>	<name2>
3684	3685	<>	<name>
3684	1599	<aphaerese>	<aphaerese>
3684	3684	<>	<aphaerese>
3684	2077	<elision3>	<elision3>
3684	3684	<>	<elision3>
3684	2077	<elision2>	<elision2>
3684	3684	<>	<elision2>
3684	2077	<elision1>	<elision1>
3684	3684	<>	<elision1>
3684	1595	.	υ
3684	1738	H	υ
3684	1595	.	u
3684	1747	H	u
3684	1716	H	U
3684	1595	.	α
3684	1750	H	α
3684	1595	.	a
3684	1753	H	a
3684	1687	H	A
3685	1598	.	.
3685	1598	<~>	<~>
3685	1598	<split-s>	<split-s>
3685	1598	<split-h>	<split-h>
3685	1598	<name2>	<name2>
3685	1601	<aphaerese>	<aphaerese>
3685	3686	<>	<aphaerese>
3685	2076	<elision3>	<elision3>
3685	3686	<>	<elision3>
3685	2076	<elision2>	<elision2>
3685	3686	<>	<elision2>
3685	2076	<elision1>	<elision1>
3685	3686	<>	<elision1>
3685	1594	.	υ
3685	1740	H	υ
3685	1594	.	u
3685	1749	H	u
3685	1718	H	U
3685	1594	.	α
3685	1752	H	α
3685	1594	.	a
3685	1755	H	a
3685	1689	H	A
3686	1596	.	.
3686	1596	<~>	<~>
3686	1596	<split-s>	<split-s>
3686	1596	<split-h>	<split-h>
3686	1596	<name2>	<name2>
3686	1599	<aphaerese>	<aphaerese>
3686	3684	<>	<aphaerese>
3686	2077	<elision3>	<elision3>
3686	3684	<>	<elision3>
3686	2077	<elision2>	<elision2>
3686	3684	<>	<elision2>
3686	2077	<elision1>	<elision1>
3686	3684	<>	<elision1>
3686	1595	.	υ
3686	1738	H	υ
3686	1595	.	u
3686	1747	H	u
3686	1716	H	U
3686	1595	.	α
3686	1750	H	α
3686	1595	.	a
3686	1753	H	a
3686	1687	H	A
3687	2984	.	.
3687	2985	 	 
3687	2984	<~>	<~>
3687	2984	<split-s>	<split-s>
3687	2984	<split-h>	<split-h>
3687	2984	<name2>	<name2>
3687	2988	<aphaerese>	<aphaerese>
3687	3679	<>	<aphaerese>
3687	3101	<elision3>	<elision3>
3687	3679	<>	<elision3>
3687	3101	<elision2>	<elision2>
3687	3679	<>	<elision2>
3687	3101	<elision1>	<elision1>
3687	3679	<>	<elision1>
3687	2992	.	υ
3687	2995	s	υ
3687	2992	.	u
3687	2995	s	u
3687	3041	s	U
3687	2992	.	α
3687	3066	s	α
3687	2992	.	a
3687	3066	s	a
3687	3069	s	A
3687	3688	<1s>	<>
3688	251	.	.
3688	252	 	 
3688	251	<~>	<~>
3688	251	<split-s>	<split-s>
3688	251	<split-h>	<split-h>
3688	251	<name2>	<name2>
3688	255	<aphaerese>	<aphaerese>
3688	3683	<>	<aphaerese>
3688	2128	<elision3>	<elision3>
3688	3683	<>	<elision3>
3688	2128	<elision2>	<elision2>
3688	3683	<>	<elision2>
3688	2128	<elision1>	<elision1>
3688	3683	<>	<elision1>
3688	1546	.	υ
3688	1546	.	u
3688	1546	.	α
3688	1546	.	a
3688	3689	<K>	<>
3689	1596	.	.
3689	1596	<~>	<~>
3689	1596	<split-s>	<split-s>
3689	1596	<split-h>	<split-h>
3689	1596	<name2>	<name2>
3689	1599	<aphaerese>	<aphaerese>
3689	3684	<>	<aphaerese>
3689	2077	<elision3>	<elision3>
3689	3684	<>	<elision3>
3689	2077	<elision2>	<elision2>
3689	3684	<>	<elision2>
3689	2077	<elision1>	<elision1>
3689	3684	<>	<elision1>
3689	1595	.	υ
3689	1595	.	u
3689	1595	.	α
3689	1595	.	a
3690	3691	<>	<aphaerese>
3690	3691	<>	<elision3>
3690	3691	<>	<elision2>
3690	3691	<>	<elision1>
3690	3694	<k2K>	<>
3690	3700	<k2L>	<>
3690	3137	<l2L>	<>
3691	3692	<>	<name>
3691	3691	<>	<aphaerese>
3691	3691	<>	<elision3>
3691	3691	<>	<elision2>
3691	3691	<>	<elision1>
3691	3695	<k2K>	<>
3691	3698	<k2L>	<>
3691	3135	<l2L>	<>
3692	3693	<>	<aphaerese>
3692	3693	<>	<elision3>
3692	3693	<>	<elision2>
3692	3693	<>	<elision1>
3692	3696	<k2K>	<>
3692	3699	<k2L>	<>
3692	3136	<l2L>	<>
3693	3691	<>	<aphaerese>
3693	3691	<>	<elision3>
3693	3691	<>	<elision2>
3693	3691	<>	<elision1>
3693	3694	<k2K>	<>
3693	3697	<k2L>	<>
3693	3137	<l2L>	<>
3694	2818	.	.
3694	2819	 	 
3694	2818	<~>	<~>
3694	2818	<split-s>	<split-s>
3694	2818	<split-h>	<split-h>
3694	2818	<name2>	<name2>
3694	2822	<aphaerese>	<aphaerese>
3694	3695	<>	<aphaerese>
3694	2818	<elision3>	<elision3>
3694	3695	<>	<elision3>
3694	2818	<elision2>	<elision2>
3694	3695	<>	<elision2>
3694	2818	<elision1>	<elision1>
3694	3695	<>	<elision1>
3694	2826	.	υ
3694	2829	s	υ
3694	2826	.	u
3694	2829	s	u
3694	2892	s	U
3694	2826	.	α
3694	2920	s	α
3694	2826	.	a
3694	2920	s	a
3694	2923	s	A
3695	2818	.	.
3695	2819	 	 
3695	2818	<~>	<~>
3695	2818	<split-s>	<split-s>
3695	2818	<split-h>	<split-h>
3695	2818	<name2>	<name2>
3695	3696	<>	<name>
3695	2822	<aphaerese>	<aphaerese>
3695	3695	<>	<aphaerese>
3695	2818	<elision3>	<elision3>
3695	3695	<>	<elision3>
3695	2818	<elision2>	<elision2>
3695	3695	<>	<elision2>
3695	2818	<elision1>	<elision1>
3695	3695	<>	<elision1>
3695	2826	.	υ
3695	2829	s	υ
3695	2826	.	u
3695	2829	s	u
3695	2892	s	U
3695	2826	.	α
3695	2920	s	α
3695	2826	.	a
3695	2920	s	a
3695	2923	s	A
3696	2821	.	.
3696	2824	 	 
3696	2821	<~>	<~>
3696	2821	<split-s>	<split-s>
3696	2821	<split-h>	<split-h>
3696	2821	<name2>	<name2>
3696	2950	<aphaerese>	<aphaerese>
3696	3694	<>	<aphaerese>
3696	2821	<elision3>	<elision3>
3696	3694	<>	<elision3>
3696	2821	<elision2>	<elision2>
3696	3694	<>	<elision2>
3696	2821	<elision1>	<elision1>
3696	3694	<>	<elision1>
3696	2828	.	υ
3696	2831	s	υ
3696	2828	.	u
3696	2831	s	u
3696	2894	s	U
3696	2828	.	α
3696	2922	s	α
3696	2828	.	a
3696	2922	s	a
3696	2925	s	A
3697	2984	.	.
3697	2985	 	 
3697	2984	<~>	<~>
3697	2984	<split-s>	<split-s>
3697	2984	<split-h>	<split-h>
3697	2984	<name2>	<name2>
3697	2988	<aphaerese>	<aphaerese>
3697	3698	<>	<aphaerese>
3697	2984	<elision3>	<elision3>
3697	3698	<>	<elision3>
3697	2984	<elision2>	<elision2>
3697	3698	<>	<elision2>
3697	2984	<elision1>	<elision1>
3697	3698	<>	<elision1>
3697	2992	.	υ
3697	2995	s	υ
3697	2992	.	u
3697	2995	s	u
3697	3041	s	U
3697	2992	.	α
3697	3066	s	α
3697	2992	.	a
3697	3066	s	a
3697	3069	s	A
3697	2399	<1s>	<>
3698	2984	.	.
3698	2985	 	 
3698	2984	<~>	<~>
3698	2984	<split-s>	<split-s>
3698	2984	<split-h>	<split-h>
3698	2984	<name2>	<name2>
3698	3699	<>	<name>
3698	2988	<aphaerese>	<aphaerese>
3698	3698	<>	<aphaerese>
3698	2984	<elision3>	<elision3>
3698	3698	<>	<elision3>
3698	2984	<elision2>	<elision2>
3698	3698	<>	<elision2>
3698	2984	<elision1>	<elision1>
3698	3698	<>	<elision1>
3698	2992	.	υ
3698	2995	s	υ
3698	2992	.	u
3698	2995	s	u
3698	3041	s	U
3698	2992	.	α
3698	3066	s	α
3698	2992	.	a
3698	3066	s	a
3698	3069	s	A
3698	2400	<1s>	<>
3699	2987	.	.
3699	2990	 	 
3699	2987	<~>	<~>
3699	2987	<split-s>	<split-s>
3699	2987	<split-h>	<split-h>
3699	2987	<name2>	<name2>
3699	3096	<aphaerese>	<aphaerese>
3699	3697	<>	<aphaerese>
3699	2987	<elision3>	<elision3>
3699	3697	<>	<elision3>
3699	2987	<elision2>	<elision2>
3699	3697	<>	<elision2>
3699	2987	<elision1>	<elision1>
3699	3697	<>	<elision1>
3699	2994	.	υ
3699	2997	s	υ
3699	2994	.	u
3699	2997	s	u
3699	3043	s	U
3699	2994	.	α
3699	3068	s	α
3699	2994	.	a
3699	3068	s	a
3699	3071	s	A
3699	2401	<1s>	<>
3700	2984	.	.
3700	2985	 	 
3700	2984	<~>	<~>
3700	2984	<split-s>	<split-s>
3700	2984	<split-h>	<split-h>
3700	2984	<name2>	<name2>
3700	2988	<aphaerese>	<aphaerese>
3700	3698	<>	<aphaerese>
3700	2984	<elision3>	<elision3>
3700	3698	<>	<elision3>
3700	2984	<elision2>	<elision2>
3700	3698	<>	<elision2>
3700	2984	<elision1>	<elision1>
3700	3698	<>	<elision1>
3700	2992	.	υ
3700	2995	s	υ
3700	2992	.	u
3700	2995	s	u
3700	3041	s	U
3700	2992	.	α
3700	3066	s	α
3700	2992	.	a
3700	3066	s	a
3700	3069	s	A
3700	3701	<1s>	<>
3701	251	.	.
3701	252	 	 
3701	251	<~>	<~>
3701	251	<split-s>	<split-s>
3701	251	<split-h>	<split-h>
3701	251	<name2>	<name2>
3701	255	<aphaerese>	<aphaerese>
3701	2400	<>	<aphaerese>
3701	251	<elision3>	<elision3>
3701	2400	<>	<elision3>
3701	251	<elision2>	<elision2>
3701	2400	<>	<elision2>
3701	251	<elision1>	<elision1>
3701	2400	<>	<elision1>
3701	1546	.	υ
3701	1546	.	u
3701	1546	.	α
3701	1546	.	a
3701	3702	<K>	<>
3702	1596	.	.
3702	1596	<~>	<~>
3702	1596	<split-s>	<split-s>
3702	1596	<split-h>	<split-h>
3702	1596	<name2>	<name2>
3702	1599	<aphaerese>	<aphaerese>
3702	2404	<>	<aphaerese>
3702	1596	<elision3>	<elision3>
3702	2404	<>	<elision3>
3702	1596	<elision2>	<elision2>
3702	2404	<>	<elision2>
3702	1596	<elision1>	<elision1>
3702	2404	<>	<elision1>
3702	1595	.	υ
3702	1595	.	u
3702	1595	.	α
3702	1595	.	a
3703	2818	.	.
3703	2819	 	 
3703	2818	<~>	<~>
3703	2818	<split-s>	<split-s>
3703	2818	<split-h>	<split-h>
3703	2818	<name2>	<name2>
3703	2822	<aphaerese>	<aphaerese>
3703	3704	<>	<aphaerese>
3703	2818	<elision3>	<elision3>
3703	3704	<>	<elision3>
3703	2818	<elision2>	<elision2>
3703	3704	<>	<elision2>
3703	2818	<elision1>	<elision1>
3703	3704	<>	<elision1>
3703	2826	.	υ
3703	2829	s	υ
3703	2826	.	u
3703	2829	s	u
3703	2992	.	κ
3703	2892	s	U
3703	2826	.	α
3703	2920	s	α
3703	2826	.	a
3703	2920	s	a
3703	2923	s	A
3703	2992	.	λ
3703	2315	<1s>	<>
3703	3700	<K2L>	<>
3704	2818	.	.
3704	2819	 	 
3704	2818	<~>	<~>
3704	2818	<split-s>	<split-s>
3704	2818	<split-h>	<split-h>
3704	2818	<name2>	<name2>
3704	3705	<>	<name>
3704	2822	<aphaerese>	<aphaerese>
3704	3704	<>	<aphaerese>
3704	2818	<elision3>	<elision3>
3704	3704	<>	<elision3>
3704	2818	<elision2>	<elision2>
3704	3704	<>	<elision2>
3704	2818	<elision1>	<elision1>
3704	3704	<>	<elision1>
3704	2826	.	υ
3704	2829	s	υ
3704	2826	.	u
3704	2829	s	u
3704	2992	.	κ
3704	2892	s	U
3704	2826	.	α
3704	2920	s	α
3704	2826	.	a
3704	2920	s	a
3704	2923	s	A
3704	2992	.	λ
3704	2316	<1s>	<>
3704	3698	<K2L>	<>
3705	2821	.	.
3705	2824	 	 
3705	2821	<~>	<~>
3705	2821	<split-s>	<split-s>
3705	2821	<split-h>	<split-h>
3705	2821	<name2>	<name2>
3705	2950	<aphaerese>	<aphaerese>
3705	3706	<>	<aphaerese>
3705	2821	<elision3>	<elision3>
3705	3706	<>	<elision3>
3705	2821	<elision2>	<elision2>
3705	3706	<>	<elision2>
3705	2821	<elision1>	<elision1>
3705	3706	<>	<elision1>
3705	2828	.	υ
3705	2831	s	υ
3705	2828	.	u
3705	2831	s	u
3705	2994	.	κ
3705	2894	s	U
3705	2828	.	α
3705	2922	s	α
3705	2828	.	a
3705	2922	s	a
3705	2925	s	A
3705	2994	.	λ
3705	2317	<1s>	<>
3705	3699	<K2L>	<>
3706	2818	.	.
3706	2819	 	 
3706	2818	<~>	<~>
3706	2818	<split-s>	<split-s>
3706	2818	<split-h>	<split-h>
3706	2818	<name2>	<name2>
3706	2822	<aphaerese>	<aphaerese>
3706	3704	<>	<aphaerese>
3706	2818	<elision3>	<elision3>
3706	3704	<>	<elision3>
3706	2818	<elision2>	<elision2>
3706	3704	<>	<elision2>
3706	2818	<elision1>	<elision1>
3706	3704	<>	<elision1>
3706	2826	.	υ
3706	2829	s	υ
3706	2826	.	u
3706	2829	s	u
3706	2992	.	κ
3706	2892	s	U
3706	2826	.	α
3706	2920	s	α
3706	2826	.	a
3706	2920	s	a
3706	2923	s	A
3706	2992	.	λ
3706	2315	<1s>	<>
3706	3697	<K2L>	<>
3707	3708	<>	<aphaerese>
3707	3708	<>	<elision3>
3707	3708	<>	<elision2>
3707	3708	<>	<elision1>
3707	3711	<lambda2L>	<>
3708	3709	<>	<name>
3708	3708	<>	<aphaerese>
3708	3708	<>	<elision3>
3708	3708	<>	<elision2>
3708	3708	<>	<elision1>
3708	3712	<lambda2L>	<>
3709	3707	<>	<aphaerese>
3709	3707	<>	<elision3>
3709	3707	<>	<elision2>
3709	3707	<>	<elision1>
3709	3710	<lambda2L>	<>
3710	2987	.	.
3710	2990	 	 
3710	2987	<~>	<~>
3710	2987	<split-s>	<split-s>
3710	2987	<split-h>	<split-h>
3710	2987	<name2>	<name2>
3710	3096	<aphaerese>	<aphaerese>
3710	3711	<>	<aphaerese>
3710	2987	<elision3>	<elision3>
3710	3711	<>	<elision3>
3710	2987	<elision2>	<elision2>
3710	3711	<>	<elision2>
3710	2987	<elision1>	<elision1>
3710	3711	<>	<elision1>
3710	2994	.	υ
3710	2997	s	υ
3710	2994	.	u
3710	2997	s	u
3710	2994	.	κ
3710	3043	s	U
3710	2994	.	α
3710	3068	s	α
3710	2994	.	a
3710	3068	s	a
3710	3071	s	A
3710	2994	.	λ
3710	2388	<1s>	<>
3711	2984	.	.
3711	2985	 	 
3711	2984	<~>	<~>
3711	2984	<split-s>	<split-s>
3711	2984	<split-h>	<split-h>
3711	2984	<name2>	<name2>
3711	2988	<aphaerese>	<aphaerese>
3711	3712	<>	<aphaerese>
3711	2984	<elision3>	<elision3>
3711	3712	<>	<elision3>
3711	2984	<elision2>	<elision2>
3711	3712	<>	<elision2>
3711	2984	<elision1>	<elision1>
3711	3712	<>	<elision1>
3711	2992	.	υ
3711	2995	s	υ
3711	2992	.	u
3711	2995	s	u
3711	2992	.	κ
3711	3041	s	U
3711	2992	.	α
3711	3066	s	α
3711	2992	.	a
3711	3066	s	a
3711	3069	s	A
3711	2992	.	λ
3711	2386	<1s>	<>
3712	2984	.	.
3712	2985	 	 
3712	2984	<~>	<~>
3712	2984	<split-s>	<split-s>
3712	2984	<split-h>	<split-h>
3712	2984	<name2>	<name2>
3712	3710	<>	<name>
3712	2988	<aphaerese>	<aphaerese>
3712	3712	<>	<aphaerese>
3712	2984	<elision3>	<elision3>
3712	3712	<>	<elision3>
3712	2984	<elision2>	<elision2>
3712	3712	<>	<elision2>
3712	2984	<elision1>	<elision1>
3712	3712	<>	<elision1>
3712	2992	.	υ
3712	2995	s	υ
3712	2992	.	u
3712	2995	s	u
3712	2992	.	κ
3712	3041	s	U
3712	2992	.	α
3712	3066	s	α
3712	2992	.	a
3712	3066	s	a
3712	3069	s	A
3712	2992	.	λ
3712	2387	<1s>	<>
3713	3714	<>	<aphaerese>
3713	3714	<>	<elision3>
3713	3714	<>	<elision2>
3713	3714	<>	<elision1>
3713	3711	<l2L>	<>
3714	3715	<>	<name>
3714	3714	<>	<aphaerese>
3714	3714	<>	<elision3>
3714	3714	<>	<elision2>
3714	3714	<>	<elision1>
3714	3712	<l2L>	<>
3715	3713	<>	<aphaerese>
3715	3713	<>	<elision3>
3715	3713	<>	<elision2>
3715	3713	<>	<elision1>
3715	3710	<l2L>	<>
3716	3239	.	.
3716	3239	<~>	<~>
3716	3239	<split-s>	<split-s>
3716	3239	<split-h>	<split-h>
3716	3239	<name2>	<name2>
3716	3242	<aphaerese>	<aphaerese>
3716	3717	<>	<aphaerese>
3716	3239	<elision3>	<elision3>
3716	3717	<>	<elision3>
3716	3239	<elision2>	<elision2>
3716	3717	<>	<elision2>
3716	3239	<elision1>	<elision1>
3716	3717	<>	<elision1>
3716	3235	.	υ
3716	3381	H	υ
3716	3235	.	u
3716	3390	H	u
3716	3245	.	κ
3716	3721	H	κ
3716	3730	H	k
3716	3359	H	U
3716	3739	H	K
3716	3235	.	α
3716	3393	H	α
3716	3235	.	a
3716	3396	H	a
3716	3330	H	A
3716	3744	H	λ
3716	3750	H	l
3716	3745	H	L
3717	3237	.	.
3717	3237	<~>	<~>
3717	3237	<split-s>	<split-s>
3717	3237	<split-h>	<split-h>
3717	3237	<name2>	<name2>
3717	3240	<aphaerese>	<aphaerese>
3717	3718	<>	<aphaerese>
3717	3237	<elision3>	<elision3>
3717	3718	<>	<elision3>
3717	3237	<elision2>	<elision2>
3717	3718	<>	<elision2>
3717	3237	<elision1>	<elision1>
3717	3718	<>	<elision1>
3717	3236	.	υ
3717	3379	H	υ
3717	3236	.	u
3717	3388	H	u
3717	3243	.	κ
3717	3719	H	κ
3717	3728	H	k
3717	3357	H	U
3717	3737	H	K
3717	3236	.	α
3717	3391	H	α
3717	3236	.	a
3717	3394	H	a
3717	3328	H	A
3717	3742	H	λ
3717	3748	H	l
3717	3751	H	L
3718	3237	.	.
3718	3237	<~>	<~>
3718	3237	<split-s>	<split-s>
3718	3237	<split-h>	<split-h>
3718	3237	<name2>	<name2>
3718	3716	<>	<name>
3718	3240	<aphaerese>	<aphaerese>
3718	3718	<>	<aphaerese>
3718	3237	<elision3>	<elision3>
3718	3718	<>	<elision3>
3718	3237	<elision2>	<elision2>
3718	3718	<>	<elision2>
3718	3237	<elision1>	<elision1>
3718	3718	<>	<elision1>
3718	3236	.	υ
3718	3379	H	υ
3718	3236	.	u
3718	3388	H	u
3718	3243	.	κ
3718	3719	H	κ
3718	3728	H	k
3718	3357	H	U
3718	3737	H	K
3718	3236	.	α
3718	3391	H	α
3718	3236	.	a
3718	3394	H	a
3718	3328	H	A
3718	3742	H	λ
3718	3748	H	l
3718	3751	H	L
3719	3720	<>	<name>
3719	3719	<>	<aphaerese>
3719	3719	<>	<elision3>
3719	3719	<>	<elision2>
3719	3719	<>	<elision1>
3719	3723	<kappa2K>	<>
3719	3726	<kappa2L>	<>
3719	3346	<lambda2L>	<>
3720	3721	<>	<aphaerese>
3720	3721	<>	<elision3>
3720	3721	<>	<elision2>
3720	3721	<>	<elision1>
3720	3724	<kappa2K>	<>
3720	3727	<kappa2L>	<>
3720	3347	<lambda2L>	<>
3721	3719	<>	<aphaerese>
3721	3719	<>	<elision3>
3721	3719	<>	<elision2>
3721	3719	<>	<elision1>
3721	3722	<kappa2K>	<>
3721	3725	<kappa2L>	<>
3721	3345	<lambda2L>	<>
3722	3298	.	.
3722	3298	<~>	<~>
3722	3298	<split-s>	<split-s>
3722	3298	<split-h>	<split-h>
3722	3298	<name2>	<name2>
3722	3301	<aphaerese>	<aphaerese>
3722	3723	<>	<aphaerese>
3722	3322	<elision3>	<elision3>
3722	3723	<>	<elision3>
3722	3322	<elision2>	<elision2>
3722	3723	<>	<elision2>
3722	3322	<elision1>	<elision1>
3722	3723	<>	<elision1>
3722	3316	.	υ
3722	3269	s	υ
3722	3316	.	u
3722	3269	s	u
3722	3310	s	U
3722	3316	.	α
3722	3269	s	α
3722	3316	.	a
3722	3269	s	a
3722	3313	s	A
3722	3262	<1m>	<>
3723	3298	.	.
3723	3298	<~>	<~>
3723	3298	<split-s>	<split-s>
3723	3298	<split-h>	<split-h>
3723	3298	<name2>	<name2>
3723	3724	<>	<name>
3723	3301	<aphaerese>	<aphaerese>
3723	3723	<>	<aphaerese>
3723	3322	<elision3>	<elision3>
3723	3723	<>	<elision3>
3723	3322	<elision2>	<elision2>
3723	3723	<>	<elision2>
3723	3322	<elision1>	<elision1>
3723	3723	<>	<elision1>
3723	3316	.	υ
3723	3269	s	υ
3723	3316	.	u
3723	3269	s	u
3723	3310	s	U
3723	3316	.	α
3723	3269	s	α
3723	3316	.	a
3723	3269	s	a
3723	3313	s	A
3723	3263	<1m>	<>
3724	3300	.	.
3724	3300	<~>	<~>
3724	3300	<split-s>	<split-s>
3724	3300	<split-h>	<split-h>
3724	3300	<name2>	<name2>
3724	3303	<aphaerese>	<aphaerese>
3724	3722	<>	<aphaerese>
3724	3321	<elision3>	<elision3>
3724	3722	<>	<elision3>
3724	3321	<elision2>	<elision2>
3724	3722	<>	<elision2>
3724	3321	<elision1>	<elision1>
3724	3722	<>	<elision1>
3724	3318	.	υ
3724	3268	s	υ
3724	3318	.	u
3724	3268	s	u
3724	3312	s	U
3724	3318	.	α
3724	3268	s	α
3724	3318	.	a
3724	3268	s	a
3724	3315	s	A
3724	3261	<1m>	<>
3725	3328	.	.
3725	3328	<~>	<~>
3725	3328	<split-s>	<split-s>
3725	3328	<split-h>	<split-h>
3725	3328	<name2>	<name2>
3725	3331	<aphaerese>	<aphaerese>
3725	3726	<>	<aphaerese>
3725	3340	<elision3>	<elision3>
3725	3726	<>	<elision3>
3725	3340	<elision2>	<elision2>
3725	3726	<>	<elision2>
3725	3340	<elision1>	<elision1>
3725	3726	<>	<elision1>
3725	3334	.	υ
3725	3269	s	υ
3725	3334	.	u
3725	3269	s	u
3725	3310	s	U
3725	3334	.	α
3725	3269	s	α
3725	3334	.	a
3725	3269	s	a
3725	3313	s	A
3725	3262	<1m>	<>
3726	3328	.	.
3726	3328	<~>	<~>
3726	3328	<split-s>	<split-s>
3726	3328	<split-h>	<split-h>
3726	3328	<name2>	<name2>
3726	3727	<>	<name>
3726	3331	<aphaerese>	<aphaerese>
3726	3726	<>	<aphaerese>
3726	3340	<elision3>	<elision3>
3726	3726	<>	<elision3>
3726	3340	<elision2>	<elision2>
3726	3726	<>	<elision2>
3726	3340	<elision1>	<elision1>
3726	3726	<>	<elision1>
3726	3334	.	υ
3726	3269	s	υ
3726	3334	.	u
3726	3269	s	u
3726	3310	s	U
3726	3334	.	α
3726	3269	s	α
3726	3334	.	a
3726	3269	s	a
3726	3313	s	A
3726	3263	<1m>	<>
3727	3330	.	.
3727	3330	<~>	<~>
3727	3330	<split-s>	<split-s>
3727	3330	<split-h>	<split-h>
3727	3330	<name2>	<name2>
3727	3333	<aphaerese>	<aphaerese>
3727	3725	<>	<aphaerese>
3727	3339	<elision3>	<elision3>
3727	3725	<>	<elision3>
3727	3339	<elision2>	<elision2>
3727	3725	<>	<elision2>
3727	3339	<elision1>	<elision1>
3727	3725	<>	<elision1>
3727	3336	.	υ
3727	3268	s	υ
3727	3336	.	u
3727	3268	s	u
3727	3312	s	U
3727	3336	.	α
3727	3268	s	α
3727	3336	.	a
3727	3268	s	a
3727	3315	s	A
3727	3261	<1m>	<>
3728	3729	<>	<name>
3728	3728	<>	<aphaerese>
3728	3728	<>	<elision3>
3728	3728	<>	<elision2>
3728	3728	<>	<elision1>
3728	3732	<k2K>	<>
3728	3735	<k2L>	<>
3728	3346	<l2L>	<>
3729	3730	<>	<aphaerese>
3729	3730	<>	<elision3>
3729	3730	<>	<elision2>
3729	3730	<>	<elision1>
3729	3733	<k2K>	<>
3729	3736	<k2L>	<>
3729	3347	<l2L>	<>
3730	3728	<>	<aphaerese>
3730	3728	<>	<elision3>
3730	3728	<>	<elision2>
3730	3728	<>	<elision1>
3730	3731	<k2K>	<>
3730	3734	<k2L>	<>
3730	3345	<l2L>	<>
3731	3298	.	.
3731	3298	<~>	<~>
3731	3298	<split-s>	<split-s>
3731	3298	<split-h>	<split-h>
3731	3298	<name2>	<name2>
3731	3301	<aphaerese>	<aphaerese>
3731	3732	<>	<aphaerese>
3731	3298	<elision3>	<elision3>
3731	3732	<>	<elision3>
3731	3298	<elision2>	<elision2>
3731	3732	<>	<elision2>
3731	3298	<elision1>	<elision1>
3731	3732	<>	<elision1>
3731	3316	.	υ
3731	3269	s	υ
3731	3316	.	u
3731	3269	s	u
3731	3310	s	U
3731	3316	.	α
3731	3269	s	α
3731	3316	.	a
3731	3269	s	a
3731	3313	s	A
3731	3262	<1m>	<>
3732	3298	.	.
3732	3298	<~>	<~>
3732	3298	<split-s>	<split-s>
3732	3298	<split-h>	<split-h>
3732	3298	<name2>	<name2>
3732	3733	<>	<name>
3732	3301	<aphaerese>	<aphaerese>
3732	3732	<>	<aphaerese>
3732	3298	<elision3>	<elision3>
3732	3732	<>	<elision3>
3732	3298	<elision2>	<elision2>
3732	3732	<>	<elision2>
3732	3298	<elision1>	<elision1>
3732	3732	<>	<elision1>
3732	3316	.	υ
3732	3269	s	υ
3732	3316	.	u
3732	3269	s	u
3732	3310	s	U
3732	3316	.	α
3732	3269	s	α
3732	3316	.	a
3732	3269	s	a
3732	3313	s	A
3732	3263	<1m>	<>
3733	3300	.	.
3733	3300	<~>	<~>
3733	3300	<split-s>	<split-s>
3733	3300	<split-h>	<split-h>
3733	3300	<name2>	<name2>
3733	3303	<aphaerese>	<aphaerese>
3733	3731	<>	<aphaerese>
3733	3300	<elision3>	<elision3>
3733	3731	<>	<elision3>
3733	3300	<elision2>	<elision2>
3733	3731	<>	<elision2>
3733	3300	<elision1>	<elision1>
3733	3731	<>	<elision1>
3733	3318	.	υ
3733	3268	s	υ
3733	3318	.	u
3733	3268	s	u
3733	3312	s	U
3733	3318	.	α
3733	3268	s	α
3733	3318	.	a
3733	3268	s	a
3733	3315	s	A
3733	3261	<1m>	<>
3734	3328	.	.
3734	3328	<~>	<~>
3734	3328	<split-s>	<split-s>
3734	3328	<split-h>	<split-h>
3734	3328	<name2>	<name2>
3734	3331	<aphaerese>	<aphaerese>
3734	3735	<>	<aphaerese>
3734	3328	<elision3>	<elision3>
3734	3735	<>	<elision3>
3734	3328	<elision2>	<elision2>
3734	3735	<>	<elision2>
3734	3328	<elision1>	<elision1>
3734	3735	<>	<elision1>
3734	3334	.	υ
3734	3269	s	υ
3734	3334	.	u
3734	3269	s	u
3734	3310	s	U
3734	3334	.	α
3734	3269	s	α
3734	3334	.	a
3734	3269	s	a
3734	3313	s	A
3734	3262	<1m>	<>
3735	3328	.	.
3735	3328	<~>	<~>
3735	3328	<split-s>	<split-s>
3735	3328	<split-h>	<split-h>
3735	3328	<name2>	<name2>
3735	3736	<>	<name>
3735	3331	<aphaerese>	<aphaerese>
3735	3735	<>	<aphaerese>
3735	3328	<elision3>	<elision3>
3735	3735	<>	<elision3>
3735	3328	<elision2>	<elision2>
3735	3735	<>	<elision2>
3735	3328	<elision1>	<elision1>
3735	3735	<>	<elision1>
3735	3334	.	υ
3735	3269	s	υ
3735	3334	.	u
3735	3269	s	u
3735	3310	s	U
3735	3334	.	α
3735	3269	s	α
3735	3334	.	a
3735	3269	s	a
3735	3313	s	A
3735	3263	<1m>	<>
3736	3330	.	.
3736	3330	<~>	<~>
3736	3330	<split-s>	<split-s>
3736	3330	<split-h>	<split-h>
3736	3330	<name2>	<name2>
3736	3333	<aphaerese>	<aphaerese>
3736	3734	<>	<aphaerese>
3736	3330	<elision3>	<elision3>
3736	3734	<>	<elision3>
3736	3330	<elision2>	<elision2>
3736	3734	<>	<elision2>
3736	3330	<elision1>	<elision1>
3736	3734	<>	<elision1>
3736	3336	.	υ
3736	3268	s	υ
3736	3336	.	u
3736	3268	s	u
3736	3312	s	U
3736	3336	.	α
3736	3268	s	α
3736	3336	.	a
3736	3268	s	a
3736	3315	s	A
3736	3261	<1m>	<>
3737	3298	.	.
3737	3298	<~>	<~>
3737	3298	<split-s>	<split-s>
3737	3298	<split-h>	<split-h>
3737	3298	<name2>	<name2>
3737	3361	<name2>	<name>
3737	3738	<>	<name>
3737	3301	<aphaerese>	<aphaerese>
3737	3740	<>	<aphaerese>
3737	3298	<elision3>	<elision3>
3737	3740	<>	<elision3>
3737	3298	<elision2>	<elision2>
3737	3740	<>	<elision2>
3737	3298	<elision1>	<elision1>
3737	3740	<>	<elision1>
3737	3316	.	υ
3737	3269	s	υ
3737	3316	.	u
3737	3269	s	u
3737	3334	.	κ
3737	3310	s	U
3737	3316	.	α
3737	3269	s	α
3737	3316	.	a
3737	3269	s	a
3737	3313	s	A
3737	3334	.	λ
3737	3263	<1m>	<>
3737	3365	<k2K>	<>
3737	3366	<k2L>	<>
3737	3741	<K2L>	<>
3738	3300	.	.
3738	3300	<~>	<~>
3738	3300	<split-s>	<split-s>
3738	3300	<split-h>	<split-h>
3738	3300	<name2>	<name2>
3738	3303	<aphaerese>	<aphaerese>
3738	3739	<>	<aphaerese>
3738	3300	<elision3>	<elision3>
3738	3739	<>	<elision3>
3738	3300	<elision2>	<elision2>
3738	3739	<>	<elision2>
3738	3300	<elision1>	<elision1>
3738	3739	<>	<elision1>
3738	3318	.	υ
3738	3268	s	υ
3738	3318	.	u
3738	3268	s	u
3738	3336	.	κ
3738	3312	s	U
3738	3318	.	α
3738	3268	s	α
3738	3318	.	a
3738	3268	s	a
3738	3315	s	A
3738	3336	.	λ
3738	3261	<1m>	<>
3738	3736	<K2L>	<>
3739	3298	.	.
3739	3298	<~>	<~>
3739	3298	<split-s>	<split-s>
3739	3298	<split-h>	<split-h>
3739	3298	<name2>	<name2>
3739	3301	<aphaerese>	<aphaerese>
3739	3740	<>	<aphaerese>
3739	3298	<elision3>	<elision3>
3739	3740	<>	<elision3>
3739	3298	<elision2>	<elision2>
3739	3740	<>	<elision2>
3739	3298	<elision1>	<elision1>
3739	3740	<>	<elision1>
3739	3316	.	υ
3739	3269	s	υ
3739	3316	.	u
3739	3269	s	u
3739	3334	.	κ
3739	3310	s	U
3739	3316	.	α
3739	3269	s	α
3739	3316	.	a
3739	3269	s	a
3739	3313	s	A
3739	3334	.	λ
3739	3262	<1m>	<>
3739	3734	<K2L>	<>
3740	3298	.	.
3740	3298	<~>	<~>
3740	3298	<split-s>	<split-s>
3740	3298	<split-h>	<split-h>
3740	3298	<name2>	<name2>
3740	3738	<>	<name>
3740	3301	<aphaerese>	<aphaerese>
3740	3740	<>	<aphaerese>
3740	3298	<elision3>	<elision3>
3740	3740	<>	<elision3>
3740	3298	<elision2>	<elision2>
3740	3740	<>	<elision2>
3740	3298	<elision1>	<elision1>
3740	3740	<>	<elision1>
3740	3316	.	υ
3740	3269	s	υ
3740	3316	.	u
3740	3269	s	u
3740	3334	.	κ
3740	3310	s	U
3740	3316	.	α
3740	3269	s	α
3740	3316	.	a
3740	3269	s	a
3740	3313	s	A
3740	3334	.	λ
3740	3263	<1m>	<>
3740	3735	<K2L>	<>
3741	3328	.	.
3741	3328	<~>	<~>
3741	3328	<split-s>	<split-s>
3741	3328	<split-h>	<split-h>
3741	3328	<name2>	<name2>
3741	3367	<name2>	<name>
3741	3736	<>	<name>
3741	3331	<aphaerese>	<aphaerese>
3741	3735	<>	<aphaerese>
3741	3328	<elision3>	<elision3>
3741	3735	<>	<elision3>
3741	3328	<elision2>	<elision2>
3741	3735	<>	<elision2>
3741	3328	<elision1>	<elision1>
3741	3735	<>	<elision1>
3741	3334	.	υ
3741	3269	s	υ
3741	3334	.	u
3741	3269	s	u
3741	3310	s	U
3741	3334	.	α
3741	3269	s	α
3741	3334	.	a
3741	3269	s	a
3741	3313	s	A
3741	3263	<1m>	<>
3742	3743	<>	<name>
3742	3742	<>	<aphaerese>
3742	3742	<>	<elision3>
3742	3742	<>	<elision2>
3742	3742	<>	<elision1>
3742	3746	<lambda2L>	<>
3743	3744	<>	<aphaerese>
3743	3744	<>	<elision3>
3743	3744	<>	<elision2>
3743	3744	<>	<elision1>
3743	3747	<lambda2L>	<>
3744	3742	<>	<aphaerese>
3744	3742	<>	<elision3>
3744	3742	<>	<elision2>
3744	3742	<>	<elision1>
3744	3745	<lambda2L>	<>
3745	3328	.	.
3745	3328	<~>	<~>
3745	3328	<split-s>	<split-s>
3745	3328	<split-h>	<split-h>
3745	3328	<name2>	<name2>
3745	3331	<aphaerese>	<aphaerese>
3745	3746	<>	<aphaerese>
3745	3328	<elision3>	<elision3>
3745	3746	<>	<elision3>
3745	3328	<elision2>	<elision2>
3745	3746	<>	<elision2>
3745	3328	<elision1>	<elision1>
3745	3746	<>	<elision1>
3745	3334	.	υ
3745	3269	s	υ
3745	3334	.	u
3745	3269	s	u
3745	3334	.	κ
3745	3310	s	U
3745	3334	.	α
3745	3269	s	α
3745	3334	.	a
3745	3269	s	a
3745	3313	s	A
3745	3334	.	λ
3745	3262	<1m>	<>
3746	3328	.	.
3746	3328	<~>	<~>
3746	3328	<split-s>	<split-s>
3746	3328	<split-h>	<split-h>
3746	3328	<name2>	<name2>
3746	3747	<>	<name>
3746	3331	<aphaerese>	<aphaerese>
3746	3746	<>	<aphaerese>
3746	3328	<elision3>	<elision3>
3746	3746	<>	<elision3>
3746	3328	<elision2>	<elision2>
3746	3746	<>	<elision2>
3746	3328	<elision1>	<elision1>
3746	3746	<>	<elision1>
3746	3334	.	υ
3746	3269	s	υ
3746	3334	.	u
3746	3269	s	u
3746	3334	.	κ
3746	3310	s	U
3746	3334	.	α
3746	3269	s	α
3746	3334	.	a
3746	3269	s	a
3746	3313	s	A
3746	3334	.	λ
3746	3263	<1m>	<>
3747	3330	.	.
3747	3330	<~>	<~>
3747	3330	<split-s>	<split-s>
3747	3330	<split-h>	<split-h>
3747	3330	<name2>	<name2>
3747	3333	<aphaerese>	<aphaerese>
3747	3745	<>	<aphaerese>
3747	3330	<elision3>	<elision3>
3747	3745	<>	<elision3>
3747	3330	<elision2>	<elision2>
3747	3745	<>	<elision2>
3747	3330	<elision1>	<elision1>
3747	3745	<>	<elision1>
3747	3336	.	υ
3747	3268	s	υ
3747	3336	.	u
3747	3268	s	u
3747	3336	.	κ
3747	3312	s	U
3747	3336	.	α
3747	3268	s	α
3747	3336	.	a
3747	3268	s	a
3747	3315	s	A
3747	3336	.	λ
3747	3261	<1m>	<>
3748	3749	<>	<name>
3748	3748	<>	<aphaerese>
3748	3748	<>	<elision3>
3748	3748	<>	<elision2>
3748	3748	<>	<elision1>
3748	3746	<l2L>	<>
3749	3750	<>	<aphaerese>
3749	3750	<>	<elision3>
3749	3750	<>	<elision2>
3749	3750	<>	<elision1>
3749	3747	<l2L>	<>
3750	3748	<>	<aphaerese>
3750	3748	<>	<elision3>
3750	3748	<>	<elision2>
3750	3748	<>	<elision1>
3750	3745	<l2L>	<>
3751	3328	.	.
3751	3328	<~>	<~>
3751	3328	<split-s>	<split-s>
3751	3328	<split-h>	<split-h>
3751	3328	<name2>	<name2>
3751	3367	<name2>	<name>
3751	3747	<>	<name>
3751	3331	<aphaerese>	<aphaerese>
3751	3746	<>	<aphaerese>
3751	3328	<elision3>	<elision3>
3751	3746	<>	<elision3>
3751	3328	<elision2>	<elision2>
3751	3746	<>	<elision2>
3751	3328	<elision1>	<elision1>
3751	3746	<>	<elision1>
3751	3334	.	υ
3751	3269	s	υ
3751	3334	.	u
3751	3269	s	u
3751	3334	.	κ
3751	3310	s	U
3751	3334	.	α
3751	3269	s	α
3751	3334	.	a
3751	3269	s	a
3751	3313	s	A
3751	3334	.	λ
3751	3263	<1m>	<>
3751	3366	<l2L>	<>
3752	3673	<>	<name>
3752	3672	<>	<aphaerese>
3752	3672	<>	<elision3>
3752	3672	<>	<elision2>
3752	3672	<>	<elision1>
3752	3676	<kappa2K>	<>
3752	3753	<kappa2L>	<>
3752	3135	<lambda2L>	<>
3753	2984	.	.
3753	2985	 	 
3753	2984	<~>	<~>
3753	2984	<split-s>	<split-s>
3753	2984	<split-h>	<split-h>
3753	2984	<name2>	<name2>
3753	3680	<>	<name>
3753	2988	<aphaerese>	<aphaerese>
3753	3679	<>	<aphaerese>
3753	3101	<elision3>	<elision3>
3753	3679	<>	<elision3>
3753	3101	<elision2>	<elision2>
3753	3679	<>	<elision2>
3753	3101	<elision1>	<elision1>
3753	3679	<>	<elision1>
3753	2992	.	υ
3753	2995	s	υ
3753	2992	.	u
3753	2995	s	u
3753	3041	s	U
3753	2992	.	α
3753	3066	s	α
3753	2992	.	a
3753	3066	s	a
3753	3069	s	A
3753	3754	<1s>	<>
3754	251	.	.
3754	252	 	 
3754	251	<~>	<~>
3754	251	<split-s>	<split-s>
3754	251	<split-h>	<split-h>
3754	251	<name2>	<name2>
3754	3681	<>	<name>
3754	255	<aphaerese>	<aphaerese>
3754	3683	<>	<aphaerese>
3754	2128	<elision3>	<elision3>
3754	3683	<>	<elision3>
3754	2128	<elision2>	<elision2>
3754	3683	<>	<elision2>
3754	2128	<elision1>	<elision1>
3754	3683	<>	<elision1>
3754	1546	.	υ
3754	1546	.	u
3754	1546	.	α
3754	1546	.	a
3754	3755	<K>	<>
3755	1596	.	.
3755	1596	<~>	<~>
3755	1596	<split-s>	<split-s>
3755	1596	<split-h>	<split-h>
3755	1596	<name2>	<name2>
3755	3685	<>	<name>
3755	1599	<aphaerese>	<aphaerese>
3755	3684	<>	<aphaerese>
3755	2077	<elision3>	<elision3>
3755	3684	<>	<elision3>
3755	2077	<elision2>	<elision2>
3755	3684	<>	<elision2>
3755	2077	<elision1>	<elision1>
3755	3684	<>	<elision1>
3755	1595	.	υ
3755	1595	.	u
3755	1595	.	α
3755	1595	.	a
3756	3692	<>	<name>
3756	3691	<>	<aphaerese>
3756	3691	<>	<elision3>
3756	3691	<>	<elision2>
3756	3691	<>	<elision1>
3756	3695	<k2K>	<>
3756	3757	<k2L>	<>
3756	3135	<l2L>	<>
3757	2984	.	.
3757	2985	 	 
3757	2984	<~>	<~>
3757	2984	<split-s>	<split-s>
3757	2984	<split-h>	<split-h>
3757	2984	<name2>	<name2>
3757	3699	<>	<name>
3757	2988	<aphaerese>	<aphaerese>
3757	3698	<>	<aphaerese>
3757	2984	<elision3>	<elision3>
3757	3698	<>	<elision3>
3757	2984	<elision2>	<elision2>
3757	3698	<>	<elision2>
3757	2984	<elision1>	<elision1>
3757	3698	<>	<elision1>
3757	2992	.	υ
3757	2995	s	υ
3757	2992	.	u
3757	2995	s	u
3757	3041	s	U
3757	2992	.	α
3757	3066	s	α
3757	2992	.	a
3757	3066	s	a
3757	3069	s	A
3757	3758	<1s>	<>
3758	251	.	.
3758	252	 	 
3758	251	<~>	<~>
3758	251	<split-s>	<split-s>
3758	251	<split-h>	<split-h>
3758	251	<name2>	<name2>
3758	2401	<>	<name>
3758	255	<aphaerese>	<aphaerese>
3758	2400	<>	<aphaerese>
3758	251	<elision3>	<elision3>
3758	2400	<>	<elision3>
3758	251	<elision2>	<elision2>
3758	2400	<>	<elision2>
3758	251	<elision1>	<elision1>
3758	2400	<>	<elision1>
3758	1546	.	υ
3758	1546	.	u
3758	1546	.	α
3758	1546	.	a
3758	3759	<K>	<>
3759	1596	.	.
3759	1596	<~>	<~>
3759	1596	<split-s>	<split-s>
3759	1596	<split-h>	<split-h>
3759	1596	<name2>	<name2>
3759	2402	<>	<name>
3759	1599	<aphaerese>	<aphaerese>
3759	2404	<>	<aphaerese>
3759	1596	<elision3>	<elision3>
3759	2404	<>	<elision3>
3759	1596	<elision2>	<elision2>
3759	2404	<>	<elision2>
3759	1596	<elision1>	<elision1>
3759	2404	<>	<elision1>
3759	1595	.	υ
3759	1595	.	u
3759	1595	.	α
3759	1595	.	a
3760	2818	.	.
3760	2819	 	 
3760	2818	<~>	<~>
3760	2818	<split-s>	<split-s>
3760	2818	<split-h>	<split-h>
3760	2818	<name2>	<name2>
3760	3158	<name2>	<name>
3760	3705	<>	<name>
3760	2822	<aphaerese>	<aphaerese>
3760	3704	<>	<aphaerese>
3760	2818	<elision3>	<elision3>
3760	3704	<>	<elision3>
3760	2818	<elision2>	<elision2>
3760	3704	<>	<elision2>
3760	2818	<elision1>	<elision1>
3760	3704	<>	<elision1>
3760	2826	.	υ
3760	2829	s	υ
3760	2826	.	u
3760	2829	s	u
3760	2992	.	κ
3760	2892	s	U
3760	2826	.	α
3760	2920	s	α
3760	2826	.	a
3760	2920	s	a
3760	2923	s	A
3760	2992	.	λ
3760	2316	<1s>	<>
3760	3162	<k2K>	<>
3760	3163	<k2L>	<>
3760	3761	<K2L>	<>
3761	2984	.	.
3761	2985	 	 
3761	2984	<~>	<~>
3761	2984	<split-s>	<split-s>
3761	2984	<split-h>	<split-h>
3761	2984	<name2>	<name2>
3761	3164	<name2>	<name>
3761	3699	<>	<name>
3761	2988	<aphaerese>	<aphaerese>
3761	3698	<>	<aphaerese>
3761	2984	<elision3>	<elision3>
3761	3698	<>	<elision3>
3761	2984	<elision2>	<elision2>
3761	3698	<>	<elision2>
3761	2984	<elision1>	<elision1>
3761	3698	<>	<elision1>
3761	2992	.	υ
3761	2995	s	υ
3761	2992	.	u
3761	2995	s	u
3761	3041	s	U
3761	2992	.	α
3761	3066	s	α
3761	2992	.	a
3761	3066	s	a
3761	3069	s	A
3761	3762	<1s>	<>
3762	251	.	.
3762	252	 	 
3762	251	<~>	<~>
3762	251	<split-s>	<split-s>
3762	251	<split-h>	<split-h>
3762	251	<name2>	<name2>
3762	2258	<name2>	<name>
3762	2401	<>	<name>
3762	255	<aphaerese>	<aphaerese>
3762	2400	<>	<aphaerese>
3762	251	<elision3>	<elision3>
3762	2400	<>	<elision3>
3762	251	<elision2>	<elision2>
3762	2400	<>	<elision2>
3762	251	<elision1>	<elision1>
3762	2400	<>	<elision1>
3762	1546	.	υ
3762	1546	.	u
3762	1546	.	α
3762	1546	.	a
3762	3763	<K>	<>
3763	1596	.	.
3763	1596	<~>	<~>
3763	1596	<split-s>	<split-s>
3763	1596	<split-h>	<split-h>
3763	1596	<name2>	<name2>
3763	2148	<name2>	<name>
3763	2402	<>	<name>
3763	1599	<aphaerese>	<aphaerese>
3763	2404	<>	<aphaerese>
3763	1596	<elision3>	<elision3>
3763	2404	<>	<elision3>
3763	1596	<elision2>	<elision2>
3763	2404	<>	<elision2>
3763	1596	<elision1>	<elision1>
3763	2404	<>	<elision1>
3763	1595	.	υ
3763	1595	.	u
3763	1595	.	α
3763	1595	.	a
3764	2984	.	.
3764	2985	 	 
3764	2984	<~>	<~>
3764	2984	<split-s>	<split-s>
3764	2984	<split-h>	<split-h>
3764	2984	<name2>	<name2>
3764	3164	<name2>	<name>
3764	3710	<>	<name>
3764	2988	<aphaerese>	<aphaerese>
3764	3712	<>	<aphaerese>
3764	2984	<elision3>	<elision3>
3764	3712	<>	<elision3>
3764	2984	<elision2>	<elision2>
3764	3712	<>	<elision2>
3764	2984	<elision1>	<elision1>
3764	3712	<>	<elision1>
3764	2992	.	υ
3764	2995	s	υ
3764	2992	.	u
3764	2995	s	u
3764	2992	.	κ
3764	3041	s	U
3764	2992	.	α
3764	3066	s	α
3764	2992	.	a
3764	3066	s	a
3764	3069	s	A
3764	2992	.	λ
3764	2413	<1s>	<>
3764	3163	<l2L>	<>
3765	215	.	.
3765	216	 	 
3765	215	<~>	<~>
3765	215	<split-s>	<split-s>
3765	215	<split-h>	<split-h>
3765	215	<name2>	<name2>
3765	219	<aphaerese>	<aphaerese>
3765	3766	<>	<aphaerese>
3765	3769	<elision3>	<elision3>
3765	3766	<>	<elision3>
3765	3769	<elision2>	<elision2>
3765	3766	<>	<elision2>
3765	3769	<elision1>	<elision1>
3765	3766	<>	<elision1>
3765	3187	.	υ
3765	3231	H	υ
3765	3187	.	u
3765	3233	H	u
3765	3187	.	κ
3765	3646	H	κ
3765	3141	H	k
3765	3154	H	U
3765	3157	H	K
3765	3187	.	α
3765	3217	H	α
3765	3187	.	a
3765	3222	H	a
3765	2984	H	A
3765	3187	.	λ
3765	3623	H	λ
3765	3571	H	l
3765	3576	H	L
3765	3772	<K>	<>
3766	215	.	.
3766	216	 	 
3766	215	<~>	<~>
3766	215	<split-s>	<split-s>
3766	215	<split-h>	<split-h>
3766	215	<name2>	<name2>
3766	3767	<>	<name>
3766	219	<aphaerese>	<aphaerese>
3766	3766	<>	<aphaerese>
3766	3769	<elision3>	<elision3>
3766	3766	<>	<elision3>
3766	3769	<elision2>	<elision2>
3766	3766	<>	<elision2>
3766	3769	<elision1>	<elision1>
3766	3766	<>	<elision1>
3766	3187	.	υ
3766	3231	H	υ
3766	3187	.	u
3766	3233	H	u
3766	3187	.	κ
3766	3646	H	κ
3766	3141	H	k
3766	3154	H	U
3766	3157	H	K
3766	3187	.	α
3766	3217	H	α
3766	3187	.	a
3766	3222	H	a
3766	2984	H	A
3766	3187	.	λ
3766	3623	H	λ
3766	3571	H	l
3766	3576	H	L
3766	3773	<K>	<>
3767	214	.	.
3767	218	 	 
3767	214	<~>	<~>
3767	214	<split-s>	<split-s>
3767	214	<split-h>	<split-h>
3767	214	<name2>	<name2>
3767	221	<aphaerese>	<aphaerese>
3767	3765	<>	<aphaerese>
3767	3768	<elision3>	<elision3>
3767	3765	<>	<elision3>
3767	3768	<elision2>	<elision2>
3767	3765	<>	<elision2>
3767	3768	<elision1>	<elision1>
3767	3765	<>	<elision1>
3767	3189	.	υ
3767	3226	H	υ
3767	3189	.	u
3767	3230	H	u
3767	3189	.	κ
3767	3603	H	κ
3767	3182	H	k
3767	3156	H	U
3767	3186	H	K
3767	3189	.	α
3767	3216	H	α
3767	3189	.	a
3767	3221	H	a
3767	2987	H	A
3767	3189	.	λ
3767	3622	H	λ
3767	3570	H	l
3767	3573	H	L
3767	3771	<K>	<>
3768	215	.	.
3768	216	 	 
3768	215	<~>	<~>
3768	215	<split-s>	<split-s>
3768	215	<split-h>	<split-h>
3768	215	<name2>	<name2>
3768	219	<aphaerese>	<aphaerese>
3768	3769	<>	<aphaerese>
3768	215	<elision3>	<elision3>
3768	3769	<>	<elision3>
3768	215	<elision2>	<elision2>
3768	3769	<>	<elision2>
3768	215	<elision1>	<elision1>
3768	3769	<>	<elision1>
3768	3187	.	υ
3768	3231	H	υ
3768	3187	.	u
3768	3233	H	u
3768	222	.	κ
3768	3752	H	κ
3768	3756	H	k
3768	3154	H	U
3768	3760	H	K
3768	3187	.	α
3768	3217	H	α
3768	3187	.	a
3768	3222	H	a
3768	2984	H	A
3768	3708	H	λ
3768	3714	H	l
3768	3764	H	L
3769	215	.	.
3769	216	 	 
3769	215	<~>	<~>
3769	215	<split-s>	<split-s>
3769	215	<split-h>	<split-h>
3769	215	<name2>	<name2>
3769	3770	<>	<name>
3769	219	<aphaerese>	<aphaerese>
3769	3769	<>	<aphaerese>
3769	215	<elision3>	<elision3>
3769	3769	<>	<elision3>
3769	215	<elision2>	<elision2>
3769	3769	<>	<elision2>
3769	215	<elision1>	<elision1>
3769	3769	<>	<elision1>
3769	3187	.	υ
3769	3231	H	υ
3769	3187	.	u
3769	3233	H	u
3769	222	.	κ
3769	3752	H	κ
3769	3756	H	k
3769	3154	H	U
3769	3760	H	K
3769	3187	.	α
3769	3217	H	α
3769	3187	.	a
3769	3222	H	a
3769	2984	H	A
3769	3708	H	λ
3769	3714	H	l
3769	3764	H	L
3770	214	.	.
3770	218	 	 
3770	214	<~>	<~>
3770	214	<split-s>	<split-s>
3770	214	<split-h>	<split-h>
3770	214	<name2>	<name2>
3770	221	<aphaerese>	<aphaerese>
3770	3768	<>	<aphaerese>
3770	214	<elision3>	<elision3>
3770	3768	<>	<elision3>
3770	214	<elision2>	<elision2>
3770	3768	<>	<elision2>
3770	214	<elision1>	<elision1>
3770	3768	<>	<elision1>
3770	3189	.	υ
3770	3226	H	υ
3770	3189	.	u
3770	3230	H	u
3770	224	.	κ
3770	3671	H	κ
3770	3690	H	k
3770	3156	H	U
3770	3703	H	K
3770	3189	.	α
3770	3216	H	α
3770	3189	.	a
3770	3221	H	a
3770	2987	H	A
3770	3707	H	λ
3770	3713	H	l
3770	3711	H	L
3771	3239	.	.
3771	3239	<~>	<~>
3771	3239	<split-s>	<split-s>
3771	3239	<split-h>	<split-h>
3771	3239	<name2>	<name2>
3771	3242	<aphaerese>	<aphaerese>
3771	3772	<>	<aphaerese>
3771	3717	<elision3>	<elision3>
3771	3772	<>	<elision3>
3771	3717	<elision2>	<elision2>
3771	3772	<>	<elision2>
3771	3717	<elision1>	<elision1>
3771	3772	<>	<elision1>
3771	3235	.	υ
3771	3381	H	υ
3771	3235	.	u
3771	3390	H	u
3771	3235	.	κ
3771	3633	H	κ
3771	3350	H	k
3771	3359	H	U
3771	3363	H	K
3771	3235	.	α
3771	3393	H	α
3771	3235	.	a
3771	3396	H	a
3771	3330	H	A
3771	3235	.	λ
3771	3642	H	λ
3771	3377	H	l
3771	3372	H	L
3772	3237	.	.
3772	3237	<~>	<~>
3772	3237	<split-s>	<split-s>
3772	3237	<split-h>	<split-h>
3772	3237	<name2>	<name2>
3772	3240	<aphaerese>	<aphaerese>
3772	3773	<>	<aphaerese>
3772	3718	<elision3>	<elision3>
3772	3773	<>	<elision3>
3772	3718	<elision2>	<elision2>
3772	3773	<>	<elision2>
3772	3718	<elision1>	<elision1>
3772	3773	<>	<elision1>
3772	3236	.	υ
3772	3379	H	υ
3772	3236	.	u
3772	3388	H	u
3772	3236	.	κ
3772	3631	H	κ
3772	3348	H	k
3772	3357	H	U
3772	3360	H	K
3772	3236	.	α
3772	3391	H	α
3772	3236	.	a
3772	3394	H	a
3772	3328	H	A
3772	3236	.	λ
3772	3640	H	λ
3772	3375	H	l
3772	3378	H	L
3773	3237	.	.
3773	3237	<~>	<~>
3773	3237	<split-s>	<split-s>
3773	3237	<split-h>	<split-h>
3773	3237	<name2>	<name2>
3773	3771	<>	<name>
3773	3240	<aphaerese>	<aphaerese>
3773	3773	<>	<aphaerese>
3773	3718	<elision3>	<elision3>
3773	3773	<>	<elision3>
3773	3718	<elision2>	<elision2>
3773	3773	<>	<elision2>
3773	3718	<elision1>	<elision1>
3773	3773	<>	<elision1>
3773	3236	.	υ
3773	3379	H	υ
3773	3236	.	u
3773	3388	H	u
3773	3236	.	κ
3773	3631	H	κ
3773	3348	H	k
3773	3357	H	U
3773	3360	H	K
3773	3236	.	α
3773	3391	H	α
3773	3236	.	a
3773	3394	H	a
3773	3328	H	A
3773	3236	.	λ
3773	3640	H	λ
3773	3375	H	l
3773	3378	H	L
3774	3413	.	.
3774	3413	 	 
3774	3413	<~>	<~>
3774	3413	<split-s>	<split-s>
3774	3413	<split-h>	<split-h>
3774	3413	<name2>	<name2>
3774	3775	<>	<name>
3774	3416	<aphaerese>	<aphaerese>
3774	3774	<>	<aphaerese>
3774	3413	<elision3>	<elision3>
3774	3774	<>	<elision3>
3774	3413	<elision2>	<elision2>
3774	3774	<>	<elision2>
3774	3413	<elision1>	<elision1>
3774	3774	<>	<elision1>
3774	3577	.	υ
3774	3577	.	u
3774	3577	.	κ
3774	3577	.	α
3774	3577	.	a
3774	3577	.	λ
3774	3778	<4s>	<>
3775	3415	.	.
3775	3415	 	 
3775	3415	<~>	<~>
3775	3415	<split-s>	<split-s>
3775	3415	<split-h>	<split-h>
3775	3415	<name2>	<name2>
3775	3418	<aphaerese>	<aphaerese>
3775	3776	<>	<aphaerese>
3775	3415	<elision3>	<elision3>
3775	3776	<>	<elision3>
3775	3415	<elision2>	<elision2>
3775	3776	<>	<elision2>
3775	3415	<elision1>	<elision1>
3775	3776	<>	<elision1>
3775	3579	.	υ
3775	3579	.	u
3775	3579	.	κ
3775	3579	.	α
3775	3579	.	a
3775	3579	.	λ
3775	3779	<4s>	<>
3776	3413	.	.
3776	3413	 	 
3776	3413	<~>	<~>
3776	3413	<split-s>	<split-s>
3776	3413	<split-h>	<split-h>
3776	3413	<name2>	<name2>
3776	3416	<aphaerese>	<aphaerese>
3776	3774	<>	<aphaerese>
3776	3413	<elision3>	<elision3>
3776	3774	<>	<elision3>
3776	3413	<elision2>	<elision2>
3776	3774	<>	<elision2>
3776	3413	<elision1>	<elision1>
3776	3774	<>	<elision1>
3776	3577	.	υ
3776	3577	.	u
3776	3577	.	κ
3776	3577	.	α
3776	3577	.	a
3776	3577	.	λ
3776	3777	<4s>	<>
3777	215	.	.
3777	216	 	 
3777	215	<~>	<~>
3777	215	<split-s>	<split-s>
3777	215	<split-h>	<split-h>
3777	215	<name2>	<name2>
3777	219	<aphaerese>	<aphaerese>
3777	3778	<>	<aphaerese>
3777	215	<elision3>	<elision3>
3777	3778	<>	<elision3>
3777	215	<elision2>	<elision2>
3777	3778	<>	<elision2>
3777	215	<elision1>	<elision1>
3777	3778	<>	<elision1>
3777	3187	.	υ
3777	3231	H	υ
3777	3187	.	u
3777	3233	H	u
3777	3187	.	κ
3777	3646	H	κ
3777	3141	H	k
3777	3154	H	U
3777	3157	H	K
3777	3187	.	α
3777	3217	H	α
3777	3187	.	a
3777	3222	H	a
3777	2984	H	A
3777	3187	.	λ
3777	3623	H	λ
3777	3571	H	l
3777	3576	H	L
3777	3781	<K>	<>
3778	215	.	.
3778	216	 	 
3778	215	<~>	<~>
3778	215	<split-s>	<split-s>
3778	215	<split-h>	<split-h>
3778	215	<name2>	<name2>
3778	3779	<>	<name>
3778	219	<aphaerese>	<aphaerese>
3778	3778	<>	<aphaerese>
3778	215	<elision3>	<elision3>
3778	3778	<>	<elision3>
3778	215	<elision2>	<elision2>
3778	3778	<>	<elision2>
3778	215	<elision1>	<elision1>
3778	3778	<>	<elision1>
3778	3187	.	υ
3778	3231	H	υ
3778	3187	.	u
3778	3233	H	u
3778	3187	.	κ
3778	3646	H	κ
3778	3141	H	k
3778	3154	H	U
3778	3157	H	K
3778	3187	.	α
3778	3217	H	α
3778	3187	.	a
3778	3222	H	a
3778	2984	H	A
3778	3187	.	λ
3778	3623	H	λ
3778	3571	H	l
3778	3576	H	L
3778	3782	<K>	<>
3779	214	.	.
3779	218	 	 
3779	214	<~>	<~>
3779	214	<split-s>	<split-s>
3779	214	<split-h>	<split-h>
3779	214	<name2>	<name2>
3779	221	<aphaerese>	<aphaerese>
3779	3777	<>	<aphaerese>
3779	214	<elision3>	<elision3>
3779	3777	<>	<elision3>
3779	214	<elision2>	<elision2>
3779	3777	<>	<elision2>
3779	214	<elision1>	<elision1>
3779	3777	<>	<elision1>
3779	3189	.	υ
3779	3226	H	υ
3779	3189	.	u
3779	3230	H	u
3779	3189	.	κ
3779	3603	H	κ
3779	3182	H	k
3779	3156	H	U
3779	3186	H	K
3779	3189	.	α
3779	3216	H	α
3779	3189	.	a
3779	3221	H	a
3779	2987	H	A
3779	3189	.	λ
3779	3622	H	λ
3779	3570	H	l
3779	3573	H	L
3779	3780	<K>	<>
3780	3239	.	.
3780	3239	<~>	<~>
3780	3239	<split-s>	<split-s>
3780	3239	<split-h>	<split-h>
3780	3239	<name2>	<name2>
3780	3242	<aphaerese>	<aphaerese>
3780	3781	<>	<aphaerese>
3780	3239	<elision3>	<elision3>
3780	3781	<>	<elision3>
3780	3239	<elision2>	<elision2>
3780	3781	<>	<elision2>
3780	3239	<elision1>	<elision1>
3780	3781	<>	<elision1>
3780	3235	.	υ
3780	3381	H	υ
3780	3235	.	u
3780	3390	H	u
3780	3235	.	κ
3780	3633	H	κ
3780	3350	H	k
3780	3359	H	U
3780	3363	H	K
3780	3235	.	α
3780	3393	H	α
3780	3235	.	a
3780	3396	H	a
3780	3330	H	A
3780	3235	.	λ
3780	3642	H	λ
3780	3377	H	l
3780	3372	H	L
3781	3237	.	.
3781	3237	<~>	<~>
3781	3237	<split-s>	<split-s>
3781	3237	<split-h>	<split-h>
3781	3237	<name2>	<name2>
3781	3240	<aphaerese>	<aphaerese>
3781	3782	<>	<aphaerese>
3781	3237	<elision3>	<elision3>
3781	3782	<>	<elision3>
3781	3237	<elision2>	<elision2>
3781	3782	<>	<elision2>
3781	3237	<elision1>	<elision1>
3781	3782	<>	<elision1>
3781	3236	.	υ
3781	3379	H	υ
3781	3236	.	u
3781	3388	H	u
3781	3236	.	κ
3781	3631	H	κ
3781	3348	H	k
3781	3357	H	U
3781	3360	H	K
3781	3236	.	α
3781	3391	H	α
3781	3236	.	a
3781	3394	H	a
3781	3328	H	A
3781	3236	.	λ
3781	3640	H	λ
3781	3375	H	l
3781	3378	H	L
3782	3237	.	.
3782	3237	<~>	<~>
3782	3237	<split-s>	<split-s>
3782	3237	<split-h>	<split-h>
3782	3237	<name2>	<name2>
3782	3780	<>	<name>
3782	3240	<aphaerese>	<aphaerese>
3782	3782	<>	<aphaerese>
3782	3237	<elision3>	<elision3>
3782	3782	<>	<elision3>
3782	3237	<elision2>	<elision2>
3782	3782	<>	<elision2>
3782	3237	<elision1>	<elision1>
3782	3782	<>	<elision1>
3782	3236	.	υ
3782	3379	H	υ
3782	3236	.	u
3782	3388	H	u
3782	3236	.	κ
3782	3631	H	κ
3782	3348	H	k
3782	3357	H	U
3782	3360	H	K
3782	3236	.	α
3782	3391	H	α
3782	3236	.	a
3782	3394	H	a
3782	3328	H	A
3782	3236	.	λ
3782	3640	H	λ
3782	3375	H	l
3782	3378	H	L
3783	3784	<>	<name>
3783	3783	<>	<aphaerese>
3783	3783	<>	<elision3>
3783	3783	<>	<elision2>
3783	3783	<>	<elision1>
3783	3413	<U2kl>	<>
3784	3785	<>	<aphaerese>
3784	3785	<>	<elision3>
3784	3785	<>	<elision2>
3784	3785	<>	<elision1>
3784	3414	<U2kl>	<>
3785	3783	<>	<aphaerese>
3785	3783	<>	<elision3>
3785	3783	<>	<elision2>
3785	3783	<>	<elision1>
3785	3415	<U2kl>	<>
3786	3787	<name>	<name>
3786	3790	<>	<name>
3786	3792	<>	<aphaerese>
3786	3792	<>	<elision3>
3786	3792	<>	<elision2>
3786	3792	<>	<elision1>
3786	3898	<4s>	<>
3786	3793	<A2kl>	<>
3786	3856	<L2kl>	<>
3786	3901	<K2kl>	<>
3787	3788	<4s>	<>
3788	3186	H	k
3788	3573	H	l
3788	3789	<K>	<>
3789	3363	H	k
3789	3372	H	l
3790	3791	<>	<aphaerese>
3790	3791	<>	<elision3>
3790	3791	<>	<elision2>
3790	3791	<>	<elision1>
3790	3794	<A2kl>	<>
3790	3857	<L2kl>	<>
3790	3890	<K2kl>	<>
3791	3792	<>	<aphaerese>
3791	3792	<>	<elision3>
3791	3792	<>	<elision2>
3791	3792	<>	<elision1>
3791	3795	<A2kl>	<>
3791	3858	<L2kl>	<>
3791	3891	<K2kl>	<>
3792	3790	<>	<name>
3792	3792	<>	<aphaerese>
3792	3792	<>	<elision3>
3792	3792	<>	<elision2>
3792	3792	<>	<elision1>
3792	3793	<A2kl>	<>
3792	3856	<L2kl>	<>
3792	3889	<K2kl>	<>
3793	3794	<>	<name>
3793	3793	<>	<aphaerese>
3793	3793	<>	<elision3>
3793	3793	<>	<elision2>
3793	3793	<>	<elision1>
3793	3796	.	κ
3793	3796	.	λ
3793	3848	<4s>	<>
3794	3795	<>	<aphaerese>
3794	3795	<>	<elision3>
3794	3795	<>	<elision2>
3794	3795	<>	<elision1>
3794	3798	.	κ
3794	3798	.	λ
3794	3849	<4s>	<>
3795	3793	<>	<aphaerese>
3795	3793	<>	<elision3>
3795	3793	<>	<elision2>
3795	3793	<>	<elision1>
3795	3796	.	κ
3795	3796	.	λ
3795	3847	<4s>	<>
3796	3797	<>	<name>
3796	3796	<>	<aphaerese>
3796	3799	<elision3>	<elision3>
3796	3796	<>	<elision3>
3796	3799	<elision2>	<elision2>
3796	3796	<>	<elision2>
3796	3799	<elision1>	<elision1>
3796	3796	<>	<elision1>
3796	3839	<4s>	<>
3797	3798	<>	<aphaerese>
3797	3801	<elision3>	<elision3>
3797	3798	<>	<elision3>
3797	3801	<elision2>	<elision2>
3797	3798	<>	<elision2>
3797	3801	<elision1>	<elision1>
3797	3798	<>	<elision1>
3797	3840	<4s>	<>
3798	3796	<>	<aphaerese>
3798	3799	<elision3>	<elision3>
3798	3796	<>	<elision3>
3798	3799	<elision2>	<elision2>
3798	3796	<>	<elision2>
3798	3799	<elision1>	<elision1>
3798	3796	<>	<elision1>
3798	3838	<4s>	<>
3799	3413	.	.
3799	3413	 	 
3799	3413	<~>	<~>
3799	3413	<split-s>	<split-s>
3799	3413	<split-h>	<split-h>
3799	3413	<name2>	<name2>
3799	3800	<>	<name>
3799	3416	<aphaerese>	<aphaerese>
3799	3799	<>	<aphaerese>
3799	3413	<elision3>	<elision3>
3799	3799	<>	<elision3>
3799	3413	<elision2>	<elision2>
3799	3799	<>	<elision2>
3799	3413	<elision1>	<elision1>
3799	3799	<>	<elision1>
3799	3577	.	υ
3799	3577	.	u
3799	3577	.	α
3799	3577	.	a
3799	3803	<4s>	<>
3800	3415	.	.
3800	3415	 	 
3800	3415	<~>	<~>
3800	3415	<split-s>	<split-s>
3800	3415	<split-h>	<split-h>
3800	3415	<name2>	<name2>
3800	3418	<aphaerese>	<aphaerese>
3800	3801	<>	<aphaerese>
3800	3415	<elision3>	<elision3>
3800	3801	<>	<elision3>
3800	3415	<elision2>	<elision2>
3800	3801	<>	<elision2>
3800	3415	<elision1>	<elision1>
3800	3801	<>	<elision1>
3800	3579	.	υ
3800	3579	.	u
3800	3579	.	α
3800	3579	.	a
3800	3804	<4s>	<>
3801	3413	.	.
3801	3413	 	 
3801	3413	<~>	<~>
3801	3413	<split-s>	<split-s>
3801	3413	<split-h>	<split-h>
3801	3413	<name2>	<name2>
3801	3416	<aphaerese>	<aphaerese>
3801	3799	<>	<aphaerese>
3801	3413	<elision3>	<elision3>
3801	3799	<>	<elision3>
3801	3413	<elision2>	<elision2>
3801	3799	<>	<elision2>
3801	3413	<elision1>	<elision1>
3801	3799	<>	<elision1>
3801	3577	.	υ
3801	3577	.	u
3801	3577	.	α
3801	3577	.	a
3801	3802	<4s>	<>
3802	215	.	.
3802	216	 	 
3802	215	<~>	<~>
3802	215	<split-s>	<split-s>
3802	215	<split-h>	<split-h>
3802	215	<name2>	<name2>
3802	219	<aphaerese>	<aphaerese>
3802	3803	<>	<aphaerese>
3802	215	<elision3>	<elision3>
3802	3803	<>	<elision3>
3802	215	<elision2>	<elision2>
3802	3803	<>	<elision2>
3802	215	<elision1>	<elision1>
3802	3803	<>	<elision1>
3802	3187	.	υ
3802	3231	H	υ
3802	3187	.	u
3802	3233	H	u
3802	3806	H	κ
3802	3818	H	k
3802	3154	H	U
3802	3810	H	K
3802	3187	.	α
3802	3217	H	α
3802	3187	.	a
3802	3222	H	a
3802	2984	H	A
3802	3806	H	λ
3802	3818	H	l
3802	3810	H	L
3802	3821	<K>	<>
3803	215	.	.
3803	216	 	 
3803	215	<~>	<~>
3803	215	<split-s>	<split-s>
3803	215	<split-h>	<split-h>
3803	215	<name2>	<name2>
3803	3804	<>	<name>
3803	219	<aphaerese>	<aphaerese>
3803	3803	<>	<aphaerese>
3803	215	<elision3>	<elision3>
3803	3803	<>	<elision3>
3803	215	<elision2>	<elision2>
3803	3803	<>	<elision2>
3803	215	<elision1>	<elision1>
3803	3803	<>	<elision1>
3803	3187	.	υ
3803	3231	H	υ
3803	3187	.	u
3803	3233	H	u
3803	3806	H	κ
3803	3818	H	k
3803	3154	H	U
3803	3810	H	K
3803	3187	.	α
3803	3217	H	α
3803	3187	.	a
3803	3222	H	a
3803	2984	H	A
3803	3806	H	λ
3803	3818	H	l
3803	3810	H	L
3803	3822	<K>	<>
3804	214	.	.
3804	218	 	 
3804	214	<~>	<~>
3804	214	<split-s>	<split-s>
3804	214	<split-h>	<split-h>
3804	214	<name2>	<name2>
3804	221	<aphaerese>	<aphaerese>
3804	3802	<>	<aphaerese>
3804	214	<elision3>	<elision3>
3804	3802	<>	<elision3>
3804	214	<elision2>	<elision2>
3804	3802	<>	<elision2>
3804	214	<elision1>	<elision1>
3804	3802	<>	<elision1>
3804	3189	.	υ
3804	3226	H	υ
3804	3189	.	u
3804	3230	H	u
3804	3805	H	κ
3804	3817	H	k
3804	3156	H	U
3804	3809	H	K
3804	3189	.	α
3804	3216	H	α
3804	3189	.	a
3804	3221	H	a
3804	2987	H	A
3804	3805	H	λ
3804	3817	H	l
3804	3809	H	L
3804	3820	<K>	<>
3805	3806	<>	<aphaerese>
3805	3806	<>	<elision3>
3805	3806	<>	<elision2>
3805	3806	<>	<elision1>
3805	3809	<lambda2L>	<>
3806	3807	<>	<name>
3806	3806	<>	<aphaerese>
3806	3806	<>	<elision3>
3806	3806	<>	<elision2>
3806	3806	<>	<elision1>
3806	3810	<lambda2L>	<>
3807	3805	<>	<aphaerese>
3807	3805	<>	<elision3>
3807	3805	<>	<elision2>
3807	3805	<>	<elision1>
3807	3808	<lambda2L>	<>
3808	3809	<>	<aphaerese>
3808	3809	<>	<elision3>
3808	3809	<>	<elision2>
3808	3809	<>	<elision1>
3808	3813	.	κ
3808	3813	.	λ
3808	2241	<1s>	<>
3809	3810	<>	<aphaerese>
3809	3810	<>	<elision3>
3809	3810	<>	<elision2>
3809	3810	<>	<elision1>
3809	3811	.	κ
3809	3811	.	λ
3809	2239	<1s>	<>
3810	3808	<>	<name>
3810	3810	<>	<aphaerese>
3810	3810	<>	<elision3>
3810	3810	<>	<elision2>
3810	3810	<>	<elision1>
3810	3811	.	κ
3810	3811	.	λ
3810	2240	<1s>	<>
3811	3812	<>	<name>
3811	3811	<>	<aphaerese>
3811	3814	<elision3>	<elision3>
3811	3811	<>	<elision3>
3811	3814	<elision2>	<elision2>
3811	3811	<>	<elision2>
3811	3814	<elision1>	<elision1>
3811	3811	<>	<elision1>
3811	2231	<1s>	<>
3812	3813	<>	<aphaerese>
3812	3816	<elision3>	<elision3>
3812	3813	<>	<elision3>
3812	3816	<elision2>	<elision2>
3812	3813	<>	<elision2>
3812	3816	<elision1>	<elision1>
3812	3813	<>	<elision1>
3812	2232	<1s>	<>
3813	3811	<>	<aphaerese>
3813	3814	<elision3>	<elision3>
3813	3811	<>	<elision3>
3813	3814	<elision2>	<elision2>
3813	3811	<>	<elision2>
3813	3814	<elision1>	<elision1>
3813	3811	<>	<elision1>
3813	2230	<1s>	<>
3814	3815	<>	<name>
3814	3814	<>	<aphaerese>
3814	3814	<>	<elision3>
3814	3814	<>	<elision2>
3814	3814	<>	<elision1>
3814	2998	.	κ
3814	3016	s	κ
3814	2751	s	k
3814	2769	s	K
3814	3072	s	λ
3814	2782	s	l
3814	2785	s	L
3814	2225	<1s>	<>
3815	3816	<>	<aphaerese>
3815	3816	<>	<elision3>
3815	3816	<>	<elision2>
3815	3816	<>	<elision1>
3815	3000	.	κ
3815	3018	s	κ
3815	2753	s	k
3815	2772	s	K
3815	3074	s	λ
3815	2784	s	l
3815	2787	s	L
3815	2226	<1s>	<>
3816	3814	<>	<aphaerese>
3816	3814	<>	<elision3>
3816	3814	<>	<elision2>
3816	3814	<>	<elision1>
3816	2998	.	κ
3816	3016	s	κ
3816	2751	s	k
3816	2769	s	K
3816	3072	s	λ
3816	2782	s	l
3816	2785	s	L
3816	2224	<1s>	<>
3817	3818	<>	<aphaerese>
3817	3818	<>	<elision3>
3817	3818	<>	<elision2>
3817	3818	<>	<elision1>
3817	3809	<l2L>	<>
3818	3819	<>	<name>
3818	3818	<>	<aphaerese>
3818	3818	<>	<elision3>
3818	3818	<>	<elision2>
3818	3818	<>	<elision1>
3818	3810	<l2L>	<>
3819	3817	<>	<aphaerese>
3819	3817	<>	<elision3>
3819	3817	<>	<elision2>
3819	3817	<>	<elision1>
3819	3808	<l2L>	<>
3820	3239	.	.
3820	3239	<~>	<~>
3820	3239	<split-s>	<split-s>
3820	3239	<split-h>	<split-h>
3820	3239	<name2>	<name2>
3820	3242	<aphaerese>	<aphaerese>
3820	3821	<>	<aphaerese>
3820	3239	<elision3>	<elision3>
3820	3821	<>	<elision3>
3820	3239	<elision2>	<elision2>
3820	3821	<>	<elision2>
3820	3239	<elision1>	<elision1>
3820	3821	<>	<elision1>
3820	3235	.	υ
3820	3381	H	υ
3820	3235	.	u
3820	3390	H	u
3820	3825	H	κ
3820	3837	H	k
3820	3359	H	U
3820	3826	H	K
3820	3235	.	α
3820	3393	H	α
3820	3235	.	a
3820	3396	H	a
3820	3330	H	A
3820	3825	H	λ
3820	3837	H	l
3820	3826	H	L
3821	3237	.	.
3821	3237	<~>	<~>
3821	3237	<split-s>	<split-s>
3821	3237	<split-h>	<split-h>
3821	3237	<name2>	<name2>
3821	3240	<aphaerese>	<aphaerese>
3821	3822	<>	<aphaerese>
3821	3237	<elision3>	<elision3>
3821	3822	<>	<elision3>
3821	3237	<elision2>	<elision2>
3821	3822	<>	<elision2>
3821	3237	<elision1>	<elision1>
3821	3822	<>	<elision1>
3821	3236	.	υ
3821	3379	H	υ
3821	3236	.	u
3821	3388	H	u
3821	3823	H	κ
3821	3835	H	k
3821	3357	H	U
3821	3827	H	K
3821	3236	.	α
3821	3391	H	α
3821	3236	.	a
3821	3394	H	a
3821	3328	H	A
3821	3823	H	λ
3821	3835	H	l
3821	3827	H	L
3822	3237	.	.
3822	3237	<~>	<~>
3822	3237	<split-s>	<split-s>
3822	3237	<split-h>	<split-h>
3822	3237	<name2>	<name2>
3822	3820	<>	<name>
3822	3240	<aphaerese>	<aphaerese>
3822	3822	<>	<aphaerese>
3822	3237	<elision3>	<elision3>
3822	3822	<>	<elision3>
3822	3237	<elision2>	<elision2>
3822	3822	<>	<elision2>
3822	3237	<elision1>	<elision1>
3822	3822	<>	<elision1>
3822	3236	.	υ
3822	3379	H	υ
3822	3236	.	u
3822	3388	H	u
3822	3823	H	κ
3822	3835	H	k
3822	3357	H	U
3822	3827	H	K
3822	3236	.	α
3822	3391	H	α
3822	3236	.	a
3822	3394	H	a
3822	3328	H	A
3822	3823	H	λ
3822	3835	H	l
3822	3827	H	L
3823	3824	<>	<name>
3823	3823	<>	<aphaerese>
3823	3823	<>	<elision3>
3823	3823	<>	<elision2>
3823	3823	<>	<elision1>
3823	3827	<lambda2L>	<>
3824	3825	<>	<aphaerese>
3824	3825	<>	<elision3>
3824	3825	<>	<elision2>
3824	3825	<>	<elision1>
3824	3828	<lambda2L>	<>
3825	3823	<>	<aphaerese>
3825	3823	<>	<elision3>
3825	3823	<>	<elision2>
3825	3823	<>	<elision1>
3825	3826	<lambda2L>	<>
3826	3827	<>	<aphaerese>
3826	3827	<>	<elision3>
3826	3827	<>	<elision2>
3826	3827	<>	<elision1>
3826	3830	.	κ
3826	3830	.	λ
3827	3828	<>	<name>
3827	3827	<>	<aphaerese>
3827	3827	<>	<elision3>
3827	3827	<>	<elision2>
3827	3827	<>	<elision1>
3827	3830	.	κ
3827	3830	.	λ
3828	3826	<>	<aphaerese>
3828	3826	<>	<elision3>
3828	3826	<>	<elision2>
3828	3826	<>	<elision1>
3828	3829	.	κ
3828	3829	.	λ
3829	3830	<>	<aphaerese>
3829	3833	<elision3>	<elision3>
3829	3830	<>	<elision3>
3829	3833	<elision2>	<elision2>
3829	3830	<>	<elision2>
3829	3833	<elision1>	<elision1>
3829	3830	<>	<elision1>
3830	3831	<>	<name>
3830	3830	<>	<aphaerese>
3830	3833	<elision3>	<elision3>
3830	3830	<>	<elision3>
3830	3833	<elision2>	<elision2>
3830	3830	<>	<elision2>
3830	3833	<elision1>	<elision1>
3830	3830	<>	<elision1>
3831	3829	<>	<aphaerese>
3831	3832	<elision3>	<elision3>
3831	3829	<>	<elision3>
3831	3832	<elision2>	<elision2>
3831	3829	<>	<elision2>
3831	3832	<elision1>	<elision1>
3831	3829	<>	<elision1>
3832	3833	<>	<aphaerese>
3832	3833	<>	<elision3>
3832	3833	<>	<elision2>
3832	3833	<>	<elision1>
3832	3304	.	κ
3832	3277	s	κ
3832	3280	H	κ
3832	3277	s	k
3832	3280	H	k
3832	3265	s	K
3832	3280	H	K
3832	3277	s	λ
3832	3280	H	λ
3832	3277	s	l
3832	3280	H	l
3832	3271	s	L
3832	3280	H	L
3833	3834	<>	<name>
3833	3833	<>	<aphaerese>
3833	3833	<>	<elision3>
3833	3833	<>	<elision2>
3833	3833	<>	<elision1>
3833	3304	.	κ
3833	3277	s	κ
3833	3280	H	κ
3833	3277	s	k
3833	3280	H	k
3833	3265	s	K
3833	3280	H	K
3833	3277	s	λ
3833	3280	H	λ
3833	3277	s	l
3833	3280	H	l
3833	3271	s	L
3833	3280	H	L
3834	3832	<>	<aphaerese>
3834	3832	<>	<elision3>
3834	3832	<>	<elision2>
3834	3832	<>	<elision1>
3834	3306	.	κ
3834	3276	s	κ
3834	3279	H	κ
3834	3276	s	k
3834	3279	H	k
3834	3264	s	K
3834	3279	H	K
3834	3276	s	λ
3834	3279	H	λ
3834	3276	s	l
3834	3279	H	l
3834	3270	s	L
3834	3279	H	L
3835	3836	<>	<name>
3835	3835	<>	<aphaerese>
3835	3835	<>	<elision3>
3835	3835	<>	<elision2>
3835	3835	<>	<elision1>
3835	3827	<l2L>	<>
3836	3837	<>	<aphaerese>
3836	3837	<>	<elision3>
3836	3837	<>	<elision2>
3836	3837	<>	<elision1>
3836	3828	<l2L>	<>
3837	3835	<>	<aphaerese>
3837	3835	<>	<elision3>
3837	3835	<>	<elision2>
3837	3835	<>	<elision1>
3837	3826	<l2L>	<>
3838	3839	<>	<aphaerese>
3838	3842	<elision3>	<elision3>
3838	3839	<>	<elision3>
3838	3842	<elision2>	<elision2>
3838	3839	<>	<elision2>
3838	3842	<elision1>	<elision1>
3838	3839	<>	<elision1>
3838	3845	<K>	<>
3839	3840	<>	<name>
3839	3839	<>	<aphaerese>
3839	3842	<elision3>	<elision3>
3839	3839	<>	<elision3>
3839	3842	<elision2>	<elision2>
3839	3839	<>	<elision2>
3839	3842	<elision1>	<elision1>
3839	3839	<>	<elision1>
3839	3846	<K>	<>
3840	3838	<>	<aphaerese>
3840	3841	<elision3>	<elision3>
3840	3838	<>	<elision3>
3840	3841	<elision2>	<elision2>
3840	3838	<>	<elision2>
3840	3841	<elision1>	<elision1>
3840	3838	<>	<elision1>
3840	3844	<K>	<>
3841	215	.	.
3841	216	 	 
3841	215	<~>	<~>
3841	215	<split-s>	<split-s>
3841	215	<split-h>	<split-h>
3841	215	<name2>	<name2>
3841	219	<aphaerese>	<aphaerese>
3841	3842	<>	<aphaerese>
3841	215	<elision3>	<elision3>
3841	3842	<>	<elision3>
3841	215	<elision2>	<elision2>
3841	3842	<>	<elision2>
3841	215	<elision1>	<elision1>
3841	3842	<>	<elision1>
3841	3187	.	υ
3841	3231	H	υ
3841	3187	.	u
3841	3233	H	u
3841	3806	H	κ
3841	3818	H	k
3841	3154	H	U
3841	3810	H	K
3841	3187	.	α
3841	3217	H	α
3841	3187	.	a
3841	3222	H	a
3841	2984	H	A
3841	3806	H	λ
3841	3818	H	l
3841	3810	H	L
3842	215	.	.
3842	216	 	 
3842	215	<~>	<~>
3842	215	<split-s>	<split-s>
3842	215	<split-h>	<split-h>
3842	215	<name2>	<name2>
3842	3843	<>	<name>
3842	219	<aphaerese>	<aphaerese>
3842	3842	<>	<aphaerese>
3842	215	<elision3>	<elision3>
3842	3842	<>	<elision3>
3842	215	<elision2>	<elision2>
3842	3842	<>	<elision2>
3842	215	<elision1>	<elision1>
3842	3842	<>	<elision1>
3842	3187	.	υ
3842	3231	H	υ
3842	3187	.	u
3842	3233	H	u
3842	3806	H	κ
3842	3818	H	k
3842	3154	H	U
3842	3810	H	K
3842	3187	.	α
3842	3217	H	α
3842	3187	.	a
3842	3222	H	a
3842	2984	H	A
3842	3806	H	λ
3842	3818	H	l
3842	3810	H	L
3843	214	.	.
3843	218	 	 
3843	214	<~>	<~>
3843	214	<split-s>	<split-s>
3843	214	<split-h>	<split-h>
3843	214	<name2>	<name2>
3843	221	<aphaerese>	<aphaerese>
3843	3841	<>	<aphaerese>
3843	214	<elision3>	<elision3>
3843	3841	<>	<elision3>
3843	214	<elision2>	<elision2>
3843	3841	<>	<elision2>
3843	214	<elision1>	<elision1>
3843	3841	<>	<elision1>
3843	3189	.	υ
3843	3226	H	υ
3843	3189	.	u
3843	3230	H	u
3843	3805	H	κ
3843	3817	H	k
3843	3156	H	U
3843	3809	H	K
3843	3189	.	α
3843	3216	H	α
3843	3189	.	a
3843	3221	H	a
3843	2987	H	A
3843	3805	H	λ
3843	3817	H	l
3843	3809	H	L
3844	3845	<>	<aphaerese>
3844	3821	<elision3>	<elision3>
3844	3845	<>	<elision3>
3844	3821	<elision2>	<elision2>
3844	3845	<>	<elision2>
3844	3821	<elision1>	<elision1>
3844	3845	<>	<elision1>
3845	3846	<>	<aphaerese>
3845	3822	<elision3>	<elision3>
3845	3846	<>	<elision3>
3845	3822	<elision2>	<elision2>
3845	3846	<>	<elision2>
3845	3822	<elision1>	<elision1>
3845	3846	<>	<elision1>
3846	3844	<>	<name>
3846	3846	<>	<aphaerese>
3846	3822	<elision3>	<elision3>
3846	3846	<>	<elision3>
3846	3822	<elision2>	<elision2>
3846	3846	<>	<elision2>
3846	3822	<elision1>	<elision1>
3846	3846	<>	<elision1>
3847	3848	<>	<aphaerese>
3847	3848	<>	<elision3>
3847	3848	<>	<elision2>
3847	3848	<>	<elision1>
3847	3851	.	κ
3847	3851	.	λ
3847	3854	<K>	<>
3848	3849	<>	<name>
3848	3848	<>	<aphaerese>
3848	3848	<>	<elision3>
3848	3848	<>	<elision2>
3848	3848	<>	<elision1>
3848	3851	.	κ
3848	3851	.	λ
3848	3855	<K>	<>
3849	3847	<>	<aphaerese>
3849	3847	<>	<elision3>
3849	3847	<>	<elision2>
3849	3847	<>	<elision1>
3849	3850	.	κ
3849	3850	.	λ
3849	3853	<K>	<>
3850	3851	<>	<aphaerese>
3850	3842	<elision3>	<elision3>
3850	3851	<>	<elision3>
3850	3842	<elision2>	<elision2>
3850	3851	<>	<elision2>
3850	3842	<elision1>	<elision1>
3850	3851	<>	<elision1>
3851	3852	<>	<name>
3851	3851	<>	<aphaerese>
3851	3842	<elision3>	<elision3>
3851	3851	<>	<elision3>
3851	3842	<elision2>	<elision2>
3851	3851	<>	<elision2>
3851	3842	<elision1>	<elision1>
3851	3851	<>	<elision1>
3852	3850	<>	<aphaerese>
3852	3841	<elision3>	<elision3>
3852	3850	<>	<elision3>
3852	3841	<elision2>	<elision2>
3852	3850	<>	<elision2>
3852	3841	<elision1>	<elision1>
3852	3850	<>	<elision1>
3853	3854	<>	<aphaerese>
3853	3854	<>	<elision3>
3853	3854	<>	<elision2>
3853	3854	<>	<elision1>
3853	3845	.	κ
3853	3845	.	λ
3854	3855	<>	<aphaerese>
3854	3855	<>	<elision3>
3854	3855	<>	<elision2>
3854	3855	<>	<elision1>
3854	3846	.	κ
3854	3846	.	λ
3855	3853	<>	<name>
3855	3855	<>	<aphaerese>
3855	3855	<>	<elision3>
3855	3855	<>	<elision2>
3855	3855	<>	<elision1>
3855	3846	.	κ
3855	3846	.	λ
3856	3857	<>	<name>
3856	3856	<>	<aphaerese>
3856	3856	<>	<elision3>
3856	3856	<>	<elision2>
3856	3856	<>	<elision1>
3856	3859	.	κ
3856	3859	.	λ
3856	3881	<4s>	<>
3857	3858	<>	<aphaerese>
3857	3858	<>	<elision3>
3857	3858	<>	<elision2>
3857	3858	<>	<elision1>
3857	3861	.	κ
3857	3861	.	λ
3857	3882	<4s>	<>
3858	3856	<>	<aphaerese>
3858	3856	<>	<elision3>
3858	3856	<>	<elision2>
3858	3856	<>	<elision1>
3858	3859	.	κ
3858	3859	.	λ
3858	3880	<4s>	<>
3859	3860	<>	<name>
3859	3859	<>	<aphaerese>
3859	3862	<elision3>	<elision3>
3859	3859	<>	<elision3>
3859	3862	<elision2>	<elision2>
3859	3859	<>	<elision2>
3859	3862	<elision1>	<elision1>
3859	3859	<>	<elision1>
3859	3872	<4s>	<>
3860	3861	<>	<aphaerese>
3860	3864	<elision3>	<elision3>
3860	3861	<>	<elision3>
3860	3864	<elision2>	<elision2>
3860	3861	<>	<elision2>
3860	3864	<elision1>	<elision1>
3860	3861	<>	<elision1>
3860	3873	<4s>	<>
3861	3859	<>	<aphaerese>
3861	3862	<elision3>	<elision3>
3861	3859	<>	<elision3>
3861	3862	<elision2>	<elision2>
3861	3859	<>	<elision2>
3861	3862	<elision1>	<elision1>
3861	3859	<>	<elision1>
3861	3871	<4s>	<>
3862	3863	<>	<name>
3862	3862	<>	<aphaerese>
3862	3862	<>	<elision3>
3862	3862	<>	<elision2>
3862	3862	<>	<elision1>
3862	3419	.	κ
3862	3866	<4s>	<>
3863	3864	<>	<aphaerese>
3863	3864	<>	<elision3>
3863	3864	<>	<elision2>
3863	3864	<>	<elision1>
3863	3421	.	κ
3863	3867	<4s>	<>
3864	3862	<>	<aphaerese>
3864	3862	<>	<elision3>
3864	3862	<>	<elision2>
3864	3862	<>	<elision1>
3864	3419	.	κ
3864	3865	<4s>	<>
3865	3866	<>	<aphaerese>
3865	3866	<>	<elision3>
3865	3866	<>	<elision2>
3865	3866	<>	<elision1>
3865	222	.	κ
3865	2813	H	κ
3865	3141	H	k
3865	3157	H	K
3865	3168	H	λ
3865	3571	H	l
3865	3576	H	L
3865	3869	<K>	<>
3866	3867	<>	<name>
3866	3866	<>	<aphaerese>
3866	3866	<>	<elision3>
3866	3866	<>	<elision2>
3866	3866	<>	<elision1>
3866	222	.	κ
3866	2813	H	κ
3866	3141	H	k
3866	3157	H	K
3866	3168	H	λ
3866	3571	H	l
3866	3576	H	L
3866	3870	<K>	<>
3867	3865	<>	<aphaerese>
3867	3865	<>	<elision3>
3867	3865	<>	<elision2>
3867	3865	<>	<elision1>
3867	224	.	κ
3867	3178	H	κ
3867	3182	H	k
3867	3186	H	K
3867	3170	H	λ
3867	3570	H	l
3867	3573	H	L
3867	3868	<K>	<>
3868	3869	<>	<aphaerese>
3868	3869	<>	<elision3>
3868	3869	<>	<elision2>
3868	3869	<>	<elision1>
3868	3245	.	κ
3868	3296	H	κ
3868	3350	H	k
3868	3363	H	K
3868	3371	H	λ
3868	3377	H	l
3868	3372	H	L
3869	3870	<>	<aphaerese>
3869	3870	<>	<elision3>
3869	3870	<>	<elision2>
3869	3870	<>	<elision1>
3869	3243	.	κ
3869	3294	H	κ
3869	3348	H	k
3869	3360	H	K
3869	3369	H	λ
3869	3375	H	l
3869	3378	H	L
3870	3868	<>	<name>
3870	3870	<>	<aphaerese>
3870	3870	<>	<elision3>
3870	3870	<>	<elision2>
3870	3870	<>	<elision1>
3870	3243	.	κ
3870	3294	H	κ
3870	3348	H	k
3870	3360	H	K
3870	3369	H	λ
3870	3375	H	l
3870	3378	H	L
3871	3872	<>	<aphaerese>
3871	3875	<elision3>	<elision3>
3871	3872	<>	<elision3>
3871	3875	<elision2>	<elision2>
3871	3872	<>	<elision2>
3871	3875	<elision1>	<elision1>
3871	3872	<>	<elision1>
3871	3878	<K>	<>
3872	3873	<>	<name>
3872	3872	<>	<aphaerese>
3872	3875	<elision3>	<elision3>
3872	3872	<>	<elision3>
3872	3875	<elision2>	<elision2>
3872	3872	<>	<elision2>
3872	3875	<elision1>	<elision1>
3872	3872	<>	<elision1>
3872	3879	<K>	<>
3873	3871	<>	<aphaerese>
3873	3874	<elision3>	<elision3>
3873	3871	<>	<elision3>
3873	3874	<elision2>	<elision2>
3873	3871	<>	<elision2>
3873	3874	<elision1>	<elision1>
3873	3871	<>	<elision1>
3873	3877	<K>	<>
3874	3875	<>	<aphaerese>
3874	3875	<>	<elision3>
3874	3875	<>	<elision2>
3874	3875	<>	<elision1>
3874	222	.	κ
3874	2813	H	κ
3874	3141	H	k
3874	3157	H	K
3874	3168	H	λ
3874	3174	H	l
3874	3177	H	L
3875	3876	<>	<name>
3875	3875	<>	<aphaerese>
3875	3875	<>	<elision3>
3875	3875	<>	<elision2>
3875	3875	<>	<elision1>
3875	222	.	κ
3875	2813	H	κ
3875	3141	H	k
3875	3157	H	K
3875	3168	H	λ
3875	3174	H	l
3875	3177	H	L
3876	3874	<>	<aphaerese>
3876	3874	<>	<elision3>
3876	3874	<>	<elision2>
3876	3874	<>	<elision1>
3876	224	.	κ
3876	3178	H	κ
3876	3182	H	k
3876	3186	H	K
3876	3170	H	λ
3876	3176	H	l
3876	3171	H	L
3877	3878	<>	<aphaerese>
3877	3869	<elision3>	<elision3>
3877	3878	<>	<elision3>
3877	3869	<elision2>	<elision2>
3877	3878	<>	<elision2>
3877	3869	<elision1>	<elision1>
3877	3878	<>	<elision1>
3878	3879	<>	<aphaerese>
3878	3870	<elision3>	<elision3>
3878	3879	<>	<elision3>
3878	3870	<elision2>	<elision2>
3878	3879	<>	<elision2>
3878	3870	<elision1>	<elision1>
3878	3879	<>	<elision1>
3879	3877	<>	<name>
3879	3879	<>	<aphaerese>
3879	3870	<elision3>	<elision3>
3879	3879	<>	<elision3>
3879	3870	<elision2>	<elision2>
3879	3879	<>	<elision2>
3879	3870	<elision1>	<elision1>
3879	3879	<>	<elision1>
3880	3881	<>	<aphaerese>
3880	3881	<>	<elision3>
3880	3881	<>	<elision2>
3880	3881	<>	<elision1>
3880	3884	.	κ
3880	3884	.	λ
3880	3887	<K>	<>
3881	3882	<>	<name>
3881	3881	<>	<aphaerese>
3881	3881	<>	<elision3>
3881	3881	<>	<elision2>
3881	3881	<>	<elision1>
3881	3884	.	κ
3881	3884	.	λ
3881	3888	<K>	<>
3882	3880	<>	<aphaerese>
3882	3880	<>	<elision3>
3882	3880	<>	<elision2>
3882	3880	<>	<elision1>
3882	3883	.	κ
3882	3883	.	λ
3882	3886	<K>	<>
3883	3884	<>	<aphaerese>
3883	3875	<elision3>	<elision3>
3883	3884	<>	<elision3>
3883	3875	<elision2>	<elision2>
3883	3884	<>	<elision2>
3883	3875	<elision1>	<elision1>
3883	3884	<>	<elision1>
3884	3885	<>	<name>
3884	3884	<>	<aphaerese>
3884	3875	<elision3>	<elision3>
3884	3884	<>	<elision3>
3884	3875	<elision2>	<elision2>
3884	3884	<>	<elision2>
3884	3875	<elision1>	<elision1>
3884	3884	<>	<elision1>
3885	3883	<>	<aphaerese>
3885	3874	<elision3>	<elision3>
3885	3883	<>	<elision3>
3885	3874	<elision2>	<elision2>
3885	3883	<>	<elision2>
3885	3874	<elision1>	<elision1>
3885	3883	<>	<elision1>
3886	3887	<>	<aphaerese>
3886	3887	<>	<elision3>
3886	3887	<>	<elision2>
3886	3887	<>	<elision1>
3886	3878	.	κ
3886	3878	.	λ
3887	3888	<>	<aphaerese>
3887	3888	<>	<elision3>
3887	3888	<>	<elision2>
3887	3888	<>	<elision1>
3887	3879	.	κ
3887	3879	.	λ
3888	3886	<>	<name>
3888	3888	<>	<aphaerese>
3888	3888	<>	<elision3>
3888	3888	<>	<elision2>
3888	3888	<>	<elision1>
3888	3879	.	κ
3888	3879	.	λ
3889	3413	.	.
3889	3413	 	 
3889	3413	<~>	<~>
3889	3413	<split-s>	<split-s>
3889	3413	<split-h>	<split-h>
3889	3413	<name2>	<name2>
3889	3890	<>	<name>
3889	3416	<aphaerese>	<aphaerese>
3889	3889	<>	<aphaerese>
3889	3413	<elision3>	<elision3>
3889	3889	<>	<elision3>
3889	3413	<elision2>	<elision2>
3889	3889	<>	<elision2>
3889	3413	<elision1>	<elision1>
3889	3889	<>	<elision1>
3889	3577	.	υ
3889	3577	.	u
3889	3577	.	α
3889	3577	.	a
3889	3893	<4s>	<>
3890	3415	.	.
3890	3415	 	 
3890	3415	<~>	<~>
3890	3415	<split-s>	<split-s>
3890	3415	<split-h>	<split-h>
3890	3415	<name2>	<name2>
3890	3418	<aphaerese>	<aphaerese>
3890	3891	<>	<aphaerese>
3890	3415	<elision3>	<elision3>
3890	3891	<>	<elision3>
3890	3415	<elision2>	<elision2>
3890	3891	<>	<elision2>
3890	3415	<elision1>	<elision1>
3890	3891	<>	<elision1>
3890	3579	.	υ
3890	3579	.	u
3890	3579	.	α
3890	3579	.	a
3890	3894	<4s>	<>
3891	3413	.	.
3891	3413	 	 
3891	3413	<~>	<~>
3891	3413	<split-s>	<split-s>
3891	3413	<split-h>	<split-h>
3891	3413	<name2>	<name2>
3891	3416	<aphaerese>	<aphaerese>
3891	3889	<>	<aphaerese>
3891	3413	<elision3>	<elision3>
3891	3889	<>	<elision3>
3891	3413	<elision2>	<elision2>
3891	3889	<>	<elision2>
3891	3413	<elision1>	<elision1>
3891	3889	<>	<elision1>
3891	3577	.	υ
3891	3577	.	u
3891	3577	.	α
3891	3577	.	a
3891	3892	<4s>	<>
3892	215	.	.
3892	216	 	 
3892	215	<~>	<~>
3892	215	<split-s>	<split-s>
3892	215	<split-h>	<split-h>
3892	215	<name2>	<name2>
3892	219	<aphaerese>	<aphaerese>
3892	3893	<>	<aphaerese>
3892	215	<elision3>	<elision3>
3892	3893	<>	<elision3>
3892	215	<elision2>	<elision2>
3892	3893	<>	<elision2>
3892	215	<elision1>	<elision1>
3892	3893	<>	<elision1>
3892	3187	.	υ
3892	3231	H	υ
3892	3187	.	u
3892	3233	H	u
3892	3646	H	κ
3892	3141	H	k
3892	3154	H	U
3892	3157	H	K
3892	3187	.	α
3892	3217	H	α
3892	3187	.	a
3892	3222	H	a
3892	2984	H	A
3892	3623	H	λ
3892	3571	H	l
3892	3576	H	L
3892	3896	<K>	<>
3893	215	.	.
3893	216	 	 
3893	215	<~>	<~>
3893	215	<split-s>	<split-s>
3893	215	<split-h>	<split-h>
3893	215	<name2>	<name2>
3893	3894	<>	<name>
3893	219	<aphaerese>	<aphaerese>
3893	3893	<>	<aphaerese>
3893	215	<elision3>	<elision3>
3893	3893	<>	<elision3>
3893	215	<elision2>	<elision2>
3893	3893	<>	<elision2>
3893	215	<elision1>	<elision1>
3893	3893	<>	<elision1>
3893	3187	.	υ
3893	3231	H	υ
3893	3187	.	u
3893	3233	H	u
3893	3646	H	κ
3893	3141	H	k
3893	3154	H	U
3893	3157	H	K
3893	3187	.	α
3893	3217	H	α
3893	3187	.	a
3893	3222	H	a
3893	2984	H	A
3893	3623	H	λ
3893	3571	H	l
3893	3576	H	L
3893	3897	<K>	<>
3894	214	.	.
3894	218	 	 
3894	214	<~>	<~>
3894	214	<split-s>	<split-s>
3894	214	<split-h>	<split-h>
3894	214	<name2>	<name2>
3894	221	<aphaerese>	<aphaerese>
3894	3892	<>	<aphaerese>
3894	214	<elision3>	<elision3>
3894	3892	<>	<elision3>
3894	214	<elision2>	<elision2>
3894	3892	<>	<elision2>
3894	214	<elision1>	<elision1>
3894	3892	<>	<elision1>
3894	3189	.	υ
3894	3226	H	υ
3894	3189	.	u
3894	3230	H	u
3894	3603	H	κ
3894	3182	H	k
3894	3156	H	U
3894	3186	H	K
3894	3189	.	α
3894	3216	H	α
3894	3189	.	a
3894	3221	H	a
3894	2987	H	A
3894	3622	H	λ
3894	3570	H	l
3894	3573	H	L
3894	3895	<K>	<>
3895	3239	.	.
3895	3239	<~>	<~>
3895	3239	<split-s>	<split-s>
3895	3239	<split-h>	<split-h>
3895	3239	<name2>	<name2>
3895	3242	<aphaerese>	<aphaerese>
3895	3896	<>	<aphaerese>
3895	3239	<elision3>	<elision3>
3895	3896	<>	<elision3>
3895	3239	<elision2>	<elision2>
3895	3896	<>	<elision2>
3895	3239	<elision1>	<elision1>
3895	3896	<>	<elision1>
3895	3235	.	υ
3895	3381	H	υ
3895	3235	.	u
3895	3390	H	u
3895	3633	H	κ
3895	3350	H	k
3895	3359	H	U
3895	3363	H	K
3895	3235	.	α
3895	3393	H	α
3895	3235	.	a
3895	3396	H	a
3895	3330	H	A
3895	3642	H	λ
3895	3377	H	l
3895	3372	H	L
3896	3237	.	.
3896	3237	<~>	<~>
3896	3237	<split-s>	<split-s>
3896	3237	<split-h>	<split-h>
3896	3237	<name2>	<name2>
3896	3240	<aphaerese>	<aphaerese>
3896	3897	<>	<aphaerese>
3896	3237	<elision3>	<elision3>
3896	3897	<>	<elision3>
3896	3237	<elision2>	<elision2>
3896	3897	<>	<elision2>
3896	3237	<elision1>	<elision1>
3896	3897	<>	<elision1>
3896	3236	.	υ
3896	3379	H	υ
3896	3236	.	u
3896	3388	H	u
3896	3631	H	κ
3896	3348	H	k
3896	3357	H	U
3896	3360	H	K
3896	3236	.	α
3896	3391	H	α
3896	3236	.	a
3896	3394	H	a
3896	3328	H	A
3896	3640	H	λ
3896	3375	H	l
3896	3378	H	L
3897	3237	.	.
3897	3237	<~>	<~>
3897	3237	<split-s>	<split-s>
3897	3237	<split-h>	<split-h>
3897	3237	<name2>	<name2>
3897	3895	<>	<name>
3897	3240	<aphaerese>	<aphaerese>
3897	3897	<>	<aphaerese>
3897	3237	<elision3>	<elision3>
3897	3897	<>	<elision3>
3897	3237	<elision2>	<elision2>
3897	3897	<>	<elision2>
3897	3237	<elision1>	<elision1>
3897	3897	<>	<elision1>
3897	3236	.	υ
3897	3379	H	υ
3897	3236	.	u
3897	3388	H	u
3897	3631	H	κ
3897	3348	H	k
3897	3357	H	U
3897	3360	H	K
3897	3236	.	α
3897	3391	H	α
3897	3236	.	a
3897	3394	H	a
3897	3328	H	A
3897	3640	H	λ
3897	3375	H	l
3897	3378	H	L
3898	3899	<name>	<name>
3898	3900	<K>	<>
3899	3186	H	k
3899	3171	H	l
3900	3789	<name>	<name>
3901	3413	.	.
3901	3413	 	 
3901	3413	<~>	<~>
3901	3413	<split-s>	<split-s>
3901	3413	<split-h>	<split-h>
3901	3413	<name2>	<name2>
3901	3787	<name2>	<name>
3901	3890	<>	<name>
3901	3416	<aphaerese>	<aphaerese>
3901	3889	<>	<aphaerese>
3901	3413	<elision3>	<elision3>
3901	3889	<>	<elision3>
3901	3413	<elision2>	<elision2>
3901	3889	<>	<elision2>
3901	3413	<elision1>	<elision1>
3901	3889	<>	<elision1>
3901	3577	.	υ
3901	3577	.	u
3901	3577	.	α
3901	3577	.	a
3901	3902	<4s>	<>
3902	215	.	.
3902	216	 	 
3902	215	<~>	<~>
3902	215	<split-s>	<split-s>
3902	215	<split-h>	<split-h>
3902	215	<name2>	<name2>
3902	3899	<name2>	<name>
3902	3894	<>	<name>
3902	219	<aphaerese>	<aphaerese>
3902	3893	<>	<aphaerese>
3902	215	<elision3>	<elision3>
3902	3893	<>	<elision3>
3902	215	<elision2>	<elision2>
3902	3893	<>	<elision2>
3902	215	<elision1>	<elision1>
3902	3893	<>	<elision1>
3902	3187	.	υ
3902	3231	H	υ
3902	3187	.	u
3902	3233	H	u
3902	3646	H	κ
3902	3141	H	k
3902	3154	H	U
3902	3157	H	K
3902	3187	.	α
3902	3217	H	α
3902	3187	.	a
3902	3222	H	a
3902	2984	H	A
3902	3623	H	λ
3902	3571	H	l
3902	3576	H	L
3902	3903	<K>	<>
3903	3237	.	.
3903	3237	<~>	<~>
3903	3237	<split-s>	<split-s>
3903	3237	<split-h>	<split-h>
3903	3237	<name2>	<name2>
3903	3789	<name2>	<name>
3903	3895	<>	<name>
3903	3240	<aphaerese>	<aphaerese>
3903	3897	<>	<aphaerese>
3903	3237	<elision3>	<elision3>
3903	3897	<>	<elision3>
3903	3237	<elision2>	<elision2>
3903	3897	<>	<elision2>
3903	3237	<elision1>	<elision1>
3903	3897	<>	<elision1>
3903	3236	.	υ
3903	3379	H	υ
3903	3236	.	u
3903	3388	H	u
3903	3631	H	κ
3903	3348	H	k
3903	3357	H	U
3903	3360	H	K
3903	3236	.	α
3903	3391	H	α
3903	3236	.	a
3903	3394	H	a
3903	3328	H	A
3903	3640	H	λ
3903	3375	H	l
3903	3378	H	L
3904	3905	<>	<name>
3904	3904	<>	<aphaerese>
3904	3904	<>	<elision3>
3904	3904	<>	<elision2>
3904	3904	<>	<elision1>
3904	3413	<A2kl>	<>
3905	3906	<>	<aphaerese>
3905	3906	<>	<elision3>
3905	3906	<>	<elision2>
3905	3906	<>	<elision1>
3905	3414	<A2kl>	<>
3906	3904	<>	<aphaerese>
3906	3904	<>	<elision3>
3906	3904	<>	<elision2>
3906	3904	<>	<elision1>
3906	3415	<A2kl>	<>
3907	3787	<name>	<name>
3907	3908	<>	<name>
3907	3910	<>	<aphaerese>
3907	3910	<>	<elision3>
3907	3910	<>	<elision2>
3907	3910	<>	<elision1>
3907	3898	<4s>	<>
3907	3793	<A2kl>	<>
3907	3920	<L2kl>	<>
3908	3909	<>	<aphaerese>
3908	3909	<>	<elision3>
3908	3909	<>	<elision2>
3908	3909	<>	<elision1>
3908	3794	<A2kl>	<>
3908	3912	<L2kl>	<>
3909	3910	<>	<aphaerese>
3909	3910	<>	<elision3>
3909	3910	<>	<elision2>
3909	3910	<>	<elision1>
3909	3795	<A2kl>	<>
3909	3913	<L2kl>	<>
3910	3908	<>	<name>
3910	3910	<>	<aphaerese>
3910	3910	<>	<elision3>
3910	3910	<>	<elision2>
3910	3910	<>	<elision1>
3910	3793	<A2kl>	<>
3910	3911	<L2kl>	<>
3911	3413	.	.
3911	3413	 	 
3911	3413	<~>	<~>
3911	3413	<split-s>	<split-s>
3911	3413	<split-h>	<split-h>
3911	3413	<name2>	<name2>
3911	3912	<>	<name>
3911	3416	<aphaerese>	<aphaerese>
3911	3911	<>	<aphaerese>
3911	3413	<elision3>	<elision3>
3911	3911	<>	<elision3>
3911	3413	<elision2>	<elision2>
3911	3911	<>	<elision2>
3911	3413	<elision1>	<elision1>
3911	3911	<>	<elision1>
3911	3577	.	υ
3911	3577	.	u
3911	3859	.	κ
3911	3577	.	α
3911	3577	.	a
3911	3859	.	λ
3911	3915	<4s>	<>
3912	3415	.	.
3912	3415	 	 
3912	3415	<~>	<~>
3912	3415	<split-s>	<split-s>
3912	3415	<split-h>	<split-h>
3912	3415	<name2>	<name2>
3912	3418	<aphaerese>	<aphaerese>
3912	3913	<>	<aphaerese>
3912	3415	<elision3>	<elision3>
3912	3913	<>	<elision3>
3912	3415	<elision2>	<elision2>
3912	3913	<>	<elision2>
3912	3415	<elision1>	<elision1>
3912	3913	<>	<elision1>
3912	3579	.	υ
3912	3579	.	u
3912	3861	.	κ
3912	3579	.	α
3912	3579	.	a
3912	3861	.	λ
3912	3916	<4s>	<>
3913	3413	.	.
3913	3413	 	 
3913	3413	<~>	<~>
3913	3413	<split-s>	<split-s>
3913	3413	<split-h>	<split-h>
3913	3413	<name2>	<name2>
3913	3416	<aphaerese>	<aphaerese>
3913	3911	<>	<aphaerese>
3913	3413	<elision3>	<elision3>
3913	3911	<>	<elision3>
3913	3413	<elision2>	<elision2>
3913	3911	<>	<elision2>
3913	3413	<elision1>	<elision1>
3913	3911	<>	<elision1>
3913	3577	.	υ
3913	3577	.	u
3913	3859	.	κ
3913	3577	.	α
3913	3577	.	a
3913	3859	.	λ
3913	3914	<4s>	<>
3914	215	.	.
3914	216	 	 
3914	215	<~>	<~>
3914	215	<split-s>	<split-s>
3914	215	<split-h>	<split-h>
3914	215	<name2>	<name2>
3914	219	<aphaerese>	<aphaerese>
3914	3915	<>	<aphaerese>
3914	215	<elision3>	<elision3>
3914	3915	<>	<elision3>
3914	215	<elision2>	<elision2>
3914	3915	<>	<elision2>
3914	215	<elision1>	<elision1>
3914	3915	<>	<elision1>
3914	3187	.	υ
3914	3231	H	υ
3914	3187	.	u
3914	3233	H	u
3914	3884	.	κ
3914	3646	H	κ
3914	3141	H	k
3914	3154	H	U
3914	3157	H	K
3914	3187	.	α
3914	3217	H	α
3914	3187	.	a
3914	3222	H	a
3914	2984	H	A
3914	3884	.	λ
3914	3623	H	λ
3914	3571	H	l
3914	3576	H	L
3914	3918	<K>	<>
3915	215	.	.
3915	216	 	 
3915	215	<~>	<~>
3915	215	<split-s>	<split-s>
3915	215	<split-h>	<split-h>
3915	215	<name2>	<name2>
3915	3916	<>	<name>
3915	219	<aphaerese>	<aphaerese>
3915	3915	<>	<aphaerese>
3915	215	<elision3>	<elision3>
3915	3915	<>	<elision3>
3915	215	<elision2>	<elision2>
3915	3915	<>	<elision2>
3915	215	<elision1>	<elision1>
3915	3915	<>	<elision1>
3915	3187	.	υ
3915	3231	H	υ
3915	3187	.	u
3915	3233	H	u
3915	3884	.	κ
3915	3646	H	κ
3915	3141	H	k
3915	3154	H	U
3915	3157	H	K
3915	3187	.	α
3915	3217	H	α
3915	3187	.	a
3915	3222	H	a
3915	2984	H	A
3915	3884	.	λ
3915	3623	H	λ
3915	3571	H	l
3915	3576	H	L
3915	3919	<K>	<>
3916	214	.	.
3916	218	 	 
3916	214	<~>	<~>
3916	214	<split-s>	<split-s>
3916	214	<split-h>	<split-h>
3916	214	<name2>	<name2>
3916	221	<aphaerese>	<aphaerese>
3916	3914	<>	<aphaerese>
3916	214	<elision3>	<elision3>
3916	3914	<>	<elision3>
3916	214	<elision2>	<elision2>
3916	3914	<>	<elision2>
3916	214	<elision1>	<elision1>
3916	3914	<>	<elision1>
3916	3189	.	υ
3916	3226	H	υ
3916	3189	.	u
3916	3230	H	u
3916	3883	.	κ
3916	3603	H	κ
3916	3182	H	k
3916	3156	H	U
3916	3186	H	K
3916	3189	.	α
3916	3216	H	α
3916	3189	.	a
3916	3221	H	a
3916	2987	H	A
3916	3883	.	λ
3916	3622	H	λ
3916	3570	H	l
3916	3573	H	L
3916	3917	<K>	<>
3917	3239	.	.
3917	3239	<~>	<~>
3917	3239	<split-s>	<split-s>
3917	3239	<split-h>	<split-h>
3917	3239	<name2>	<name2>
3917	3242	<aphaerese>	<aphaerese>
3917	3918	<>	<aphaerese>
3917	3239	<elision3>	<elision3>
3917	3918	<>	<elision3>
3917	3239	<elision2>	<elision2>
3917	3918	<>	<elision2>
3917	3239	<elision1>	<elision1>
3917	3918	<>	<elision1>
3917	3235	.	υ
3917	3381	H	υ
3917	3235	.	u
3917	3390	H	u
3917	3878	.	κ
3917	3633	H	κ
3917	3350	H	k
3917	3359	H	U
3917	3363	H	K
3917	3235	.	α
3917	3393	H	α
3917	3235	.	a
3917	3396	H	a
3917	3330	H	A
3917	3878	.	λ
3917	3642	H	λ
3917	3377	H	l
3917	3372	H	L
3918	3237	.	.
3918	3237	<~>	<~>
3918	3237	<split-s>	<split-s>
3918	3237	<split-h>	<split-h>
3918	3237	<name2>	<name2>
3918	3240	<aphaerese>	<aphaerese>
3918	3919	<>	<aphaerese>
3918	3237	<elision3>	<elision3>
3918	3919	<>	<elision3>
3918	3237	<elision2>	<elision2>
3918	3919	<>	<elision2>
3918	3237	<elision1>	<elision1>
3918	3919	<>	<elision1>
3918	3236	.	υ
3918	3379	H	υ
3918	3236	.	u
3918	3388	H	u
3918	3879	.	κ
3918	3631	H	κ
3918	3348	H	k
3918	3357	H	U
3918	3360	H	K
3918	3236	.	α
3918	3391	H	α
3918	3236	.	a
3918	3394	H	a
3918	3328	H	A
3918	3879	.	λ
3918	3640	H	λ
3918	3375	H	l
3918	3378	H	L
3919	3237	.	.
3919	3237	<~>	<~>
3919	3237	<split-s>	<split-s>
3919	3237	<split-h>	<split-h>
3919	3237	<name2>	<name2>
3919	3917	<>	<name>
3919	3240	<aphaerese>	<aphaerese>
3919	3919	<>	<aphaerese>
3919	3237	<elision3>	<elision3>
3919	3919	<>	<elision3>
3919	3237	<elision2>	<elision2>
3919	3919	<>	<elision2>
3919	3237	<elision1>	<elision1>
3919	3919	<>	<elision1>
3919	3236	.	υ
3919	3379	H	υ
3919	3236	.	u
3919	3388	H	u
3919	3879	.	κ
3919	3631	H	κ
3919	3348	H	k
3919	3357	H	U
3919	3360	H	K
3919	3236	.	α
3919	3391	H	α
3919	3236	.	a
3919	3394	H	a
3919	3328	H	A
3919	3879	.	λ
3919	3640	H	λ
3919	3375	H	l
3919	3378	H	L
3920	3413	.	.
3920	3413	 	 
3920	3413	<~>	<~>
3920	3413	<split-s>	<split-s>
3920	3413	<split-h>	<split-h>
3920	3413	<name2>	<name2>
3920	3787	<name2>	<name>
3920	3912	<>	<name>
3920	3416	<aphaerese>	<aphaerese>
3920	3911	<>	<aphaerese>
3920	3413	<elision3>	<elision3>
3920	3911	<>	<elision3>
3920	3413	<elision2>	<elision2>
3920	3911	<>	<elision2>
3920	3413	<elision1>	<elision1>
3920	3911	<>	<elision1>
3920	3577	.	υ
3920	3577	.	u
3920	3859	.	κ
3920	3577	.	α
3920	3577	.	a
3920	3859	.	λ
3920	3921	<4s>	<>
3921	215	.	.
3921	216	 	 
3921	215	<~>	<~>
3921	215	<split-s>	<split-s>
3921	215	<split-h>	<split-h>
3921	215	<name2>	<name2>
3921	3899	<name2>	<name>
3921	3916	<>	<name>
3921	219	<aphaerese>	<aphaerese>
3921	3915	<>	<aphaerese>
3921	215	<elision3>	<elision3>
3921	3915	<>	<elision3>
3921	215	<elision2>	<elision2>
3921	3915	<>	<elision2>
3921	215	<elision1>	<elision1>
3921	3915	<>	<elision1>
3921	3187	.	υ
3921	3231	H	υ
3921	3187	.	u
3921	3233	H	u
3921	3884	.	κ
3921	3646	H	κ
3921	3141	H	k
3921	3154	H	U
3921	3157	H	K
3921	3187	.	α
3921	3217	H	α
3921	3187	.	a
3921	3222	H	a
3921	2984	H	A
3921	3884	.	λ
3921	3623	H	λ
3921	3571	H	l
3921	3576	H	L
3921	3922	<K>	<>
3922	3237	.	.
3922	3237	<~>	<~>
3922	3237	<split-s>	<split-s>
3922	3237	<split-h>	<split-h>
3922	3237	<name2>	<name2>
3922	3789	<name2>	<name>
3922	3917	<>	<name>
3922	3240	<aphaerese>	<aphaerese>
3922	3919	<>	<aphaerese>
3922	3237	<elision3>	<elision3>
3922	3919	<>	<elision3>
3922	3237	<elision2>	<elision2>
3922	3919	<>	<elision2>
3922	3237	<elision1>	<elision1>
3922	3919	<>	<elision1>
3922	3236	.	υ
3922	3379	H	υ
3922	3236	.	u
3922	3388	H	u
3922	3879	.	κ
3922	3631	H	κ
3922	3348	H	k
3922	3357	H	U
3922	3360	H	K
3922	3236	.	α
3922	3391	H	α
3922	3236	.	a
3922	3394	H	a
3922	3328	H	A
3922	3879	.	λ
3922	3640	H	λ
3922	3375	H	l
3922	3378	H	L
3923	3924	<>	<name>
3923	3923	<>	<aphaerese>
3923	3923	<>	<elision3>
3923	3923	<>	<elision2>
3923	3923	<>	<elision1>
3923	3581	<3s>	<>
3924	3925	<>	<aphaerese>
3924	3925	<>	<elision3>
3924	3925	<>	<elision2>
3924	3925	<>	<elision1>
3924	3582	<3s>	<>
3925	3923	<>	<aphaerese>
3925	3923	<>	<elision3>
3925	3923	<>	<elision2>
3925	3923	<>	<elision1>
3925	3580	<3s>	<>
3926	3413	.	.
3926	3413	 	 
3926	3413	<~>	<~>
3926	3413	<split-s>	<split-s>
3926	3413	<split-h>	<split-h>
3926	3413	<name2>	<name2>
3926	3583	<>	<name>
3926	3416	<aphaerese>	<aphaerese>
3926	3412	<>	<aphaerese>
3926	3412	<>	<elision3>
3926	3412	<>	<elision2>
3926	3412	<>	<elision1>
3926	3577	.	υ
3926	3577	.	u
3926	3419	.	κ
3926	3577	.	α
3926	3577	.	a
3926	3927	<4s>	<>
3927	215	.	.
3927	216	 	 
3927	215	<~>	<~>
3927	215	<split-s>	<split-s>
3927	215	<split-h>	<split-h>
3927	215	<name2>	<name2>
3927	3587	<>	<name>
3927	219	<aphaerese>	<aphaerese>
3927	3586	<>	<aphaerese>
3927	3586	<>	<elision3>
3927	3586	<>	<elision2>
3927	3586	<>	<elision1>
3927	3187	.	υ
3927	3187	.	u
3927	222	.	κ
3927	3154	H	U
3927	3157	H	K
3927	3187	.	α
3927	3187	.	a
3927	2984	H	A
3927	3576	H	L
3927	3928	<K>	<>
3928	3237	.	.
3928	3237	<~>	<~>
3928	3237	<split-s>	<split-s>
3928	3237	<split-h>	<split-h>
3928	3237	<name2>	<name2>
3928	3588	<>	<name>
3928	3240	<aphaerese>	<aphaerese>
3928	3590	<>	<aphaerese>
3928	3590	<>	<elision3>
3928	3590	<>	<elision2>
3928	3590	<>	<elision1>
3928	3236	.	υ
3928	3236	.	u
3928	3243	.	κ
3928	3357	H	U
3928	3360	H	K
3928	3236	.	α
3928	3236	.	a
3928	3328	H	A
3928	3378	H	L
3929	3413	.	.
3929	3413	 	 
3929	3413	<~>	<~>
3929	3413	<split-s>	<split-s>
3929	3413	<split-h>	<split-h>
3929	3413	<name2>	<name2>
3929	3663	<>	<name>
3929	3416	<aphaerese>	<aphaerese>
3929	3662	<>	<aphaerese>
3929	3665	<elision3>	<elision3>
3929	3662	<>	<elision3>
3929	3665	<elision2>	<elision2>
3929	3662	<>	<elision2>
3929	3665	<elision1>	<elision1>
3929	3662	<>	<elision1>
3929	3577	.	υ
3929	3577	.	u
3929	3577	.	κ
3929	3577	.	α
3929	3577	.	a
3929	3577	.	λ
3929	3930	<4s>	<>
3930	215	.	.
3930	216	 	 
3930	215	<~>	<~>
3930	215	<split-s>	<split-s>
3930	215	<split-h>	<split-h>
3930	215	<name2>	<name2>
3930	3767	<>	<name>
3930	219	<aphaerese>	<aphaerese>
3930	3766	<>	<aphaerese>
3930	3769	<elision3>	<elision3>
3930	3766	<>	<elision3>
3930	3769	<elision2>	<elision2>
3930	3766	<>	<elision2>
3930	3769	<elision1>	<elision1>
3930	3766	<>	<elision1>
3930	3187	.	υ
3930	3187	.	u
3930	3187	.	κ
3930	3154	H	U
3930	3157	H	K
3930	3187	.	α
3930	3187	.	a
3930	2984	H	A
3930	3187	.	λ
3930	3576	H	L
3930	3931	<K>	<>
3931	3237	.	.
3931	3237	<~>	<~>
3931	3237	<split-s>	<split-s>
3931	3237	<split-h>	<split-h>
3931	3237	<name2>	<name2>
3931	3771	<>	<name>
3931	3240	<aphaerese>	<aphaerese>
3931	3773	<>	<aphaerese>
3931	3718	<elision3>	<elision3>
3931	3773	<>	<elision3>
3931	3718	<elision2>	<elision2>
3931	3773	<>	<elision2>
3931	3718	<elision1>	<elision1>
3931	3773	<>	<elision1>
3931	3236	.	υ
3931	3236	.	u
3931	3236	.	κ
3931	3357	H	U
3931	3360	H	K
3931	3236	.	α
3931	3236	.	a
3931	3328	H	A
3931	3236	.	λ
3931	3378	H	L
3932	3413	.	.
3932	3413	 	 
3932	3413	<~>	<~>
3932	3413	<split-s>	<split-s>
3932	3413	<split-h>	<split-h>
3932	3413	<name2>	<name2>
3932	3775	<>	<name>
3932	3416	<aphaerese>	<aphaerese>
3932	3774	<>	<aphaerese>
3932	3413	<elision3>	<elision3>
3932	3774	<>	<elision3>
3932	3413	<elision2>	<elision2>
3932	3774	<>	<elision2>
3932	3413	<elision1>	<elision1>
3932	3774	<>	<elision1>
3932	3577	.	υ
3932	3577	.	u
3932	3577	.	κ
3932	3577	.	α
3932	3577	.	a
3932	3577	.	λ
3932	3933	<4s>	<>
3933	215	.	.
3933	216	 	 
3933	215	<~>	<~>
3933	215	<split-s>	<split-s>
3933	215	<split-h>	<split-h>
3933	215	<name2>	<name2>
3933	3779	<>	<name>
3933	219	<aphaerese>	<aphaerese>
3933	3778	<>	<aphaerese>
3933	215	<elision3>	<elision3>
3933	3778	<>	<elision3>
3933	215	<elision2>	<elision2>
3933	3778	<>	<elision2>
3933	215	<elision1>	<elision1>
3933	3778	<>	<elision1>
3933	3187	.	υ
3933	3187	.	u
3933	3187	.	κ
3933	3154	H	U
3933	3157	H	K
3933	3187	.	α
3933	3187	.	a
3933	2984	H	A
3933	3187	.	λ
3933	3576	H	L
3933	3934	<K>	<>
3934	3237	.	.
3934	3237	<~>	<~>
3934	3237	<split-s>	<split-s>
3934	3237	<split-h>	<split-h>
3934	3237	<name2>	<name2>
3934	3780	<>	<name>
3934	3240	<aphaerese>	<aphaerese>
3934	3782	<>	<aphaerese>
3934	3237	<elision3>	<elision3>
3934	3782	<>	<elision3>
3934	3237	<elision2>	<elision2>
3934	3782	<>	<elision2>
3934	3237	<elision1>	<elision1>
3934	3782	<>	<elision1>
3934	3236	.	υ
3934	3236	.	u
3934	3236	.	κ
3934	3357	H	U
3934	3360	H	K
3934	3236	.	α
3934	3236	.	a
3934	3328	H	A
3934	3236	.	λ
3934	3378	H	L
3935	3784	<>	<name>
3935	3783	<>	<aphaerese>
3935	3783	<>	<elision3>
3935	3783	<>	<elision2>
3935	3783	<>	<elision1>
3935	3936	<U2kl>	<>
3936	3413	.	.
3936	3413	 	 
3936	3413	<~>	<~>
3936	3413	<split-s>	<split-s>
3936	3413	<split-h>	<split-h>
3936	3413	<name2>	<name2>
3936	3414	<>	<name>
3936	3416	<aphaerese>	<aphaerese>
3936	3413	<>	<aphaerese>
3936	3413	<elision3>	<elision3>
3936	3413	<>	<elision3>
3936	3413	<elision2>	<elision2>
3936	3413	<>	<elision2>
3936	3413	<elision1>	<elision1>
3936	3413	<>	<elision1>
3936	3577	.	υ
3936	3577	.	u
3936	3419	.	κ
3936	3577	.	α
3936	3577	.	a
3936	3937	<4s>	<>
3937	215	.	.
3937	216	 	 
3937	215	<~>	<~>
3937	215	<split-s>	<split-s>
3937	215	<split-h>	<split-h>
3937	215	<name2>	<name2>
3937	3582	<>	<name>
3937	219	<aphaerese>	<aphaerese>
3937	3581	<>	<aphaerese>
3937	215	<elision3>	<elision3>
3937	3581	<>	<elision3>
3937	215	<elision2>	<elision2>
3937	3581	<>	<elision2>
3937	215	<elision1>	<elision1>
3937	3581	<>	<elision1>
3937	3187	.	υ
3937	3187	.	u
3937	222	.	κ
3937	3154	H	U
3937	3157	H	K
3937	3187	.	α
3937	3187	.	a
3937	2984	H	A
3937	3576	H	L
3937	3938	<K>	<>
3938	3237	.	.
3938	3237	<~>	<~>
3938	3237	<split-s>	<split-s>
3938	3237	<split-h>	<split-h>
3938	3237	<name2>	<name2>
3938	3238	<>	<name>
3938	3240	<aphaerese>	<aphaerese>
3938	3237	<>	<aphaerese>
3938	3237	<elision3>	<elision3>
3938	3237	<>	<elision3>
3938	3237	<elision2>	<elision2>
3938	3237	<>	<elision2>
3938	3237	<elision1>	<elision1>
3938	3237	<>	<elision1>
3938	3236	.	υ
3938	3236	.	u
3938	3243	.	κ
3938	3357	H	U
3938	3360	H	K
3938	3236	.	α
3938	3236	.	a
3938	3328	H	A
3938	3378	H	L
3939	3787	<name>	<name>
3939	3790	<>	<name>
3939	3792	<>	<aphaerese>
3939	3792	<>	<elision3>
3939	3792	<>	<elision2>
3939	3792	<>	<elision1>
3939	3898	<4s>	<>
3939	3793	<A2kl>	<>
3939	3856	<L2kl>	<>
3939	3940	<K2kl>	<>
3940	3413	.	.
3940	3413	 	 
3940	3413	<~>	<~>
3940	3413	<split-s>	<split-s>
3940	3413	<split-h>	<split-h>
3940	3413	<name2>	<name2>
3940	3787	<name2>	<name>
3940	3890	<>	<name>
3940	3416	<aphaerese>	<aphaerese>
3940	3889	<>	<aphaerese>
3940	3413	<elision3>	<elision3>
3940	3889	<>	<elision3>
3940	3413	<elision2>	<elision2>
3940	3889	<>	<elision2>
3940	3413	<elision1>	<elision1>
3940	3889	<>	<elision1>
3940	3577	.	υ
3940	3577	.	u
3940	3577	.	α
3940	3577	.	a
3940	3941	<4s>	<>
3941	215	.	.
3941	216	 	 
3941	215	<~>	<~>
3941	215	<split-s>	<split-s>
3941	215	<split-h>	<split-h>
3941	215	<name2>	<name2>
3941	3899	<name2>	<name>
3941	3894	<>	<name>
3941	219	<aphaerese>	<aphaerese>
3941	3893	<>	<aphaerese>
3941	215	<elision3>	<elision3>
3941	3893	<>	<elision3>
3941	215	<elision2>	<elision2>
3941	3893	<>	<elision2>
3941	215	<elision1>	<elision1>
3941	3893	<>	<elision1>
3941	3187	.	υ
3941	3187	.	u
3941	3154	H	U
3941	3157	H	K
3941	3187	.	α
3941	3187	.	a
3941	2984	H	A
3941	3576	H	L
3941	3942	<K>	<>
3942	3237	.	.
3942	3237	<~>	<~>
3942	3237	<split-s>	<split-s>
3942	3237	<split-h>	<split-h>
3942	3237	<name2>	<name2>
3942	3789	<name2>	<name>
3942	3895	<>	<name>
3942	3240	<aphaerese>	<aphaerese>
3942	3897	<>	<aphaerese>
3942	3237	<elision3>	<elision3>
3942	3897	<>	<elision3>
3942	3237	<elision2>	<elision2>
3942	3897	<>	<elision2>
3942	3237	<elision1>	<elision1>
3942	3897	<>	<elision1>
3942	3236	.	υ
3942	3236	.	u
3942	3357	H	U
3942	3360	H	K
3942	3236	.	α
3942	3236	.	a
3942	3328	H	A
3942	3378	H	L
3943	3905	<>	<name>
3943	3904	<>	<aphaerese>
3943	3904	<>	<elision3>
3943	3904	<>	<elision2>
3943	3904	<>	<elision1>
3943	3936	<A2kl>	<>
3944	3787	<name>	<name>
3944	3908	<>	<name>
3944	3910	<>	<aphaerese>
3944	3910	<>	<elision3>
3944	3910	<>	<elision2>
3944	3910	<>	<elision1>
3944	3898	<4s>	<>
3944	3793	<A2kl>	<>
3944	3945	<L2kl>	<>
3945	3413	.	.
3945	3413	 	 
3945	3413	<~>	<~>
3945	3413	<split-s>	<split-s>
3945	3413	<split-h>	<split-h>
3945	3413	<name2>	<name2>
3945	3787	<name2>	<name>
3945	3912	<>	<name>
3945	3416	<aphaerese>	<aphaerese>
3945	3911	<>	<aphaerese>
3945	3413	<elision3>	<elision3>
3945	3911	<>	<elision3>
3945	3413	<elision2>	<elision2>
3945	3911	<>	<elision2>
3945	3413	<elision1>	<elision1>
3945	3911	<>	<elision1>
3945	3577	.	υ
3945	3577	.	u
3945	3859	.	κ
3945	3577	.	α
3945	3577	.	a
3945	3859	.	λ
3945	3946	<4s>	<>
3946	215	.	.
3946	216	 	 
3946	215	<~>	<~>
3946	215	<split-s>	<split-s>
3946	215	<split-h>	<split-h>
3946	215	<name2>	<name2>
3946	3899	<name2>	<name>
3946	3916	<>	<name>
3946	219	<aphaerese>	<aphaerese>
3946	3915	<>	<aphaerese>
3946	215	<elision3>	<elision3>
3946	3915	<>	<elision3>
3946	215	<elision2>	<elision2>
3946	3915	<>	<elision2>
3946	215	<elision1>	<elision1>
3946	3915	<>	<elision1>
3946	3187	.	υ
3946	3187	.	u
3946	3884	.	κ
3946	3154	H	U
3946	3157	H	K
3946	3187	.	α
3946	3187	.	a
3946	2984	H	A
3946	3884	.	λ
3946	3576	H	L
3946	3947	<K>	<>
3947	3237	.	.
3947	3237	<~>	<~>
3947	3237	<split-s>	<split-s>
3947	3237	<split-h>	<split-h>
3947	3237	<name2>	<name2>
3947	3789	<name2>	<name>
3947	3917	<>	<name>
3947	3240	<aphaerese>	<aphaerese>
3947	3919	<>	<aphaerese>
3947	3237	<elision3>	<elision3>
3947	3919	<>	<elision3>
3947	3237	<elision2>	<elision2>
3947	3919	<>	<elision2>
3947	3237	<elision1>	<elision1>
3947	3919	<>	<elision1>
3947	3236	.	υ
3947	3236	.	u
3947	3879	.	κ
3947	3357	H	U
3947	3360	H	K
3947	3236	.	α
3947	3236	.	a
3947	3328	H	A
3947	3879	.	λ
3947	3378	H	L
3948	3398	.	.
3948	3399	 	 
3948	3398	<~>	<~>
3948	3398	<split-s>	<split-s>
3948	3398	<split-h>	<split-h>
3948	3398	<name2>	<name2>
3948	3402	<aphaerese>	<aphaerese>
3948	3402	<>	<aphaerese>
3948	3398	<elision3>	<elision3>
3948	3402	<>	<elision3>
3948	3398	<elision2>	<elision2>
3948	3402	<>	<elision2>
3948	3398	<elision1>	<elision1>
3948	3402	<>	<elision1>
3948	3398	.	υ
3948	3398	.	u
3948	3591	.	κ
3948	3662	s	κ
3948	3774	s	k
3948	3783	s	U
3948	3949	s	K
3948	3398	.	α
3948	3398	.	a
3948	3904	s	A
3948	3774	s	λ
3948	3774	s	l
3948	3962	s	L
3948	3969	<split-h>	<>
3949	3787	<name>	<name>
3949	3950	<>	<name>
3949	3952	<>	<aphaerese>
3949	3952	<>	<elision3>
3949	3952	<>	<elision2>
3949	3952	<>	<elision1>
3949	3898	<4s>	<>
3949	3953	<L2kl>	<>
3949	3901	<K2kl>	<>
3950	3951	<>	<aphaerese>
3950	3951	<>	<elision3>
3950	3951	<>	<elision2>
3950	3951	<>	<elision1>
3950	3954	<L2kl>	<>
3950	3890	<K2kl>	<>
3951	3952	<>	<aphaerese>
3951	3952	<>	<elision3>
3951	3952	<>	<elision2>
3951	3952	<>	<elision1>
3951	3955	<L2kl>	<>
3951	3891	<K2kl>	<>
3952	3950	<>	<name>
3952	3952	<>	<aphaerese>
3952	3952	<>	<elision3>
3952	3952	<>	<elision2>
3952	3952	<>	<elision1>
3952	3953	<L2kl>	<>
3952	3889	<K2kl>	<>
3953	3954	<>	<name>
3953	3953	<>	<aphaerese>
3953	3953	<>	<elision3>
3953	3953	<>	<elision2>
3953	3953	<>	<elision1>
3953	3577	.	κ
3953	3577	.	λ
3953	3957	<4s>	<>
3954	3955	<>	<aphaerese>
3954	3955	<>	<elision3>
3954	3955	<>	<elision2>
3954	3955	<>	<elision1>
3954	3579	.	κ
3954	3579	.	λ
3954	3958	<4s>	<>
3955	3953	<>	<aphaerese>
3955	3953	<>	<elision3>
3955	3953	<>	<elision2>
3955	3953	<>	<elision1>
3955	3577	.	κ
3955	3577	.	λ
3955	3956	<4s>	<>
3956	3957	<>	<aphaerese>
3956	3957	<>	<elision3>
3956	3957	<>	<elision2>
3956	3957	<>	<elision1>
3956	3187	.	κ
3956	3187	.	λ
3956	3960	<K>	<>
3957	3958	<>	<name>
3957	3957	<>	<aphaerese>
3957	3957	<>	<elision3>
3957	3957	<>	<elision2>
3957	3957	<>	<elision1>
3957	3187	.	κ
3957	3187	.	λ
3957	3961	<K>	<>
3958	3956	<>	<aphaerese>
3958	3956	<>	<elision3>
3958	3956	<>	<elision2>
3958	3956	<>	<elision1>
3958	3189	.	κ
3958	3189	.	λ
3958	3959	<K>	<>
3959	3960	<>	<aphaerese>
3959	3960	<>	<elision3>
3959	3960	<>	<elision2>
3959	3960	<>	<elision1>
3959	3235	.	κ
3959	3235	.	λ
3960	3961	<>	<aphaerese>
3960	3961	<>	<elision3>
3960	3961	<>	<elision2>
3960	3961	<>	<elision1>
3960	3236	.	κ
3960	3236	.	λ
3961	3959	<>	<name>
3961	3961	<>	<aphaerese>
3961	3961	<>	<elision3>
3961	3961	<>	<elision2>
3961	3961	<>	<elision1>
3961	3236	.	κ
3961	3236	.	λ
3962	3787	<name>	<name>
3962	3963	<>	<name>
3962	3965	<>	<aphaerese>
3962	3965	<>	<elision3>
3962	3965	<>	<elision2>
3962	3965	<>	<elision1>
3962	3898	<4s>	<>
3962	3966	<L2kl>	<>
3963	3964	<>	<aphaerese>
3963	3964	<>	<elision3>
3963	3964	<>	<elision2>
3963	3964	<>	<elision1>
3963	3775	<L2kl>	<>
3964	3965	<>	<aphaerese>
3964	3965	<>	<elision3>
3964	3965	<>	<elision2>
3964	3965	<>	<elision1>
3964	3776	<L2kl>	<>
3965	3963	<>	<name>
3965	3965	<>	<aphaerese>
3965	3965	<>	<elision3>
3965	3965	<>	<elision2>
3965	3965	<>	<elision1>
3965	3774	<L2kl>	<>
3966	3413	.	.
3966	3413	 	 
3966	3413	<~>	<~>
3966	3413	<split-s>	<split-s>
3966	3413	<split-h>	<split-h>
3966	3413	<name2>	<name2>
3966	3787	<name2>	<name>
3966	3775	<>	<name>
3966	3416	<aphaerese>	<aphaerese>
3966	3774	<>	<aphaerese>
3966	3413	<elision3>	<elision3>
3966	3774	<>	<elision3>
3966	3413	<elision2>	<elision2>
3966	3774	<>	<elision2>
3966	3413	<elision1>	<elision1>
3966	3774	<>	<elision1>
3966	3577	.	υ
3966	3577	.	u
3966	3577	.	κ
3966	3577	.	α
3966	3577	.	a
3966	3577	.	λ
3966	3967	<4s>	<>
3967	215	.	.
3967	216	 	 
3967	215	<~>	<~>
3967	215	<split-s>	<split-s>
3967	215	<split-h>	<split-h>
3967	215	<name2>	<name2>
3967	3899	<name2>	<name>
3967	3779	<>	<name>
3967	219	<aphaerese>	<aphaerese>
3967	3778	<>	<aphaerese>
3967	215	<elision3>	<elision3>
3967	3778	<>	<elision3>
3967	215	<elision2>	<elision2>
3967	3778	<>	<elision2>
3967	215	<elision1>	<elision1>
3967	3778	<>	<elision1>
3967	3187	.	υ
3967	3231	H	υ
3967	3187	.	u
3967	3233	H	u
3967	3187	.	κ
3967	3646	H	κ
3967	3141	H	k
3967	3154	H	U
3967	3157	H	K
3967	3187	.	α
3967	3217	H	α
3967	3187	.	a
3967	3222	H	a
3967	2984	H	A
3967	3187	.	λ
3967	3623	H	λ
3967	3571	H	l
3967	3576	H	L
3967	3968	<K>	<>
3968	3237	.	.
3968	3237	<~>	<~>
3968	3237	<split-s>	<split-s>
3968	3237	<split-h>	<split-h>
3968	3237	<name2>	<name2>
3968	3789	<name2>	<name>
3968	3780	<>	<name>
3968	3240	<aphaerese>	<aphaerese>
3968	3782	<>	<aphaerese>
3968	3237	<elision3>	<elision3>
3968	3782	<>	<elision3>
3968	3237	<elision2>	<elision2>
3968	3782	<>	<elision2>
3968	3237	<elision1>	<elision1>
3968	3782	<>	<elision1>
3968	3236	.	υ
3968	3379	H	υ
3968	3236	.	u
3968	3388	H	u
3968	3236	.	κ
3968	3631	H	κ
3968	3348	H	k
3968	3357	H	U
3968	3360	H	K
3968	3236	.	α
3968	3391	H	α
3968	3236	.	a
3968	3394	H	a
3968	3328	H	A
3968	3236	.	λ
3968	3640	H	λ
3968	3375	H	l
3968	3378	H	L
3969	3970	<>	<aphaerese>
3969	3970	<>	<elision3>
3969	3970	<>	<elision2>
3969	3970	<>	<elision1>
3969	3567	<3s>	<>
3970	3971	<>	<name>
3970	3970	<>	<aphaerese>
3970	3970	<>	<elision3>
3970	3970	<>	<elision2>
3970	3970	<>	<elision1>
3970	3568	<3s>	<>
3971	3969	<>	<aphaerese>
3971	3969	<>	<elision3>
3971	3969	<>	<elision2>
3971	3969	<>	<elision1>
3971	3569	<3s>	<>
3972	3398	.	.
3972	3399	 	 
3972	3398	<~>	<~>
3972	3398	<split-s>	<split-s>
3972	3398	<split-h>	<split-h>
3972	3398	<name2>	<name2>
3972	3402	<aphaerese>	<aphaerese>
3972	3405	<>	<aphaerese>
3972	3398	<elision3>	<elision3>
3972	3405	<>	<elision3>
3972	3398	<elision2>	<elision2>
3972	3405	<>	<elision2>
3972	3398	<elision1>	<elision1>
3972	3405	<>	<elision1>
3972	3406	.	υ
3972	3412	s	υ
3972	3406	.	u
3972	3412	s	u
3972	3591	.	κ
3972	3662	s	κ
3972	3774	s	k
3972	3783	s	U
3972	3786	s	K
3972	3406	.	α
3972	3412	s	α
3972	3406	.	a
3972	3412	s	a
3972	3904	s	A
3972	3774	s	λ
3972	3774	s	l
3972	3907	s	L
3972	3925	<split-h>	<>
3973	3401	.	.
3973	3404	 	 
3973	3401	<~>	<~>
3973	3401	<split-s>	<split-s>
3973	3401	<split-h>	<split-h>
3973	3401	<name2>	<name2>
3973	3948	<aphaerese>	<aphaerese>
3973	3401	<>	<aphaerese>
3973	3401	<elision3>	<elision3>
3973	3401	<>	<elision3>
3973	3401	<elision2>	<elision2>
3973	3401	<>	<elision2>
3973	3401	<elision1>	<elision1>
3973	3401	<>	<elision1>
3973	3408	.	υ
3973	3584	s	υ
3973	3408	.	u
3973	3584	s	u
3973	3593	.	κ
3973	3664	s	κ
3973	3776	s	k
3973	3785	s	U
3973	3951	s	K
3973	3408	.	α
3973	3584	s	α
3973	3408	.	a
3973	3584	s	a
3973	3906	s	A
3973	3776	s	λ
3973	3776	s	l
3973	3964	s	L
3973	3924	<split-h>	<>
3974	3401	.	.
3974	3404	 	 
3974	3401	<~>	<~>
3974	3401	<split-s>	<split-s>
3974	3401	<split-h>	<split-h>
3974	3401	<name2>	<name2>
3974	3948	<aphaerese>	<aphaerese>
3974	3975	<>	<aphaerese>
3974	3975	<>	<elision3>
3974	3975	<>	<elision2>
3974	3975	<>	<elision1>
3974	3408	.	υ
3974	3584	s	υ
3974	3408	.	u
3974	3584	s	u
3974	3593	.	κ
3974	3664	s	κ
3974	3776	s	k
3974	3785	s	U
3974	3951	s	K
3974	3408	.	α
3974	3584	s	α
3974	3408	.	a
3974	3584	s	a
3974	3906	s	A
3974	3776	s	λ
3974	3776	s	l
3974	3964	s	L
3974	3978	<split-h>	<>
3975	3398	.	.
3975	3399	 	 
3975	3398	<~>	<~>
3975	3398	<split-s>	<split-s>
3975	3398	<split-h>	<split-h>
3975	3398	<name2>	<name2>
3975	3402	<aphaerese>	<aphaerese>
3975	3397	<>	<aphaerese>
3975	3397	<>	<elision3>
3975	3397	<>	<elision2>
3975	3397	<>	<elision1>
3975	3406	.	υ
3975	3412	s	υ
3975	3406	.	u
3975	3412	s	u
3975	3591	.	κ
3975	3662	s	κ
3975	3774	s	k
3975	3783	s	U
3975	3949	s	K
3975	3406	.	α
3975	3412	s	α
3975	3406	.	a
3975	3412	s	a
3975	3904	s	A
3975	3774	s	λ
3975	3774	s	l
3975	3962	s	L
3975	3976	<split-h>	<>
3976	3977	<>	<aphaerese>
3976	3977	<>	<elision3>
3976	3977	<>	<elision2>
3976	3977	<>	<elision1>
3976	3585	<3s>	<>
3977	3978	<>	<name>
3977	3977	<>	<aphaerese>
3977	3977	<>	<elision3>
3977	3977	<>	<elision2>
3977	3977	<>	<elision1>
3977	3586	<3s>	<>
3978	3976	<>	<aphaerese>
3978	3976	<>	<elision3>
3978	3976	<>	<elision2>
3978	3976	<>	<elision1>
3978	3587	<3s>	<>
3979	3980	<>	<name>
3979	3979	<>	<aphaerese>
3979	3982	<elision3>	<elision3>
3979	3979	<>	<elision3>
3979	3982	<elision2>	<elision2>
3979	3979	<>	<elision2>
3979	3982	<elision1>	<elision1>
3979	3979	<>	<elision1>
3979	3565	<2s>	<>
3980	3981	<>	<aphaerese>
3980	3984	<elision3>	<elision3>
3980	3981	<>	<elision3>
3980	3984	<elision2>	<elision2>
3980	3981	<>	<elision2>
3980	3984	<elision1>	<elision1>
3980	3981	<>	<elision1>
3980	3566	<2s>	<>
3981	3979	<>	<aphaerese>
3981	3982	<elision3>	<elision3>
3981	3979	<>	<elision3>
3981	3982	<elision2>	<elision2>
3981	3979	<>	<elision2>
3981	3982	<elision1>	<elision1>
3981	3979	<>	<elision1>
3981	3564	<2s>	<>
3982	3983	<>	<name>
3982	3982	<>	<aphaerese>
3982	3982	<>	<elision3>
3982	3982	<>	<elision2>
3982	3982	<>	<elision1>
3982	3985	s	κ
3982	3985	s	k
3982	4000	s	K
3982	3985	s	λ
3982	4004	s	l
3982	4006	s	L
3982	3426	<2s>	<>
3983	3984	<>	<aphaerese>
3983	3984	<>	<elision3>
3983	3984	<>	<elision2>
3983	3984	<>	<elision1>
3983	3987	s	κ
3983	3987	s	k
3983	4002	s	K
3983	3987	s	λ
3983	4003	s	l
3983	4008	s	L
3983	3427	<2s>	<>
3984	3982	<>	<aphaerese>
3984	3982	<>	<elision3>
3984	3982	<>	<elision2>
3984	3982	<>	<elision1>
3984	3985	s	κ
3984	3985	s	k
3984	4000	s	K
3984	3985	s	λ
3984	4004	s	l
3984	4006	s	L
3984	3425	<2s>	<>
3985	3986	<>	<name>
3985	3985	<>	<aphaerese>
3985	3985	<>	<elision3>
3985	3985	<>	<elision2>
3985	3985	<>	<elision1>
3985	3988	s	κ
3985	3774	s	k
3985	3949	s	K
3985	3988	s	λ
3985	3774	s	l
3985	3962	s	L
3985	3998	<split-h>	<>
3986	3987	<>	<aphaerese>
3986	3987	<>	<elision3>
3986	3987	<>	<elision2>
3986	3987	<>	<elision1>
3986	3990	s	κ
3986	3776	s	k
3986	3951	s	K
3986	3990	s	λ
3986	3776	s	l
3986	3964	s	L
3986	3999	<split-h>	<>
3987	3985	<>	<aphaerese>
3987	3985	<>	<elision3>
3987	3985	<>	<elision2>
3987	3985	<>	<elision1>
3987	3988	s	κ
3987	3774	s	k
3987	3949	s	K
3987	3988	s	λ
3987	3774	s	l
3987	3962	s	L
3987	3997	<split-h>	<>
3988	3413	.	.
3988	3413	 	 
3988	3413	<~>	<~>
3988	3413	<split-s>	<split-s>
3988	3413	<split-h>	<split-h>
3988	3413	<name2>	<name2>
3988	3989	<>	<name>
3988	3416	<aphaerese>	<aphaerese>
3988	3988	<>	<aphaerese>
3988	3988	<>	<elision3>
3988	3988	<>	<elision2>
3988	3988	<>	<elision1>
3988	3577	.	υ
3988	3577	.	u
3988	3577	.	κ
3988	3577	.	α
3988	3577	.	a
3988	3577	.	λ
3988	3992	<4s>	<>
3989	3415	.	.
3989	3415	 	 
3989	3415	<~>	<~>
3989	3415	<split-s>	<split-s>
3989	3415	<split-h>	<split-h>
3989	3415	<name2>	<name2>
3989	3418	<aphaerese>	<aphaerese>
3989	3990	<>	<aphaerese>
3989	3990	<>	<elision3>
3989	3990	<>	<elision2>
3989	3990	<>	<elision1>
3989	3579	.	υ
3989	3579	.	u
3989	3579	.	κ
3989	3579	.	α
3989	3579	.	a
3989	3579	.	λ
3989	3993	<4s>	<>
3990	3413	.	.
3990	3413	 	 
3990	3413	<~>	<~>
3990	3413	<split-s>	<split-s>
3990	3413	<split-h>	<split-h>
3990	3413	<name2>	<name2>
3990	3416	<aphaerese>	<aphaerese>
3990	3988	<>	<aphaerese>
3990	3988	<>	<elision3>
3990	3988	<>	<elision2>
3990	3988	<>	<elision1>
3990	3577	.	υ
3990	3577	.	u
3990	3577	.	κ
3990	3577	.	α
3990	3577	.	a
3990	3577	.	λ
3990	3991	<4s>	<>
3991	215	.	.
3991	216	 	 
3991	215	<~>	<~>
3991	215	<split-s>	<split-s>
3991	215	<split-h>	<split-h>
3991	215	<name2>	<name2>
3991	219	<aphaerese>	<aphaerese>
3991	3992	<>	<aphaerese>
3991	3992	<>	<elision3>
3991	3992	<>	<elision2>
3991	3992	<>	<elision1>
3991	3187	.	υ
3991	3231	H	υ
3991	3187	.	u
3991	3233	H	u
3991	3187	.	κ
3991	3646	H	κ
3991	3141	H	k
3991	3154	H	U
3991	3157	H	K
3991	3187	.	α
3991	3217	H	α
3991	3187	.	a
3991	3222	H	a
3991	2984	H	A
3991	3187	.	λ
3991	3623	H	λ
3991	3571	H	l
3991	3576	H	L
3991	3995	<K>	<>
3992	215	.	.
3992	216	 	 
3992	215	<~>	<~>
3992	215	<split-s>	<split-s>
3992	215	<split-h>	<split-h>
3992	215	<name2>	<name2>
3992	3993	<>	<name>
3992	219	<aphaerese>	<aphaerese>
3992	3992	<>	<aphaerese>
3992	3992	<>	<elision3>
3992	3992	<>	<elision2>
3992	3992	<>	<elision1>
3992	3187	.	υ
3992	3231	H	υ
3992	3187	.	u
3992	3233	H	u
3992	3187	.	κ
3992	3646	H	κ
3992	3141	H	k
3992	3154	H	U
3992	3157	H	K
3992	3187	.	α
3992	3217	H	α
3992	3187	.	a
3992	3222	H	a
3992	2984	H	A
3992	3187	.	λ
3992	3623	H	λ
3992	3571	H	l
3992	3576	H	L
3992	3996	<K>	<>
3993	214	.	.
3993	218	 	 
3993	214	<~>	<~>
3993	214	<split-s>	<split-s>
3993	214	<split-h>	<split-h>
3993	214	<name2>	<name2>
3993	221	<aphaerese>	<aphaerese>
3993	3991	<>	<aphaerese>
3993	3991	<>	<elision3>
3993	3991	<>	<elision2>
3993	3991	<>	<elision1>
3993	3189	.	υ
3993	3226	H	υ
3993	3189	.	u
3993	3230	H	u
3993	3189	.	κ
3993	3603	H	κ
3993	3182	H	k
3993	3156	H	U
3993	3186	H	K
3993	3189	.	α
3993	3216	H	α
3993	3189	.	a
3993	3221	H	a
3993	2987	H	A
3993	3189	.	λ
3993	3622	H	λ
3993	3570	H	l
3993	3573	H	L
3993	3994	<K>	<>
3994	3239	.	.
3994	3239	<~>	<~>
3994	3239	<split-s>	<split-s>
3994	3239	<split-h>	<split-h>
3994	3239	<name2>	<name2>
3994	3242	<aphaerese>	<aphaerese>
3994	3995	<>	<aphaerese>
3994	3995	<>	<elision3>
3994	3995	<>	<elision2>
3994	3995	<>	<elision1>
3994	3235	.	υ
3994	3381	H	υ
3994	3235	.	u
3994	3390	H	u
3994	3235	.	κ
3994	3633	H	κ
3994	3350	H	k
3994	3359	H	U
3994	3363	H	K
3994	3235	.	α
3994	3393	H	α
3994	3235	.	a
3994	3396	H	a
3994	3330	H	A
3994	3235	.	λ
3994	3642	H	λ
3994	3377	H	l
3994	3372	H	L
3995	3237	.	.
3995	3237	<~>	<~>
3995	3237	<split-s>	<split-s>
3995	3237	<split-h>	<split-h>
3995	3237	<name2>	<name2>
3995	3240	<aphaerese>	<aphaerese>
3995	3996	<>	<aphaerese>
3995	3996	<>	<elision3>
3995	3996	<>	<elision2>
3995	3996	<>	<elision1>
3995	3236	.	υ
3995	3379	H	υ
3995	3236	.	u
3995	3388	H	u
3995	3236	.	κ
3995	3631	H	κ
3995	3348	H	k
3995	3357	H	U
3995	3360	H	K
3995	3236	.	α
3995	3391	H	α
3995	3236	.	a
3995	3394	H	a
3995	3328	H	A
3995	3236	.	λ
3995	3640	H	λ
3995	3375	H	l
3995	3378	H	L
3996	3237	.	.
3996	3237	<~>	<~>
3996	3237	<split-s>	<split-s>
3996	3237	<split-h>	<split-h>
3996	3237	<name2>	<name2>
3996	3994	<>	<name>
3996	3240	<aphaerese>	<aphaerese>
3996	3996	<>	<aphaerese>
3996	3996	<>	<elision3>
3996	3996	<>	<elision2>
3996	3996	<>	<elision1>
3996	3236	.	υ
3996	3379	H	υ
3996	3236	.	u
3996	3388	H	u
3996	3236	.	κ
3996	3631	H	κ
3996	3348	H	k
3996	3357	H	U
3996	3360	H	K
3996	3236	.	α
3996	3391	H	α
3996	3236	.	a
3996	3394	H	a
3996	3328	H	A
3996	3236	.	λ
3996	3640	H	λ
3996	3375	H	l
3996	3378	H	L
3997	3998	<>	<aphaerese>
3997	3998	<>	<elision3>
3997	3998	<>	<elision2>
3997	3998	<>	<elision1>
3997	3600	<3s>	<>
3998	3999	<>	<name>
3998	3998	<>	<aphaerese>
3998	3998	<>	<elision3>
3998	3998	<>	<elision2>
3998	3998	<>	<elision1>
3998	3601	<3s>	<>
3999	3997	<>	<aphaerese>
3999	3997	<>	<elision3>
3999	3997	<>	<elision2>
3999	3997	<>	<elision1>
3999	3602	<3s>	<>
4000	4001	<>	<name>
4000	4000	<>	<aphaerese>
4000	4000	<>	<elision3>
4000	4000	<>	<elision2>
4000	4000	<>	<elision1>
4000	4004	<K2kl>	<>
4001	4002	<>	<aphaerese>
4001	4002	<>	<elision3>
4001	4002	<>	<elision2>
4001	4002	<>	<elision1>
4001	4005	<K2kl>	<>
4002	4000	<>	<aphaerese>
4002	4000	<>	<elision3>
4002	4000	<>	<elision2>
4002	4000	<>	<elision1>
4002	4003	<K2kl>	<>
4003	4004	<>	<aphaerese>
4003	4004	<>	<elision3>
4003	4004	<>	<elision2>
4003	4004	<>	<elision1>
4003	3997	<split-h>	<>
4004	4005	<>	<name>
4004	4004	<>	<aphaerese>
4004	4004	<>	<elision3>
4004	4004	<>	<elision2>
4004	4004	<>	<elision1>
4004	3998	<split-h>	<>
4005	4003	<>	<aphaerese>
4005	4003	<>	<elision3>
4005	4003	<>	<elision2>
4005	4003	<>	<elision1>
4005	3999	<split-h>	<>
4006	4007	<>	<name>
4006	4006	<>	<aphaerese>
4006	4006	<>	<elision3>
4006	4006	<>	<elision2>
4006	4006	<>	<elision1>
4006	4004	<L2kl>	<>
4007	4008	<>	<aphaerese>
4007	4008	<>	<elision3>
4007	4008	<>	<elision2>
4007	4008	<>	<elision1>
4007	4005	<L2kl>	<>
4008	4006	<>	<aphaerese>
4008	4006	<>	<elision3>
4008	4006	<>	<elision2>
4008	4006	<>	<elision1>
4008	4003	<L2kl>	<>
4009	3398	.	.
4009	3399	 	 
4009	3398	<~>	<~>
4009	3398	<split-s>	<split-s>
4009	3398	<split-h>	<split-h>
4009	3398	<name2>	<name2>
4009	4010	<>	<name>
4009	3402	<aphaerese>	<aphaerese>
4009	4009	<>	<aphaerese>
4009	4012	<elision3>	<elision3>
4009	4009	<>	<elision3>
4009	4012	<elision2>	<elision2>
4009	4009	<>	<elision2>
4009	4012	<elision1>	<elision1>
4009	4009	<>	<elision1>
4009	3406	.	υ
4009	3412	s	υ
4009	3406	.	u
4009	3412	s	u
4009	3406	.	κ
4009	3988	s	κ
4009	3774	s	k
4009	3783	s	U
4009	3949	s	K
4009	3406	.	α
4009	3412	s	α
4009	3406	.	a
4009	3412	s	a
4009	3904	s	A
4009	3406	.	λ
4009	3988	s	λ
4009	3774	s	l
4009	3962	s	L
4009	4060	<split-h>	<>
4010	3401	.	.
4010	3404	 	 
4010	3401	<~>	<~>
4010	3401	<split-s>	<split-s>
4010	3401	<split-h>	<split-h>
4010	3401	<name2>	<name2>
4010	3948	<aphaerese>	<aphaerese>
4010	4011	<>	<aphaerese>
4010	4014	<elision3>	<elision3>
4010	4011	<>	<elision3>
4010	4014	<elision2>	<elision2>
4010	4011	<>	<elision2>
4010	4014	<elision1>	<elision1>
4010	4011	<>	<elision1>
4010	3408	.	υ
4010	3584	s	υ
4010	3408	.	u
4010	3584	s	u
4010	3408	.	κ
4010	3990	s	κ
4010	3776	s	k
4010	3785	s	U
4010	3951	s	K
4010	3408	.	α
4010	3584	s	α
4010	3408	.	a
4010	3584	s	a
4010	3906	s	A
4010	3408	.	λ
4010	3990	s	λ
4010	3776	s	l
4010	3964	s	L
4010	4061	<split-h>	<>
4011	3398	.	.
4011	3399	 	 
4011	3398	<~>	<~>
4011	3398	<split-s>	<split-s>
4011	3398	<split-h>	<split-h>
4011	3398	<name2>	<name2>
4011	3402	<aphaerese>	<aphaerese>
4011	4009	<>	<aphaerese>
4011	4012	<elision3>	<elision3>
4011	4009	<>	<elision3>
4011	4012	<elision2>	<elision2>
4011	4009	<>	<elision2>
4011	4012	<elision1>	<elision1>
4011	4009	<>	<elision1>
4011	3406	.	υ
4011	3412	s	υ
4011	3406	.	u
4011	3412	s	u
4011	3406	.	κ
4011	3988	s	κ
4011	3774	s	k
4011	3783	s	U
4011	3949	s	K
4011	3406	.	α
4011	3412	s	α
4011	3406	.	a
4011	3412	s	a
4011	3904	s	A
4011	3406	.	λ
4011	3988	s	λ
4011	3774	s	l
4011	3962	s	L
4011	4059	<split-h>	<>
4012	3398	.	.
4012	3399	 	 
4012	3398	<~>	<~>
4012	3398	<split-s>	<split-s>
4012	3398	<split-h>	<split-h>
4012	3398	<name2>	<name2>
4012	4013	<>	<name>
4012	3402	<aphaerese>	<aphaerese>
4012	4012	<>	<aphaerese>
4012	3398	<elision3>	<elision3>
4012	4012	<>	<elision3>
4012	3398	<elision2>	<elision2>
4012	4012	<>	<elision2>
4012	3398	<elision1>	<elision1>
4012	4012	<>	<elision1>
4012	3406	.	υ
4012	3412	s	υ
4012	3406	.	u
4012	3412	s	u
4012	3591	.	κ
4012	4015	s	κ
4012	4024	s	k
4012	3783	s	U
4012	4033	s	K
4012	3406	.	α
4012	3412	s	α
4012	3406	.	a
4012	3412	s	a
4012	3904	s	A
4012	4024	s	λ
4012	4024	s	l
4012	4049	s	L
4012	4057	<split-h>	<>
4013	3401	.	.
4013	3404	 	 
4013	3401	<~>	<~>
4013	3401	<split-s>	<split-s>
4013	3401	<split-h>	<split-h>
4013	3401	<name2>	<name2>
4013	3948	<aphaerese>	<aphaerese>
4013	4014	<>	<aphaerese>
4013	3401	<elision3>	<elision3>
4013	4014	<>	<elision3>
4013	3401	<elision2>	<elision2>
4013	4014	<>	<elision2>
4013	3401	<elision1>	<elision1>
4013	4014	<>	<elision1>
4013	3408	.	υ
4013	3584	s	υ
4013	3408	.	u
4013	3584	s	u
4013	3593	.	κ
4013	4017	s	κ
4013	4026	s	k
4013	3785	s	U
4013	4035	s	K
4013	3408	.	α
4013	3584	s	α
4013	3408	.	a
4013	3584	s	a
4013	3906	s	A
4013	4026	s	λ
4013	4026	s	l
4013	4051	s	L
4013	4058	<split-h>	<>
4014	3398	.	.
4014	3399	 	 
4014	3398	<~>	<~>
4014	3398	<split-s>	<split-s>
4014	3398	<split-h>	<split-h>
4014	3398	<name2>	<name2>
4014	3402	<aphaerese>	<aphaerese>
4014	4012	<>	<aphaerese>
4014	3398	<elision3>	<elision3>
4014	4012	<>	<elision3>
4014	3398	<elision2>	<elision2>
4014	4012	<>	<elision2>
4014	3398	<elision1>	<elision1>
4014	4012	<>	<elision1>
4014	3406	.	υ
4014	3412	s	υ
4014	3406	.	u
4014	3412	s	u
4014	3591	.	κ
4014	4015	s	κ
4014	4024	s	k
4014	3783	s	U
4014	4033	s	K
4014	3406	.	α
4014	3412	s	α
4014	3406	.	a
4014	3412	s	a
4014	3904	s	A
4014	4024	s	λ
4014	4024	s	l
4014	4049	s	L
4014	4056	<split-h>	<>
4015	3413	.	.
4015	3413	 	 
4015	3413	<~>	<~>
4015	3413	<split-s>	<split-s>
4015	3413	<split-h>	<split-h>
4015	3413	<name2>	<name2>
4015	4016	<>	<name>
4015	3416	<aphaerese>	<aphaerese>
4015	4015	<>	<aphaerese>
4015	3665	<elision3>	<elision3>
4015	4015	<>	<elision3>
4015	3665	<elision2>	<elision2>
4015	4015	<>	<elision2>
4015	3665	<elision1>	<elision1>
4015	4015	<>	<elision1>
4015	3577	.	υ
4015	3577	.	u
4015	3577	.	κ
4015	3577	.	α
4015	3577	.	a
4015	3577	.	λ
4015	4019	<4s>	<>
4016	3415	.	.
4016	3415	 	 
4016	3415	<~>	<~>
4016	3415	<split-s>	<split-s>
4016	3415	<split-h>	<split-h>
4016	3415	<name2>	<name2>
4016	3418	<aphaerese>	<aphaerese>
4016	4017	<>	<aphaerese>
4016	3667	<elision3>	<elision3>
4016	4017	<>	<elision3>
4016	3667	<elision2>	<elision2>
4016	4017	<>	<elision2>
4016	3667	<elision1>	<elision1>
4016	4017	<>	<elision1>
4016	3579	.	υ
4016	3579	.	u
4016	3579	.	κ
4016	3579	.	α
4016	3579	.	a
4016	3579	.	λ
4016	4020	<4s>	<>
4017	3413	.	.
4017	3413	 	 
4017	3413	<~>	<~>
4017	3413	<split-s>	<split-s>
4017	3413	<split-h>	<split-h>
4017	3413	<name2>	<name2>
4017	3416	<aphaerese>	<aphaerese>
4017	4015	<>	<aphaerese>
4017	3665	<elision3>	<elision3>
4017	4015	<>	<elision3>
4017	3665	<elision2>	<elision2>
4017	4015	<>	<elision2>
4017	3665	<elision1>	<elision1>
4017	4015	<>	<elision1>
4017	3577	.	υ
4017	3577	.	u
4017	3577	.	κ
4017	3577	.	α
4017	3577	.	a
4017	3577	.	λ
4017	4018	<4s>	<>
4018	215	.	.
4018	216	 	 
4018	215	<~>	<~>
4018	215	<split-s>	<split-s>
4018	215	<split-h>	<split-h>
4018	215	<name2>	<name2>
4018	219	<aphaerese>	<aphaerese>
4018	4019	<>	<aphaerese>
4018	3769	<elision3>	<elision3>
4018	4019	<>	<elision3>
4018	3769	<elision2>	<elision2>
4018	4019	<>	<elision2>
4018	3769	<elision1>	<elision1>
4018	4019	<>	<elision1>
4018	3187	.	υ
4018	3231	H	υ
4018	3187	.	u
4018	3233	H	u
4018	3187	.	κ
4018	3154	H	U
4018	3187	.	α
4018	3217	H	α
4018	3187	.	a
4018	3222	H	a
4018	2984	H	A
4018	3187	.	λ
4018	4022	<K>	<>
4019	215	.	.
4019	216	 	 
4019	215	<~>	<~>
4019	215	<split-s>	<split-s>
4019	215	<split-h>	<split-h>
4019	215	<name2>	<name2>
4019	4020	<>	<name>
4019	219	<aphaerese>	<aphaerese>
4019	4019	<>	<aphaerese>
4019	3769	<elision3>	<elision3>
4019	4019	<>	<elision3>
4019	3769	<elision2>	<elision2>
4019	4019	<>	<elision2>
4019	3769	<elision1>	<elision1>
4019	4019	<>	<elision1>
4019	3187	.	υ
4019	3231	H	υ
4019	3187	.	u
4019	3233	H	u
4019	3187	.	κ
4019	3154	H	U
4019	3187	.	α
4019	3217	H	α
4019	3187	.	a
4019	3222	H	a
4019	2984	H	A
4019	3187	.	λ
4019	4023	<K>	<>
4020	214	.	.
4020	218	 	 
4020	214	<~>	<~>
4020	214	<split-s>	<split-s>
4020	214	<split-h>	<split-h>
4020	214	<name2>	<name2>
4020	221	<aphaerese>	<aphaerese>
4020	4018	<>	<aphaerese>
4020	3768	<elision3>	<elision3>
4020	4018	<>	<elision3>
4020	3768	<elision2>	<elision2>
4020	4018	<>	<elision2>
4020	3768	<elision1>	<elision1>
4020	4018	<>	<elision1>
4020	3189	.	υ
4020	3226	H	υ
4020	3189	.	u
4020	3230	H	u
4020	3189	.	κ
4020	3156	H	U
4020	3189	.	α
4020	3216	H	α
4020	3189	.	a
4020	3221	H	a
4020	2987	H	A
4020	3189	.	λ
4020	4021	<K>	<>
4021	3239	.	.
4021	3239	<~>	<~>
4021	3239	<split-s>	<split-s>
4021	3239	<split-h>	<split-h>
4021	3239	<name2>	<name2>
4021	3242	<aphaerese>	<aphaerese>
4021	4022	<>	<aphaerese>
4021	3717	<elision3>	<elision3>
4021	4022	<>	<elision3>
4021	3717	<elision2>	<elision2>
4021	4022	<>	<elision2>
4021	3717	<elision1>	<elision1>
4021	4022	<>	<elision1>
4021	3235	.	υ
4021	3381	H	υ
4021	3235	.	u
4021	3390	H	u
4021	3235	.	κ
4021	3359	H	U
4021	3235	.	α
4021	3393	H	α
4021	3235	.	a
4021	3396	H	a
4021	3330	H	A
4021	3235	.	λ
4022	3237	.	.
4022	3237	<~>	<~>
4022	3237	<split-s>	<split-s>
4022	3237	<split-h>	<split-h>
4022	3237	<name2>	<name2>
4022	3240	<aphaerese>	<aphaerese>
4022	4023	<>	<aphaerese>
4022	3718	<elision3>	<elision3>
4022	4023	<>	<elision3>
4022	3718	<elision2>	<elision2>
4022	4023	<>	<elision2>
4022	3718	<elision1>	<elision1>
4022	4023	<>	<elision1>
4022	3236	.	υ
4022	3379	H	υ
4022	3236	.	u
4022	3388	H	u
4022	3236	.	κ
4022	3357	H	U
4022	3236	.	α
4022	3391	H	α
4022	3236	.	a
4022	3394	H	a
4022	3328	H	A
4022	3236	.	λ
4023	3237	.	.
4023	3237	<~>	<~>
4023	3237	<split-s>	<split-s>
4023	3237	<split-h>	<split-h>
4023	3237	<name2>	<name2>
4023	4021	<>	<name>
4023	3240	<aphaerese>	<aphaerese>
4023	4023	<>	<aphaerese>
4023	3718	<elision3>	<elision3>
4023	4023	<>	<elision3>
4023	3718	<elision2>	<elision2>
4023	4023	<>	<elision2>
4023	3718	<elision1>	<elision1>
4023	4023	<>	<elision1>
4023	3236	.	υ
4023	3379	H	υ
4023	3236	.	u
4023	3388	H	u
4023	3236	.	κ
4023	3357	H	U
4023	3236	.	α
4023	3391	H	α
4023	3236	.	a
4023	3394	H	a
4023	3328	H	A
4023	3236	.	λ
4024	3413	.	.
4024	3413	 	 
4024	3413	<~>	<~>
4024	3413	<split-s>	<split-s>
4024	3413	<split-h>	<split-h>
4024	3413	<name2>	<name2>
4024	4025	<>	<name>
4024	3416	<aphaerese>	<aphaerese>
4024	4024	<>	<aphaerese>
4024	3413	<elision3>	<elision3>
4024	4024	<>	<elision3>
4024	3413	<elision2>	<elision2>
4024	4024	<>	<elision2>
4024	3413	<elision1>	<elision1>
4024	4024	<>	<elision1>
4024	3577	.	υ
4024	3577	.	u
4024	3577	.	κ
4024	3577	.	α
4024	3577	.	a
4024	3577	.	λ
4024	4028	<4s>	<>
4025	3415	.	.
4025	3415	 	 
4025	3415	<~>	<~>
4025	3415	<split-s>	<split-s>
4025	3415	<split-h>	<split-h>
4025	3415	<name2>	<name2>
4025	3418	<aphaerese>	<aphaerese>
4025	4026	<>	<aphaerese>
4025	3415	<elision3>	<elision3>
4025	4026	<>	<elision3>
4025	3415	<elision2>	<elision2>
4025	4026	<>	<elision2>
4025	3415	<elision1>	<elision1>
4025	4026	<>	<elision1>
4025	3579	.	υ
4025	3579	.	u
4025	3579	.	κ
4025	3579	.	α
4025	3579	.	a
4025	3579	.	λ
4025	4029	<4s>	<>
4026	3413	.	.
4026	3413	 	 
4026	3413	<~>	<~>
4026	3413	<split-s>	<split-s>
4026	3413	<split-h>	<split-h>
4026	3413	<name2>	<name2>
4026	3416	<aphaerese>	<aphaerese>
4026	4024	<>	<aphaerese>
4026	3413	<elision3>	<elision3>
4026	4024	<>	<elision3>
4026	3413	<elision2>	<elision2>
4026	4024	<>	<elision2>
4026	3413	<elision1>	<elision1>
4026	4024	<>	<elision1>
4026	3577	.	υ
4026	3577	.	u
4026	3577	.	κ
4026	3577	.	α
4026	3577	.	a
4026	3577	.	λ
4026	4027	<4s>	<>
4027	215	.	.
4027	216	 	 
4027	215	<~>	<~>
4027	215	<split-s>	<split-s>
4027	215	<split-h>	<split-h>
4027	215	<name2>	<name2>
4027	219	<aphaerese>	<aphaerese>
4027	4028	<>	<aphaerese>
4027	215	<elision3>	<elision3>
4027	4028	<>	<elision3>
4027	215	<elision2>	<elision2>
4027	4028	<>	<elision2>
4027	215	<elision1>	<elision1>
4027	4028	<>	<elision1>
4027	3187	.	υ
4027	3231	H	υ
4027	3187	.	u
4027	3233	H	u
4027	3187	.	κ
4027	3154	H	U
4027	3187	.	α
4027	3217	H	α
4027	3187	.	a
4027	3222	H	a
4027	2984	H	A
4027	3187	.	λ
4027	4031	<K>	<>
4028	215	.	.
4028	216	 	 
4028	215	<~>	<~>
4028	215	<split-s>	<split-s>
4028	215	<split-h>	<split-h>
4028	215	<name2>	<name2>
4028	4029	<>	<name>
4028	219	<aphaerese>	<aphaerese>
4028	4028	<>	<aphaerese>
4028	215	<elision3>	<elision3>
4028	4028	<>	<elision3>
4028	215	<elision2>	<elision2>
4028	4028	<>	<elision2>
4028	215	<elision1>	<elision1>
4028	4028	<>	<elision1>
4028	3187	.	υ
4028	3231	H	υ
4028	3187	.	u
4028	3233	H	u
4028	3187	.	κ
4028	3154	H	U
4028	3187	.	α
4028	3217	H	α
4028	3187	.	a
4028	3222	H	a
4028	2984	H	A
4028	3187	.	λ
4028	4032	<K>	<>
4029	214	.	.
4029	218	 	 
4029	214	<~>	<~>
4029	214	<split-s>	<split-s>
4029	214	<split-h>	<split-h>
4029	214	<name2>	<name2>
4029	221	<aphaerese>	<aphaerese>
4029	4027	<>	<aphaerese>
4029	214	<elision3>	<elision3>
4029	4027	<>	<elision3>
4029	214	<elision2>	<elision2>
4029	4027	<>	<elision2>
4029	214	<elision1>	<elision1>
4029	4027	<>	<elision1>
4029	3189	.	υ
4029	3226	H	υ
4029	3189	.	u
4029	3230	H	u
4029	3189	.	κ
4029	3156	H	U
4029	3189	.	α
4029	3216	H	α
4029	3189	.	a
4029	3221	H	a
4029	2987	H	A
4029	3189	.	λ
4029	4030	<K>	<>
4030	3239	.	.
4030	3239	<~>	<~>
4030	3239	<split-s>	<split-s>
4030	3239	<split-h>	<split-h>
4030	3239	<name2>	<name2>
4030	3242	<aphaerese>	<aphaerese>
4030	4031	<>	<aphaerese>
4030	3239	<elision3>	<elision3>
4030	4031	<>	<elision3>
4030	3239	<elision2>	<elision2>
4030	4031	<>	<elision2>
4030	3239	<elision1>	<elision1>
4030	4031	<>	<elision1>
4030	3235	.	υ
4030	3381	H	υ
4030	3235	.	u
4030	3390	H	u
4030	3235	.	κ
4030	3359	H	U
4030	3235	.	α
4030	3393	H	α
4030	3235	.	a
4030	3396	H	a
4030	3330	H	A
4030	3235	.	λ
4031	3237	.	.
4031	3237	<~>	<~>
4031	3237	<split-s>	<split-s>
4031	3237	<split-h>	<split-h>
4031	3237	<name2>	<name2>
4031	3240	<aphaerese>	<aphaerese>
4031	4032	<>	<aphaerese>
4031	3237	<elision3>	<elision3>
4031	4032	<>	<elision3>
4031	3237	<elision2>	<elision2>
4031	4032	<>	<elision2>
4031	3237	<elision1>	<elision1>
4031	4032	<>	<elision1>
4031	3236	.	υ
4031	3379	H	υ
4031	3236	.	u
4031	3388	H	u
4031	3236	.	κ
4031	3357	H	U
4031	3236	.	α
4031	3391	H	α
4031	3236	.	a
4031	3394	H	a
4031	3328	H	A
4031	3236	.	λ
4032	3237	.	.
4032	3237	<~>	<~>
4032	3237	<split-s>	<split-s>
4032	3237	<split-h>	<split-h>
4032	3237	<name2>	<name2>
4032	4030	<>	<name>
4032	3240	<aphaerese>	<aphaerese>
4032	4032	<>	<aphaerese>
4032	3237	<elision3>	<elision3>
4032	4032	<>	<elision3>
4032	3237	<elision2>	<elision2>
4032	4032	<>	<elision2>
4032	3237	<elision1>	<elision1>
4032	4032	<>	<elision1>
4032	3236	.	υ
4032	3379	H	υ
4032	3236	.	u
4032	3388	H	u
4032	3236	.	κ
4032	3357	H	U
4032	3236	.	α
4032	3391	H	α
4032	3236	.	a
4032	3394	H	a
4032	3328	H	A
4032	3236	.	λ
4033	3787	<name>	<name>
4033	4034	<>	<name>
4033	4036	<>	<aphaerese>
4033	4036	<>	<elision3>
4033	4036	<>	<elision2>
4033	4036	<>	<elision1>
4033	3898	<4s>	<>
4033	3953	<L2kl>	<>
4033	4046	<K2kl>	<>
4034	4035	<>	<aphaerese>
4034	4035	<>	<elision3>
4034	4035	<>	<elision2>
4034	4035	<>	<elision1>
4034	3954	<L2kl>	<>
4034	4038	<K2kl>	<>
4035	4036	<>	<aphaerese>
4035	4036	<>	<elision3>
4035	4036	<>	<elision2>
4035	4036	<>	<elision1>
4035	3955	<L2kl>	<>
4035	4039	<K2kl>	<>
4036	4034	<>	<name>
4036	4036	<>	<aphaerese>
4036	4036	<>	<elision3>
4036	4036	<>	<elision2>
4036	4036	<>	<elision1>
4036	3953	<L2kl>	<>
4036	4037	<K2kl>	<>
4037	3413	.	.
4037	3413	 	 
4037	3413	<~>	<~>
4037	3413	<split-s>	<split-s>
4037	3413	<split-h>	<split-h>
4037	3413	<name2>	<name2>
4037	4038	<>	<name>
4037	3416	<aphaerese>	<aphaerese>
4037	4037	<>	<aphaerese>
4037	3413	<elision3>	<elision3>
4037	4037	<>	<elision3>
4037	3413	<elision2>	<elision2>
4037	4037	<>	<elision2>
4037	3413	<elision1>	<elision1>
4037	4037	<>	<elision1>
4037	3577	.	υ
4037	3577	.	u
4037	3577	.	α
4037	3577	.	a
4037	4041	<4s>	<>
4038	3415	.	.
4038	3415	 	 
4038	3415	<~>	<~>
4038	3415	<split-s>	<split-s>
4038	3415	<split-h>	<split-h>
4038	3415	<name2>	<name2>
4038	3418	<aphaerese>	<aphaerese>
4038	4039	<>	<aphaerese>
4038	3415	<elision3>	<elision3>
4038	4039	<>	<elision3>
4038	3415	<elision2>	<elision2>
4038	4039	<>	<elision2>
4038	3415	<elision1>	<elision1>
4038	4039	<>	<elision1>
4038	3579	.	υ
4038	3579	.	u
4038	3579	.	α
4038	3579	.	a
4038	4042	<4s>	<>
4039	3413	.	.
4039	3413	 	 
4039	3413	<~>	<~>
4039	3413	<split-s>	<split-s>
4039	3413	<split-h>	<split-h>
4039	3413	<name2>	<name2>
4039	3416	<aphaerese>	<aphaerese>
4039	4037	<>	<aphaerese>
4039	3413	<elision3>	<elision3>
4039	4037	<>	<elision3>
4039	3413	<elision2>	<elision2>
4039	4037	<>	<elision2>
4039	3413	<elision1>	<elision1>
4039	4037	<>	<elision1>
4039	3577	.	υ
4039	3577	.	u
4039	3577	.	α
4039	3577	.	a
4039	4040	<4s>	<>
4040	215	.	.
4040	216	 	 
4040	215	<~>	<~>
4040	215	<split-s>	<split-s>
4040	215	<split-h>	<split-h>
4040	215	<name2>	<name2>
4040	219	<aphaerese>	<aphaerese>
4040	4041	<>	<aphaerese>
4040	215	<elision3>	<elision3>
4040	4041	<>	<elision3>
4040	215	<elision2>	<elision2>
4040	4041	<>	<elision2>
4040	215	<elision1>	<elision1>
4040	4041	<>	<elision1>
4040	3187	.	υ
4040	3231	H	υ
4040	3187	.	u
4040	3233	H	u
4040	3154	H	U
4040	3187	.	α
4040	3217	H	α
4040	3187	.	a
4040	3222	H	a
4040	2984	H	A
4040	4044	<K>	<>
4041	215	.	.
4041	216	 	 
4041	215	<~>	<~>
4041	215	<split-s>	<split-s>
4041	215	<split-h>	<split-h>
4041	215	<name2>	<name2>
4041	4042	<>	<name>
4041	219	<aphaerese>	<aphaerese>
4041	4041	<>	<aphaerese>
4041	215	<elision3>	<elision3>
4041	4041	<>	<elision3>
4041	215	<elision2>	<elision2>
4041	4041	<>	<elision2>
4041	215	<elision1>	<elision1>
4041	4041	<>	<elision1>
4041	3187	.	υ
4041	3231	H	υ
4041	3187	.	u
4041	3233	H	u
4041	3154	H	U
4041	3187	.	α
4041	3217	H	α
4041	3187	.	a
4041	3222	H	a
4041	2984	H	A
4041	4045	<K>	<>
4042	214	.	.
4042	218	 	 
4042	214	<~>	<~>
4042	214	<split-s>	<split-s>
4042	214	<split-h>	<split-h>
4042	214	<name2>	<name2>
4042	221	<aphaerese>	<aphaerese>
4042	4040	<>	<aphaerese>
4042	214	<elision3>	<elision3>
4042	4040	<>	<elision3>
4042	214	<elision2>	<elision2>
4042	4040	<>	<elision2>
4042	214	<elision1>	<elision1>
4042	4040	<>	<elision1>
4042	3189	.	υ
4042	3226	H	υ
4042	3189	.	u
4042	3230	H	u
4042	3156	H	U
4042	3189	.	α
4042	3216	H	α
4042	3189	.	a
4042	3221	H	a
4042	2987	H	A
4042	4043	<K>	<>
4043	3239	.	.
4043	3239	<~>	<~>
4043	3239	<split-s>	<split-s>
4043	3239	<split-h>	<split-h>
4043	3239	<name2>	<name2>
4043	3242	<aphaerese>	<aphaerese>
4043	4044	<>	<aphaerese>
4043	3239	<elision3>	<elision3>
4043	4044	<>	<elision3>
4043	3239	<elision2>	<elision2>
4043	4044	<>	<elision2>
4043	3239	<elision1>	<elision1>
4043	4044	<>	<elision1>
4043	3235	.	υ
4043	3381	H	υ
4043	3235	.	u
4043	3390	H	u
4043	3359	H	U
4043	3235	.	α
4043	3393	H	α
4043	3235	.	a
4043	3396	H	a
4043	3330	H	A
4044	3237	.	.
4044	3237	<~>	<~>
4044	3237	<split-s>	<split-s>
4044	3237	<split-h>	<split-h>
4044	3237	<name2>	<name2>
4044	3240	<aphaerese>	<aphaerese>
4044	4045	<>	<aphaerese>
4044	3237	<elision3>	<elision3>
4044	4045	<>	<elision3>
4044	3237	<elision2>	<elision2>
4044	4045	<>	<elision2>
4044	3237	<elision1>	<elision1>
4044	4045	<>	<elision1>
4044	3236	.	υ
4044	3379	H	υ
4044	3236	.	u
4044	3388	H	u
4044	3357	H	U
4044	3236	.	α
4044	3391	H	α
4044	3236	.	a
4044	3394	H	a
4044	3328	H	A
4045	3237	.	.
4045	3237	<~>	<~>
4045	3237	<split-s>	<split-s>
4045	3237	<split-h>	<split-h>
4045	3237	<name2>	<name2>
4045	4043	<>	<name>
4045	3240	<aphaerese>	<aphaerese>
4045	4045	<>	<aphaerese>
4045	3237	<elision3>	<elision3>
4045	4045	<>	<elision3>
4045	3237	<elision2>	<elision2>
4045	4045	<>	<elision2>
4045	3237	<elision1>	<elision1>
4045	4045	<>	<elision1>
4045	3236	.	υ
4045	3379	H	υ
4045	3236	.	u
4045	3388	H	u
4045	3357	H	U
4045	3236	.	α
4045	3391	H	α
4045	3236	.	a
4045	3394	H	a
4045	3328	H	A
4046	3413	.	.
4046	3413	 	 
4046	3413	<~>	<~>
4046	3413	<split-s>	<split-s>
4046	3413	<split-h>	<split-h>
4046	3413	<name2>	<name2>
4046	3787	<name2>	<name>
4046	4038	<>	<name>
4046	3416	<aphaerese>	<aphaerese>
4046	4037	<>	<aphaerese>
4046	3413	<elision3>	<elision3>
4046	4037	<>	<elision3>
4046	3413	<elision2>	<elision2>
4046	4037	<>	<elision2>
4046	3413	<elision1>	<elision1>
4046	4037	<>	<elision1>
4046	3577	.	υ
4046	3577	.	u
4046	3577	.	α
4046	3577	.	a
4046	4047	<4s>	<>
4047	215	.	.
4047	216	 	 
4047	215	<~>	<~>
4047	215	<split-s>	<split-s>
4047	215	<split-h>	<split-h>
4047	215	<name2>	<name2>
4047	3899	<name2>	<name>
4047	4042	<>	<name>
4047	219	<aphaerese>	<aphaerese>
4047	4041	<>	<aphaerese>
4047	215	<elision3>	<elision3>
4047	4041	<>	<elision3>
4047	215	<elision2>	<elision2>
4047	4041	<>	<elision2>
4047	215	<elision1>	<elision1>
4047	4041	<>	<elision1>
4047	3187	.	υ
4047	3231	H	υ
4047	3187	.	u
4047	3233	H	u
4047	3154	H	U
4047	3187	.	α
4047	3217	H	α
4047	3187	.	a
4047	3222	H	a
4047	2984	H	A
4047	4048	<K>	<>
4048	3237	.	.
4048	3237	<~>	<~>
4048	3237	<split-s>	<split-s>
4048	3237	<split-h>	<split-h>
4048	3237	<name2>	<name2>
4048	3789	<name2>	<name>
4048	4043	<>	<name>
4048	3240	<aphaerese>	<aphaerese>
4048	4045	<>	<aphaerese>
4048	3237	<elision3>	<elision3>
4048	4045	<>	<elision3>
4048	3237	<elision2>	<elision2>
4048	4045	<>	<elision2>
4048	3237	<elision1>	<elision1>
4048	4045	<>	<elision1>
4048	3236	.	υ
4048	3379	H	υ
4048	3236	.	u
4048	3388	H	u
4048	3357	H	U
4048	3236	.	α
4048	3391	H	α
4048	3236	.	a
4048	3394	H	a
4048	3328	H	A
4049	3787	<name>	<name>
4049	4050	<>	<name>
4049	4052	<>	<aphaerese>
4049	4052	<>	<elision3>
4049	4052	<>	<elision2>
4049	4052	<>	<elision1>
4049	3898	<4s>	<>
4049	4053	<L2kl>	<>
4050	4051	<>	<aphaerese>
4050	4051	<>	<elision3>
4050	4051	<>	<elision2>
4050	4051	<>	<elision1>
4050	4025	<L2kl>	<>
4051	4052	<>	<aphaerese>
4051	4052	<>	<elision3>
4051	4052	<>	<elision2>
4051	4052	<>	<elision1>
4051	4026	<L2kl>	<>
4052	4050	<>	<name>
4052	4052	<>	<aphaerese>
4052	4052	<>	<elision3>
4052	4052	<>	<elision2>
4052	4052	<>	<elision1>
4052	4024	<L2kl>	<>
4053	3413	.	.
4053	3413	 	 
4053	3413	<~>	<~>
4053	3413	<split-s>	<split-s>
4053	3413	<split-h>	<split-h>
4053	3413	<name2>	<name2>
4053	3787	<name2>	<name>
4053	4025	<>	<name>
4053	3416	<aphaerese>	<aphaerese>
4053	4024	<>	<aphaerese>
4053	3413	<elision3>	<elision3>
4053	4024	<>	<elision3>
4053	3413	<elision2>	<elision2>
4053	4024	<>	<elision2>
4053	3413	<elision1>	<elision1>
4053	4024	<>	<elision1>
4053	3577	.	υ
4053	3577	.	u
4053	3577	.	κ
4053	3577	.	α
4053	3577	.	a
4053	3577	.	λ
4053	4054	<4s>	<>
4054	215	.	.
4054	216	 	 
4054	215	<~>	<~>
4054	215	<split-s>	<split-s>
4054	215	<split-h>	<split-h>
4054	215	<name2>	<name2>
4054	3899	<name2>	<name>
4054	4029	<>	<name>
4054	219	<aphaerese>	<aphaerese>
4054	4028	<>	<aphaerese>
4054	215	<elision3>	<elision3>
4054	4028	<>	<elision3>
4054	215	<elision2>	<elision2>
4054	4028	<>	<elision2>
4054	215	<elision1>	<elision1>
4054	4028	<>	<elision1>
4054	3187	.	υ
4054	3231	H	υ
4054	3187	.	u
4054	3233	H	u
4054	3187	.	κ
4054	3154	H	U
4054	3187	.	α
4054	3217	H	α
4054	3187	.	a
4054	3222	H	a
4054	2984	H	A
4054	3187	.	λ
4054	4055	<K>	<>
4055	3237	.	.
4055	3237	<~>	<~>
4055	3237	<split-s>	<split-s>
4055	3237	<split-h>	<split-h>
4055	3237	<name2>	<name2>
4055	3789	<name2>	<name>
4055	4030	<>	<name>
4055	3240	<aphaerese>	<aphaerese>
4055	4032	<>	<aphaerese>
4055	3237	<elision3>	<elision3>
4055	4032	<>	<elision3>
4055	3237	<elision2>	<elision2>
4055	4032	<>	<elision2>
4055	3237	<elision1>	<elision1>
4055	4032	<>	<elision1>
4055	3236	.	υ
4055	3379	H	υ
4055	3236	.	u
4055	3388	H	u
4055	3236	.	κ
4055	3357	H	U
4055	3236	.	α
4055	3391	H	α
4055	3236	.	a
4055	3394	H	a
4055	3328	H	A
4055	3236	.	λ
4056	4057	<>	<aphaerese>
4056	4057	<>	<elision3>
4056	4057	<>	<elision2>
4056	4057	<>	<elision1>
4056	3668	<3s>	<>
4057	4058	<>	<name>
4057	4057	<>	<aphaerese>
4057	4057	<>	<elision3>
4057	4057	<>	<elision2>
4057	4057	<>	<elision1>
4057	3669	<3s>	<>
4058	4056	<>	<aphaerese>
4058	4056	<>	<elision3>
4058	4056	<>	<elision2>
4058	4056	<>	<elision1>
4058	3670	<3s>	<>
4059	4060	<>	<aphaerese>
4059	4060	<>	<elision3>
4059	4060	<>	<elision2>
4059	4060	<>	<elision1>
4059	3765	<3s>	<>
4060	4061	<>	<name>
4060	4060	<>	<aphaerese>
4060	4060	<>	<elision3>
4060	4060	<>	<elision2>
4060	4060	<>	<elision1>
4060	3766	<3s>	<>
4061	4059	<>	<aphaerese>
4061	4059	<>	<elision3>
4061	4059	<>	<elision2>
4061	4059	<>	<elision1>
4061	3767	<3s>	<>
4062	3398	.	.
4062	3399	 	 
4062	3398	<~>	<~>
4062	3398	<split-s>	<split-s>
4062	3398	<split-h>	<split-h>
4062	3398	<name2>	<name2>
4062	4063	<>	<name>
4062	3402	<aphaerese>	<aphaerese>
4062	4062	<>	<aphaerese>
4062	3398	<elision3>	<elision3>
4062	4062	<>	<elision3>
4062	3398	<elision2>	<elision2>
4062	4062	<>	<elision2>
4062	3398	<elision1>	<elision1>
4062	4062	<>	<elision1>
4062	3406	.	υ
4062	3412	s	υ
4062	3406	.	u
4062	3412	s	u
4062	4065	.	κ
4062	3988	s	κ
4062	3774	s	k
4062	3783	s	U
4062	3949	s	K
4062	3406	.	α
4062	3412	s	α
4062	3406	.	a
4062	3412	s	a
4062	3904	s	A
4062	4065	.	λ
4062	3988	s	λ
4062	3774	s	l
4062	3962	s	L
4062	4081	<split-h>	<>
4063	3401	.	.
4063	3404	 	 
4063	3401	<~>	<~>
4063	3401	<split-s>	<split-s>
4063	3401	<split-h>	<split-h>
4063	3401	<name2>	<name2>
4063	3948	<aphaerese>	<aphaerese>
4063	4064	<>	<aphaerese>
4063	3401	<elision3>	<elision3>
4063	4064	<>	<elision3>
4063	3401	<elision2>	<elision2>
4063	4064	<>	<elision2>
4063	3401	<elision1>	<elision1>
4063	4064	<>	<elision1>
4063	3408	.	υ
4063	3584	s	υ
4063	3408	.	u
4063	3584	s	u
4063	4067	.	κ
4063	3990	s	κ
4063	3776	s	k
4063	3785	s	U
4063	3951	s	K
4063	3408	.	α
4063	3584	s	α
4063	3408	.	a
4063	3584	s	a
4063	3906	s	A
4063	4067	.	λ
4063	3990	s	λ
4063	3776	s	l
4063	3964	s	L
4063	4082	<split-h>	<>
4064	3398	.	.
4064	3399	 	 
4064	3398	<~>	<~>
4064	3398	<split-s>	<split-s>
4064	3398	<split-h>	<split-h>
4064	3398	<name2>	<name2>
4064	3402	<aphaerese>	<aphaerese>
4064	4062	<>	<aphaerese>
4064	3398	<elision3>	<elision3>
4064	4062	<>	<elision3>
4064	3398	<elision2>	<elision2>
4064	4062	<>	<elision2>
4064	3398	<elision1>	<elision1>
4064	4062	<>	<elision1>
4064	3406	.	υ
4064	3412	s	υ
4064	3406	.	u
4064	3412	s	u
4064	4065	.	κ
4064	3988	s	κ
4064	3774	s	k
4064	3783	s	U
4064	3949	s	K
4064	3406	.	α
4064	3412	s	α
4064	3406	.	a
4064	3412	s	a
4064	3904	s	A
4064	4065	.	λ
4064	3988	s	λ
4064	3774	s	l
4064	3962	s	L
4064	4080	<split-h>	<>
4065	4066	<>	<name>
4065	4065	<>	<aphaerese>
4065	4068	<elision3>	<elision3>
4065	4065	<>	<elision3>
4065	4068	<elision2>	<elision2>
4065	4065	<>	<elision2>
4065	4068	<elision1>	<elision1>
4065	4065	<>	<elision1>
4065	3410	<split-h>	<>
4066	4067	<>	<aphaerese>
4066	4070	<elision3>	<elision3>
4066	4067	<>	<elision3>
4066	4070	<elision2>	<elision2>
4066	4067	<>	<elision2>
4066	4070	<elision1>	<elision1>
4066	4067	<>	<elision1>
4066	3411	<split-h>	<>
4067	4065	<>	<aphaerese>
4067	4068	<elision3>	<elision3>
4067	4065	<>	<elision3>
4067	4068	<elision2>	<elision2>
4067	4065	<>	<elision2>
4067	4068	<elision1>	<elision1>
4067	4065	<>	<elision1>
4067	3409	<split-h>	<>
4068	4068	.	.
4068	4068	 	 
4068	4068	<~>	<~>
4068	4068	<split-s>	<split-s>
4068	4068	<split-h>	<split-h>
4068	4068	<name2>	<name2>
4068	4069	<>	<name>
4068	4071	<aphaerese>	<aphaerese>
4068	4068	<>	<aphaerese>
4068	4068	<elision3>	<elision3>
4068	4068	<>	<elision3>
4068	4068	<elision2>	<elision2>
4068	4068	<>	<elision2>
4068	4068	<elision1>	<elision1>
4068	4068	<>	<elision1>
4068	4065	.	υ
4068	4065	.	u
4068	4074	.	κ
4068	4065	.	α
4068	4065	.	a
4068	3923	<split-h>	<>
4069	4070	.	.
4069	4070	 	 
4069	4070	<~>	<~>
4069	4070	<split-s>	<split-s>
4069	4070	<split-h>	<split-h>
4069	4070	<name2>	<name2>
4069	4073	<aphaerese>	<aphaerese>
4069	4070	<>	<aphaerese>
4069	4070	<elision3>	<elision3>
4069	4070	<>	<elision3>
4069	4070	<elision2>	<elision2>
4069	4070	<>	<elision2>
4069	4070	<elision1>	<elision1>
4069	4070	<>	<elision1>
4069	4067	.	υ
4069	4067	.	u
4069	4076	.	κ
4069	4067	.	α
4069	4067	.	a
4069	3924	<split-h>	<>
4070	4068	.	.
4070	4068	 	 
4070	4068	<~>	<~>
4070	4068	<split-s>	<split-s>
4070	4068	<split-h>	<split-h>
4070	4068	<name2>	<name2>
4070	4071	<aphaerese>	<aphaerese>
4070	4068	<>	<aphaerese>
4070	4068	<elision3>	<elision3>
4070	4068	<>	<elision3>
4070	4068	<elision2>	<elision2>
4070	4068	<>	<elision2>
4070	4068	<elision1>	<elision1>
4070	4068	<>	<elision1>
4070	4065	.	υ
4070	4065	.	u
4070	4074	.	κ
4070	4065	.	α
4070	4065	.	a
4070	3925	<split-h>	<>
4071	4068	.	.
4071	4068	 	 
4071	4068	<~>	<~>
4071	4068	<split-s>	<split-s>
4071	4068	<split-h>	<split-h>
4071	4068	<name2>	<name2>
4071	4072	<>	<name>
4071	4071	<aphaerese>	<aphaerese>
4071	4071	<>	<aphaerese>
4071	4068	<elision3>	<elision3>
4071	4071	<>	<elision3>
4071	4068	<elision2>	<elision2>
4071	4071	<>	<elision2>
4071	4068	<elision1>	<elision1>
4071	4071	<>	<elision1>
4071	4068	.	υ
4071	4068	.	u
4071	4074	.	κ
4071	4068	.	α
4071	4068	.	a
4071	3970	<split-h>	<>
4072	4070	.	.
4072	4070	 	 
4072	4070	<~>	<~>
4072	4070	<split-s>	<split-s>
4072	4070	<split-h>	<split-h>
4072	4070	<name2>	<name2>
4072	4073	<aphaerese>	<aphaerese>
4072	4073	<>	<aphaerese>
4072	4070	<elision3>	<elision3>
4072	4073	<>	<elision3>
4072	4070	<elision2>	<elision2>
4072	4073	<>	<elision2>
4072	4070	<elision1>	<elision1>
4072	4073	<>	<elision1>
4072	4070	.	υ
4072	4070	.	u
4072	4076	.	κ
4072	4070	.	α
4072	4070	.	a
4072	3971	<split-h>	<>
4073	4068	.	.
4073	4068	 	 
4073	4068	<~>	<~>
4073	4068	<split-s>	<split-s>
4073	4068	<split-h>	<split-h>
4073	4068	<name2>	<name2>
4073	4071	<aphaerese>	<aphaerese>
4073	4071	<>	<aphaerese>
4073	4068	<elision3>	<elision3>
4073	4071	<>	<elision3>
4073	4068	<elision2>	<elision2>
4073	4071	<>	<elision2>
4073	4068	<elision1>	<elision1>
4073	4071	<>	<elision1>
4073	4068	.	υ
4073	4068	.	u
4073	4074	.	κ
4073	4068	.	α
4073	4068	.	a
4073	3969	<split-h>	<>
4074	4075	<>	<name>
4074	4074	<>	<aphaerese>
4074	4077	<elision3>	<elision3>
4074	4074	<>	<elision3>
4074	4077	<elision2>	<elision2>
4074	4074	<>	<elision2>
4074	4077	<elision1>	<elision1>
4074	4074	<>	<elision1>
4074	3660	<split-h>	<>
4075	4076	<>	<aphaerese>
4075	4079	<elision3>	<elision3>
4075	4076	<>	<elision3>
4075	4079	<elision2>	<elision2>
4075	4076	<>	<elision2>
4075	4079	<elision1>	<elision1>
4075	4076	<>	<elision1>
4075	3661	<split-h>	<>
4076	4074	<>	<aphaerese>
4076	4077	<elision3>	<elision3>
4076	4074	<>	<elision3>
4076	4077	<elision2>	<elision2>
4076	4074	<>	<elision2>
4076	4077	<elision1>	<elision1>
4076	4074	<>	<elision1>
4076	3659	<split-h>	<>
4077	4078	<>	<name>
4077	4077	<>	<aphaerese>
4077	4077	<>	<elision3>
4077	4077	<>	<elision2>
4077	4077	<>	<elision1>
4077	3657	<split-h>	<>
4078	4079	<>	<aphaerese>
4078	4079	<>	<elision3>
4078	4079	<>	<elision2>
4078	4079	<>	<elision1>
4078	3658	<split-h>	<>
4079	4077	<>	<aphaerese>
4079	4077	<>	<elision3>
4079	4077	<>	<elision2>
4079	4077	<>	<elision1>
4079	3656	<split-h>	<>
4080	4081	<>	<aphaerese>
4080	4081	<>	<elision3>
4080	4081	<>	<elision2>
4080	4081	<>	<elision1>
4080	3777	<3s>	<>
4081	4082	<>	<name>
4081	4081	<>	<aphaerese>
4081	4081	<>	<elision3>
4081	4081	<>	<elision2>
4081	4081	<>	<elision1>
4081	3778	<3s>	<>
4082	4080	<>	<aphaerese>
4082	4080	<>	<elision3>
4082	4080	<>	<elision2>
4082	4080	<>	<elision1>
4082	3779	<3s>	<>
4083	4084	<>	<name>
4083	4083	<>	<aphaerese>
4083	4083	<>	<elision3>
4083	4083	<>	<elision2>
4083	4083	<>	<elision1>
4083	4068	<U2kl>	<>
4084	4085	<>	<aphaerese>
4084	4085	<>	<elision3>
4084	4085	<>	<elision2>
4084	4085	<>	<elision1>
4084	4069	<U2kl>	<>
4085	4083	<>	<aphaerese>
4085	4083	<>	<elision3>
4085	4083	<>	<elision2>
4085	4083	<>	<elision1>
4085	4070	<U2kl>	<>
4086	4087	<name>	<name>
4086	4089	<>	<name>
4086	4091	<>	<aphaerese>
4086	4091	<>	<elision3>
4086	4091	<>	<elision2>
4086	4091	<>	<elision1>
4086	4134	<split-h>	<>
4086	4092	<A2kl>	<>
4086	4110	<L2kl>	<>
4086	4135	<K2kl>	<>
4087	3951	s	k
4087	3964	s	l
4087	4088	<split-h>	<>
4088	3788	<3s>	<>
4089	4090	<>	<aphaerese>
4089	4090	<>	<elision3>
4089	4090	<>	<elision2>
4089	4090	<>	<elision1>
4089	4093	<A2kl>	<>
4089	4111	<L2kl>	<>
4089	4129	<K2kl>	<>
4090	4091	<>	<aphaerese>
4090	4091	<>	<elision3>
4090	4091	<>	<elision2>
4090	4091	<>	<elision1>
4090	4094	<A2kl>	<>
4090	4112	<L2kl>	<>
4090	4130	<K2kl>	<>
4091	4089	<>	<name>
4091	4091	<>	<aphaerese>
4091	4091	<>	<elision3>
4091	4091	<>	<elision2>
4091	4091	<>	<elision1>
4091	4092	<A2kl>	<>
4091	4110	<L2kl>	<>
4091	4128	<K2kl>	<>
4092	4093	<>	<name>
4092	4092	<>	<aphaerese>
4092	4092	<>	<elision3>
4092	4092	<>	<elision2>
4092	4092	<>	<elision1>
4092	4095	.	κ
4092	4095	.	λ
4092	4108	<split-h>	<>
4093	4094	<>	<aphaerese>
4093	4094	<>	<elision3>
4093	4094	<>	<elision2>
4093	4094	<>	<elision1>
4093	4097	.	κ
4093	4097	.	λ
4093	4109	<split-h>	<>
4094	4092	<>	<aphaerese>
4094	4092	<>	<elision3>
4094	4092	<>	<elision2>
4094	4092	<>	<elision1>
4094	4095	.	κ
4094	4095	.	λ
4094	4107	<split-h>	<>
4095	4096	<>	<name>
4095	4095	<>	<aphaerese>
4095	4098	<elision3>	<elision3>
4095	4095	<>	<elision3>
4095	4098	<elision2>	<elision2>
4095	4095	<>	<elision2>
4095	4098	<elision1>	<elision1>
4095	4095	<>	<elision1>
4095	4105	<split-h>	<>
4096	4097	<>	<aphaerese>
4096	4100	<elision3>	<elision3>
4096	4097	<>	<elision3>
4096	4100	<elision2>	<elision2>
4096	4097	<>	<elision2>
4096	4100	<elision1>	<elision1>
4096	4097	<>	<elision1>
4096	4106	<split-h>	<>
4097	4095	<>	<aphaerese>
4097	4098	<elision3>	<elision3>
4097	4095	<>	<elision3>
4097	4098	<elision2>	<elision2>
4097	4095	<>	<elision2>
4097	4098	<elision1>	<elision1>
4097	4095	<>	<elision1>
4097	4104	<split-h>	<>
4098	4068	.	.
4098	4068	 	 
4098	4068	<~>	<~>
4098	4068	<split-s>	<split-s>
4098	4068	<split-h>	<split-h>
4098	4068	<name2>	<name2>
4098	4099	<>	<name>
4098	4071	<aphaerese>	<aphaerese>
4098	4098	<>	<aphaerese>
4098	4068	<elision3>	<elision3>
4098	4098	<>	<elision3>
4098	4068	<elision2>	<elision2>
4098	4098	<>	<elision2>
4098	4068	<elision1>	<elision1>
4098	4098	<>	<elision1>
4098	4065	.	υ
4098	4065	.	u
4098	4065	.	α
4098	4065	.	a
4098	4102	<split-h>	<>
4099	4070	.	.
4099	4070	 	 
4099	4070	<~>	<~>
4099	4070	<split-s>	<split-s>
4099	4070	<split-h>	<split-h>
4099	4070	<name2>	<name2>
4099	4073	<aphaerese>	<aphaerese>
4099	4100	<>	<aphaerese>
4099	4070	<elision3>	<elision3>
4099	4100	<>	<elision3>
4099	4070	<elision2>	<elision2>
4099	4100	<>	<elision2>
4099	4070	<elision1>	<elision1>
4099	4100	<>	<elision1>
4099	4067	.	υ
4099	4067	.	u
4099	4067	.	α
4099	4067	.	a
4099	4103	<split-h>	<>
4100	4068	.	.
4100	4068	 	 
4100	4068	<~>	<~>
4100	4068	<split-s>	<split-s>
4100	4068	<split-h>	<split-h>
4100	4068	<name2>	<name2>
4100	4071	<aphaerese>	<aphaerese>
4100	4098	<>	<aphaerese>
4100	4068	<elision3>	<elision3>
4100	4098	<>	<elision3>
4100	4068	<elision2>	<elision2>
4100	4098	<>	<elision2>
4100	4068	<elision1>	<elision1>
4100	4098	<>	<elision1>
4100	4065	.	υ
4100	4065	.	u
4100	4065	.	α
4100	4065	.	a
4100	4101	<split-h>	<>
4101	4102	<>	<aphaerese>
4101	4102	<>	<elision3>
4101	4102	<>	<elision2>
4101	4102	<>	<elision1>
4101	3802	<3s>	<>
4102	4103	<>	<name>
4102	4102	<>	<aphaerese>
4102	4102	<>	<elision3>
4102	4102	<>	<elision2>
4102	4102	<>	<elision1>
4102	3803	<3s>	<>
4103	4101	<>	<aphaerese>
4103	4101	<>	<elision3>
4103	4101	<>	<elision2>
4103	4101	<>	<elision1>
4103	3804	<3s>	<>
4104	4105	<>	<aphaerese>
4104	4105	<>	<elision3>
4104	4105	<>	<elision2>
4104	4105	<>	<elision1>
4104	3838	<3s>	<>
4105	4106	<>	<name>
4105	4105	<>	<aphaerese>
4105	4105	<>	<elision3>
4105	4105	<>	<elision2>
4105	4105	<>	<elision1>
4105	3839	<3s>	<>
4106	4104	<>	<aphaerese>
4106	4104	<>	<elision3>
4106	4104	<>	<elision2>
4106	4104	<>	<elision1>
4106	3840	<3s>	<>
4107	4108	<>	<aphaerese>
4107	4108	<>	<elision3>
4107	4108	<>	<elision2>
4107	4108	<>	<elision1>
4107	3847	<3s>	<>
4108	4109	<>	<name>
4108	4108	<>	<aphaerese>
4108	4108	<>	<elision3>
4108	4108	<>	<elision2>
4108	4108	<>	<elision1>
4108	3848	<3s>	<>
4109	4107	<>	<aphaerese>
4109	4107	<>	<elision3>
4109	4107	<>	<elision2>
4109	4107	<>	<elision1>
4109	3849	<3s>	<>
4110	4111	<>	<name>
4110	4110	<>	<aphaerese>
4110	4110	<>	<elision3>
4110	4110	<>	<elision2>
4110	4110	<>	<elision1>
4110	4113	.	κ
4110	4113	.	λ
4110	4126	<split-h>	<>
4111	4112	<>	<aphaerese>
4111	4112	<>	<elision3>
4111	4112	<>	<elision2>
4111	4112	<>	<elision1>
4111	4115	.	κ
4111	4115	.	λ
4111	4127	<split-h>	<>
4112	4110	<>	<aphaerese>
4112	4110	<>	<elision3>
4112	4110	<>	<elision2>
4112	4110	<>	<elision1>
4112	4113	.	κ
4112	4113	.	λ
4112	4125	<split-h>	<>
4113	4114	<>	<name>
4113	4113	<>	<aphaerese>
4113	4116	<elision3>	<elision3>
4113	4113	<>	<elision3>
4113	4116	<elision2>	<elision2>
4113	4113	<>	<elision2>
4113	4116	<elision1>	<elision1>
4113	4113	<>	<elision1>
4113	4123	<split-h>	<>
4114	4115	<>	<aphaerese>
4114	4118	<elision3>	<elision3>
4114	4115	<>	<elision3>
4114	4118	<elision2>	<elision2>
4114	4115	<>	<elision2>
4114	4118	<elision1>	<elision1>
4114	4115	<>	<elision1>
4114	4124	<split-h>	<>
4115	4113	<>	<aphaerese>
4115	4116	<elision3>	<elision3>
4115	4113	<>	<elision3>
4115	4116	<elision2>	<elision2>
4115	4113	<>	<elision2>
4115	4116	<elision1>	<elision1>
4115	4113	<>	<elision1>
4115	4122	<split-h>	<>
4116	4117	<>	<name>
4116	4116	<>	<aphaerese>
4116	4116	<>	<elision3>
4116	4116	<>	<elision2>
4116	4116	<>	<elision1>
4116	4074	.	κ
4116	4120	<split-h>	<>
4117	4118	<>	<aphaerese>
4117	4118	<>	<elision3>
4117	4118	<>	<elision2>
4117	4118	<>	<elision1>
4117	4076	.	κ
4117	4121	<split-h>	<>
4118	4116	<>	<aphaerese>
4118	4116	<>	<elision3>
4118	4116	<>	<elision2>
4118	4116	<>	<elision1>
4118	4074	.	κ
4118	4119	<split-h>	<>
4119	4120	<>	<aphaerese>
4119	4120	<>	<elision3>
4119	4120	<>	<elision2>
4119	4120	<>	<elision1>
4119	3865	<3s>	<>
4120	4121	<>	<name>
4120	4120	<>	<aphaerese>
4120	4120	<>	<elision3>
4120	4120	<>	<elision2>
4120	4120	<>	<elision1>
4120	3866	<3s>	<>
4121	4119	<>	<aphaerese>
4121	4119	<>	<elision3>
4121	4119	<>	<elision2>
4121	4119	<>	<elision1>
4121	3867	<3s>	<>
4122	4123	<>	<aphaerese>
4122	4123	<>	<elision3>
4122	4123	<>	<elision2>
4122	4123	<>	<elision1>
4122	3871	<3s>	<>
4123	4124	<>	<name>
4123	4123	<>	<aphaerese>
4123	4123	<>	<elision3>
4123	4123	<>	<elision2>
4123	4123	<>	<elision1>
4123	3872	<3s>	<>
4124	4122	<>	<aphaerese>
4124	4122	<>	<elision3>
4124	4122	<>	<elision2>
4124	4122	<>	<elision1>
4124	3873	<3s>	<>
4125	4126	<>	<aphaerese>
4125	4126	<>	<elision3>
4125	4126	<>	<elision2>
4125	4126	<>	<elision1>
4125	3880	<3s>	<>
4126	4127	<>	<name>
4126	4126	<>	<aphaerese>
4126	4126	<>	<elision3>
4126	4126	<>	<elision2>
4126	4126	<>	<elision1>
4126	3881	<3s>	<>
4127	4125	<>	<aphaerese>
4127	4125	<>	<elision3>
4127	4125	<>	<elision2>
4127	4125	<>	<elision1>
4127	3882	<3s>	<>
4128	4068	.	.
4128	4068	 	 
4128	4068	<~>	<~>
4128	4068	<split-s>	<split-s>
4128	4068	<split-h>	<split-h>
4128	4068	<name2>	<name2>
4128	4129	<>	<name>
4128	4071	<aphaerese>	<aphaerese>
4128	4128	<>	<aphaerese>
4128	4068	<elision3>	<elision3>
4128	4128	<>	<elision3>
4128	4068	<elision2>	<elision2>
4128	4128	<>	<elision2>
4128	4068	<elision1>	<elision1>
4128	4128	<>	<elision1>
4128	4065	.	υ
4128	4065	.	u
4128	4065	.	α
4128	4065	.	a
4128	4132	<split-h>	<>
4129	4070	.	.
4129	4070	 	 
4129	4070	<~>	<~>
4129	4070	<split-s>	<split-s>
4129	4070	<split-h>	<split-h>
4129	4070	<name2>	<name2>
4129	4073	<aphaerese>	<aphaerese>
4129	4130	<>	<aphaerese>
4129	4070	<elision3>	<elision3>
4129	4130	<>	<elision3>
4129	4070	<elision2>	<elision2>
4129	4130	<>	<elision2>
4129	4070	<elision1>	<elision1>
4129	4130	<>	<elision1>
4129	4067	.	υ
4129	4067	.	u
4129	4067	.	α
4129	4067	.	a
4129	4133	<split-h>	<>
4130	4068	.	.
4130	4068	 	 
4130	4068	<~>	<~>
4130	4068	<split-s>	<split-s>
4130	4068	<split-h>	<split-h>
4130	4068	<name2>	<name2>
4130	4071	<aphaerese>	<aphaerese>
4130	4128	<>	<aphaerese>
4130	4068	<elision3>	<elision3>
4130	4128	<>	<elision3>
4130	4068	<elision2>	<elision2>
4130	4128	<>	<elision2>
4130	4068	<elision1>	<elision1>
4130	4128	<>	<elision1>
4130	4065	.	υ
4130	4065	.	u
4130	4065	.	α
4130	4065	.	a
4130	4131	<split-h>	<>
4131	4132	<>	<aphaerese>
4131	4132	<>	<elision3>
4131	4132	<>	<elision2>
4131	4132	<>	<elision1>
4131	3892	<3s>	<>
4132	4133	<>	<name>
4132	4132	<>	<aphaerese>
4132	4132	<>	<elision3>
4132	4132	<>	<elision2>
4132	4132	<>	<elision1>
4132	3893	<3s>	<>
4133	4131	<>	<aphaerese>
4133	4131	<>	<elision3>
4133	4131	<>	<elision2>
4133	4131	<>	<elision1>
4133	3894	<3s>	<>
4134	3898	<3s>	<>
4135	4068	.	.
4135	4068	 	 
4135	4068	<~>	<~>
4135	4068	<split-s>	<split-s>
4135	4068	<split-h>	<split-h>
4135	4068	<name2>	<name2>
4135	4136	<name2>	<name>
4135	4129	<>	<name>
4135	4071	<aphaerese>	<aphaerese>
4135	4128	<>	<aphaerese>
4135	4068	<elision3>	<elision3>
4135	4128	<>	<elision3>
4135	4068	<elision2>	<elision2>
4135	4128	<>	<elision2>
4135	4068	<elision1>	<elision1>
4135	4128	<>	<elision1>
4135	4065	.	υ
4135	4065	.	u
4135	4065	.	α
4135	4065	.	a
4135	4137	<split-h>	<>
4136	4088	<split-h>	<>
4137	4133	<>	<name>
4137	4132	<>	<aphaerese>
4137	4132	<>	<elision3>
4137	4132	<>	<elision2>
4137	4132	<>	<elision1>
4137	3902	<3s>	<>
4138	4068	.	.
4138	4068	 	 
4138	4068	<~>	<~>
4138	4068	<split-s>	<split-s>
4138	4068	<split-h>	<split-h>
4138	4068	<name2>	<name2>
4138	4139	<>	<name>
4138	4071	<aphaerese>	<aphaerese>
4138	4138	<>	<aphaerese>
4138	4138	<>	<elision3>
4138	4138	<>	<elision2>
4138	4138	<>	<elision1>
4138	4065	.	υ
4138	4065	.	u
4138	4074	.	κ
4138	4065	.	α
4138	4065	.	a
4138	3977	<split-h>	<>
4139	4070	.	.
4139	4070	 	 
4139	4070	<~>	<~>
4139	4070	<split-s>	<split-s>
4139	4070	<split-h>	<split-h>
4139	4070	<name2>	<name2>
4139	4073	<aphaerese>	<aphaerese>
4139	4140	<>	<aphaerese>
4139	4140	<>	<elision3>
4139	4140	<>	<elision2>
4139	4140	<>	<elision1>
4139	4067	.	υ
4139	4067	.	u
4139	4076	.	κ
4139	4067	.	α
4139	4067	.	a
4139	3978	<split-h>	<>
4140	4068	.	.
4140	4068	 	 
4140	4068	<~>	<~>
4140	4068	<split-s>	<split-s>
4140	4068	<split-h>	<split-h>
4140	4068	<name2>	<name2>
4140	4071	<aphaerese>	<aphaerese>
4140	4138	<>	<aphaerese>
4140	4138	<>	<elision3>
4140	4138	<>	<elision2>
4140	4138	<>	<elision1>
4140	4065	.	υ
4140	4065	.	u
4140	4074	.	κ
4140	4065	.	α
4140	4065	.	a
4140	3976	<split-h>	<>
4141	4142	<>	<name>
4141	4141	<>	<aphaerese>
4141	4141	<>	<elision3>
4141	4141	<>	<elision2>
4141	4141	<>	<elision1>
4141	4068	<A2kl>	<>
4142	4143	<>	<aphaerese>
4142	4143	<>	<elision3>
4142	4143	<>	<elision2>
4142	4143	<>	<elision1>
4142	4069	<A2kl>	<>
4143	4141	<>	<aphaerese>
4143	4141	<>	<elision3>
4143	4141	<>	<elision2>
4143	4141	<>	<elision1>
4143	4070	<A2kl>	<>
4144	3398	.	.
4144	3399	 	 
4144	3398	<~>	<~>
4144	3398	<split-s>	<split-s>
4144	3398	<split-h>	<split-h>
4144	3398	<name2>	<name2>
4144	4145	<>	<name>
4144	3402	<aphaerese>	<aphaerese>
4144	4144	<>	<aphaerese>
4144	3398	<elision3>	<elision3>
4144	4144	<>	<elision3>
4144	3398	<elision2>	<elision2>
4144	4144	<>	<elision2>
4144	3398	<elision1>	<elision1>
4144	4144	<>	<elision1>
4144	3406	.	υ
4144	3412	s	υ
4144	3406	.	u
4144	3412	s	u
4144	3406	.	κ
4144	3988	s	κ
4144	3774	s	k
4144	3783	s	U
4144	3949	s	K
4144	3406	.	α
4144	3412	s	α
4144	3406	.	a
4144	3412	s	a
4144	3904	s	A
4144	3406	.	λ
4144	3988	s	λ
4144	3774	s	l
4144	3962	s	L
4144	4081	<split-h>	<>
4145	3401	.	.
4145	3404	 	 
4145	3401	<~>	<~>
4145	3401	<split-s>	<split-s>
4145	3401	<split-h>	<split-h>
4145	3401	<name2>	<name2>
4145	3948	<aphaerese>	<aphaerese>
4145	4146	<>	<aphaerese>
4145	3401	<elision3>	<elision3>
4145	4146	<>	<elision3>
4145	3401	<elision2>	<elision2>
4145	4146	<>	<elision2>
4145	3401	<elision1>	<elision1>
4145	4146	<>	<elision1>
4145	3408	.	υ
4145	3584	s	υ
4145	3408	.	u
4145	3584	s	u
4145	3408	.	κ
4145	3990	s	κ
4145	3776	s	k
4145	3785	s	U
4145	3951	s	K
4145	3408	.	α
4145	3584	s	α
4145	3408	.	a
4145	3584	s	a
4145	3906	s	A
4145	3408	.	λ
4145	3990	s	λ
4145	3776	s	l
4145	3964	s	L
4145	4082	<split-h>	<>
4146	3398	.	.
4146	3399	 	 
4146	3398	<~>	<~>
4146	3398	<split-s>	<split-s>
4146	3398	<split-h>	<split-h>
4146	3398	<name2>	<name2>
4146	3402	<aphaerese>	<aphaerese>
4146	4144	<>	<aphaerese>
4146	3398	<elision3>	<elision3>
4146	4144	<>	<elision3>
4146	3398	<elision2>	<elision2>
4146	4144	<>	<elision2>
4146	3398	<elision1>	<elision1>
4146	4144	<>	<elision1>
4146	3406	.	υ
4146	3412	s	υ
4146	3406	.	u
4146	3412	s	u
4146	3406	.	κ
4146	3988	s	κ
4146	3774	s	k
4146	3783	s	U
4146	3949	s	K
4146	3406	.	α
4146	3412	s	α
4146	3406	.	a
4146	3412	s	a
4146	3904	s	A
4146	3406	.	λ
4146	3988	s	λ
4146	3774	s	l
4146	3962	s	L
4146	4080	<split-h>	<>
4147	4068	.	.
4147	4068	 	 
4147	4068	<~>	<~>
4147	4068	<split-s>	<split-s>
4147	4068	<split-h>	<split-h>
4147	4068	<name2>	<name2>
4147	4148	<>	<name>
4147	4071	<aphaerese>	<aphaerese>
4147	4147	<>	<aphaerese>
4147	4068	<elision3>	<elision3>
4147	4147	<>	<elision3>
4147	4068	<elision2>	<elision2>
4147	4147	<>	<elision2>
4147	4068	<elision1>	<elision1>
4147	4147	<>	<elision1>
4147	4065	.	υ
4147	4065	.	u
4147	4065	.	κ
4147	4065	.	α
4147	4065	.	a
4147	4065	.	λ
4147	4081	<split-h>	<>
4148	4070	.	.
4148	4070	 	 
4148	4070	<~>	<~>
4148	4070	<split-s>	<split-s>
4148	4070	<split-h>	<split-h>
4148	4070	<name2>	<name2>
4148	4073	<aphaerese>	<aphaerese>
4148	4149	<>	<aphaerese>
4148	4070	<elision3>	<elision3>
4148	4149	<>	<elision3>
4148	4070	<elision2>	<elision2>
4148	4149	<>	<elision2>
4148	4070	<elision1>	<elision1>
4148	4149	<>	<elision1>
4148	4067	.	υ
4148	4067	.	u
4148	4067	.	κ
4148	4067	.	α
4148	4067	.	a
4148	4067	.	λ
4148	4082	<split-h>	<>
4149	4068	.	.
4149	4068	 	 
4149	4068	<~>	<~>
4149	4068	<split-s>	<split-s>
4149	4068	<split-h>	<split-h>
4149	4068	<name2>	<name2>
4149	4071	<aphaerese>	<aphaerese>
4149	4147	<>	<aphaerese>
4149	4068	<elision3>	<elision3>
4149	4147	<>	<elision3>
4149	4068	<elision2>	<elision2>
4149	4147	<>	<elision2>
4149	4068	<elision1>	<elision1>
4149	4147	<>	<elision1>
4149	4065	.	υ
4149	4065	.	u
4149	4065	.	κ
4149	4065	.	α
4149	4065	.	a
4149	4065	.	λ
4149	4080	<split-h>	<>
4150	4136	<name>	<name>
4150	4151	<>	<name>
4150	4153	<>	<aphaerese>
4150	4153	<>	<elision3>
4150	4153	<>	<elision2>
4150	4153	<>	<elision1>
4150	4134	<split-h>	<>
4150	4092	<A2kl>	<>
4150	4160	<L2kl>	<>
4151	4152	<>	<aphaerese>
4151	4152	<>	<elision3>
4151	4152	<>	<elision2>
4151	4152	<>	<elision1>
4151	4093	<A2kl>	<>
4151	4155	<L2kl>	<>
4152	4153	<>	<aphaerese>
4152	4153	<>	<elision3>
4152	4153	<>	<elision2>
4152	4153	<>	<elision1>
4152	4094	<A2kl>	<>
4152	4156	<L2kl>	<>
4153	4151	<>	<name>
4153	4153	<>	<aphaerese>
4153	4153	<>	<elision3>
4153	4153	<>	<elision2>
4153	4153	<>	<elision1>
4153	4092	<A2kl>	<>
4153	4154	<L2kl>	<>
4154	4068	.	.
4154	4068	 	 
4154	4068	<~>	<~>
4154	4068	<split-s>	<split-s>
4154	4068	<split-h>	<split-h>
4154	4068	<name2>	<name2>
4154	4155	<>	<name>
4154	4071	<aphaerese>	<aphaerese>
4154	4154	<>	<aphaerese>
4154	4068	<elision3>	<elision3>
4154	4154	<>	<elision3>
4154	4068	<elision2>	<elision2>
4154	4154	<>	<elision2>
4154	4068	<elision1>	<elision1>
4154	4154	<>	<elision1>
4154	4065	.	υ
4154	4065	.	u
4154	4113	.	κ
4154	4065	.	α
4154	4065	.	a
4154	4113	.	λ
4154	4158	<split-h>	<>
4155	4070	.	.
4155	4070	 	 
4155	4070	<~>	<~>
4155	4070	<split-s>	<split-s>
4155	4070	<split-h>	<split-h>
4155	4070	<name2>	<name2>
4155	4073	<aphaerese>	<aphaerese>
4155	4156	<>	<aphaerese>
4155	4070	<elision3>	<elision3>
4155	4156	<>	<elision3>
4155	4070	<elision2>	<elision2>
4155	4156	<>	<elision2>
4155	4070	<elision1>	<elision1>
4155	4156	<>	<elision1>
4155	4067	.	υ
4155	4067	.	u
4155	4115	.	κ
4155	4067	.	α
4155	4067	.	a
4155	4115	.	λ
4155	4159	<split-h>	<>
4156	4068	.	.
4156	4068	 	 
4156	4068	<~>	<~>
4156	4068	<split-s>	<split-s>
4156	4068	<split-h>	<split-h>
4156	4068	<name2>	<name2>
4156	4071	<aphaerese>	<aphaerese>
4156	4154	<>	<aphaerese>
4156	4068	<elision3>	<elision3>
4156	4154	<>	<elision3>
4156	4068	<elision2>	<elision2>
4156	4154	<>	<elision2>
4156	4068	<elision1>	<elision1>
4156	4154	<>	<elision1>
4156	4065	.	υ
4156	4065	.	u
4156	4113	.	κ
4156	4065	.	α
4156	4065	.	a
4156	4113	.	λ
4156	4157	<split-h>	<>
4157	4158	<>	<aphaerese>
4157	4158	<>	<elision3>
4157	4158	<>	<elision2>
4157	4158	<>	<elision1>
4157	3914	<3s>	<>
4158	4159	<>	<name>
4158	4158	<>	<aphaerese>
4158	4158	<>	<elision3>
4158	4158	<>	<elision2>
4158	4158	<>	<elision1>
4158	3915	<3s>	<>
4159	4157	<>	<aphaerese>
4159	4157	<>	<elision3>
4159	4157	<>	<elision2>
4159	4157	<>	<elision1>
4159	3916	<3s>	<>
4160	4068	.	.
4160	4068	 	 
4160	4068	<~>	<~>
4160	4068	<split-s>	<split-s>
4160	4068	<split-h>	<split-h>
4160	4068	<name2>	<name2>
4160	4136	<name2>	<name>
4160	4155	<>	<name>
4160	4071	<aphaerese>	<aphaerese>
4160	4154	<>	<aphaerese>
4160	4068	<elision3>	<elision3>
4160	4154	<>	<elision3>
4160	4068	<elision2>	<elision2>
4160	4154	<>	<elision2>
4160	4068	<elision1>	<elision1>
4160	4154	<>	<elision1>
4160	4065	.	υ
4160	4065	.	u
4160	4113	.	κ
4160	4065	.	α
4160	4065	.	a
4160	4113	.	λ
4160	4161	<split-h>	<>
4161	4159	<>	<name>
4161	4158	<>	<aphaerese>
4161	4158	<>	<elision3>
4161	4158	<>	<elision2>
4161	4158	<>	<elision1>
4161	3921	<3s>	<>
4162	3398	.	.
4162	3399	 	 
4162	3398	<~>	<~>
4162	3398	<split-s>	<split-s>
4162	3398	<split-h>	<split-h>
4162	3398	<name2>	<name2>
4162	3974	<>	<name>
4162	3402	<aphaerese>	<aphaerese>
4162	3397	<>	<aphaerese>
4162	3397	<>	<elision3>
4162	3397	<>	<elision2>
4162	3397	<>	<elision1>
4162	3406	.	υ
4162	3412	s	υ
4162	3406	.	u
4162	3412	s	u
4162	3591	.	κ
4162	3662	s	κ
4162	3774	s	k
4162	3783	s	U
4162	3949	s	K
4162	3406	.	α
4162	3412	s	α
4162	3406	.	a
4162	3412	s	a
4162	3904	s	A
4162	3774	s	λ
4162	3774	s	l
4162	3962	s	L
4162	4163	<split-h>	<>
4163	3978	<>	<name>
4163	3977	<>	<aphaerese>
4163	3977	<>	<elision3>
4163	3977	<>	<elision2>
4163	3977	<>	<elision1>
4163	3927	<3s>	<>
4164	3398	.	.
4164	3399	 	 
4164	3398	<~>	<~>
4164	3398	<split-s>	<split-s>
4164	3398	<split-h>	<split-h>
4164	3398	<name2>	<name2>
4164	4010	<>	<name>
4164	3402	<aphaerese>	<aphaerese>
4164	4009	<>	<aphaerese>
4164	4012	<elision3>	<elision3>
4164	4009	<>	<elision3>
4164	4012	<elision2>	<elision2>
4164	4009	<>	<elision2>
4164	4012	<elision1>	<elision1>
4164	4009	<>	<elision1>
4164	3406	.	υ
4164	3412	s	υ
4164	3406	.	u
4164	3412	s	u
4164	3406	.	κ
4164	3988	s	κ
4164	3774	s	k
4164	3783	s	U
4164	3949	s	K
4164	3406	.	α
4164	3412	s	α
4164	3406	.	a
4164	3412	s	a
4164	3904	s	A
4164	3406	.	λ
4164	3988	s	λ
4164	3774	s	l
4164	3962	s	L
4164	4165	<split-h>	<>
4165	4061	<>	<name>
4165	4060	<>	<aphaerese>
4165	4060	<>	<elision3>
4165	4060	<>	<elision2>
4165	4060	<>	<elision1>
4165	3930	<3s>	<>
4166	3398	.	.
4166	3399	 	 
4166	3398	<~>	<~>
4166	3398	<split-s>	<split-s>
4166	3398	<split-h>	<split-h>
4166	3398	<name2>	<name2>
4166	4063	<>	<name>
4166	3402	<aphaerese>	<aphaerese>
4166	4062	<>	<aphaerese>
4166	3398	<elision3>	<elision3>
4166	4062	<>	<elision3>
4166	3398	<elision2>	<elision2>
4166	4062	<>	<elision2>
4166	3398	<elision1>	<elision1>
4166	4062	<>	<elision1>
4166	3406	.	υ
4166	3412	s	υ
4166	3406	.	u
4166	3412	s	u
4166	4065	.	κ
4166	3988	s	κ
4166	3774	s	k
4166	3783	s	U
4166	3949	s	K
4166	3406	.	α
4166	3412	s	α
4166	3406	.	a
4166	3412	s	a
4166	3904	s	A
4166	4065	.	λ
4166	3988	s	λ
4166	3774	s	l
4166	3962	s	L
4166	4167	<split-h>	<>
4167	4082	<>	<name>
4167	4081	<>	<aphaerese>
4167	4081	<>	<elision3>
4167	4081	<>	<elision2>
4167	4081	<>	<elision1>
4167	3933	<3s>	<>
4168	4084	<>	<name>
4168	4083	<>	<aphaerese>
4168	4083	<>	<elision3>
4168	4083	<>	<elision2>
4168	4083	<>	<elision1>
4168	4169	<U2kl>	<>
4169	4068	.	.
4169	4068	 	 
4169	4068	<~>	<~>
4169	4068	<split-s>	<split-s>
4169	4068	<split-h>	<split-h>
4169	4068	<name2>	<name2>
4169	4069	<>	<name>
4169	4071	<aphaerese>	<aphaerese>
4169	4068	<>	<aphaerese>
4169	4068	<elision3>	<elision3>
4169	4068	<>	<elision3>
4169	4068	<elision2>	<elision2>
4169	4068	<>	<elision2>
4169	4068	<elision1>	<elision1>
4169	4068	<>	<elision1>
4169	4065	.	υ
4169	4065	.	u
4169	4074	.	κ
4169	4065	.	α
4169	4065	.	a
4169	4170	<split-h>	<>
4170	3924	<>	<name>
4170	3923	<>	<aphaerese>
4170	3923	<>	<elision3>
4170	3923	<>	<elision2>
4170	3923	<>	<elision1>
4170	3937	<3s>	<>
4171	4087	<name>	<name>
4171	4089	<>	<name>
4171	4091	<>	<aphaerese>
4171	4091	<>	<elision3>
4171	4091	<>	<elision2>
4171	4091	<>	<elision1>
4171	4134	<split-h>	<>
4171	4092	<A2kl>	<>
4171	4110	<L2kl>	<>
4171	4172	<K2kl>	<>
4172	4068	.	.
4172	4068	 	 
4172	4068	<~>	<~>
4172	4068	<split-s>	<split-s>
4172	4068	<split-h>	<split-h>
4172	4068	<name2>	<name2>
4172	4136	<name2>	<name>
4172	4129	<>	<name>
4172	4071	<aphaerese>	<aphaerese>
4172	4128	<>	<aphaerese>
4172	4068	<elision3>	<elision3>
4172	4128	<>	<elision3>
4172	4068	<elision2>	<elision2>
4172	4128	<>	<elision2>
4172	4068	<elision1>	<elision1>
4172	4128	<>	<elision1>
4172	4065	.	υ
4172	4065	.	u
4172	4065	.	α
4172	4065	.	a
4172	4173	<split-h>	<>
4173	4133	<>	<name>
4173	4132	<>	<aphaerese>
4173	4132	<>	<elision3>
4173	4132	<>	<elision2>
4173	4132	<>	<elision1>
4173	3941	<3s>	<>
4174	4068	.	.
4174	4068	 	 
4174	4068	<~>	<~>
4174	4068	<split-s>	<split-s>
4174	4068	<split-h>	<split-h>
4174	4068	<name2>	<name2>
4174	4139	<>	<name>
4174	4071	<aphaerese>	<aphaerese>
4174	4138	<>	<aphaerese>
4174	4138	<>	<elision3>
4174	4138	<>	<elision2>
4174	4138	<>	<elision1>
4174	4065	.	υ
4174	4065	.	u
4174	4074	.	κ
4174	4065	.	α
4174	4065	.	a
4174	4163	<split-h>	<>
4175	4142	<>	<name>
4175	4141	<>	<aphaerese>
4175	4141	<>	<elision3>
4175	4141	<>	<elision2>
4175	4141	<>	<elision1>
4175	4169	<A2kl>	<>
4176	3398	.	.
4176	3399	 	 
4176	3398	<~>	<~>
4176	3398	<split-s>	<split-s>
4176	3398	<split-h>	<split-h>
4176	3398	<name2>	<name2>
4176	4145	<>	<name>
4176	3402	<aphaerese>	<aphaerese>
4176	4144	<>	<aphaerese>
4176	3398	<elision3>	<elision3>
4176	4144	<>	<elision3>
4176	3398	<elision2>	<elision2>
4176	4144	<>	<elision2>
4176	3398	<elision1>	<elision1>
4176	4144	<>	<elision1>
4176	3406	.	υ
4176	3412	s	υ
4176	3406	.	u
4176	3412	s	u
4176	3406	.	κ
4176	3988	s	κ
4176	3774	s	k
4176	3783	s	U
4176	3949	s	K
4176	3406	.	α
4176	3412	s	α
4176	3406	.	a
4176	3412	s	a
4176	3904	s	A
4176	3406	.	λ
4176	3988	s	λ
4176	3774	s	l
4176	3962	s	L
4176	4167	<split-h>	<>
4177	4068	.	.
4177	4068	 	 
4177	4068	<~>	<~>
4177	4068	<split-s>	<split-s>
4177	4068	<split-h>	<split-h>
4177	4068	<name2>	<name2>
4177	4148	<>	<name>
4177	4071	<aphaerese>	<aphaerese>
4177	4147	<>	<aphaerese>
4177	4068	<elision3>	<elision3>
4177	4147	<>	<elision3>
4177	4068	<elision2>	<elision2>
4177	4147	<>	<elision2>
4177	4068	<elision1>	<elision1>
4177	4147	<>	<elision1>
4177	4065	.	υ
4177	4065	.	u
4177	4065	.	κ
4177	4065	.	α
4177	4065	.	a
4177	4065	.	λ
4177	4167	<split-h>	<>
4178	4136	<name>	<name>
4178	4151	<>	<name>
4178	4153	<>	<aphaerese>
4178	4153	<>	<elision3>
4178	4153	<>	<elision2>
4178	4153	<>	<elision1>
4178	4134	<split-h>	<>
4178	4092	<A2kl>	<>
4178	4179	<L2kl>	<>
4179	4068	.	.
4179	4068	 	 
4179	4068	<~>	<~>
4179	4068	<split-s>	<split-s>
4179	4068	<split-h>	<split-h>
4179	4068	<name2>	<name2>
4179	4136	<name2>	<name>
4179	4155	<>	<name>
4179	4071	<aphaerese>	<aphaerese>
4179	4154	<>	<aphaerese>
4179	4068	<elision3>	<elision3>
4179	4154	<>	<elision3>
4179	4068	<elision2>	<elision2>
4179	4154	<>	<elision2>
4179	4068	<elision1>	<elision1>
4179	4154	<>	<elision1>
4179	4065	.	υ
4179	4065	.	u
4179	4113	.	κ
4179	4065	.	α
4179	4065	.	a
4179	4113	.	λ
4179	4180	<split-h>	<>
4180	4159	<>	<name>
4180	4158	<>	<aphaerese>
4180	4158	<>	<elision3>
4180	4158	<>	<elision2>
4180	4158	<>	<elision1>
4180	3946	<3s>	<>
4181	200	.	.
4181	201	 	 
4181	200	<~>	<~>
4181	200	<split-s>	<split-s>
4181	200	<split-h>	<split-h>
4181	200	<name2>	<name2>
4181	204	<aphaerese>	<aphaerese>
4181	204	<>	<aphaerese>
4181	200	<elision3>	<elision3>
4181	204	<>	<elision3>
4181	200	<elision2>	<elision2>
4181	204	<>	<elision2>
4181	200	<elision1>	<elision1>
4181	204	<>	<elision1>
4181	200	.	υ
4181	200	.	u
4181	3979	.	κ
4181	4009	s	κ
4181	4062	s	k
4181	4083	s	U
4181	4182	s	K
4181	200	.	α
4181	200	.	a
4181	4141	s	A
4181	4144	s	λ
4181	4147	s	l
4181	4192	s	L
4181	3567	<2s>	<>
4182	4087	<name>	<name>
4182	4183	<>	<name>
4182	4185	<>	<aphaerese>
4182	4185	<>	<elision3>
4182	4185	<>	<elision2>
4182	4185	<>	<elision1>
4182	4134	<split-h>	<>
4182	4186	<L2kl>	<>
4182	4135	<K2kl>	<>
4183	4184	<>	<aphaerese>
4183	4184	<>	<elision3>
4183	4184	<>	<elision2>
4183	4184	<>	<elision1>
4183	4187	<L2kl>	<>
4183	4129	<K2kl>	<>
4184	4185	<>	<aphaerese>
4184	4185	<>	<elision3>
4184	4185	<>	<elision2>
4184	4185	<>	<elision1>
4184	4188	<L2kl>	<>
4184	4130	<K2kl>	<>
4185	4183	<>	<name>
4185	4185	<>	<aphaerese>
4185	4185	<>	<elision3>
4185	4185	<>	<elision2>
4185	4185	<>	<elision1>
4185	4186	<L2kl>	<>
4185	4128	<K2kl>	<>
4186	4187	<>	<name>
4186	4186	<>	<aphaerese>
4186	4186	<>	<elision3>
4186	4186	<>	<elision2>
4186	4186	<>	<elision1>
4186	4065	.	κ
4186	4065	.	λ
4186	4190	<split-h>	<>
4187	4188	<>	<aphaerese>
4187	4188	<>	<elision3>
4187	4188	<>	<elision2>
4187	4188	<>	<elision1>
4187	4067	.	κ
4187	4067	.	λ
4187	4191	<split-h>	<>
4188	4186	<>	<aphaerese>
4188	4186	<>	<elision3>
4188	4186	<>	<elision2>
4188	4186	<>	<elision1>
4188	4065	.	κ
4188	4065	.	λ
4188	4189	<split-h>	<>
4189	4190	<>	<aphaerese>
4189	4190	<>	<elision3>
4189	4190	<>	<elision2>
4189	4190	<>	<elision1>
4189	3956	<3s>	<>
4190	4191	<>	<name>
4190	4190	<>	<aphaerese>
4190	4190	<>	<elision3>
4190	4190	<>	<elision2>
4190	4190	<>	<elision1>
4190	3957	<3s>	<>
4191	4189	<>	<aphaerese>
4191	4189	<>	<elision3>
4191	4189	<>	<elision2>
4191	4189	<>	<elision1>
4191	3958	<3s>	<>
4192	4136	<name>	<name>
4192	4193	<>	<name>
4192	4195	<>	<aphaerese>
4192	4195	<>	<elision3>
4192	4195	<>	<elision2>
4192	4195	<>	<elision1>
4192	4134	<split-h>	<>
4192	4196	<L2kl>	<>
4193	4194	<>	<aphaerese>
4193	4194	<>	<elision3>
4193	4194	<>	<elision2>
4193	4194	<>	<elision1>
4193	4148	<L2kl>	<>
4194	4195	<>	<aphaerese>
4194	4195	<>	<elision3>
4194	4195	<>	<elision2>
4194	4195	<>	<elision1>
4194	4149	<L2kl>	<>
4195	4193	<>	<name>
4195	4195	<>	<aphaerese>
4195	4195	<>	<elision3>
4195	4195	<>	<elision2>
4195	4195	<>	<elision1>
4195	4147	<L2kl>	<>
4196	4068	.	.
4196	4068	 	 
4196	4068	<~>	<~>
4196	4068	<split-s>	<split-s>
4196	4068	<split-h>	<split-h>
4196	4068	<name2>	<name2>
4196	4136	<name2>	<name>
4196	4148	<>	<name>
4196	4071	<aphaerese>	<aphaerese>
4196	4147	<>	<aphaerese>
4196	4068	<elision3>	<elision3>
4196	4147	<>	<elision3>
4196	4068	<elision2>	<elision2>
4196	4147	<>	<elision2>
4196	4068	<elision1>	<elision1>
4196	4147	<>	<elision1>
4196	4065	.	υ
4196	4065	.	u
4196	4065	.	κ
4196	4065	.	α
4196	4065	.	a
4196	4065	.	λ
4196	4197	<split-h>	<>
4197	4082	<>	<name>
4197	4081	<>	<aphaerese>
4197	4081	<>	<elision3>
4197	4081	<>	<elision2>
4197	4081	<>	<elision1>
4197	3967	<3s>	<>
4198	200	.	.
4198	201	 	 
4198	200	<~>	<~>
4198	200	<split-s>	<split-s>
4198	200	<split-h>	<split-h>
4198	200	<name2>	<name2>
4198	204	<aphaerese>	<aphaerese>
4198	207	<>	<aphaerese>
4198	200	<elision3>	<elision3>
4198	207	<>	<elision3>
4198	200	<elision2>	<elision2>
4198	207	<>	<elision2>
4198	200	<elision1>	<elision1>
4198	207	<>	<elision1>
4198	208	.	υ
4198	3397	s	υ
4198	208	.	u
4198	3397	s	u
4198	3979	.	κ
4198	4009	s	κ
4198	4062	s	k
4198	4083	s	U
4198	4086	s	K
4198	208	.	α
4198	4138	s	α
4198	208	.	a
4198	4138	s	a
4198	4141	s	A
4198	4144	s	λ
4198	4147	s	l
4198	4150	s	L
4198	3580	<2s>	<>
4199	203	.	.
4199	206	 	 
4199	203	<~>	<~>
4199	203	<split-s>	<split-s>
4199	203	<split-h>	<split-h>
4199	203	<name2>	<name2>
4199	4181	<aphaerese>	<aphaerese>
4199	203	<>	<aphaerese>
4199	203	<elision3>	<elision3>
4199	203	<>	<elision3>
4199	203	<elision2>	<elision2>
4199	203	<>	<elision2>
4199	203	<elision1>	<elision1>
4199	203	<>	<elision1>
4199	210	.	υ
4199	3975	s	υ
4199	210	.	u
4199	3975	s	u
4199	3981	.	κ
4199	4011	s	κ
4199	4064	s	k
4199	4085	s	U
4199	4184	s	K
4199	210	.	α
4199	4140	s	α
4199	210	.	a
4199	4140	s	a
4199	4143	s	A
4199	4146	s	λ
4199	4149	s	l
4199	4194	s	L
4199	3582	<2s>	<>
4200	203	.	.
4200	206	 	 
4200	203	<~>	<~>
4200	203	<split-s>	<split-s>
4200	203	<split-h>	<split-h>
4200	203	<name2>	<name2>
4200	4181	<aphaerese>	<aphaerese>
4200	4201	<>	<aphaerese>
4200	4201	<>	<elision3>
4200	4201	<>	<elision2>
4200	4201	<>	<elision1>
4200	210	.	υ
4200	3975	s	υ
4200	210	.	u
4200	3975	s	u
4200	210	.	κ
4200	4204	s	κ
4200	4064	s	k
4200	4085	s	U
4200	4184	s	K
4200	210	.	α
4200	4140	s	α
4200	210	.	a
4200	4140	s	a
4200	4143	s	A
4200	210	.	λ
4200	4204	s	λ
4200	4149	s	l
4200	4194	s	L
4200	3993	<2s>	<>
4201	200	.	.
4201	201	 	 
4201	200	<~>	<~>
4201	200	<split-s>	<split-s>
4201	200	<split-h>	<split-h>
4201	200	<name2>	<name2>
4201	204	<aphaerese>	<aphaerese>
4201	199	<>	<aphaerese>
4201	199	<>	<elision3>
4201	199	<>	<elision2>
4201	199	<>	<elision1>
4201	208	.	υ
4201	3397	s	υ
4201	208	.	u
4201	3397	s	u
4201	208	.	κ
4201	4202	s	κ
4201	4062	s	k
4201	4083	s	U
4201	4182	s	K
4201	208	.	α
4201	4138	s	α
4201	208	.	a
4201	4138	s	a
4201	4141	s	A
4201	208	.	λ
4201	4202	s	λ
4201	4147	s	l
4201	4192	s	L
4201	3991	<2s>	<>
4202	3398	.	.
4202	3399	 	 
4202	3398	<~>	<~>
4202	3398	<split-s>	<split-s>
4202	3398	<split-h>	<split-h>
4202	3398	<name2>	<name2>
4202	4203	<>	<name>
4202	3402	<aphaerese>	<aphaerese>
4202	4202	<>	<aphaerese>
4202	4202	<>	<elision3>
4202	4202	<>	<elision2>
4202	4202	<>	<elision1>
4202	3406	.	υ
4202	3412	s	υ
4202	3406	.	u
4202	3412	s	u
4202	3406	.	κ
4202	3988	s	κ
4202	3774	s	k
4202	3783	s	U
4202	3949	s	K
4202	3406	.	α
4202	3412	s	α
4202	3406	.	a
4202	3412	s	a
4202	3904	s	A
4202	3406	.	λ
4202	3988	s	λ
4202	3774	s	l
4202	3962	s	L
4202	4206	<split-h>	<>
4203	3401	.	.
4203	3404	 	 
4203	3401	<~>	<~>
4203	3401	<split-s>	<split-s>
4203	3401	<split-h>	<split-h>
4203	3401	<name2>	<name2>
4203	3948	<aphaerese>	<aphaerese>
4203	4204	<>	<aphaerese>
4203	4204	<>	<elision3>
4203	4204	<>	<elision2>
4203	4204	<>	<elision1>
4203	3408	.	υ
4203	3584	s	υ
4203	3408	.	u
4203	3584	s	u
4203	3408	.	κ
4203	3990	s	κ
4203	3776	s	k
4203	3785	s	U
4203	3951	s	K
4203	3408	.	α
4203	3584	s	α
4203	3408	.	a
4203	3584	s	a
4203	3906	s	A
4203	3408	.	λ
4203	3990	s	λ
4203	3776	s	l
4203	3964	s	L
4203	4207	<split-h>	<>
4204	3398	.	.
4204	3399	 	 
4204	3398	<~>	<~>
4204	3398	<split-s>	<split-s>
4204	3398	<split-h>	<split-h>
4204	3398	<name2>	<name2>
4204	3402	<aphaerese>	<aphaerese>
4204	4202	<>	<aphaerese>
4204	4202	<>	<elision3>
4204	4202	<>	<elision2>
4204	4202	<>	<elision1>
4204	3406	.	υ
4204	3412	s	υ
4204	3406	.	u
4204	3412	s	u
4204	3406	.	κ
4204	3988	s	κ
4204	3774	s	k
4204	3783	s	U
4204	3949	s	K
4204	3406	.	α
4204	3412	s	α
4204	3406	.	a
4204	3412	s	a
4204	3904	s	A
4204	3406	.	λ
4204	3988	s	λ
4204	3774	s	l
4204	3962	s	L
4204	4205	<split-h>	<>
4205	4206	<>	<aphaerese>
4205	4206	<>	<elision3>
4205	4206	<>	<elision2>
4205	4206	<>	<elision1>
4205	3991	<3s>	<>
4206	4207	<>	<name>
4206	4206	<>	<aphaerese>
4206	4206	<>	<elision3>
4206	4206	<>	<elision2>
4206	4206	<>	<elision1>
4206	3992	<3s>	<>
4207	4205	<>	<aphaerese>
4207	4205	<>	<elision3>
4207	4205	<>	<elision2>
4207	4205	<>	<elision1>
4207	3993	<3s>	<>
4208	200	.	.
4208	201	 	 
4208	200	<~>	<~>
4208	200	<split-s>	<split-s>
4208	200	<split-h>	<split-h>
4208	200	<name2>	<name2>
4208	4209	<>	<name>
4208	204	<aphaerese>	<aphaerese>
4208	4208	<>	<aphaerese>
4208	200	<elision3>	<elision3>
4208	4208	<>	<elision3>
4208	200	<elision2>	<elision2>
4208	4208	<>	<elision2>
4208	200	<elision1>	<elision1>
4208	4208	<>	<elision1>
4208	208	.	υ
4208	3397	s	υ
4208	208	.	u
4208	3397	s	u
4208	4211	.	κ
4208	4202	s	κ
4208	4062	s	k
4208	4083	s	U
4208	4182	s	K
4208	208	.	α
4208	4138	s	α
4208	208	.	a
4208	4138	s	a
4208	4141	s	A
4208	4211	.	λ
4208	4202	s	λ
4208	4147	s	l
4208	4192	s	L
4208	3778	<2s>	<>
4209	203	.	.
4209	206	 	 
4209	203	<~>	<~>
4209	203	<split-s>	<split-s>
4209	203	<split-h>	<split-h>
4209	203	<name2>	<name2>
4209	4181	<aphaerese>	<aphaerese>
4209	4210	<>	<aphaerese>
4209	203	<elision3>	<elision3>
4209	4210	<>	<elision3>
4209	203	<elision2>	<elision2>
4209	4210	<>	<elision2>
4209	203	<elision1>	<elision1>
4209	4210	<>	<elision1>
4209	210	.	υ
4209	3975	s	υ
4209	210	.	u
4209	3975	s	u
4209	4213	.	κ
4209	4204	s	κ
4209	4064	s	k
4209	4085	s	U
4209	4184	s	K
4209	210	.	α
4209	4140	s	α
4209	210	.	a
4209	4140	s	a
4209	4143	s	A
4209	4213	.	λ
4209	4204	s	λ
4209	4149	s	l
4209	4194	s	L
4209	3779	<2s>	<>
4210	200	.	.
4210	201	 	 
4210	200	<~>	<~>
4210	200	<split-s>	<split-s>
4210	200	<split-h>	<split-h>
4210	200	<name2>	<name2>
4210	204	<aphaerese>	<aphaerese>
4210	4208	<>	<aphaerese>
4210	200	<elision3>	<elision3>
4210	4208	<>	<elision3>
4210	200	<elision2>	<elision2>
4210	4208	<>	<elision2>
4210	200	<elision1>	<elision1>
4210	4208	<>	<elision1>
4210	208	.	υ
4210	3397	s	υ
4210	208	.	u
4210	3397	s	u
4210	4211	.	κ
4210	4202	s	κ
4210	4062	s	k
4210	4083	s	U
4210	4182	s	K
4210	208	.	α
4210	4138	s	α
4210	208	.	a
4210	4138	s	a
4210	4141	s	A
4210	4211	.	λ
4210	4202	s	λ
4210	4147	s	l
4210	4192	s	L
4210	3777	<2s>	<>
4211	4212	<>	<name>
4211	4211	<>	<aphaerese>
4211	4214	<elision3>	<elision3>
4211	4211	<>	<elision3>
4211	4214	<elision2>	<elision2>
4211	4211	<>	<elision2>
4211	4214	<elision1>	<elision1>
4211	4211	<>	<elision1>
4211	212	<2s>	<>
4212	4213	<>	<aphaerese>
4212	4217	<elision3>	<elision3>
4212	4213	<>	<elision3>
4212	4217	<elision2>	<elision2>
4212	4213	<>	<elision2>
4212	4217	<elision1>	<elision1>
4212	4213	<>	<elision1>
4212	213	<2s>	<>
4213	4211	<>	<aphaerese>
4213	4214	<elision3>	<elision3>
4213	4211	<>	<elision3>
4213	4214	<elision2>	<elision2>
4213	4211	<>	<elision2>
4213	4214	<elision1>	<elision1>
4213	4211	<>	<elision1>
4213	211	<2s>	<>
4214	4214	.	.
4214	4215	 	 
4214	4214	<~>	<~>
4214	4214	<split-s>	<split-s>
4214	4214	<split-h>	<split-h>
4214	4214	<name2>	<name2>
4214	4240	<>	<name>
4214	4218	<aphaerese>	<aphaerese>
4214	4214	<>	<aphaerese>
4214	4214	<elision3>	<elision3>
4214	4214	<>	<elision3>
4214	4214	<elision2>	<elision2>
4214	4214	<>	<elision2>
4214	4214	<elision1>	<elision1>
4214	4214	<>	<elision1>
4214	4211	.	υ
4214	4138	s	υ
4214	4211	.	u
4214	4138	s	u
4214	4222	.	κ
4214	4228	s	κ
4214	4147	s	k
4214	4083	s	U
4214	4238	s	K
4214	4211	.	α
4214	4138	s	α
4214	4211	.	a
4214	4138	s	a
4214	4141	s	A
4214	4147	s	λ
4214	4147	s	l
4214	4192	s	L
4214	3581	<2s>	<>
4215	4214	.	.
4215	4215	 	 
4215	4214	<~>	<~>
4215	4214	<split-s>	<split-s>
4215	4214	<split-h>	<split-h>
4215	4214	<name2>	<name2>
4215	4216	<>	<name>
4215	4218	<aphaerese>	<aphaerese>
4215	4221	<>	<aphaerese>
4215	4214	<elision3>	<elision3>
4215	4221	<>	<elision3>
4215	4214	<elision2>	<elision2>
4215	4221	<>	<elision2>
4215	4214	<elision1>	<elision1>
4215	4221	<>	<elision1>
4215	4211	.	υ
4215	4174	s	υ
4215	4211	.	u
4215	4174	s	u
4215	4222	.	κ
4215	4235	s	κ
4215	4177	s	k
4215	4168	s	U
4215	4236	s	K
4215	4211	.	α
4215	4174	s	α
4215	4211	.	a
4215	4174	s	a
4215	4175	s	A
4215	4177	s	λ
4215	4177	s	l
4215	4178	s	L
4215	3581	<2s>	<>
4216	4217	.	.
4216	4220	 	 
4216	4217	<~>	<~>
4216	4217	<split-s>	<split-s>
4216	4217	<split-h>	<split-h>
4216	4217	<name2>	<name2>
4216	4237	<aphaerese>	<aphaerese>
4216	4239	<>	<aphaerese>
4216	4217	<elision3>	<elision3>
4216	4239	<>	<elision3>
4216	4217	<elision2>	<elision2>
4216	4239	<>	<elision2>
4216	4217	<elision1>	<elision1>
4216	4239	<>	<elision1>
4216	4213	.	υ
4216	4140	s	υ
4216	4213	.	u
4216	4140	s	u
4216	4224	.	κ
4216	4230	s	κ
4216	4149	s	k
4216	4085	s	U
4216	4090	s	K
4216	4213	.	α
4216	4140	s	α
4216	4213	.	a
4216	4140	s	a
4216	4143	s	A
4216	4149	s	λ
4216	4149	s	l
4216	4152	s	L
4216	3582	<2s>	<>
4217	4214	.	.
4217	4215	 	 
4217	4214	<~>	<~>
4217	4214	<split-s>	<split-s>
4217	4214	<split-h>	<split-h>
4217	4214	<name2>	<name2>
4217	4218	<aphaerese>	<aphaerese>
4217	4214	<>	<aphaerese>
4217	4214	<elision3>	<elision3>
4217	4214	<>	<elision3>
4217	4214	<elision2>	<elision2>
4217	4214	<>	<elision2>
4217	4214	<elision1>	<elision1>
4217	4214	<>	<elision1>
4217	4211	.	υ
4217	4138	s	υ
4217	4211	.	u
4217	4138	s	u
4217	4222	.	κ
4217	4228	s	κ
4217	4147	s	k
4217	4083	s	U
4217	4238	s	K
4217	4211	.	α
4217	4138	s	α
4217	4211	.	a
4217	4138	s	a
4217	4141	s	A
4217	4147	s	λ
4217	4147	s	l
4217	4192	s	L
4217	3580	<2s>	<>
4218	4214	.	.
4218	4215	 	 
4218	4214	<~>	<~>
4218	4214	<split-s>	<split-s>
4218	4214	<split-h>	<split-h>
4218	4214	<name2>	<name2>
4218	4219	<>	<name>
4218	4218	<aphaerese>	<aphaerese>
4218	4218	<>	<aphaerese>
4218	4214	<elision3>	<elision3>
4218	4218	<>	<elision3>
4218	4214	<elision2>	<elision2>
4218	4218	<>	<elision2>
4218	4214	<elision1>	<elision1>
4218	4218	<>	<elision1>
4218	4214	.	υ
4218	4214	.	u
4218	4222	.	κ
4218	4228	s	κ
4218	4147	s	k
4218	4083	s	U
4218	4238	s	K
4218	4214	.	α
4218	4214	.	a
4218	4141	s	A
4218	4147	s	λ
4218	4147	s	l
4218	4192	s	L
4218	3568	<2s>	<>
4219	4217	.	.
4219	4220	 	 
4219	4217	<~>	<~>
4219	4217	<split-s>	<split-s>
4219	4217	<split-h>	<split-h>
4219	4217	<name2>	<name2>
4219	4237	<aphaerese>	<aphaerese>
4219	4237	<>	<aphaerese>
4219	4217	<elision3>	<elision3>
4219	4237	<>	<elision3>
4219	4217	<elision2>	<elision2>
4219	4237	<>	<elision2>
4219	4217	<elision1>	<elision1>
4219	4237	<>	<elision1>
4219	4217	.	υ
4219	4217	.	u
4219	4224	.	κ
4219	4230	s	κ
4219	4149	s	k
4219	4085	s	U
4219	4184	s	K
4219	4217	.	α
4219	4217	.	a
4219	4143	s	A
4219	4149	s	λ
4219	4149	s	l
4219	4194	s	L
4219	3569	<2s>	<>
4220	4214	.	.
4220	4215	 	 
4220	4214	<~>	<~>
4220	4214	<split-s>	<split-s>
4220	4214	<split-h>	<split-h>
4220	4214	<name2>	<name2>
4220	4218	<aphaerese>	<aphaerese>
4220	4221	<>	<aphaerese>
4220	4214	<elision3>	<elision3>
4220	4221	<>	<elision3>
4220	4214	<elision2>	<elision2>
4220	4221	<>	<elision2>
4220	4214	<elision1>	<elision1>
4220	4221	<>	<elision1>
4220	4211	.	υ
4220	4174	s	υ
4220	4211	.	u
4220	4174	s	u
4220	4222	.	κ
4220	4235	s	κ
4220	4177	s	k
4220	4168	s	U
4220	4236	s	K
4220	4211	.	α
4220	4174	s	α
4220	4211	.	a
4220	4174	s	a
4220	4175	s	A
4220	4177	s	λ
4220	4177	s	l
4220	4178	s	L
4220	3580	<2s>	<>
4221	4214	.	.
4221	4215	 	 
4221	4214	<~>	<~>
4221	4214	<split-s>	<split-s>
4221	4214	<split-h>	<split-h>
4221	4214	<name2>	<name2>
4221	4216	<>	<name>
4221	4218	<aphaerese>	<aphaerese>
4221	4221	<>	<aphaerese>
4221	4214	<elision3>	<elision3>
4221	4221	<>	<elision3>
4221	4214	<elision2>	<elision2>
4221	4221	<>	<elision2>
4221	4214	<elision1>	<elision1>
4221	4221	<>	<elision1>
4221	4211	.	υ
4221	4138	s	υ
4221	4211	.	u
4221	4138	s	u
4221	4222	.	κ
4221	4228	s	κ
4221	4147	s	k
4221	4083	s	U
4221	4234	s	K
4221	4211	.	α
4221	4138	s	α
4221	4211	.	a
4221	4138	s	a
4221	4141	s	A
4221	4147	s	λ
4221	4147	s	l
4221	4150	s	L
4221	3581	<2s>	<>
4222	4223	<>	<name>
4222	4222	<>	<aphaerese>
4222	4225	<elision3>	<elision3>
4222	4222	<>	<elision3>
4222	4225	<elision2>	<elision2>
4222	4222	<>	<elision2>
4222	4225	<elision1>	<elision1>
4222	4222	<>	<elision1>
4222	3565	<2s>	<>
4223	4224	<>	<aphaerese>
4223	4227	<elision3>	<elision3>
4223	4224	<>	<elision3>
4223	4227	<elision2>	<elision2>
4223	4224	<>	<elision2>
4223	4227	<elision1>	<elision1>
4223	4224	<>	<elision1>
4223	3566	<2s>	<>
4224	4222	<>	<aphaerese>
4224	4225	<elision3>	<elision3>
4224	4222	<>	<elision3>
4224	4225	<elision2>	<elision2>
4224	4222	<>	<elision2>
4224	4225	<elision1>	<elision1>
4224	4222	<>	<elision1>
4224	3564	<2s>	<>
4225	4226	<>	<name>
4225	4225	<>	<aphaerese>
4225	4225	<>	<elision3>
4225	4225	<>	<elision2>
4225	4225	<>	<elision1>
4225	4004	s	κ
4225	4004	s	k
4225	4000	s	K
4225	4004	s	λ
4225	4004	s	l
4225	4006	s	L
4225	3426	<2s>	<>
4226	4227	<>	<aphaerese>
4226	4227	<>	<elision3>
4226	4227	<>	<elision2>
4226	4227	<>	<elision1>
4226	4003	s	κ
4226	4003	s	k
4226	4002	s	K
4226	4003	s	λ
4226	4003	s	l
4226	4008	s	L
4226	3427	<2s>	<>
4227	4225	<>	<aphaerese>
4227	4225	<>	<elision3>
4227	4225	<>	<elision2>
4227	4225	<>	<elision1>
4227	4004	s	κ
4227	4004	s	k
4227	4000	s	K
4227	4004	s	λ
4227	4004	s	l
4227	4006	s	L
4227	3425	<2s>	<>
4228	4068	.	.
4228	4068	 	 
4228	4068	<~>	<~>
4228	4068	<split-s>	<split-s>
4228	4068	<split-h>	<split-h>
4228	4068	<name2>	<name2>
4228	4229	<>	<name>
4228	4071	<aphaerese>	<aphaerese>
4228	4228	<>	<aphaerese>
4228	4231	<elision3>	<elision3>
4228	4228	<>	<elision3>
4228	4231	<elision2>	<elision2>
4228	4228	<>	<elision2>
4228	4231	<elision1>	<elision1>
4228	4228	<>	<elision1>
4228	4065	.	υ
4228	4065	.	u
4228	4065	.	κ
4228	4065	.	α
4228	4065	.	a
4228	4065	.	λ
4228	4060	<split-h>	<>
4229	4070	.	.
4229	4070	 	 
4229	4070	<~>	<~>
4229	4070	<split-s>	<split-s>
4229	4070	<split-h>	<split-h>
4229	4070	<name2>	<name2>
4229	4073	<aphaerese>	<aphaerese>
4229	4230	<>	<aphaerese>
4229	4233	<elision3>	<elision3>
4229	4230	<>	<elision3>
4229	4233	<elision2>	<elision2>
4229	4230	<>	<elision2>
4229	4233	<elision1>	<elision1>
4229	4230	<>	<elision1>
4229	4067	.	υ
4229	4067	.	u
4229	4067	.	κ
4229	4067	.	α
4229	4067	.	a
4229	4067	.	λ
4229	4061	<split-h>	<>
4230	4068	.	.
4230	4068	 	 
4230	4068	<~>	<~>
4230	4068	<split-s>	<split-s>
4230	4068	<split-h>	<split-h>
4230	4068	<name2>	<name2>
4230	4071	<aphaerese>	<aphaerese>
4230	4228	<>	<aphaerese>
4230	4231	<elision3>	<elision3>
4230	4228	<>	<elision3>
4230	4231	<elision2>	<elision2>
4230	4228	<>	<elision2>
4230	4231	<elision1>	<elision1>
4230	4228	<>	<elision1>
4230	4065	.	υ
4230	4065	.	u
4230	4065	.	κ
4230	4065	.	α
4230	4065	.	a
4230	4065	.	λ
4230	4059	<split-h>	<>
4231	4068	.	.
4231	4068	 	 
4231	4068	<~>	<~>
4231	4068	<split-s>	<split-s>
4231	4068	<split-h>	<split-h>
4231	4068	<name2>	<name2>
4231	4232	<>	<name>
4231	4071	<aphaerese>	<aphaerese>
4231	4231	<>	<aphaerese>
4231	4068	<elision3>	<elision3>
4231	4231	<>	<elision3>
4231	4068	<elision2>	<elision2>
4231	4231	<>	<elision2>
4231	4068	<elision1>	<elision1>
4231	4231	<>	<elision1>
4231	4065	.	υ
4231	4065	.	u
4231	4074	.	κ
4231	4065	.	α
4231	4065	.	a
4231	4057	<split-h>	<>
4232	4070	.	.
4232	4070	 	 
4232	4070	<~>	<~>
4232	4070	<split-s>	<split-s>
4232	4070	<split-h>	<split-h>
4232	4070	<name2>	<name2>
4232	4073	<aphaerese>	<aphaerese>
4232	4233	<>	<aphaerese>
4232	4070	<elision3>	<elision3>
4232	4233	<>	<elision3>
4232	4070	<elision2>	<elision2>
4232	4233	<>	<elision2>
4232	4070	<elision1>	<elision1>
4232	4233	<>	<elision1>
4232	4067	.	υ
4232	4067	.	u
4232	4076	.	κ
4232	4067	.	α
4232	4067	.	a
4232	4058	<split-h>	<>
4233	4068	.	.
4233	4068	 	 
4233	4068	<~>	<~>
4233	4068	<split-s>	<split-s>
4233	4068	<split-h>	<split-h>
4233	4068	<name2>	<name2>
4233	4071	<aphaerese>	<aphaerese>
4233	4231	<>	<aphaerese>
4233	4068	<elision3>	<elision3>
4233	4231	<>	<elision3>
4233	4068	<elision2>	<elision2>
4233	4231	<>	<elision2>
4233	4068	<elision1>	<elision1>
4233	4231	<>	<elision1>
4233	4065	.	υ
4233	4065	.	u
4233	4074	.	κ
4233	4065	.	α
4233	4065	.	a
4233	4056	<split-h>	<>
4234	4136	<name>	<name>
4234	4089	<>	<name>
4234	4091	<>	<aphaerese>
4234	4091	<>	<elision3>
4234	4091	<>	<elision2>
4234	4091	<>	<elision1>
4234	4134	<split-h>	<>
4234	4092	<A2kl>	<>
4234	4110	<L2kl>	<>
4234	4135	<K2kl>	<>
4235	4068	.	.
4235	4068	 	 
4235	4068	<~>	<~>
4235	4068	<split-s>	<split-s>
4235	4068	<split-h>	<split-h>
4235	4068	<name2>	<name2>
4235	4229	<>	<name>
4235	4071	<aphaerese>	<aphaerese>
4235	4228	<>	<aphaerese>
4235	4231	<elision3>	<elision3>
4235	4228	<>	<elision3>
4235	4231	<elision2>	<elision2>
4235	4228	<>	<elision2>
4235	4231	<elision1>	<elision1>
4235	4228	<>	<elision1>
4235	4065	.	υ
4235	4065	.	u
4235	4065	.	κ
4235	4065	.	α
4235	4065	.	a
4235	4065	.	λ
4235	4165	<split-h>	<>
4236	4136	<name>	<name>
4236	4089	<>	<name>
4236	4091	<>	<aphaerese>
4236	4091	<>	<elision3>
4236	4091	<>	<elision2>
4236	4091	<>	<elision1>
4236	4134	<split-h>	<>
4236	4092	<A2kl>	<>
4236	4110	<L2kl>	<>
4236	4172	<K2kl>	<>
4237	4214	.	.
4237	4215	 	 
4237	4214	<~>	<~>
4237	4214	<split-s>	<split-s>
4237	4214	<split-h>	<split-h>
4237	4214	<name2>	<name2>
4237	4218	<aphaerese>	<aphaerese>
4237	4218	<>	<aphaerese>
4237	4214	<elision3>	<elision3>
4237	4218	<>	<elision3>
4237	4214	<elision2>	<elision2>
4237	4218	<>	<elision2>
4237	4214	<elision1>	<elision1>
4237	4218	<>	<elision1>
4237	4214	.	υ
4237	4214	.	u
4237	4222	.	κ
4237	4228	s	κ
4237	4147	s	k
4237	4083	s	U
4237	4238	s	K
4237	4214	.	α
4237	4214	.	a
4237	4141	s	A
4237	4147	s	λ
4237	4147	s	l
4237	4192	s	L
4237	3567	<2s>	<>
4238	4136	<name>	<name>
4238	4183	<>	<name>
4238	4185	<>	<aphaerese>
4238	4185	<>	<elision3>
4238	4185	<>	<elision2>
4238	4185	<>	<elision1>
4238	4134	<split-h>	<>
4238	4186	<L2kl>	<>
4238	4135	<K2kl>	<>
4239	4214	.	.
4239	4215	 	 
4239	4214	<~>	<~>
4239	4214	<split-s>	<split-s>
4239	4214	<split-h>	<split-h>
4239	4214	<name2>	<name2>
4239	4218	<aphaerese>	<aphaerese>
4239	4221	<>	<aphaerese>
4239	4214	<elision3>	<elision3>
4239	4221	<>	<elision3>
4239	4214	<elision2>	<elision2>
4239	4221	<>	<elision2>
4239	4214	<elision1>	<elision1>
4239	4221	<>	<elision1>
4239	4211	.	υ
4239	4138	s	υ
4239	4211	.	u
4239	4138	s	u
4239	4222	.	κ
4239	4228	s	κ
4239	4147	s	k
4239	4083	s	U
4239	4234	s	K
4239	4211	.	α
4239	4138	s	α
4239	4211	.	a
4239	4138	s	a
4239	4141	s	A
4239	4147	s	λ
4239	4147	s	l
4239	4150	s	L
4239	3580	<2s>	<>
4240	4217	.	.
4240	4220	 	 
4240	4217	<~>	<~>
4240	4217	<split-s>	<split-s>
4240	4217	<split-h>	<split-h>
4240	4217	<name2>	<name2>
4240	4237	<aphaerese>	<aphaerese>
4240	4217	<>	<aphaerese>
4240	4217	<elision3>	<elision3>
4240	4217	<>	<elision3>
4240	4217	<elision2>	<elision2>
4240	4217	<>	<elision2>
4240	4217	<elision1>	<elision1>
4240	4217	<>	<elision1>
4240	4213	.	υ
4240	4140	s	υ
4240	4213	.	u
4240	4140	s	u
4240	4224	.	κ
4240	4230	s	κ
4240	4149	s	k
4240	4085	s	U
4240	4184	s	K
4240	4213	.	α
4240	4140	s	α
4240	4213	.	a
4240	4140	s	a
4240	4143	s	A
4240	4149	s	λ
4240	4149	s	l
4240	4194	s	L
4240	3582	<2s>	<>
4241	4242	<name>	<name>
4241	4243	<>	<name>
4241	4245	<>	<aphaerese>
4241	4245	<>	<elision3>
4241	4245	<>	<elision2>
4241	4245	<>	<elision1>
4241	3898	<2s>	<>
4241	4246	<L2kl>	<>
4241	4255	<K2kl>	<>
4242	4184	s	k
4242	4194	s	l
4242	3788	<2s>	<>
4243	4244	<>	<aphaerese>
4243	4244	<>	<elision3>
4243	4244	<>	<elision2>
4243	4244	<>	<elision1>
4243	4247	<L2kl>	<>
4243	4250	<K2kl>	<>
4244	4245	<>	<aphaerese>
4244	4245	<>	<elision3>
4244	4245	<>	<elision2>
4244	4245	<>	<elision1>
4244	4248	<L2kl>	<>
4244	4251	<K2kl>	<>
4245	4243	<>	<name>
4245	4245	<>	<aphaerese>
4245	4245	<>	<elision3>
4245	4245	<>	<elision2>
4245	4245	<>	<elision1>
4245	4246	<L2kl>	<>
4245	4249	<K2kl>	<>
4246	4247	<>	<name>
4246	4246	<>	<aphaerese>
4246	4246	<>	<elision3>
4246	4246	<>	<elision2>
4246	4246	<>	<elision1>
4246	4211	.	κ
4246	4211	.	λ
4246	3957	<2s>	<>
4247	4248	<>	<aphaerese>
4247	4248	<>	<elision3>
4247	4248	<>	<elision2>
4247	4248	<>	<elision1>
4247	4213	.	κ
4247	4213	.	λ
4247	3958	<2s>	<>
4248	4246	<>	<aphaerese>
4248	4246	<>	<elision3>
4248	4246	<>	<elision2>
4248	4246	<>	<elision1>
4248	4211	.	κ
4248	4211	.	λ
4248	3956	<2s>	<>
4249	4214	.	.
4249	4215	 	 
4249	4214	<~>	<~>
4249	4214	<split-s>	<split-s>
4249	4214	<split-h>	<split-h>
4249	4214	<name2>	<name2>
4249	4250	<>	<name>
4249	4218	<aphaerese>	<aphaerese>
4249	4249	<>	<aphaerese>
4249	4214	<elision3>	<elision3>
4249	4249	<>	<elision3>
4249	4214	<elision2>	<elision2>
4249	4249	<>	<elision2>
4249	4214	<elision1>	<elision1>
4249	4249	<>	<elision1>
4249	4211	.	υ
4249	4138	s	υ
4249	4211	.	u
4249	4138	s	u
4249	4252	s	κ
4249	4147	s	k
4249	4083	s	U
4249	4238	s	K
4249	4211	.	α
4249	4138	s	α
4249	4211	.	a
4249	4138	s	a
4249	4141	s	A
4249	4252	s	λ
4249	4147	s	l
4249	4192	s	L
4249	3893	<2s>	<>
4250	4217	.	.
4250	4220	 	 
4250	4217	<~>	<~>
4250	4217	<split-s>	<split-s>
4250	4217	<split-h>	<split-h>
4250	4217	<name2>	<name2>
4250	4237	<aphaerese>	<aphaerese>
4250	4251	<>	<aphaerese>
4250	4217	<elision3>	<elision3>
4250	4251	<>	<elision3>
4250	4217	<elision2>	<elision2>
4250	4251	<>	<elision2>
4250	4217	<elision1>	<elision1>
4250	4251	<>	<elision1>
4250	4213	.	υ
4250	4140	s	υ
4250	4213	.	u
4250	4140	s	u
4250	4254	s	κ
4250	4149	s	k
4250	4085	s	U
4250	4184	s	K
4250	4213	.	α
4250	4140	s	α
4250	4213	.	a
4250	4140	s	a
4250	4143	s	A
4250	4254	s	λ
4250	4149	s	l
4250	4194	s	L
4250	3894	<2s>	<>
4251	4214	.	.
4251	4215	 	 
4251	4214	<~>	<~>
4251	4214	<split-s>	<split-s>
4251	4214	<split-h>	<split-h>
4251	4214	<name2>	<name2>
4251	4218	<aphaerese>	<aphaerese>
4251	4249	<>	<aphaerese>
4251	4214	<elision3>	<elision3>
4251	4249	<>	<elision3>
4251	4214	<elision2>	<elision2>
4251	4249	<>	<elision2>
4251	4214	<elision1>	<elision1>
4251	4249	<>	<elision1>
4251	4211	.	υ
4251	4138	s	υ
4251	4211	.	u
4251	4138	s	u
4251	4252	s	κ
4251	4147	s	k
4251	4083	s	U
4251	4238	s	K
4251	4211	.	α
4251	4138	s	α
4251	4211	.	a
4251	4138	s	a
4251	4141	s	A
4251	4252	s	λ
4251	4147	s	l
4251	4192	s	L
4251	3892	<2s>	<>
4252	4068	.	.
4252	4068	 	 
4252	4068	<~>	<~>
4252	4068	<split-s>	<split-s>
4252	4068	<split-h>	<split-h>
4252	4068	<name2>	<name2>
4252	4253	<>	<name>
4252	4071	<aphaerese>	<aphaerese>
4252	4252	<>	<aphaerese>
4252	4252	<>	<elision3>
4252	4252	<>	<elision2>
4252	4252	<>	<elision1>
4252	4065	.	υ
4252	4065	.	u
4252	4065	.	κ
4252	4065	.	α
4252	4065	.	a
4252	4065	.	λ
4252	4206	<split-h>	<>
4253	4070	.	.
4253	4070	 	 
4253	4070	<~>	<~>
4253	4070	<split-s>	<split-s>
4253	4070	<split-h>	<split-h>
4253	4070	<name2>	<name2>
4253	4073	<aphaerese>	<aphaerese>
4253	4254	<>	<aphaerese>
4253	4254	<>	<elision3>
4253	4254	<>	<elision2>
4253	4254	<>	<elision1>
4253	4067	.	υ
4253	4067	.	u
4253	4067	.	κ
4253	4067	.	α
4253	4067	.	a
4253	4067	.	λ
4253	4207	<split-h>	<>
4254	4068	.	.
4254	4068	 	 
4254	4068	<~>	<~>
4254	4068	<split-s>	<split-s>
4254	4068	<split-h>	<split-h>
4254	4068	<name2>	<name2>
4254	4071	<aphaerese>	<aphaerese>
4254	4252	<>	<aphaerese>
4254	4252	<>	<elision3>
4254	4252	<>	<elision2>
4254	4252	<>	<elision1>
4254	4065	.	υ
4254	4065	.	u
4254	4065	.	κ
4254	4065	.	α
4254	4065	.	a
4254	4065	.	λ
4254	4205	<split-h>	<>
4255	4214	.	.
4255	4215	 	 
4255	4214	<~>	<~>
4255	4214	<split-s>	<split-s>
4255	4214	<split-h>	<split-h>
4255	4214	<name2>	<name2>
4255	4242	<name2>	<name>
4255	4250	<>	<name>
4255	4218	<aphaerese>	<aphaerese>
4255	4249	<>	<aphaerese>
4255	4214	<elision3>	<elision3>
4255	4249	<>	<elision3>
4255	4214	<elision2>	<elision2>
4255	4249	<>	<elision2>
4255	4214	<elision1>	<elision1>
4255	4249	<>	<elision1>
4255	4211	.	υ
4255	4138	s	υ
4255	4211	.	u
4255	4138	s	u
4255	4252	s	κ
4255	4147	s	k
4255	4083	s	U
4255	4238	s	K
4255	4211	.	α
4255	4138	s	α
4255	4211	.	a
4255	4138	s	a
4255	4141	s	A
4255	4252	s	λ
4255	4147	s	l
4255	4192	s	L
4255	3902	<2s>	<>
4256	4214	.	.
4256	4215	 	 
4256	4214	<~>	<~>
4256	4214	<split-s>	<split-s>
4256	4214	<split-h>	<split-h>
4256	4214	<name2>	<name2>
4256	4257	<>	<name>
4256	4218	<aphaerese>	<aphaerese>
4256	4256	<>	<aphaerese>
4256	4214	<elision3>	<elision3>
4256	4256	<>	<elision3>
4256	4214	<elision2>	<elision2>
4256	4256	<>	<elision2>
4256	4214	<elision1>	<elision1>
4256	4256	<>	<elision1>
4256	4211	.	υ
4256	4138	s	υ
4256	4211	.	u
4256	4138	s	u
4256	4211	.	κ
4256	4252	s	κ
4256	4147	s	k
4256	4083	s	U
4256	4238	s	K
4256	4211	.	α
4256	4138	s	α
4256	4211	.	a
4256	4138	s	a
4256	4141	s	A
4256	4211	.	λ
4256	4252	s	λ
4256	4147	s	l
4256	4192	s	L
4256	3778	<2s>	<>
4257	4217	.	.
4257	4220	 	 
4257	4217	<~>	<~>
4257	4217	<split-s>	<split-s>
4257	4217	<split-h>	<split-h>
4257	4217	<name2>	<name2>
4257	4237	<aphaerese>	<aphaerese>
4257	4258	<>	<aphaerese>
4257	4217	<elision3>	<elision3>
4257	4258	<>	<elision3>
4257	4217	<elision2>	<elision2>
4257	4258	<>	<elision2>
4257	4217	<elision1>	<elision1>
4257	4258	<>	<elision1>
4257	4213	.	υ
4257	4140	s	υ
4257	4213	.	u
4257	4140	s	u
4257	4213	.	κ
4257	4254	s	κ
4257	4149	s	k
4257	4085	s	U
4257	4184	s	K
4257	4213	.	α
4257	4140	s	α
4257	4213	.	a
4257	4140	s	a
4257	4143	s	A
4257	4213	.	λ
4257	4254	s	λ
4257	4149	s	l
4257	4194	s	L
4257	3779	<2s>	<>
4258	4214	.	.
4258	4215	 	 
4258	4214	<~>	<~>
4258	4214	<split-s>	<split-s>
4258	4214	<split-h>	<split-h>
4258	4214	<name2>	<name2>
4258	4218	<aphaerese>	<aphaerese>
4258	4256	<>	<aphaerese>
4258	4214	<elision3>	<elision3>
4258	4256	<>	<elision3>
4258	4214	<elision2>	<elision2>
4258	4256	<>	<elision2>
4258	4214	<elision1>	<elision1>
4258	4256	<>	<elision1>
4258	4211	.	υ
4258	4138	s	υ
4258	4211	.	u
4258	4138	s	u
4258	4211	.	κ
4258	4252	s	κ
4258	4147	s	k
4258	4083	s	U
4258	4238	s	K
4258	4211	.	α
4258	4138	s	α
4258	4211	.	a
4258	4138	s	a
4258	4141	s	A
4258	4211	.	λ
4258	4252	s	λ
4258	4147	s	l
4258	4192	s	L
4258	3777	<2s>	<>
4259	4242	<name>	<name>
4259	4260	<>	<name>
4259	4262	<>	<aphaerese>
4259	4262	<>	<elision3>
4259	4262	<>	<elision2>
4259	4262	<>	<elision1>
4259	3898	<2s>	<>
4259	4263	<L2kl>	<>
4260	4261	<>	<aphaerese>
4260	4261	<>	<elision3>
4260	4261	<>	<elision2>
4260	4261	<>	<elision1>
4260	4257	<L2kl>	<>
4261	4262	<>	<aphaerese>
4261	4262	<>	<elision3>
4261	4262	<>	<elision2>
4261	4262	<>	<elision1>
4261	4258	<L2kl>	<>
4262	4260	<>	<name>
4262	4262	<>	<aphaerese>
4262	4262	<>	<elision3>
4262	4262	<>	<elision2>
4262	4262	<>	<elision1>
4262	4256	<L2kl>	<>
4263	4214	.	.
4263	4215	 	 
4263	4214	<~>	<~>
4263	4214	<split-s>	<split-s>
4263	4214	<split-h>	<split-h>
4263	4214	<name2>	<name2>
4263	4242	<name2>	<name>
4263	4257	<>	<name>
4263	4218	<aphaerese>	<aphaerese>
4263	4256	<>	<aphaerese>
4263	4214	<elision3>	<elision3>
4263	4256	<>	<elision3>
4263	4214	<elision2>	<elision2>
4263	4256	<>	<elision2>
4263	4214	<elision1>	<elision1>
4263	4256	<>	<elision1>
4263	4211	.	υ
4263	4138	s	υ
4263	4211	.	u
4263	4138	s	u
4263	4211	.	κ
4263	4252	s	κ
4263	4147	s	k
4263	4083	s	U
4263	4238	s	K
4263	4211	.	α
4263	4138	s	α
4263	4211	.	a
4263	4138	s	a
4263	4141	s	A
4263	4211	.	λ
4263	4252	s	λ
4263	4147	s	l
4263	4192	s	L
4263	3967	<2s>	<>
4264	4265	<>	<name>
4264	4264	<>	<aphaerese>
4264	4264	<>	<elision3>
4264	4264	<>	<elision2>
4264	4264	<>	<elision1>
4264	4267	s	κ
4264	4392	s	k
4264	4410	s	K
4264	4267	s	λ
4264	4423	s	l
4264	4426	s	L
4264	3601	<1s>	<>
4265	4266	<>	<aphaerese>
4265	4266	<>	<elision3>
4265	4266	<>	<elision2>
4265	4266	<>	<elision1>
4265	4388	s	κ
4265	4394	s	k
4265	4413	s	K
4265	4388	s	λ
4265	4425	s	l
4265	4428	s	L
4265	3602	<1s>	<>
4266	4264	<>	<aphaerese>
4266	4264	<>	<elision3>
4266	4264	<>	<elision2>
4266	4264	<>	<elision1>
4266	4267	s	κ
4266	4392	s	k
4266	4410	s	K
4266	4267	s	λ
4266	4423	s	l
4266	4426	s	L
4266	3600	<1s>	<>
4267	4268	.	.
4267	4269	 	 
4267	4268	<~>	<~>
4267	4268	<split-s>	<split-s>
4267	4268	<split-h>	<split-h>
4267	4268	<name2>	<name2>
4267	4387	<>	<name>
4267	4272	<aphaerese>	<aphaerese>
4267	4267	<>	<aphaerese>
4267	4267	<>	<elision3>
4267	4267	<>	<elision2>
4267	4267	<>	<elision1>
4267	4276	.	υ
4267	4279	s	υ
4267	4276	.	u
4267	4279	s	u
4267	4276	.	κ
4267	4389	s	κ
4267	4318	s	k
4267	4321	s	U
4267	4373	s	K
4267	4276	.	α
4267	4279	s	α
4267	4276	.	a
4267	4279	s	a
4267	4351	s	A
4267	4276	.	λ
4267	4389	s	λ
4267	4318	s	l
4267	4380	s	L
4267	3992	<2s>	<>
4268	4268	.	.
4268	4269	 	 
4268	4268	<~>	<~>
4268	4268	<split-s>	<split-s>
4268	4268	<split-h>	<split-h>
4268	4268	<name2>	<name2>
4268	4386	<>	<name>
4268	4272	<aphaerese>	<aphaerese>
4268	4268	<>	<aphaerese>
4268	4268	<elision3>	<elision3>
4268	4268	<>	<elision3>
4268	4268	<elision2>	<elision2>
4268	4268	<>	<elision2>
4268	4268	<elision1>	<elision1>
4268	4268	<>	<elision1>
4268	4276	.	υ
4268	4279	s	υ
4268	4276	.	u
4268	4279	s	u
4268	4297	.	κ
4268	4312	s	κ
4268	4318	s	k
4268	4321	s	U
4268	4373	s	K
4268	4276	.	α
4268	4279	s	α
4268	4276	.	a
4268	4279	s	a
4268	4351	s	A
4268	4318	s	λ
4268	4318	s	l
4268	4380	s	L
4268	3581	<2s>	<>
4269	4268	.	.
4269	4269	 	 
4269	4268	<~>	<~>
4269	4268	<split-s>	<split-s>
4269	4268	<split-h>	<split-h>
4269	4268	<name2>	<name2>
4269	4270	<>	<name>
4269	4272	<aphaerese>	<aphaerese>
4269	4275	<>	<aphaerese>
4269	4268	<elision3>	<elision3>
4269	4275	<>	<elision3>
4269	4268	<elision2>	<elision2>
4269	4275	<>	<elision2>
4269	4268	<elision1>	<elision1>
4269	4275	<>	<elision1>
4269	4276	.	υ
4269	4362	s	υ
4269	4276	.	u
4269	4362	s	u
4269	4297	.	κ
4269	4363	s	κ
4269	4364	s	k
4269	4365	s	U
4269	4367	s	K
4269	4276	.	α
4269	4362	s	α
4269	4276	.	a
4269	4362	s	a
4269	4369	s	A
4269	4364	s	λ
4269	4364	s	l
4269	4370	s	L
4269	3581	<2s>	<>
4270	4271	.	.
4270	4274	 	 
4270	4271	<~>	<~>
4270	4271	<split-s>	<split-s>
4270	4271	<split-h>	<split-h>
4270	4271	<name2>	<name2>
4270	4372	<aphaerese>	<aphaerese>
4270	4385	<>	<aphaerese>
4270	4271	<elision3>	<elision3>
4270	4385	<>	<elision3>
4270	4271	<elision2>	<elision2>
4270	4385	<>	<elision2>
4270	4271	<elision1>	<elision1>
4270	4385	<>	<elision1>
4270	4278	.	υ
4270	4296	s	υ
4270	4278	.	u
4270	4296	s	u
4270	4299	.	κ
4270	4314	s	κ
4270	4320	s	k
4270	4323	s	U
4270	4327	s	K
4270	4278	.	α
4270	4296	s	α
4270	4278	.	a
4270	4296	s	a
4270	4353	s	A
4270	4320	s	λ
4270	4320	s	l
4270	4356	s	L
4270	3582	<2s>	<>
4271	4268	.	.
4271	4269	 	 
4271	4268	<~>	<~>
4271	4268	<split-s>	<split-s>
4271	4268	<split-h>	<split-h>
4271	4268	<name2>	<name2>
4271	4272	<aphaerese>	<aphaerese>
4271	4268	<>	<aphaerese>
4271	4268	<elision3>	<elision3>
4271	4268	<>	<elision3>
4271	4268	<elision2>	<elision2>
4271	4268	<>	<elision2>
4271	4268	<elision1>	<elision1>
4271	4268	<>	<elision1>
4271	4276	.	υ
4271	4279	s	υ
4271	4276	.	u
4271	4279	s	u
4271	4297	.	κ
4271	4312	s	κ
4271	4318	s	k
4271	4321	s	U
4271	4373	s	K
4271	4276	.	α
4271	4279	s	α
4271	4276	.	a
4271	4279	s	a
4271	4351	s	A
4271	4318	s	λ
4271	4318	s	l
4271	4380	s	L
4271	3580	<2s>	<>
4272	4268	.	.
4272	4269	 	 
4272	4268	<~>	<~>
4272	4268	<split-s>	<split-s>
4272	4268	<split-h>	<split-h>
4272	4268	<name2>	<name2>
4272	4273	<>	<name>
4272	4272	<aphaerese>	<aphaerese>
4272	4272	<>	<aphaerese>
4272	4268	<elision3>	<elision3>
4272	4272	<>	<elision3>
4272	4268	<elision2>	<elision2>
4272	4272	<>	<elision2>
4272	4268	<elision1>	<elision1>
4272	4272	<>	<elision1>
4272	4268	.	υ
4272	4268	.	u
4272	4297	.	κ
4272	4312	s	κ
4272	4318	s	k
4272	4321	s	U
4272	4373	s	K
4272	4268	.	α
4272	4268	.	a
4272	4351	s	A
4272	4318	s	λ
4272	4318	s	l
4272	4380	s	L
4272	3568	<2s>	<>
4273	4271	.	.
4273	4274	 	 
4273	4271	<~>	<~>
4273	4271	<split-s>	<split-s>
4273	4271	<split-h>	<split-h>
4273	4271	<name2>	<name2>
4273	4372	<aphaerese>	<aphaerese>
4273	4372	<>	<aphaerese>
4273	4271	<elision3>	<elision3>
4273	4372	<>	<elision3>
4273	4271	<elision2>	<elision2>
4273	4372	<>	<elision2>
4273	4271	<elision1>	<elision1>
4273	4372	<>	<elision1>
4273	4271	.	υ
4273	4271	.	u
4273	4299	.	κ
4273	4314	s	κ
4273	4320	s	k
4273	4323	s	U
4273	4375	s	K
4273	4271	.	α
4273	4271	.	a
4273	4353	s	A
4273	4320	s	λ
4273	4320	s	l
4273	4382	s	L
4273	3569	<2s>	<>
4274	4268	.	.
4274	4269	 	 
4274	4268	<~>	<~>
4274	4268	<split-s>	<split-s>
4274	4268	<split-h>	<split-h>
4274	4268	<name2>	<name2>
4274	4272	<aphaerese>	<aphaerese>
4274	4275	<>	<aphaerese>
4274	4268	<elision3>	<elision3>
4274	4275	<>	<elision3>
4274	4268	<elision2>	<elision2>
4274	4275	<>	<elision2>
4274	4268	<elision1>	<elision1>
4274	4275	<>	<elision1>
4274	4276	.	υ
4274	4362	s	υ
4274	4276	.	u
4274	4362	s	u
4274	4297	.	κ
4274	4363	s	κ
4274	4364	s	k
4274	4365	s	U
4274	4367	s	K
4274	4276	.	α
4274	4362	s	α
4274	4276	.	a
4274	4362	s	a
4274	4369	s	A
4274	4364	s	λ
4274	4364	s	l
4274	4370	s	L
4274	3580	<2s>	<>
4275	4268	.	.
4275	4269	 	 
4275	4268	<~>	<~>
4275	4268	<split-s>	<split-s>
4275	4268	<split-h>	<split-h>
4275	4268	<name2>	<name2>
4275	4270	<>	<name>
4275	4272	<aphaerese>	<aphaerese>
4275	4275	<>	<aphaerese>
4275	4268	<elision3>	<elision3>
4275	4275	<>	<elision3>
4275	4268	<elision2>	<elision2>
4275	4275	<>	<elision2>
4275	4268	<elision1>	<elision1>
4275	4275	<>	<elision1>
4275	4276	.	υ
4275	4279	s	υ
4275	4276	.	u
4275	4279	s	u
4275	4297	.	κ
4275	4312	s	κ
4275	4318	s	k
4275	4321	s	U
4275	4324	s	K
4275	4276	.	α
4275	4279	s	α
4275	4276	.	a
4275	4279	s	a
4275	4351	s	A
4275	4318	s	λ
4275	4318	s	l
4275	4354	s	L
4275	3581	<2s>	<>
4276	4277	<>	<name>
4276	4276	<>	<aphaerese>
4276	4268	<elision3>	<elision3>
4276	4276	<>	<elision3>
4276	4268	<elision2>	<elision2>
4276	4276	<>	<elision2>
4276	4268	<elision1>	<elision1>
4276	4276	<>	<elision1>
4276	212	<2s>	<>
4277	4278	<>	<aphaerese>
4277	4271	<elision3>	<elision3>
4277	4278	<>	<elision3>
4277	4271	<elision2>	<elision2>
4277	4278	<>	<elision2>
4277	4271	<elision1>	<elision1>
4277	4278	<>	<elision1>
4277	213	<2s>	<>
4278	4276	<>	<aphaerese>
4278	4268	<elision3>	<elision3>
4278	4276	<>	<elision3>
4278	4268	<elision2>	<elision2>
4278	4276	<>	<elision2>
4278	4268	<elision1>	<elision1>
4278	4276	<>	<elision1>
4278	211	<2s>	<>
4279	4280	.	.
4279	4280	 	 
4279	4280	<~>	<~>
4279	4280	<split-s>	<split-s>
4279	4280	<split-h>	<split-h>
4279	4280	<name2>	<name2>
4279	4295	<>	<name>
4279	4283	<aphaerese>	<aphaerese>
4279	4279	<>	<aphaerese>
4279	4279	<>	<elision3>
4279	4279	<>	<elision2>
4279	4279	<>	<elision1>
4279	4292	.	υ
4279	4292	.	u
4279	4286	.	κ
4279	4292	.	α
4279	4292	.	a
4279	3977	<split-s>	<>
4280	4280	.	.
4280	4280	 	 
4280	4280	<~>	<~>
4280	4280	<split-s>	<split-s>
4280	4280	<split-h>	<split-h>
4280	4280	<name2>	<name2>
4280	4281	<>	<name>
4280	4283	<aphaerese>	<aphaerese>
4280	4280	<>	<aphaerese>
4280	4280	<elision3>	<elision3>
4280	4280	<>	<elision3>
4280	4280	<elision2>	<elision2>
4280	4280	<>	<elision2>
4280	4280	<elision1>	<elision1>
4280	4280	<>	<elision1>
4280	4292	.	υ
4280	4292	.	u
4280	4286	.	κ
4280	4292	.	α
4280	4292	.	a
4280	3923	<split-s>	<>
4281	4282	.	.
4281	4282	 	 
4281	4282	<~>	<~>
4281	4282	<split-s>	<split-s>
4281	4282	<split-h>	<split-h>
4281	4282	<name2>	<name2>
4281	4285	<aphaerese>	<aphaerese>
4281	4282	<>	<aphaerese>
4281	4282	<elision3>	<elision3>
4281	4282	<>	<elision3>
4281	4282	<elision2>	<elision2>
4281	4282	<>	<elision2>
4281	4282	<elision1>	<elision1>
4281	4282	<>	<elision1>
4281	4294	.	υ
4281	4294	.	u
4281	4288	.	κ
4281	4294	.	α
4281	4294	.	a
4281	3924	<split-s>	<>
4282	4280	.	.
4282	4280	 	 
4282	4280	<~>	<~>
4282	4280	<split-s>	<split-s>
4282	4280	<split-h>	<split-h>
4282	4280	<name2>	<name2>
4282	4283	<aphaerese>	<aphaerese>
4282	4280	<>	<aphaerese>
4282	4280	<elision3>	<elision3>
4282	4280	<>	<elision3>
4282	4280	<elision2>	<elision2>
4282	4280	<>	<elision2>
4282	4280	<elision1>	<elision1>
4282	4280	<>	<elision1>
4282	4292	.	υ
4282	4292	.	u
4282	4286	.	κ
4282	4292	.	α
4282	4292	.	a
4282	3925	<split-s>	<>
4283	4280	.	.
4283	4280	 	 
4283	4280	<~>	<~>
4283	4280	<split-s>	<split-s>
4283	4280	<split-h>	<split-h>
4283	4280	<name2>	<name2>
4283	4284	<>	<name>
4283	4283	<aphaerese>	<aphaerese>
4283	4283	<>	<aphaerese>
4283	4280	<elision3>	<elision3>
4283	4283	<>	<elision3>
4283	4280	<elision2>	<elision2>
4283	4283	<>	<elision2>
4283	4280	<elision1>	<elision1>
4283	4283	<>	<elision1>
4283	4280	.	υ
4283	4280	.	u
4283	4286	.	κ
4283	4280	.	α
4283	4280	.	a
4283	3970	<split-s>	<>
4284	4282	.	.
4284	4282	 	 
4284	4282	<~>	<~>
4284	4282	<split-s>	<split-s>
4284	4282	<split-h>	<split-h>
4284	4282	<name2>	<name2>
4284	4285	<aphaerese>	<aphaerese>
4284	4285	<>	<aphaerese>
4284	4282	<elision3>	<elision3>
4284	4285	<>	<elision3>
4284	4282	<elision2>	<elision2>
4284	4285	<>	<elision2>
4284	4282	<elision1>	<elision1>
4284	4285	<>	<elision1>
4284	4282	.	υ
4284	4282	.	u
4284	4288	.	κ
4284	4282	.	α
4284	4282	.	a
4284	3971	<split-s>	<>
4285	4280	.	.
4285	4280	 	 
4285	4280	<~>	<~>
4285	4280	<split-s>	<split-s>
4285	4280	<split-h>	<split-h>
4285	4280	<name2>	<name2>
4285	4283	<aphaerese>	<aphaerese>
4285	4283	<>	<aphaerese>
4285	4280	<elision3>	<elision3>
4285	4283	<>	<elision3>
4285	4280	<elision2>	<elision2>
4285	4283	<>	<elision2>
4285	4280	<elision1>	<elision1>
4285	4283	<>	<elision1>
4285	4280	.	υ
4285	4280	.	u
4285	4286	.	κ
4285	4280	.	α
4285	4280	.	a
4285	3969	<split-s>	<>
4286	4287	<>	<name>
4286	4286	<>	<aphaerese>
4286	4289	<elision3>	<elision3>
4286	4286	<>	<elision3>
4286	4289	<elision2>	<elision2>
4286	4286	<>	<elision2>
4286	4289	<elision1>	<elision1>
4286	4286	<>	<elision1>
4286	3660	<split-s>	<>
4287	4288	<>	<aphaerese>
4287	4291	<elision3>	<elision3>
4287	4288	<>	<elision3>
4287	4291	<elision2>	<elision2>
4287	4288	<>	<elision2>
4287	4291	<elision1>	<elision1>
4287	4288	<>	<elision1>
4287	3661	<split-s>	<>
4288	4286	<>	<aphaerese>
4288	4289	<elision3>	<elision3>
4288	4286	<>	<elision3>
4288	4289	<elision2>	<elision2>
4288	4286	<>	<elision2>
4288	4289	<elision1>	<elision1>
4288	4286	<>	<elision1>
4288	3659	<split-s>	<>
4289	4290	<>	<name>
4289	4289	<>	<aphaerese>
4289	4289	<>	<elision3>
4289	4289	<>	<elision2>
4289	4289	<>	<elision1>
4289	3657	<split-s>	<>
4290	4291	<>	<aphaerese>
4290	4291	<>	<elision3>
4290	4291	<>	<elision2>
4290	4291	<>	<elision1>
4290	3658	<split-s>	<>
4291	4289	<>	<aphaerese>
4291	4289	<>	<elision3>
4291	4289	<>	<elision2>
4291	4289	<>	<elision1>
4291	3656	<split-s>	<>
4292	4293	<>	<name>
4292	4292	<>	<aphaerese>
4292	4280	<elision3>	<elision3>
4292	4292	<>	<elision3>
4292	4280	<elision2>	<elision2>
4292	4292	<>	<elision2>
4292	4280	<elision1>	<elision1>
4292	4292	<>	<elision1>
4292	3410	<split-s>	<>
4293	4294	<>	<aphaerese>
4293	4282	<elision3>	<elision3>
4293	4294	<>	<elision3>
4293	4282	<elision2>	<elision2>
4293	4294	<>	<elision2>
4293	4282	<elision1>	<elision1>
4293	4294	<>	<elision1>
4293	3411	<split-s>	<>
4294	4292	<>	<aphaerese>
4294	4280	<elision3>	<elision3>
4294	4292	<>	<elision3>
4294	4280	<elision2>	<elision2>
4294	4292	<>	<elision2>
4294	4280	<elision1>	<elision1>
4294	4292	<>	<elision1>
4294	3409	<split-s>	<>
4295	4282	.	.
4295	4282	 	 
4295	4282	<~>	<~>
4295	4282	<split-s>	<split-s>
4295	4282	<split-h>	<split-h>
4295	4282	<name2>	<name2>
4295	4285	<aphaerese>	<aphaerese>
4295	4296	<>	<aphaerese>
4295	4296	<>	<elision3>
4295	4296	<>	<elision2>
4295	4296	<>	<elision1>
4295	4294	.	υ
4295	4294	.	u
4295	4288	.	κ
4295	4294	.	α
4295	4294	.	a
4295	3978	<split-s>	<>
4296	4280	.	.
4296	4280	 	 
4296	4280	<~>	<~>
4296	4280	<split-s>	<split-s>
4296	4280	<split-h>	<split-h>
4296	4280	<name2>	<name2>
4296	4283	<aphaerese>	<aphaerese>
4296	4279	<>	<aphaerese>
4296	4279	<>	<elision3>
4296	4279	<>	<elision2>
4296	4279	<>	<elision1>
4296	4292	.	υ
4296	4292	.	u
4296	4286	.	κ
4296	4292	.	α
4296	4292	.	a
4296	3976	<split-s>	<>
4297	4298	<>	<name>
4297	4297	<>	<aphaerese>
4297	4300	<elision3>	<elision3>
4297	4297	<>	<elision3>
4297	4300	<elision2>	<elision2>
4297	4297	<>	<elision2>
4297	4300	<elision1>	<elision1>
4297	4297	<>	<elision1>
4297	3565	<2s>	<>
4298	4299	<>	<aphaerese>
4298	4302	<elision3>	<elision3>
4298	4299	<>	<elision3>
4298	4302	<elision2>	<elision2>
4298	4299	<>	<elision2>
4298	4302	<elision1>	<elision1>
4298	4299	<>	<elision1>
4298	3566	<2s>	<>
4299	4297	<>	<aphaerese>
4299	4300	<elision3>	<elision3>
4299	4297	<>	<elision3>
4299	4300	<elision2>	<elision2>
4299	4297	<>	<elision2>
4299	4300	<elision1>	<elision1>
4299	4297	<>	<elision1>
4299	3564	<2s>	<>
4300	4301	<>	<name>
4300	4300	<>	<aphaerese>
4300	4300	<>	<elision3>
4300	4300	<>	<elision2>
4300	4300	<>	<elision1>
4300	4303	s	κ
4300	4303	s	k
4300	4306	s	K
4300	4303	s	λ
4300	4303	s	l
4300	4309	s	L
4300	3426	<2s>	<>
4301	4302	<>	<aphaerese>
4301	4302	<>	<elision3>
4301	4302	<>	<elision2>
4301	4302	<>	<elision1>
4301	4305	s	κ
4301	4305	s	k
4301	4308	s	K
4301	4305	s	λ
4301	4305	s	l
4301	4311	s	L
4301	3427	<2s>	<>
4302	4300	<>	<aphaerese>
4302	4300	<>	<elision3>
4302	4300	<>	<elision2>
4302	4300	<>	<elision1>
4302	4303	s	κ
4302	4303	s	k
4302	4306	s	K
4302	4303	s	λ
4302	4303	s	l
4302	4309	s	L
4302	3425	<2s>	<>
4303	4304	<>	<name>
4303	4303	<>	<aphaerese>
4303	4303	<>	<elision3>
4303	4303	<>	<elision2>
4303	4303	<>	<elision1>
4303	3998	<split-s>	<>
4304	4305	<>	<aphaerese>
4304	4305	<>	<elision3>
4304	4305	<>	<elision2>
4304	4305	<>	<elision1>
4304	3999	<split-s>	<>
4305	4303	<>	<aphaerese>
4305	4303	<>	<elision3>
4305	4303	<>	<elision2>
4305	4303	<>	<elision1>
4305	3997	<split-s>	<>
4306	4307	<>	<name>
4306	4306	<>	<aphaerese>
4306	4306	<>	<elision3>
4306	4306	<>	<elision2>
4306	4306	<>	<elision1>
4306	4303	<K2kl>	<>
4307	4308	<>	<aphaerese>
4307	4308	<>	<elision3>
4307	4308	<>	<elision2>
4307	4308	<>	<elision1>
4307	4304	<K2kl>	<>
4308	4306	<>	<aphaerese>
4308	4306	<>	<elision3>
4308	4306	<>	<elision2>
4308	4306	<>	<elision1>
4308	4305	<K2kl>	<>
4309	4310	<>	<name>
4309	4309	<>	<aphaerese>
4309	4309	<>	<elision3>
4309	4309	<>	<elision2>
4309	4309	<>	<elision1>
4309	4303	<L2kl>	<>
4310	4311	<>	<aphaerese>
4310	4311	<>	<elision3>
4310	4311	<>	<elision2>
4310	4311	<>	<elision1>
4310	4304	<L2kl>	<>
4311	4309	<>	<aphaerese>
4311	4309	<>	<elision3>
4311	4309	<>	<elision2>
4311	4309	<>	<elision1>
4311	4305	<L2kl>	<>
4312	4280	.	.
4312	4280	 	 
4312	4280	<~>	<~>
4312	4280	<split-s>	<split-s>
4312	4280	<split-h>	<split-h>
4312	4280	<name2>	<name2>
4312	4313	<>	<name>
4312	4283	<aphaerese>	<aphaerese>
4312	4312	<>	<aphaerese>
4312	4315	<elision3>	<elision3>
4312	4312	<>	<elision3>
4312	4315	<elision2>	<elision2>
4312	4312	<>	<elision2>
4312	4315	<elision1>	<elision1>
4312	4312	<>	<elision1>
4312	4292	.	υ
4312	4292	.	u
4312	4292	.	κ
4312	4292	.	α
4312	4292	.	a
4312	4292	.	λ
4312	4060	<split-s>	<>
4313	4282	.	.
4313	4282	 	 
4313	4282	<~>	<~>
4313	4282	<split-s>	<split-s>
4313	4282	<split-h>	<split-h>
4313	4282	<name2>	<name2>
4313	4285	<aphaerese>	<aphaerese>
4313	4314	<>	<aphaerese>
4313	4317	<elision3>	<elision3>
4313	4314	<>	<elision3>
4313	4317	<elision2>	<elision2>
4313	4314	<>	<elision2>
4313	4317	<elision1>	<elision1>
4313	4314	<>	<elision1>
4313	4294	.	υ
4313	4294	.	u
4313	4294	.	κ
4313	4294	.	α
4313	4294	.	a
4313	4294	.	λ
4313	4061	<split-s>	<>
4314	4280	.	.
4314	4280	 	 
4314	4280	<~>	<~>
4314	4280	<split-s>	<split-s>
4314	4280	<split-h>	<split-h>
4314	4280	<name2>	<name2>
4314	4283	<aphaerese>	<aphaerese>
4314	4312	<>	<aphaerese>
4314	4315	<elision3>	<elision3>
4314	4312	<>	<elision3>
4314	4315	<elision2>	<elision2>
4314	4312	<>	<elision2>
4314	4315	<elision1>	<elision1>
4314	4312	<>	<elision1>
4314	4292	.	υ
4314	4292	.	u
4314	4292	.	κ
4314	4292	.	α
4314	4292	.	a
4314	4292	.	λ
4314	4059	<split-s>	<>
4315	4280	.	.
4315	4280	 	 
4315	4280	<~>	<~>
4315	4280	<split-s>	<split-s>
4315	4280	<split-h>	<split-h>
4315	4280	<name2>	<name2>
4315	4316	<>	<name>
4315	4283	<aphaerese>	<aphaerese>
4315	4315	<>	<aphaerese>
4315	4280	<elision3>	<elision3>
4315	4315	<>	<elision3>
4315	4280	<elision2>	<elision2>
4315	4315	<>	<elision2>
4315	4280	<elision1>	<elision1>
4315	4315	<>	<elision1>
4315	4292	.	υ
4315	4292	.	u
4315	4286	.	κ
4315	4292	.	α
4315	4292	.	a
4315	4057	<split-s>	<>
4316	4282	.	.
4316	4282	 	 
4316	4282	<~>	<~>
4316	4282	<split-s>	<split-s>
4316	4282	<split-h>	<split-h>
4316	4282	<name2>	<name2>
4316	4285	<aphaerese>	<aphaerese>
4316	4317	<>	<aphaerese>
4316	4282	<elision3>	<elision3>
4316	4317	<>	<elision3>
4316	4282	<elision2>	<elision2>
4316	4317	<>	<elision2>
4316	4282	<elision1>	<elision1>
4316	4317	<>	<elision1>
4316	4294	.	υ
4316	4294	.	u
4316	4288	.	κ
4316	4294	.	α
4316	4294	.	a
4316	4058	<split-s>	<>
4317	4280	.	.
4317	4280	 	 
4317	4280	<~>	<~>
4317	4280	<split-s>	<split-s>
4317	4280	<split-h>	<split-h>
4317	4280	<name2>	<name2>
4317	4283	<aphaerese>	<aphaerese>
4317	4315	<>	<aphaerese>
4317	4280	<elision3>	<elision3>
4317	4315	<>	<elision3>
4317	4280	<elision2>	<elision2>
4317	4315	<>	<elision2>
4317	4280	<elision1>	<elision1>
4317	4315	<>	<elision1>
4317	4292	.	υ
4317	4292	.	u
4317	4286	.	κ
4317	4292	.	α
4317	4292	.	a
4317	4056	<split-s>	<>
4318	4280	.	.
4318	4280	 	 
4318	4280	<~>	<~>
4318	4280	<split-s>	<split-s>
4318	4280	<split-h>	<split-h>
4318	4280	<name2>	<name2>
4318	4319	<>	<name>
4318	4283	<aphaerese>	<aphaerese>
4318	4318	<>	<aphaerese>
4318	4280	<elision3>	<elision3>
4318	4318	<>	<elision3>
4318	4280	<elision2>	<elision2>
4318	4318	<>	<elision2>
4318	4280	<elision1>	<elision1>
4318	4318	<>	<elision1>
4318	4292	.	υ
4318	4292	.	u
4318	4292	.	κ
4318	4292	.	α
4318	4292	.	a
4318	4292	.	λ
4318	4081	<split-s>	<>
4319	4282	.	.
4319	4282	 	 
4319	4282	<~>	<~>
4319	4282	<split-s>	<split-s>
4319	4282	<split-h>	<split-h>
4319	4282	<name2>	<name2>
4319	4285	<aphaerese>	<aphaerese>
4319	4320	<>	<aphaerese>
4319	4282	<elision3>	<elision3>
4319	4320	<>	<elision3>
4319	4282	<elision2>	<elision2>
4319	4320	<>	<elision2>
4319	4282	<elision1>	<elision1>
4319	4320	<>	<elision1>
4319	4294	.	υ
4319	4294	.	u
4319	4294	.	κ
4319	4294	.	α
4319	4294	.	a
4319	4294	.	λ
4319	4082	<split-s>	<>
4320	4280	.	.
4320	4280	 	 
4320	4280	<~>	<~>
4320	4280	<split-s>	<split-s>
4320	4280	<split-h>	<split-h>
4320	4280	<name2>	<name2>
4320	4283	<aphaerese>	<aphaerese>
4320	4318	<>	<aphaerese>
4320	4280	<elision3>	<elision3>
4320	4318	<>	<elision3>
4320	4280	<elision2>	<elision2>
4320	4318	<>	<elision2>
4320	4280	<elision1>	<elision1>
4320	4318	<>	<elision1>
4320	4292	.	υ
4320	4292	.	u
4320	4292	.	κ
4320	4292	.	α
4320	4292	.	a
4320	4292	.	λ
4320	4080	<split-s>	<>
4321	4322	<>	<name>
4321	4321	<>	<aphaerese>
4321	4321	<>	<elision3>
4321	4321	<>	<elision2>
4321	4321	<>	<elision1>
4321	4280	<U2kl>	<>
4322	4323	<>	<aphaerese>
4322	4323	<>	<elision3>
4322	4323	<>	<elision2>
4322	4323	<>	<elision1>
4322	4281	<U2kl>	<>
4323	4321	<>	<aphaerese>
4323	4321	<>	<elision3>
4323	4321	<>	<elision2>
4323	4321	<>	<elision1>
4323	4282	<U2kl>	<>
4324	4325	<name>	<name>
4324	4326	<>	<name>
4324	4328	<>	<aphaerese>
4324	4328	<>	<elision3>
4324	4328	<>	<elision2>
4324	4328	<>	<elision1>
4324	4134	<split-s>	<>
4324	4329	<A2kl>	<>
4324	4338	<L2kl>	<>
4324	4350	<K2kl>	<>
4325	4088	<split-s>	<>
4326	4327	<>	<aphaerese>
4326	4327	<>	<elision3>
4326	4327	<>	<elision2>
4326	4327	<>	<elision1>
4326	4330	<A2kl>	<>
4326	4339	<L2kl>	<>
4326	4348	<K2kl>	<>
4327	4328	<>	<aphaerese>
4327	4328	<>	<elision3>
4327	4328	<>	<elision2>
4327	4328	<>	<elision1>
4327	4331	<A2kl>	<>
4327	4340	<L2kl>	<>
4327	4349	<K2kl>	<>
4328	4326	<>	<name>
4328	4328	<>	<aphaerese>
4328	4328	<>	<elision3>
4328	4328	<>	<elision2>
4328	4328	<>	<elision1>
4328	4329	<A2kl>	<>
4328	4338	<L2kl>	<>
4328	4347	<K2kl>	<>
4329	4330	<>	<name>
4329	4329	<>	<aphaerese>
4329	4329	<>	<elision3>
4329	4329	<>	<elision2>
4329	4329	<>	<elision1>
4329	4332	.	κ
4329	4332	.	λ
4329	4108	<split-s>	<>
4330	4331	<>	<aphaerese>
4330	4331	<>	<elision3>
4330	4331	<>	<elision2>
4330	4331	<>	<elision1>
4330	4334	.	κ
4330	4334	.	λ
4330	4109	<split-s>	<>
4331	4329	<>	<aphaerese>
4331	4329	<>	<elision3>
4331	4329	<>	<elision2>
4331	4329	<>	<elision1>
4331	4332	.	κ
4331	4332	.	λ
4331	4107	<split-s>	<>
4332	4333	<>	<name>
4332	4332	<>	<aphaerese>
4332	4335	<elision3>	<elision3>
4332	4332	<>	<elision3>
4332	4335	<elision2>	<elision2>
4332	4332	<>	<elision2>
4332	4335	<elision1>	<elision1>
4332	4332	<>	<elision1>
4332	4105	<split-s>	<>
4333	4334	<>	<aphaerese>
4333	4337	<elision3>	<elision3>
4333	4334	<>	<elision3>
4333	4337	<elision2>	<elision2>
4333	4334	<>	<elision2>
4333	4337	<elision1>	<elision1>
4333	4334	<>	<elision1>
4333	4106	<split-s>	<>
4334	4332	<>	<aphaerese>
4334	4335	<elision3>	<elision3>
4334	4332	<>	<elision3>
4334	4335	<elision2>	<elision2>
4334	4332	<>	<elision2>
4334	4335	<elision1>	<elision1>
4334	4332	<>	<elision1>
4334	4104	<split-s>	<>
4335	4280	.	.
4335	4280	 	 
4335	4280	<~>	<~>
4335	4280	<split-s>	<split-s>
4335	4280	<split-h>	<split-h>
4335	4280	<name2>	<name2>
4335	4336	<>	<name>
4335	4283	<aphaerese>	<aphaerese>
4335	4335	<>	<aphaerese>
4335	4280	<elision3>	<elision3>
4335	4335	<>	<elision3>
4335	4280	<elision2>	<elision2>
4335	4335	<>	<elision2>
4335	4280	<elision1>	<elision1>
4335	4335	<>	<elision1>
4335	4292	.	υ
4335	4292	.	u
4335	4292	.	α
4335	4292	.	a
4335	4102	<split-s>	<>
4336	4282	.	.
4336	4282	 	 
4336	4282	<~>	<~>
4336	4282	<split-s>	<split-s>
4336	4282	<split-h>	<split-h>
4336	4282	<name2>	<name2>
4336	4285	<aphaerese>	<aphaerese>
4336	4337	<>	<aphaerese>
4336	4282	<elision3>	<elision3>
4336	4337	<>	<elision3>
4336	4282	<elision2>	<elision2>
4336	4337	<>	<elision2>
4336	4282	<elision1>	<elision1>
4336	4337	<>	<elision1>
4336	4294	.	υ
4336	4294	.	u
4336	4294	.	α
4336	4294	.	a
4336	4103	<split-s>	<>
4337	4280	.	.
4337	4280	 	 
4337	4280	<~>	<~>
4337	4280	<split-s>	<split-s>
4337	4280	<split-h>	<split-h>
4337	4280	<name2>	<name2>
4337	4283	<aphaerese>	<aphaerese>
4337	4335	<>	<aphaerese>
4337	4280	<elision3>	<elision3>
4337	4335	<>	<elision3>
4337	4280	<elision2>	<elision2>
4337	4335	<>	<elision2>
4337	4280	<elision1>	<elision1>
4337	4335	<>	<elision1>
4337	4292	.	υ
4337	4292	.	u
4337	4292	.	α
4337	4292	.	a
4337	4101	<split-s>	<>
4338	4339	<>	<name>
4338	4338	<>	<aphaerese>
4338	4338	<>	<elision3>
4338	4338	<>	<elision2>
4338	4338	<>	<elision1>
4338	4341	.	κ
4338	4341	.	λ
4338	4126	<split-s>	<>
4339	4340	<>	<aphaerese>
4339	4340	<>	<elision3>
4339	4340	<>	<elision2>
4339	4340	<>	<elision1>
4339	4343	.	κ
4339	4343	.	λ
4339	4127	<split-s>	<>
4340	4338	<>	<aphaerese>
4340	4338	<>	<elision3>
4340	4338	<>	<elision2>
4340	4338	<>	<elision1>
4340	4341	.	κ
4340	4341	.	λ
4340	4125	<split-s>	<>
4341	4342	<>	<name>
4341	4341	<>	<aphaerese>
4341	4344	<elision3>	<elision3>
4341	4341	<>	<elision3>
4341	4344	<elision2>	<elision2>
4341	4341	<>	<elision2>
4341	4344	<elision1>	<elision1>
4341	4341	<>	<elision1>
4341	4123	<split-s>	<>
4342	4343	<>	<aphaerese>
4342	4346	<elision3>	<elision3>
4342	4343	<>	<elision3>
4342	4346	<elision2>	<elision2>
4342	4343	<>	<elision2>
4342	4346	<elision1>	<elision1>
4342	4343	<>	<elision1>
4342	4124	<split-s>	<>
4343	4341	<>	<aphaerese>
4343	4344	<elision3>	<elision3>
4343	4341	<>	<elision3>
4343	4344	<elision2>	<elision2>
4343	4341	<>	<elision2>
4343	4344	<elision1>	<elision1>
4343	4341	<>	<elision1>
4343	4122	<split-s>	<>
4344	4345	<>	<name>
4344	4344	<>	<aphaerese>
4344	4344	<>	<elision3>
4344	4344	<>	<elision2>
4344	4344	<>	<elision1>
4344	4286	.	κ
4344	4120	<split-s>	<>
4345	4346	<>	<aphaerese>
4345	4346	<>	<elision3>
4345	4346	<>	<elision2>
4345	4346	<>	<elision1>
4345	4288	.	κ
4345	4121	<split-s>	<>
4346	4344	<>	<aphaerese>
4346	4344	<>	<elision3>
4346	4344	<>	<elision2>
4346	4344	<>	<elision1>
4346	4286	.	κ
4346	4119	<split-s>	<>
4347	4280	.	.
4347	4280	 	 
4347	4280	<~>	<~>
4347	4280	<split-s>	<split-s>
4347	4280	<split-h>	<split-h>
4347	4280	<name2>	<name2>
4347	4348	<>	<name>
4347	4283	<aphaerese>	<aphaerese>
4347	4347	<>	<aphaerese>
4347	4280	<elision3>	<elision3>
4347	4347	<>	<elision3>
4347	4280	<elision2>	<elision2>
4347	4347	<>	<elision2>
4347	4280	<elision1>	<elision1>
4347	4347	<>	<elision1>
4347	4292	.	υ
4347	4292	.	u
4347	4292	.	α
4347	4292	.	a
4347	4132	<split-s>	<>
4348	4282	.	.
4348	4282	 	 
4348	4282	<~>	<~>
4348	4282	<split-s>	<split-s>
4348	4282	<split-h>	<split-h>
4348	4282	<name2>	<name2>
4348	4285	<aphaerese>	<aphaerese>
4348	4349	<>	<aphaerese>
4348	4282	<elision3>	<elision3>
4348	4349	<>	<elision3>
4348	4282	<elision2>	<elision2>
4348	4349	<>	<elision2>
4348	4282	<elision1>	<elision1>
4348	4349	<>	<elision1>
4348	4294	.	υ
4348	4294	.	u
4348	4294	.	α
4348	4294	.	a
4348	4133	<split-s>	<>
4349	4280	.	.
4349	4280	 	 
4349	4280	<~>	<~>
4349	4280	<split-s>	<split-s>
4349	4280	<split-h>	<split-h>
4349	4280	<name2>	<name2>
4349	4283	<aphaerese>	<aphaerese>
4349	4347	<>	<aphaerese>
4349	4280	<elision3>	<elision3>
4349	4347	<>	<elision3>
4349	4280	<elision2>	<elision2>
4349	4347	<>	<elision2>
4349	4280	<elision1>	<elision1>
4349	4347	<>	<elision1>
4349	4292	.	υ
4349	4292	.	u
4349	4292	.	α
4349	4292	.	a
4349	4131	<split-s>	<>
4350	4280	.	.
4350	4280	 	 
4350	4280	<~>	<~>
4350	4280	<split-s>	<split-s>
4350	4280	<split-h>	<split-h>
4350	4280	<name2>	<name2>
4350	4325	<name2>	<name>
4350	4348	<>	<name>
4350	4283	<aphaerese>	<aphaerese>
4350	4347	<>	<aphaerese>
4350	4280	<elision3>	<elision3>
4350	4347	<>	<elision3>
4350	4280	<elision2>	<elision2>
4350	4347	<>	<elision2>
4350	4280	<elision1>	<elision1>
4350	4347	<>	<elision1>
4350	4292	.	υ
4350	4292	.	u
4350	4292	.	α
4350	4292	.	a
4350	4137	<split-s>	<>
4351	4352	<>	<name>
4351	4351	<>	<aphaerese>
4351	4351	<>	<elision3>
4351	4351	<>	<elision2>
4351	4351	<>	<elision1>
4351	4280	<A2kl>	<>
4352	4353	<>	<aphaerese>
4352	4353	<>	<elision3>
4352	4353	<>	<elision2>
4352	4353	<>	<elision1>
4352	4281	<A2kl>	<>
4353	4351	<>	<aphaerese>
4353	4351	<>	<elision3>
4353	4351	<>	<elision2>
4353	4351	<>	<elision1>
4353	4282	<A2kl>	<>
4354	4325	<name>	<name>
4354	4355	<>	<name>
4354	4357	<>	<aphaerese>
4354	4357	<>	<elision3>
4354	4357	<>	<elision2>
4354	4357	<>	<elision1>
4354	4134	<split-s>	<>
4354	4329	<A2kl>	<>
4354	4361	<L2kl>	<>
4355	4356	<>	<aphaerese>
4355	4356	<>	<elision3>
4355	4356	<>	<elision2>
4355	4356	<>	<elision1>
4355	4330	<A2kl>	<>
4355	4359	<L2kl>	<>
4356	4357	<>	<aphaerese>
4356	4357	<>	<elision3>
4356	4357	<>	<elision2>
4356	4357	<>	<elision1>
4356	4331	<A2kl>	<>
4356	4360	<L2kl>	<>
4357	4355	<>	<name>
4357	4357	<>	<aphaerese>
4357	4357	<>	<elision3>
4357	4357	<>	<elision2>
4357	4357	<>	<elision1>
4357	4329	<A2kl>	<>
4357	4358	<L2kl>	<>
4358	4280	.	.
4358	4280	 	 
4358	4280	<~>	<~>
4358	4280	<split-s>	<split-s>
4358	4280	<split-h>	<split-h>
4358	4280	<name2>	<name2>
4358	4359	<>	<name>
4358	4283	<aphaerese>	<aphaerese>
4358	4358	<>	<aphaerese>
4358	4280	<elision3>	<elision3>
4358	4358	<>	<elision3>
4358	4280	<elision2>	<elision2>
4358	4358	<>	<elision2>
4358	4280	<elision1>	<elision1>
4358	4358	<>	<elision1>
4358	4292	.	υ
4358	4292	.	u
4358	4341	.	κ
4358	4292	.	α
4358	4292	.	a
4358	4341	.	λ
4358	4158	<split-s>	<>
4359	4282	.	.
4359	4282	 	 
4359	4282	<~>	<~>
4359	4282	<split-s>	<split-s>
4359	4282	<split-h>	<split-h>
4359	4282	<name2>	<name2>
4359	4285	<aphaerese>	<aphaerese>
4359	4360	<>	<aphaerese>
4359	4282	<elision3>	<elision3>
4359	4360	<>	<elision3>
4359	4282	<elision2>	<elision2>
4359	4360	<>	<elision2>
4359	4282	<elision1>	<elision1>
4359	4360	<>	<elision1>
4359	4294	.	υ
4359	4294	.	u
4359	4343	.	κ
4359	4294	.	α
4359	4294	.	a
4359	4343	.	λ
4359	4159	<split-s>	<>
4360	4280	.	.
4360	4280	 	 
4360	4280	<~>	<~>
4360	4280	<split-s>	<split-s>
4360	4280	<split-h>	<split-h>
4360	4280	<name2>	<name2>
4360	4283	<aphaerese>	<aphaerese>
4360	4358	<>	<aphaerese>
4360	4280	<elision3>	<elision3>
4360	4358	<>	<elision3>
4360	4280	<elision2>	<elision2>
4360	4358	<>	<elision2>
4360	4280	<elision1>	<elision1>
4360	4358	<>	<elision1>
4360	4292	.	υ
4360	4292	.	u
4360	4341	.	κ
4360	4292	.	α
4360	4292	.	a
4360	4341	.	λ
4360	4157	<split-s>	<>
4361	4280	.	.
4361	4280	 	 
4361	4280	<~>	<~>
4361	4280	<split-s>	<split-s>
4361	4280	<split-h>	<split-h>
4361	4280	<name2>	<name2>
4361	4325	<name2>	<name>
4361	4359	<>	<name>
4361	4283	<aphaerese>	<aphaerese>
4361	4358	<>	<aphaerese>
4361	4280	<elision3>	<elision3>
4361	4358	<>	<elision3>
4361	4280	<elision2>	<elision2>
4361	4358	<>	<elision2>
4361	4280	<elision1>	<elision1>
4361	4358	<>	<elision1>
4361	4292	.	υ
4361	4292	.	u
4361	4341	.	κ
4361	4292	.	α
4361	4292	.	a
4361	4341	.	λ
4361	4161	<split-s>	<>
4362	4280	.	.
4362	4280	 	 
4362	4280	<~>	<~>
4362	4280	<split-s>	<split-s>
4362	4280	<split-h>	<split-h>
4362	4280	<name2>	<name2>
4362	4295	<>	<name>
4362	4283	<aphaerese>	<aphaerese>
4362	4279	<>	<aphaerese>
4362	4279	<>	<elision3>
4362	4279	<>	<elision2>
4362	4279	<>	<elision1>
4362	4292	.	υ
4362	4292	.	u
4362	4286	.	κ
4362	4292	.	α
4362	4292	.	a
4362	4163	<split-s>	<>
4363	4280	.	.
4363	4280	 	 
4363	4280	<~>	<~>
4363	4280	<split-s>	<split-s>
4363	4280	<split-h>	<split-h>
4363	4280	<name2>	<name2>
4363	4313	<>	<name>
4363	4283	<aphaerese>	<aphaerese>
4363	4312	<>	<aphaerese>
4363	4315	<elision3>	<elision3>
4363	4312	<>	<elision3>
4363	4315	<elision2>	<elision2>
4363	4312	<>	<elision2>
4363	4315	<elision1>	<elision1>
4363	4312	<>	<elision1>
4363	4292	.	υ
4363	4292	.	u
4363	4292	.	κ
4363	4292	.	α
4363	4292	.	a
4363	4292	.	λ
4363	4165	<split-s>	<>
4364	4280	.	.
4364	4280	 	 
4364	4280	<~>	<~>
4364	4280	<split-s>	<split-s>
4364	4280	<split-h>	<split-h>
4364	4280	<name2>	<name2>
4364	4319	<>	<name>
4364	4283	<aphaerese>	<aphaerese>
4364	4318	<>	<aphaerese>
4364	4280	<elision3>	<elision3>
4364	4318	<>	<elision3>
4364	4280	<elision2>	<elision2>
4364	4318	<>	<elision2>
4364	4280	<elision1>	<elision1>
4364	4318	<>	<elision1>
4364	4292	.	υ
4364	4292	.	u
4364	4292	.	κ
4364	4292	.	α
4364	4292	.	a
4364	4292	.	λ
4364	4167	<split-s>	<>
4365	4322	<>	<name>
4365	4321	<>	<aphaerese>
4365	4321	<>	<elision3>
4365	4321	<>	<elision2>
4365	4321	<>	<elision1>
4365	4366	<U2kl>	<>
4366	4280	.	.
4366	4280	 	 
4366	4280	<~>	<~>
4366	4280	<split-s>	<split-s>
4366	4280	<split-h>	<split-h>
4366	4280	<name2>	<name2>
4366	4281	<>	<name>
4366	4283	<aphaerese>	<aphaerese>
4366	4280	<>	<aphaerese>
4366	4280	<elision3>	<elision3>
4366	4280	<>	<elision3>
4366	4280	<elision2>	<elision2>
4366	4280	<>	<elision2>
4366	4280	<elision1>	<elision1>
4366	4280	<>	<elision1>
4366	4292	.	υ
4366	4292	.	u
4366	4286	.	κ
4366	4292	.	α
4366	4292	.	a
4366	4170	<split-s>	<>
4367	4325	<name>	<name>
4367	4326	<>	<name>
4367	4328	<>	<aphaerese>
4367	4328	<>	<elision3>
4367	4328	<>	<elision2>
4367	4328	<>	<elision1>
4367	4134	<split-s>	<>
4367	4329	<A2kl>	<>
4367	4338	<L2kl>	<>
4367	4368	<K2kl>	<>
4368	4280	.	.
4368	4280	 	 
4368	4280	<~>	<~>
4368	4280	<split-s>	<split-s>
4368	4280	<split-h>	<split-h>
4368	4280	<name2>	<name2>
4368	4325	<name2>	<name>
4368	4348	<>	<name>
4368	4283	<aphaerese>	<aphaerese>
4368	4347	<>	<aphaerese>
4368	4280	<elision3>	<elision3>
4368	4347	<>	<elision3>
4368	4280	<elision2>	<elision2>
4368	4347	<>	<elision2>
4368	4280	<elision1>	<elision1>
4368	4347	<>	<elision1>
4368	4292	.	υ
4368	4292	.	u
4368	4292	.	α
4368	4292	.	a
4368	4173	<split-s>	<>
4369	4352	<>	<name>
4369	4351	<>	<aphaerese>
4369	4351	<>	<elision3>
4369	4351	<>	<elision2>
4369	4351	<>	<elision1>
4369	4366	<A2kl>	<>
4370	4325	<name>	<name>
4370	4355	<>	<name>
4370	4357	<>	<aphaerese>
4370	4357	<>	<elision3>
4370	4357	<>	<elision2>
4370	4357	<>	<elision1>
4370	4134	<split-s>	<>
4370	4329	<A2kl>	<>
4370	4371	<L2kl>	<>
4371	4280	.	.
4371	4280	 	 
4371	4280	<~>	<~>
4371	4280	<split-s>	<split-s>
4371	4280	<split-h>	<split-h>
4371	4280	<name2>	<name2>
4371	4325	<name2>	<name>
4371	4359	<>	<name>
4371	4283	<aphaerese>	<aphaerese>
4371	4358	<>	<aphaerese>
4371	4280	<elision3>	<elision3>
4371	4358	<>	<elision3>
4371	4280	<elision2>	<elision2>
4371	4358	<>	<elision2>
4371	4280	<elision1>	<elision1>
4371	4358	<>	<elision1>
4371	4292	.	υ
4371	4292	.	u
4371	4341	.	κ
4371	4292	.	α
4371	4292	.	a
4371	4341	.	λ
4371	4180	<split-s>	<>
4372	4268	.	.
4372	4269	 	 
4372	4268	<~>	<~>
4372	4268	<split-s>	<split-s>
4372	4268	<split-h>	<split-h>
4372	4268	<name2>	<name2>
4372	4272	<aphaerese>	<aphaerese>
4372	4272	<>	<aphaerese>
4372	4268	<elision3>	<elision3>
4372	4272	<>	<elision3>
4372	4268	<elision2>	<elision2>
4372	4272	<>	<elision2>
4372	4268	<elision1>	<elision1>
4372	4272	<>	<elision1>
4372	4268	.	υ
4372	4268	.	u
4372	4297	.	κ
4372	4312	s	κ
4372	4318	s	k
4372	4321	s	U
4372	4373	s	K
4372	4268	.	α
4372	4268	.	a
4372	4351	s	A
4372	4318	s	λ
4372	4318	s	l
4372	4380	s	L
4372	3567	<2s>	<>
4373	4325	<name>	<name>
4373	4374	<>	<name>
4373	4376	<>	<aphaerese>
4373	4376	<>	<elision3>
4373	4376	<>	<elision2>
4373	4376	<>	<elision1>
4373	4134	<split-s>	<>
4373	4377	<L2kl>	<>
4373	4350	<K2kl>	<>
4374	4375	<>	<aphaerese>
4374	4375	<>	<elision3>
4374	4375	<>	<elision2>
4374	4375	<>	<elision1>
4374	4378	<L2kl>	<>
4374	4348	<K2kl>	<>
4375	4376	<>	<aphaerese>
4375	4376	<>	<elision3>
4375	4376	<>	<elision2>
4375	4376	<>	<elision1>
4375	4379	<L2kl>	<>
4375	4349	<K2kl>	<>
4376	4374	<>	<name>
4376	4376	<>	<aphaerese>
4376	4376	<>	<elision3>
4376	4376	<>	<elision2>
4376	4376	<>	<elision1>
4376	4377	<L2kl>	<>
4376	4347	<K2kl>	<>
4377	4378	<>	<name>
4377	4377	<>	<aphaerese>
4377	4377	<>	<elision3>
4377	4377	<>	<elision2>
4377	4377	<>	<elision1>
4377	4292	.	κ
4377	4292	.	λ
4377	4190	<split-s>	<>
4378	4379	<>	<aphaerese>
4378	4379	<>	<elision3>
4378	4379	<>	<elision2>
4378	4379	<>	<elision1>
4378	4294	.	κ
4378	4294	.	λ
4378	4191	<split-s>	<>
4379	4377	<>	<aphaerese>
4379	4377	<>	<elision3>
4379	4377	<>	<elision2>
4379	4377	<>	<elision1>
4379	4292	.	κ
4379	4292	.	λ
4379	4189	<split-s>	<>
4380	4325	<name>	<name>
4380	4381	<>	<name>
4380	4383	<>	<aphaerese>
4380	4383	<>	<elision3>
4380	4383	<>	<elision2>
4380	4383	<>	<elision1>
4380	4134	<split-s>	<>
4380	4384	<L2kl>	<>
4381	4382	<>	<aphaerese>
4381	4382	<>	<elision3>
4381	4382	<>	<elision2>
4381	4382	<>	<elision1>
4381	4319	<L2kl>	<>
4382	4383	<>	<aphaerese>
4382	4383	<>	<elision3>
4382	4383	<>	<elision2>
4382	4383	<>	<elision1>
4382	4320	<L2kl>	<>
4383	4381	<>	<name>
4383	4383	<>	<aphaerese>
4383	4383	<>	<elision3>
4383	4383	<>	<elision2>
4383	4383	<>	<elision1>
4383	4318	<L2kl>	<>
4384	4280	.	.
4384	4280	 	 
4384	4280	<~>	<~>
4384	4280	<split-s>	<split-s>
4384	4280	<split-h>	<split-h>
4384	4280	<name2>	<name2>
4384	4325	<name2>	<name>
4384	4319	<>	<name>
4384	4283	<aphaerese>	<aphaerese>
4384	4318	<>	<aphaerese>
4384	4280	<elision3>	<elision3>
4384	4318	<>	<elision3>
4384	4280	<elision2>	<elision2>
4384	4318	<>	<elision2>
4384	4280	<elision1>	<elision1>
4384	4318	<>	<elision1>
4384	4292	.	υ
4384	4292	.	u
4384	4292	.	κ
4384	4292	.	α
4384	4292	.	a
4384	4292	.	λ
4384	4197	<split-s>	<>
4385	4268	.	.
4385	4269	 	 
4385	4268	<~>	<~>
4385	4268	<split-s>	<split-s>
4385	4268	<split-h>	<split-h>
4385	4268	<name2>	<name2>
4385	4272	<aphaerese>	<aphaerese>
4385	4275	<>	<aphaerese>
4385	4268	<elision3>	<elision3>
4385	4275	<>	<elision3>
4385	4268	<elision2>	<elision2>
4385	4275	<>	<elision2>
4385	4268	<elision1>	<elision1>
4385	4275	<>	<elision1>
4385	4276	.	υ
4385	4279	s	υ
4385	4276	.	u
4385	4279	s	u
4385	4297	.	κ
4385	4312	s	κ
4385	4318	s	k
4385	4321	s	U
4385	4324	s	K
4385	4276	.	α
4385	4279	s	α
4385	4276	.	a
4385	4279	s	a
4385	4351	s	A
4385	4318	s	λ
4385	4318	s	l
4385	4354	s	L
4385	3580	<2s>	<>
4386	4271	.	.
4386	4274	 	 
4386	4271	<~>	<~>
4386	4271	<split-s>	<split-s>
4386	4271	<split-h>	<split-h>
4386	4271	<name2>	<name2>
4386	4372	<aphaerese>	<aphaerese>
4386	4271	<>	<aphaerese>
4386	4271	<elision3>	<elision3>
4386	4271	<>	<elision3>
4386	4271	<elision2>	<elision2>
4386	4271	<>	<elision2>
4386	4271	<elision1>	<elision1>
4386	4271	<>	<elision1>
4386	4278	.	υ
4386	4296	s	υ
4386	4278	.	u
4386	4296	s	u
4386	4299	.	κ
4386	4314	s	κ
4386	4320	s	k
4386	4323	s	U
4386	4375	s	K
4386	4278	.	α
4386	4296	s	α
4386	4278	.	a
4386	4296	s	a
4386	4353	s	A
4386	4320	s	λ
4386	4320	s	l
4386	4382	s	L
4386	3582	<2s>	<>
4387	4271	.	.
4387	4274	 	 
4387	4271	<~>	<~>
4387	4271	<split-s>	<split-s>
4387	4271	<split-h>	<split-h>
4387	4271	<name2>	<name2>
4387	4372	<aphaerese>	<aphaerese>
4387	4388	<>	<aphaerese>
4387	4388	<>	<elision3>
4387	4388	<>	<elision2>
4387	4388	<>	<elision1>
4387	4278	.	υ
4387	4296	s	υ
4387	4278	.	u
4387	4296	s	u
4387	4278	.	κ
4387	4391	s	κ
4387	4320	s	k
4387	4323	s	U
4387	4375	s	K
4387	4278	.	α
4387	4296	s	α
4387	4278	.	a
4387	4296	s	a
4387	4353	s	A
4387	4278	.	λ
4387	4391	s	λ
4387	4320	s	l
4387	4382	s	L
4387	3993	<2s>	<>
4388	4268	.	.
4388	4269	 	 
4388	4268	<~>	<~>
4388	4268	<split-s>	<split-s>
4388	4268	<split-h>	<split-h>
4388	4268	<name2>	<name2>
4388	4272	<aphaerese>	<aphaerese>
4388	4267	<>	<aphaerese>
4388	4267	<>	<elision3>
4388	4267	<>	<elision2>
4388	4267	<>	<elision1>
4388	4276	.	υ
4388	4279	s	υ
4388	4276	.	u
4388	4279	s	u
4388	4276	.	κ
4388	4389	s	κ
4388	4318	s	k
4388	4321	s	U
4388	4373	s	K
4388	4276	.	α
4388	4279	s	α
4388	4276	.	a
4388	4279	s	a
4388	4351	s	A
4388	4276	.	λ
4388	4389	s	λ
4388	4318	s	l
4388	4380	s	L
4388	3991	<2s>	<>
4389	4280	.	.
4389	4280	 	 
4389	4280	<~>	<~>
4389	4280	<split-s>	<split-s>
4389	4280	<split-h>	<split-h>
4389	4280	<name2>	<name2>
4389	4390	<>	<name>
4389	4283	<aphaerese>	<aphaerese>
4389	4389	<>	<aphaerese>
4389	4389	<>	<elision3>
4389	4389	<>	<elision2>
4389	4389	<>	<elision1>
4389	4292	.	υ
4389	4292	.	u
4389	4292	.	κ
4389	4292	.	α
4389	4292	.	a
4389	4292	.	λ
4389	4206	<split-s>	<>
4390	4282	.	.
4390	4282	 	 
4390	4282	<~>	<~>
4390	4282	<split-s>	<split-s>
4390	4282	<split-h>	<split-h>
4390	4282	<name2>	<name2>
4390	4285	<aphaerese>	<aphaerese>
4390	4391	<>	<aphaerese>
4390	4391	<>	<elision3>
4390	4391	<>	<elision2>
4390	4391	<>	<elision1>
4390	4294	.	υ
4390	4294	.	u
4390	4294	.	κ
4390	4294	.	α
4390	4294	.	a
4390	4294	.	λ
4390	4207	<split-s>	<>
4391	4280	.	.
4391	4280	 	 
4391	4280	<~>	<~>
4391	4280	<split-s>	<split-s>
4391	4280	<split-h>	<split-h>
4391	4280	<name2>	<name2>
4391	4283	<aphaerese>	<aphaerese>
4391	4389	<>	<aphaerese>
4391	4389	<>	<elision3>
4391	4389	<>	<elision2>
4391	4389	<>	<elision1>
4391	4292	.	υ
4391	4292	.	u
4391	4292	.	κ
4391	4292	.	α
4391	4292	.	a
4391	4292	.	λ
4391	4205	<split-s>	<>
4392	4268	.	.
4392	4269	 	 
4392	4268	<~>	<~>
4392	4268	<split-s>	<split-s>
4392	4268	<split-h>	<split-h>
4392	4268	<name2>	<name2>
4392	4393	<>	<name>
4392	4272	<aphaerese>	<aphaerese>
4392	4392	<>	<aphaerese>
4392	4268	<elision3>	<elision3>
4392	4392	<>	<elision3>
4392	4268	<elision2>	<elision2>
4392	4392	<>	<elision2>
4392	4268	<elision1>	<elision1>
4392	4392	<>	<elision1>
4392	4276	.	υ
4392	4279	s	υ
4392	4276	.	u
4392	4279	s	u
4392	4395	.	κ
4392	4389	s	κ
4392	4318	s	k
4392	4321	s	U
4392	4373	s	K
4392	4276	.	α
4392	4279	s	α
4392	4276	.	a
4392	4279	s	a
4392	4351	s	A
4392	4395	.	λ
4392	4389	s	λ
4392	4318	s	l
4392	4380	s	L
4392	3778	<2s>	<>
4393	4271	.	.
4393	4274	 	 
4393	4271	<~>	<~>
4393	4271	<split-s>	<split-s>
4393	4271	<split-h>	<split-h>
4393	4271	<name2>	<name2>
4393	4372	<aphaerese>	<aphaerese>
4393	4394	<>	<aphaerese>
4393	4271	<elision3>	<elision3>
4393	4394	<>	<elision3>
4393	4271	<elision2>	<elision2>
4393	4394	<>	<elision2>
4393	4271	<elision1>	<elision1>
4393	4394	<>	<elision1>
4393	4278	.	υ
4393	4296	s	υ
4393	4278	.	u
4393	4296	s	u
4393	4397	.	κ
4393	4391	s	κ
4393	4320	s	k
4393	4323	s	U
4393	4375	s	K
4393	4278	.	α
4393	4296	s	α
4393	4278	.	a
4393	4296	s	a
4393	4353	s	A
4393	4397	.	λ
4393	4391	s	λ
4393	4320	s	l
4393	4382	s	L
4393	3779	<2s>	<>
4394	4268	.	.
4394	4269	 	 
4394	4268	<~>	<~>
4394	4268	<split-s>	<split-s>
4394	4268	<split-h>	<split-h>
4394	4268	<name2>	<name2>
4394	4272	<aphaerese>	<aphaerese>
4394	4392	<>	<aphaerese>
4394	4268	<elision3>	<elision3>
4394	4392	<>	<elision3>
4394	4268	<elision2>	<elision2>
4394	4392	<>	<elision2>
4394	4268	<elision1>	<elision1>
4394	4392	<>	<elision1>
4394	4276	.	υ
4394	4279	s	υ
4394	4276	.	u
4394	4279	s	u
4394	4395	.	κ
4394	4389	s	κ
4394	4318	s	k
4394	4321	s	U
4394	4373	s	K
4394	4276	.	α
4394	4279	s	α
4394	4276	.	a
4394	4279	s	a
4394	4351	s	A
4394	4395	.	λ
4394	4389	s	λ
4394	4318	s	l
4394	4380	s	L
4394	3777	<2s>	<>
4395	4396	<>	<name>
4395	4395	<>	<aphaerese>
4395	4398	<elision3>	<elision3>
4395	4395	<>	<elision3>
4395	4398	<elision2>	<elision2>
4395	4395	<>	<elision2>
4395	4398	<elision1>	<elision1>
4395	4395	<>	<elision1>
4395	212	<2s>	<>
4396	4397	<>	<aphaerese>
4396	4400	<elision3>	<elision3>
4396	4397	<>	<elision3>
4396	4400	<elision2>	<elision2>
4396	4397	<>	<elision2>
4396	4400	<elision1>	<elision1>
4396	4397	<>	<elision1>
4396	213	<2s>	<>
4397	4395	<>	<aphaerese>
4397	4398	<elision3>	<elision3>
4397	4395	<>	<elision3>
4397	4398	<elision2>	<elision2>
4397	4395	<>	<elision2>
4397	4398	<elision1>	<elision1>
4397	4395	<>	<elision1>
4397	211	<2s>	<>
4398	4398	.	.
4398	4398	 	 
4398	4398	<~>	<~>
4398	4398	<split-s>	<split-s>
4398	4398	<split-h>	<split-h>
4398	4398	<name2>	<name2>
4398	4399	<>	<name>
4398	4401	<aphaerese>	<aphaerese>
4398	4398	<>	<aphaerese>
4398	4398	<elision3>	<elision3>
4398	4398	<>	<elision3>
4398	4398	<elision2>	<elision2>
4398	4398	<>	<elision2>
4398	4398	<elision1>	<elision1>
4398	4398	<>	<elision1>
4398	4395	.	υ
4398	4395	.	u
4398	4404	.	κ
4398	4395	.	α
4398	4395	.	a
4398	3581	<2s>	<>
4399	4400	.	.
4399	4400	 	 
4399	4400	<~>	<~>
4399	4400	<split-s>	<split-s>
4399	4400	<split-h>	<split-h>
4399	4400	<name2>	<name2>
4399	4403	<aphaerese>	<aphaerese>
4399	4400	<>	<aphaerese>
4399	4400	<elision3>	<elision3>
4399	4400	<>	<elision3>
4399	4400	<elision2>	<elision2>
4399	4400	<>	<elision2>
4399	4400	<elision1>	<elision1>
4399	4400	<>	<elision1>
4399	4397	.	υ
4399	4397	.	u
4399	4406	.	κ
4399	4397	.	α
4399	4397	.	a
4399	3582	<2s>	<>
4400	4398	.	.
4400	4398	 	 
4400	4398	<~>	<~>
4400	4398	<split-s>	<split-s>
4400	4398	<split-h>	<split-h>
4400	4398	<name2>	<name2>
4400	4401	<aphaerese>	<aphaerese>
4400	4398	<>	<aphaerese>
4400	4398	<elision3>	<elision3>
4400	4398	<>	<elision3>
4400	4398	<elision2>	<elision2>
4400	4398	<>	<elision2>
4400	4398	<elision1>	<elision1>
4400	4398	<>	<elision1>
4400	4395	.	υ
4400	4395	.	u
4400	4404	.	κ
4400	4395	.	α
4400	4395	.	a
4400	3580	<2s>	<>
4401	4398	.	.
4401	4398	 	 
4401	4398	<~>	<~>
4401	4398	<split-s>	<split-s>
4401	4398	<split-h>	<split-h>
4401	4398	<name2>	<name2>
4401	4402	<>	<name>
4401	4401	<aphaerese>	<aphaerese>
4401	4401	<>	<aphaerese>
4401	4398	<elision3>	<elision3>
4401	4401	<>	<elision3>
4401	4398	<elision2>	<elision2>
4401	4401	<>	<elision2>
4401	4398	<elision1>	<elision1>
4401	4401	<>	<elision1>
4401	4398	.	υ
4401	4398	.	u
4401	4404	.	κ
4401	4398	.	α
4401	4398	.	a
4401	3568	<2s>	<>
4402	4400	.	.
4402	4400	 	 
4402	4400	<~>	<~>
4402	4400	<split-s>	<split-s>
4402	4400	<split-h>	<split-h>
4402	4400	<name2>	<name2>
4402	4403	<aphaerese>	<aphaerese>
4402	4403	<>	<aphaerese>
4402	4400	<elision3>	<elision3>
4402	4403	<>	<elision3>
4402	4400	<elision2>	<elision2>
4402	4403	<>	<elision2>
4402	4400	<elision1>	<elision1>
4402	4403	<>	<elision1>
4402	4400	.	υ
4402	4400	.	u
4402	4406	.	κ
4402	4400	.	α
4402	4400	.	a
4402	3569	<2s>	<>
4403	4398	.	.
4403	4398	 	 
4403	4398	<~>	<~>
4403	4398	<split-s>	<split-s>
4403	4398	<split-h>	<split-h>
4403	4398	<name2>	<name2>
4403	4401	<aphaerese>	<aphaerese>
4403	4401	<>	<aphaerese>
4403	4398	<elision3>	<elision3>
4403	4401	<>	<elision3>
4403	4398	<elision2>	<elision2>
4403	4401	<>	<elision2>
4403	4398	<elision1>	<elision1>
4403	4401	<>	<elision1>
4403	4398	.	υ
4403	4398	.	u
4403	4404	.	κ
4403	4398	.	α
4403	4398	.	a
4403	3567	<2s>	<>
4404	4405	<>	<name>
4404	4404	<>	<aphaerese>
4404	4407	<elision3>	<elision3>
4404	4404	<>	<elision3>
4404	4407	<elision2>	<elision2>
4404	4404	<>	<elision2>
4404	4407	<elision1>	<elision1>
4404	4404	<>	<elision1>
4404	3565	<2s>	<>
4405	4406	<>	<aphaerese>
4405	4409	<elision3>	<elision3>
4405	4406	<>	<elision3>
4405	4409	<elision2>	<elision2>
4405	4406	<>	<elision2>
4405	4409	<elision1>	<elision1>
4405	4406	<>	<elision1>
4405	3566	<2s>	<>
4406	4404	<>	<aphaerese>
4406	4407	<elision3>	<elision3>
4406	4404	<>	<elision3>
4406	4407	<elision2>	<elision2>
4406	4404	<>	<elision2>
4406	4407	<elision1>	<elision1>
4406	4404	<>	<elision1>
4406	3564	<2s>	<>
4407	4408	<>	<name>
4407	4407	<>	<aphaerese>
4407	4407	<>	<elision3>
4407	4407	<>	<elision2>
4407	4407	<>	<elision1>
4407	3426	<2s>	<>
4408	4409	<>	<aphaerese>
4408	4409	<>	<elision3>
4408	4409	<>	<elision2>
4408	4409	<>	<elision1>
4408	3427	<2s>	<>
4409	4407	<>	<aphaerese>
4409	4407	<>	<elision3>
4409	4407	<>	<elision2>
4409	4407	<>	<elision1>
4409	3425	<2s>	<>
4410	4411	<name>	<name>
4410	4412	<>	<name>
4410	4414	<>	<aphaerese>
4410	4414	<>	<elision3>
4410	4414	<>	<elision2>
4410	4414	<>	<elision1>
4410	3898	<2s>	<>
4410	4415	<L2kl>	<>
4410	4421	<K2kl>	<>
4411	4375	s	k
4411	4382	s	l
4411	3788	<2s>	<>
4412	4413	<>	<aphaerese>
4412	4413	<>	<elision3>
4412	4413	<>	<elision2>
4412	4413	<>	<elision1>
4412	4416	<L2kl>	<>
4412	4419	<K2kl>	<>
4413	4414	<>	<aphaerese>
4413	4414	<>	<elision3>
4413	4414	<>	<elision2>
4413	4414	<>	<elision1>
4413	4417	<L2kl>	<>
4413	4420	<K2kl>	<>
4414	4412	<>	<name>
4414	4414	<>	<aphaerese>
4414	4414	<>	<elision3>
4414	4414	<>	<elision2>
4414	4414	<>	<elision1>
4414	4415	<L2kl>	<>
4414	4418	<K2kl>	<>
4415	4416	<>	<name>
4415	4415	<>	<aphaerese>
4415	4415	<>	<elision3>
4415	4415	<>	<elision2>
4415	4415	<>	<elision1>
4415	4395	.	κ
4415	4395	.	λ
4415	3957	<2s>	<>
4416	4417	<>	<aphaerese>
4416	4417	<>	<elision3>
4416	4417	<>	<elision2>
4416	4417	<>	<elision1>
4416	4397	.	κ
4416	4397	.	λ
4416	3958	<2s>	<>
4417	4415	<>	<aphaerese>
4417	4415	<>	<elision3>
4417	4415	<>	<elision2>
4417	4415	<>	<elision1>
4417	4395	.	κ
4417	4395	.	λ
4417	3956	<2s>	<>
4418	4398	.	.
4418	4398	 	 
4418	4398	<~>	<~>
4418	4398	<split-s>	<split-s>
4418	4398	<split-h>	<split-h>
4418	4398	<name2>	<name2>
4418	4419	<>	<name>
4418	4401	<aphaerese>	<aphaerese>
4418	4418	<>	<aphaerese>
4418	4398	<elision3>	<elision3>
4418	4418	<>	<elision3>
4418	4398	<elision2>	<elision2>
4418	4418	<>	<elision2>
4418	4398	<elision1>	<elision1>
4418	4418	<>	<elision1>
4418	4395	.	υ
4418	4395	.	u
4418	4395	.	α
4418	4395	.	a
4418	3893	<2s>	<>
4419	4400	.	.
4419	4400	 	 
4419	4400	<~>	<~>
4419	4400	<split-s>	<split-s>
4419	4400	<split-h>	<split-h>
4419	4400	<name2>	<name2>
4419	4403	<aphaerese>	<aphaerese>
4419	4420	<>	<aphaerese>
4419	4400	<elision3>	<elision3>
4419	4420	<>	<elision3>
4419	4400	<elision2>	<elision2>
4419	4420	<>	<elision2>
4419	4400	<elision1>	<elision1>
4419	4420	<>	<elision1>
4419	4397	.	υ
4419	4397	.	u
4419	4397	.	α
4419	4397	.	a
4419	3894	<2s>	<>
4420	4398	.	.
4420	4398	 	 
4420	4398	<~>	<~>
4420	4398	<split-s>	<split-s>
4420	4398	<split-h>	<split-h>
4420	4398	<name2>	<name2>
4420	4401	<aphaerese>	<aphaerese>
4420	4418	<>	<aphaerese>
4420	4398	<elision3>	<elision3>
4420	4418	<>	<elision3>
4420	4398	<elision2>	<elision2>
4420	4418	<>	<elision2>
4420	4398	<elision1>	<elision1>
4420	4418	<>	<elision1>
4420	4395	.	υ
4420	4395	.	u
4420	4395	.	α
4420	4395	.	a
4420	3892	<2s>	<>
4421	4398	.	.
4421	4398	 	 
4421	4398	<~>	<~>
4421	4398	<split-s>	<split-s>
4421	4398	<split-h>	<split-h>
4421	4398	<name2>	<name2>
4421	4422	<name2>	<name>
4421	4419	<>	<name>
4421	4401	<aphaerese>	<aphaerese>
4421	4418	<>	<aphaerese>
4421	4398	<elision3>	<elision3>
4421	4418	<>	<elision3>
4421	4398	<elision2>	<elision2>
4421	4418	<>	<elision2>
4421	4398	<elision1>	<elision1>
4421	4418	<>	<elision1>
4421	4395	.	υ
4421	4395	.	u
4421	4395	.	α
4421	4395	.	a
4421	3902	<2s>	<>
4422	3788	<2s>	<>
4423	4398	.	.
4423	4398	 	 
4423	4398	<~>	<~>
4423	4398	<split-s>	<split-s>
4423	4398	<split-h>	<split-h>
4423	4398	<name2>	<name2>
4423	4424	<>	<name>
4423	4401	<aphaerese>	<aphaerese>
4423	4423	<>	<aphaerese>
4423	4398	<elision3>	<elision3>
4423	4423	<>	<elision3>
4423	4398	<elision2>	<elision2>
4423	4423	<>	<elision2>
4423	4398	<elision1>	<elision1>
4423	4423	<>	<elision1>
4423	4395	.	υ
4423	4395	.	u
4423	4395	.	κ
4423	4395	.	α
4423	4395	.	a
4423	4395	.	λ
4423	3778	<2s>	<>
4424	4400	.	.
4424	4400	 	 
4424	4400	<~>	<~>
4424	4400	<split-s>	<split-s>
4424	4400	<split-h>	<split-h>
4424	4400	<name2>	<name2>
4424	4403	<aphaerese>	<aphaerese>
4424	4425	<>	<aphaerese>
4424	4400	<elision3>	<elision3>
4424	4425	<>	<elision3>
4424	4400	<elision2>	<elision2>
4424	4425	<>	<elision2>
4424	4400	<elision1>	<elision1>
4424	4425	<>	<elision1>
4424	4397	.	υ
4424	4397	.	u
4424	4397	.	κ
4424	4397	.	α
4424	4397	.	a
4424	4397	.	λ
4424	3779	<2s>	<>
4425	4398	.	.
4425	4398	 	 
4425	4398	<~>	<~>
4425	4398	<split-s>	<split-s>
4425	4398	<split-h>	<split-h>
4425	4398	<name2>	<name2>
4425	4401	<aphaerese>	<aphaerese>
4425	4423	<>	<aphaerese>
4425	4398	<elision3>	<elision3>
4425	4423	<>	<elision3>
4425	4398	<elision2>	<elision2>
4425	4423	<>	<elision2>
4425	4398	<elision1>	<elision1>
4425	4423	<>	<elision1>
4425	4395	.	υ
4425	4395	.	u
4425	4395	.	κ
4425	4395	.	α
4425	4395	.	a
4425	4395	.	λ
4425	3777	<2s>	<>
4426	4422	<name>	<name>
4426	4427	<>	<name>
4426	4429	<>	<aphaerese>
4426	4429	<>	<elision3>
4426	4429	<>	<elision2>
4426	4429	<>	<elision1>
4426	3898	<2s>	<>
4426	4430	<L2kl>	<>
4427	4428	<>	<aphaerese>
4427	4428	<>	<elision3>
4427	4428	<>	<elision2>
4427	4428	<>	<elision1>
4427	4424	<L2kl>	<>
4428	4429	<>	<aphaerese>
4428	4429	<>	<elision3>
4428	4429	<>	<elision2>
4428	4429	<>	<elision1>
4428	4425	<L2kl>	<>
4429	4427	<>	<name>
4429	4429	<>	<aphaerese>
4429	4429	<>	<elision3>
4429	4429	<>	<elision2>
4429	4429	<>	<elision1>
4429	4423	<L2kl>	<>
4430	4398	.	.
4430	4398	 	 
4430	4398	<~>	<~>
4430	4398	<split-s>	<split-s>
4430	4398	<split-h>	<split-h>
4430	4398	<name2>	<name2>
4430	4422	<name2>	<name>
4430	4424	<>	<name>
4430	4401	<aphaerese>	<aphaerese>
4430	4423	<>	<aphaerese>
4430	4398	<elision3>	<elision3>
4430	4423	<>	<elision3>
4430	4398	<elision2>	<elision2>
4430	4423	<>	<elision2>
4430	4398	<elision1>	<elision1>
4430	4423	<>	<elision1>
4430	4395	.	υ
4430	4395	.	u
4430	4395	.	κ
4430	4395	.	α
4430	4395	.	a
4430	4395	.	λ
4430	3967	<2s>	<>
4431	4265	<>	<name>
4431	4264	<>	<aphaerese>
4431	4264	<>	<elision3>
4431	4264	<>	<elision2>
4431	4264	<>	<elision1>
4431	4267	s	κ
4431	4392	s	k
4431	4410	s	K
4431	4267	s	λ
4431	4423	s	l
4431	4426	s	L
4431	4432	<1s>	<>
4432	3602	<>	<name>
4432	3601	<>	<aphaerese>
4432	3601	<>	<elision3>
4432	3601	<>	<elision2>
4432	3601	<>	<elision1>
4432	4433	<K>	<>
4433	3628	<>	<name>
4433	3630	<>	<aphaerese>
4433	3630	<>	<elision3>
4433	3630	<>	<elision2>
4433	3630	<>	<elision1>
4434	4435	<>	<name>
4434	4437	<>	<aphaerese>
4434	4437	<>	<elision3>
4434	4437	<>	<elision2>
4434	4437	<>	<elision1>
4434	196	<k2K>	<>
4434	4431	<k2L>	<>
4435	4436	<>	<aphaerese>
4435	4436	<>	<elision3>
4435	4436	<>	<elision2>
4435	4436	<>	<elision1>
4435	197	<k2K>	<>
4435	4265	<k2L>	<>
4436	4437	<>	<aphaerese>
4436	4437	<>	<elision3>
4436	4437	<>	<elision2>
4436	4437	<>	<elision1>
4436	198	<k2K>	<>
4436	4266	<k2L>	<>
4437	4435	<>	<name>
4437	4437	<>	<aphaerese>
4437	4437	<>	<elision3>
4437	4437	<>	<elision2>
4437	4437	<>	<elision1>
4437	196	<k2K>	<>
4437	4264	<k2L>	<>
4438	4439	<>	<name>
4438	4441	<>	<aphaerese>
4438	4441	<>	<elision3>
4438	4441	<>	<elision2>
4438	4441	<>	<elision1>
4438	199	s	κ
4438	4208	s	k
4438	4241	s	K
4438	199	s	λ
4438	4256	s	l
4438	4259	s	L
4438	4431	<K2L>	<>
4439	4440	<>	<aphaerese>
4439	4440	<>	<elision3>
4439	4440	<>	<elision2>
4439	4440	<>	<elision1>
4439	4201	s	κ
4439	4210	s	k
4439	4244	s	K
4439	4201	s	λ
4439	4258	s	l
4439	4261	s	L
4439	4265	<K2L>	<>
4440	4441	<>	<aphaerese>
4440	4441	<>	<elision3>
4440	4441	<>	<elision2>
4440	4441	<>	<elision1>
4440	199	s	κ
4440	4208	s	k
4440	4241	s	K
4440	199	s	λ
4440	4256	s	l
4440	4259	s	L
4440	4266	<K2L>	<>
4441	4439	<>	<name>
4441	4441	<>	<aphaerese>
4441	4441	<>	<elision3>
4441	4441	<>	<elision2>
4441	4441	<>	<elision1>
4441	199	s	κ
4441	4208	s	k
4441	4241	s	K
4441	199	s	λ
4441	4256	s	l
4441	4259	s	L
4441	4264	<K2L>	<>
4442	4443	<>	<name>
4442	4442	<>	<aphaerese>
4442	4442	<>	<elision3>
4442	4442	<>	<elision2>
4442	4442	<>	<elision1>
4442	4264	<lambda2L>	<>
4443	4444	<>	<aphaerese>
4443	4444	<>	<elision3>
4443	4444	<>	<elision2>
4443	4444	<>	<elision1>
4443	4265	<lambda2L>	<>
4444	4442	<>	<aphaerese>
4444	4442	<>	<elision3>
4444	4442	<>	<elision2>
4444	4442	<>	<elision1>
4444	4266	<lambda2L>	<>
4445	4446	<>	<name>
4445	4445	<>	<aphaerese>
4445	4445	<>	<elision3>
4445	4445	<>	<elision2>
4445	4445	<>	<elision1>
4445	4264	<l2L>	<>
4446	4447	<>	<aphaerese>
4446	4447	<>	<elision3>
4446	4447	<>	<elision2>
4446	4447	<>	<elision1>
4446	4265	<l2L>	<>
4447	4445	<>	<aphaerese>
4447	4445	<>	<elision3>
4447	4445	<>	<elision2>
4447	4445	<>	<elision1>
4447	4266	<l2L>	<>
4448	195	<>	<aphaerese>
4448	195	<>	<elision3>
4448	195	<>	<elision2>
4448	195	<>	<elision1>
4448	198	<kappa2K>	<>
4448	4449	<kappa2L>	<>
4449	4264	<>	<aphaerese>
4449	4264	<>	<elision3>
4449	4264	<>	<elision2>
4449	4264	<>	<elision1>
4449	4267	s	κ
4449	4392	s	k
4449	4410	s	K
4449	4267	s	λ
4449	4423	s	l
4449	4426	s	L
4449	4450	<1s>	<>
4450	3601	<>	<aphaerese>
4450	3601	<>	<elision3>
4450	3601	<>	<elision2>
4450	3601	<>	<elision1>
4450	4451	<K>	<>
4451	3630	<>	<aphaerese>
4451	3630	<>	<elision3>
4451	3630	<>	<elision2>
4451	3630	<>	<elision1>
4452	4437	<>	<aphaerese>
4452	4437	<>	<elision3>
4452	4437	<>	<elision2>
4452	4437	<>	<elision1>
4452	198	<k2K>	<>
4452	4449	<k2L>	<>
4453	4441	<>	<aphaerese>
4453	4441	<>	<elision3>
4453	4441	<>	<elision2>
4453	4441	<>	<elision1>
4453	199	s	κ
4453	4208	s	k
4453	4241	s	K
4453	199	s	λ
4453	4256	s	l
4453	4259	s	L
4453	4449	<K2L>	<>
4454	4455	<>	<name>
4454	4457	<>	<aphaerese>
4454	4457	<>	<elision3>
4454	4457	<>	<elision2>
4454	4457	<>	<elision1>
4454	4458	<kappa2K>	<>
4454	4779	<kappa2L>	<>
4454	4776	<lambda2L>	<>
4455	4456	<>	<aphaerese>
4455	4456	<>	<elision3>
4455	4456	<>	<elision2>
4455	4456	<>	<elision1>
4455	4594	<kappa2K>	<>
4455	4740	<kappa2L>	<>
4455	4777	<lambda2L>	<>
4456	4457	<>	<aphaerese>
4456	4457	<>	<elision3>
4456	4457	<>	<elision2>
4456	4457	<>	<elision1>
4456	4595	<kappa2K>	<>
4456	4741	<kappa2L>	<>
4456	4778	<lambda2L>	<>
4457	4455	<>	<name>
4457	4457	<>	<aphaerese>
4457	4457	<>	<elision3>
4457	4457	<>	<elision2>
4457	4457	<>	<elision1>
4457	4458	<kappa2K>	<>
4457	4624	<kappa2L>	<>
4457	4776	<lambda2L>	<>
4458	4459	.	.
4458	4460	 	 
4458	4459	<~>	<~>
4458	4459	<split-s>	<split-s>
4458	4459	<split-h>	<split-h>
4458	4459	<name2>	<name2>
4458	4594	<>	<name>
4458	4463	<aphaerese>	<aphaerese>
4458	4458	<>	<aphaerese>
4458	4596	<elision3>	<elision3>
4458	4458	<>	<elision3>
4458	4596	<elision2>	<elision2>
4458	4458	<>	<elision2>
4458	4596	<elision1>	<elision1>
4458	4458	<>	<elision1>
4458	4467	.	υ
4458	4470	s	υ
4458	4467	.	u
4458	4470	s	u
4458	199	s	κ
4458	4208	s	k
4458	4533	s	U
4458	4241	s	K
4458	4467	.	α
4458	4561	s	α
4458	4467	.	a
4458	4561	s	a
4458	4564	s	A
4458	199	s	λ
4458	4256	s	l
4458	4259	s	L
4459	4459	.	.
4459	4460	 	 
4459	4459	<~>	<~>
4459	4459	<split-s>	<split-s>
4459	4459	<split-h>	<split-h>
4459	4459	<name2>	<name2>
4459	4593	<>	<name>
4459	4463	<aphaerese>	<aphaerese>
4459	4459	<>	<aphaerese>
4459	4459	<elision3>	<elision3>
4459	4459	<>	<elision3>
4459	4459	<elision2>	<elision2>
4459	4459	<>	<elision2>
4459	4459	<elision1>	<elision1>
4459	4459	<>	<elision1>
4459	4467	.	υ
4459	4470	s	υ
4459	4467	.	u
4459	4470	s	u
4459	4473	.	κ
4459	4491	s	κ
4459	4208	s	k
4459	4533	s	U
4459	4241	s	K
4459	4467	.	α
4459	4561	s	α
4459	4467	.	a
4459	4561	s	a
4459	4564	s	A
4459	4567	s	λ
4459	4256	s	l
4459	4259	s	L
4460	4459	.	.
4460	4460	 	 
4460	4459	<~>	<~>
4460	4459	<split-s>	<split-s>
4460	4459	<split-h>	<split-h>
4460	4459	<name2>	<name2>
4460	4461	<>	<name>
4460	4463	<aphaerese>	<aphaerese>
4460	4466	<>	<aphaerese>
4460	4459	<elision3>	<elision3>
4460	4466	<>	<elision3>
4460	4459	<elision2>	<elision2>
4460	4466	<>	<elision2>
4460	4459	<elision1>	<elision1>
4460	4466	<>	<elision1>
4460	4467	.	υ
4460	4578	s	υ
4460	4467	.	u
4460	4578	s	u
4460	4473	.	κ
4460	4579	s	κ
4460	4580	s	k
4460	4581	s	U
4460	4583	s	K
4460	4467	.	α
4460	4585	s	α
4460	4467	.	a
4460	4585	s	a
4460	4586	s	A
4460	4587	s	λ
4460	4588	s	l
4460	4589	s	L
4461	4462	.	.
4461	4465	 	 
4461	4462	<~>	<~>
4461	4462	<split-s>	<split-s>
4461	4462	<split-h>	<split-h>
4461	4462	<name2>	<name2>
4461	4591	<aphaerese>	<aphaerese>
4461	4592	<>	<aphaerese>
4461	4462	<elision3>	<elision3>
4461	4592	<>	<elision3>
4461	4462	<elision2>	<elision2>
4461	4592	<>	<elision2>
4461	4462	<elision1>	<elision1>
4461	4592	<>	<elision1>
4461	4469	.	υ
4461	4472	s	υ
4461	4469	.	u
4461	4472	s	u
4461	4475	.	κ
4461	4493	s	κ
4461	4210	s	k
4461	4535	s	U
4461	4538	s	K
4461	4469	.	α
4461	4563	s	α
4461	4469	.	a
4461	4563	s	a
4461	4566	s	A
4461	4569	s	λ
4461	4258	s	l
4461	4572	s	L
4462	4459	.	.
4462	4460	 	 
4462	4459	<~>	<~>
4462	4459	<split-s>	<split-s>
4462	4459	<split-h>	<split-h>
4462	4459	<name2>	<name2>
4462	4463	<aphaerese>	<aphaerese>
4462	4459	<>	<aphaerese>
4462	4459	<elision3>	<elision3>
4462	4459	<>	<elision3>
4462	4459	<elision2>	<elision2>
4462	4459	<>	<elision2>
4462	4459	<elision1>	<elision1>
4462	4459	<>	<elision1>
4462	4467	.	υ
4462	4470	s	υ
4462	4467	.	u
4462	4470	s	u
4462	4473	.	κ
4462	4491	s	κ
4462	4208	s	k
4462	4533	s	U
4462	4241	s	K
4462	4467	.	α
4462	4561	s	α
4462	4467	.	a
4462	4561	s	a
4462	4564	s	A
4462	4567	s	λ
4462	4256	s	l
4462	4259	s	L
4463	4459	.	.
4463	4460	 	 
4463	4459	<~>	<~>
4463	4459	<split-s>	<split-s>
4463	4459	<split-h>	<split-h>
4463	4459	<name2>	<name2>
4463	4464	<>	<name>
4463	4463	<aphaerese>	<aphaerese>
4463	4463	<>	<aphaerese>
4463	4459	<elision3>	<elision3>
4463	4463	<>	<elision3>
4463	4459	<elision2>	<elision2>
4463	4463	<>	<elision2>
4463	4459	<elision1>	<elision1>
4463	4463	<>	<elision1>
4463	4459	.	υ
4463	4459	.	u
4463	4473	.	κ
4463	4491	s	κ
4463	4208	s	k
4463	4533	s	U
4463	4241	s	K
4463	4459	.	α
4463	4459	.	a
4463	4564	s	A
4463	4567	s	λ
4463	4256	s	l
4463	4259	s	L
4464	4462	.	.
4464	4465	 	 
4464	4462	<~>	<~>
4464	4462	<split-s>	<split-s>
4464	4462	<split-h>	<split-h>
4464	4462	<name2>	<name2>
4464	4591	<aphaerese>	<aphaerese>
4464	4591	<>	<aphaerese>
4464	4462	<elision3>	<elision3>
4464	4591	<>	<elision3>
4464	4462	<elision2>	<elision2>
4464	4591	<>	<elision2>
4464	4462	<elision1>	<elision1>
4464	4591	<>	<elision1>
4464	4462	.	υ
4464	4462	.	u
4464	4475	.	κ
4464	4493	s	κ
4464	4210	s	k
4464	4535	s	U
4464	4244	s	K
4464	4462	.	α
4464	4462	.	a
4464	4566	s	A
4464	4569	s	λ
4464	4258	s	l
4464	4261	s	L
4465	4459	.	.
4465	4460	 	 
4465	4459	<~>	<~>
4465	4459	<split-s>	<split-s>
4465	4459	<split-h>	<split-h>
4465	4459	<name2>	<name2>
4465	4463	<aphaerese>	<aphaerese>
4465	4466	<>	<aphaerese>
4465	4459	<elision3>	<elision3>
4465	4466	<>	<elision3>
4465	4459	<elision2>	<elision2>
4465	4466	<>	<elision2>
4465	4459	<elision1>	<elision1>
4465	4466	<>	<elision1>
4465	4467	.	υ
4465	4578	s	υ
4465	4467	.	u
4465	4578	s	u
4465	4473	.	κ
4465	4579	s	κ
4465	4580	s	k
4465	4581	s	U
4465	4583	s	K
4465	4467	.	α
4465	4585	s	α
4465	4467	.	a
4465	4585	s	a
4465	4586	s	A
4465	4587	s	λ
4465	4588	s	l
4465	4589	s	L
4466	4459	.	.
4466	4460	 	 
4466	4459	<~>	<~>
4466	4459	<split-s>	<split-s>
4466	4459	<split-h>	<split-h>
4466	4459	<name2>	<name2>
4466	4461	<>	<name>
4466	4463	<aphaerese>	<aphaerese>
4466	4466	<>	<aphaerese>
4466	4459	<elision3>	<elision3>
4466	4466	<>	<elision3>
4466	4459	<elision2>	<elision2>
4466	4466	<>	<elision2>
4466	4459	<elision1>	<elision1>
4466	4466	<>	<elision1>
4466	4467	.	υ
4466	4470	s	υ
4466	4467	.	u
4466	4470	s	u
4466	4473	.	κ
4466	4491	s	κ
4466	4208	s	k
4466	4533	s	U
4466	4536	s	K
4466	4467	.	α
4466	4561	s	α
4466	4467	.	a
4466	4561	s	a
4466	4564	s	A
4466	4567	s	λ
4466	4256	s	l
4466	4570	s	L
4467	4468	<>	<name>
4467	4467	<>	<aphaerese>
4467	4459	<elision3>	<elision3>
4467	4467	<>	<elision3>
4467	4459	<elision2>	<elision2>
4467	4467	<>	<elision2>
4467	4459	<elision1>	<elision1>
4467	4467	<>	<elision1>
4468	4469	<>	<aphaerese>
4468	4462	<elision3>	<elision3>
4468	4469	<>	<elision3>
4468	4462	<elision2>	<elision2>
4468	4469	<>	<elision2>
4468	4462	<elision1>	<elision1>
4468	4469	<>	<elision1>
4469	4467	<>	<aphaerese>
4469	4459	<elision3>	<elision3>
4469	4467	<>	<elision3>
4469	4459	<elision2>	<elision2>
4469	4467	<>	<elision2>
4469	4459	<elision1>	<elision1>
4469	4467	<>	<elision1>
4470	200	.	.
4470	201	 	 
4470	200	<~>	<~>
4470	200	<split-s>	<split-s>
4470	200	<split-h>	<split-h>
4470	200	<name2>	<name2>
4470	4471	<>	<name>
4470	204	<aphaerese>	<aphaerese>
4470	4470	<>	<aphaerese>
4470	4470	<>	<elision3>
4470	4470	<>	<elision2>
4470	4470	<>	<elision1>
4470	208	.	υ
4470	3397	s	υ
4470	208	.	u
4470	3397	s	u
4470	3979	.	κ
4470	4009	s	κ
4470	4062	s	k
4470	4083	s	U
4470	4182	s	K
4470	208	.	α
4470	4138	s	α
4470	208	.	a
4470	4138	s	a
4470	4141	s	A
4470	4144	s	λ
4470	4147	s	l
4470	4192	s	L
4470	3586	<2s>	<>
4471	203	.	.
4471	206	 	 
4471	203	<~>	<~>
4471	203	<split-s>	<split-s>
4471	203	<split-h>	<split-h>
4471	203	<name2>	<name2>
4471	4181	<aphaerese>	<aphaerese>
4471	4472	<>	<aphaerese>
4471	4472	<>	<elision3>
4471	4472	<>	<elision2>
4471	4472	<>	<elision1>
4471	210	.	υ
4471	3975	s	υ
4471	210	.	u
4471	3975	s	u
4471	3981	.	κ
4471	4011	s	κ
4471	4064	s	k
4471	4085	s	U
4471	4184	s	K
4471	210	.	α
4471	4140	s	α
4471	210	.	a
4471	4140	s	a
4471	4143	s	A
4471	4146	s	λ
4471	4149	s	l
4471	4194	s	L
4471	3587	<2s>	<>
4472	200	.	.
4472	201	 	 
4472	200	<~>	<~>
4472	200	<split-s>	<split-s>
4472	200	<split-h>	<split-h>
4472	200	<name2>	<name2>
4472	204	<aphaerese>	<aphaerese>
4472	4470	<>	<aphaerese>
4472	4470	<>	<elision3>
4472	4470	<>	<elision2>
4472	4470	<>	<elision1>
4472	208	.	υ
4472	3397	s	υ
4472	208	.	u
4472	3397	s	u
4472	3979	.	κ
4472	4009	s	κ
4472	4062	s	k
4472	4083	s	U
4472	4182	s	K
4472	208	.	α
4472	4138	s	α
4472	208	.	a
4472	4138	s	a
4472	4141	s	A
4472	4144	s	λ
4472	4147	s	l
4472	4192	s	L
4472	3585	<2s>	<>
4473	4474	<>	<name>
4473	4473	<>	<aphaerese>
4473	4476	<elision3>	<elision3>
4473	4473	<>	<elision3>
4473	4476	<elision2>	<elision2>
4473	4473	<>	<elision2>
4473	4476	<elision1>	<elision1>
4473	4473	<>	<elision1>
4474	4475	<>	<aphaerese>
4474	4478	<elision3>	<elision3>
4474	4475	<>	<elision3>
4474	4478	<elision2>	<elision2>
4474	4475	<>	<elision2>
4474	4478	<elision1>	<elision1>
4474	4475	<>	<elision1>
4475	4473	<>	<aphaerese>
4475	4476	<elision3>	<elision3>
4475	4473	<>	<elision3>
4475	4476	<elision2>	<elision2>
4475	4473	<>	<elision2>
4475	4476	<elision1>	<elision1>
4475	4473	<>	<elision1>
4476	4477	<>	<name>
4476	4476	<>	<aphaerese>
4476	4476	<>	<elision3>
4476	4476	<>	<elision2>
4476	4476	<>	<elision1>
4476	4479	s	κ
4476	4479	s	k
4476	4482	s	K
4476	4479	s	λ
4476	4486	s	l
4476	4488	s	L
4477	4478	<>	<aphaerese>
4477	4478	<>	<elision3>
4477	4478	<>	<elision2>
4477	4478	<>	<elision1>
4477	4481	s	κ
4477	4481	s	k
4477	4484	s	K
4477	4481	s	λ
4477	4485	s	l
4477	4490	s	L
4478	4476	<>	<aphaerese>
4478	4476	<>	<elision3>
4478	4476	<>	<elision2>
4478	4476	<>	<elision1>
4478	4479	s	κ
4478	4479	s	k
4478	4482	s	K
4478	4479	s	λ
4478	4486	s	l
4478	4488	s	L
4479	4480	<>	<name>
4479	4479	<>	<aphaerese>
4479	4479	<>	<elision3>
4479	4479	<>	<elision2>
4479	4479	<>	<elision1>
4479	4202	s	κ
4479	4062	s	k
4479	4182	s	K
4479	4202	s	λ
4479	4147	s	l
4479	4192	s	L
4479	3601	<2s>	<>
4480	4481	<>	<aphaerese>
4480	4481	<>	<elision3>
4480	4481	<>	<elision2>
4480	4481	<>	<elision1>
4480	4204	s	κ
4480	4064	s	k
4480	4184	s	K
4480	4204	s	λ
4480	4149	s	l
4480	4194	s	L
4480	3602	<2s>	<>
4481	4479	<>	<aphaerese>
4481	4479	<>	<elision3>
4481	4479	<>	<elision2>
4481	4479	<>	<elision1>
4481	4202	s	κ
4481	4062	s	k
4481	4182	s	K
4481	4202	s	λ
4481	4147	s	l
4481	4192	s	L
4481	3600	<2s>	<>
4482	4483	<>	<name>
4482	4482	<>	<aphaerese>
4482	4482	<>	<elision3>
4482	4482	<>	<elision2>
4482	4482	<>	<elision1>
4482	4486	<K2kl>	<>
4483	4484	<>	<aphaerese>
4483	4484	<>	<elision3>
4483	4484	<>	<elision2>
4483	4484	<>	<elision1>
4483	4487	<K2kl>	<>
4484	4482	<>	<aphaerese>
4484	4482	<>	<elision3>
4484	4482	<>	<elision2>
4484	4482	<>	<elision1>
4484	4485	<K2kl>	<>
4485	4486	<>	<aphaerese>
4485	4486	<>	<elision3>
4485	4486	<>	<elision2>
4485	4486	<>	<elision1>
4485	4252	s	κ
4485	4147	s	k
4485	4238	s	K
4485	4252	s	λ
4485	4147	s	l
4485	4192	s	L
4485	3600	<2s>	<>
4486	4487	<>	<name>
4486	4486	<>	<aphaerese>
4486	4486	<>	<elision3>
4486	4486	<>	<elision2>
4486	4486	<>	<elision1>
4486	4252	s	κ
4486	4147	s	k
4486	4238	s	K
4486	4252	s	λ
4486	4147	s	l
4486	4192	s	L
4486	3601	<2s>	<>
4487	4485	<>	<aphaerese>
4487	4485	<>	<elision3>
4487	4485	<>	<elision2>
4487	4485	<>	<elision1>
4487	4254	s	κ
4487	4149	s	k
4487	4184	s	K
4487	4254	s	λ
4487	4149	s	l
4487	4194	s	L
4487	3602	<2s>	<>
4488	4489	<>	<name>
4488	4488	<>	<aphaerese>
4488	4488	<>	<elision3>
4488	4488	<>	<elision2>
4488	4488	<>	<elision1>
4488	4486	<L2kl>	<>
4489	4490	<>	<aphaerese>
4489	4490	<>	<elision3>
4489	4490	<>	<elision2>
4489	4490	<>	<elision1>
4489	4487	<L2kl>	<>
4490	4488	<>	<aphaerese>
4490	4488	<>	<elision3>
4490	4488	<>	<elision2>
4490	4488	<>	<elision1>
4490	4485	<L2kl>	<>
4491	200	.	.
4491	201	 	 
4491	200	<~>	<~>
4491	200	<split-s>	<split-s>
4491	200	<split-h>	<split-h>
4491	200	<name2>	<name2>
4491	4492	<>	<name>
4491	204	<aphaerese>	<aphaerese>
4491	4491	<>	<aphaerese>
4491	4494	<elision3>	<elision3>
4491	4491	<>	<elision3>
4491	4494	<elision2>	<elision2>
4491	4491	<>	<elision2>
4491	4494	<elision1>	<elision1>
4491	4491	<>	<elision1>
4491	208	.	υ
4491	3397	s	υ
4491	208	.	u
4491	3397	s	u
4491	208	.	κ
4491	4202	s	κ
4491	4062	s	k
4491	4083	s	U
4491	4182	s	K
4491	208	.	α
4491	4138	s	α
4491	208	.	a
4491	4138	s	a
4491	4141	s	A
4491	208	.	λ
4491	4202	s	λ
4491	4147	s	l
4491	4192	s	L
4491	3766	<2s>	<>
4492	203	.	.
4492	206	 	 
4492	203	<~>	<~>
4492	203	<split-s>	<split-s>
4492	203	<split-h>	<split-h>
4492	203	<name2>	<name2>
4492	4181	<aphaerese>	<aphaerese>
4492	4493	<>	<aphaerese>
4492	4496	<elision3>	<elision3>
4492	4493	<>	<elision3>
4492	4496	<elision2>	<elision2>
4492	4493	<>	<elision2>
4492	4496	<elision1>	<elision1>
4492	4493	<>	<elision1>
4492	210	.	υ
4492	3975	s	υ
4492	210	.	u
4492	3975	s	u
4492	210	.	κ
4492	4204	s	κ
4492	4064	s	k
4492	4085	s	U
4492	4184	s	K
4492	210	.	α
4492	4140	s	α
4492	210	.	a
4492	4140	s	a
4492	4143	s	A
4492	210	.	λ
4492	4204	s	λ
4492	4149	s	l
4492	4194	s	L
4492	3767	<2s>	<>
4493	200	.	.
4493	201	 	 
4493	200	<~>	<~>
4493	200	<split-s>	<split-s>
4493	200	<split-h>	<split-h>
4493	200	<name2>	<name2>
4493	204	<aphaerese>	<aphaerese>
4493	4491	<>	<aphaerese>
4493	4494	<elision3>	<elision3>
4493	4491	<>	<elision3>
4493	4494	<elision2>	<elision2>
4493	4491	<>	<elision2>
4493	4494	<elision1>	<elision1>
4493	4491	<>	<elision1>
4493	208	.	υ
4493	3397	s	υ
4493	208	.	u
4493	3397	s	u
4493	208	.	κ
4493	4202	s	κ
4493	4062	s	k
4493	4083	s	U
4493	4182	s	K
4493	208	.	α
4493	4138	s	α
4493	208	.	a
4493	4138	s	a
4493	4141	s	A
4493	208	.	λ
4493	4202	s	λ
4493	4147	s	l
4493	4192	s	L
4493	3765	<2s>	<>
4494	200	.	.
4494	201	 	 
4494	200	<~>	<~>
4494	200	<split-s>	<split-s>
4494	200	<split-h>	<split-h>
4494	200	<name2>	<name2>
4494	4495	<>	<name>
4494	204	<aphaerese>	<aphaerese>
4494	4494	<>	<aphaerese>
4494	200	<elision3>	<elision3>
4494	4494	<>	<elision3>
4494	200	<elision2>	<elision2>
4494	4494	<>	<elision2>
4494	200	<elision1>	<elision1>
4494	4494	<>	<elision1>
4494	208	.	υ
4494	3397	s	υ
4494	208	.	u
4494	3397	s	u
4494	3979	.	κ
4494	4497	s	κ
4494	4503	s	k
4494	4083	s	U
4494	4509	s	K
4494	208	.	α
4494	4138	s	α
4494	208	.	a
4494	4138	s	a
4494	4141	s	A
4494	4521	s	λ
4494	4524	s	l
4494	4527	s	L
4494	3669	<2s>	<>
4495	203	.	.
4495	206	 	 
4495	203	<~>	<~>
4495	203	<split-s>	<split-s>
4495	203	<split-h>	<split-h>
4495	203	<name2>	<name2>
4495	4181	<aphaerese>	<aphaerese>
4495	4496	<>	<aphaerese>
4495	203	<elision3>	<elision3>
4495	4496	<>	<elision3>
4495	203	<elision2>	<elision2>
4495	4496	<>	<elision2>
4495	203	<elision1>	<elision1>
4495	4496	<>	<elision1>
4495	210	.	υ
4495	3975	s	υ
4495	210	.	u
4495	3975	s	u
4495	3981	.	κ
4495	4499	s	κ
4495	4505	s	k
4495	4085	s	U
4495	4511	s	K
4495	210	.	α
4495	4140	s	α
4495	210	.	a
4495	4140	s	a
4495	4143	s	A
4495	4523	s	λ
4495	4526	s	l
4495	4529	s	L
4495	3670	<2s>	<>
4496	200	.	.
4496	201	 	 
4496	200	<~>	<~>
4496	200	<split-s>	<split-s>
4496	200	<split-h>	<split-h>
4496	200	<name2>	<name2>
4496	204	<aphaerese>	<aphaerese>
4496	4494	<>	<aphaerese>
4496	200	<elision3>	<elision3>
4496	4494	<>	<elision3>
4496	200	<elision2>	<elision2>
4496	4494	<>	<elision2>
4496	200	<elision1>	<elision1>
4496	4494	<>	<elision1>
4496	208	.	υ
4496	3397	s	υ
4496	208	.	u
4496	3397	s	u
4496	3979	.	κ
4496	4497	s	κ
4496	4503	s	k
4496	4083	s	U
4496	4509	s	K
4496	208	.	α
4496	4138	s	α
4496	208	.	a
4496	4138	s	a
4496	4141	s	A
4496	4521	s	λ
4496	4524	s	l
4496	4527	s	L
4496	3668	<2s>	<>
4497	3398	.	.
4497	3399	 	 
4497	3398	<~>	<~>
4497	3398	<split-s>	<split-s>
4497	3398	<split-h>	<split-h>
4497	3398	<name2>	<name2>
4497	4498	<>	<name>
4497	3402	<aphaerese>	<aphaerese>
4497	4497	<>	<aphaerese>
4497	4012	<elision3>	<elision3>
4497	4497	<>	<elision3>
4497	4012	<elision2>	<elision2>
4497	4497	<>	<elision2>
4497	4012	<elision1>	<elision1>
4497	4497	<>	<elision1>
4497	3406	.	υ
4497	3412	s	υ
4497	3406	.	u
4497	3412	s	u
4497	3406	.	κ
4497	3783	s	U
4497	3406	.	α
4497	3412	s	α
4497	3406	.	a
4497	3412	s	a
4497	3904	s	A
4497	3406	.	λ
4497	4501	<split-h>	<>
4498	3401	.	.
4498	3404	 	 
4498	3401	<~>	<~>
4498	3401	<split-s>	<split-s>
4498	3401	<split-h>	<split-h>
4498	3401	<name2>	<name2>
4498	3948	<aphaerese>	<aphaerese>
4498	4499	<>	<aphaerese>
4498	4014	<elision3>	<elision3>
4498	4499	<>	<elision3>
4498	4014	<elision2>	<elision2>
4498	4499	<>	<elision2>
4498	4014	<elision1>	<elision1>
4498	4499	<>	<elision1>
4498	3408	.	υ
4498	3584	s	υ
4498	3408	.	u
4498	3584	s	u
4498	3408	.	κ
4498	3785	s	U
4498	3408	.	α
4498	3584	s	α
4498	3408	.	a
4498	3584	s	a
4498	3906	s	A
4498	3408	.	λ
4498	4502	<split-h>	<>
4499	3398	.	.
4499	3399	 	 
4499	3398	<~>	<~>
4499	3398	<split-s>	<split-s>
4499	3398	<split-h>	<split-h>
4499	3398	<name2>	<name2>
4499	3402	<aphaerese>	<aphaerese>
4499	4497	<>	<aphaerese>
4499	4012	<elision3>	<elision3>
4499	4497	<>	<elision3>
4499	4012	<elision2>	<elision2>
4499	4497	<>	<elision2>
4499	4012	<elision1>	<elision1>
4499	4497	<>	<elision1>
4499	3406	.	υ
4499	3412	s	υ
4499	3406	.	u
4499	3412	s	u
4499	3406	.	κ
4499	3783	s	U
4499	3406	.	α
4499	3412	s	α
4499	3406	.	a
4499	3412	s	a
4499	3904	s	A
4499	3406	.	λ
4499	4500	<split-h>	<>
4500	4501	<>	<aphaerese>
4500	4501	<>	<elision3>
4500	4501	<>	<elision2>
4500	4501	<>	<elision1>
4500	4018	<3s>	<>
4501	4502	<>	<name>
4501	4501	<>	<aphaerese>
4501	4501	<>	<elision3>
4501	4501	<>	<elision2>
4501	4501	<>	<elision1>
4501	4019	<3s>	<>
4502	4500	<>	<aphaerese>
4502	4500	<>	<elision3>
4502	4500	<>	<elision2>
4502	4500	<>	<elision1>
4502	4020	<3s>	<>
4503	3398	.	.
4503	3399	 	 
4503	3398	<~>	<~>
4503	3398	<split-s>	<split-s>
4503	3398	<split-h>	<split-h>
4503	3398	<name2>	<name2>
4503	4504	<>	<name>
4503	3402	<aphaerese>	<aphaerese>
4503	4503	<>	<aphaerese>
4503	3398	<elision3>	<elision3>
4503	4503	<>	<elision3>
4503	3398	<elision2>	<elision2>
4503	4503	<>	<elision2>
4503	3398	<elision1>	<elision1>
4503	4503	<>	<elision1>
4503	3406	.	υ
4503	3412	s	υ
4503	3406	.	u
4503	3412	s	u
4503	4065	.	κ
4503	3783	s	U
4503	3406	.	α
4503	3412	s	α
4503	3406	.	a
4503	3412	s	a
4503	3904	s	A
4503	4065	.	λ
4503	4507	<split-h>	<>
4504	3401	.	.
4504	3404	 	 
4504	3401	<~>	<~>
4504	3401	<split-s>	<split-s>
4504	3401	<split-h>	<split-h>
4504	3401	<name2>	<name2>
4504	3948	<aphaerese>	<aphaerese>
4504	4505	<>	<aphaerese>
4504	3401	<elision3>	<elision3>
4504	4505	<>	<elision3>
4504	3401	<elision2>	<elision2>
4504	4505	<>	<elision2>
4504	3401	<elision1>	<elision1>
4504	4505	<>	<elision1>
4504	3408	.	υ
4504	3584	s	υ
4504	3408	.	u
4504	3584	s	u
4504	4067	.	κ
4504	3785	s	U
4504	3408	.	α
4504	3584	s	α
4504	3408	.	a
4504	3584	s	a
4504	3906	s	A
4504	4067	.	λ
4504	4508	<split-h>	<>
4505	3398	.	.
4505	3399	 	 
4505	3398	<~>	<~>
4505	3398	<split-s>	<split-s>
4505	3398	<split-h>	<split-h>
4505	3398	<name2>	<name2>
4505	3402	<aphaerese>	<aphaerese>
4505	4503	<>	<aphaerese>
4505	3398	<elision3>	<elision3>
4505	4503	<>	<elision3>
4505	3398	<elision2>	<elision2>
4505	4503	<>	<elision2>
4505	3398	<elision1>	<elision1>
4505	4503	<>	<elision1>
4505	3406	.	υ
4505	3412	s	υ
4505	3406	.	u
4505	3412	s	u
4505	4065	.	κ
4505	3783	s	U
4505	3406	.	α
4505	3412	s	α
4505	3406	.	a
4505	3412	s	a
4505	3904	s	A
4505	4065	.	λ
4505	4506	<split-h>	<>
4506	4507	<>	<aphaerese>
4506	4507	<>	<elision3>
4506	4507	<>	<elision2>
4506	4507	<>	<elision1>
4506	4027	<3s>	<>
4507	4508	<>	<name>
4507	4507	<>	<aphaerese>
4507	4507	<>	<elision3>
4507	4507	<>	<elision2>
4507	4507	<>	<elision1>
4507	4028	<3s>	<>
4508	4506	<>	<aphaerese>
4508	4506	<>	<elision3>
4508	4506	<>	<elision2>
4508	4506	<>	<elision1>
4508	4029	<3s>	<>
4509	4087	<name>	<name>
4509	4510	<>	<name>
4509	4512	<>	<aphaerese>
4509	4512	<>	<elision3>
4509	4512	<>	<elision2>
4509	4512	<>	<elision1>
4509	4134	<split-h>	<>
4509	4186	<L2kl>	<>
4509	4519	<K2kl>	<>
4510	4511	<>	<aphaerese>
4510	4511	<>	<elision3>
4510	4511	<>	<elision2>
4510	4511	<>	<elision1>
4510	4187	<L2kl>	<>
4510	4514	<K2kl>	<>
4511	4512	<>	<aphaerese>
4511	4512	<>	<elision3>
4511	4512	<>	<elision2>
4511	4512	<>	<elision1>
4511	4188	<L2kl>	<>
4511	4515	<K2kl>	<>
4512	4510	<>	<name>
4512	4512	<>	<aphaerese>
4512	4512	<>	<elision3>
4512	4512	<>	<elision2>
4512	4512	<>	<elision1>
4512	4186	<L2kl>	<>
4512	4513	<K2kl>	<>
4513	4068	.	.
4513	4068	 	 
4513	4068	<~>	<~>
4513	4068	<split-s>	<split-s>
4513	4068	<split-h>	<split-h>
4513	4068	<name2>	<name2>
4513	4514	<>	<name>
4513	4071	<aphaerese>	<aphaerese>
4513	4513	<>	<aphaerese>
4513	4068	<elision3>	<elision3>
4513	4513	<>	<elision3>
4513	4068	<elision2>	<elision2>
4513	4513	<>	<elision2>
4513	4068	<elision1>	<elision1>
4513	4513	<>	<elision1>
4513	4065	.	υ
4513	4065	.	u
4513	4065	.	α
4513	4065	.	a
4513	4517	<split-h>	<>
4514	4070	.	.
4514	4070	 	 
4514	4070	<~>	<~>
4514	4070	<split-s>	<split-s>
4514	4070	<split-h>	<split-h>
4514	4070	<name2>	<name2>
4514	4073	<aphaerese>	<aphaerese>
4514	4515	<>	<aphaerese>
4514	4070	<elision3>	<elision3>
4514	4515	<>	<elision3>
4514	4070	<elision2>	<elision2>
4514	4515	<>	<elision2>
4514	4070	<elision1>	<elision1>
4514	4515	<>	<elision1>
4514	4067	.	υ
4514	4067	.	u
4514	4067	.	α
4514	4067	.	a
4514	4518	<split-h>	<>
4515	4068	.	.
4515	4068	 	 
4515	4068	<~>	<~>
4515	4068	<split-s>	<split-s>
4515	4068	<split-h>	<split-h>
4515	4068	<name2>	<name2>
4515	4071	<aphaerese>	<aphaerese>
4515	4513	<>	<aphaerese>
4515	4068	<elision3>	<elision3>
4515	4513	<>	<elision3>
4515	4068	<elision2>	<elision2>
4515	4513	<>	<elision2>
4515	4068	<elision1>	<elision1>
4515	4513	<>	<elision1>
4515	4065	.	υ
4515	4065	.	u
4515	4065	.	α
4515	4065	.	a
4515	4516	<split-h>	<>
4516	4517	<>	<aphaerese>
4516	4517	<>	<elision3>
4516	4517	<>	<elision2>
4516	4517	<>	<elision1>
4516	4040	<3s>	<>
4517	4518	<>	<name>
4517	4517	<>	<aphaerese>
4517	4517	<>	<elision3>
4517	4517	<>	<elision2>
4517	4517	<>	<elision1>
4517	4041	<3s>	<>
4518	4516	<>	<aphaerese>
4518	4516	<>	<elision3>
4518	4516	<>	<elision2>
4518	4516	<>	<elision1>
4518	4042	<3s>	<>
4519	4068	.	.
4519	4068	 	 
4519	4068	<~>	<~>
4519	4068	<split-s>	<split-s>
4519	4068	<split-h>	<split-h>
4519	4068	<name2>	<name2>
4519	4136	<name2>	<name>
4519	4514	<>	<name>
4519	4071	<aphaerese>	<aphaerese>
4519	4513	<>	<aphaerese>
4519	4068	<elision3>	<elision3>
4519	4513	<>	<elision3>
4519	4068	<elision2>	<elision2>
4519	4513	<>	<elision2>
4519	4068	<elision1>	<elision1>
4519	4513	<>	<elision1>
4519	4065	.	υ
4519	4065	.	u
4519	4065	.	α
4519	4065	.	a
4519	4520	<split-h>	<>
4520	4518	<>	<name>
4520	4517	<>	<aphaerese>
4520	4517	<>	<elision3>
4520	4517	<>	<elision2>
4520	4517	<>	<elision1>
4520	4047	<3s>	<>
4521	3398	.	.
4521	3399	 	 
4521	3398	<~>	<~>
4521	3398	<split-s>	<split-s>
4521	3398	<split-h>	<split-h>
4521	3398	<name2>	<name2>
4521	4522	<>	<name>
4521	3402	<aphaerese>	<aphaerese>
4521	4521	<>	<aphaerese>
4521	3398	<elision3>	<elision3>
4521	4521	<>	<elision3>
4521	3398	<elision2>	<elision2>
4521	4521	<>	<elision2>
4521	3398	<elision1>	<elision1>
4521	4521	<>	<elision1>
4521	3406	.	υ
4521	3412	s	υ
4521	3406	.	u
4521	3412	s	u
4521	3406	.	κ
4521	3783	s	U
4521	3406	.	α
4521	3412	s	α
4521	3406	.	a
4521	3412	s	a
4521	3904	s	A
4521	3406	.	λ
4521	4507	<split-h>	<>
4522	3401	.	.
4522	3404	 	 
4522	3401	<~>	<~>
4522	3401	<split-s>	<split-s>
4522	3401	<split-h>	<split-h>
4522	3401	<name2>	<name2>
4522	3948	<aphaerese>	<aphaerese>
4522	4523	<>	<aphaerese>
4522	3401	<elision3>	<elision3>
4522	4523	<>	<elision3>
4522	3401	<elision2>	<elision2>
4522	4523	<>	<elision2>
4522	3401	<elision1>	<elision1>
4522	4523	<>	<elision1>
4522	3408	.	υ
4522	3584	s	υ
4522	3408	.	u
4522	3584	s	u
4522	3408	.	κ
4522	3785	s	U
4522	3408	.	α
4522	3584	s	α
4522	3408	.	a
4522	3584	s	a
4522	3906	s	A
4522	3408	.	λ
4522	4508	<split-h>	<>
4523	3398	.	.
4523	3399	 	 
4523	3398	<~>	<~>
4523	3398	<split-s>	<split-s>
4523	3398	<split-h>	<split-h>
4523	3398	<name2>	<name2>
4523	3402	<aphaerese>	<aphaerese>
4523	4521	<>	<aphaerese>
4523	3398	<elision3>	<elision3>
4523	4521	<>	<elision3>
4523	3398	<elision2>	<elision2>
4523	4521	<>	<elision2>
4523	3398	<elision1>	<elision1>
4523	4521	<>	<elision1>
4523	3406	.	υ
4523	3412	s	υ
4523	3406	.	u
4523	3412	s	u
4523	3406	.	κ
4523	3783	s	U
4523	3406	.	α
4523	3412	s	α
4523	3406	.	a
4523	3412	s	a
4523	3904	s	A
4523	3406	.	λ
4523	4506	<split-h>	<>
4524	4068	.	.
4524	4068	 	 
4524	4068	<~>	<~>
4524	4068	<split-s>	<split-s>
4524	4068	<split-h>	<split-h>
4524	4068	<name2>	<name2>
4524	4525	<>	<name>
4524	4071	<aphaerese>	<aphaerese>
4524	4524	<>	<aphaerese>
4524	4068	<elision3>	<elision3>
4524	4524	<>	<elision3>
4524	4068	<elision2>	<elision2>
4524	4524	<>	<elision2>
4524	4068	<elision1>	<elision1>
4524	4524	<>	<elision1>
4524	4065	.	υ
4524	4065	.	u
4524	4065	.	κ
4524	4065	.	α
4524	4065	.	a
4524	4065	.	λ
4524	4507	<split-h>	<>
4525	4070	.	.
4525	4070	 	 
4525	4070	<~>	<~>
4525	4070	<split-s>	<split-s>
4525	4070	<split-h>	<split-h>
4525	4070	<name2>	<name2>
4525	4073	<aphaerese>	<aphaerese>
4525	4526	<>	<aphaerese>
4525	4070	<elision3>	<elision3>
4525	4526	<>	<elision3>
4525	4070	<elision2>	<elision2>
4525	4526	<>	<elision2>
4525	4070	<elision1>	<elision1>
4525	4526	<>	<elision1>
4525	4067	.	υ
4525	4067	.	u
4525	4067	.	κ
4525	4067	.	α
4525	4067	.	a
4525	4067	.	λ
4525	4508	<split-h>	<>
4526	4068	.	.
4526	4068	 	 
4526	4068	<~>	<~>
4526	4068	<split-s>	<split-s>
4526	4068	<split-h>	<split-h>
4526	4068	<name2>	<name2>
4526	4071	<aphaerese>	<aphaerese>
4526	4524	<>	<aphaerese>
4526	4068	<elision3>	<elision3>
4526	4524	<>	<elision3>
4526	4068	<elision2>	<elision2>
4526	4524	<>	<elision2>
4526	4068	<elision1>	<elision1>
4526	4524	<>	<elision1>
4526	4065	.	υ
4526	4065	.	u
4526	4065	.	κ
4526	4065	.	α
4526	4065	.	a
4526	4065	.	λ
4526	4506	<split-h>	<>
4527	4136	<name>	<name>
4527	4528	<>	<name>
4527	4530	<>	<aphaerese>
4527	4530	<>	<elision3>
4527	4530	<>	<elision2>
4527	4530	<>	<elision1>
4527	4134	<split-h>	<>
4527	4531	<L2kl>	<>
4528	4529	<>	<aphaerese>
4528	4529	<>	<elision3>
4528	4529	<>	<elision2>
4528	4529	<>	<elision1>
4528	4525	<L2kl>	<>
4529	4530	<>	<aphaerese>
4529	4530	<>	<elision3>
4529	4530	<>	<elision2>
4529	4530	<>	<elision1>
4529	4526	<L2kl>	<>
4530	4528	<>	<name>
4530	4530	<>	<aphaerese>
4530	4530	<>	<elision3>
4530	4530	<>	<elision2>
4530	4530	<>	<elision1>
4530	4524	<L2kl>	<>
4531	4068	.	.
4531	4068	 	 
4531	4068	<~>	<~>
4531	4068	<split-s>	<split-s>
4531	4068	<split-h>	<split-h>
4531	4068	<name2>	<name2>
4531	4136	<name2>	<name>
4531	4525	<>	<name>
4531	4071	<aphaerese>	<aphaerese>
4531	4524	<>	<aphaerese>
4531	4068	<elision3>	<elision3>
4531	4524	<>	<elision3>
4531	4068	<elision2>	<elision2>
4531	4524	<>	<elision2>
4531	4068	<elision1>	<elision1>
4531	4524	<>	<elision1>
4531	4065	.	υ
4531	4065	.	u
4531	4065	.	κ
4531	4065	.	α
4531	4065	.	a
4531	4065	.	λ
4531	4532	<split-h>	<>
4532	4508	<>	<name>
4532	4507	<>	<aphaerese>
4532	4507	<>	<elision3>
4532	4507	<>	<elision2>
4532	4507	<>	<elision1>
4532	4054	<3s>	<>
4533	4534	<>	<name>
4533	4533	<>	<aphaerese>
4533	4533	<>	<elision3>
4533	4533	<>	<elision2>
4533	4533	<>	<elision1>
4533	4214	<U2kl>	<>
4534	4535	<>	<aphaerese>
4534	4535	<>	<elision3>
4534	4535	<>	<elision2>
4534	4535	<>	<elision1>
4534	4240	<U2kl>	<>
4535	4533	<>	<aphaerese>
4535	4533	<>	<elision3>
4535	4533	<>	<elision2>
4535	4533	<>	<elision1>
4535	4217	<U2kl>	<>
4536	4242	<name>	<name>
4536	4537	<>	<name>
4536	4539	<>	<aphaerese>
4536	4539	<>	<elision3>
4536	4539	<>	<elision2>
4536	4539	<>	<elision1>
4536	3898	<2s>	<>
4536	4540	<A2kl>	<>
4536	4552	<L2kl>	<>
4536	4255	<K2kl>	<>
4537	4538	<>	<aphaerese>
4537	4538	<>	<elision3>
4537	4538	<>	<elision2>
4537	4538	<>	<elision1>
4537	4541	<A2kl>	<>
4537	4553	<L2kl>	<>
4537	4250	<K2kl>	<>
4538	4539	<>	<aphaerese>
4538	4539	<>	<elision3>
4538	4539	<>	<elision2>
4538	4539	<>	<elision1>
4538	4542	<A2kl>	<>
4538	4554	<L2kl>	<>
4538	4251	<K2kl>	<>
4539	4537	<>	<name>
4539	4539	<>	<aphaerese>
4539	4539	<>	<elision3>
4539	4539	<>	<elision2>
4539	4539	<>	<elision1>
4539	4540	<A2kl>	<>
4539	4552	<L2kl>	<>
4539	4249	<K2kl>	<>
4540	4541	<>	<name>
4540	4540	<>	<aphaerese>
4540	4540	<>	<elision3>
4540	4540	<>	<elision2>
4540	4540	<>	<elision1>
4540	4543	.	κ
4540	4543	.	λ
4540	3848	<2s>	<>
4541	4542	<>	<aphaerese>
4541	4542	<>	<elision3>
4541	4542	<>	<elision2>
4541	4542	<>	<elision1>
4541	4545	.	κ
4541	4545	.	λ
4541	3849	<2s>	<>
4542	4540	<>	<aphaerese>
4542	4540	<>	<elision3>
4542	4540	<>	<elision2>
4542	4540	<>	<elision1>
4542	4543	.	κ
4542	4543	.	λ
4542	3847	<2s>	<>
4543	4544	<>	<name>
4543	4543	<>	<aphaerese>
4543	4546	<elision3>	<elision3>
4543	4543	<>	<elision3>
4543	4546	<elision2>	<elision2>
4543	4543	<>	<elision2>
4543	4546	<elision1>	<elision1>
4543	4543	<>	<elision1>
4543	3839	<2s>	<>
4544	4545	<>	<aphaerese>
4544	4548	<elision3>	<elision3>
4544	4545	<>	<elision3>
4544	4548	<elision2>	<elision2>
4544	4545	<>	<elision2>
4544	4548	<elision1>	<elision1>
4544	4545	<>	<elision1>
4544	3840	<2s>	<>
4545	4543	<>	<aphaerese>
4545	4546	<elision3>	<elision3>
4545	4543	<>	<elision3>
4545	4546	<elision2>	<elision2>
4545	4543	<>	<elision2>
4545	4546	<elision1>	<elision1>
4545	4543	<>	<elision1>
4545	3838	<2s>	<>
4546	4214	.	.
4546	4215	 	 
4546	4214	<~>	<~>
4546	4214	<split-s>	<split-s>
4546	4214	<split-h>	<split-h>
4546	4214	<name2>	<name2>
4546	4547	<>	<name>
4546	4218	<aphaerese>	<aphaerese>
4546	4546	<>	<aphaerese>
4546	4214	<elision3>	<elision3>
4546	4546	<>	<elision3>
4546	4214	<elision2>	<elision2>
4546	4546	<>	<elision2>
4546	4214	<elision1>	<elision1>
4546	4546	<>	<elision1>
4546	4211	.	υ
4546	4138	s	υ
4546	4211	.	u
4546	4138	s	u
4546	4110	s	κ
4546	4110	s	k
4546	4083	s	U
4546	4549	s	K
4546	4211	.	α
4546	4138	s	α
4546	4211	.	a
4546	4138	s	a
4546	4141	s	A
4546	4110	s	λ
4546	4110	s	l
4546	4549	s	L
4546	3803	<2s>	<>
4547	4217	.	.
4547	4220	 	 
4547	4217	<~>	<~>
4547	4217	<split-s>	<split-s>
4547	4217	<split-h>	<split-h>
4547	4217	<name2>	<name2>
4547	4237	<aphaerese>	<aphaerese>
4547	4548	<>	<aphaerese>
4547	4217	<elision3>	<elision3>
4547	4548	<>	<elision3>
4547	4217	<elision2>	<elision2>
4547	4548	<>	<elision2>
4547	4217	<elision1>	<elision1>
4547	4548	<>	<elision1>
4547	4213	.	υ
4547	4140	s	υ
4547	4213	.	u
4547	4140	s	u
4547	4112	s	κ
4547	4112	s	k
4547	4085	s	U
4547	4551	s	K
4547	4213	.	α
4547	4140	s	α
4547	4213	.	a
4547	4140	s	a
4547	4143	s	A
4547	4112	s	λ
4547	4112	s	l
4547	4551	s	L
4547	3804	<2s>	<>
4548	4214	.	.
4548	4215	 	 
4548	4214	<~>	<~>
4548	4214	<split-s>	<split-s>
4548	4214	<split-h>	<split-h>
4548	4214	<name2>	<name2>
4548	4218	<aphaerese>	<aphaerese>
4548	4546	<>	<aphaerese>
4548	4214	<elision3>	<elision3>
4548	4546	<>	<elision3>
4548	4214	<elision2>	<elision2>
4548	4546	<>	<elision2>
4548	4214	<elision1>	<elision1>
4548	4546	<>	<elision1>
4548	4211	.	υ
4548	4138	s	υ
4548	4211	.	u
4548	4138	s	u
4548	4110	s	κ
4548	4110	s	k
4548	4083	s	U
4548	4549	s	K
4548	4211	.	α
4548	4138	s	α
4548	4211	.	a
4548	4138	s	a
4548	4141	s	A
4548	4110	s	λ
4548	4110	s	l
4548	4549	s	L
4548	3802	<2s>	<>
4549	4550	<>	<name>
4549	4549	<>	<aphaerese>
4549	4549	<>	<elision3>
4549	4549	<>	<elision2>
4549	4549	<>	<elision1>
4549	4110	<L2kl>	<>
4550	4551	<>	<aphaerese>
4550	4551	<>	<elision3>
4550	4551	<>	<elision2>
4550	4551	<>	<elision1>
4550	4111	<L2kl>	<>
4551	4549	<>	<aphaerese>
4551	4549	<>	<elision3>
4551	4549	<>	<elision2>
4551	4549	<>	<elision1>
4551	4112	<L2kl>	<>
4552	4553	<>	<name>
4552	4552	<>	<aphaerese>
4552	4552	<>	<elision3>
4552	4552	<>	<elision2>
4552	4552	<>	<elision1>
4552	4555	.	κ
4552	4555	.	λ
4552	3881	<2s>	<>
4553	4554	<>	<aphaerese>
4553	4554	<>	<elision3>
4553	4554	<>	<elision2>
4553	4554	<>	<elision1>
4553	4557	.	κ
4553	4557	.	λ
4553	3882	<2s>	<>
4554	4552	<>	<aphaerese>
4554	4552	<>	<elision3>
4554	4552	<>	<elision2>
4554	4552	<>	<elision1>
4554	4555	.	κ
4554	4555	.	λ
4554	3880	<2s>	<>
4555	4556	<>	<name>
4555	4555	<>	<aphaerese>
4555	4558	<elision3>	<elision3>
4555	4555	<>	<elision3>
4555	4558	<elision2>	<elision2>
4555	4555	<>	<elision2>
4555	4558	<elision1>	<elision1>
4555	4555	<>	<elision1>
4555	3872	<2s>	<>
4556	4557	<>	<aphaerese>
4556	4560	<elision3>	<elision3>
4556	4557	<>	<elision3>
4556	4560	<elision2>	<elision2>
4556	4557	<>	<elision2>
4556	4560	<elision1>	<elision1>
4556	4557	<>	<elision1>
4556	3873	<2s>	<>
4557	4555	<>	<aphaerese>
4557	4558	<elision3>	<elision3>
4557	4555	<>	<elision3>
4557	4558	<elision2>	<elision2>
4557	4555	<>	<elision2>
4557	4558	<elision1>	<elision1>
4557	4555	<>	<elision1>
4557	3871	<2s>	<>
4558	4559	<>	<name>
4558	4558	<>	<aphaerese>
4558	4558	<>	<elision3>
4558	4558	<>	<elision2>
4558	4558	<>	<elision1>
4558	4222	.	κ
4558	4228	s	κ
4558	4147	s	k
4558	4238	s	K
4558	4147	s	λ
4558	4147	s	l
4558	4192	s	L
4558	3866	<2s>	<>
4559	4560	<>	<aphaerese>
4559	4560	<>	<elision3>
4559	4560	<>	<elision2>
4559	4560	<>	<elision1>
4559	4224	.	κ
4559	4230	s	κ
4559	4149	s	k
4559	4184	s	K
4559	4149	s	λ
4559	4149	s	l
4559	4194	s	L
4559	3867	<2s>	<>
4560	4558	<>	<aphaerese>
4560	4558	<>	<elision3>
4560	4558	<>	<elision2>
4560	4558	<>	<elision1>
4560	4222	.	κ
4560	4228	s	κ
4560	4147	s	k
4560	4238	s	K
4560	4147	s	λ
4560	4147	s	l
4560	4192	s	L
4560	3865	<2s>	<>
4561	4214	.	.
4561	4215	 	 
4561	4214	<~>	<~>
4561	4214	<split-s>	<split-s>
4561	4214	<split-h>	<split-h>
4561	4214	<name2>	<name2>
4561	4562	<>	<name>
4561	4218	<aphaerese>	<aphaerese>
4561	4561	<>	<aphaerese>
4561	4561	<>	<elision3>
4561	4561	<>	<elision2>
4561	4561	<>	<elision1>
4561	4211	.	υ
4561	4138	s	υ
4561	4211	.	u
4561	4138	s	u
4561	4222	.	κ
4561	4228	s	κ
4561	4147	s	k
4561	4083	s	U
4561	4238	s	K
4561	4211	.	α
4561	4138	s	α
4561	4211	.	a
4561	4138	s	a
4561	4141	s	A
4561	4147	s	λ
4561	4147	s	l
4561	4192	s	L
4561	3586	<2s>	<>
4562	4217	.	.
4562	4220	 	 
4562	4217	<~>	<~>
4562	4217	<split-s>	<split-s>
4562	4217	<split-h>	<split-h>
4562	4217	<name2>	<name2>
4562	4237	<aphaerese>	<aphaerese>
4562	4563	<>	<aphaerese>
4562	4563	<>	<elision3>
4562	4563	<>	<elision2>
4562	4563	<>	<elision1>
4562	4213	.	υ
4562	4140	s	υ
4562	4213	.	u
4562	4140	s	u
4562	4224	.	κ
4562	4230	s	κ
4562	4149	s	k
4562	4085	s	U
4562	4184	s	K
4562	4213	.	α
4562	4140	s	α
4562	4213	.	a
4562	4140	s	a
4562	4143	s	A
4562	4149	s	λ
4562	4149	s	l
4562	4194	s	L
4562	3587	<2s>	<>
4563	4214	.	.
4563	4215	 	 
4563	4214	<~>	<~>
4563	4214	<split-s>	<split-s>
4563	4214	<split-h>	<split-h>
4563	4214	<name2>	<name2>
4563	4218	<aphaerese>	<aphaerese>
4563	4561	<>	<aphaerese>
4563	4561	<>	<elision3>
4563	4561	<>	<elision2>
4563	4561	<>	<elision1>
4563	4211	.	υ
4563	4138	s	υ
4563	4211	.	u
4563	4138	s	u
4563	4222	.	κ
4563	4228	s	κ
4563	4147	s	k
4563	4083	s	U
4563	4238	s	K
4563	4211	.	α
4563	4138	s	α
4563	4211	.	a
4563	4138	s	a
4563	4141	s	A
4563	4147	s	λ
4563	4147	s	l
4563	4192	s	L
4563	3585	<2s>	<>
4564	4565	<>	<name>
4564	4564	<>	<aphaerese>
4564	4564	<>	<elision3>
4564	4564	<>	<elision2>
4564	4564	<>	<elision1>
4564	4214	<A2kl>	<>
4565	4566	<>	<aphaerese>
4565	4566	<>	<elision3>
4565	4566	<>	<elision2>
4565	4566	<>	<elision1>
4565	4240	<A2kl>	<>
4566	4564	<>	<aphaerese>
4566	4564	<>	<elision3>
4566	4564	<>	<elision2>
4566	4564	<>	<elision1>
4566	4217	<A2kl>	<>
4567	200	.	.
4567	201	 	 
4567	200	<~>	<~>
4567	200	<split-s>	<split-s>
4567	200	<split-h>	<split-h>
4567	200	<name2>	<name2>
4567	4568	<>	<name>
4567	204	<aphaerese>	<aphaerese>
4567	4567	<>	<aphaerese>
4567	200	<elision3>	<elision3>
4567	4567	<>	<elision3>
4567	200	<elision2>	<elision2>
4567	4567	<>	<elision2>
4567	200	<elision1>	<elision1>
4567	4567	<>	<elision1>
4567	208	.	υ
4567	3397	s	υ
4567	208	.	u
4567	3397	s	u
4567	208	.	κ
4567	4202	s	κ
4567	4062	s	k
4567	4083	s	U
4567	4182	s	K
4567	208	.	α
4567	4138	s	α
4567	208	.	a
4567	4138	s	a
4567	4141	s	A
4567	208	.	λ
4567	4202	s	λ
4567	4147	s	l
4567	4192	s	L
4567	3778	<2s>	<>
4568	203	.	.
4568	206	 	 
4568	203	<~>	<~>
4568	203	<split-s>	<split-s>
4568	203	<split-h>	<split-h>
4568	203	<name2>	<name2>
4568	4181	<aphaerese>	<aphaerese>
4568	4569	<>	<aphaerese>
4568	203	<elision3>	<elision3>
4568	4569	<>	<elision3>
4568	203	<elision2>	<elision2>
4568	4569	<>	<elision2>
4568	203	<elision1>	<elision1>
4568	4569	<>	<elision1>
4568	210	.	υ
4568	3975	s	υ
4568	210	.	u
4568	3975	s	u
4568	210	.	κ
4568	4204	s	κ
4568	4064	s	k
4568	4085	s	U
4568	4184	s	K
4568	210	.	α
4568	4140	s	α
4568	210	.	a
4568	4140	s	a
4568	4143	s	A
4568	210	.	λ
4568	4204	s	λ
4568	4149	s	l
4568	4194	s	L
4568	3779	<2s>	<>
4569	200	.	.
4569	201	 	 
4569	200	<~>	<~>
4569	200	<split-s>	<split-s>
4569	200	<split-h>	<split-h>
4569	200	<name2>	<name2>
4569	204	<aphaerese>	<aphaerese>
4569	4567	<>	<aphaerese>
4569	200	<elision3>	<elision3>
4569	4567	<>	<elision3>
4569	200	<elision2>	<elision2>
4569	4567	<>	<elision2>
4569	200	<elision1>	<elision1>
4569	4567	<>	<elision1>
4569	208	.	υ
4569	3397	s	υ
4569	208	.	u
4569	3397	s	u
4569	208	.	κ
4569	4202	s	κ
4569	4062	s	k
4569	4083	s	U
4569	4182	s	K
4569	208	.	α
4569	4138	s	α
4569	208	.	a
4569	4138	s	a
4569	4141	s	A
4569	208	.	λ
4569	4202	s	λ
4569	4147	s	l
4569	4192	s	L
4569	3777	<2s>	<>
4570	4242	<name>	<name>
4570	4571	<>	<name>
4570	4573	<>	<aphaerese>
4570	4573	<>	<elision3>
4570	4573	<>	<elision2>
4570	4573	<>	<elision1>
4570	3898	<2s>	<>
4570	4540	<A2kl>	<>
4570	4577	<L2kl>	<>
4571	4572	<>	<aphaerese>
4571	4572	<>	<elision3>
4571	4572	<>	<elision2>
4571	4572	<>	<elision1>
4571	4541	<A2kl>	<>
4571	4575	<L2kl>	<>
4572	4573	<>	<aphaerese>
4572	4573	<>	<elision3>
4572	4573	<>	<elision2>
4572	4573	<>	<elision1>
4572	4542	<A2kl>	<>
4572	4576	<L2kl>	<>
4573	4571	<>	<name>
4573	4573	<>	<aphaerese>
4573	4573	<>	<elision3>
4573	4573	<>	<elision2>
4573	4573	<>	<elision1>
4573	4540	<A2kl>	<>
4573	4574	<L2kl>	<>
4574	4214	.	.
4574	4215	 	 
4574	4214	<~>	<~>
4574	4214	<split-s>	<split-s>
4574	4214	<split-h>	<split-h>
4574	4214	<name2>	<name2>
4574	4575	<>	<name>
4574	4218	<aphaerese>	<aphaerese>
4574	4574	<>	<aphaerese>
4574	4214	<elision3>	<elision3>
4574	4574	<>	<elision3>
4574	4214	<elision2>	<elision2>
4574	4574	<>	<elision2>
4574	4214	<elision1>	<elision1>
4574	4574	<>	<elision1>
4574	4211	.	υ
4574	4138	s	υ
4574	4211	.	u
4574	4138	s	u
4574	4555	.	κ
4574	4252	s	κ
4574	4147	s	k
4574	4083	s	U
4574	4238	s	K
4574	4211	.	α
4574	4138	s	α
4574	4211	.	a
4574	4138	s	a
4574	4141	s	A
4574	4555	.	λ
4574	4252	s	λ
4574	4147	s	l
4574	4192	s	L
4574	3915	<2s>	<>
4575	4217	.	.
4575	4220	 	 
4575	4217	<~>	<~>
4575	4217	<split-s>	<split-s>
4575	4217	<split-h>	<split-h>
4575	4217	<name2>	<name2>
4575	4237	<aphaerese>	<aphaerese>
4575	4576	<>	<aphaerese>
4575	4217	<elision3>	<elision3>
4575	4576	<>	<elision3>
4575	4217	<elision2>	<elision2>
4575	4576	<>	<elision2>
4575	4217	<elision1>	<elision1>
4575	4576	<>	<elision1>
4575	4213	.	υ
4575	4140	s	υ
4575	4213	.	u
4575	4140	s	u
4575	4557	.	κ
4575	4254	s	κ
4575	4149	s	k
4575	4085	s	U
4575	4184	s	K
4575	4213	.	α
4575	4140	s	α
4575	4213	.	a
4575	4140	s	a
4575	4143	s	A
4575	4557	.	λ
4575	4254	s	λ
4575	4149	s	l
4575	4194	s	L
4575	3916	<2s>	<>
4576	4214	.	.
4576	4215	 	 
4576	4214	<~>	<~>
4576	4214	<split-s>	<split-s>
4576	4214	<split-h>	<split-h>
4576	4214	<name2>	<name2>
4576	4218	<aphaerese>	<aphaerese>
4576	4574	<>	<aphaerese>
4576	4214	<elision3>	<elision3>
4576	4574	<>	<elision3>
4576	4214	<elision2>	<elision2>
4576	4574	<>	<elision2>
4576	4214	<elision1>	<elision1>
4576	4574	<>	<elision1>
4576	4211	.	υ
4576	4138	s	υ
4576	4211	.	u
4576	4138	s	u
4576	4555	.	κ
4576	4252	s	κ
4576	4147	s	k
4576	4083	s	U
4576	4238	s	K
4576	4211	.	α
4576	4138	s	α
4576	4211	.	a
4576	4138	s	a
4576	4141	s	A
4576	4555	.	λ
4576	4252	s	λ
4576	4147	s	l
4576	4192	s	L
4576	3914	<2s>	<>
4577	4214	.	.
4577	4215	 	 
4577	4214	<~>	<~>
4577	4214	<split-s>	<split-s>
4577	4214	<split-h>	<split-h>
4577	4214	<name2>	<name2>
4577	4242	<name2>	<name>
4577	4575	<>	<name>
4577	4218	<aphaerese>	<aphaerese>
4577	4574	<>	<aphaerese>
4577	4214	<elision3>	<elision3>
4577	4574	<>	<elision3>
4577	4214	<elision2>	<elision2>
4577	4574	<>	<elision2>
4577	4214	<elision1>	<elision1>
4577	4574	<>	<elision1>
4577	4211	.	υ
4577	4138	s	υ
4577	4211	.	u
4577	4138	s	u
4577	4555	.	κ
4577	4252	s	κ
4577	4147	s	k
4577	4083	s	U
4577	4238	s	K
4577	4211	.	α
4577	4138	s	α
4577	4211	.	a
4577	4138	s	a
4577	4141	s	A
4577	4555	.	λ
4577	4252	s	λ
4577	4147	s	l
4577	4192	s	L
4577	3921	<2s>	<>
4578	200	.	.
4578	201	 	 
4578	200	<~>	<~>
4578	200	<split-s>	<split-s>
4578	200	<split-h>	<split-h>
4578	200	<name2>	<name2>
4578	4471	<>	<name>
4578	204	<aphaerese>	<aphaerese>
4578	4470	<>	<aphaerese>
4578	4470	<>	<elision3>
4578	4470	<>	<elision2>
4578	4470	<>	<elision1>
4578	208	.	υ
4578	3397	s	υ
4578	208	.	u
4578	3397	s	u
4578	3979	.	κ
4578	4009	s	κ
4578	4062	s	k
4578	4083	s	U
4578	4182	s	K
4578	208	.	α
4578	4138	s	α
4578	208	.	a
4578	4138	s	a
4578	4141	s	A
4578	4144	s	λ
4578	4147	s	l
4578	4192	s	L
4578	3927	<2s>	<>
4579	200	.	.
4579	201	 	 
4579	200	<~>	<~>
4579	200	<split-s>	<split-s>
4579	200	<split-h>	<split-h>
4579	200	<name2>	<name2>
4579	4492	<>	<name>
4579	204	<aphaerese>	<aphaerese>
4579	4491	<>	<aphaerese>
4579	4494	<elision3>	<elision3>
4579	4491	<>	<elision3>
4579	4494	<elision2>	<elision2>
4579	4491	<>	<elision2>
4579	4494	<elision1>	<elision1>
4579	4491	<>	<elision1>
4579	208	.	υ
4579	3397	s	υ
4579	208	.	u
4579	3397	s	u
4579	208	.	κ
4579	4202	s	κ
4579	4062	s	k
4579	4083	s	U
4579	4182	s	K
4579	208	.	α
4579	4138	s	α
4579	208	.	a
4579	4138	s	a
4579	4141	s	A
4579	208	.	λ
4579	4202	s	λ
4579	4147	s	l
4579	4192	s	L
4579	3930	<2s>	<>
4580	200	.	.
4580	201	 	 
4580	200	<~>	<~>
4580	200	<split-s>	<split-s>
4580	200	<split-h>	<split-h>
4580	200	<name2>	<name2>
4580	4209	<>	<name>
4580	204	<aphaerese>	<aphaerese>
4580	4208	<>	<aphaerese>
4580	200	<elision3>	<elision3>
4580	4208	<>	<elision3>
4580	200	<elision2>	<elision2>
4580	4208	<>	<elision2>
4580	200	<elision1>	<elision1>
4580	4208	<>	<elision1>
4580	208	.	υ
4580	3397	s	υ
4580	208	.	u
4580	3397	s	u
4580	4211	.	κ
4580	4202	s	κ
4580	4062	s	k
4580	4083	s	U
4580	4182	s	K
4580	208	.	α
4580	4138	s	α
4580	208	.	a
4580	4138	s	a
4580	4141	s	A
4580	4211	.	λ
4580	4202	s	λ
4580	4147	s	l
4580	4192	s	L
4580	3933	<2s>	<>
4581	4534	<>	<name>
4581	4533	<>	<aphaerese>
4581	4533	<>	<elision3>
4581	4533	<>	<elision2>
4581	4533	<>	<elision1>
4581	4582	<U2kl>	<>
4582	4214	.	.
4582	4215	 	 
4582	4214	<~>	<~>
4582	4214	<split-s>	<split-s>
4582	4214	<split-h>	<split-h>
4582	4214	<name2>	<name2>
4582	4240	<>	<name>
4582	4218	<aphaerese>	<aphaerese>
4582	4214	<>	<aphaerese>
4582	4214	<elision3>	<elision3>
4582	4214	<>	<elision3>
4582	4214	<elision2>	<elision2>
4582	4214	<>	<elision2>
4582	4214	<elision1>	<elision1>
4582	4214	<>	<elision1>
4582	4211	.	υ
4582	4138	s	υ
4582	4211	.	u
4582	4138	s	u
4582	4222	.	κ
4582	4228	s	κ
4582	4147	s	k
4582	4083	s	U
4582	4238	s	K
4582	4211	.	α
4582	4138	s	α
4582	4211	.	a
4582	4138	s	a
4582	4141	s	A
4582	4147	s	λ
4582	4147	s	l
4582	4192	s	L
4582	3937	<2s>	<>
4583	4242	<name>	<name>
4583	4537	<>	<name>
4583	4539	<>	<aphaerese>
4583	4539	<>	<elision3>
4583	4539	<>	<elision2>
4583	4539	<>	<elision1>
4583	3898	<2s>	<>
4583	4540	<A2kl>	<>
4583	4552	<L2kl>	<>
4583	4584	<K2kl>	<>
4584	4214	.	.
4584	4215	 	 
4584	4214	<~>	<~>
4584	4214	<split-s>	<split-s>
4584	4214	<split-h>	<split-h>
4584	4214	<name2>	<name2>
4584	4242	<name2>	<name>
4584	4250	<>	<name>
4584	4218	<aphaerese>	<aphaerese>
4584	4249	<>	<aphaerese>
4584	4214	<elision3>	<elision3>
4584	4249	<>	<elision3>
4584	4214	<elision2>	<elision2>
4584	4249	<>	<elision2>
4584	4214	<elision1>	<elision1>
4584	4249	<>	<elision1>
4584	4211	.	υ
4584	4138	s	υ
4584	4211	.	u
4584	4138	s	u
4584	4252	s	κ
4584	4147	s	k
4584	4083	s	U
4584	4238	s	K
4584	4211	.	α
4584	4138	s	α
4584	4211	.	a
4584	4138	s	a
4584	4141	s	A
4584	4252	s	λ
4584	4147	s	l
4584	4192	s	L
4584	3941	<2s>	<>
4585	4214	.	.
4585	4215	 	 
4585	4214	<~>	<~>
4585	4214	<split-s>	<split-s>
4585	4214	<split-h>	<split-h>
4585	4214	<name2>	<name2>
4585	4562	<>	<name>
4585	4218	<aphaerese>	<aphaerese>
4585	4561	<>	<aphaerese>
4585	4561	<>	<elision3>
4585	4561	<>	<elision2>
4585	4561	<>	<elision1>
4585	4211	.	υ
4585	4138	s	υ
4585	4211	.	u
4585	4138	s	u
4585	4222	.	κ
4585	4228	s	κ
4585	4147	s	k
4585	4083	s	U
4585	4238	s	K
4585	4211	.	α
4585	4138	s	α
4585	4211	.	a
4585	4138	s	a
4585	4141	s	A
4585	4147	s	λ
4585	4147	s	l
4585	4192	s	L
4585	3927	<2s>	<>
4586	4565	<>	<name>
4586	4564	<>	<aphaerese>
4586	4564	<>	<elision3>
4586	4564	<>	<elision2>
4586	4564	<>	<elision1>
4586	4582	<A2kl>	<>
4587	200	.	.
4587	201	 	 
4587	200	<~>	<~>
4587	200	<split-s>	<split-s>
4587	200	<split-h>	<split-h>
4587	200	<name2>	<name2>
4587	4568	<>	<name>
4587	204	<aphaerese>	<aphaerese>
4587	4567	<>	<aphaerese>
4587	200	<elision3>	<elision3>
4587	4567	<>	<elision3>
4587	200	<elision2>	<elision2>
4587	4567	<>	<elision2>
4587	200	<elision1>	<elision1>
4587	4567	<>	<elision1>
4587	208	.	υ
4587	3397	s	υ
4587	208	.	u
4587	3397	s	u
4587	208	.	κ
4587	4202	s	κ
4587	4062	s	k
4587	4083	s	U
4587	4182	s	K
4587	208	.	α
4587	4138	s	α
4587	208	.	a
4587	4138	s	a
4587	4141	s	A
4587	208	.	λ
4587	4202	s	λ
4587	4147	s	l
4587	4192	s	L
4587	3933	<2s>	<>
4588	4214	.	.
4588	4215	 	 
4588	4214	<~>	<~>
4588	4214	<split-s>	<split-s>
4588	4214	<split-h>	<split-h>
4588	4214	<name2>	<name2>
4588	4257	<>	<name>
4588	4218	<aphaerese>	<aphaerese>
4588	4256	<>	<aphaerese>
4588	4214	<elision3>	<elision3>
4588	4256	<>	<elision3>
4588	4214	<elision2>	<elision2>
4588	4256	<>	<elision2>
4588	4214	<elision1>	<elision1>
4588	4256	<>	<elision1>
4588	4211	.	υ
4588	4138	s	υ
4588	4211	.	u
4588	4138	s	u
4588	4211	.	κ
4588	4252	s	κ
4588	4147	s	k
4588	4083	s	U
4588	4238	s	K
4588	4211	.	α
4588	4138	s	α
4588	4211	.	a
4588	4138	s	a
4588	4141	s	A
4588	4211	.	λ
4588	4252	s	λ
4588	4147	s	l
4588	4192	s	L
4588	3933	<2s>	<>
4589	4242	<name>	<name>
4589	4571	<>	<name>
4589	4573	<>	<aphaerese>
4589	4573	<>	<elision3>
4589	4573	<>	<elision2>
4589	4573	<>	<elision1>
4589	3898	<2s>	<>
4589	4540	<A2kl>	<>
4589	4590	<L2kl>	<>
4590	4214	.	.
4590	4215	 	 
4590	4214	<~>	<~>
4590	4214	<split-s>	<split-s>
4590	4214	<split-h>	<split-h>
4590	4214	<name2>	<name2>
4590	4242	<name2>	<name>
4590	4575	<>	<name>
4590	4218	<aphaerese>	<aphaerese>
4590	4574	<>	<aphaerese>
4590	4214	<elision3>	<elision3>
4590	4574	<>	<elision3>
4590	4214	<elision2>	<elision2>
4590	4574	<>	<elision2>
4590	4214	<elision1>	<elision1>
4590	4574	<>	<elision1>
4590	4211	.	υ
4590	4138	s	υ
4590	4211	.	u
4590	4138	s	u
4590	4555	.	κ
4590	4252	s	κ
4590	4147	s	k
4590	4083	s	U
4590	4238	s	K
4590	4211	.	α
4590	4138	s	α
4590	4211	.	a
4590	4138	s	a
4590	4141	s	A
4590	4555	.	λ
4590	4252	s	λ
4590	4147	s	l
4590	4192	s	L
4590	3946	<2s>	<>
4591	4459	.	.
4591	4460	 	 
4591	4459	<~>	<~>
4591	4459	<split-s>	<split-s>
4591	4459	<split-h>	<split-h>
4591	4459	<name2>	<name2>
4591	4463	<aphaerese>	<aphaerese>
4591	4463	<>	<aphaerese>
4591	4459	<elision3>	<elision3>
4591	4463	<>	<elision3>
4591	4459	<elision2>	<elision2>
4591	4463	<>	<elision2>
4591	4459	<elision1>	<elision1>
4591	4463	<>	<elision1>
4591	4459	.	υ
4591	4459	.	u
4591	4473	.	κ
4591	4491	s	κ
4591	4208	s	k
4591	4533	s	U
4591	4241	s	K
4591	4459	.	α
4591	4459	.	a
4591	4564	s	A
4591	4567	s	λ
4591	4256	s	l
4591	4259	s	L
4592	4459	.	.
4592	4460	 	 
4592	4459	<~>	<~>
4592	4459	<split-s>	<split-s>
4592	4459	<split-h>	<split-h>
4592	4459	<name2>	<name2>
4592	4463	<aphaerese>	<aphaerese>
4592	4466	<>	<aphaerese>
4592	4459	<elision3>	<elision3>
4592	4466	<>	<elision3>
4592	4459	<elision2>	<elision2>
4592	4466	<>	<elision2>
4592	4459	<elision1>	<elision1>
4592	4466	<>	<elision1>
4592	4467	.	υ
4592	4470	s	υ
4592	4467	.	u
4592	4470	s	u
4592	4473	.	κ
4592	4491	s	κ
4592	4208	s	k
4592	4533	s	U
4592	4536	s	K
4592	4467	.	α
4592	4561	s	α
4592	4467	.	a
4592	4561	s	a
4592	4564	s	A
4592	4567	s	λ
4592	4256	s	l
4592	4570	s	L
4593	4462	.	.
4593	4465	 	 
4593	4462	<~>	<~>
4593	4462	<split-s>	<split-s>
4593	4462	<split-h>	<split-h>
4593	4462	<name2>	<name2>
4593	4591	<aphaerese>	<aphaerese>
4593	4462	<>	<aphaerese>
4593	4462	<elision3>	<elision3>
4593	4462	<>	<elision3>
4593	4462	<elision2>	<elision2>
4593	4462	<>	<elision2>
4593	4462	<elision1>	<elision1>
4593	4462	<>	<elision1>
4593	4469	.	υ
4593	4472	s	υ
4593	4469	.	u
4593	4472	s	u
4593	4475	.	κ
4593	4493	s	κ
4593	4210	s	k
4593	4535	s	U
4593	4244	s	K
4593	4469	.	α
4593	4563	s	α
4593	4469	.	a
4593	4563	s	a
4593	4566	s	A
4593	4569	s	λ
4593	4258	s	l
4593	4261	s	L
4594	4462	.	.
4594	4465	 	 
4594	4462	<~>	<~>
4594	4462	<split-s>	<split-s>
4594	4462	<split-h>	<split-h>
4594	4462	<name2>	<name2>
4594	4591	<aphaerese>	<aphaerese>
4594	4595	<>	<aphaerese>
4594	4598	<elision3>	<elision3>
4594	4595	<>	<elision3>
4594	4598	<elision2>	<elision2>
4594	4595	<>	<elision2>
4594	4598	<elision1>	<elision1>
4594	4595	<>	<elision1>
4594	4469	.	υ
4594	4472	s	υ
4594	4469	.	u
4594	4472	s	u
4594	4201	s	κ
4594	4210	s	k
4594	4535	s	U
4594	4244	s	K
4594	4469	.	α
4594	4563	s	α
4594	4469	.	a
4594	4563	s	a
4594	4566	s	A
4594	4201	s	λ
4594	4258	s	l
4594	4261	s	L
4595	4459	.	.
4595	4460	 	 
4595	4459	<~>	<~>
4595	4459	<split-s>	<split-s>
4595	4459	<split-h>	<split-h>
4595	4459	<name2>	<name2>
4595	4463	<aphaerese>	<aphaerese>
4595	4458	<>	<aphaerese>
4595	4596	<elision3>	<elision3>
4595	4458	<>	<elision3>
4595	4596	<elision2>	<elision2>
4595	4458	<>	<elision2>
4595	4596	<elision1>	<elision1>
4595	4458	<>	<elision1>
4595	4467	.	υ
4595	4470	s	υ
4595	4467	.	u
4595	4470	s	u
4595	199	s	κ
4595	4208	s	k
4595	4533	s	U
4595	4241	s	K
4595	4467	.	α
4595	4561	s	α
4595	4467	.	a
4595	4561	s	a
4595	4564	s	A
4595	199	s	λ
4595	4256	s	l
4595	4259	s	L
4596	4459	.	.
4596	4460	 	 
4596	4459	<~>	<~>
4596	4459	<split-s>	<split-s>
4596	4459	<split-h>	<split-h>
4596	4459	<name2>	<name2>
4596	4597	<>	<name>
4596	4463	<aphaerese>	<aphaerese>
4596	4596	<>	<aphaerese>
4596	4459	<elision3>	<elision3>
4596	4596	<>	<elision3>
4596	4459	<elision2>	<elision2>
4596	4596	<>	<elision2>
4596	4459	<elision1>	<elision1>
4596	4596	<>	<elision1>
4596	4467	.	υ
4596	4470	s	υ
4596	4467	.	u
4596	4470	s	u
4596	4473	.	κ
4596	4599	s	κ
4596	4602	s	k
4596	4533	s	U
4596	4605	s	K
4596	4467	.	α
4596	4561	s	α
4596	4467	.	a
4596	4561	s	a
4596	4564	s	A
4596	4613	s	λ
4596	4616	s	l
4596	4619	s	L
4597	4462	.	.
4597	4465	 	 
4597	4462	<~>	<~>
4597	4462	<split-s>	<split-s>
4597	4462	<split-h>	<split-h>
4597	4462	<name2>	<name2>
4597	4591	<aphaerese>	<aphaerese>
4597	4598	<>	<aphaerese>
4597	4462	<elision3>	<elision3>
4597	4598	<>	<elision3>
4597	4462	<elision2>	<elision2>
4597	4598	<>	<elision2>
4597	4462	<elision1>	<elision1>
4597	4598	<>	<elision1>
4597	4469	.	υ
4597	4472	s	υ
4597	4469	.	u
4597	4472	s	u
4597	4475	.	κ
4597	4601	s	κ
4597	4604	s	k
4597	4535	s	U
4597	4607	s	K
4597	4469	.	α
4597	4563	s	α
4597	4469	.	a
4597	4563	s	a
4597	4566	s	A
4597	4615	s	λ
4597	4618	s	l
4597	4621	s	L
4598	4459	.	.
4598	4460	 	 
4598	4459	<~>	<~>
4598	4459	<split-s>	<split-s>
4598	4459	<split-h>	<split-h>
4598	4459	<name2>	<name2>
4598	4463	<aphaerese>	<aphaerese>
4598	4596	<>	<aphaerese>
4598	4459	<elision3>	<elision3>
4598	4596	<>	<elision3>
4598	4459	<elision2>	<elision2>
4598	4596	<>	<elision2>
4598	4459	<elision1>	<elision1>
4598	4596	<>	<elision1>
4598	4467	.	υ
4598	4470	s	υ
4598	4467	.	u
4598	4470	s	u
4598	4473	.	κ
4598	4599	s	κ
4598	4602	s	k
4598	4533	s	U
4598	4605	s	K
4598	4467	.	α
4598	4561	s	α
4598	4467	.	a
4598	4561	s	a
4598	4564	s	A
4598	4613	s	λ
4598	4616	s	l
4598	4619	s	L
4599	200	.	.
4599	201	 	 
4599	200	<~>	<~>
4599	200	<split-s>	<split-s>
4599	200	<split-h>	<split-h>
4599	200	<name2>	<name2>
4599	4600	<>	<name>
4599	204	<aphaerese>	<aphaerese>
4599	4599	<>	<aphaerese>
4599	4494	<elision3>	<elision3>
4599	4599	<>	<elision3>
4599	4494	<elision2>	<elision2>
4599	4599	<>	<elision2>
4599	4494	<elision1>	<elision1>
4599	4599	<>	<elision1>
4599	208	.	υ
4599	3397	s	υ
4599	208	.	u
4599	3397	s	u
4599	208	.	κ
4599	4083	s	U
4599	208	.	α
4599	4138	s	α
4599	208	.	a
4599	4138	s	a
4599	4141	s	A
4599	208	.	λ
4599	4019	<2s>	<>
4600	203	.	.
4600	206	 	 
4600	203	<~>	<~>
4600	203	<split-s>	<split-s>
4600	203	<split-h>	<split-h>
4600	203	<name2>	<name2>
4600	4181	<aphaerese>	<aphaerese>
4600	4601	<>	<aphaerese>
4600	4496	<elision3>	<elision3>
4600	4601	<>	<elision3>
4600	4496	<elision2>	<elision2>
4600	4601	<>	<elision2>
4600	4496	<elision1>	<elision1>
4600	4601	<>	<elision1>
4600	210	.	υ
4600	3975	s	υ
4600	210	.	u
4600	3975	s	u
4600	210	.	κ
4600	4085	s	U
4600	210	.	α
4600	4140	s	α
4600	210	.	a
4600	4140	s	a
4600	4143	s	A
4600	210	.	λ
4600	4020	<2s>	<>
4601	200	.	.
4601	201	 	 
4601	200	<~>	<~>
4601	200	<split-s>	<split-s>
4601	200	<split-h>	<split-h>
4601	200	<name2>	<name2>
4601	204	<aphaerese>	<aphaerese>
4601	4599	<>	<aphaerese>
4601	4494	<elision3>	<elision3>
4601	4599	<>	<elision3>
4601	4494	<elision2>	<elision2>
4601	4599	<>	<elision2>
4601	4494	<elision1>	<elision1>
4601	4599	<>	<elision1>
4601	208	.	υ
4601	3397	s	υ
4601	208	.	u
4601	3397	s	u
4601	208	.	κ
4601	4083	s	U
4601	208	.	α
4601	4138	s	α
4601	208	.	a
4601	4138	s	a
4601	4141	s	A
4601	208	.	λ
4601	4018	<2s>	<>
4602	200	.	.
4602	201	 	 
4602	200	<~>	<~>
4602	200	<split-s>	<split-s>
4602	200	<split-h>	<split-h>
4602	200	<name2>	<name2>
4602	4603	<>	<name>
4602	204	<aphaerese>	<aphaerese>
4602	4602	<>	<aphaerese>
4602	200	<elision3>	<elision3>
4602	4602	<>	<elision3>
4602	200	<elision2>	<elision2>
4602	4602	<>	<elision2>
4602	200	<elision1>	<elision1>
4602	4602	<>	<elision1>
4602	208	.	υ
4602	3397	s	υ
4602	208	.	u
4602	3397	s	u
4602	4211	.	κ
4602	4083	s	U
4602	208	.	α
4602	4138	s	α
4602	208	.	a
4602	4138	s	a
4602	4141	s	A
4602	4211	.	λ
4602	4028	<2s>	<>
4603	203	.	.
4603	206	 	 
4603	203	<~>	<~>
4603	203	<split-s>	<split-s>
4603	203	<split-h>	<split-h>
4603	203	<name2>	<name2>
4603	4181	<aphaerese>	<aphaerese>
4603	4604	<>	<aphaerese>
4603	203	<elision3>	<elision3>
4603	4604	<>	<elision3>
4603	203	<elision2>	<elision2>
4603	4604	<>	<elision2>
4603	203	<elision1>	<elision1>
4603	4604	<>	<elision1>
4603	210	.	υ
4603	3975	s	υ
4603	210	.	u
4603	3975	s	u
4603	4213	.	κ
4603	4085	s	U
4603	210	.	α
4603	4140	s	α
4603	210	.	a
4603	4140	s	a
4603	4143	s	A
4603	4213	.	λ
4603	4029	<2s>	<>
4604	200	.	.
4604	201	 	 
4604	200	<~>	<~>
4604	200	<split-s>	<split-s>
4604	200	<split-h>	<split-h>
4604	200	<name2>	<name2>
4604	204	<aphaerese>	<aphaerese>
4604	4602	<>	<aphaerese>
4604	200	<elision3>	<elision3>
4604	4602	<>	<elision3>
4604	200	<elision2>	<elision2>
4604	4602	<>	<elision2>
4604	200	<elision1>	<elision1>
4604	4602	<>	<elision1>
4604	208	.	υ
4604	3397	s	υ
4604	208	.	u
4604	3397	s	u
4604	4211	.	κ
4604	4083	s	U
4604	208	.	α
4604	4138	s	α
4604	208	.	a
4604	4138	s	a
4604	4141	s	A
4604	4211	.	λ
4604	4027	<2s>	<>
4605	4242	<name>	<name>
4605	4606	<>	<name>
4605	4608	<>	<aphaerese>
4605	4608	<>	<elision3>
4605	4608	<>	<elision2>
4605	4608	<>	<elision1>
4605	3898	<2s>	<>
4605	4246	<L2kl>	<>
4605	4612	<K2kl>	<>
4606	4607	<>	<aphaerese>
4606	4607	<>	<elision3>
4606	4607	<>	<elision2>
4606	4607	<>	<elision1>
4606	4247	<L2kl>	<>
4606	4610	<K2kl>	<>
4607	4608	<>	<aphaerese>
4607	4608	<>	<elision3>
4607	4608	<>	<elision2>
4607	4608	<>	<elision1>
4607	4248	<L2kl>	<>
4607	4611	<K2kl>	<>
4608	4606	<>	<name>
4608	4608	<>	<aphaerese>
4608	4608	<>	<elision3>
4608	4608	<>	<elision2>
4608	4608	<>	<elision1>
4608	4246	<L2kl>	<>
4608	4609	<K2kl>	<>
4609	4214	.	.
4609	4215	 	 
4609	4214	<~>	<~>
4609	4214	<split-s>	<split-s>
4609	4214	<split-h>	<split-h>
4609	4214	<name2>	<name2>
4609	4610	<>	<name>
4609	4218	<aphaerese>	<aphaerese>
4609	4609	<>	<aphaerese>
4609	4214	<elision3>	<elision3>
4609	4609	<>	<elision3>
4609	4214	<elision2>	<elision2>
4609	4609	<>	<elision2>
4609	4214	<elision1>	<elision1>
4609	4609	<>	<elision1>
4609	4211	.	υ
4609	4138	s	υ
4609	4211	.	u
4609	4138	s	u
4609	4083	s	U
4609	4211	.	α
4609	4138	s	α
4609	4211	.	a
4609	4138	s	a
4609	4141	s	A
4609	4041	<2s>	<>
4610	4217	.	.
4610	4220	 	 
4610	4217	<~>	<~>
4610	4217	<split-s>	<split-s>
4610	4217	<split-h>	<split-h>
4610	4217	<name2>	<name2>
4610	4237	<aphaerese>	<aphaerese>
4610	4611	<>	<aphaerese>
4610	4217	<elision3>	<elision3>
4610	4611	<>	<elision3>
4610	4217	<elision2>	<elision2>
4610	4611	<>	<elision2>
4610	4217	<elision1>	<elision1>
4610	4611	<>	<elision1>
4610	4213	.	υ
4610	4140	s	υ
4610	4213	.	u
4610	4140	s	u
4610	4085	s	U
4610	4213	.	α
4610	4140	s	α
4610	4213	.	a
4610	4140	s	a
4610	4143	s	A
4610	4042	<2s>	<>
4611	4214	.	.
4611	4215	 	 
4611	4214	<~>	<~>
4611	4214	<split-s>	<split-s>
4611	4214	<split-h>	<split-h>
4611	4214	<name2>	<name2>
4611	4218	<aphaerese>	<aphaerese>
4611	4609	<>	<aphaerese>
4611	4214	<elision3>	<elision3>
4611	4609	<>	<elision3>
4611	4214	<elision2>	<elision2>
4611	4609	<>	<elision2>
4611	4214	<elision1>	<elision1>
4611	4609	<>	<elision1>
4611	4211	.	υ
4611	4138	s	υ
4611	4211	.	u
4611	4138	s	u
4611	4083	s	U
4611	4211	.	α
4611	4138	s	α
4611	4211	.	a
4611	4138	s	a
4611	4141	s	A
4611	4040	<2s>	<>
4612	4214	.	.
4612	4215	 	 
4612	4214	<~>	<~>
4612	4214	<split-s>	<split-s>
4612	4214	<split-h>	<split-h>
4612	4214	<name2>	<name2>
4612	4242	<name2>	<name>
4612	4610	<>	<name>
4612	4218	<aphaerese>	<aphaerese>
4612	4609	<>	<aphaerese>
4612	4214	<elision3>	<elision3>
4612	4609	<>	<elision3>
4612	4214	<elision2>	<elision2>
4612	4609	<>	<elision2>
4612	4214	<elision1>	<elision1>
4612	4609	<>	<elision1>
4612	4211	.	υ
4612	4138	s	υ
4612	4211	.	u
4612	4138	s	u
4612	4083	s	U
4612	4211	.	α
4612	4138	s	α
4612	4211	.	a
4612	4138	s	a
4612	4141	s	A
4612	4047	<2s>	<>
4613	200	.	.
4613	201	 	 
4613	200	<~>	<~>
4613	200	<split-s>	<split-s>
4613	200	<split-h>	<split-h>
4613	200	<name2>	<name2>
4613	4614	<>	<name>
4613	204	<aphaerese>	<aphaerese>
4613	4613	<>	<aphaerese>
4613	200	<elision3>	<elision3>
4613	4613	<>	<elision3>
4613	200	<elision2>	<elision2>
4613	4613	<>	<elision2>
4613	200	<elision1>	<elision1>
4613	4613	<>	<elision1>
4613	208	.	υ
4613	3397	s	υ
4613	208	.	u
4613	3397	s	u
4613	208	.	κ
4613	4083	s	U
4613	208	.	α
4613	4138	s	α
4613	208	.	a
4613	4138	s	a
4613	4141	s	A
4613	208	.	λ
4613	4028	<2s>	<>
4614	203	.	.
4614	206	 	 
4614	203	<~>	<~>
4614	203	<split-s>	<split-s>
4614	203	<split-h>	<split-h>
4614	203	<name2>	<name2>
4614	4181	<aphaerese>	<aphaerese>
4614	4615	<>	<aphaerese>
4614	203	<elision3>	<elision3>
4614	4615	<>	<elision3>
4614	203	<elision2>	<elision2>
4614	4615	<>	<elision2>
4614	203	<elision1>	<elision1>
4614	4615	<>	<elision1>
4614	210	.	υ
4614	3975	s	υ
4614	210	.	u
4614	3975	s	u
4614	210	.	κ
4614	4085	s	U
4614	210	.	α
4614	4140	s	α
4614	210	.	a
4614	4140	s	a
4614	4143	s	A
4614	210	.	λ
4614	4029	<2s>	<>
4615	200	.	.
4615	201	 	 
4615	200	<~>	<~>
4615	200	<split-s>	<split-s>
4615	200	<split-h>	<split-h>
4615	200	<name2>	<name2>
4615	204	<aphaerese>	<aphaerese>
4615	4613	<>	<aphaerese>
4615	200	<elision3>	<elision3>
4615	4613	<>	<elision3>
4615	200	<elision2>	<elision2>
4615	4613	<>	<elision2>
4615	200	<elision1>	<elision1>
4615	4613	<>	<elision1>
4615	208	.	υ
4615	3397	s	υ
4615	208	.	u
4615	3397	s	u
4615	208	.	κ
4615	4083	s	U
4615	208	.	α
4615	4138	s	α
4615	208	.	a
4615	4138	s	a
4615	4141	s	A
4615	208	.	λ
4615	4027	<2s>	<>
4616	4214	.	.
4616	4215	 	 
4616	4214	<~>	<~>
4616	4214	<split-s>	<split-s>
4616	4214	<split-h>	<split-h>
4616	4214	<name2>	<name2>
4616	4617	<>	<name>
4616	4218	<aphaerese>	<aphaerese>
4616	4616	<>	<aphaerese>
4616	4214	<elision3>	<elision3>
4616	4616	<>	<elision3>
4616	4214	<elision2>	<elision2>
4616	4616	<>	<elision2>
4616	4214	<elision1>	<elision1>
4616	4616	<>	<elision1>
4616	4211	.	υ
4616	4138	s	υ
4616	4211	.	u
4616	4138	s	u
4616	4211	.	κ
4616	4083	s	U
4616	4211	.	α
4616	4138	s	α
4616	4211	.	a
4616	4138	s	a
4616	4141	s	A
4616	4211	.	λ
4616	4028	<2s>	<>
4617	4217	.	.
4617	4220	 	 
4617	4217	<~>	<~>
4617	4217	<split-s>	<split-s>
4617	4217	<split-h>	<split-h>
4617	4217	<name2>	<name2>
4617	4237	<aphaerese>	<aphaerese>
4617	4618	<>	<aphaerese>
4617	4217	<elision3>	<elision3>
4617	4618	<>	<elision3>
4617	4217	<elision2>	<elision2>
4617	4618	<>	<elision2>
4617	4217	<elision1>	<elision1>
4617	4618	<>	<elision1>
4617	4213	.	υ
4617	4140	s	υ
4617	4213	.	u
4617	4140	s	u
4617	4213	.	κ
4617	4085	s	U
4617	4213	.	α
4617	4140	s	α
4617	4213	.	a
4617	4140	s	a
4617	4143	s	A
4617	4213	.	λ
4617	4029	<2s>	<>
4618	4214	.	.
4618	4215	 	 
4618	4214	<~>	<~>
4618	4214	<split-s>	<split-s>
4618	4214	<split-h>	<split-h>
4618	4214	<name2>	<name2>
4618	4218	<aphaerese>	<aphaerese>
4618	4616	<>	<aphaerese>
4618	4214	<elision3>	<elision3>
4618	4616	<>	<elision3>
4618	4214	<elision2>	<elision2>
4618	4616	<>	<elision2>
4618	4214	<elision1>	<elision1>
4618	4616	<>	<elision1>
4618	4211	.	υ
4618	4138	s	υ
4618	4211	.	u
4618	4138	s	u
4618	4211	.	κ
4618	4083	s	U
4618	4211	.	α
4618	4138	s	α
4618	4211	.	a
4618	4138	s	a
4618	4141	s	A
4618	4211	.	λ
4618	4027	<2s>	<>
4619	4242	<name>	<name>
4619	4620	<>	<name>
4619	4622	<>	<aphaerese>
4619	4622	<>	<elision3>
4619	4622	<>	<elision2>
4619	4622	<>	<elision1>
4619	3898	<2s>	<>
4619	4623	<L2kl>	<>
4620	4621	<>	<aphaerese>
4620	4621	<>	<elision3>
4620	4621	<>	<elision2>
4620	4621	<>	<elision1>
4620	4617	<L2kl>	<>
4621	4622	<>	<aphaerese>
4621	4622	<>	<elision3>
4621	4622	<>	<elision2>
4621	4622	<>	<elision1>
4621	4618	<L2kl>	<>
4622	4620	<>	<name>
4622	4622	<>	<aphaerese>
4622	4622	<>	<elision3>
4622	4622	<>	<elision2>
4622	4622	<>	<elision1>
4622	4616	<L2kl>	<>
4623	4214	.	.
4623	4215	 	 
4623	4214	<~>	<~>
4623	4214	<split-s>	<split-s>
4623	4214	<split-h>	<split-h>
4623	4214	<name2>	<name2>
4623	4242	<name2>	<name>
4623	4617	<>	<name>
4623	4218	<aphaerese>	<aphaerese>
4623	4616	<>	<aphaerese>
4623	4214	<elision3>	<elision3>
4623	4616	<>	<elision3>
4623	4214	<elision2>	<elision2>
4623	4616	<>	<elision2>
4623	4214	<elision1>	<elision1>
4623	4616	<>	<elision1>
4623	4211	.	υ
4623	4138	s	υ
4623	4211	.	u
4623	4138	s	u
4623	4211	.	κ
4623	4083	s	U
4623	4211	.	α
4623	4138	s	α
4623	4211	.	a
4623	4138	s	a
4623	4141	s	A
4623	4211	.	λ
4623	4054	<2s>	<>
4624	4625	.	.
4624	4626	 	 
4624	4625	<~>	<~>
4624	4625	<split-s>	<split-s>
4624	4625	<split-h>	<split-h>
4624	4625	<name2>	<name2>
4624	4740	<>	<name>
4624	4629	<aphaerese>	<aphaerese>
4624	4624	<>	<aphaerese>
4624	4742	<elision3>	<elision3>
4624	4624	<>	<elision3>
4624	4742	<elision2>	<elision2>
4624	4624	<>	<elision2>
4624	4742	<elision1>	<elision1>
4624	4624	<>	<elision1>
4624	4633	.	υ
4624	4636	s	υ
4624	4633	.	u
4624	4636	s	u
4624	4267	s	κ
4624	4392	s	k
4624	4682	s	U
4624	4410	s	K
4624	4633	.	α
4624	4707	s	α
4624	4633	.	a
4624	4707	s	a
4624	4710	s	A
4624	4267	s	λ
4624	4423	s	l
4624	4426	s	L
4624	4771	<1s>	<>
4625	4625	.	.
4625	4626	 	 
4625	4625	<~>	<~>
4625	4625	<split-s>	<split-s>
4625	4625	<split-h>	<split-h>
4625	4625	<name2>	<name2>
4625	4739	<>	<name>
4625	4629	<aphaerese>	<aphaerese>
4625	4625	<>	<aphaerese>
4625	4625	<elision3>	<elision3>
4625	4625	<>	<elision3>
4625	4625	<elision2>	<elision2>
4625	4625	<>	<elision2>
4625	4625	<elision1>	<elision1>
4625	4625	<>	<elision1>
4625	4633	.	υ
4625	4636	s	υ
4625	4633	.	u
4625	4636	s	u
4625	4639	.	κ
4625	4657	s	κ
4625	4392	s	k
4625	4682	s	U
4625	4410	s	K
4625	4633	.	α
4625	4707	s	α
4625	4633	.	a
4625	4707	s	a
4625	4710	s	A
4625	4713	s	λ
4625	4423	s	l
4625	4426	s	L
4625	3581	<1s>	<>
4626	4625	.	.
4626	4626	 	 
4626	4625	<~>	<~>
4626	4625	<split-s>	<split-s>
4626	4625	<split-h>	<split-h>
4626	4625	<name2>	<name2>
4626	4627	<>	<name>
4626	4629	<aphaerese>	<aphaerese>
4626	4632	<>	<aphaerese>
4626	4625	<elision3>	<elision3>
4626	4632	<>	<elision3>
4626	4625	<elision2>	<elision2>
4626	4632	<>	<elision2>
4626	4625	<elision1>	<elision1>
4626	4632	<>	<elision1>
4626	4633	.	υ
4626	4724	s	υ
4626	4633	.	u
4626	4724	s	u
4626	4639	.	κ
4626	4725	s	κ
4626	4726	s	k
4626	4727	s	U
4626	4729	s	K
4626	4633	.	α
4626	4731	s	α
4626	4633	.	a
4626	4731	s	a
4626	4732	s	A
4626	4733	s	λ
4626	4734	s	l
4626	4735	s	L
4626	3581	<1s>	<>
4627	4628	.	.
4627	4631	 	 
4627	4628	<~>	<~>
4627	4628	<split-s>	<split-s>
4627	4628	<split-h>	<split-h>
4627	4628	<name2>	<name2>
4627	4737	<aphaerese>	<aphaerese>
4627	4738	<>	<aphaerese>
4627	4628	<elision3>	<elision3>
4627	4738	<>	<elision3>
4627	4628	<elision2>	<elision2>
4627	4738	<>	<elision2>
4627	4628	<elision1>	<elision1>
4627	4738	<>	<elision1>
4627	4635	.	υ
4627	4638	s	υ
4627	4635	.	u
4627	4638	s	u
4627	4641	.	κ
4627	4659	s	κ
4627	4394	s	k
4627	4684	s	U
4627	4687	s	K
4627	4635	.	α
4627	4709	s	α
4627	4635	.	a
4627	4709	s	a
4627	4712	s	A
4627	4715	s	λ
4627	4425	s	l
4627	4718	s	L
4627	3582	<1s>	<>
4628	4625	.	.
4628	4626	 	 
4628	4625	<~>	<~>
4628	4625	<split-s>	<split-s>
4628	4625	<split-h>	<split-h>
4628	4625	<name2>	<name2>
4628	4629	<aphaerese>	<aphaerese>
4628	4625	<>	<aphaerese>
4628	4625	<elision3>	<elision3>
4628	4625	<>	<elision3>
4628	4625	<elision2>	<elision2>
4628	4625	<>	<elision2>
4628	4625	<elision1>	<elision1>
4628	4625	<>	<elision1>
4628	4633	.	υ
4628	4636	s	υ
4628	4633	.	u
4628	4636	s	u
4628	4639	.	κ
4628	4657	s	κ
4628	4392	s	k
4628	4682	s	U
4628	4410	s	K
4628	4633	.	α
4628	4707	s	α
4628	4633	.	a
4628	4707	s	a
4628	4710	s	A
4628	4713	s	λ
4628	4423	s	l
4628	4426	s	L
4628	3580	<1s>	<>
4629	4625	.	.
4629	4626	 	 
4629	4625	<~>	<~>
4629	4625	<split-s>	<split-s>
4629	4625	<split-h>	<split-h>
4629	4625	<name2>	<name2>
4629	4630	<>	<name>
4629	4629	<aphaerese>	<aphaerese>
4629	4629	<>	<aphaerese>
4629	4625	<elision3>	<elision3>
4629	4629	<>	<elision3>
4629	4625	<elision2>	<elision2>
4629	4629	<>	<elision2>
4629	4625	<elision1>	<elision1>
4629	4629	<>	<elision1>
4629	4625	.	υ
4629	4625	.	u
4629	4639	.	κ
4629	4657	s	κ
4629	4392	s	k
4629	4682	s	U
4629	4410	s	K
4629	4625	.	α
4629	4625	.	a
4629	4710	s	A
4629	4713	s	λ
4629	4423	s	l
4629	4426	s	L
4629	3568	<1s>	<>
4630	4628	.	.
4630	4631	 	 
4630	4628	<~>	<~>
4630	4628	<split-s>	<split-s>
4630	4628	<split-h>	<split-h>
4630	4628	<name2>	<name2>
4630	4737	<aphaerese>	<aphaerese>
4630	4737	<>	<aphaerese>
4630	4628	<elision3>	<elision3>
4630	4737	<>	<elision3>
4630	4628	<elision2>	<elision2>
4630	4737	<>	<elision2>
4630	4628	<elision1>	<elision1>
4630	4737	<>	<elision1>
4630	4628	.	υ
4630	4628	.	u
4630	4641	.	κ
4630	4659	s	κ
4630	4394	s	k
4630	4684	s	U
4630	4413	s	K
4630	4628	.	α
4630	4628	.	a
4630	4712	s	A
4630	4715	s	λ
4630	4425	s	l
4630	4428	s	L
4630	3569	<1s>	<>
4631	4625	.	.
4631	4626	 	 
4631	4625	<~>	<~>
4631	4625	<split-s>	<split-s>
4631	4625	<split-h>	<split-h>
4631	4625	<name2>	<name2>
4631	4629	<aphaerese>	<aphaerese>
4631	4632	<>	<aphaerese>
4631	4625	<elision3>	<elision3>
4631	4632	<>	<elision3>
4631	4625	<elision2>	<elision2>
4631	4632	<>	<elision2>
4631	4625	<elision1>	<elision1>
4631	4632	<>	<elision1>
4631	4633	.	υ
4631	4724	s	υ
4631	4633	.	u
4631	4724	s	u
4631	4639	.	κ
4631	4725	s	κ
4631	4726	s	k
4631	4727	s	U
4631	4729	s	K
4631	4633	.	α
4631	4731	s	α
4631	4633	.	a
4631	4731	s	a
4631	4732	s	A
4631	4733	s	λ
4631	4734	s	l
4631	4735	s	L
4631	3580	<1s>	<>
4632	4625	.	.
4632	4626	 	 
4632	4625	<~>	<~>
4632	4625	<split-s>	<split-s>
4632	4625	<split-h>	<split-h>
4632	4625	<name2>	<name2>
4632	4627	<>	<name>
4632	4629	<aphaerese>	<aphaerese>
4632	4632	<>	<aphaerese>
4632	4625	<elision3>	<elision3>
4632	4632	<>	<elision3>
4632	4625	<elision2>	<elision2>
4632	4632	<>	<elision2>
4632	4625	<elision1>	<elision1>
4632	4632	<>	<elision1>
4632	4633	.	υ
4632	4636	s	υ
4632	4633	.	u
4632	4636	s	u
4632	4639	.	κ
4632	4657	s	κ
4632	4392	s	k
4632	4682	s	U
4632	4685	s	K
4632	4633	.	α
4632	4707	s	α
4632	4633	.	a
4632	4707	s	a
4632	4710	s	A
4632	4713	s	λ
4632	4423	s	l
4632	4716	s	L
4632	3581	<1s>	<>
4633	4634	<>	<name>
4633	4633	<>	<aphaerese>
4633	4625	<elision3>	<elision3>
4633	4633	<>	<elision3>
4633	4625	<elision2>	<elision2>
4633	4633	<>	<elision2>
4633	4625	<elision1>	<elision1>
4633	4633	<>	<elision1>
4633	212	<1s>	<>
4634	4635	<>	<aphaerese>
4634	4628	<elision3>	<elision3>
4634	4635	<>	<elision3>
4634	4628	<elision2>	<elision2>
4634	4635	<>	<elision2>
4634	4628	<elision1>	<elision1>
4634	4635	<>	<elision1>
4634	213	<1s>	<>
4635	4633	<>	<aphaerese>
4635	4625	<elision3>	<elision3>
4635	4633	<>	<elision3>
4635	4625	<elision2>	<elision2>
4635	4633	<>	<elision2>
4635	4625	<elision1>	<elision1>
4635	4633	<>	<elision1>
4635	211	<1s>	<>
4636	4268	.	.
4636	4269	 	 
4636	4268	<~>	<~>
4636	4268	<split-s>	<split-s>
4636	4268	<split-h>	<split-h>
4636	4268	<name2>	<name2>
4636	4637	<>	<name>
4636	4272	<aphaerese>	<aphaerese>
4636	4636	<>	<aphaerese>
4636	4636	<>	<elision3>
4636	4636	<>	<elision2>
4636	4636	<>	<elision1>
4636	4276	.	υ
4636	4279	s	υ
4636	4276	.	u
4636	4279	s	u
4636	4297	.	κ
4636	4312	s	κ
4636	4318	s	k
4636	4321	s	U
4636	4373	s	K
4636	4276	.	α
4636	4279	s	α
4636	4276	.	a
4636	4279	s	a
4636	4351	s	A
4636	4318	s	λ
4636	4318	s	l
4636	4380	s	L
4636	3586	<2s>	<>
4637	4271	.	.
4637	4274	 	 
4637	4271	<~>	<~>
4637	4271	<split-s>	<split-s>
4637	4271	<split-h>	<split-h>
4637	4271	<name2>	<name2>
4637	4372	<aphaerese>	<aphaerese>
4637	4638	<>	<aphaerese>
4637	4638	<>	<elision3>
4637	4638	<>	<elision2>
4637	4638	<>	<elision1>
4637	4278	.	υ
4637	4296	s	υ
4637	4278	.	u
4637	4296	s	u
4637	4299	.	κ
4637	4314	s	κ
4637	4320	s	k
4637	4323	s	U
4637	4375	s	K
4637	4278	.	α
4637	4296	s	α
4637	4278	.	a
4637	4296	s	a
4637	4353	s	A
4637	4320	s	λ
4637	4320	s	l
4637	4382	s	L
4637	3587	<2s>	<>
4638	4268	.	.
4638	4269	 	 
4638	4268	<~>	<~>
4638	4268	<split-s>	<split-s>
4638	4268	<split-h>	<split-h>
4638	4268	<name2>	<name2>
4638	4272	<aphaerese>	<aphaerese>
4638	4636	<>	<aphaerese>
4638	4636	<>	<elision3>
4638	4636	<>	<elision2>
4638	4636	<>	<elision1>
4638	4276	.	υ
4638	4279	s	υ
4638	4276	.	u
4638	4279	s	u
4638	4297	.	κ
4638	4312	s	κ
4638	4318	s	k
4638	4321	s	U
4638	4373	s	K
4638	4276	.	α
4638	4279	s	α
4638	4276	.	a
4638	4279	s	a
4638	4351	s	A
4638	4318	s	λ
4638	4318	s	l
4638	4380	s	L
4638	3585	<2s>	<>
4639	4640	<>	<name>
4639	4639	<>	<aphaerese>
4639	4642	<elision3>	<elision3>
4639	4639	<>	<elision3>
4639	4642	<elision2>	<elision2>
4639	4639	<>	<elision2>
4639	4642	<elision1>	<elision1>
4639	4639	<>	<elision1>
4639	3565	<1s>	<>
4640	4641	<>	<aphaerese>
4640	4644	<elision3>	<elision3>
4640	4641	<>	<elision3>
4640	4644	<elision2>	<elision2>
4640	4641	<>	<elision2>
4640	4644	<elision1>	<elision1>
4640	4641	<>	<elision1>
4640	3566	<1s>	<>
4641	4639	<>	<aphaerese>
4641	4642	<elision3>	<elision3>
4641	4639	<>	<elision3>
4641	4642	<elision2>	<elision2>
4641	4639	<>	<elision2>
4641	4642	<elision1>	<elision1>
4641	4639	<>	<elision1>
4641	3564	<1s>	<>
4642	4643	<>	<name>
4642	4642	<>	<aphaerese>
4642	4642	<>	<elision3>
4642	4642	<>	<elision2>
4642	4642	<>	<elision1>
4642	4645	s	κ
4642	4645	s	k
4642	4648	s	K
4642	4645	s	λ
4642	4652	s	l
4642	4654	s	L
4642	3426	<1s>	<>
4643	4644	<>	<aphaerese>
4643	4644	<>	<elision3>
4643	4644	<>	<elision2>
4643	4644	<>	<elision1>
4643	4647	s	κ
4643	4647	s	k
4643	4650	s	K
4643	4647	s	λ
4643	4651	s	l
4643	4656	s	L
4643	3427	<1s>	<>
4644	4642	<>	<aphaerese>
4644	4642	<>	<elision3>
4644	4642	<>	<elision2>
4644	4642	<>	<elision1>
4644	4645	s	κ
4644	4645	s	k
4644	4648	s	K
4644	4645	s	λ
4644	4652	s	l
4644	4654	s	L
4644	3425	<1s>	<>
4645	4646	<>	<name>
4645	4645	<>	<aphaerese>
4645	4645	<>	<elision3>
4645	4645	<>	<elision2>
4645	4645	<>	<elision1>
4645	4389	s	κ
4645	4318	s	k
4645	4373	s	K
4645	4389	s	λ
4645	4318	s	l
4645	4380	s	L
4645	3601	<2s>	<>
4646	4647	<>	<aphaerese>
4646	4647	<>	<elision3>
4646	4647	<>	<elision2>
4646	4647	<>	<elision1>
4646	4391	s	κ
4646	4320	s	k
4646	4375	s	K
4646	4391	s	λ
4646	4320	s	l
4646	4382	s	L
4646	3602	<2s>	<>
4647	4645	<>	<aphaerese>
4647	4645	<>	<elision3>
4647	4645	<>	<elision2>
4647	4645	<>	<elision1>
4647	4389	s	κ
4647	4318	s	k
4647	4373	s	K
4647	4389	s	λ
4647	4318	s	l
4647	4380	s	L
4647	3600	<2s>	<>
4648	4649	<>	<name>
4648	4648	<>	<aphaerese>
4648	4648	<>	<elision3>
4648	4648	<>	<elision2>
4648	4648	<>	<elision1>
4648	4652	<K2kl>	<>
4649	4650	<>	<aphaerese>
4649	4650	<>	<elision3>
4649	4650	<>	<elision2>
4649	4650	<>	<elision1>
4649	4653	<K2kl>	<>
4650	4648	<>	<aphaerese>
4650	4648	<>	<elision3>
4650	4648	<>	<elision2>
4650	4648	<>	<elision1>
4650	4651	<K2kl>	<>
4651	4652	<>	<aphaerese>
4651	4652	<>	<elision3>
4651	4652	<>	<elision2>
4651	4652	<>	<elision1>
4651	3600	<2s>	<>
4652	4653	<>	<name>
4652	4652	<>	<aphaerese>
4652	4652	<>	<elision3>
4652	4652	<>	<elision2>
4652	4652	<>	<elision1>
4652	3601	<2s>	<>
4653	4651	<>	<aphaerese>
4653	4651	<>	<elision3>
4653	4651	<>	<elision2>
4653	4651	<>	<elision1>
4653	3602	<2s>	<>
4654	4655	<>	<name>
4654	4654	<>	<aphaerese>
4654	4654	<>	<elision3>
4654	4654	<>	<elision2>
4654	4654	<>	<elision1>
4654	4652	<L2kl>	<>
4655	4656	<>	<aphaerese>
4655	4656	<>	<elision3>
4655	4656	<>	<elision2>
4655	4656	<>	<elision1>
4655	4653	<L2kl>	<>
4656	4654	<>	<aphaerese>
4656	4654	<>	<elision3>
4656	4654	<>	<elision2>
4656	4654	<>	<elision1>
4656	4651	<L2kl>	<>
4657	4268	.	.
4657	4269	 	 
4657	4268	<~>	<~>
4657	4268	<split-s>	<split-s>
4657	4268	<split-h>	<split-h>
4657	4268	<name2>	<name2>
4657	4658	<>	<name>
4657	4272	<aphaerese>	<aphaerese>
4657	4657	<>	<aphaerese>
4657	4660	<elision3>	<elision3>
4657	4657	<>	<elision3>
4657	4660	<elision2>	<elision2>
4657	4657	<>	<elision2>
4657	4660	<elision1>	<elision1>
4657	4657	<>	<elision1>
4657	4276	.	υ
4657	4279	s	υ
4657	4276	.	u
4657	4279	s	u
4657	4276	.	κ
4657	4389	s	κ
4657	4318	s	k
4657	4321	s	U
4657	4373	s	K
4657	4276	.	α
4657	4279	s	α
4657	4276	.	a
4657	4279	s	a
4657	4351	s	A
4657	4276	.	λ
4657	4389	s	λ
4657	4318	s	l
4657	4380	s	L
4657	3766	<2s>	<>
4658	4271	.	.
4658	4274	 	 
4658	4271	<~>	<~>
4658	4271	<split-s>	<split-s>
4658	4271	<split-h>	<split-h>
4658	4271	<name2>	<name2>
4658	4372	<aphaerese>	<aphaerese>
4658	4659	<>	<aphaerese>
4658	4662	<elision3>	<elision3>
4658	4659	<>	<elision3>
4658	4662	<elision2>	<elision2>
4658	4659	<>	<elision2>
4658	4662	<elision1>	<elision1>
4658	4659	<>	<elision1>
4658	4278	.	υ
4658	4296	s	υ
4658	4278	.	u
4658	4296	s	u
4658	4278	.	κ
4658	4391	s	κ
4658	4320	s	k
4658	4323	s	U
4658	4375	s	K
4658	4278	.	α
4658	4296	s	α
4658	4278	.	a
4658	4296	s	a
4658	4353	s	A
4658	4278	.	λ
4658	4391	s	λ
4658	4320	s	l
4658	4382	s	L
4658	3767	<2s>	<>
4659	4268	.	.
4659	4269	 	 
4659	4268	<~>	<~>
4659	4268	<split-s>	<split-s>
4659	4268	<split-h>	<split-h>
4659	4268	<name2>	<name2>
4659	4272	<aphaerese>	<aphaerese>
4659	4657	<>	<aphaerese>
4659	4660	<elision3>	<elision3>
4659	4657	<>	<elision3>
4659	4660	<elision2>	<elision2>
4659	4657	<>	<elision2>
4659	4660	<elision1>	<elision1>
4659	4657	<>	<elision1>
4659	4276	.	υ
4659	4279	s	υ
4659	4276	.	u
4659	4279	s	u
4659	4276	.	κ
4659	4389	s	κ
4659	4318	s	k
4659	4321	s	U
4659	4373	s	K
4659	4276	.	α
4659	4279	s	α
4659	4276	.	a
4659	4279	s	a
4659	4351	s	A
4659	4276	.	λ
4659	4389	s	λ
4659	4318	s	l
4659	4380	s	L
4659	3765	<2s>	<>
4660	4268	.	.
4660	4269	 	 
4660	4268	<~>	<~>
4660	4268	<split-s>	<split-s>
4660	4268	<split-h>	<split-h>
4660	4268	<name2>	<name2>
4660	4661	<>	<name>
4660	4272	<aphaerese>	<aphaerese>
4660	4660	<>	<aphaerese>
4660	4268	<elision3>	<elision3>
4660	4660	<>	<elision3>
4660	4268	<elision2>	<elision2>
4660	4660	<>	<elision2>
4660	4268	<elision1>	<elision1>
4660	4660	<>	<elision1>
4660	4276	.	υ
4660	4279	s	υ
4660	4276	.	u
4660	4279	s	u
4660	4297	.	κ
4660	4663	s	κ
4660	4666	s	k
4660	4321	s	U
4660	4669	s	K
4660	4276	.	α
4660	4279	s	α
4660	4276	.	a
4660	4279	s	a
4660	4351	s	A
4660	4666	s	λ
4660	4666	s	l
4660	4677	s	L
4660	3669	<2s>	<>
4661	4271	.	.
4661	4274	 	 
4661	4271	<~>	<~>
4661	4271	<split-s>	<split-s>
4661	4271	<split-h>	<split-h>
4661	4271	<name2>	<name2>
4661	4372	<aphaerese>	<aphaerese>
4661	4662	<>	<aphaerese>
4661	4271	<elision3>	<elision3>
4661	4662	<>	<elision3>
4661	4271	<elision2>	<elision2>
4661	4662	<>	<elision2>
4661	4271	<elision1>	<elision1>
4661	4662	<>	<elision1>
4661	4278	.	υ
4661	4296	s	υ
4661	4278	.	u
4661	4296	s	u
4661	4299	.	κ
4661	4665	s	κ
4661	4668	s	k
4661	4323	s	U
4661	4671	s	K
4661	4278	.	α
4661	4296	s	α
4661	4278	.	a
4661	4296	s	a
4661	4353	s	A
4661	4668	s	λ
4661	4668	s	l
4661	4679	s	L
4661	3670	<2s>	<>
4662	4268	.	.
4662	4269	 	 
4662	4268	<~>	<~>
4662	4268	<split-s>	<split-s>
4662	4268	<split-h>	<split-h>
4662	4268	<name2>	<name2>
4662	4272	<aphaerese>	<aphaerese>
4662	4660	<>	<aphaerese>
4662	4268	<elision3>	<elision3>
4662	4660	<>	<elision3>
4662	4268	<elision2>	<elision2>
4662	4660	<>	<elision2>
4662	4268	<elision1>	<elision1>
4662	4660	<>	<elision1>
4662	4276	.	υ
4662	4279	s	υ
4662	4276	.	u
4662	4279	s	u
4662	4297	.	κ
4662	4663	s	κ
4662	4666	s	k
4662	4321	s	U
4662	4669	s	K
4662	4276	.	α
4662	4279	s	α
4662	4276	.	a
4662	4279	s	a
4662	4351	s	A
4662	4666	s	λ
4662	4666	s	l
4662	4677	s	L
4662	3668	<2s>	<>
4663	4280	.	.
4663	4280	 	 
4663	4280	<~>	<~>
4663	4280	<split-s>	<split-s>
4663	4280	<split-h>	<split-h>
4663	4280	<name2>	<name2>
4663	4664	<>	<name>
4663	4283	<aphaerese>	<aphaerese>
4663	4663	<>	<aphaerese>
4663	4315	<elision3>	<elision3>
4663	4663	<>	<elision3>
4663	4315	<elision2>	<elision2>
4663	4663	<>	<elision2>
4663	4315	<elision1>	<elision1>
4663	4663	<>	<elision1>
4663	4292	.	υ
4663	4292	.	u
4663	4292	.	κ
4663	4292	.	α
4663	4292	.	a
4663	4292	.	λ
4663	4501	<split-s>	<>
4664	4282	.	.
4664	4282	 	 
4664	4282	<~>	<~>
4664	4282	<split-s>	<split-s>
4664	4282	<split-h>	<split-h>
4664	4282	<name2>	<name2>
4664	4285	<aphaerese>	<aphaerese>
4664	4665	<>	<aphaerese>
4664	4317	<elision3>	<elision3>
4664	4665	<>	<elision3>
4664	4317	<elision2>	<elision2>
4664	4665	<>	<elision2>
4664	4317	<elision1>	<elision1>
4664	4665	<>	<elision1>
4664	4294	.	υ
4664	4294	.	u
4664	4294	.	κ
4664	4294	.	α
4664	4294	.	a
4664	4294	.	λ
4664	4502	<split-s>	<>
4665	4280	.	.
4665	4280	 	 
4665	4280	<~>	<~>
4665	4280	<split-s>	<split-s>
4665	4280	<split-h>	<split-h>
4665	4280	<name2>	<name2>
4665	4283	<aphaerese>	<aphaerese>
4665	4663	<>	<aphaerese>
4665	4315	<elision3>	<elision3>
4665	4663	<>	<elision3>
4665	4315	<elision2>	<elision2>
4665	4663	<>	<elision2>
4665	4315	<elision1>	<elision1>
4665	4663	<>	<elision1>
4665	4292	.	υ
4665	4292	.	u
4665	4292	.	κ
4665	4292	.	α
4665	4292	.	a
4665	4292	.	λ
4665	4500	<split-s>	<>
4666	4280	.	.
4666	4280	 	 
4666	4280	<~>	<~>
4666	4280	<split-s>	<split-s>
4666	4280	<split-h>	<split-h>
4666	4280	<name2>	<name2>
4666	4667	<>	<name>
4666	4283	<aphaerese>	<aphaerese>
4666	4666	<>	<aphaerese>
4666	4280	<elision3>	<elision3>
4666	4666	<>	<elision3>
4666	4280	<elision2>	<elision2>
4666	4666	<>	<elision2>
4666	4280	<elision1>	<elision1>
4666	4666	<>	<elision1>
4666	4292	.	υ
4666	4292	.	u
4666	4292	.	κ
4666	4292	.	α
4666	4292	.	a
4666	4292	.	λ
4666	4507	<split-s>	<>
4667	4282	.	.
4667	4282	 	 
4667	4282	<~>	<~>
4667	4282	<split-s>	<split-s>
4667	4282	<split-h>	<split-h>
4667	4282	<name2>	<name2>
4667	4285	<aphaerese>	<aphaerese>
4667	4668	<>	<aphaerese>
4667	4282	<elision3>	<elision3>
4667	4668	<>	<elision3>
4667	4282	<elision2>	<elision2>
4667	4668	<>	<elision2>
4667	4282	<elision1>	<elision1>
4667	4668	<>	<elision1>
4667	4294	.	υ
4667	4294	.	u
4667	4294	.	κ
4667	4294	.	α
4667	4294	.	a
4667	4294	.	λ
4667	4508	<split-s>	<>
4668	4280	.	.
4668	4280	 	 
4668	4280	<~>	<~>
4668	4280	<split-s>	<split-s>
4668	4280	<split-h>	<split-h>
4668	4280	<name2>	<name2>
4668	4283	<aphaerese>	<aphaerese>
4668	4666	<>	<aphaerese>
4668	4280	<elision3>	<elision3>
4668	4666	<>	<elision3>
4668	4280	<elision2>	<elision2>
4668	4666	<>	<elision2>
4668	4280	<elision1>	<elision1>
4668	4666	<>	<elision1>
4668	4292	.	υ
4668	4292	.	u
4668	4292	.	κ
4668	4292	.	α
4668	4292	.	a
4668	4292	.	λ
4668	4506	<split-s>	<>
4669	4325	<name>	<name>
4669	4670	<>	<name>
4669	4672	<>	<aphaerese>
4669	4672	<>	<elision3>
4669	4672	<>	<elision2>
4669	4672	<>	<elision1>
4669	4134	<split-s>	<>
4669	4377	<L2kl>	<>
4669	4676	<K2kl>	<>
4670	4671	<>	<aphaerese>
4670	4671	<>	<elision3>
4670	4671	<>	<elision2>
4670	4671	<>	<elision1>
4670	4378	<L2kl>	<>
4670	4674	<K2kl>	<>
4671	4672	<>	<aphaerese>
4671	4672	<>	<elision3>
4671	4672	<>	<elision2>
4671	4672	<>	<elision1>
4671	4379	<L2kl>	<>
4671	4675	<K2kl>	<>
4672	4670	<>	<name>
4672	4672	<>	<aphaerese>
4672	4672	<>	<elision3>
4672	4672	<>	<elision2>
4672	4672	<>	<elision1>
4672	4377	<L2kl>	<>
4672	4673	<K2kl>	<>
4673	4280	.	.
4673	4280	 	 
4673	4280	<~>	<~>
4673	4280	<split-s>	<split-s>
4673	4280	<split-h>	<split-h>
4673	4280	<name2>	<name2>
4673	4674	<>	<name>
4673	4283	<aphaerese>	<aphaerese>
4673	4673	<>	<aphaerese>
4673	4280	<elision3>	<elision3>
4673	4673	<>	<elision3>
4673	4280	<elision2>	<elision2>
4673	4673	<>	<elision2>
4673	4280	<elision1>	<elision1>
4673	4673	<>	<elision1>
4673	4292	.	υ
4673	4292	.	u
4673	4292	.	α
4673	4292	.	a
4673	4517	<split-s>	<>
4674	4282	.	.
4674	4282	 	 
4674	4282	<~>	<~>
4674	4282	<split-s>	<split-s>
4674	4282	<split-h>	<split-h>
4674	4282	<name2>	<name2>
4674	4285	<aphaerese>	<aphaerese>
4674	4675	<>	<aphaerese>
4674	4282	<elision3>	<elision3>
4674	4675	<>	<elision3>
4674	4282	<elision2>	<elision2>
4674	4675	<>	<elision2>
4674	4282	<elision1>	<elision1>
4674	4675	<>	<elision1>
4674	4294	.	υ
4674	4294	.	u
4674	4294	.	α
4674	4294	.	a
4674	4518	<split-s>	<>
4675	4280	.	.
4675	4280	 	 
4675	4280	<~>	<~>
4675	4280	<split-s>	<split-s>
4675	4280	<split-h>	<split-h>
4675	4280	<name2>	<name2>
4675	4283	<aphaerese>	<aphaerese>
4675	4673	<>	<aphaerese>
4675	4280	<elision3>	<elision3>
4675	4673	<>	<elision3>
4675	4280	<elision2>	<elision2>
4675	4673	<>	<elision2>
4675	4280	<elision1>	<elision1>
4675	4673	<>	<elision1>
4675	4292	.	υ
4675	4292	.	u
4675	4292	.	α
4675	4292	.	a
4675	4516	<split-s>	<>
4676	4280	.	.
4676	4280	 	 
4676	4280	<~>	<~>
4676	4280	<split-s>	<split-s>
4676	4280	<split-h>	<split-h>
4676	4280	<name2>	<name2>
4676	4325	<name2>	<name>
4676	4674	<>	<name>
4676	4283	<aphaerese>	<aphaerese>
4676	4673	<>	<aphaerese>
4676	4280	<elision3>	<elision3>
4676	4673	<>	<elision3>
4676	4280	<elision2>	<elision2>
4676	4673	<>	<elision2>
4676	4280	<elision1>	<elision1>
4676	4673	<>	<elision1>
4676	4292	.	υ
4676	4292	.	u
4676	4292	.	α
4676	4292	.	a
4676	4520	<split-s>	<>
4677	4325	<name>	<name>
4677	4678	<>	<name>
4677	4680	<>	<aphaerese>
4677	4680	<>	<elision3>
4677	4680	<>	<elision2>
4677	4680	<>	<elision1>
4677	4134	<split-s>	<>
4677	4681	<L2kl>	<>
4678	4679	<>	<aphaerese>
4678	4679	<>	<elision3>
4678	4679	<>	<elision2>
4678	4679	<>	<elision1>
4678	4667	<L2kl>	<>
4679	4680	<>	<aphaerese>
4679	4680	<>	<elision3>
4679	4680	<>	<elision2>
4679	4680	<>	<elision1>
4679	4668	<L2kl>	<>
4680	4678	<>	<name>
4680	4680	<>	<aphaerese>
4680	4680	<>	<elision3>
4680	4680	<>	<elision2>
4680	4680	<>	<elision1>
4680	4666	<L2kl>	<>
4681	4280	.	.
4681	4280	 	 
4681	4280	<~>	<~>
4681	4280	<split-s>	<split-s>
4681	4280	<split-h>	<split-h>
4681	4280	<name2>	<name2>
4681	4325	<name2>	<name>
4681	4667	<>	<name>
4681	4283	<aphaerese>	<aphaerese>
4681	4666	<>	<aphaerese>
4681	4280	<elision3>	<elision3>
4681	4666	<>	<elision3>
4681	4280	<elision2>	<elision2>
4681	4666	<>	<elision2>
4681	4280	<elision1>	<elision1>
4681	4666	<>	<elision1>
4681	4292	.	υ
4681	4292	.	u
4681	4292	.	κ
4681	4292	.	α
4681	4292	.	a
4681	4292	.	λ
4681	4532	<split-s>	<>
4682	4683	<>	<name>
4682	4682	<>	<aphaerese>
4682	4682	<>	<elision3>
4682	4682	<>	<elision2>
4682	4682	<>	<elision1>
4682	4398	<U2kl>	<>
4683	4684	<>	<aphaerese>
4683	4684	<>	<elision3>
4683	4684	<>	<elision2>
4683	4684	<>	<elision1>
4683	4399	<U2kl>	<>
4684	4682	<>	<aphaerese>
4684	4682	<>	<elision3>
4684	4682	<>	<elision2>
4684	4682	<>	<elision1>
4684	4400	<U2kl>	<>
4685	4411	<name>	<name>
4685	4686	<>	<name>
4685	4688	<>	<aphaerese>
4685	4688	<>	<elision3>
4685	4688	<>	<elision2>
4685	4688	<>	<elision1>
4685	3898	<2s>	<>
4685	4689	<A2kl>	<>
4685	4698	<L2kl>	<>
4685	4421	<K2kl>	<>
4686	4687	<>	<aphaerese>
4686	4687	<>	<elision3>
4686	4687	<>	<elision2>
4686	4687	<>	<elision1>
4686	4690	<A2kl>	<>
4686	4699	<L2kl>	<>
4686	4419	<K2kl>	<>
4687	4688	<>	<aphaerese>
4687	4688	<>	<elision3>
4687	4688	<>	<elision2>
4687	4688	<>	<elision1>
4687	4691	<A2kl>	<>
4687	4700	<L2kl>	<>
4687	4420	<K2kl>	<>
4688	4686	<>	<name>
4688	4688	<>	<aphaerese>
4688	4688	<>	<elision3>
4688	4688	<>	<elision2>
4688	4688	<>	<elision1>
4688	4689	<A2kl>	<>
4688	4698	<L2kl>	<>
4688	4418	<K2kl>	<>
4689	4690	<>	<name>
4689	4689	<>	<aphaerese>
4689	4689	<>	<elision3>
4689	4689	<>	<elision2>
4689	4689	<>	<elision1>
4689	4692	.	κ
4689	4692	.	λ
4689	3848	<2s>	<>
4690	4691	<>	<aphaerese>
4690	4691	<>	<elision3>
4690	4691	<>	<elision2>
4690	4691	<>	<elision1>
4690	4694	.	κ
4690	4694	.	λ
4690	3849	<2s>	<>
4691	4689	<>	<aphaerese>
4691	4689	<>	<elision3>
4691	4689	<>	<elision2>
4691	4689	<>	<elision1>
4691	4692	.	κ
4691	4692	.	λ
4691	3847	<2s>	<>
4692	4693	<>	<name>
4692	4692	<>	<aphaerese>
4692	4695	<elision3>	<elision3>
4692	4692	<>	<elision3>
4692	4695	<elision2>	<elision2>
4692	4692	<>	<elision2>
4692	4695	<elision1>	<elision1>
4692	4692	<>	<elision1>
4692	3839	<2s>	<>
4693	4694	<>	<aphaerese>
4693	4697	<elision3>	<elision3>
4693	4694	<>	<elision3>
4693	4697	<elision2>	<elision2>
4693	4694	<>	<elision2>
4693	4697	<elision1>	<elision1>
4693	4694	<>	<elision1>
4693	3840	<2s>	<>
4694	4692	<>	<aphaerese>
4694	4695	<elision3>	<elision3>
4694	4692	<>	<elision3>
4694	4695	<elision2>	<elision2>
4694	4692	<>	<elision2>
4694	4695	<elision1>	<elision1>
4694	4692	<>	<elision1>
4694	3838	<2s>	<>
4695	4398	.	.
4695	4398	 	 
4695	4398	<~>	<~>
4695	4398	<split-s>	<split-s>
4695	4398	<split-h>	<split-h>
4695	4398	<name2>	<name2>
4695	4696	<>	<name>
4695	4401	<aphaerese>	<aphaerese>
4695	4695	<>	<aphaerese>
4695	4398	<elision3>	<elision3>
4695	4695	<>	<elision3>
4695	4398	<elision2>	<elision2>
4695	4695	<>	<elision2>
4695	4398	<elision1>	<elision1>
4695	4695	<>	<elision1>
4695	4395	.	υ
4695	4395	.	u
4695	4395	.	α
4695	4395	.	a
4695	3803	<2s>	<>
4696	4400	.	.
4696	4400	 	 
4696	4400	<~>	<~>
4696	4400	<split-s>	<split-s>
4696	4400	<split-h>	<split-h>
4696	4400	<name2>	<name2>
4696	4403	<aphaerese>	<aphaerese>
4696	4697	<>	<aphaerese>
4696	4400	<elision3>	<elision3>
4696	4697	<>	<elision3>
4696	4400	<elision2>	<elision2>
4696	4697	<>	<elision2>
4696	4400	<elision1>	<elision1>
4696	4697	<>	<elision1>
4696	4397	.	υ
4696	4397	.	u
4696	4397	.	α
4696	4397	.	a
4696	3804	<2s>	<>
4697	4398	.	.
4697	4398	 	 
4697	4398	<~>	<~>
4697	4398	<split-s>	<split-s>
4697	4398	<split-h>	<split-h>
4697	4398	<name2>	<name2>
4697	4401	<aphaerese>	<aphaerese>
4697	4695	<>	<aphaerese>
4697	4398	<elision3>	<elision3>
4697	4695	<>	<elision3>
4697	4398	<elision2>	<elision2>
4697	4695	<>	<elision2>
4697	4398	<elision1>	<elision1>
4697	4695	<>	<elision1>
4697	4395	.	υ
4697	4395	.	u
4697	4395	.	α
4697	4395	.	a
4697	3802	<2s>	<>
4698	4699	<>	<name>
4698	4698	<>	<aphaerese>
4698	4698	<>	<elision3>
4698	4698	<>	<elision2>
4698	4698	<>	<elision1>
4698	4701	.	κ
4698	4701	.	λ
4698	3881	<2s>	<>
4699	4700	<>	<aphaerese>
4699	4700	<>	<elision3>
4699	4700	<>	<elision2>
4699	4700	<>	<elision1>
4699	4703	.	κ
4699	4703	.	λ
4699	3882	<2s>	<>
4700	4698	<>	<aphaerese>
4700	4698	<>	<elision3>
4700	4698	<>	<elision2>
4700	4698	<>	<elision1>
4700	4701	.	κ
4700	4701	.	λ
4700	3880	<2s>	<>
4701	4702	<>	<name>
4701	4701	<>	<aphaerese>
4701	4704	<elision3>	<elision3>
4701	4701	<>	<elision3>
4701	4704	<elision2>	<elision2>
4701	4701	<>	<elision2>
4701	4704	<elision1>	<elision1>
4701	4701	<>	<elision1>
4701	3872	<2s>	<>
4702	4703	<>	<aphaerese>
4702	4706	<elision3>	<elision3>
4702	4703	<>	<elision3>
4702	4706	<elision2>	<elision2>
4702	4703	<>	<elision2>
4702	4706	<elision1>	<elision1>
4702	4703	<>	<elision1>
4702	3873	<2s>	<>
4703	4701	<>	<aphaerese>
4703	4704	<elision3>	<elision3>
4703	4701	<>	<elision3>
4703	4704	<elision2>	<elision2>
4703	4701	<>	<elision2>
4703	4704	<elision1>	<elision1>
4703	4701	<>	<elision1>
4703	3871	<2s>	<>
4704	4705	<>	<name>
4704	4704	<>	<aphaerese>
4704	4704	<>	<elision3>
4704	4704	<>	<elision2>
4704	4704	<>	<elision1>
4704	4404	.	κ
4704	3866	<2s>	<>
4705	4706	<>	<aphaerese>
4705	4706	<>	<elision3>
4705	4706	<>	<elision2>
4705	4706	<>	<elision1>
4705	4406	.	κ
4705	3867	<2s>	<>
4706	4704	<>	<aphaerese>
4706	4704	<>	<elision3>
4706	4704	<>	<elision2>
4706	4704	<>	<elision1>
4706	4404	.	κ
4706	3865	<2s>	<>
4707	4398	.	.
4707	4398	 	 
4707	4398	<~>	<~>
4707	4398	<split-s>	<split-s>
4707	4398	<split-h>	<split-h>
4707	4398	<name2>	<name2>
4707	4708	<>	<name>
4707	4401	<aphaerese>	<aphaerese>
4707	4707	<>	<aphaerese>
4707	4707	<>	<elision3>
4707	4707	<>	<elision2>
4707	4707	<>	<elision1>
4707	4395	.	υ
4707	4395	.	u
4707	4404	.	κ
4707	4395	.	α
4707	4395	.	a
4707	3586	<2s>	<>
4708	4400	.	.
4708	4400	 	 
4708	4400	<~>	<~>
4708	4400	<split-s>	<split-s>
4708	4400	<split-h>	<split-h>
4708	4400	<name2>	<name2>
4708	4403	<aphaerese>	<aphaerese>
4708	4709	<>	<aphaerese>
4708	4709	<>	<elision3>
4708	4709	<>	<elision2>
4708	4709	<>	<elision1>
4708	4397	.	υ
4708	4397	.	u
4708	4406	.	κ
4708	4397	.	α
4708	4397	.	a
4708	3587	<2s>	<>
4709	4398	.	.
4709	4398	 	 
4709	4398	<~>	<~>
4709	4398	<split-s>	<split-s>
4709	4398	<split-h>	<split-h>
4709	4398	<name2>	<name2>
4709	4401	<aphaerese>	<aphaerese>
4709	4707	<>	<aphaerese>
4709	4707	<>	<elision3>
4709	4707	<>	<elision2>
4709	4707	<>	<elision1>
4709	4395	.	υ
4709	4395	.	u
4709	4404	.	κ
4709	4395	.	α
4709	4395	.	a
4709	3585	<2s>	<>
4710	4711	<>	<name>
4710	4710	<>	<aphaerese>
4710	4710	<>	<elision3>
4710	4710	<>	<elision2>
4710	4710	<>	<elision1>
4710	4398	<A2kl>	<>
4711	4712	<>	<aphaerese>
4711	4712	<>	<elision3>
4711	4712	<>	<elision2>
4711	4712	<>	<elision1>
4711	4399	<A2kl>	<>
4712	4710	<>	<aphaerese>
4712	4710	<>	<elision3>
4712	4710	<>	<elision2>
4712	4710	<>	<elision1>
4712	4400	<A2kl>	<>
4713	4268	.	.
4713	4269	 	 
4713	4268	<~>	<~>
4713	4268	<split-s>	<split-s>
4713	4268	<split-h>	<split-h>
4713	4268	<name2>	<name2>
4713	4714	<>	<name>
4713	4272	<aphaerese>	<aphaerese>
4713	4713	<>	<aphaerese>
4713	4268	<elision3>	<elision3>
4713	4713	<>	<elision3>
4713	4268	<elision2>	<elision2>
4713	4713	<>	<elision2>
4713	4268	<elision1>	<elision1>
4713	4713	<>	<elision1>
4713	4276	.	υ
4713	4279	s	υ
4713	4276	.	u
4713	4279	s	u
4713	4276	.	κ
4713	4389	s	κ
4713	4318	s	k
4713	4321	s	U
4713	4373	s	K
4713	4276	.	α
4713	4279	s	α
4713	4276	.	a
4713	4279	s	a
4713	4351	s	A
4713	4276	.	λ
4713	4389	s	λ
4713	4318	s	l
4713	4380	s	L
4713	3778	<2s>	<>
4714	4271	.	.
4714	4274	 	 
4714	4271	<~>	<~>
4714	4271	<split-s>	<split-s>
4714	4271	<split-h>	<split-h>
4714	4271	<name2>	<name2>
4714	4372	<aphaerese>	<aphaerese>
4714	4715	<>	<aphaerese>
4714	4271	<elision3>	<elision3>
4714	4715	<>	<elision3>
4714	4271	<elision2>	<elision2>
4714	4715	<>	<elision2>
4714	4271	<elision1>	<elision1>
4714	4715	<>	<elision1>
4714	4278	.	υ
4714	4296	s	υ
4714	4278	.	u
4714	4296	s	u
4714	4278	.	κ
4714	4391	s	κ
4714	4320	s	k
4714	4323	s	U
4714	4375	s	K
4714	4278	.	α
4714	4296	s	α
4714	4278	.	a
4714	4296	s	a
4714	4353	s	A
4714	4278	.	λ
4714	4391	s	λ
4714	4320	s	l
4714	4382	s	L
4714	3779	<2s>	<>
4715	4268	.	.
4715	4269	 	 
4715	4268	<~>	<~>
4715	4268	<split-s>	<split-s>
4715	4268	<split-h>	<split-h>
4715	4268	<name2>	<name2>
4715	4272	<aphaerese>	<aphaerese>
4715	4713	<>	<aphaerese>
4715	4268	<elision3>	<elision3>
4715	4713	<>	<elision3>
4715	4268	<elision2>	<elision2>
4715	4713	<>	<elision2>
4715	4268	<elision1>	<elision1>
4715	4713	<>	<elision1>
4715	4276	.	υ
4715	4279	s	υ
4715	4276	.	u
4715	4279	s	u
4715	4276	.	κ
4715	4389	s	κ
4715	4318	s	k
4715	4321	s	U
4715	4373	s	K
4715	4276	.	α
4715	4279	s	α
4715	4276	.	a
4715	4279	s	a
4715	4351	s	A
4715	4276	.	λ
4715	4389	s	λ
4715	4318	s	l
4715	4380	s	L
4715	3777	<2s>	<>
4716	4422	<name>	<name>
4716	4717	<>	<name>
4716	4719	<>	<aphaerese>
4716	4719	<>	<elision3>
4716	4719	<>	<elision2>
4716	4719	<>	<elision1>
4716	3898	<2s>	<>
4716	4689	<A2kl>	<>
4716	4723	<L2kl>	<>
4717	4718	<>	<aphaerese>
4717	4718	<>	<elision3>
4717	4718	<>	<elision2>
4717	4718	<>	<elision1>
4717	4690	<A2kl>	<>
4717	4721	<L2kl>	<>
4718	4719	<>	<aphaerese>
4718	4719	<>	<elision3>
4718	4719	<>	<elision2>
4718	4719	<>	<elision1>
4718	4691	<A2kl>	<>
4718	4722	<L2kl>	<>
4719	4717	<>	<name>
4719	4719	<>	<aphaerese>
4719	4719	<>	<elision3>
4719	4719	<>	<elision2>
4719	4719	<>	<elision1>
4719	4689	<A2kl>	<>
4719	4720	<L2kl>	<>
4720	4398	.	.
4720	4398	 	 
4720	4398	<~>	<~>
4720	4398	<split-s>	<split-s>
4720	4398	<split-h>	<split-h>
4720	4398	<name2>	<name2>
4720	4721	<>	<name>
4720	4401	<aphaerese>	<aphaerese>
4720	4720	<>	<aphaerese>
4720	4398	<elision3>	<elision3>
4720	4720	<>	<elision3>
4720	4398	<elision2>	<elision2>
4720	4720	<>	<elision2>
4720	4398	<elision1>	<elision1>
4720	4720	<>	<elision1>
4720	4395	.	υ
4720	4395	.	u
4720	4701	.	κ
4720	4395	.	α
4720	4395	.	a
4720	4701	.	λ
4720	3915	<2s>	<>
4721	4400	.	.
4721	4400	 	 
4721	4400	<~>	<~>
4721	4400	<split-s>	<split-s>
4721	4400	<split-h>	<split-h>
4721	4400	<name2>	<name2>
4721	4403	<aphaerese>	<aphaerese>
4721	4722	<>	<aphaerese>
4721	4400	<elision3>	<elision3>
4721	4722	<>	<elision3>
4721	4400	<elision2>	<elision2>
4721	4722	<>	<elision2>
4721	4400	<elision1>	<elision1>
4721	4722	<>	<elision1>
4721	4397	.	υ
4721	4397	.	u
4721	4703	.	κ
4721	4397	.	α
4721	4397	.	a
4721	4703	.	λ
4721	3916	<2s>	<>
4722	4398	.	.
4722	4398	 	 
4722	4398	<~>	<~>
4722	4398	<split-s>	<split-s>
4722	4398	<split-h>	<split-h>
4722	4398	<name2>	<name2>
4722	4401	<aphaerese>	<aphaerese>
4722	4720	<>	<aphaerese>
4722	4398	<elision3>	<elision3>
4722	4720	<>	<elision3>
4722	4398	<elision2>	<elision2>
4722	4720	<>	<elision2>
4722	4398	<elision1>	<elision1>
4722	4720	<>	<elision1>
4722	4395	.	υ
4722	4395	.	u
4722	4701	.	κ
4722	4395	.	α
4722	4395	.	a
4722	4701	.	λ
4722	3914	<2s>	<>
4723	4398	.	.
4723	4398	 	 
4723	4398	<~>	<~>
4723	4398	<split-s>	<split-s>
4723	4398	<split-h>	<split-h>
4723	4398	<name2>	<name2>
4723	4422	<name2>	<name>
4723	4721	<>	<name>
4723	4401	<aphaerese>	<aphaerese>
4723	4720	<>	<aphaerese>
4723	4398	<elision3>	<elision3>
4723	4720	<>	<elision3>
4723	4398	<elision2>	<elision2>
4723	4720	<>	<elision2>
4723	4398	<elision1>	<elision1>
4723	4720	<>	<elision1>
4723	4395	.	υ
4723	4395	.	u
4723	4701	.	κ
4723	4395	.	α
4723	4395	.	a
4723	4701	.	λ
4723	3921	<2s>	<>
4724	4268	.	.
4724	4269	 	 
4724	4268	<~>	<~>
4724	4268	<split-s>	<split-s>
4724	4268	<split-h>	<split-h>
4724	4268	<name2>	<name2>
4724	4637	<>	<name>
4724	4272	<aphaerese>	<aphaerese>
4724	4636	<>	<aphaerese>
4724	4636	<>	<elision3>
4724	4636	<>	<elision2>
4724	4636	<>	<elision1>
4724	4276	.	υ
4724	4279	s	υ
4724	4276	.	u
4724	4279	s	u
4724	4297	.	κ
4724	4312	s	κ
4724	4318	s	k
4724	4321	s	U
4724	4373	s	K
4724	4276	.	α
4724	4279	s	α
4724	4276	.	a
4724	4279	s	a
4724	4351	s	A
4724	4318	s	λ
4724	4318	s	l
4724	4380	s	L
4724	3927	<2s>	<>
4725	4268	.	.
4725	4269	 	 
4725	4268	<~>	<~>
4725	4268	<split-s>	<split-s>
4725	4268	<split-h>	<split-h>
4725	4268	<name2>	<name2>
4725	4658	<>	<name>
4725	4272	<aphaerese>	<aphaerese>
4725	4657	<>	<aphaerese>
4725	4660	<elision3>	<elision3>
4725	4657	<>	<elision3>
4725	4660	<elision2>	<elision2>
4725	4657	<>	<elision2>
4725	4660	<elision1>	<elision1>
4725	4657	<>	<elision1>
4725	4276	.	υ
4725	4279	s	υ
4725	4276	.	u
4725	4279	s	u
4725	4276	.	κ
4725	4389	s	κ
4725	4318	s	k
4725	4321	s	U
4725	4373	s	K
4725	4276	.	α
4725	4279	s	α
4725	4276	.	a
4725	4279	s	a
4725	4351	s	A
4725	4276	.	λ
4725	4389	s	λ
4725	4318	s	l
4725	4380	s	L
4725	3930	<2s>	<>
4726	4268	.	.
4726	4269	 	 
4726	4268	<~>	<~>
4726	4268	<split-s>	<split-s>
4726	4268	<split-h>	<split-h>
4726	4268	<name2>	<name2>
4726	4393	<>	<name>
4726	4272	<aphaerese>	<aphaerese>
4726	4392	<>	<aphaerese>
4726	4268	<elision3>	<elision3>
4726	4392	<>	<elision3>
4726	4268	<elision2>	<elision2>
4726	4392	<>	<elision2>
4726	4268	<elision1>	<elision1>
4726	4392	<>	<elision1>
4726	4276	.	υ
4726	4279	s	υ
4726	4276	.	u
4726	4279	s	u
4726	4395	.	κ
4726	4389	s	κ
4726	4318	s	k
4726	4321	s	U
4726	4373	s	K
4726	4276	.	α
4726	4279	s	α
4726	4276	.	a
4726	4279	s	a
4726	4351	s	A
4726	4395	.	λ
4726	4389	s	λ
4726	4318	s	l
4726	4380	s	L
4726	3933	<2s>	<>
4727	4683	<>	<name>
4727	4682	<>	<aphaerese>
4727	4682	<>	<elision3>
4727	4682	<>	<elision2>
4727	4682	<>	<elision1>
4727	4728	<U2kl>	<>
4728	4398	.	.
4728	4398	 	 
4728	4398	<~>	<~>
4728	4398	<split-s>	<split-s>
4728	4398	<split-h>	<split-h>
4728	4398	<name2>	<name2>
4728	4399	<>	<name>
4728	4401	<aphaerese>	<aphaerese>
4728	4398	<>	<aphaerese>
4728	4398	<elision3>	<elision3>
4728	4398	<>	<elision3>
4728	4398	<elision2>	<elision2>
4728	4398	<>	<elision2>
4728	4398	<elision1>	<elision1>
4728	4398	<>	<elision1>
4728	4395	.	υ
4728	4395	.	u
4728	4404	.	κ
4728	4395	.	α
4728	4395	.	a
4728	3937	<2s>	<>
4729	4411	<name>	<name>
4729	4686	<>	<name>
4729	4688	<>	<aphaerese>
4729	4688	<>	<elision3>
4729	4688	<>	<elision2>
4729	4688	<>	<elision1>
4729	3898	<2s>	<>
4729	4689	<A2kl>	<>
4729	4698	<L2kl>	<>
4729	4730	<K2kl>	<>
4730	4398	.	.
4730	4398	 	 
4730	4398	<~>	<~>
4730	4398	<split-s>	<split-s>
4730	4398	<split-h>	<split-h>
4730	4398	<name2>	<name2>
4730	4422	<name2>	<name>
4730	4419	<>	<name>
4730	4401	<aphaerese>	<aphaerese>
4730	4418	<>	<aphaerese>
4730	4398	<elision3>	<elision3>
4730	4418	<>	<elision3>
4730	4398	<elision2>	<elision2>
4730	4418	<>	<elision2>
4730	4398	<elision1>	<elision1>
4730	4418	<>	<elision1>
4730	4395	.	υ
4730	4395	.	u
4730	4395	.	α
4730	4395	.	a
4730	3941	<2s>	<>
4731	4398	.	.
4731	4398	 	 
4731	4398	<~>	<~>
4731	4398	<split-s>	<split-s>
4731	4398	<split-h>	<split-h>
4731	4398	<name2>	<name2>
4731	4708	<>	<name>
4731	4401	<aphaerese>	<aphaerese>
4731	4707	<>	<aphaerese>
4731	4707	<>	<elision3>
4731	4707	<>	<elision2>
4731	4707	<>	<elision1>
4731	4395	.	υ
4731	4395	.	u
4731	4404	.	κ
4731	4395	.	α
4731	4395	.	a
4731	3927	<2s>	<>
4732	4711	<>	<name>
4732	4710	<>	<aphaerese>
4732	4710	<>	<elision3>
4732	4710	<>	<elision2>
4732	4710	<>	<elision1>
4732	4728	<A2kl>	<>
4733	4268	.	.
4733	4269	 	 
4733	4268	<~>	<~>
4733	4268	<split-s>	<split-s>
4733	4268	<split-h>	<split-h>
4733	4268	<name2>	<name2>
4733	4714	<>	<name>
4733	4272	<aphaerese>	<aphaerese>
4733	4713	<>	<aphaerese>
4733	4268	<elision3>	<elision3>
4733	4713	<>	<elision3>
4733	4268	<elision2>	<elision2>
4733	4713	<>	<elision2>
4733	4268	<elision1>	<elision1>
4733	4713	<>	<elision1>
4733	4276	.	υ
4733	4279	s	υ
4733	4276	.	u
4733	4279	s	u
4733	4276	.	κ
4733	4389	s	κ
4733	4318	s	k
4733	4321	s	U
4733	4373	s	K
4733	4276	.	α
4733	4279	s	α
4733	4276	.	a
4733	4279	s	a
4733	4351	s	A
4733	4276	.	λ
4733	4389	s	λ
4733	4318	s	l
4733	4380	s	L
4733	3933	<2s>	<>
4734	4398	.	.
4734	4398	 	 
4734	4398	<~>	<~>
4734	4398	<split-s>	<split-s>
4734	4398	<split-h>	<split-h>
4734	4398	<name2>	<name2>
4734	4424	<>	<name>
4734	4401	<aphaerese>	<aphaerese>
4734	4423	<>	<aphaerese>
4734	4398	<elision3>	<elision3>
4734	4423	<>	<elision3>
4734	4398	<elision2>	<elision2>
4734	4423	<>	<elision2>
4734	4398	<elision1>	<elision1>
4734	4423	<>	<elision1>
4734	4395	.	υ
4734	4395	.	u
4734	4395	.	κ
4734	4395	.	α
4734	4395	.	a
4734	4395	.	λ
4734	3933	<2s>	<>
4735	4422	<name>	<name>
4735	4717	<>	<name>
4735	4719	<>	<aphaerese>
4735	4719	<>	<elision3>
4735	4719	<>	<elision2>
4735	4719	<>	<elision1>
4735	3898	<2s>	<>
4735	4689	<A2kl>	<>
4735	4736	<L2kl>	<>
4736	4398	.	.
4736	4398	 	 
4736	4398	<~>	<~>
4736	4398	<split-s>	<split-s>
4736	4398	<split-h>	<split-h>
4736	4398	<name2>	<name2>
4736	4422	<name2>	<name>
4736	4721	<>	<name>
4736	4401	<aphaerese>	<aphaerese>
4736	4720	<>	<aphaerese>
4736	4398	<elision3>	<elision3>
4736	4720	<>	<elision3>
4736	4398	<elision2>	<elision2>
4736	4720	<>	<elision2>
4736	4398	<elision1>	<elision1>
4736	4720	<>	<elision1>
4736	4395	.	υ
4736	4395	.	u
4736	4701	.	κ
4736	4395	.	α
4736	4395	.	a
4736	4701	.	λ
4736	3946	<2s>	<>
4737	4625	.	.
4737	4626	 	 
4737	4625	<~>	<~>
4737	4625	<split-s>	<split-s>
4737	4625	<split-h>	<split-h>
4737	4625	<name2>	<name2>
4737	4629	<aphaerese>	<aphaerese>
4737	4629	<>	<aphaerese>
4737	4625	<elision3>	<elision3>
4737	4629	<>	<elision3>
4737	4625	<elision2>	<elision2>
4737	4629	<>	<elision2>
4737	4625	<elision1>	<elision1>
4737	4629	<>	<elision1>
4737	4625	.	υ
4737	4625	.	u
4737	4639	.	κ
4737	4657	s	κ
4737	4392	s	k
4737	4682	s	U
4737	4410	s	K
4737	4625	.	α
4737	4625	.	a
4737	4710	s	A
4737	4713	s	λ
4737	4423	s	l
4737	4426	s	L
4737	3567	<1s>	<>
4738	4625	.	.
4738	4626	 	 
4738	4625	<~>	<~>
4738	4625	<split-s>	<split-s>
4738	4625	<split-h>	<split-h>
4738	4625	<name2>	<name2>
4738	4629	<aphaerese>	<aphaerese>
4738	4632	<>	<aphaerese>
4738	4625	<elision3>	<elision3>
4738	4632	<>	<elision3>
4738	4625	<elision2>	<elision2>
4738	4632	<>	<elision2>
4738	4625	<elision1>	<elision1>
4738	4632	<>	<elision1>
4738	4633	.	υ
4738	4636	s	υ
4738	4633	.	u
4738	4636	s	u
4738	4639	.	κ
4738	4657	s	κ
4738	4392	s	k
4738	4682	s	U
4738	4685	s	K
4738	4633	.	α
4738	4707	s	α
4738	4633	.	a
4738	4707	s	a
4738	4710	s	A
4738	4713	s	λ
4738	4423	s	l
4738	4716	s	L
4738	3580	<1s>	<>
4739	4628	.	.
4739	4631	 	 
4739	4628	<~>	<~>
4739	4628	<split-s>	<split-s>
4739	4628	<split-h>	<split-h>
4739	4628	<name2>	<name2>
4739	4737	<aphaerese>	<aphaerese>
4739	4628	<>	<aphaerese>
4739	4628	<elision3>	<elision3>
4739	4628	<>	<elision3>
4739	4628	<elision2>	<elision2>
4739	4628	<>	<elision2>
4739	4628	<elision1>	<elision1>
4739	4628	<>	<elision1>
4739	4635	.	υ
4739	4638	s	υ
4739	4635	.	u
4739	4638	s	u
4739	4641	.	κ
4739	4659	s	κ
4739	4394	s	k
4739	4684	s	U
4739	4413	s	K
4739	4635	.	α
4739	4709	s	α
4739	4635	.	a
4739	4709	s	a
4739	4712	s	A
4739	4715	s	λ
4739	4425	s	l
4739	4428	s	L
4739	3582	<1s>	<>
4740	4628	.	.
4740	4631	 	 
4740	4628	<~>	<~>
4740	4628	<split-s>	<split-s>
4740	4628	<split-h>	<split-h>
4740	4628	<name2>	<name2>
4740	4737	<aphaerese>	<aphaerese>
4740	4741	<>	<aphaerese>
4740	4744	<elision3>	<elision3>
4740	4741	<>	<elision3>
4740	4744	<elision2>	<elision2>
4740	4741	<>	<elision2>
4740	4744	<elision1>	<elision1>
4740	4741	<>	<elision1>
4740	4635	.	υ
4740	4638	s	υ
4740	4635	.	u
4740	4638	s	u
4740	4388	s	κ
4740	4394	s	k
4740	4684	s	U
4740	4413	s	K
4740	4635	.	α
4740	4709	s	α
4740	4635	.	a
4740	4709	s	a
4740	4712	s	A
4740	4388	s	λ
4740	4425	s	l
4740	4428	s	L
4740	4772	<1s>	<>
4741	4625	.	.
4741	4626	 	 
4741	4625	<~>	<~>
4741	4625	<split-s>	<split-s>
4741	4625	<split-h>	<split-h>
4741	4625	<name2>	<name2>
4741	4629	<aphaerese>	<aphaerese>
4741	4624	<>	<aphaerese>
4741	4742	<elision3>	<elision3>
4741	4624	<>	<elision3>
4741	4742	<elision2>	<elision2>
4741	4624	<>	<elision2>
4741	4742	<elision1>	<elision1>
4741	4624	<>	<elision1>
4741	4633	.	υ
4741	4636	s	υ
4741	4633	.	u
4741	4636	s	u
4741	4267	s	κ
4741	4392	s	k
4741	4682	s	U
4741	4410	s	K
4741	4633	.	α
4741	4707	s	α
4741	4633	.	a
4741	4707	s	a
4741	4710	s	A
4741	4267	s	λ
4741	4423	s	l
4741	4426	s	L
4741	4770	<1s>	<>
4742	4625	.	.
4742	4626	 	 
4742	4625	<~>	<~>
4742	4625	<split-s>	<split-s>
4742	4625	<split-h>	<split-h>
4742	4625	<name2>	<name2>
4742	4743	<>	<name>
4742	4629	<aphaerese>	<aphaerese>
4742	4742	<>	<aphaerese>
4742	4625	<elision3>	<elision3>
4742	4742	<>	<elision3>
4742	4625	<elision2>	<elision2>
4742	4742	<>	<elision2>
4742	4625	<elision1>	<elision1>
4742	4742	<>	<elision1>
4742	4633	.	υ
4742	4636	s	υ
4742	4633	.	u
4742	4636	s	u
4742	4639	.	κ
4742	4745	s	κ
4742	4748	s	k
4742	4682	s	U
4742	4751	s	K
4742	4633	.	α
4742	4707	s	α
4742	4633	.	a
4742	4707	s	a
4742	4710	s	A
4742	4759	s	λ
4742	4762	s	l
4742	4765	s	L
4742	3669	<1s>	<>
4743	4628	.	.
4743	4631	 	 
4743	4628	<~>	<~>
4743	4628	<split-s>	<split-s>
4743	4628	<split-h>	<split-h>
4743	4628	<name2>	<name2>
4743	4737	<aphaerese>	<aphaerese>
4743	4744	<>	<aphaerese>
4743	4628	<elision3>	<elision3>
4743	4744	<>	<elision3>
4743	4628	<elision2>	<elision2>
4743	4744	<>	<elision2>
4743	4628	<elision1>	<elision1>
4743	4744	<>	<elision1>
4743	4635	.	υ
4743	4638	s	υ
4743	4635	.	u
4743	4638	s	u
4743	4641	.	κ
4743	4747	s	κ
4743	4750	s	k
4743	4684	s	U
4743	4753	s	K
4743	4635	.	α
4743	4709	s	α
4743	4635	.	a
4743	4709	s	a
4743	4712	s	A
4743	4761	s	λ
4743	4764	s	l
4743	4767	s	L
4743	3670	<1s>	<>
4744	4625	.	.
4744	4626	 	 
4744	4625	<~>	<~>
4744	4625	<split-s>	<split-s>
4744	4625	<split-h>	<split-h>
4744	4625	<name2>	<name2>
4744	4629	<aphaerese>	<aphaerese>
4744	4742	<>	<aphaerese>
4744	4625	<elision3>	<elision3>
4744	4742	<>	<elision3>
4744	4625	<elision2>	<elision2>
4744	4742	<>	<elision2>
4744	4625	<elision1>	<elision1>
4744	4742	<>	<elision1>
4744	4633	.	υ
4744	4636	s	υ
4744	4633	.	u
4744	4636	s	u
4744	4639	.	κ
4744	4745	s	κ
4744	4748	s	k
4744	4682	s	U
4744	4751	s	K
4744	4633	.	α
4744	4707	s	α
4744	4633	.	a
4744	4707	s	a
4744	4710	s	A
4744	4759	s	λ
4744	4762	s	l
4744	4765	s	L
4744	3668	<1s>	<>
4745	4268	.	.
4745	4269	 	 
4745	4268	<~>	<~>
4745	4268	<split-s>	<split-s>
4745	4268	<split-h>	<split-h>
4745	4268	<name2>	<name2>
4745	4746	<>	<name>
4745	4272	<aphaerese>	<aphaerese>
4745	4745	<>	<aphaerese>
4745	4660	<elision3>	<elision3>
4745	4745	<>	<elision3>
4745	4660	<elision2>	<elision2>
4745	4745	<>	<elision2>
4745	4660	<elision1>	<elision1>
4745	4745	<>	<elision1>
4745	4276	.	υ
4745	4279	s	υ
4745	4276	.	u
4745	4279	s	u
4745	4276	.	κ
4745	4321	s	U
4745	4276	.	α
4745	4279	s	α
4745	4276	.	a
4745	4279	s	a
4745	4351	s	A
4745	4276	.	λ
4745	4019	<2s>	<>
4746	4271	.	.
4746	4274	 	 
4746	4271	<~>	<~>
4746	4271	<split-s>	<split-s>
4746	4271	<split-h>	<split-h>
4746	4271	<name2>	<name2>
4746	4372	<aphaerese>	<aphaerese>
4746	4747	<>	<aphaerese>
4746	4662	<elision3>	<elision3>
4746	4747	<>	<elision3>
4746	4662	<elision2>	<elision2>
4746	4747	<>	<elision2>
4746	4662	<elision1>	<elision1>
4746	4747	<>	<elision1>
4746	4278	.	υ
4746	4296	s	υ
4746	4278	.	u
4746	4296	s	u
4746	4278	.	κ
4746	4323	s	U
4746	4278	.	α
4746	4296	s	α
4746	4278	.	a
4746	4296	s	a
4746	4353	s	A
4746	4278	.	λ
4746	4020	<2s>	<>
4747	4268	.	.
4747	4269	 	 
4747	4268	<~>	<~>
4747	4268	<split-s>	<split-s>
4747	4268	<split-h>	<split-h>
4747	4268	<name2>	<name2>
4747	4272	<aphaerese>	<aphaerese>
4747	4745	<>	<aphaerese>
4747	4660	<elision3>	<elision3>
4747	4745	<>	<elision3>
4747	4660	<elision2>	<elision2>
4747	4745	<>	<elision2>
4747	4660	<elision1>	<elision1>
4747	4745	<>	<elision1>
4747	4276	.	υ
4747	4279	s	υ
4747	4276	.	u
4747	4279	s	u
4747	4276	.	κ
4747	4321	s	U
4747	4276	.	α
4747	4279	s	α
4747	4276	.	a
4747	4279	s	a
4747	4351	s	A
4747	4276	.	λ
4747	4018	<2s>	<>
4748	4268	.	.
4748	4269	 	 
4748	4268	<~>	<~>
4748	4268	<split-s>	<split-s>
4748	4268	<split-h>	<split-h>
4748	4268	<name2>	<name2>
4748	4749	<>	<name>
4748	4272	<aphaerese>	<aphaerese>
4748	4748	<>	<aphaerese>
4748	4268	<elision3>	<elision3>
4748	4748	<>	<elision3>
4748	4268	<elision2>	<elision2>
4748	4748	<>	<elision2>
4748	4268	<elision1>	<elision1>
4748	4748	<>	<elision1>
4748	4276	.	υ
4748	4279	s	υ
4748	4276	.	u
4748	4279	s	u
4748	4395	.	κ
4748	4321	s	U
4748	4276	.	α
4748	4279	s	α
4748	4276	.	a
4748	4279	s	a
4748	4351	s	A
4748	4395	.	λ
4748	4028	<2s>	<>
4749	4271	.	.
4749	4274	 	 
4749	4271	<~>	<~>
4749	4271	<split-s>	<split-s>
4749	4271	<split-h>	<split-h>
4749	4271	<name2>	<name2>
4749	4372	<aphaerese>	<aphaerese>
4749	4750	<>	<aphaerese>
4749	4271	<elision3>	<elision3>
4749	4750	<>	<elision3>
4749	4271	<elision2>	<elision2>
4749	4750	<>	<elision2>
4749	4271	<elision1>	<elision1>
4749	4750	<>	<elision1>
4749	4278	.	υ
4749	4296	s	υ
4749	4278	.	u
4749	4296	s	u
4749	4397	.	κ
4749	4323	s	U
4749	4278	.	α
4749	4296	s	α
4749	4278	.	a
4749	4296	s	a
4749	4353	s	A
4749	4397	.	λ
4749	4029	<2s>	<>
4750	4268	.	.
4750	4269	 	 
4750	4268	<~>	<~>
4750	4268	<split-s>	<split-s>
4750	4268	<split-h>	<split-h>
4750	4268	<name2>	<name2>
4750	4272	<aphaerese>	<aphaerese>
4750	4748	<>	<aphaerese>
4750	4268	<elision3>	<elision3>
4750	4748	<>	<elision3>
4750	4268	<elision2>	<elision2>
4750	4748	<>	<elision2>
4750	4268	<elision1>	<elision1>
4750	4748	<>	<elision1>
4750	4276	.	υ
4750	4279	s	υ
4750	4276	.	u
4750	4279	s	u
4750	4395	.	κ
4750	4321	s	U
4750	4276	.	α
4750	4279	s	α
4750	4276	.	a
4750	4279	s	a
4750	4351	s	A
4750	4395	.	λ
4750	4027	<2s>	<>
4751	4411	<name>	<name>
4751	4752	<>	<name>
4751	4754	<>	<aphaerese>
4751	4754	<>	<elision3>
4751	4754	<>	<elision2>
4751	4754	<>	<elision1>
4751	3898	<2s>	<>
4751	4415	<L2kl>	<>
4751	4758	<K2kl>	<>
4752	4753	<>	<aphaerese>
4752	4753	<>	<elision3>
4752	4753	<>	<elision2>
4752	4753	<>	<elision1>
4752	4416	<L2kl>	<>
4752	4756	<K2kl>	<>
4753	4754	<>	<aphaerese>
4753	4754	<>	<elision3>
4753	4754	<>	<elision2>
4753	4754	<>	<elision1>
4753	4417	<L2kl>	<>
4753	4757	<K2kl>	<>
4754	4752	<>	<name>
4754	4754	<>	<aphaerese>
4754	4754	<>	<elision3>
4754	4754	<>	<elision2>
4754	4754	<>	<elision1>
4754	4415	<L2kl>	<>
4754	4755	<K2kl>	<>
4755	4398	.	.
4755	4398	 	 
4755	4398	<~>	<~>
4755	4398	<split-s>	<split-s>
4755	4398	<split-h>	<split-h>
4755	4398	<name2>	<name2>
4755	4756	<>	<name>
4755	4401	<aphaerese>	<aphaerese>
4755	4755	<>	<aphaerese>
4755	4398	<elision3>	<elision3>
4755	4755	<>	<elision3>
4755	4398	<elision2>	<elision2>
4755	4755	<>	<elision2>
4755	4398	<elision1>	<elision1>
4755	4755	<>	<elision1>
4755	4395	.	υ
4755	4395	.	u
4755	4395	.	α
4755	4395	.	a
4755	4041	<2s>	<>
4756	4400	.	.
4756	4400	 	 
4756	4400	<~>	<~>
4756	4400	<split-s>	<split-s>
4756	4400	<split-h>	<split-h>
4756	4400	<name2>	<name2>
4756	4403	<aphaerese>	<aphaerese>
4756	4757	<>	<aphaerese>
4756	4400	<elision3>	<elision3>
4756	4757	<>	<elision3>
4756	4400	<elision2>	<elision2>
4756	4757	<>	<elision2>
4756	4400	<elision1>	<elision1>
4756	4757	<>	<elision1>
4756	4397	.	υ
4756	4397	.	u
4756	4397	.	α
4756	4397	.	a
4756	4042	<2s>	<>
4757	4398	.	.
4757	4398	 	 
4757	4398	<~>	<~>
4757	4398	<split-s>	<split-s>
4757	4398	<split-h>	<split-h>
4757	4398	<name2>	<name2>
4757	4401	<aphaerese>	<aphaerese>
4757	4755	<>	<aphaerese>
4757	4398	<elision3>	<elision3>
4757	4755	<>	<elision3>
4757	4398	<elision2>	<elision2>
4757	4755	<>	<elision2>
4757	4398	<elision1>	<elision1>
4757	4755	<>	<elision1>
4757	4395	.	υ
4757	4395	.	u
4757	4395	.	α
4757	4395	.	a
4757	4040	<2s>	<>
4758	4398	.	.
4758	4398	 	 
4758	4398	<~>	<~>
4758	4398	<split-s>	<split-s>
4758	4398	<split-h>	<split-h>
4758	4398	<name2>	<name2>
4758	4422	<name2>	<name>
4758	4756	<>	<name>
4758	4401	<aphaerese>	<aphaerese>
4758	4755	<>	<aphaerese>
4758	4398	<elision3>	<elision3>
4758	4755	<>	<elision3>
4758	4398	<elision2>	<elision2>
4758	4755	<>	<elision2>
4758	4398	<elision1>	<elision1>
4758	4755	<>	<elision1>
4758	4395	.	υ
4758	4395	.	u
4758	4395	.	α
4758	4395	.	a
4758	4047	<2s>	<>
4759	4268	.	.
4759	4269	 	 
4759	4268	<~>	<~>
4759	4268	<split-s>	<split-s>
4759	4268	<split-h>	<split-h>
4759	4268	<name2>	<name2>
4759	4760	<>	<name>
4759	4272	<aphaerese>	<aphaerese>
4759	4759	<>	<aphaerese>
4759	4268	<elision3>	<elision3>
4759	4759	<>	<elision3>
4759	4268	<elision2>	<elision2>
4759	4759	<>	<elision2>
4759	4268	<elision1>	<elision1>
4759	4759	<>	<elision1>
4759	4276	.	υ
4759	4279	s	υ
4759	4276	.	u
4759	4279	s	u
4759	4276	.	κ
4759	4321	s	U
4759	4276	.	α
4759	4279	s	α
4759	4276	.	a
4759	4279	s	a
4759	4351	s	A
4759	4276	.	λ
4759	4028	<2s>	<>
4760	4271	.	.
4760	4274	 	 
4760	4271	<~>	<~>
4760	4271	<split-s>	<split-s>
4760	4271	<split-h>	<split-h>
4760	4271	<name2>	<name2>
4760	4372	<aphaerese>	<aphaerese>
4760	4761	<>	<aphaerese>
4760	4271	<elision3>	<elision3>
4760	4761	<>	<elision3>
4760	4271	<elision2>	<elision2>
4760	4761	<>	<elision2>
4760	4271	<elision1>	<elision1>
4760	4761	<>	<elision1>
4760	4278	.	υ
4760	4296	s	υ
4760	4278	.	u
4760	4296	s	u
4760	4278	.	κ
4760	4323	s	U
4760	4278	.	α
4760	4296	s	α
4760	4278	.	a
4760	4296	s	a
4760	4353	s	A
4760	4278	.	λ
4760	4029	<2s>	<>
4761	4268	.	.
4761	4269	 	 
4761	4268	<~>	<~>
4761	4268	<split-s>	<split-s>
4761	4268	<split-h>	<split-h>
4761	4268	<name2>	<name2>
4761	4272	<aphaerese>	<aphaerese>
4761	4759	<>	<aphaerese>
4761	4268	<elision3>	<elision3>
4761	4759	<>	<elision3>
4761	4268	<elision2>	<elision2>
4761	4759	<>	<elision2>
4761	4268	<elision1>	<elision1>
4761	4759	<>	<elision1>
4761	4276	.	υ
4761	4279	s	υ
4761	4276	.	u
4761	4279	s	u
4761	4276	.	κ
4761	4321	s	U
4761	4276	.	α
4761	4279	s	α
4761	4276	.	a
4761	4279	s	a
4761	4351	s	A
4761	4276	.	λ
4761	4027	<2s>	<>
4762	4398	.	.
4762	4398	 	 
4762	4398	<~>	<~>
4762	4398	<split-s>	<split-s>
4762	4398	<split-h>	<split-h>
4762	4398	<name2>	<name2>
4762	4763	<>	<name>
4762	4401	<aphaerese>	<aphaerese>
4762	4762	<>	<aphaerese>
4762	4398	<elision3>	<elision3>
4762	4762	<>	<elision3>
4762	4398	<elision2>	<elision2>
4762	4762	<>	<elision2>
4762	4398	<elision1>	<elision1>
4762	4762	<>	<elision1>
4762	4395	.	υ
4762	4395	.	u
4762	4395	.	κ
4762	4395	.	α
4762	4395	.	a
4762	4395	.	λ
4762	4028	<2s>	<>
4763	4400	.	.
4763	4400	 	 
4763	4400	<~>	<~>
4763	4400	<split-s>	<split-s>
4763	4400	<split-h>	<split-h>
4763	4400	<name2>	<name2>
4763	4403	<aphaerese>	<aphaerese>
4763	4764	<>	<aphaerese>
4763	4400	<elision3>	<elision3>
4763	4764	<>	<elision3>
4763	4400	<elision2>	<elision2>
4763	4764	<>	<elision2>
4763	4400	<elision1>	<elision1>
4763	4764	<>	<elision1>
4763	4397	.	υ
4763	4397	.	u
4763	4397	.	κ
4763	4397	.	α
4763	4397	.	a
4763	4397	.	λ
4763	4029	<2s>	<>
4764	4398	.	.
4764	4398	 	 
4764	4398	<~>	<~>
4764	4398	<split-s>	<split-s>
4764	4398	<split-h>	<split-h>
4764	4398	<name2>	<name2>
4764	4401	<aphaerese>	<aphaerese>
4764	4762	<>	<aphaerese>
4764	4398	<elision3>	<elision3>
4764	4762	<>	<elision3>
4764	4398	<elision2>	<elision2>
4764	4762	<>	<elision2>
4764	4398	<elision1>	<elision1>
4764	4762	<>	<elision1>
4764	4395	.	υ
4764	4395	.	u
4764	4395	.	κ
4764	4395	.	α
4764	4395	.	a
4764	4395	.	λ
4764	4027	<2s>	<>
4765	4422	<name>	<name>
4765	4766	<>	<name>
4765	4768	<>	<aphaerese>
4765	4768	<>	<elision3>
4765	4768	<>	<elision2>
4765	4768	<>	<elision1>
4765	3898	<2s>	<>
4765	4769	<L2kl>	<>
4766	4767	<>	<aphaerese>
4766	4767	<>	<elision3>
4766	4767	<>	<elision2>
4766	4767	<>	<elision1>
4766	4763	<L2kl>	<>
4767	4768	<>	<aphaerese>
4767	4768	<>	<elision3>
4767	4768	<>	<elision2>
4767	4768	<>	<elision1>
4767	4764	<L2kl>	<>
4768	4766	<>	<name>
4768	4768	<>	<aphaerese>
4768	4768	<>	<elision3>
4768	4768	<>	<elision2>
4768	4768	<>	<elision1>
4768	4762	<L2kl>	<>
4769	4398	.	.
4769	4398	 	 
4769	4398	<~>	<~>
4769	4398	<split-s>	<split-s>
4769	4398	<split-h>	<split-h>
4769	4398	<name2>	<name2>
4769	4422	<name2>	<name>
4769	4763	<>	<name>
4769	4401	<aphaerese>	<aphaerese>
4769	4762	<>	<aphaerese>
4769	4398	<elision3>	<elision3>
4769	4762	<>	<elision3>
4769	4398	<elision2>	<elision2>
4769	4762	<>	<elision2>
4769	4398	<elision1>	<elision1>
4769	4762	<>	<elision1>
4769	4395	.	υ
4769	4395	.	u
4769	4395	.	κ
4769	4395	.	α
4769	4395	.	a
4769	4395	.	λ
4769	4054	<2s>	<>
4770	215	.	.
4770	216	 	 
4770	215	<~>	<~>
4770	215	<split-s>	<split-s>
4770	215	<split-h>	<split-h>
4770	215	<name2>	<name2>
4770	219	<aphaerese>	<aphaerese>
4770	4771	<>	<aphaerese>
4770	3769	<elision3>	<elision3>
4770	4771	<>	<elision3>
4770	3769	<elision2>	<elision2>
4770	4771	<>	<elision2>
4770	3769	<elision1>	<elision1>
4770	4771	<>	<elision1>
4770	3187	.	υ
4770	3231	H	υ
4770	3187	.	u
4770	3233	H	u
4770	3646	H	κ
4770	3141	H	k
4770	3154	H	U
4770	3157	H	K
4770	3187	.	α
4770	3217	H	α
4770	3187	.	a
4770	3222	H	a
4770	2984	H	A
4770	3623	H	λ
4770	3571	H	l
4770	3576	H	L
4770	4774	<K>	<>
4771	215	.	.
4771	216	 	 
4771	215	<~>	<~>
4771	215	<split-s>	<split-s>
4771	215	<split-h>	<split-h>
4771	215	<name2>	<name2>
4771	4772	<>	<name>
4771	219	<aphaerese>	<aphaerese>
4771	4771	<>	<aphaerese>
4771	3769	<elision3>	<elision3>
4771	4771	<>	<elision3>
4771	3769	<elision2>	<elision2>
4771	4771	<>	<elision2>
4771	3769	<elision1>	<elision1>
4771	4771	<>	<elision1>
4771	3187	.	υ
4771	3231	H	υ
4771	3187	.	u
4771	3233	H	u
4771	3646	H	κ
4771	3141	H	k
4771	3154	H	U
4771	3157	H	K
4771	3187	.	α
4771	3217	H	α
4771	3187	.	a
4771	3222	H	a
4771	2984	H	A
4771	3623	H	λ
4771	3571	H	l
4771	3576	H	L
4771	4775	<K>	<>
4772	214	.	.
4772	218	 	 
4772	214	<~>	<~>
4772	214	<split-s>	<split-s>
4772	214	<split-h>	<split-h>
4772	214	<name2>	<name2>
4772	221	<aphaerese>	<aphaerese>
4772	4770	<>	<aphaerese>
4772	3768	<elision3>	<elision3>
4772	4770	<>	<elision3>
4772	3768	<elision2>	<elision2>
4772	4770	<>	<elision2>
4772	3768	<elision1>	<elision1>
4772	4770	<>	<elision1>
4772	3189	.	υ
4772	3226	H	υ
4772	3189	.	u
4772	3230	H	u
4772	3603	H	κ
4772	3182	H	k
4772	3156	H	U
4772	3186	H	K
4772	3189	.	α
4772	3216	H	α
4772	3189	.	a
4772	3221	H	a
4772	2987	H	A
4772	3622	H	λ
4772	3570	H	l
4772	3573	H	L
4772	4773	<K>	<>
4773	3239	.	.
4773	3239	<~>	<~>
4773	3239	<split-s>	<split-s>
4773	3239	<split-h>	<split-h>
4773	3239	<name2>	<name2>
4773	3242	<aphaerese>	<aphaerese>
4773	4774	<>	<aphaerese>
4773	3717	<elision3>	<elision3>
4773	4774	<>	<elision3>
4773	3717	<elision2>	<elision2>
4773	4774	<>	<elision2>
4773	3717	<elision1>	<elision1>
4773	4774	<>	<elision1>
4773	3235	.	υ
4773	3381	H	υ
4773	3235	.	u
4773	3390	H	u
4773	3633	H	κ
4773	3350	H	k
4773	3359	H	U
4773	3363	H	K
4773	3235	.	α
4773	3393	H	α
4773	3235	.	a
4773	3396	H	a
4773	3330	H	A
4773	3642	H	λ
4773	3377	H	l
4773	3372	H	L
4774	3237	.	.
4774	3237	<~>	<~>
4774	3237	<split-s>	<split-s>
4774	3237	<split-h>	<split-h>
4774	3237	<name2>	<name2>
4774	3240	<aphaerese>	<aphaerese>
4774	4775	<>	<aphaerese>
4774	3718	<elision3>	<elision3>
4774	4775	<>	<elision3>
4774	3718	<elision2>	<elision2>
4774	4775	<>	<elision2>
4774	3718	<elision1>	<elision1>
4774	4775	<>	<elision1>
4774	3236	.	υ
4774	3379	H	υ
4774	3236	.	u
4774	3388	H	u
4774	3631	H	κ
4774	3348	H	k
4774	3357	H	U
4774	3360	H	K
4774	3236	.	α
4774	3391	H	α
4774	3236	.	a
4774	3394	H	a
4774	3328	H	A
4774	3640	H	λ
4774	3375	H	l
4774	3378	H	L
4775	3237	.	.
4775	3237	<~>	<~>
4775	3237	<split-s>	<split-s>
4775	3237	<split-h>	<split-h>
4775	3237	<name2>	<name2>
4775	4773	<>	<name>
4775	3240	<aphaerese>	<aphaerese>
4775	4775	<>	<aphaerese>
4775	3718	<elision3>	<elision3>
4775	4775	<>	<elision3>
4775	3718	<elision2>	<elision2>
4775	4775	<>	<elision2>
4775	3718	<elision1>	<elision1>
4775	4775	<>	<elision1>
4775	3236	.	υ
4775	3379	H	υ
4775	3236	.	u
4775	3388	H	u
4775	3631	H	κ
4775	3348	H	k
4775	3357	H	U
4775	3360	H	K
4775	3236	.	α
4775	3391	H	α
4775	3236	.	a
4775	3394	H	a
4775	3328	H	A
4775	3640	H	λ
4775	3375	H	l
4775	3378	H	L
4776	4777	<>	<name>
4776	4776	<>	<aphaerese>
4776	4776	<>	<elision3>
4776	4776	<>	<elision2>
4776	4776	<>	<elision1>
4776	4633	.	κ
4776	4633	.	λ
4776	3957	<1s>	<>
4777	4778	<>	<aphaerese>
4777	4778	<>	<elision3>
4777	4778	<>	<elision2>
4777	4778	<>	<elision1>
4777	4635	.	κ
4777	4635	.	λ
4777	3958	<1s>	<>
4778	4776	<>	<aphaerese>
4778	4776	<>	<elision3>
4778	4776	<>	<elision2>
4778	4776	<>	<elision1>
4778	4633	.	κ
4778	4633	.	λ
4778	3956	<1s>	<>
4779	4625	.	.
4779	4626	 	 
4779	4625	<~>	<~>
4779	4625	<split-s>	<split-s>
4779	4625	<split-h>	<split-h>
4779	4625	<name2>	<name2>
4779	4740	<>	<name>
4779	4629	<aphaerese>	<aphaerese>
4779	4624	<>	<aphaerese>
4779	4742	<elision3>	<elision3>
4779	4624	<>	<elision3>
4779	4742	<elision2>	<elision2>
4779	4624	<>	<elision2>
4779	4742	<elision1>	<elision1>
4779	4624	<>	<elision1>
4779	4633	.	υ
4779	4636	s	υ
4779	4633	.	u
4779	4636	s	u
4779	4267	s	κ
4779	4392	s	k
4779	4682	s	U
4779	4410	s	K
4779	4633	.	α
4779	4707	s	α
4779	4633	.	a
4779	4707	s	a
4779	4710	s	A
4779	4267	s	λ
4779	4423	s	l
4779	4426	s	L
4779	4780	<1s>	<>
4780	215	.	.
4780	216	 	 
4780	215	<~>	<~>
4780	215	<split-s>	<split-s>
4780	215	<split-h>	<split-h>
4780	215	<name2>	<name2>
4780	4772	<>	<name>
4780	219	<aphaerese>	<aphaerese>
4780	4771	<>	<aphaerese>
4780	3769	<elision3>	<elision3>
4780	4771	<>	<elision3>
4780	3769	<elision2>	<elision2>
4780	4771	<>	<elision2>
4780	3769	<elision1>	<elision1>
4780	4771	<>	<elision1>
4780	3187	.	υ
4780	3187	.	u
4780	3187	.	α
4780	3187	.	a
4780	4781	<K>	<>
4781	3237	.	.
4781	3237	<~>	<~>
4781	3237	<split-s>	<split-s>
4781	3237	<split-h>	<split-h>
4781	3237	<name2>	<name2>
4781	4773	<>	<name>
4781	3240	<aphaerese>	<aphaerese>
4781	4775	<>	<aphaerese>
4781	3718	<elision3>	<elision3>
4781	4775	<>	<elision3>
4781	3718	<elision2>	<elision2>
4781	4775	<>	<elision2>
4781	3718	<elision1>	<elision1>
4781	4775	<>	<elision1>
4781	3236	.	υ
4781	3236	.	u
4781	3236	.	α
4781	3236	.	a
4782	4783	<>	<name>
4782	4785	<>	<aphaerese>
4782	4785	<>	<elision3>
4782	4785	<>	<elision2>
4782	4785	<>	<elision1>
4782	4786	<k2K>	<>
4782	4792	<k2L>	<>
4782	4776	<l2L>	<>
4783	4784	<>	<aphaerese>
4783	4784	<>	<elision3>
4783	4784	<>	<elision2>
4783	4784	<>	<elision1>
4783	4787	<k2K>	<>
4783	4790	<k2L>	<>
4783	4777	<l2L>	<>
4784	4785	<>	<aphaerese>
4784	4785	<>	<elision3>
4784	4785	<>	<elision2>
4784	4785	<>	<elision1>
4784	4788	<k2K>	<>
4784	4791	<k2L>	<>
4784	4778	<l2L>	<>
4785	4783	<>	<name>
4785	4785	<>	<aphaerese>
4785	4785	<>	<elision3>
4785	4785	<>	<elision2>
4785	4785	<>	<elision1>
4785	4786	<k2K>	<>
4785	4789	<k2L>	<>
4785	4776	<l2L>	<>
4786	4459	.	.
4786	4460	 	 
4786	4459	<~>	<~>
4786	4459	<split-s>	<split-s>
4786	4459	<split-h>	<split-h>
4786	4459	<name2>	<name2>
4786	4787	<>	<name>
4786	4463	<aphaerese>	<aphaerese>
4786	4786	<>	<aphaerese>
4786	4459	<elision3>	<elision3>
4786	4786	<>	<elision3>
4786	4459	<elision2>	<elision2>
4786	4786	<>	<elision2>
4786	4459	<elision1>	<elision1>
4786	4786	<>	<elision1>
4786	4467	.	υ
4786	4470	s	υ
4786	4467	.	u
4786	4470	s	u
4786	199	s	κ
4786	4208	s	k
4786	4533	s	U
4786	4241	s	K
4786	4467	.	α
4786	4561	s	α
4786	4467	.	a
4786	4561	s	a
4786	4564	s	A
4786	199	s	λ
4786	4256	s	l
4786	4259	s	L
4787	4462	.	.
4787	4465	 	 
4787	4462	<~>	<~>
4787	4462	<split-s>	<split-s>
4787	4462	<split-h>	<split-h>
4787	4462	<name2>	<name2>
4787	4591	<aphaerese>	<aphaerese>
4787	4788	<>	<aphaerese>
4787	4462	<elision3>	<elision3>
4787	4788	<>	<elision3>
4787	4462	<elision2>	<elision2>
4787	4788	<>	<elision2>
4787	4462	<elision1>	<elision1>
4787	4788	<>	<elision1>
4787	4469	.	υ
4787	4472	s	υ
4787	4469	.	u
4787	4472	s	u
4787	4201	s	κ
4787	4210	s	k
4787	4535	s	U
4787	4244	s	K
4787	4469	.	α
4787	4563	s	α
4787	4469	.	a
4787	4563	s	a
4787	4566	s	A
4787	4201	s	λ
4787	4258	s	l
4787	4261	s	L
4788	4459	.	.
4788	4460	 	 
4788	4459	<~>	<~>
4788	4459	<split-s>	<split-s>
4788	4459	<split-h>	<split-h>
4788	4459	<name2>	<name2>
4788	4463	<aphaerese>	<aphaerese>
4788	4786	<>	<aphaerese>
4788	4459	<elision3>	<elision3>
4788	4786	<>	<elision3>
4788	4459	<elision2>	<elision2>
4788	4786	<>	<elision2>
4788	4459	<elision1>	<elision1>
4788	4786	<>	<elision1>
4788	4467	.	υ
4788	4470	s	υ
4788	4467	.	u
4788	4470	s	u
4788	199	s	κ
4788	4208	s	k
4788	4533	s	U
4788	4241	s	K
4788	4467	.	α
4788	4561	s	α
4788	4467	.	a
4788	4561	s	a
4788	4564	s	A
4788	199	s	λ
4788	4256	s	l
4788	4259	s	L
4789	4625	.	.
4789	4626	 	 
4789	4625	<~>	<~>
4789	4625	<split-s>	<split-s>
4789	4625	<split-h>	<split-h>
4789	4625	<name2>	<name2>
4789	4790	<>	<name>
4789	4629	<aphaerese>	<aphaerese>
4789	4789	<>	<aphaerese>
4789	4625	<elision3>	<elision3>
4789	4789	<>	<elision3>
4789	4625	<elision2>	<elision2>
4789	4789	<>	<elision2>
4789	4625	<elision1>	<elision1>
4789	4789	<>	<elision1>
4789	4633	.	υ
4789	4636	s	υ
4789	4633	.	u
4789	4636	s	u
4789	4267	s	κ
4789	4392	s	k
4789	4682	s	U
4789	4410	s	K
4789	4633	.	α
4789	4707	s	α
4789	4633	.	a
4789	4707	s	a
4789	4710	s	A
4789	4267	s	λ
4789	4423	s	l
4789	4426	s	L
4789	3893	<1s>	<>
4790	4628	.	.
4790	4631	 	 
4790	4628	<~>	<~>
4790	4628	<split-s>	<split-s>
4790	4628	<split-h>	<split-h>
4790	4628	<name2>	<name2>
4790	4737	<aphaerese>	<aphaerese>
4790	4791	<>	<aphaerese>
4790	4628	<elision3>	<elision3>
4790	4791	<>	<elision3>
4790	4628	<elision2>	<elision2>
4790	4791	<>	<elision2>
4790	4628	<elision1>	<elision1>
4790	4791	<>	<elision1>
4790	4635	.	υ
4790	4638	s	υ
4790	4635	.	u
4790	4638	s	u
4790	4388	s	κ
4790	4394	s	k
4790	4684	s	U
4790	4413	s	K
4790	4635	.	α
4790	4709	s	α
4790	4635	.	a
4790	4709	s	a
4790	4712	s	A
4790	4388	s	λ
4790	4425	s	l
4790	4428	s	L
4790	3894	<1s>	<>
4791	4625	.	.
4791	4626	 	 
4791	4625	<~>	<~>
4791	4625	<split-s>	<split-s>
4791	4625	<split-h>	<split-h>
4791	4625	<name2>	<name2>
4791	4629	<aphaerese>	<aphaerese>
4791	4789	<>	<aphaerese>
4791	4625	<elision3>	<elision3>
4791	4789	<>	<elision3>
4791	4625	<elision2>	<elision2>
4791	4789	<>	<elision2>
4791	4625	<elision1>	<elision1>
4791	4789	<>	<elision1>
4791	4633	.	υ
4791	4636	s	υ
4791	4633	.	u
4791	4636	s	u
4791	4267	s	κ
4791	4392	s	k
4791	4682	s	U
4791	4410	s	K
4791	4633	.	α
4791	4707	s	α
4791	4633	.	a
4791	4707	s	a
4791	4710	s	A
4791	4267	s	λ
4791	4423	s	l
4791	4426	s	L
4791	3892	<1s>	<>
4792	4625	.	.
4792	4626	 	 
4792	4625	<~>	<~>
4792	4625	<split-s>	<split-s>
4792	4625	<split-h>	<split-h>
4792	4625	<name2>	<name2>
4792	4790	<>	<name>
4792	4629	<aphaerese>	<aphaerese>
4792	4789	<>	<aphaerese>
4792	4625	<elision3>	<elision3>
4792	4789	<>	<elision3>
4792	4625	<elision2>	<elision2>
4792	4789	<>	<elision2>
4792	4625	<elision1>	<elision1>
4792	4789	<>	<elision1>
4792	4633	.	υ
4792	4636	s	υ
4792	4633	.	u
4792	4636	s	u
4792	4267	s	κ
4792	4392	s	k
4792	4682	s	U
4792	4410	s	K
4792	4633	.	α
4792	4707	s	α
4792	4633	.	a
4792	4707	s	a
4792	4710	s	A
4792	4267	s	λ
4792	4423	s	l
4792	4426	s	L
4792	4793	<1s>	<>
4793	215	.	.
4793	216	 	 
4793	215	<~>	<~>
4793	215	<split-s>	<split-s>
4793	215	<split-h>	<split-h>
4793	215	<name2>	<name2>
4793	3894	<>	<name>
4793	219	<aphaerese>	<aphaerese>
4793	3893	<>	<aphaerese>
4793	215	<elision3>	<elision3>
4793	3893	<>	<elision3>
4793	215	<elision2>	<elision2>
4793	3893	<>	<elision2>
4793	215	<elision1>	<elision1>
4793	3893	<>	<elision1>
4793	3187	.	υ
4793	3187	.	u
4793	3187	.	α
4793	3187	.	a
4793	4794	<K>	<>
4794	3237	.	.
4794	3237	<~>	<~>
4794	3237	<split-s>	<split-s>
4794	3237	<split-h>	<split-h>
4794	3237	<name2>	<name2>
4794	3895	<>	<name>
4794	3240	<aphaerese>	<aphaerese>
4794	3897	<>	<aphaerese>
4794	3237	<elision3>	<elision3>
4794	3897	<>	<elision3>
4794	3237	<elision2>	<elision2>
4794	3897	<>	<elision2>
4794	3237	<elision1>	<elision1>
4794	3897	<>	<elision1>
4794	3236	.	υ
4794	3236	.	u
4794	3236	.	α
4794	3236	.	a
4795	4459	.	.
4795	4460	 	 
4795	4459	<~>	<~>
4795	4459	<split-s>	<split-s>
4795	4459	<split-h>	<split-h>
4795	4459	<name2>	<name2>
4795	4796	<>	<name>
4795	4463	<aphaerese>	<aphaerese>
4795	4795	<>	<aphaerese>
4795	4459	<elision3>	<elision3>
4795	4795	<>	<elision3>
4795	4459	<elision2>	<elision2>
4795	4795	<>	<elision2>
4795	4459	<elision1>	<elision1>
4795	4795	<>	<elision1>
4795	4467	.	υ
4795	4470	s	υ
4795	4467	.	u
4795	4470	s	u
4795	4473	.	κ
4795	4491	s	κ
4795	4208	s	k
4795	4533	s	U
4795	4241	s	K
4795	4467	.	α
4795	4561	s	α
4795	4467	.	a
4795	4561	s	a
4795	4564	s	A
4795	4567	s	λ
4795	4256	s	l
4795	4259	s	L
4795	4625	<U2L>	<>
4796	4462	.	.
4796	4465	 	 
4796	4462	<~>	<~>
4796	4462	<split-s>	<split-s>
4796	4462	<split-h>	<split-h>
4796	4462	<name2>	<name2>
4796	4591	<aphaerese>	<aphaerese>
4796	4797	<>	<aphaerese>
4796	4462	<elision3>	<elision3>
4796	4797	<>	<elision3>
4796	4462	<elision2>	<elision2>
4796	4797	<>	<elision2>
4796	4462	<elision1>	<elision1>
4796	4797	<>	<elision1>
4796	4469	.	υ
4796	4472	s	υ
4796	4469	.	u
4796	4472	s	u
4796	4475	.	κ
4796	4493	s	κ
4796	4210	s	k
4796	4535	s	U
4796	4244	s	K
4796	4469	.	α
4796	4563	s	α
4796	4469	.	a
4796	4563	s	a
4796	4566	s	A
4796	4569	s	λ
4796	4258	s	l
4796	4261	s	L
4796	4739	<U2L>	<>
4797	4459	.	.
4797	4460	 	 
4797	4459	<~>	<~>
4797	4459	<split-s>	<split-s>
4797	4459	<split-h>	<split-h>
4797	4459	<name2>	<name2>
4797	4463	<aphaerese>	<aphaerese>
4797	4795	<>	<aphaerese>
4797	4459	<elision3>	<elision3>
4797	4795	<>	<elision3>
4797	4459	<elision2>	<elision2>
4797	4795	<>	<elision2>
4797	4459	<elision1>	<elision1>
4797	4795	<>	<elision1>
4797	4467	.	υ
4797	4470	s	υ
4797	4467	.	u
4797	4470	s	u
4797	4473	.	κ
4797	4491	s	κ
4797	4208	s	k
4797	4533	s	U
4797	4241	s	K
4797	4467	.	α
4797	4561	s	α
4797	4467	.	a
4797	4561	s	a
4797	4564	s	A
4797	4567	s	λ
4797	4256	s	l
4797	4259	s	L
4797	4628	<U2L>	<>
4798	4459	.	.
4798	4460	 	 
4798	4459	<~>	<~>
4798	4459	<split-s>	<split-s>
4798	4459	<split-h>	<split-h>
4798	4459	<name2>	<name2>
4798	4799	<name2>	<name>
4798	4800	<>	<name>
4798	4463	<aphaerese>	<aphaerese>
4798	4802	<>	<aphaerese>
4798	4459	<elision3>	<elision3>
4798	4802	<>	<elision3>
4798	4459	<elision2>	<elision2>
4798	4802	<>	<elision2>
4798	4459	<elision1>	<elision1>
4798	4802	<>	<elision1>
4798	4467	.	υ
4798	4470	s	υ
4798	4467	.	u
4798	4470	s	u
4798	4633	.	κ
4798	199	s	κ
4798	4208	s	k
4798	4533	s	U
4798	4241	s	K
4798	4467	.	α
4798	4561	s	α
4798	4467	.	a
4798	4561	s	a
4798	4564	s	A
4798	4633	.	λ
4798	199	s	λ
4798	4256	s	l
4798	4259	s	L
4798	3957	<1s>	<>
4798	4803	<k2K>	<>
4798	4804	<k2L>	<>
4798	4806	<K2L>	<>
4799	4244	s	k
4799	4261	s	l
4800	4462	.	.
4800	4465	 	 
4800	4462	<~>	<~>
4800	4462	<split-s>	<split-s>
4800	4462	<split-h>	<split-h>
4800	4462	<name2>	<name2>
4800	4591	<aphaerese>	<aphaerese>
4800	4801	<>	<aphaerese>
4800	4462	<elision3>	<elision3>
4800	4801	<>	<elision3>
4800	4462	<elision2>	<elision2>
4800	4801	<>	<elision2>
4800	4462	<elision1>	<elision1>
4800	4801	<>	<elision1>
4800	4469	.	υ
4800	4472	s	υ
4800	4469	.	u
4800	4472	s	u
4800	4635	.	κ
4800	4201	s	κ
4800	4210	s	k
4800	4535	s	U
4800	4244	s	K
4800	4469	.	α
4800	4563	s	α
4800	4469	.	a
4800	4563	s	a
4800	4566	s	A
4800	4635	.	λ
4800	4201	s	λ
4800	4258	s	l
4800	4261	s	L
4800	3958	<1s>	<>
4800	4790	<K2L>	<>
4801	4459	.	.
4801	4460	 	 
4801	4459	<~>	<~>
4801	4459	<split-s>	<split-s>
4801	4459	<split-h>	<split-h>
4801	4459	<name2>	<name2>
4801	4463	<aphaerese>	<aphaerese>
4801	4802	<>	<aphaerese>
4801	4459	<elision3>	<elision3>
4801	4802	<>	<elision3>
4801	4459	<elision2>	<elision2>
4801	4802	<>	<elision2>
4801	4459	<elision1>	<elision1>
4801	4802	<>	<elision1>
4801	4467	.	υ
4801	4470	s	υ
4801	4467	.	u
4801	4470	s	u
4801	4633	.	κ
4801	199	s	κ
4801	4208	s	k
4801	4533	s	U
4801	4241	s	K
4801	4467	.	α
4801	4561	s	α
4801	4467	.	a
4801	4561	s	a
4801	4564	s	A
4801	4633	.	λ
4801	199	s	λ
4801	4256	s	l
4801	4259	s	L
4801	3956	<1s>	<>
4801	4791	<K2L>	<>
4802	4459	.	.
4802	4460	 	 
4802	4459	<~>	<~>
4802	4459	<split-s>	<split-s>
4802	4459	<split-h>	<split-h>
4802	4459	<name2>	<name2>
4802	4800	<>	<name>
4802	4463	<aphaerese>	<aphaerese>
4802	4802	<>	<aphaerese>
4802	4459	<elision3>	<elision3>
4802	4802	<>	<elision3>
4802	4459	<elision2>	<elision2>
4802	4802	<>	<elision2>
4802	4459	<elision1>	<elision1>
4802	4802	<>	<elision1>
4802	4467	.	υ
4802	4470	s	υ
4802	4467	.	u
4802	4470	s	u
4802	4633	.	κ
4802	199	s	κ
4802	4208	s	k
4802	4533	s	U
4802	4241	s	K
4802	4467	.	α
4802	4561	s	α
4802	4467	.	a
4802	4561	s	a
4802	4564	s	A
4802	4633	.	λ
4802	199	s	λ
4802	4256	s	l
4802	4259	s	L
4802	3957	<1s>	<>
4802	4789	<K2L>	<>
4803	4799	<name>	<name>
4804	4805	<name>	<name>
4804	3898	<1s>	<>
4805	4413	s	k
4805	4428	s	l
4805	3788	<1s>	<>
4806	4625	.	.
4806	4626	 	 
4806	4625	<~>	<~>
4806	4625	<split-s>	<split-s>
4806	4625	<split-h>	<split-h>
4806	4625	<name2>	<name2>
4806	4805	<name2>	<name>
4806	4790	<>	<name>
4806	4629	<aphaerese>	<aphaerese>
4806	4789	<>	<aphaerese>
4806	4625	<elision3>	<elision3>
4806	4789	<>	<elision3>
4806	4625	<elision2>	<elision2>
4806	4789	<>	<elision2>
4806	4625	<elision1>	<elision1>
4806	4789	<>	<elision1>
4806	4633	.	υ
4806	4636	s	υ
4806	4633	.	u
4806	4636	s	u
4806	4267	s	κ
4806	4392	s	k
4806	4682	s	U
4806	4410	s	K
4806	4633	.	α
4806	4707	s	α
4806	4633	.	a
4806	4707	s	a
4806	4710	s	A
4806	4267	s	λ
4806	4423	s	l
4806	4426	s	L
4806	4807	<1s>	<>
4807	215	.	.
4807	216	 	 
4807	215	<~>	<~>
4807	215	<split-s>	<split-s>
4807	215	<split-h>	<split-h>
4807	215	<name2>	<name2>
4807	3899	<name2>	<name>
4807	3894	<>	<name>
4807	219	<aphaerese>	<aphaerese>
4807	3893	<>	<aphaerese>
4807	215	<elision3>	<elision3>
4807	3893	<>	<elision3>
4807	215	<elision2>	<elision2>
4807	3893	<>	<elision2>
4807	215	<elision1>	<elision1>
4807	3893	<>	<elision1>
4807	3187	.	υ
4807	3187	.	u
4807	3187	.	α
4807	3187	.	a
4807	4808	<K>	<>
4808	3237	.	.
4808	3237	<~>	<~>
4808	3237	<split-s>	<split-s>
4808	3237	<split-h>	<split-h>
4808	3237	<name2>	<name2>
4808	3789	<name2>	<name>
4808	3895	<>	<name>
4808	3240	<aphaerese>	<aphaerese>
4808	3897	<>	<aphaerese>
4808	3237	<elision3>	<elision3>
4808	3897	<>	<elision3>
4808	3237	<elision2>	<elision2>
4808	3897	<>	<elision2>
4808	3237	<elision1>	<elision1>
4808	3897	<>	<elision1>
4808	3236	.	υ
4808	3236	.	u
4808	3236	.	α
4808	3236	.	a
4809	4810	<>	<name>
4809	4809	<>	<aphaerese>
4809	4809	<>	<elision3>
4809	4809	<>	<elision2>
4809	4809	<>	<elision1>
4809	4813	<lambda2L>	<>
4810	4811	<>	<aphaerese>
4810	4811	<>	<elision3>
4810	4811	<>	<elision2>
4810	4811	<>	<elision1>
4810	4814	<lambda2L>	<>
4811	4809	<>	<aphaerese>
4811	4809	<>	<elision3>
4811	4809	<>	<elision2>
4811	4809	<>	<elision1>
4811	4812	<lambda2L>	<>
4812	4625	.	.
4812	4626	 	 
4812	4625	<~>	<~>
4812	4625	<split-s>	<split-s>
4812	4625	<split-h>	<split-h>
4812	4625	<name2>	<name2>
4812	4629	<aphaerese>	<aphaerese>
4812	4813	<>	<aphaerese>
4812	4625	<elision3>	<elision3>
4812	4813	<>	<elision3>
4812	4625	<elision2>	<elision2>
4812	4813	<>	<elision2>
4812	4625	<elision1>	<elision1>
4812	4813	<>	<elision1>
4812	4633	.	υ
4812	4636	s	υ
4812	4633	.	u
4812	4636	s	u
4812	4633	.	κ
4812	4267	s	κ
4812	4392	s	k
4812	4682	s	U
4812	4410	s	K
4812	4633	.	α
4812	4707	s	α
4812	4633	.	a
4812	4707	s	a
4812	4710	s	A
4812	4633	.	λ
4812	4267	s	λ
4812	4423	s	l
4812	4426	s	L
4812	3777	<1s>	<>
4813	4625	.	.
4813	4626	 	 
4813	4625	<~>	<~>
4813	4625	<split-s>	<split-s>
4813	4625	<split-h>	<split-h>
4813	4625	<name2>	<name2>
4813	4814	<>	<name>
4813	4629	<aphaerese>	<aphaerese>
4813	4813	<>	<aphaerese>
4813	4625	<elision3>	<elision3>
4813	4813	<>	<elision3>
4813	4625	<elision2>	<elision2>
4813	4813	<>	<elision2>
4813	4625	<elision1>	<elision1>
4813	4813	<>	<elision1>
4813	4633	.	υ
4813	4636	s	υ
4813	4633	.	u
4813	4636	s	u
4813	4633	.	κ
4813	4267	s	κ
4813	4392	s	k
4813	4682	s	U
4813	4410	s	K
4813	4633	.	α
4813	4707	s	α
4813	4633	.	a
4813	4707	s	a
4813	4710	s	A
4813	4633	.	λ
4813	4267	s	λ
4813	4423	s	l
4813	4426	s	L
4813	3778	<1s>	<>
4814	4628	.	.
4814	4631	 	 
4814	4628	<~>	<~>
4814	4628	<split-s>	<split-s>
4814	4628	<split-h>	<split-h>
4814	4628	<name2>	<name2>
4814	4737	<aphaerese>	<aphaerese>
4814	4812	<>	<aphaerese>
4814	4628	<elision3>	<elision3>
4814	4812	<>	<elision3>
4814	4628	<elision2>	<elision2>
4814	4812	<>	<elision2>
4814	4628	<elision1>	<elision1>
4814	4812	<>	<elision1>
4814	4635	.	υ
4814	4638	s	υ
4814	4635	.	u
4814	4638	s	u
4814	4635	.	κ
4814	4388	s	κ
4814	4394	s	k
4814	4684	s	U
4814	4413	s	K
4814	4635	.	α
4814	4709	s	α
4814	4635	.	a
4814	4709	s	a
4814	4712	s	A
4814	4635	.	λ
4814	4388	s	λ
4814	4425	s	l
4814	4428	s	L
4814	3779	<1s>	<>
4815	4816	<>	<name>
4815	4815	<>	<aphaerese>
4815	4815	<>	<elision3>
4815	4815	<>	<elision2>
4815	4815	<>	<elision1>
4815	4813	<l2L>	<>
4816	4817	<>	<aphaerese>
4816	4817	<>	<elision3>
4816	4817	<>	<elision2>
4816	4817	<>	<elision1>
4816	4814	<l2L>	<>
4817	4815	<>	<aphaerese>
4817	4815	<>	<elision3>
4817	4815	<>	<elision2>
4817	4815	<>	<elision1>
4817	4812	<l2L>	<>
4818	4625	.	.
4818	4626	 	 
4818	4625	<~>	<~>
4818	4625	<split-s>	<split-s>
4818	4625	<split-h>	<split-h>
4818	4625	<name2>	<name2>
4818	4805	<name2>	<name>
4818	4814	<>	<name>
4818	4629	<aphaerese>	<aphaerese>
4818	4813	<>	<aphaerese>
4818	4625	<elision3>	<elision3>
4818	4813	<>	<elision3>
4818	4625	<elision2>	<elision2>
4818	4813	<>	<elision2>
4818	4625	<elision1>	<elision1>
4818	4813	<>	<elision1>
4818	4633	.	υ
4818	4636	s	υ
4818	4633	.	u
4818	4636	s	u
4818	4633	.	κ
4818	4267	s	κ
4818	4392	s	k
4818	4682	s	U
4818	4410	s	K
4818	4633	.	α
4818	4707	s	α
4818	4633	.	a
4818	4707	s	a
4818	4710	s	A
4818	4633	.	λ
4818	4267	s	λ
4818	4423	s	l
4818	4426	s	L
4818	3967	<1s>	<>
4818	4804	<l2L>	<>
4819	4457	<>	<aphaerese>
4819	4457	<>	<elision3>
4819	4457	<>	<elision2>
4819	4457	<>	<elision1>
4819	4595	<kappa2K>	<>
4819	4820	<kappa2L>	<>
4819	4778	<lambda2L>	<>
4820	4625	.	.
4820	4626	 	 
4820	4625	<~>	<~>
4820	4625	<split-s>	<split-s>
4820	4625	<split-h>	<split-h>
4820	4625	<name2>	<name2>
4820	4629	<aphaerese>	<aphaerese>
4820	4624	<>	<aphaerese>
4820	4742	<elision3>	<elision3>
4820	4624	<>	<elision3>
4820	4742	<elision2>	<elision2>
4820	4624	<>	<elision2>
4820	4742	<elision1>	<elision1>
4820	4624	<>	<elision1>
4820	4633	.	υ
4820	4636	s	υ
4820	4633	.	u
4820	4636	s	u
4820	4267	s	κ
4820	4392	s	k
4820	4682	s	U
4820	4410	s	K
4820	4633	.	α
4820	4707	s	α
4820	4633	.	a
4820	4707	s	a
4820	4710	s	A
4820	4267	s	λ
4820	4423	s	l
4820	4426	s	L
4820	4821	<1s>	<>
4821	215	.	.
4821	216	 	 
4821	215	<~>	<~>
4821	215	<split-s>	<split-s>
4821	215	<split-h>	<split-h>
4821	215	<name2>	<name2>
4821	219	<aphaerese>	<aphaerese>
4821	4771	<>	<aphaerese>
4821	3769	<elision3>	<elision3>
4821	4771	<>	<elision3>
4821	3769	<elision2>	<elision2>
4821	4771	<>	<elision2>
4821	3769	<elision1>	<elision1>
4821	4771	<>	<elision1>
4821	3187	.	υ
4821	3187	.	u
4821	3187	.	α
4821	3187	.	a
4821	4822	<K>	<>
4822	3237	.	.
4822	3237	<~>	<~>
4822	3237	<split-s>	<split-s>
4822	3237	<split-h>	<split-h>
4822	3237	<name2>	<name2>
4822	3240	<aphaerese>	<aphaerese>
4822	4775	<>	<aphaerese>
4822	3718	<elision3>	<elision3>
4822	4775	<>	<elision3>
4822	3718	<elision2>	<elision2>
4822	4775	<>	<elision2>
4822	3718	<elision1>	<elision1>
4822	4775	<>	<elision1>
4822	3236	.	υ
4822	3236	.	u
4822	3236	.	α
4822	3236	.	a
4823	4785	<>	<aphaerese>
4823	4785	<>	<elision3>
4823	4785	<>	<elision2>
4823	4785	<>	<elision1>
4823	4788	<k2K>	<>
4823	4824	<k2L>	<>
4823	4778	<l2L>	<>
4824	4625	.	.
4824	4626	 	 
4824	4625	<~>	<~>
4824	4625	<split-s>	<split-s>
4824	4625	<split-h>	<split-h>
4824	4625	<name2>	<name2>
4824	4629	<aphaerese>	<aphaerese>
4824	4789	<>	<aphaerese>
4824	4625	<elision3>	<elision3>
4824	4789	<>	<elision3>
4824	4625	<elision2>	<elision2>
4824	4789	<>	<elision2>
4824	4625	<elision1>	<elision1>
4824	4789	<>	<elision1>
4824	4633	.	υ
4824	4636	s	υ
4824	4633	.	u
4824	4636	s	u
4824	4267	s	κ
4824	4392	s	k
4824	4682	s	U
4824	4410	s	K
4824	4633	.	α
4824	4707	s	α
4824	4633	.	a
4824	4707	s	a
4824	4710	s	A
4824	4267	s	λ
4824	4423	s	l
4824	4426	s	L
4824	4825	<1s>	<>
4825	215	.	.
4825	216	 	 
4825	215	<~>	<~>
4825	215	<split-s>	<split-s>
4825	215	<split-h>	<split-h>
4825	215	<name2>	<name2>
4825	219	<aphaerese>	<aphaerese>
4825	3893	<>	<aphaerese>
4825	215	<elision3>	<elision3>
4825	3893	<>	<elision3>
4825	215	<elision2>	<elision2>
4825	3893	<>	<elision2>
4825	215	<elision1>	<elision1>
4825	3893	<>	<elision1>
4825	3187	.	υ
4825	3187	.	u
4825	3187	.	α
4825	3187	.	a
4825	4826	<K>	<>
4826	3237	.	.
4826	3237	<~>	<~>
4826	3237	<split-s>	<split-s>
4826	3237	<split-h>	<split-h>
4826	3237	<name2>	<name2>
4826	3240	<aphaerese>	<aphaerese>
4826	3897	<>	<aphaerese>
4826	3237	<elision3>	<elision3>
4826	3897	<>	<elision3>
4826	3237	<elision2>	<elision2>
4826	3897	<>	<elision2>
4826	3237	<elision1>	<elision1>
4826	3897	<>	<elision1>
4826	3236	.	υ
4826	3236	.	u
4826	3236	.	α
4826	3236	.	a
4827	4459	.	.
4827	4460	 	 
4827	4459	<~>	<~>
4827	4459	<split-s>	<split-s>
4827	4459	<split-h>	<split-h>
4827	4459	<name2>	<name2>
4827	4463	<aphaerese>	<aphaerese>
4827	4802	<>	<aphaerese>
4827	4459	<elision3>	<elision3>
4827	4802	<>	<elision3>
4827	4459	<elision2>	<elision2>
4827	4802	<>	<elision2>
4827	4459	<elision1>	<elision1>
4827	4802	<>	<elision1>
4827	4467	.	υ
4827	4470	s	υ
4827	4467	.	u
4827	4470	s	u
4827	4633	.	κ
4827	199	s	κ
4827	4208	s	k
4827	4533	s	U
4827	4241	s	K
4827	4467	.	α
4827	4561	s	α
4827	4467	.	a
4827	4561	s	a
4827	4564	s	A
4827	4633	.	λ
4827	199	s	λ
4827	4256	s	l
4827	4259	s	L
4827	3956	<1s>	<>
4827	4824	<K2L>	<>
4828	4829	<>	<name>
4828	4828	<>	<aphaerese>
4828	179	<elision3>	<elision3>
4828	4828	<>	<elision3>
4828	179	<elision2>	<elision2>
4828	4828	<>	<elision2>
4828	179	<elision1>	<elision1>
4828	4828	<>	<elision1>
4829	4830	<>	<aphaerese>
4829	178	<elision3>	<elision3>
4829	4830	<>	<elision3>
4829	178	<elision2>	<elision2>
4829	4830	<>	<elision2>
4829	178	<elision1>	<elision1>
4829	4830	<>	<elision1>
4830	4828	<>	<aphaerese>
4830	179	<elision3>	<elision3>
4830	4828	<>	<elision3>
4830	179	<elision2>	<elision2>
4830	4828	<>	<elision2>
4830	179	<elision1>	<elision1>
4830	4828	<>	<elision1>
4831	4832	<>	<name>
4831	4834	<>	<aphaerese>
4831	4834	<>	<elision3>
4831	4834	<>	<elision2>
4831	4834	<>	<elision1>
4831	4841	<ypsilon2K>	<>
4831	4842	<ypsilon2L>	<>
4832	4833	<>	<aphaerese>
4832	4833	<>	<elision3>
4832	4833	<>	<elision2>
4832	4833	<>	<elision1>
4832	4836	<ypsilon2K>	<>
4832	4839	<ypsilon2L>	<>
4833	4834	<>	<aphaerese>
4833	4834	<>	<elision3>
4833	4834	<>	<elision2>
4833	4834	<>	<elision1>
4833	4837	<ypsilon2K>	<>
4833	4840	<ypsilon2L>	<>
4834	4832	<>	<name>
4834	4834	<>	<aphaerese>
4834	4834	<>	<elision3>
4834	4834	<>	<elision2>
4834	4834	<>	<elision1>
4834	4835	<ypsilon2K>	<>
4834	4838	<ypsilon2L>	<>
4835	4459	.	.
4835	4460	 	 
4835	4459	<~>	<~>
4835	4459	<split-s>	<split-s>
4835	4459	<split-h>	<split-h>
4835	4459	<name2>	<name2>
4835	4836	<>	<name>
4835	4463	<aphaerese>	<aphaerese>
4835	4835	<>	<aphaerese>
4835	4835	<>	<elision3>
4835	4835	<>	<elision2>
4835	4835	<>	<elision1>
4835	4467	.	υ
4835	4470	s	υ
4835	4467	.	u
4835	4470	s	u
4835	4473	.	κ
4835	4491	s	κ
4835	4208	s	k
4835	4533	s	U
4835	4241	s	K
4835	4467	.	α
4835	4561	s	α
4835	4467	.	a
4835	4561	s	a
4835	4564	s	A
4835	4567	s	λ
4835	4256	s	l
4835	4259	s	L
4836	4462	.	.
4836	4465	 	 
4836	4462	<~>	<~>
4836	4462	<split-s>	<split-s>
4836	4462	<split-h>	<split-h>
4836	4462	<name2>	<name2>
4836	4591	<aphaerese>	<aphaerese>
4836	4837	<>	<aphaerese>
4836	4837	<>	<elision3>
4836	4837	<>	<elision2>
4836	4837	<>	<elision1>
4836	4469	.	υ
4836	4472	s	υ
4836	4469	.	u
4836	4472	s	u
4836	4475	.	κ
4836	4493	s	κ
4836	4210	s	k
4836	4535	s	U
4836	4244	s	K
4836	4469	.	α
4836	4563	s	α
4836	4469	.	a
4836	4563	s	a
4836	4566	s	A
4836	4569	s	λ
4836	4258	s	l
4836	4261	s	L
4837	4459	.	.
4837	4460	 	 
4837	4459	<~>	<~>
4837	4459	<split-s>	<split-s>
4837	4459	<split-h>	<split-h>
4837	4459	<name2>	<name2>
4837	4463	<aphaerese>	<aphaerese>
4837	4835	<>	<aphaerese>
4837	4835	<>	<elision3>
4837	4835	<>	<elision2>
4837	4835	<>	<elision1>
4837	4467	.	υ
4837	4470	s	υ
4837	4467	.	u
4837	4470	s	u
4837	4473	.	κ
4837	4491	s	κ
4837	4208	s	k
4837	4533	s	U
4837	4241	s	K
4837	4467	.	α
4837	4561	s	α
4837	4467	.	a
4837	4561	s	a
4837	4564	s	A
4837	4567	s	λ
4837	4256	s	l
4837	4259	s	L
4838	4625	.	.
4838	4626	 	 
4838	4625	<~>	<~>
4838	4625	<split-s>	<split-s>
4838	4625	<split-h>	<split-h>
4838	4625	<name2>	<name2>
4838	4839	<>	<name>
4838	4629	<aphaerese>	<aphaerese>
4838	4838	<>	<aphaerese>
4838	4838	<>	<elision3>
4838	4838	<>	<elision2>
4838	4838	<>	<elision1>
4838	4633	.	υ
4838	4636	s	υ
4838	4633	.	u
4838	4636	s	u
4838	4639	.	κ
4838	4657	s	κ
4838	4392	s	k
4838	4682	s	U
4838	4410	s	K
4838	4633	.	α
4838	4707	s	α
4838	4633	.	a
4838	4707	s	a
4838	4710	s	A
4838	4713	s	λ
4838	4423	s	l
4838	4426	s	L
4838	3586	<1s>	<>
4839	4628	.	.
4839	4631	 	 
4839	4628	<~>	<~>
4839	4628	<split-s>	<split-s>
4839	4628	<split-h>	<split-h>
4839	4628	<name2>	<name2>
4839	4737	<aphaerese>	<aphaerese>
4839	4840	<>	<aphaerese>
4839	4840	<>	<elision3>
4839	4840	<>	<elision2>
4839	4840	<>	<elision1>
4839	4635	.	υ
4839	4638	s	υ
4839	4635	.	u
4839	4638	s	u
4839	4641	.	κ
4839	4659	s	κ
4839	4394	s	k
4839	4684	s	U
4839	4413	s	K
4839	4635	.	α
4839	4709	s	α
4839	4635	.	a
4839	4709	s	a
4839	4712	s	A
4839	4715	s	λ
4839	4425	s	l
4839	4428	s	L
4839	3587	<1s>	<>
4840	4625	.	.
4840	4626	 	 
4840	4625	<~>	<~>
4840	4625	<split-s>	<split-s>
4840	4625	<split-h>	<split-h>
4840	4625	<name2>	<name2>
4840	4629	<aphaerese>	<aphaerese>
4840	4838	<>	<aphaerese>
4840	4838	<>	<elision3>
4840	4838	<>	<elision2>
4840	4838	<>	<elision1>
4840	4633	.	υ
4840	4636	s	υ
4840	4633	.	u
4840	4636	s	u
4840	4639	.	κ
4840	4657	s	κ
4840	4392	s	k
4840	4682	s	U
4840	4410	s	K
4840	4633	.	α
4840	4707	s	α
4840	4633	.	a
4840	4707	s	a
4840	4710	s	A
4840	4713	s	λ
4840	4423	s	l
4840	4426	s	L
4840	3585	<1s>	<>
4841	4459	.	.
4841	4460	 	 
4841	4459	<~>	<~>
4841	4459	<split-s>	<split-s>
4841	4459	<split-h>	<split-h>
4841	4459	<name2>	<name2>
4841	4836	<>	<name>
4841	4463	<aphaerese>	<aphaerese>
4841	4835	<>	<aphaerese>
4841	4835	<>	<elision3>
4841	4835	<>	<elision2>
4841	4835	<>	<elision1>
4841	4467	.	υ
4841	4470	s	υ
4841	4467	.	u
4841	4470	s	u
4841	4473	.	κ
4841	4491	s	κ
4841	4208	s	k
4841	4467	.	α
4841	4561	s	α
4841	4467	.	a
4841	4561	s	a
4841	4567	s	λ
4841	4256	s	l
4842	4625	.	.
4842	4626	 	 
4842	4625	<~>	<~>
4842	4625	<split-s>	<split-s>
4842	4625	<split-h>	<split-h>
4842	4625	<name2>	<name2>
4842	4839	<>	<name>
4842	4629	<aphaerese>	<aphaerese>
4842	4838	<>	<aphaerese>
4842	4838	<>	<elision3>
4842	4838	<>	<elision2>
4842	4838	<>	<elision1>
4842	4633	.	υ
4842	4636	s	υ
4842	4633	.	u
4842	4636	s	u
4842	4639	.	κ
4842	4657	s	κ
4842	4392	s	k
4842	4633	.	α
4842	4707	s	α
4842	4633	.	a
4842	4707	s	a
4842	4713	s	λ
4842	4423	s	l
4842	4843	<1s>	<>
4843	215	.	.
4843	216	 	 
4843	215	<~>	<~>
4843	215	<split-s>	<split-s>
4843	215	<split-h>	<split-h>
4843	215	<name2>	<name2>
4843	3587	<>	<name>
4843	219	<aphaerese>	<aphaerese>
4843	3586	<>	<aphaerese>
4843	3586	<>	<elision3>
4843	3586	<>	<elision2>
4843	3586	<>	<elision1>
4843	3187	.	υ
4843	3187	.	u
4843	222	.	κ
4843	3187	.	α
4843	3187	.	a
4843	4844	<K>	<>
4844	3237	.	.
4844	3237	<~>	<~>
4844	3237	<split-s>	<split-s>
4844	3237	<split-h>	<split-h>
4844	3237	<name2>	<name2>
4844	3588	<>	<name>
4844	3240	<aphaerese>	<aphaerese>
4844	3590	<>	<aphaerese>
4844	3590	<>	<elision3>
4844	3590	<>	<elision2>
4844	3590	<>	<elision1>
4844	3236	.	υ
4844	3236	.	u
4844	3243	.	κ
4844	3236	.	α
4844	3236	.	a
4845	4846	<>	<name>
4845	4848	<>	<aphaerese>
4845	4848	<>	<elision3>
4845	4848	<>	<elision2>
4845	4848	<>	<elision1>
4845	4841	<u2K>	<>
4845	4842	<u2L>	<>
4846	4847	<>	<aphaerese>
4846	4847	<>	<elision3>
4846	4847	<>	<elision2>
4846	4847	<>	<elision1>
4846	4836	<u2K>	<>
4846	4839	<u2L>	<>
4847	4848	<>	<aphaerese>
4847	4848	<>	<elision3>
4847	4848	<>	<elision2>
4847	4848	<>	<elision1>
4847	4837	<u2K>	<>
4847	4840	<u2L>	<>
4848	4846	<>	<name>
4848	4848	<>	<aphaerese>
4848	4848	<>	<elision3>
4848	4848	<>	<elision2>
4848	4848	<>	<elision1>
4848	4835	<u2K>	<>
4848	4838	<u2L>	<>
4849	4455	<>	<name>
4849	4457	<>	<aphaerese>
4849	4457	<>	<elision3>
4849	4457	<>	<elision2>
4849	4457	<>	<elision1>
4849	4850	<kappa2K>	<>
4849	4851	<kappa2L>	<>
4849	4776	<lambda2L>	<>
4850	4459	.	.
4850	4460	 	 
4850	4459	<~>	<~>
4850	4459	<split-s>	<split-s>
4850	4459	<split-h>	<split-h>
4850	4459	<name2>	<name2>
4850	4594	<>	<name>
4850	4463	<aphaerese>	<aphaerese>
4850	4458	<>	<aphaerese>
4850	4596	<elision3>	<elision3>
4850	4458	<>	<elision3>
4850	4596	<elision2>	<elision2>
4850	4458	<>	<elision2>
4850	4596	<elision1>	<elision1>
4850	4458	<>	<elision1>
4850	4467	.	υ
4850	4470	s	υ
4850	4467	.	u
4850	4470	s	u
4850	199	s	κ
4850	4208	s	k
4850	4467	.	α
4850	4561	s	α
4850	4467	.	a
4850	4561	s	a
4850	199	s	λ
4850	4256	s	l
4851	4625	.	.
4851	4626	 	 
4851	4625	<~>	<~>
4851	4625	<split-s>	<split-s>
4851	4625	<split-h>	<split-h>
4851	4625	<name2>	<name2>
4851	4740	<>	<name>
4851	4629	<aphaerese>	<aphaerese>
4851	4624	<>	<aphaerese>
4851	4742	<elision3>	<elision3>
4851	4624	<>	<elision3>
4851	4742	<elision2>	<elision2>
4851	4624	<>	<elision2>
4851	4742	<elision1>	<elision1>
4851	4624	<>	<elision1>
4851	4633	.	υ
4851	4636	s	υ
4851	4633	.	u
4851	4636	s	u
4851	4267	s	κ
4851	4392	s	k
4851	4633	.	α
4851	4707	s	α
4851	4633	.	a
4851	4707	s	a
4851	4267	s	λ
4851	4423	s	l
4851	4780	<1s>	<>
4852	4783	<>	<name>
4852	4785	<>	<aphaerese>
4852	4785	<>	<elision3>
4852	4785	<>	<elision2>
4852	4785	<>	<elision1>
4852	4853	<k2K>	<>
4852	4854	<k2L>	<>
4852	4776	<l2L>	<>
4853	4459	.	.
4853	4460	 	 
4853	4459	<~>	<~>
4853	4459	<split-s>	<split-s>
4853	4459	<split-h>	<split-h>
4853	4459	<name2>	<name2>
4853	4787	<>	<name>
4853	4463	<aphaerese>	<aphaerese>
4853	4786	<>	<aphaerese>
4853	4459	<elision3>	<elision3>
4853	4786	<>	<elision3>
4853	4459	<elision2>	<elision2>
4853	4786	<>	<elision2>
4853	4459	<elision1>	<elision1>
4853	4786	<>	<elision1>
4853	4467	.	υ
4853	4470	s	υ
4853	4467	.	u
4853	4470	s	u
4853	199	s	κ
4853	4208	s	k
4853	4467	.	α
4853	4561	s	α
4853	4467	.	a
4853	4561	s	a
4853	199	s	λ
4853	4256	s	l
4854	4625	.	.
4854	4626	 	 
4854	4625	<~>	<~>
4854	4625	<split-s>	<split-s>
4854	4625	<split-h>	<split-h>
4854	4625	<name2>	<name2>
4854	4790	<>	<name>
4854	4629	<aphaerese>	<aphaerese>
4854	4789	<>	<aphaerese>
4854	4625	<elision3>	<elision3>
4854	4789	<>	<elision3>
4854	4625	<elision2>	<elision2>
4854	4789	<>	<elision2>
4854	4625	<elision1>	<elision1>
4854	4789	<>	<elision1>
4854	4633	.	υ
4854	4636	s	υ
4854	4633	.	u
4854	4636	s	u
4854	4267	s	κ
4854	4392	s	k
4854	4633	.	α
4854	4707	s	α
4854	4633	.	a
4854	4707	s	a
4854	4267	s	λ
4854	4423	s	l
4854	4793	<1s>	<>
4855	4856	<>	<name>
4855	4858	<>	<aphaerese>
4855	4858	<>	<elision3>
4855	4858	<>	<elision2>
4855	4858	<>	<elision1>
4855	4859	<alpha2L>	<>
4856	4857	<>	<aphaerese>
4856	4857	<>	<elision3>
4856	4857	<>	<elision2>
4856	4857	<>	<elision1>
4856	4839	<alpha2L>	<>
4857	4858	<>	<aphaerese>
4857	4858	<>	<elision3>
4857	4858	<>	<elision2>
4857	4858	<>	<elision1>
4857	4840	<alpha2L>	<>
4858	4856	<>	<name>
4858	4858	<>	<aphaerese>
4858	4858	<>	<elision3>
4858	4858	<>	<elision2>
4858	4858	<>	<elision1>
4858	4838	<alpha2L>	<>
4859	4625	.	.
4859	4626	 	 
4859	4625	<~>	<~>
4859	4625	<split-s>	<split-s>
4859	4625	<split-h>	<split-h>
4859	4625	<name2>	<name2>
4859	4839	<>	<name>
4859	4629	<aphaerese>	<aphaerese>
4859	4838	<>	<aphaerese>
4859	4838	<>	<elision3>
4859	4838	<>	<elision2>
4859	4838	<>	<elision1>
4859	4633	.	υ
4859	4636	s	υ
4859	4633	.	u
4859	4636	s	u
4859	4639	.	κ
4859	4657	s	κ
4859	4392	s	k
4859	4633	.	α
4859	4707	s	α
4859	4633	.	a
4859	4707	s	a
4859	4713	s	λ
4859	4423	s	l
4859	3586	<1s>	<>
4860	4861	<>	<name>
4860	4863	<>	<aphaerese>
4860	4863	<>	<elision3>
4860	4863	<>	<elision2>
4860	4863	<>	<elision1>
4860	4859	<a2L>	<>
4861	4862	<>	<aphaerese>
4861	4862	<>	<elision3>
4861	4862	<>	<elision2>
4861	4862	<>	<elision1>
4861	4839	<a2L>	<>
4862	4863	<>	<aphaerese>
4862	4863	<>	<elision3>
4862	4863	<>	<elision2>
4862	4863	<>	<elision1>
4862	4840	<a2L>	<>
4863	4861	<>	<name>
4863	4863	<>	<aphaerese>
4863	4863	<>	<elision3>
4863	4863	<>	<elision2>
4863	4863	<>	<elision1>
4863	4838	<a2L>	<>
4864	4810	<>	<name>
4864	4809	<>	<aphaerese>
4864	4809	<>	<elision3>
4864	4809	<>	<elision2>
4864	4809	<>	<elision1>
4864	4865	<lambda2L>	<>
4865	4625	.	.
4865	4626	 	 
4865	4625	<~>	<~>
4865	4625	<split-s>	<split-s>
4865	4625	<split-h>	<split-h>
4865	4625	<name2>	<name2>
4865	4814	<>	<name>
4865	4629	<aphaerese>	<aphaerese>
4865	4813	<>	<aphaerese>
4865	4625	<elision3>	<elision3>
4865	4813	<>	<elision3>
4865	4625	<elision2>	<elision2>
4865	4813	<>	<elision2>
4865	4625	<elision1>	<elision1>
4865	4813	<>	<elision1>
4865	4633	.	υ
4865	4636	s	υ
4865	4633	.	u
4865	4636	s	u
4865	4633	.	κ
4865	4267	s	κ
4865	4392	s	k
4865	4633	.	α
4865	4707	s	α
4865	4633	.	a
4865	4707	s	a
4865	4633	.	λ
4865	4267	s	λ
4865	4423	s	l
4865	3778	<1s>	<>
4866	4816	<>	<name>
4866	4815	<>	<aphaerese>
4866	4815	<>	<elision3>
4866	4815	<>	<elision2>
4866	4815	<>	<elision1>
4866	4865	<l2L>	<>
4867	4834	<>	<aphaerese>
4867	4834	<>	<elision3>
4867	4834	<>	<elision2>
4867	4834	<>	<elision1>
4867	4837	<ypsilon2K>	<>
4867	4868	<ypsilon2L>	<>
4868	4625	.	.
4868	4626	 	 
4868	4625	<~>	<~>
4868	4625	<split-s>	<split-s>
4868	4625	<split-h>	<split-h>
4868	4625	<name2>	<name2>
4868	4629	<aphaerese>	<aphaerese>
4868	4838	<>	<aphaerese>
4868	4838	<>	<elision3>
4868	4838	<>	<elision2>
4868	4838	<>	<elision1>
4868	4633	.	υ
4868	4636	s	υ
4868	4633	.	u
4868	4636	s	u
4868	4639	.	κ
4868	4657	s	κ
4868	4392	s	k
4868	4682	s	U
4868	4410	s	K
4868	4633	.	α
4868	4707	s	α
4868	4633	.	a
4868	4707	s	a
4868	4710	s	A
4868	4713	s	λ
4868	4423	s	l
4868	4426	s	L
4868	4869	<1s>	<>
4869	215	.	.
4869	216	 	 
4869	215	<~>	<~>
4869	215	<split-s>	<split-s>
4869	215	<split-h>	<split-h>
4869	215	<name2>	<name2>
4869	219	<aphaerese>	<aphaerese>
4869	3586	<>	<aphaerese>
4869	3586	<>	<elision3>
4869	3586	<>	<elision2>
4869	3586	<>	<elision1>
4869	3187	.	υ
4869	3187	.	u
4869	222	.	κ
4869	3187	.	α
4869	3187	.	a
4869	4870	<K>	<>
4870	3237	.	.
4870	3237	<~>	<~>
4870	3237	<split-s>	<split-s>
4870	3237	<split-h>	<split-h>
4870	3237	<name2>	<name2>
4870	3240	<aphaerese>	<aphaerese>
4870	3590	<>	<aphaerese>
4870	3590	<>	<elision3>
4870	3590	<>	<elision2>
4870	3590	<>	<elision1>
4870	3236	.	υ
4870	3236	.	u
4870	3243	.	κ
4870	3236	.	α
4870	3236	.	a
4871	4848	<>	<aphaerese>
4871	4848	<>	<elision3>
4871	4848	<>	<elision2>
4871	4848	<>	<elision1>
4871	4837	<u2K>	<>
4871	4868	<u2L>	<>
4872	4832	<>	<name>
4872	4834	<>	<aphaerese>
4872	4834	<>	<elision3>
4872	4834	<>	<elision2>
4872	4834	<>	<elision1>
4872	4835	<ypsilon2K>	<>
4872	4873	<ypsilon2L>	<>
4873	4625	.	.
4873	4626	 	 
4873	4625	<~>	<~>
4873	4625	<split-s>	<split-s>
4873	4625	<split-h>	<split-h>
4873	4625	<name2>	<name2>
4873	4839	<>	<name>
4873	4629	<aphaerese>	<aphaerese>
4873	4838	<>	<aphaerese>
4873	4838	<>	<elision3>
4873	4838	<>	<elision2>
4873	4838	<>	<elision1>
4873	4633	.	υ
4873	4636	s	υ
4873	4633	.	u
4873	4636	s	u
4873	4639	.	κ
4873	4657	s	κ
4873	4392	s	k
4873	4682	s	U
4873	4410	s	K
4873	4633	.	α
4873	4707	s	α
4873	4633	.	a
4873	4707	s	a
4873	4710	s	A
4873	4713	s	λ
4873	4423	s	l
4873	4426	s	L
4873	4843	<1s>	<>
4874	4846	<>	<name>
4874	4848	<>	<aphaerese>
4874	4848	<>	<elision3>
4874	4848	<>	<elision2>
4874	4848	<>	<elision1>
4874	4835	<u2K>	<>
4874	4873	<u2L>	<>
4875	4876	<>	<aphaerese>
4875	4880	<elision3>	<elision3>
4875	4876	<>	<elision3>
4875	4880	<elision2>	<elision2>
4875	4876	<>	<elision2>
4875	4880	<elision1>	<elision1>
4875	4876	<>	<elision1>
4876	4877	<>	<aphaerese>
4876	4878	<elision3>	<elision3>
4876	4877	<>	<elision3>
4876	4878	<elision2>	<elision2>
4876	4877	<>	<elision2>
4876	4878	<elision1>	<elision1>
4876	4877	<>	<elision1>
4877	4875	<>	<name>
4877	4877	<>	<aphaerese>
4877	4878	<elision3>	<elision3>
4877	4877	<>	<elision3>
4877	4878	<elision2>	<elision2>
4877	4877	<>	<elision2>
4877	4878	<elision1>	<elision1>
4877	4877	<>	<elision1>
4878	4878	.	.
4878	4878	<~>	<~>
4878	4878	<split-s>	<split-s>
4878	4878	<split-h>	<split-h>
4878	4878	<name2>	<name2>
4878	4879	<>	<name>
4878	4881	<aphaerese>	<aphaerese>
4878	4878	<>	<aphaerese>
4878	4878	<elision3>	<elision3>
4878	4878	<>	<elision3>
4878	4878	<elision2>	<elision2>
4878	4878	<>	<elision2>
4878	4878	<elision1>	<elision1>
4878	4878	<>	<elision1>
4878	4877	.	υ
4878	5020	H	υ
4878	4877	.	u
4878	5029	H	u
4878	4884	.	κ
4878	4935	H	κ
4878	4989	H	k
4878	4998	H	U
4878	5001	H	K
4878	4877	.	α
4878	5032	H	α
4878	4877	.	a
4878	5035	H	a
4878	4969	H	A
4878	5010	H	λ
4878	5016	H	l
4878	5019	H	L
4879	4880	.	.
4879	4880	<~>	<~>
4879	4880	<split-s>	<split-s>
4879	4880	<split-h>	<split-h>
4879	4880	<name2>	<name2>
4879	4883	<aphaerese>	<aphaerese>
4879	4880	<>	<aphaerese>
4879	4880	<elision3>	<elision3>
4879	4880	<>	<elision3>
4879	4880	<elision2>	<elision2>
4879	4880	<>	<elision2>
4879	4880	<elision1>	<elision1>
4879	4880	<>	<elision1>
4879	4876	.	υ
4879	5022	H	υ
4879	4876	.	u
4879	5031	H	u
4879	4886	.	κ
4879	4937	H	κ
4879	4991	H	k
4879	5000	H	U
4879	5004	H	K
4879	4876	.	α
4879	5034	H	α
4879	4876	.	a
4879	5037	H	a
4879	4971	H	A
4879	5012	H	λ
4879	5018	H	l
4879	5013	H	L
4880	4878	.	.
4880	4878	<~>	<~>
4880	4878	<split-s>	<split-s>
4880	4878	<split-h>	<split-h>
4880	4878	<name2>	<name2>
4880	4881	<aphaerese>	<aphaerese>
4880	4878	<>	<aphaerese>
4880	4878	<elision3>	<elision3>
4880	4878	<>	<elision3>
4880	4878	<elision2>	<elision2>
4880	4878	<>	<elision2>
4880	4878	<elision1>	<elision1>
4880	4878	<>	<elision1>
4880	4877	.	υ
4880	5020	H	υ
4880	4877	.	u
4880	5029	H	u
4880	4884	.	κ
4880	4935	H	κ
4880	4989	H	k
4880	4998	H	U
4880	5001	H	K
4880	4877	.	α
4880	5032	H	α
4880	4877	.	a
4880	5035	H	a
4880	4969	H	A
4880	5010	H	λ
4880	5016	H	l
4880	5019	H	L
4881	4878	.	.
4881	4878	<~>	<~>
4881	4878	<split-s>	<split-s>
4881	4878	<split-h>	<split-h>
4881	4878	<name2>	<name2>
4881	4882	<>	<name>
4881	4881	<aphaerese>	<aphaerese>
4881	4881	<>	<aphaerese>
4881	4878	<elision3>	<elision3>
4881	4881	<>	<elision3>
4881	4878	<elision2>	<elision2>
4881	4881	<>	<elision2>
4881	4878	<elision1>	<elision1>
4881	4881	<>	<elision1>
4881	4878	.	υ
4881	4878	.	u
4881	4884	.	κ
4881	4935	H	κ
4881	4989	H	k
4881	4998	H	U
4881	5001	H	K
4881	4878	.	α
4881	4878	.	a
4881	4969	H	A
4881	5010	H	λ
4881	5016	H	l
4881	5019	H	L
4882	4880	.	.
4882	4880	<~>	<~>
4882	4880	<split-s>	<split-s>
4882	4880	<split-h>	<split-h>
4882	4880	<name2>	<name2>
4882	4883	<aphaerese>	<aphaerese>
4882	4883	<>	<aphaerese>
4882	4880	<elision3>	<elision3>
4882	4883	<>	<elision3>
4882	4880	<elision2>	<elision2>
4882	4883	<>	<elision2>
4882	4880	<elision1>	<elision1>
4882	4883	<>	<elision1>
4882	4880	.	υ
4882	4880	.	u
4882	4886	.	κ
4882	4937	H	κ
4882	4991	H	k
4882	5000	H	U
4882	5004	H	K
4882	4880	.	α
4882	4880	.	a
4882	4971	H	A
4882	5012	H	λ
4882	5018	H	l
4882	5013	H	L
4883	4878	.	.
4883	4878	<~>	<~>
4883	4878	<split-s>	<split-s>
4883	4878	<split-h>	<split-h>
4883	4878	<name2>	<name2>
4883	4881	<aphaerese>	<aphaerese>
4883	4881	<>	<aphaerese>
4883	4878	<elision3>	<elision3>
4883	4881	<>	<elision3>
4883	4878	<elision2>	<elision2>
4883	4881	<>	<elision2>
4883	4878	<elision1>	<elision1>
4883	4881	<>	<elision1>
4883	4878	.	υ
4883	4878	.	u
4883	4884	.	κ
4883	4935	H	κ
4883	4989	H	k
4883	4998	H	U
4883	5001	H	K
4883	4878	.	α
4883	4878	.	a
4883	4969	H	A
4883	5010	H	λ
4883	5016	H	l
4883	5019	H	L
4884	4885	<>	<name>
4884	4884	<>	<aphaerese>
4884	4887	<elision3>	<elision3>
4884	4884	<>	<elision3>
4884	4887	<elision2>	<elision2>
4884	4884	<>	<elision2>
4884	4887	<elision1>	<elision1>
4884	4884	<>	<elision1>
4885	4886	<>	<aphaerese>
4885	4889	<elision3>	<elision3>
4885	4886	<>	<elision3>
4885	4889	<elision2>	<elision2>
4885	4886	<>	<elision2>
4885	4889	<elision1>	<elision1>
4885	4886	<>	<elision1>
4886	4884	<>	<aphaerese>
4886	4887	<elision3>	<elision3>
4886	4884	<>	<elision3>
4886	4887	<elision2>	<elision2>
4886	4884	<>	<elision2>
4886	4887	<elision1>	<elision1>
4886	4884	<>	<elision1>
4887	4888	<>	<name>
4887	4887	<>	<aphaerese>
4887	4887	<>	<elision3>
4887	4887	<>	<elision2>
4887	4887	<>	<elision1>
4887	4890	H	κ
4887	4923	H	k
4887	4926	H	K
4887	4929	H	λ
4887	4932	H	l
4887	4915	H	L
4888	4889	<>	<aphaerese>
4888	4889	<>	<elision3>
4888	4889	<>	<elision2>
4888	4889	<>	<elision1>
4888	4892	H	κ
4888	4925	H	k
4888	4928	H	K
4888	4931	H	λ
4888	4934	H	l
4888	4914	H	L
4889	4887	<>	<aphaerese>
4889	4887	<>	<elision3>
4889	4887	<>	<elision2>
4889	4887	<>	<elision1>
4889	4890	H	κ
4889	4923	H	k
4889	4926	H	K
4889	4929	H	λ
4889	4932	H	l
4889	4915	H	L
4890	4891	<>	<name>
4890	4890	<>	<aphaerese>
4890	4890	<>	<elision3>
4890	4890	<>	<elision2>
4890	4890	<>	<elision1>
4890	4894	<kappa2K>	<>
4890	4915	<kappa2L>	<>
4891	4892	<>	<aphaerese>
4891	4892	<>	<elision3>
4891	4892	<>	<elision2>
4891	4892	<>	<elision1>
4891	4895	<kappa2K>	<>
4891	4916	<kappa2L>	<>
4892	4890	<>	<aphaerese>
4892	4890	<>	<elision3>
4892	4890	<>	<elision2>
4892	4890	<>	<elision1>
4892	4893	<kappa2K>	<>
4892	4914	<kappa2L>	<>
4893	4894	<>	<aphaerese>
4893	4894	<>	<elision3>
4893	4894	<>	<elision2>
4893	4894	<>	<elision1>
4893	4897	s	κ
4893	4897	s	k
4893	4906	s	K
4893	4897	s	λ
4893	4897	s	l
4893	4912	s	L
4894	4895	<>	<name>
4894	4894	<>	<aphaerese>
4894	4894	<>	<elision3>
4894	4894	<>	<elision2>
4894	4894	<>	<elision1>
4894	4897	s	κ
4894	4897	s	k
4894	4906	s	K
4894	4897	s	λ
4894	4897	s	l
4894	4912	s	L
4895	4893	<>	<aphaerese>
4895	4893	<>	<elision3>
4895	4893	<>	<elision2>
4895	4893	<>	<elision1>
4895	4896	s	κ
4895	4896	s	k
4895	4905	s	K
4895	4896	s	λ
4895	4896	s	l
4895	4911	s	L
4896	4897	<>	<aphaerese>
4896	4897	<>	<elision3>
4896	4897	<>	<elision2>
4896	4897	<>	<elision1>
4896	4900	H	κ
4896	4900	H	k
4896	4900	H	K
4896	4900	H	λ
4896	4900	H	l
4896	4900	H	L
4896	4903	<2m>	<>
4897	4898	<>	<name>
4897	4897	<>	<aphaerese>
4897	4897	<>	<elision3>
4897	4897	<>	<elision2>
4897	4897	<>	<elision1>
4897	4900	H	κ
4897	4900	H	k
4897	4900	H	K
4897	4900	H	λ
4897	4900	H	l
4897	4900	H	L
4897	4904	<2m>	<>
4898	4896	<>	<aphaerese>
4898	4896	<>	<elision3>
4898	4896	<>	<elision2>
4898	4896	<>	<elision1>
4898	4899	H	κ
4898	4899	H	k
4898	4899	H	K
4898	4899	H	λ
4898	4899	H	l
4898	4899	H	L
4898	4902	<2m>	<>
4899	4900	<>	<aphaerese>
4899	4900	<>	<elision3>
4899	4900	<>	<elision2>
4899	4900	<>	<elision1>
4899	3262	<3k>	<>
4900	4901	<>	<name>
4900	4900	<>	<aphaerese>
4900	4900	<>	<elision3>
4900	4900	<>	<elision2>
4900	4900	<>	<elision1>
4900	3263	<3k>	<>
4901	4899	<>	<aphaerese>
4901	4899	<>	<elision3>
4901	4899	<>	<elision2>
4901	4899	<>	<elision1>
4901	3261	<3k>	<>
4902	4903	<>	<aphaerese>
4902	4903	<>	<elision3>
4902	4903	<>	<elision2>
4902	4903	<>	<elision1>
4902	314	<5h>	<>
4903	4904	<>	<aphaerese>
4903	4904	<>	<elision3>
4903	4904	<>	<elision2>
4903	4904	<>	<elision1>
4903	315	<5h>	<>
4904	4902	<>	<name>
4904	4904	<>	<aphaerese>
4904	4904	<>	<elision3>
4904	4904	<>	<elision2>
4904	4904	<>	<elision1>
4904	313	<5h>	<>
4905	4906	<>	<aphaerese>
4905	4906	<>	<elision3>
4905	4906	<>	<elision2>
4905	4906	<>	<elision1>
4905	4909	<K2kl>	<>
4906	4907	<>	<name>
4906	4906	<>	<aphaerese>
4906	4906	<>	<elision3>
4906	4906	<>	<elision2>
4906	4906	<>	<elision1>
4906	4910	<K2kl>	<>
4907	4905	<>	<aphaerese>
4907	4905	<>	<elision3>
4907	4905	<>	<elision2>
4907	4905	<>	<elision1>
4907	4908	<K2kl>	<>
4908	4909	<>	<aphaerese>
4908	4909	<>	<elision3>
4908	4909	<>	<elision2>
4908	4909	<>	<elision1>
4908	4899	H	κ
4908	4899	H	k
4908	4899	H	K
4908	4899	H	λ
4908	4899	H	l
4908	4899	H	L
4909	4910	<>	<aphaerese>
4909	4910	<>	<elision3>
4909	4910	<>	<elision2>
4909	4910	<>	<elision1>
4909	4900	H	κ
4909	4900	H	k
4909	4900	H	K
4909	4900	H	λ
4909	4900	H	l
4909	4900	H	L
4910	4908	<>	<name>
4910	4910	<>	<aphaerese>
4910	4910	<>	<elision3>
4910	4910	<>	<elision2>
4910	4910	<>	<elision1>
4910	4900	H	κ
4910	4900	H	k
4910	4900	H	K
4910	4900	H	λ
4910	4900	H	l
4910	4900	H	L
4911	4912	<>	<aphaerese>
4911	4912	<>	<elision3>
4911	4912	<>	<elision2>
4911	4912	<>	<elision1>
4911	4909	<L2kl>	<>
4912	4913	<>	<name>
4912	4912	<>	<aphaerese>
4912	4912	<>	<elision3>
4912	4912	<>	<elision2>
4912	4912	<>	<elision1>
4912	4910	<L2kl>	<>
4913	4911	<>	<aphaerese>
4913	4911	<>	<elision3>
4913	4911	<>	<elision2>
4913	4911	<>	<elision1>
4913	4908	<L2kl>	<>
4914	4915	<>	<aphaerese>
4914	4915	<>	<elision3>
4914	4915	<>	<elision2>
4914	4915	<>	<elision1>
4914	4918	s	κ
4914	4921	H	κ
4914	4918	s	k
4914	4921	H	k
4914	4906	s	K
4914	4921	H	K
4914	4918	s	λ
4914	4921	H	λ
4914	4918	s	l
4914	4921	H	l
4914	4912	s	L
4914	4921	H	L
4915	4916	<>	<name>
4915	4915	<>	<aphaerese>
4915	4915	<>	<elision3>
4915	4915	<>	<elision2>
4915	4915	<>	<elision1>
4915	4918	s	κ
4915	4921	H	κ
4915	4918	s	k
4915	4921	H	k
4915	4906	s	K
4915	4921	H	K
4915	4918	s	λ
4915	4921	H	λ
4915	4918	s	l
4915	4921	H	l
4915	4912	s	L
4915	4921	H	L
4916	4914	<>	<aphaerese>
4916	4914	<>	<elision3>
4916	4914	<>	<elision2>
4916	4914	<>	<elision1>
4916	4917	s	κ
4916	4920	H	κ
4916	4917	s	k
4916	4920	H	k
4916	4905	s	K
4916	4920	H	K
4916	4917	s	λ
4916	4920	H	λ
4916	4917	s	l
4916	4920	H	l
4916	4911	s	L
4916	4920	H	L
4917	4918	<>	<aphaerese>
4917	4918	<>	<elision3>
4917	4918	<>	<elision2>
4917	4918	<>	<elision1>
4917	4900	H	κ
4917	4900	H	k
4917	4900	H	K
4917	4900	H	λ
4917	4900	H	l
4917	4900	H	L
4917	4903	<w>	<>
4918	4919	<>	<name>
4918	4918	<>	<aphaerese>
4918	4918	<>	<elision3>
4918	4918	<>	<elision2>
4918	4918	<>	<elision1>
4918	4900	H	κ
4918	4900	H	k
4918	4900	H	K
4918	4900	H	λ
4918	4900	H	l
4918	4900	H	L
4918	4904	<w>	<>
4919	4917	<>	<aphaerese>
4919	4917	<>	<elision3>
4919	4917	<>	<elision2>
4919	4917	<>	<elision1>
4919	4899	H	κ
4919	4899	H	k
4919	4899	H	K
4919	4899	H	λ
4919	4899	H	l
4919	4899	H	L
4919	4902	<w>	<>
4920	4921	<>	<aphaerese>
4920	4921	<>	<elision3>
4920	4921	<>	<elision2>
4920	4921	<>	<elision1>
4920	3262	<2k>	<>
4921	4922	<>	<name>
4921	4921	<>	<aphaerese>
4921	4921	<>	<elision3>
4921	4921	<>	<elision2>
4921	4921	<>	<elision1>
4921	3263	<2k>	<>
4922	4920	<>	<aphaerese>
4922	4920	<>	<elision3>
4922	4920	<>	<elision2>
4922	4920	<>	<elision1>
4922	3261	<2k>	<>
4923	4924	<>	<name>
4923	4923	<>	<aphaerese>
4923	4923	<>	<elision3>
4923	4923	<>	<elision2>
4923	4923	<>	<elision1>
4923	4894	<k2K>	<>
4923	4915	<k2L>	<>
4924	4925	<>	<aphaerese>
4924	4925	<>	<elision3>
4924	4925	<>	<elision2>
4924	4925	<>	<elision1>
4924	4895	<k2K>	<>
4924	4916	<k2L>	<>
4925	4923	<>	<aphaerese>
4925	4923	<>	<elision3>
4925	4923	<>	<elision2>
4925	4923	<>	<elision1>
4925	4893	<k2K>	<>
4925	4914	<k2L>	<>
4926	4927	<>	<name>
4926	4926	<>	<aphaerese>
4926	4926	<>	<elision3>
4926	4926	<>	<elision2>
4926	4926	<>	<elision1>
4926	4897	s	κ
4926	4897	s	k
4926	4906	s	K
4926	4897	s	λ
4926	4897	s	l
4926	4912	s	L
4926	4915	<K2L>	<>
4927	4928	<>	<aphaerese>
4927	4928	<>	<elision3>
4927	4928	<>	<elision2>
4927	4928	<>	<elision1>
4927	4896	s	κ
4927	4896	s	k
4927	4905	s	K
4927	4896	s	λ
4927	4896	s	l
4927	4911	s	L
4927	4916	<K2L>	<>
4928	4926	<>	<aphaerese>
4928	4926	<>	<elision3>
4928	4926	<>	<elision2>
4928	4926	<>	<elision1>
4928	4897	s	κ
4928	4897	s	k
4928	4906	s	K
4928	4897	s	λ
4928	4897	s	l
4928	4912	s	L
4928	4914	<K2L>	<>
4929	4930	<>	<name>
4929	4929	<>	<aphaerese>
4929	4929	<>	<elision3>
4929	4929	<>	<elision2>
4929	4929	<>	<elision1>
4929	4915	<lambda2L>	<>
4930	4931	<>	<aphaerese>
4930	4931	<>	<elision3>
4930	4931	<>	<elision2>
4930	4931	<>	<elision1>
4930	4916	<lambda2L>	<>
4931	4929	<>	<aphaerese>
4931	4929	<>	<elision3>
4931	4929	<>	<elision2>
4931	4929	<>	<elision1>
4931	4914	<lambda2L>	<>
4932	4933	<>	<name>
4932	4932	<>	<aphaerese>
4932	4932	<>	<elision3>
4932	4932	<>	<elision2>
4932	4932	<>	<elision1>
4932	4915	<l2L>	<>
4933	4934	<>	<aphaerese>
4933	4934	<>	<elision3>
4933	4934	<>	<elision2>
4933	4934	<>	<elision1>
4933	4916	<l2L>	<>
4934	4932	<>	<aphaerese>
4934	4932	<>	<elision3>
4934	4932	<>	<elision2>
4934	4932	<>	<elision1>
4934	4914	<l2L>	<>
4935	4936	<>	<name>
4935	4935	<>	<aphaerese>
4935	4935	<>	<elision3>
4935	4935	<>	<elision2>
4935	4935	<>	<elision1>
4935	4960	<kappa2K>	<>
4935	4978	<kappa2L>	<>
4935	4987	<lambda2L>	<>
4936	4937	<>	<aphaerese>
4936	4937	<>	<elision3>
4936	4937	<>	<elision2>
4936	4937	<>	<elision1>
4936	4961	<kappa2K>	<>
4936	4979	<kappa2L>	<>
4936	4988	<lambda2L>	<>
4937	4935	<>	<aphaerese>
4937	4935	<>	<elision3>
4937	4935	<>	<elision2>
4937	4935	<>	<elision1>
4937	4938	<kappa2K>	<>
4937	4968	<kappa2L>	<>
4937	4986	<lambda2L>	<>
4938	4939	.	.
4938	4939	<~>	<~>
4938	4939	<split-s>	<split-s>
4938	4939	<split-h>	<split-h>
4938	4939	<name2>	<name2>
4938	4942	<aphaerese>	<aphaerese>
4938	4960	<>	<aphaerese>
4938	4963	<elision3>	<elision3>
4938	4960	<>	<elision3>
4938	4963	<elision2>	<elision2>
4938	4960	<>	<elision2>
4938	4963	<elision1>	<elision1>
4938	4960	<>	<elision1>
4938	4957	.	υ
4938	4910	s	υ
4938	4957	.	u
4938	4910	s	u
4938	4897	s	κ
4938	4897	s	k
4938	4951	s	U
4938	4906	s	K
4938	4957	.	α
4938	4910	s	α
4938	4957	.	a
4938	4910	s	a
4938	4954	s	A
4938	4897	s	λ
4938	4897	s	l
4938	4912	s	L
4938	4903	<1m>	<>
4939	4939	.	.
4939	4939	<~>	<~>
4939	4939	<split-s>	<split-s>
4939	4939	<split-h>	<split-h>
4939	4939	<name2>	<name2>
4939	4940	<>	<name>
4939	4942	<aphaerese>	<aphaerese>
4939	4939	<>	<aphaerese>
4939	4939	<elision3>	<elision3>
4939	4939	<>	<elision3>
4939	4939	<elision2>	<elision2>
4939	4939	<>	<elision2>
4939	4939	<elision1>	<elision1>
4939	4939	<>	<elision1>
4939	4957	.	υ
4939	4910	s	υ
4939	4957	.	u
4939	4910	s	u
4939	4945	.	κ
4939	4897	s	κ
4939	4897	s	k
4939	4951	s	U
4939	4906	s	K
4939	4957	.	α
4939	4910	s	α
4939	4957	.	a
4939	4910	s	a
4939	4954	s	A
4939	4897	s	λ
4939	4897	s	l
4939	4912	s	L
4939	4904	<1m>	<>
4940	4941	.	.
4940	4941	<~>	<~>
4940	4941	<split-s>	<split-s>
4940	4941	<split-h>	<split-h>
4940	4941	<name2>	<name2>
4940	4944	<aphaerese>	<aphaerese>
4940	4941	<>	<aphaerese>
4940	4941	<elision3>	<elision3>
4940	4941	<>	<elision3>
4940	4941	<elision2>	<elision2>
4940	4941	<>	<elision2>
4940	4941	<elision1>	<elision1>
4940	4941	<>	<elision1>
4940	4959	.	υ
4940	4909	s	υ
4940	4959	.	u
4940	4909	s	u
4940	4947	.	κ
4940	4896	s	κ
4940	4896	s	k
4940	4953	s	U
4940	4905	s	K
4940	4959	.	α
4940	4909	s	α
4940	4959	.	a
4940	4909	s	a
4940	4956	s	A
4940	4896	s	λ
4940	4896	s	l
4940	4911	s	L
4940	4902	<1m>	<>
4941	4939	.	.
4941	4939	<~>	<~>
4941	4939	<split-s>	<split-s>
4941	4939	<split-h>	<split-h>
4941	4939	<name2>	<name2>
4941	4942	<aphaerese>	<aphaerese>
4941	4939	<>	<aphaerese>
4941	4939	<elision3>	<elision3>
4941	4939	<>	<elision3>
4941	4939	<elision2>	<elision2>
4941	4939	<>	<elision2>
4941	4939	<elision1>	<elision1>
4941	4939	<>	<elision1>
4941	4957	.	υ
4941	4910	s	υ
4941	4957	.	u
4941	4910	s	u
4941	4945	.	κ
4941	4897	s	κ
4941	4897	s	k
4941	4951	s	U
4941	4906	s	K
4941	4957	.	α
4941	4910	s	α
4941	4957	.	a
4941	4910	s	a
4941	4954	s	A
4941	4897	s	λ
4941	4897	s	l
4941	4912	s	L
4941	4903	<1m>	<>
4942	4939	.	.
4942	4939	<~>	<~>
4942	4939	<split-s>	<split-s>
4942	4939	<split-h>	<split-h>
4942	4939	<name2>	<name2>
4942	4943	<>	<name>
4942	4942	<aphaerese>	<aphaerese>
4942	4942	<>	<aphaerese>
4942	4939	<elision3>	<elision3>
4942	4942	<>	<elision3>
4942	4939	<elision2>	<elision2>
4942	4942	<>	<elision2>
4942	4939	<elision1>	<elision1>
4942	4942	<>	<elision1>
4942	4939	.	υ
4942	4939	.	u
4942	4945	.	κ
4942	4897	s	κ
4942	4897	s	k
4942	4951	s	U
4942	4906	s	K
4942	4939	.	α
4942	4939	.	a
4942	4954	s	A
4942	4897	s	λ
4942	4897	s	l
4942	4912	s	L
4942	4904	<1m>	<>
4943	4941	.	.
4943	4941	<~>	<~>
4943	4941	<split-s>	<split-s>
4943	4941	<split-h>	<split-h>
4943	4941	<name2>	<name2>
4943	4944	<aphaerese>	<aphaerese>
4943	4944	<>	<aphaerese>
4943	4941	<elision3>	<elision3>
4943	4944	<>	<elision3>
4943	4941	<elision2>	<elision2>
4943	4944	<>	<elision2>
4943	4941	<elision1>	<elision1>
4943	4944	<>	<elision1>
4943	4941	.	υ
4943	4941	.	u
4943	4947	.	κ
4943	4896	s	κ
4943	4896	s	k
4943	4953	s	U
4943	4905	s	K
4943	4941	.	α
4943	4941	.	a
4943	4956	s	A
4943	4896	s	λ
4943	4896	s	l
4943	4911	s	L
4943	4902	<1m>	<>
4944	4939	.	.
4944	4939	<~>	<~>
4944	4939	<split-s>	<split-s>
4944	4939	<split-h>	<split-h>
4944	4939	<name2>	<name2>
4944	4942	<aphaerese>	<aphaerese>
4944	4942	<>	<aphaerese>
4944	4939	<elision3>	<elision3>
4944	4942	<>	<elision3>
4944	4939	<elision2>	<elision2>
4944	4942	<>	<elision2>
4944	4939	<elision1>	<elision1>
4944	4942	<>	<elision1>
4944	4939	.	υ
4944	4939	.	u
4944	4945	.	κ
4944	4897	s	κ
4944	4897	s	k
4944	4951	s	U
4944	4906	s	K
4944	4939	.	α
4944	4939	.	a
4944	4954	s	A
4944	4897	s	λ
4944	4897	s	l
4944	4912	s	L
4944	4903	<1m>	<>
4945	4946	<>	<name>
4945	4945	<>	<aphaerese>
4945	4948	<elision3>	<elision3>
4945	4945	<>	<elision3>
4945	4948	<elision2>	<elision2>
4945	4945	<>	<elision2>
4945	4948	<elision1>	<elision1>
4945	4945	<>	<elision1>
4946	4947	<>	<aphaerese>
4946	4950	<elision3>	<elision3>
4946	4947	<>	<elision3>
4946	4950	<elision2>	<elision2>
4946	4947	<>	<elision2>
4946	4950	<elision1>	<elision1>
4946	4947	<>	<elision1>
4947	4945	<>	<aphaerese>
4947	4948	<elision3>	<elision3>
4947	4945	<>	<elision3>
4947	4948	<elision2>	<elision2>
4947	4945	<>	<elision2>
4947	4948	<elision1>	<elision1>
4947	4945	<>	<elision1>
4948	4949	<>	<name>
4948	4948	<>	<aphaerese>
4948	4948	<>	<elision3>
4948	4948	<>	<elision2>
4948	4948	<>	<elision1>
4948	4910	s	κ
4948	4910	s	k
4948	4906	s	K
4948	4910	s	λ
4948	4910	s	l
4948	4912	s	L
4949	4950	<>	<aphaerese>
4949	4950	<>	<elision3>
4949	4950	<>	<elision2>
4949	4950	<>	<elision1>
4949	4909	s	κ
4949	4909	s	k
4949	4905	s	K
4949	4909	s	λ
4949	4909	s	l
4949	4911	s	L
4950	4948	<>	<aphaerese>
4950	4948	<>	<elision3>
4950	4948	<>	<elision2>
4950	4948	<>	<elision1>
4950	4910	s	κ
4950	4910	s	k
4950	4906	s	K
4950	4910	s	λ
4950	4910	s	l
4950	4912	s	L
4951	4952	<>	<name>
4951	4951	<>	<aphaerese>
4951	4951	<>	<elision3>
4951	4951	<>	<elision2>
4951	4951	<>	<elision1>
4951	4910	<U2kl>	<>
4952	4953	<>	<aphaerese>
4952	4953	<>	<elision3>
4952	4953	<>	<elision2>
4952	4953	<>	<elision1>
4952	4908	<U2kl>	<>
4953	4951	<>	<aphaerese>
4953	4951	<>	<elision3>
4953	4951	<>	<elision2>
4953	4951	<>	<elision1>
4953	4909	<U2kl>	<>
4954	4955	<>	<name>
4954	4954	<>	<aphaerese>
4954	4954	<>	<elision3>
4954	4954	<>	<elision2>
4954	4954	<>	<elision1>
4954	4910	<A2kl>	<>
4955	4956	<>	<aphaerese>
4955	4956	<>	<elision3>
4955	4956	<>	<elision2>
4955	4956	<>	<elision1>
4955	4908	<A2kl>	<>
4956	4954	<>	<aphaerese>
4956	4954	<>	<elision3>
4956	4954	<>	<elision2>
4956	4954	<>	<elision1>
4956	4909	<A2kl>	<>
4957	4958	<>	<name>
4957	4957	<>	<aphaerese>
4957	4939	<elision3>	<elision3>
4957	4957	<>	<elision3>
4957	4939	<elision2>	<elision2>
4957	4957	<>	<elision2>
4957	4939	<elision1>	<elision1>
4957	4957	<>	<elision1>
4958	4959	<>	<aphaerese>
4958	4941	<elision3>	<elision3>
4958	4959	<>	<elision3>
4958	4941	<elision2>	<elision2>
4958	4959	<>	<elision2>
4958	4941	<elision1>	<elision1>
4958	4959	<>	<elision1>
4959	4957	<>	<aphaerese>
4959	4939	<elision3>	<elision3>
4959	4957	<>	<elision3>
4959	4939	<elision2>	<elision2>
4959	4957	<>	<elision2>
4959	4939	<elision1>	<elision1>
4959	4957	<>	<elision1>
4960	4939	.	.
4960	4939	<~>	<~>
4960	4939	<split-s>	<split-s>
4960	4939	<split-h>	<split-h>
4960	4939	<name2>	<name2>
4960	4961	<>	<name>
4960	4942	<aphaerese>	<aphaerese>
4960	4960	<>	<aphaerese>
4960	4963	<elision3>	<elision3>
4960	4960	<>	<elision3>
4960	4963	<elision2>	<elision2>
4960	4960	<>	<elision2>
4960	4963	<elision1>	<elision1>
4960	4960	<>	<elision1>
4960	4957	.	υ
4960	4910	s	υ
4960	4957	.	u
4960	4910	s	u
4960	4897	s	κ
4960	4897	s	k
4960	4951	s	U
4960	4906	s	K
4960	4957	.	α
4960	4910	s	α
4960	4957	.	a
4960	4910	s	a
4960	4954	s	A
4960	4897	s	λ
4960	4897	s	l
4960	4912	s	L
4960	4904	<1m>	<>
4961	4941	.	.
4961	4941	<~>	<~>
4961	4941	<split-s>	<split-s>
4961	4941	<split-h>	<split-h>
4961	4941	<name2>	<name2>
4961	4944	<aphaerese>	<aphaerese>
4961	4938	<>	<aphaerese>
4961	4962	<elision3>	<elision3>
4961	4938	<>	<elision3>
4961	4962	<elision2>	<elision2>
4961	4938	<>	<elision2>
4961	4962	<elision1>	<elision1>
4961	4938	<>	<elision1>
4961	4959	.	υ
4961	4909	s	υ
4961	4959	.	u
4961	4909	s	u
4961	4896	s	κ
4961	4896	s	k
4961	4953	s	U
4961	4905	s	K
4961	4959	.	α
4961	4909	s	α
4961	4959	.	a
4961	4909	s	a
4961	4956	s	A
4961	4896	s	λ
4961	4896	s	l
4961	4911	s	L
4961	4902	<1m>	<>
4962	4939	.	.
4962	4939	<~>	<~>
4962	4939	<split-s>	<split-s>
4962	4939	<split-h>	<split-h>
4962	4939	<name2>	<name2>
4962	4942	<aphaerese>	<aphaerese>
4962	4963	<>	<aphaerese>
4962	4939	<elision3>	<elision3>
4962	4963	<>	<elision3>
4962	4939	<elision2>	<elision2>
4962	4963	<>	<elision2>
4962	4939	<elision1>	<elision1>
4962	4963	<>	<elision1>
4962	4957	.	υ
4962	4910	s	υ
4962	4957	.	u
4962	4910	s	u
4962	4945	.	κ
4962	4966	s	κ
4962	4966	s	k
4962	4951	s	U
4962	4957	.	α
4962	4910	s	α
4962	4957	.	a
4962	4910	s	a
4962	4954	s	A
4962	4966	s	λ
4962	4966	s	l
4962	4903	<1m>	<>
4963	4939	.	.
4963	4939	<~>	<~>
4963	4939	<split-s>	<split-s>
4963	4939	<split-h>	<split-h>
4963	4939	<name2>	<name2>
4963	4964	<>	<name>
4963	4942	<aphaerese>	<aphaerese>
4963	4963	<>	<aphaerese>
4963	4939	<elision3>	<elision3>
4963	4963	<>	<elision3>
4963	4939	<elision2>	<elision2>
4963	4963	<>	<elision2>
4963	4939	<elision1>	<elision1>
4963	4963	<>	<elision1>
4963	4957	.	υ
4963	4910	s	υ
4963	4957	.	u
4963	4910	s	u
4963	4945	.	κ
4963	4966	s	κ
4963	4966	s	k
4963	4951	s	U
4963	4957	.	α
4963	4910	s	α
4963	4957	.	a
4963	4910	s	a
4963	4954	s	A
4963	4966	s	λ
4963	4966	s	l
4963	4904	<1m>	<>
4964	4941	.	.
4964	4941	<~>	<~>
4964	4941	<split-s>	<split-s>
4964	4941	<split-h>	<split-h>
4964	4941	<name2>	<name2>
4964	4944	<aphaerese>	<aphaerese>
4964	4962	<>	<aphaerese>
4964	4941	<elision3>	<elision3>
4964	4962	<>	<elision3>
4964	4941	<elision2>	<elision2>
4964	4962	<>	<elision2>
4964	4941	<elision1>	<elision1>
4964	4962	<>	<elision1>
4964	4959	.	υ
4964	4909	s	υ
4964	4959	.	u
4964	4909	s	u
4964	4947	.	κ
4964	4965	s	κ
4964	4965	s	k
4964	4953	s	U
4964	4959	.	α
4964	4909	s	α
4964	4959	.	a
4964	4909	s	a
4964	4956	s	A
4964	4965	s	λ
4964	4965	s	l
4964	4902	<1m>	<>
4965	4966	<>	<aphaerese>
4965	4966	<>	<elision3>
4965	4966	<>	<elision2>
4965	4966	<>	<elision1>
4965	4903	<2m>	<>
4966	4967	<>	<name>
4966	4966	<>	<aphaerese>
4966	4966	<>	<elision3>
4966	4966	<>	<elision2>
4966	4966	<>	<elision1>
4966	4904	<2m>	<>
4967	4965	<>	<aphaerese>
4967	4965	<>	<elision3>
4967	4965	<>	<elision2>
4967	4965	<>	<elision1>
4967	4902	<2m>	<>
4968	4969	.	.
4968	4969	<~>	<~>
4968	4969	<split-s>	<split-s>
4968	4969	<split-h>	<split-h>
4968	4969	<name2>	<name2>
4968	4972	<aphaerese>	<aphaerese>
4968	4978	<>	<aphaerese>
4968	4981	<elision3>	<elision3>
4968	4978	<>	<elision3>
4968	4981	<elision2>	<elision2>
4968	4978	<>	<elision2>
4968	4981	<elision1>	<elision1>
4968	4978	<>	<elision1>
4968	4975	.	υ
4968	4910	s	υ
4968	4975	.	u
4968	4910	s	u
4968	4918	s	κ
4968	4921	H	κ
4968	4918	s	k
4968	4921	H	k
4968	4951	s	U
4968	4906	s	K
4968	4921	H	K
4968	4975	.	α
4968	4910	s	α
4968	4975	.	a
4968	4910	s	a
4968	4954	s	A
4968	4918	s	λ
4968	4921	H	λ
4968	4918	s	l
4968	4921	H	l
4968	4912	s	L
4968	4921	H	L
4968	4903	<1m>	<>
4969	4969	.	.
4969	4969	<~>	<~>
4969	4969	<split-s>	<split-s>
4969	4969	<split-h>	<split-h>
4969	4969	<name2>	<name2>
4969	4970	<>	<name>
4969	4972	<aphaerese>	<aphaerese>
4969	4969	<>	<aphaerese>
4969	4969	<elision3>	<elision3>
4969	4969	<>	<elision3>
4969	4969	<elision2>	<elision2>
4969	4969	<>	<elision2>
4969	4969	<elision1>	<elision1>
4969	4969	<>	<elision1>
4969	4975	.	υ
4969	4910	s	υ
4969	4975	.	u
4969	4910	s	u
4969	4945	.	κ
4969	4918	s	κ
4969	4921	H	κ
4969	4918	s	k
4969	4921	H	k
4969	4951	s	U
4969	4906	s	K
4969	4921	H	K
4969	4975	.	α
4969	4910	s	α
4969	4975	.	a
4969	4910	s	a
4969	4954	s	A
4969	4918	s	λ
4969	4921	H	λ
4969	4918	s	l
4969	4921	H	l
4969	4912	s	L
4969	4921	H	L
4969	4904	<1m>	<>
4970	4971	.	.
4970	4971	<~>	<~>
4970	4971	<split-s>	<split-s>
4970	4971	<split-h>	<split-h>
4970	4971	<name2>	<name2>
4970	4974	<aphaerese>	<aphaerese>
4970	4971	<>	<aphaerese>
4970	4971	<elision3>	<elision3>
4970	4971	<>	<elision3>
4970	4971	<elision2>	<elision2>
4970	4971	<>	<elision2>
4970	4971	<elision1>	<elision1>
4970	4971	<>	<elision1>
4970	4977	.	υ
4970	4909	s	υ
4970	4977	.	u
4970	4909	s	u
4970	4947	.	κ
4970	4917	s	κ
4970	4920	H	κ
4970	4917	s	k
4970	4920	H	k
4970	4953	s	U
4970	4905	s	K
4970	4920	H	K
4970	4977	.	α
4970	4909	s	α
4970	4977	.	a
4970	4909	s	a
4970	4956	s	A
4970	4917	s	λ
4970	4920	H	λ
4970	4917	s	l
4970	4920	H	l
4970	4911	s	L
4970	4920	H	L
4970	4902	<1m>	<>
4971	4969	.	.
4971	4969	<~>	<~>
4971	4969	<split-s>	<split-s>
4971	4969	<split-h>	<split-h>
4971	4969	<name2>	<name2>
4971	4972	<aphaerese>	<aphaerese>
4971	4969	<>	<aphaerese>
4971	4969	<elision3>	<elision3>
4971	4969	<>	<elision3>
4971	4969	<elision2>	<elision2>
4971	4969	<>	<elision2>
4971	4969	<elision1>	<elision1>
4971	4969	<>	<elision1>
4971	4975	.	υ
4971	4910	s	υ
4971	4975	.	u
4971	4910	s	u
4971	4945	.	κ
4971	4918	s	κ
4971	4921	H	κ
4971	4918	s	k
4971	4921	H	k
4971	4951	s	U
4971	4906	s	K
4971	4921	H	K
4971	4975	.	α
4971	4910	s	α
4971	4975	.	a
4971	4910	s	a
4971	4954	s	A
4971	4918	s	λ
4971	4921	H	λ
4971	4918	s	l
4971	4921	H	l
4971	4912	s	L
4971	4921	H	L
4971	4903	<1m>	<>
4972	4969	.	.
4972	4969	<~>	<~>
4972	4969	<split-s>	<split-s>
4972	4969	<split-h>	<split-h>
4972	4969	<name2>	<name2>
4972	4973	<>	<name>
4972	4972	<aphaerese>	<aphaerese>
4972	4972	<>	<aphaerese>
4972	4969	<elision3>	<elision3>
4972	4972	<>	<elision3>
4972	4969	<elision2>	<elision2>
4972	4972	<>	<elision2>
4972	4969	<elision1>	<elision1>
4972	4972	<>	<elision1>
4972	4969	.	υ
4972	4969	.	u
4972	4945	.	κ
4972	4918	s	κ
4972	4921	H	κ
4972	4918	s	k
4972	4921	H	k
4972	4951	s	U
4972	4906	s	K
4972	4921	H	K
4972	4969	.	α
4972	4969	.	a
4972	4954	s	A
4972	4918	s	λ
4972	4921	H	λ
4972	4918	s	l
4972	4921	H	l
4972	4912	s	L
4972	4921	H	L
4972	4904	<1m>	<>
4973	4971	.	.
4973	4971	<~>	<~>
4973	4971	<split-s>	<split-s>
4973	4971	<split-h>	<split-h>
4973	4971	<name2>	<name2>
4973	4974	<aphaerese>	<aphaerese>
4973	4974	<>	<aphaerese>
4973	4971	<elision3>	<elision3>
4973	4974	<>	<elision3>
4973	4971	<elision2>	<elision2>
4973	4974	<>	<elision2>
4973	4971	<elision1>	<elision1>
4973	4974	<>	<elision1>
4973	4971	.	υ
4973	4971	.	u
4973	4947	.	κ
4973	4917	s	κ
4973	4920	H	κ
4973	4917	s	k
4973	4920	H	k
4973	4953	s	U
4973	4905	s	K
4973	4920	H	K
4973	4971	.	α
4973	4971	.	a
4973	4956	s	A
4973	4917	s	λ
4973	4920	H	λ
4973	4917	s	l
4973	4920	H	l
4973	4911	s	L
4973	4920	H	L
4973	4902	<1m>	<>
4974	4969	.	.
4974	4969	<~>	<~>
4974	4969	<split-s>	<split-s>
4974	4969	<split-h>	<split-h>
4974	4969	<name2>	<name2>
4974	4972	<aphaerese>	<aphaerese>
4974	4972	<>	<aphaerese>
4974	4969	<elision3>	<elision3>
4974	4972	<>	<elision3>
4974	4969	<elision2>	<elision2>
4974	4972	<>	<elision2>
4974	4969	<elision1>	<elision1>
4974	4972	<>	<elision1>
4974	4969	.	υ
4974	4969	.	u
4974	4945	.	κ
4974	4918	s	κ
4974	4921	H	κ
4974	4918	s	k
4974	4921	H	k
4974	4951	s	U
4974	4906	s	K
4974	4921	H	K
4974	4969	.	α
4974	4969	.	a
4974	4954	s	A
4974	4918	s	λ
4974	4921	H	λ
4974	4918	s	l
4974	4921	H	l
4974	4912	s	L
4974	4921	H	L
4974	4903	<1m>	<>
4975	4976	<>	<name>
4975	4975	<>	<aphaerese>
4975	4969	<elision3>	<elision3>
4975	4975	<>	<elision3>
4975	4969	<elision2>	<elision2>
4975	4975	<>	<elision2>
4975	4969	<elision1>	<elision1>
4975	4975	<>	<elision1>
4976	4977	<>	<aphaerese>
4976	4971	<elision3>	<elision3>
4976	4977	<>	<elision3>
4976	4971	<elision2>	<elision2>
4976	4977	<>	<elision2>
4976	4971	<elision1>	<elision1>
4976	4977	<>	<elision1>
4977	4975	<>	<aphaerese>
4977	4969	<elision3>	<elision3>
4977	4975	<>	<elision3>
4977	4969	<elision2>	<elision2>
4977	4975	<>	<elision2>
4977	4969	<elision1>	<elision1>
4977	4975	<>	<elision1>
4978	4969	.	.
4978	4969	<~>	<~>
4978	4969	<split-s>	<split-s>
4978	4969	<split-h>	<split-h>
4978	4969	<name2>	<name2>
4978	4979	<>	<name>
4978	4972	<aphaerese>	<aphaerese>
4978	4978	<>	<aphaerese>
4978	4981	<elision3>	<elision3>
4978	4978	<>	<elision3>
4978	4981	<elision2>	<elision2>
4978	4978	<>	<elision2>
4978	4981	<elision1>	<elision1>
4978	4978	<>	<elision1>
4978	4975	.	υ
4978	4910	s	υ
4978	4975	.	u
4978	4910	s	u
4978	4918	s	κ
4978	4921	H	κ
4978	4918	s	k
4978	4921	H	k
4978	4951	s	U
4978	4906	s	K
4978	4921	H	K
4978	4975	.	α
4978	4910	s	α
4978	4975	.	a
4978	4910	s	a
4978	4954	s	A
4978	4918	s	λ
4978	4921	H	λ
4978	4918	s	l
4978	4921	H	l
4978	4912	s	L
4978	4921	H	L
4978	4904	<1m>	<>
4979	4971	.	.
4979	4971	<~>	<~>
4979	4971	<split-s>	<split-s>
4979	4971	<split-h>	<split-h>
4979	4971	<name2>	<name2>
4979	4974	<aphaerese>	<aphaerese>
4979	4968	<>	<aphaerese>
4979	4980	<elision3>	<elision3>
4979	4968	<>	<elision3>
4979	4980	<elision2>	<elision2>
4979	4968	<>	<elision2>
4979	4980	<elision1>	<elision1>
4979	4968	<>	<elision1>
4979	4977	.	υ
4979	4909	s	υ
4979	4977	.	u
4979	4909	s	u
4979	4917	s	κ
4979	4920	H	κ
4979	4917	s	k
4979	4920	H	k
4979	4953	s	U
4979	4905	s	K
4979	4920	H	K
4979	4977	.	α
4979	4909	s	α
4979	4977	.	a
4979	4909	s	a
4979	4956	s	A
4979	4917	s	λ
4979	4920	H	λ
4979	4917	s	l
4979	4920	H	l
4979	4911	s	L
4979	4920	H	L
4979	4902	<1m>	<>
4980	4969	.	.
4980	4969	<~>	<~>
4980	4969	<split-s>	<split-s>
4980	4969	<split-h>	<split-h>
4980	4969	<name2>	<name2>
4980	4972	<aphaerese>	<aphaerese>
4980	4981	<>	<aphaerese>
4980	4969	<elision3>	<elision3>
4980	4981	<>	<elision3>
4980	4969	<elision2>	<elision2>
4980	4981	<>	<elision2>
4980	4969	<elision1>	<elision1>
4980	4981	<>	<elision1>
4980	4975	.	υ
4980	4910	s	υ
4980	4975	.	u
4980	4910	s	u
4980	4945	.	κ
4980	4984	s	κ
4980	4921	H	κ
4980	4984	s	k
4980	4921	H	k
4980	4951	s	U
4980	4921	H	K
4980	4975	.	α
4980	4910	s	α
4980	4975	.	a
4980	4910	s	a
4980	4954	s	A
4980	4984	s	λ
4980	4921	H	λ
4980	4984	s	l
4980	4921	H	l
4980	4921	H	L
4980	4903	<1m>	<>
4981	4969	.	.
4981	4969	<~>	<~>
4981	4969	<split-s>	<split-s>
4981	4969	<split-h>	<split-h>
4981	4969	<name2>	<name2>
4981	4982	<>	<name>
4981	4972	<aphaerese>	<aphaerese>
4981	4981	<>	<aphaerese>
4981	4969	<elision3>	<elision3>
4981	4981	<>	<elision3>
4981	4969	<elision2>	<elision2>
4981	4981	<>	<elision2>
4981	4969	<elision1>	<elision1>
4981	4981	<>	<elision1>
4981	4975	.	υ
4981	4910	s	υ
4981	4975	.	u
4981	4910	s	u
4981	4945	.	κ
4981	4984	s	κ
4981	4921	H	κ
4981	4984	s	k
4981	4921	H	k
4981	4951	s	U
4981	4921	H	K
4981	4975	.	α
4981	4910	s	α
4981	4975	.	a
4981	4910	s	a
4981	4954	s	A
4981	4984	s	λ
4981	4921	H	λ
4981	4984	s	l
4981	4921	H	l
4981	4921	H	L
4981	4904	<1m>	<>
4982	4971	.	.
4982	4971	<~>	<~>
4982	4971	<split-s>	<split-s>
4982	4971	<split-h>	<split-h>
4982	4971	<name2>	<name2>
4982	4974	<aphaerese>	<aphaerese>
4982	4980	<>	<aphaerese>
4982	4971	<elision3>	<elision3>
4982	4980	<>	<elision3>
4982	4971	<elision2>	<elision2>
4982	4980	<>	<elision2>
4982	4971	<elision1>	<elision1>
4982	4980	<>	<elision1>
4982	4977	.	υ
4982	4909	s	υ
4982	4977	.	u
4982	4909	s	u
4982	4947	.	κ
4982	4983	s	κ
4982	4920	H	κ
4982	4983	s	k
4982	4920	H	k
4982	4953	s	U
4982	4920	H	K
4982	4977	.	α
4982	4909	s	α
4982	4977	.	a
4982	4909	s	a
4982	4956	s	A
4982	4983	s	λ
4982	4920	H	λ
4982	4983	s	l
4982	4920	H	l
4982	4920	H	L
4982	4902	<1m>	<>
4983	4984	<>	<aphaerese>
4983	4984	<>	<elision3>
4983	4984	<>	<elision2>
4983	4984	<>	<elision1>
4983	4903	<w>	<>
4984	4985	<>	<name>
4984	4984	<>	<aphaerese>
4984	4984	<>	<elision3>
4984	4984	<>	<elision2>
4984	4984	<>	<elision1>
4984	4904	<w>	<>
4985	4983	<>	<aphaerese>
4985	4983	<>	<elision3>
4985	4983	<>	<elision2>
4985	4983	<>	<elision1>
4985	4902	<w>	<>
4986	4987	<>	<aphaerese>
4986	4987	<>	<elision3>
4986	4987	<>	<elision2>
4986	4987	<>	<elision1>
4986	4975	.	κ
4986	4975	.	λ
4987	4988	<>	<name>
4987	4987	<>	<aphaerese>
4987	4987	<>	<elision3>
4987	4987	<>	<elision2>
4987	4987	<>	<elision1>
4987	4975	.	κ
4987	4975	.	λ
4988	4986	<>	<aphaerese>
4988	4986	<>	<elision3>
4988	4986	<>	<elision2>
4988	4986	<>	<elision1>
4988	4977	.	κ
4988	4977	.	λ
4989	4990	<>	<name>
4989	4989	<>	<aphaerese>
4989	4989	<>	<elision3>
4989	4989	<>	<elision2>
4989	4989	<>	<elision1>
4989	4993	<k2K>	<>
4989	4996	<k2L>	<>
4989	4987	<l2L>	<>
4990	4991	<>	<aphaerese>
4990	4991	<>	<elision3>
4990	4991	<>	<elision2>
4990	4991	<>	<elision1>
4990	4994	<k2K>	<>
4990	4997	<k2L>	<>
4990	4988	<l2L>	<>
4991	4989	<>	<aphaerese>
4991	4989	<>	<elision3>
4991	4989	<>	<elision2>
4991	4989	<>	<elision1>
4991	4992	<k2K>	<>
4991	4995	<k2L>	<>
4991	4986	<l2L>	<>
4992	4939	.	.
4992	4939	<~>	<~>
4992	4939	<split-s>	<split-s>
4992	4939	<split-h>	<split-h>
4992	4939	<name2>	<name2>
4992	4942	<aphaerese>	<aphaerese>
4992	4993	<>	<aphaerese>
4992	4939	<elision3>	<elision3>
4992	4993	<>	<elision3>
4992	4939	<elision2>	<elision2>
4992	4993	<>	<elision2>
4992	4939	<elision1>	<elision1>
4992	4993	<>	<elision1>
4992	4957	.	υ
4992	4910	s	υ
4992	4957	.	u
4992	4910	s	u
4992	4897	s	κ
4992	4897	s	k
4992	4951	s	U
4992	4906	s	K
4992	4957	.	α
4992	4910	s	α
4992	4957	.	a
4992	4910	s	a
4992	4954	s	A
4992	4897	s	λ
4992	4897	s	l
4992	4912	s	L
4992	4903	<1m>	<>
4993	4939	.	.
4993	4939	<~>	<~>
4993	4939	<split-s>	<split-s>
4993	4939	<split-h>	<split-h>
4993	4939	<name2>	<name2>
4993	4994	<>	<name>
4993	4942	<aphaerese>	<aphaerese>
4993	4993	<>	<aphaerese>
4993	4939	<elision3>	<elision3>
4993	4993	<>	<elision3>
4993	4939	<elision2>	<elision2>
4993	4993	<>	<elision2>
4993	4939	<elision1>	<elision1>
4993	4993	<>	<elision1>
4993	4957	.	υ
4993	4910	s	υ
4993	4957	.	u
4993	4910	s	u
4993	4897	s	κ
4993	4897	s	k
4993	4951	s	U
4993	4906	s	K
4993	4957	.	α
4993	4910	s	α
4993	4957	.	a
4993	4910	s	a
4993	4954	s	A
4993	4897	s	λ
4993	4897	s	l
4993	4912	s	L
4993	4904	<1m>	<>
4994	4941	.	.
4994	4941	<~>	<~>
4994	4941	<split-s>	<split-s>
4994	4941	<split-h>	<split-h>
4994	4941	<name2>	<name2>
4994	4944	<aphaerese>	<aphaerese>
4994	4992	<>	<aphaerese>
4994	4941	<elision3>	<elision3>
4994	4992	<>	<elision3>
4994	4941	<elision2>	<elision2>
4994	4992	<>	<elision2>
4994	4941	<elision1>	<elision1>
4994	4992	<>	<elision1>
4994	4959	.	υ
4994	4909	s	υ
4994	4959	.	u
4994	4909	s	u
4994	4896	s	κ
4994	4896	s	k
4994	4953	s	U
4994	4905	s	K
4994	4959	.	α
4994	4909	s	α
4994	4959	.	a
4994	4909	s	a
4994	4956	s	A
4994	4896	s	λ
4994	4896	s	l
4994	4911	s	L
4994	4902	<1m>	<>
4995	4969	.	.
4995	4969	<~>	<~>
4995	4969	<split-s>	<split-s>
4995	4969	<split-h>	<split-h>
4995	4969	<name2>	<name2>
4995	4972	<aphaerese>	<aphaerese>
4995	4996	<>	<aphaerese>
4995	4969	<elision3>	<elision3>
4995	4996	<>	<elision3>
4995	4969	<elision2>	<elision2>
4995	4996	<>	<elision2>
4995	4969	<elision1>	<elision1>
4995	4996	<>	<elision1>
4995	4975	.	υ
4995	4910	s	υ
4995	4975	.	u
4995	4910	s	u
4995	4918	s	κ
4995	4921	H	κ
4995	4918	s	k
4995	4921	H	k
4995	4951	s	U
4995	4906	s	K
4995	4921	H	K
4995	4975	.	α
4995	4910	s	α
4995	4975	.	a
4995	4910	s	a
4995	4954	s	A
4995	4918	s	λ
4995	4921	H	λ
4995	4918	s	l
4995	4921	H	l
4995	4912	s	L
4995	4921	H	L
4995	4903	<1m>	<>
4996	4969	.	.
4996	4969	<~>	<~>
4996	4969	<split-s>	<split-s>
4996	4969	<split-h>	<split-h>
4996	4969	<name2>	<name2>
4996	4997	<>	<name>
4996	4972	<aphaerese>	<aphaerese>
4996	4996	<>	<aphaerese>
4996	4969	<elision3>	<elision3>
4996	4996	<>	<elision3>
4996	4969	<elision2>	<elision2>
4996	4996	<>	<elision2>
4996	4969	<elision1>	<elision1>
4996	4996	<>	<elision1>
4996	4975	.	υ
4996	4910	s	υ
4996	4975	.	u
4996	4910	s	u
4996	4918	s	κ
4996	4921	H	κ
4996	4918	s	k
4996	4921	H	k
4996	4951	s	U
4996	4906	s	K
4996	4921	H	K
4996	4975	.	α
4996	4910	s	α
4996	4975	.	a
4996	4910	s	a
4996	4954	s	A
4996	4918	s	λ
4996	4921	H	λ
4996	4918	s	l
4996	4921	H	l
4996	4912	s	L
4996	4921	H	L
4996	4904	<1m>	<>
4997	4971	.	.
4997	4971	<~>	<~>
4997	4971	<split-s>	<split-s>
4997	4971	<split-h>	<split-h>
4997	4971	<name2>	<name2>
4997	4974	<aphaerese>	<aphaerese>
4997	4995	<>	<aphaerese>
4997	4971	<elision3>	<elision3>
4997	4995	<>	<elision3>
4997	4971	<elision2>	<elision2>
4997	4995	<>	<elision2>
4997	4971	<elision1>	<elision1>
4997	4995	<>	<elision1>
4997	4977	.	υ
4997	4909	s	υ
4997	4977	.	u
4997	4909	s	u
4997	4917	s	κ
4997	4920	H	κ
4997	4917	s	k
4997	4920	H	k
4997	4953	s	U
4997	4905	s	K
4997	4920	H	K
4997	4977	.	α
4997	4909	s	α
4997	4977	.	a
4997	4909	s	a
4997	4956	s	A
4997	4917	s	λ
4997	4920	H	λ
4997	4917	s	l
4997	4920	H	l
4997	4911	s	L
4997	4920	H	L
4997	4902	<1m>	<>
4998	4939	.	.
4998	4939	<~>	<~>
4998	4939	<split-s>	<split-s>
4998	4939	<split-h>	<split-h>
4998	4939	<name2>	<name2>
4998	4999	<>	<name>
4998	4942	<aphaerese>	<aphaerese>
4998	4998	<>	<aphaerese>
4998	4939	<elision3>	<elision3>
4998	4998	<>	<elision3>
4998	4939	<elision2>	<elision2>
4998	4998	<>	<elision2>
4998	4939	<elision1>	<elision1>
4998	4998	<>	<elision1>
4998	4957	.	υ
4998	4910	s	υ
4998	4957	.	u
4998	4910	s	u
4998	4945	.	κ
4998	4897	s	κ
4998	4897	s	k
4998	4951	s	U
4998	4906	s	K
4998	4957	.	α
4998	4910	s	α
4998	4957	.	a
4998	4910	s	a
4998	4954	s	A
4998	4897	s	λ
4998	4897	s	l
4998	4912	s	L
4998	4904	<1m>	<>
4998	4969	<U2L>	<>
4999	4941	.	.
4999	4941	<~>	<~>
4999	4941	<split-s>	<split-s>
4999	4941	<split-h>	<split-h>
4999	4941	<name2>	<name2>
4999	4944	<aphaerese>	<aphaerese>
4999	5000	<>	<aphaerese>
4999	4941	<elision3>	<elision3>
4999	5000	<>	<elision3>
4999	4941	<elision2>	<elision2>
4999	5000	<>	<elision2>
4999	4941	<elision1>	<elision1>
4999	5000	<>	<elision1>
4999	4959	.	υ
4999	4909	s	υ
4999	4959	.	u
4999	4909	s	u
4999	4947	.	κ
4999	4896	s	κ
4999	4896	s	k
4999	4953	s	U
4999	4905	s	K
4999	4959	.	α
4999	4909	s	α
4999	4959	.	a
4999	4909	s	a
4999	4956	s	A
4999	4896	s	λ
4999	4896	s	l
4999	4911	s	L
4999	4902	<1m>	<>
4999	4970	<U2L>	<>
5000	4939	.	.
5000	4939	<~>	<~>
5000	4939	<split-s>	<split-s>
5000	4939	<split-h>	<split-h>
5000	4939	<name2>	<name2>
5000	4942	<aphaerese>	<aphaerese>
5000	4998	<>	<aphaerese>
5000	4939	<elision3>	<elision3>
5000	4998	<>	<elision3>
5000	4939	<elision2>	<elision2>
5000	4998	<>	<elision2>
5000	4939	<elision1>	<elision1>
5000	4998	<>	<elision1>
5000	4957	.	υ
5000	4910	s	υ
5000	4957	.	u
5000	4910	s	u
5000	4945	.	κ
5000	4897	s	κ
5000	4897	s	k
5000	4951	s	U
5000	4906	s	K
5000	4957	.	α
5000	4910	s	α
5000	4957	.	a
5000	4910	s	a
5000	4954	s	A
5000	4897	s	λ
5000	4897	s	l
5000	4912	s	L
5000	4903	<1m>	<>
5000	4971	<U2L>	<>
5001	4939	.	.
5001	4939	<~>	<~>
5001	4939	<split-s>	<split-s>
5001	4939	<split-h>	<split-h>
5001	4939	<name2>	<name2>
5001	5002	<name2>	<name>
5001	5003	<>	<name>
5001	4942	<aphaerese>	<aphaerese>
5001	5005	<>	<aphaerese>
5001	4939	<elision3>	<elision3>
5001	5005	<>	<elision3>
5001	4939	<elision2>	<elision2>
5001	5005	<>	<elision2>
5001	4939	<elision1>	<elision1>
5001	5005	<>	<elision1>
5001	4957	.	υ
5001	4910	s	υ
5001	4957	.	u
5001	4910	s	u
5001	4975	.	κ
5001	4897	s	κ
5001	4897	s	k
5001	4951	s	U
5001	4906	s	K
5001	4957	.	α
5001	4910	s	α
5001	4957	.	a
5001	4910	s	a
5001	4954	s	A
5001	4975	.	λ
5001	4897	s	λ
5001	4897	s	l
5001	4912	s	L
5001	4904	<1m>	<>
5001	5006	<k2K>	<>
5001	5007	<k2L>	<>
5001	5009	<K2L>	<>
5002	4905	s	k
5002	4911	s	l
5003	4941	.	.
5003	4941	<~>	<~>
5003	4941	<split-s>	<split-s>
5003	4941	<split-h>	<split-h>
5003	4941	<name2>	<name2>
5003	4944	<aphaerese>	<aphaerese>
5003	5004	<>	<aphaerese>
5003	4941	<elision3>	<elision3>
5003	5004	<>	<elision3>
5003	4941	<elision2>	<elision2>
5003	5004	<>	<elision2>
5003	4941	<elision1>	<elision1>
5003	5004	<>	<elision1>
5003	4959	.	υ
5003	4909	s	υ
5003	4959	.	u
5003	4909	s	u
5003	4977	.	κ
5003	4896	s	κ
5003	4896	s	k
5003	4953	s	U
5003	4905	s	K
5003	4959	.	α
5003	4909	s	α
5003	4959	.	a
5003	4909	s	a
5003	4956	s	A
5003	4977	.	λ
5003	4896	s	λ
5003	4896	s	l
5003	4911	s	L
5003	4902	<1m>	<>
5003	4997	<K2L>	<>
5004	4939	.	.
5004	4939	<~>	<~>
5004	4939	<split-s>	<split-s>
5004	4939	<split-h>	<split-h>
5004	4939	<name2>	<name2>
5004	4942	<aphaerese>	<aphaerese>
5004	5005	<>	<aphaerese>
5004	4939	<elision3>	<elision3>
5004	5005	<>	<elision3>
5004	4939	<elision2>	<elision2>
5004	5005	<>	<elision2>
5004	4939	<elision1>	<elision1>
5004	5005	<>	<elision1>
5004	4957	.	υ
5004	4910	s	υ
5004	4957	.	u
5004	4910	s	u
5004	4975	.	κ
5004	4897	s	κ
5004	4897	s	k
5004	4951	s	U
5004	4906	s	K
5004	4957	.	α
5004	4910	s	α
5004	4957	.	a
5004	4910	s	a
5004	4954	s	A
5004	4975	.	λ
5004	4897	s	λ
5004	4897	s	l
5004	4912	s	L
5004	4903	<1m>	<>
5004	4995	<K2L>	<>
5005	4939	.	.
5005	4939	<~>	<~>
5005	4939	<split-s>	<split-s>
5005	4939	<split-h>	<split-h>
5005	4939	<name2>	<name2>
5005	5003	<>	<name>
5005	4942	<aphaerese>	<aphaerese>
5005	5005	<>	<aphaerese>
5005	4939	<elision3>	<elision3>
5005	5005	<>	<elision3>
5005	4939	<elision2>	<elision2>
5005	5005	<>	<elision2>
5005	4939	<elision1>	<elision1>
5005	5005	<>	<elision1>
5005	4957	.	υ
5005	4910	s	υ
5005	4957	.	u
5005	4910	s	u
5005	4975	.	κ
5005	4897	s	κ
5005	4897	s	k
5005	4951	s	U
5005	4906	s	K
5005	4957	.	α
5005	4910	s	α
5005	4957	.	a
5005	4910	s	a
5005	4954	s	A
5005	4975	.	λ
5005	4897	s	λ
5005	4897	s	l
5005	4912	s	L
5005	4904	<1m>	<>
5005	4996	<K2L>	<>
5006	5002	<name>	<name>
5007	5008	<name>	<name>
5008	4905	s	k
5008	4920	H	k
5008	4911	s	l
5008	4920	H	l
5009	4969	.	.
5009	4969	<~>	<~>
5009	4969	<split-s>	<split-s>
5009	4969	<split-h>	<split-h>
5009	4969	<name2>	<name2>
5009	5008	<name2>	<name>
5009	4997	<>	<name>
5009	4972	<aphaerese>	<aphaerese>
5009	4996	<>	<aphaerese>
5009	4969	<elision3>	<elision3>
5009	4996	<>	<elision3>
5009	4969	<elision2>	<elision2>
5009	4996	<>	<elision2>
5009	4969	<elision1>	<elision1>
5009	4996	<>	<elision1>
5009	4975	.	υ
5009	4910	s	υ
5009	4975	.	u
5009	4910	s	u
5009	4918	s	κ
5009	4921	H	κ
5009	4918	s	k
5009	4921	H	k
5009	4951	s	U
5009	4906	s	K
5009	4921	H	K
5009	4975	.	α
5009	4910	s	α
5009	4975	.	a
5009	4910	s	a
5009	4954	s	A
5009	4918	s	λ
5009	4921	H	λ
5009	4918	s	l
5009	4921	H	l
5009	4912	s	L
5009	4921	H	L
5009	4904	<1m>	<>
5010	5011	<>	<name>
5010	5010	<>	<aphaerese>
5010	5010	<>	<elision3>
5010	5010	<>	<elision2>
5010	5010	<>	<elision1>
5010	5014	<lambda2L>	<>
5011	5012	<>	<aphaerese>
5011	5012	<>	<elision3>
5011	5012	<>	<elision2>
5011	5012	<>	<elision1>
5011	5015	<lambda2L>	<>
5012	5010	<>	<aphaerese>
5012	5010	<>	<elision3>
5012	5010	<>	<elision2>
5012	5010	<>	<elision1>
5012	5013	<lambda2L>	<>
5013	4969	.	.
5013	4969	<~>	<~>
5013	4969	<split-s>	<split-s>
5013	4969	<split-h>	<split-h>
5013	4969	<name2>	<name2>
5013	4972	<aphaerese>	<aphaerese>
5013	5014	<>	<aphaerese>
5013	4969	<elision3>	<elision3>
5013	5014	<>	<elision3>
5013	4969	<elision2>	<elision2>
5013	5014	<>	<elision2>
5013	4969	<elision1>	<elision1>
5013	5014	<>	<elision1>
5013	4975	.	υ
5013	4910	s	υ
5013	4975	.	u
5013	4910	s	u
5013	4975	.	κ
5013	4918	s	κ
5013	4921	H	κ
5013	4918	s	k
5013	4921	H	k
5013	4951	s	U
5013	4906	s	K
5013	4921	H	K
5013	4975	.	α
5013	4910	s	α
5013	4975	.	a
5013	4910	s	a
5013	4954	s	A
5013	4975	.	λ
5013	4918	s	λ
5013	4921	H	λ
5013	4918	s	l
5013	4921	H	l
5013	4912	s	L
5013	4921	H	L
5013	4903	<1m>	<>
5014	4969	.	.
5014	4969	<~>	<~>
5014	4969	<split-s>	<split-s>
5014	4969	<split-h>	<split-h>
5014	4969	<name2>	<name2>
5014	5015	<>	<name>
5014	4972	<aphaerese>	<aphaerese>
5014	5014	<>	<aphaerese>
5014	4969	<elision3>	<elision3>
5014	5014	<>	<elision3>
5014	4969	<elision2>	<elision2>
5014	5014	<>	<elision2>
5014	4969	<elision1>	<elision1>
5014	5014	<>	<elision1>
5014	4975	.	υ
5014	4910	s	υ
5014	4975	.	u
5014	4910	s	u
5014	4975	.	κ
5014	4918	s	κ
5014	4921	H	κ
5014	4918	s	k
5014	4921	H	k
5014	4951	s	U
5014	4906	s	K
5014	4921	H	K
5014	4975	.	α
5014	4910	s	α
5014	4975	.	a
5014	4910	s	a
5014	4954	s	A
5014	4975	.	λ
5014	4918	s	λ
5014	4921	H	λ
5014	4918	s	l
5014	4921	H	l
5014	4912	s	L
5014	4921	H	L
5014	4904	<1m>	<>
5015	4971	.	.
5015	4971	<~>	<~>
5015	4971	<split-s>	<split-s>
5015	4971	<split-h>	<split-h>
5015	4971	<name2>	<name2>
5015	4974	<aphaerese>	<aphaerese>
5015	5013	<>	<aphaerese>
5015	4971	<elision3>	<elision3>
5015	5013	<>	<elision3>
5015	4971	<elision2>	<elision2>
5015	5013	<>	<elision2>
5015	4971	<elision1>	<elision1>
5015	5013	<>	<elision1>
5015	4977	.	υ
5015	4909	s	υ
5015	4977	.	u
5015	4909	s	u
5015	4977	.	κ
5015	4917	s	κ
5015	4920	H	κ
5015	4917	s	k
5015	4920	H	k
5015	4953	s	U
5015	4905	s	K
5015	4920	H	K
5015	4977	.	α
5015	4909	s	α
5015	4977	.	a
5015	4909	s	a
5015	4956	s	A
5015	4977	.	λ
5015	4917	s	λ
5015	4920	H	λ
5015	4917	s	l
5015	4920	H	l
5015	4911	s	L
5015	4920	H	L
5015	4902	<1m>	<>
5016	5017	<>	<name>
5016	5016	<>	<aphaerese>
5016	5016	<>	<elision3>
5016	5016	<>	<elision2>
5016	5016	<>	<elision1>
5016	5014	<l2L>	<>
5017	5018	<>	<aphaerese>
5017	5018	<>	<elision3>
5017	5018	<>	<elision2>
5017	5018	<>	<elision1>
5017	5015	<l2L>	<>
5018	5016	<>	<aphaerese>
5018	5016	<>	<elision3>
5018	5016	<>	<elision2>
5018	5016	<>	<elision1>
5018	5013	<l2L>	<>
5019	4969	.	.
5019	4969	<~>	<~>
5019	4969	<split-s>	<split-s>
5019	4969	<split-h>	<split-h>
5019	4969	<name2>	<name2>
5019	5008	<name2>	<name>
5019	5015	<>	<name>
5019	4972	<aphaerese>	<aphaerese>
5019	5014	<>	<aphaerese>
5019	4969	<elision3>	<elision3>
5019	5014	<>	<elision3>
5019	4969	<elision2>	<elision2>
5019	5014	<>	<elision2>
5019	4969	<elision1>	<elision1>
5019	5014	<>	<elision1>
5019	4975	.	υ
5019	4910	s	υ
5019	4975	.	u
5019	4910	s	u
5019	4975	.	κ
5019	4918	s	κ
5019	4921	H	κ
5019	4918	s	k
5019	4921	H	k
5019	4951	s	U
5019	4906	s	K
5019	4921	H	K
5019	4975	.	α
5019	4910	s	α
5019	4975	.	a
5019	4910	s	a
5019	4954	s	A
5019	4975	.	λ
5019	4918	s	λ
5019	4921	H	λ
5019	4918	s	l
5019	4921	H	l
5019	4912	s	L
5019	4921	H	L
5019	4904	<1m>	<>
5019	5007	<l2L>	<>
5020	5021	<>	<name>
5020	5020	<>	<aphaerese>
5020	5020	<>	<elision3>
5020	5020	<>	<elision2>
5020	5020	<>	<elision1>
5020	5024	<ypsilon2K>	<>
5020	5027	<ypsilon2L>	<>
5021	5022	<>	<aphaerese>
5021	5022	<>	<elision3>
5021	5022	<>	<elision2>
5021	5022	<>	<elision1>
5021	5025	<ypsilon2K>	<>
5021	5028	<ypsilon2L>	<>
5022	5020	<>	<aphaerese>
5022	5020	<>	<elision3>
5022	5020	<>	<elision2>
5022	5020	<>	<elision1>
5022	5023	<ypsilon2K>	<>
5022	5026	<ypsilon2L>	<>
5023	4939	.	.
5023	4939	<~>	<~>
5023	4939	<split-s>	<split-s>
5023	4939	<split-h>	<split-h>
5023	4939	<name2>	<name2>
5023	4942	<aphaerese>	<aphaerese>
5023	5024	<>	<aphaerese>
5023	5024	<>	<elision3>
5023	5024	<>	<elision2>
5023	5024	<>	<elision1>
5023	4957	.	υ
5023	4910	s	υ
5023	4957	.	u
5023	4910	s	u
5023	4945	.	κ
5023	4897	s	κ
5023	4897	s	k
5023	4951	s	U
5023	4906	s	K
5023	4957	.	α
5023	4910	s	α
5023	4957	.	a
5023	4910	s	a
5023	4954	s	A
5023	4897	s	λ
5023	4897	s	l
5023	4912	s	L
5023	4903	<1m>	<>
5024	4939	.	.
5024	4939	<~>	<~>
5024	4939	<split-s>	<split-s>
5024	4939	<split-h>	<split-h>
5024	4939	<name2>	<name2>
5024	5025	<>	<name>
5024	4942	<aphaerese>	<aphaerese>
5024	5024	<>	<aphaerese>
5024	5024	<>	<elision3>
5024	5024	<>	<elision2>
5024	5024	<>	<elision1>
5024	4957	.	υ
5024	4910	s	υ
5024	4957	.	u
5024	4910	s	u
5024	4945	.	κ
5024	4897	s	κ
5024	4897	s	k
5024	4951	s	U
5024	4906	s	K
5024	4957	.	α
5024	4910	s	α
5024	4957	.	a
5024	4910	s	a
5024	4954	s	A
5024	4897	s	λ
5024	4897	s	l
5024	4912	s	L
5024	4904	<1m>	<>
5025	4941	.	.
5025	4941	<~>	<~>
5025	4941	<split-s>	<split-s>
5025	4941	<split-h>	<split-h>
5025	4941	<name2>	<name2>
5025	4944	<aphaerese>	<aphaerese>
5025	5023	<>	<aphaerese>
5025	5023	<>	<elision3>
5025	5023	<>	<elision2>
5025	5023	<>	<elision1>
5025	4959	.	υ
5025	4909	s	υ
5025	4959	.	u
5025	4909	s	u
5025	4947	.	κ
5025	4896	s	κ
5025	4896	s	k
5025	4953	s	U
5025	4905	s	K
5025	4959	.	α
5025	4909	s	α
5025	4959	.	a
5025	4909	s	a
5025	4956	s	A
5025	4896	s	λ
5025	4896	s	l
5025	4911	s	L
5025	4902	<1m>	<>
5026	4969	.	.
5026	4969	<~>	<~>
5026	4969	<split-s>	<split-s>
5026	4969	<split-h>	<split-h>
5026	4969	<name2>	<name2>
5026	4972	<aphaerese>	<aphaerese>
5026	5027	<>	<aphaerese>
5026	5027	<>	<elision3>
5026	5027	<>	<elision2>
5026	5027	<>	<elision1>
5026	4975	.	υ
5026	4910	s	υ
5026	4975	.	u
5026	4910	s	u
5026	4945	.	κ
5026	4918	s	κ
5026	4921	H	κ
5026	4918	s	k
5026	4921	H	k
5026	4951	s	U
5026	4906	s	K
5026	4921	H	K
5026	4975	.	α
5026	4910	s	α
5026	4975	.	a
5026	4910	s	a
5026	4954	s	A
5026	4918	s	λ
5026	4921	H	λ
5026	4918	s	l
5026	4921	H	l
5026	4912	s	L
5026	4921	H	L
5026	4903	<1m>	<>
5027	4969	.	.
5027	4969	<~>	<~>
5027	4969	<split-s>	<split-s>
5027	4969	<split-h>	<split-h>
5027	4969	<name2>	<name2>
5027	5028	<>	<name>
5027	4972	<aphaerese>	<aphaerese>
5027	5027	<>	<aphaerese>
5027	5027	<>	<elision3>
5027	5027	<>	<elision2>
5027	5027	<>	<elision1>
5027	4975	.	υ
5027	4910	s	υ
5027	4975	.	u
5027	4910	s	u
5027	4945	.	κ
5027	4918	s	κ
5027	4921	H	κ
5027	4918	s	k
5027	4921	H	k
5027	4951	s	U
5027	4906	s	K
5027	4921	H	K
5027	4975	.	α
5027	4910	s	α
5027	4975	.	a
5027	4910	s	a
5027	4954	s	A
5027	4918	s	λ
5027	4921	H	λ
5027	4918	s	l
5027	4921	H	l
5027	4912	s	L
5027	4921	H	L
5027	4904	<1m>	<>
5028	4971	.	.
5028	4971	<~>	<~>
5028	4971	<split-s>	<split-s>
5028	4971	<split-h>	<split-h>
5028	4971	<name2>	<name2>
5028	4974	<aphaerese>	<aphaerese>
5028	5026	<>	<aphaerese>
5028	5026	<>	<elision3>
5028	5026	<>	<elision2>
5028	5026	<>	<elision1>
5028	4977	.	υ
5028	4909	s	υ
5028	4977	.	u
5028	4909	s	u
5028	4947	.	κ
5028	4917	s	κ
5028	4920	H	κ
5028	4917	s	k
5028	4920	H	k
5028	4953	s	U
5028	4905	s	K
5028	4920	H	K
5028	4977	.	α
5028	4909	s	α
5028	4977	.	a
5028	4909	s	a
5028	4956	s	A
5028	4917	s	λ
5028	4920	H	λ
5028	4917	s	l
5028	4920	H	l
5028	4911	s	L
5028	4920	H	L
5028	4902	<1m>	<>
5029	5030	<>	<name>
5029	5029	<>	<aphaerese>
5029	5029	<>	<elision3>
5029	5029	<>	<elision2>
5029	5029	<>	<elision1>
5029	5024	<u2K>	<>
5029	5027	<u2L>	<>
5030	5031	<>	<aphaerese>
5030	5031	<>	<elision3>
5030	5031	<>	<elision2>
5030	5031	<>	<elision1>
5030	5025	<u2K>	<>
5030	5028	<u2L>	<>
5031	5029	<>	<aphaerese>
5031	5029	<>	<elision3>
5031	5029	<>	<elision2>
5031	5029	<>	<elision1>
5031	5023	<u2K>	<>
5031	5026	<u2L>	<>
5032	5033	<>	<name>
5032	5032	<>	<aphaerese>
5032	5032	<>	<elision3>
5032	5032	<>	<elision2>
5032	5032	<>	<elision1>
5032	5027	<alpha2L>	<>
5033	5034	<>	<aphaerese>
5033	5034	<>	<elision3>
5033	5034	<>	<elision2>
5033	5034	<>	<elision1>
5033	5028	<alpha2L>	<>
5034	5032	<>	<aphaerese>
5034	5032	<>	<elision3>
5034	5032	<>	<elision2>
5034	5032	<>	<elision1>
5034	5026	<alpha2L>	<>
5035	5036	<>	<name>
5035	5035	<>	<aphaerese>
5035	5035	<>	<elision3>
5035	5035	<>	<elision2>
5035	5035	<>	<elision1>
5035	5027	<a2L>	<>
5036	5037	<>	<aphaerese>
5036	5037	<>	<elision3>
5036	5037	<>	<elision2>
5036	5037	<>	<elision1>
5036	5028	<a2L>	<>
5037	5035	<>	<aphaerese>
5037	5035	<>	<elision3>
5037	5035	<>	<elision2>
5037	5035	<>	<elision1>
5037	5026	<a2L>	<>
5038	5039	.	.
5038	5040	 	 
5038	5039	<~>	<~>
5038	5039	<split-s>	<split-s>
5038	5039	<split-h>	<split-h>
5038	5039	<name2>	<name2>
5038	5615	<>	<name>
5038	5043	<aphaerese>	<aphaerese>
5038	5038	<>	<aphaerese>
5038	5038	<>	<elision3>
5038	5038	<>	<elision2>
5038	5038	<>	<elision1>
5038	5047	.	υ
5038	5053	s	υ
5038	5047	.	u
5038	5053	s	u
5038	5232	.	κ
5038	5303	s	κ
5038	5415	s	k
5038	5424	s	U
5038	5590	s	K
5038	5047	.	α
5038	5053	s	α
5038	5047	.	a
5038	5053	s	a
5038	5545	s	A
5038	5415	s	λ
5038	5415	s	l
5038	5603	s	L
5038	5618	<split-h>	<>
5039	5039	.	.
5039	5040	 	 
5039	5039	<~>	<~>
5039	5039	<split-s>	<split-s>
5039	5039	<split-h>	<split-h>
5039	5039	<name2>	<name2>
5039	5614	<>	<name>
5039	5043	<aphaerese>	<aphaerese>
5039	5039	<>	<aphaerese>
5039	5039	<elision3>	<elision3>
5039	5039	<>	<elision3>
5039	5039	<elision2>	<elision2>
5039	5039	<>	<elision2>
5039	5039	<elision1>	<elision1>
5039	5039	<>	<elision1>
5039	5047	.	υ
5039	5053	s	υ
5039	5047	.	u
5039	5053	s	u
5039	5232	.	κ
5039	5303	s	κ
5039	5415	s	k
5039	5424	s	U
5039	5590	s	K
5039	5047	.	α
5039	5053	s	α
5039	5047	.	a
5039	5053	s	a
5039	5545	s	A
5039	5415	s	λ
5039	5415	s	l
5039	5603	s	L
5039	5564	<split-h>	<>
5040	5039	.	.
5040	5040	 	 
5040	5039	<~>	<~>
5040	5039	<split-s>	<split-s>
5040	5039	<split-h>	<split-h>
5040	5039	<name2>	<name2>
5040	5041	<>	<name>
5040	5043	<aphaerese>	<aphaerese>
5040	5046	<>	<aphaerese>
5040	5039	<elision3>	<elision3>
5040	5046	<>	<elision3>
5040	5039	<elision2>	<elision2>
5040	5046	<>	<elision2>
5040	5039	<elision1>	<elision1>
5040	5046	<>	<elision1>
5040	5047	.	υ
5040	5567	s	υ
5040	5047	.	u
5040	5567	s	u
5040	5232	.	κ
5040	5570	s	κ
5040	5573	s	k
5040	5576	s	U
5040	5580	s	K
5040	5047	.	α
5040	5567	s	α
5040	5047	.	a
5040	5567	s	a
5040	5584	s	A
5040	5573	s	λ
5040	5573	s	l
5040	5585	s	L
5040	5564	<split-h>	<>
5041	5042	.	.
5041	5045	 	 
5041	5042	<~>	<~>
5041	5042	<split-s>	<split-s>
5041	5042	<split-h>	<split-h>
5041	5042	<name2>	<name2>
5041	5589	<aphaerese>	<aphaerese>
5041	5613	<>	<aphaerese>
5041	5042	<elision3>	<elision3>
5041	5613	<>	<elision3>
5041	5042	<elision2>	<elision2>
5041	5613	<>	<elision2>
5041	5042	<elision1>	<elision1>
5041	5613	<>	<elision1>
5041	5049	.	υ
5041	5225	s	υ
5041	5049	.	u
5041	5225	s	u
5041	5234	.	κ
5041	5305	s	κ
5041	5417	s	k
5041	5426	s	U
5041	5432	s	K
5041	5049	.	α
5041	5225	s	α
5041	5049	.	a
5041	5225	s	a
5041	5547	s	A
5041	5417	s	λ
5041	5417	s	l
5041	5550	s	L
5041	5565	<split-h>	<>
5042	5039	.	.
5042	5040	 	 
5042	5039	<~>	<~>
5042	5039	<split-s>	<split-s>
5042	5039	<split-h>	<split-h>
5042	5039	<name2>	<name2>
5042	5043	<aphaerese>	<aphaerese>
5042	5039	<>	<aphaerese>
5042	5039	<elision3>	<elision3>
5042	5039	<>	<elision3>
5042	5039	<elision2>	<elision2>
5042	5039	<>	<elision2>
5042	5039	<elision1>	<elision1>
5042	5039	<>	<elision1>
5042	5047	.	υ
5042	5053	s	υ
5042	5047	.	u
5042	5053	s	u
5042	5232	.	κ
5042	5303	s	κ
5042	5415	s	k
5042	5424	s	U
5042	5590	s	K
5042	5047	.	α
5042	5053	s	α
5042	5047	.	a
5042	5053	s	a
5042	5545	s	A
5042	5415	s	λ
5042	5415	s	l
5042	5603	s	L
5042	5566	<split-h>	<>
5043	5039	.	.
5043	5040	 	 
5043	5039	<~>	<~>
5043	5039	<split-s>	<split-s>
5043	5039	<split-h>	<split-h>
5043	5039	<name2>	<name2>
5043	5044	<>	<name>
5043	5043	<aphaerese>	<aphaerese>
5043	5043	<>	<aphaerese>
5043	5039	<elision3>	<elision3>
5043	5043	<>	<elision3>
5043	5039	<elision2>	<elision2>
5043	5043	<>	<elision2>
5043	5039	<elision1>	<elision1>
5043	5043	<>	<elision1>
5043	5039	.	υ
5043	5039	.	u
5043	5232	.	κ
5043	5303	s	κ
5043	5415	s	k
5043	5424	s	U
5043	5590	s	K
5043	5039	.	α
5043	5039	.	a
5043	5545	s	A
5043	5415	s	λ
5043	5415	s	l
5043	5603	s	L
5043	5611	<split-h>	<>
5044	5042	.	.
5044	5045	 	 
5044	5042	<~>	<~>
5044	5042	<split-s>	<split-s>
5044	5042	<split-h>	<split-h>
5044	5042	<name2>	<name2>
5044	5589	<aphaerese>	<aphaerese>
5044	5589	<>	<aphaerese>
5044	5042	<elision3>	<elision3>
5044	5589	<>	<elision3>
5044	5042	<elision2>	<elision2>
5044	5589	<>	<elision2>
5044	5042	<elision1>	<elision1>
5044	5589	<>	<elision1>
5044	5042	.	υ
5044	5042	.	u
5044	5234	.	κ
5044	5305	s	κ
5044	5417	s	k
5044	5426	s	U
5044	5592	s	K
5044	5042	.	α
5044	5042	.	a
5044	5547	s	A
5044	5417	s	λ
5044	5417	s	l
5044	5605	s	L
5044	5612	<split-h>	<>
5045	5039	.	.
5045	5040	 	 
5045	5039	<~>	<~>
5045	5039	<split-s>	<split-s>
5045	5039	<split-h>	<split-h>
5045	5039	<name2>	<name2>
5045	5043	<aphaerese>	<aphaerese>
5045	5046	<>	<aphaerese>
5045	5039	<elision3>	<elision3>
5045	5046	<>	<elision3>
5045	5039	<elision2>	<elision2>
5045	5046	<>	<elision2>
5045	5039	<elision1>	<elision1>
5045	5046	<>	<elision1>
5045	5047	.	υ
5045	5567	s	υ
5045	5047	.	u
5045	5567	s	u
5045	5232	.	κ
5045	5570	s	κ
5045	5573	s	k
5045	5576	s	U
5045	5580	s	K
5045	5047	.	α
5045	5567	s	α
5045	5047	.	a
5045	5567	s	a
5045	5584	s	A
5045	5573	s	λ
5045	5573	s	l
5045	5585	s	L
5045	5566	<split-h>	<>
5046	5039	.	.
5046	5040	 	 
5046	5039	<~>	<~>
5046	5039	<split-s>	<split-s>
5046	5039	<split-h>	<split-h>
5046	5039	<name2>	<name2>
5046	5041	<>	<name>
5046	5043	<aphaerese>	<aphaerese>
5046	5046	<>	<aphaerese>
5046	5039	<elision3>	<elision3>
5046	5046	<>	<elision3>
5046	5039	<elision2>	<elision2>
5046	5046	<>	<elision2>
5046	5039	<elision1>	<elision1>
5046	5046	<>	<elision1>
5046	5047	.	υ
5046	5053	s	υ
5046	5047	.	u
5046	5053	s	u
5046	5232	.	κ
5046	5303	s	κ
5046	5415	s	k
5046	5424	s	U
5046	5427	s	K
5046	5047	.	α
5046	5053	s	α
5046	5047	.	a
5046	5053	s	a
5046	5545	s	A
5046	5415	s	λ
5046	5415	s	l
5046	5548	s	L
5046	5564	<split-h>	<>
5047	5048	<>	<name>
5047	5047	<>	<aphaerese>
5047	5039	<elision3>	<elision3>
5047	5047	<>	<elision3>
5047	5039	<elision2>	<elision2>
5047	5047	<>	<elision2>
5047	5039	<elision1>	<elision1>
5047	5047	<>	<elision1>
5047	5051	<split-h>	<>
5048	5049	<>	<aphaerese>
5048	5042	<elision3>	<elision3>
5048	5049	<>	<elision3>
5048	5042	<elision2>	<elision2>
5048	5049	<>	<elision2>
5048	5042	<elision1>	<elision1>
5048	5049	<>	<elision1>
5048	5052	<split-h>	<>
5049	5047	<>	<aphaerese>
5049	5039	<elision3>	<elision3>
5049	5047	<>	<elision3>
5049	5039	<elision2>	<elision2>
5049	5047	<>	<elision2>
5049	5039	<elision1>	<elision1>
5049	5047	<>	<elision1>
5049	5050	<split-h>	<>
5050	5051	<>	<aphaerese>
5050	5051	<>	<elision3>
5050	5051	<>	<elision2>
5050	5051	<>	<elision1>
5050	175	<3s>	<>
5051	5052	<>	<name>
5051	5051	<>	<aphaerese>
5051	5051	<>	<elision3>
5051	5051	<>	<elision2>
5051	5051	<>	<elision1>
5051	176	<3s>	<>
5052	5050	<>	<aphaerese>
5052	5050	<>	<elision3>
5052	5050	<>	<elision2>
5052	5050	<>	<elision1>
5052	177	<3s>	<>
5053	5054	.	.
5053	5054	 	 
5053	5054	<~>	<~>
5053	5054	<split-s>	<split-s>
5053	5054	<split-h>	<split-h>
5053	5054	<name2>	<name2>
5053	5224	<>	<name>
5053	5057	<aphaerese>	<aphaerese>
5053	5053	<>	<aphaerese>
5053	5053	<>	<elision3>
5053	5053	<>	<elision2>
5053	5053	<>	<elision1>
5053	5218	.	υ
5053	5218	.	u
5053	5060	.	κ
5053	5218	.	α
5053	5218	.	a
5053	5227	<4s>	<>
5054	5054	.	.
5054	5054	 	 
5054	5054	<~>	<~>
5054	5054	<split-s>	<split-s>
5054	5054	<split-h>	<split-h>
5054	5054	<name2>	<name2>
5054	5055	<>	<name>
5054	5057	<aphaerese>	<aphaerese>
5054	5054	<>	<aphaerese>
5054	5054	<elision3>	<elision3>
5054	5054	<>	<elision3>
5054	5054	<elision2>	<elision2>
5054	5054	<>	<elision2>
5054	5054	<elision1>	<elision1>
5054	5054	<>	<elision1>
5054	5218	.	υ
5054	5218	.	u
5054	5060	.	κ
5054	5218	.	α
5054	5218	.	a
5054	5222	<4s>	<>
5055	5056	.	.
5055	5056	 	 
5055	5056	<~>	<~>
5055	5056	<split-s>	<split-s>
5055	5056	<split-h>	<split-h>
5055	5056	<name2>	<name2>
5055	5059	<aphaerese>	<aphaerese>
5055	5056	<>	<aphaerese>
5055	5056	<elision3>	<elision3>
5055	5056	<>	<elision3>
5055	5056	<elision2>	<elision2>
5055	5056	<>	<elision2>
5055	5056	<elision1>	<elision1>
5055	5056	<>	<elision1>
5055	5220	.	υ
5055	5220	.	u
5055	5062	.	κ
5055	5220	.	α
5055	5220	.	a
5055	5223	<4s>	<>
5056	5054	.	.
5056	5054	 	 
5056	5054	<~>	<~>
5056	5054	<split-s>	<split-s>
5056	5054	<split-h>	<split-h>
5056	5054	<name2>	<name2>
5056	5057	<aphaerese>	<aphaerese>
5056	5054	<>	<aphaerese>
5056	5054	<elision3>	<elision3>
5056	5054	<>	<elision3>
5056	5054	<elision2>	<elision2>
5056	5054	<>	<elision2>
5056	5054	<elision1>	<elision1>
5056	5054	<>	<elision1>
5056	5218	.	υ
5056	5218	.	u
5056	5060	.	κ
5056	5218	.	α
5056	5218	.	a
5056	5221	<4s>	<>
5057	5054	.	.
5057	5054	 	 
5057	5054	<~>	<~>
5057	5054	<split-s>	<split-s>
5057	5054	<split-h>	<split-h>
5057	5054	<name2>	<name2>
5057	5058	<>	<name>
5057	5057	<aphaerese>	<aphaerese>
5057	5057	<>	<aphaerese>
5057	5054	<elision3>	<elision3>
5057	5057	<>	<elision3>
5057	5054	<elision2>	<elision2>
5057	5057	<>	<elision2>
5057	5054	<elision1>	<elision1>
5057	5057	<>	<elision1>
5057	5054	.	υ
5057	5054	.	u
5057	5060	.	κ
5057	5054	.	α
5057	5054	.	a
5057	5209	<4s>	<>
5058	5056	.	.
5058	5056	 	 
5058	5056	<~>	<~>
5058	5056	<split-s>	<split-s>
5058	5056	<split-h>	<split-h>
5058	5056	<name2>	<name2>
5058	5059	<aphaerese>	<aphaerese>
5058	5059	<>	<aphaerese>
5058	5056	<elision3>	<elision3>
5058	5059	<>	<elision3>
5058	5056	<elision2>	<elision2>
5058	5059	<>	<elision2>
5058	5056	<elision1>	<elision1>
5058	5059	<>	<elision1>
5058	5056	.	υ
5058	5056	.	u
5058	5062	.	κ
5058	5056	.	α
5058	5056	.	a
5058	5210	<4s>	<>
5059	5054	.	.
5059	5054	 	 
5059	5054	<~>	<~>
5059	5054	<split-s>	<split-s>
5059	5054	<split-h>	<split-h>
5059	5054	<name2>	<name2>
5059	5057	<aphaerese>	<aphaerese>
5059	5057	<>	<aphaerese>
5059	5054	<elision3>	<elision3>
5059	5057	<>	<elision3>
5059	5054	<elision2>	<elision2>
5059	5057	<>	<elision2>
5059	5054	<elision1>	<elision1>
5059	5057	<>	<elision1>
5059	5054	.	υ
5059	5054	.	u
5059	5060	.	κ
5059	5054	.	α
5059	5054	.	a
5059	5208	<4s>	<>
5060	5061	<>	<name>
5060	5060	<>	<aphaerese>
5060	5063	<elision3>	<elision3>
5060	5060	<>	<elision3>
5060	5063	<elision2>	<elision2>
5060	5060	<>	<elision2>
5060	5063	<elision1>	<elision1>
5060	5060	<>	<elision1>
5060	5206	<4s>	<>
5061	5062	<>	<aphaerese>
5061	5065	<elision3>	<elision3>
5061	5062	<>	<elision3>
5061	5065	<elision2>	<elision2>
5061	5062	<>	<elision2>
5061	5065	<elision1>	<elision1>
5061	5062	<>	<elision1>
5061	5207	<4s>	<>
5062	5060	<>	<aphaerese>
5062	5063	<elision3>	<elision3>
5062	5060	<>	<elision3>
5062	5063	<elision2>	<elision2>
5062	5060	<>	<elision2>
5062	5063	<elision1>	<elision1>
5062	5060	<>	<elision1>
5062	5205	<4s>	<>
5063	5064	<>	<name>
5063	5063	<>	<aphaerese>
5063	5063	<>	<elision3>
5063	5063	<>	<elision2>
5063	5063	<>	<elision1>
5063	5067	<4s>	<>
5064	5065	<>	<aphaerese>
5064	5065	<>	<elision3>
5064	5065	<>	<elision2>
5064	5065	<>	<elision1>
5064	5068	<4s>	<>
5065	5063	<>	<aphaerese>
5065	5063	<>	<elision3>
5065	5063	<>	<elision2>
5065	5063	<>	<elision1>
5065	5066	<4s>	<>
5066	5067	<>	<aphaerese>
5066	5067	<>	<elision3>
5066	5067	<>	<elision2>
5066	5067	<>	<elision1>
5066	192	H	κ
5066	4434	H	k
5066	4438	H	K
5066	4442	H	λ
5066	5070	H	l
5066	5199	H	L
5066	4889	<K>	<>
5067	5068	<>	<name>
5067	5067	<>	<aphaerese>
5067	5067	<>	<elision3>
5067	5067	<>	<elision2>
5067	5067	<>	<elision1>
5067	192	H	κ
5067	4434	H	k
5067	4438	H	K
5067	4442	H	λ
5067	5070	H	l
5067	5199	H	L
5067	4887	<K>	<>
5068	5066	<>	<aphaerese>
5068	5066	<>	<elision3>
5068	5066	<>	<elision2>
5068	5066	<>	<elision1>
5068	4448	H	κ
5068	4452	H	k
5068	4453	H	K
5068	4444	H	λ
5068	5069	H	l
5068	5198	H	L
5068	4888	<K>	<>
5069	5070	<>	<aphaerese>
5069	5070	<>	<elision3>
5069	5070	<>	<elision2>
5069	5070	<>	<elision1>
5069	5073	<~>	<>
5069	4266	<l2L>	<>
5070	5071	<>	<name>
5070	5070	<>	<aphaerese>
5070	5070	<>	<elision3>
5070	5070	<>	<elision2>
5070	5070	<>	<elision1>
5070	5074	<~>	<>
5070	4264	<l2L>	<>
5071	5069	<>	<aphaerese>
5071	5069	<>	<elision3>
5071	5069	<>	<elision2>
5071	5069	<>	<elision1>
5071	5072	<~>	<>
5071	4265	<l2L>	<>
5072	5073	<>	<aphaerese>
5072	5073	<>	<elision3>
5072	5073	<>	<elision2>
5072	5073	<>	<elision1>
5072	5077	h	K
5072	5193	h	L
5073	5074	<>	<aphaerese>
5073	5074	<>	<elision3>
5073	5074	<>	<elision2>
5073	5074	<>	<elision1>
5073	5075	h	K
5073	5190	h	L
5074	5072	<>	<name>
5074	5074	<>	<aphaerese>
5074	5074	<>	<elision3>
5074	5074	<>	<elision2>
5074	5074	<>	<elision1>
5074	5075	h	K
5074	5190	h	L
5075	5076	<>	<name>
5075	5075	<>	<aphaerese>
5075	5075	<>	<elision3>
5075	5075	<>	<elision2>
5075	5075	<>	<elision1>
5075	5078	.	κ
5075	5078	.	λ
5076	5077	<>	<aphaerese>
5076	5077	<>	<elision3>
5076	5077	<>	<elision2>
5076	5077	<>	<elision1>
5076	5080	.	κ
5076	5080	.	λ
5077	5075	<>	<aphaerese>
5077	5075	<>	<elision3>
5077	5075	<>	<elision2>
5077	5075	<>	<elision1>
5077	5078	.	κ
5077	5078	.	λ
5078	5079	<>	<name>
5078	5078	<>	<aphaerese>
5078	5081	<elision3>	<elision3>
5078	5078	<>	<elision3>
5078	5081	<elision2>	<elision2>
5078	5078	<>	<elision2>
5078	5081	<elision1>	<elision1>
5078	5078	<>	<elision1>
5079	5080	<>	<aphaerese>
5079	5084	<elision3>	<elision3>
5079	5080	<>	<elision3>
5079	5084	<elision2>	<elision2>
5079	5080	<>	<elision2>
5079	5084	<elision1>	<elision1>
5079	5080	<>	<elision1>
5080	5078	<>	<aphaerese>
5080	5081	<elision3>	<elision3>
5080	5078	<>	<elision3>
5080	5081	<elision2>	<elision2>
5080	5078	<>	<elision2>
5080	5081	<elision1>	<elision1>
5080	5078	<>	<elision1>
5081	5081	.	.
5081	5082	 	 
5081	5081	<~>	<~>
5081	5081	<split-s>	<split-s>
5081	5081	<split-h>	<split-h>
5081	5081	<name2>	<name2>
5081	5189	<>	<name>
5081	5085	<aphaerese>	<aphaerese>
5081	5081	<>	<aphaerese>
5081	5081	<elision3>	<elision3>
5081	5081	<>	<elision3>
5081	5081	<elision2>	<elision2>
5081	5081	<>	<elision2>
5081	5081	<elision1>	<elision1>
5081	5081	<>	<elision1>
5081	5078	.	υ
5081	5089	s	υ
5081	5078	.	u
5081	5089	s	u
5081	5104	.	κ
5081	5116	s	κ
5081	5122	s	k
5081	5125	s	U
5081	5176	s	K
5081	5078	.	α
5081	5089	s	α
5081	5078	.	a
5081	5089	s	a
5081	5154	s	A
5081	5122	s	λ
5081	5122	s	l
5081	5183	s	L
5082	5081	.	.
5082	5082	 	 
5082	5081	<~>	<~>
5082	5081	<split-s>	<split-s>
5082	5081	<split-h>	<split-h>
5082	5081	<name2>	<name2>
5082	5083	<>	<name>
5082	5085	<aphaerese>	<aphaerese>
5082	5088	<>	<aphaerese>
5082	5081	<elision3>	<elision3>
5082	5088	<>	<elision3>
5082	5081	<elision2>	<elision2>
5082	5088	<>	<elision2>
5082	5081	<elision1>	<elision1>
5082	5088	<>	<elision1>
5082	5078	.	υ
5082	5165	s	υ
5082	5078	.	u
5082	5165	s	u
5082	5104	.	κ
5082	5166	s	κ
5082	5167	s	k
5082	5168	s	U
5082	5170	s	K
5082	5078	.	α
5082	5165	s	α
5082	5078	.	a
5082	5165	s	a
5082	5172	s	A
5082	5167	s	λ
5082	5167	s	l
5082	5173	s	L
5083	5084	.	.
5083	5087	 	 
5083	5084	<~>	<~>
5083	5084	<split-s>	<split-s>
5083	5084	<split-h>	<split-h>
5083	5084	<name2>	<name2>
5083	5175	<aphaerese>	<aphaerese>
5083	5188	<>	<aphaerese>
5083	5084	<elision3>	<elision3>
5083	5188	<>	<elision3>
5083	5084	<elision2>	<elision2>
5083	5188	<>	<elision2>
5083	5084	<elision1>	<elision1>
5083	5188	<>	<elision1>
5083	5080	.	υ
5083	5103	s	υ
5083	5080	.	u
5083	5103	s	u
5083	5106	.	κ
5083	5118	s	κ
5083	5124	s	k
5083	5127	s	U
5083	5130	s	K
5083	5080	.	α
5083	5103	s	α
5083	5080	.	a
5083	5103	s	a
5083	5156	s	A
5083	5124	s	λ
5083	5124	s	l
5083	5159	s	L
5084	5081	.	.
5084	5082	 	 
5084	5081	<~>	<~>
5084	5081	<split-s>	<split-s>
5084	5081	<split-h>	<split-h>
5084	5081	<name2>	<name2>
5084	5085	<aphaerese>	<aphaerese>
5084	5081	<>	<aphaerese>
5084	5081	<elision3>	<elision3>
5084	5081	<>	<elision3>
5084	5081	<elision2>	<elision2>
5084	5081	<>	<elision2>
5084	5081	<elision1>	<elision1>
5084	5081	<>	<elision1>
5084	5078	.	υ
5084	5089	s	υ
5084	5078	.	u
5084	5089	s	u
5084	5104	.	κ
5084	5116	s	κ
5084	5122	s	k
5084	5125	s	U
5084	5176	s	K
5084	5078	.	α
5084	5089	s	α
5084	5078	.	a
5084	5089	s	a
5084	5154	s	A
5084	5122	s	λ
5084	5122	s	l
5084	5183	s	L
5085	5081	.	.
5085	5082	 	 
5085	5081	<~>	<~>
5085	5081	<split-s>	<split-s>
5085	5081	<split-h>	<split-h>
5085	5081	<name2>	<name2>
5085	5086	<>	<name>
5085	5085	<aphaerese>	<aphaerese>
5085	5085	<>	<aphaerese>
5085	5081	<elision3>	<elision3>
5085	5085	<>	<elision3>
5085	5081	<elision2>	<elision2>
5085	5085	<>	<elision2>
5085	5081	<elision1>	<elision1>
5085	5085	<>	<elision1>
5085	5081	.	υ
5085	5081	.	u
5085	5104	.	κ
5085	5116	s	κ
5085	5122	s	k
5085	5125	s	U
5085	5176	s	K
5085	5081	.	α
5085	5081	.	a
5085	5154	s	A
5085	5122	s	λ
5085	5122	s	l
5085	5183	s	L
5086	5084	.	.
5086	5087	 	 
5086	5084	<~>	<~>
5086	5084	<split-s>	<split-s>
5086	5084	<split-h>	<split-h>
5086	5084	<name2>	<name2>
5086	5175	<aphaerese>	<aphaerese>
5086	5175	<>	<aphaerese>
5086	5084	<elision3>	<elision3>
5086	5175	<>	<elision3>
5086	5084	<elision2>	<elision2>
5086	5175	<>	<elision2>
5086	5084	<elision1>	<elision1>
5086	5175	<>	<elision1>
5086	5084	.	υ
5086	5084	.	u
5086	5106	.	κ
5086	5118	s	κ
5086	5124	s	k
5086	5127	s	U
5086	5178	s	K
5086	5084	.	α
5086	5084	.	a
5086	5156	s	A
5086	5124	s	λ
5086	5124	s	l
5086	5185	s	L
5087	5081	.	.
5087	5082	 	 
5087	5081	<~>	<~>
5087	5081	<split-s>	<split-s>
5087	5081	<split-h>	<split-h>
5087	5081	<name2>	<name2>
5087	5085	<aphaerese>	<aphaerese>
5087	5088	<>	<aphaerese>
5087	5081	<elision3>	<elision3>
5087	5088	<>	<elision3>
5087	5081	<elision2>	<elision2>
5087	5088	<>	<elision2>
5087	5081	<elision1>	<elision1>
5087	5088	<>	<elision1>
5087	5078	.	υ
5087	5165	s	υ
5087	5078	.	u
5087	5165	s	u
5087	5104	.	κ
5087	5166	s	κ
5087	5167	s	k
5087	5168	s	U
5087	5170	s	K
5087	5078	.	α
5087	5165	s	α
5087	5078	.	a
5087	5165	s	a
5087	5172	s	A
5087	5167	s	λ
5087	5167	s	l
5087	5173	s	L
5088	5081	.	.
5088	5082	 	 
5088	5081	<~>	<~>
5088	5081	<split-s>	<split-s>
5088	5081	<split-h>	<split-h>
5088	5081	<name2>	<name2>
5088	5083	<>	<name>
5088	5085	<aphaerese>	<aphaerese>
5088	5088	<>	<aphaerese>
5088	5081	<elision3>	<elision3>
5088	5088	<>	<elision3>
5088	5081	<elision2>	<elision2>
5088	5088	<>	<elision2>
5088	5081	<elision1>	<elision1>
5088	5088	<>	<elision1>
5088	5078	.	υ
5088	5089	s	υ
5088	5078	.	u
5088	5089	s	u
5088	5104	.	κ
5088	5116	s	κ
5088	5122	s	k
5088	5125	s	U
5088	5128	s	K
5088	5078	.	α
5088	5089	s	α
5088	5078	.	a
5088	5089	s	a
5088	5154	s	A
5088	5122	s	λ
5088	5122	s	l
5088	5157	s	L
5089	5090	.	.
5089	5090	 	 
5089	5090	<~>	<~>
5089	5090	<split-s>	<split-s>
5089	5090	<split-h>	<split-h>
5089	5090	<name2>	<name2>
5089	5102	<>	<name>
5089	5093	<aphaerese>	<aphaerese>
5089	5089	<>	<aphaerese>
5089	5089	<>	<elision3>
5089	5089	<>	<elision2>
5089	5089	<>	<elision1>
5089	5099	.	υ
5089	5099	.	u
5089	5096	.	κ
5089	5099	.	α
5089	5099	.	a
5089	3586	<3s>	<>
5090	5090	.	.
5090	5090	 	 
5090	5090	<~>	<~>
5090	5090	<split-s>	<split-s>
5090	5090	<split-h>	<split-h>
5090	5090	<name2>	<name2>
5090	5091	<>	<name>
5090	5093	<aphaerese>	<aphaerese>
5090	5090	<>	<aphaerese>
5090	5090	<elision3>	<elision3>
5090	5090	<>	<elision3>
5090	5090	<elision2>	<elision2>
5090	5090	<>	<elision2>
5090	5090	<elision1>	<elision1>
5090	5090	<>	<elision1>
5090	5099	.	υ
5090	5099	.	u
5090	5096	.	κ
5090	5099	.	α
5090	5099	.	a
5090	3581	<3s>	<>
5091	5092	.	.
5091	5092	 	 
5091	5092	<~>	<~>
5091	5092	<split-s>	<split-s>
5091	5092	<split-h>	<split-h>
5091	5092	<name2>	<name2>
5091	5095	<aphaerese>	<aphaerese>
5091	5092	<>	<aphaerese>
5091	5092	<elision3>	<elision3>
5091	5092	<>	<elision3>
5091	5092	<elision2>	<elision2>
5091	5092	<>	<elision2>
5091	5092	<elision1>	<elision1>
5091	5092	<>	<elision1>
5091	5101	.	υ
5091	5101	.	u
5091	5098	.	κ
5091	5101	.	α
5091	5101	.	a
5091	3582	<3s>	<>
5092	5090	.	.
5092	5090	 	 
5092	5090	<~>	<~>
5092	5090	<split-s>	<split-s>
5092	5090	<split-h>	<split-h>
5092	5090	<name2>	<name2>
5092	5093	<aphaerese>	<aphaerese>
5092	5090	<>	<aphaerese>
5092	5090	<elision3>	<elision3>
5092	5090	<>	<elision3>
5092	5090	<elision2>	<elision2>
5092	5090	<>	<elision2>
5092	5090	<elision1>	<elision1>
5092	5090	<>	<elision1>
5092	5099	.	υ
5092	5099	.	u
5092	5096	.	κ
5092	5099	.	α
5092	5099	.	a
5092	3580	<3s>	<>
5093	5090	.	.
5093	5090	 	 
5093	5090	<~>	<~>
5093	5090	<split-s>	<split-s>
5093	5090	<split-h>	<split-h>
5093	5090	<name2>	<name2>
5093	5094	<>	<name>
5093	5093	<aphaerese>	<aphaerese>
5093	5093	<>	<aphaerese>
5093	5090	<elision3>	<elision3>
5093	5093	<>	<elision3>
5093	5090	<elision2>	<elision2>
5093	5093	<>	<elision2>
5093	5090	<elision1>	<elision1>
5093	5093	<>	<elision1>
5093	5090	.	υ
5093	5090	.	u
5093	5096	.	κ
5093	5090	.	α
5093	5090	.	a
5093	3568	<3s>	<>
5094	5092	.	.
5094	5092	 	 
5094	5092	<~>	<~>
5094	5092	<split-s>	<split-s>
5094	5092	<split-h>	<split-h>
5094	5092	<name2>	<name2>
5094	5095	<aphaerese>	<aphaerese>
5094	5095	<>	<aphaerese>
5094	5092	<elision3>	<elision3>
5094	5095	<>	<elision3>
5094	5092	<elision2>	<elision2>
5094	5095	<>	<elision2>
5094	5092	<elision1>	<elision1>
5094	5095	<>	<elision1>
5094	5092	.	υ
5094	5092	.	u
5094	5098	.	κ
5094	5092	.	α
5094	5092	.	a
5094	3569	<3s>	<>
5095	5090	.	.
5095	5090	 	 
5095	5090	<~>	<~>
5095	5090	<split-s>	<split-s>
5095	5090	<split-h>	<split-h>
5095	5090	<name2>	<name2>
5095	5093	<aphaerese>	<aphaerese>
5095	5093	<>	<aphaerese>
5095	5090	<elision3>	<elision3>
5095	5093	<>	<elision3>
5095	5090	<elision2>	<elision2>
5095	5093	<>	<elision2>
5095	5090	<elision1>	<elision1>
5095	5093	<>	<elision1>
5095	5090	.	υ
5095	5090	.	u
5095	5096	.	κ
5095	5090	.	α
5095	5090	.	a
5095	3567	<3s>	<>
5096	5097	<>	<name>
5096	5096	<>	<aphaerese>
5096	3657	<elision3>	<elision3>
5096	5096	<>	<elision3>
5096	3657	<elision2>	<elision2>
5096	5096	<>	<elision2>
5096	3657	<elision1>	<elision1>
5096	5096	<>	<elision1>
5096	3565	<3s>	<>
5097	5098	<>	<aphaerese>
5097	3656	<elision3>	<elision3>
5097	5098	<>	<elision3>
5097	3656	<elision2>	<elision2>
5097	5098	<>	<elision2>
5097	3656	<elision1>	<elision1>
5097	5098	<>	<elision1>
5097	3566	<3s>	<>
5098	5096	<>	<aphaerese>
5098	3657	<elision3>	<elision3>
5098	5096	<>	<elision3>
5098	3657	<elision2>	<elision2>
5098	5096	<>	<elision2>
5098	3657	<elision1>	<elision1>
5098	5096	<>	<elision1>
5098	3564	<3s>	<>
5099	5100	<>	<name>
5099	5099	<>	<aphaerese>
5099	5090	<elision3>	<elision3>
5099	5099	<>	<elision3>
5099	5090	<elision2>	<elision2>
5099	5099	<>	<elision2>
5099	5090	<elision1>	<elision1>
5099	5099	<>	<elision1>
5099	212	<3s>	<>
5100	5101	<>	<aphaerese>
5100	5092	<elision3>	<elision3>
5100	5101	<>	<elision3>
5100	5092	<elision2>	<elision2>
5100	5101	<>	<elision2>
5100	5092	<elision1>	<elision1>
5100	5101	<>	<elision1>
5100	213	<3s>	<>
5101	5099	<>	<aphaerese>
5101	5090	<elision3>	<elision3>
5101	5099	<>	<elision3>
5101	5090	<elision2>	<elision2>
5101	5099	<>	<elision2>
5101	5090	<elision1>	<elision1>
5101	5099	<>	<elision1>
5101	211	<3s>	<>
5102	5092	.	.
5102	5092	 	 
5102	5092	<~>	<~>
5102	5092	<split-s>	<split-s>
5102	5092	<split-h>	<split-h>
5102	5092	<name2>	<name2>
5102	5095	<aphaerese>	<aphaerese>
5102	5103	<>	<aphaerese>
5102	5103	<>	<elision3>
5102	5103	<>	<elision2>
5102	5103	<>	<elision1>
5102	5101	.	υ
5102	5101	.	u
5102	5098	.	κ
5102	5101	.	α
5102	5101	.	a
5102	3587	<3s>	<>
5103	5090	.	.
5103	5090	 	 
5103	5090	<~>	<~>
5103	5090	<split-s>	<split-s>
5103	5090	<split-h>	<split-h>
5103	5090	<name2>	<name2>
5103	5093	<aphaerese>	<aphaerese>
5103	5089	<>	<aphaerese>
5103	5089	<>	<elision3>
5103	5089	<>	<elision2>
5103	5089	<>	<elision1>
5103	5099	.	υ
5103	5099	.	u
5103	5096	.	κ
5103	5099	.	α
5103	5099	.	a
5103	3585	<3s>	<>
5104	5105	<>	<name>
5104	5104	<>	<aphaerese>
5104	5107	<elision3>	<elision3>
5104	5104	<>	<elision3>
5104	5107	<elision2>	<elision2>
5104	5104	<>	<elision2>
5104	5107	<elision1>	<elision1>
5104	5104	<>	<elision1>
5105	5106	<>	<aphaerese>
5105	5109	<elision3>	<elision3>
5105	5106	<>	<elision3>
5105	5109	<elision2>	<elision2>
5105	5106	<>	<elision2>
5105	5109	<elision1>	<elision1>
5105	5106	<>	<elision1>
5106	5104	<>	<aphaerese>
5106	5107	<elision3>	<elision3>
5106	5104	<>	<elision3>
5106	5107	<elision2>	<elision2>
5106	5104	<>	<elision2>
5106	5107	<elision1>	<elision1>
5106	5104	<>	<elision1>
5107	5108	<>	<name>
5107	5107	<>	<aphaerese>
5107	5107	<>	<elision3>
5107	5107	<>	<elision2>
5107	5107	<>	<elision1>
5107	3998	s	κ
5107	3998	s	k
5107	5110	s	K
5107	3998	s	λ
5107	3998	s	l
5107	5113	s	L
5108	5109	<>	<aphaerese>
5108	5109	<>	<elision3>
5108	5109	<>	<elision2>
5108	5109	<>	<elision1>
5108	3997	s	κ
5108	3997	s	k
5108	5112	s	K
5108	3997	s	λ
5108	3997	s	l
5108	5115	s	L
5109	5107	<>	<aphaerese>
5109	5107	<>	<elision3>
5109	5107	<>	<elision2>
5109	5107	<>	<elision1>
5109	3998	s	κ
5109	3998	s	k
5109	5110	s	K
5109	3998	s	λ
5109	3998	s	l
5109	5113	s	L
5110	5111	<>	<name>
5110	5110	<>	<aphaerese>
5110	5110	<>	<elision3>
5110	5110	<>	<elision2>
5110	5110	<>	<elision1>
5110	3998	<K2kl>	<>
5111	5112	<>	<aphaerese>
5111	5112	<>	<elision3>
5111	5112	<>	<elision2>
5111	5112	<>	<elision1>
5111	3999	<K2kl>	<>
5112	5110	<>	<aphaerese>
5112	5110	<>	<elision3>
5112	5110	<>	<elision2>
5112	5110	<>	<elision1>
5112	3997	<K2kl>	<>
5113	5114	<>	<name>
5113	5113	<>	<aphaerese>
5113	5113	<>	<elision3>
5113	5113	<>	<elision2>
5113	5113	<>	<elision1>
5113	3998	<L2kl>	<>
5114	5115	<>	<aphaerese>
5114	5115	<>	<elision3>
5114	5115	<>	<elision2>
5114	5115	<>	<elision1>
5114	3999	<L2kl>	<>
5115	5113	<>	<aphaerese>
5115	5113	<>	<elision3>
5115	5113	<>	<elision2>
5115	5113	<>	<elision1>
5115	3997	<L2kl>	<>
5116	5090	.	.
5116	5090	 	 
5116	5090	<~>	<~>
5116	5090	<split-s>	<split-s>
5116	5090	<split-h>	<split-h>
5116	5090	<name2>	<name2>
5116	5117	<>	<name>
5116	5093	<aphaerese>	<aphaerese>
5116	5116	<>	<aphaerese>
5116	5119	<elision3>	<elision3>
5116	5116	<>	<elision3>
5116	5119	<elision2>	<elision2>
5116	5116	<>	<elision2>
5116	5119	<elision1>	<elision1>
5116	5116	<>	<elision1>
5116	5099	.	υ
5116	5099	.	u
5116	5099	.	κ
5116	5099	.	α
5116	5099	.	a
5116	5099	.	λ
5116	3766	<3s>	<>
5117	5092	.	.
5117	5092	 	 
5117	5092	<~>	<~>
5117	5092	<split-s>	<split-s>
5117	5092	<split-h>	<split-h>
5117	5092	<name2>	<name2>
5117	5095	<aphaerese>	<aphaerese>
5117	5118	<>	<aphaerese>
5117	5121	<elision3>	<elision3>
5117	5118	<>	<elision3>
5117	5121	<elision2>	<elision2>
5117	5118	<>	<elision2>
5117	5121	<elision1>	<elision1>
5117	5118	<>	<elision1>
5117	5101	.	υ
5117	5101	.	u
5117	5101	.	κ
5117	5101	.	α
5117	5101	.	a
5117	5101	.	λ
5117	3767	<3s>	<>
5118	5090	.	.
5118	5090	 	 
5118	5090	<~>	<~>
5118	5090	<split-s>	<split-s>
5118	5090	<split-h>	<split-h>
5118	5090	<name2>	<name2>
5118	5093	<aphaerese>	<aphaerese>
5118	5116	<>	<aphaerese>
5118	5119	<elision3>	<elision3>
5118	5116	<>	<elision3>
5118	5119	<elision2>	<elision2>
5118	5116	<>	<elision2>
5118	5119	<elision1>	<elision1>
5118	5116	<>	<elision1>
5118	5099	.	υ
5118	5099	.	u
5118	5099	.	κ
5118	5099	.	α
5118	5099	.	a
5118	5099	.	λ
5118	3765	<3s>	<>
5119	5090	.	.
5119	5090	 	 
5119	5090	<~>	<~>
5119	5090	<split-s>	<split-s>
5119	5090	<split-h>	<split-h>
5119	5090	<name2>	<name2>
5119	5120	<>	<name>
5119	5093	<aphaerese>	<aphaerese>
5119	5119	<>	<aphaerese>
5119	5090	<elision3>	<elision3>
5119	5119	<>	<elision3>
5119	5090	<elision2>	<elision2>
5119	5119	<>	<elision2>
5119	5090	<elision1>	<elision1>
5119	5119	<>	<elision1>
5119	5099	.	υ
5119	5099	.	u
5119	5096	.	κ
5119	5099	.	α
5119	5099	.	a
5119	3669	<3s>	<>
5120	5092	.	.
5120	5092	 	 
5120	5092	<~>	<~>
5120	5092	<split-s>	<split-s>
5120	5092	<split-h>	<split-h>
5120	5092	<name2>	<name2>
5120	5095	<aphaerese>	<aphaerese>
5120	5121	<>	<aphaerese>
5120	5092	<elision3>	<elision3>
5120	5121	<>	<elision3>
5120	5092	<elision2>	<elision2>
5120	5121	<>	<elision2>
5120	5092	<elision1>	<elision1>
5120	5121	<>	<elision1>
5120	5101	.	υ
5120	5101	.	u
5120	5098	.	κ
5120	5101	.	α
5120	5101	.	a
5120	3670	<3s>	<>
5121	5090	.	.
5121	5090	 	 
5121	5090	<~>	<~>
5121	5090	<split-s>	<split-s>
5121	5090	<split-h>	<split-h>
5121	5090	<name2>	<name2>
5121	5093	<aphaerese>	<aphaerese>
5121	5119	<>	<aphaerese>
5121	5090	<elision3>	<elision3>
5121	5119	<>	<elision3>
5121	5090	<elision2>	<elision2>
5121	5119	<>	<elision2>
5121	5090	<elision1>	<elision1>
5121	5119	<>	<elision1>
5121	5099	.	υ
5121	5099	.	u
5121	5096	.	κ
5121	5099	.	α
5121	5099	.	a
5121	3668	<3s>	<>
5122	5090	.	.
5122	5090	 	 
5122	5090	<~>	<~>
5122	5090	<split-s>	<split-s>
5122	5090	<split-h>	<split-h>
5122	5090	<name2>	<name2>
5122	5123	<>	<name>
5122	5093	<aphaerese>	<aphaerese>
5122	5122	<>	<aphaerese>
5122	5090	<elision3>	<elision3>
5122	5122	<>	<elision3>
5122	5090	<elision2>	<elision2>
5122	5122	<>	<elision2>
5122	5090	<elision1>	<elision1>
5122	5122	<>	<elision1>
5122	5099	.	υ
5122	5099	.	u
5122	5099	.	κ
5122	5099	.	α
5122	5099	.	a
5122	5099	.	λ
5122	3778	<3s>	<>
5123	5092	.	.
5123	5092	 	 
5123	5092	<~>	<~>
5123	5092	<split-s>	<split-s>
5123	5092	<split-h>	<split-h>
5123	5092	<name2>	<name2>
5123	5095	<aphaerese>	<aphaerese>
5123	5124	<>	<aphaerese>
5123	5092	<elision3>	<elision3>
5123	5124	<>	<elision3>
5123	5092	<elision2>	<elision2>
5123	5124	<>	<elision2>
5123	5092	<elision1>	<elision1>
5123	5124	<>	<elision1>
5123	5101	.	υ
5123	5101	.	u
5123	5101	.	κ
5123	5101	.	α
5123	5101	.	a
5123	5101	.	λ
5123	3779	<3s>	<>
5124	5090	.	.
5124	5090	 	 
5124	5090	<~>	<~>
5124	5090	<split-s>	<split-s>
5124	5090	<split-h>	<split-h>
5124	5090	<name2>	<name2>
5124	5093	<aphaerese>	<aphaerese>
5124	5122	<>	<aphaerese>
5124	5090	<elision3>	<elision3>
5124	5122	<>	<elision3>
5124	5090	<elision2>	<elision2>
5124	5122	<>	<elision2>
5124	5090	<elision1>	<elision1>
5124	5122	<>	<elision1>
5124	5099	.	υ
5124	5099	.	u
5124	5099	.	κ
5124	5099	.	α
5124	5099	.	a
5124	5099	.	λ
5124	3777	<3s>	<>
5125	5126	<>	<name>
5125	5125	<>	<aphaerese>
5125	5125	<>	<elision3>
5125	5125	<>	<elision2>
5125	5125	<>	<elision1>
5125	5090	<U2kl>	<>
5126	5127	<>	<aphaerese>
5126	5127	<>	<elision3>
5126	5127	<>	<elision2>
5126	5127	<>	<elision1>
5126	5091	<U2kl>	<>
5127	5125	<>	<aphaerese>
5127	5125	<>	<elision3>
5127	5125	<>	<elision2>
5127	5125	<>	<elision1>
5127	5092	<U2kl>	<>
5128	4088	<name>	<name>
5128	5129	<>	<name>
5128	5131	<>	<aphaerese>
5128	5131	<>	<elision3>
5128	5131	<>	<elision2>
5128	5131	<>	<elision1>
5128	3898	<3s>	<>
5128	5132	<A2kl>	<>
5128	5141	<L2kl>	<>
5128	5153	<K2kl>	<>
5129	5130	<>	<aphaerese>
5129	5130	<>	<elision3>
5129	5130	<>	<elision2>
5129	5130	<>	<elision1>
5129	5133	<A2kl>	<>
5129	5142	<L2kl>	<>
5129	5151	<K2kl>	<>
5130	5131	<>	<aphaerese>
5130	5131	<>	<elision3>
5130	5131	<>	<elision2>
5130	5131	<>	<elision1>
5130	5134	<A2kl>	<>
5130	5143	<L2kl>	<>
5130	5152	<K2kl>	<>
5131	5129	<>	<name>
5131	5131	<>	<aphaerese>
5131	5131	<>	<elision3>
5131	5131	<>	<elision2>
5131	5131	<>	<elision1>
5131	5132	<A2kl>	<>
5131	5141	<L2kl>	<>
5131	5150	<K2kl>	<>
5132	5133	<>	<name>
5132	5132	<>	<aphaerese>
5132	5132	<>	<elision3>
5132	5132	<>	<elision2>
5132	5132	<>	<elision1>
5132	5135	.	κ
5132	5135	.	λ
5132	3848	<3s>	<>
5133	5134	<>	<aphaerese>
5133	5134	<>	<elision3>
5133	5134	<>	<elision2>
5133	5134	<>	<elision1>
5133	5137	.	κ
5133	5137	.	λ
5133	3849	<3s>	<>
5134	5132	<>	<aphaerese>
5134	5132	<>	<elision3>
5134	5132	<>	<elision2>
5134	5132	<>	<elision1>
5134	5135	.	κ
5134	5135	.	λ
5134	3847	<3s>	<>
5135	5136	<>	<name>
5135	5135	<>	<aphaerese>
5135	5138	<elision3>	<elision3>
5135	5135	<>	<elision3>
5135	5138	<elision2>	<elision2>
5135	5135	<>	<elision2>
5135	5138	<elision1>	<elision1>
5135	5135	<>	<elision1>
5135	3839	<3s>	<>
5136	5137	<>	<aphaerese>
5136	5140	<elision3>	<elision3>
5136	5137	<>	<elision3>
5136	5140	<elision2>	<elision2>
5136	5137	<>	<elision2>
5136	5140	<elision1>	<elision1>
5136	5137	<>	<elision1>
5136	3840	<3s>	<>
5137	5135	<>	<aphaerese>
5137	5138	<elision3>	<elision3>
5137	5135	<>	<elision3>
5137	5138	<elision2>	<elision2>
5137	5135	<>	<elision2>
5137	5138	<elision1>	<elision1>
5137	5135	<>	<elision1>
5137	3838	<3s>	<>
5138	5090	.	.
5138	5090	 	 
5138	5090	<~>	<~>
5138	5090	<split-s>	<split-s>
5138	5090	<split-h>	<split-h>
5138	5090	<name2>	<name2>
5138	5139	<>	<name>
5138	5093	<aphaerese>	<aphaerese>
5138	5138	<>	<aphaerese>
5138	5090	<elision3>	<elision3>
5138	5138	<>	<elision3>
5138	5090	<elision2>	<elision2>
5138	5138	<>	<elision2>
5138	5090	<elision1>	<elision1>
5138	5138	<>	<elision1>
5138	5099	.	υ
5138	5099	.	u
5138	5099	.	α
5138	5099	.	a
5138	3803	<3s>	<>
5139	5092	.	.
5139	5092	 	 
5139	5092	<~>	<~>
5139	5092	<split-s>	<split-s>
5139	5092	<split-h>	<split-h>
5139	5092	<name2>	<name2>
5139	5095	<aphaerese>	<aphaerese>
5139	5140	<>	<aphaerese>
5139	5092	<elision3>	<elision3>
5139	5140	<>	<elision3>
5139	5092	<elision2>	<elision2>
5139	5140	<>	<elision2>
5139	5092	<elision1>	<elision1>
5139	5140	<>	<elision1>
5139	5101	.	υ
5139	5101	.	u
5139	5101	.	α
5139	5101	.	a
5139	3804	<3s>	<>
5140	5090	.	.
5140	5090	 	 
5140	5090	<~>	<~>
5140	5090	<split-s>	<split-s>
5140	5090	<split-h>	<split-h>
5140	5090	<name2>	<name2>
5140	5093	<aphaerese>	<aphaerese>
5140	5138	<>	<aphaerese>
5140	5090	<elision3>	<elision3>
5140	5138	<>	<elision3>
5140	5090	<elision2>	<elision2>
5140	5138	<>	<elision2>
5140	5090	<elision1>	<elision1>
5140	5138	<>	<elision1>
5140	5099	.	υ
5140	5099	.	u
5140	5099	.	α
5140	5099	.	a
5140	3802	<3s>	<>
5141	5142	<>	<name>
5141	5141	<>	<aphaerese>
5141	5141	<>	<elision3>
5141	5141	<>	<elision2>
5141	5141	<>	<elision1>
5141	5144	.	κ
5141	5144	.	λ
5141	3881	<3s>	<>
5142	5143	<>	<aphaerese>
5142	5143	<>	<elision3>
5142	5143	<>	<elision2>
5142	5143	<>	<elision1>
5142	5146	.	κ
5142	5146	.	λ
5142	3882	<3s>	<>
5143	5141	<>	<aphaerese>
5143	5141	<>	<elision3>
5143	5141	<>	<elision2>
5143	5141	<>	<elision1>
5143	5144	.	κ
5143	5144	.	λ
5143	3880	<3s>	<>
5144	5145	<>	<name>
5144	5144	<>	<aphaerese>
5144	5147	<elision3>	<elision3>
5144	5144	<>	<elision3>
5144	5147	<elision2>	<elision2>
5144	5144	<>	<elision2>
5144	5147	<elision1>	<elision1>
5144	5144	<>	<elision1>
5144	3872	<3s>	<>
5145	5146	<>	<aphaerese>
5145	5149	<elision3>	<elision3>
5145	5146	<>	<elision3>
5145	5149	<elision2>	<elision2>
5145	5146	<>	<elision2>
5145	5149	<elision1>	<elision1>
5145	5146	<>	<elision1>
5145	3873	<3s>	<>
5146	5144	<>	<aphaerese>
5146	5147	<elision3>	<elision3>
5146	5144	<>	<elision3>
5146	5147	<elision2>	<elision2>
5146	5144	<>	<elision2>
5146	5147	<elision1>	<elision1>
5146	5144	<>	<elision1>
5146	3871	<3s>	<>
5147	5148	<>	<name>
5147	5147	<>	<aphaerese>
5147	5147	<>	<elision3>
5147	5147	<>	<elision2>
5147	5147	<>	<elision1>
5147	5096	.	κ
5147	3866	<3s>	<>
5148	5149	<>	<aphaerese>
5148	5149	<>	<elision3>
5148	5149	<>	<elision2>
5148	5149	<>	<elision1>
5148	5098	.	κ
5148	3867	<3s>	<>
5149	5147	<>	<aphaerese>
5149	5147	<>	<elision3>
5149	5147	<>	<elision2>
5149	5147	<>	<elision1>
5149	5096	.	κ
5149	3865	<3s>	<>
5150	5090	.	.
5150	5090	 	 
5150	5090	<~>	<~>
5150	5090	<split-s>	<split-s>
5150	5090	<split-h>	<split-h>
5150	5090	<name2>	<name2>
5150	5151	<>	<name>
5150	5093	<aphaerese>	<aphaerese>
5150	5150	<>	<aphaerese>
5150	5090	<elision3>	<elision3>
5150	5150	<>	<elision3>
5150	5090	<elision2>	<elision2>
5150	5150	<>	<elision2>
5150	5090	<elision1>	<elision1>
5150	5150	<>	<elision1>
5150	5099	.	υ
5150	5099	.	u
5150	5099	.	α
5150	5099	.	a
5150	3893	<3s>	<>
5151	5092	.	.
5151	5092	 	 
5151	5092	<~>	<~>
5151	5092	<split-s>	<split-s>
5151	5092	<split-h>	<split-h>
5151	5092	<name2>	<name2>
5151	5095	<aphaerese>	<aphaerese>
5151	5152	<>	<aphaerese>
5151	5092	<elision3>	<elision3>
5151	5152	<>	<elision3>
5151	5092	<elision2>	<elision2>
5151	5152	<>	<elision2>
5151	5092	<elision1>	<elision1>
5151	5152	<>	<elision1>
5151	5101	.	υ
5151	5101	.	u
5151	5101	.	α
5151	5101	.	a
5151	3894	<3s>	<>
5152	5090	.	.
5152	5090	 	 
5152	5090	<~>	<~>
5152	5090	<split-s>	<split-s>
5152	5090	<split-h>	<split-h>
5152	5090	<name2>	<name2>
5152	5093	<aphaerese>	<aphaerese>
5152	5150	<>	<aphaerese>
5152	5090	<elision3>	<elision3>
5152	5150	<>	<elision3>
5152	5090	<elision2>	<elision2>
5152	5150	<>	<elision2>
5152	5090	<elision1>	<elision1>
5152	5150	<>	<elision1>
5152	5099	.	υ
5152	5099	.	u
5152	5099	.	α
5152	5099	.	a
5152	3892	<3s>	<>
5153	5090	.	.
5153	5090	 	 
5153	5090	<~>	<~>
5153	5090	<split-s>	<split-s>
5153	5090	<split-h>	<split-h>
5153	5090	<name2>	<name2>
5153	4088	<name2>	<name>
5153	5151	<>	<name>
5153	5093	<aphaerese>	<aphaerese>
5153	5150	<>	<aphaerese>
5153	5090	<elision3>	<elision3>
5153	5150	<>	<elision3>
5153	5090	<elision2>	<elision2>
5153	5150	<>	<elision2>
5153	5090	<elision1>	<elision1>
5153	5150	<>	<elision1>
5153	5099	.	υ
5153	5099	.	u
5153	5099	.	α
5153	5099	.	a
5153	3902	<3s>	<>
5154	5155	<>	<name>
5154	5154	<>	<aphaerese>
5154	5154	<>	<elision3>
5154	5154	<>	<elision2>
5154	5154	<>	<elision1>
5154	5090	<A2kl>	<>
5155	5156	<>	<aphaerese>
5155	5156	<>	<elision3>
5155	5156	<>	<elision2>
5155	5156	<>	<elision1>
5155	5091	<A2kl>	<>
5156	5154	<>	<aphaerese>
5156	5154	<>	<elision3>
5156	5154	<>	<elision2>
5156	5154	<>	<elision1>
5156	5092	<A2kl>	<>
5157	4088	<name>	<name>
5157	5158	<>	<name>
5157	5160	<>	<aphaerese>
5157	5160	<>	<elision3>
5157	5160	<>	<elision2>
5157	5160	<>	<elision1>
5157	3898	<3s>	<>
5157	5132	<A2kl>	<>
5157	5164	<L2kl>	<>
5158	5159	<>	<aphaerese>
5158	5159	<>	<elision3>
5158	5159	<>	<elision2>
5158	5159	<>	<elision1>
5158	5133	<A2kl>	<>
5158	5162	<L2kl>	<>
5159	5160	<>	<aphaerese>
5159	5160	<>	<elision3>
5159	5160	<>	<elision2>
5159	5160	<>	<elision1>
5159	5134	<A2kl>	<>
5159	5163	<L2kl>	<>
5160	5158	<>	<name>
5160	5160	<>	<aphaerese>
5160	5160	<>	<elision3>
5160	5160	<>	<elision2>
5160	5160	<>	<elision1>
5160	5132	<A2kl>	<>
5160	5161	<L2kl>	<>
5161	5090	.	.
5161	5090	 	 
5161	5090	<~>	<~>
5161	5090	<split-s>	<split-s>
5161	5090	<split-h>	<split-h>
5161	5090	<name2>	<name2>
5161	5162	<>	<name>
5161	5093	<aphaerese>	<aphaerese>
5161	5161	<>	<aphaerese>
5161	5090	<elision3>	<elision3>
5161	5161	<>	<elision3>
5161	5090	<elision2>	<elision2>
5161	5161	<>	<elision2>
5161	5090	<elision1>	<elision1>
5161	5161	<>	<elision1>
5161	5099	.	υ
5161	5099	.	u
5161	5144	.	κ
5161	5099	.	α
5161	5099	.	a
5161	5144	.	λ
5161	3915	<3s>	<>
5162	5092	.	.
5162	5092	 	 
5162	5092	<~>	<~>
5162	5092	<split-s>	<split-s>
5162	5092	<split-h>	<split-h>
5162	5092	<name2>	<name2>
5162	5095	<aphaerese>	<aphaerese>
5162	5163	<>	<aphaerese>
5162	5092	<elision3>	<elision3>
5162	5163	<>	<elision3>
5162	5092	<elision2>	<elision2>
5162	5163	<>	<elision2>
5162	5092	<elision1>	<elision1>
5162	5163	<>	<elision1>
5162	5101	.	υ
5162	5101	.	u
5162	5146	.	κ
5162	5101	.	α
5162	5101	.	a
5162	5146	.	λ
5162	3916	<3s>	<>
5163	5090	.	.
5163	5090	 	 
5163	5090	<~>	<~>
5163	5090	<split-s>	<split-s>
5163	5090	<split-h>	<split-h>
5163	5090	<name2>	<name2>
5163	5093	<aphaerese>	<aphaerese>
5163	5161	<>	<aphaerese>
5163	5090	<elision3>	<elision3>
5163	5161	<>	<elision3>
5163	5090	<elision2>	<elision2>
5163	5161	<>	<elision2>
5163	5090	<elision1>	<elision1>
5163	5161	<>	<elision1>
5163	5099	.	υ
5163	5099	.	u
5163	5144	.	κ
5163	5099	.	α
5163	5099	.	a
5163	5144	.	λ
5163	3914	<3s>	<>
5164	5090	.	.
5164	5090	 	 
5164	5090	<~>	<~>
5164	5090	<split-s>	<split-s>
5164	5090	<split-h>	<split-h>
5164	5090	<name2>	<name2>
5164	4088	<name2>	<name>
5164	5162	<>	<name>
5164	5093	<aphaerese>	<aphaerese>
5164	5161	<>	<aphaerese>
5164	5090	<elision3>	<elision3>
5164	5161	<>	<elision3>
5164	5090	<elision2>	<elision2>
5164	5161	<>	<elision2>
5164	5090	<elision1>	<elision1>
5164	5161	<>	<elision1>
5164	5099	.	υ
5164	5099	.	u
5164	5144	.	κ
5164	5099	.	α
5164	5099	.	a
5164	5144	.	λ
5164	3921	<3s>	<>
5165	5090	.	.
5165	5090	 	 
5165	5090	<~>	<~>
5165	5090	<split-s>	<split-s>
5165	5090	<split-h>	<split-h>
5165	5090	<name2>	<name2>
5165	5102	<>	<name>
5165	5093	<aphaerese>	<aphaerese>
5165	5089	<>	<aphaerese>
5165	5089	<>	<elision3>
5165	5089	<>	<elision2>
5165	5089	<>	<elision1>
5165	5099	.	υ
5165	5099	.	u
5165	5096	.	κ
5165	5099	.	α
5165	5099	.	a
5165	3927	<3s>	<>
5166	5090	.	.
5166	5090	 	 
5166	5090	<~>	<~>
5166	5090	<split-s>	<split-s>
5166	5090	<split-h>	<split-h>
5166	5090	<name2>	<name2>
5166	5117	<>	<name>
5166	5093	<aphaerese>	<aphaerese>
5166	5116	<>	<aphaerese>
5166	5119	<elision3>	<elision3>
5166	5116	<>	<elision3>
5166	5119	<elision2>	<elision2>
5166	5116	<>	<elision2>
5166	5119	<elision1>	<elision1>
5166	5116	<>	<elision1>
5166	5099	.	υ
5166	5099	.	u
5166	5099	.	κ
5166	5099	.	α
5166	5099	.	a
5166	5099	.	λ
5166	3930	<3s>	<>
5167	5090	.	.
5167	5090	 	 
5167	5090	<~>	<~>
5167	5090	<split-s>	<split-s>
5167	5090	<split-h>	<split-h>
5167	5090	<name2>	<name2>
5167	5123	<>	<name>
5167	5093	<aphaerese>	<aphaerese>
5167	5122	<>	<aphaerese>
5167	5090	<elision3>	<elision3>
5167	5122	<>	<elision3>
5167	5090	<elision2>	<elision2>
5167	5122	<>	<elision2>
5167	5090	<elision1>	<elision1>
5167	5122	<>	<elision1>
5167	5099	.	υ
5167	5099	.	u
5167	5099	.	κ
5167	5099	.	α
5167	5099	.	a
5167	5099	.	λ
5167	3933	<3s>	<>
5168	5126	<>	<name>
5168	5125	<>	<aphaerese>
5168	5125	<>	<elision3>
5168	5125	<>	<elision2>
5168	5125	<>	<elision1>
5168	5169	<U2kl>	<>
5169	5090	.	.
5169	5090	 	 
5169	5090	<~>	<~>
5169	5090	<split-s>	<split-s>
5169	5090	<split-h>	<split-h>
5169	5090	<name2>	<name2>
5169	5091	<>	<name>
5169	5093	<aphaerese>	<aphaerese>
5169	5090	<>	<aphaerese>
5169	5090	<elision3>	<elision3>
5169	5090	<>	<elision3>
5169	5090	<elision2>	<elision2>
5169	5090	<>	<elision2>
5169	5090	<elision1>	<elision1>
5169	5090	<>	<elision1>
5169	5099	.	υ
5169	5099	.	u
5169	5096	.	κ
5169	5099	.	α
5169	5099	.	a
5169	3937	<3s>	<>
5170	4088	<name>	<name>
5170	5129	<>	<name>
5170	5131	<>	<aphaerese>
5170	5131	<>	<elision3>
5170	5131	<>	<elision2>
5170	5131	<>	<elision1>
5170	3898	<3s>	<>
5170	5132	<A2kl>	<>
5170	5141	<L2kl>	<>
5170	5171	<K2kl>	<>
5171	5090	.	.
5171	5090	 	 
5171	5090	<~>	<~>
5171	5090	<split-s>	<split-s>
5171	5090	<split-h>	<split-h>
5171	5090	<name2>	<name2>
5171	4088	<name2>	<name>
5171	5151	<>	<name>
5171	5093	<aphaerese>	<aphaerese>
5171	5150	<>	<aphaerese>
5171	5090	<elision3>	<elision3>
5171	5150	<>	<elision3>
5171	5090	<elision2>	<elision2>
5171	5150	<>	<elision2>
5171	5090	<elision1>	<elision1>
5171	5150	<>	<elision1>
5171	5099	.	υ
5171	5099	.	u
5171	5099	.	α
5171	5099	.	a
5171	3941	<3s>	<>
5172	5155	<>	<name>
5172	5154	<>	<aphaerese>
5172	5154	<>	<elision3>
5172	5154	<>	<elision2>
5172	5154	<>	<elision1>
5172	5169	<A2kl>	<>
5173	4088	<name>	<name>
5173	5158	<>	<name>
5173	5160	<>	<aphaerese>
5173	5160	<>	<elision3>
5173	5160	<>	<elision2>
5173	5160	<>	<elision1>
5173	3898	<3s>	<>
5173	5132	<A2kl>	<>
5173	5174	<L2kl>	<>
5174	5090	.	.
5174	5090	 	 
5174	5090	<~>	<~>
5174	5090	<split-s>	<split-s>
5174	5090	<split-h>	<split-h>
5174	5090	<name2>	<name2>
5174	4088	<name2>	<name>
5174	5162	<>	<name>
5174	5093	<aphaerese>	<aphaerese>
5174	5161	<>	<aphaerese>
5174	5090	<elision3>	<elision3>
5174	5161	<>	<elision3>
5174	5090	<elision2>	<elision2>
5174	5161	<>	<elision2>
5174	5090	<elision1>	<elision1>
5174	5161	<>	<elision1>
5174	5099	.	υ
5174	5099	.	u
5174	5144	.	κ
5174	5099	.	α
5174	5099	.	a
5174	5144	.	λ
5174	3946	<3s>	<>
5175	5081	.	.
5175	5082	 	 
5175	5081	<~>	<~>
5175	5081	<split-s>	<split-s>
5175	5081	<split-h>	<split-h>
5175	5081	<name2>	<name2>
5175	5085	<aphaerese>	<aphaerese>
5175	5085	<>	<aphaerese>
5175	5081	<elision3>	<elision3>
5175	5085	<>	<elision3>
5175	5081	<elision2>	<elision2>
5175	5085	<>	<elision2>
5175	5081	<elision1>	<elision1>
5175	5085	<>	<elision1>
5175	5081	.	υ
5175	5081	.	u
5175	5104	.	κ
5175	5116	s	κ
5175	5122	s	k
5175	5125	s	U
5175	5176	s	K
5175	5081	.	α
5175	5081	.	a
5175	5154	s	A
5175	5122	s	λ
5175	5122	s	l
5175	5183	s	L
5176	4088	<name>	<name>
5176	5177	<>	<name>
5176	5179	<>	<aphaerese>
5176	5179	<>	<elision3>
5176	5179	<>	<elision2>
5176	5179	<>	<elision1>
5176	3898	<3s>	<>
5176	5180	<L2kl>	<>
5176	5153	<K2kl>	<>
5177	5178	<>	<aphaerese>
5177	5178	<>	<elision3>
5177	5178	<>	<elision2>
5177	5178	<>	<elision1>
5177	5181	<L2kl>	<>
5177	5151	<K2kl>	<>
5178	5179	<>	<aphaerese>
5178	5179	<>	<elision3>
5178	5179	<>	<elision2>
5178	5179	<>	<elision1>
5178	5182	<L2kl>	<>
5178	5152	<K2kl>	<>
5179	5177	<>	<name>
5179	5179	<>	<aphaerese>
5179	5179	<>	<elision3>
5179	5179	<>	<elision2>
5179	5179	<>	<elision1>
5179	5180	<L2kl>	<>
5179	5150	<K2kl>	<>
5180	5181	<>	<name>
5180	5180	<>	<aphaerese>
5180	5180	<>	<elision3>
5180	5180	<>	<elision2>
5180	5180	<>	<elision1>
5180	5099	.	κ
5180	5099	.	λ
5180	3957	<3s>	<>
5181	5182	<>	<aphaerese>
5181	5182	<>	<elision3>
5181	5182	<>	<elision2>
5181	5182	<>	<elision1>
5181	5101	.	κ
5181	5101	.	λ
5181	3958	<3s>	<>
5182	5180	<>	<aphaerese>
5182	5180	<>	<elision3>
5182	5180	<>	<elision2>
5182	5180	<>	<elision1>
5182	5099	.	κ
5182	5099	.	λ
5182	3956	<3s>	<>
5183	4088	<name>	<name>
5183	5184	<>	<name>
5183	5186	<>	<aphaerese>
5183	5186	<>	<elision3>
5183	5186	<>	<elision2>
5183	5186	<>	<elision1>
5183	3898	<3s>	<>
5183	5187	<L2kl>	<>
5184	5185	<>	<aphaerese>
5184	5185	<>	<elision3>
5184	5185	<>	<elision2>
5184	5185	<>	<elision1>
5184	5123	<L2kl>	<>
5185	5186	<>	<aphaerese>
5185	5186	<>	<elision3>
5185	5186	<>	<elision2>
5185	5186	<>	<elision1>
5185	5124	<L2kl>	<>
5186	5184	<>	<name>
5186	5186	<>	<aphaerese>
5186	5186	<>	<elision3>
5186	5186	<>	<elision2>
5186	5186	<>	<elision1>
5186	5122	<L2kl>	<>
5187	5090	.	.
5187	5090	 	 
5187	5090	<~>	<~>
5187	5090	<split-s>	<split-s>
5187	5090	<split-h>	<split-h>
5187	5090	<name2>	<name2>
5187	4088	<name2>	<name>
5187	5123	<>	<name>
5187	5093	<aphaerese>	<aphaerese>
5187	5122	<>	<aphaerese>
5187	5090	<elision3>	<elision3>
5187	5122	<>	<elision3>
5187	5090	<elision2>	<elision2>
5187	5122	<>	<elision2>
5187	5090	<elision1>	<elision1>
5187	5122	<>	<elision1>
5187	5099	.	υ
5187	5099	.	u
5187	5099	.	κ
5187	5099	.	α
5187	5099	.	a
5187	5099	.	λ
5187	3967	<3s>	<>
5188	5081	.	.
5188	5082	 	 
5188	5081	<~>	<~>
5188	5081	<split-s>	<split-s>
5188	5081	<split-h>	<split-h>
5188	5081	<name2>	<name2>
5188	5085	<aphaerese>	<aphaerese>
5188	5088	<>	<aphaerese>
5188	5081	<elision3>	<elision3>
5188	5088	<>	<elision3>
5188	5081	<elision2>	<elision2>
5188	5088	<>	<elision2>
5188	5081	<elision1>	<elision1>
5188	5088	<>	<elision1>
5188	5078	.	υ
5188	5089	s	υ
5188	5078	.	u
5188	5089	s	u
5188	5104	.	κ
5188	5116	s	κ
5188	5122	s	k
5188	5125	s	U
5188	5128	s	K
5188	5078	.	α
5188	5089	s	α
5188	5078	.	a
5188	5089	s	a
5188	5154	s	A
5188	5122	s	λ
5188	5122	s	l
5188	5157	s	L
5189	5084	.	.
5189	5087	 	 
5189	5084	<~>	<~>
5189	5084	<split-s>	<split-s>
5189	5084	<split-h>	<split-h>
5189	5084	<name2>	<name2>
5189	5175	<aphaerese>	<aphaerese>
5189	5084	<>	<aphaerese>
5189	5084	<elision3>	<elision3>
5189	5084	<>	<elision3>
5189	5084	<elision2>	<elision2>
5189	5084	<>	<elision2>
5189	5084	<elision1>	<elision1>
5189	5084	<>	<elision1>
5189	5080	.	υ
5189	5103	s	υ
5189	5080	.	u
5189	5103	s	u
5189	5106	.	κ
5189	5118	s	κ
5189	5124	s	k
5189	5127	s	U
5189	5178	s	K
5189	5080	.	α
5189	5103	s	α
5189	5080	.	a
5189	5103	s	a
5189	5156	s	A
5189	5124	s	λ
5189	5124	s	l
5189	5185	s	L
5190	5081	.	.
5190	5082	 	 
5190	5081	<~>	<~>
5190	5081	<split-s>	<split-s>
5190	5081	<split-h>	<split-h>
5190	5081	<name2>	<name2>
5190	5191	<name2>	<name>
5190	5192	<>	<name>
5190	5085	<aphaerese>	<aphaerese>
5190	5194	<>	<aphaerese>
5190	5081	<elision3>	<elision3>
5190	5194	<>	<elision3>
5190	5081	<elision2>	<elision2>
5190	5194	<>	<elision2>
5190	5081	<elision1>	<elision1>
5190	5194	<>	<elision1>
5190	5078	.	υ
5190	5089	s	υ
5190	5078	.	u
5190	5089	s	u
5190	5078	.	κ
5190	5195	s	κ
5190	5122	s	k
5190	5125	s	U
5190	5176	s	K
5190	5078	.	α
5190	5089	s	α
5190	5078	.	a
5190	5089	s	a
5190	5154	s	A
5190	5078	.	λ
5190	5195	s	λ
5190	5122	s	l
5190	5183	s	L
5191	5178	s	k
5191	5185	s	l
5192	5084	.	.
5192	5087	 	 
5192	5084	<~>	<~>
5192	5084	<split-s>	<split-s>
5192	5084	<split-h>	<split-h>
5192	5084	<name2>	<name2>
5192	5175	<aphaerese>	<aphaerese>
5192	5193	<>	<aphaerese>
5192	5084	<elision3>	<elision3>
5192	5193	<>	<elision3>
5192	5084	<elision2>	<elision2>
5192	5193	<>	<elision2>
5192	5084	<elision1>	<elision1>
5192	5193	<>	<elision1>
5192	5080	.	υ
5192	5103	s	υ
5192	5080	.	u
5192	5103	s	u
5192	5080	.	κ
5192	5197	s	κ
5192	5124	s	k
5192	5127	s	U
5192	5178	s	K
5192	5080	.	α
5192	5103	s	α
5192	5080	.	a
5192	5103	s	a
5192	5156	s	A
5192	5080	.	λ
5192	5197	s	λ
5192	5124	s	l
5192	5185	s	L
5193	5081	.	.
5193	5082	 	 
5193	5081	<~>	<~>
5193	5081	<split-s>	<split-s>
5193	5081	<split-h>	<split-h>
5193	5081	<name2>	<name2>
5193	5085	<aphaerese>	<aphaerese>
5193	5194	<>	<aphaerese>
5193	5081	<elision3>	<elision3>
5193	5194	<>	<elision3>
5193	5081	<elision2>	<elision2>
5193	5194	<>	<elision2>
5193	5081	<elision1>	<elision1>
5193	5194	<>	<elision1>
5193	5078	.	υ
5193	5089	s	υ
5193	5078	.	u
5193	5089	s	u
5193	5078	.	κ
5193	5195	s	κ
5193	5122	s	k
5193	5125	s	U
5193	5176	s	K
5193	5078	.	α
5193	5089	s	α
5193	5078	.	a
5193	5089	s	a
5193	5154	s	A
5193	5078	.	λ
5193	5195	s	λ
5193	5122	s	l
5193	5183	s	L
5194	5081	.	.
5194	5082	 	 
5194	5081	<~>	<~>
5194	5081	<split-s>	<split-s>
5194	5081	<split-h>	<split-h>
5194	5081	<name2>	<name2>
5194	5192	<>	<name>
5194	5085	<aphaerese>	<aphaerese>
5194	5194	<>	<aphaerese>
5194	5081	<elision3>	<elision3>
5194	5194	<>	<elision3>
5194	5081	<elision2>	<elision2>
5194	5194	<>	<elision2>
5194	5081	<elision1>	<elision1>
5194	5194	<>	<elision1>
5194	5078	.	υ
5194	5089	s	υ
5194	5078	.	u
5194	5089	s	u
5194	5078	.	κ
5194	5195	s	κ
5194	5122	s	k
5194	5125	s	U
5194	5176	s	K
5194	5078	.	α
5194	5089	s	α
5194	5078	.	a
5194	5089	s	a
5194	5154	s	A
5194	5078	.	λ
5194	5195	s	λ
5194	5122	s	l
5194	5183	s	L
5195	5090	.	.
5195	5090	 	 
5195	5090	<~>	<~>
5195	5090	<split-s>	<split-s>
5195	5090	<split-h>	<split-h>
5195	5090	<name2>	<name2>
5195	5196	<>	<name>
5195	5093	<aphaerese>	<aphaerese>
5195	5195	<>	<aphaerese>
5195	5195	<>	<elision3>
5195	5195	<>	<elision2>
5195	5195	<>	<elision1>
5195	5099	.	υ
5195	5099	.	u
5195	5099	.	κ
5195	5099	.	α
5195	5099	.	a
5195	5099	.	λ
5195	3992	<3s>	<>
5196	5092	.	.
5196	5092	 	 
5196	5092	<~>	<~>
5196	5092	<split-s>	<split-s>
5196	5092	<split-h>	<split-h>
5196	5092	<name2>	<name2>
5196	5095	<aphaerese>	<aphaerese>
5196	5197	<>	<aphaerese>
5196	5197	<>	<elision3>
5196	5197	<>	<elision2>
5196	5197	<>	<elision1>
5196	5101	.	υ
5196	5101	.	u
5196	5101	.	κ
5196	5101	.	α
5196	5101	.	a
5196	5101	.	λ
5196	3993	<3s>	<>
5197	5090	.	.
5197	5090	 	 
5197	5090	<~>	<~>
5197	5090	<split-s>	<split-s>
5197	5090	<split-h>	<split-h>
5197	5090	<name2>	<name2>
5197	5093	<aphaerese>	<aphaerese>
5197	5195	<>	<aphaerese>
5197	5195	<>	<elision3>
5197	5195	<>	<elision2>
5197	5195	<>	<elision1>
5197	5099	.	υ
5197	5099	.	u
5197	5099	.	κ
5197	5099	.	α
5197	5099	.	a
5197	5099	.	λ
5197	3991	<3s>	<>
5198	5199	<>	<aphaerese>
5198	5199	<>	<elision3>
5198	5199	<>	<elision2>
5198	5199	<>	<elision1>
5198	4267	s	κ
5198	4392	s	k
5198	4410	s	K
5198	4267	s	λ
5198	4423	s	l
5198	4426	s	L
5198	3600	<1s>	<>
5198	5202	<~>	<>
5199	5200	<>	<name>
5199	5199	<>	<aphaerese>
5199	5199	<>	<elision3>
5199	5199	<>	<elision2>
5199	5199	<>	<elision1>
5199	4267	s	κ
5199	4392	s	k
5199	4410	s	K
5199	4267	s	λ
5199	4423	s	l
5199	4426	s	L
5199	3601	<1s>	<>
5199	5203	<~>	<>
5200	5198	<>	<aphaerese>
5200	5198	<>	<elision3>
5200	5198	<>	<elision2>
5200	5198	<>	<elision1>
5200	4388	s	κ
5200	4394	s	k
5200	4413	s	K
5200	4388	s	λ
5200	4425	s	l
5200	4428	s	L
5200	3602	<1s>	<>
5200	5201	<~>	<>
5201	5202	<>	<aphaerese>
5201	5202	<>	<elision3>
5201	5202	<>	<elision2>
5201	5202	<>	<elision1>
5201	5077	h	k
5201	5077	h	K
5201	5193	h	l
5201	5193	h	L
5202	5203	<>	<aphaerese>
5202	5203	<>	<elision3>
5202	5203	<>	<elision2>
5202	5203	<>	<elision1>
5202	5075	h	k
5202	5075	h	K
5202	5194	h	l
5202	5204	h	L
5203	5201	<>	<name>
5203	5203	<>	<aphaerese>
5203	5203	<>	<elision3>
5203	5203	<>	<elision2>
5203	5203	<>	<elision1>
5203	5075	h	k
5203	5075	h	K
5203	5194	h	l
5203	5204	h	L
5204	5081	.	.
5204	5082	 	 
5204	5081	<~>	<~>
5204	5081	<split-s>	<split-s>
5204	5081	<split-h>	<split-h>
5204	5081	<name2>	<name2>
5204	5191	<name2>	<name>
5204	5191	<name>	<name>
5204	5192	<>	<name>
5204	5085	<aphaerese>	<aphaerese>
5204	5194	<>	<aphaerese>
5204	5081	<elision3>	<elision3>
5204	5194	<>	<elision3>
5204	5081	<elision2>	<elision2>
5204	5194	<>	<elision2>
5204	5081	<elision1>	<elision1>
5204	5194	<>	<elision1>
5204	5078	.	υ
5204	5089	s	υ
5204	5078	.	u
5204	5089	s	u
5204	5078	.	κ
5204	5195	s	κ
5204	5122	s	k
5204	5125	s	U
5204	5176	s	K
5204	5078	.	α
5204	5089	s	α
5204	5078	.	a
5204	5089	s	a
5204	5154	s	A
5204	5078	.	λ
5204	5195	s	λ
5204	5122	s	l
5204	5183	s	L
5205	5206	<>	<aphaerese>
5205	189	<elision3>	<elision3>
5205	5206	<>	<elision3>
5205	189	<elision2>	<elision2>
5205	5206	<>	<elision2>
5205	189	<elision1>	<elision1>
5205	5206	<>	<elision1>
5205	4886	<K>	<>
5206	5207	<>	<name>
5206	5206	<>	<aphaerese>
5206	189	<elision3>	<elision3>
5206	5206	<>	<elision3>
5206	189	<elision2>	<elision2>
5206	5206	<>	<elision2>
5206	189	<elision1>	<elision1>
5206	5206	<>	<elision1>
5206	4884	<K>	<>
5207	5205	<>	<aphaerese>
5207	191	<elision3>	<elision3>
5207	5205	<>	<elision3>
5207	191	<elision2>	<elision2>
5207	5205	<>	<elision2>
5207	191	<elision1>	<elision1>
5207	5205	<>	<elision1>
5207	4885	<K>	<>
5208	179	.	.
5208	180	 	 
5208	179	<~>	<~>
5208	179	<split-s>	<split-s>
5208	179	<split-h>	<split-h>
5208	179	<name2>	<name2>
5208	183	<aphaerese>	<aphaerese>
5208	5209	<>	<aphaerese>
5208	179	<elision3>	<elision3>
5208	5209	<>	<elision3>
5208	179	<elision2>	<elision2>
5208	5209	<>	<elision2>
5208	179	<elision1>	<elision1>
5208	5209	<>	<elision1>
5208	179	.	υ
5208	179	.	u
5208	186	.	κ
5208	4454	H	κ
5208	4782	H	k
5208	4795	H	U
5208	4798	H	K
5208	179	.	α
5208	179	.	a
5208	4625	H	A
5208	4809	H	λ
5208	5212	H	l
5208	5217	H	L
5208	4883	<K>	<>
5209	179	.	.
5209	180	 	 
5209	179	<~>	<~>
5209	179	<split-s>	<split-s>
5209	179	<split-h>	<split-h>
5209	179	<name2>	<name2>
5209	5210	<>	<name>
5209	183	<aphaerese>	<aphaerese>
5209	5209	<>	<aphaerese>
5209	179	<elision3>	<elision3>
5209	5209	<>	<elision3>
5209	179	<elision2>	<elision2>
5209	5209	<>	<elision2>
5209	179	<elision1>	<elision1>
5209	5209	<>	<elision1>
5209	179	.	υ
5209	179	.	u
5209	186	.	κ
5209	4454	H	κ
5209	4782	H	k
5209	4795	H	U
5209	4798	H	K
5209	179	.	α
5209	179	.	a
5209	4625	H	A
5209	4809	H	λ
5209	5212	H	l
5209	5217	H	L
5209	4881	<K>	<>
5210	178	.	.
5210	182	 	 
5210	178	<~>	<~>
5210	178	<split-s>	<split-s>
5210	178	<split-h>	<split-h>
5210	178	<name2>	<name2>
5210	185	<aphaerese>	<aphaerese>
5210	5208	<>	<aphaerese>
5210	178	<elision3>	<elision3>
5210	5208	<>	<elision3>
5210	178	<elision2>	<elision2>
5210	5208	<>	<elision2>
5210	178	<elision1>	<elision1>
5210	5208	<>	<elision1>
5210	178	.	υ
5210	178	.	u
5210	188	.	κ
5210	4819	H	κ
5210	4823	H	k
5210	4797	H	U
5210	4827	H	K
5210	178	.	α
5210	178	.	a
5210	4628	H	A
5210	4811	H	λ
5210	5211	H	l
5210	5214	H	L
5210	4882	<K>	<>
5211	5212	<>	<aphaerese>
5211	5212	<>	<elision3>
5211	5212	<>	<elision2>
5211	5212	<>	<elision1>
5211	5073	<~>	<>
5211	4812	<l2L>	<>
5212	5213	<>	<name>
5212	5212	<>	<aphaerese>
5212	5212	<>	<elision3>
5212	5212	<>	<elision2>
5212	5212	<>	<elision1>
5212	5074	<~>	<>
5212	4813	<l2L>	<>
5213	5211	<>	<aphaerese>
5213	5211	<>	<elision3>
5213	5211	<>	<elision2>
5213	5211	<>	<elision1>
5213	5072	<~>	<>
5213	4814	<l2L>	<>
5214	4625	.	.
5214	4626	 	 
5214	4625	<~>	<~>
5214	4625	<split-s>	<split-s>
5214	4625	<split-h>	<split-h>
5214	4625	<name2>	<name2>
5214	4629	<aphaerese>	<aphaerese>
5214	5215	<>	<aphaerese>
5214	4625	<elision3>	<elision3>
5214	5215	<>	<elision3>
5214	4625	<elision2>	<elision2>
5214	5215	<>	<elision2>
5214	4625	<elision1>	<elision1>
5214	5215	<>	<elision1>
5214	4633	.	υ
5214	4636	s	υ
5214	4633	.	u
5214	4636	s	u
5214	4633	.	κ
5214	4267	s	κ
5214	4392	s	k
5214	4682	s	U
5214	4410	s	K
5214	4633	.	α
5214	4707	s	α
5214	4633	.	a
5214	4707	s	a
5214	4710	s	A
5214	4633	.	λ
5214	4267	s	λ
5214	4423	s	l
5214	4426	s	L
5214	3777	<1s>	<>
5214	5202	<~>	<>
5215	4625	.	.
5215	4626	 	 
5215	4625	<~>	<~>
5215	4625	<split-s>	<split-s>
5215	4625	<split-h>	<split-h>
5215	4625	<name2>	<name2>
5215	5216	<>	<name>
5215	4629	<aphaerese>	<aphaerese>
5215	5215	<>	<aphaerese>
5215	4625	<elision3>	<elision3>
5215	5215	<>	<elision3>
5215	4625	<elision2>	<elision2>
5215	5215	<>	<elision2>
5215	4625	<elision1>	<elision1>
5215	5215	<>	<elision1>
5215	4633	.	υ
5215	4636	s	υ
5215	4633	.	u
5215	4636	s	u
5215	4633	.	κ
5215	4267	s	κ
5215	4392	s	k
5215	4682	s	U
5215	4410	s	K
5215	4633	.	α
5215	4707	s	α
5215	4633	.	a
5215	4707	s	a
5215	4710	s	A
5215	4633	.	λ
5215	4267	s	λ
5215	4423	s	l
5215	4426	s	L
5215	3778	<1s>	<>
5215	5203	<~>	<>
5216	4628	.	.
5216	4631	 	 
5216	4628	<~>	<~>
5216	4628	<split-s>	<split-s>
5216	4628	<split-h>	<split-h>
5216	4628	<name2>	<name2>
5216	4737	<aphaerese>	<aphaerese>
5216	5214	<>	<aphaerese>
5216	4628	<elision3>	<elision3>
5216	5214	<>	<elision3>
5216	4628	<elision2>	<elision2>
5216	5214	<>	<elision2>
5216	4628	<elision1>	<elision1>
5216	5214	<>	<elision1>
5216	4635	.	υ
5216	4638	s	υ
5216	4635	.	u
5216	4638	s	u
5216	4635	.	κ
5216	4388	s	κ
5216	4394	s	k
5216	4684	s	U
5216	4413	s	K
5216	4635	.	α
5216	4709	s	α
5216	4635	.	a
5216	4709	s	a
5216	4712	s	A
5216	4635	.	λ
5216	4388	s	λ
5216	4425	s	l
5216	4428	s	L
5216	3779	<1s>	<>
5216	5201	<~>	<>
5217	4625	.	.
5217	4626	 	 
5217	4625	<~>	<~>
5217	4625	<split-s>	<split-s>
5217	4625	<split-h>	<split-h>
5217	4625	<name2>	<name2>
5217	4805	<name2>	<name>
5217	5216	<>	<name>
5217	4629	<aphaerese>	<aphaerese>
5217	5215	<>	<aphaerese>
5217	4625	<elision3>	<elision3>
5217	5215	<>	<elision3>
5217	4625	<elision2>	<elision2>
5217	5215	<>	<elision2>
5217	4625	<elision1>	<elision1>
5217	5215	<>	<elision1>
5217	4633	.	υ
5217	4636	s	υ
5217	4633	.	u
5217	4636	s	u
5217	4633	.	κ
5217	4267	s	κ
5217	4392	s	k
5217	4682	s	U
5217	4410	s	K
5217	4633	.	α
5217	4707	s	α
5217	4633	.	a
5217	4707	s	a
5217	4710	s	A
5217	4633	.	λ
5217	4267	s	λ
5217	4423	s	l
5217	4426	s	L
5217	3967	<1s>	<>
5217	5203	<~>	<>
5217	4804	<l2L>	<>
5218	5219	<>	<name>
5218	5218	<>	<aphaerese>
5218	5054	<elision3>	<elision3>
5218	5218	<>	<elision3>
5218	5054	<elision2>	<elision2>
5218	5218	<>	<elision2>
5218	5054	<elision1>	<elision1>
5218	5218	<>	<elision1>
5218	176	<4s>	<>
5219	5220	<>	<aphaerese>
5219	5056	<elision3>	<elision3>
5219	5220	<>	<elision3>
5219	5056	<elision2>	<elision2>
5219	5220	<>	<elision2>
5219	5056	<elision1>	<elision1>
5219	5220	<>	<elision1>
5219	177	<4s>	<>
5220	5218	<>	<aphaerese>
5220	5054	<elision3>	<elision3>
5220	5218	<>	<elision3>
5220	5054	<elision2>	<elision2>
5220	5218	<>	<elision2>
5220	5054	<elision1>	<elision1>
5220	5218	<>	<elision1>
5220	175	<4s>	<>
5221	179	.	.
5221	180	 	 
5221	179	<~>	<~>
5221	179	<split-s>	<split-s>
5221	179	<split-h>	<split-h>
5221	179	<name2>	<name2>
5221	183	<aphaerese>	<aphaerese>
5221	5222	<>	<aphaerese>
5221	179	<elision3>	<elision3>
5221	5222	<>	<elision3>
5221	179	<elision2>	<elision2>
5221	5222	<>	<elision2>
5221	179	<elision1>	<elision1>
5221	5222	<>	<elision1>
5221	4828	.	υ
5221	4872	H	υ
5221	4828	.	u
5221	4874	H	u
5221	186	.	κ
5221	4454	H	κ
5221	4782	H	k
5221	4795	H	U
5221	4798	H	K
5221	4828	.	α
5221	4858	H	α
5221	4828	.	a
5221	4863	H	a
5221	4625	H	A
5221	4809	H	λ
5221	5212	H	l
5221	5217	H	L
5221	4880	<K>	<>
5222	179	.	.
5222	180	 	 
5222	179	<~>	<~>
5222	179	<split-s>	<split-s>
5222	179	<split-h>	<split-h>
5222	179	<name2>	<name2>
5222	5223	<>	<name>
5222	183	<aphaerese>	<aphaerese>
5222	5222	<>	<aphaerese>
5222	179	<elision3>	<elision3>
5222	5222	<>	<elision3>
5222	179	<elision2>	<elision2>
5222	5222	<>	<elision2>
5222	179	<elision1>	<elision1>
5222	5222	<>	<elision1>
5222	4828	.	υ
5222	4872	H	υ
5222	4828	.	u
5222	4874	H	u
5222	186	.	κ
5222	4454	H	κ
5222	4782	H	k
5222	4795	H	U
5222	4798	H	K
5222	4828	.	α
5222	4858	H	α
5222	4828	.	a
5222	4863	H	a
5222	4625	H	A
5222	4809	H	λ
5222	5212	H	l
5222	5217	H	L
5222	4878	<K>	<>
5223	178	.	.
5223	182	 	 
5223	178	<~>	<~>
5223	178	<split-s>	<split-s>
5223	178	<split-h>	<split-h>
5223	178	<name2>	<name2>
5223	185	<aphaerese>	<aphaerese>
5223	5221	<>	<aphaerese>
5223	178	<elision3>	<elision3>
5223	5221	<>	<elision3>
5223	178	<elision2>	<elision2>
5223	5221	<>	<elision2>
5223	178	<elision1>	<elision1>
5223	5221	<>	<elision1>
5223	4830	.	υ
5223	4867	H	υ
5223	4830	.	u
5223	4871	H	u
5223	188	.	κ
5223	4819	H	κ
5223	4823	H	k
5223	4797	H	U
5223	4827	H	K
5223	4830	.	α
5223	4857	H	α
5223	4830	.	a
5223	4862	H	a
5223	4628	H	A
5223	4811	H	λ
5223	5211	H	l
5223	5214	H	L
5223	4879	<K>	<>
5224	5056	.	.
5224	5056	 	 
5224	5056	<~>	<~>
5224	5056	<split-s>	<split-s>
5224	5056	<split-h>	<split-h>
5224	5056	<name2>	<name2>
5224	5059	<aphaerese>	<aphaerese>
5224	5225	<>	<aphaerese>
5224	5225	<>	<elision3>
5224	5225	<>	<elision2>
5224	5225	<>	<elision1>
5224	5220	.	υ
5224	5220	.	u
5224	5062	.	κ
5224	5220	.	α
5224	5220	.	a
5224	5228	<4s>	<>
5225	5054	.	.
5225	5054	 	 
5225	5054	<~>	<~>
5225	5054	<split-s>	<split-s>
5225	5054	<split-h>	<split-h>
5225	5054	<name2>	<name2>
5225	5057	<aphaerese>	<aphaerese>
5225	5053	<>	<aphaerese>
5225	5053	<>	<elision3>
5225	5053	<>	<elision2>
5225	5053	<>	<elision1>
5225	5218	.	υ
5225	5218	.	u
5225	5060	.	κ
5225	5218	.	α
5225	5218	.	a
5225	5226	<4s>	<>
5226	179	.	.
5226	180	 	 
5226	179	<~>	<~>
5226	179	<split-s>	<split-s>
5226	179	<split-h>	<split-h>
5226	179	<name2>	<name2>
5226	183	<aphaerese>	<aphaerese>
5226	5227	<>	<aphaerese>
5226	5227	<>	<elision3>
5226	5227	<>	<elision2>
5226	5227	<>	<elision1>
5226	4828	.	υ
5226	4872	H	υ
5226	4828	.	u
5226	4874	H	u
5226	186	.	κ
5226	4454	H	κ
5226	4782	H	k
5226	4795	H	U
5226	4798	H	K
5226	4828	.	α
5226	4858	H	α
5226	4828	.	a
5226	4863	H	a
5226	4625	H	A
5226	4809	H	λ
5226	5212	H	l
5226	5217	H	L
5226	5230	<K>	<>
5227	179	.	.
5227	180	 	 
5227	179	<~>	<~>
5227	179	<split-s>	<split-s>
5227	179	<split-h>	<split-h>
5227	179	<name2>	<name2>
5227	5228	<>	<name>
5227	183	<aphaerese>	<aphaerese>
5227	5227	<>	<aphaerese>
5227	5227	<>	<elision3>
5227	5227	<>	<elision2>
5227	5227	<>	<elision1>
5227	4828	.	υ
5227	4872	H	υ
5227	4828	.	u
5227	4874	H	u
5227	186	.	κ
5227	4454	H	κ
5227	4782	H	k
5227	4795	H	U
5227	4798	H	K
5227	4828	.	α
5227	4858	H	α
5227	4828	.	a
5227	4863	H	a
5227	4625	H	A
5227	4809	H	λ
5227	5212	H	l
5227	5217	H	L
5227	5231	<K>	<>
5228	178	.	.
5228	182	 	 
5228	178	<~>	<~>
5228	178	<split-s>	<split-s>
5228	178	<split-h>	<split-h>
5228	178	<name2>	<name2>
5228	185	<aphaerese>	<aphaerese>
5228	5226	<>	<aphaerese>
5228	5226	<>	<elision3>
5228	5226	<>	<elision2>
5228	5226	<>	<elision1>
5228	4830	.	υ
5228	4867	H	υ
5228	4830	.	u
5228	4871	H	u
5228	188	.	κ
5228	4819	H	κ
5228	4823	H	k
5228	4797	H	U
5228	4827	H	K
5228	4830	.	α
5228	4857	H	α
5228	4830	.	a
5228	4862	H	a
5228	4628	H	A
5228	4811	H	λ
5228	5211	H	l
5228	5214	H	L
5228	5229	<K>	<>
5229	4880	.	.
5229	4880	<~>	<~>
5229	4880	<split-s>	<split-s>
5229	4880	<split-h>	<split-h>
5229	4880	<name2>	<name2>
5229	4883	<aphaerese>	<aphaerese>
5229	5230	<>	<aphaerese>
5229	5230	<>	<elision3>
5229	5230	<>	<elision2>
5229	5230	<>	<elision1>
5229	4876	.	υ
5229	5022	H	υ
5229	4876	.	u
5229	5031	H	u
5229	4886	.	κ
5229	4937	H	κ
5229	4991	H	k
5229	5000	H	U
5229	5004	H	K
5229	4876	.	α
5229	5034	H	α
5229	4876	.	a
5229	5037	H	a
5229	4971	H	A
5229	5012	H	λ
5229	5018	H	l
5229	5013	H	L
5230	4878	.	.
5230	4878	<~>	<~>
5230	4878	<split-s>	<split-s>
5230	4878	<split-h>	<split-h>
5230	4878	<name2>	<name2>
5230	4881	<aphaerese>	<aphaerese>
5230	5231	<>	<aphaerese>
5230	5231	<>	<elision3>
5230	5231	<>	<elision2>
5230	5231	<>	<elision1>
5230	4877	.	υ
5230	5020	H	υ
5230	4877	.	u
5230	5029	H	u
5230	4884	.	κ
5230	4935	H	κ
5230	4989	H	k
5230	4998	H	U
5230	5001	H	K
5230	4877	.	α
5230	5032	H	α
5230	4877	.	a
5230	5035	H	a
5230	4969	H	A
5230	5010	H	λ
5230	5016	H	l
5230	5019	H	L
5231	4878	.	.
5231	4878	<~>	<~>
5231	4878	<split-s>	<split-s>
5231	4878	<split-h>	<split-h>
5231	4878	<name2>	<name2>
5231	5229	<>	<name>
5231	4881	<aphaerese>	<aphaerese>
5231	5231	<>	<aphaerese>
5231	5231	<>	<elision3>
5231	5231	<>	<elision2>
5231	5231	<>	<elision1>
5231	4877	.	υ
5231	5020	H	υ
5231	4877	.	u
5231	5029	H	u
5231	4884	.	κ
5231	4935	H	κ
5231	4989	H	k
5231	4998	H	U
5231	5001	H	K
5231	4877	.	α
5231	5032	H	α
5231	4877	.	a
5231	5035	H	a
5231	4969	H	A
5231	5010	H	λ
5231	5016	H	l
5231	5019	H	L
5232	5233	<>	<name>
5232	5232	<>	<aphaerese>
5232	5235	<elision3>	<elision3>
5232	5232	<>	<elision3>
5232	5235	<elision2>	<elision2>
5232	5232	<>	<elision2>
5232	5235	<elision1>	<elision1>
5232	5232	<>	<elision1>
5232	5301	<split-h>	<>
5233	5234	<>	<aphaerese>
5233	5237	<elision3>	<elision3>
5233	5234	<>	<elision3>
5233	5237	<elision2>	<elision2>
5233	5234	<>	<elision2>
5233	5237	<elision1>	<elision1>
5233	5234	<>	<elision1>
5233	5302	<split-h>	<>
5234	5232	<>	<aphaerese>
5234	5235	<elision3>	<elision3>
5234	5232	<>	<elision3>
5234	5235	<elision2>	<elision2>
5234	5232	<>	<elision2>
5234	5235	<elision1>	<elision1>
5234	5232	<>	<elision1>
5234	5300	<split-h>	<>
5235	5236	<>	<name>
5235	5235	<>	<aphaerese>
5235	5235	<>	<elision3>
5235	5235	<>	<elision2>
5235	5235	<>	<elision1>
5235	5238	s	κ
5235	5238	s	k
5235	5291	s	K
5235	5238	s	λ
5235	5238	s	l
5235	5294	s	L
5235	5298	<split-h>	<>
5236	5237	<>	<aphaerese>
5236	5237	<>	<elision3>
5236	5237	<>	<elision2>
5236	5237	<>	<elision1>
5236	5240	s	κ
5236	5240	s	k
5236	5293	s	K
5236	5240	s	λ
5236	5240	s	l
5236	5296	s	L
5236	5299	<split-h>	<>
5237	5235	<>	<aphaerese>
5237	5235	<>	<elision3>
5237	5235	<>	<elision2>
5237	5235	<>	<elision1>
5237	5238	s	κ
5237	5238	s	k
5237	5291	s	K
5237	5238	s	λ
5237	5238	s	l
5237	5294	s	L
5237	5297	<split-h>	<>
5238	5239	<>	<name>
5238	5238	<>	<aphaerese>
5238	5238	<>	<elision3>
5238	5238	<>	<elision2>
5238	5238	<>	<elision1>
5238	5242	<4s>	<>
5239	5240	<>	<aphaerese>
5239	5240	<>	<elision3>
5239	5240	<>	<elision2>
5239	5240	<>	<elision1>
5239	5243	<4s>	<>
5240	5238	<>	<aphaerese>
5240	5238	<>	<elision3>
5240	5238	<>	<elision2>
5240	5238	<>	<elision1>
5240	5241	<4s>	<>
5241	5242	<>	<aphaerese>
5241	5242	<>	<elision3>
5241	5242	<>	<elision2>
5241	5242	<>	<elision1>
5241	5287	H	κ
5241	4782	H	k
5241	4798	H	K
5241	5264	H	λ
5241	5212	H	l
5241	5217	H	L
5241	5270	<K>	<>
5242	5243	<>	<name>
5242	5242	<>	<aphaerese>
5242	5242	<>	<elision3>
5242	5242	<>	<elision2>
5242	5242	<>	<elision1>
5242	5287	H	κ
5242	4782	H	k
5242	4798	H	K
5242	5264	H	λ
5242	5212	H	l
5242	5217	H	L
5242	5271	<K>	<>
5243	5241	<>	<aphaerese>
5243	5241	<>	<elision3>
5243	5241	<>	<elision2>
5243	5241	<>	<elision1>
5243	5244	H	κ
5243	4823	H	k
5243	4827	H	K
5243	5263	H	λ
5243	5211	H	l
5243	5214	H	L
5243	5269	<K>	<>
5244	5245	<>	<aphaerese>
5244	5245	<>	<elision3>
5244	5245	<>	<elision2>
5244	5245	<>	<elision1>
5244	5248	<kappa2K>	<>
5244	5260	<kappa2L>	<>
5244	4778	<lambda2L>	<>
5245	5246	<>	<name>
5245	5245	<>	<aphaerese>
5245	5245	<>	<elision3>
5245	5245	<>	<elision2>
5245	5245	<>	<elision1>
5245	5249	<kappa2K>	<>
5245	5252	<kappa2L>	<>
5245	4776	<lambda2L>	<>
5246	5247	<>	<aphaerese>
5246	5247	<>	<elision3>
5246	5247	<>	<elision2>
5246	5247	<>	<elision1>
5246	5250	<kappa2K>	<>
5246	5253	<kappa2L>	<>
5246	4777	<lambda2L>	<>
5247	5245	<>	<aphaerese>
5247	5245	<>	<elision3>
5247	5245	<>	<elision2>
5247	5245	<>	<elision1>
5247	5248	<kappa2K>	<>
5247	5251	<kappa2L>	<>
5247	4778	<lambda2L>	<>
5248	4459	.	.
5248	4460	 	 
5248	4459	<~>	<~>
5248	4459	<split-s>	<split-s>
5248	4459	<split-h>	<split-h>
5248	4459	<name2>	<name2>
5248	4463	<aphaerese>	<aphaerese>
5248	5249	<>	<aphaerese>
5248	5249	<>	<elision3>
5248	5249	<>	<elision2>
5248	5249	<>	<elision1>
5248	4467	.	υ
5248	4470	s	υ
5248	4467	.	u
5248	4470	s	u
5248	199	s	κ
5248	4208	s	k
5248	4533	s	U
5248	4241	s	K
5248	4467	.	α
5248	4561	s	α
5248	4467	.	a
5248	4561	s	a
5248	4564	s	A
5248	199	s	λ
5248	4256	s	l
5248	4259	s	L
5249	4459	.	.
5249	4460	 	 
5249	4459	<~>	<~>
5249	4459	<split-s>	<split-s>
5249	4459	<split-h>	<split-h>
5249	4459	<name2>	<name2>
5249	5250	<>	<name>
5249	4463	<aphaerese>	<aphaerese>
5249	5249	<>	<aphaerese>
5249	5249	<>	<elision3>
5249	5249	<>	<elision2>
5249	5249	<>	<elision1>
5249	4467	.	υ
5249	4470	s	υ
5249	4467	.	u
5249	4470	s	u
5249	199	s	κ
5249	4208	s	k
5249	4533	s	U
5249	4241	s	K
5249	4467	.	α
5249	4561	s	α
5249	4467	.	a
5249	4561	s	a
5249	4564	s	A
5249	199	s	λ
5249	4256	s	l
5249	4259	s	L
5250	4462	.	.
5250	4465	 	 
5250	4462	<~>	<~>
5250	4462	<split-s>	<split-s>
5250	4462	<split-h>	<split-h>
5250	4462	<name2>	<name2>
5250	4591	<aphaerese>	<aphaerese>
5250	5248	<>	<aphaerese>
5250	5248	<>	<elision3>
5250	5248	<>	<elision2>
5250	5248	<>	<elision1>
5250	4469	.	υ
5250	4472	s	υ
5250	4469	.	u
5250	4472	s	u
5250	4201	s	κ
5250	4210	s	k
5250	4535	s	U
5250	4244	s	K
5250	4469	.	α
5250	4563	s	α
5250	4469	.	a
5250	4563	s	a
5250	4566	s	A
5250	4201	s	λ
5250	4258	s	l
5250	4261	s	L
5251	4625	.	.
5251	4626	 	 
5251	4625	<~>	<~>
5251	4625	<split-s>	<split-s>
5251	4625	<split-h>	<split-h>
5251	4625	<name2>	<name2>
5251	4629	<aphaerese>	<aphaerese>
5251	5252	<>	<aphaerese>
5251	5252	<>	<elision3>
5251	5252	<>	<elision2>
5251	5252	<>	<elision1>
5251	4633	.	υ
5251	4636	s	υ
5251	4633	.	u
5251	4636	s	u
5251	4267	s	κ
5251	4392	s	k
5251	4682	s	U
5251	4410	s	K
5251	4633	.	α
5251	4707	s	α
5251	4633	.	a
5251	4707	s	a
5251	4710	s	A
5251	4267	s	λ
5251	4423	s	l
5251	4426	s	L
5251	5255	<1s>	<>
5252	4625	.	.
5252	4626	 	 
5252	4625	<~>	<~>
5252	4625	<split-s>	<split-s>
5252	4625	<split-h>	<split-h>
5252	4625	<name2>	<name2>
5252	5253	<>	<name>
5252	4629	<aphaerese>	<aphaerese>
5252	5252	<>	<aphaerese>
5252	5252	<>	<elision3>
5252	5252	<>	<elision2>
5252	5252	<>	<elision1>
5252	4633	.	υ
5252	4636	s	υ
5252	4633	.	u
5252	4636	s	u
5252	4267	s	κ
5252	4392	s	k
5252	4682	s	U
5252	4410	s	K
5252	4633	.	α
5252	4707	s	α
5252	4633	.	a
5252	4707	s	a
5252	4710	s	A
5252	4267	s	λ
5252	4423	s	l
5252	4426	s	L
5252	5256	<1s>	<>
5253	4628	.	.
5253	4631	 	 
5253	4628	<~>	<~>
5253	4628	<split-s>	<split-s>
5253	4628	<split-h>	<split-h>
5253	4628	<name2>	<name2>
5253	4737	<aphaerese>	<aphaerese>
5253	5251	<>	<aphaerese>
5253	5251	<>	<elision3>
5253	5251	<>	<elision2>
5253	5251	<>	<elision1>
5253	4635	.	υ
5253	4638	s	υ
5253	4635	.	u
5253	4638	s	u
5253	4388	s	κ
5253	4394	s	k
5253	4684	s	U
5253	4413	s	K
5253	4635	.	α
5253	4709	s	α
5253	4635	.	a
5253	4709	s	a
5253	4712	s	A
5253	4388	s	λ
5253	4425	s	l
5253	4428	s	L
5253	5254	<1s>	<>
5254	214	.	.
5254	218	 	 
5254	214	<~>	<~>
5254	214	<split-s>	<split-s>
5254	214	<split-h>	<split-h>
5254	214	<name2>	<name2>
5254	221	<aphaerese>	<aphaerese>
5254	5255	<>	<aphaerese>
5254	5255	<>	<elision3>
5254	5255	<>	<elision2>
5254	5255	<>	<elision1>
5254	3189	.	υ
5254	3226	H	υ
5254	3189	.	u
5254	3230	H	u
5254	3603	H	κ
5254	3182	H	k
5254	3156	H	U
5254	3186	H	K
5254	3189	.	α
5254	3216	H	α
5254	3189	.	a
5254	3221	H	a
5254	2987	H	A
5254	3622	H	λ
5254	3570	H	l
5254	3573	H	L
5254	5258	<K>	<>
5255	215	.	.
5255	216	 	 
5255	215	<~>	<~>
5255	215	<split-s>	<split-s>
5255	215	<split-h>	<split-h>
5255	215	<name2>	<name2>
5255	219	<aphaerese>	<aphaerese>
5255	5256	<>	<aphaerese>
5255	5256	<>	<elision3>
5255	5256	<>	<elision2>
5255	5256	<>	<elision1>
5255	3187	.	υ
5255	3231	H	υ
5255	3187	.	u
5255	3233	H	u
5255	3646	H	κ
5255	3141	H	k
5255	3154	H	U
5255	3157	H	K
5255	3187	.	α
5255	3217	H	α
5255	3187	.	a
5255	3222	H	a
5255	2984	H	A
5255	3623	H	λ
5255	3571	H	l
5255	3576	H	L
5255	5259	<K>	<>
5256	215	.	.
5256	216	 	 
5256	215	<~>	<~>
5256	215	<split-s>	<split-s>
5256	215	<split-h>	<split-h>
5256	215	<name2>	<name2>
5256	5254	<>	<name>
5256	219	<aphaerese>	<aphaerese>
5256	5256	<>	<aphaerese>
5256	5256	<>	<elision3>
5256	5256	<>	<elision2>
5256	5256	<>	<elision1>
5256	3187	.	υ
5256	3231	H	υ
5256	3187	.	u
5256	3233	H	u
5256	3646	H	κ
5256	3141	H	k
5256	3154	H	U
5256	3157	H	K
5256	3187	.	α
5256	3217	H	α
5256	3187	.	a
5256	3222	H	a
5256	2984	H	A
5256	3623	H	λ
5256	3571	H	l
5256	3576	H	L
5256	5257	<K>	<>
5257	3237	.	.
5257	3237	<~>	<~>
5257	3237	<split-s>	<split-s>
5257	3237	<split-h>	<split-h>
5257	3237	<name2>	<name2>
5257	5258	<>	<name>
5257	3240	<aphaerese>	<aphaerese>
5257	5257	<>	<aphaerese>
5257	5257	<>	<elision3>
5257	5257	<>	<elision2>
5257	5257	<>	<elision1>
5257	3236	.	υ
5257	3379	H	υ
5257	3236	.	u
5257	3388	H	u
5257	3631	H	κ
5257	3348	H	k
5257	3357	H	U
5257	3360	H	K
5257	3236	.	α
5257	3391	H	α
5257	3236	.	a
5257	3394	H	a
5257	3328	H	A
5257	3640	H	λ
5257	3375	H	l
5257	3378	H	L
5258	3239	.	.
5258	3239	<~>	<~>
5258	3239	<split-s>	<split-s>
5258	3239	<split-h>	<split-h>
5258	3239	<name2>	<name2>
5258	3242	<aphaerese>	<aphaerese>
5258	5259	<>	<aphaerese>
5258	5259	<>	<elision3>
5258	5259	<>	<elision2>
5258	5259	<>	<elision1>
5258	3235	.	υ
5258	3381	H	υ
5258	3235	.	u
5258	3390	H	u
5258	3633	H	κ
5258	3350	H	k
5258	3359	H	U
5258	3363	H	K
5258	3235	.	α
5258	3393	H	α
5258	3235	.	a
5258	3396	H	a
5258	3330	H	A
5258	3642	H	λ
5258	3377	H	l
5258	3372	H	L
5259	3237	.	.
5259	3237	<~>	<~>
5259	3237	<split-s>	<split-s>
5259	3237	<split-h>	<split-h>
5259	3237	<name2>	<name2>
5259	3240	<aphaerese>	<aphaerese>
5259	5257	<>	<aphaerese>
5259	5257	<>	<elision3>
5259	5257	<>	<elision2>
5259	5257	<>	<elision1>
5259	3236	.	υ
5259	3379	H	υ
5259	3236	.	u
5259	3388	H	u
5259	3631	H	κ
5259	3348	H	k
5259	3357	H	U
5259	3360	H	K
5259	3236	.	α
5259	3391	H	α
5259	3236	.	a
5259	3394	H	a
5259	3328	H	A
5259	3640	H	λ
5259	3375	H	l
5259	3378	H	L
5260	4625	.	.
5260	4626	 	 
5260	4625	<~>	<~>
5260	4625	<split-s>	<split-s>
5260	4625	<split-h>	<split-h>
5260	4625	<name2>	<name2>
5260	4629	<aphaerese>	<aphaerese>
5260	5252	<>	<aphaerese>
5260	5252	<>	<elision3>
5260	5252	<>	<elision2>
5260	5252	<>	<elision1>
5260	4633	.	υ
5260	4636	s	υ
5260	4633	.	u
5260	4636	s	u
5260	4267	s	κ
5260	4392	s	k
5260	4682	s	U
5260	4410	s	K
5260	4633	.	α
5260	4707	s	α
5260	4633	.	a
5260	4707	s	a
5260	4710	s	A
5260	4267	s	λ
5260	4423	s	l
5260	4426	s	L
5260	5261	<1s>	<>
5261	215	.	.
5261	216	 	 
5261	215	<~>	<~>
5261	215	<split-s>	<split-s>
5261	215	<split-h>	<split-h>
5261	215	<name2>	<name2>
5261	219	<aphaerese>	<aphaerese>
5261	5256	<>	<aphaerese>
5261	5256	<>	<elision3>
5261	5256	<>	<elision2>
5261	5256	<>	<elision1>
5261	3187	.	υ
5261	3187	.	u
5261	3187	.	α
5261	3187	.	a
5261	5262	<K>	<>
5262	3237	.	.
5262	3237	<~>	<~>
5262	3237	<split-s>	<split-s>
5262	3237	<split-h>	<split-h>
5262	3237	<name2>	<name2>
5262	3240	<aphaerese>	<aphaerese>
5262	5257	<>	<aphaerese>
5262	5257	<>	<elision3>
5262	5257	<>	<elision2>
5262	5257	<>	<elision1>
5262	3236	.	υ
5262	3236	.	u
5262	3236	.	α
5262	3236	.	a
5263	5264	<>	<aphaerese>
5263	5264	<>	<elision3>
5263	5264	<>	<elision2>
5263	5264	<>	<elision1>
5263	5267	<lambda2L>	<>
5264	5265	<>	<name>
5264	5264	<>	<aphaerese>
5264	5264	<>	<elision3>
5264	5264	<>	<elision2>
5264	5264	<>	<elision1>
5264	5268	<lambda2L>	<>
5265	5263	<>	<aphaerese>
5265	5263	<>	<elision3>
5265	5263	<>	<elision2>
5265	5263	<>	<elision1>
5265	5266	<lambda2L>	<>
5266	4628	.	.
5266	4631	 	 
5266	4628	<~>	<~>
5266	4628	<split-s>	<split-s>
5266	4628	<split-h>	<split-h>
5266	4628	<name2>	<name2>
5266	4737	<aphaerese>	<aphaerese>
5266	5267	<>	<aphaerese>
5266	5267	<>	<elision3>
5266	5267	<>	<elision2>
5266	5267	<>	<elision1>
5266	4635	.	υ
5266	4638	s	υ
5266	4635	.	u
5266	4638	s	u
5266	4635	.	κ
5266	4388	s	κ
5266	4394	s	k
5266	4684	s	U
5266	4413	s	K
5266	4635	.	α
5266	4709	s	α
5266	4635	.	a
5266	4709	s	a
5266	4712	s	A
5266	4635	.	λ
5266	4388	s	λ
5266	4425	s	l
5266	4428	s	L
5266	3993	<1s>	<>
5267	4625	.	.
5267	4626	 	 
5267	4625	<~>	<~>
5267	4625	<split-s>	<split-s>
5267	4625	<split-h>	<split-h>
5267	4625	<name2>	<name2>
5267	4629	<aphaerese>	<aphaerese>
5267	5268	<>	<aphaerese>
5267	5268	<>	<elision3>
5267	5268	<>	<elision2>
5267	5268	<>	<elision1>
5267	4633	.	υ
5267	4636	s	υ
5267	4633	.	u
5267	4636	s	u
5267	4633	.	κ
5267	4267	s	κ
5267	4392	s	k
5267	4682	s	U
5267	4410	s	K
5267	4633	.	α
5267	4707	s	α
5267	4633	.	a
5267	4707	s	a
5267	4710	s	A
5267	4633	.	λ
5267	4267	s	λ
5267	4423	s	l
5267	4426	s	L
5267	3991	<1s>	<>
5268	4625	.	.
5268	4626	 	 
5268	4625	<~>	<~>
5268	4625	<split-s>	<split-s>
5268	4625	<split-h>	<split-h>
5268	4625	<name2>	<name2>
5268	5266	<>	<name>
5268	4629	<aphaerese>	<aphaerese>
5268	5268	<>	<aphaerese>
5268	5268	<>	<elision3>
5268	5268	<>	<elision2>
5268	5268	<>	<elision1>
5268	4633	.	υ
5268	4636	s	υ
5268	4633	.	u
5268	4636	s	u
5268	4633	.	κ
5268	4267	s	κ
5268	4392	s	k
5268	4682	s	U
5268	4410	s	K
5268	4633	.	α
5268	4707	s	α
5268	4633	.	a
5268	4707	s	a
5268	4710	s	A
5268	4633	.	λ
5268	4267	s	λ
5268	4423	s	l
5268	4426	s	L
5268	3992	<1s>	<>
5269	5270	<>	<aphaerese>
5269	5270	<>	<elision3>
5269	5270	<>	<elision2>
5269	5270	<>	<elision1>
5269	5274	H	κ
5269	4991	H	k
5269	5004	H	K
5269	5283	H	λ
5269	5018	H	l
5269	5013	H	L
5270	5271	<>	<aphaerese>
5270	5271	<>	<elision3>
5270	5271	<>	<elision2>
5270	5271	<>	<elision1>
5270	5272	H	κ
5270	4989	H	k
5270	5001	H	K
5270	5281	H	λ
5270	5016	H	l
5270	5019	H	L
5271	5269	<>	<name>
5271	5271	<>	<aphaerese>
5271	5271	<>	<elision3>
5271	5271	<>	<elision2>
5271	5271	<>	<elision1>
5271	5272	H	κ
5271	4989	H	k
5271	5001	H	K
5271	5281	H	λ
5271	5016	H	l
5271	5019	H	L
5272	5273	<>	<name>
5272	5272	<>	<aphaerese>
5272	5272	<>	<elision3>
5272	5272	<>	<elision2>
5272	5272	<>	<elision1>
5272	5276	<kappa2K>	<>
5272	5279	<kappa2L>	<>
5272	4987	<lambda2L>	<>
5273	5274	<>	<aphaerese>
5273	5274	<>	<elision3>
5273	5274	<>	<elision2>
5273	5274	<>	<elision1>
5273	5277	<kappa2K>	<>
5273	5280	<kappa2L>	<>
5273	4988	<lambda2L>	<>
5274	5272	<>	<aphaerese>
5274	5272	<>	<elision3>
5274	5272	<>	<elision2>
5274	5272	<>	<elision1>
5274	5275	<kappa2K>	<>
5274	5278	<kappa2L>	<>
5274	4986	<lambda2L>	<>
5275	4939	.	.
5275	4939	<~>	<~>
5275	4939	<split-s>	<split-s>
5275	4939	<split-h>	<split-h>
5275	4939	<name2>	<name2>
5275	4942	<aphaerese>	<aphaerese>
5275	5276	<>	<aphaerese>
5275	5276	<>	<elision3>
5275	5276	<>	<elision2>
5275	5276	<>	<elision1>
5275	4957	.	υ
5275	4910	s	υ
5275	4957	.	u
5275	4910	s	u
5275	4897	s	κ
5275	4897	s	k
5275	4951	s	U
5275	4906	s	K
5275	4957	.	α
5275	4910	s	α
5275	4957	.	a
5275	4910	s	a
5275	4954	s	A
5275	4897	s	λ
5275	4897	s	l
5275	4912	s	L
5275	4903	<1m>	<>
5276	4939	.	.
5276	4939	<~>	<~>
5276	4939	<split-s>	<split-s>
5276	4939	<split-h>	<split-h>
5276	4939	<name2>	<name2>
5276	5277	<>	<name>
5276	4942	<aphaerese>	<aphaerese>
5276	5276	<>	<aphaerese>
5276	5276	<>	<elision3>
5276	5276	<>	<elision2>
5276	5276	<>	<elision1>
5276	4957	.	υ
5276	4910	s	υ
5276	4957	.	u
5276	4910	s	u
5276	4897	s	κ
5276	4897	s	k
5276	4951	s	U
5276	4906	s	K
5276	4957	.	α
5276	4910	s	α
5276	4957	.	a
5276	4910	s	a
5276	4954	s	A
5276	4897	s	λ
5276	4897	s	l
5276	4912	s	L
5276	4904	<1m>	<>
5277	4941	.	.
5277	4941	<~>	<~>
5277	4941	<split-s>	<split-s>
5277	4941	<split-h>	<split-h>
5277	4941	<name2>	<name2>
5277	4944	<aphaerese>	<aphaerese>
5277	5275	<>	<aphaerese>
5277	5275	<>	<elision3>
5277	5275	<>	<elision2>
5277	5275	<>	<elision1>
5277	4959	.	υ
5277	4909	s	υ
5277	4959	.	u
5277	4909	s	u
5277	4896	s	κ
5277	4896	s	k
5277	4953	s	U
5277	4905	s	K
5277	4959	.	α
5277	4909	s	α
5277	4959	.	a
5277	4909	s	a
5277	4956	s	A
5277	4896	s	λ
5277	4896	s	l
5277	4911	s	L
5277	4902	<1m>	<>
5278	4969	.	.
5278	4969	<~>	<~>
5278	4969	<split-s>	<split-s>
5278	4969	<split-h>	<split-h>
5278	4969	<name2>	<name2>
5278	4972	<aphaerese>	<aphaerese>
5278	5279	<>	<aphaerese>
5278	5279	<>	<elision3>
5278	5279	<>	<elision2>
5278	5279	<>	<elision1>
5278	4975	.	υ
5278	4910	s	υ
5278	4975	.	u
5278	4910	s	u
5278	4918	s	κ
5278	4921	H	κ
5278	4918	s	k
5278	4921	H	k
5278	4951	s	U
5278	4906	s	K
5278	4921	H	K
5278	4975	.	α
5278	4910	s	α
5278	4975	.	a
5278	4910	s	a
5278	4954	s	A
5278	4918	s	λ
5278	4921	H	λ
5278	4918	s	l
5278	4921	H	l
5278	4912	s	L
5278	4921	H	L
5278	4903	<1m>	<>
5279	4969	.	.
5279	4969	<~>	<~>
5279	4969	<split-s>	<split-s>
5279	4969	<split-h>	<split-h>
5279	4969	<name2>	<name2>
5279	5280	<>	<name>
5279	4972	<aphaerese>	<aphaerese>
5279	5279	<>	<aphaerese>
5279	5279	<>	<elision3>
5279	5279	<>	<elision2>
5279	5279	<>	<elision1>
5279	4975	.	υ
5279	4910	s	υ
5279	4975	.	u
5279	4910	s	u
5279	4918	s	κ
5279	4921	H	κ
5279	4918	s	k
5279	4921	H	k
5279	4951	s	U
5279	4906	s	K
5279	4921	H	K
5279	4975	.	α
5279	4910	s	α
5279	4975	.	a
5279	4910	s	a
5279	4954	s	A
5279	4918	s	λ
5279	4921	H	λ
5279	4918	s	l
5279	4921	H	l
5279	4912	s	L
5279	4921	H	L
5279	4904	<1m>	<>
5280	4971	.	.
5280	4971	<~>	<~>
5280	4971	<split-s>	<split-s>
5280	4971	<split-h>	<split-h>
5280	4971	<name2>	<name2>
5280	4974	<aphaerese>	<aphaerese>
5280	5278	<>	<aphaerese>
5280	5278	<>	<elision3>
5280	5278	<>	<elision2>
5280	5278	<>	<elision1>
5280	4977	.	υ
5280	4909	s	υ
5280	4977	.	u
5280	4909	s	u
5280	4917	s	κ
5280	4920	H	κ
5280	4917	s	k
5280	4920	H	k
5280	4953	s	U
5280	4905	s	K
5280	4920	H	K
5280	4977	.	α
5280	4909	s	α
5280	4977	.	a
5280	4909	s	a
5280	4956	s	A
5280	4917	s	λ
5280	4920	H	λ
5280	4917	s	l
5280	4920	H	l
5280	4911	s	L
5280	4920	H	L
5280	4902	<1m>	<>
5281	5282	<>	<name>
5281	5281	<>	<aphaerese>
5281	5281	<>	<elision3>
5281	5281	<>	<elision2>
5281	5281	<>	<elision1>
5281	5285	<lambda2L>	<>
5282	5283	<>	<aphaerese>
5282	5283	<>	<elision3>
5282	5283	<>	<elision2>
5282	5283	<>	<elision1>
5282	5286	<lambda2L>	<>
5283	5281	<>	<aphaerese>
5283	5281	<>	<elision3>
5283	5281	<>	<elision2>
5283	5281	<>	<elision1>
5283	5284	<lambda2L>	<>
5284	4969	.	.
5284	4969	<~>	<~>
5284	4969	<split-s>	<split-s>
5284	4969	<split-h>	<split-h>
5284	4969	<name2>	<name2>
5284	4972	<aphaerese>	<aphaerese>
5284	5285	<>	<aphaerese>
5284	5285	<>	<elision3>
5284	5285	<>	<elision2>
5284	5285	<>	<elision1>
5284	4975	.	υ
5284	4910	s	υ
5284	4975	.	u
5284	4910	s	u
5284	4975	.	κ
5284	4918	s	κ
5284	4921	H	κ
5284	4918	s	k
5284	4921	H	k
5284	4951	s	U
5284	4906	s	K
5284	4921	H	K
5284	4975	.	α
5284	4910	s	α
5284	4975	.	a
5284	4910	s	a
5284	4954	s	A
5284	4975	.	λ
5284	4918	s	λ
5284	4921	H	λ
5284	4918	s	l
5284	4921	H	l
5284	4912	s	L
5284	4921	H	L
5284	4903	<1m>	<>
5285	4969	.	.
5285	4969	<~>	<~>
5285	4969	<split-s>	<split-s>
5285	4969	<split-h>	<split-h>
5285	4969	<name2>	<name2>
5285	5286	<>	<name>
5285	4972	<aphaerese>	<aphaerese>
5285	5285	<>	<aphaerese>
5285	5285	<>	<elision3>
5285	5285	<>	<elision2>
5285	5285	<>	<elision1>
5285	4975	.	υ
5285	4910	s	υ
5285	4975	.	u
5285	4910	s	u
5285	4975	.	κ
5285	4918	s	κ
5285	4921	H	κ
5285	4918	s	k
5285	4921	H	k
5285	4951	s	U
5285	4906	s	K
5285	4921	H	K
5285	4975	.	α
5285	4910	s	α
5285	4975	.	a
5285	4910	s	a
5285	4954	s	A
5285	4975	.	λ
5285	4918	s	λ
5285	4921	H	λ
5285	4918	s	l
5285	4921	H	l
5285	4912	s	L
5285	4921	H	L
5285	4904	<1m>	<>
5286	4971	.	.
5286	4971	<~>	<~>
5286	4971	<split-s>	<split-s>
5286	4971	<split-h>	<split-h>
5286	4971	<name2>	<name2>
5286	4974	<aphaerese>	<aphaerese>
5286	5284	<>	<aphaerese>
5286	5284	<>	<elision3>
5286	5284	<>	<elision2>
5286	5284	<>	<elision1>
5286	4977	.	υ
5286	4909	s	υ
5286	4977	.	u
5286	4909	s	u
5286	4977	.	κ
5286	4917	s	κ
5286	4920	H	κ
5286	4917	s	k
5286	4920	H	k
5286	4953	s	U
5286	4905	s	K
5286	4920	H	K
5286	4977	.	α
5286	4909	s	α
5286	4977	.	a
5286	4909	s	a
5286	4956	s	A
5286	4977	.	λ
5286	4917	s	λ
5286	4920	H	λ
5286	4917	s	l
5286	4920	H	l
5286	4911	s	L
5286	4920	H	L
5286	4902	<1m>	<>
5287	5246	<>	<name>
5287	5245	<>	<aphaerese>
5287	5245	<>	<elision3>
5287	5245	<>	<elision2>
5287	5245	<>	<elision1>
5287	5249	<kappa2K>	<>
5287	5288	<kappa2L>	<>
5287	4776	<lambda2L>	<>
5288	4625	.	.
5288	4626	 	 
5288	4625	<~>	<~>
5288	4625	<split-s>	<split-s>
5288	4625	<split-h>	<split-h>
5288	4625	<name2>	<name2>
5288	5253	<>	<name>
5288	4629	<aphaerese>	<aphaerese>
5288	5252	<>	<aphaerese>
5288	5252	<>	<elision3>
5288	5252	<>	<elision2>
5288	5252	<>	<elision1>
5288	4633	.	υ
5288	4636	s	υ
5288	4633	.	u
5288	4636	s	u
5288	4267	s	κ
5288	4392	s	k
5288	4682	s	U
5288	4410	s	K
5288	4633	.	α
5288	4707	s	α
5288	4633	.	a
5288	4707	s	a
5288	4710	s	A
5288	4267	s	λ
5288	4423	s	l
5288	4426	s	L
5288	5289	<1s>	<>
5289	215	.	.
5289	216	 	 
5289	215	<~>	<~>
5289	215	<split-s>	<split-s>
5289	215	<split-h>	<split-h>
5289	215	<name2>	<name2>
5289	5254	<>	<name>
5289	219	<aphaerese>	<aphaerese>
5289	5256	<>	<aphaerese>
5289	5256	<>	<elision3>
5289	5256	<>	<elision2>
5289	5256	<>	<elision1>
5289	3187	.	υ
5289	3187	.	u
5289	3187	.	α
5289	3187	.	a
5289	5290	<K>	<>
5290	3237	.	.
5290	3237	<~>	<~>
5290	3237	<split-s>	<split-s>
5290	3237	<split-h>	<split-h>
5290	3237	<name2>	<name2>
5290	5258	<>	<name>
5290	3240	<aphaerese>	<aphaerese>
5290	5257	<>	<aphaerese>
5290	5257	<>	<elision3>
5290	5257	<>	<elision2>
5290	5257	<>	<elision1>
5290	3236	.	υ
5290	3236	.	u
5290	3236	.	α
5290	3236	.	a
5291	5292	<>	<name>
5291	5291	<>	<aphaerese>
5291	5291	<>	<elision3>
5291	5291	<>	<elision2>
5291	5291	<>	<elision1>
5291	5238	<K2kl>	<>
5292	5293	<>	<aphaerese>
5292	5293	<>	<elision3>
5292	5293	<>	<elision2>
5292	5293	<>	<elision1>
5292	5239	<K2kl>	<>
5293	5291	<>	<aphaerese>
5293	5291	<>	<elision3>
5293	5291	<>	<elision2>
5293	5291	<>	<elision1>
5293	5240	<K2kl>	<>
5294	5295	<>	<name>
5294	5294	<>	<aphaerese>
5294	5294	<>	<elision3>
5294	5294	<>	<elision2>
5294	5294	<>	<elision1>
5294	5238	<L2kl>	<>
5295	5296	<>	<aphaerese>
5295	5296	<>	<elision3>
5295	5296	<>	<elision2>
5295	5296	<>	<elision1>
5295	5239	<L2kl>	<>
5296	5294	<>	<aphaerese>
5296	5294	<>	<elision3>
5296	5294	<>	<elision2>
5296	5294	<>	<elision1>
5296	5240	<L2kl>	<>
5297	5298	<>	<aphaerese>
5297	5298	<>	<elision3>
5297	5298	<>	<elision2>
5297	5298	<>	<elision1>
5297	5066	<3s>	<>
5298	5299	<>	<name>
5298	5298	<>	<aphaerese>
5298	5298	<>	<elision3>
5298	5298	<>	<elision2>
5298	5298	<>	<elision1>
5298	5067	<3s>	<>
5299	5297	<>	<aphaerese>
5299	5297	<>	<elision3>
5299	5297	<>	<elision2>
5299	5297	<>	<elision1>
5299	5068	<3s>	<>
5300	5301	<>	<aphaerese>
5300	5301	<>	<elision3>
5300	5301	<>	<elision2>
5300	5301	<>	<elision1>
5300	5205	<3s>	<>
5301	5302	<>	<name>
5301	5301	<>	<aphaerese>
5301	5301	<>	<elision3>
5301	5301	<>	<elision2>
5301	5301	<>	<elision1>
5301	5206	<3s>	<>
5302	5300	<>	<aphaerese>
5302	5300	<>	<elision3>
5302	5300	<>	<elision2>
5302	5300	<>	<elision1>
5302	5207	<3s>	<>
5303	5054	.	.
5303	5054	 	 
5303	5054	<~>	<~>
5303	5054	<split-s>	<split-s>
5303	5054	<split-h>	<split-h>
5303	5054	<name2>	<name2>
5303	5304	<>	<name>
5303	5057	<aphaerese>	<aphaerese>
5303	5303	<>	<aphaerese>
5303	5306	<elision3>	<elision3>
5303	5303	<>	<elision3>
5303	5306	<elision2>	<elision2>
5303	5303	<>	<elision2>
5303	5306	<elision1>	<elision1>
5303	5303	<>	<elision1>
5303	5218	.	υ
5303	5218	.	u
5303	5218	.	κ
5303	5218	.	α
5303	5218	.	a
5303	5218	.	λ
5303	5407	<4s>	<>
5304	5056	.	.
5304	5056	 	 
5304	5056	<~>	<~>
5304	5056	<split-s>	<split-s>
5304	5056	<split-h>	<split-h>
5304	5056	<name2>	<name2>
5304	5059	<aphaerese>	<aphaerese>
5304	5305	<>	<aphaerese>
5304	5308	<elision3>	<elision3>
5304	5305	<>	<elision3>
5304	5308	<elision2>	<elision2>
5304	5305	<>	<elision2>
5304	5308	<elision1>	<elision1>
5304	5305	<>	<elision1>
5304	5220	.	υ
5304	5220	.	u
5304	5220	.	κ
5304	5220	.	α
5304	5220	.	a
5304	5220	.	λ
5304	5408	<4s>	<>
5305	5054	.	.
5305	5054	 	 
5305	5054	<~>	<~>
5305	5054	<split-s>	<split-s>
5305	5054	<split-h>	<split-h>
5305	5054	<name2>	<name2>
5305	5057	<aphaerese>	<aphaerese>
5305	5303	<>	<aphaerese>
5305	5306	<elision3>	<elision3>
5305	5303	<>	<elision3>
5305	5306	<elision2>	<elision2>
5305	5303	<>	<elision2>
5305	5306	<elision1>	<elision1>
5305	5303	<>	<elision1>
5305	5218	.	υ
5305	5218	.	u
5305	5218	.	κ
5305	5218	.	α
5305	5218	.	a
5305	5218	.	λ
5305	5406	<4s>	<>
5306	5054	.	.
5306	5054	 	 
5306	5054	<~>	<~>
5306	5054	<split-s>	<split-s>
5306	5054	<split-h>	<split-h>
5306	5054	<name2>	<name2>
5306	5307	<>	<name>
5306	5057	<aphaerese>	<aphaerese>
5306	5306	<>	<aphaerese>
5306	5054	<elision3>	<elision3>
5306	5306	<>	<elision3>
5306	5054	<elision2>	<elision2>
5306	5306	<>	<elision2>
5306	5054	<elision1>	<elision1>
5306	5306	<>	<elision1>
5306	5218	.	υ
5306	5218	.	u
5306	5060	.	κ
5306	5218	.	α
5306	5218	.	a
5306	5310	<4s>	<>
5307	5056	.	.
5307	5056	 	 
5307	5056	<~>	<~>
5307	5056	<split-s>	<split-s>
5307	5056	<split-h>	<split-h>
5307	5056	<name2>	<name2>
5307	5059	<aphaerese>	<aphaerese>
5307	5308	<>	<aphaerese>
5307	5056	<elision3>	<elision3>
5307	5308	<>	<elision3>
5307	5056	<elision2>	<elision2>
5307	5308	<>	<elision2>
5307	5056	<elision1>	<elision1>
5307	5308	<>	<elision1>
5307	5220	.	υ
5307	5220	.	u
5307	5062	.	κ
5307	5220	.	α
5307	5220	.	a
5307	5311	<4s>	<>
5308	5054	.	.
5308	5054	 	 
5308	5054	<~>	<~>
5308	5054	<split-s>	<split-s>
5308	5054	<split-h>	<split-h>
5308	5054	<name2>	<name2>
5308	5057	<aphaerese>	<aphaerese>
5308	5306	<>	<aphaerese>
5308	5054	<elision3>	<elision3>
5308	5306	<>	<elision3>
5308	5054	<elision2>	<elision2>
5308	5306	<>	<elision2>
5308	5054	<elision1>	<elision1>
5308	5306	<>	<elision1>
5308	5218	.	υ
5308	5218	.	u
5308	5060	.	κ
5308	5218	.	α
5308	5218	.	a
5308	5309	<4s>	<>
5309	179	.	.
5309	180	 	 
5309	179	<~>	<~>
5309	179	<split-s>	<split-s>
5309	179	<split-h>	<split-h>
5309	179	<name2>	<name2>
5309	183	<aphaerese>	<aphaerese>
5309	5310	<>	<aphaerese>
5309	179	<elision3>	<elision3>
5309	5310	<>	<elision3>
5309	179	<elision2>	<elision2>
5309	5310	<>	<elision2>
5309	179	<elision1>	<elision1>
5309	5310	<>	<elision1>
5309	4828	.	υ
5309	4872	H	υ
5309	4828	.	u
5309	4874	H	u
5309	186	.	κ
5309	5393	H	κ
5309	5397	H	k
5309	4795	H	U
5309	5401	H	K
5309	4828	.	α
5309	4858	H	α
5309	4828	.	a
5309	4863	H	a
5309	4625	H	A
5309	5349	H	λ
5309	5355	H	l
5309	5405	H	L
5309	5358	<K>	<>
5310	179	.	.
5310	180	 	 
5310	179	<~>	<~>
5310	179	<split-s>	<split-s>
5310	179	<split-h>	<split-h>
5310	179	<name2>	<name2>
5310	5311	<>	<name>
5310	183	<aphaerese>	<aphaerese>
5310	5310	<>	<aphaerese>
5310	179	<elision3>	<elision3>
5310	5310	<>	<elision3>
5310	179	<elision2>	<elision2>
5310	5310	<>	<elision2>
5310	179	<elision1>	<elision1>
5310	5310	<>	<elision1>
5310	4828	.	υ
5310	4872	H	υ
5310	4828	.	u
5310	4874	H	u
5310	186	.	κ
5310	5393	H	κ
5310	5397	H	k
5310	4795	H	U
5310	5401	H	K
5310	4828	.	α
5310	4858	H	α
5310	4828	.	a
5310	4863	H	a
5310	4625	H	A
5310	5349	H	λ
5310	5355	H	l
5310	5405	H	L
5310	5359	<K>	<>
5311	178	.	.
5311	182	 	 
5311	178	<~>	<~>
5311	178	<split-s>	<split-s>
5311	178	<split-h>	<split-h>
5311	178	<name2>	<name2>
5311	185	<aphaerese>	<aphaerese>
5311	5309	<>	<aphaerese>
5311	178	<elision3>	<elision3>
5311	5309	<>	<elision3>
5311	178	<elision2>	<elision2>
5311	5309	<>	<elision2>
5311	178	<elision1>	<elision1>
5311	5309	<>	<elision1>
5311	4830	.	υ
5311	4867	H	υ
5311	4830	.	u
5311	4871	H	u
5311	188	.	κ
5311	5312	H	κ
5311	5331	H	k
5311	4797	H	U
5311	5344	H	K
5311	4830	.	α
5311	4857	H	α
5311	4830	.	a
5311	4862	H	a
5311	4628	H	A
5311	5348	H	λ
5311	5354	H	l
5311	5352	H	L
5311	5357	<K>	<>
5312	5313	<>	<aphaerese>
5312	5313	<>	<elision3>
5312	5313	<>	<elision2>
5312	5313	<>	<elision1>
5312	5316	<kappa2K>	<>
5312	5328	<kappa2L>	<>
5312	4778	<lambda2L>	<>
5313	5314	<>	<name>
5313	5313	<>	<aphaerese>
5313	5313	<>	<elision3>
5313	5313	<>	<elision2>
5313	5313	<>	<elision1>
5313	5317	<kappa2K>	<>
5313	5320	<kappa2L>	<>
5313	4776	<lambda2L>	<>
5314	5315	<>	<aphaerese>
5314	5315	<>	<elision3>
5314	5315	<>	<elision2>
5314	5315	<>	<elision1>
5314	5318	<kappa2K>	<>
5314	5321	<kappa2L>	<>
5314	4777	<lambda2L>	<>
5315	5313	<>	<aphaerese>
5315	5313	<>	<elision3>
5315	5313	<>	<elision2>
5315	5313	<>	<elision1>
5315	5316	<kappa2K>	<>
5315	5319	<kappa2L>	<>
5315	4778	<lambda2L>	<>
5316	4459	.	.
5316	4460	 	 
5316	4459	<~>	<~>
5316	4459	<split-s>	<split-s>
5316	4459	<split-h>	<split-h>
5316	4459	<name2>	<name2>
5316	4463	<aphaerese>	<aphaerese>
5316	5317	<>	<aphaerese>
5316	4596	<elision3>	<elision3>
5316	5317	<>	<elision3>
5316	4596	<elision2>	<elision2>
5316	5317	<>	<elision2>
5316	4596	<elision1>	<elision1>
5316	5317	<>	<elision1>
5316	4467	.	υ
5316	4470	s	υ
5316	4467	.	u
5316	4470	s	u
5316	4533	s	U
5316	4467	.	α
5316	4561	s	α
5316	4467	.	a
5316	4561	s	a
5316	4564	s	A
5317	4459	.	.
5317	4460	 	 
5317	4459	<~>	<~>
5317	4459	<split-s>	<split-s>
5317	4459	<split-h>	<split-h>
5317	4459	<name2>	<name2>
5317	5318	<>	<name>
5317	4463	<aphaerese>	<aphaerese>
5317	5317	<>	<aphaerese>
5317	4596	<elision3>	<elision3>
5317	5317	<>	<elision3>
5317	4596	<elision2>	<elision2>
5317	5317	<>	<elision2>
5317	4596	<elision1>	<elision1>
5317	5317	<>	<elision1>
5317	4467	.	υ
5317	4470	s	υ
5317	4467	.	u
5317	4470	s	u
5317	4533	s	U
5317	4467	.	α
5317	4561	s	α
5317	4467	.	a
5317	4561	s	a
5317	4564	s	A
5318	4462	.	.
5318	4465	 	 
5318	4462	<~>	<~>
5318	4462	<split-s>	<split-s>
5318	4462	<split-h>	<split-h>
5318	4462	<name2>	<name2>
5318	4591	<aphaerese>	<aphaerese>
5318	5316	<>	<aphaerese>
5318	4598	<elision3>	<elision3>
5318	5316	<>	<elision3>
5318	4598	<elision2>	<elision2>
5318	5316	<>	<elision2>
5318	4598	<elision1>	<elision1>
5318	5316	<>	<elision1>
5318	4469	.	υ
5318	4472	s	υ
5318	4469	.	u
5318	4472	s	u
5318	4535	s	U
5318	4469	.	α
5318	4563	s	α
5318	4469	.	a
5318	4563	s	a
5318	4566	s	A
5319	4625	.	.
5319	4626	 	 
5319	4625	<~>	<~>
5319	4625	<split-s>	<split-s>
5319	4625	<split-h>	<split-h>
5319	4625	<name2>	<name2>
5319	4629	<aphaerese>	<aphaerese>
5319	5320	<>	<aphaerese>
5319	4742	<elision3>	<elision3>
5319	5320	<>	<elision3>
5319	4742	<elision2>	<elision2>
5319	5320	<>	<elision2>
5319	4742	<elision1>	<elision1>
5319	5320	<>	<elision1>
5319	4633	.	υ
5319	4636	s	υ
5319	4633	.	u
5319	4636	s	u
5319	4682	s	U
5319	4633	.	α
5319	4707	s	α
5319	4633	.	a
5319	4707	s	a
5319	4710	s	A
5319	5323	<1s>	<>
5320	4625	.	.
5320	4626	 	 
5320	4625	<~>	<~>
5320	4625	<split-s>	<split-s>
5320	4625	<split-h>	<split-h>
5320	4625	<name2>	<name2>
5320	5321	<>	<name>
5320	4629	<aphaerese>	<aphaerese>
5320	5320	<>	<aphaerese>
5320	4742	<elision3>	<elision3>
5320	5320	<>	<elision3>
5320	4742	<elision2>	<elision2>
5320	5320	<>	<elision2>
5320	4742	<elision1>	<elision1>
5320	5320	<>	<elision1>
5320	4633	.	υ
5320	4636	s	υ
5320	4633	.	u
5320	4636	s	u
5320	4682	s	U
5320	4633	.	α
5320	4707	s	α
5320	4633	.	a
5320	4707	s	a
5320	4710	s	A
5320	5324	<1s>	<>
5321	4628	.	.
5321	4631	 	 
5321	4628	<~>	<~>
5321	4628	<split-s>	<split-s>
5321	4628	<split-h>	<split-h>
5321	4628	<name2>	<name2>
5321	4737	<aphaerese>	<aphaerese>
5321	5319	<>	<aphaerese>
5321	4744	<elision3>	<elision3>
5321	5319	<>	<elision3>
5321	4744	<elision2>	<elision2>
5321	5319	<>	<elision2>
5321	4744	<elision1>	<elision1>
5321	5319	<>	<elision1>
5321	4635	.	υ
5321	4638	s	υ
5321	4635	.	u
5321	4638	s	u
5321	4684	s	U
5321	4635	.	α
5321	4709	s	α
5321	4635	.	a
5321	4709	s	a
5321	4712	s	A
5321	5322	<1s>	<>
5322	214	.	.
5322	218	 	 
5322	214	<~>	<~>
5322	214	<split-s>	<split-s>
5322	214	<split-h>	<split-h>
5322	214	<name2>	<name2>
5322	221	<aphaerese>	<aphaerese>
5322	5323	<>	<aphaerese>
5322	3768	<elision3>	<elision3>
5322	5323	<>	<elision3>
5322	3768	<elision2>	<elision2>
5322	5323	<>	<elision2>
5322	3768	<elision1>	<elision1>
5322	5323	<>	<elision1>
5322	3189	.	υ
5322	3226	H	υ
5322	3189	.	u
5322	3230	H	u
5322	3156	H	U
5322	3189	.	α
5322	3216	H	α
5322	3189	.	a
5322	3221	H	a
5322	2987	H	A
5322	5326	<K>	<>
5323	215	.	.
5323	216	 	 
5323	215	<~>	<~>
5323	215	<split-s>	<split-s>
5323	215	<split-h>	<split-h>
5323	215	<name2>	<name2>
5323	219	<aphaerese>	<aphaerese>
5323	5324	<>	<aphaerese>
5323	3769	<elision3>	<elision3>
5323	5324	<>	<elision3>
5323	3769	<elision2>	<elision2>
5323	5324	<>	<elision2>
5323	3769	<elision1>	<elision1>
5323	5324	<>	<elision1>
5323	3187	.	υ
5323	3231	H	υ
5323	3187	.	u
5323	3233	H	u
5323	3154	H	U
5323	3187	.	α
5323	3217	H	α
5323	3187	.	a
5323	3222	H	a
5323	2984	H	A
5323	5327	<K>	<>
5324	215	.	.
5324	216	 	 
5324	215	<~>	<~>
5324	215	<split-s>	<split-s>
5324	215	<split-h>	<split-h>
5324	215	<name2>	<name2>
5324	5322	<>	<name>
5324	219	<aphaerese>	<aphaerese>
5324	5324	<>	<aphaerese>
5324	3769	<elision3>	<elision3>
5324	5324	<>	<elision3>
5324	3769	<elision2>	<elision2>
5324	5324	<>	<elision2>
5324	3769	<elision1>	<elision1>
5324	5324	<>	<elision1>
5324	3187	.	υ
5324	3231	H	υ
5324	3187	.	u
5324	3233	H	u
5324	3154	H	U
5324	3187	.	α
5324	3217	H	α
5324	3187	.	a
5324	3222	H	a
5324	2984	H	A
5324	5325	<K>	<>
5325	3237	.	.
5325	3237	<~>	<~>
5325	3237	<split-s>	<split-s>
5325	3237	<split-h>	<split-h>
5325	3237	<name2>	<name2>
5325	5326	<>	<name>
5325	3240	<aphaerese>	<aphaerese>
5325	5325	<>	<aphaerese>
5325	3718	<elision3>	<elision3>
5325	5325	<>	<elision3>
5325	3718	<elision2>	<elision2>
5325	5325	<>	<elision2>
5325	3718	<elision1>	<elision1>
5325	5325	<>	<elision1>
5325	3236	.	υ
5325	3379	H	υ
5325	3236	.	u
5325	3388	H	u
5325	3357	H	U
5325	3236	.	α
5325	3391	H	α
5325	3236	.	a
5325	3394	H	a
5325	3328	H	A
5326	3239	.	.
5326	3239	<~>	<~>
5326	3239	<split-s>	<split-s>
5326	3239	<split-h>	<split-h>
5326	3239	<name2>	<name2>
5326	3242	<aphaerese>	<aphaerese>
5326	5327	<>	<aphaerese>
5326	3717	<elision3>	<elision3>
5326	5327	<>	<elision3>
5326	3717	<elision2>	<elision2>
5326	5327	<>	<elision2>
5326	3717	<elision1>	<elision1>
5326	5327	<>	<elision1>
5326	3235	.	υ
5326	3381	H	υ
5326	3235	.	u
5326	3390	H	u
5326	3359	H	U
5326	3235	.	α
5326	3393	H	α
5326	3235	.	a
5326	3396	H	a
5326	3330	H	A
5327	3237	.	.
5327	3237	<~>	<~>
5327	3237	<split-s>	<split-s>
5327	3237	<split-h>	<split-h>
5327	3237	<name2>	<name2>
5327	3240	<aphaerese>	<aphaerese>
5327	5325	<>	<aphaerese>
5327	3718	<elision3>	<elision3>
5327	5325	<>	<elision3>
5327	3718	<elision2>	<elision2>
5327	5325	<>	<elision2>
5327	3718	<elision1>	<elision1>
5327	5325	<>	<elision1>
5327	3236	.	υ
5327	3379	H	υ
5327	3236	.	u
5327	3388	H	u
5327	3357	H	U
5327	3236	.	α
5327	3391	H	α
5327	3236	.	a
5327	3394	H	a
5327	3328	H	A
5328	4625	.	.
5328	4626	 	 
5328	4625	<~>	<~>
5328	4625	<split-s>	<split-s>
5328	4625	<split-h>	<split-h>
5328	4625	<name2>	<name2>
5328	4629	<aphaerese>	<aphaerese>
5328	5320	<>	<aphaerese>
5328	4742	<elision3>	<elision3>
5328	5320	<>	<elision3>
5328	4742	<elision2>	<elision2>
5328	5320	<>	<elision2>
5328	4742	<elision1>	<elision1>
5328	5320	<>	<elision1>
5328	4633	.	υ
5328	4636	s	υ
5328	4633	.	u
5328	4636	s	u
5328	4682	s	U
5328	4633	.	α
5328	4707	s	α
5328	4633	.	a
5328	4707	s	a
5328	4710	s	A
5328	5329	<1s>	<>
5329	215	.	.
5329	216	 	 
5329	215	<~>	<~>
5329	215	<split-s>	<split-s>
5329	215	<split-h>	<split-h>
5329	215	<name2>	<name2>
5329	219	<aphaerese>	<aphaerese>
5329	5324	<>	<aphaerese>
5329	3769	<elision3>	<elision3>
5329	5324	<>	<elision3>
5329	3769	<elision2>	<elision2>
5329	5324	<>	<elision2>
5329	3769	<elision1>	<elision1>
5329	5324	<>	<elision1>
5329	3187	.	υ
5329	3187	.	u
5329	3187	.	α
5329	3187	.	a
5329	5330	<K>	<>
5330	3237	.	.
5330	3237	<~>	<~>
5330	3237	<split-s>	<split-s>
5330	3237	<split-h>	<split-h>
5330	3237	<name2>	<name2>
5330	3240	<aphaerese>	<aphaerese>
5330	5325	<>	<aphaerese>
5330	3718	<elision3>	<elision3>
5330	5325	<>	<elision3>
5330	3718	<elision2>	<elision2>
5330	5325	<>	<elision2>
5330	3718	<elision1>	<elision1>
5330	5325	<>	<elision1>
5330	3236	.	υ
5330	3236	.	u
5330	3236	.	α
5330	3236	.	a
5331	5332	<>	<aphaerese>
5331	5332	<>	<elision3>
5331	5332	<>	<elision2>
5331	5332	<>	<elision1>
5331	5335	<k2K>	<>
5331	5341	<k2L>	<>
5331	4778	<l2L>	<>
5332	5333	<>	<name>
5332	5332	<>	<aphaerese>
5332	5332	<>	<elision3>
5332	5332	<>	<elision2>
5332	5332	<>	<elision1>
5332	5336	<k2K>	<>
5332	5339	<k2L>	<>
5332	4776	<l2L>	<>
5333	5334	<>	<aphaerese>
5333	5334	<>	<elision3>
5333	5334	<>	<elision2>
5333	5334	<>	<elision1>
5333	5337	<k2K>	<>
5333	5340	<k2L>	<>
5333	4777	<l2L>	<>
5334	5332	<>	<aphaerese>
5334	5332	<>	<elision3>
5334	5332	<>	<elision2>
5334	5332	<>	<elision1>
5334	5335	<k2K>	<>
5334	5338	<k2L>	<>
5334	4778	<l2L>	<>
5335	4459	.	.
5335	4460	 	 
5335	4459	<~>	<~>
5335	4459	<split-s>	<split-s>
5335	4459	<split-h>	<split-h>
5335	4459	<name2>	<name2>
5335	4463	<aphaerese>	<aphaerese>
5335	5336	<>	<aphaerese>
5335	4459	<elision3>	<elision3>
5335	5336	<>	<elision3>
5335	4459	<elision2>	<elision2>
5335	5336	<>	<elision2>
5335	4459	<elision1>	<elision1>
5335	5336	<>	<elision1>
5335	4467	.	υ
5335	4470	s	υ
5335	4467	.	u
5335	4470	s	u
5335	4533	s	U
5335	4467	.	α
5335	4561	s	α
5335	4467	.	a
5335	4561	s	a
5335	4564	s	A
5336	4459	.	.
5336	4460	 	 
5336	4459	<~>	<~>
5336	4459	<split-s>	<split-s>
5336	4459	<split-h>	<split-h>
5336	4459	<name2>	<name2>
5336	5337	<>	<name>
5336	4463	<aphaerese>	<aphaerese>
5336	5336	<>	<aphaerese>
5336	4459	<elision3>	<elision3>
5336	5336	<>	<elision3>
5336	4459	<elision2>	<elision2>
5336	5336	<>	<elision2>
5336	4459	<elision1>	<elision1>
5336	5336	<>	<elision1>
5336	4467	.	υ
5336	4470	s	υ
5336	4467	.	u
5336	4470	s	u
5336	4533	s	U
5336	4467	.	α
5336	4561	s	α
5336	4467	.	a
5336	4561	s	a
5336	4564	s	A
5337	4462	.	.
5337	4465	 	 
5337	4462	<~>	<~>
5337	4462	<split-s>	<split-s>
5337	4462	<split-h>	<split-h>
5337	4462	<name2>	<name2>
5337	4591	<aphaerese>	<aphaerese>
5337	5335	<>	<aphaerese>
5337	4462	<elision3>	<elision3>
5337	5335	<>	<elision3>
5337	4462	<elision2>	<elision2>
5337	5335	<>	<elision2>
5337	4462	<elision1>	<elision1>
5337	5335	<>	<elision1>
5337	4469	.	υ
5337	4472	s	υ
5337	4469	.	u
5337	4472	s	u
5337	4535	s	U
5337	4469	.	α
5337	4563	s	α
5337	4469	.	a
5337	4563	s	a
5337	4566	s	A
5338	4625	.	.
5338	4626	 	 
5338	4625	<~>	<~>
5338	4625	<split-s>	<split-s>
5338	4625	<split-h>	<split-h>
5338	4625	<name2>	<name2>
5338	4629	<aphaerese>	<aphaerese>
5338	5339	<>	<aphaerese>
5338	4625	<elision3>	<elision3>
5338	5339	<>	<elision3>
5338	4625	<elision2>	<elision2>
5338	5339	<>	<elision2>
5338	4625	<elision1>	<elision1>
5338	5339	<>	<elision1>
5338	4633	.	υ
5338	4636	s	υ
5338	4633	.	u
5338	4636	s	u
5338	4682	s	U
5338	4633	.	α
5338	4707	s	α
5338	4633	.	a
5338	4707	s	a
5338	4710	s	A
5338	4040	<1s>	<>
5339	4625	.	.
5339	4626	 	 
5339	4625	<~>	<~>
5339	4625	<split-s>	<split-s>
5339	4625	<split-h>	<split-h>
5339	4625	<name2>	<name2>
5339	5340	<>	<name>
5339	4629	<aphaerese>	<aphaerese>
5339	5339	<>	<aphaerese>
5339	4625	<elision3>	<elision3>
5339	5339	<>	<elision3>
5339	4625	<elision2>	<elision2>
5339	5339	<>	<elision2>
5339	4625	<elision1>	<elision1>
5339	5339	<>	<elision1>
5339	4633	.	υ
5339	4636	s	υ
5339	4633	.	u
5339	4636	s	u
5339	4682	s	U
5339	4633	.	α
5339	4707	s	α
5339	4633	.	a
5339	4707	s	a
5339	4710	s	A
5339	4041	<1s>	<>
5340	4628	.	.
5340	4631	 	 
5340	4628	<~>	<~>
5340	4628	<split-s>	<split-s>
5340	4628	<split-h>	<split-h>
5340	4628	<name2>	<name2>
5340	4737	<aphaerese>	<aphaerese>
5340	5338	<>	<aphaerese>
5340	4628	<elision3>	<elision3>
5340	5338	<>	<elision3>
5340	4628	<elision2>	<elision2>
5340	5338	<>	<elision2>
5340	4628	<elision1>	<elision1>
5340	5338	<>	<elision1>
5340	4635	.	υ
5340	4638	s	υ
5340	4635	.	u
5340	4638	s	u
5340	4684	s	U
5340	4635	.	α
5340	4709	s	α
5340	4635	.	a
5340	4709	s	a
5340	4712	s	A
5340	4042	<1s>	<>
5341	4625	.	.
5341	4626	 	 
5341	4625	<~>	<~>
5341	4625	<split-s>	<split-s>
5341	4625	<split-h>	<split-h>
5341	4625	<name2>	<name2>
5341	4629	<aphaerese>	<aphaerese>
5341	5339	<>	<aphaerese>
5341	4625	<elision3>	<elision3>
5341	5339	<>	<elision3>
5341	4625	<elision2>	<elision2>
5341	5339	<>	<elision2>
5341	4625	<elision1>	<elision1>
5341	5339	<>	<elision1>
5341	4633	.	υ
5341	4636	s	υ
5341	4633	.	u
5341	4636	s	u
5341	4682	s	U
5341	4633	.	α
5341	4707	s	α
5341	4633	.	a
5341	4707	s	a
5341	4710	s	A
5341	5342	<1s>	<>
5342	215	.	.
5342	216	 	 
5342	215	<~>	<~>
5342	215	<split-s>	<split-s>
5342	215	<split-h>	<split-h>
5342	215	<name2>	<name2>
5342	219	<aphaerese>	<aphaerese>
5342	4041	<>	<aphaerese>
5342	215	<elision3>	<elision3>
5342	4041	<>	<elision3>
5342	215	<elision2>	<elision2>
5342	4041	<>	<elision2>
5342	215	<elision1>	<elision1>
5342	4041	<>	<elision1>
5342	3187	.	υ
5342	3187	.	u
5342	3187	.	α
5342	3187	.	a
5342	5343	<K>	<>
5343	3237	.	.
5343	3237	<~>	<~>
5343	3237	<split-s>	<split-s>
5343	3237	<split-h>	<split-h>
5343	3237	<name2>	<name2>
5343	3240	<aphaerese>	<aphaerese>
5343	4045	<>	<aphaerese>
5343	3237	<elision3>	<elision3>
5343	4045	<>	<elision3>
5343	3237	<elision2>	<elision2>
5343	4045	<>	<elision2>
5343	3237	<elision1>	<elision1>
5343	4045	<>	<elision1>
5343	3236	.	υ
5343	3236	.	u
5343	3236	.	α
5343	3236	.	a
5344	4459	.	.
5344	4460	 	 
5344	4459	<~>	<~>
5344	4459	<split-s>	<split-s>
5344	4459	<split-h>	<split-h>
5344	4459	<name2>	<name2>
5344	4463	<aphaerese>	<aphaerese>
5344	5345	<>	<aphaerese>
5344	4459	<elision3>	<elision3>
5344	5345	<>	<elision3>
5344	4459	<elision2>	<elision2>
5344	5345	<>	<elision2>
5344	4459	<elision1>	<elision1>
5344	5345	<>	<elision1>
5344	4467	.	υ
5344	4470	s	υ
5344	4467	.	u
5344	4470	s	u
5344	4633	.	κ
5344	4533	s	U
5344	4467	.	α
5344	4561	s	α
5344	4467	.	a
5344	4561	s	a
5344	4564	s	A
5344	4633	.	λ
5344	3956	<1s>	<>
5344	5341	<K2L>	<>
5345	4459	.	.
5345	4460	 	 
5345	4459	<~>	<~>
5345	4459	<split-s>	<split-s>
5345	4459	<split-h>	<split-h>
5345	4459	<name2>	<name2>
5345	5346	<>	<name>
5345	4463	<aphaerese>	<aphaerese>
5345	5345	<>	<aphaerese>
5345	4459	<elision3>	<elision3>
5345	5345	<>	<elision3>
5345	4459	<elision2>	<elision2>
5345	5345	<>	<elision2>
5345	4459	<elision1>	<elision1>
5345	5345	<>	<elision1>
5345	4467	.	υ
5345	4470	s	υ
5345	4467	.	u
5345	4470	s	u
5345	4633	.	κ
5345	4533	s	U
5345	4467	.	α
5345	4561	s	α
5345	4467	.	a
5345	4561	s	a
5345	4564	s	A
5345	4633	.	λ
5345	3957	<1s>	<>
5345	5339	<K2L>	<>
5346	4462	.	.
5346	4465	 	 
5346	4462	<~>	<~>
5346	4462	<split-s>	<split-s>
5346	4462	<split-h>	<split-h>
5346	4462	<name2>	<name2>
5346	4591	<aphaerese>	<aphaerese>
5346	5347	<>	<aphaerese>
5346	4462	<elision3>	<elision3>
5346	5347	<>	<elision3>
5346	4462	<elision2>	<elision2>
5346	5347	<>	<elision2>
5346	4462	<elision1>	<elision1>
5346	5347	<>	<elision1>
5346	4469	.	υ
5346	4472	s	υ
5346	4469	.	u
5346	4472	s	u
5346	4635	.	κ
5346	4535	s	U
5346	4469	.	α
5346	4563	s	α
5346	4469	.	a
5346	4563	s	a
5346	4566	s	A
5346	4635	.	λ
5346	3958	<1s>	<>
5346	5340	<K2L>	<>
5347	4459	.	.
5347	4460	 	 
5347	4459	<~>	<~>
5347	4459	<split-s>	<split-s>
5347	4459	<split-h>	<split-h>
5347	4459	<name2>	<name2>
5347	4463	<aphaerese>	<aphaerese>
5347	5345	<>	<aphaerese>
5347	4459	<elision3>	<elision3>
5347	5345	<>	<elision3>
5347	4459	<elision2>	<elision2>
5347	5345	<>	<elision2>
5347	4459	<elision1>	<elision1>
5347	5345	<>	<elision1>
5347	4467	.	υ
5347	4470	s	υ
5347	4467	.	u
5347	4470	s	u
5347	4633	.	κ
5347	4533	s	U
5347	4467	.	α
5347	4561	s	α
5347	4467	.	a
5347	4561	s	a
5347	4564	s	A
5347	4633	.	λ
5347	3956	<1s>	<>
5347	5338	<K2L>	<>
5348	5349	<>	<aphaerese>
5348	5349	<>	<elision3>
5348	5349	<>	<elision2>
5348	5349	<>	<elision1>
5348	5352	<lambda2L>	<>
5349	5350	<>	<name>
5349	5349	<>	<aphaerese>
5349	5349	<>	<elision3>
5349	5349	<>	<elision2>
5349	5349	<>	<elision1>
5349	5353	<lambda2L>	<>
5350	5348	<>	<aphaerese>
5350	5348	<>	<elision3>
5350	5348	<>	<elision2>
5350	5348	<>	<elision1>
5350	5351	<lambda2L>	<>
5351	4628	.	.
5351	4631	 	 
5351	4628	<~>	<~>
5351	4628	<split-s>	<split-s>
5351	4628	<split-h>	<split-h>
5351	4628	<name2>	<name2>
5351	4737	<aphaerese>	<aphaerese>
5351	5352	<>	<aphaerese>
5351	4628	<elision3>	<elision3>
5351	5352	<>	<elision3>
5351	4628	<elision2>	<elision2>
5351	5352	<>	<elision2>
5351	4628	<elision1>	<elision1>
5351	5352	<>	<elision1>
5351	4635	.	υ
5351	4638	s	υ
5351	4635	.	u
5351	4638	s	u
5351	4635	.	κ
5351	4684	s	U
5351	4635	.	α
5351	4709	s	α
5351	4635	.	a
5351	4709	s	a
5351	4712	s	A
5351	4635	.	λ
5351	4029	<1s>	<>
5352	4625	.	.
5352	4626	 	 
5352	4625	<~>	<~>
5352	4625	<split-s>	<split-s>
5352	4625	<split-h>	<split-h>
5352	4625	<name2>	<name2>
5352	4629	<aphaerese>	<aphaerese>
5352	5353	<>	<aphaerese>
5352	4625	<elision3>	<elision3>
5352	5353	<>	<elision3>
5352	4625	<elision2>	<elision2>
5352	5353	<>	<elision2>
5352	4625	<elision1>	<elision1>
5352	5353	<>	<elision1>
5352	4633	.	υ
5352	4636	s	υ
5352	4633	.	u
5352	4636	s	u
5352	4633	.	κ
5352	4682	s	U
5352	4633	.	α
5352	4707	s	α
5352	4633	.	a
5352	4707	s	a
5352	4710	s	A
5352	4633	.	λ
5352	4027	<1s>	<>
5353	4625	.	.
5353	4626	 	 
5353	4625	<~>	<~>
5353	4625	<split-s>	<split-s>
5353	4625	<split-h>	<split-h>
5353	4625	<name2>	<name2>
5353	5351	<>	<name>
5353	4629	<aphaerese>	<aphaerese>
5353	5353	<>	<aphaerese>
5353	4625	<elision3>	<elision3>
5353	5353	<>	<elision3>
5353	4625	<elision2>	<elision2>
5353	5353	<>	<elision2>
5353	4625	<elision1>	<elision1>
5353	5353	<>	<elision1>
5353	4633	.	υ
5353	4636	s	υ
5353	4633	.	u
5353	4636	s	u
5353	4633	.	κ
5353	4682	s	U
5353	4633	.	α
5353	4707	s	α
5353	4633	.	a
5353	4707	s	a
5353	4710	s	A
5353	4633	.	λ
5353	4028	<1s>	<>
5354	5355	<>	<aphaerese>
5354	5355	<>	<elision3>
5354	5355	<>	<elision2>
5354	5355	<>	<elision1>
5354	5352	<l2L>	<>
5355	5356	<>	<name>
5355	5355	<>	<aphaerese>
5355	5355	<>	<elision3>
5355	5355	<>	<elision2>
5355	5355	<>	<elision1>
5355	5353	<l2L>	<>
5356	5354	<>	<aphaerese>
5356	5354	<>	<elision3>
5356	5354	<>	<elision2>
5356	5354	<>	<elision1>
5356	5351	<l2L>	<>
5357	4880	.	.
5357	4880	<~>	<~>
5357	4880	<split-s>	<split-s>
5357	4880	<split-h>	<split-h>
5357	4880	<name2>	<name2>
5357	4883	<aphaerese>	<aphaerese>
5357	5358	<>	<aphaerese>
5357	4880	<elision3>	<elision3>
5357	5358	<>	<elision3>
5357	4880	<elision2>	<elision2>
5357	5358	<>	<elision2>
5357	4880	<elision1>	<elision1>
5357	5358	<>	<elision1>
5357	4876	.	υ
5357	5022	H	υ
5357	4876	.	u
5357	5031	H	u
5357	4886	.	κ
5357	5362	H	κ
5357	5371	H	k
5357	5000	H	U
5357	5380	H	K
5357	4876	.	α
5357	5034	H	α
5357	4876	.	a
5357	5037	H	a
5357	4971	H	A
5357	5385	H	λ
5357	5391	H	l
5357	5386	H	L
5358	4878	.	.
5358	4878	<~>	<~>
5358	4878	<split-s>	<split-s>
5358	4878	<split-h>	<split-h>
5358	4878	<name2>	<name2>
5358	4881	<aphaerese>	<aphaerese>
5358	5359	<>	<aphaerese>
5358	4878	<elision3>	<elision3>
5358	5359	<>	<elision3>
5358	4878	<elision2>	<elision2>
5358	5359	<>	<elision2>
5358	4878	<elision1>	<elision1>
5358	5359	<>	<elision1>
5358	4877	.	υ
5358	5020	H	υ
5358	4877	.	u
5358	5029	H	u
5358	4884	.	κ
5358	5360	H	κ
5358	5369	H	k
5358	4998	H	U
5358	5378	H	K
5358	4877	.	α
5358	5032	H	α
5358	4877	.	a
5358	5035	H	a
5358	4969	H	A
5358	5383	H	λ
5358	5389	H	l
5358	5392	H	L
5359	4878	.	.
5359	4878	<~>	<~>
5359	4878	<split-s>	<split-s>
5359	4878	<split-h>	<split-h>
5359	4878	<name2>	<name2>
5359	5357	<>	<name>
5359	4881	<aphaerese>	<aphaerese>
5359	5359	<>	<aphaerese>
5359	4878	<elision3>	<elision3>
5359	5359	<>	<elision3>
5359	4878	<elision2>	<elision2>
5359	5359	<>	<elision2>
5359	4878	<elision1>	<elision1>
5359	5359	<>	<elision1>
5359	4877	.	υ
5359	5020	H	υ
5359	4877	.	u
5359	5029	H	u
5359	4884	.	κ
5359	5360	H	κ
5359	5369	H	k
5359	4998	H	U
5359	5378	H	K
5359	4877	.	α
5359	5032	H	α
5359	4877	.	a
5359	5035	H	a
5359	4969	H	A
5359	5383	H	λ
5359	5389	H	l
5359	5392	H	L
5360	5361	<>	<name>
5360	5360	<>	<aphaerese>
5360	5360	<>	<elision3>
5360	5360	<>	<elision2>
5360	5360	<>	<elision1>
5360	5364	<kappa2K>	<>
5360	5367	<kappa2L>	<>
5360	4987	<lambda2L>	<>
5361	5362	<>	<aphaerese>
5361	5362	<>	<elision3>
5361	5362	<>	<elision2>
5361	5362	<>	<elision1>
5361	5365	<kappa2K>	<>
5361	5368	<kappa2L>	<>
5361	4988	<lambda2L>	<>
5362	5360	<>	<aphaerese>
5362	5360	<>	<elision3>
5362	5360	<>	<elision2>
5362	5360	<>	<elision1>
5362	5363	<kappa2K>	<>
5362	5366	<kappa2L>	<>
5362	4986	<lambda2L>	<>
5363	4939	.	.
5363	4939	<~>	<~>
5363	4939	<split-s>	<split-s>
5363	4939	<split-h>	<split-h>
5363	4939	<name2>	<name2>
5363	4942	<aphaerese>	<aphaerese>
5363	5364	<>	<aphaerese>
5363	4963	<elision3>	<elision3>
5363	5364	<>	<elision3>
5363	4963	<elision2>	<elision2>
5363	5364	<>	<elision2>
5363	4963	<elision1>	<elision1>
5363	5364	<>	<elision1>
5363	4957	.	υ
5363	4910	s	υ
5363	4957	.	u
5363	4910	s	u
5363	4951	s	U
5363	4957	.	α
5363	4910	s	α
5363	4957	.	a
5363	4910	s	a
5363	4954	s	A
5363	4903	<1m>	<>
5364	4939	.	.
5364	4939	<~>	<~>
5364	4939	<split-s>	<split-s>
5364	4939	<split-h>	<split-h>
5364	4939	<name2>	<name2>
5364	5365	<>	<name>
5364	4942	<aphaerese>	<aphaerese>
5364	5364	<>	<aphaerese>
5364	4963	<elision3>	<elision3>
5364	5364	<>	<elision3>
5364	4963	<elision2>	<elision2>
5364	5364	<>	<elision2>
5364	4963	<elision1>	<elision1>
5364	5364	<>	<elision1>
5364	4957	.	υ
5364	4910	s	υ
5364	4957	.	u
5364	4910	s	u
5364	4951	s	U
5364	4957	.	α
5364	4910	s	α
5364	4957	.	a
5364	4910	s	a
5364	4954	s	A
5364	4904	<1m>	<>
5365	4941	.	.
5365	4941	<~>	<~>
5365	4941	<split-s>	<split-s>
5365	4941	<split-h>	<split-h>
5365	4941	<name2>	<name2>
5365	4944	<aphaerese>	<aphaerese>
5365	5363	<>	<aphaerese>
5365	4962	<elision3>	<elision3>
5365	5363	<>	<elision3>
5365	4962	<elision2>	<elision2>
5365	5363	<>	<elision2>
5365	4962	<elision1>	<elision1>
5365	5363	<>	<elision1>
5365	4959	.	υ
5365	4909	s	υ
5365	4959	.	u
5365	4909	s	u
5365	4953	s	U
5365	4959	.	α
5365	4909	s	α
5365	4959	.	a
5365	4909	s	a
5365	4956	s	A
5365	4902	<1m>	<>
5366	4969	.	.
5366	4969	<~>	<~>
5366	4969	<split-s>	<split-s>
5366	4969	<split-h>	<split-h>
5366	4969	<name2>	<name2>
5366	4972	<aphaerese>	<aphaerese>
5366	5367	<>	<aphaerese>
5366	4981	<elision3>	<elision3>
5366	5367	<>	<elision3>
5366	4981	<elision2>	<elision2>
5366	5367	<>	<elision2>
5366	4981	<elision1>	<elision1>
5366	5367	<>	<elision1>
5366	4975	.	υ
5366	4910	s	υ
5366	4975	.	u
5366	4910	s	u
5366	4951	s	U
5366	4975	.	α
5366	4910	s	α
5366	4975	.	a
5366	4910	s	a
5366	4954	s	A
5366	4903	<1m>	<>
5367	4969	.	.
5367	4969	<~>	<~>
5367	4969	<split-s>	<split-s>
5367	4969	<split-h>	<split-h>
5367	4969	<name2>	<name2>
5367	5368	<>	<name>
5367	4972	<aphaerese>	<aphaerese>
5367	5367	<>	<aphaerese>
5367	4981	<elision3>	<elision3>
5367	5367	<>	<elision3>
5367	4981	<elision2>	<elision2>
5367	5367	<>	<elision2>
5367	4981	<elision1>	<elision1>
5367	5367	<>	<elision1>
5367	4975	.	υ
5367	4910	s	υ
5367	4975	.	u
5367	4910	s	u
5367	4951	s	U
5367	4975	.	α
5367	4910	s	α
5367	4975	.	a
5367	4910	s	a
5367	4954	s	A
5367	4904	<1m>	<>
5368	4971	.	.
5368	4971	<~>	<~>
5368	4971	<split-s>	<split-s>
5368	4971	<split-h>	<split-h>
5368	4971	<name2>	<name2>
5368	4974	<aphaerese>	<aphaerese>
5368	5366	<>	<aphaerese>
5368	4980	<elision3>	<elision3>
5368	5366	<>	<elision3>
5368	4980	<elision2>	<elision2>
5368	5366	<>	<elision2>
5368	4980	<elision1>	<elision1>
5368	5366	<>	<elision1>
5368	4977	.	υ
5368	4909	s	υ
5368	4977	.	u
5368	4909	s	u
5368	4953	s	U
5368	4977	.	α
5368	4909	s	α
5368	4977	.	a
5368	4909	s	a
5368	4956	s	A
5368	4902	<1m>	<>
5369	5370	<>	<name>
5369	5369	<>	<aphaerese>
5369	5369	<>	<elision3>
5369	5369	<>	<elision2>
5369	5369	<>	<elision1>
5369	5373	<k2K>	<>
5369	5376	<k2L>	<>
5369	4987	<l2L>	<>
5370	5371	<>	<aphaerese>
5370	5371	<>	<elision3>
5370	5371	<>	<elision2>
5370	5371	<>	<elision1>
5370	5374	<k2K>	<>
5370	5377	<k2L>	<>
5370	4988	<l2L>	<>
5371	5369	<>	<aphaerese>
5371	5369	<>	<elision3>
5371	5369	<>	<elision2>
5371	5369	<>	<elision1>
5371	5372	<k2K>	<>
5371	5375	<k2L>	<>
5371	4986	<l2L>	<>
5372	4939	.	.
5372	4939	<~>	<~>
5372	4939	<split-s>	<split-s>
5372	4939	<split-h>	<split-h>
5372	4939	<name2>	<name2>
5372	4942	<aphaerese>	<aphaerese>
5372	5373	<>	<aphaerese>
5372	4939	<elision3>	<elision3>
5372	5373	<>	<elision3>
5372	4939	<elision2>	<elision2>
5372	5373	<>	<elision2>
5372	4939	<elision1>	<elision1>
5372	5373	<>	<elision1>
5372	4957	.	υ
5372	4910	s	υ
5372	4957	.	u
5372	4910	s	u
5372	4951	s	U
5372	4957	.	α
5372	4910	s	α
5372	4957	.	a
5372	4910	s	a
5372	4954	s	A
5372	4903	<1m>	<>
5373	4939	.	.
5373	4939	<~>	<~>
5373	4939	<split-s>	<split-s>
5373	4939	<split-h>	<split-h>
5373	4939	<name2>	<name2>
5373	5374	<>	<name>
5373	4942	<aphaerese>	<aphaerese>
5373	5373	<>	<aphaerese>
5373	4939	<elision3>	<elision3>
5373	5373	<>	<elision3>
5373	4939	<elision2>	<elision2>
5373	5373	<>	<elision2>
5373	4939	<elision1>	<elision1>
5373	5373	<>	<elision1>
5373	4957	.	υ
5373	4910	s	υ
5373	4957	.	u
5373	4910	s	u
5373	4951	s	U
5373	4957	.	α
5373	4910	s	α
5373	4957	.	a
5373	4910	s	a
5373	4954	s	A
5373	4904	<1m>	<>
5374	4941	.	.
5374	4941	<~>	<~>
5374	4941	<split-s>	<split-s>
5374	4941	<split-h>	<split-h>
5374	4941	<name2>	<name2>
5374	4944	<aphaerese>	<aphaerese>
5374	5372	<>	<aphaerese>
5374	4941	<elision3>	<elision3>
5374	5372	<>	<elision3>
5374	4941	<elision2>	<elision2>
5374	5372	<>	<elision2>
5374	4941	<elision1>	<elision1>
5374	5372	<>	<elision1>
5374	4959	.	υ
5374	4909	s	υ
5374	4959	.	u
5374	4909	s	u
5374	4953	s	U
5374	4959	.	α
5374	4909	s	α
5374	4959	.	a
5374	4909	s	a
5374	4956	s	A
5374	4902	<1m>	<>
5375	4969	.	.
5375	4969	<~>	<~>
5375	4969	<split-s>	<split-s>
5375	4969	<split-h>	<split-h>
5375	4969	<name2>	<name2>
5375	4972	<aphaerese>	<aphaerese>
5375	5376	<>	<aphaerese>
5375	4969	<elision3>	<elision3>
5375	5376	<>	<elision3>
5375	4969	<elision2>	<elision2>
5375	5376	<>	<elision2>
5375	4969	<elision1>	<elision1>
5375	5376	<>	<elision1>
5375	4975	.	υ
5375	4910	s	υ
5375	4975	.	u
5375	4910	s	u
5375	4951	s	U
5375	4975	.	α
5375	4910	s	α
5375	4975	.	a
5375	4910	s	a
5375	4954	s	A
5375	4903	<1m>	<>
5376	4969	.	.
5376	4969	<~>	<~>
5376	4969	<split-s>	<split-s>
5376	4969	<split-h>	<split-h>
5376	4969	<name2>	<name2>
5376	5377	<>	<name>
5376	4972	<aphaerese>	<aphaerese>
5376	5376	<>	<aphaerese>
5376	4969	<elision3>	<elision3>
5376	5376	<>	<elision3>
5376	4969	<elision2>	<elision2>
5376	5376	<>	<elision2>
5376	4969	<elision1>	<elision1>
5376	5376	<>	<elision1>
5376	4975	.	υ
5376	4910	s	υ
5376	4975	.	u
5376	4910	s	u
5376	4951	s	U
5376	4975	.	α
5376	4910	s	α
5376	4975	.	a
5376	4910	s	a
5376	4954	s	A
5376	4904	<1m>	<>
5377	4971	.	.
5377	4971	<~>	<~>
5377	4971	<split-s>	<split-s>
5377	4971	<split-h>	<split-h>
5377	4971	<name2>	<name2>
5377	4974	<aphaerese>	<aphaerese>
5377	5375	<>	<aphaerese>
5377	4971	<elision3>	<elision3>
5377	5375	<>	<elision3>
5377	4971	<elision2>	<elision2>
5377	5375	<>	<elision2>
5377	4971	<elision1>	<elision1>
5377	5375	<>	<elision1>
5377	4977	.	υ
5377	4909	s	υ
5377	4977	.	u
5377	4909	s	u
5377	4953	s	U
5377	4977	.	α
5377	4909	s	α
5377	4977	.	a
5377	4909	s	a
5377	4956	s	A
5377	4902	<1m>	<>
5378	4939	.	.
5378	4939	<~>	<~>
5378	4939	<split-s>	<split-s>
5378	4939	<split-h>	<split-h>
5378	4939	<name2>	<name2>
5378	5002	<name2>	<name>
5378	5379	<>	<name>
5378	4942	<aphaerese>	<aphaerese>
5378	5381	<>	<aphaerese>
5378	4939	<elision3>	<elision3>
5378	5381	<>	<elision3>
5378	4939	<elision2>	<elision2>
5378	5381	<>	<elision2>
5378	4939	<elision1>	<elision1>
5378	5381	<>	<elision1>
5378	4957	.	υ
5378	4910	s	υ
5378	4957	.	u
5378	4910	s	u
5378	4975	.	κ
5378	4951	s	U
5378	4957	.	α
5378	4910	s	α
5378	4957	.	a
5378	4910	s	a
5378	4954	s	A
5378	4975	.	λ
5378	4904	<1m>	<>
5378	5006	<k2K>	<>
5378	5007	<k2L>	<>
5378	5382	<K2L>	<>
5379	4941	.	.
5379	4941	<~>	<~>
5379	4941	<split-s>	<split-s>
5379	4941	<split-h>	<split-h>
5379	4941	<name2>	<name2>
5379	4944	<aphaerese>	<aphaerese>
5379	5380	<>	<aphaerese>
5379	4941	<elision3>	<elision3>
5379	5380	<>	<elision3>
5379	4941	<elision2>	<elision2>
5379	5380	<>	<elision2>
5379	4941	<elision1>	<elision1>
5379	5380	<>	<elision1>
5379	4959	.	υ
5379	4909	s	υ
5379	4959	.	u
5379	4909	s	u
5379	4977	.	κ
5379	4953	s	U
5379	4959	.	α
5379	4909	s	α
5379	4959	.	a
5379	4909	s	a
5379	4956	s	A
5379	4977	.	λ
5379	4902	<1m>	<>
5379	5377	<K2L>	<>
5380	4939	.	.
5380	4939	<~>	<~>
5380	4939	<split-s>	<split-s>
5380	4939	<split-h>	<split-h>
5380	4939	<name2>	<name2>
5380	4942	<aphaerese>	<aphaerese>
5380	5381	<>	<aphaerese>
5380	4939	<elision3>	<elision3>
5380	5381	<>	<elision3>
5380	4939	<elision2>	<elision2>
5380	5381	<>	<elision2>
5380	4939	<elision1>	<elision1>
5380	5381	<>	<elision1>
5380	4957	.	υ
5380	4910	s	υ
5380	4957	.	u
5380	4910	s	u
5380	4975	.	κ
5380	4951	s	U
5380	4957	.	α
5380	4910	s	α
5380	4957	.	a
5380	4910	s	a
5380	4954	s	A
5380	4975	.	λ
5380	4903	<1m>	<>
5380	5375	<K2L>	<>
5381	4939	.	.
5381	4939	<~>	<~>
5381	4939	<split-s>	<split-s>
5381	4939	<split-h>	<split-h>
5381	4939	<name2>	<name2>
5381	5379	<>	<name>
5381	4942	<aphaerese>	<aphaerese>
5381	5381	<>	<aphaerese>
5381	4939	<elision3>	<elision3>
5381	5381	<>	<elision3>
5381	4939	<elision2>	<elision2>
5381	5381	<>	<elision2>
5381	4939	<elision1>	<elision1>
5381	5381	<>	<elision1>
5381	4957	.	υ
5381	4910	s	υ
5381	4957	.	u
5381	4910	s	u
5381	4975	.	κ
5381	4951	s	U
5381	4957	.	α
5381	4910	s	α
5381	4957	.	a
5381	4910	s	a
5381	4954	s	A
5381	4975	.	λ
5381	4904	<1m>	<>
5381	5376	<K2L>	<>
5382	4969	.	.
5382	4969	<~>	<~>
5382	4969	<split-s>	<split-s>
5382	4969	<split-h>	<split-h>
5382	4969	<name2>	<name2>
5382	5008	<name2>	<name>
5382	5377	<>	<name>
5382	4972	<aphaerese>	<aphaerese>
5382	5376	<>	<aphaerese>
5382	4969	<elision3>	<elision3>
5382	5376	<>	<elision3>
5382	4969	<elision2>	<elision2>
5382	5376	<>	<elision2>
5382	4969	<elision1>	<elision1>
5382	5376	<>	<elision1>
5382	4975	.	υ
5382	4910	s	υ
5382	4975	.	u
5382	4910	s	u
5382	4951	s	U
5382	4975	.	α
5382	4910	s	α
5382	4975	.	a
5382	4910	s	a
5382	4954	s	A
5382	4904	<1m>	<>
5383	5384	<>	<name>
5383	5383	<>	<aphaerese>
5383	5383	<>	<elision3>
5383	5383	<>	<elision2>
5383	5383	<>	<elision1>
5383	5387	<lambda2L>	<>
5384	5385	<>	<aphaerese>
5384	5385	<>	<elision3>
5384	5385	<>	<elision2>
5384	5385	<>	<elision1>
5384	5388	<lambda2L>	<>
5385	5383	<>	<aphaerese>
5385	5383	<>	<elision3>
5385	5383	<>	<elision2>
5385	5383	<>	<elision1>
5385	5386	<lambda2L>	<>
5386	4969	.	.
5386	4969	<~>	<~>
5386	4969	<split-s>	<split-s>
5386	4969	<split-h>	<split-h>
5386	4969	<name2>	<name2>
5386	4972	<aphaerese>	<aphaerese>
5386	5387	<>	<aphaerese>
5386	4969	<elision3>	<elision3>
5386	5387	<>	<elision3>
5386	4969	<elision2>	<elision2>
5386	5387	<>	<elision2>
5386	4969	<elision1>	<elision1>
5386	5387	<>	<elision1>
5386	4975	.	υ
5386	4910	s	υ
5386	4975	.	u
5386	4910	s	u
5386	4975	.	κ
5386	4951	s	U
5386	4975	.	α
5386	4910	s	α
5386	4975	.	a
5386	4910	s	a
5386	4954	s	A
5386	4975	.	λ
5386	4903	<1m>	<>
5387	4969	.	.
5387	4969	<~>	<~>
5387	4969	<split-s>	<split-s>
5387	4969	<split-h>	<split-h>
5387	4969	<name2>	<name2>
5387	5388	<>	<name>
5387	4972	<aphaerese>	<aphaerese>
5387	5387	<>	<aphaerese>
5387	4969	<elision3>	<elision3>
5387	5387	<>	<elision3>
5387	4969	<elision2>	<elision2>
5387	5387	<>	<elision2>
5387	4969	<elision1>	<elision1>
5387	5387	<>	<elision1>
5387	4975	.	υ
5387	4910	s	υ
5387	4975	.	u
5387	4910	s	u
5387	4975	.	κ
5387	4951	s	U
5387	4975	.	α
5387	4910	s	α
5387	4975	.	a
5387	4910	s	a
5387	4954	s	A
5387	4975	.	λ
5387	4904	<1m>	<>
5388	4971	.	.
5388	4971	<~>	<~>
5388	4971	<split-s>	<split-s>
5388	4971	<split-h>	<split-h>
5388	4971	<name2>	<name2>
5388	4974	<aphaerese>	<aphaerese>
5388	5386	<>	<aphaerese>
5388	4971	<elision3>	<elision3>
5388	5386	<>	<elision3>
5388	4971	<elision2>	<elision2>
5388	5386	<>	<elision2>
5388	4971	<elision1>	<elision1>
5388	5386	<>	<elision1>
5388	4977	.	υ
5388	4909	s	υ
5388	4977	.	u
5388	4909	s	u
5388	4977	.	κ
5388	4953	s	U
5388	4977	.	α
5388	4909	s	α
5388	4977	.	a
5388	4909	s	a
5388	4956	s	A
5388	4977	.	λ
5388	4902	<1m>	<>
5389	5390	<>	<name>
5389	5389	<>	<aphaerese>
5389	5389	<>	<elision3>
5389	5389	<>	<elision2>
5389	5389	<>	<elision1>
5389	5387	<l2L>	<>
5390	5391	<>	<aphaerese>
5390	5391	<>	<elision3>
5390	5391	<>	<elision2>
5390	5391	<>	<elision1>
5390	5388	<l2L>	<>
5391	5389	<>	<aphaerese>
5391	5389	<>	<elision3>
5391	5389	<>	<elision2>
5391	5389	<>	<elision1>
5391	5386	<l2L>	<>
5392	4969	.	.
5392	4969	<~>	<~>
5392	4969	<split-s>	<split-s>
5392	4969	<split-h>	<split-h>
5392	4969	<name2>	<name2>
5392	5008	<name2>	<name>
5392	5388	<>	<name>
5392	4972	<aphaerese>	<aphaerese>
5392	5387	<>	<aphaerese>
5392	4969	<elision3>	<elision3>
5392	5387	<>	<elision3>
5392	4969	<elision2>	<elision2>
5392	5387	<>	<elision2>
5392	4969	<elision1>	<elision1>
5392	5387	<>	<elision1>
5392	4975	.	υ
5392	4910	s	υ
5392	4975	.	u
5392	4910	s	u
5392	4975	.	κ
5392	4951	s	U
5392	4975	.	α
5392	4910	s	α
5392	4975	.	a
5392	4910	s	a
5392	4954	s	A
5392	4975	.	λ
5392	4904	<1m>	<>
5392	5007	<l2L>	<>
5393	5314	<>	<name>
5393	5313	<>	<aphaerese>
5393	5313	<>	<elision3>
5393	5313	<>	<elision2>
5393	5313	<>	<elision1>
5393	5317	<kappa2K>	<>
5393	5394	<kappa2L>	<>
5393	4776	<lambda2L>	<>
5394	4625	.	.
5394	4626	 	 
5394	4625	<~>	<~>
5394	4625	<split-s>	<split-s>
5394	4625	<split-h>	<split-h>
5394	4625	<name2>	<name2>
5394	5321	<>	<name>
5394	4629	<aphaerese>	<aphaerese>
5394	5320	<>	<aphaerese>
5394	4742	<elision3>	<elision3>
5394	5320	<>	<elision3>
5394	4742	<elision2>	<elision2>
5394	5320	<>	<elision2>
5394	4742	<elision1>	<elision1>
5394	5320	<>	<elision1>
5394	4633	.	υ
5394	4636	s	υ
5394	4633	.	u
5394	4636	s	u
5394	4682	s	U
5394	4633	.	α
5394	4707	s	α
5394	4633	.	a
5394	4707	s	a
5394	4710	s	A
5394	5395	<1s>	<>
5395	215	.	.
5395	216	 	 
5395	215	<~>	<~>
5395	215	<split-s>	<split-s>
5395	215	<split-h>	<split-h>
5395	215	<name2>	<name2>
5395	5322	<>	<name>
5395	219	<aphaerese>	<aphaerese>
5395	5324	<>	<aphaerese>
5395	3769	<elision3>	<elision3>
5395	5324	<>	<elision3>
5395	3769	<elision2>	<elision2>
5395	5324	<>	<elision2>
5395	3769	<elision1>	<elision1>
5395	5324	<>	<elision1>
5395	3187	.	υ
5395	3187	.	u
5395	3187	.	α
5395	3187	.	a
5395	5396	<K>	<>
5396	3237	.	.
5396	3237	<~>	<~>
5396	3237	<split-s>	<split-s>
5396	3237	<split-h>	<split-h>
5396	3237	<name2>	<name2>
5396	5326	<>	<name>
5396	3240	<aphaerese>	<aphaerese>
5396	5325	<>	<aphaerese>
5396	3718	<elision3>	<elision3>
5396	5325	<>	<elision3>
5396	3718	<elision2>	<elision2>
5396	5325	<>	<elision2>
5396	3718	<elision1>	<elision1>
5396	5325	<>	<elision1>
5396	3236	.	υ
5396	3236	.	u
5396	3236	.	α
5396	3236	.	a
5397	5333	<>	<name>
5397	5332	<>	<aphaerese>
5397	5332	<>	<elision3>
5397	5332	<>	<elision2>
5397	5332	<>	<elision1>
5397	5336	<k2K>	<>
5397	5398	<k2L>	<>
5397	4776	<l2L>	<>
5398	4625	.	.
5398	4626	 	 
5398	4625	<~>	<~>
5398	4625	<split-s>	<split-s>
5398	4625	<split-h>	<split-h>
5398	4625	<name2>	<name2>
5398	5340	<>	<name>
5398	4629	<aphaerese>	<aphaerese>
5398	5339	<>	<aphaerese>
5398	4625	<elision3>	<elision3>
5398	5339	<>	<elision3>
5398	4625	<elision2>	<elision2>
5398	5339	<>	<elision2>
5398	4625	<elision1>	<elision1>
5398	5339	<>	<elision1>
5398	4633	.	υ
5398	4636	s	υ
5398	4633	.	u
5398	4636	s	u
5398	4682	s	U
5398	4633	.	α
5398	4707	s	α
5398	4633	.	a
5398	4707	s	a
5398	4710	s	A
5398	5399	<1s>	<>
5399	215	.	.
5399	216	 	 
5399	215	<~>	<~>
5399	215	<split-s>	<split-s>
5399	215	<split-h>	<split-h>
5399	215	<name2>	<name2>
5399	4042	<>	<name>
5399	219	<aphaerese>	<aphaerese>
5399	4041	<>	<aphaerese>
5399	215	<elision3>	<elision3>
5399	4041	<>	<elision3>
5399	215	<elision2>	<elision2>
5399	4041	<>	<elision2>
5399	215	<elision1>	<elision1>
5399	4041	<>	<elision1>
5399	3187	.	υ
5399	3187	.	u
5399	3187	.	α
5399	3187	.	a
5399	5400	<K>	<>
5400	3237	.	.
5400	3237	<~>	<~>
5400	3237	<split-s>	<split-s>
5400	3237	<split-h>	<split-h>
5400	3237	<name2>	<name2>
5400	4043	<>	<name>
5400	3240	<aphaerese>	<aphaerese>
5400	4045	<>	<aphaerese>
5400	3237	<elision3>	<elision3>
5400	4045	<>	<elision3>
5400	3237	<elision2>	<elision2>
5400	4045	<>	<elision2>
5400	3237	<elision1>	<elision1>
5400	4045	<>	<elision1>
5400	3236	.	υ
5400	3236	.	u
5400	3236	.	α
5400	3236	.	a
5401	4459	.	.
5401	4460	 	 
5401	4459	<~>	<~>
5401	4459	<split-s>	<split-s>
5401	4459	<split-h>	<split-h>
5401	4459	<name2>	<name2>
5401	4799	<name2>	<name>
5401	5346	<>	<name>
5401	4463	<aphaerese>	<aphaerese>
5401	5345	<>	<aphaerese>
5401	4459	<elision3>	<elision3>
5401	5345	<>	<elision3>
5401	4459	<elision2>	<elision2>
5401	5345	<>	<elision2>
5401	4459	<elision1>	<elision1>
5401	5345	<>	<elision1>
5401	4467	.	υ
5401	4470	s	υ
5401	4467	.	u
5401	4470	s	u
5401	4633	.	κ
5401	4533	s	U
5401	4467	.	α
5401	4561	s	α
5401	4467	.	a
5401	4561	s	a
5401	4564	s	A
5401	4633	.	λ
5401	3957	<1s>	<>
5401	4803	<k2K>	<>
5401	4804	<k2L>	<>
5401	5402	<K2L>	<>
5402	4625	.	.
5402	4626	 	 
5402	4625	<~>	<~>
5402	4625	<split-s>	<split-s>
5402	4625	<split-h>	<split-h>
5402	4625	<name2>	<name2>
5402	4805	<name2>	<name>
5402	5340	<>	<name>
5402	4629	<aphaerese>	<aphaerese>
5402	5339	<>	<aphaerese>
5402	4625	<elision3>	<elision3>
5402	5339	<>	<elision3>
5402	4625	<elision2>	<elision2>
5402	5339	<>	<elision2>
5402	4625	<elision1>	<elision1>
5402	5339	<>	<elision1>
5402	4633	.	υ
5402	4636	s	υ
5402	4633	.	u
5402	4636	s	u
5402	4682	s	U
5402	4633	.	α
5402	4707	s	α
5402	4633	.	a
5402	4707	s	a
5402	4710	s	A
5402	5403	<1s>	<>
5403	215	.	.
5403	216	 	 
5403	215	<~>	<~>
5403	215	<split-s>	<split-s>
5403	215	<split-h>	<split-h>
5403	215	<name2>	<name2>
5403	3899	<name2>	<name>
5403	4042	<>	<name>
5403	219	<aphaerese>	<aphaerese>
5403	4041	<>	<aphaerese>
5403	215	<elision3>	<elision3>
5403	4041	<>	<elision3>
5403	215	<elision2>	<elision2>
5403	4041	<>	<elision2>
5403	215	<elision1>	<elision1>
5403	4041	<>	<elision1>
5403	3187	.	υ
5403	3187	.	u
5403	3187	.	α
5403	3187	.	a
5403	5404	<K>	<>
5404	3237	.	.
5404	3237	<~>	<~>
5404	3237	<split-s>	<split-s>
5404	3237	<split-h>	<split-h>
5404	3237	<name2>	<name2>
5404	3789	<name2>	<name>
5404	4043	<>	<name>
5404	3240	<aphaerese>	<aphaerese>
5404	4045	<>	<aphaerese>
5404	3237	<elision3>	<elision3>
5404	4045	<>	<elision3>
5404	3237	<elision2>	<elision2>
5404	4045	<>	<elision2>
5404	3237	<elision1>	<elision1>
5404	4045	<>	<elision1>
5404	3236	.	υ
5404	3236	.	u
5404	3236	.	α
5404	3236	.	a
5405	4625	.	.
5405	4626	 	 
5405	4625	<~>	<~>
5405	4625	<split-s>	<split-s>
5405	4625	<split-h>	<split-h>
5405	4625	<name2>	<name2>
5405	4805	<name2>	<name>
5405	5351	<>	<name>
5405	4629	<aphaerese>	<aphaerese>
5405	5353	<>	<aphaerese>
5405	4625	<elision3>	<elision3>
5405	5353	<>	<elision3>
5405	4625	<elision2>	<elision2>
5405	5353	<>	<elision2>
5405	4625	<elision1>	<elision1>
5405	5353	<>	<elision1>
5405	4633	.	υ
5405	4636	s	υ
5405	4633	.	u
5405	4636	s	u
5405	4633	.	κ
5405	4682	s	U
5405	4633	.	α
5405	4707	s	α
5405	4633	.	a
5405	4707	s	a
5405	4710	s	A
5405	4633	.	λ
5405	4054	<1s>	<>
5405	4804	<l2L>	<>
5406	179	.	.
5406	180	 	 
5406	179	<~>	<~>
5406	179	<split-s>	<split-s>
5406	179	<split-h>	<split-h>
5406	179	<name2>	<name2>
5406	183	<aphaerese>	<aphaerese>
5406	5407	<>	<aphaerese>
5406	5410	<elision3>	<elision3>
5406	5407	<>	<elision3>
5406	5410	<elision2>	<elision2>
5406	5407	<>	<elision2>
5406	5410	<elision1>	<elision1>
5406	5407	<>	<elision1>
5406	4828	.	υ
5406	4872	H	υ
5406	4828	.	u
5406	4874	H	u
5406	4828	.	κ
5406	5287	H	κ
5406	4782	H	k
5406	4795	H	U
5406	4798	H	K
5406	4828	.	α
5406	4858	H	α
5406	4828	.	a
5406	4863	H	a
5406	4625	H	A
5406	4828	.	λ
5406	5264	H	λ
5406	5212	H	l
5406	5217	H	L
5406	5413	<K>	<>
5407	179	.	.
5407	180	 	 
5407	179	<~>	<~>
5407	179	<split-s>	<split-s>
5407	179	<split-h>	<split-h>
5407	179	<name2>	<name2>
5407	5408	<>	<name>
5407	183	<aphaerese>	<aphaerese>
5407	5407	<>	<aphaerese>
5407	5410	<elision3>	<elision3>
5407	5407	<>	<elision3>
5407	5410	<elision2>	<elision2>
5407	5407	<>	<elision2>
5407	5410	<elision1>	<elision1>
5407	5407	<>	<elision1>
5407	4828	.	υ
5407	4872	H	υ
5407	4828	.	u
5407	4874	H	u
5407	4828	.	κ
5407	5287	H	κ
5407	4782	H	k
5407	4795	H	U
5407	4798	H	K
5407	4828	.	α
5407	4858	H	α
5407	4828	.	a
5407	4863	H	a
5407	4625	H	A
5407	4828	.	λ
5407	5264	H	λ
5407	5212	H	l
5407	5217	H	L
5407	5414	<K>	<>
5408	178	.	.
5408	182	 	 
5408	178	<~>	<~>
5408	178	<split-s>	<split-s>
5408	178	<split-h>	<split-h>
5408	178	<name2>	<name2>
5408	185	<aphaerese>	<aphaerese>
5408	5406	<>	<aphaerese>
5408	5409	<elision3>	<elision3>
5408	5406	<>	<elision3>
5408	5409	<elision2>	<elision2>
5408	5406	<>	<elision2>
5408	5409	<elision1>	<elision1>
5408	5406	<>	<elision1>
5408	4830	.	υ
5408	4867	H	υ
5408	4830	.	u
5408	4871	H	u
5408	4830	.	κ
5408	5244	H	κ
5408	4823	H	k
5408	4797	H	U
5408	4827	H	K
5408	4830	.	α
5408	4857	H	α
5408	4830	.	a
5408	4862	H	a
5408	4628	H	A
5408	4830	.	λ
5408	5263	H	λ
5408	5211	H	l
5408	5214	H	L
5408	5412	<K>	<>
5409	179	.	.
5409	180	 	 
5409	179	<~>	<~>
5409	179	<split-s>	<split-s>
5409	179	<split-h>	<split-h>
5409	179	<name2>	<name2>
5409	183	<aphaerese>	<aphaerese>
5409	5410	<>	<aphaerese>
5409	179	<elision3>	<elision3>
5409	5410	<>	<elision3>
5409	179	<elision2>	<elision2>
5409	5410	<>	<elision2>
5409	179	<elision1>	<elision1>
5409	5410	<>	<elision1>
5409	4828	.	υ
5409	4872	H	υ
5409	4828	.	u
5409	4874	H	u
5409	186	.	κ
5409	5393	H	κ
5409	5397	H	k
5409	4795	H	U
5409	5401	H	K
5409	4828	.	α
5409	4858	H	α
5409	4828	.	a
5409	4863	H	a
5409	4625	H	A
5409	5349	H	λ
5409	5355	H	l
5409	5405	H	L
5410	179	.	.
5410	180	 	 
5410	179	<~>	<~>
5410	179	<split-s>	<split-s>
5410	179	<split-h>	<split-h>
5410	179	<name2>	<name2>
5410	5411	<>	<name>
5410	183	<aphaerese>	<aphaerese>
5410	5410	<>	<aphaerese>
5410	179	<elision3>	<elision3>
5410	5410	<>	<elision3>
5410	179	<elision2>	<elision2>
5410	5410	<>	<elision2>
5410	179	<elision1>	<elision1>
5410	5410	<>	<elision1>
5410	4828	.	υ
5410	4872	H	υ
5410	4828	.	u
5410	4874	H	u
5410	186	.	κ
5410	5393	H	κ
5410	5397	H	k
5410	4795	H	U
5410	5401	H	K
5410	4828	.	α
5410	4858	H	α
5410	4828	.	a
5410	4863	H	a
5410	4625	H	A
5410	5349	H	λ
5410	5355	H	l
5410	5405	H	L
5411	178	.	.
5411	182	 	 
5411	178	<~>	<~>
5411	178	<split-s>	<split-s>
5411	178	<split-h>	<split-h>
5411	178	<name2>	<name2>
5411	185	<aphaerese>	<aphaerese>
5411	5409	<>	<aphaerese>
5411	178	<elision3>	<elision3>
5411	5409	<>	<elision3>
5411	178	<elision2>	<elision2>
5411	5409	<>	<elision2>
5411	178	<elision1>	<elision1>
5411	5409	<>	<elision1>
5411	4830	.	υ
5411	4867	H	υ
5411	4830	.	u
5411	4871	H	u
5411	188	.	κ
5411	5312	H	κ
5411	5331	H	k
5411	4797	H	U
5411	5344	H	K
5411	4830	.	α
5411	4857	H	α
5411	4830	.	a
5411	4862	H	a
5411	4628	H	A
5411	5348	H	λ
5411	5354	H	l
5411	5352	H	L
5412	4880	.	.
5412	4880	<~>	<~>
5412	4880	<split-s>	<split-s>
5412	4880	<split-h>	<split-h>
5412	4880	<name2>	<name2>
5412	4883	<aphaerese>	<aphaerese>
5412	5413	<>	<aphaerese>
5412	5358	<elision3>	<elision3>
5412	5413	<>	<elision3>
5412	5358	<elision2>	<elision2>
5412	5413	<>	<elision2>
5412	5358	<elision1>	<elision1>
5412	5413	<>	<elision1>
5412	4876	.	υ
5412	5022	H	υ
5412	4876	.	u
5412	5031	H	u
5412	4876	.	κ
5412	5274	H	κ
5412	4991	H	k
5412	5000	H	U
5412	5004	H	K
5412	4876	.	α
5412	5034	H	α
5412	4876	.	a
5412	5037	H	a
5412	4971	H	A
5412	4876	.	λ
5412	5283	H	λ
5412	5018	H	l
5412	5013	H	L
5413	4878	.	.
5413	4878	<~>	<~>
5413	4878	<split-s>	<split-s>
5413	4878	<split-h>	<split-h>
5413	4878	<name2>	<name2>
5413	4881	<aphaerese>	<aphaerese>
5413	5414	<>	<aphaerese>
5413	5359	<elision3>	<elision3>
5413	5414	<>	<elision3>
5413	5359	<elision2>	<elision2>
5413	5414	<>	<elision2>
5413	5359	<elision1>	<elision1>
5413	5414	<>	<elision1>
5413	4877	.	υ
5413	5020	H	υ
5413	4877	.	u
5413	5029	H	u
5413	4877	.	κ
5413	5272	H	κ
5413	4989	H	k
5413	4998	H	U
5413	5001	H	K
5413	4877	.	α
5413	5032	H	α
5413	4877	.	a
5413	5035	H	a
5413	4969	H	A
5413	4877	.	λ
5413	5281	H	λ
5413	5016	H	l
5413	5019	H	L
5414	4878	.	.
5414	4878	<~>	<~>
5414	4878	<split-s>	<split-s>
5414	4878	<split-h>	<split-h>
5414	4878	<name2>	<name2>
5414	5412	<>	<name>
5414	4881	<aphaerese>	<aphaerese>
5414	5414	<>	<aphaerese>
5414	5359	<elision3>	<elision3>
5414	5414	<>	<elision3>
5414	5359	<elision2>	<elision2>
5414	5414	<>	<elision2>
5414	5359	<elision1>	<elision1>
5414	5414	<>	<elision1>
5414	4877	.	υ
5414	5020	H	υ
5414	4877	.	u
5414	5029	H	u
5414	4877	.	κ
5414	5272	H	κ
5414	4989	H	k
5414	4998	H	U
5414	5001	H	K
5414	4877	.	α
5414	5032	H	α
5414	4877	.	a
5414	5035	H	a
5414	4969	H	A
5414	4877	.	λ
5414	5281	H	λ
5414	5016	H	l
5414	5019	H	L
5415	5054	.	.
5415	5054	 	 
5415	5054	<~>	<~>
5415	5054	<split-s>	<split-s>
5415	5054	<split-h>	<split-h>
5415	5054	<name2>	<name2>
5415	5416	<>	<name>
5415	5057	<aphaerese>	<aphaerese>
5415	5415	<>	<aphaerese>
5415	5054	<elision3>	<elision3>
5415	5415	<>	<elision3>
5415	5054	<elision2>	<elision2>
5415	5415	<>	<elision2>
5415	5054	<elision1>	<elision1>
5415	5415	<>	<elision1>
5415	5218	.	υ
5415	5218	.	u
5415	5218	.	κ
5415	5218	.	α
5415	5218	.	a
5415	5218	.	λ
5415	5419	<4s>	<>
5416	5056	.	.
5416	5056	 	 
5416	5056	<~>	<~>
5416	5056	<split-s>	<split-s>
5416	5056	<split-h>	<split-h>
5416	5056	<name2>	<name2>
5416	5059	<aphaerese>	<aphaerese>
5416	5417	<>	<aphaerese>
5416	5056	<elision3>	<elision3>
5416	5417	<>	<elision3>
5416	5056	<elision2>	<elision2>
5416	5417	<>	<elision2>
5416	5056	<elision1>	<elision1>
5416	5417	<>	<elision1>
5416	5220	.	υ
5416	5220	.	u
5416	5220	.	κ
5416	5220	.	α
5416	5220	.	a
5416	5220	.	λ
5416	5420	<4s>	<>
5417	5054	.	.
5417	5054	 	 
5417	5054	<~>	<~>
5417	5054	<split-s>	<split-s>
5417	5054	<split-h>	<split-h>
5417	5054	<name2>	<name2>
5417	5057	<aphaerese>	<aphaerese>
5417	5415	<>	<aphaerese>
5417	5054	<elision3>	<elision3>
5417	5415	<>	<elision3>
5417	5054	<elision2>	<elision2>
5417	5415	<>	<elision2>
5417	5054	<elision1>	<elision1>
5417	5415	<>	<elision1>
5417	5218	.	υ
5417	5218	.	u
5417	5218	.	κ
5417	5218	.	α
5417	5218	.	a
5417	5218	.	λ
5417	5418	<4s>	<>
5418	179	.	.
5418	180	 	 
5418	179	<~>	<~>
5418	179	<split-s>	<split-s>
5418	179	<split-h>	<split-h>
5418	179	<name2>	<name2>
5418	183	<aphaerese>	<aphaerese>
5418	5419	<>	<aphaerese>
5418	179	<elision3>	<elision3>
5418	5419	<>	<elision3>
5418	179	<elision2>	<elision2>
5418	5419	<>	<elision2>
5418	179	<elision1>	<elision1>
5418	5419	<>	<elision1>
5418	4828	.	υ
5418	4872	H	υ
5418	4828	.	u
5418	4874	H	u
5418	4828	.	κ
5418	5287	H	κ
5418	4782	H	k
5418	4795	H	U
5418	4798	H	K
5418	4828	.	α
5418	4858	H	α
5418	4828	.	a
5418	4863	H	a
5418	4625	H	A
5418	4828	.	λ
5418	5264	H	λ
5418	5212	H	l
5418	5217	H	L
5418	5422	<K>	<>
5419	179	.	.
5419	180	 	 
5419	179	<~>	<~>
5419	179	<split-s>	<split-s>
5419	179	<split-h>	<split-h>
5419	179	<name2>	<name2>
5419	5420	<>	<name>
5419	183	<aphaerese>	<aphaerese>
5419	5419	<>	<aphaerese>
5419	179	<elision3>	<elision3>
5419	5419	<>	<elision3>
5419	179	<elision2>	<elision2>
5419	5419	<>	<elision2>
5419	179	<elision1>	<elision1>
5419	5419	<>	<elision1>
5419	4828	.	υ
5419	4872	H	υ
5419	4828	.	u
5419	4874	H	u
5419	4828	.	κ
5419	5287	H	κ
5419	4782	H	k
5419	4795	H	U
5419	4798	H	K
5419	4828	.	α
5419	4858	H	α
5419	4828	.	a
5419	4863	H	a
5419	4625	H	A
5419	4828	.	λ
5419	5264	H	λ
5419	5212	H	l
5419	5217	H	L
5419	5423	<K>	<>
5420	178	.	.
5420	182	 	 
5420	178	<~>	<~>
5420	178	<split-s>	<split-s>
5420	178	<split-h>	<split-h>
5420	178	<name2>	<name2>
5420	185	<aphaerese>	<aphaerese>
5420	5418	<>	<aphaerese>
5420	178	<elision3>	<elision3>
5420	5418	<>	<elision3>
5420	178	<elision2>	<elision2>
5420	5418	<>	<elision2>
5420	178	<elision1>	<elision1>
5420	5418	<>	<elision1>
5420	4830	.	υ
5420	4867	H	υ
5420	4830	.	u
5420	4871	H	u
5420	4830	.	κ
5420	5244	H	κ
5420	4823	H	k
5420	4797	H	U
5420	4827	H	K
5420	4830	.	α
5420	4857	H	α
5420	4830	.	a
5420	4862	H	a
5420	4628	H	A
5420	4830	.	λ
5420	5263	H	λ
5420	5211	H	l
5420	5214	H	L
5420	5421	<K>	<>
5421	4880	.	.
5421	4880	<~>	<~>
5421	4880	<split-s>	<split-s>
5421	4880	<split-h>	<split-h>
5421	4880	<name2>	<name2>
5421	4883	<aphaerese>	<aphaerese>
5421	5422	<>	<aphaerese>
5421	4880	<elision3>	<elision3>
5421	5422	<>	<elision3>
5421	4880	<elision2>	<elision2>
5421	5422	<>	<elision2>
5421	4880	<elision1>	<elision1>
5421	5422	<>	<elision1>
5421	4876	.	υ
5421	5022	H	υ
5421	4876	.	u
5421	5031	H	u
5421	4876	.	κ
5421	5274	H	κ
5421	4991	H	k
5421	5000	H	U
5421	5004	H	K
5421	4876	.	α
5421	5034	H	α
5421	4876	.	a
5421	5037	H	a
5421	4971	H	A
5421	4876	.	λ
5421	5283	H	λ
5421	5018	H	l
5421	5013	H	L
5422	4878	.	.
5422	4878	<~>	<~>
5422	4878	<split-s>	<split-s>
5422	4878	<split-h>	<split-h>
5422	4878	<name2>	<name2>
5422	4881	<aphaerese>	<aphaerese>
5422	5423	<>	<aphaerese>
5422	4878	<elision3>	<elision3>
5422	5423	<>	<elision3>
5422	4878	<elision2>	<elision2>
5422	5423	<>	<elision2>
5422	4878	<elision1>	<elision1>
5422	5423	<>	<elision1>
5422	4877	.	υ
5422	5020	H	υ
5422	4877	.	u
5422	5029	H	u
5422	4877	.	κ
5422	5272	H	κ
5422	4989	H	k
5422	4998	H	U
5422	5001	H	K
5422	4877	.	α
5422	5032	H	α
5422	4877	.	a
5422	5035	H	a
5422	4969	H	A
5422	4877	.	λ
5422	5281	H	λ
5422	5016	H	l
5422	5019	H	L
5423	4878	.	.
5423	4878	<~>	<~>
5423	4878	<split-s>	<split-s>
5423	4878	<split-h>	<split-h>
5423	4878	<name2>	<name2>
5423	5421	<>	<name>
5423	4881	<aphaerese>	<aphaerese>
5423	5423	<>	<aphaerese>
5423	4878	<elision3>	<elision3>
5423	5423	<>	<elision3>
5423	4878	<elision2>	<elision2>
5423	5423	<>	<elision2>
5423	4878	<elision1>	<elision1>
5423	5423	<>	<elision1>
5423	4877	.	υ
5423	5020	H	υ
5423	4877	.	u
5423	5029	H	u
5423	4877	.	κ
5423	5272	H	κ
5423	4989	H	k
5423	4998	H	U
5423	5001	H	K
5423	4877	.	α
5423	5032	H	α
5423	4877	.	a
5423	5035	H	a
5423	4969	H	A
5423	4877	.	λ
5423	5281	H	λ
5423	5016	H	l
5423	5019	H	L
5424	5425	<>	<name>
5424	5424	<>	<aphaerese>
5424	5424	<>	<elision3>
5424	5424	<>	<elision2>
5424	5424	<>	<elision1>
5424	5054	<U2kl>	<>
5425	5426	<>	<aphaerese>
5425	5426	<>	<elision3>
5425	5426	<>	<elision2>
5425	5426	<>	<elision1>
5425	5055	<U2kl>	<>
5426	5424	<>	<aphaerese>
5426	5424	<>	<elision3>
5426	5424	<>	<elision2>
5426	5424	<>	<elision1>
5426	5056	<U2kl>	<>
5427	5428	<name>	<name>
5427	5431	<>	<name>
5427	5433	<>	<aphaerese>
5427	5433	<>	<elision3>
5427	5433	<>	<elision2>
5427	5433	<>	<elision1>
5427	5539	<4s>	<>
5427	5434	<A2kl>	<>
5427	5497	<L2kl>	<>
5427	5542	<K2kl>	<>
5428	5429	<4s>	<>
5429	4827	H	k
5429	5214	H	l
5429	5430	<K>	<>
5430	5004	H	k
5430	5013	H	l
5431	5432	<>	<aphaerese>
5431	5432	<>	<elision3>
5431	5432	<>	<elision2>
5431	5432	<>	<elision1>
5431	5435	<A2kl>	<>
5431	5498	<L2kl>	<>
5431	5531	<K2kl>	<>
5432	5433	<>	<aphaerese>
5432	5433	<>	<elision3>
5432	5433	<>	<elision2>
5432	5433	<>	<elision1>
5432	5436	<A2kl>	<>
5432	5499	<L2kl>	<>
5432	5532	<K2kl>	<>
5433	5431	<>	<name>
5433	5433	<>	<aphaerese>
5433	5433	<>	<elision3>
5433	5433	<>	<elision2>
5433	5433	<>	<elision1>
5433	5434	<A2kl>	<>
5433	5497	<L2kl>	<>
5433	5530	<K2kl>	<>
5434	5435	<>	<name>
5434	5434	<>	<aphaerese>
5434	5434	<>	<elision3>
5434	5434	<>	<elision2>
5434	5434	<>	<elision1>
5434	5437	.	κ
5434	5437	.	λ
5434	5489	<4s>	<>
5435	5436	<>	<aphaerese>
5435	5436	<>	<elision3>
5435	5436	<>	<elision2>
5435	5436	<>	<elision1>
5435	5439	.	κ
5435	5439	.	λ
5435	5490	<4s>	<>
5436	5434	<>	<aphaerese>
5436	5434	<>	<elision3>
5436	5434	<>	<elision2>
5436	5434	<>	<elision1>
5436	5437	.	κ
5436	5437	.	λ
5436	5488	<4s>	<>
5437	5438	<>	<name>
5437	5437	<>	<aphaerese>
5437	5440	<elision3>	<elision3>
5437	5437	<>	<elision3>
5437	5440	<elision2>	<elision2>
5437	5437	<>	<elision2>
5437	5440	<elision1>	<elision1>
5437	5437	<>	<elision1>
5437	5480	<4s>	<>
5438	5439	<>	<aphaerese>
5438	5442	<elision3>	<elision3>
5438	5439	<>	<elision3>
5438	5442	<elision2>	<elision2>
5438	5439	<>	<elision2>
5438	5442	<elision1>	<elision1>
5438	5439	<>	<elision1>
5438	5481	<4s>	<>
5439	5437	<>	<aphaerese>
5439	5440	<elision3>	<elision3>
5439	5437	<>	<elision3>
5439	5440	<elision2>	<elision2>
5439	5437	<>	<elision2>
5439	5440	<elision1>	<elision1>
5439	5437	<>	<elision1>
5439	5479	<4s>	<>
5440	5054	.	.
5440	5054	 	 
5440	5054	<~>	<~>
5440	5054	<split-s>	<split-s>
5440	5054	<split-h>	<split-h>
5440	5054	<name2>	<name2>
5440	5441	<>	<name>
5440	5057	<aphaerese>	<aphaerese>
5440	5440	<>	<aphaerese>
5440	5054	<elision3>	<elision3>
5440	5440	<>	<elision3>
5440	5054	<elision2>	<elision2>
5440	5440	<>	<elision2>
5440	5054	<elision1>	<elision1>
5440	5440	<>	<elision1>
5440	5218	.	υ
5440	5218	.	u
5440	5218	.	α
5440	5218	.	a
5440	5444	<4s>	<>
5441	5056	.	.
5441	5056	 	 
5441	5056	<~>	<~>
5441	5056	<split-s>	<split-s>
5441	5056	<split-h>	<split-h>
5441	5056	<name2>	<name2>
5441	5059	<aphaerese>	<aphaerese>
5441	5442	<>	<aphaerese>
5441	5056	<elision3>	<elision3>
5441	5442	<>	<elision3>
5441	5056	<elision2>	<elision2>
5441	5442	<>	<elision2>
5441	5056	<elision1>	<elision1>
5441	5442	<>	<elision1>
5441	5220	.	υ
5441	5220	.	u
5441	5220	.	α
5441	5220	.	a
5441	5445	<4s>	<>
5442	5054	.	.
5442	5054	 	 
5442	5054	<~>	<~>
5442	5054	<split-s>	<split-s>
5442	5054	<split-h>	<split-h>
5442	5054	<name2>	<name2>
5442	5057	<aphaerese>	<aphaerese>
5442	5440	<>	<aphaerese>
5442	5054	<elision3>	<elision3>
5442	5440	<>	<elision3>
5442	5054	<elision2>	<elision2>
5442	5440	<>	<elision2>
5442	5054	<elision1>	<elision1>
5442	5440	<>	<elision1>
5442	5218	.	υ
5442	5218	.	u
5442	5218	.	α
5442	5218	.	a
5442	5443	<4s>	<>
5443	179	.	.
5443	180	 	 
5443	179	<~>	<~>
5443	179	<split-s>	<split-s>
5443	179	<split-h>	<split-h>
5443	179	<name2>	<name2>
5443	183	<aphaerese>	<aphaerese>
5443	5444	<>	<aphaerese>
5443	179	<elision3>	<elision3>
5443	5444	<>	<elision3>
5443	179	<elision2>	<elision2>
5443	5444	<>	<elision2>
5443	179	<elision1>	<elision1>
5443	5444	<>	<elision1>
5443	4828	.	υ
5443	4872	H	υ
5443	4828	.	u
5443	4874	H	u
5443	5447	H	κ
5443	5459	H	k
5443	4795	H	U
5443	5451	H	K
5443	4828	.	α
5443	4858	H	α
5443	4828	.	a
5443	4863	H	a
5443	4625	H	A
5443	5447	H	λ
5443	5459	H	l
5443	5451	H	L
5443	5462	<K>	<>
5444	179	.	.
5444	180	 	 
5444	179	<~>	<~>
5444	179	<split-s>	<split-s>
5444	179	<split-h>	<split-h>
5444	179	<name2>	<name2>
5444	5445	<>	<name>
5444	183	<aphaerese>	<aphaerese>
5444	5444	<>	<aphaerese>
5444	179	<elision3>	<elision3>
5444	5444	<>	<elision3>
5444	179	<elision2>	<elision2>
5444	5444	<>	<elision2>
5444	179	<elision1>	<elision1>
5444	5444	<>	<elision1>
5444	4828	.	υ
5444	4872	H	υ
5444	4828	.	u
5444	4874	H	u
5444	5447	H	κ
5444	5459	H	k
5444	4795	H	U
5444	5451	H	K
5444	4828	.	α
5444	4858	H	α
5444	4828	.	a
5444	4863	H	a
5444	4625	H	A
5444	5447	H	λ
5444	5459	H	l
5444	5451	H	L
5444	5463	<K>	<>
5445	178	.	.
5445	182	 	 
5445	178	<~>	<~>
5445	178	<split-s>	<split-s>
5445	178	<split-h>	<split-h>
5445	178	<name2>	<name2>
5445	185	<aphaerese>	<aphaerese>
5445	5443	<>	<aphaerese>
5445	178	<elision3>	<elision3>
5445	5443	<>	<elision3>
5445	178	<elision2>	<elision2>
5445	5443	<>	<elision2>
5445	178	<elision1>	<elision1>
5445	5443	<>	<elision1>
5445	4830	.	υ
5445	4867	H	υ
5445	4830	.	u
5445	4871	H	u
5445	5446	H	κ
5445	5458	H	k
5445	4797	H	U
5445	5450	H	K
5445	4830	.	α
5445	4857	H	α
5445	4830	.	a
5445	4862	H	a
5445	4628	H	A
5445	5446	H	λ
5445	5458	H	l
5445	5450	H	L
5445	5461	<K>	<>
5446	5447	<>	<aphaerese>
5446	5447	<>	<elision3>
5446	5447	<>	<elision2>
5446	5447	<>	<elision1>
5446	5450	<lambda2L>	<>
5447	5448	<>	<name>
5447	5447	<>	<aphaerese>
5447	5447	<>	<elision3>
5447	5447	<>	<elision2>
5447	5447	<>	<elision1>
5447	5451	<lambda2L>	<>
5448	5446	<>	<aphaerese>
5448	5446	<>	<elision3>
5448	5446	<>	<elision2>
5448	5446	<>	<elision1>
5448	5449	<lambda2L>	<>
5449	5450	<>	<aphaerese>
5449	5450	<>	<elision3>
5449	5450	<>	<elision2>
5449	5450	<>	<elision1>
5449	5454	.	κ
5449	5454	.	λ
5449	3882	<1s>	<>
5450	5451	<>	<aphaerese>
5450	5451	<>	<elision3>
5450	5451	<>	<elision2>
5450	5451	<>	<elision1>
5450	5452	.	κ
5450	5452	.	λ
5450	3880	<1s>	<>
5451	5449	<>	<name>
5451	5451	<>	<aphaerese>
5451	5451	<>	<elision3>
5451	5451	<>	<elision2>
5451	5451	<>	<elision1>
5451	5452	.	κ
5451	5452	.	λ
5451	3881	<1s>	<>
5452	5453	<>	<name>
5452	5452	<>	<aphaerese>
5452	5455	<elision3>	<elision3>
5452	5452	<>	<elision3>
5452	5455	<elision2>	<elision2>
5452	5452	<>	<elision2>
5452	5455	<elision1>	<elision1>
5452	5452	<>	<elision1>
5452	3872	<1s>	<>
5453	5454	<>	<aphaerese>
5453	5457	<elision3>	<elision3>
5453	5454	<>	<elision3>
5453	5457	<elision2>	<elision2>
5453	5454	<>	<elision2>
5453	5457	<elision1>	<elision1>
5453	5454	<>	<elision1>
5453	3873	<1s>	<>
5454	5452	<>	<aphaerese>
5454	5455	<elision3>	<elision3>
5454	5452	<>	<elision3>
5454	5455	<elision2>	<elision2>
5454	5452	<>	<elision2>
5454	5455	<elision1>	<elision1>
5454	5452	<>	<elision1>
5454	3871	<1s>	<>
5455	5456	<>	<name>
5455	5455	<>	<aphaerese>
5455	5455	<>	<elision3>
5455	5455	<>	<elision2>
5455	5455	<>	<elision1>
5455	4639	.	κ
5455	4657	s	κ
5455	4392	s	k
5455	4410	s	K
5455	4713	s	λ
5455	4423	s	l
5455	4426	s	L
5455	3866	<1s>	<>
5456	5457	<>	<aphaerese>
5456	5457	<>	<elision3>
5456	5457	<>	<elision2>
5456	5457	<>	<elision1>
5456	4641	.	κ
5456	4659	s	κ
5456	4394	s	k
5456	4413	s	K
5456	4715	s	λ
5456	4425	s	l
5456	4428	s	L
5456	3867	<1s>	<>
5457	5455	<>	<aphaerese>
5457	5455	<>	<elision3>
5457	5455	<>	<elision2>
5457	5455	<>	<elision1>
5457	4639	.	κ
5457	4657	s	κ
5457	4392	s	k
5457	4410	s	K
5457	4713	s	λ
5457	4423	s	l
5457	4426	s	L
5457	3865	<1s>	<>
5458	5459	<>	<aphaerese>
5458	5459	<>	<elision3>
5458	5459	<>	<elision2>
5458	5459	<>	<elision1>
5458	5450	<l2L>	<>
5459	5460	<>	<name>
5459	5459	<>	<aphaerese>
5459	5459	<>	<elision3>
5459	5459	<>	<elision2>
5459	5459	<>	<elision1>
5459	5451	<l2L>	<>
5460	5458	<>	<aphaerese>
5460	5458	<>	<elision3>
5460	5458	<>	<elision2>
5460	5458	<>	<elision1>
5460	5449	<l2L>	<>
5461	4880	.	.
5461	4880	<~>	<~>
5461	4880	<split-s>	<split-s>
5461	4880	<split-h>	<split-h>
5461	4880	<name2>	<name2>
5461	4883	<aphaerese>	<aphaerese>
5461	5462	<>	<aphaerese>
5461	4880	<elision3>	<elision3>
5461	5462	<>	<elision3>
5461	4880	<elision2>	<elision2>
5461	5462	<>	<elision2>
5461	4880	<elision1>	<elision1>
5461	5462	<>	<elision1>
5461	4876	.	υ
5461	5022	H	υ
5461	4876	.	u
5461	5031	H	u
5461	5466	H	κ
5461	5478	H	k
5461	5000	H	U
5461	5467	H	K
5461	4876	.	α
5461	5034	H	α
5461	4876	.	a
5461	5037	H	a
5461	4971	H	A
5461	5466	H	λ
5461	5478	H	l
5461	5467	H	L
5462	4878	.	.
5462	4878	<~>	<~>
5462	4878	<split-s>	<split-s>
5462	4878	<split-h>	<split-h>
5462	4878	<name2>	<name2>
5462	4881	<aphaerese>	<aphaerese>
5462	5463	<>	<aphaerese>
5462	4878	<elision3>	<elision3>
5462	5463	<>	<elision3>
5462	4878	<elision2>	<elision2>
5462	5463	<>	<elision2>
5462	4878	<elision1>	<elision1>
5462	5463	<>	<elision1>
5462	4877	.	υ
5462	5020	H	υ
5462	4877	.	u
5462	5029	H	u
5462	5464	H	κ
5462	5476	H	k
5462	4998	H	U
5462	5468	H	K
5462	4877	.	α
5462	5032	H	α
5462	4877	.	a
5462	5035	H	a
5462	4969	H	A
5462	5464	H	λ
5462	5476	H	l
5462	5468	H	L
5463	4878	.	.
5463	4878	<~>	<~>
5463	4878	<split-s>	<split-s>
5463	4878	<split-h>	<split-h>
5463	4878	<name2>	<name2>
5463	5461	<>	<name>
5463	4881	<aphaerese>	<aphaerese>
5463	5463	<>	<aphaerese>
5463	4878	<elision3>	<elision3>
5463	5463	<>	<elision3>
5463	4878	<elision2>	<elision2>
5463	5463	<>	<elision2>
5463	4878	<elision1>	<elision1>
5463	5463	<>	<elision1>
5463	4877	.	υ
5463	5020	H	υ
5463	4877	.	u
5463	5029	H	u
5463	5464	H	κ
5463	5476	H	k
5463	4998	H	U
5463	5468	H	K
5463	4877	.	α
5463	5032	H	α
5463	4877	.	a
5463	5035	H	a
5463	4969	H	A
5463	5464	H	λ
5463	5476	H	l
5463	5468	H	L
5464	5465	<>	<name>
5464	5464	<>	<aphaerese>
5464	5464	<>	<elision3>
5464	5464	<>	<elision2>
5464	5464	<>	<elision1>
5464	5468	<lambda2L>	<>
5465	5466	<>	<aphaerese>
5465	5466	<>	<elision3>
5465	5466	<>	<elision2>
5465	5466	<>	<elision1>
5465	5469	<lambda2L>	<>
5466	5464	<>	<aphaerese>
5466	5464	<>	<elision3>
5466	5464	<>	<elision2>
5466	5464	<>	<elision1>
5466	5467	<lambda2L>	<>
5467	5468	<>	<aphaerese>
5467	5468	<>	<elision3>
5467	5468	<>	<elision2>
5467	5468	<>	<elision1>
5467	5471	.	κ
5467	5471	.	λ
5468	5469	<>	<name>
5468	5468	<>	<aphaerese>
5468	5468	<>	<elision3>
5468	5468	<>	<elision2>
5468	5468	<>	<elision1>
5468	5471	.	κ
5468	5471	.	λ
5469	5467	<>	<aphaerese>
5469	5467	<>	<elision3>
5469	5467	<>	<elision2>
5469	5467	<>	<elision1>
5469	5470	.	κ
5469	5470	.	λ
5470	5471	<>	<aphaerese>
5470	5474	<elision3>	<elision3>
5470	5471	<>	<elision3>
5470	5474	<elision2>	<elision2>
5470	5471	<>	<elision2>
5470	5474	<elision1>	<elision1>
5470	5471	<>	<elision1>
5471	5472	<>	<name>
5471	5471	<>	<aphaerese>
5471	5474	<elision3>	<elision3>
5471	5471	<>	<elision3>
5471	5474	<elision2>	<elision2>
5471	5471	<>	<elision2>
5471	5474	<elision1>	<elision1>
5471	5471	<>	<elision1>
5472	5470	<>	<aphaerese>
5472	5473	<elision3>	<elision3>
5472	5470	<>	<elision3>
5472	5473	<elision2>	<elision2>
5472	5470	<>	<elision2>
5472	5473	<elision1>	<elision1>
5472	5470	<>	<elision1>
5473	5474	<>	<aphaerese>
5473	5474	<>	<elision3>
5473	5474	<>	<elision2>
5473	5474	<>	<elision1>
5473	4945	.	κ
5473	4918	s	κ
5473	4921	H	κ
5473	4918	s	k
5473	4921	H	k
5473	4906	s	K
5473	4921	H	K
5473	4918	s	λ
5473	4921	H	λ
5473	4918	s	l
5473	4921	H	l
5473	4912	s	L
5473	4921	H	L
5474	5475	<>	<name>
5474	5474	<>	<aphaerese>
5474	5474	<>	<elision3>
5474	5474	<>	<elision2>
5474	5474	<>	<elision1>
5474	4945	.	κ
5474	4918	s	κ
5474	4921	H	κ
5474	4918	s	k
5474	4921	H	k
5474	4906	s	K
5474	4921	H	K
5474	4918	s	λ
5474	4921	H	λ
5474	4918	s	l
5474	4921	H	l
5474	4912	s	L
5474	4921	H	L
5475	5473	<>	<aphaerese>
5475	5473	<>	<elision3>
5475	5473	<>	<elision2>
5475	5473	<>	<elision1>
5475	4947	.	κ
5475	4917	s	κ
5475	4920	H	κ
5475	4917	s	k
5475	4920	H	k
5475	4905	s	K
5475	4920	H	K
5475	4917	s	λ
5475	4920	H	λ
5475	4917	s	l
5475	4920	H	l
5475	4911	s	L
5475	4920	H	L
5476	5477	<>	<name>
5476	5476	<>	<aphaerese>
5476	5476	<>	<elision3>
5476	5476	<>	<elision2>
5476	5476	<>	<elision1>
5476	5468	<l2L>	<>
5477	5478	<>	<aphaerese>
5477	5478	<>	<elision3>
5477	5478	<>	<elision2>
5477	5478	<>	<elision1>
5477	5469	<l2L>	<>
5478	5476	<>	<aphaerese>
5478	5476	<>	<elision3>
5478	5476	<>	<elision2>
5478	5476	<>	<elision1>
5478	5467	<l2L>	<>
5479	5480	<>	<aphaerese>
5479	5483	<elision3>	<elision3>
5479	5480	<>	<elision3>
5479	5483	<elision2>	<elision2>
5479	5480	<>	<elision2>
5479	5483	<elision1>	<elision1>
5479	5480	<>	<elision1>
5479	5486	<K>	<>
5480	5481	<>	<name>
5480	5480	<>	<aphaerese>
5480	5483	<elision3>	<elision3>
5480	5480	<>	<elision3>
5480	5483	<elision2>	<elision2>
5480	5480	<>	<elision2>
5480	5483	<elision1>	<elision1>
5480	5480	<>	<elision1>
5480	5487	<K>	<>
5481	5479	<>	<aphaerese>
5481	5482	<elision3>	<elision3>
5481	5479	<>	<elision3>
5481	5482	<elision2>	<elision2>
5481	5479	<>	<elision2>
5481	5482	<elision1>	<elision1>
5481	5479	<>	<elision1>
5481	5485	<K>	<>
5482	179	.	.
5482	180	 	 
5482	179	<~>	<~>
5482	179	<split-s>	<split-s>
5482	179	<split-h>	<split-h>
5482	179	<name2>	<name2>
5482	183	<aphaerese>	<aphaerese>
5482	5483	<>	<aphaerese>
5482	179	<elision3>	<elision3>
5482	5483	<>	<elision3>
5482	179	<elision2>	<elision2>
5482	5483	<>	<elision2>
5482	179	<elision1>	<elision1>
5482	5483	<>	<elision1>
5482	4828	.	υ
5482	4872	H	υ
5482	4828	.	u
5482	4874	H	u
5482	5447	H	κ
5482	5459	H	k
5482	4795	H	U
5482	5451	H	K
5482	4828	.	α
5482	4858	H	α
5482	4828	.	a
5482	4863	H	a
5482	4625	H	A
5482	5447	H	λ
5482	5459	H	l
5482	5451	H	L
5483	179	.	.
5483	180	 	 
5483	179	<~>	<~>
5483	179	<split-s>	<split-s>
5483	179	<split-h>	<split-h>
5483	179	<name2>	<name2>
5483	5484	<>	<name>
5483	183	<aphaerese>	<aphaerese>
5483	5483	<>	<aphaerese>
5483	179	<elision3>	<elision3>
5483	5483	<>	<elision3>
5483	179	<elision2>	<elision2>
5483	5483	<>	<elision2>
5483	179	<elision1>	<elision1>
5483	5483	<>	<elision1>
5483	4828	.	υ
5483	4872	H	υ
5483	4828	.	u
5483	4874	H	u
5483	5447	H	κ
5483	5459	H	k
5483	4795	H	U
5483	5451	H	K
5483	4828	.	α
5483	4858	H	α
5483	4828	.	a
5483	4863	H	a
5483	4625	H	A
5483	5447	H	λ
5483	5459	H	l
5483	5451	H	L
5484	178	.	.
5484	182	 	 
5484	178	<~>	<~>
5484	178	<split-s>	<split-s>
5484	178	<split-h>	<split-h>
5484	178	<name2>	<name2>
5484	185	<aphaerese>	<aphaerese>
5484	5482	<>	<aphaerese>
5484	178	<elision3>	<elision3>
5484	5482	<>	<elision3>
5484	178	<elision2>	<elision2>
5484	5482	<>	<elision2>
5484	178	<elision1>	<elision1>
5484	5482	<>	<elision1>
5484	4830	.	υ
5484	4867	H	υ
5484	4830	.	u
5484	4871	H	u
5484	5446	H	κ
5484	5458	H	k
5484	4797	H	U
5484	5450	H	K
5484	4830	.	α
5484	4857	H	α
5484	4830	.	a
5484	4862	H	a
5484	4628	H	A
5484	5446	H	λ
5484	5458	H	l
5484	5450	H	L
5485	5486	<>	<aphaerese>
5485	5462	<elision3>	<elision3>
5485	5486	<>	<elision3>
5485	5462	<elision2>	<elision2>
5485	5486	<>	<elision2>
5485	5462	<elision1>	<elision1>
5485	5486	<>	<elision1>
5486	5487	<>	<aphaerese>
5486	5463	<elision3>	<elision3>
5486	5487	<>	<elision3>
5486	5463	<elision2>	<elision2>
5486	5487	<>	<elision2>
5486	5463	<elision1>	<elision1>
5486	5487	<>	<elision1>
5487	5485	<>	<name>
5487	5487	<>	<aphaerese>
5487	5463	<elision3>	<elision3>
5487	5487	<>	<elision3>
5487	5463	<elision2>	<elision2>
5487	5487	<>	<elision2>
5487	5463	<elision1>	<elision1>
5487	5487	<>	<elision1>
5488	5489	<>	<aphaerese>
5488	5489	<>	<elision3>
5488	5489	<>	<elision2>
5488	5489	<>	<elision1>
5488	5492	.	κ
5488	5492	.	λ
5488	5495	<K>	<>
5489	5490	<>	<name>
5489	5489	<>	<aphaerese>
5489	5489	<>	<elision3>
5489	5489	<>	<elision2>
5489	5489	<>	<elision1>
5489	5492	.	κ
5489	5492	.	λ
5489	5496	<K>	<>
5490	5488	<>	<aphaerese>
5490	5488	<>	<elision3>
5490	5488	<>	<elision2>
5490	5488	<>	<elision1>
5490	5491	.	κ
5490	5491	.	λ
5490	5494	<K>	<>
5491	5492	<>	<aphaerese>
5491	5483	<elision3>	<elision3>
5491	5492	<>	<elision3>
5491	5483	<elision2>	<elision2>
5491	5492	<>	<elision2>
5491	5483	<elision1>	<elision1>
5491	5492	<>	<elision1>
5492	5493	<>	<name>
5492	5492	<>	<aphaerese>
5492	5483	<elision3>	<elision3>
5492	5492	<>	<elision3>
5492	5483	<elision2>	<elision2>
5492	5492	<>	<elision2>
5492	5483	<elision1>	<elision1>
5492	5492	<>	<elision1>
5493	5491	<>	<aphaerese>
5493	5482	<elision3>	<elision3>
5493	5491	<>	<elision3>
5493	5482	<elision2>	<elision2>
5493	5491	<>	<elision2>
5493	5482	<elision1>	<elision1>
5493	5491	<>	<elision1>
5494	5495	<>	<aphaerese>
5494	5495	<>	<elision3>
5494	5495	<>	<elision2>
5494	5495	<>	<elision1>
5494	5486	.	κ
5494	5486	.	λ
5495	5496	<>	<aphaerese>
5495	5496	<>	<elision3>
5495	5496	<>	<elision2>
5495	5496	<>	<elision1>
5495	5487	.	κ
5495	5487	.	λ
5496	5494	<>	<name>
5496	5496	<>	<aphaerese>
5496	5496	<>	<elision3>
5496	5496	<>	<elision2>
5496	5496	<>	<elision1>
5496	5487	.	κ
5496	5487	.	λ
5497	5498	<>	<name>
5497	5497	<>	<aphaerese>
5497	5497	<>	<elision3>
5497	5497	<>	<elision2>
5497	5497	<>	<elision1>
5497	5500	.	κ
5497	5500	.	λ
5497	5522	<4s>	<>
5498	5499	<>	<aphaerese>
5498	5499	<>	<elision3>
5498	5499	<>	<elision2>
5498	5499	<>	<elision1>
5498	5502	.	κ
5498	5502	.	λ
5498	5523	<4s>	<>
5499	5497	<>	<aphaerese>
5499	5497	<>	<elision3>
5499	5497	<>	<elision2>
5499	5497	<>	<elision1>
5499	5500	.	κ
5499	5500	.	λ
5499	5521	<4s>	<>
5500	5501	<>	<name>
5500	5500	<>	<aphaerese>
5500	5503	<elision3>	<elision3>
5500	5500	<>	<elision3>
5500	5503	<elision2>	<elision2>
5500	5500	<>	<elision2>
5500	5503	<elision1>	<elision1>
5500	5500	<>	<elision1>
5500	5513	<4s>	<>
5501	5502	<>	<aphaerese>
5501	5505	<elision3>	<elision3>
5501	5502	<>	<elision3>
5501	5505	<elision2>	<elision2>
5501	5502	<>	<elision2>
5501	5505	<elision1>	<elision1>
5501	5502	<>	<elision1>
5501	5514	<4s>	<>
5502	5500	<>	<aphaerese>
5502	5503	<elision3>	<elision3>
5502	5500	<>	<elision3>
5502	5503	<elision2>	<elision2>
5502	5500	<>	<elision2>
5502	5503	<elision1>	<elision1>
5502	5500	<>	<elision1>
5502	5512	<4s>	<>
5503	5504	<>	<name>
5503	5503	<>	<aphaerese>
5503	5503	<>	<elision3>
5503	5503	<>	<elision2>
5503	5503	<>	<elision1>
5503	5060	.	κ
5503	5507	<4s>	<>
5504	5505	<>	<aphaerese>
5504	5505	<>	<elision3>
5504	5505	<>	<elision2>
5504	5505	<>	<elision1>
5504	5062	.	κ
5504	5508	<4s>	<>
5505	5503	<>	<aphaerese>
5505	5503	<>	<elision3>
5505	5503	<>	<elision2>
5505	5503	<>	<elision1>
5505	5060	.	κ
5505	5506	<4s>	<>
5506	5507	<>	<aphaerese>
5506	5507	<>	<elision3>
5506	5507	<>	<elision2>
5506	5507	<>	<elision1>
5506	186	.	κ
5506	4454	H	κ
5506	4782	H	k
5506	4798	H	K
5506	4809	H	λ
5506	5212	H	l
5506	5217	H	L
5506	5510	<K>	<>
5507	5508	<>	<name>
5507	5507	<>	<aphaerese>
5507	5507	<>	<elision3>
5507	5507	<>	<elision2>
5507	5507	<>	<elision1>
5507	186	.	κ
5507	4454	H	κ
5507	4782	H	k
5507	4798	H	K
5507	4809	H	λ
5507	5212	H	l
5507	5217	H	L
5507	5511	<K>	<>
5508	5506	<>	<aphaerese>
5508	5506	<>	<elision3>
5508	5506	<>	<elision2>
5508	5506	<>	<elision1>
5508	188	.	κ
5508	4819	H	κ
5508	4823	H	k
5508	4827	H	K
5508	4811	H	λ
5508	5211	H	l
5508	5214	H	L
5508	5509	<K>	<>
5509	5510	<>	<aphaerese>
5509	5510	<>	<elision3>
5509	5510	<>	<elision2>
5509	5510	<>	<elision1>
5509	4886	.	κ
5509	4937	H	κ
5509	4991	H	k
5509	5004	H	K
5509	5012	H	λ
5509	5018	H	l
5509	5013	H	L
5510	5511	<>	<aphaerese>
5510	5511	<>	<elision3>
5510	5511	<>	<elision2>
5510	5511	<>	<elision1>
5510	4884	.	κ
5510	4935	H	κ
5510	4989	H	k
5510	5001	H	K
5510	5010	H	λ
5510	5016	H	l
5510	5019	H	L
5511	5509	<>	<name>
5511	5511	<>	<aphaerese>
5511	5511	<>	<elision3>
5511	5511	<>	<elision2>
5511	5511	<>	<elision1>
5511	4884	.	κ
5511	4935	H	κ
5511	4989	H	k
5511	5001	H	K
5511	5010	H	λ
5511	5016	H	l
5511	5019	H	L
5512	5513	<>	<aphaerese>
5512	5516	<elision3>	<elision3>
5512	5513	<>	<elision3>
5512	5516	<elision2>	<elision2>
5512	5513	<>	<elision2>
5512	5516	<elision1>	<elision1>
5512	5513	<>	<elision1>
5512	5519	<K>	<>
5513	5514	<>	<name>
5513	5513	<>	<aphaerese>
5513	5516	<elision3>	<elision3>
5513	5513	<>	<elision3>
5513	5516	<elision2>	<elision2>
5513	5513	<>	<elision2>
5513	5516	<elision1>	<elision1>
5513	5513	<>	<elision1>
5513	5520	<K>	<>
5514	5512	<>	<aphaerese>
5514	5515	<elision3>	<elision3>
5514	5512	<>	<elision3>
5514	5515	<elision2>	<elision2>
5514	5512	<>	<elision2>
5514	5515	<elision1>	<elision1>
5514	5512	<>	<elision1>
5514	5518	<K>	<>
5515	5516	<>	<aphaerese>
5515	5516	<>	<elision3>
5515	5516	<>	<elision2>
5515	5516	<>	<elision1>
5515	186	.	κ
5515	4454	H	κ
5515	4782	H	k
5515	4798	H	K
5515	4809	H	λ
5515	4815	H	l
5515	4818	H	L
5516	5517	<>	<name>
5516	5516	<>	<aphaerese>
5516	5516	<>	<elision3>
5516	5516	<>	<elision2>
5516	5516	<>	<elision1>
5516	186	.	κ
5516	4454	H	κ
5516	4782	H	k
5516	4798	H	K
5516	4809	H	λ
5516	4815	H	l
5516	4818	H	L
5517	5515	<>	<aphaerese>
5517	5515	<>	<elision3>
5517	5515	<>	<elision2>
5517	5515	<>	<elision1>
5517	188	.	κ
5517	4819	H	κ
5517	4823	H	k
5517	4827	H	K
5517	4811	H	λ
5517	4817	H	l
5517	4812	H	L
5518	5519	<>	<aphaerese>
5518	5510	<elision3>	<elision3>
5518	5519	<>	<elision3>
5518	5510	<elision2>	<elision2>
5518	5519	<>	<elision2>
5518	5510	<elision1>	<elision1>
5518	5519	<>	<elision1>
5519	5520	<>	<aphaerese>
5519	5511	<elision3>	<elision3>
5519	5520	<>	<elision3>
5519	5511	<elision2>	<elision2>
5519	5520	<>	<elision2>
5519	5511	<elision1>	<elision1>
5519	5520	<>	<elision1>
5520	5518	<>	<name>
5520	5520	<>	<aphaerese>
5520	5511	<elision3>	<elision3>
5520	5520	<>	<elision3>
5520	5511	<elision2>	<elision2>
5520	5520	<>	<elision2>
5520	5511	<elision1>	<elision1>
5520	5520	<>	<elision1>
5521	5522	<>	<aphaerese>
5521	5522	<>	<elision3>
5521	5522	<>	<elision2>
5521	5522	<>	<elision1>
5521	5525	.	κ
5521	5525	.	λ
5521	5528	<K>	<>
5522	5523	<>	<name>
5522	5522	<>	<aphaerese>
5522	5522	<>	<elision3>
5522	5522	<>	<elision2>
5522	5522	<>	<elision1>
5522	5525	.	κ
5522	5525	.	λ
5522	5529	<K>	<>
5523	5521	<>	<aphaerese>
5523	5521	<>	<elision3>
5523	5521	<>	<elision2>
5523	5521	<>	<elision1>
5523	5524	.	κ
5523	5524	.	λ
5523	5527	<K>	<>
5524	5525	<>	<aphaerese>
5524	5516	<elision3>	<elision3>
5524	5525	<>	<elision3>
5524	5516	<elision2>	<elision2>
5524	5525	<>	<elision2>
5524	5516	<elision1>	<elision1>
5524	5525	<>	<elision1>
5525	5526	<>	<name>
5525	5525	<>	<aphaerese>
5525	5516	<elision3>	<elision3>
5525	5525	<>	<elision3>
5525	5516	<elision2>	<elision2>
5525	5525	<>	<elision2>
5525	5516	<elision1>	<elision1>
5525	5525	<>	<elision1>
5526	5524	<>	<aphaerese>
5526	5515	<elision3>	<elision3>
5526	5524	<>	<elision3>
5526	5515	<elision2>	<elision2>
5526	5524	<>	<elision2>
5526	5515	<elision1>	<elision1>
5526	5524	<>	<elision1>
5527	5528	<>	<aphaerese>
5527	5528	<>	<elision3>
5527	5528	<>	<elision2>
5527	5528	<>	<elision1>
5527	5519	.	κ
5527	5519	.	λ
5528	5529	<>	<aphaerese>
5528	5529	<>	<elision3>
5528	5529	<>	<elision2>
5528	5529	<>	<elision1>
5528	5520	.	κ
5528	5520	.	λ
5529	5527	<>	<name>
5529	5529	<>	<aphaerese>
5529	5529	<>	<elision3>
5529	5529	<>	<elision2>
5529	5529	<>	<elision1>
5529	5520	.	κ
5529	5520	.	λ
5530	5054	.	.
5530	5054	 	 
5530	5054	<~>	<~>
5530	5054	<split-s>	<split-s>
5530	5054	<split-h>	<split-h>
5530	5054	<name2>	<name2>
5530	5531	<>	<name>
5530	5057	<aphaerese>	<aphaerese>
5530	5530	<>	<aphaerese>
5530	5054	<elision3>	<elision3>
5530	5530	<>	<elision3>
5530	5054	<elision2>	<elision2>
5530	5530	<>	<elision2>
5530	5054	<elision1>	<elision1>
5530	5530	<>	<elision1>
5530	5218	.	υ
5530	5218	.	u
5530	5218	.	α
5530	5218	.	a
5530	5534	<4s>	<>
5531	5056	.	.
5531	5056	 	 
5531	5056	<~>	<~>
5531	5056	<split-s>	<split-s>
5531	5056	<split-h>	<split-h>
5531	5056	<name2>	<name2>
5531	5059	<aphaerese>	<aphaerese>
5531	5532	<>	<aphaerese>
5531	5056	<elision3>	<elision3>
5531	5532	<>	<elision3>
5531	5056	<elision2>	<elision2>
5531	5532	<>	<elision2>
5531	5056	<elision1>	<elision1>
5531	5532	<>	<elision1>
5531	5220	.	υ
5531	5220	.	u
5531	5220	.	α
5531	5220	.	a
5531	5535	<4s>	<>
5532	5054	.	.
5532	5054	 	 
5532	5054	<~>	<~>
5532	5054	<split-s>	<split-s>
5532	5054	<split-h>	<split-h>
5532	5054	<name2>	<name2>
5532	5057	<aphaerese>	<aphaerese>
5532	5530	<>	<aphaerese>
5532	5054	<elision3>	<elision3>
5532	5530	<>	<elision3>
5532	5054	<elision2>	<elision2>
5532	5530	<>	<elision2>
5532	5054	<elision1>	<elision1>
5532	5530	<>	<elision1>
5532	5218	.	υ
5532	5218	.	u
5532	5218	.	α
5532	5218	.	a
5532	5533	<4s>	<>
5533	179	.	.
5533	180	 	 
5533	179	<~>	<~>
5533	179	<split-s>	<split-s>
5533	179	<split-h>	<split-h>
5533	179	<name2>	<name2>
5533	183	<aphaerese>	<aphaerese>
5533	5534	<>	<aphaerese>
5533	179	<elision3>	<elision3>
5533	5534	<>	<elision3>
5533	179	<elision2>	<elision2>
5533	5534	<>	<elision2>
5533	179	<elision1>	<elision1>
5533	5534	<>	<elision1>
5533	4828	.	υ
5533	4872	H	υ
5533	4828	.	u
5533	4874	H	u
5533	5287	H	κ
5533	4782	H	k
5533	4795	H	U
5533	4798	H	K
5533	4828	.	α
5533	4858	H	α
5533	4828	.	a
5533	4863	H	a
5533	4625	H	A
5533	5264	H	λ
5533	5212	H	l
5533	5217	H	L
5533	5537	<K>	<>
5534	179	.	.
5534	180	 	 
5534	179	<~>	<~>
5534	179	<split-s>	<split-s>
5534	179	<split-h>	<split-h>
5534	179	<name2>	<name2>
5534	5535	<>	<name>
5534	183	<aphaerese>	<aphaerese>
5534	5534	<>	<aphaerese>
5534	179	<elision3>	<elision3>
5534	5534	<>	<elision3>
5534	179	<elision2>	<elision2>
5534	5534	<>	<elision2>
5534	179	<elision1>	<elision1>
5534	5534	<>	<elision1>
5534	4828	.	υ
5534	4872	H	υ
5534	4828	.	u
5534	4874	H	u
5534	5287	H	κ
5534	4782	H	k
5534	4795	H	U
5534	4798	H	K
5534	4828	.	α
5534	4858	H	α
5534	4828	.	a
5534	4863	H	a
5534	4625	H	A
5534	5264	H	λ
5534	5212	H	l
5534	5217	H	L
5534	5538	<K>	<>
5535	178	.	.
5535	182	 	 
5535	178	<~>	<~>
5535	178	<split-s>	<split-s>
5535	178	<split-h>	<split-h>
5535	178	<name2>	<name2>
5535	185	<aphaerese>	<aphaerese>
5535	5533	<>	<aphaerese>
5535	178	<elision3>	<elision3>
5535	5533	<>	<elision3>
5535	178	<elision2>	<elision2>
5535	5533	<>	<elision2>
5535	178	<elision1>	<elision1>
5535	5533	<>	<elision1>
5535	4830	.	υ
5535	4867	H	υ
5535	4830	.	u
5535	4871	H	u
5535	5244	H	κ
5535	4823	H	k
5535	4797	H	U
5535	4827	H	K
5535	4830	.	α
5535	4857	H	α
5535	4830	.	a
5535	4862	H	a
5535	4628	H	A
5535	5263	H	λ
5535	5211	H	l
5535	5214	H	L
5535	5536	<K>	<>
5536	4880	.	.
5536	4880	<~>	<~>
5536	4880	<split-s>	<split-s>
5536	4880	<split-h>	<split-h>
5536	4880	<name2>	<name2>
5536	4883	<aphaerese>	<aphaerese>
5536	5537	<>	<aphaerese>
5536	4880	<elision3>	<elision3>
5536	5537	<>	<elision3>
5536	4880	<elision2>	<elision2>
5536	5537	<>	<elision2>
5536	4880	<elision1>	<elision1>
5536	5537	<>	<elision1>
5536	4876	.	υ
5536	5022	H	υ
5536	4876	.	u
5536	5031	H	u
5536	5274	H	κ
5536	4991	H	k
5536	5000	H	U
5536	5004	H	K
5536	4876	.	α
5536	5034	H	α
5536	4876	.	a
5536	5037	H	a
5536	4971	H	A
5536	5283	H	λ
5536	5018	H	l
5536	5013	H	L
5537	4878	.	.
5537	4878	<~>	<~>
5537	4878	<split-s>	<split-s>
5537	4878	<split-h>	<split-h>
5537	4878	<name2>	<name2>
5537	4881	<aphaerese>	<aphaerese>
5537	5538	<>	<aphaerese>
5537	4878	<elision3>	<elision3>
5537	5538	<>	<elision3>
5537	4878	<elision2>	<elision2>
5537	5538	<>	<elision2>
5537	4878	<elision1>	<elision1>
5537	5538	<>	<elision1>
5537	4877	.	υ
5537	5020	H	υ
5537	4877	.	u
5537	5029	H	u
5537	5272	H	κ
5537	4989	H	k
5537	4998	H	U
5537	5001	H	K
5537	4877	.	α
5537	5032	H	α
5537	4877	.	a
5537	5035	H	a
5537	4969	H	A
5537	5281	H	λ
5537	5016	H	l
5537	5019	H	L
5538	4878	.	.
5538	4878	<~>	<~>
5538	4878	<split-s>	<split-s>
5538	4878	<split-h>	<split-h>
5538	4878	<name2>	<name2>
5538	5536	<>	<name>
5538	4881	<aphaerese>	<aphaerese>
5538	5538	<>	<aphaerese>
5538	4878	<elision3>	<elision3>
5538	5538	<>	<elision3>
5538	4878	<elision2>	<elision2>
5538	5538	<>	<elision2>
5538	4878	<elision1>	<elision1>
5538	5538	<>	<elision1>
5538	4877	.	υ
5538	5020	H	υ
5538	4877	.	u
5538	5029	H	u
5538	5272	H	κ
5538	4989	H	k
5538	4998	H	U
5538	5001	H	K
5538	4877	.	α
5538	5032	H	α
5538	4877	.	a
5538	5035	H	a
5538	4969	H	A
5538	5281	H	λ
5538	5016	H	l
5538	5019	H	L
5539	5540	<name>	<name>
5539	5541	<K>	<>
5540	4827	H	k
5540	4812	H	l
5541	5430	<name>	<name>
5542	5054	.	.
5542	5054	 	 
5542	5054	<~>	<~>
5542	5054	<split-s>	<split-s>
5542	5054	<split-h>	<split-h>
5542	5054	<name2>	<name2>
5542	5428	<name2>	<name>
5542	5531	<>	<name>
5542	5057	<aphaerese>	<aphaerese>
5542	5530	<>	<aphaerese>
5542	5054	<elision3>	<elision3>
5542	5530	<>	<elision3>
5542	5054	<elision2>	<elision2>
5542	5530	<>	<elision2>
5542	5054	<elision1>	<elision1>
5542	5530	<>	<elision1>
5542	5218	.	υ
5542	5218	.	u
5542	5218	.	α
5542	5218	.	a
5542	5543	<4s>	<>
5543	179	.	.
5543	180	 	 
5543	179	<~>	<~>
5543	179	<split-s>	<split-s>
5543	179	<split-h>	<split-h>
5543	179	<name2>	<name2>
5543	5540	<name2>	<name>
5543	5535	<>	<name>
5543	183	<aphaerese>	<aphaerese>
5543	5534	<>	<aphaerese>
5543	179	<elision3>	<elision3>
5543	5534	<>	<elision3>
5543	179	<elision2>	<elision2>
5543	5534	<>	<elision2>
5543	179	<elision1>	<elision1>
5543	5534	<>	<elision1>
5543	4828	.	υ
5543	4872	H	υ
5543	4828	.	u
5543	4874	H	u
5543	5287	H	κ
5543	4782	H	k
5543	4795	H	U
5543	4798	H	K
5543	4828	.	α
5543	4858	H	α
5543	4828	.	a
5543	4863	H	a
5543	4625	H	A
5543	5264	H	λ
5543	5212	H	l
5543	5217	H	L
5543	5544	<K>	<>
5544	4878	.	.
5544	4878	<~>	<~>
5544	4878	<split-s>	<split-s>
5544	4878	<split-h>	<split-h>
5544	4878	<name2>	<name2>
5544	5430	<name2>	<name>
5544	5536	<>	<name>
5544	4881	<aphaerese>	<aphaerese>
5544	5538	<>	<aphaerese>
5544	4878	<elision3>	<elision3>
5544	5538	<>	<elision3>
5544	4878	<elision2>	<elision2>
5544	5538	<>	<elision2>
5544	4878	<elision1>	<elision1>
5544	5538	<>	<elision1>
5544	4877	.	υ
5544	5020	H	υ
5544	4877	.	u
5544	5029	H	u
5544	5272	H	κ
5544	4989	H	k
5544	4998	H	U
5544	5001	H	K
5544	4877	.	α
5544	5032	H	α
5544	4877	.	a
5544	5035	H	a
5544	4969	H	A
5544	5281	H	λ
5544	5016	H	l
5544	5019	H	L
5545	5546	<>	<name>
5545	5545	<>	<aphaerese>
5545	5545	<>	<elision3>
5545	5545	<>	<elision2>
5545	5545	<>	<elision1>
5545	5054	<A2kl>	<>
5546	5547	<>	<aphaerese>
5546	5547	<>	<elision3>
5546	5547	<>	<elision2>
5546	5547	<>	<elision1>
5546	5055	<A2kl>	<>
5547	5545	<>	<aphaerese>
5547	5545	<>	<elision3>
5547	5545	<>	<elision2>
5547	5545	<>	<elision1>
5547	5056	<A2kl>	<>
5548	5428	<name>	<name>
5548	5549	<>	<name>
5548	5551	<>	<aphaerese>
5548	5551	<>	<elision3>
5548	5551	<>	<elision2>
5548	5551	<>	<elision1>
5548	5539	<4s>	<>
5548	5434	<A2kl>	<>
5548	5561	<L2kl>	<>
5549	5550	<>	<aphaerese>
5549	5550	<>	<elision3>
5549	5550	<>	<elision2>
5549	5550	<>	<elision1>
5549	5435	<A2kl>	<>
5549	5553	<L2kl>	<>
5550	5551	<>	<aphaerese>
5550	5551	<>	<elision3>
5550	5551	<>	<elision2>
5550	5551	<>	<elision1>
5550	5436	<A2kl>	<>
5550	5554	<L2kl>	<>
5551	5549	<>	<name>
5551	5551	<>	<aphaerese>
5551	5551	<>	<elision3>
5551	5551	<>	<elision2>
5551	5551	<>	<elision1>
5551	5434	<A2kl>	<>
5551	5552	<L2kl>	<>
5552	5054	.	.
5552	5054	 	 
5552	5054	<~>	<~>
5552	5054	<split-s>	<split-s>
5552	5054	<split-h>	<split-h>
5552	5054	<name2>	<name2>
5552	5553	<>	<name>
5552	5057	<aphaerese>	<aphaerese>
5552	5552	<>	<aphaerese>
5552	5054	<elision3>	<elision3>
5552	5552	<>	<elision3>
5552	5054	<elision2>	<elision2>
5552	5552	<>	<elision2>
5552	5054	<elision1>	<elision1>
5552	5552	<>	<elision1>
5552	5218	.	υ
5552	5218	.	u
5552	5500	.	κ
5552	5218	.	α
5552	5218	.	a
5552	5500	.	λ
5552	5556	<4s>	<>
5553	5056	.	.
5553	5056	 	 
5553	5056	<~>	<~>
5553	5056	<split-s>	<split-s>
5553	5056	<split-h>	<split-h>
5553	5056	<name2>	<name2>
5553	5059	<aphaerese>	<aphaerese>
5553	5554	<>	<aphaerese>
5553	5056	<elision3>	<elision3>
5553	5554	<>	<elision3>
5553	5056	<elision2>	<elision2>
5553	5554	<>	<elision2>
5553	5056	<elision1>	<elision1>
5553	5554	<>	<elision1>
5553	5220	.	υ
5553	5220	.	u
5553	5502	.	κ
5553	5220	.	α
5553	5220	.	a
5553	5502	.	λ
5553	5557	<4s>	<>
5554	5054	.	.
5554	5054	 	 
5554	5054	<~>	<~>
5554	5054	<split-s>	<split-s>
5554	5054	<split-h>	<split-h>
5554	5054	<name2>	<name2>
5554	5057	<aphaerese>	<aphaerese>
5554	5552	<>	<aphaerese>
5554	5054	<elision3>	<elision3>
5554	5552	<>	<elision3>
5554	5054	<elision2>	<elision2>
5554	5552	<>	<elision2>
5554	5054	<elision1>	<elision1>
5554	5552	<>	<elision1>
5554	5218	.	υ
5554	5218	.	u
5554	5500	.	κ
5554	5218	.	α
5554	5218	.	a
5554	5500	.	λ
5554	5555	<4s>	<>
5555	179	.	.
5555	180	 	 
5555	179	<~>	<~>
5555	179	<split-s>	<split-s>
5555	179	<split-h>	<split-h>
5555	179	<name2>	<name2>
5555	183	<aphaerese>	<aphaerese>
5555	5556	<>	<aphaerese>
5555	179	<elision3>	<elision3>
5555	5556	<>	<elision3>
5555	179	<elision2>	<elision2>
5555	5556	<>	<elision2>
5555	179	<elision1>	<elision1>
5555	5556	<>	<elision1>
5555	4828	.	υ
5555	4872	H	υ
5555	4828	.	u
5555	4874	H	u
5555	5525	.	κ
5555	5287	H	κ
5555	4782	H	k
5555	4795	H	U
5555	4798	H	K
5555	4828	.	α
5555	4858	H	α
5555	4828	.	a
5555	4863	H	a
5555	4625	H	A
5555	5525	.	λ
5555	5264	H	λ
5555	5212	H	l
5555	5217	H	L
5555	5559	<K>	<>
5556	179	.	.
5556	180	 	 
5556	179	<~>	<~>
5556	179	<split-s>	<split-s>
5556	179	<split-h>	<split-h>
5556	179	<name2>	<name2>
5556	5557	<>	<name>
5556	183	<aphaerese>	<aphaerese>
5556	5556	<>	<aphaerese>
5556	179	<elision3>	<elision3>
5556	5556	<>	<elision3>
5556	179	<elision2>	<elision2>
5556	5556	<>	<elision2>
5556	179	<elision1>	<elision1>
5556	5556	<>	<elision1>
5556	4828	.	υ
5556	4872	H	υ
5556	4828	.	u
5556	4874	H	u
5556	5525	.	κ
5556	5287	H	κ
5556	4782	H	k
5556	4795	H	U
5556	4798	H	K
5556	4828	.	α
5556	4858	H	α
5556	4828	.	a
5556	4863	H	a
5556	4625	H	A
5556	5525	.	λ
5556	5264	H	λ
5556	5212	H	l
5556	5217	H	L
5556	5560	<K>	<>
5557	178	.	.
5557	182	 	 
5557	178	<~>	<~>
5557	178	<split-s>	<split-s>
5557	178	<split-h>	<split-h>
5557	178	<name2>	<name2>
5557	185	<aphaerese>	<aphaerese>
5557	5555	<>	<aphaerese>
5557	178	<elision3>	<elision3>
5557	5555	<>	<elision3>
5557	178	<elision2>	<elision2>
5557	5555	<>	<elision2>
5557	178	<elision1>	<elision1>
5557	5555	<>	<elision1>
5557	4830	.	υ
5557	4867	H	υ
5557	4830	.	u
5557	4871	H	u
5557	5524	.	κ
5557	5244	H	κ
5557	4823	H	k
5557	4797	H	U
5557	4827	H	K
5557	4830	.	α
5557	4857	H	α
5557	4830	.	a
5557	4862	H	a
5557	4628	H	A
5557	5524	.	λ
5557	5263	H	λ
5557	5211	H	l
5557	5214	H	L
5557	5558	<K>	<>
5558	4880	.	.
5558	4880	<~>	<~>
5558	4880	<split-s>	<split-s>
5558	4880	<split-h>	<split-h>
5558	4880	<name2>	<name2>
5558	4883	<aphaerese>	<aphaerese>
5558	5559	<>	<aphaerese>
5558	4880	<elision3>	<elision3>
5558	5559	<>	<elision3>
5558	4880	<elision2>	<elision2>
5558	5559	<>	<elision2>
5558	4880	<elision1>	<elision1>
5558	5559	<>	<elision1>
5558	4876	.	υ
5558	5022	H	υ
5558	4876	.	u
5558	5031	H	u
5558	5519	.	κ
5558	5274	H	κ
5558	4991	H	k
5558	5000	H	U
5558	5004	H	K
5558	4876	.	α
5558	5034	H	α
5558	4876	.	a
5558	5037	H	a
5558	4971	H	A
5558	5519	.	λ
5558	5283	H	λ
5558	5018	H	l
5558	5013	H	L
5559	4878	.	.
5559	4878	<~>	<~>
5559	4878	<split-s>	<split-s>
5559	4878	<split-h>	<split-h>
5559	4878	<name2>	<name2>
5559	4881	<aphaerese>	<aphaerese>
5559	5560	<>	<aphaerese>
5559	4878	<elision3>	<elision3>
5559	5560	<>	<elision3>
5559	4878	<elision2>	<elision2>
5559	5560	<>	<elision2>
5559	4878	<elision1>	<elision1>
5559	5560	<>	<elision1>
5559	4877	.	υ
5559	5020	H	υ
5559	4877	.	u
5559	5029	H	u
5559	5520	.	κ
5559	5272	H	κ
5559	4989	H	k
5559	4998	H	U
5559	5001	H	K
5559	4877	.	α
5559	5032	H	α
5559	4877	.	a
5559	5035	H	a
5559	4969	H	A
5559	5520	.	λ
5559	5281	H	λ
5559	5016	H	l
5559	5019	H	L
5560	4878	.	.
5560	4878	<~>	<~>
5560	4878	<split-s>	<split-s>
5560	4878	<split-h>	<split-h>
5560	4878	<name2>	<name2>
5560	5558	<>	<name>
5560	4881	<aphaerese>	<aphaerese>
5560	5560	<>	<aphaerese>
5560	4878	<elision3>	<elision3>
5560	5560	<>	<elision3>
5560	4878	<elision2>	<elision2>
5560	5560	<>	<elision2>
5560	4878	<elision1>	<elision1>
5560	5560	<>	<elision1>
5560	4877	.	υ
5560	5020	H	υ
5560	4877	.	u
5560	5029	H	u
5560	5520	.	κ
5560	5272	H	κ
5560	4989	H	k
5560	4998	H	U
5560	5001	H	K
5560	4877	.	α
5560	5032	H	α
5560	4877	.	a
5560	5035	H	a
5560	4969	H	A
5560	5520	.	λ
5560	5281	H	λ
5560	5016	H	l
5560	5019	H	L
5561	5054	.	.
5561	5054	 	 
5561	5054	<~>	<~>
5561	5054	<split-s>	<split-s>
5561	5054	<split-h>	<split-h>
5561	5054	<name2>	<name2>
5561	5428	<name2>	<name>
5561	5553	<>	<name>
5561	5057	<aphaerese>	<aphaerese>
5561	5552	<>	<aphaerese>
5561	5054	<elision3>	<elision3>
5561	5552	<>	<elision3>
5561	5054	<elision2>	<elision2>
5561	5552	<>	<elision2>
5561	5054	<elision1>	<elision1>
5561	5552	<>	<elision1>
5561	5218	.	υ
5561	5218	.	u
5561	5500	.	κ
5561	5218	.	α
5561	5218	.	a
5561	5500	.	λ
5561	5562	<4s>	<>
5562	179	.	.
5562	180	 	 
5562	179	<~>	<~>
5562	179	<split-s>	<split-s>
5562	179	<split-h>	<split-h>
5562	179	<name2>	<name2>
5562	5540	<name2>	<name>
5562	5557	<>	<name>
5562	183	<aphaerese>	<aphaerese>
5562	5556	<>	<aphaerese>
5562	179	<elision3>	<elision3>
5562	5556	<>	<elision3>
5562	179	<elision2>	<elision2>
5562	5556	<>	<elision2>
5562	179	<elision1>	<elision1>
5562	5556	<>	<elision1>
5562	4828	.	υ
5562	4872	H	υ
5562	4828	.	u
5562	4874	H	u
5562	5525	.	κ
5562	5287	H	κ
5562	4782	H	k
5562	4795	H	U
5562	4798	H	K
5562	4828	.	α
5562	4858	H	α
5562	4828	.	a
5562	4863	H	a
5562	4625	H	A
5562	5525	.	λ
5562	5264	H	λ
5562	5212	H	l
5562	5217	H	L
5562	5563	<K>	<>
5563	4878	.	.
5563	4878	<~>	<~>
5563	4878	<split-s>	<split-s>
5563	4878	<split-h>	<split-h>
5563	4878	<name2>	<name2>
5563	5430	<name2>	<name>
5563	5558	<>	<name>
5563	4881	<aphaerese>	<aphaerese>
5563	5560	<>	<aphaerese>
5563	4878	<elision3>	<elision3>
5563	5560	<>	<elision3>
5563	4878	<elision2>	<elision2>
5563	5560	<>	<elision2>
5563	4878	<elision1>	<elision1>
5563	5560	<>	<elision1>
5563	4877	.	υ
5563	5020	H	υ
5563	4877	.	u
5563	5029	H	u
5563	5520	.	κ
5563	5272	H	κ
5563	4989	H	k
5563	4998	H	U
5563	5001	H	K
5563	4877	.	α
5563	5032	H	α
5563	4877	.	a
5563	5035	H	a
5563	4969	H	A
5563	5520	.	λ
5563	5281	H	λ
5563	5016	H	l
5563	5019	H	L
5564	5565	<>	<name>
5564	5564	<>	<aphaerese>
5564	5564	<>	<elision3>
5564	5564	<>	<elision2>
5564	5564	<>	<elision1>
5564	5222	<3s>	<>
5565	5566	<>	<aphaerese>
5565	5566	<>	<elision3>
5565	5566	<>	<elision2>
5565	5566	<>	<elision1>
5565	5223	<3s>	<>
5566	5564	<>	<aphaerese>
5566	5564	<>	<elision3>
5566	5564	<>	<elision2>
5566	5564	<>	<elision1>
5566	5221	<3s>	<>
5567	5054	.	.
5567	5054	 	 
5567	5054	<~>	<~>
5567	5054	<split-s>	<split-s>
5567	5054	<split-h>	<split-h>
5567	5054	<name2>	<name2>
5567	5224	<>	<name>
5567	5057	<aphaerese>	<aphaerese>
5567	5053	<>	<aphaerese>
5567	5053	<>	<elision3>
5567	5053	<>	<elision2>
5567	5053	<>	<elision1>
5567	5218	.	υ
5567	5218	.	u
5567	5060	.	κ
5567	5218	.	α
5567	5218	.	a
5567	5568	<4s>	<>
5568	179	.	.
5568	180	 	 
5568	179	<~>	<~>
5568	179	<split-s>	<split-s>
5568	179	<split-h>	<split-h>
5568	179	<name2>	<name2>
5568	5228	<>	<name>
5568	183	<aphaerese>	<aphaerese>
5568	5227	<>	<aphaerese>
5568	5227	<>	<elision3>
5568	5227	<>	<elision2>
5568	5227	<>	<elision1>
5568	4828	.	υ
5568	4828	.	u
5568	186	.	κ
5568	4795	H	U
5568	4798	H	K
5568	4828	.	α
5568	4828	.	a
5568	4625	H	A
5568	5217	H	L
5568	5569	<K>	<>
5569	4878	.	.
5569	4878	<~>	<~>
5569	4878	<split-s>	<split-s>
5569	4878	<split-h>	<split-h>
5569	4878	<name2>	<name2>
5569	5229	<>	<name>
5569	4881	<aphaerese>	<aphaerese>
5569	5231	<>	<aphaerese>
5569	5231	<>	<elision3>
5569	5231	<>	<elision2>
5569	5231	<>	<elision1>
5569	4877	.	υ
5569	4877	.	u
5569	4884	.	κ
5569	4998	H	U
5569	5001	H	K
5569	4877	.	α
5569	4877	.	a
5569	4969	H	A
5569	5019	H	L
5570	5054	.	.
5570	5054	 	 
5570	5054	<~>	<~>
5570	5054	<split-s>	<split-s>
5570	5054	<split-h>	<split-h>
5570	5054	<name2>	<name2>
5570	5304	<>	<name>
5570	5057	<aphaerese>	<aphaerese>
5570	5303	<>	<aphaerese>
5570	5306	<elision3>	<elision3>
5570	5303	<>	<elision3>
5570	5306	<elision2>	<elision2>
5570	5303	<>	<elision2>
5570	5306	<elision1>	<elision1>
5570	5303	<>	<elision1>
5570	5218	.	υ
5570	5218	.	u
5570	5218	.	κ
5570	5218	.	α
5570	5218	.	a
5570	5218	.	λ
5570	5571	<4s>	<>
5571	179	.	.
5571	180	 	 
5571	179	<~>	<~>
5571	179	<split-s>	<split-s>
5571	179	<split-h>	<split-h>
5571	179	<name2>	<name2>
5571	5408	<>	<name>
5571	183	<aphaerese>	<aphaerese>
5571	5407	<>	<aphaerese>
5571	5410	<elision3>	<elision3>
5571	5407	<>	<elision3>
5571	5410	<elision2>	<elision2>
5571	5407	<>	<elision2>
5571	5410	<elision1>	<elision1>
5571	5407	<>	<elision1>
5571	4828	.	υ
5571	4828	.	u
5571	4828	.	κ
5571	4795	H	U
5571	4798	H	K
5571	4828	.	α
5571	4828	.	a
5571	4625	H	A
5571	4828	.	λ
5571	5217	H	L
5571	5572	<K>	<>
5572	4878	.	.
5572	4878	<~>	<~>
5572	4878	<split-s>	<split-s>
5572	4878	<split-h>	<split-h>
5572	4878	<name2>	<name2>
5572	5412	<>	<name>
5572	4881	<aphaerese>	<aphaerese>
5572	5414	<>	<aphaerese>
5572	5359	<elision3>	<elision3>
5572	5414	<>	<elision3>
5572	5359	<elision2>	<elision2>
5572	5414	<>	<elision2>
5572	5359	<elision1>	<elision1>
5572	5414	<>	<elision1>
5572	4877	.	υ
5572	4877	.	u
5572	4877	.	κ
5572	4998	H	U
5572	5001	H	K
5572	4877	.	α
5572	4877	.	a
5572	4969	H	A
5572	4877	.	λ
5572	5019	H	L
5573	5054	.	.
5573	5054	 	 
5573	5054	<~>	<~>
5573	5054	<split-s>	<split-s>
5573	5054	<split-h>	<split-h>
5573	5054	<name2>	<name2>
5573	5416	<>	<name>
5573	5057	<aphaerese>	<aphaerese>
5573	5415	<>	<aphaerese>
5573	5054	<elision3>	<elision3>
5573	5415	<>	<elision3>
5573	5054	<elision2>	<elision2>
5573	5415	<>	<elision2>
5573	5054	<elision1>	<elision1>
5573	5415	<>	<elision1>
5573	5218	.	υ
5573	5218	.	u
5573	5218	.	κ
5573	5218	.	α
5573	5218	.	a
5573	5218	.	λ
5573	5574	<4s>	<>
5574	179	.	.
5574	180	 	 
5574	179	<~>	<~>
5574	179	<split-s>	<split-s>
5574	179	<split-h>	<split-h>
5574	179	<name2>	<name2>
5574	5420	<>	<name>
5574	183	<aphaerese>	<aphaerese>
5574	5419	<>	<aphaerese>
5574	179	<elision3>	<elision3>
5574	5419	<>	<elision3>
5574	179	<elision2>	<elision2>
5574	5419	<>	<elision2>
5574	179	<elision1>	<elision1>
5574	5419	<>	<elision1>
5574	4828	.	υ
5574	4828	.	u
5574	4828	.	κ
5574	4795	H	U
5574	4798	H	K
5574	4828	.	α
5574	4828	.	a
5574	4625	H	A
5574	4828	.	λ
5574	5217	H	L
5574	5575	<K>	<>
5575	4878	.	.
5575	4878	<~>	<~>
5575	4878	<split-s>	<split-s>
5575	4878	<split-h>	<split-h>
5575	4878	<name2>	<name2>
5575	5421	<>	<name>
5575	4881	<aphaerese>	<aphaerese>
5575	5423	<>	<aphaerese>
5575	4878	<elision3>	<elision3>
5575	5423	<>	<elision3>
5575	4878	<elision2>	<elision2>
5575	5423	<>	<elision2>
5575	4878	<elision1>	<elision1>
5575	5423	<>	<elision1>
5575	4877	.	υ
5575	4877	.	u
5575	4877	.	κ
5575	4998	H	U
5575	5001	H	K
5575	4877	.	α
5575	4877	.	a
5575	4969	H	A
5575	4877	.	λ
5575	5019	H	L
5576	5425	<>	<name>
5576	5424	<>	<aphaerese>
5576	5424	<>	<elision3>
5576	5424	<>	<elision2>
5576	5424	<>	<elision1>
5576	5577	<U2kl>	<>
5577	5054	.	.
5577	5054	 	 
5577	5054	<~>	<~>
5577	5054	<split-s>	<split-s>
5577	5054	<split-h>	<split-h>
5577	5054	<name2>	<name2>
5577	5055	<>	<name>
5577	5057	<aphaerese>	<aphaerese>
5577	5054	<>	<aphaerese>
5577	5054	<elision3>	<elision3>
5577	5054	<>	<elision3>
5577	5054	<elision2>	<elision2>
5577	5054	<>	<elision2>
5577	5054	<elision1>	<elision1>
5577	5054	<>	<elision1>
5577	5218	.	υ
5577	5218	.	u
5577	5060	.	κ
5577	5218	.	α
5577	5218	.	a
5577	5578	<4s>	<>
5578	179	.	.
5578	180	 	 
5578	179	<~>	<~>
5578	179	<split-s>	<split-s>
5578	179	<split-h>	<split-h>
5578	179	<name2>	<name2>
5578	5223	<>	<name>
5578	183	<aphaerese>	<aphaerese>
5578	5222	<>	<aphaerese>
5578	179	<elision3>	<elision3>
5578	5222	<>	<elision3>
5578	179	<elision2>	<elision2>
5578	5222	<>	<elision2>
5578	179	<elision1>	<elision1>
5578	5222	<>	<elision1>
5578	4828	.	υ
5578	4828	.	u
5578	186	.	κ
5578	4795	H	U
5578	4798	H	K
5578	4828	.	α
5578	4828	.	a
5578	4625	H	A
5578	5217	H	L
5578	5579	<K>	<>
5579	4878	.	.
5579	4878	<~>	<~>
5579	4878	<split-s>	<split-s>
5579	4878	<split-h>	<split-h>
5579	4878	<name2>	<name2>
5579	4879	<>	<name>
5579	4881	<aphaerese>	<aphaerese>
5579	4878	<>	<aphaerese>
5579	4878	<elision3>	<elision3>
5579	4878	<>	<elision3>
5579	4878	<elision2>	<elision2>
5579	4878	<>	<elision2>
5579	4878	<elision1>	<elision1>
5579	4878	<>	<elision1>
5579	4877	.	υ
5579	4877	.	u
5579	4884	.	κ
5579	4998	H	U
5579	5001	H	K
5579	4877	.	α
5579	4877	.	a
5579	4969	H	A
5579	5019	H	L
5580	5428	<name>	<name>
5580	5431	<>	<name>
5580	5433	<>	<aphaerese>
5580	5433	<>	<elision3>
5580	5433	<>	<elision2>
5580	5433	<>	<elision1>
5580	5539	<4s>	<>
5580	5434	<A2kl>	<>
5580	5497	<L2kl>	<>
5580	5581	<K2kl>	<>
5581	5054	.	.
5581	5054	 	 
5581	5054	<~>	<~>
5581	5054	<split-s>	<split-s>
5581	5054	<split-h>	<split-h>
5581	5054	<name2>	<name2>
5581	5428	<name2>	<name>
5581	5531	<>	<name>
5581	5057	<aphaerese>	<aphaerese>
5581	5530	<>	<aphaerese>
5581	5054	<elision3>	<elision3>
5581	5530	<>	<elision3>
5581	5054	<elision2>	<elision2>
5581	5530	<>	<elision2>
5581	5054	<elision1>	<elision1>
5581	5530	<>	<elision1>
5581	5218	.	υ
5581	5218	.	u
5581	5218	.	α
5581	5218	.	a
5581	5582	<4s>	<>
5582	179	.	.
5582	180	 	 
5582	179	<~>	<~>
5582	179	<split-s>	<split-s>
5582	179	<split-h>	<split-h>
5582	179	<name2>	<name2>
5582	5540	<name2>	<name>
5582	5535	<>	<name>
5582	183	<aphaerese>	<aphaerese>
5582	5534	<>	<aphaerese>
5582	179	<elision3>	<elision3>
5582	5534	<>	<elision3>
5582	179	<elision2>	<elision2>
5582	5534	<>	<elision2>
5582	179	<elision1>	<elision1>
5582	5534	<>	<elision1>
5582	4828	.	υ
5582	4828	.	u
5582	4795	H	U
5582	4798	H	K
5582	4828	.	α
5582	4828	.	a
5582	4625	H	A
5582	5217	H	L
5582	5583	<K>	<>
5583	4878	.	.
5583	4878	<~>	<~>
5583	4878	<split-s>	<split-s>
5583	4878	<split-h>	<split-h>
5583	4878	<name2>	<name2>
5583	5430	<name2>	<name>
5583	5536	<>	<name>
5583	4881	<aphaerese>	<aphaerese>
5583	5538	<>	<aphaerese>
5583	4878	<elision3>	<elision3>
5583	5538	<>	<elision3>
5583	4878	<elision2>	<elision2>
5583	5538	<>	<elision2>
5583	4878	<elision1>	<elision1>
5583	5538	<>	<elision1>
5583	4877	.	υ
5583	4877	.	u
5583	4998	H	U
5583	5001	H	K
5583	4877	.	α
5583	4877	.	a
5583	4969	H	A
5583	5019	H	L
5584	5546	<>	<name>
5584	5545	<>	<aphaerese>
5584	5545	<>	<elision3>
5584	5545	<>	<elision2>
5584	5545	<>	<elision1>
5584	5577	<A2kl>	<>
5585	5428	<name>	<name>
5585	5549	<>	<name>
5585	5551	<>	<aphaerese>
5585	5551	<>	<elision3>
5585	5551	<>	<elision2>
5585	5551	<>	<elision1>
5585	5539	<4s>	<>
5585	5434	<A2kl>	<>
5585	5586	<L2kl>	<>
5586	5054	.	.
5586	5054	 	 
5586	5054	<~>	<~>
5586	5054	<split-s>	<split-s>
5586	5054	<split-h>	<split-h>
5586	5054	<name2>	<name2>
5586	5428	<name2>	<name>
5586	5553	<>	<name>
5586	5057	<aphaerese>	<aphaerese>
5586	5552	<>	<aphaerese>
5586	5054	<elision3>	<elision3>
5586	5552	<>	<elision3>
5586	5054	<elision2>	<elision2>
5586	5552	<>	<elision2>
5586	5054	<elision1>	<elision1>
5586	5552	<>	<elision1>
5586	5218	.	υ
5586	5218	.	u
5586	5500	.	κ
5586	5218	.	α
5586	5218	.	a
5586	5500	.	λ
5586	5587	<4s>	<>
5587	179	.	.
5587	180	 	 
5587	179	<~>	<~>
5587	179	<split-s>	<split-s>
5587	179	<split-h>	<split-h>
5587	179	<name2>	<name2>
5587	5540	<name2>	<name>
5587	5557	<>	<name>
5587	183	<aphaerese>	<aphaerese>
5587	5556	<>	<aphaerese>
5587	179	<elision3>	<elision3>
5587	5556	<>	<elision3>
5587	179	<elision2>	<elision2>
5587	5556	<>	<elision2>
5587	179	<elision1>	<elision1>
5587	5556	<>	<elision1>
5587	4828	.	υ
5587	4828	.	u
5587	5525	.	κ
5587	4795	H	U
5587	4798	H	K
5587	4828	.	α
5587	4828	.	a
5587	4625	H	A
5587	5525	.	λ
5587	5217	H	L
5587	5588	<K>	<>
5588	4878	.	.
5588	4878	<~>	<~>
5588	4878	<split-s>	<split-s>
5588	4878	<split-h>	<split-h>
5588	4878	<name2>	<name2>
5588	5430	<name2>	<name>
5588	5558	<>	<name>
5588	4881	<aphaerese>	<aphaerese>
5588	5560	<>	<aphaerese>
5588	4878	<elision3>	<elision3>
5588	5560	<>	<elision3>
5588	4878	<elision2>	<elision2>
5588	5560	<>	<elision2>
5588	4878	<elision1>	<elision1>
5588	5560	<>	<elision1>
5588	4877	.	υ
5588	4877	.	u
5588	5520	.	κ
5588	4998	H	U
5588	5001	H	K
5588	4877	.	α
5588	4877	.	a
5588	4969	H	A
5588	5520	.	λ
5588	5019	H	L
5589	5039	.	.
5589	5040	 	 
5589	5039	<~>	<~>
5589	5039	<split-s>	<split-s>
5589	5039	<split-h>	<split-h>
5589	5039	<name2>	<name2>
5589	5043	<aphaerese>	<aphaerese>
5589	5043	<>	<aphaerese>
5589	5039	<elision3>	<elision3>
5589	5043	<>	<elision3>
5589	5039	<elision2>	<elision2>
5589	5043	<>	<elision2>
5589	5039	<elision1>	<elision1>
5589	5043	<>	<elision1>
5589	5039	.	υ
5589	5039	.	u
5589	5232	.	κ
5589	5303	s	κ
5589	5415	s	k
5589	5424	s	U
5589	5590	s	K
5589	5039	.	α
5589	5039	.	a
5589	5545	s	A
5589	5415	s	λ
5589	5415	s	l
5589	5603	s	L
5589	5610	<split-h>	<>
5590	5428	<name>	<name>
5590	5591	<>	<name>
5590	5593	<>	<aphaerese>
5590	5593	<>	<elision3>
5590	5593	<>	<elision2>
5590	5593	<>	<elision1>
5590	5539	<4s>	<>
5590	5594	<L2kl>	<>
5590	5542	<K2kl>	<>
5591	5592	<>	<aphaerese>
5591	5592	<>	<elision3>
5591	5592	<>	<elision2>
5591	5592	<>	<elision1>
5591	5595	<L2kl>	<>
5591	5531	<K2kl>	<>
5592	5593	<>	<aphaerese>
5592	5593	<>	<elision3>
5592	5593	<>	<elision2>
5592	5593	<>	<elision1>
5592	5596	<L2kl>	<>
5592	5532	<K2kl>	<>
5593	5591	<>	<name>
5593	5593	<>	<aphaerese>
5593	5593	<>	<elision3>
5593	5593	<>	<elision2>
5593	5593	<>	<elision1>
5593	5594	<L2kl>	<>
5593	5530	<K2kl>	<>
5594	5595	<>	<name>
5594	5594	<>	<aphaerese>
5594	5594	<>	<elision3>
5594	5594	<>	<elision2>
5594	5594	<>	<elision1>
5594	5218	.	κ
5594	5218	.	λ
5594	5598	<4s>	<>
5595	5596	<>	<aphaerese>
5595	5596	<>	<elision3>
5595	5596	<>	<elision2>
5595	5596	<>	<elision1>
5595	5220	.	κ
5595	5220	.	λ
5595	5599	<4s>	<>
5596	5594	<>	<aphaerese>
5596	5594	<>	<elision3>
5596	5594	<>	<elision2>
5596	5594	<>	<elision1>
5596	5218	.	κ
5596	5218	.	λ
5596	5597	<4s>	<>
5597	5598	<>	<aphaerese>
5597	5598	<>	<elision3>
5597	5598	<>	<elision2>
5597	5598	<>	<elision1>
5597	4828	.	κ
5597	4828	.	λ
5597	5601	<K>	<>
5598	5599	<>	<name>
5598	5598	<>	<aphaerese>
5598	5598	<>	<elision3>
5598	5598	<>	<elision2>
5598	5598	<>	<elision1>
5598	4828	.	κ
5598	4828	.	λ
5598	5602	<K>	<>
5599	5597	<>	<aphaerese>
5599	5597	<>	<elision3>
5599	5597	<>	<elision2>
5599	5597	<>	<elision1>
5599	4830	.	κ
5599	4830	.	λ
5599	5600	<K>	<>
5600	5601	<>	<aphaerese>
5600	5601	<>	<elision3>
5600	5601	<>	<elision2>
5600	5601	<>	<elision1>
5600	4876	.	κ
5600	4876	.	λ
5601	5602	<>	<aphaerese>
5601	5602	<>	<elision3>
5601	5602	<>	<elision2>
5601	5602	<>	<elision1>
5601	4877	.	κ
5601	4877	.	λ
5602	5600	<>	<name>
5602	5602	<>	<aphaerese>
5602	5602	<>	<elision3>
5602	5602	<>	<elision2>
5602	5602	<>	<elision1>
5602	4877	.	κ
5602	4877	.	λ
5603	5428	<name>	<name>
5603	5604	<>	<name>
5603	5606	<>	<aphaerese>
5603	5606	<>	<elision3>
5603	5606	<>	<elision2>
5603	5606	<>	<elision1>
5603	5539	<4s>	<>
5603	5607	<L2kl>	<>
5604	5605	<>	<aphaerese>
5604	5605	<>	<elision3>
5604	5605	<>	<elision2>
5604	5605	<>	<elision1>
5604	5416	<L2kl>	<>
5605	5606	<>	<aphaerese>
5605	5606	<>	<elision3>
5605	5606	<>	<elision2>
5605	5606	<>	<elision1>
5605	5417	<L2kl>	<>
5606	5604	<>	<name>
5606	5606	<>	<aphaerese>
5606	5606	<>	<elision3>
5606	5606	<>	<elision2>
5606	5606	<>	<elision1>
5606	5415	<L2kl>	<>
5607	5054	.	.
5607	5054	 	 
5607	5054	<~>	<~>
5607	5054	<split-s>	<split-s>
5607	5054	<split-h>	<split-h>
5607	5054	<name2>	<name2>
5607	5428	<name2>	<name>
5607	5416	<>	<name>
5607	5057	<aphaerese>	<aphaerese>
5607	5415	<>	<aphaerese>
5607	5054	<elision3>	<elision3>
5607	5415	<>	<elision3>
5607	5054	<elision2>	<elision2>
5607	5415	<>	<elision2>
5607	5054	<elision1>	<elision1>
5607	5415	<>	<elision1>
5607	5218	.	υ
5607	5218	.	u
5607	5218	.	κ
5607	5218	.	α
5607	5218	.	a
5607	5218	.	λ
5607	5608	<4s>	<>
5608	179	.	.
5608	180	 	 
5608	179	<~>	<~>
5608	179	<split-s>	<split-s>
5608	179	<split-h>	<split-h>
5608	179	<name2>	<name2>
5608	5540	<name2>	<name>
5608	5420	<>	<name>
5608	183	<aphaerese>	<aphaerese>
5608	5419	<>	<aphaerese>
5608	179	<elision3>	<elision3>
5608	5419	<>	<elision3>
5608	179	<elision2>	<elision2>
5608	5419	<>	<elision2>
5608	179	<elision1>	<elision1>
5608	5419	<>	<elision1>
5608	4828	.	υ
5608	4872	H	υ
5608	4828	.	u
5608	4874	H	u
5608	4828	.	κ
5608	5287	H	κ
5608	4782	H	k
5608	4795	H	U
5608	4798	H	K
5608	4828	.	α
5608	4858	H	α
5608	4828	.	a
5608	4863	H	a
5608	4625	H	A
5608	4828	.	λ
5608	5264	H	λ
5608	5212	H	l
5608	5217	H	L
5608	5609	<K>	<>
5609	4878	.	.
5609	4878	<~>	<~>
5609	4878	<split-s>	<split-s>
5609	4878	<split-h>	<split-h>
5609	4878	<name2>	<name2>
5609	5430	<name2>	<name>
5609	5421	<>	<name>
5609	4881	<aphaerese>	<aphaerese>
5609	5423	<>	<aphaerese>
5609	4878	<elision3>	<elision3>
5609	5423	<>	<elision3>
5609	4878	<elision2>	<elision2>
5609	5423	<>	<elision2>
5609	4878	<elision1>	<elision1>
5609	5423	<>	<elision1>
5609	4877	.	υ
5609	5020	H	υ
5609	4877	.	u
5609	5029	H	u
5609	4877	.	κ
5609	5272	H	κ
5609	4989	H	k
5609	4998	H	U
5609	5001	H	K
5609	4877	.	α
5609	5032	H	α
5609	4877	.	a
5609	5035	H	a
5609	4969	H	A
5609	4877	.	λ
5609	5281	H	λ
5609	5016	H	l
5609	5019	H	L
5610	5611	<>	<aphaerese>
5610	5611	<>	<elision3>
5610	5611	<>	<elision2>
5610	5611	<>	<elision1>
5610	5208	<3s>	<>
5611	5612	<>	<name>
5611	5611	<>	<aphaerese>
5611	5611	<>	<elision3>
5611	5611	<>	<elision2>
5611	5611	<>	<elision1>
5611	5209	<3s>	<>
5612	5610	<>	<aphaerese>
5612	5610	<>	<elision3>
5612	5610	<>	<elision2>
5612	5610	<>	<elision1>
5612	5210	<3s>	<>
5613	5039	.	.
5613	5040	 	 
5613	5039	<~>	<~>
5613	5039	<split-s>	<split-s>
5613	5039	<split-h>	<split-h>
5613	5039	<name2>	<name2>
5613	5043	<aphaerese>	<aphaerese>
5613	5046	<>	<aphaerese>
5613	5039	<elision3>	<elision3>
5613	5046	<>	<elision3>
5613	5039	<elision2>	<elision2>
5613	5046	<>	<elision2>
5613	5039	<elision1>	<elision1>
5613	5046	<>	<elision1>
5613	5047	.	υ
5613	5053	s	υ
5613	5047	.	u
5613	5053	s	u
5613	5232	.	κ
5613	5303	s	κ
5613	5415	s	k
5613	5424	s	U
5613	5427	s	K
5613	5047	.	α
5613	5053	s	α
5613	5047	.	a
5613	5053	s	a
5613	5545	s	A
5613	5415	s	λ
5613	5415	s	l
5613	5548	s	L
5613	5566	<split-h>	<>
5614	5042	.	.
5614	5045	 	 
5614	5042	<~>	<~>
5614	5042	<split-s>	<split-s>
5614	5042	<split-h>	<split-h>
5614	5042	<name2>	<name2>
5614	5589	<aphaerese>	<aphaerese>
5614	5042	<>	<aphaerese>
5614	5042	<elision3>	<elision3>
5614	5042	<>	<elision3>
5614	5042	<elision2>	<elision2>
5614	5042	<>	<elision2>
5614	5042	<elision1>	<elision1>
5614	5042	<>	<elision1>
5614	5049	.	υ
5614	5225	s	υ
5614	5049	.	u
5614	5225	s	u
5614	5234	.	κ
5614	5305	s	κ
5614	5417	s	k
5614	5426	s	U
5614	5592	s	K
5614	5049	.	α
5614	5225	s	α
5614	5049	.	a
5614	5225	s	a
5614	5547	s	A
5614	5417	s	λ
5614	5417	s	l
5614	5605	s	L
5614	5565	<split-h>	<>
5615	5042	.	.
5615	5045	 	 
5615	5042	<~>	<~>
5615	5042	<split-s>	<split-s>
5615	5042	<split-h>	<split-h>
5615	5042	<name2>	<name2>
5615	5589	<aphaerese>	<aphaerese>
5615	5616	<>	<aphaerese>
5615	5616	<>	<elision3>
5615	5616	<>	<elision2>
5615	5616	<>	<elision1>
5615	5049	.	υ
5615	5225	s	υ
5615	5049	.	u
5615	5225	s	u
5615	5234	.	κ
5615	5305	s	κ
5615	5417	s	k
5615	5426	s	U
5615	5592	s	K
5615	5049	.	α
5615	5225	s	α
5615	5049	.	a
5615	5225	s	a
5615	5547	s	A
5615	5417	s	λ
5615	5417	s	l
5615	5605	s	L
5615	5619	<split-h>	<>
5616	5039	.	.
5616	5040	 	 
5616	5039	<~>	<~>
5616	5039	<split-s>	<split-s>
5616	5039	<split-h>	<split-h>
5616	5039	<name2>	<name2>
5616	5043	<aphaerese>	<aphaerese>
5616	5038	<>	<aphaerese>
5616	5038	<>	<elision3>
5616	5038	<>	<elision2>
5616	5038	<>	<elision1>
5616	5047	.	υ
5616	5053	s	υ
5616	5047	.	u
5616	5053	s	u
5616	5232	.	κ
5616	5303	s	κ
5616	5415	s	k
5616	5424	s	U
5616	5590	s	K
5616	5047	.	α
5616	5053	s	α
5616	5047	.	a
5616	5053	s	a
5616	5545	s	A
5616	5415	s	λ
5616	5415	s	l
5616	5603	s	L
5616	5617	<split-h>	<>
5617	5618	<>	<aphaerese>
5617	5618	<>	<elision3>
5617	5618	<>	<elision2>
5617	5618	<>	<elision1>
5617	5226	<3s>	<>
5618	5619	<>	<name>
5618	5618	<>	<aphaerese>
5618	5618	<>	<elision3>
5618	5618	<>	<elision2>
5618	5618	<>	<elision1>
5618	5227	<3s>	<>
5619	5617	<>	<aphaerese>
5619	5617	<>	<elision3>
5619	5617	<>	<elision2>
5619	5617	<>	<elision1>
5619	5228	<3s>	<>
5620	5621	<>	<name>
5620	5620	<>	<aphaerese>
5620	5623	<elision3>	<elision3>
5620	5620	<>	<elision3>
5620	5623	<elision2>	<elision2>
5620	5620	<>	<elision2>
5620	5623	<elision1>	<elision1>
5620	5620	<>	<elision1>
5620	5206	<2s>	<>
5621	5622	<>	<aphaerese>
5621	5625	<elision3>	<elision3>
5621	5622	<>	<elision3>
5621	5625	<elision2>	<elision2>
5621	5622	<>	<elision2>
5621	5625	<elision1>	<elision1>
5621	5622	<>	<elision1>
5621	5207	<2s>	<>
5622	5620	<>	<aphaerese>
5622	5623	<elision3>	<elision3>
5622	5620	<>	<elision3>
5622	5623	<elision2>	<elision2>
5622	5620	<>	<elision2>
5622	5623	<elision1>	<elision1>
5622	5620	<>	<elision1>
5622	5205	<2s>	<>
5623	5624	<>	<name>
5623	5623	<>	<aphaerese>
5623	5623	<>	<elision3>
5623	5623	<>	<elision2>
5623	5623	<>	<elision1>
5623	5626	s	κ
5623	5626	s	k
5623	5641	s	K
5623	5626	s	λ
5623	5645	s	l
5623	5647	s	L
5623	5067	<2s>	<>
5624	5625	<>	<aphaerese>
5624	5625	<>	<elision3>
5624	5625	<>	<elision2>
5624	5625	<>	<elision1>
5624	5628	s	κ
5624	5628	s	k
5624	5643	s	K
5624	5628	s	λ
5624	5644	s	l
5624	5649	s	L
5624	5068	<2s>	<>
5625	5623	<>	<aphaerese>
5625	5623	<>	<elision3>
5625	5623	<>	<elision2>
5625	5623	<>	<elision1>
5625	5626	s	κ
5625	5626	s	k
5625	5641	s	K
5625	5626	s	λ
5625	5645	s	l
5625	5647	s	L
5625	5066	<2s>	<>
5626	5627	<>	<name>
5626	5626	<>	<aphaerese>
5626	5626	<>	<elision3>
5626	5626	<>	<elision2>
5626	5626	<>	<elision1>
5626	5629	s	κ
5626	5415	s	k
5626	5590	s	K
5626	5629	s	λ
5626	5415	s	l
5626	5603	s	L
5626	5639	<split-h>	<>
5627	5628	<>	<aphaerese>
5627	5628	<>	<elision3>
5627	5628	<>	<elision2>
5627	5628	<>	<elision1>
5627	5631	s	κ
5627	5417	s	k
5627	5592	s	K
5627	5631	s	λ
5627	5417	s	l
5627	5605	s	L
5627	5640	<split-h>	<>
5628	5626	<>	<aphaerese>
5628	5626	<>	<elision3>
5628	5626	<>	<elision2>
5628	5626	<>	<elision1>
5628	5629	s	κ
5628	5415	s	k
5628	5590	s	K
5628	5629	s	λ
5628	5415	s	l
5628	5603	s	L
5628	5638	<split-h>	<>
5629	5054	.	.
5629	5054	 	 
5629	5054	<~>	<~>
5629	5054	<split-s>	<split-s>
5629	5054	<split-h>	<split-h>
5629	5054	<name2>	<name2>
5629	5630	<>	<name>
5629	5057	<aphaerese>	<aphaerese>
5629	5629	<>	<aphaerese>
5629	5629	<>	<elision3>
5629	5629	<>	<elision2>
5629	5629	<>	<elision1>
5629	5218	.	υ
5629	5218	.	u
5629	5218	.	κ
5629	5218	.	α
5629	5218	.	a
5629	5218	.	λ
5629	5633	<4s>	<>
5630	5056	.	.
5630	5056	 	 
5630	5056	<~>	<~>
5630	5056	<split-s>	<split-s>
5630	5056	<split-h>	<split-h>
5630	5056	<name2>	<name2>
5630	5059	<aphaerese>	<aphaerese>
5630	5631	<>	<aphaerese>
5630	5631	<>	<elision3>
5630	5631	<>	<elision2>
5630	5631	<>	<elision1>
5630	5220	.	υ
5630	5220	.	u
5630	5220	.	κ
5630	5220	.	α
5630	5220	.	a
5630	5220	.	λ
5630	5634	<4s>	<>
5631	5054	.	.
5631	5054	 	 
5631	5054	<~>	<~>
5631	5054	<split-s>	<split-s>
5631	5054	<split-h>	<split-h>
5631	5054	<name2>	<name2>
5631	5057	<aphaerese>	<aphaerese>
5631	5629	<>	<aphaerese>
5631	5629	<>	<elision3>
5631	5629	<>	<elision2>
5631	5629	<>	<elision1>
5631	5218	.	υ
5631	5218	.	u
5631	5218	.	κ
5631	5218	.	α
5631	5218	.	a
5631	5218	.	λ
5631	5632	<4s>	<>
5632	179	.	.
5632	180	 	 
5632	179	<~>	<~>
5632	179	<split-s>	<split-s>
5632	179	<split-h>	<split-h>
5632	179	<name2>	<name2>
5632	183	<aphaerese>	<aphaerese>
5632	5633	<>	<aphaerese>
5632	5633	<>	<elision3>
5632	5633	<>	<elision2>
5632	5633	<>	<elision1>
5632	4828	.	υ
5632	4872	H	υ
5632	4828	.	u
5632	4874	H	u
5632	4828	.	κ
5632	5287	H	κ
5632	4782	H	k
5632	4795	H	U
5632	4798	H	K
5632	4828	.	α
5632	4858	H	α
5632	4828	.	a
5632	4863	H	a
5632	4625	H	A
5632	4828	.	λ
5632	5264	H	λ
5632	5212	H	l
5632	5217	H	L
5632	5636	<K>	<>
5633	179	.	.
5633	180	 	 
5633	179	<~>	<~>
5633	179	<split-s>	<split-s>
5633	179	<split-h>	<split-h>
5633	179	<name2>	<name2>
5633	5634	<>	<name>
5633	183	<aphaerese>	<aphaerese>
5633	5633	<>	<aphaerese>
5633	5633	<>	<elision3>
5633	5633	<>	<elision2>
5633	5633	<>	<elision1>
5633	4828	.	υ
5633	4872	H	υ
5633	4828	.	u
5633	4874	H	u
5633	4828	.	κ
5633	5287	H	κ
5633	4782	H	k
5633	4795	H	U
5633	4798	H	K
5633	4828	.	α
5633	4858	H	α
5633	4828	.	a
5633	4863	H	a
5633	4625	H	A
5633	4828	.	λ
5633	5264	H	λ
5633	5212	H	l
5633	5217	H	L
5633	5637	<K>	<>
5634	178	.	.
5634	182	 	 
5634	178	<~>	<~>
5634	178	<split-s>	<split-s>
5634	178	<split-h>	<split-h>
5634	178	<name2>	<name2>
5634	185	<aphaerese>	<aphaerese>
5634	5632	<>	<aphaerese>
5634	5632	<>	<elision3>
5634	5632	<>	<elision2>
5634	5632	<>	<elision1>
5634	4830	.	υ
5634	4867	H	υ
5634	4830	.	u
5634	4871	H	u
5634	4830	.	κ
5634	5244	H	κ
5634	4823	H	k
5634	4797	H	U
5634	4827	H	K
5634	4830	.	α
5634	4857	H	α
5634	4830	.	a
5634	4862	H	a
5634	4628	H	A
5634	4830	.	λ
5634	5263	H	λ
5634	5211	H	l
5634	5214	H	L
5634	5635	<K>	<>
5635	4880	.	.
5635	4880	<~>	<~>
5635	4880	<split-s>	<split-s>
5635	4880	<split-h>	<split-h>
5635	4880	<name2>	<name2>
5635	4883	<aphaerese>	<aphaerese>
5635	5636	<>	<aphaerese>
5635	5636	<>	<elision3>
5635	5636	<>	<elision2>
5635	5636	<>	<elision1>
5635	4876	.	υ
5635	5022	H	υ
5635	4876	.	u
5635	5031	H	u
5635	4876	.	κ
5635	5274	H	κ
5635	4991	H	k
5635	5000	H	U
5635	5004	H	K
5635	4876	.	α
5635	5034	H	α
5635	4876	.	a
5635	5037	H	a
5635	4971	H	A
5635	4876	.	λ
5635	5283	H	λ
5635	5018	H	l
5635	5013	H	L
5636	4878	.	.
5636	4878	<~>	<~>
5636	4878	<split-s>	<split-s>
5636	4878	<split-h>	<split-h>
5636	4878	<name2>	<name2>
5636	4881	<aphaerese>	<aphaerese>
5636	5637	<>	<aphaerese>
5636	5637	<>	<elision3>
5636	5637	<>	<elision2>
5636	5637	<>	<elision1>
5636	4877	.	υ
5636	5020	H	υ
5636	4877	.	u
5636	5029	H	u
5636	4877	.	κ
5636	5272	H	κ
5636	4989	H	k
5636	4998	H	U
5636	5001	H	K
5636	4877	.	α
5636	5032	H	α
5636	4877	.	a
5636	5035	H	a
5636	4969	H	A
5636	4877	.	λ
5636	5281	H	λ
5636	5016	H	l
5636	5019	H	L
5637	4878	.	.
5637	4878	<~>	<~>
5637	4878	<split-s>	<split-s>
5637	4878	<split-h>	<split-h>
5637	4878	<name2>	<name2>
5637	5635	<>	<name>
5637	4881	<aphaerese>	<aphaerese>
5637	5637	<>	<aphaerese>
5637	5637	<>	<elision3>
5637	5637	<>	<elision2>
5637	5637	<>	<elision1>
5637	4877	.	υ
5637	5020	H	υ
5637	4877	.	u
5637	5029	H	u
5637	4877	.	κ
5637	5272	H	κ
5637	4989	H	k
5637	4998	H	U
5637	5001	H	K
5637	4877	.	α
5637	5032	H	α
5637	4877	.	a
5637	5035	H	a
5637	4969	H	A
5637	4877	.	λ
5637	5281	H	λ
5637	5016	H	l
5637	5019	H	L
5638	5639	<>	<aphaerese>
5638	5639	<>	<elision3>
5638	5639	<>	<elision2>
5638	5639	<>	<elision1>
5638	5241	<3s>	<>
5639	5640	<>	<name>
5639	5639	<>	<aphaerese>
5639	5639	<>	<elision3>
5639	5639	<>	<elision2>
5639	5639	<>	<elision1>
5639	5242	<3s>	<>
5640	5638	<>	<aphaerese>
5640	5638	<>	<elision3>
5640	5638	<>	<elision2>
5640	5638	<>	<elision1>
5640	5243	<3s>	<>
5641	5642	<>	<name>
5641	5641	<>	<aphaerese>
5641	5641	<>	<elision3>
5641	5641	<>	<elision2>
5641	5641	<>	<elision1>
5641	5645	<K2kl>	<>
5642	5643	<>	<aphaerese>
5642	5643	<>	<elision3>
5642	5643	<>	<elision2>
5642	5643	<>	<elision1>
5642	5646	<K2kl>	<>
5643	5641	<>	<aphaerese>
5643	5641	<>	<elision3>
5643	5641	<>	<elision2>
5643	5641	<>	<elision1>
5643	5644	<K2kl>	<>
5644	5645	<>	<aphaerese>
5644	5645	<>	<elision3>
5644	5645	<>	<elision2>
5644	5645	<>	<elision1>
5644	5638	<split-h>	<>
5645	5646	<>	<name>
5645	5645	<>	<aphaerese>
5645	5645	<>	<elision3>
5645	5645	<>	<elision2>
5645	5645	<>	<elision1>
5645	5639	<split-h>	<>
5646	5644	<>	<aphaerese>
5646	5644	<>	<elision3>
5646	5644	<>	<elision2>
5646	5644	<>	<elision1>
5646	5640	<split-h>	<>
5647	5648	<>	<name>
5647	5647	<>	<aphaerese>
5647	5647	<>	<elision3>
5647	5647	<>	<elision2>
5647	5647	<>	<elision1>
5647	5645	<L2kl>	<>
5648	5649	<>	<aphaerese>
5648	5649	<>	<elision3>
5648	5649	<>	<elision2>
5648	5649	<>	<elision1>
5648	5646	<L2kl>	<>
5649	5647	<>	<aphaerese>
5649	5647	<>	<elision3>
5649	5647	<>	<elision2>
5649	5647	<>	<elision1>
5649	5644	<L2kl>	<>
5650	5039	.	.
5650	5040	 	 
5650	5039	<~>	<~>
5650	5039	<split-s>	<split-s>
5650	5039	<split-h>	<split-h>
5650	5039	<name2>	<name2>
5650	5651	<>	<name>
5650	5043	<aphaerese>	<aphaerese>
5650	5650	<>	<aphaerese>
5650	5653	<elision3>	<elision3>
5650	5650	<>	<elision3>
5650	5653	<elision2>	<elision2>
5650	5650	<>	<elision2>
5650	5653	<elision1>	<elision1>
5650	5650	<>	<elision1>
5650	5047	.	υ
5650	5053	s	υ
5650	5047	.	u
5650	5053	s	u
5650	5047	.	κ
5650	5629	s	κ
5650	5415	s	k
5650	5424	s	U
5650	5590	s	K
5650	5047	.	α
5650	5053	s	α
5650	5047	.	a
5650	5053	s	a
5650	5545	s	A
5650	5047	.	λ
5650	5629	s	λ
5650	5415	s	l
5650	5603	s	L
5650	5701	<split-h>	<>
5651	5042	.	.
5651	5045	 	 
5651	5042	<~>	<~>
5651	5042	<split-s>	<split-s>
5651	5042	<split-h>	<split-h>
5651	5042	<name2>	<name2>
5651	5589	<aphaerese>	<aphaerese>
5651	5652	<>	<aphaerese>
5651	5655	<elision3>	<elision3>
5651	5652	<>	<elision3>
5651	5655	<elision2>	<elision2>
5651	5652	<>	<elision2>
5651	5655	<elision1>	<elision1>
5651	5652	<>	<elision1>
5651	5049	.	υ
5651	5225	s	υ
5651	5049	.	u
5651	5225	s	u
5651	5049	.	κ
5651	5631	s	κ
5651	5417	s	k
5651	5426	s	U
5651	5592	s	K
5651	5049	.	α
5651	5225	s	α
5651	5049	.	a
5651	5225	s	a
5651	5547	s	A
5651	5049	.	λ
5651	5631	s	λ
5651	5417	s	l
5651	5605	s	L
5651	5702	<split-h>	<>
5652	5039	.	.
5652	5040	 	 
5652	5039	<~>	<~>
5652	5039	<split-s>	<split-s>
5652	5039	<split-h>	<split-h>
5652	5039	<name2>	<name2>
5652	5043	<aphaerese>	<aphaerese>
5652	5650	<>	<aphaerese>
5652	5653	<elision3>	<elision3>
5652	5650	<>	<elision3>
5652	5653	<elision2>	<elision2>
5652	5650	<>	<elision2>
5652	5653	<elision1>	<elision1>
5652	5650	<>	<elision1>
5652	5047	.	υ
5652	5053	s	υ
5652	5047	.	u
5652	5053	s	u
5652	5047	.	κ
5652	5629	s	κ
5652	5415	s	k
5652	5424	s	U
5652	5590	s	K
5652	5047	.	α
5652	5053	s	α
5652	5047	.	a
5652	5053	s	a
5652	5545	s	A
5652	5047	.	λ
5652	5629	s	λ
5652	5415	s	l
5652	5603	s	L
5652	5700	<split-h>	<>
5653	5039	.	.
5653	5040	 	 
5653	5039	<~>	<~>
5653	5039	<split-s>	<split-s>
5653	5039	<split-h>	<split-h>
5653	5039	<name2>	<name2>
5653	5654	<>	<name>
5653	5043	<aphaerese>	<aphaerese>
5653	5653	<>	<aphaerese>
5653	5039	<elision3>	<elision3>
5653	5653	<>	<elision3>
5653	5039	<elision2>	<elision2>
5653	5653	<>	<elision2>
5653	5039	<elision1>	<elision1>
5653	5653	<>	<elision1>
5653	5047	.	υ
5653	5053	s	υ
5653	5047	.	u
5653	5053	s	u
5653	5232	.	κ
5653	5656	s	κ
5653	5665	s	k
5653	5424	s	U
5653	5674	s	K
5653	5047	.	α
5653	5053	s	α
5653	5047	.	a
5653	5053	s	a
5653	5545	s	A
5653	5665	s	λ
5653	5665	s	l
5653	5690	s	L
5653	5698	<split-h>	<>
5654	5042	.	.
5654	5045	 	 
5654	5042	<~>	<~>
5654	5042	<split-s>	<split-s>
5654	5042	<split-h>	<split-h>
5654	5042	<name2>	<name2>
5654	5589	<aphaerese>	<aphaerese>
5654	5655	<>	<aphaerese>
5654	5042	<elision3>	<elision3>
5654	5655	<>	<elision3>
5654	5042	<elision2>	<elision2>
5654	5655	<>	<elision2>
5654	5042	<elision1>	<elision1>
5654	5655	<>	<elision1>
5654	5049	.	υ
5654	5225	s	υ
5654	5049	.	u
5654	5225	s	u
5654	5234	.	κ
5654	5658	s	κ
5654	5667	s	k
5654	5426	s	U
5654	5676	s	K
5654	5049	.	α
5654	5225	s	α
5654	5049	.	a
5654	5225	s	a
5654	5547	s	A
5654	5667	s	λ
5654	5667	s	l
5654	5692	s	L
5654	5699	<split-h>	<>
5655	5039	.	.
5655	5040	 	 
5655	5039	<~>	<~>
5655	5039	<split-s>	<split-s>
5655	5039	<split-h>	<split-h>
5655	5039	<name2>	<name2>
5655	5043	<aphaerese>	<aphaerese>
5655	5653	<>	<aphaerese>
5655	5039	<elision3>	<elision3>
5655	5653	<>	<elision3>
5655	5039	<elision2>	<elision2>
5655	5653	<>	<elision2>
5655	5039	<elision1>	<elision1>
5655	5653	<>	<elision1>
5655	5047	.	υ
5655	5053	s	υ
5655	5047	.	u
5655	5053	s	u
5655	5232	.	κ
5655	5656	s	κ
5655	5665	s	k
5655	5424	s	U
5655	5674	s	K
5655	5047	.	α
5655	5053	s	α
5655	5047	.	a
5655	5053	s	a
5655	5545	s	A
5655	5665	s	λ
5655	5665	s	l
5655	5690	s	L
5655	5697	<split-h>	<>
5656	5054	.	.
5656	5054	 	 
5656	5054	<~>	<~>
5656	5054	<split-s>	<split-s>
5656	5054	<split-h>	<split-h>
5656	5054	<name2>	<name2>
5656	5657	<>	<name>
5656	5057	<aphaerese>	<aphaerese>
5656	5656	<>	<aphaerese>
5656	5306	<elision3>	<elision3>
5656	5656	<>	<elision3>
5656	5306	<elision2>	<elision2>
5656	5656	<>	<elision2>
5656	5306	<elision1>	<elision1>
5656	5656	<>	<elision1>
5656	5218	.	υ
5656	5218	.	u
5656	5218	.	κ
5656	5218	.	α
5656	5218	.	a
5656	5218	.	λ
5656	5660	<4s>	<>
5657	5056	.	.
5657	5056	 	 
5657	5056	<~>	<~>
5657	5056	<split-s>	<split-s>
5657	5056	<split-h>	<split-h>
5657	5056	<name2>	<name2>
5657	5059	<aphaerese>	<aphaerese>
5657	5658	<>	<aphaerese>
5657	5308	<elision3>	<elision3>
5657	5658	<>	<elision3>
5657	5308	<elision2>	<elision2>
5657	5658	<>	<elision2>
5657	5308	<elision1>	<elision1>
5657	5658	<>	<elision1>
5657	5220	.	υ
5657	5220	.	u
5657	5220	.	κ
5657	5220	.	α
5657	5220	.	a
5657	5220	.	λ
5657	5661	<4s>	<>
5658	5054	.	.
5658	5054	 	 
5658	5054	<~>	<~>
5658	5054	<split-s>	<split-s>
5658	5054	<split-h>	<split-h>
5658	5054	<name2>	<name2>
5658	5057	<aphaerese>	<aphaerese>
5658	5656	<>	<aphaerese>
5658	5306	<elision3>	<elision3>
5658	5656	<>	<elision3>
5658	5306	<elision2>	<elision2>
5658	5656	<>	<elision2>
5658	5306	<elision1>	<elision1>
5658	5656	<>	<elision1>
5658	5218	.	υ
5658	5218	.	u
5658	5218	.	κ
5658	5218	.	α
5658	5218	.	a
5658	5218	.	λ
5658	5659	<4s>	<>
5659	179	.	.
5659	180	 	 
5659	179	<~>	<~>
5659	179	<split-s>	<split-s>
5659	179	<split-h>	<split-h>
5659	179	<name2>	<name2>
5659	183	<aphaerese>	<aphaerese>
5659	5660	<>	<aphaerese>
5659	5410	<elision3>	<elision3>
5659	5660	<>	<elision3>
5659	5410	<elision2>	<elision2>
5659	5660	<>	<elision2>
5659	5410	<elision1>	<elision1>
5659	5660	<>	<elision1>
5659	4828	.	υ
5659	4872	H	υ
5659	4828	.	u
5659	4874	H	u
5659	4828	.	κ
5659	4795	H	U
5659	4828	.	α
5659	4858	H	α
5659	4828	.	a
5659	4863	H	a
5659	4625	H	A
5659	4828	.	λ
5659	5663	<K>	<>
5660	179	.	.
5660	180	 	 
5660	179	<~>	<~>
5660	179	<split-s>	<split-s>
5660	179	<split-h>	<split-h>
5660	179	<name2>	<name2>
5660	5661	<>	<name>
5660	183	<aphaerese>	<aphaerese>
5660	5660	<>	<aphaerese>
5660	5410	<elision3>	<elision3>
5660	5660	<>	<elision3>
5660	5410	<elision2>	<elision2>
5660	5660	<>	<elision2>
5660	5410	<elision1>	<elision1>
5660	5660	<>	<elision1>
5660	4828	.	υ
5660	4872	H	υ
5660	4828	.	u
5660	4874	H	u
5660	4828	.	κ
5660	4795	H	U
5660	4828	.	α
5660	4858	H	α
5660	4828	.	a
5660	4863	H	a
5660	4625	H	A
5660	4828	.	λ
5660	5664	<K>	<>
5661	178	.	.
5661	182	 	 
5661	178	<~>	<~>
5661	178	<split-s>	<split-s>
5661	178	<split-h>	<split-h>
5661	178	<name2>	<name2>
5661	185	<aphaerese>	<aphaerese>
5661	5659	<>	<aphaerese>
5661	5409	<elision3>	<elision3>
5661	5659	<>	<elision3>
5661	5409	<elision2>	<elision2>
5661	5659	<>	<elision2>
5661	5409	<elision1>	<elision1>
5661	5659	<>	<elision1>
5661	4830	.	υ
5661	4867	H	υ
5661	4830	.	u
5661	4871	H	u
5661	4830	.	κ
5661	4797	H	U
5661	4830	.	α
5661	4857	H	α
5661	4830	.	a
5661	4862	H	a
5661	4628	H	A
5661	4830	.	λ
5661	5662	<K>	<>
5662	4880	.	.
5662	4880	<~>	<~>
5662	4880	<split-s>	<split-s>
5662	4880	<split-h>	<split-h>
5662	4880	<name2>	<name2>
5662	4883	<aphaerese>	<aphaerese>
5662	5663	<>	<aphaerese>
5662	5358	<elision3>	<elision3>
5662	5663	<>	<elision3>
5662	5358	<elision2>	<elision2>
5662	5663	<>	<elision2>
5662	5358	<elision1>	<elision1>
5662	5663	<>	<elision1>
5662	4876	.	υ
5662	5022	H	υ
5662	4876	.	u
5662	5031	H	u
5662	4876	.	κ
5662	5000	H	U
5662	4876	.	α
5662	5034	H	α
5662	4876	.	a
5662	5037	H	a
5662	4971	H	A
5662	4876	.	λ
5663	4878	.	.
5663	4878	<~>	<~>
5663	4878	<split-s>	<split-s>
5663	4878	<split-h>	<split-h>
5663	4878	<name2>	<name2>
5663	4881	<aphaerese>	<aphaerese>
5663	5664	<>	<aphaerese>
5663	5359	<elision3>	<elision3>
5663	5664	<>	<elision3>
5663	5359	<elision2>	<elision2>
5663	5664	<>	<elision2>
5663	5359	<elision1>	<elision1>
5663	5664	<>	<elision1>
5663	4877	.	υ
5663	5020	H	υ
5663	4877	.	u
5663	5029	H	u
5663	4877	.	κ
5663	4998	H	U
5663	4877	.	α
5663	5032	H	α
5663	4877	.	a
5663	5035	H	a
5663	4969	H	A
5663	4877	.	λ
5664	4878	.	.
5664	4878	<~>	<~>
5664	4878	<split-s>	<split-s>
5664	4878	<split-h>	<split-h>
5664	4878	<name2>	<name2>
5664	5662	<>	<name>
5664	4881	<aphaerese>	<aphaerese>
5664	5664	<>	<aphaerese>
5664	5359	<elision3>	<elision3>
5664	5664	<>	<elision3>
5664	5359	<elision2>	<elision2>
5664	5664	<>	<elision2>
5664	5359	<elision1>	<elision1>
5664	5664	<>	<elision1>
5664	4877	.	υ
5664	5020	H	υ
5664	4877	.	u
5664	5029	H	u
5664	4877	.	κ
5664	4998	H	U
5664	4877	.	α
5664	5032	H	α
5664	4877	.	a
5664	5035	H	a
5664	4969	H	A
5664	4877	.	λ
5665	5054	.	.
5665	5054	 	 
5665	5054	<~>	<~>
5665	5054	<split-s>	<split-s>
5665	5054	<split-h>	<split-h>
5665	5054	<name2>	<name2>
5665	5666	<>	<name>
5665	5057	<aphaerese>	<aphaerese>
5665	5665	<>	<aphaerese>
5665	5054	<elision3>	<elision3>
5665	5665	<>	<elision3>
5665	5054	<elision2>	<elision2>
5665	5665	<>	<elision2>
5665	5054	<elision1>	<elision1>
5665	5665	<>	<elision1>
5665	5218	.	υ
5665	5218	.	u
5665	5218	.	κ
5665	5218	.	α
5665	5218	.	a
5665	5218	.	λ
5665	5669	<4s>	<>
5666	5056	.	.
5666	5056	 	 
5666	5056	<~>	<~>
5666	5056	<split-s>	<split-s>
5666	5056	<split-h>	<split-h>
5666	5056	<name2>	<name2>
5666	5059	<aphaerese>	<aphaerese>
5666	5667	<>	<aphaerese>
5666	5056	<elision3>	<elision3>
5666	5667	<>	<elision3>
5666	5056	<elision2>	<elision2>
5666	5667	<>	<elision2>
5666	5056	<elision1>	<elision1>
5666	5667	<>	<elision1>
5666	5220	.	υ
5666	5220	.	u
5666	5220	.	κ
5666	5220	.	α
5666	5220	.	a
5666	5220	.	λ
5666	5670	<4s>	<>
5667	5054	.	.
5667	5054	 	 
5667	5054	<~>	<~>
5667	5054	<split-s>	<split-s>
5667	5054	<split-h>	<split-h>
5667	5054	<name2>	<name2>
5667	5057	<aphaerese>	<aphaerese>
5667	5665	<>	<aphaerese>
5667	5054	<elision3>	<elision3>
5667	5665	<>	<elision3>
5667	5054	<elision2>	<elision2>
5667	5665	<>	<elision2>
5667	5054	<elision1>	<elision1>
5667	5665	<>	<elision1>
5667	5218	.	υ
5667	5218	.	u
5667	5218	.	κ
5667	5218	.	α
5667	5218	.	a
5667	5218	.	λ
5667	5668	<4s>	<>
5668	179	.	.
5668	180	 	 
5668	179	<~>	<~>
5668	179	<split-s>	<split-s>
5668	179	<split-h>	<split-h>
5668	179	<name2>	<name2>
5668	183	<aphaerese>	<aphaerese>
5668	5669	<>	<aphaerese>
5668	179	<elision3>	<elision3>
5668	5669	<>	<elision3>
5668	179	<elision2>	<elision2>
5668	5669	<>	<elision2>
5668	179	<elision1>	<elision1>
5668	5669	<>	<elision1>
5668	4828	.	υ
5668	4872	H	υ
5668	4828	.	u
5668	4874	H	u
5668	4828	.	κ
5668	4795	H	U
5668	4828	.	α
5668	4858	H	α
5668	4828	.	a
5668	4863	H	a
5668	4625	H	A
5668	4828	.	λ
5668	5672	<K>	<>
5669	179	.	.
5669	180	 	 
5669	179	<~>	<~>
5669	179	<split-s>	<split-s>
5669	179	<split-h>	<split-h>
5669	179	<name2>	<name2>
5669	5670	<>	<name>
5669	183	<aphaerese>	<aphaerese>
5669	5669	<>	<aphaerese>
5669	179	<elision3>	<elision3>
5669	5669	<>	<elision3>
5669	179	<elision2>	<elision2>
5669	5669	<>	<elision2>
5669	179	<elision1>	<elision1>
5669	5669	<>	<elision1>
5669	4828	.	υ
5669	4872	H	υ
5669	4828	.	u
5669	4874	H	u
5669	4828	.	κ
5669	4795	H	U
5669	4828	.	α
5669	4858	H	α
5669	4828	.	a
5669	4863	H	a
5669	4625	H	A
5669	4828	.	λ
5669	5673	<K>	<>
5670	178	.	.
5670	182	 	 
5670	178	<~>	<~>
5670	178	<split-s>	<split-s>
5670	178	<split-h>	<split-h>
5670	178	<name2>	<name2>
5670	185	<aphaerese>	<aphaerese>
5670	5668	<>	<aphaerese>
5670	178	<elision3>	<elision3>
5670	5668	<>	<elision3>
5670	178	<elision2>	<elision2>
5670	5668	<>	<elision2>
5670	178	<elision1>	<elision1>
5670	5668	<>	<elision1>
5670	4830	.	υ
5670	4867	H	υ
5670	4830	.	u
5670	4871	H	u
5670	4830	.	κ
5670	4797	H	U
5670	4830	.	α
5670	4857	H	α
5670	4830	.	a
5670	4862	H	a
5670	4628	H	A
5670	4830	.	λ
5670	5671	<K>	<>
5671	4880	.	.
5671	4880	<~>	<~>
5671	4880	<split-s>	<split-s>
5671	4880	<split-h>	<split-h>
5671	4880	<name2>	<name2>
5671	4883	<aphaerese>	<aphaerese>
5671	5672	<>	<aphaerese>
5671	4880	<elision3>	<elision3>
5671	5672	<>	<elision3>
5671	4880	<elision2>	<elision2>
5671	5672	<>	<elision2>
5671	4880	<elision1>	<elision1>
5671	5672	<>	<elision1>
5671	4876	.	υ
5671	5022	H	υ
5671	4876	.	u
5671	5031	H	u
5671	4876	.	κ
5671	5000	H	U
5671	4876	.	α
5671	5034	H	α
5671	4876	.	a
5671	5037	H	a
5671	4971	H	A
5671	4876	.	λ
5672	4878	.	.
5672	4878	<~>	<~>
5672	4878	<split-s>	<split-s>
5672	4878	<split-h>	<split-h>
5672	4878	<name2>	<name2>
5672	4881	<aphaerese>	<aphaerese>
5672	5673	<>	<aphaerese>
5672	4878	<elision3>	<elision3>
5672	5673	<>	<elision3>
5672	4878	<elision2>	<elision2>
5672	5673	<>	<elision2>
5672	4878	<elision1>	<elision1>
5672	5673	<>	<elision1>
5672	4877	.	υ
5672	5020	H	υ
5672	4877	.	u
5672	5029	H	u
5672	4877	.	κ
5672	4998	H	U
5672	4877	.	α
5672	5032	H	α
5672	4877	.	a
5672	5035	H	a
5672	4969	H	A
5672	4877	.	λ
5673	4878	.	.
5673	4878	<~>	<~>
5673	4878	<split-s>	<split-s>
5673	4878	<split-h>	<split-h>
5673	4878	<name2>	<name2>
5673	5671	<>	<name>
5673	4881	<aphaerese>	<aphaerese>
5673	5673	<>	<aphaerese>
5673	4878	<elision3>	<elision3>
5673	5673	<>	<elision3>
5673	4878	<elision2>	<elision2>
5673	5673	<>	<elision2>
5673	4878	<elision1>	<elision1>
5673	5673	<>	<elision1>
5673	4877	.	υ
5673	5020	H	υ
5673	4877	.	u
5673	5029	H	u
5673	4877	.	κ
5673	4998	H	U
5673	4877	.	α
5673	5032	H	α
5673	4877	.	a
5673	5035	H	a
5673	4969	H	A
5673	4877	.	λ
5674	5428	<name>	<name>
5674	5675	<>	<name>
5674	5677	<>	<aphaerese>
5674	5677	<>	<elision3>
5674	5677	<>	<elision2>
5674	5677	<>	<elision1>
5674	5539	<4s>	<>
5674	5594	<L2kl>	<>
5674	5687	<K2kl>	<>
5675	5676	<>	<aphaerese>
5675	5676	<>	<elision3>
5675	5676	<>	<elision2>
5675	5676	<>	<elision1>
5675	5595	<L2kl>	<>
5675	5679	<K2kl>	<>
5676	5677	<>	<aphaerese>
5676	5677	<>	<elision3>
5676	5677	<>	<elision2>
5676	5677	<>	<elision1>
5676	5596	<L2kl>	<>
5676	5680	<K2kl>	<>
5677	5675	<>	<name>
5677	5677	<>	<aphaerese>
5677	5677	<>	<elision3>
5677	5677	<>	<elision2>
5677	5677	<>	<elision1>
5677	5594	<L2kl>	<>
5677	5678	<K2kl>	<>
5678	5054	.	.
5678	5054	 	 
5678	5054	<~>	<~>
5678	5054	<split-s>	<split-s>
5678	5054	<split-h>	<split-h>
5678	5054	<name2>	<name2>
5678	5679	<>	<name>
5678	5057	<aphaerese>	<aphaerese>
5678	5678	<>	<aphaerese>
5678	5054	<elision3>	<elision3>
5678	5678	<>	<elision3>
5678	5054	<elision2>	<elision2>
5678	5678	<>	<elision2>
5678	5054	<elision1>	<elision1>
5678	5678	<>	<elision1>
5678	5218	.	υ
5678	5218	.	u
5678	5218	.	α
5678	5218	.	a
5678	5682	<4s>	<>
5679	5056	.	.
5679	5056	 	 
5679	5056	<~>	<~>
5679	5056	<split-s>	<split-s>
5679	5056	<split-h>	<split-h>
5679	5056	<name2>	<name2>
5679	5059	<aphaerese>	<aphaerese>
5679	5680	<>	<aphaerese>
5679	5056	<elision3>	<elision3>
5679	5680	<>	<elision3>
5679	5056	<elision2>	<elision2>
5679	5680	<>	<elision2>
5679	5056	<elision1>	<elision1>
5679	5680	<>	<elision1>
5679	5220	.	υ
5679	5220	.	u
5679	5220	.	α
5679	5220	.	a
5679	5683	<4s>	<>
5680	5054	.	.
5680	5054	 	 
5680	5054	<~>	<~>
5680	5054	<split-s>	<split-s>
5680	5054	<split-h>	<split-h>
5680	5054	<name2>	<name2>
5680	5057	<aphaerese>	<aphaerese>
5680	5678	<>	<aphaerese>
5680	5054	<elision3>	<elision3>
5680	5678	<>	<elision3>
5680	5054	<elision2>	<elision2>
5680	5678	<>	<elision2>
5680	5054	<elision1>	<elision1>
5680	5678	<>	<elision1>
5680	5218	.	υ
5680	5218	.	u
5680	5218	.	α
5680	5218	.	a
5680	5681	<4s>	<>
5681	179	.	.
5681	180	 	 
5681	179	<~>	<~>
5681	179	<split-s>	<split-s>
5681	179	<split-h>	<split-h>
5681	179	<name2>	<name2>
5681	183	<aphaerese>	<aphaerese>
5681	5682	<>	<aphaerese>
5681	179	<elision3>	<elision3>
5681	5682	<>	<elision3>
5681	179	<elision2>	<elision2>
5681	5682	<>	<elision2>
5681	179	<elision1>	<elision1>
5681	5682	<>	<elision1>
5681	4828	.	υ
5681	4872	H	υ
5681	4828	.	u
5681	4874	H	u
5681	4795	H	U
5681	4828	.	α
5681	4858	H	α
5681	4828	.	a
5681	4863	H	a
5681	4625	H	A
5681	5685	<K>	<>
5682	179	.	.
5682	180	 	 
5682	179	<~>	<~>
5682	179	<split-s>	<split-s>
5682	179	<split-h>	<split-h>
5682	179	<name2>	<name2>
5682	5683	<>	<name>
5682	183	<aphaerese>	<aphaerese>
5682	5682	<>	<aphaerese>
5682	179	<elision3>	<elision3>
5682	5682	<>	<elision3>
5682	179	<elision2>	<elision2>
5682	5682	<>	<elision2>
5682	179	<elision1>	<elision1>
5682	5682	<>	<elision1>
5682	4828	.	υ
5682	4872	H	υ
5682	4828	.	u
5682	4874	H	u
5682	4795	H	U
5682	4828	.	α
5682	4858	H	α
5682	4828	.	a
5682	4863	H	a
5682	4625	H	A
5682	5686	<K>	<>
5683	178	.	.
5683	182	 	 
5683	178	<~>	<~>
5683	178	<split-s>	<split-s>
5683	178	<split-h>	<split-h>
5683	178	<name2>	<name2>
5683	185	<aphaerese>	<aphaerese>
5683	5681	<>	<aphaerese>
5683	178	<elision3>	<elision3>
5683	5681	<>	<elision3>
5683	178	<elision2>	<elision2>
5683	5681	<>	<elision2>
5683	178	<elision1>	<elision1>
5683	5681	<>	<elision1>
5683	4830	.	υ
5683	4867	H	υ
5683	4830	.	u
5683	4871	H	u
5683	4797	H	U
5683	4830	.	α
5683	4857	H	α
5683	4830	.	a
5683	4862	H	a
5683	4628	H	A
5683	5684	<K>	<>
5684	4880	.	.
5684	4880	<~>	<~>
5684	4880	<split-s>	<split-s>
5684	4880	<split-h>	<split-h>
5684	4880	<name2>	<name2>
5684	4883	<aphaerese>	<aphaerese>
5684	5685	<>	<aphaerese>
5684	4880	<elision3>	<elision3>
5684	5685	<>	<elision3>
5684	4880	<elision2>	<elision2>
5684	5685	<>	<elision2>
5684	4880	<elision1>	<elision1>
5684	5685	<>	<elision1>
5684	4876	.	υ
5684	5022	H	υ
5684	4876	.	u
5684	5031	H	u
5684	5000	H	U
5684	4876	.	α
5684	5034	H	α
5684	4876	.	a
5684	5037	H	a
5684	4971	H	A
5685	4878	.	.
5685	4878	<~>	<~>
5685	4878	<split-s>	<split-s>
5685	4878	<split-h>	<split-h>
5685	4878	<name2>	<name2>
5685	4881	<aphaerese>	<aphaerese>
5685	5686	<>	<aphaerese>
5685	4878	<elision3>	<elision3>
5685	5686	<>	<elision3>
5685	4878	<elision2>	<elision2>
5685	5686	<>	<elision2>
5685	4878	<elision1>	<elision1>
5685	5686	<>	<elision1>
5685	4877	.	υ
5685	5020	H	υ
5685	4877	.	u
5685	5029	H	u
5685	4998	H	U
5685	4877	.	α
5685	5032	H	α
5685	4877	.	a
5685	5035	H	a
5685	4969	H	A
5686	4878	.	.
5686	4878	<~>	<~>
5686	4878	<split-s>	<split-s>
5686	4878	<split-h>	<split-h>
5686	4878	<name2>	<name2>
5686	5684	<>	<name>
5686	4881	<aphaerese>	<aphaerese>
5686	5686	<>	<aphaerese>
5686	4878	<elision3>	<elision3>
5686	5686	<>	<elision3>
5686	4878	<elision2>	<elision2>
5686	5686	<>	<elision2>
5686	4878	<elision1>	<elision1>
5686	5686	<>	<elision1>
5686	4877	.	υ
5686	5020	H	υ
5686	4877	.	u
5686	5029	H	u
5686	4998	H	U
5686	4877	.	α
5686	5032	H	α
5686	4877	.	a
5686	5035	H	a
5686	4969	H	A
5687	5054	.	.
5687	5054	 	 
5687	5054	<~>	<~>
5687	5054	<split-s>	<split-s>
5687	5054	<split-h>	<split-h>
5687	5054	<name2>	<name2>
5687	5428	<name2>	<name>
5687	5679	<>	<name>
5687	5057	<aphaerese>	<aphaerese>
5687	5678	<>	<aphaerese>
5687	5054	<elision3>	<elision3>
5687	5678	<>	<elision3>
5687	5054	<elision2>	<elision2>
5687	5678	<>	<elision2>
5687	5054	<elision1>	<elision1>
5687	5678	<>	<elision1>
5687	5218	.	υ
5687	5218	.	u
5687	5218	.	α
5687	5218	.	a
5687	5688	<4s>	<>
5688	179	.	.
5688	180	 	 
5688	179	<~>	<~>
5688	179	<split-s>	<split-s>
5688	179	<split-h>	<split-h>
5688	179	<name2>	<name2>
5688	5540	<name2>	<name>
5688	5683	<>	<name>
5688	183	<aphaerese>	<aphaerese>
5688	5682	<>	<aphaerese>
5688	179	<elision3>	<elision3>
5688	5682	<>	<elision3>
5688	179	<elision2>	<elision2>
5688	5682	<>	<elision2>
5688	179	<elision1>	<elision1>
5688	5682	<>	<elision1>
5688	4828	.	υ
5688	4872	H	υ
5688	4828	.	u
5688	4874	H	u
5688	4795	H	U
5688	4828	.	α
5688	4858	H	α
5688	4828	.	a
5688	4863	H	a
5688	4625	H	A
5688	5689	<K>	<>
5689	4878	.	.
5689	4878	<~>	<~>
5689	4878	<split-s>	<split-s>
5689	4878	<split-h>	<split-h>
5689	4878	<name2>	<name2>
5689	5430	<name2>	<name>
5689	5684	<>	<name>
5689	4881	<aphaerese>	<aphaerese>
5689	5686	<>	<aphaerese>
5689	4878	<elision3>	<elision3>
5689	5686	<>	<elision3>
5689	4878	<elision2>	<elision2>
5689	5686	<>	<elision2>
5689	4878	<elision1>	<elision1>
5689	5686	<>	<elision1>
5689	4877	.	υ
5689	5020	H	υ
5689	4877	.	u
5689	5029	H	u
5689	4998	H	U
5689	4877	.	α
5689	5032	H	α
5689	4877	.	a
5689	5035	H	a
5689	4969	H	A
5690	5428	<name>	<name>
5690	5691	<>	<name>
5690	5693	<>	<aphaerese>
5690	5693	<>	<elision3>
5690	5693	<>	<elision2>
5690	5693	<>	<elision1>
5690	5539	<4s>	<>
5690	5694	<L2kl>	<>
5691	5692	<>	<aphaerese>
5691	5692	<>	<elision3>
5691	5692	<>	<elision2>
5691	5692	<>	<elision1>
5691	5666	<L2kl>	<>
5692	5693	<>	<aphaerese>
5692	5693	<>	<elision3>
5692	5693	<>	<elision2>
5692	5693	<>	<elision1>
5692	5667	<L2kl>	<>
5693	5691	<>	<name>
5693	5693	<>	<aphaerese>
5693	5693	<>	<elision3>
5693	5693	<>	<elision2>
5693	5693	<>	<elision1>
5693	5665	<L2kl>	<>
5694	5054	.	.
5694	5054	 	 
5694	5054	<~>	<~>
5694	5054	<split-s>	<split-s>
5694	5054	<split-h>	<split-h>
5694	5054	<name2>	<name2>
5694	5428	<name2>	<name>
5694	5666	<>	<name>
5694	5057	<aphaerese>	<aphaerese>
5694	5665	<>	<aphaerese>
5694	5054	<elision3>	<elision3>
5694	5665	<>	<elision3>
5694	5054	<elision2>	<elision2>
5694	5665	<>	<elision2>
5694	5054	<elision1>	<elision1>
5694	5665	<>	<elision1>
5694	5218	.	υ
5694	5218	.	u
5694	5218	.	κ
5694	5218	.	α
5694	5218	.	a
5694	5218	.	λ
5694	5695	<4s>	<>
5695	179	.	.
5695	180	 	 
5695	179	<~>	<~>
5695	179	<split-s>	<split-s>
5695	179	<split-h>	<split-h>
5695	179	<name2>	<name2>
5695	5540	<name2>	<name>
5695	5670	<>	<name>
5695	183	<aphaerese>	<aphaerese>
5695	5669	<>	<aphaerese>
5695	179	<elision3>	<elision3>
5695	5669	<>	<elision3>
5695	179	<elision2>	<elision2>
5695	5669	<>	<elision2>
5695	179	<elision1>	<elision1>
5695	5669	<>	<elision1>
5695	4828	.	υ
5695	4872	H	υ
5695	4828	.	u
5695	4874	H	u
5695	4828	.	κ
5695	4795	H	U
5695	4828	.	α
5695	4858	H	α
5695	4828	.	a
5695	4863	H	a
5695	4625	H	A
5695	4828	.	λ
5695	5696	<K>	<>
5696	4878	.	.
5696	4878	<~>	<~>
5696	4878	<split-s>	<split-s>
5696	4878	<split-h>	<split-h>
5696	4878	<name2>	<name2>
5696	5430	<name2>	<name>
5696	5671	<>	<name>
5696	4881	<aphaerese>	<aphaerese>
5696	5673	<>	<aphaerese>
5696	4878	<elision3>	<elision3>
5696	5673	<>	<elision3>
5696	4878	<elision2>	<elision2>
5696	5673	<>	<elision2>
5696	4878	<elision1>	<elision1>
5696	5673	<>	<elision1>
5696	4877	.	υ
5696	5020	H	υ
5696	4877	.	u
5696	5029	H	u
5696	4877	.	κ
5696	4998	H	U
5696	4877	.	α
5696	5032	H	α
5696	4877	.	a
5696	5035	H	a
5696	4969	H	A
5696	4877	.	λ
5697	5698	<>	<aphaerese>
5697	5698	<>	<elision3>
5697	5698	<>	<elision2>
5697	5698	<>	<elision1>
5697	5309	<3s>	<>
5698	5699	<>	<name>
5698	5698	<>	<aphaerese>
5698	5698	<>	<elision3>
5698	5698	<>	<elision2>
5698	5698	<>	<elision1>
5698	5310	<3s>	<>
5699	5697	<>	<aphaerese>
5699	5697	<>	<elision3>
5699	5697	<>	<elision2>
5699	5697	<>	<elision1>
5699	5311	<3s>	<>
5700	5701	<>	<aphaerese>
5700	5701	<>	<elision3>
5700	5701	<>	<elision2>
5700	5701	<>	<elision1>
5700	5406	<3s>	<>
5701	5702	<>	<name>
5701	5701	<>	<aphaerese>
5701	5701	<>	<elision3>
5701	5701	<>	<elision2>
5701	5701	<>	<elision1>
5701	5407	<3s>	<>
5702	5700	<>	<aphaerese>
5702	5700	<>	<elision3>
5702	5700	<>	<elision2>
5702	5700	<>	<elision1>
5702	5408	<3s>	<>
5703	5039	.	.
5703	5040	 	 
5703	5039	<~>	<~>
5703	5039	<split-s>	<split-s>
5703	5039	<split-h>	<split-h>
5703	5039	<name2>	<name2>
5703	5704	<>	<name>
5703	5043	<aphaerese>	<aphaerese>
5703	5703	<>	<aphaerese>
5703	5039	<elision3>	<elision3>
5703	5703	<>	<elision3>
5703	5039	<elision2>	<elision2>
5703	5703	<>	<elision2>
5703	5039	<elision1>	<elision1>
5703	5703	<>	<elision1>
5703	5047	.	υ
5703	5053	s	υ
5703	5047	.	u
5703	5053	s	u
5703	5706	.	κ
5703	5629	s	κ
5703	5415	s	k
5703	5424	s	U
5703	5590	s	K
5703	5047	.	α
5703	5053	s	α
5703	5047	.	a
5703	5053	s	a
5703	5545	s	A
5703	5706	.	λ
5703	5629	s	λ
5703	5415	s	l
5703	5603	s	L
5703	5722	<split-h>	<>
5704	5042	.	.
5704	5045	 	 
5704	5042	<~>	<~>
5704	5042	<split-s>	<split-s>
5704	5042	<split-h>	<split-h>
5704	5042	<name2>	<name2>
5704	5589	<aphaerese>	<aphaerese>
5704	5705	<>	<aphaerese>
5704	5042	<elision3>	<elision3>
5704	5705	<>	<elision3>
5704	5042	<elision2>	<elision2>
5704	5705	<>	<elision2>
5704	5042	<elision1>	<elision1>
5704	5705	<>	<elision1>
5704	5049	.	υ
5704	5225	s	υ
5704	5049	.	u
5704	5225	s	u
5704	5708	.	κ
5704	5631	s	κ
5704	5417	s	k
5704	5426	s	U
5704	5592	s	K
5704	5049	.	α
5704	5225	s	α
5704	5049	.	a
5704	5225	s	a
5704	5547	s	A
5704	5708	.	λ
5704	5631	s	λ
5704	5417	s	l
5704	5605	s	L
5704	5723	<split-h>	<>
5705	5039	.	.
5705	5040	 	 
5705	5039	<~>	<~>
5705	5039	<split-s>	<split-s>
5705	5039	<split-h>	<split-h>
5705	5039	<name2>	<name2>
5705	5043	<aphaerese>	<aphaerese>
5705	5703	<>	<aphaerese>
5705	5039	<elision3>	<elision3>
5705	5703	<>	<elision3>
5705	5039	<elision2>	<elision2>
5705	5703	<>	<elision2>
5705	5039	<elision1>	<elision1>
5705	5703	<>	<elision1>
5705	5047	.	υ
5705	5053	s	υ
5705	5047	.	u
5705	5053	s	u
5705	5706	.	κ
5705	5629	s	κ
5705	5415	s	k
5705	5424	s	U
5705	5590	s	K
5705	5047	.	α
5705	5053	s	α
5705	5047	.	a
5705	5053	s	a
5705	5545	s	A
5705	5706	.	λ
5705	5629	s	λ
5705	5415	s	l
5705	5603	s	L
5705	5721	<split-h>	<>
5706	5707	<>	<name>
5706	5706	<>	<aphaerese>
5706	5709	<elision3>	<elision3>
5706	5706	<>	<elision3>
5706	5709	<elision2>	<elision2>
5706	5706	<>	<elision2>
5706	5709	<elision1>	<elision1>
5706	5706	<>	<elision1>
5706	5051	<split-h>	<>
5707	5708	<>	<aphaerese>
5707	5711	<elision3>	<elision3>
5707	5708	<>	<elision3>
5707	5711	<elision2>	<elision2>
5707	5708	<>	<elision2>
5707	5711	<elision1>	<elision1>
5707	5708	<>	<elision1>
5707	5052	<split-h>	<>
5708	5706	<>	<aphaerese>
5708	5709	<elision3>	<elision3>
5708	5706	<>	<elision3>
5708	5709	<elision2>	<elision2>
5708	5706	<>	<elision2>
5708	5709	<elision1>	<elision1>
5708	5706	<>	<elision1>
5708	5050	<split-h>	<>
5709	5709	.	.
5709	5709	 	 
5709	5709	<~>	<~>
5709	5709	<split-s>	<split-s>
5709	5709	<split-h>	<split-h>
5709	5709	<name2>	<name2>
5709	5710	<>	<name>
5709	5712	<aphaerese>	<aphaerese>
5709	5709	<>	<aphaerese>
5709	5709	<elision3>	<elision3>
5709	5709	<>	<elision3>
5709	5709	<elision2>	<elision2>
5709	5709	<>	<elision2>
5709	5709	<elision1>	<elision1>
5709	5709	<>	<elision1>
5709	5706	.	υ
5709	5706	.	u
5709	5715	.	κ
5709	5706	.	α
5709	5706	.	a
5709	5564	<split-h>	<>
5710	5711	.	.
5710	5711	 	 
5710	5711	<~>	<~>
5710	5711	<split-s>	<split-s>
5710	5711	<split-h>	<split-h>
5710	5711	<name2>	<name2>
5710	5714	<aphaerese>	<aphaerese>
5710	5711	<>	<aphaerese>
5710	5711	<elision3>	<elision3>
5710	5711	<>	<elision3>
5710	5711	<elision2>	<elision2>
5710	5711	<>	<elision2>
5710	5711	<elision1>	<elision1>
5710	5711	<>	<elision1>
5710	5708	.	υ
5710	5708	.	u
5710	5717	.	κ
5710	5708	.	α
5710	5708	.	a
5710	5565	<split-h>	<>
5711	5709	.	.
5711	5709	 	 
5711	5709	<~>	<~>
5711	5709	<split-s>	<split-s>
5711	5709	<split-h>	<split-h>
5711	5709	<name2>	<name2>
5711	5712	<aphaerese>	<aphaerese>
5711	5709	<>	<aphaerese>
5711	5709	<elision3>	<elision3>
5711	5709	<>	<elision3>
5711	5709	<elision2>	<elision2>
5711	5709	<>	<elision2>
5711	5709	<elision1>	<elision1>
5711	5709	<>	<elision1>
5711	5706	.	υ
5711	5706	.	u
5711	5715	.	κ
5711	5706	.	α
5711	5706	.	a
5711	5566	<split-h>	<>
5712	5709	.	.
5712	5709	 	 
5712	5709	<~>	<~>
5712	5709	<split-s>	<split-s>
5712	5709	<split-h>	<split-h>
5712	5709	<name2>	<name2>
5712	5713	<>	<name>
5712	5712	<aphaerese>	<aphaerese>
5712	5712	<>	<aphaerese>
5712	5709	<elision3>	<elision3>
5712	5712	<>	<elision3>
5712	5709	<elision2>	<elision2>
5712	5712	<>	<elision2>
5712	5709	<elision1>	<elision1>
5712	5712	<>	<elision1>
5712	5709	.	υ
5712	5709	.	u
5712	5715	.	κ
5712	5709	.	α
5712	5709	.	a
5712	5611	<split-h>	<>
5713	5711	.	.
5713	5711	 	 
5713	5711	<~>	<~>
5713	5711	<split-s>	<split-s>
5713	5711	<split-h>	<split-h>
5713	5711	<name2>	<name2>
5713	5714	<aphaerese>	<aphaerese>
5713	5714	<>	<aphaerese>
5713	5711	<elision3>	<elision3>
5713	5714	<>	<elision3>
5713	5711	<elision2>	<elision2>
5713	5714	<>	<elision2>
5713	5711	<elision1>	<elision1>
5713	5714	<>	<elision1>
5713	5711	.	υ
5713	5711	.	u
5713	5717	.	κ
5713	5711	.	α
5713	5711	.	a
5713	5612	<split-h>	<>
5714	5709	.	.
5714	5709	 	 
5714	5709	<~>	<~>
5714	5709	<split-s>	<split-s>
5714	5709	<split-h>	<split-h>
5714	5709	<name2>	<name2>
5714	5712	<aphaerese>	<aphaerese>
5714	5712	<>	<aphaerese>
5714	5709	<elision3>	<elision3>
5714	5712	<>	<elision3>
5714	5709	<elision2>	<elision2>
5714	5712	<>	<elision2>
5714	5709	<elision1>	<elision1>
5714	5712	<>	<elision1>
5714	5709	.	υ
5714	5709	.	u
5714	5715	.	κ
5714	5709	.	α
5714	5709	.	a
5714	5610	<split-h>	<>
5715	5716	<>	<name>
5715	5715	<>	<aphaerese>
5715	5718	<elision3>	<elision3>
5715	5715	<>	<elision3>
5715	5718	<elision2>	<elision2>
5715	5715	<>	<elision2>
5715	5718	<elision1>	<elision1>
5715	5715	<>	<elision1>
5715	5301	<split-h>	<>
5716	5717	<>	<aphaerese>
5716	5720	<elision3>	<elision3>
5716	5717	<>	<elision3>
5716	5720	<elision2>	<elision2>
5716	5717	<>	<elision2>
5716	5720	<elision1>	<elision1>
5716	5717	<>	<elision1>
5716	5302	<split-h>	<>
5717	5715	<>	<aphaerese>
5717	5718	<elision3>	<elision3>
5717	5715	<>	<elision3>
5717	5718	<elision2>	<elision2>
5717	5715	<>	<elision2>
5717	5718	<elision1>	<elision1>
5717	5715	<>	<elision1>
5717	5300	<split-h>	<>
5718	5719	<>	<name>
5718	5718	<>	<aphaerese>
5718	5718	<>	<elision3>
5718	5718	<>	<elision2>
5718	5718	<>	<elision1>
5718	5298	<split-h>	<>
5719	5720	<>	<aphaerese>
5719	5720	<>	<elision3>
5719	5720	<>	<elision2>
5719	5720	<>	<elision1>
5719	5299	<split-h>	<>
5720	5718	<>	<aphaerese>
5720	5718	<>	<elision3>
5720	5718	<>	<elision2>
5720	5718	<>	<elision1>
5720	5297	<split-h>	<>
5721	5722	<>	<aphaerese>
5721	5722	<>	<elision3>
5721	5722	<>	<elision2>
5721	5722	<>	<elision1>
5721	5418	<3s>	<>
5722	5723	<>	<name>
5722	5722	<>	<aphaerese>
5722	5722	<>	<elision3>
5722	5722	<>	<elision2>
5722	5722	<>	<elision1>
5722	5419	<3s>	<>
5723	5721	<>	<aphaerese>
5723	5721	<>	<elision3>
5723	5721	<>	<elision2>
5723	5721	<>	<elision1>
5723	5420	<3s>	<>
5724	5725	<>	<name>
5724	5724	<>	<aphaerese>
5724	5724	<>	<elision3>
5724	5724	<>	<elision2>
5724	5724	<>	<elision1>
5724	5709	<U2kl>	<>
5725	5726	<>	<aphaerese>
5725	5726	<>	<elision3>
5725	5726	<>	<elision2>
5725	5726	<>	<elision1>
5725	5710	<U2kl>	<>
5726	5724	<>	<aphaerese>
5726	5724	<>	<elision3>
5726	5724	<>	<elision2>
5726	5724	<>	<elision1>
5726	5711	<U2kl>	<>
5727	5728	<name>	<name>
5727	5730	<>	<name>
5727	5732	<>	<aphaerese>
5727	5732	<>	<elision3>
5727	5732	<>	<elision2>
5727	5732	<>	<elision1>
5727	5775	<split-h>	<>
5727	5733	<A2kl>	<>
5727	5751	<L2kl>	<>
5727	5776	<K2kl>	<>
5728	5592	s	k
5728	5605	s	l
5728	5729	<split-h>	<>
5729	5429	<3s>	<>
5730	5731	<>	<aphaerese>
5730	5731	<>	<elision3>
5730	5731	<>	<elision2>
5730	5731	<>	<elision1>
5730	5734	<A2kl>	<>
5730	5752	<L2kl>	<>
5730	5770	<K2kl>	<>
5731	5732	<>	<aphaerese>
5731	5732	<>	<elision3>
5731	5732	<>	<elision2>
5731	5732	<>	<elision1>
5731	5735	<A2kl>	<>
5731	5753	<L2kl>	<>
5731	5771	<K2kl>	<>
5732	5730	<>	<name>
5732	5732	<>	<aphaerese>
5732	5732	<>	<elision3>
5732	5732	<>	<elision2>
5732	5732	<>	<elision1>
5732	5733	<A2kl>	<>
5732	5751	<L2kl>	<>
5732	5769	<K2kl>	<>
5733	5734	<>	<name>
5733	5733	<>	<aphaerese>
5733	5733	<>	<elision3>
5733	5733	<>	<elision2>
5733	5733	<>	<elision1>
5733	5736	.	κ
5733	5736	.	λ
5733	5749	<split-h>	<>
5734	5735	<>	<aphaerese>
5734	5735	<>	<elision3>
5734	5735	<>	<elision2>
5734	5735	<>	<elision1>
5734	5738	.	κ
5734	5738	.	λ
5734	5750	<split-h>	<>
5735	5733	<>	<aphaerese>
5735	5733	<>	<elision3>
5735	5733	<>	<elision2>
5735	5733	<>	<elision1>
5735	5736	.	κ
5735	5736	.	λ
5735	5748	<split-h>	<>
5736	5737	<>	<name>
5736	5736	<>	<aphaerese>
5736	5739	<elision3>	<elision3>
5736	5736	<>	<elision3>
5736	5739	<elision2>	<elision2>
5736	5736	<>	<elision2>
5736	5739	<elision1>	<elision1>
5736	5736	<>	<elision1>
5736	5746	<split-h>	<>
5737	5738	<>	<aphaerese>
5737	5741	<elision3>	<elision3>
5737	5738	<>	<elision3>
5737	5741	<elision2>	<elision2>
5737	5738	<>	<elision2>
5737	5741	<elision1>	<elision1>
5737	5738	<>	<elision1>
5737	5747	<split-h>	<>
5738	5736	<>	<aphaerese>
5738	5739	<elision3>	<elision3>
5738	5736	<>	<elision3>
5738	5739	<elision2>	<elision2>
5738	5736	<>	<elision2>
5738	5739	<elision1>	<elision1>
5738	5736	<>	<elision1>
5738	5745	<split-h>	<>
5739	5709	.	.
5739	5709	 	 
5739	5709	<~>	<~>
5739	5709	<split-s>	<split-s>
5739	5709	<split-h>	<split-h>
5739	5709	<name2>	<name2>
5739	5740	<>	<name>
5739	5712	<aphaerese>	<aphaerese>
5739	5739	<>	<aphaerese>
5739	5709	<elision3>	<elision3>
5739	5739	<>	<elision3>
5739	5709	<elision2>	<elision2>
5739	5739	<>	<elision2>
5739	5709	<elision1>	<elision1>
5739	5739	<>	<elision1>
5739	5706	.	υ
5739	5706	.	u
5739	5706	.	α
5739	5706	.	a
5739	5743	<split-h>	<>
5740	5711	.	.
5740	5711	 	 
5740	5711	<~>	<~>
5740	5711	<split-s>	<split-s>
5740	5711	<split-h>	<split-h>
5740	5711	<name2>	<name2>
5740	5714	<aphaerese>	<aphaerese>
5740	5741	<>	<aphaerese>
5740	5711	<elision3>	<elision3>
5740	5741	<>	<elision3>
5740	5711	<elision2>	<elision2>
5740	5741	<>	<elision2>
5740	5711	<elision1>	<elision1>
5740	5741	<>	<elision1>
5740	5708	.	υ
5740	5708	.	u
5740	5708	.	α
5740	5708	.	a
5740	5744	<split-h>	<>
5741	5709	.	.
5741	5709	 	 
5741	5709	<~>	<~>
5741	5709	<split-s>	<split-s>
5741	5709	<split-h>	<split-h>
5741	5709	<name2>	<name2>
5741	5712	<aphaerese>	<aphaerese>
5741	5739	<>	<aphaerese>
5741	5709	<elision3>	<elision3>
5741	5739	<>	<elision3>
5741	5709	<elision2>	<elision2>
5741	5739	<>	<elision2>
5741	5709	<elision1>	<elision1>
5741	5739	<>	<elision1>
5741	5706	.	υ
5741	5706	.	u
5741	5706	.	α
5741	5706	.	a
5741	5742	<split-h>	<>
5742	5743	<>	<aphaerese>
5742	5743	<>	<elision3>
5742	5743	<>	<elision2>
5742	5743	<>	<elision1>
5742	5443	<3s>	<>
5743	5744	<>	<name>
5743	5743	<>	<aphaerese>
5743	5743	<>	<elision3>
5743	5743	<>	<elision2>
5743	5743	<>	<elision1>
5743	5444	<3s>	<>
5744	5742	<>	<aphaerese>
5744	5742	<>	<elision3>
5744	5742	<>	<elision2>
5744	5742	<>	<elision1>
5744	5445	<3s>	<>
5745	5746	<>	<aphaerese>
5745	5746	<>	<elision3>
5745	5746	<>	<elision2>
5745	5746	<>	<elision1>
5745	5479	<3s>	<>
5746	5747	<>	<name>
5746	5746	<>	<aphaerese>
5746	5746	<>	<elision3>
5746	5746	<>	<elision2>
5746	5746	<>	<elision1>
5746	5480	<3s>	<>
5747	5745	<>	<aphaerese>
5747	5745	<>	<elision3>
5747	5745	<>	<elision2>
5747	5745	<>	<elision1>
5747	5481	<3s>	<>
5748	5749	<>	<aphaerese>
5748	5749	<>	<elision3>
5748	5749	<>	<elision2>
5748	5749	<>	<elision1>
5748	5488	<3s>	<>
5749	5750	<>	<name>
5749	5749	<>	<aphaerese>
5749	5749	<>	<elision3>
5749	5749	<>	<elision2>
5749	5749	<>	<elision1>
5749	5489	<3s>	<>
5750	5748	<>	<aphaerese>
5750	5748	<>	<elision3>
5750	5748	<>	<elision2>
5750	5748	<>	<elision1>
5750	5490	<3s>	<>
5751	5752	<>	<name>
5751	5751	<>	<aphaerese>
5751	5751	<>	<elision3>
5751	5751	<>	<elision2>
5751	5751	<>	<elision1>
5751	5754	.	κ
5751	5754	.	λ
5751	5767	<split-h>	<>
5752	5753	<>	<aphaerese>
5752	5753	<>	<elision3>
5752	5753	<>	<elision2>
5752	5753	<>	<elision1>
5752	5756	.	κ
5752	5756	.	λ
5752	5768	<split-h>	<>
5753	5751	<>	<aphaerese>
5753	5751	<>	<elision3>
5753	5751	<>	<elision2>
5753	5751	<>	<elision1>
5753	5754	.	κ
5753	5754	.	λ
5753	5766	<split-h>	<>
5754	5755	<>	<name>
5754	5754	<>	<aphaerese>
5754	5757	<elision3>	<elision3>
5754	5754	<>	<elision3>
5754	5757	<elision2>	<elision2>
5754	5754	<>	<elision2>
5754	5757	<elision1>	<elision1>
5754	5754	<>	<elision1>
5754	5764	<split-h>	<>
5755	5756	<>	<aphaerese>
5755	5759	<elision3>	<elision3>
5755	5756	<>	<elision3>
5755	5759	<elision2>	<elision2>
5755	5756	<>	<elision2>
5755	5759	<elision1>	<elision1>
5755	5756	<>	<elision1>
5755	5765	<split-h>	<>
5756	5754	<>	<aphaerese>
5756	5757	<elision3>	<elision3>
5756	5754	<>	<elision3>
5756	5757	<elision2>	<elision2>
5756	5754	<>	<elision2>
5756	5757	<elision1>	<elision1>
5756	5754	<>	<elision1>
5756	5763	<split-h>	<>
5757	5758	<>	<name>
5757	5757	<>	<aphaerese>
5757	5757	<>	<elision3>
5757	5757	<>	<elision2>
5757	5757	<>	<elision1>
5757	5715	.	κ
5757	5761	<split-h>	<>
5758	5759	<>	<aphaerese>
5758	5759	<>	<elision3>
5758	5759	<>	<elision2>
5758	5759	<>	<elision1>
5758	5717	.	κ
5758	5762	<split-h>	<>
5759	5757	<>	<aphaerese>
5759	5757	<>	<elision3>
5759	5757	<>	<elision2>
5759	5757	<>	<elision1>
5759	5715	.	κ
5759	5760	<split-h>	<>
5760	5761	<>	<aphaerese>
5760	5761	<>	<elision3>
5760	5761	<>	<elision2>
5760	5761	<>	<elision1>
5760	5506	<3s>	<>
5761	5762	<>	<name>
5761	5761	<>	<aphaerese>
5761	5761	<>	<elision3>
5761	5761	<>	<elision2>
5761	5761	<>	<elision1>
5761	5507	<3s>	<>
5762	5760	<>	<aphaerese>
5762	5760	<>	<elision3>
5762	5760	<>	<elision2>
5762	5760	<>	<elision1>
5762	5508	<3s>	<>
5763	5764	<>	<aphaerese>
5763	5764	<>	<elision3>
5763	5764	<>	<elision2>
5763	5764	<>	<elision1>
5763	5512	<3s>	<>
5764	5765	<>	<name>
5764	5764	<>	<aphaerese>
5764	5764	<>	<elision3>
5764	5764	<>	<elision2>
5764	5764	<>	<elision1>
5764	5513	<3s>	<>
5765	5763	<>	<aphaerese>
5765	5763	<>	<elision3>
5765	5763	<>	<elision2>
5765	5763	<>	<elision1>
5765	5514	<3s>	<>
5766	5767	<>	<aphaerese>
5766	5767	<>	<elision3>
5766	5767	<>	<elision2>
5766	5767	<>	<elision1>
5766	5521	<3s>	<>
5767	5768	<>	<name>
5767	5767	<>	<aphaerese>
5767	5767	<>	<elision3>
5767	5767	<>	<elision2>
5767	5767	<>	<elision1>
5767	5522	<3s>	<>
5768	5766	<>	<aphaerese>
5768	5766	<>	<elision3>
5768	5766	<>	<elision2>
5768	5766	<>	<elision1>
5768	5523	<3s>	<>
5769	5709	.	.
5769	5709	 	 
5769	5709	<~>	<~>
5769	5709	<split-s>	<split-s>
5769	5709	<split-h>	<split-h>
5769	5709	<name2>	<name2>
5769	5770	<>	<name>
5769	5712	<aphaerese>	<aphaerese>
5769	5769	<>	<aphaerese>
5769	5709	<elision3>	<elision3>
5769	5769	<>	<elision3>
5769	5709	<elision2>	<elision2>
5769	5769	<>	<elision2>
5769	5709	<elision1>	<elision1>
5769	5769	<>	<elision1>
5769	5706	.	υ
5769	5706	.	u
5769	5706	.	α
5769	5706	.	a
5769	5773	<split-h>	<>
5770	5711	.	.
5770	5711	 	 
5770	5711	<~>	<~>
5770	5711	<split-s>	<split-s>
5770	5711	<split-h>	<split-h>
5770	5711	<name2>	<name2>
5770	5714	<aphaerese>	<aphaerese>
5770	5771	<>	<aphaerese>
5770	5711	<elision3>	<elision3>
5770	5771	<>	<elision3>
5770	5711	<elision2>	<elision2>
5770	5771	<>	<elision2>
5770	5711	<elision1>	<elision1>
5770	5771	<>	<elision1>
5770	5708	.	υ
5770	5708	.	u
5770	5708	.	α
5770	5708	.	a
5770	5774	<split-h>	<>
5771	5709	.	.
5771	5709	 	 
5771	5709	<~>	<~>
5771	5709	<split-s>	<split-s>
5771	5709	<split-h>	<split-h>
5771	5709	<name2>	<name2>
5771	5712	<aphaerese>	<aphaerese>
5771	5769	<>	<aphaerese>
5771	5709	<elision3>	<elision3>
5771	5769	<>	<elision3>
5771	5709	<elision2>	<elision2>
5771	5769	<>	<elision2>
5771	5709	<elision1>	<elision1>
5771	5769	<>	<elision1>
5771	5706	.	υ
5771	5706	.	u
5771	5706	.	α
5771	5706	.	a
5771	5772	<split-h>	<>
5772	5773	<>	<aphaerese>
5772	5773	<>	<elision3>
5772	5773	<>	<elision2>
5772	5773	<>	<elision1>
5772	5533	<3s>	<>
5773	5774	<>	<name>
5773	5773	<>	<aphaerese>
5773	5773	<>	<elision3>
5773	5773	<>	<elision2>
5773	5773	<>	<elision1>
5773	5534	<3s>	<>
5774	5772	<>	<aphaerese>
5774	5772	<>	<elision3>
5774	5772	<>	<elision2>
5774	5772	<>	<elision1>
5774	5535	<3s>	<>
5775	5539	<3s>	<>
5776	5709	.	.
5776	5709	 	 
5776	5709	<~>	<~>
5776	5709	<split-s>	<split-s>
5776	5709	<split-h>	<split-h>
5776	5709	<name2>	<name2>
5776	5777	<name2>	<name>
5776	5770	<>	<name>
5776	5712	<aphaerese>	<aphaerese>
5776	5769	<>	<aphaerese>
5776	5709	<elision3>	<elision3>
5776	5769	<>	<elision3>
5776	5709	<elision2>	<elision2>
5776	5769	<>	<elision2>
5776	5709	<elision1>	<elision1>
5776	5769	<>	<elision1>
5776	5706	.	υ
5776	5706	.	u
5776	5706	.	α
5776	5706	.	a
5776	5778	<split-h>	<>
5777	5729	<split-h>	<>
5778	5774	<>	<name>
5778	5773	<>	<aphaerese>
5778	5773	<>	<elision3>
5778	5773	<>	<elision2>
5778	5773	<>	<elision1>
5778	5543	<3s>	<>
5779	5709	.	.
5779	5709	 	 
5779	5709	<~>	<~>
5779	5709	<split-s>	<split-s>
5779	5709	<split-h>	<split-h>
5779	5709	<name2>	<name2>
5779	5780	<>	<name>
5779	5712	<aphaerese>	<aphaerese>
5779	5779	<>	<aphaerese>
5779	5779	<>	<elision3>
5779	5779	<>	<elision2>
5779	5779	<>	<elision1>
5779	5706	.	υ
5779	5706	.	u
5779	5715	.	κ
5779	5706	.	α
5779	5706	.	a
5779	5618	<split-h>	<>
5780	5711	.	.
5780	5711	 	 
5780	5711	<~>	<~>
5780	5711	<split-s>	<split-s>
5780	5711	<split-h>	<split-h>
5780	5711	<name2>	<name2>
5780	5714	<aphaerese>	<aphaerese>
5780	5781	<>	<aphaerese>
5780	5781	<>	<elision3>
5780	5781	<>	<elision2>
5780	5781	<>	<elision1>
5780	5708	.	υ
5780	5708	.	u
5780	5717	.	κ
5780	5708	.	α
5780	5708	.	a
5780	5619	<split-h>	<>
5781	5709	.	.
5781	5709	 	 
5781	5709	<~>	<~>
5781	5709	<split-s>	<split-s>
5781	5709	<split-h>	<split-h>
5781	5709	<name2>	<name2>
5781	5712	<aphaerese>	<aphaerese>
5781	5779	<>	<aphaerese>
5781	5779	<>	<elision3>
5781	5779	<>	<elision2>
5781	5779	<>	<elision1>
5781	5706	.	υ
5781	5706	.	u
5781	5715	.	κ
5781	5706	.	α
5781	5706	.	a
5781	5617	<split-h>	<>
5782	5783	<>	<name>
5782	5782	<>	<aphaerese>
5782	5782	<>	<elision3>
5782	5782	<>	<elision2>
5782	5782	<>	<elision1>
5782	5709	<A2kl>	<>
5783	5784	<>	<aphaerese>
5783	5784	<>	<elision3>
5783	5784	<>	<elision2>
5783	5784	<>	<elision1>
5783	5710	<A2kl>	<>
5784	5782	<>	<aphaerese>
5784	5782	<>	<elision3>
5784	5782	<>	<elision2>
5784	5782	<>	<elision1>
5784	5711	<A2kl>	<>
5785	5039	.	.
5785	5040	 	 
5785	5039	<~>	<~>
5785	5039	<split-s>	<split-s>
5785	5039	<split-h>	<split-h>
5785	5039	<name2>	<name2>
5785	5786	<>	<name>
5785	5043	<aphaerese>	<aphaerese>
5785	5785	<>	<aphaerese>
5785	5039	<elision3>	<elision3>
5785	5785	<>	<elision3>
5785	5039	<elision2>	<elision2>
5785	5785	<>	<elision2>
5785	5039	<elision1>	<elision1>
5785	5785	<>	<elision1>
5785	5047	.	υ
5785	5053	s	υ
5785	5047	.	u
5785	5053	s	u
5785	5047	.	κ
5785	5629	s	κ
5785	5415	s	k
5785	5424	s	U
5785	5590	s	K
5785	5047	.	α
5785	5053	s	α
5785	5047	.	a
5785	5053	s	a
5785	5545	s	A
5785	5047	.	λ
5785	5629	s	λ
5785	5415	s	l
5785	5603	s	L
5785	5722	<split-h>	<>
5786	5042	.	.
5786	5045	 	 
5786	5042	<~>	<~>
5786	5042	<split-s>	<split-s>
5786	5042	<split-h>	<split-h>
5786	5042	<name2>	<name2>
5786	5589	<aphaerese>	<aphaerese>
5786	5787	<>	<aphaerese>
5786	5042	<elision3>	<elision3>
5786	5787	<>	<elision3>
5786	5042	<elision2>	<elision2>
5786	5787	<>	<elision2>
5786	5042	<elision1>	<elision1>
5786	5787	<>	<elision1>
5786	5049	.	υ
5786	5225	s	υ
5786	5049	.	u
5786	5225	s	u
5786	5049	.	κ
5786	5631	s	κ
5786	5417	s	k
5786	5426	s	U
5786	5592	s	K
5786	5049	.	α
5786	5225	s	α
5786	5049	.	a
5786	5225	s	a
5786	5547	s	A
5786	5049	.	λ
5786	5631	s	λ
5786	5417	s	l
5786	5605	s	L
5786	5723	<split-h>	<>
5787	5039	.	.
5787	5040	 	 
5787	5039	<~>	<~>
5787	5039	<split-s>	<split-s>
5787	5039	<split-h>	<split-h>
5787	5039	<name2>	<name2>
5787	5043	<aphaerese>	<aphaerese>
5787	5785	<>	<aphaerese>
5787	5039	<elision3>	<elision3>
5787	5785	<>	<elision3>
5787	5039	<elision2>	<elision2>
5787	5785	<>	<elision2>
5787	5039	<elision1>	<elision1>
5787	5785	<>	<elision1>
5787	5047	.	υ
5787	5053	s	υ
5787	5047	.	u
5787	5053	s	u
5787	5047	.	κ
5787	5629	s	κ
5787	5415	s	k
5787	5424	s	U
5787	5590	s	K
5787	5047	.	α
5787	5053	s	α
5787	5047	.	a
5787	5053	s	a
5787	5545	s	A
5787	5047	.	λ
5787	5629	s	λ
5787	5415	s	l
5787	5603	s	L
5787	5721	<split-h>	<>
5788	5709	.	.
5788	5709	 	 
5788	5709	<~>	<~>
5788	5709	<split-s>	<split-s>
5788	5709	<split-h>	<split-h>
5788	5709	<name2>	<name2>
5788	5789	<>	<name>
5788	5712	<aphaerese>	<aphaerese>
5788	5788	<>	<aphaerese>
5788	5709	<elision3>	<elision3>
5788	5788	<>	<elision3>
5788	5709	<elision2>	<elision2>
5788	5788	<>	<elision2>
5788	5709	<elision1>	<elision1>
5788	5788	<>	<elision1>
5788	5706	.	υ
5788	5706	.	u
5788	5706	.	κ
5788	5706	.	α
5788	5706	.	a
5788	5706	.	λ
5788	5722	<split-h>	<>
5789	5711	.	.
5789	5711	 	 
5789	5711	<~>	<~>
5789	5711	<split-s>	<split-s>
5789	5711	<split-h>	<split-h>
5789	5711	<name2>	<name2>
5789	5714	<aphaerese>	<aphaerese>
5789	5790	<>	<aphaerese>
5789	5711	<elision3>	<elision3>
5789	5790	<>	<elision3>
5789	5711	<elision2>	<elision2>
5789	5790	<>	<elision2>
5789	5711	<elision1>	<elision1>
5789	5790	<>	<elision1>
5789	5708	.	υ
5789	5708	.	u
5789	5708	.	κ
5789	5708	.	α
5789	5708	.	a
5789	5708	.	λ
5789	5723	<split-h>	<>
5790	5709	.	.
5790	5709	 	 
5790	5709	<~>	<~>
5790	5709	<split-s>	<split-s>
5790	5709	<split-h>	<split-h>
5790	5709	<name2>	<name2>
5790	5712	<aphaerese>	<aphaerese>
5790	5788	<>	<aphaerese>
5790	5709	<elision3>	<elision3>
5790	5788	<>	<elision3>
5790	5709	<elision2>	<elision2>
5790	5788	<>	<elision2>
5790	5709	<elision1>	<elision1>
5790	5788	<>	<elision1>
5790	5706	.	υ
5790	5706	.	u
5790	5706	.	κ
5790	5706	.	α
5790	5706	.	a
5790	5706	.	λ
5790	5721	<split-h>	<>
5791	5777	<name>	<name>
5791	5792	<>	<name>
5791	5794	<>	<aphaerese>
5791	5794	<>	<elision3>
5791	5794	<>	<elision2>
5791	5794	<>	<elision1>
5791	5775	<split-h>	<>
5791	5733	<A2kl>	<>
5791	5801	<L2kl>	<>
5792	5793	<>	<aphaerese>
5792	5793	<>	<elision3>
5792	5793	<>	<elision2>
5792	5793	<>	<elision1>
5792	5734	<A2kl>	<>
5792	5796	<L2kl>	<>
5793	5794	<>	<aphaerese>
5793	5794	<>	<elision3>
5793	5794	<>	<elision2>
5793	5794	<>	<elision1>
5793	5735	<A2kl>	<>
5793	5797	<L2kl>	<>
5794	5792	<>	<name>
5794	5794	<>	<aphaerese>
5794	5794	<>	<elision3>
5794	5794	<>	<elision2>
5794	5794	<>	<elision1>
5794	5733	<A2kl>	<>
5794	5795	<L2kl>	<>
5795	5709	.	.
5795	5709	 	 
5795	5709	<~>	<~>
5795	5709	<split-s>	<split-s>
5795	5709	<split-h>	<split-h>
5795	5709	<name2>	<name2>
5795	5796	<>	<name>
5795	5712	<aphaerese>	<aphaerese>
5795	5795	<>	<aphaerese>
5795	5709	<elision3>	<elision3>
5795	5795	<>	<elision3>
5795	5709	<elision2>	<elision2>
5795	5795	<>	<elision2>
5795	5709	<elision1>	<elision1>
5795	5795	<>	<elision1>
5795	5706	.	υ
5795	5706	.	u
5795	5754	.	κ
5795	5706	.	α
5795	5706	.	a
5795	5754	.	λ
5795	5799	<split-h>	<>
5796	5711	.	.
5796	5711	 	 
5796	5711	<~>	<~>
5796	5711	<split-s>	<split-s>
5796	5711	<split-h>	<split-h>
5796	5711	<name2>	<name2>
5796	5714	<aphaerese>	<aphaerese>
5796	5797	<>	<aphaerese>
5796	5711	<elision3>	<elision3>
5796	5797	<>	<elision3>
5796	5711	<elision2>	<elision2>
5796	5797	<>	<elision2>
5796	5711	<elision1>	<elision1>
5796	5797	<>	<elision1>
5796	5708	.	υ
5796	5708	.	u
5796	5756	.	κ
5796	5708	.	α
5796	5708	.	a
5796	5756	.	λ
5796	5800	<split-h>	<>
5797	5709	.	.
5797	5709	 	 
5797	5709	<~>	<~>
5797	5709	<split-s>	<split-s>
5797	5709	<split-h>	<split-h>
5797	5709	<name2>	<name2>
5797	5712	<aphaerese>	<aphaerese>
5797	5795	<>	<aphaerese>
5797	5709	<elision3>	<elision3>
5797	5795	<>	<elision3>
5797	5709	<elision2>	<elision2>
5797	5795	<>	<elision2>
5797	5709	<elision1>	<elision1>
5797	5795	<>	<elision1>
5797	5706	.	υ
5797	5706	.	u
5797	5754	.	κ
5797	5706	.	α
5797	5706	.	a
5797	5754	.	λ
5797	5798	<split-h>	<>
5798	5799	<>	<aphaerese>
5798	5799	<>	<elision3>
5798	5799	<>	<elision2>
5798	5799	<>	<elision1>
5798	5555	<3s>	<>
5799	5800	<>	<name>
5799	5799	<>	<aphaerese>
5799	5799	<>	<elision3>
5799	5799	<>	<elision2>
5799	5799	<>	<elision1>
5799	5556	<3s>	<>
5800	5798	<>	<aphaerese>
5800	5798	<>	<elision3>
5800	5798	<>	<elision2>
5800	5798	<>	<elision1>
5800	5557	<3s>	<>
5801	5709	.	.
5801	5709	 	 
5801	5709	<~>	<~>
5801	5709	<split-s>	<split-s>
5801	5709	<split-h>	<split-h>
5801	5709	<name2>	<name2>
5801	5777	<name2>	<name>
5801	5796	<>	<name>
5801	5712	<aphaerese>	<aphaerese>
5801	5795	<>	<aphaerese>
5801	5709	<elision3>	<elision3>
5801	5795	<>	<elision3>
5801	5709	<elision2>	<elision2>
5801	5795	<>	<elision2>
5801	5709	<elision1>	<elision1>
5801	5795	<>	<elision1>
5801	5706	.	υ
5801	5706	.	u
5801	5754	.	κ
5801	5706	.	α
5801	5706	.	a
5801	5754	.	λ
5801	5802	<split-h>	<>
5802	5800	<>	<name>
5802	5799	<>	<aphaerese>
5802	5799	<>	<elision3>
5802	5799	<>	<elision2>
5802	5799	<>	<elision1>
5802	5562	<3s>	<>
5803	5039	.	.
5803	5040	 	 
5803	5039	<~>	<~>
5803	5039	<split-s>	<split-s>
5803	5039	<split-h>	<split-h>
5803	5039	<name2>	<name2>
5803	5615	<>	<name>
5803	5043	<aphaerese>	<aphaerese>
5803	5038	<>	<aphaerese>
5803	5038	<>	<elision3>
5803	5038	<>	<elision2>
5803	5038	<>	<elision1>
5803	5047	.	υ
5803	5053	s	υ
5803	5047	.	u
5803	5053	s	u
5803	5232	.	κ
5803	5303	s	κ
5803	5415	s	k
5803	5424	s	U
5803	5590	s	K
5803	5047	.	α
5803	5053	s	α
5803	5047	.	a
5803	5053	s	a
5803	5545	s	A
5803	5415	s	λ
5803	5415	s	l
5803	5603	s	L
5803	5804	<split-h>	<>
5804	5619	<>	<name>
5804	5618	<>	<aphaerese>
5804	5618	<>	<elision3>
5804	5618	<>	<elision2>
5804	5618	<>	<elision1>
5804	5568	<3s>	<>
5805	5039	.	.
5805	5040	 	 
5805	5039	<~>	<~>
5805	5039	<split-s>	<split-s>
5805	5039	<split-h>	<split-h>
5805	5039	<name2>	<name2>
5805	5651	<>	<name>
5805	5043	<aphaerese>	<aphaerese>
5805	5650	<>	<aphaerese>
5805	5653	<elision3>	<elision3>
5805	5650	<>	<elision3>
5805	5653	<elision2>	<elision2>
5805	5650	<>	<elision2>
5805	5653	<elision1>	<elision1>
5805	5650	<>	<elision1>
5805	5047	.	υ
5805	5053	s	υ
5805	5047	.	u
5805	5053	s	u
5805	5047	.	κ
5805	5629	s	κ
5805	5415	s	k
5805	5424	s	U
5805	5590	s	K
5805	5047	.	α
5805	5053	s	α
5805	5047	.	a
5805	5053	s	a
5805	5545	s	A
5805	5047	.	λ
5805	5629	s	λ
5805	5415	s	l
5805	5603	s	L
5805	5806	<split-h>	<>
5806	5702	<>	<name>
5806	5701	<>	<aphaerese>
5806	5701	<>	<elision3>
5806	5701	<>	<elision2>
5806	5701	<>	<elision1>
5806	5571	<3s>	<>
5807	5039	.	.
5807	5040	 	 
5807	5039	<~>	<~>
5807	5039	<split-s>	<split-s>
5807	5039	<split-h>	<split-h>
5807	5039	<name2>	<name2>
5807	5704	<>	<name>
5807	5043	<aphaerese>	<aphaerese>
5807	5703	<>	<aphaerese>
5807	5039	<elision3>	<elision3>
5807	5703	<>	<elision3>
5807	5039	<elision2>	<elision2>
5807	5703	<>	<elision2>
5807	5039	<elision1>	<elision1>
5807	5703	<>	<elision1>
5807	5047	.	υ
5807	5053	s	υ
5807	5047	.	u
5807	5053	s	u
5807	5706	.	κ
5807	5629	s	κ
5807	5415	s	k
5807	5424	s	U
5807	5590	s	K
5807	5047	.	α
5807	5053	s	α
5807	5047	.	a
5807	5053	s	a
5807	5545	s	A
5807	5706	.	λ
5807	5629	s	λ
5807	5415	s	l
5807	5603	s	L
5807	5808	<split-h>	<>
5808	5723	<>	<name>
5808	5722	<>	<aphaerese>
5808	5722	<>	<elision3>
5808	5722	<>	<elision2>
5808	5722	<>	<elision1>
5808	5574	<3s>	<>
5809	5725	<>	<name>
5809	5724	<>	<aphaerese>
5809	5724	<>	<elision3>
5809	5724	<>	<elision2>
5809	5724	<>	<elision1>
5809	5810	<U2kl>	<>
5810	5709	.	.
5810	5709	 	 
5810	5709	<~>	<~>
5810	5709	<split-s>	<split-s>
5810	5709	<split-h>	<split-h>
5810	5709	<name2>	<name2>
5810	5710	<>	<name>
5810	5712	<aphaerese>	<aphaerese>
5810	5709	<>	<aphaerese>
5810	5709	<elision3>	<elision3>
5810	5709	<>	<elision3>
5810	5709	<elision2>	<elision2>
5810	5709	<>	<elision2>
5810	5709	<elision1>	<elision1>
5810	5709	<>	<elision1>
5810	5706	.	υ
5810	5706	.	u
5810	5715	.	κ
5810	5706	.	α
5810	5706	.	a
5810	5811	<split-h>	<>
5811	5565	<>	<name>
5811	5564	<>	<aphaerese>
5811	5564	<>	<elision3>
5811	5564	<>	<elision2>
5811	5564	<>	<elision1>
5811	5578	<3s>	<>
5812	5728	<name>	<name>
5812	5730	<>	<name>
5812	5732	<>	<aphaerese>
5812	5732	<>	<elision3>
5812	5732	<>	<elision2>
5812	5732	<>	<elision1>
5812	5775	<split-h>	<>
5812	5733	<A2kl>	<>
5812	5751	<L2kl>	<>
5812	5813	<K2kl>	<>
5813	5709	.	.
5813	5709	 	 
5813	5709	<~>	<~>
5813	5709	<split-s>	<split-s>
5813	5709	<split-h>	<split-h>
5813	5709	<name2>	<name2>
5813	5777	<name2>	<name>
5813	5770	<>	<name>
5813	5712	<aphaerese>	<aphaerese>
5813	5769	<>	<aphaerese>
5813	5709	<elision3>	<elision3>
5813	5769	<>	<elision3>
5813	5709	<elision2>	<elision2>
5813	5769	<>	<elision2>
5813	5709	<elision1>	<elision1>
5813	5769	<>	<elision1>
5813	5706	.	υ
5813	5706	.	u
5813	5706	.	α
5813	5706	.	a
5813	5814	<split-h>	<>
5814	5774	<>	<name>
5814	5773	<>	<aphaerese>
5814	5773	<>	<elision3>
5814	5773	<>	<elision2>
5814	5773	<>	<elision1>
5814	5582	<3s>	<>
5815	5709	.	.
5815	5709	 	 
5815	5709	<~>	<~>
5815	5709	<split-s>	<split-s>
5815	5709	<split-h>	<split-h>
5815	5709	<name2>	<name2>
5815	5780	<>	<name>
5815	5712	<aphaerese>	<aphaerese>
5815	5779	<>	<aphaerese>
5815	5779	<>	<elision3>
5815	5779	<>	<elision2>
5815	5779	<>	<elision1>
5815	5706	.	υ
5815	5706	.	u
5815	5715	.	κ
5815	5706	.	α
5815	5706	.	a
5815	5804	<split-h>	<>
5816	5783	<>	<name>
5816	5782	<>	<aphaerese>
5816	5782	<>	<elision3>
5816	5782	<>	<elision2>
5816	5782	<>	<elision1>
5816	5810	<A2kl>	<>
5817	5039	.	.
5817	5040	 	 
5817	5039	<~>	<~>
5817	5039	<split-s>	<split-s>
5817	5039	<split-h>	<split-h>
5817	5039	<name2>	<name2>
5817	5786	<>	<name>
5817	5043	<aphaerese>	<aphaerese>
5817	5785	<>	<aphaerese>
5817	5039	<elision3>	<elision3>
5817	5785	<>	<elision3>
5817	5039	<elision2>	<elision2>
5817	5785	<>	<elision2>
5817	5039	<elision1>	<elision1>
5817	5785	<>	<elision1>
5817	5047	.	υ
5817	5053	s	υ
5817	5047	.	u
5817	5053	s	u
5817	5047	.	κ
5817	5629	s	κ
5817	5415	s	k
5817	5424	s	U
5817	5590	s	K
5817	5047	.	α
5817	5053	s	α
5817	5047	.	a
5817	5053	s	a
5817	5545	s	A
5817	5047	.	λ
5817	5629	s	λ
5817	5415	s	l
5817	5603	s	L
5817	5808	<split-h>	<>
5818	5709	.	.
5818	5709	 	 
5818	5709	<~>	<~>
5818	5709	<split-s>	<split-s>
5818	5709	<split-h>	<split-h>
5818	5709	<name2>	<name2>
5818	5789	<>	<name>
5818	5712	<aphaerese>	<aphaerese>
5818	5788	<>	<aphaerese>
5818	5709	<elision3>	<elision3>
5818	5788	<>	<elision3>
5818	5709	<elision2>	<elision2>
5818	5788	<>	<elision2>
5818	5709	<elision1>	<elision1>
5818	5788	<>	<elision1>
5818	5706	.	υ
5818	5706	.	u
5818	5706	.	κ
5818	5706	.	α
5818	5706	.	a
5818	5706	.	λ
5818	5808	<split-h>	<>
5819	5777	<name>	<name>
5819	5792	<>	<name>
5819	5794	<>	<aphaerese>
5819	5794	<>	<elision3>
5819	5794	<>	<elision2>
5819	5794	<>	<elision1>
5819	5775	<split-h>	<>
5819	5733	<A2kl>	<>
5819	5820	<L2kl>	<>
5820	5709	.	.
5820	5709	 	 
5820	5709	<~>	<~>
5820	5709	<split-s>	<split-s>
5820	5709	<split-h>	<split-h>
5820	5709	<name2>	<name2>
5820	5777	<name2>	<name>
5820	5796	<>	<name>
5820	5712	<aphaerese>	<aphaerese>
5820	5795	<>	<aphaerese>
5820	5709	<elision3>	<elision3>
5820	5795	<>	<elision3>
5820	5709	<elision2>	<elision2>
5820	5795	<>	<elision2>
5820	5709	<elision1>	<elision1>
5820	5795	<>	<elision1>
5820	5706	.	υ
5820	5706	.	u
5820	5754	.	κ
5820	5706	.	α
5820	5706	.	a
5820	5754	.	λ
5820	5821	<split-h>	<>
5821	5800	<>	<name>
5821	5799	<>	<aphaerese>
5821	5799	<>	<elision3>
5821	5799	<>	<elision2>
5821	5799	<>	<elision1>
5821	5587	<3s>	<>
5822	164	.	.
5822	165	 	 
5822	164	<~>	<~>
5822	164	<split-s>	<split-s>
5822	164	<split-h>	<split-h>
5822	164	<name2>	<name2>
5822	168	<aphaerese>	<aphaerese>
5822	168	<>	<aphaerese>
5822	164	<elision3>	<elision3>
5822	168	<>	<elision3>
5822	164	<elision2>	<elision2>
5822	168	<>	<elision2>
5822	164	<elision1>	<elision1>
5822	168	<>	<elision1>
5822	164	.	υ
5822	164	.	u
5822	5620	.	κ
5822	5650	s	κ
5822	5703	s	k
5822	5724	s	U
5822	5823	s	K
5822	164	.	α
5822	164	.	a
5822	5782	s	A
5822	5785	s	λ
5822	5788	s	l
5822	5833	s	L
5822	5208	<2s>	<>
5823	5728	<name>	<name>
5823	5824	<>	<name>
5823	5826	<>	<aphaerese>
5823	5826	<>	<elision3>
5823	5826	<>	<elision2>
5823	5826	<>	<elision1>
5823	5775	<split-h>	<>
5823	5827	<L2kl>	<>
5823	5776	<K2kl>	<>
5824	5825	<>	<aphaerese>
5824	5825	<>	<elision3>
5824	5825	<>	<elision2>
5824	5825	<>	<elision1>
5824	5828	<L2kl>	<>
5824	5770	<K2kl>	<>
5825	5826	<>	<aphaerese>
5825	5826	<>	<elision3>
5825	5826	<>	<elision2>
5825	5826	<>	<elision1>
5825	5829	<L2kl>	<>
5825	5771	<K2kl>	<>
5826	5824	<>	<name>
5826	5826	<>	<aphaerese>
5826	5826	<>	<elision3>
5826	5826	<>	<elision2>
5826	5826	<>	<elision1>
5826	5827	<L2kl>	<>
5826	5769	<K2kl>	<>
5827	5828	<>	<name>
5827	5827	<>	<aphaerese>
5827	5827	<>	<elision3>
5827	5827	<>	<elision2>
5827	5827	<>	<elision1>
5827	5706	.	κ
5827	5706	.	λ
5827	5831	<split-h>	<>
5828	5829	<>	<aphaerese>
5828	5829	<>	<elision3>
5828	5829	<>	<elision2>
5828	5829	<>	<elision1>
5828	5708	.	κ
5828	5708	.	λ
5828	5832	<split-h>	<>
5829	5827	<>	<aphaerese>
5829	5827	<>	<elision3>
5829	5827	<>	<elision2>
5829	5827	<>	<elision1>
5829	5706	.	κ
5829	5706	.	λ
5829	5830	<split-h>	<>
5830	5831	<>	<aphaerese>
5830	5831	<>	<elision3>
5830	5831	<>	<elision2>
5830	5831	<>	<elision1>
5830	5597	<3s>	<>
5831	5832	<>	<name>
5831	5831	<>	<aphaerese>
5831	5831	<>	<elision3>
5831	5831	<>	<elision2>
5831	5831	<>	<elision1>
5831	5598	<3s>	<>
5832	5830	<>	<aphaerese>
5832	5830	<>	<elision3>
5832	5830	<>	<elision2>
5832	5830	<>	<elision1>
5832	5599	<3s>	<>
5833	5777	<name>	<name>
5833	5834	<>	<name>
5833	5836	<>	<aphaerese>
5833	5836	<>	<elision3>
5833	5836	<>	<elision2>
5833	5836	<>	<elision1>
5833	5775	<split-h>	<>
5833	5837	<L2kl>	<>
5834	5835	<>	<aphaerese>
5834	5835	<>	<elision3>
5834	5835	<>	<elision2>
5834	5835	<>	<elision1>
5834	5789	<L2kl>	<>
5835	5836	<>	<aphaerese>
5835	5836	<>	<elision3>
5835	5836	<>	<elision2>
5835	5836	<>	<elision1>
5835	5790	<L2kl>	<>
5836	5834	<>	<name>
5836	5836	<>	<aphaerese>
5836	5836	<>	<elision3>
5836	5836	<>	<elision2>
5836	5836	<>	<elision1>
5836	5788	<L2kl>	<>
5837	5709	.	.
5837	5709	 	 
5837	5709	<~>	<~>
5837	5709	<split-s>	<split-s>
5837	5709	<split-h>	<split-h>
5837	5709	<name2>	<name2>
5837	5777	<name2>	<name>
5837	5789	<>	<name>
5837	5712	<aphaerese>	<aphaerese>
5837	5788	<>	<aphaerese>
5837	5709	<elision3>	<elision3>
5837	5788	<>	<elision3>
5837	5709	<elision2>	<elision2>
5837	5788	<>	<elision2>
5837	5709	<elision1>	<elision1>
5837	5788	<>	<elision1>
5837	5706	.	υ
5837	5706	.	u
5837	5706	.	κ
5837	5706	.	α
5837	5706	.	a
5837	5706	.	λ
5837	5838	<split-h>	<>
5838	5723	<>	<name>
5838	5722	<>	<aphaerese>
5838	5722	<>	<elision3>
5838	5722	<>	<elision2>
5838	5722	<>	<elision1>
5838	5608	<3s>	<>
5839	164	.	.
5839	165	 	 
5839	164	<~>	<~>
5839	164	<split-s>	<split-s>
5839	164	<split-h>	<split-h>
5839	164	<name2>	<name2>
5839	168	<aphaerese>	<aphaerese>
5839	171	<>	<aphaerese>
5839	164	<elision3>	<elision3>
5839	171	<>	<elision3>
5839	164	<elision2>	<elision2>
5839	171	<>	<elision2>
5839	164	<elision1>	<elision1>
5839	171	<>	<elision1>
5839	172	.	υ
5839	5038	s	υ
5839	172	.	u
5839	5038	s	u
5839	5620	.	κ
5839	5650	s	κ
5839	5703	s	k
5839	5724	s	U
5839	5727	s	K
5839	172	.	α
5839	5779	s	α
5839	172	.	a
5839	5779	s	a
5839	5782	s	A
5839	5785	s	λ
5839	5788	s	l
5839	5791	s	L
5839	5221	<2s>	<>
5840	167	.	.
5840	170	 	 
5840	167	<~>	<~>
5840	167	<split-s>	<split-s>
5840	167	<split-h>	<split-h>
5840	167	<name2>	<name2>
5840	5822	<aphaerese>	<aphaerese>
5840	167	<>	<aphaerese>
5840	167	<elision3>	<elision3>
5840	167	<>	<elision3>
5840	167	<elision2>	<elision2>
5840	167	<>	<elision2>
5840	167	<elision1>	<elision1>
5840	167	<>	<elision1>
5840	174	.	υ
5840	5616	s	υ
5840	174	.	u
5840	5616	s	u
5840	5622	.	κ
5840	5652	s	κ
5840	5705	s	k
5840	5726	s	U
5840	5825	s	K
5840	174	.	α
5840	5781	s	α
5840	174	.	a
5840	5781	s	a
5840	5784	s	A
5840	5787	s	λ
5840	5790	s	l
5840	5835	s	L
5840	5223	<2s>	<>
5841	167	.	.
5841	170	 	 
5841	167	<~>	<~>
5841	167	<split-s>	<split-s>
5841	167	<split-h>	<split-h>
5841	167	<name2>	<name2>
5841	5822	<aphaerese>	<aphaerese>
5841	5842	<>	<aphaerese>
5841	5842	<>	<elision3>
5841	5842	<>	<elision2>
5841	5842	<>	<elision1>
5841	174	.	υ
5841	5616	s	υ
5841	174	.	u
5841	5616	s	u
5841	174	.	κ
5841	5845	s	κ
5841	5705	s	k
5841	5726	s	U
5841	5825	s	K
5841	174	.	α
5841	5781	s	α
5841	174	.	a
5841	5781	s	a
5841	5784	s	A
5841	174	.	λ
5841	5845	s	λ
5841	5790	s	l
5841	5835	s	L
5841	5634	<2s>	<>
5842	164	.	.
5842	165	 	 
5842	164	<~>	<~>
5842	164	<split-s>	<split-s>
5842	164	<split-h>	<split-h>
5842	164	<name2>	<name2>
5842	168	<aphaerese>	<aphaerese>
5842	163	<>	<aphaerese>
5842	163	<>	<elision3>
5842	163	<>	<elision2>
5842	163	<>	<elision1>
5842	172	.	υ
5842	5038	s	υ
5842	172	.	u
5842	5038	s	u
5842	172	.	κ
5842	5843	s	κ
5842	5703	s	k
5842	5724	s	U
5842	5823	s	K
5842	172	.	α
5842	5779	s	α
5842	172	.	a
5842	5779	s	a
5842	5782	s	A
5842	172	.	λ
5842	5843	s	λ
5842	5788	s	l
5842	5833	s	L
5842	5632	<2s>	<>
5843	5039	.	.
5843	5040	 	 
5843	5039	<~>	<~>
5843	5039	<split-s>	<split-s>
5843	5039	<split-h>	<split-h>
5843	5039	<name2>	<name2>
5843	5844	<>	<name>
5843	5043	<aphaerese>	<aphaerese>
5843	5843	<>	<aphaerese>
5843	5843	<>	<elision3>
5843	5843	<>	<elision2>
5843	5843	<>	<elision1>
5843	5047	.	υ
5843	5053	s	υ
5843	5047	.	u
5843	5053	s	u
5843	5047	.	κ
5843	5629	s	κ
5843	5415	s	k
5843	5424	s	U
5843	5590	s	K
5843	5047	.	α
5843	5053	s	α
5843	5047	.	a
5843	5053	s	a
5843	5545	s	A
5843	5047	.	λ
5843	5629	s	λ
5843	5415	s	l
5843	5603	s	L
5843	5847	<split-h>	<>
5844	5042	.	.
5844	5045	 	 
5844	5042	<~>	<~>
5844	5042	<split-s>	<split-s>
5844	5042	<split-h>	<split-h>
5844	5042	<name2>	<name2>
5844	5589	<aphaerese>	<aphaerese>
5844	5845	<>	<aphaerese>
5844	5845	<>	<elision3>
5844	5845	<>	<elision2>
5844	5845	<>	<elision1>
5844	5049	.	υ
5844	5225	s	υ
5844	5049	.	u
5844	5225	s	u
5844	5049	.	κ
5844	5631	s	κ
5844	5417	s	k
5844	5426	s	U
5844	5592	s	K
5844	5049	.	α
5844	5225	s	α
5844	5049	.	a
5844	5225	s	a
5844	5547	s	A
5844	5049	.	λ
5844	5631	s	λ
5844	5417	s	l
5844	5605	s	L
5844	5848	<split-h>	<>
5845	5039	.	.
5845	5040	 	 
5845	5039	<~>	<~>
5845	5039	<split-s>	<split-s>
5845	5039	<split-h>	<split-h>
5845	5039	<name2>	<name2>
5845	5043	<aphaerese>	<aphaerese>
5845	5843	<>	<aphaerese>
5845	5843	<>	<elision3>
5845	5843	<>	<elision2>
5845	5843	<>	<elision1>
5845	5047	.	υ
5845	5053	s	υ
5845	5047	.	u
5845	5053	s	u
5845	5047	.	κ
5845	5629	s	κ
5845	5415	s	k
5845	5424	s	U
5845	5590	s	K
5845	5047	.	α
5845	5053	s	α
5845	5047	.	a
5845	5053	s	a
5845	5545	s	A
5845	5047	.	λ
5845	5629	s	λ
5845	5415	s	l
5845	5603	s	L
5845	5846	<split-h>	<>
5846	5847	<>	<aphaerese>
5846	5847	<>	<elision3>
5846	5847	<>	<elision2>
5846	5847	<>	<elision1>
5846	5632	<3s>	<>
5847	5848	<>	<name>
5847	5847	<>	<aphaerese>
5847	5847	<>	<elision3>
5847	5847	<>	<elision2>
5847	5847	<>	<elision1>
5847	5633	<3s>	<>
5848	5846	<>	<aphaerese>
5848	5846	<>	<elision3>
5848	5846	<>	<elision2>
5848	5846	<>	<elision1>
5848	5634	<3s>	<>
5849	164	.	.
5849	165	 	 
5849	164	<~>	<~>
5849	164	<split-s>	<split-s>
5849	164	<split-h>	<split-h>
5849	164	<name2>	<name2>
5849	5850	<>	<name>
5849	168	<aphaerese>	<aphaerese>
5849	5849	<>	<aphaerese>
5849	164	<elision3>	<elision3>
5849	5849	<>	<elision3>
5849	164	<elision2>	<elision2>
5849	5849	<>	<elision2>
5849	164	<elision1>	<elision1>
5849	5849	<>	<elision1>
5849	172	.	υ
5849	5038	s	υ
5849	172	.	u
5849	5038	s	u
5849	5852	.	κ
5849	5843	s	κ
5849	5703	s	k
5849	5724	s	U
5849	5823	s	K
5849	172	.	α
5849	5779	s	α
5849	172	.	a
5849	5779	s	a
5849	5782	s	A
5849	5852	.	λ
5849	5843	s	λ
5849	5788	s	l
5849	5833	s	L
5849	5419	<2s>	<>
5850	167	.	.
5850	170	 	 
5850	167	<~>	<~>
5850	167	<split-s>	<split-s>
5850	167	<split-h>	<split-h>
5850	167	<name2>	<name2>
5850	5822	<aphaerese>	<aphaerese>
5850	5851	<>	<aphaerese>
5850	167	<elision3>	<elision3>
5850	5851	<>	<elision3>
5850	167	<elision2>	<elision2>
5850	5851	<>	<elision2>
5850	167	<elision1>	<elision1>
5850	5851	<>	<elision1>
5850	174	.	υ
5850	5616	s	υ
5850	174	.	u
5850	5616	s	u
5850	5854	.	κ
5850	5845	s	κ
5850	5705	s	k
5850	5726	s	U
5850	5825	s	K
5850	174	.	α
5850	5781	s	α
5850	174	.	a
5850	5781	s	a
5850	5784	s	A
5850	5854	.	λ
5850	5845	s	λ
5850	5790	s	l
5850	5835	s	L
5850	5420	<2s>	<>
5851	164	.	.
5851	165	 	 
5851	164	<~>	<~>
5851	164	<split-s>	<split-s>
5851	164	<split-h>	<split-h>
5851	164	<name2>	<name2>
5851	168	<aphaerese>	<aphaerese>
5851	5849	<>	<aphaerese>
5851	164	<elision3>	<elision3>
5851	5849	<>	<elision3>
5851	164	<elision2>	<elision2>
5851	5849	<>	<elision2>
5851	164	<elision1>	<elision1>
5851	5849	<>	<elision1>
5851	172	.	υ
5851	5038	s	υ
5851	172	.	u
5851	5038	s	u
5851	5852	.	κ
5851	5843	s	κ
5851	5703	s	k
5851	5724	s	U
5851	5823	s	K
5851	172	.	α
5851	5779	s	α
5851	172	.	a
5851	5779	s	a
5851	5782	s	A
5851	5852	.	λ
5851	5843	s	λ
5851	5788	s	l
5851	5833	s	L
5851	5418	<2s>	<>
5852	5853	<>	<name>
5852	5852	<>	<aphaerese>
5852	5855	<elision3>	<elision3>
5852	5852	<>	<elision3>
5852	5855	<elision2>	<elision2>
5852	5852	<>	<elision2>
5852	5855	<elision1>	<elision1>
5852	5852	<>	<elision1>
5852	176	<2s>	<>
5853	5854	<>	<aphaerese>
5853	5858	<elision3>	<elision3>
5853	5854	<>	<elision3>
5853	5858	<elision2>	<elision2>
5853	5854	<>	<elision2>
5853	5858	<elision1>	<elision1>
5853	5854	<>	<elision1>
5853	177	<2s>	<>
5854	5852	<>	<aphaerese>
5854	5855	<elision3>	<elision3>
5854	5852	<>	<elision3>
5854	5855	<elision2>	<elision2>
5854	5852	<>	<elision2>
5854	5855	<elision1>	<elision1>
5854	5852	<>	<elision1>
5854	175	<2s>	<>
5855	5855	.	.
5855	5856	 	 
5855	5855	<~>	<~>
5855	5855	<split-s>	<split-s>
5855	5855	<split-h>	<split-h>
5855	5855	<name2>	<name2>
5855	5881	<>	<name>
5855	5859	<aphaerese>	<aphaerese>
5855	5855	<>	<aphaerese>
5855	5855	<elision3>	<elision3>
5855	5855	<>	<elision3>
5855	5855	<elision2>	<elision2>
5855	5855	<>	<elision2>
5855	5855	<elision1>	<elision1>
5855	5855	<>	<elision1>
5855	5852	.	υ
5855	5779	s	υ
5855	5852	.	u
5855	5779	s	u
5855	5863	.	κ
5855	5869	s	κ
5855	5788	s	k
5855	5724	s	U
5855	5879	s	K
5855	5852	.	α
5855	5779	s	α
5855	5852	.	a
5855	5779	s	a
5855	5782	s	A
5855	5788	s	λ
5855	5788	s	l
5855	5833	s	L
5855	5222	<2s>	<>
5856	5855	.	.
5856	5856	 	 
5856	5855	<~>	<~>
5856	5855	<split-s>	<split-s>
5856	5855	<split-h>	<split-h>
5856	5855	<name2>	<name2>
5856	5857	<>	<name>
5856	5859	<aphaerese>	<aphaerese>
5856	5862	<>	<aphaerese>
5856	5855	<elision3>	<elision3>
5856	5862	<>	<elision3>
5856	5855	<elision2>	<elision2>
5856	5862	<>	<elision2>
5856	5855	<elision1>	<elision1>
5856	5862	<>	<elision1>
5856	5852	.	υ
5856	5815	s	υ
5856	5852	.	u
5856	5815	s	u
5856	5863	.	κ
5856	5876	s	κ
5856	5818	s	k
5856	5809	s	U
5856	5877	s	K
5856	5852	.	α
5856	5815	s	α
5856	5852	.	a
5856	5815	s	a
5856	5816	s	A
5856	5818	s	λ
5856	5818	s	l
5856	5819	s	L
5856	5222	<2s>	<>
5857	5858	.	.
5857	5861	 	 
5857	5858	<~>	<~>
5857	5858	<split-s>	<split-s>
5857	5858	<split-h>	<split-h>
5857	5858	<name2>	<name2>
5857	5878	<aphaerese>	<aphaerese>
5857	5880	<>	<aphaerese>
5857	5858	<elision3>	<elision3>
5857	5880	<>	<elision3>
5857	5858	<elision2>	<elision2>
5857	5880	<>	<elision2>
5857	5858	<elision1>	<elision1>
5857	5880	<>	<elision1>
5857	5854	.	υ
5857	5781	s	υ
5857	5854	.	u
5857	5781	s	u
5857	5865	.	κ
5857	5871	s	κ
5857	5790	s	k
5857	5726	s	U
5857	5731	s	K
5857	5854	.	α
5857	5781	s	α
5857	5854	.	a
5857	5781	s	a
5857	5784	s	A
5857	5790	s	λ
5857	5790	s	l
5857	5793	s	L
5857	5223	<2s>	<>
5858	5855	.	.
5858	5856	 	 
5858	5855	<~>	<~>
5858	5855	<split-s>	<split-s>
5858	5855	<split-h>	<split-h>
5858	5855	<name2>	<name2>
5858	5859	<aphaerese>	<aphaerese>
5858	5855	<>	<aphaerese>
5858	5855	<elision3>	<elision3>
5858	5855	<>	<elision3>
5858	5855	<elision2>	<elision2>
5858	5855	<>	<elision2>
5858	5855	<elision1>	<elision1>
5858	5855	<>	<elision1>
5858	5852	.	υ
5858	5779	s	υ
5858	5852	.	u
5858	5779	s	u
5858	5863	.	κ
5858	5869	s	κ
5858	5788	s	k
5858	5724	s	U
5858	5879	s	K
5858	5852	.	α
5858	5779	s	α
5858	5852	.	a
5858	5779	s	a
5858	5782	s	A
5858	5788	s	λ
5858	5788	s	l
5858	5833	s	L
5858	5221	<2s>	<>
5859	5855	.	.
5859	5856	 	 
5859	5855	<~>	<~>
5859	5855	<split-s>	<split-s>
5859	5855	<split-h>	<split-h>
5859	5855	<name2>	<name2>
5859	5860	<>	<name>
5859	5859	<aphaerese>	<aphaerese>
5859	5859	<>	<aphaerese>
5859	5855	<elision3>	<elision3>
5859	5859	<>	<elision3>
5859	5855	<elision2>	<elision2>
5859	5859	<>	<elision2>
5859	5855	<elision1>	<elision1>
5859	5859	<>	<elision1>
5859	5855	.	υ
5859	5855	.	u
5859	5863	.	κ
5859	5869	s	κ
5859	5788	s	k
5859	5724	s	U
5859	5879	s	K
5859	5855	.	α
5859	5855	.	a
5859	5782	s	A
5859	5788	s	λ
5859	5788	s	l
5859	5833	s	L
5859	5209	<2s>	<>
5860	5858	.	.
5860	5861	 	 
5860	5858	<~>	<~>
5860	5858	<split-s>	<split-s>
5860	5858	<split-h>	<split-h>
5860	5858	<name2>	<name2>
5860	5878	<aphaerese>	<aphaerese>
5860	5878	<>	<aphaerese>
5860	5858	<elision3>	<elision3>
5860	5878	<>	<elision3>
5860	5858	<elision2>	<elision2>
5860	5878	<>	<elision2>
5860	5858	<elision1>	<elision1>
5860	5878	<>	<elision1>
5860	5858	.	υ
5860	5858	.	u
5860	5865	.	κ
5860	5871	s	κ
5860	5790	s	k
5860	5726	s	U
5860	5825	s	K
5860	5858	.	α
5860	5858	.	a
5860	5784	s	A
5860	5790	s	λ
5860	5790	s	l
5860	5835	s	L
5860	5210	<2s>	<>
5861	5855	.	.
5861	5856	 	 
5861	5855	<~>	<~>
5861	5855	<split-s>	<split-s>
5861	5855	<split-h>	<split-h>
5861	5855	<name2>	<name2>
5861	5859	<aphaerese>	<aphaerese>
5861	5862	<>	<aphaerese>
5861	5855	<elision3>	<elision3>
5861	5862	<>	<elision3>
5861	5855	<elision2>	<elision2>
5861	5862	<>	<elision2>
5861	5855	<elision1>	<elision1>
5861	5862	<>	<elision1>
5861	5852	.	υ
5861	5815	s	υ
5861	5852	.	u
5861	5815	s	u
5861	5863	.	κ
5861	5876	s	κ
5861	5818	s	k
5861	5809	s	U
5861	5877	s	K
5861	5852	.	α
5861	5815	s	α
5861	5852	.	a
5861	5815	s	a
5861	5816	s	A
5861	5818	s	λ
5861	5818	s	l
5861	5819	s	L
5861	5221	<2s>	<>
5862	5855	.	.
5862	5856	 	 
5862	5855	<~>	<~>
5862	5855	<split-s>	<split-s>
5862	5855	<split-h>	<split-h>
5862	5855	<name2>	<name2>
5862	5857	<>	<name>
5862	5859	<aphaerese>	<aphaerese>
5862	5862	<>	<aphaerese>
5862	5855	<elision3>	<elision3>
5862	5862	<>	<elision3>
5862	5855	<elision2>	<elision2>
5862	5862	<>	<elision2>
5862	5855	<elision1>	<elision1>
5862	5862	<>	<elision1>
5862	5852	.	υ
5862	5779	s	υ
5862	5852	.	u
5862	5779	s	u
5862	5863	.	κ
5862	5869	s	κ
5862	5788	s	k
5862	5724	s	U
5862	5875	s	K
5862	5852	.	α
5862	5779	s	α
5862	5852	.	a
5862	5779	s	a
5862	5782	s	A
5862	5788	s	λ
5862	5788	s	l
5862	5791	s	L
5862	5222	<2s>	<>
5863	5864	<>	<name>
5863	5863	<>	<aphaerese>
5863	5866	<elision3>	<elision3>
5863	5863	<>	<elision3>
5863	5866	<elision2>	<elision2>
5863	5863	<>	<elision2>
5863	5866	<elision1>	<elision1>
5863	5863	<>	<elision1>
5863	5206	<2s>	<>
5864	5865	<>	<aphaerese>
5864	5868	<elision3>	<elision3>
5864	5865	<>	<elision3>
5864	5868	<elision2>	<elision2>
5864	5865	<>	<elision2>
5864	5868	<elision1>	<elision1>
5864	5865	<>	<elision1>
5864	5207	<2s>	<>
5865	5863	<>	<aphaerese>
5865	5866	<elision3>	<elision3>
5865	5863	<>	<elision3>
5865	5866	<elision2>	<elision2>
5865	5863	<>	<elision2>
5865	5866	<elision1>	<elision1>
5865	5863	<>	<elision1>
5865	5205	<2s>	<>
5866	5867	<>	<name>
5866	5866	<>	<aphaerese>
5866	5866	<>	<elision3>
5866	5866	<>	<elision2>
5866	5866	<>	<elision1>
5866	5645	s	κ
5866	5645	s	k
5866	5641	s	K
5866	5645	s	λ
5866	5645	s	l
5866	5647	s	L
5866	5067	<2s>	<>
5867	5868	<>	<aphaerese>
5867	5868	<>	<elision3>
5867	5868	<>	<elision2>
5867	5868	<>	<elision1>
5867	5644	s	κ
5867	5644	s	k
5867	5643	s	K
5867	5644	s	λ
5867	5644	s	l
5867	5649	s	L
5867	5068	<2s>	<>
5868	5866	<>	<aphaerese>
5868	5866	<>	<elision3>
5868	5866	<>	<elision2>
5868	5866	<>	<elision1>
5868	5645	s	κ
5868	5645	s	k
5868	5641	s	K
5868	5645	s	λ
5868	5645	s	l
5868	5647	s	L
5868	5066	<2s>	<>
5869	5709	.	.
5869	5709	 	 
5869	5709	<~>	<~>
5869	5709	<split-s>	<split-s>
5869	5709	<split-h>	<split-h>
5869	5709	<name2>	<name2>
5869	5870	<>	<name>
5869	5712	<aphaerese>	<aphaerese>
5869	5869	<>	<aphaerese>
5869	5872	<elision3>	<elision3>
5869	5869	<>	<elision3>
5869	5872	<elision2>	<elision2>
5869	5869	<>	<elision2>
5869	5872	<elision1>	<elision1>
5869	5869	<>	<elision1>
5869	5706	.	υ
5869	5706	.	u
5869	5706	.	κ
5869	5706	.	α
5869	5706	.	a
5869	5706	.	λ
5869	5701	<split-h>	<>
5870	5711	.	.
5870	5711	 	 
5870	5711	<~>	<~>
5870	5711	<split-s>	<split-s>
5870	5711	<split-h>	<split-h>
5870	5711	<name2>	<name2>
5870	5714	<aphaerese>	<aphaerese>
5870	5871	<>	<aphaerese>
5870	5874	<elision3>	<elision3>
5870	5871	<>	<elision3>
5870	5874	<elision2>	<elision2>
5870	5871	<>	<elision2>
5870	5874	<elision1>	<elision1>
5870	5871	<>	<elision1>
5870	5708	.	υ
5870	5708	.	u
5870	5708	.	κ
5870	5708	.	α
5870	5708	.	a
5870	5708	.	λ
5870	5702	<split-h>	<>
5871	5709	.	.
5871	5709	 	 
5871	5709	<~>	<~>
5871	5709	<split-s>	<split-s>
5871	5709	<split-h>	<split-h>
5871	5709	<name2>	<name2>
5871	5712	<aphaerese>	<aphaerese>
5871	5869	<>	<aphaerese>
5871	5872	<elision3>	<elision3>
5871	5869	<>	<elision3>
5871	5872	<elision2>	<elision2>
5871	5869	<>	<elision2>
5871	5872	<elision1>	<elision1>
5871	5869	<>	<elision1>
5871	5706	.	υ
5871	5706	.	u
5871	5706	.	κ
5871	5706	.	α
5871	5706	.	a
5871	5706	.	λ
5871	5700	<split-h>	<>
5872	5709	.	.
5872	5709	 	 
5872	5709	<~>	<~>
5872	5709	<split-s>	<split-s>
5872	5709	<split-h>	<split-h>
5872	5709	<name2>	<name2>
5872	5873	<>	<name>
5872	5712	<aphaerese>	<aphaerese>
5872	5872	<>	<aphaerese>
5872	5709	<elision3>	<elision3>
5872	5872	<>	<elision3>
5872	5709	<elision2>	<elision2>
5872	5872	<>	<elision2>
5872	5709	<elision1>	<elision1>
5872	5872	<>	<elision1>
5872	5706	.	υ
5872	5706	.	u
5872	5715	.	κ
5872	5706	.	α
5872	5706	.	a
5872	5698	<split-h>	<>
5873	5711	.	.
5873	5711	 	 
5873	5711	<~>	<~>
5873	5711	<split-s>	<split-s>
5873	5711	<split-h>	<split-h>
5873	5711	<name2>	<name2>
5873	5714	<aphaerese>	<aphaerese>
5873	5874	<>	<aphaerese>
5873	5711	<elision3>	<elision3>
5873	5874	<>	<elision3>
5873	5711	<elision2>	<elision2>
5873	5874	<>	<elision2>
5873	5711	<elision1>	<elision1>
5873	5874	<>	<elision1>
5873	5708	.	υ
5873	5708	.	u
5873	5717	.	κ
5873	5708	.	α
5873	5708	.	a
5873	5699	<split-h>	<>
5874	5709	.	.
5874	5709	 	 
5874	5709	<~>	<~>
5874	5709	<split-s>	<split-s>
5874	5709	<split-h>	<split-h>
5874	5709	<name2>	<name2>
5874	5712	<aphaerese>	<aphaerese>
5874	5872	<>	<aphaerese>
5874	5709	<elision3>	<elision3>
5874	5872	<>	<elision3>
5874	5709	<elision2>	<elision2>
5874	5872	<>	<elision2>
5874	5709	<elision1>	<elision1>
5874	5872	<>	<elision1>
5874	5706	.	υ
5874	5706	.	u
5874	5715	.	κ
5874	5706	.	α
5874	5706	.	a
5874	5697	<split-h>	<>
5875	5777	<name>	<name>
5875	5730	<>	<name>
5875	5732	<>	<aphaerese>
5875	5732	<>	<elision3>
5875	5732	<>	<elision2>
5875	5732	<>	<elision1>
5875	5775	<split-h>	<>
5875	5733	<A2kl>	<>
5875	5751	<L2kl>	<>
5875	5776	<K2kl>	<>
5876	5709	.	.
5876	5709	 	 
5876	5709	<~>	<~>
5876	5709	<split-s>	<split-s>
5876	5709	<split-h>	<split-h>
5876	5709	<name2>	<name2>
5876	5870	<>	<name>
5876	5712	<aphaerese>	<aphaerese>
5876	5869	<>	<aphaerese>
5876	5872	<elision3>	<elision3>
5876	5869	<>	<elision3>
5876	5872	<elision2>	<elision2>
5876	5869	<>	<elision2>
5876	5872	<elision1>	<elision1>
5876	5869	<>	<elision1>
5876	5706	.	υ
5876	5706	.	u
5876	5706	.	κ
5876	5706	.	α
5876	5706	.	a
5876	5706	.	λ
5876	5806	<split-h>	<>
5877	5777	<name>	<name>
5877	5730	<>	<name>
5877	5732	<>	<aphaerese>
5877	5732	<>	<elision3>
5877	5732	<>	<elision2>
5877	5732	<>	<elision1>
5877	5775	<split-h>	<>
5877	5733	<A2kl>	<>
5877	5751	<L2kl>	<>
5877	5813	<K2kl>	<>
5878	5855	.	.
5878	5856	 	 
5878	5855	<~>	<~>
5878	5855	<split-s>	<split-s>
5878	5855	<split-h>	<split-h>
5878	5855	<name2>	<name2>
5878	5859	<aphaerese>	<aphaerese>
5878	5859	<>	<aphaerese>
5878	5855	<elision3>	<elision3>
5878	5859	<>	<elision3>
5878	5855	<elision2>	<elision2>
5878	5859	<>	<elision2>
5878	5855	<elision1>	<elision1>
5878	5859	<>	<elision1>
5878	5855	.	υ
5878	5855	.	u
5878	5863	.	κ
5878	5869	s	κ
5878	5788	s	k
5878	5724	s	U
5878	5879	s	K
5878	5855	.	α
5878	5855	.	a
5878	5782	s	A
5878	5788	s	λ
5878	5788	s	l
5878	5833	s	L
5878	5208	<2s>	<>
5879	5777	<name>	<name>
5879	5824	<>	<name>
5879	5826	<>	<aphaerese>
5879	5826	<>	<elision3>
5879	5826	<>	<elision2>
5879	5826	<>	<elision1>
5879	5775	<split-h>	<>
5879	5827	<L2kl>	<>
5879	5776	<K2kl>	<>
5880	5855	.	.
5880	5856	 	 
5880	5855	<~>	<~>
5880	5855	<split-s>	<split-s>
5880	5855	<split-h>	<split-h>
5880	5855	<name2>	<name2>
5880	5859	<aphaerese>	<aphaerese>
5880	5862	<>	<aphaerese>
5880	5855	<elision3>	<elision3>
5880	5862	<>	<elision3>
5880	5855	<elision2>	<elision2>
5880	5862	<>	<elision2>
5880	5855	<elision1>	<elision1>
5880	5862	<>	<elision1>
5880	5852	.	υ
5880	5779	s	υ
5880	5852	.	u
5880	5779	s	u
5880	5863	.	κ
5880	5869	s	κ
5880	5788	s	k
5880	5724	s	U
5880	5875	s	K
5880	5852	.	α
5880	5779	s	α
5880	5852	.	a
5880	5779	s	a
5880	5782	s	A
5880	5788	s	λ
5880	5788	s	l
5880	5791	s	L
5880	5221	<2s>	<>
5881	5858	.	.
5881	5861	 	 
5881	5858	<~>	<~>
5881	5858	<split-s>	<split-s>
5881	5858	<split-h>	<split-h>
5881	5858	<name2>	<name2>
5881	5878	<aphaerese>	<aphaerese>
5881	5858	<>	<aphaerese>
5881	5858	<elision3>	<elision3>
5881	5858	<>	<elision3>
5881	5858	<elision2>	<elision2>
5881	5858	<>	<elision2>
5881	5858	<elision1>	<elision1>
5881	5858	<>	<elision1>
5881	5854	.	υ
5881	5781	s	υ
5881	5854	.	u
5881	5781	s	u
5881	5865	.	κ
5881	5871	s	κ
5881	5790	s	k
5881	5726	s	U
5881	5825	s	K
5881	5854	.	α
5881	5781	s	α
5881	5854	.	a
5881	5781	s	a
5881	5784	s	A
5881	5790	s	λ
5881	5790	s	l
5881	5835	s	L
5881	5223	<2s>	<>
5882	5883	<name>	<name>
5882	5884	<>	<name>
5882	5886	<>	<aphaerese>
5882	5886	<>	<elision3>
5882	5886	<>	<elision2>
5882	5886	<>	<elision1>
5882	5539	<2s>	<>
5882	5887	<L2kl>	<>
5882	5896	<K2kl>	<>
5883	5825	s	k
5883	5835	s	l
5883	5429	<2s>	<>
5884	5885	<>	<aphaerese>
5884	5885	<>	<elision3>
5884	5885	<>	<elision2>
5884	5885	<>	<elision1>
5884	5888	<L2kl>	<>
5884	5891	<K2kl>	<>
5885	5886	<>	<aphaerese>
5885	5886	<>	<elision3>
5885	5886	<>	<elision2>
5885	5886	<>	<elision1>
5885	5889	<L2kl>	<>
5885	5892	<K2kl>	<>
5886	5884	<>	<name>
5886	5886	<>	<aphaerese>
5886	5886	<>	<elision3>
5886	5886	<>	<elision2>
5886	5886	<>	<elision1>
5886	5887	<L2kl>	<>
5886	5890	<K2kl>	<>
5887	5888	<>	<name>
5887	5887	<>	<aphaerese>
5887	5887	<>	<elision3>
5887	5887	<>	<elision2>
5887	5887	<>	<elision1>
5887	5852	.	κ
5887	5852	.	λ
5887	5598	<2s>	<>
5888	5889	<>	<aphaerese>
5888	5889	<>	<elision3>
5888	5889	<>	<elision2>
5888	5889	<>	<elision1>
5888	5854	.	κ
5888	5854	.	λ
5888	5599	<2s>	<>
5889	5887	<>	<aphaerese>
5889	5887	<>	<elision3>
5889	5887	<>	<elision2>
5889	5887	<>	<elision1>
5889	5852	.	κ
5889	5852	.	λ
5889	5597	<2s>	<>
5890	5855	.	.
5890	5856	 	 
5890	5855	<~>	<~>
5890	5855	<split-s>	<split-s>
5890	5855	<split-h>	<split-h>
5890	5855	<name2>	<name2>
5890	5891	<>	<name>
5890	5859	<aphaerese>	<aphaerese>
5890	5890	<>	<aphaerese>
5890	5855	<elision3>	<elision3>
5890	5890	<>	<elision3>
5890	5855	<elision2>	<elision2>
5890	5890	<>	<elision2>
5890	5855	<elision1>	<elision1>
5890	5890	<>	<elision1>
5890	5852	.	υ
5890	5779	s	υ
5890	5852	.	u
5890	5779	s	u
5890	5893	s	κ
5890	5788	s	k
5890	5724	s	U
5890	5879	s	K
5890	5852	.	α
5890	5779	s	α
5890	5852	.	a
5890	5779	s	a
5890	5782	s	A
5890	5893	s	λ
5890	5788	s	l
5890	5833	s	L
5890	5534	<2s>	<>
5891	5858	.	.
5891	5861	 	 
5891	5858	<~>	<~>
5891	5858	<split-s>	<split-s>
5891	5858	<split-h>	<split-h>
5891	5858	<name2>	<name2>
5891	5878	<aphaerese>	<aphaerese>
5891	5892	<>	<aphaerese>
5891	5858	<elision3>	<elision3>
5891	5892	<>	<elision3>
5891	5858	<elision2>	<elision2>
5891	5892	<>	<elision2>
5891	5858	<elision1>	<elision1>
5891	5892	<>	<elision1>
5891	5854	.	υ
5891	5781	s	υ
5891	5854	.	u
5891	5781	s	u
5891	5895	s	κ
5891	5790	s	k
5891	5726	s	U
5891	5825	s	K
5891	5854	.	α
5891	5781	s	α
5891	5854	.	a
5891	5781	s	a
5891	5784	s	A
5891	5895	s	λ
5891	5790	s	l
5891	5835	s	L
5891	5535	<2s>	<>
5892	5855	.	.
5892	5856	 	 
5892	5855	<~>	<~>
5892	5855	<split-s>	<split-s>
5892	5855	<split-h>	<split-h>
5892	5855	<name2>	<name2>
5892	5859	<aphaerese>	<aphaerese>
5892	5890	<>	<aphaerese>
5892	5855	<elision3>	<elision3>
5892	5890	<>	<elision3>
5892	5855	<elision2>	<elision2>
5892	5890	<>	<elision2>
5892	5855	<elision1>	<elision1>
5892	5890	<>	<elision1>
5892	5852	.	υ
5892	5779	s	υ
5892	5852	.	u
5892	5779	s	u
5892	5893	s	κ
5892	5788	s	k
5892	5724	s	U
5892	5879	s	K
5892	5852	.	α
5892	5779	s	α
5892	5852	.	a
5892	5779	s	a
5892	5782	s	A
5892	5893	s	λ
5892	5788	s	l
5892	5833	s	L
5892	5533	<2s>	<>
5893	5709	.	.
5893	5709	 	 
5893	5709	<~>	<~>
5893	5709	<split-s>	<split-s>
5893	5709	<split-h>	<split-h>
5893	5709	<name2>	<name2>
5893	5894	<>	<name>
5893	5712	<aphaerese>	<aphaerese>
5893	5893	<>	<aphaerese>
5893	5893	<>	<elision3>
5893	5893	<>	<elision2>
5893	5893	<>	<elision1>
5893	5706	.	υ
5893	5706	.	u
5893	5706	.	κ
5893	5706	.	α
5893	5706	.	a
5893	5706	.	λ
5893	5847	<split-h>	<>
5894	5711	.	.
5894	5711	 	 
5894	5711	<~>	<~>
5894	5711	<split-s>	<split-s>
5894	5711	<split-h>	<split-h>
5894	5711	<name2>	<name2>
5894	5714	<aphaerese>	<aphaerese>
5894	5895	<>	<aphaerese>
5894	5895	<>	<elision3>
5894	5895	<>	<elision2>
5894	5895	<>	<elision1>
5894	5708	.	υ
5894	5708	.	u
5894	5708	.	κ
5894	5708	.	α
5894	5708	.	a
5894	5708	.	λ
5894	5848	<split-h>	<>
5895	5709	.	.
5895	5709	 	 
5895	5709	<~>	<~>
5895	5709	<split-s>	<split-s>
5895	5709	<split-h>	<split-h>
5895	5709	<name2>	<name2>
5895	5712	<aphaerese>	<aphaerese>
5895	5893	<>	<aphaerese>
5895	5893	<>	<elision3>
5895	5893	<>	<elision2>
5895	5893	<>	<elision1>
5895	5706	.	υ
5895	5706	.	u
5895	5706	.	κ
5895	5706	.	α
5895	5706	.	a
5895	5706	.	λ
5895	5846	<split-h>	<>
5896	5855	.	.
5896	5856	 	 
5896	5855	<~>	<~>
5896	5855	<split-s>	<split-s>
5896	5855	<split-h>	<split-h>
5896	5855	<name2>	<name2>
5896	5883	<name2>	<name>
5896	5891	<>	<name>
5896	5859	<aphaerese>	<aphaerese>
5896	5890	<>	<aphaerese>
5896	5855	<elision3>	<elision3>
5896	5890	<>	<elision3>
5896	5855	<elision2>	<elision2>
5896	5890	<>	<elision2>
5896	5855	<elision1>	<elision1>
5896	5890	<>	<elision1>
5896	5852	.	υ
5896	5779	s	υ
5896	5852	.	u
5896	5779	s	u
5896	5893	s	κ
5896	5788	s	k
5896	5724	s	U
5896	5879	s	K
5896	5852	.	α
5896	5779	s	α
5896	5852	.	a
5896	5779	s	a
5896	5782	s	A
5896	5893	s	λ
5896	5788	s	l
5896	5833	s	L
5896	5543	<2s>	<>
5897	5855	.	.
5897	5856	 	 
5897	5855	<~>	<~>
5897	5855	<split-s>	<split-s>
5897	5855	<split-h>	<split-h>
5897	5855	<name2>	<name2>
5897	5898	<>	<name>
5897	5859	<aphaerese>	<aphaerese>
5897	5897	<>	<aphaerese>
5897	5855	<elision3>	<elision3>
5897	5897	<>	<elision3>
5897	5855	<elision2>	<elision2>
5897	5897	<>	<elision2>
5897	5855	<elision1>	<elision1>
5897	5897	<>	<elision1>
5897	5852	.	υ
5897	5779	s	υ
5897	5852	.	u
5897	5779	s	u
5897	5852	.	κ
5897	5893	s	κ
5897	5788	s	k
5897	5724	s	U
5897	5879	s	K
5897	5852	.	α
5897	5779	s	α
5897	5852	.	a
5897	5779	s	a
5897	5782	s	A
5897	5852	.	λ
5897	5893	s	λ
5897	5788	s	l
5897	5833	s	L
5897	5419	<2s>	<>
5898	5858	.	.
5898	5861	 	 
5898	5858	<~>	<~>
5898	5858	<split-s>	<split-s>
5898	5858	<split-h>	<split-h>
5898	5858	<name2>	<name2>
5898	5878	<aphaerese>	<aphaerese>
5898	5899	<>	<aphaerese>
5898	5858	<elision3>	<elision3>
5898	5899	<>	<elision3>
5898	5858	<elision2>	<elision2>
5898	5899	<>	<elision2>
5898	5858	<elision1>	<elision1>
5898	5899	<>	<elision1>
5898	5854	.	υ
5898	5781	s	υ
5898	5854	.	u
5898	5781	s	u
5898	5854	.	κ
5898	5895	s	κ
5898	5790	s	k
5898	5726	s	U
5898	5825	s	K
5898	5854	.	α
5898	5781	s	α
5898	5854	.	a
5898	5781	s	a
5898	5784	s	A
5898	5854	.	λ
5898	5895	s	λ
5898	5790	s	l
5898	5835	s	L
5898	5420	<2s>	<>
5899	5855	.	.
5899	5856	 	 
5899	5855	<~>	<~>
5899	5855	<split-s>	<split-s>
5899	5855	<split-h>	<split-h>
5899	5855	<name2>	<name2>
5899	5859	<aphaerese>	<aphaerese>
5899	5897	<>	<aphaerese>
5899	5855	<elision3>	<elision3>
5899	5897	<>	<elision3>
5899	5855	<elision2>	<elision2>
5899	5897	<>	<elision2>
5899	5855	<elision1>	<elision1>
5899	5897	<>	<elision1>
5899	5852	.	υ
5899	5779	s	υ
5899	5852	.	u
5899	5779	s	u
5899	5852	.	κ
5899	5893	s	κ
5899	5788	s	k
5899	5724	s	U
5899	5879	s	K
5899	5852	.	α
5899	5779	s	α
5899	5852	.	a
5899	5779	s	a
5899	5782	s	A
5899	5852	.	λ
5899	5893	s	λ
5899	5788	s	l
5899	5833	s	L
5899	5418	<2s>	<>
5900	5883	<name>	<name>
5900	5901	<>	<name>
5900	5903	<>	<aphaerese>
5900	5903	<>	<elision3>
5900	5903	<>	<elision2>
5900	5903	<>	<elision1>
5900	5539	<2s>	<>
5900	5904	<L2kl>	<>
5901	5902	<>	<aphaerese>
5901	5902	<>	<elision3>
5901	5902	<>	<elision2>
5901	5902	<>	<elision1>
5901	5898	<L2kl>	<>
5902	5903	<>	<aphaerese>
5902	5903	<>	<elision3>
5902	5903	<>	<elision2>
5902	5903	<>	<elision1>
5902	5899	<L2kl>	<>
5903	5901	<>	<name>
5903	5903	<>	<aphaerese>
5903	5903	<>	<elision3>
5903	5903	<>	<elision2>
5903	5903	<>	<elision1>
5903	5897	<L2kl>	<>
5904	5855	.	.
5904	5856	 	 
5904	5855	<~>	<~>
5904	5855	<split-s>	<split-s>
5904	5855	<split-h>	<split-h>
5904	5855	<name2>	<name2>
5904	5883	<name2>	<name>
5904	5898	<>	<name>
5904	5859	<aphaerese>	<aphaerese>
5904	5897	<>	<aphaerese>
5904	5855	<elision3>	<elision3>
5904	5897	<>	<elision3>
5904	5855	<elision2>	<elision2>
5904	5897	<>	<elision2>
5904	5855	<elision1>	<elision1>
5904	5897	<>	<elision1>
5904	5852	.	υ
5904	5779	s	υ
5904	5852	.	u
5904	5779	s	u
5904	5852	.	κ
5904	5893	s	κ
5904	5788	s	k
5904	5724	s	U
5904	5879	s	K
5904	5852	.	α
5904	5779	s	α
5904	5852	.	a
5904	5779	s	a
5904	5782	s	A
5904	5852	.	λ
5904	5893	s	λ
5904	5788	s	l
5904	5833	s	L
5904	5608	<2s>	<>
5905	5906	<>	<name>
5905	5905	<>	<aphaerese>
5905	5905	<>	<elision3>
5905	5905	<>	<elision2>
5905	5905	<>	<elision1>
5905	5908	s	κ
5905	6033	s	k
5905	6051	s	K
5905	5908	s	λ
5905	6064	s	l
5905	6067	s	L
5905	5242	<1s>	<>
5906	5907	<>	<aphaerese>
5906	5907	<>	<elision3>
5906	5907	<>	<elision2>
5906	5907	<>	<elision1>
5906	6029	s	κ
5906	6035	s	k
5906	6054	s	K
5906	6029	s	λ
5906	6066	s	l
5906	6069	s	L
5906	5243	<1s>	<>
5907	5905	<>	<aphaerese>
5907	5905	<>	<elision3>
5907	5905	<>	<elision2>
5907	5905	<>	<elision1>
5907	5908	s	κ
5907	6033	s	k
5907	6051	s	K
5907	5908	s	λ
5907	6064	s	l
5907	6067	s	L
5907	5241	<1s>	<>
5908	5909	.	.
5908	5910	 	 
5908	5909	<~>	<~>
5908	5909	<split-s>	<split-s>
5908	5909	<split-h>	<split-h>
5908	5909	<name2>	<name2>
5908	6028	<>	<name>
5908	5913	<aphaerese>	<aphaerese>
5908	5908	<>	<aphaerese>
5908	5908	<>	<elision3>
5908	5908	<>	<elision2>
5908	5908	<>	<elision1>
5908	5917	.	υ
5908	5920	s	υ
5908	5917	.	u
5908	5920	s	u
5908	5917	.	κ
5908	6030	s	κ
5908	5959	s	k
5908	5962	s	U
5908	6014	s	K
5908	5917	.	α
5908	5920	s	α
5908	5917	.	a
5908	5920	s	a
5908	5992	s	A
5908	5917	.	λ
5908	6030	s	λ
5908	5959	s	l
5908	6021	s	L
5908	5633	<2s>	<>
5909	5909	.	.
5909	5910	 	 
5909	5909	<~>	<~>
5909	5909	<split-s>	<split-s>
5909	5909	<split-h>	<split-h>
5909	5909	<name2>	<name2>
5909	6027	<>	<name>
5909	5913	<aphaerese>	<aphaerese>
5909	5909	<>	<aphaerese>
5909	5909	<elision3>	<elision3>
5909	5909	<>	<elision3>
5909	5909	<elision2>	<elision2>
5909	5909	<>	<elision2>
5909	5909	<elision1>	<elision1>
5909	5909	<>	<elision1>
5909	5917	.	υ
5909	5920	s	υ
5909	5917	.	u
5909	5920	s	u
5909	5938	.	κ
5909	5953	s	κ
5909	5959	s	k
5909	5962	s	U
5909	6014	s	K
5909	5917	.	α
5909	5920	s	α
5909	5917	.	a
5909	5920	s	a
5909	5992	s	A
5909	5959	s	λ
5909	5959	s	l
5909	6021	s	L
5909	5222	<2s>	<>
5910	5909	.	.
5910	5910	 	 
5910	5909	<~>	<~>
5910	5909	<split-s>	<split-s>
5910	5909	<split-h>	<split-h>
5910	5909	<name2>	<name2>
5910	5911	<>	<name>
5910	5913	<aphaerese>	<aphaerese>
5910	5916	<>	<aphaerese>
5910	5909	<elision3>	<elision3>
5910	5916	<>	<elision3>
5910	5909	<elision2>	<elision2>
5910	5916	<>	<elision2>
5910	5909	<elision1>	<elision1>
5910	5916	<>	<elision1>
5910	5917	.	υ
5910	6003	s	υ
5910	5917	.	u
5910	6003	s	u
5910	5938	.	κ
5910	6004	s	κ
5910	6005	s	k
5910	6006	s	U
5910	6008	s	K
5910	5917	.	α
5910	6003	s	α
5910	5917	.	a
5910	6003	s	a
5910	6010	s	A
5910	6005	s	λ
5910	6005	s	l
5910	6011	s	L
5910	5222	<2s>	<>
5911	5912	.	.
5911	5915	 	 
5911	5912	<~>	<~>
5911	5912	<split-s>	<split-s>
5911	5912	<split-h>	<split-h>
5911	5912	<name2>	<name2>
5911	6013	<aphaerese>	<aphaerese>
5911	6026	<>	<aphaerese>
5911	5912	<elision3>	<elision3>
5911	6026	<>	<elision3>
5911	5912	<elision2>	<elision2>
5911	6026	<>	<elision2>
5911	5912	<elision1>	<elision1>
5911	6026	<>	<elision1>
5911	5919	.	υ
5911	5937	s	υ
5911	5919	.	u
5911	5937	s	u
5911	5940	.	κ
5911	5955	s	κ
5911	5961	s	k
5911	5964	s	U
5911	5968	s	K
5911	5919	.	α
5911	5937	s	α
5911	5919	.	a
5911	5937	s	a
5911	5994	s	A
5911	5961	s	λ
5911	5961	s	l
5911	5997	s	L
5911	5223	<2s>	<>
5912	5909	.	.
5912	5910	 	 
5912	5909	<~>	<~>
5912	5909	<split-s>	<split-s>
5912	5909	<split-h>	<split-h>
5912	5909	<name2>	<name2>
5912	5913	<aphaerese>	<aphaerese>
5912	5909	<>	<aphaerese>
5912	5909	<elision3>	<elision3>
5912	5909	<>	<elision3>
5912	5909	<elision2>	<elision2>
5912	5909	<>	<elision2>
5912	5909	<elision1>	<elision1>
5912	5909	<>	<elision1>
5912	5917	.	υ
5912	5920	s	υ
5912	5917	.	u
5912	5920	s	u
5912	5938	.	κ
5912	5953	s	κ
5912	5959	s	k
5912	5962	s	U
5912	6014	s	K
5912	5917	.	α
5912	5920	s	α
5912	5917	.	a
5912	5920	s	a
5912	5992	s	A
5912	5959	s	λ
5912	5959	s	l
5912	6021	s	L
5912	5221	<2s>	<>
5913	5909	.	.
5913	5910	 	 
5913	5909	<~>	<~>
5913	5909	<split-s>	<split-s>
5913	5909	<split-h>	<split-h>
5913	5909	<name2>	<name2>
5913	5914	<>	<name>
5913	5913	<aphaerese>	<aphaerese>
5913	5913	<>	<aphaerese>
5913	5909	<elision3>	<elision3>
5913	5913	<>	<elision3>
5913	5909	<elision2>	<elision2>
5913	5913	<>	<elision2>
5913	5909	<elision1>	<elision1>
5913	5913	<>	<elision1>
5913	5909	.	υ
5913	5909	.	u
5913	5938	.	κ
5913	5953	s	κ
5913	5959	s	k
5913	5962	s	U
5913	6014	s	K
5913	5909	.	α
5913	5909	.	a
5913	5992	s	A
5913	5959	s	λ
5913	5959	s	l
5913	6021	s	L
5913	5209	<2s>	<>
5914	5912	.	.
5914	5915	 	 
5914	5912	<~>	<~>
5914	5912	<split-s>	<split-s>
5914	5912	<split-h>	<split-h>
5914	5912	<name2>	<name2>
5914	6013	<aphaerese>	<aphaerese>
5914	6013	<>	<aphaerese>
5914	5912	<elision3>	<elision3>
5914	6013	<>	<elision3>
5914	5912	<elision2>	<elision2>
5914	6013	<>	<elision2>
5914	5912	<elision1>	<elision1>
5914	6013	<>	<elision1>
5914	5912	.	υ
5914	5912	.	u
5914	5940	.	κ
5914	5955	s	κ
5914	5961	s	k
5914	5964	s	U
5914	6016	s	K
5914	5912	.	α
5914	5912	.	a
5914	5994	s	A
5914	5961	s	λ
5914	5961	s	l
5914	6023	s	L
5914	5210	<2s>	<>
5915	5909	.	.
5915	5910	 	 
5915	5909	<~>	<~>
5915	5909	<split-s>	<split-s>
5915	5909	<split-h>	<split-h>
5915	5909	<name2>	<name2>
5915	5913	<aphaerese>	<aphaerese>
5915	5916	<>	<aphaerese>
5915	5909	<elision3>	<elision3>
5915	5916	<>	<elision3>
5915	5909	<elision2>	<elision2>
5915	5916	<>	<elision2>
5915	5909	<elision1>	<elision1>
5915	5916	<>	<elision1>
5915	5917	.	υ
5915	6003	s	υ
5915	5917	.	u
5915	6003	s	u
5915	5938	.	κ
5915	6004	s	κ
5915	6005	s	k
5915	6006	s	U
5915	6008	s	K
5915	5917	.	α
5915	6003	s	α
5915	5917	.	a
5915	6003	s	a
5915	6010	s	A
5915	6005	s	λ
5915	6005	s	l
5915	6011	s	L
5915	5221	<2s>	<>
5916	5909	.	.
5916	5910	 	 
5916	5909	<~>	<~>
5916	5909	<split-s>	<split-s>
5916	5909	<split-h>	<split-h>
5916	5909	<name2>	<name2>
5916	5911	<>	<name>
5916	5913	<aphaerese>	<aphaerese>
5916	5916	<>	<aphaerese>
5916	5909	<elision3>	<elision3>
5916	5916	<>	<elision3>
5916	5909	<elision2>	<elision2>
5916	5916	<>	<elision2>
5916	5909	<elision1>	<elision1>
5916	5916	<>	<elision1>
5916	5917	.	υ
5916	5920	s	υ
5916	5917	.	u
5916	5920	s	u
5916	5938	.	κ
5916	5953	s	κ
5916	5959	s	k
5916	5962	s	U
5916	5965	s	K
5916	5917	.	α
5916	5920	s	α
5916	5917	.	a
5916	5920	s	a
5916	5992	s	A
5916	5959	s	λ
5916	5959	s	l
5916	5995	s	L
5916	5222	<2s>	<>
5917	5918	<>	<name>
5917	5917	<>	<aphaerese>
5917	5909	<elision3>	<elision3>
5917	5917	<>	<elision3>
5917	5909	<elision2>	<elision2>
5917	5917	<>	<elision2>
5917	5909	<elision1>	<elision1>
5917	5917	<>	<elision1>
5917	176	<2s>	<>
5918	5919	<>	<aphaerese>
5918	5912	<elision3>	<elision3>
5918	5919	<>	<elision3>
5918	5912	<elision2>	<elision2>
5918	5919	<>	<elision2>
5918	5912	<elision1>	<elision1>
5918	5919	<>	<elision1>
5918	177	<2s>	<>
5919	5917	<>	<aphaerese>
5919	5909	<elision3>	<elision3>
5919	5917	<>	<elision3>
5919	5909	<elision2>	<elision2>
5919	5917	<>	<elision2>
5919	5909	<elision1>	<elision1>
5919	5917	<>	<elision1>
5919	175	<2s>	<>
5920	5921	.	.
5920	5921	 	 
5920	5921	<~>	<~>
5920	5921	<split-s>	<split-s>
5920	5921	<split-h>	<split-h>
5920	5921	<name2>	<name2>
5920	5936	<>	<name>
5920	5924	<aphaerese>	<aphaerese>
5920	5920	<>	<aphaerese>
5920	5920	<>	<elision3>
5920	5920	<>	<elision2>
5920	5920	<>	<elision1>
5920	5933	.	υ
5920	5933	.	u
5920	5927	.	κ
5920	5933	.	α
5920	5933	.	a
5920	5618	<split-s>	<>
5921	5921	.	.
5921	5921	 	 
5921	5921	<~>	<~>
5921	5921	<split-s>	<split-s>
5921	5921	<split-h>	<split-h>
5921	5921	<name2>	<name2>
5921	5922	<>	<name>
5921	5924	<aphaerese>	<aphaerese>
5921	5921	<>	<aphaerese>
5921	5921	<elision3>	<elision3>
5921	5921	<>	<elision3>
5921	5921	<elision2>	<elision2>
5921	5921	<>	<elision2>
5921	5921	<elision1>	<elision1>
5921	5921	<>	<elision1>
5921	5933	.	υ
5921	5933	.	u
5921	5927	.	κ
5921	5933	.	α
5921	5933	.	a
5921	5564	<split-s>	<>
5922	5923	.	.
5922	5923	 	 
5922	5923	<~>	<~>
5922	5923	<split-s>	<split-s>
5922	5923	<split-h>	<split-h>
5922	5923	<name2>	<name2>
5922	5926	<aphaerese>	<aphaerese>
5922	5923	<>	<aphaerese>
5922	5923	<elision3>	<elision3>
5922	5923	<>	<elision3>
5922	5923	<elision2>	<elision2>
5922	5923	<>	<elision2>
5922	5923	<elision1>	<elision1>
5922	5923	<>	<elision1>
5922	5935	.	υ
5922	5935	.	u
5922	5929	.	κ
5922	5935	.	α
5922	5935	.	a
5922	5565	<split-s>	<>
5923	5921	.	.
5923	5921	 	 
5923	5921	<~>	<~>
5923	5921	<split-s>	<split-s>
5923	5921	<split-h>	<split-h>
5923	5921	<name2>	<name2>
5923	5924	<aphaerese>	<aphaerese>
5923	5921	<>	<aphaerese>
5923	5921	<elision3>	<elision3>
5923	5921	<>	<elision3>
5923	5921	<elision2>	<elision2>
5923	5921	<>	<elision2>
5923	5921	<elision1>	<elision1>
5923	5921	<>	<elision1>
5923	5933	.	υ
5923	5933	.	u
5923	5927	.	κ
5923	5933	.	α
5923	5933	.	a
5923	5566	<split-s>	<>
5924	5921	.	.
5924	5921	 	 
5924	5921	<~>	<~>
5924	5921	<split-s>	<split-s>
5924	5921	<split-h>	<split-h>
5924	5921	<name2>	<name2>
5924	5925	<>	<name>
5924	5924	<aphaerese>	<aphaerese>
5924	5924	<>	<aphaerese>
5924	5921	<elision3>	<elision3>
5924	5924	<>	<elision3>
5924	5921	<elision2>	<elision2>
5924	5924	<>	<elision2>
5924	5921	<elision1>	<elision1>
5924	5924	<>	<elision1>
5924	5921	.	υ
5924	5921	.	u
5924	5927	.	κ
5924	5921	.	α
5924	5921	.	a
5924	5611	<split-s>	<>
5925	5923	.	.
5925	5923	 	 
5925	5923	<~>	<~>
5925	5923	<split-s>	<split-s>
5925	5923	<split-h>	<split-h>
5925	5923	<name2>	<name2>
5925	5926	<aphaerese>	<aphaerese>
5925	5926	<>	<aphaerese>
5925	5923	<elision3>	<elision3>
5925	5926	<>	<elision3>
5925	5923	<elision2>	<elision2>
5925	5926	<>	<elision2>
5925	5923	<elision1>	<elision1>
5925	5926	<>	<elision1>
5925	5923	.	υ
5925	5923	.	u
5925	5929	.	κ
5925	5923	.	α
5925	5923	.	a
5925	5612	<split-s>	<>
5926	5921	.	.
5926	5921	 	 
5926	5921	<~>	<~>
5926	5921	<split-s>	<split-s>
5926	5921	<split-h>	<split-h>
5926	5921	<name2>	<name2>
5926	5924	<aphaerese>	<aphaerese>
5926	5924	<>	<aphaerese>
5926	5921	<elision3>	<elision3>
5926	5924	<>	<elision3>
5926	5921	<elision2>	<elision2>
5926	5924	<>	<elision2>
5926	5921	<elision1>	<elision1>
5926	5924	<>	<elision1>
5926	5921	.	υ
5926	5921	.	u
5926	5927	.	κ
5926	5921	.	α
5926	5921	.	a
5926	5610	<split-s>	<>
5927	5928	<>	<name>
5927	5927	<>	<aphaerese>
5927	5930	<elision3>	<elision3>
5927	5927	<>	<elision3>
5927	5930	<elision2>	<elision2>
5927	5927	<>	<elision2>
5927	5930	<elision1>	<elision1>
5927	5927	<>	<elision1>
5927	5301	<split-s>	<>
5928	5929	<>	<aphaerese>
5928	5932	<elision3>	<elision3>
5928	5929	<>	<elision3>
5928	5932	<elision2>	<elision2>
5928	5929	<>	<elision2>
5928	5932	<elision1>	<elision1>
5928	5929	<>	<elision1>
5928	5302	<split-s>	<>
5929	5927	<>	<aphaerese>
5929	5930	<elision3>	<elision3>
5929	5927	<>	<elision3>
5929	5930	<elision2>	<elision2>
5929	5927	<>	<elision2>
5929	5930	<elision1>	<elision1>
5929	5927	<>	<elision1>
5929	5300	<split-s>	<>
5930	5931	<>	<name>
5930	5930	<>	<aphaerese>
5930	5930	<>	<elision3>
5930	5930	<>	<elision2>
5930	5930	<>	<elision1>
5930	5298	<split-s>	<>
5931	5932	<>	<aphaerese>
5931	5932	<>	<elision3>
5931	5932	<>	<elision2>
5931	5932	<>	<elision1>
5931	5299	<split-s>	<>
5932	5930	<>	<aphaerese>
5932	5930	<>	<elision3>
5932	5930	<>	<elision2>
5932	5930	<>	<elision1>
5932	5297	<split-s>	<>
5933	5934	<>	<name>
5933	5933	<>	<aphaerese>
5933	5921	<elision3>	<elision3>
5933	5933	<>	<elision3>
5933	5921	<elision2>	<elision2>
5933	5933	<>	<elision2>
5933	5921	<elision1>	<elision1>
5933	5933	<>	<elision1>
5933	5051	<split-s>	<>
5934	5935	<>	<aphaerese>
5934	5923	<elision3>	<elision3>
5934	5935	<>	<elision3>
5934	5923	<elision2>	<elision2>
5934	5935	<>	<elision2>
5934	5923	<elision1>	<elision1>
5934	5935	<>	<elision1>
5934	5052	<split-s>	<>
5935	5933	<>	<aphaerese>
5935	5921	<elision3>	<elision3>
5935	5933	<>	<elision3>
5935	5921	<elision2>	<elision2>
5935	5933	<>	<elision2>
5935	5921	<elision1>	<elision1>
5935	5933	<>	<elision1>
5935	5050	<split-s>	<>
5936	5923	.	.
5936	5923	 	 
5936	5923	<~>	<~>
5936	5923	<split-s>	<split-s>
5936	5923	<split-h>	<split-h>
5936	5923	<name2>	<name2>
5936	5926	<aphaerese>	<aphaerese>
5936	5937	<>	<aphaerese>
5936	5937	<>	<elision3>
5936	5937	<>	<elision2>
5936	5937	<>	<elision1>
5936	5935	.	υ
5936	5935	.	u
5936	5929	.	κ
5936	5935	.	α
5936	5935	.	a
5936	5619	<split-s>	<>
5937	5921	.	.
5937	5921	 	 
5937	5921	<~>	<~>
5937	5921	<split-s>	<split-s>
5937	5921	<split-h>	<split-h>
5937	5921	<name2>	<name2>
5937	5924	<aphaerese>	<aphaerese>
5937	5920	<>	<aphaerese>
5937	5920	<>	<elision3>
5937	5920	<>	<elision2>
5937	5920	<>	<elision1>
5937	5933	.	υ
5937	5933	.	u
5937	5927	.	κ
5937	5933	.	α
5937	5933	.	a
5937	5617	<split-s>	<>
5938	5939	<>	<name>
5938	5938	<>	<aphaerese>
5938	5941	<elision3>	<elision3>
5938	5938	<>	<elision3>
5938	5941	<elision2>	<elision2>
5938	5938	<>	<elision2>
5938	5941	<elision1>	<elision1>
5938	5938	<>	<elision1>
5938	5206	<2s>	<>
5939	5940	<>	<aphaerese>
5939	5943	<elision3>	<elision3>
5939	5940	<>	<elision3>
5939	5943	<elision2>	<elision2>
5939	5940	<>	<elision2>
5939	5943	<elision1>	<elision1>
5939	5940	<>	<elision1>
5939	5207	<2s>	<>
5940	5938	<>	<aphaerese>
5940	5941	<elision3>	<elision3>
5940	5938	<>	<elision3>
5940	5941	<elision2>	<elision2>
5940	5938	<>	<elision2>
5940	5941	<elision1>	<elision1>
5940	5938	<>	<elision1>
5940	5205	<2s>	<>
5941	5942	<>	<name>
5941	5941	<>	<aphaerese>
5941	5941	<>	<elision3>
5941	5941	<>	<elision2>
5941	5941	<>	<elision1>
5941	5944	s	κ
5941	5944	s	k
5941	5947	s	K
5941	5944	s	λ
5941	5944	s	l
5941	5950	s	L
5941	5067	<2s>	<>
5942	5943	<>	<aphaerese>
5942	5943	<>	<elision3>
5942	5943	<>	<elision2>
5942	5943	<>	<elision1>
5942	5946	s	κ
5942	5946	s	k
5942	5949	s	K
5942	5946	s	λ
5942	5946	s	l
5942	5952	s	L
5942	5068	<2s>	<>
5943	5941	<>	<aphaerese>
5943	5941	<>	<elision3>
5943	5941	<>	<elision2>
5943	5941	<>	<elision1>
5943	5944	s	κ
5943	5944	s	k
5943	5947	s	K
5943	5944	s	λ
5943	5944	s	l
5943	5950	s	L
5943	5066	<2s>	<>
5944	5945	<>	<name>
5944	5944	<>	<aphaerese>
5944	5944	<>	<elision3>
5944	5944	<>	<elision2>
5944	5944	<>	<elision1>
5944	5639	<split-s>	<>
5945	5946	<>	<aphaerese>
5945	5946	<>	<elision3>
5945	5946	<>	<elision2>
5945	5946	<>	<elision1>
5945	5640	<split-s>	<>
5946	5944	<>	<aphaerese>
5946	5944	<>	<elision3>
5946	5944	<>	<elision2>
5946	5944	<>	<elision1>
5946	5638	<split-s>	<>
5947	5948	<>	<name>
5947	5947	<>	<aphaerese>
5947	5947	<>	<elision3>
5947	5947	<>	<elision2>
5947	5947	<>	<elision1>
5947	5944	<K2kl>	<>
5948	5949	<>	<aphaerese>
5948	5949	<>	<elision3>
5948	5949	<>	<elision2>
5948	5949	<>	<elision1>
5948	5945	<K2kl>	<>
5949	5947	<>	<aphaerese>
5949	5947	<>	<elision3>
5949	5947	<>	<elision2>
5949	5947	<>	<elision1>
5949	5946	<K2kl>	<>
5950	5951	<>	<name>
5950	5950	<>	<aphaerese>
5950	5950	<>	<elision3>
5950	5950	<>	<elision2>
5950	5950	<>	<elision1>
5950	5944	<L2kl>	<>
5951	5952	<>	<aphaerese>
5951	5952	<>	<elision3>
5951	5952	<>	<elision2>
5951	5952	<>	<elision1>
5951	5945	<L2kl>	<>
5952	5950	<>	<aphaerese>
5952	5950	<>	<elision3>
5952	5950	<>	<elision2>
5952	5950	<>	<elision1>
5952	5946	<L2kl>	<>
5953	5921	.	.
5953	5921	 	 
5953	5921	<~>	<~>
5953	5921	<split-s>	<split-s>
5953	5921	<split-h>	<split-h>
5953	5921	<name2>	<name2>
5953	5954	<>	<name>
5953	5924	<aphaerese>	<aphaerese>
5953	5953	<>	<aphaerese>
5953	5956	<elision3>	<elision3>
5953	5953	<>	<elision3>
5953	5956	<elision2>	<elision2>
5953	5953	<>	<elision2>
5953	5956	<elision1>	<elision1>
5953	5953	<>	<elision1>
5953	5933	.	υ
5953	5933	.	u
5953	5933	.	κ
5953	5933	.	α
5953	5933	.	a
5953	5933	.	λ
5953	5701	<split-s>	<>
5954	5923	.	.
5954	5923	 	 
5954	5923	<~>	<~>
5954	5923	<split-s>	<split-s>
5954	5923	<split-h>	<split-h>
5954	5923	<name2>	<name2>
5954	5926	<aphaerese>	<aphaerese>
5954	5955	<>	<aphaerese>
5954	5958	<elision3>	<elision3>
5954	5955	<>	<elision3>
5954	5958	<elision2>	<elision2>
5954	5955	<>	<elision2>
5954	5958	<elision1>	<elision1>
5954	5955	<>	<elision1>
5954	5935	.	υ
5954	5935	.	u
5954	5935	.	κ
5954	5935	.	α
5954	5935	.	a
5954	5935	.	λ
5954	5702	<split-s>	<>
5955	5921	.	.
5955	5921	 	 
5955	5921	<~>	<~>
5955	5921	<split-s>	<split-s>
5955	5921	<split-h>	<split-h>
5955	5921	<name2>	<name2>
5955	5924	<aphaerese>	<aphaerese>
5955	5953	<>	<aphaerese>
5955	5956	<elision3>	<elision3>
5955	5953	<>	<elision3>
5955	5956	<elision2>	<elision2>
5955	5953	<>	<elision2>
5955	5956	<elision1>	<elision1>
5955	5953	<>	<elision1>
5955	5933	.	υ
5955	5933	.	u
5955	5933	.	κ
5955	5933	.	α
5955	5933	.	a
5955	5933	.	λ
5955	5700	<split-s>	<>
5956	5921	.	.
5956	5921	 	 
5956	5921	<~>	<~>
5956	5921	<split-s>	<split-s>
5956	5921	<split-h>	<split-h>
5956	5921	<name2>	<name2>
5956	5957	<>	<name>
5956	5924	<aphaerese>	<aphaerese>
5956	5956	<>	<aphaerese>
5956	5921	<elision3>	<elision3>
5956	5956	<>	<elision3>
5956	5921	<elision2>	<elision2>
5956	5956	<>	<elision2>
5956	5921	<elision1>	<elision1>
5956	5956	<>	<elision1>
5956	5933	.	υ
5956	5933	.	u
5956	5927	.	κ
5956	5933	.	α
5956	5933	.	a
5956	5698	<split-s>	<>
5957	5923	.	.
5957	5923	 	 
5957	5923	<~>	<~>
5957	5923	<split-s>	<split-s>
5957	5923	<split-h>	<split-h>
5957	5923	<name2>	<name2>
5957	5926	<aphaerese>	<aphaerese>
5957	5958	<>	<aphaerese>
5957	5923	<elision3>	<elision3>
5957	5958	<>	<elision3>
5957	5923	<elision2>	<elision2>
5957	5958	<>	<elision2>
5957	5923	<elision1>	<elision1>
5957	5958	<>	<elision1>
5957	5935	.	υ
5957	5935	.	u
5957	5929	.	κ
5957	5935	.	α
5957	5935	.	a
5957	5699	<split-s>	<>
5958	5921	.	.
5958	5921	 	 
5958	5921	<~>	<~>
5958	5921	<split-s>	<split-s>
5958	5921	<split-h>	<split-h>
5958	5921	<name2>	<name2>
5958	5924	<aphaerese>	<aphaerese>
5958	5956	<>	<aphaerese>
5958	5921	<elision3>	<elision3>
5958	5956	<>	<elision3>
5958	5921	<elision2>	<elision2>
5958	5956	<>	<elision2>
5958	5921	<elision1>	<elision1>
5958	5956	<>	<elision1>
5958	5933	.	υ
5958	5933	.	u
5958	5927	.	κ
5958	5933	.	α
5958	5933	.	a
5958	5697	<split-s>	<>
5959	5921	.	.
5959	5921	 	 
5959	5921	<~>	<~>
5959	5921	<split-s>	<split-s>
5959	5921	<split-h>	<split-h>
5959	5921	<name2>	<name2>
5959	5960	<>	<name>
5959	5924	<aphaerese>	<aphaerese>
5959	5959	<>	<aphaerese>
5959	5921	<elision3>	<elision3>
5959	5959	<>	<elision3>
5959	5921	<elision2>	<elision2>
5959	5959	<>	<elision2>
5959	5921	<elision1>	<elision1>
5959	5959	<>	<elision1>
5959	5933	.	υ
5959	5933	.	u
5959	5933	.	κ
5959	5933	.	α
5959	5933	.	a
5959	5933	.	λ
5959	5722	<split-s>	<>
5960	5923	.	.
5960	5923	 	 
5960	5923	<~>	<~>
5960	5923	<split-s>	<split-s>
5960	5923	<split-h>	<split-h>
5960	5923	<name2>	<name2>
5960	5926	<aphaerese>	<aphaerese>
5960	5961	<>	<aphaerese>
5960	5923	<elision3>	<elision3>
5960	5961	<>	<elision3>
5960	5923	<elision2>	<elision2>
5960	5961	<>	<elision2>
5960	5923	<elision1>	<elision1>
5960	5961	<>	<elision1>
5960	5935	.	υ
5960	5935	.	u
5960	5935	.	κ
5960	5935	.	α
5960	5935	.	a
5960	5935	.	λ
5960	5723	<split-s>	<>
5961	5921	.	.
5961	5921	 	 
5961	5921	<~>	<~>
5961	5921	<split-s>	<split-s>
5961	5921	<split-h>	<split-h>
5961	5921	<name2>	<name2>
5961	5924	<aphaerese>	<aphaerese>
5961	5959	<>	<aphaerese>
5961	5921	<elision3>	<elision3>
5961	5959	<>	<elision3>
5961	5921	<elision2>	<elision2>
5961	5959	<>	<elision2>
5961	5921	<elision1>	<elision1>
5961	5959	<>	<elision1>
5961	5933	.	υ
5961	5933	.	u
5961	5933	.	κ
5961	5933	.	α
5961	5933	.	a
5961	5933	.	λ
5961	5721	<split-s>	<>
5962	5963	<>	<name>
5962	5962	<>	<aphaerese>
5962	5962	<>	<elision3>
5962	5962	<>	<elision2>
5962	5962	<>	<elision1>
5962	5921	<U2kl>	<>
5963	5964	<>	<aphaerese>
5963	5964	<>	<elision3>
5963	5964	<>	<elision2>
5963	5964	<>	<elision1>
5963	5922	<U2kl>	<>
5964	5962	<>	<aphaerese>
5964	5962	<>	<elision3>
5964	5962	<>	<elision2>
5964	5962	<>	<elision1>
5964	5923	<U2kl>	<>
5965	5966	<name>	<name>
5965	5967	<>	<name>
5965	5969	<>	<aphaerese>
5965	5969	<>	<elision3>
5965	5969	<>	<elision2>
5965	5969	<>	<elision1>
5965	5775	<split-s>	<>
5965	5970	<A2kl>	<>
5965	5979	<L2kl>	<>
5965	5991	<K2kl>	<>
5966	5729	<split-s>	<>
5967	5968	<>	<aphaerese>
5967	5968	<>	<elision3>
5967	5968	<>	<elision2>
5967	5968	<>	<elision1>
5967	5971	<A2kl>	<>
5967	5980	<L2kl>	<>
5967	5989	<K2kl>	<>
5968	5969	<>	<aphaerese>
5968	5969	<>	<elision3>
5968	5969	<>	<elision2>
5968	5969	<>	<elision1>
5968	5972	<A2kl>	<>
5968	5981	<L2kl>	<>
5968	5990	<K2kl>	<>
5969	5967	<>	<name>
5969	5969	<>	<aphaerese>
5969	5969	<>	<elision3>
5969	5969	<>	<elision2>
5969	5969	<>	<elision1>
5969	5970	<A2kl>	<>
5969	5979	<L2kl>	<>
5969	5988	<K2kl>	<>
5970	5971	<>	<name>
5970	5970	<>	<aphaerese>
5970	5970	<>	<elision3>
5970	5970	<>	<elision2>
5970	5970	<>	<elision1>
5970	5973	.	κ
5970	5973	.	λ
5970	5749	<split-s>	<>
5971	5972	<>	<aphaerese>
5971	5972	<>	<elision3>
5971	5972	<>	<elision2>
5971	5972	<>	<elision1>
5971	5975	.	κ
5971	5975	.	λ
5971	5750	<split-s>	<>
5972	5970	<>	<aphaerese>
5972	5970	<>	<elision3>
5972	5970	<>	<elision2>
5972	5970	<>	<elision1>
5972	5973	.	κ
5972	5973	.	λ
5972	5748	<split-s>	<>
5973	5974	<>	<name>
5973	5973	<>	<aphaerese>
5973	5976	<elision3>	<elision3>
5973	5973	<>	<elision3>
5973	5976	<elision2>	<elision2>
5973	5973	<>	<elision2>
5973	5976	<elision1>	<elision1>
5973	5973	<>	<elision1>
5973	5746	<split-s>	<>
5974	5975	<>	<aphaerese>
5974	5978	<elision3>	<elision3>
5974	5975	<>	<elision3>
5974	5978	<elision2>	<elision2>
5974	5975	<>	<elision2>
5974	5978	<elision1>	<elision1>
5974	5975	<>	<elision1>
5974	5747	<split-s>	<>
5975	5973	<>	<aphaerese>
5975	5976	<elision3>	<elision3>
5975	5973	<>	<elision3>
5975	5976	<elision2>	<elision2>
5975	5973	<>	<elision2>
5975	5976	<elision1>	<elision1>
5975	5973	<>	<elision1>
5975	5745	<split-s>	<>
5976	5921	.	.
5976	5921	 	 
5976	5921	<~>	<~>
5976	5921	<split-s>	<split-s>
5976	5921	<split-h>	<split-h>
5976	5921	<name2>	<name2>
5976	5977	<>	<name>
5976	5924	<aphaerese>	<aphaerese>
5976	5976	<>	<aphaerese>
5976	5921	<elision3>	<elision3>
5976	5976	<>	<elision3>
5976	5921	<elision2>	<elision2>
5976	5976	<>	<elision2>
5976	5921	<elision1>	<elision1>
5976	5976	<>	<elision1>
5976	5933	.	υ
5976	5933	.	u
5976	5933	.	α
5976	5933	.	a
5976	5743	<split-s>	<>
5977	5923	.	.
5977	5923	 	 
5977	5923	<~>	<~>
5977	5923	<split-s>	<split-s>
5977	5923	<split-h>	<split-h>
5977	5923	<name2>	<name2>
5977	5926	<aphaerese>	<aphaerese>
5977	5978	<>	<aphaerese>
5977	5923	<elision3>	<elision3>
5977	5978	<>	<elision3>
5977	5923	<elision2>	<elision2>
5977	5978	<>	<elision2>
5977	5923	<elision1>	<elision1>
5977	5978	<>	<elision1>
5977	5935	.	υ
5977	5935	.	u
5977	5935	.	α
5977	5935	.	a
5977	5744	<split-s>	<>
5978	5921	.	.
5978	5921	 	 
5978	5921	<~>	<~>
5978	5921	<split-s>	<split-s>
5978	5921	<split-h>	<split-h>
5978	5921	<name2>	<name2>
5978	5924	<aphaerese>	<aphaerese>
5978	5976	<>	<aphaerese>
5978	5921	<elision3>	<elision3>
5978	5976	<>	<elision3>
5978	5921	<elision2>	<elision2>
5978	5976	<>	<elision2>
5978	5921	<elision1>	<elision1>
5978	5976	<>	<elision1>
5978	5933	.	υ
5978	5933	.	u
5978	5933	.	α
5978	5933	.	a
5978	5742	<split-s>	<>
5979	5980	<>	<name>
5979	5979	<>	<aphaerese>
5979	5979	<>	<elision3>
5979	5979	<>	<elision2>
5979	5979	<>	<elision1>
5979	5982	.	κ
5979	5982	.	λ
5979	5767	<split-s>	<>
5980	5981	<>	<aphaerese>
5980	5981	<>	<elision3>
5980	5981	<>	<elision2>
5980	5981	<>	<elision1>
5980	5984	.	κ
5980	5984	.	λ
5980	5768	<split-s>	<>
5981	5979	<>	<aphaerese>
5981	5979	<>	<elision3>
5981	5979	<>	<elision2>
5981	5979	<>	<elision1>
5981	5982	.	κ
5981	5982	.	λ
5981	5766	<split-s>	<>
5982	5983	<>	<name>
5982	5982	<>	<aphaerese>
5982	5985	<elision3>	<elision3>
5982	5982	<>	<elision3>
5982	5985	<elision2>	<elision2>
5982	5982	<>	<elision2>
5982	5985	<elision1>	<elision1>
5982	5982	<>	<elision1>
5982	5764	<split-s>	<>
5983	5984	<>	<aphaerese>
5983	5987	<elision3>	<elision3>
5983	5984	<>	<elision3>
5983	5987	<elision2>	<elision2>
5983	5984	<>	<elision2>
5983	5987	<elision1>	<elision1>
5983	5984	<>	<elision1>
5983	5765	<split-s>	<>
5984	5982	<>	<aphaerese>
5984	5985	<elision3>	<elision3>
5984	5982	<>	<elision3>
5984	5985	<elision2>	<elision2>
5984	5982	<>	<elision2>
5984	5985	<elision1>	<elision1>
5984	5982	<>	<elision1>
5984	5763	<split-s>	<>
5985	5986	<>	<name>
5985	5985	<>	<aphaerese>
5985	5985	<>	<elision3>
5985	5985	<>	<elision2>
5985	5985	<>	<elision1>
5985	5927	.	κ
5985	5761	<split-s>	<>
5986	5987	<>	<aphaerese>
5986	5987	<>	<elision3>
5986	5987	<>	<elision2>
5986	5987	<>	<elision1>
5986	5929	.	κ
5986	5762	<split-s>	<>
5987	5985	<>	<aphaerese>
5987	5985	<>	<elision3>
5987	5985	<>	<elision2>
5987	5985	<>	<elision1>
5987	5927	.	κ
5987	5760	<split-s>	<>
5988	5921	.	.
5988	5921	 	 
5988	5921	<~>	<~>
5988	5921	<split-s>	<split-s>
5988	5921	<split-h>	<split-h>
5988	5921	<name2>	<name2>
5988	5989	<>	<name>
5988	5924	<aphaerese>	<aphaerese>
5988	5988	<>	<aphaerese>
5988	5921	<elision3>	<elision3>
5988	5988	<>	<elision3>
5988	5921	<elision2>	<elision2>
5988	5988	<>	<elision2>
5988	5921	<elision1>	<elision1>
5988	5988	<>	<elision1>
5988	5933	.	υ
5988	5933	.	u
5988	5933	.	α
5988	5933	.	a
5988	5773	<split-s>	<>
5989	5923	.	.
5989	5923	 	 
5989	5923	<~>	<~>
5989	5923	<split-s>	<split-s>
5989	5923	<split-h>	<split-h>
5989	5923	<name2>	<name2>
5989	5926	<aphaerese>	<aphaerese>
5989	5990	<>	<aphaerese>
5989	5923	<elision3>	<elision3>
5989	5990	<>	<elision3>
5989	5923	<elision2>	<elision2>
5989	5990	<>	<elision2>
5989	5923	<elision1>	<elision1>
5989	5990	<>	<elision1>
5989	5935	.	υ
5989	5935	.	u
5989	5935	.	α
5989	5935	.	a
5989	5774	<split-s>	<>
5990	5921	.	.
5990	5921	 	 
5990	5921	<~>	<~>
5990	5921	<split-s>	<split-s>
5990	5921	<split-h>	<split-h>
5990	5921	<name2>	<name2>
5990	5924	<aphaerese>	<aphaerese>
5990	5988	<>	<aphaerese>
5990	5921	<elision3>	<elision3>
5990	5988	<>	<elision3>
5990	5921	<elision2>	<elision2>
5990	5988	<>	<elision2>
5990	5921	<elision1>	<elision1>
5990	5988	<>	<elision1>
5990	5933	.	υ
5990	5933	.	u
5990	5933	.	α
5990	5933	.	a
5990	5772	<split-s>	<>
5991	5921	.	.
5991	5921	 	 
5991	5921	<~>	<~>
5991	5921	<split-s>	<split-s>
5991	5921	<split-h>	<split-h>
5991	5921	<name2>	<name2>
5991	5966	<name2>	<name>
5991	5989	<>	<name>
5991	5924	<aphaerese>	<aphaerese>
5991	5988	<>	<aphaerese>
5991	5921	<elision3>	<elision3>
5991	5988	<>	<elision3>
5991	5921	<elision2>	<elision2>
5991	5988	<>	<elision2>
5991	5921	<elision1>	<elision1>
5991	5988	<>	<elision1>
5991	5933	.	υ
5991	5933	.	u
5991	5933	.	α
5991	5933	.	a
5991	5778	<split-s>	<>
5992	5993	<>	<name>
5992	5992	<>	<aphaerese>
5992	5992	<>	<elision3>
5992	5992	<>	<elision2>
5992	5992	<>	<elision1>
5992	5921	<A2kl>	<>
5993	5994	<>	<aphaerese>
5993	5994	<>	<elision3>
5993	5994	<>	<elision2>
5993	5994	<>	<elision1>
5993	5922	<A2kl>	<>
5994	5992	<>	<aphaerese>
5994	5992	<>	<elision3>
5994	5992	<>	<elision2>
5994	5992	<>	<elision1>
5994	5923	<A2kl>	<>
5995	5966	<name>	<name>
5995	5996	<>	<name>
5995	5998	<>	<aphaerese>
5995	5998	<>	<elision3>
5995	5998	<>	<elision2>
5995	5998	<>	<elision1>
5995	5775	<split-s>	<>
5995	5970	<A2kl>	<>
5995	6002	<L2kl>	<>
5996	5997	<>	<aphaerese>
5996	5997	<>	<elision3>
5996	5997	<>	<elision2>
5996	5997	<>	<elision1>
5996	5971	<A2kl>	<>
5996	6000	<L2kl>	<>
5997	5998	<>	<aphaerese>
5997	5998	<>	<elision3>
5997	5998	<>	<elision2>
5997	5998	<>	<elision1>
5997	5972	<A2kl>	<>
5997	6001	<L2kl>	<>
5998	5996	<>	<name>
5998	5998	<>	<aphaerese>
5998	5998	<>	<elision3>
5998	5998	<>	<elision2>
5998	5998	<>	<elision1>
5998	5970	<A2kl>	<>
5998	5999	<L2kl>	<>
5999	5921	.	.
5999	5921	 	 
5999	5921	<~>	<~>
5999	5921	<split-s>	<split-s>
5999	5921	<split-h>	<split-h>
5999	5921	<name2>	<name2>
5999	6000	<>	<name>
5999	5924	<aphaerese>	<aphaerese>
5999	5999	<>	<aphaerese>
5999	5921	<elision3>	<elision3>
5999	5999	<>	<elision3>
5999	5921	<elision2>	<elision2>
5999	5999	<>	<elision2>
5999	5921	<elision1>	<elision1>
5999	5999	<>	<elision1>
5999	5933	.	υ
5999	5933	.	u
5999	5982	.	κ
5999	5933	.	α
5999	5933	.	a
5999	5982	.	λ
5999	5799	<split-s>	<>
6000	5923	.	.
6000	5923	 	 
6000	5923	<~>	<~>
6000	5923	<split-s>	<split-s>
6000	5923	<split-h>	<split-h>
6000	5923	<name2>	<name2>
6000	5926	<aphaerese>	<aphaerese>
6000	6001	<>	<aphaerese>
6000	5923	<elision3>	<elision3>
6000	6001	<>	<elision3>
6000	5923	<elision2>	<elision2>
6000	6001	<>	<elision2>
6000	5923	<elision1>	<elision1>
6000	6001	<>	<elision1>
6000	5935	.	υ
6000	5935	.	u
6000	5984	.	κ
6000	5935	.	α
6000	5935	.	a
6000	5984	.	λ
6000	5800	<split-s>	<>
6001	5921	.	.
6001	5921	 	 
6001	5921	<~>	<~>
6001	5921	<split-s>	<split-s>
6001	5921	<split-h>	<split-h>
6001	5921	<name2>	<name2>
6001	5924	<aphaerese>	<aphaerese>
6001	5999	<>	<aphaerese>
6001	5921	<elision3>	<elision3>
6001	5999	<>	<elision3>
6001	5921	<elision2>	<elision2>
6001	5999	<>	<elision2>
6001	5921	<elision1>	<elision1>
6001	5999	<>	<elision1>
6001	5933	.	υ
6001	5933	.	u
6001	5982	.	κ
6001	5933	.	α
6001	5933	.	a
6001	5982	.	λ
6001	5798	<split-s>	<>
6002	5921	.	.
6002	5921	 	 
6002	5921	<~>	<~>
6002	5921	<split-s>	<split-s>
6002	5921	<split-h>	<split-h>
6002	5921	<name2>	<name2>
6002	5966	<name2>	<name>
6002	6000	<>	<name>
6002	5924	<aphaerese>	<aphaerese>
6002	5999	<>	<aphaerese>
6002	5921	<elision3>	<elision3>
6002	5999	<>	<elision3>
6002	5921	<elision2>	<elision2>
6002	5999	<>	<elision2>
6002	5921	<elision1>	<elision1>
6002	5999	<>	<elision1>
6002	5933	.	υ
6002	5933	.	u
6002	5982	.	κ
6002	5933	.	α
6002	5933	.	a
6002	5982	.	λ
6002	5802	<split-s>	<>
6003	5921	.	.
6003	5921	 	 
6003	5921	<~>	<~>
6003	5921	<split-s>	<split-s>
6003	5921	<split-h>	<split-h>
6003	5921	<name2>	<name2>
6003	5936	<>	<name>
6003	5924	<aphaerese>	<aphaerese>
6003	5920	<>	<aphaerese>
6003	5920	<>	<elision3>
6003	5920	<>	<elision2>
6003	5920	<>	<elision1>
6003	5933	.	υ
6003	5933	.	u
6003	5927	.	κ
6003	5933	.	α
6003	5933	.	a
6003	5804	<split-s>	<>
6004	5921	.	.
6004	5921	 	 
6004	5921	<~>	<~>
6004	5921	<split-s>	<split-s>
6004	5921	<split-h>	<split-h>
6004	5921	<name2>	<name2>
6004	5954	<>	<name>
6004	5924	<aphaerese>	<aphaerese>
6004	5953	<>	<aphaerese>
6004	5956	<elision3>	<elision3>
6004	5953	<>	<elision3>
6004	5956	<elision2>	<elision2>
6004	5953	<>	<elision2>
6004	5956	<elision1>	<elision1>
6004	5953	<>	<elision1>
6004	5933	.	υ
6004	5933	.	u
6004	5933	.	κ
6004	5933	.	α
6004	5933	.	a
6004	5933	.	λ
6004	5806	<split-s>	<>
6005	5921	.	.
6005	5921	 	 
6005	5921	<~>	<~>
6005	5921	<split-s>	<split-s>
6005	5921	<split-h>	<split-h>
6005	5921	<name2>	<name2>
6005	5960	<>	<name>
6005	5924	<aphaerese>	<aphaerese>
6005	5959	<>	<aphaerese>
6005	5921	<elision3>	<elision3>
6005	5959	<>	<elision3>
6005	5921	<elision2>	<elision2>
6005	5959	<>	<elision2>
6005	5921	<elision1>	<elision1>
6005	5959	<>	<elision1>
6005	5933	.	υ
6005	5933	.	u
6005	5933	.	κ
6005	5933	.	α
6005	5933	.	a
6005	5933	.	λ
6005	5808	<split-s>	<>
6006	5963	<>	<name>
6006	5962	<>	<aphaerese>
6006	5962	<>	<elision3>
6006	5962	<>	<elision2>
6006	5962	<>	<elision1>
6006	6007	<U2kl>	<>
6007	5921	.	.
6007	5921	 	 
6007	5921	<~>	<~>
6007	5921	<split-s>	<split-s>
6007	5921	<split-h>	<split-h>
6007	5921	<name2>	<name2>
6007	5922	<>	<name>
6007	5924	<aphaerese>	<aphaerese>
6007	5921	<>	<aphaerese>
6007	5921	<elision3>	<elision3>
6007	5921	<>	<elision3>
6007	5921	<elision2>	<elision2>
6007	5921	<>	<elision2>
6007	5921	<elision1>	<elision1>
6007	5921	<>	<elision1>
6007	5933	.	υ
6007	5933	.	u
6007	5927	.	κ
6007	5933	.	α
6007	5933	.	a
6007	5811	<split-s>	<>
6008	5966	<name>	<name>
6008	5967	<>	<name>
6008	5969	<>	<aphaerese>
6008	5969	<>	<elision3>
6008	5969	<>	<elision2>
6008	5969	<>	<elision1>
6008	5775	<split-s>	<>
6008	5970	<A2kl>	<>
6008	5979	<L2kl>	<>
6008	6009	<K2kl>	<>
6009	5921	.	.
6009	5921	 	 
6009	5921	<~>	<~>
6009	5921	<split-s>	<split-s>
6009	5921	<split-h>	<split-h>
6009	5921	<name2>	<name2>
6009	5966	<name2>	<name>
6009	5989	<>	<name>
6009	5924	<aphaerese>	<aphaerese>
6009	5988	<>	<aphaerese>
6009	5921	<elision3>	<elision3>
6009	5988	<>	<elision3>
6009	5921	<elision2>	<elision2>
6009	5988	<>	<elision2>
6009	5921	<elision1>	<elision1>
6009	5988	<>	<elision1>
6009	5933	.	υ
6009	5933	.	u
6009	5933	.	α
6009	5933	.	a
6009	5814	<split-s>	<>
6010	5993	<>	<name>
6010	5992	<>	<aphaerese>
6010	5992	<>	<elision3>
6010	5992	<>	<elision2>
6010	5992	<>	<elision1>
6010	6007	<A2kl>	<>
6011	5966	<name>	<name>
6011	5996	<>	<name>
6011	5998	<>	<aphaerese>
6011	5998	<>	<elision3>
6011	5998	<>	<elision2>
6011	5998	<>	<elision1>
6011	5775	<split-s>	<>
6011	5970	<A2kl>	<>
6011	6012	<L2kl>	<>
6012	5921	.	.
6012	5921	 	 
6012	5921	<~>	<~>
6012	5921	<split-s>	<split-s>
6012	5921	<split-h>	<split-h>
6012	5921	<name2>	<name2>
6012	5966	<name2>	<name>
6012	6000	<>	<name>
6012	5924	<aphaerese>	<aphaerese>
6012	5999	<>	<aphaerese>
6012	5921	<elision3>	<elision3>
6012	5999	<>	<elision3>
6012	5921	<elision2>	<elision2>
6012	5999	<>	<elision2>
6012	5921	<elision1>	<elision1>
6012	5999	<>	<elision1>
6012	5933	.	υ
6012	5933	.	u
6012	5982	.	κ
6012	5933	.	α
6012	5933	.	a
6012	5982	.	λ
6012	5821	<split-s>	<>
6013	5909	.	.
6013	5910	 	 
6013	5909	<~>	<~>
6013	5909	<split-s>	<split-s>
6013	5909	<split-h>	<split-h>
6013	5909	<name2>	<name2>
6013	5913	<aphaerese>	<aphaerese>
6013	5913	<>	<aphaerese>
6013	5909	<elision3>	<elision3>
6013	5913	<>	<elision3>
6013	5909	<elision2>	<elision2>
6013	5913	<>	<elision2>
6013	5909	<elision1>	<elision1>
6013	5913	<>	<elision1>
6013	5909	.	υ
6013	5909	.	u
6013	5938	.	κ
6013	5953	s	κ
6013	5959	s	k
6013	5962	s	U
6013	6014	s	K
6013	5909	.	α
6013	5909	.	a
6013	5992	s	A
6013	5959	s	λ
6013	5959	s	l
6013	6021	s	L
6013	5208	<2s>	<>
6014	5966	<name>	<name>
6014	6015	<>	<name>
6014	6017	<>	<aphaerese>
6014	6017	<>	<elision3>
6014	6017	<>	<elision2>
6014	6017	<>	<elision1>
6014	5775	<split-s>	<>
6014	6018	<L2kl>	<>
6014	5991	<K2kl>	<>
6015	6016	<>	<aphaerese>
6015	6016	<>	<elision3>
6015	6016	<>	<elision2>
6015	6016	<>	<elision1>
6015	6019	<L2kl>	<>
6015	5989	<K2kl>	<>
6016	6017	<>	<aphaerese>
6016	6017	<>	<elision3>
6016	6017	<>	<elision2>
6016	6017	<>	<elision1>
6016	6020	<L2kl>	<>
6016	5990	<K2kl>	<>
6017	6015	<>	<name>
6017	6017	<>	<aphaerese>
6017	6017	<>	<elision3>
6017	6017	<>	<elision2>
6017	6017	<>	<elision1>
6017	6018	<L2kl>	<>
6017	5988	<K2kl>	<>
6018	6019	<>	<name>
6018	6018	<>	<aphaerese>
6018	6018	<>	<elision3>
6018	6018	<>	<elision2>
6018	6018	<>	<elision1>
6018	5933	.	κ
6018	5933	.	λ
6018	5831	<split-s>	<>
6019	6020	<>	<aphaerese>
6019	6020	<>	<elision3>
6019	6020	<>	<elision2>
6019	6020	<>	<elision1>
6019	5935	.	κ
6019	5935	.	λ
6019	5832	<split-s>	<>
6020	6018	<>	<aphaerese>
6020	6018	<>	<elision3>
6020	6018	<>	<elision2>
6020	6018	<>	<elision1>
6020	5933	.	κ
6020	5933	.	λ
6020	5830	<split-s>	<>
6021	5966	<name>	<name>
6021	6022	<>	<name>
6021	6024	<>	<aphaerese>
6021	6024	<>	<elision3>
6021	6024	<>	<elision2>
6021	6024	<>	<elision1>
6021	5775	<split-s>	<>
6021	6025	<L2kl>	<>
6022	6023	<>	<aphaerese>
6022	6023	<>	<elision3>
6022	6023	<>	<elision2>
6022	6023	<>	<elision1>
6022	5960	<L2kl>	<>
6023	6024	<>	<aphaerese>
6023	6024	<>	<elision3>
6023	6024	<>	<elision2>
6023	6024	<>	<elision1>
6023	5961	<L2kl>	<>
6024	6022	<>	<name>
6024	6024	<>	<aphaerese>
6024	6024	<>	<elision3>
6024	6024	<>	<elision2>
6024	6024	<>	<elision1>
6024	5959	<L2kl>	<>
6025	5921	.	.
6025	5921	 	 
6025	5921	<~>	<~>
6025	5921	<split-s>	<split-s>
6025	5921	<split-h>	<split-h>
6025	5921	<name2>	<name2>
6025	5966	<name2>	<name>
6025	5960	<>	<name>
6025	5924	<aphaerese>	<aphaerese>
6025	5959	<>	<aphaerese>
6025	5921	<elision3>	<elision3>
6025	5959	<>	<elision3>
6025	5921	<elision2>	<elision2>
6025	5959	<>	<elision2>
6025	5921	<elision1>	<elision1>
6025	5959	<>	<elision1>
6025	5933	.	υ
6025	5933	.	u
6025	5933	.	κ
6025	5933	.	α
6025	5933	.	a
6025	5933	.	λ
6025	5838	<split-s>	<>
6026	5909	.	.
6026	5910	 	 
6026	5909	<~>	<~>
6026	5909	<split-s>	<split-s>
6026	5909	<split-h>	<split-h>
6026	5909	<name2>	<name2>
6026	5913	<aphaerese>	<aphaerese>
6026	5916	<>	<aphaerese>
6026	5909	<elision3>	<elision3>
6026	5916	<>	<elision3>
6026	5909	<elision2>	<elision2>
6026	5916	<>	<elision2>
6026	5909	<elision1>	<elision1>
6026	5916	<>	<elision1>
6026	5917	.	υ
6026	5920	s	υ
6026	5917	.	u
6026	5920	s	u
6026	5938	.	κ
6026	5953	s	κ
6026	5959	s	k
6026	5962	s	U
6026	5965	s	K
6026	5917	.	α
6026	5920	s	α
6026	5917	.	a
6026	5920	s	a
6026	5992	s	A
6026	5959	s	λ
6026	5959	s	l
6026	5995	s	L
6026	5221	<2s>	<>
6027	5912	.	.
6027	5915	 	 
6027	5912	<~>	<~>
6027	5912	<split-s>	<split-s>
6027	5912	<split-h>	<split-h>
6027	5912	<name2>	<name2>
6027	6013	<aphaerese>	<aphaerese>
6027	5912	<>	<aphaerese>
6027	5912	<elision3>	<elision3>
6027	5912	<>	<elision3>
6027	5912	<elision2>	<elision2>
6027	5912	<>	<elision2>
6027	5912	<elision1>	<elision1>
6027	5912	<>	<elision1>
6027	5919	.	υ
6027	5937	s	υ
6027	5919	.	u
6027	5937	s	u
6027	5940	.	κ
6027	5955	s	κ
6027	5961	s	k
6027	5964	s	U
6027	6016	s	K
6027	5919	.	α
6027	5937	s	α
6027	5919	.	a
6027	5937	s	a
6027	5994	s	A
6027	5961	s	λ
6027	5961	s	l
6027	6023	s	L
6027	5223	<2s>	<>
6028	5912	.	.
6028	5915	 	 
6028	5912	<~>	<~>
6028	5912	<split-s>	<split-s>
6028	5912	<split-h>	<split-h>
6028	5912	<name2>	<name2>
6028	6013	<aphaerese>	<aphaerese>
6028	6029	<>	<aphaerese>
6028	6029	<>	<elision3>
6028	6029	<>	<elision2>
6028	6029	<>	<elision1>
6028	5919	.	υ
6028	5937	s	υ
6028	5919	.	u
6028	5937	s	u
6028	5919	.	κ
6028	6032	s	κ
6028	5961	s	k
6028	5964	s	U
6028	6016	s	K
6028	5919	.	α
6028	5937	s	α
6028	5919	.	a
6028	5937	s	a
6028	5994	s	A
6028	5919	.	λ
6028	6032	s	λ
6028	5961	s	l
6028	6023	s	L
6028	5634	<2s>	<>
6029	5909	.	.
6029	5910	 	 
6029	5909	<~>	<~>
6029	5909	<split-s>	<split-s>
6029	5909	<split-h>	<split-h>
6029	5909	<name2>	<name2>
6029	5913	<aphaerese>	<aphaerese>
6029	5908	<>	<aphaerese>
6029	5908	<>	<elision3>
6029	5908	<>	<elision2>
6029	5908	<>	<elision1>
6029	5917	.	υ
6029	5920	s	υ
6029	5917	.	u
6029	5920	s	u
6029	5917	.	κ
6029	6030	s	κ
6029	5959	s	k
6029	5962	s	U
6029	6014	s	K
6029	5917	.	α
6029	5920	s	α
6029	5917	.	a
6029	5920	s	a
6029	5992	s	A
6029	5917	.	λ
6029	6030	s	λ
6029	5959	s	l
6029	6021	s	L
6029	5632	<2s>	<>
6030	5921	.	.
6030	5921	 	 
6030	5921	<~>	<~>
6030	5921	<split-s>	<split-s>
6030	5921	<split-h>	<split-h>
6030	5921	<name2>	<name2>
6030	6031	<>	<name>
6030	5924	<aphaerese>	<aphaerese>
6030	6030	<>	<aphaerese>
6030	6030	<>	<elision3>
6030	6030	<>	<elision2>
6030	6030	<>	<elision1>
6030	5933	.	υ
6030	5933	.	u
6030	5933	.	κ
6030	5933	.	α
6030	5933	.	a
6030	5933	.	λ
6030	5847	<split-s>	<>
6031	5923	.	.
6031	5923	 	 
6031	5923	<~>	<~>
6031	5923	<split-s>	<split-s>
6031	5923	<split-h>	<split-h>
6031	5923	<name2>	<name2>
6031	5926	<aphaerese>	<aphaerese>
6031	6032	<>	<aphaerese>
6031	6032	<>	<elision3>
6031	6032	<>	<elision2>
6031	6032	<>	<elision1>
6031	5935	.	υ
6031	5935	.	u
6031	5935	.	κ
6031	5935	.	α
6031	5935	.	a
6031	5935	.	λ
6031	5848	<split-s>	<>
6032	5921	.	.
6032	5921	 	 
6032	5921	<~>	<~>
6032	5921	<split-s>	<split-s>
6032	5921	<split-h>	<split-h>
6032	5921	<name2>	<name2>
6032	5924	<aphaerese>	<aphaerese>
6032	6030	<>	<aphaerese>
6032	6030	<>	<elision3>
6032	6030	<>	<elision2>
6032	6030	<>	<elision1>
6032	5933	.	υ
6032	5933	.	u
6032	5933	.	κ
6032	5933	.	α
6032	5933	.	a
6032	5933	.	λ
6032	5846	<split-s>	<>
6033	5909	.	.
6033	5910	 	 
6033	5909	<~>	<~>
6033	5909	<split-s>	<split-s>
6033	5909	<split-h>	<split-h>
6033	5909	<name2>	<name2>
6033	6034	<>	<name>
6033	5913	<aphaerese>	<aphaerese>
6033	6033	<>	<aphaerese>
6033	5909	<elision3>	<elision3>
6033	6033	<>	<elision3>
6033	5909	<elision2>	<elision2>
6033	6033	<>	<elision2>
6033	5909	<elision1>	<elision1>
6033	6033	<>	<elision1>
6033	5917	.	υ
6033	5920	s	υ
6033	5917	.	u
6033	5920	s	u
6033	6036	.	κ
6033	6030	s	κ
6033	5959	s	k
6033	5962	s	U
6033	6014	s	K
6033	5917	.	α
6033	5920	s	α
6033	5917	.	a
6033	5920	s	a
6033	5992	s	A
6033	6036	.	λ
6033	6030	s	λ
6033	5959	s	l
6033	6021	s	L
6033	5419	<2s>	<>
6034	5912	.	.
6034	5915	 	 
6034	5912	<~>	<~>
6034	5912	<split-s>	<split-s>
6034	5912	<split-h>	<split-h>
6034	5912	<name2>	<name2>
6034	6013	<aphaerese>	<aphaerese>
6034	6035	<>	<aphaerese>
6034	5912	<elision3>	<elision3>
6034	6035	<>	<elision3>
6034	5912	<elision2>	<elision2>
6034	6035	<>	<elision2>
6034	5912	<elision1>	<elision1>
6034	6035	<>	<elision1>
6034	5919	.	υ
6034	5937	s	υ
6034	5919	.	u
6034	5937	s	u
6034	6038	.	κ
6034	6032	s	κ
6034	5961	s	k
6034	5964	s	U
6034	6016	s	K
6034	5919	.	α
6034	5937	s	α
6034	5919	.	a
6034	5937	s	a
6034	5994	s	A
6034	6038	.	λ
6034	6032	s	λ
6034	5961	s	l
6034	6023	s	L
6034	5420	<2s>	<>
6035	5909	.	.
6035	5910	 	 
6035	5909	<~>	<~>
6035	5909	<split-s>	<split-s>
6035	5909	<split-h>	<split-h>
6035	5909	<name2>	<name2>
6035	5913	<aphaerese>	<aphaerese>
6035	6033	<>	<aphaerese>
6035	5909	<elision3>	<elision3>
6035	6033	<>	<elision3>
6035	5909	<elision2>	<elision2>
6035	6033	<>	<elision2>
6035	5909	<elision1>	<elision1>
6035	6033	<>	<elision1>
6035	5917	.	υ
6035	5920	s	υ
6035	5917	.	u
6035	5920	s	u
6035	6036	.	κ
6035	6030	s	κ
6035	5959	s	k
6035	5962	s	U
6035	6014	s	K
6035	5917	.	α
6035	5920	s	α
6035	5917	.	a
6035	5920	s	a
6035	5992	s	A
6035	6036	.	λ
6035	6030	s	λ
6035	5959	s	l
6035	6021	s	L
6035	5418	<2s>	<>
6036	6037	<>	<name>
6036	6036	<>	<aphaerese>
6036	6039	<elision3>	<elision3>
6036	6036	<>	<elision3>
6036	6039	<elision2>	<elision2>
6036	6036	<>	<elision2>
6036	6039	<elision1>	<elision1>
6036	6036	<>	<elision1>
6036	176	<2s>	<>
6037	6038	<>	<aphaerese>
6037	6041	<elision3>	<elision3>
6037	6038	<>	<elision3>
6037	6041	<elision2>	<elision2>
6037	6038	<>	<elision2>
6037	6041	<elision1>	<elision1>
6037	6038	<>	<elision1>
6037	177	<2s>	<>
6038	6036	<>	<aphaerese>
6038	6039	<elision3>	<elision3>
6038	6036	<>	<elision3>
6038	6039	<elision2>	<elision2>
6038	6036	<>	<elision2>
6038	6039	<elision1>	<elision1>
6038	6036	<>	<elision1>
6038	175	<2s>	<>
6039	6039	.	.
6039	6039	 	 
6039	6039	<~>	<~>
6039	6039	<split-s>	<split-s>
6039	6039	<split-h>	<split-h>
6039	6039	<name2>	<name2>
6039	6040	<>	<name>
6039	6042	<aphaerese>	<aphaerese>
6039	6039	<>	<aphaerese>
6039	6039	<elision3>	<elision3>
6039	6039	<>	<elision3>
6039	6039	<elision2>	<elision2>
6039	6039	<>	<elision2>
6039	6039	<elision1>	<elision1>
6039	6039	<>	<elision1>
6039	6036	.	υ
6039	6036	.	u
6039	6045	.	κ
6039	6036	.	α
6039	6036	.	a
6039	5222	<2s>	<>
6040	6041	.	.
6040	6041	 	 
6040	6041	<~>	<~>
6040	6041	<split-s>	<split-s>
6040	6041	<split-h>	<split-h>
6040	6041	<name2>	<name2>
6040	6044	<aphaerese>	<aphaerese>
6040	6041	<>	<aphaerese>
6040	6041	<elision3>	<elision3>
6040	6041	<>	<elision3>
6040	6041	<elision2>	<elision2>
6040	6041	<>	<elision2>
6040	6041	<elision1>	<elision1>
6040	6041	<>	<elision1>
6040	6038	.	υ
6040	6038	.	u
6040	6047	.	κ
6040	6038	.	α
6040	6038	.	a
6040	5223	<2s>	<>
6041	6039	.	.
6041	6039	 	 
6041	6039	<~>	<~>
6041	6039	<split-s>	<split-s>
6041	6039	<split-h>	<split-h>
6041	6039	<name2>	<name2>
6041	6042	<aphaerese>	<aphaerese>
6041	6039	<>	<aphaerese>
6041	6039	<elision3>	<elision3>
6041	6039	<>	<elision3>
6041	6039	<elision2>	<elision2>
6041	6039	<>	<elision2>
6041	6039	<elision1>	<elision1>
6041	6039	<>	<elision1>
6041	6036	.	υ
6041	6036	.	u
6041	6045	.	κ
6041	6036	.	α
6041	6036	.	a
6041	5221	<2s>	<>
6042	6039	.	.
6042	6039	 	 
6042	6039	<~>	<~>
6042	6039	<split-s>	<split-s>
6042	6039	<split-h>	<split-h>
6042	6039	<name2>	<name2>
6042	6043	<>	<name>
6042	6042	<aphaerese>	<aphaerese>
6042	6042	<>	<aphaerese>
6042	6039	<elision3>	<elision3>
6042	6042	<>	<elision3>
6042	6039	<elision2>	<elision2>
6042	6042	<>	<elision2>
6042	6039	<elision1>	<elision1>
6042	6042	<>	<elision1>
6042	6039	.	υ
6042	6039	.	u
6042	6045	.	κ
6042	6039	.	α
6042	6039	.	a
6042	5209	<2s>	<>
6043	6041	.	.
6043	6041	 	 
6043	6041	<~>	<~>
6043	6041	<split-s>	<split-s>
6043	6041	<split-h>	<split-h>
6043	6041	<name2>	<name2>
6043	6044	<aphaerese>	<aphaerese>
6043	6044	<>	<aphaerese>
6043	6041	<elision3>	<elision3>
6043	6044	<>	<elision3>
6043	6041	<elision2>	<elision2>
6043	6044	<>	<elision2>
6043	6041	<elision1>	<elision1>
6043	6044	<>	<elision1>
6043	6041	.	υ
6043	6041	.	u
6043	6047	.	κ
6043	6041	.	α
6043	6041	.	a
6043	5210	<2s>	<>
6044	6039	.	.
6044	6039	 	 
6044	6039	<~>	<~>
6044	6039	<split-s>	<split-s>
6044	6039	<split-h>	<split-h>
6044	6039	<name2>	<name2>
6044	6042	<aphaerese>	<aphaerese>
6044	6042	<>	<aphaerese>
6044	6039	<elision3>	<elision3>
6044	6042	<>	<elision3>
6044	6039	<elision2>	<elision2>
6044	6042	<>	<elision2>
6044	6039	<elision1>	<elision1>
6044	6042	<>	<elision1>
6044	6039	.	υ
6044	6039	.	u
6044	6045	.	κ
6044	6039	.	α
6044	6039	.	a
6044	5208	<2s>	<>
6045	6046	<>	<name>
6045	6045	<>	<aphaerese>
6045	6048	<elision3>	<elision3>
6045	6045	<>	<elision3>
6045	6048	<elision2>	<elision2>
6045	6045	<>	<elision2>
6045	6048	<elision1>	<elision1>
6045	6045	<>	<elision1>
6045	5206	<2s>	<>
6046	6047	<>	<aphaerese>
6046	6050	<elision3>	<elision3>
6046	6047	<>	<elision3>
6046	6050	<elision2>	<elision2>
6046	6047	<>	<elision2>
6046	6050	<elision1>	<elision1>
6046	6047	<>	<elision1>
6046	5207	<2s>	<>
6047	6045	<>	<aphaerese>
6047	6048	<elision3>	<elision3>
6047	6045	<>	<elision3>
6047	6048	<elision2>	<elision2>
6047	6045	<>	<elision2>
6047	6048	<elision1>	<elision1>
6047	6045	<>	<elision1>
6047	5205	<2s>	<>
6048	6049	<>	<name>
6048	6048	<>	<aphaerese>
6048	6048	<>	<elision3>
6048	6048	<>	<elision2>
6048	6048	<>	<elision1>
6048	5067	<2s>	<>
6049	6050	<>	<aphaerese>
6049	6050	<>	<elision3>
6049	6050	<>	<elision2>
6049	6050	<>	<elision1>
6049	5068	<2s>	<>
6050	6048	<>	<aphaerese>
6050	6048	<>	<elision3>
6050	6048	<>	<elision2>
6050	6048	<>	<elision1>
6050	5066	<2s>	<>
6051	6052	<name>	<name>
6051	6053	<>	<name>
6051	6055	<>	<aphaerese>
6051	6055	<>	<elision3>
6051	6055	<>	<elision2>
6051	6055	<>	<elision1>
6051	5539	<2s>	<>
6051	6056	<L2kl>	<>
6051	6062	<K2kl>	<>
6052	6016	s	k
6052	6023	s	l
6052	5429	<2s>	<>
6053	6054	<>	<aphaerese>
6053	6054	<>	<elision3>
6053	6054	<>	<elision2>
6053	6054	<>	<elision1>
6053	6057	<L2kl>	<>
6053	6060	<K2kl>	<>
6054	6055	<>	<aphaerese>
6054	6055	<>	<elision3>
6054	6055	<>	<elision2>
6054	6055	<>	<elision1>
6054	6058	<L2kl>	<>
6054	6061	<K2kl>	<>
6055	6053	<>	<name>
6055	6055	<>	<aphaerese>
6055	6055	<>	<elision3>
6055	6055	<>	<elision2>
6055	6055	<>	<elision1>
6055	6056	<L2kl>	<>
6055	6059	<K2kl>	<>
6056	6057	<>	<name>
6056	6056	<>	<aphaerese>
6056	6056	<>	<elision3>
6056	6056	<>	<elision2>
6056	6056	<>	<elision1>
6056	6036	.	κ
6056	6036	.	λ
6056	5598	<2s>	<>
6057	6058	<>	<aphaerese>
6057	6058	<>	<elision3>
6057	6058	<>	<elision2>
6057	6058	<>	<elision1>
6057	6038	.	κ
6057	6038	.	λ
6057	5599	<2s>	<>
6058	6056	<>	<aphaerese>
6058	6056	<>	<elision3>
6058	6056	<>	<elision2>
6058	6056	<>	<elision1>
6058	6036	.	κ
6058	6036	.	λ
6058	5597	<2s>	<>
6059	6039	.	.
6059	6039	 	 
6059	6039	<~>	<~>
6059	6039	<split-s>	<split-s>
6059	6039	<split-h>	<split-h>
6059	6039	<name2>	<name2>
6059	6060	<>	<name>
6059	6042	<aphaerese>	<aphaerese>
6059	6059	<>	<aphaerese>
6059	6039	<elision3>	<elision3>
6059	6059	<>	<elision3>
6059	6039	<elision2>	<elision2>
6059	6059	<>	<elision2>
6059	6039	<elision1>	<elision1>
6059	6059	<>	<elision1>
6059	6036	.	υ
6059	6036	.	u
6059	6036	.	α
6059	6036	.	a
6059	5534	<2s>	<>
6060	6041	.	.
6060	6041	 	 
6060	6041	<~>	<~>
6060	6041	<split-s>	<split-s>
6060	6041	<split-h>	<split-h>
6060	6041	<name2>	<name2>
6060	6044	<aphaerese>	<aphaerese>
6060	6061	<>	<aphaerese>
6060	6041	<elision3>	<elision3>
6060	6061	<>	<elision3>
6060	6041	<elision2>	<elision2>
6060	6061	<>	<elision2>
6060	6041	<elision1>	<elision1>
6060	6061	<>	<elision1>
6060	6038	.	υ
6060	6038	.	u
6060	6038	.	α
6060	6038	.	a
6060	5535	<2s>	<>
6061	6039	.	.
6061	6039	 	 
6061	6039	<~>	<~>
6061	6039	<split-s>	<split-s>
6061	6039	<split-h>	<split-h>
6061	6039	<name2>	<name2>
6061	6042	<aphaerese>	<aphaerese>
6061	6059	<>	<aphaerese>
6061	6039	<elision3>	<elision3>
6061	6059	<>	<elision3>
6061	6039	<elision2>	<elision2>
6061	6059	<>	<elision2>
6061	6039	<elision1>	<elision1>
6061	6059	<>	<elision1>
6061	6036	.	υ
6061	6036	.	u
6061	6036	.	α
6061	6036	.	a
6061	5533	<2s>	<>
6062	6039	.	.
6062	6039	 	 
6062	6039	<~>	<~>
6062	6039	<split-s>	<split-s>
6062	6039	<split-h>	<split-h>
6062	6039	<name2>	<name2>
6062	6063	<name2>	<name>
6062	6060	<>	<name>
6062	6042	<aphaerese>	<aphaerese>
6062	6059	<>	<aphaerese>
6062	6039	<elision3>	<elision3>
6062	6059	<>	<elision3>
6062	6039	<elision2>	<elision2>
6062	6059	<>	<elision2>
6062	6039	<elision1>	<elision1>
6062	6059	<>	<elision1>
6062	6036	.	υ
6062	6036	.	u
6062	6036	.	α
6062	6036	.	a
6062	5543	<2s>	<>
6063	5429	<2s>	<>
6064	6039	.	.
6064	6039	 	 
6064	6039	<~>	<~>
6064	6039	<split-s>	<split-s>
6064	6039	<split-h>	<split-h>
6064	6039	<name2>	<name2>
6064	6065	<>	<name>
6064	6042	<aphaerese>	<aphaerese>
6064	6064	<>	<aphaerese>
6064	6039	<elision3>	<elision3>
6064	6064	<>	<elision3>
6064	6039	<elision2>	<elision2>
6064	6064	<>	<elision2>
6064	6039	<elision1>	<elision1>
6064	6064	<>	<elision1>
6064	6036	.	υ
6064	6036	.	u
6064	6036	.	κ
6064	6036	.	α
6064	6036	.	a
6064	6036	.	λ
6064	5419	<2s>	<>
6065	6041	.	.
6065	6041	 	 
6065	6041	<~>	<~>
6065	6041	<split-s>	<split-s>
6065	6041	<split-h>	<split-h>
6065	6041	<name2>	<name2>
6065	6044	<aphaerese>	<aphaerese>
6065	6066	<>	<aphaerese>
6065	6041	<elision3>	<elision3>
6065	6066	<>	<elision3>
6065	6041	<elision2>	<elision2>
6065	6066	<>	<elision2>
6065	6041	<elision1>	<elision1>
6065	6066	<>	<elision1>
6065	6038	.	υ
6065	6038	.	u
6065	6038	.	κ
6065	6038	.	α
6065	6038	.	a
6065	6038	.	λ
6065	5420	<2s>	<>
6066	6039	.	.
6066	6039	 	 
6066	6039	<~>	<~>
6066	6039	<split-s>	<split-s>
6066	6039	<split-h>	<split-h>
6066	6039	<name2>	<name2>
6066	6042	<aphaerese>	<aphaerese>
6066	6064	<>	<aphaerese>
6066	6039	<elision3>	<elision3>
6066	6064	<>	<elision3>
6066	6039	<elision2>	<elision2>
6066	6064	<>	<elision2>
6066	6039	<elision1>	<elision1>
6066	6064	<>	<elision1>
6066	6036	.	υ
6066	6036	.	u
6066	6036	.	κ
6066	6036	.	α
6066	6036	.	a
6066	6036	.	λ
6066	5418	<2s>	<>
6067	6063	<name>	<name>
6067	6068	<>	<name>
6067	6070	<>	<aphaerese>
6067	6070	<>	<elision3>
6067	6070	<>	<elision2>
6067	6070	<>	<elision1>
6067	5539	<2s>	<>
6067	6071	<L2kl>	<>
6068	6069	<>	<aphaerese>
6068	6069	<>	<elision3>
6068	6069	<>	<elision2>
6068	6069	<>	<elision1>
6068	6065	<L2kl>	<>
6069	6070	<>	<aphaerese>
6069	6070	<>	<elision3>
6069	6070	<>	<elision2>
6069	6070	<>	<elision1>
6069	6066	<L2kl>	<>
6070	6068	<>	<name>
6070	6070	<>	<aphaerese>
6070	6070	<>	<elision3>
6070	6070	<>	<elision2>
6070	6070	<>	<elision1>
6070	6064	<L2kl>	<>
6071	6039	.	.
6071	6039	 	 
6071	6039	<~>	<~>
6071	6039	<split-s>	<split-s>
6071	6039	<split-h>	<split-h>
6071	6039	<name2>	<name2>
6071	6063	<name2>	<name>
6071	6065	<>	<name>
6071	6042	<aphaerese>	<aphaerese>
6071	6064	<>	<aphaerese>
6071	6039	<elision3>	<elision3>
6071	6064	<>	<elision3>
6071	6039	<elision2>	<elision2>
6071	6064	<>	<elision2>
6071	6039	<elision1>	<elision1>
6071	6064	<>	<elision1>
6071	6036	.	υ
6071	6036	.	u
6071	6036	.	κ
6071	6036	.	α
6071	6036	.	a
6071	6036	.	λ
6071	5608	<2s>	<>
6072	5906	<>	<name>
6072	5905	<>	<aphaerese>
6072	5905	<>	<elision3>
6072	5905	<>	<elision2>
6072	5905	<>	<elision1>
6072	5908	s	κ
6072	6033	s	k
6072	6051	s	K
6072	5908	s	λ
6072	6064	s	l
6072	6067	s	L
6072	6073	<1s>	<>
6073	5243	<>	<name>
6073	5242	<>	<aphaerese>
6073	5242	<>	<elision3>
6073	5242	<>	<elision2>
6073	5242	<>	<elision1>
6073	6074	<K>	<>
6074	5269	<>	<name>
6074	5271	<>	<aphaerese>
6074	5271	<>	<elision3>
6074	5271	<>	<elision2>
6074	5271	<>	<elision1>
6075	6076	<>	<name>
6075	6078	<>	<aphaerese>
6075	6078	<>	<elision3>
6075	6078	<>	<elision2>
6075	6078	<>	<elision1>
6075	160	<k2K>	<>
6075	6072	<k2L>	<>
6076	6077	<>	<aphaerese>
6076	6077	<>	<elision3>
6076	6077	<>	<elision2>
6076	6077	<>	<elision1>
6076	161	<k2K>	<>
6076	5906	<k2L>	<>
6077	6078	<>	<aphaerese>
6077	6078	<>	<elision3>
6077	6078	<>	<elision2>
6077	6078	<>	<elision1>
6077	162	<k2K>	<>
6077	5907	<k2L>	<>
6078	6076	<>	<name>
6078	6078	<>	<aphaerese>
6078	6078	<>	<elision3>
6078	6078	<>	<elision2>
6078	6078	<>	<elision1>
6078	160	<k2K>	<>
6078	5905	<k2L>	<>
6079	6080	<>	<name>
6079	6082	<>	<aphaerese>
6079	6082	<>	<elision3>
6079	6082	<>	<elision2>
6079	6082	<>	<elision1>
6079	163	s	κ
6079	5849	s	k
6079	5882	s	K
6079	163	s	λ
6079	5897	s	l
6079	5900	s	L
6079	6072	<K2L>	<>
6080	6081	<>	<aphaerese>
6080	6081	<>	<elision3>
6080	6081	<>	<elision2>
6080	6081	<>	<elision1>
6080	5842	s	κ
6080	5851	s	k
6080	5885	s	K
6080	5842	s	λ
6080	5899	s	l
6080	5902	s	L
6080	5906	<K2L>	<>
6081	6082	<>	<aphaerese>
6081	6082	<>	<elision3>
6081	6082	<>	<elision2>
6081	6082	<>	<elision1>
6081	163	s	κ
6081	5849	s	k
6081	5882	s	K
6081	163	s	λ
6081	5897	s	l
6081	5900	s	L
6081	5907	<K2L>	<>
6082	6080	<>	<name>
6082	6082	<>	<aphaerese>
6082	6082	<>	<elision3>
6082	6082	<>	<elision2>
6082	6082	<>	<elision1>
6082	163	s	κ
6082	5849	s	k
6082	5882	s	K
6082	163	s	λ
6082	5897	s	l
6082	5900	s	L
6082	5905	<K2L>	<>
6083	6084	<>	<name>
6083	6083	<>	<aphaerese>
6083	6083	<>	<elision3>
6083	6083	<>	<elision2>
6083	6083	<>	<elision1>
6083	5905	<lambda2L>	<>
6084	6085	<>	<aphaerese>
6084	6085	<>	<elision3>
6084	6085	<>	<elision2>
6084	6085	<>	<elision1>
6084	5906	<lambda2L>	<>
6085	6083	<>	<aphaerese>
6085	6083	<>	<elision3>
6085	6083	<>	<elision2>
6085	6083	<>	<elision1>
6085	5907	<lambda2L>	<>
6086	6087	<>	<name>
6086	6086	<>	<aphaerese>
6086	6086	<>	<elision3>
6086	6086	<>	<elision2>
6086	6086	<>	<elision1>
6086	5905	<l2L>	<>
6087	6088	<>	<aphaerese>
6087	6088	<>	<elision3>
6087	6088	<>	<elision2>
6087	6088	<>	<elision1>
6087	5906	<l2L>	<>
6088	6086	<>	<aphaerese>
6088	6086	<>	<elision3>
6088	6086	<>	<elision2>
6088	6086	<>	<elision1>
6088	5907	<l2L>	<>
6089	159	<>	<aphaerese>
6089	159	<>	<elision3>
6089	159	<>	<elision2>
6089	159	<>	<elision1>
6089	162	<kappa2K>	<>
6089	6090	<kappa2L>	<>
6090	5905	<>	<aphaerese>
6090	5905	<>	<elision3>
6090	5905	<>	<elision2>
6090	5905	<>	<elision1>
6090	5908	s	κ
6090	6033	s	k
6090	6051	s	K
6090	5908	s	λ
6090	6064	s	l
6090	6067	s	L
6090	6091	<1s>	<>
6091	5242	<>	<aphaerese>
6091	5242	<>	<elision3>
6091	5242	<>	<elision2>
6091	5242	<>	<elision1>
6091	6092	<K>	<>
6092	5271	<>	<aphaerese>
6092	5271	<>	<elision3>
6092	5271	<>	<elision2>
6092	5271	<>	<elision1>
6093	6078	<>	<aphaerese>
6093	6078	<>	<elision3>
6093	6078	<>	<elision2>
6093	6078	<>	<elision1>
6093	162	<k2K>	<>
6093	6090	<k2L>	<>
6094	6082	<>	<aphaerese>
6094	6082	<>	<elision3>
6094	6082	<>	<elision2>
6094	6082	<>	<elision1>
6094	163	s	κ
6094	5849	s	k
6094	5882	s	K
6094	163	s	λ
6094	5897	s	l
6094	5900	s	L
6094	6090	<K2L>	<>
6095	6096	<>	<name>
6095	6098	<>	<aphaerese>
6095	6098	<>	<elision3>
6095	6098	<>	<elision2>
6095	6098	<>	<elision1>
6095	6099	<kappa2K>	<>
6095	6420	<kappa2L>	<>
6095	6417	<lambda2L>	<>
6096	6097	<>	<aphaerese>
6096	6097	<>	<elision3>
6096	6097	<>	<elision2>
6096	6097	<>	<elision1>
6096	6235	<kappa2K>	<>
6096	6381	<kappa2L>	<>
6096	6418	<lambda2L>	<>
6097	6098	<>	<aphaerese>
6097	6098	<>	<elision3>
6097	6098	<>	<elision2>
6097	6098	<>	<elision1>
6097	6236	<kappa2K>	<>
6097	6382	<kappa2L>	<>
6097	6419	<lambda2L>	<>
6098	6096	<>	<name>
6098	6098	<>	<aphaerese>
6098	6098	<>	<elision3>
6098	6098	<>	<elision2>
6098	6098	<>	<elision1>
6098	6099	<kappa2K>	<>
6098	6265	<kappa2L>	<>
6098	6417	<lambda2L>	<>
6099	6100	.	.
6099	6101	 	 
6099	6100	<~>	<~>
6099	6100	<split-s>	<split-s>
6099	6100	<split-h>	<split-h>
6099	6100	<name2>	<name2>
6099	6235	<>	<name>
6099	6104	<aphaerese>	<aphaerese>
6099	6099	<>	<aphaerese>
6099	6237	<elision3>	<elision3>
6099	6099	<>	<elision3>
6099	6237	<elision2>	<elision2>
6099	6099	<>	<elision2>
6099	6237	<elision1>	<elision1>
6099	6099	<>	<elision1>
6099	6108	.	υ
6099	6111	s	υ
6099	6108	.	u
6099	6111	s	u
6099	163	s	κ
6099	5849	s	k
6099	6174	s	U
6099	5882	s	K
6099	6108	.	α
6099	6202	s	α
6099	6108	.	a
6099	6202	s	a
6099	6205	s	A
6099	163	s	λ
6099	5897	s	l
6099	5900	s	L
6100	6100	.	.
6100	6101	 	 
6100	6100	<~>	<~>
6100	6100	<split-s>	<split-s>
6100	6100	<split-h>	<split-h>
6100	6100	<name2>	<name2>
6100	6234	<>	<name>
6100	6104	<aphaerese>	<aphaerese>
6100	6100	<>	<aphaerese>
6100	6100	<elision3>	<elision3>
6100	6100	<>	<elision3>
6100	6100	<elision2>	<elision2>
6100	6100	<>	<elision2>
6100	6100	<elision1>	<elision1>
6100	6100	<>	<elision1>
6100	6108	.	υ
6100	6111	s	υ
6100	6108	.	u
6100	6111	s	u
6100	6114	.	κ
6100	6132	s	κ
6100	5849	s	k
6100	6174	s	U
6100	5882	s	K
6100	6108	.	α
6100	6202	s	α
6100	6108	.	a
6100	6202	s	a
6100	6205	s	A
6100	6208	s	λ
6100	5897	s	l
6100	5900	s	L
6101	6100	.	.
6101	6101	 	 
6101	6100	<~>	<~>
6101	6100	<split-s>	<split-s>
6101	6100	<split-h>	<split-h>
6101	6100	<name2>	<name2>
6101	6102	<>	<name>
6101	6104	<aphaerese>	<aphaerese>
6101	6107	<>	<aphaerese>
6101	6100	<elision3>	<elision3>
6101	6107	<>	<elision3>
6101	6100	<elision2>	<elision2>
6101	6107	<>	<elision2>
6101	6100	<elision1>	<elision1>
6101	6107	<>	<elision1>
6101	6108	.	υ
6101	6219	s	υ
6101	6108	.	u
6101	6219	s	u
6101	6114	.	κ
6101	6220	s	κ
6101	6221	s	k
6101	6222	s	U
6101	6224	s	K
6101	6108	.	α
6101	6226	s	α
6101	6108	.	a
6101	6226	s	a
6101	6227	s	A
6101	6228	s	λ
6101	6229	s	l
6101	6230	s	L
6102	6103	.	.
6102	6106	 	 
6102	6103	<~>	<~>
6102	6103	<split-s>	<split-s>
6102	6103	<split-h>	<split-h>
6102	6103	<name2>	<name2>
6102	6232	<aphaerese>	<aphaerese>
6102	6233	<>	<aphaerese>
6102	6103	<elision3>	<elision3>
6102	6233	<>	<elision3>
6102	6103	<elision2>	<elision2>
6102	6233	<>	<elision2>
6102	6103	<elision1>	<elision1>
6102	6233	<>	<elision1>
6102	6110	.	υ
6102	6113	s	υ
6102	6110	.	u
6102	6113	s	u
6102	6116	.	κ
6102	6134	s	κ
6102	5851	s	k
6102	6176	s	U
6102	6179	s	K
6102	6110	.	α
6102	6204	s	α
6102	6110	.	a
6102	6204	s	a
6102	6207	s	A
6102	6210	s	λ
6102	5899	s	l
6102	6213	s	L
6103	6100	.	.
6103	6101	 	 
6103	6100	<~>	<~>
6103	6100	<split-s>	<split-s>
6103	6100	<split-h>	<split-h>
6103	6100	<name2>	<name2>
6103	6104	<aphaerese>	<aphaerese>
6103	6100	<>	<aphaerese>
6103	6100	<elision3>	<elision3>
6103	6100	<>	<elision3>
6103	6100	<elision2>	<elision2>
6103	6100	<>	<elision2>
6103	6100	<elision1>	<elision1>
6103	6100	<>	<elision1>
6103	6108	.	υ
6103	6111	s	υ
6103	6108	.	u
6103	6111	s	u
6103	6114	.	κ
6103	6132	s	κ
6103	5849	s	k
6103	6174	s	U
6103	5882	s	K
6103	6108	.	α
6103	6202	s	α
6103	6108	.	a
6103	6202	s	a
6103	6205	s	A
6103	6208	s	λ
6103	5897	s	l
6103	5900	s	L
6104	6100	.	.
6104	6101	 	 
6104	6100	<~>	<~>
6104	6100	<split-s>	<split-s>
6104	6100	<split-h>	<split-h>
6104	6100	<name2>	<name2>
6104	6105	<>	<name>
6104	6104	<aphaerese>	<aphaerese>
6104	6104	<>	<aphaerese>
6104	6100	<elision3>	<elision3>
6104	6104	<>	<elision3>
6104	6100	<elision2>	<elision2>
6104	6104	<>	<elision2>
6104	6100	<elision1>	<elision1>
6104	6104	<>	<elision1>
6104	6100	.	υ
6104	6100	.	u
6104	6114	.	κ
6104	6132	s	κ
6104	5849	s	k
6104	6174	s	U
6104	5882	s	K
6104	6100	.	α
6104	6100	.	a
6104	6205	s	A
6104	6208	s	λ
6104	5897	s	l
6104	5900	s	L
6105	6103	.	.
6105	6106	 	 
6105	6103	<~>	<~>
6105	6103	<split-s>	<split-s>
6105	6103	<split-h>	<split-h>
6105	6103	<name2>	<name2>
6105	6232	<aphaerese>	<aphaerese>
6105	6232	<>	<aphaerese>
6105	6103	<elision3>	<elision3>
6105	6232	<>	<elision3>
6105	6103	<elision2>	<elision2>
6105	6232	<>	<elision2>
6105	6103	<elision1>	<elision1>
6105	6232	<>	<elision1>
6105	6103	.	υ
6105	6103	.	u
6105	6116	.	κ
6105	6134	s	κ
6105	5851	s	k
6105	6176	s	U
6105	5885	s	K
6105	6103	.	α
6105	6103	.	a
6105	6207	s	A
6105	6210	s	λ
6105	5899	s	l
6105	5902	s	L
6106	6100	.	.
6106	6101	 	 
6106	6100	<~>	<~>
6106	6100	<split-s>	<split-s>
6106	6100	<split-h>	<split-h>
6106	6100	<name2>	<name2>
6106	6104	<aphaerese>	<aphaerese>
6106	6107	<>	<aphaerese>
6106	6100	<elision3>	<elision3>
6106	6107	<>	<elision3>
6106	6100	<elision2>	<elision2>
6106	6107	<>	<elision2>
6106	6100	<elision1>	<elision1>
6106	6107	<>	<elision1>
6106	6108	.	υ
6106	6219	s	υ
6106	6108	.	u
6106	6219	s	u
6106	6114	.	κ
6106	6220	s	κ
6106	6221	s	k
6106	6222	s	U
6106	6224	s	K
6106	6108	.	α
6106	6226	s	α
6106	6108	.	a
6106	6226	s	a
6106	6227	s	A
6106	6228	s	λ
6106	6229	s	l
6106	6230	s	L
6107	6100	.	.
6107	6101	 	 
6107	6100	<~>	<~>
6107	6100	<split-s>	<split-s>
6107	6100	<split-h>	<split-h>
6107	6100	<name2>	<name2>
6107	6102	<>	<name>
6107	6104	<aphaerese>	<aphaerese>
6107	6107	<>	<aphaerese>
6107	6100	<elision3>	<elision3>
6107	6107	<>	<elision3>
6107	6100	<elision2>	<elision2>
6107	6107	<>	<elision2>
6107	6100	<elision1>	<elision1>
6107	6107	<>	<elision1>
6107	6108	.	υ
6107	6111	s	υ
6107	6108	.	u
6107	6111	s	u
6107	6114	.	κ
6107	6132	s	κ
6107	5849	s	k
6107	6174	s	U
6107	6177	s	K
6107	6108	.	α
6107	6202	s	α
6107	6108	.	a
6107	6202	s	a
6107	6205	s	A
6107	6208	s	λ
6107	5897	s	l
6107	6211	s	L
6108	6109	<>	<name>
6108	6108	<>	<aphaerese>
6108	6100	<elision3>	<elision3>
6108	6108	<>	<elision3>
6108	6100	<elision2>	<elision2>
6108	6108	<>	<elision2>
6108	6100	<elision1>	<elision1>
6108	6108	<>	<elision1>
6109	6110	<>	<aphaerese>
6109	6103	<elision3>	<elision3>
6109	6110	<>	<elision3>
6109	6103	<elision2>	<elision2>
6109	6110	<>	<elision2>
6109	6103	<elision1>	<elision1>
6109	6110	<>	<elision1>
6110	6108	<>	<aphaerese>
6110	6100	<elision3>	<elision3>
6110	6108	<>	<elision3>
6110	6100	<elision2>	<elision2>
6110	6108	<>	<elision2>
6110	6100	<elision1>	<elision1>
6110	6108	<>	<elision1>
6111	164	.	.
6111	165	 	 
6111	164	<~>	<~>
6111	164	<split-s>	<split-s>
6111	164	<split-h>	<split-h>
6111	164	<name2>	<name2>
6111	6112	<>	<name>
6111	168	<aphaerese>	<aphaerese>
6111	6111	<>	<aphaerese>
6111	6111	<>	<elision3>
6111	6111	<>	<elision2>
6111	6111	<>	<elision1>
6111	172	.	υ
6111	5038	s	υ
6111	172	.	u
6111	5038	s	u
6111	5620	.	κ
6111	5650	s	κ
6111	5703	s	k
6111	5724	s	U
6111	5823	s	K
6111	172	.	α
6111	5779	s	α
6111	172	.	a
6111	5779	s	a
6111	5782	s	A
6111	5785	s	λ
6111	5788	s	l
6111	5833	s	L
6111	5227	<2s>	<>
6112	167	.	.
6112	170	 	 
6112	167	<~>	<~>
6112	167	<split-s>	<split-s>
6112	167	<split-h>	<split-h>
6112	167	<name2>	<name2>
6112	5822	<aphaerese>	<aphaerese>
6112	6113	<>	<aphaerese>
6112	6113	<>	<elision3>
6112	6113	<>	<elision2>
6112	6113	<>	<elision1>
6112	174	.	υ
6112	5616	s	υ
6112	174	.	u
6112	5616	s	u
6112	5622	.	κ
6112	5652	s	κ
6112	5705	s	k
6112	5726	s	U
6112	5825	s	K
6112	174	.	α
6112	5781	s	α
6112	174	.	a
6112	5781	s	a
6112	5784	s	A
6112	5787	s	λ
6112	5790	s	l
6112	5835	s	L
6112	5228	<2s>	<>
6113	164	.	.
6113	165	 	 
6113	164	<~>	<~>
6113	164	<split-s>	<split-s>
6113	164	<split-h>	<split-h>
6113	164	<name2>	<name2>
6113	168	<aphaerese>	<aphaerese>
6113	6111	<>	<aphaerese>
6113	6111	<>	<elision3>
6113	6111	<>	<elision2>
6113	6111	<>	<elision1>
6113	172	.	υ
6113	5038	s	υ
6113	172	.	u
6113	5038	s	u
6113	5620	.	κ
6113	5650	s	κ
6113	5703	s	k
6113	5724	s	U
6113	5823	s	K
6113	172	.	α
6113	5779	s	α
6113	172	.	a
6113	5779	s	a
6113	5782	s	A
6113	5785	s	λ
6113	5788	s	l
6113	5833	s	L
6113	5226	<2s>	<>
6114	6115	<>	<name>
6114	6114	<>	<aphaerese>
6114	6117	<elision3>	<elision3>
6114	6114	<>	<elision3>
6114	6117	<elision2>	<elision2>
6114	6114	<>	<elision2>
6114	6117	<elision1>	<elision1>
6114	6114	<>	<elision1>
6115	6116	<>	<aphaerese>
6115	6119	<elision3>	<elision3>
6115	6116	<>	<elision3>
6115	6119	<elision2>	<elision2>
6115	6116	<>	<elision2>
6115	6119	<elision1>	<elision1>
6115	6116	<>	<elision1>
6116	6114	<>	<aphaerese>
6116	6117	<elision3>	<elision3>
6116	6114	<>	<elision3>
6116	6117	<elision2>	<elision2>
6116	6114	<>	<elision2>
6116	6117	<elision1>	<elision1>
6116	6114	<>	<elision1>
6117	6118	<>	<name>
6117	6117	<>	<aphaerese>
6117	6117	<>	<elision3>
6117	6117	<>	<elision2>
6117	6117	<>	<elision1>
6117	6120	s	κ
6117	6120	s	k
6117	6123	s	K
6117	6120	s	λ
6117	6127	s	l
6117	6129	s	L
6118	6119	<>	<aphaerese>
6118	6119	<>	<elision3>
6118	6119	<>	<elision2>
6118	6119	<>	<elision1>
6118	6122	s	κ
6118	6122	s	k
6118	6125	s	K
6118	6122	s	λ
6118	6126	s	l
6118	6131	s	L
6119	6117	<>	<aphaerese>
6119	6117	<>	<elision3>
6119	6117	<>	<elision2>
6119	6117	<>	<elision1>
6119	6120	s	κ
6119	6120	s	k
6119	6123	s	K
6119	6120	s	λ
6119	6127	s	l
6119	6129	s	L
6120	6121	<>	<name>
6120	6120	<>	<aphaerese>
6120	6120	<>	<elision3>
6120	6120	<>	<elision2>
6120	6120	<>	<elision1>
6120	5843	s	κ
6120	5703	s	k
6120	5823	s	K
6120	5843	s	λ
6120	5788	s	l
6120	5833	s	L
6120	5242	<2s>	<>
6121	6122	<>	<aphaerese>
6121	6122	<>	<elision3>
6121	6122	<>	<elision2>
6121	6122	<>	<elision1>
6121	5845	s	κ
6121	5705	s	k
6121	5825	s	K
6121	5845	s	λ
6121	5790	s	l
6121	5835	s	L
6121	5243	<2s>	<>
6122	6120	<>	<aphaerese>
6122	6120	<>	<elision3>
6122	6120	<>	<elision2>
6122	6120	<>	<elision1>
6122	5843	s	κ
6122	5703	s	k
6122	5823	s	K
6122	5843	s	λ
6122	5788	s	l
6122	5833	s	L
6122	5241	<2s>	<>
6123	6124	<>	<name>
6123	6123	<>	<aphaerese>
6123	6123	<>	<elision3>
6123	6123	<>	<elision2>
6123	6123	<>	<elision1>
6123	6127	<K2kl>	<>
6124	6125	<>	<aphaerese>
6124	6125	<>	<elision3>
6124	6125	<>	<elision2>
6124	6125	<>	<elision1>
6124	6128	<K2kl>	<>
6125	6123	<>	<aphaerese>
6125	6123	<>	<elision3>
6125	6123	<>	<elision2>
6125	6123	<>	<elision1>
6125	6126	<K2kl>	<>
6126	6127	<>	<aphaerese>
6126	6127	<>	<elision3>
6126	6127	<>	<elision2>
6126	6127	<>	<elision1>
6126	5893	s	κ
6126	5788	s	k
6126	5879	s	K
6126	5893	s	λ
6126	5788	s	l
6126	5833	s	L
6126	5241	<2s>	<>
6127	6128	<>	<name>
6127	6127	<>	<aphaerese>
6127	6127	<>	<elision3>
6127	6127	<>	<elision2>
6127	6127	<>	<elision1>
6127	5893	s	κ
6127	5788	s	k
6127	5879	s	K
6127	5893	s	λ
6127	5788	s	l
6127	5833	s	L
6127	5242	<2s>	<>
6128	6126	<>	<aphaerese>
6128	6126	<>	<elision3>
6128	6126	<>	<elision2>
6128	6126	<>	<elision1>
6128	5895	s	κ
6128	5790	s	k
6128	5825	s	K
6128	5895	s	λ
6128	5790	s	l
6128	5835	s	L
6128	5243	<2s>	<>
6129	6130	<>	<name>
6129	6129	<>	<aphaerese>
6129	6129	<>	<elision3>
6129	6129	<>	<elision2>
6129	6129	<>	<elision1>
6129	6127	<L2kl>	<>
6130	6131	<>	<aphaerese>
6130	6131	<>	<elision3>
6130	6131	<>	<elision2>
6130	6131	<>	<elision1>
6130	6128	<L2kl>	<>
6131	6129	<>	<aphaerese>
6131	6129	<>	<elision3>
6131	6129	<>	<elision2>
6131	6129	<>	<elision1>
6131	6126	<L2kl>	<>
6132	164	.	.
6132	165	 	 
6132	164	<~>	<~>
6132	164	<split-s>	<split-s>
6132	164	<split-h>	<split-h>
6132	164	<name2>	<name2>
6132	6133	<>	<name>
6132	168	<aphaerese>	<aphaerese>
6132	6132	<>	<aphaerese>
6132	6135	<elision3>	<elision3>
6132	6132	<>	<elision3>
6132	6135	<elision2>	<elision2>
6132	6132	<>	<elision2>
6132	6135	<elision1>	<elision1>
6132	6132	<>	<elision1>
6132	172	.	υ
6132	5038	s	υ
6132	172	.	u
6132	5038	s	u
6132	172	.	κ
6132	5843	s	κ
6132	5703	s	k
6132	5724	s	U
6132	5823	s	K
6132	172	.	α
6132	5779	s	α
6132	172	.	a
6132	5779	s	a
6132	5782	s	A
6132	172	.	λ
6132	5843	s	λ
6132	5788	s	l
6132	5833	s	L
6132	5407	<2s>	<>
6133	167	.	.
6133	170	 	 
6133	167	<~>	<~>
6133	167	<split-s>	<split-s>
6133	167	<split-h>	<split-h>
6133	167	<name2>	<name2>
6133	5822	<aphaerese>	<aphaerese>
6133	6134	<>	<aphaerese>
6133	6137	<elision3>	<elision3>
6133	6134	<>	<elision3>
6133	6137	<elision2>	<elision2>
6133	6134	<>	<elision2>
6133	6137	<elision1>	<elision1>
6133	6134	<>	<elision1>
6133	174	.	υ
6133	5616	s	υ
6133	174	.	u
6133	5616	s	u
6133	174	.	κ
6133	5845	s	κ
6133	5705	s	k
6133	5726	s	U
6133	5825	s	K
6133	174	.	α
6133	5781	s	α
6133	174	.	a
6133	5781	s	a
6133	5784	s	A
6133	174	.	λ
6133	5845	s	λ
6133	5790	s	l
6133	5835	s	L
6133	5408	<2s>	<>
6134	164	.	.
6134	165	 	 
6134	164	<~>	<~>
6134	164	<split-s>	<split-s>
6134	164	<split-h>	<split-h>
6134	164	<name2>	<name2>
6134	168	<aphaerese>	<aphaerese>
6134	6132	<>	<aphaerese>
6134	6135	<elision3>	<elision3>
6134	6132	<>	<elision3>
6134	6135	<elision2>	<elision2>
6134	6132	<>	<elision2>
6134	6135	<elision1>	<elision1>
6134	6132	<>	<elision1>
6134	172	.	υ
6134	5038	s	υ
6134	172	.	u
6134	5038	s	u
6134	172	.	κ
6134	5843	s	κ
6134	5703	s	k
6134	5724	s	U
6134	5823	s	K
6134	172	.	α
6134	5779	s	α
6134	172	.	a
6134	5779	s	a
6134	5782	s	A
6134	172	.	λ
6134	5843	s	λ
6134	5788	s	l
6134	5833	s	L
6134	5406	<2s>	<>
6135	164	.	.
6135	165	 	 
6135	164	<~>	<~>
6135	164	<split-s>	<split-s>
6135	164	<split-h>	<split-h>
6135	164	<name2>	<name2>
6135	6136	<>	<name>
6135	168	<aphaerese>	<aphaerese>
6135	6135	<>	<aphaerese>
6135	164	<elision3>	<elision3>
6135	6135	<>	<elision3>
6135	164	<elision2>	<elision2>
6135	6135	<>	<elision2>
6135	164	<elision1>	<elision1>
6135	6135	<>	<elision1>
6135	172	.	υ
6135	5038	s	υ
6135	172	.	u
6135	5038	s	u
6135	5620	.	κ
6135	6138	s	κ
6135	6144	s	k
6135	5724	s	U
6135	6150	s	K
6135	172	.	α
6135	5779	s	α
6135	172	.	a
6135	5779	s	a
6135	5782	s	A
6135	6162	s	λ
6135	6165	s	l
6135	6168	s	L
6135	5310	<2s>	<>
6136	167	.	.
6136	170	 	 
6136	167	<~>	<~>
6136	167	<split-s>	<split-s>
6136	167	<split-h>	<split-h>
6136	167	<name2>	<name2>
6136	5822	<aphaerese>	<aphaerese>
6136	6137	<>	<aphaerese>
6136	167	<elision3>	<elision3>
6136	6137	<>	<elision3>
6136	167	<elision2>	<elision2>
6136	6137	<>	<elision2>
6136	167	<elision1>	<elision1>
6136	6137	<>	<elision1>
6136	174	.	υ
6136	5616	s	υ
6136	174	.	u
6136	5616	s	u
6136	5622	.	κ
6136	6140	s	κ
6136	6146	s	k
6136	5726	s	U
6136	6152	s	K
6136	174	.	α
6136	5781	s	α
6136	174	.	a
6136	5781	s	a
6136	5784	s	A
6136	6164	s	λ
6136	6167	s	l
6136	6170	s	L
6136	5311	<2s>	<>
6137	164	.	.
6137	165	 	 
6137	164	<~>	<~>
6137	164	<split-s>	<split-s>
6137	164	<split-h>	<split-h>
6137	164	<name2>	<name2>
6137	168	<aphaerese>	<aphaerese>
6137	6135	<>	<aphaerese>
6137	164	<elision3>	<elision3>
6137	6135	<>	<elision3>
6137	164	<elision2>	<elision2>
6137	6135	<>	<elision2>
6137	164	<elision1>	<elision1>
6137	6135	<>	<elision1>
6137	172	.	υ
6137	5038	s	υ
6137	172	.	u
6137	5038	s	u
6137	5620	.	κ
6137	6138	s	κ
6137	6144	s	k
6137	5724	s	U
6137	6150	s	K
6137	172	.	α
6137	5779	s	α
6137	172	.	a
6137	5779	s	a
6137	5782	s	A
6137	6162	s	λ
6137	6165	s	l
6137	6168	s	L
6137	5309	<2s>	<>
6138	5039	.	.
6138	5040	 	 
6138	5039	<~>	<~>
6138	5039	<split-s>	<split-s>
6138	5039	<split-h>	<split-h>
6138	5039	<name2>	<name2>
6138	6139	<>	<name>
6138	5043	<aphaerese>	<aphaerese>
6138	6138	<>	<aphaerese>
6138	5653	<elision3>	<elision3>
6138	6138	<>	<elision3>
6138	5653	<elision2>	<elision2>
6138	6138	<>	<elision2>
6138	5653	<elision1>	<elision1>
6138	6138	<>	<elision1>
6138	5047	.	υ
6138	5053	s	υ
6138	5047	.	u
6138	5053	s	u
6138	5047	.	κ
6138	5424	s	U
6138	5047	.	α
6138	5053	s	α
6138	5047	.	a
6138	5053	s	a
6138	5545	s	A
6138	5047	.	λ
6138	6142	<split-h>	<>
6139	5042	.	.
6139	5045	 	 
6139	5042	<~>	<~>
6139	5042	<split-s>	<split-s>
6139	5042	<split-h>	<split-h>
6139	5042	<name2>	<name2>
6139	5589	<aphaerese>	<aphaerese>
6139	6140	<>	<aphaerese>
6139	5655	<elision3>	<elision3>
6139	6140	<>	<elision3>
6139	5655	<elision2>	<elision2>
6139	6140	<>	<elision2>
6139	5655	<elision1>	<elision1>
6139	6140	<>	<elision1>
6139	5049	.	υ
6139	5225	s	υ
6139	5049	.	u
6139	5225	s	u
6139	5049	.	κ
6139	5426	s	U
6139	5049	.	α
6139	5225	s	α
6139	5049	.	a
6139	5225	s	a
6139	5547	s	A
6139	5049	.	λ
6139	6143	<split-h>	<>
6140	5039	.	.
6140	5040	 	 
6140	5039	<~>	<~>
6140	5039	<split-s>	<split-s>
6140	5039	<split-h>	<split-h>
6140	5039	<name2>	<name2>
6140	5043	<aphaerese>	<aphaerese>
6140	6138	<>	<aphaerese>
6140	5653	<elision3>	<elision3>
6140	6138	<>	<elision3>
6140	5653	<elision2>	<elision2>
6140	6138	<>	<elision2>
6140	5653	<elision1>	<elision1>
6140	6138	<>	<elision1>
6140	5047	.	υ
6140	5053	s	υ
6140	5047	.	u
6140	5053	s	u
6140	5047	.	κ
6140	5424	s	U
6140	5047	.	α
6140	5053	s	α
6140	5047	.	a
6140	5053	s	a
6140	5545	s	A
6140	5047	.	λ
6140	6141	<split-h>	<>
6141	6142	<>	<aphaerese>
6141	6142	<>	<elision3>
6141	6142	<>	<elision2>
6141	6142	<>	<elision1>
6141	5659	<3s>	<>
6142	6143	<>	<name>
6142	6142	<>	<aphaerese>
6142	6142	<>	<elision3>
6142	6142	<>	<elision2>
6142	6142	<>	<elision1>
6142	5660	<3s>	<>
6143	6141	<>	<aphaerese>
6143	6141	<>	<elision3>
6143	6141	<>	<elision2>
6143	6141	<>	<elision1>
6143	5661	<3s>	<>
6144	5039	.	.
6144	5040	 	 
6144	5039	<~>	<~>
6144	5039	<split-s>	<split-s>
6144	5039	<split-h>	<split-h>
6144	5039	<name2>	<name2>
6144	6145	<>	<name>
6144	5043	<aphaerese>	<aphaerese>
6144	6144	<>	<aphaerese>
6144	5039	<elision3>	<elision3>
6144	6144	<>	<elision3>
6144	5039	<elision2>	<elision2>
6144	6144	<>	<elision2>
6144	5039	<elision1>	<elision1>
6144	6144	<>	<elision1>
6144	5047	.	υ
6144	5053	s	υ
6144	5047	.	u
6144	5053	s	u
6144	5706	.	κ
6144	5424	s	U
6144	5047	.	α
6144	5053	s	α
6144	5047	.	a
6144	5053	s	a
6144	5545	s	A
6144	5706	.	λ
6144	6148	<split-h>	<>
6145	5042	.	.
6145	5045	 	 
6145	5042	<~>	<~>
6145	5042	<split-s>	<split-s>
6145	5042	<split-h>	<split-h>
6145	5042	<name2>	<name2>
6145	5589	<aphaerese>	<aphaerese>
6145	6146	<>	<aphaerese>
6145	5042	<elision3>	<elision3>
6145	6146	<>	<elision3>
6145	5042	<elision2>	<elision2>
6145	6146	<>	<elision2>
6145	5042	<elision1>	<elision1>
6145	6146	<>	<elision1>
6145	5049	.	υ
6145	5225	s	υ
6145	5049	.	u
6145	5225	s	u
6145	5708	.	κ
6145	5426	s	U
6145	5049	.	α
6145	5225	s	α
6145	5049	.	a
6145	5225	s	a
6145	5547	s	A
6145	5708	.	λ
6145	6149	<split-h>	<>
6146	5039	.	.
6146	5040	 	 
6146	5039	<~>	<~>
6146	5039	<split-s>	<split-s>
6146	5039	<split-h>	<split-h>
6146	5039	<name2>	<name2>
6146	5043	<aphaerese>	<aphaerese>
6146	6144	<>	<aphaerese>
6146	5039	<elision3>	<elision3>
6146	6144	<>	<elision3>
6146	5039	<elision2>	<elision2>
6146	6144	<>	<elision2>
6146	5039	<elision1>	<elision1>
6146	6144	<>	<elision1>
6146	5047	.	υ
6146	5053	s	υ
6146	5047	.	u
6146	5053	s	u
6146	5706	.	κ
6146	5424	s	U
6146	5047	.	α
6146	5053	s	α
6146	5047	.	a
6146	5053	s	a
6146	5545	s	A
6146	5706	.	λ
6146	6147	<split-h>	<>
6147	6148	<>	<aphaerese>
6147	6148	<>	<elision3>
6147	6148	<>	<elision2>
6147	6148	<>	<elision1>
6147	5668	<3s>	<>
6148	6149	<>	<name>
6148	6148	<>	<aphaerese>
6148	6148	<>	<elision3>
6148	6148	<>	<elision2>
6148	6148	<>	<elision1>
6148	5669	<3s>	<>
6149	6147	<>	<aphaerese>
6149	6147	<>	<elision3>
6149	6147	<>	<elision2>
6149	6147	<>	<elision1>
6149	5670	<3s>	<>
6150	5728	<name>	<name>
6150	6151	<>	<name>
6150	6153	<>	<aphaerese>
6150	6153	<>	<elision3>
6150	6153	<>	<elision2>
6150	6153	<>	<elision1>
6150	5775	<split-h>	<>
6150	5827	<L2kl>	<>
6150	6160	<K2kl>	<>
6151	6152	<>	<aphaerese>
6151	6152	<>	<elision3>
6151	6152	<>	<elision2>
6151	6152	<>	<elision1>
6151	5828	<L2kl>	<>
6151	6155	<K2kl>	<>
6152	6153	<>	<aphaerese>
6152	6153	<>	<elision3>
6152	6153	<>	<elision2>
6152	6153	<>	<elision1>
6152	5829	<L2kl>	<>
6152	6156	<K2kl>	<>
6153	6151	<>	<name>
6153	6153	<>	<aphaerese>
6153	6153	<>	<elision3>
6153	6153	<>	<elision2>
6153	6153	<>	<elision1>
6153	5827	<L2kl>	<>
6153	6154	<K2kl>	<>
6154	5709	.	.
6154	5709	 	 
6154	5709	<~>	<~>
6154	5709	<split-s>	<split-s>
6154	5709	<split-h>	<split-h>
6154	5709	<name2>	<name2>
6154	6155	<>	<name>
6154	5712	<aphaerese>	<aphaerese>
6154	6154	<>	<aphaerese>
6154	5709	<elision3>	<elision3>
6154	6154	<>	<elision3>
6154	5709	<elision2>	<elision2>
6154	6154	<>	<elision2>
6154	5709	<elision1>	<elision1>
6154	6154	<>	<elision1>
6154	5706	.	υ
6154	5706	.	u
6154	5706	.	α
6154	5706	.	a
6154	6158	<split-h>	<>
6155	5711	.	.
6155	5711	 	 
6155	5711	<~>	<~>
6155	5711	<split-s>	<split-s>
6155	5711	<split-h>	<split-h>
6155	5711	<name2>	<name2>
6155	5714	<aphaerese>	<aphaerese>
6155	6156	<>	<aphaerese>
6155	5711	<elision3>	<elision3>
6155	6156	<>	<elision3>
6155	5711	<elision2>	<elision2>
6155	6156	<>	<elision2>
6155	5711	<elision1>	<elision1>
6155	6156	<>	<elision1>
6155	5708	.	υ
6155	5708	.	u
6155	5708	.	α
6155	5708	.	a
6155	6159	<split-h>	<>
6156	5709	.	.
6156	5709	 	 
6156	5709	<~>	<~>
6156	5709	<split-s>	<split-s>
6156	5709	<split-h>	<split-h>
6156	5709	<name2>	<name2>
6156	5712	<aphaerese>	<aphaerese>
6156	6154	<>	<aphaerese>
6156	5709	<elision3>	<elision3>
6156	6154	<>	<elision3>
6156	5709	<elision2>	<elision2>
6156	6154	<>	<elision2>
6156	5709	<elision1>	<elision1>
6156	6154	<>	<elision1>
6156	5706	.	υ
6156	5706	.	u
6156	5706	.	α
6156	5706	.	a
6156	6157	<split-h>	<>
6157	6158	<>	<aphaerese>
6157	6158	<>	<elision3>
6157	6158	<>	<elision2>
6157	6158	<>	<elision1>
6157	5681	<3s>	<>
6158	6159	<>	<name>
6158	6158	<>	<aphaerese>
6158	6158	<>	<elision3>
6158	6158	<>	<elision2>
6158	6158	<>	<elision1>
6158	5682	<3s>	<>
6159	6157	<>	<aphaerese>
6159	6157	<>	<elision3>
6159	6157	<>	<elision2>
6159	6157	<>	<elision1>
6159	5683	<3s>	<>
6160	5709	.	.
6160	5709	 	 
6160	5709	<~>	<~>
6160	5709	<split-s>	<split-s>
6160	5709	<split-h>	<split-h>
6160	5709	<name2>	<name2>
6160	5777	<name2>	<name>
6160	6155	<>	<name>
6160	5712	<aphaerese>	<aphaerese>
6160	6154	<>	<aphaerese>
6160	5709	<elision3>	<elision3>
6160	6154	<>	<elision3>
6160	5709	<elision2>	<elision2>
6160	6154	<>	<elision2>
6160	5709	<elision1>	<elision1>
6160	6154	<>	<elision1>
6160	5706	.	υ
6160	5706	.	u
6160	5706	.	α
6160	5706	.	a
6160	6161	<split-h>	<>
6161	6159	<>	<name>
6161	6158	<>	<aphaerese>
6161	6158	<>	<elision3>
6161	6158	<>	<elision2>
6161	6158	<>	<elision1>
6161	5688	<3s>	<>
6162	5039	.	.
6162	5040	 	 
6162	5039	<~>	<~>
6162	5039	<split-s>	<split-s>
6162	5039	<split-h>	<split-h>
6162	5039	<name2>	<name2>
6162	6163	<>	<name>
6162	5043	<aphaerese>	<aphaerese>
6162	6162	<>	<aphaerese>
6162	5039	<elision3>	<elision3>
6162	6162	<>	<elision3>
6162	5039	<elision2>	<elision2>
6162	6162	<>	<elision2>
6162	5039	<elision1>	<elision1>
6162	6162	<>	<elision1>
6162	5047	.	υ
6162	5053	s	υ
6162	5047	.	u
6162	5053	s	u
6162	5047	.	κ
6162	5424	s	U
6162	5047	.	α
6162	5053	s	α
6162	5047	.	a
6162	5053	s	a
6162	5545	s	A
6162	5047	.	λ
6162	6148	<split-h>	<>
6163	5042	.	.
6163	5045	 	 
6163	5042	<~>	<~>
6163	5042	<split-s>	<split-s>
6163	5042	<split-h>	<split-h>
6163	5042	<name2>	<name2>
6163	5589	<aphaerese>	<aphaerese>
6163	6164	<>	<aphaerese>
6163	5042	<elision3>	<elision3>
6163	6164	<>	<elision3>
6163	5042	<elision2>	<elision2>
6163	6164	<>	<elision2>
6163	5042	<elision1>	<elision1>
6163	6164	<>	<elision1>
6163	5049	.	υ
6163	5225	s	υ
6163	5049	.	u
6163	5225	s	u
6163	5049	.	κ
6163	5426	s	U
6163	5049	.	α
6163	5225	s	α
6163	5049	.	a
6163	5225	s	a
6163	5547	s	A
6163	5049	.	λ
6163	6149	<split-h>	<>
6164	5039	.	.
6164	5040	 	 
6164	5039	<~>	<~>
6164	5039	<split-s>	<split-s>
6164	5039	<split-h>	<split-h>
6164	5039	<name2>	<name2>
6164	5043	<aphaerese>	<aphaerese>
6164	6162	<>	<aphaerese>
6164	5039	<elision3>	<elision3>
6164	6162	<>	<elision3>
6164	5039	<elision2>	<elision2>
6164	6162	<>	<elision2>
6164	5039	<elision1>	<elision1>
6164	6162	<>	<elision1>
6164	5047	.	υ
6164	5053	s	υ
6164	5047	.	u
6164	5053	s	u
6164	5047	.	κ
6164	5424	s	U
6164	5047	.	α
6164	5053	s	α
6164	5047	.	a
6164	5053	s	a
6164	5545	s	A
6164	5047	.	λ
6164	6147	<split-h>	<>
6165	5709	.	.
6165	5709	 	 
6165	5709	<~>	<~>
6165	5709	<split-s>	<split-s>
6165	5709	<split-h>	<split-h>
6165	5709	<name2>	<name2>
6165	6166	<>	<name>
6165	5712	<aphaerese>	<aphaerese>
6165	6165	<>	<aphaerese>
6165	5709	<elision3>	<elision3>
6165	6165	<>	<elision3>
6165	5709	<elision2>	<elision2>
6165	6165	<>	<elision2>
6165	5709	<elision1>	<elision1>
6165	6165	<>	<elision1>
6165	5706	.	υ
6165	5706	.	u
6165	5706	.	κ
6165	5706	.	α
6165	5706	.	a
6165	5706	.	λ
6165	6148	<split-h>	<>
6166	5711	.	.
6166	5711	 	 
6166	5711	<~>	<~>
6166	5711	<split-s>	<split-s>
6166	5711	<split-h>	<split-h>
6166	5711	<name2>	<name2>
6166	5714	<aphaerese>	<aphaerese>
6166	6167	<>	<aphaerese>
6166	5711	<elision3>	<elision3>
6166	6167	<>	<elision3>
6166	5711	<elision2>	<elision2>
6166	6167	<>	<elision2>
6166	5711	<elision1>	<elision1>
6166	6167	<>	<elision1>
6166	5708	.	υ
6166	5708	.	u
6166	5708	.	κ
6166	5708	.	α
6166	5708	.	a
6166	5708	.	λ
6166	6149	<split-h>	<>
6167	5709	.	.
6167	5709	 	 
6167	5709	<~>	<~>
6167	5709	<split-s>	<split-s>
6167	5709	<split-h>	<split-h>
6167	5709	<name2>	<name2>
6167	5712	<aphaerese>	<aphaerese>
6167	6165	<>	<aphaerese>
6167	5709	<elision3>	<elision3>
6167	6165	<>	<elision3>
6167	5709	<elision2>	<elision2>
6167	6165	<>	<elision2>
6167	5709	<elision1>	<elision1>
6167	6165	<>	<elision1>
6167	5706	.	υ
6167	5706	.	u
6167	5706	.	κ
6167	5706	.	α
6167	5706	.	a
6167	5706	.	λ
6167	6147	<split-h>	<>
6168	5777	<name>	<name>
6168	6169	<>	<name>
6168	6171	<>	<aphaerese>
6168	6171	<>	<elision3>
6168	6171	<>	<elision2>
6168	6171	<>	<elision1>
6168	5775	<split-h>	<>
6168	6172	<L2kl>	<>
6169	6170	<>	<aphaerese>
6169	6170	<>	<elision3>
6169	6170	<>	<elision2>
6169	6170	<>	<elision1>
6169	6166	<L2kl>	<>
6170	6171	<>	<aphaerese>
6170	6171	<>	<elision3>
6170	6171	<>	<elision2>
6170	6171	<>	<elision1>
6170	6167	<L2kl>	<>
6171	6169	<>	<name>
6171	6171	<>	<aphaerese>
6171	6171	<>	<elision3>
6171	6171	<>	<elision2>
6171	6171	<>	<elision1>
6171	6165	<L2kl>	<>
6172	5709	.	.
6172	5709	 	 
6172	5709	<~>	<~>
6172	5709	<split-s>	<split-s>
6172	5709	<split-h>	<split-h>
6172	5709	<name2>	<name2>
6172	5777	<name2>	<name>
6172	6166	<>	<name>
6172	5712	<aphaerese>	<aphaerese>
6172	6165	<>	<aphaerese>
6172	5709	<elision3>	<elision3>
6172	6165	<>	<elision3>
6172	5709	<elision2>	<elision2>
6172	6165	<>	<elision2>
6172	5709	<elision1>	<elision1>
6172	6165	<>	<elision1>
6172	5706	.	υ
6172	5706	.	u
6172	5706	.	κ
6172	5706	.	α
6172	5706	.	a
6172	5706	.	λ
6172	6173	<split-h>	<>
6173	6149	<>	<name>
6173	6148	<>	<aphaerese>
6173	6148	<>	<elision3>
6173	6148	<>	<elision2>
6173	6148	<>	<elision1>
6173	5695	<3s>	<>
6174	6175	<>	<name>
6174	6174	<>	<aphaerese>
6174	6174	<>	<elision3>
6174	6174	<>	<elision2>
6174	6174	<>	<elision1>
6174	5855	<U2kl>	<>
6175	6176	<>	<aphaerese>
6175	6176	<>	<elision3>
6175	6176	<>	<elision2>
6175	6176	<>	<elision1>
6175	5881	<U2kl>	<>
6176	6174	<>	<aphaerese>
6176	6174	<>	<elision3>
6176	6174	<>	<elision2>
6176	6174	<>	<elision1>
6176	5858	<U2kl>	<>
6177	5883	<name>	<name>
6177	6178	<>	<name>
6177	6180	<>	<aphaerese>
6177	6180	<>	<elision3>
6177	6180	<>	<elision2>
6177	6180	<>	<elision1>
6177	5539	<2s>	<>
6177	6181	<A2kl>	<>
6177	6193	<L2kl>	<>
6177	5896	<K2kl>	<>
6178	6179	<>	<aphaerese>
6178	6179	<>	<elision3>
6178	6179	<>	<elision2>
6178	6179	<>	<elision1>
6178	6182	<A2kl>	<>
6178	6194	<L2kl>	<>
6178	5891	<K2kl>	<>
6179	6180	<>	<aphaerese>
6179	6180	<>	<elision3>
6179	6180	<>	<elision2>
6179	6180	<>	<elision1>
6179	6183	<A2kl>	<>
6179	6195	<L2kl>	<>
6179	5892	<K2kl>	<>
6180	6178	<>	<name>
6180	6180	<>	<aphaerese>
6180	6180	<>	<elision3>
6180	6180	<>	<elision2>
6180	6180	<>	<elision1>
6180	6181	<A2kl>	<>
6180	6193	<L2kl>	<>
6180	5890	<K2kl>	<>
6181	6182	<>	<name>
6181	6181	<>	<aphaerese>
6181	6181	<>	<elision3>
6181	6181	<>	<elision2>
6181	6181	<>	<elision1>
6181	6184	.	κ
6181	6184	.	λ
6181	5489	<2s>	<>
6182	6183	<>	<aphaerese>
6182	6183	<>	<elision3>
6182	6183	<>	<elision2>
6182	6183	<>	<elision1>
6182	6186	.	κ
6182	6186	.	λ
6182	5490	<2s>	<>
6183	6181	<>	<aphaerese>
6183	6181	<>	<elision3>
6183	6181	<>	<elision2>
6183	6181	<>	<elision1>
6183	6184	.	κ
6183	6184	.	λ
6183	5488	<2s>	<>
6184	6185	<>	<name>
6184	6184	<>	<aphaerese>
6184	6187	<elision3>	<elision3>
6184	6184	<>	<elision3>
6184	6187	<elision2>	<elision2>
6184	6184	<>	<elision2>
6184	6187	<elision1>	<elision1>
6184	6184	<>	<elision1>
6184	5480	<2s>	<>
6185	6186	<>	<aphaerese>
6185	6189	<elision3>	<elision3>
6185	6186	<>	<elision3>
6185	6189	<elision2>	<elision2>
6185	6186	<>	<elision2>
6185	6189	<elision1>	<elision1>
6185	6186	<>	<elision1>
6185	5481	<2s>	<>
6186	6184	<>	<aphaerese>
6186	6187	<elision3>	<elision3>
6186	6184	<>	<elision3>
6186	6187	<elision2>	<elision2>
6186	6184	<>	<elision2>
6186	6187	<elision1>	<elision1>
6186	6184	<>	<elision1>
6186	5479	<2s>	<>
6187	5855	.	.
6187	5856	 	 
6187	5855	<~>	<~>
6187	5855	<split-s>	<split-s>
6187	5855	<split-h>	<split-h>
6187	5855	<name2>	<name2>
6187	6188	<>	<name>
6187	5859	<aphaerese>	<aphaerese>
6187	6187	<>	<aphaerese>
6187	5855	<elision3>	<elision3>
6187	6187	<>	<elision3>
6187	5855	<elision2>	<elision2>
6187	6187	<>	<elision2>
6187	5855	<elision1>	<elision1>
6187	6187	<>	<elision1>
6187	5852	.	υ
6187	5779	s	υ
6187	5852	.	u
6187	5779	s	u
6187	5751	s	κ
6187	5751	s	k
6187	5724	s	U
6187	6190	s	K
6187	5852	.	α
6187	5779	s	α
6187	5852	.	a
6187	5779	s	a
6187	5782	s	A
6187	5751	s	λ
6187	5751	s	l
6187	6190	s	L
6187	5444	<2s>	<>
6188	5858	.	.
6188	5861	 	 
6188	5858	<~>	<~>
6188	5858	<split-s>	<split-s>
6188	5858	<split-h>	<split-h>
6188	5858	<name2>	<name2>
6188	5878	<aphaerese>	<aphaerese>
6188	6189	<>	<aphaerese>
6188	5858	<elision3>	<elision3>
6188	6189	<>	<elision3>
6188	5858	<elision2>	<elision2>
6188	6189	<>	<elision2>
6188	5858	<elision1>	<elision1>
6188	6189	<>	<elision1>
6188	5854	.	υ
6188	5781	s	υ
6188	5854	.	u
6188	5781	s	u
6188	5753	s	κ
6188	5753	s	k
6188	5726	s	U
6188	6192	s	K
6188	5854	.	α
6188	5781	s	α
6188	5854	.	a
6188	5781	s	a
6188	5784	s	A
6188	5753	s	λ
6188	5753	s	l
6188	6192	s	L
6188	5445	<2s>	<>
6189	5855	.	.
6189	5856	 	 
6189	5855	<~>	<~>
6189	5855	<split-s>	<split-s>
6189	5855	<split-h>	<split-h>
6189	5855	<name2>	<name2>
6189	5859	<aphaerese>	<aphaerese>
6189	6187	<>	<aphaerese>
6189	5855	<elision3>	<elision3>
6189	6187	<>	<elision3>
6189	5855	<elision2>	<elision2>
6189	6187	<>	<elision2>
6189	5855	<elision1>	<elision1>
6189	6187	<>	<elision1>
6189	5852	.	υ
6189	5779	s	υ
6189	5852	.	u
6189	5779	s	u
6189	5751	s	κ
6189	5751	s	k
6189	5724	s	U
6189	6190	s	K
6189	5852	.	α
6189	5779	s	α
6189	5852	.	a
6189	5779	s	a
6189	5782	s	A
6189	5751	s	λ
6189	5751	s	l
6189	6190	s	L
6189	5443	<2s>	<>
6190	6191	<>	<name>
6190	6190	<>	<aphaerese>
6190	6190	<>	<elision3>
6190	6190	<>	<elision2>
6190	6190	<>	<elision1>
6190	5751	<L2kl>	<>
6191	6192	<>	<aphaerese>
6191	6192	<>	<elision3>
6191	6192	<>	<elision2>
6191	6192	<>	<elision1>
6191	5752	<L2kl>	<>
6192	6190	<>	<aphaerese>
6192	6190	<>	<elision3>
6192	6190	<>	<elision2>
6192	6190	<>	<elision1>
6192	5753	<L2kl>	<>
6193	6194	<>	<name>
6193	6193	<>	<aphaerese>
6193	6193	<>	<elision3>
6193	6193	<>	<elision2>
6193	6193	<>	<elision1>
6193	6196	.	κ
6193	6196	.	λ
6193	5522	<2s>	<>
6194	6195	<>	<aphaerese>
6194	6195	<>	<elision3>
6194	6195	<>	<elision2>
6194	6195	<>	<elision1>
6194	6198	.	κ
6194	6198	.	λ
6194	5523	<2s>	<>
6195	6193	<>	<aphaerese>
6195	6193	<>	<elision3>
6195	6193	<>	<elision2>
6195	6193	<>	<elision1>
6195	6196	.	κ
6195	6196	.	λ
6195	5521	<2s>	<>
6196	6197	<>	<name>
6196	6196	<>	<aphaerese>
6196	6199	<elision3>	<elision3>
6196	6196	<>	<elision3>
6196	6199	<elision2>	<elision2>
6196	6196	<>	<elision2>
6196	6199	<elision1>	<elision1>
6196	6196	<>	<elision1>
6196	5513	<2s>	<>
6197	6198	<>	<aphaerese>
6197	6201	<elision3>	<elision3>
6197	6198	<>	<elision3>
6197	6201	<elision2>	<elision2>
6197	6198	<>	<elision2>
6197	6201	<elision1>	<elision1>
6197	6198	<>	<elision1>
6197	5514	<2s>	<>
6198	6196	<>	<aphaerese>
6198	6199	<elision3>	<elision3>
6198	6196	<>	<elision3>
6198	6199	<elision2>	<elision2>
6198	6196	<>	<elision2>
6198	6199	<elision1>	<elision1>
6198	6196	<>	<elision1>
6198	5512	<2s>	<>
6199	6200	<>	<name>
6199	6199	<>	<aphaerese>
6199	6199	<>	<elision3>
6199	6199	<>	<elision2>
6199	6199	<>	<elision1>
6199	5863	.	κ
6199	5869	s	κ
6199	5788	s	k
6199	5879	s	K
6199	5788	s	λ
6199	5788	s	l
6199	5833	s	L
6199	5507	<2s>	<>
6200	6201	<>	<aphaerese>
6200	6201	<>	<elision3>
6200	6201	<>	<elision2>
6200	6201	<>	<elision1>
6200	5865	.	κ
6200	5871	s	κ
6200	5790	s	k
6200	5825	s	K
6200	5790	s	λ
6200	5790	s	l
6200	5835	s	L
6200	5508	<2s>	<>
6201	6199	<>	<aphaerese>
6201	6199	<>	<elision3>
6201	6199	<>	<elision2>
6201	6199	<>	<elision1>
6201	5863	.	κ
6201	5869	s	κ
6201	5788	s	k
6201	5879	s	K
6201	5788	s	λ
6201	5788	s	l
6201	5833	s	L
6201	5506	<2s>	<>
6202	5855	.	.
6202	5856	 	 
6202	5855	<~>	<~>
6202	5855	<split-s>	<split-s>
6202	5855	<split-h>	<split-h>
6202	5855	<name2>	<name2>
6202	6203	<>	<name>
6202	5859	<aphaerese>	<aphaerese>
6202	6202	<>	<aphaerese>
6202	6202	<>	<elision3>
6202	6202	<>	<elision2>
6202	6202	<>	<elision1>
6202	5852	.	υ
6202	5779	s	υ
6202	5852	.	u
6202	5779	s	u
6202	5863	.	κ
6202	5869	s	κ
6202	5788	s	k
6202	5724	s	U
6202	5879	s	K
6202	5852	.	α
6202	5779	s	α
6202	5852	.	a
6202	5779	s	a
6202	5782	s	A
6202	5788	s	λ
6202	5788	s	l
6202	5833	s	L
6202	5227	<2s>	<>
6203	5858	.	.
6203	5861	 	 
6203	5858	<~>	<~>
6203	5858	<split-s>	<split-s>
6203	5858	<split-h>	<split-h>
6203	5858	<name2>	<name2>
6203	5878	<aphaerese>	<aphaerese>
6203	6204	<>	<aphaerese>
6203	6204	<>	<elision3>
6203	6204	<>	<elision2>
6203	6204	<>	<elision1>
6203	5854	.	υ
6203	5781	s	υ
6203	5854	.	u
6203	5781	s	u
6203	5865	.	κ
6203	5871	s	κ
6203	5790	s	k
6203	5726	s	U
6203	5825	s	K
6203	5854	.	α
6203	5781	s	α
6203	5854	.	a
6203	5781	s	a
6203	5784	s	A
6203	5790	s	λ
6203	5790	s	l
6203	5835	s	L
6203	5228	<2s>	<>
6204	5855	.	.
6204	5856	 	 
6204	5855	<~>	<~>
6204	5855	<split-s>	<split-s>
6204	5855	<split-h>	<split-h>
6204	5855	<name2>	<name2>
6204	5859	<aphaerese>	<aphaerese>
6204	6202	<>	<aphaerese>
6204	6202	<>	<elision3>
6204	6202	<>	<elision2>
6204	6202	<>	<elision1>
6204	5852	.	υ
6204	5779	s	υ
6204	5852	.	u
6204	5779	s	u
6204	5863	.	κ
6204	5869	s	κ
6204	5788	s	k
6204	5724	s	U
6204	5879	s	K
6204	5852	.	α
6204	5779	s	α
6204	5852	.	a
6204	5779	s	a
6204	5782	s	A
6204	5788	s	λ
6204	5788	s	l
6204	5833	s	L
6204	5226	<2s>	<>
6205	6206	<>	<name>
6205	6205	<>	<aphaerese>
6205	6205	<>	<elision3>
6205	6205	<>	<elision2>
6205	6205	<>	<elision1>
6205	5855	<A2kl>	<>
6206	6207	<>	<aphaerese>
6206	6207	<>	<elision3>
6206	6207	<>	<elision2>
6206	6207	<>	<elision1>
6206	5881	<A2kl>	<>
6207	6205	<>	<aphaerese>
6207	6205	<>	<elision3>
6207	6205	<>	<elision2>
6207	6205	<>	<elision1>
6207	5858	<A2kl>	<>
6208	164	.	.
6208	165	 	 
6208	164	<~>	<~>
6208	164	<split-s>	<split-s>
6208	164	<split-h>	<split-h>
6208	164	<name2>	<name2>
6208	6209	<>	<name>
6208	168	<aphaerese>	<aphaerese>
6208	6208	<>	<aphaerese>
6208	164	<elision3>	<elision3>
6208	6208	<>	<elision3>
6208	164	<elision2>	<elision2>
6208	6208	<>	<elision2>
6208	164	<elision1>	<elision1>
6208	6208	<>	<elision1>
6208	172	.	υ
6208	5038	s	υ
6208	172	.	u
6208	5038	s	u
6208	172	.	κ
6208	5843	s	κ
6208	5703	s	k
6208	5724	s	U
6208	5823	s	K
6208	172	.	α
6208	5779	s	α
6208	172	.	a
6208	5779	s	a
6208	5782	s	A
6208	172	.	λ
6208	5843	s	λ
6208	5788	s	l
6208	5833	s	L
6208	5419	<2s>	<>
6209	167	.	.
6209	170	 	 
6209	167	<~>	<~>
6209	167	<split-s>	<split-s>
6209	167	<split-h>	<split-h>
6209	167	<name2>	<name2>
6209	5822	<aphaerese>	<aphaerese>
6209	6210	<>	<aphaerese>
6209	167	<elision3>	<elision3>
6209	6210	<>	<elision3>
6209	167	<elision2>	<elision2>
6209	6210	<>	<elision2>
6209	167	<elision1>	<elision1>
6209	6210	<>	<elision1>
6209	174	.	υ
6209	5616	s	υ
6209	174	.	u
6209	5616	s	u
6209	174	.	κ
6209	5845	s	κ
6209	5705	s	k
6209	5726	s	U
6209	5825	s	K
6209	174	.	α
6209	5781	s	α
6209	174	.	a
6209	5781	s	a
6209	5784	s	A
6209	174	.	λ
6209	5845	s	λ
6209	5790	s	l
6209	5835	s	L
6209	5420	<2s>	<>
6210	164	.	.
6210	165	 	 
6210	164	<~>	<~>
6210	164	<split-s>	<split-s>
6210	164	<split-h>	<split-h>
6210	164	<name2>	<name2>
6210	168	<aphaerese>	<aphaerese>
6210	6208	<>	<aphaerese>
6210	164	<elision3>	<elision3>
6210	6208	<>	<elision3>
6210	164	<elision2>	<elision2>
6210	6208	<>	<elision2>
6210	164	<elision1>	<elision1>
6210	6208	<>	<elision1>
6210	172	.	υ
6210	5038	s	υ
6210	172	.	u
6210	5038	s	u
6210	172	.	κ
6210	5843	s	κ
6210	5703	s	k
6210	5724	s	U
6210	5823	s	K
6210	172	.	α
6210	5779	s	α
6210	172	.	a
6210	5779	s	a
6210	5782	s	A
6210	172	.	λ
6210	5843	s	λ
6210	5788	s	l
6210	5833	s	L
6210	5418	<2s>	<>
6211	5883	<name>	<name>
6211	6212	<>	<name>
6211	6214	<>	<aphaerese>
6211	6214	<>	<elision3>
6211	6214	<>	<elision2>
6211	6214	<>	<elision1>
6211	5539	<2s>	<>
6211	6181	<A2kl>	<>
6211	6218	<L2kl>	<>
6212	6213	<>	<aphaerese>
6212	6213	<>	<elision3>
6212	6213	<>	<elision2>
6212	6213	<>	<elision1>
6212	6182	<A2kl>	<>
6212	6216	<L2kl>	<>
6213	6214	<>	<aphaerese>
6213	6214	<>	<elision3>
6213	6214	<>	<elision2>
6213	6214	<>	<elision1>
6213	6183	<A2kl>	<>
6213	6217	<L2kl>	<>
6214	6212	<>	<name>
6214	6214	<>	<aphaerese>
6214	6214	<>	<elision3>
6214	6214	<>	<elision2>
6214	6214	<>	<elision1>
6214	6181	<A2kl>	<>
6214	6215	<L2kl>	<>
6215	5855	.	.
6215	5856	 	 
6215	5855	<~>	<~>
6215	5855	<split-s>	<split-s>
6215	5855	<split-h>	<split-h>
6215	5855	<name2>	<name2>
6215	6216	<>	<name>
6215	5859	<aphaerese>	<aphaerese>
6215	6215	<>	<aphaerese>
6215	5855	<elision3>	<elision3>
6215	6215	<>	<elision3>
6215	5855	<elision2>	<elision2>
6215	6215	<>	<elision2>
6215	5855	<elision1>	<elision1>
6215	6215	<>	<elision1>
6215	5852	.	υ
6215	5779	s	υ
6215	5852	.	u
6215	5779	s	u
6215	6196	.	κ
6215	5893	s	κ
6215	5788	s	k
6215	5724	s	U
6215	5879	s	K
6215	5852	.	α
6215	5779	s	α
6215	5852	.	a
6215	5779	s	a
6215	5782	s	A
6215	6196	.	λ
6215	5893	s	λ
6215	5788	s	l
6215	5833	s	L
6215	5556	<2s>	<>
6216	5858	.	.
6216	5861	 	 
6216	5858	<~>	<~>
6216	5858	<split-s>	<split-s>
6216	5858	<split-h>	<split-h>
6216	5858	<name2>	<name2>
6216	5878	<aphaerese>	<aphaerese>
6216	6217	<>	<aphaerese>
6216	5858	<elision3>	<elision3>
6216	6217	<>	<elision3>
6216	5858	<elision2>	<elision2>
6216	6217	<>	<elision2>
6216	5858	<elision1>	<elision1>
6216	6217	<>	<elision1>
6216	5854	.	υ
6216	5781	s	υ
6216	5854	.	u
6216	5781	s	u
6216	6198	.	κ
6216	5895	s	κ
6216	5790	s	k
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6216	5825	s	K
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6216	5781	s	a
6216	5784	s	A
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6216	5790	s	l
6216	5835	s	L
6216	5557	<2s>	<>
6217	5855	.	.
6217	5856	 	 
6217	5855	<~>	<~>
6217	5855	<split-s>	<split-s>
6217	5855	<split-h>	<split-h>
6217	5855	<name2>	<name2>
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6217	6215	<>	<aphaerese>
6217	5855	<elision3>	<elision3>
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6217	5855	<elision2>	<elision2>
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6217	5855	<elision1>	<elision1>
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6217	5852	.	υ
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6217	5724	s	U
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6217	5779	s	α
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6217	5779	s	a
6217	5782	s	A
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6217	5893	s	λ
6217	5788	s	l
6217	5833	s	L
6217	5555	<2s>	<>
6218	5855	.	.
6218	5856	 	 
6218	5855	<~>	<~>
6218	5855	<split-s>	<split-s>
6218	5855	<split-h>	<split-h>
6218	5855	<name2>	<name2>
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6218	5855	<elision3>	<elision3>
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6218	5855	<elision2>	<elision2>
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6218	5855	<elision1>	<elision1>
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6218	5852	.	υ
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6218	5782	s	A
6218	6196	.	λ
6218	5893	s	λ
6218	5788	s	l
6218	5833	s	L
6218	5562	<2s>	<>
6219	164	.	.
6219	165	 	 
6219	164	<~>	<~>
6219	164	<split-s>	<split-s>
6219	164	<split-h>	<split-h>
6219	164	<name2>	<name2>
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6219	6111	<>	<elision3>
6219	6111	<>	<elision2>
6219	6111	<>	<elision1>
6219	172	.	υ
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6219	5782	s	A
6219	5785	s	λ
6219	5788	s	l
6219	5833	s	L
6219	5568	<2s>	<>
6220	164	.	.
6220	165	 	 
6220	164	<~>	<~>
6220	164	<split-s>	<split-s>
6220	164	<split-h>	<split-h>
6220	164	<name2>	<name2>
6220	6133	<>	<name>
6220	168	<aphaerese>	<aphaerese>
6220	6132	<>	<aphaerese>
6220	6135	<elision3>	<elision3>
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6220	6135	<elision2>	<elision2>
6220	6132	<>	<elision2>
6220	6135	<elision1>	<elision1>
6220	6132	<>	<elision1>
6220	172	.	υ
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6220	5724	s	U
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6220	5782	s	A
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6220	5843	s	λ
6220	5788	s	l
6220	5833	s	L
6220	5571	<2s>	<>
6221	164	.	.
6221	165	 	 
6221	164	<~>	<~>
6221	164	<split-s>	<split-s>
6221	164	<split-h>	<split-h>
6221	164	<name2>	<name2>
6221	5850	<>	<name>
6221	168	<aphaerese>	<aphaerese>
6221	5849	<>	<aphaerese>
6221	164	<elision3>	<elision3>
6221	5849	<>	<elision3>
6221	164	<elision2>	<elision2>
6221	5849	<>	<elision2>
6221	164	<elision1>	<elision1>
6221	5849	<>	<elision1>
6221	172	.	υ
6221	5038	s	υ
6221	172	.	u
6221	5038	s	u
6221	5852	.	κ
6221	5843	s	κ
6221	5703	s	k
6221	5724	s	U
6221	5823	s	K
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6221	5779	s	α
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6221	5779	s	a
6221	5782	s	A
6221	5852	.	λ
6221	5843	s	λ
6221	5788	s	l
6221	5833	s	L
6221	5574	<2s>	<>
6222	6175	<>	<name>
6222	6174	<>	<aphaerese>
6222	6174	<>	<elision3>
6222	6174	<>	<elision2>
6222	6174	<>	<elision1>
6222	6223	<U2kl>	<>
6223	5855	.	.
6223	5856	 	 
6223	5855	<~>	<~>
6223	5855	<split-s>	<split-s>
6223	5855	<split-h>	<split-h>
6223	5855	<name2>	<name2>
6223	5881	<>	<name>
6223	5859	<aphaerese>	<aphaerese>
6223	5855	<>	<aphaerese>
6223	5855	<elision3>	<elision3>
6223	5855	<>	<elision3>
6223	5855	<elision2>	<elision2>
6223	5855	<>	<elision2>
6223	5855	<elision1>	<elision1>
6223	5855	<>	<elision1>
6223	5852	.	υ
6223	5779	s	υ
6223	5852	.	u
6223	5779	s	u
6223	5863	.	κ
6223	5869	s	κ
6223	5788	s	k
6223	5724	s	U
6223	5879	s	K
6223	5852	.	α
6223	5779	s	α
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6223	5779	s	a
6223	5782	s	A
6223	5788	s	λ
6223	5788	s	l
6223	5833	s	L
6223	5578	<2s>	<>
6224	5883	<name>	<name>
6224	6178	<>	<name>
6224	6180	<>	<aphaerese>
6224	6180	<>	<elision3>
6224	6180	<>	<elision2>
6224	6180	<>	<elision1>
6224	5539	<2s>	<>
6224	6181	<A2kl>	<>
6224	6193	<L2kl>	<>
6224	6225	<K2kl>	<>
6225	5855	.	.
6225	5856	 	 
6225	5855	<~>	<~>
6225	5855	<split-s>	<split-s>
6225	5855	<split-h>	<split-h>
6225	5855	<name2>	<name2>
6225	5883	<name2>	<name>
6225	5891	<>	<name>
6225	5859	<aphaerese>	<aphaerese>
6225	5890	<>	<aphaerese>
6225	5855	<elision3>	<elision3>
6225	5890	<>	<elision3>
6225	5855	<elision2>	<elision2>
6225	5890	<>	<elision2>
6225	5855	<elision1>	<elision1>
6225	5890	<>	<elision1>
6225	5852	.	υ
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6225	5852	.	u
6225	5779	s	u
6225	5893	s	κ
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6225	5724	s	U
6225	5879	s	K
6225	5852	.	α
6225	5779	s	α
6225	5852	.	a
6225	5779	s	a
6225	5782	s	A
6225	5893	s	λ
6225	5788	s	l
6225	5833	s	L
6225	5582	<2s>	<>
6226	5855	.	.
6226	5856	 	 
6226	5855	<~>	<~>
6226	5855	<split-s>	<split-s>
6226	5855	<split-h>	<split-h>
6226	5855	<name2>	<name2>
6226	6203	<>	<name>
6226	5859	<aphaerese>	<aphaerese>
6226	6202	<>	<aphaerese>
6226	6202	<>	<elision3>
6226	6202	<>	<elision2>
6226	6202	<>	<elision1>
6226	5852	.	υ
6226	5779	s	υ
6226	5852	.	u
6226	5779	s	u
6226	5863	.	κ
6226	5869	s	κ
6226	5788	s	k
6226	5724	s	U
6226	5879	s	K
6226	5852	.	α
6226	5779	s	α
6226	5852	.	a
6226	5779	s	a
6226	5782	s	A
6226	5788	s	λ
6226	5788	s	l
6226	5833	s	L
6226	5568	<2s>	<>
6227	6206	<>	<name>
6227	6205	<>	<aphaerese>
6227	6205	<>	<elision3>
6227	6205	<>	<elision2>
6227	6205	<>	<elision1>
6227	6223	<A2kl>	<>
6228	164	.	.
6228	165	 	 
6228	164	<~>	<~>
6228	164	<split-s>	<split-s>
6228	164	<split-h>	<split-h>
6228	164	<name2>	<name2>
6228	6209	<>	<name>
6228	168	<aphaerese>	<aphaerese>
6228	6208	<>	<aphaerese>
6228	164	<elision3>	<elision3>
6228	6208	<>	<elision3>
6228	164	<elision2>	<elision2>
6228	6208	<>	<elision2>
6228	164	<elision1>	<elision1>
6228	6208	<>	<elision1>
6228	172	.	υ
6228	5038	s	υ
6228	172	.	u
6228	5038	s	u
6228	172	.	κ
6228	5843	s	κ
6228	5703	s	k
6228	5724	s	U
6228	5823	s	K
6228	172	.	α
6228	5779	s	α
6228	172	.	a
6228	5779	s	a
6228	5782	s	A
6228	172	.	λ
6228	5843	s	λ
6228	5788	s	l
6228	5833	s	L
6228	5574	<2s>	<>
6229	5855	.	.
6229	5856	 	 
6229	5855	<~>	<~>
6229	5855	<split-s>	<split-s>
6229	5855	<split-h>	<split-h>
6229	5855	<name2>	<name2>
6229	5898	<>	<name>
6229	5859	<aphaerese>	<aphaerese>
6229	5897	<>	<aphaerese>
6229	5855	<elision3>	<elision3>
6229	5897	<>	<elision3>
6229	5855	<elision2>	<elision2>
6229	5897	<>	<elision2>
6229	5855	<elision1>	<elision1>
6229	5897	<>	<elision1>
6229	5852	.	υ
6229	5779	s	υ
6229	5852	.	u
6229	5779	s	u
6229	5852	.	κ
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6229	5788	s	k
6229	5724	s	U
6229	5879	s	K
6229	5852	.	α
6229	5779	s	α
6229	5852	.	a
6229	5779	s	a
6229	5782	s	A
6229	5852	.	λ
6229	5893	s	λ
6229	5788	s	l
6229	5833	s	L
6229	5574	<2s>	<>
6230	5883	<name>	<name>
6230	6212	<>	<name>
6230	6214	<>	<aphaerese>
6230	6214	<>	<elision3>
6230	6214	<>	<elision2>
6230	6214	<>	<elision1>
6230	5539	<2s>	<>
6230	6181	<A2kl>	<>
6230	6231	<L2kl>	<>
6231	5855	.	.
6231	5856	 	 
6231	5855	<~>	<~>
6231	5855	<split-s>	<split-s>
6231	5855	<split-h>	<split-h>
6231	5855	<name2>	<name2>
6231	5883	<name2>	<name>
6231	6216	<>	<name>
6231	5859	<aphaerese>	<aphaerese>
6231	6215	<>	<aphaerese>
6231	5855	<elision3>	<elision3>
6231	6215	<>	<elision3>
6231	5855	<elision2>	<elision2>
6231	6215	<>	<elision2>
6231	5855	<elision1>	<elision1>
6231	6215	<>	<elision1>
6231	5852	.	υ
6231	5779	s	υ
6231	5852	.	u
6231	5779	s	u
6231	6196	.	κ
6231	5893	s	κ
6231	5788	s	k
6231	5724	s	U
6231	5879	s	K
6231	5852	.	α
6231	5779	s	α
6231	5852	.	a
6231	5779	s	a
6231	5782	s	A
6231	6196	.	λ
6231	5893	s	λ
6231	5788	s	l
6231	5833	s	L
6231	5587	<2s>	<>
6232	6100	.	.
6232	6101	 	 
6232	6100	<~>	<~>
6232	6100	<split-s>	<split-s>
6232	6100	<split-h>	<split-h>
6232	6100	<name2>	<name2>
6232	6104	<aphaerese>	<aphaerese>
6232	6104	<>	<aphaerese>
6232	6100	<elision3>	<elision3>
6232	6104	<>	<elision3>
6232	6100	<elision2>	<elision2>
6232	6104	<>	<elision2>
6232	6100	<elision1>	<elision1>
6232	6104	<>	<elision1>
6232	6100	.	υ
6232	6100	.	u
6232	6114	.	κ
6232	6132	s	κ
6232	5849	s	k
6232	6174	s	U
6232	5882	s	K
6232	6100	.	α
6232	6100	.	a
6232	6205	s	A
6232	6208	s	λ
6232	5897	s	l
6232	5900	s	L
6233	6100	.	.
6233	6101	 	 
6233	6100	<~>	<~>
6233	6100	<split-s>	<split-s>
6233	6100	<split-h>	<split-h>
6233	6100	<name2>	<name2>
6233	6104	<aphaerese>	<aphaerese>
6233	6107	<>	<aphaerese>
6233	6100	<elision3>	<elision3>
6233	6107	<>	<elision3>
6233	6100	<elision2>	<elision2>
6233	6107	<>	<elision2>
6233	6100	<elision1>	<elision1>
6233	6107	<>	<elision1>
6233	6108	.	υ
6233	6111	s	υ
6233	6108	.	u
6233	6111	s	u
6233	6114	.	κ
6233	6132	s	κ
6233	5849	s	k
6233	6174	s	U
6233	6177	s	K
6233	6108	.	α
6233	6202	s	α
6233	6108	.	a
6233	6202	s	a
6233	6205	s	A
6233	6208	s	λ
6233	5897	s	l
6233	6211	s	L
6234	6103	.	.
6234	6106	 	 
6234	6103	<~>	<~>
6234	6103	<split-s>	<split-s>
6234	6103	<split-h>	<split-h>
6234	6103	<name2>	<name2>
6234	6232	<aphaerese>	<aphaerese>
6234	6103	<>	<aphaerese>
6234	6103	<elision3>	<elision3>
6234	6103	<>	<elision3>
6234	6103	<elision2>	<elision2>
6234	6103	<>	<elision2>
6234	6103	<elision1>	<elision1>
6234	6103	<>	<elision1>
6234	6110	.	υ
6234	6113	s	υ
6234	6110	.	u
6234	6113	s	u
6234	6116	.	κ
6234	6134	s	κ
6234	5851	s	k
6234	6176	s	U
6234	5885	s	K
6234	6110	.	α
6234	6204	s	α
6234	6110	.	a
6234	6204	s	a
6234	6207	s	A
6234	6210	s	λ
6234	5899	s	l
6234	5902	s	L
6235	6103	.	.
6235	6106	 	 
6235	6103	<~>	<~>
6235	6103	<split-s>	<split-s>
6235	6103	<split-h>	<split-h>
6235	6103	<name2>	<name2>
6235	6232	<aphaerese>	<aphaerese>
6235	6236	<>	<aphaerese>
6235	6239	<elision3>	<elision3>
6235	6236	<>	<elision3>
6235	6239	<elision2>	<elision2>
6235	6236	<>	<elision2>
6235	6239	<elision1>	<elision1>
6235	6236	<>	<elision1>
6235	6110	.	υ
6235	6113	s	υ
6235	6110	.	u
6235	6113	s	u
6235	5842	s	κ
6235	5851	s	k
6235	6176	s	U
6235	5885	s	K
6235	6110	.	α
6235	6204	s	α
6235	6110	.	a
6235	6204	s	a
6235	6207	s	A
6235	5842	s	λ
6235	5899	s	l
6235	5902	s	L
6236	6100	.	.
6236	6101	 	 
6236	6100	<~>	<~>
6236	6100	<split-s>	<split-s>
6236	6100	<split-h>	<split-h>
6236	6100	<name2>	<name2>
6236	6104	<aphaerese>	<aphaerese>
6236	6099	<>	<aphaerese>
6236	6237	<elision3>	<elision3>
6236	6099	<>	<elision3>
6236	6237	<elision2>	<elision2>
6236	6099	<>	<elision2>
6236	6237	<elision1>	<elision1>
6236	6099	<>	<elision1>
6236	6108	.	υ
6236	6111	s	υ
6236	6108	.	u
6236	6111	s	u
6236	163	s	κ
6236	5849	s	k
6236	6174	s	U
6236	5882	s	K
6236	6108	.	α
6236	6202	s	α
6236	6108	.	a
6236	6202	s	a
6236	6205	s	A
6236	163	s	λ
6236	5897	s	l
6236	5900	s	L
6237	6100	.	.
6237	6101	 	 
6237	6100	<~>	<~>
6237	6100	<split-s>	<split-s>
6237	6100	<split-h>	<split-h>
6237	6100	<name2>	<name2>
6237	6238	<>	<name>
6237	6104	<aphaerese>	<aphaerese>
6237	6237	<>	<aphaerese>
6237	6100	<elision3>	<elision3>
6237	6237	<>	<elision3>
6237	6100	<elision2>	<elision2>
6237	6237	<>	<elision2>
6237	6100	<elision1>	<elision1>
6237	6237	<>	<elision1>
6237	6108	.	υ
6237	6111	s	υ
6237	6108	.	u
6237	6111	s	u
6237	6114	.	κ
6237	6240	s	κ
6237	6243	s	k
6237	6174	s	U
6237	6246	s	K
6237	6108	.	α
6237	6202	s	α
6237	6108	.	a
6237	6202	s	a
6237	6205	s	A
6237	6254	s	λ
6237	6257	s	l
6237	6260	s	L
6238	6103	.	.
6238	6106	 	 
6238	6103	<~>	<~>
6238	6103	<split-s>	<split-s>
6238	6103	<split-h>	<split-h>
6238	6103	<name2>	<name2>
6238	6232	<aphaerese>	<aphaerese>
6238	6239	<>	<aphaerese>
6238	6103	<elision3>	<elision3>
6238	6239	<>	<elision3>
6238	6103	<elision2>	<elision2>
6238	6239	<>	<elision2>
6238	6103	<elision1>	<elision1>
6238	6239	<>	<elision1>
6238	6110	.	υ
6238	6113	s	υ
6238	6110	.	u
6238	6113	s	u
6238	6116	.	κ
6238	6242	s	κ
6238	6245	s	k
6238	6176	s	U
6238	6248	s	K
6238	6110	.	α
6238	6204	s	α
6238	6110	.	a
6238	6204	s	a
6238	6207	s	A
6238	6256	s	λ
6238	6259	s	l
6238	6262	s	L
6239	6100	.	.
6239	6101	 	 
6239	6100	<~>	<~>
6239	6100	<split-s>	<split-s>
6239	6100	<split-h>	<split-h>
6239	6100	<name2>	<name2>
6239	6104	<aphaerese>	<aphaerese>
6239	6237	<>	<aphaerese>
6239	6100	<elision3>	<elision3>
6239	6237	<>	<elision3>
6239	6100	<elision2>	<elision2>
6239	6237	<>	<elision2>
6239	6100	<elision1>	<elision1>
6239	6237	<>	<elision1>
6239	6108	.	υ
6239	6111	s	υ
6239	6108	.	u
6239	6111	s	u
6239	6114	.	κ
6239	6240	s	κ
6239	6243	s	k
6239	6174	s	U
6239	6246	s	K
6239	6108	.	α
6239	6202	s	α
6239	6108	.	a
6239	6202	s	a
6239	6205	s	A
6239	6254	s	λ
6239	6257	s	l
6239	6260	s	L
6240	164	.	.
6240	165	 	 
6240	164	<~>	<~>
6240	164	<split-s>	<split-s>
6240	164	<split-h>	<split-h>
6240	164	<name2>	<name2>
6240	6241	<>	<name>
6240	168	<aphaerese>	<aphaerese>
6240	6240	<>	<aphaerese>
6240	6135	<elision3>	<elision3>
6240	6240	<>	<elision3>
6240	6135	<elision2>	<elision2>
6240	6240	<>	<elision2>
6240	6135	<elision1>	<elision1>
6240	6240	<>	<elision1>
6240	172	.	υ
6240	5038	s	υ
6240	172	.	u
6240	5038	s	u
6240	172	.	κ
6240	5724	s	U
6240	172	.	α
6240	5779	s	α
6240	172	.	a
6240	5779	s	a
6240	5782	s	A
6240	172	.	λ
6240	5660	<2s>	<>
6241	167	.	.
6241	170	 	 
6241	167	<~>	<~>
6241	167	<split-s>	<split-s>
6241	167	<split-h>	<split-h>
6241	167	<name2>	<name2>
6241	5822	<aphaerese>	<aphaerese>
6241	6242	<>	<aphaerese>
6241	6137	<elision3>	<elision3>
6241	6242	<>	<elision3>
6241	6137	<elision2>	<elision2>
6241	6242	<>	<elision2>
6241	6137	<elision1>	<elision1>
6241	6242	<>	<elision1>
6241	174	.	υ
6241	5616	s	υ
6241	174	.	u
6241	5616	s	u
6241	174	.	κ
6241	5726	s	U
6241	174	.	α
6241	5781	s	α
6241	174	.	a
6241	5781	s	a
6241	5784	s	A
6241	174	.	λ
6241	5661	<2s>	<>
6242	164	.	.
6242	165	 	 
6242	164	<~>	<~>
6242	164	<split-s>	<split-s>
6242	164	<split-h>	<split-h>
6242	164	<name2>	<name2>
6242	168	<aphaerese>	<aphaerese>
6242	6240	<>	<aphaerese>
6242	6135	<elision3>	<elision3>
6242	6240	<>	<elision3>
6242	6135	<elision2>	<elision2>
6242	6240	<>	<elision2>
6242	6135	<elision1>	<elision1>
6242	6240	<>	<elision1>
6242	172	.	υ
6242	5038	s	υ
6242	172	.	u
6242	5038	s	u
6242	172	.	κ
6242	5724	s	U
6242	172	.	α
6242	5779	s	α
6242	172	.	a
6242	5779	s	a
6242	5782	s	A
6242	172	.	λ
6242	5659	<2s>	<>
6243	164	.	.
6243	165	 	 
6243	164	<~>	<~>
6243	164	<split-s>	<split-s>
6243	164	<split-h>	<split-h>
6243	164	<name2>	<name2>
6243	6244	<>	<name>
6243	168	<aphaerese>	<aphaerese>
6243	6243	<>	<aphaerese>
6243	164	<elision3>	<elision3>
6243	6243	<>	<elision3>
6243	164	<elision2>	<elision2>
6243	6243	<>	<elision2>
6243	164	<elision1>	<elision1>
6243	6243	<>	<elision1>
6243	172	.	υ
6243	5038	s	υ
6243	172	.	u
6243	5038	s	u
6243	5852	.	κ
6243	5724	s	U
6243	172	.	α
6243	5779	s	α
6243	172	.	a
6243	5779	s	a
6243	5782	s	A
6243	5852	.	λ
6243	5669	<2s>	<>
6244	167	.	.
6244	170	 	 
6244	167	<~>	<~>
6244	167	<split-s>	<split-s>
6244	167	<split-h>	<split-h>
6244	167	<name2>	<name2>
6244	5822	<aphaerese>	<aphaerese>
6244	6245	<>	<aphaerese>
6244	167	<elision3>	<elision3>
6244	6245	<>	<elision3>
6244	167	<elision2>	<elision2>
6244	6245	<>	<elision2>
6244	167	<elision1>	<elision1>
6244	6245	<>	<elision1>
6244	174	.	υ
6244	5616	s	υ
6244	174	.	u
6244	5616	s	u
6244	5854	.	κ
6244	5726	s	U
6244	174	.	α
6244	5781	s	α
6244	174	.	a
6244	5781	s	a
6244	5784	s	A
6244	5854	.	λ
6244	5670	<2s>	<>
6245	164	.	.
6245	165	 	 
6245	164	<~>	<~>
6245	164	<split-s>	<split-s>
6245	164	<split-h>	<split-h>
6245	164	<name2>	<name2>
6245	168	<aphaerese>	<aphaerese>
6245	6243	<>	<aphaerese>
6245	164	<elision3>	<elision3>
6245	6243	<>	<elision3>
6245	164	<elision2>	<elision2>
6245	6243	<>	<elision2>
6245	164	<elision1>	<elision1>
6245	6243	<>	<elision1>
6245	172	.	υ
6245	5038	s	υ
6245	172	.	u
6245	5038	s	u
6245	5852	.	κ
6245	5724	s	U
6245	172	.	α
6245	5779	s	α
6245	172	.	a
6245	5779	s	a
6245	5782	s	A
6245	5852	.	λ
6245	5668	<2s>	<>
6246	5883	<name>	<name>
6246	6247	<>	<name>
6246	6249	<>	<aphaerese>
6246	6249	<>	<elision3>
6246	6249	<>	<elision2>
6246	6249	<>	<elision1>
6246	5539	<2s>	<>
6246	5887	<L2kl>	<>
6246	6253	<K2kl>	<>
6247	6248	<>	<aphaerese>
6247	6248	<>	<elision3>
6247	6248	<>	<elision2>
6247	6248	<>	<elision1>
6247	5888	<L2kl>	<>
6247	6251	<K2kl>	<>
6248	6249	<>	<aphaerese>
6248	6249	<>	<elision3>
6248	6249	<>	<elision2>
6248	6249	<>	<elision1>
6248	5889	<L2kl>	<>
6248	6252	<K2kl>	<>
6249	6247	<>	<name>
6249	6249	<>	<aphaerese>
6249	6249	<>	<elision3>
6249	6249	<>	<elision2>
6249	6249	<>	<elision1>
6249	5887	<L2kl>	<>
6249	6250	<K2kl>	<>
6250	5855	.	.
6250	5856	 	 
6250	5855	<~>	<~>
6250	5855	<split-s>	<split-s>
6250	5855	<split-h>	<split-h>
6250	5855	<name2>	<name2>
6250	6251	<>	<name>
6250	5859	<aphaerese>	<aphaerese>
6250	6250	<>	<aphaerese>
6250	5855	<elision3>	<elision3>
6250	6250	<>	<elision3>
6250	5855	<elision2>	<elision2>
6250	6250	<>	<elision2>
6250	5855	<elision1>	<elision1>
6250	6250	<>	<elision1>
6250	5852	.	υ
6250	5779	s	υ
6250	5852	.	u
6250	5779	s	u
6250	5724	s	U
6250	5852	.	α
6250	5779	s	α
6250	5852	.	a
6250	5779	s	a
6250	5782	s	A
6250	5682	<2s>	<>
6251	5858	.	.
6251	5861	 	 
6251	5858	<~>	<~>
6251	5858	<split-s>	<split-s>
6251	5858	<split-h>	<split-h>
6251	5858	<name2>	<name2>
6251	5878	<aphaerese>	<aphaerese>
6251	6252	<>	<aphaerese>
6251	5858	<elision3>	<elision3>
6251	6252	<>	<elision3>
6251	5858	<elision2>	<elision2>
6251	6252	<>	<elision2>
6251	5858	<elision1>	<elision1>
6251	6252	<>	<elision1>
6251	5854	.	υ
6251	5781	s	υ
6251	5854	.	u
6251	5781	s	u
6251	5726	s	U
6251	5854	.	α
6251	5781	s	α
6251	5854	.	a
6251	5781	s	a
6251	5784	s	A
6251	5683	<2s>	<>
6252	5855	.	.
6252	5856	 	 
6252	5855	<~>	<~>
6252	5855	<split-s>	<split-s>
6252	5855	<split-h>	<split-h>
6252	5855	<name2>	<name2>
6252	5859	<aphaerese>	<aphaerese>
6252	6250	<>	<aphaerese>
6252	5855	<elision3>	<elision3>
6252	6250	<>	<elision3>
6252	5855	<elision2>	<elision2>
6252	6250	<>	<elision2>
6252	5855	<elision1>	<elision1>
6252	6250	<>	<elision1>
6252	5852	.	υ
6252	5779	s	υ
6252	5852	.	u
6252	5779	s	u
6252	5724	s	U
6252	5852	.	α
6252	5779	s	α
6252	5852	.	a
6252	5779	s	a
6252	5782	s	A
6252	5681	<2s>	<>
6253	5855	.	.
6253	5856	 	 
6253	5855	<~>	<~>
6253	5855	<split-s>	<split-s>
6253	5855	<split-h>	<split-h>
6253	5855	<name2>	<name2>
6253	5883	<name2>	<name>
6253	6251	<>	<name>
6253	5859	<aphaerese>	<aphaerese>
6253	6250	<>	<aphaerese>
6253	5855	<elision3>	<elision3>
6253	6250	<>	<elision3>
6253	5855	<elision2>	<elision2>
6253	6250	<>	<elision2>
6253	5855	<elision1>	<elision1>
6253	6250	<>	<elision1>
6253	5852	.	υ
6253	5779	s	υ
6253	5852	.	u
6253	5779	s	u
6253	5724	s	U
6253	5852	.	α
6253	5779	s	α
6253	5852	.	a
6253	5779	s	a
6253	5782	s	A
6253	5688	<2s>	<>
6254	164	.	.
6254	165	 	 
6254	164	<~>	<~>
6254	164	<split-s>	<split-s>
6254	164	<split-h>	<split-h>
6254	164	<name2>	<name2>
6254	6255	<>	<name>
6254	168	<aphaerese>	<aphaerese>
6254	6254	<>	<aphaerese>
6254	164	<elision3>	<elision3>
6254	6254	<>	<elision3>
6254	164	<elision2>	<elision2>
6254	6254	<>	<elision2>
6254	164	<elision1>	<elision1>
6254	6254	<>	<elision1>
6254	172	.	υ
6254	5038	s	υ
6254	172	.	u
6254	5038	s	u
6254	172	.	κ
6254	5724	s	U
6254	172	.	α
6254	5779	s	α
6254	172	.	a
6254	5779	s	a
6254	5782	s	A
6254	172	.	λ
6254	5669	<2s>	<>
6255	167	.	.
6255	170	 	 
6255	167	<~>	<~>
6255	167	<split-s>	<split-s>
6255	167	<split-h>	<split-h>
6255	167	<name2>	<name2>
6255	5822	<aphaerese>	<aphaerese>
6255	6256	<>	<aphaerese>
6255	167	<elision3>	<elision3>
6255	6256	<>	<elision3>
6255	167	<elision2>	<elision2>
6255	6256	<>	<elision2>
6255	167	<elision1>	<elision1>
6255	6256	<>	<elision1>
6255	174	.	υ
6255	5616	s	υ
6255	174	.	u
6255	5616	s	u
6255	174	.	κ
6255	5726	s	U
6255	174	.	α
6255	5781	s	α
6255	174	.	a
6255	5781	s	a
6255	5784	s	A
6255	174	.	λ
6255	5670	<2s>	<>
6256	164	.	.
6256	165	 	 
6256	164	<~>	<~>
6256	164	<split-s>	<split-s>
6256	164	<split-h>	<split-h>
6256	164	<name2>	<name2>
6256	168	<aphaerese>	<aphaerese>
6256	6254	<>	<aphaerese>
6256	164	<elision3>	<elision3>
6256	6254	<>	<elision3>
6256	164	<elision2>	<elision2>
6256	6254	<>	<elision2>
6256	164	<elision1>	<elision1>
6256	6254	<>	<elision1>
6256	172	.	υ
6256	5038	s	υ
6256	172	.	u
6256	5038	s	u
6256	172	.	κ
6256	5724	s	U
6256	172	.	α
6256	5779	s	α
6256	172	.	a
6256	5779	s	a
6256	5782	s	A
6256	172	.	λ
6256	5668	<2s>	<>
6257	5855	.	.
6257	5856	 	 
6257	5855	<~>	<~>
6257	5855	<split-s>	<split-s>
6257	5855	<split-h>	<split-h>
6257	5855	<name2>	<name2>
6257	6258	<>	<name>
6257	5859	<aphaerese>	<aphaerese>
6257	6257	<>	<aphaerese>
6257	5855	<elision3>	<elision3>
6257	6257	<>	<elision3>
6257	5855	<elision2>	<elision2>
6257	6257	<>	<elision2>
6257	5855	<elision1>	<elision1>
6257	6257	<>	<elision1>
6257	5852	.	υ
6257	5779	s	υ
6257	5852	.	u
6257	5779	s	u
6257	5852	.	κ
6257	5724	s	U
6257	5852	.	α
6257	5779	s	α
6257	5852	.	a
6257	5779	s	a
6257	5782	s	A
6257	5852	.	λ
6257	5669	<2s>	<>
6258	5858	.	.
6258	5861	 	 
6258	5858	<~>	<~>
6258	5858	<split-s>	<split-s>
6258	5858	<split-h>	<split-h>
6258	5858	<name2>	<name2>
6258	5878	<aphaerese>	<aphaerese>
6258	6259	<>	<aphaerese>
6258	5858	<elision3>	<elision3>
6258	6259	<>	<elision3>
6258	5858	<elision2>	<elision2>
6258	6259	<>	<elision2>
6258	5858	<elision1>	<elision1>
6258	6259	<>	<elision1>
6258	5854	.	υ
6258	5781	s	υ
6258	5854	.	u
6258	5781	s	u
6258	5854	.	κ
6258	5726	s	U
6258	5854	.	α
6258	5781	s	α
6258	5854	.	a
6258	5781	s	a
6258	5784	s	A
6258	5854	.	λ
6258	5670	<2s>	<>
6259	5855	.	.
6259	5856	 	 
6259	5855	<~>	<~>
6259	5855	<split-s>	<split-s>
6259	5855	<split-h>	<split-h>
6259	5855	<name2>	<name2>
6259	5859	<aphaerese>	<aphaerese>
6259	6257	<>	<aphaerese>
6259	5855	<elision3>	<elision3>
6259	6257	<>	<elision3>
6259	5855	<elision2>	<elision2>
6259	6257	<>	<elision2>
6259	5855	<elision1>	<elision1>
6259	6257	<>	<elision1>
6259	5852	.	υ
6259	5779	s	υ
6259	5852	.	u
6259	5779	s	u
6259	5852	.	κ
6259	5724	s	U
6259	5852	.	α
6259	5779	s	α
6259	5852	.	a
6259	5779	s	a
6259	5782	s	A
6259	5852	.	λ
6259	5668	<2s>	<>
6260	5883	<name>	<name>
6260	6261	<>	<name>
6260	6263	<>	<aphaerese>
6260	6263	<>	<elision3>
6260	6263	<>	<elision2>
6260	6263	<>	<elision1>
6260	5539	<2s>	<>
6260	6264	<L2kl>	<>
6261	6262	<>	<aphaerese>
6261	6262	<>	<elision3>
6261	6262	<>	<elision2>
6261	6262	<>	<elision1>
6261	6258	<L2kl>	<>
6262	6263	<>	<aphaerese>
6262	6263	<>	<elision3>
6262	6263	<>	<elision2>
6262	6263	<>	<elision1>
6262	6259	<L2kl>	<>
6263	6261	<>	<name>
6263	6263	<>	<aphaerese>
6263	6263	<>	<elision3>
6263	6263	<>	<elision2>
6263	6263	<>	<elision1>
6263	6257	<L2kl>	<>
6264	5855	.	.
6264	5856	 	 
6264	5855	<~>	<~>
6264	5855	<split-s>	<split-s>
6264	5855	<split-h>	<split-h>
6264	5855	<name2>	<name2>
6264	5883	<name2>	<name>
6264	6258	<>	<name>
6264	5859	<aphaerese>	<aphaerese>
6264	6257	<>	<aphaerese>
6264	5855	<elision3>	<elision3>
6264	6257	<>	<elision3>
6264	5855	<elision2>	<elision2>
6264	6257	<>	<elision2>
6264	5855	<elision1>	<elision1>
6264	6257	<>	<elision1>
6264	5852	.	υ
6264	5779	s	υ
6264	5852	.	u
6264	5779	s	u
6264	5852	.	κ
6264	5724	s	U
6264	5852	.	α
6264	5779	s	α
6264	5852	.	a
6264	5779	s	a
6264	5782	s	A
6264	5852	.	λ
6264	5695	<2s>	<>
6265	6266	.	.
6265	6267	 	 
6265	6266	<~>	<~>
6265	6266	<split-s>	<split-s>
6265	6266	<split-h>	<split-h>
6265	6266	<name2>	<name2>
6265	6381	<>	<name>
6265	6270	<aphaerese>	<aphaerese>
6265	6265	<>	<aphaerese>
6265	6383	<elision3>	<elision3>
6265	6265	<>	<elision3>
6265	6383	<elision2>	<elision2>
6265	6265	<>	<elision2>
6265	6383	<elision1>	<elision1>
6265	6265	<>	<elision1>
6265	6274	.	υ
6265	6277	s	υ
6265	6274	.	u
6265	6277	s	u
6265	5908	s	κ
6265	6033	s	k
6265	6323	s	U
6265	6051	s	K
6265	6274	.	α
6265	6348	s	α
6265	6274	.	a
6265	6348	s	a
6265	6351	s	A
6265	5908	s	λ
6265	6064	s	l
6265	6067	s	L
6265	6412	<1s>	<>
6266	6266	.	.
6266	6267	 	 
6266	6266	<~>	<~>
6266	6266	<split-s>	<split-s>
6266	6266	<split-h>	<split-h>
6266	6266	<name2>	<name2>
6266	6380	<>	<name>
6266	6270	<aphaerese>	<aphaerese>
6266	6266	<>	<aphaerese>
6266	6266	<elision3>	<elision3>
6266	6266	<>	<elision3>
6266	6266	<elision2>	<elision2>
6266	6266	<>	<elision2>
6266	6266	<elision1>	<elision1>
6266	6266	<>	<elision1>
6266	6274	.	υ
6266	6277	s	υ
6266	6274	.	u
6266	6277	s	u
6266	6280	.	κ
6266	6298	s	κ
6266	6033	s	k
6266	6323	s	U
6266	6051	s	K
6266	6274	.	α
6266	6348	s	α
6266	6274	.	a
6266	6348	s	a
6266	6351	s	A
6266	6354	s	λ
6266	6064	s	l
6266	6067	s	L
6266	5222	<1s>	<>
6267	6266	.	.
6267	6267	 	 
6267	6266	<~>	<~>
6267	6266	<split-s>	<split-s>
6267	6266	<split-h>	<split-h>
6267	6266	<name2>	<name2>
6267	6268	<>	<name>
6267	6270	<aphaerese>	<aphaerese>
6267	6273	<>	<aphaerese>
6267	6266	<elision3>	<elision3>
6267	6273	<>	<elision3>
6267	6266	<elision2>	<elision2>
6267	6273	<>	<elision2>
6267	6266	<elision1>	<elision1>
6267	6273	<>	<elision1>
6267	6274	.	υ
6267	6365	s	υ
6267	6274	.	u
6267	6365	s	u
6267	6280	.	κ
6267	6366	s	κ
6267	6367	s	k
6267	6368	s	U
6267	6370	s	K
6267	6274	.	α
6267	6372	s	α
6267	6274	.	a
6267	6372	s	a
6267	6373	s	A
6267	6374	s	λ
6267	6375	s	l
6267	6376	s	L
6267	5222	<1s>	<>
6268	6269	.	.
6268	6272	 	 
6268	6269	<~>	<~>
6268	6269	<split-s>	<split-s>
6268	6269	<split-h>	<split-h>
6268	6269	<name2>	<name2>
6268	6378	<aphaerese>	<aphaerese>
6268	6379	<>	<aphaerese>
6268	6269	<elision3>	<elision3>
6268	6379	<>	<elision3>
6268	6269	<elision2>	<elision2>
6268	6379	<>	<elision2>
6268	6269	<elision1>	<elision1>
6268	6379	<>	<elision1>
6268	6276	.	υ
6268	6279	s	υ
6268	6276	.	u
6268	6279	s	u
6268	6282	.	κ
6268	6300	s	κ
6268	6035	s	k
6268	6325	s	U
6268	6328	s	K
6268	6276	.	α
6268	6350	s	α
6268	6276	.	a
6268	6350	s	a
6268	6353	s	A
6268	6356	s	λ
6268	6066	s	l
6268	6359	s	L
6268	5223	<1s>	<>
6269	6266	.	.
6269	6267	 	 
6269	6266	<~>	<~>
6269	6266	<split-s>	<split-s>
6269	6266	<split-h>	<split-h>
6269	6266	<name2>	<name2>
6269	6270	<aphaerese>	<aphaerese>
6269	6266	<>	<aphaerese>
6269	6266	<elision3>	<elision3>
6269	6266	<>	<elision3>
6269	6266	<elision2>	<elision2>
6269	6266	<>	<elision2>
6269	6266	<elision1>	<elision1>
6269	6266	<>	<elision1>
6269	6274	.	υ
6269	6277	s	υ
6269	6274	.	u
6269	6277	s	u
6269	6280	.	κ
6269	6298	s	κ
6269	6033	s	k
6269	6323	s	U
6269	6051	s	K
6269	6274	.	α
6269	6348	s	α
6269	6274	.	a
6269	6348	s	a
6269	6351	s	A
6269	6354	s	λ
6269	6064	s	l
6269	6067	s	L
6269	5221	<1s>	<>
6270	6266	.	.
6270	6267	 	 
6270	6266	<~>	<~>
6270	6266	<split-s>	<split-s>
6270	6266	<split-h>	<split-h>
6270	6266	<name2>	<name2>
6270	6271	<>	<name>
6270	6270	<aphaerese>	<aphaerese>
6270	6270	<>	<aphaerese>
6270	6266	<elision3>	<elision3>
6270	6270	<>	<elision3>
6270	6266	<elision2>	<elision2>
6270	6270	<>	<elision2>
6270	6266	<elision1>	<elision1>
6270	6270	<>	<elision1>
6270	6266	.	υ
6270	6266	.	u
6270	6280	.	κ
6270	6298	s	κ
6270	6033	s	k
6270	6323	s	U
6270	6051	s	K
6270	6266	.	α
6270	6266	.	a
6270	6351	s	A
6270	6354	s	λ
6270	6064	s	l
6270	6067	s	L
6270	5209	<1s>	<>
6271	6269	.	.
6271	6272	 	 
6271	6269	<~>	<~>
6271	6269	<split-s>	<split-s>
6271	6269	<split-h>	<split-h>
6271	6269	<name2>	<name2>
6271	6378	<aphaerese>	<aphaerese>
6271	6378	<>	<aphaerese>
6271	6269	<elision3>	<elision3>
6271	6378	<>	<elision3>
6271	6269	<elision2>	<elision2>
6271	6378	<>	<elision2>
6271	6269	<elision1>	<elision1>
6271	6378	<>	<elision1>
6271	6269	.	υ
6271	6269	.	u
6271	6282	.	κ
6271	6300	s	κ
6271	6035	s	k
6271	6325	s	U
6271	6054	s	K
6271	6269	.	α
6271	6269	.	a
6271	6353	s	A
6271	6356	s	λ
6271	6066	s	l
6271	6069	s	L
6271	5210	<1s>	<>
6272	6266	.	.
6272	6267	 	 
6272	6266	<~>	<~>
6272	6266	<split-s>	<split-s>
6272	6266	<split-h>	<split-h>
6272	6266	<name2>	<name2>
6272	6270	<aphaerese>	<aphaerese>
6272	6273	<>	<aphaerese>
6272	6266	<elision3>	<elision3>
6272	6273	<>	<elision3>
6272	6266	<elision2>	<elision2>
6272	6273	<>	<elision2>
6272	6266	<elision1>	<elision1>
6272	6273	<>	<elision1>
6272	6274	.	υ
6272	6365	s	υ
6272	6274	.	u
6272	6365	s	u
6272	6280	.	κ
6272	6366	s	κ
6272	6367	s	k
6272	6368	s	U
6272	6370	s	K
6272	6274	.	α
6272	6372	s	α
6272	6274	.	a
6272	6372	s	a
6272	6373	s	A
6272	6374	s	λ
6272	6375	s	l
6272	6376	s	L
6272	5221	<1s>	<>
6273	6266	.	.
6273	6267	 	 
6273	6266	<~>	<~>
6273	6266	<split-s>	<split-s>
6273	6266	<split-h>	<split-h>
6273	6266	<name2>	<name2>
6273	6268	<>	<name>
6273	6270	<aphaerese>	<aphaerese>
6273	6273	<>	<aphaerese>
6273	6266	<elision3>	<elision3>
6273	6273	<>	<elision3>
6273	6266	<elision2>	<elision2>
6273	6273	<>	<elision2>
6273	6266	<elision1>	<elision1>
6273	6273	<>	<elision1>
6273	6274	.	υ
6273	6277	s	υ
6273	6274	.	u
6273	6277	s	u
6273	6280	.	κ
6273	6298	s	κ
6273	6033	s	k
6273	6323	s	U
6273	6326	s	K
6273	6274	.	α
6273	6348	s	α
6273	6274	.	a
6273	6348	s	a
6273	6351	s	A
6273	6354	s	λ
6273	6064	s	l
6273	6357	s	L
6273	5222	<1s>	<>
6274	6275	<>	<name>
6274	6274	<>	<aphaerese>
6274	6266	<elision3>	<elision3>
6274	6274	<>	<elision3>
6274	6266	<elision2>	<elision2>
6274	6274	<>	<elision2>
6274	6266	<elision1>	<elision1>
6274	6274	<>	<elision1>
6274	176	<1s>	<>
6275	6276	<>	<aphaerese>
6275	6269	<elision3>	<elision3>
6275	6276	<>	<elision3>
6275	6269	<elision2>	<elision2>
6275	6276	<>	<elision2>
6275	6269	<elision1>	<elision1>
6275	6276	<>	<elision1>
6275	177	<1s>	<>
6276	6274	<>	<aphaerese>
6276	6266	<elision3>	<elision3>
6276	6274	<>	<elision3>
6276	6266	<elision2>	<elision2>
6276	6274	<>	<elision2>
6276	6266	<elision1>	<elision1>
6276	6274	<>	<elision1>
6276	175	<1s>	<>
6277	5909	.	.
6277	5910	 	 
6277	5909	<~>	<~>
6277	5909	<split-s>	<split-s>
6277	5909	<split-h>	<split-h>
6277	5909	<name2>	<name2>
6277	6278	<>	<name>
6277	5913	<aphaerese>	<aphaerese>
6277	6277	<>	<aphaerese>
6277	6277	<>	<elision3>
6277	6277	<>	<elision2>
6277	6277	<>	<elision1>
6277	5917	.	υ
6277	5920	s	υ
6277	5917	.	u
6277	5920	s	u
6277	5938	.	κ
6277	5953	s	κ
6277	5959	s	k
6277	5962	s	U
6277	6014	s	K
6277	5917	.	α
6277	5920	s	α
6277	5917	.	a
6277	5920	s	a
6277	5992	s	A
6277	5959	s	λ
6277	5959	s	l
6277	6021	s	L
6277	5227	<2s>	<>
6278	5912	.	.
6278	5915	 	 
6278	5912	<~>	<~>
6278	5912	<split-s>	<split-s>
6278	5912	<split-h>	<split-h>
6278	5912	<name2>	<name2>
6278	6013	<aphaerese>	<aphaerese>
6278	6279	<>	<aphaerese>
6278	6279	<>	<elision3>
6278	6279	<>	<elision2>
6278	6279	<>	<elision1>
6278	5919	.	υ
6278	5937	s	υ
6278	5919	.	u
6278	5937	s	u
6278	5940	.	κ
6278	5955	s	κ
6278	5961	s	k
6278	5964	s	U
6278	6016	s	K
6278	5919	.	α
6278	5937	s	α
6278	5919	.	a
6278	5937	s	a
6278	5994	s	A
6278	5961	s	λ
6278	5961	s	l
6278	6023	s	L
6278	5228	<2s>	<>
6279	5909	.	.
6279	5910	 	 
6279	5909	<~>	<~>
6279	5909	<split-s>	<split-s>
6279	5909	<split-h>	<split-h>
6279	5909	<name2>	<name2>
6279	5913	<aphaerese>	<aphaerese>
6279	6277	<>	<aphaerese>
6279	6277	<>	<elision3>
6279	6277	<>	<elision2>
6279	6277	<>	<elision1>
6279	5917	.	υ
6279	5920	s	υ
6279	5917	.	u
6279	5920	s	u
6279	5938	.	κ
6279	5953	s	κ
6279	5959	s	k
6279	5962	s	U
6279	6014	s	K
6279	5917	.	α
6279	5920	s	α
6279	5917	.	a
6279	5920	s	a
6279	5992	s	A
6279	5959	s	λ
6279	5959	s	l
6279	6021	s	L
6279	5226	<2s>	<>
6280	6281	<>	<name>
6280	6280	<>	<aphaerese>
6280	6283	<elision3>	<elision3>
6280	6280	<>	<elision3>
6280	6283	<elision2>	<elision2>
6280	6280	<>	<elision2>
6280	6283	<elision1>	<elision1>
6280	6280	<>	<elision1>
6280	5206	<1s>	<>
6281	6282	<>	<aphaerese>
6281	6285	<elision3>	<elision3>
6281	6282	<>	<elision3>
6281	6285	<elision2>	<elision2>
6281	6282	<>	<elision2>
6281	6285	<elision1>	<elision1>
6281	6282	<>	<elision1>
6281	5207	<1s>	<>
6282	6280	<>	<aphaerese>
6282	6283	<elision3>	<elision3>
6282	6280	<>	<elision3>
6282	6283	<elision2>	<elision2>
6282	6280	<>	<elision2>
6282	6283	<elision1>	<elision1>
6282	6280	<>	<elision1>
6282	5205	<1s>	<>
6283	6284	<>	<name>
6283	6283	<>	<aphaerese>
6283	6283	<>	<elision3>
6283	6283	<>	<elision2>
6283	6283	<>	<elision1>
6283	6286	s	κ
6283	6286	s	k
6283	6289	s	K
6283	6286	s	λ
6283	6293	s	l
6283	6295	s	L
6283	5067	<1s>	<>
6284	6285	<>	<aphaerese>
6284	6285	<>	<elision3>
6284	6285	<>	<elision2>
6284	6285	<>	<elision1>
6284	6288	s	κ
6284	6288	s	k
6284	6291	s	K
6284	6288	s	λ
6284	6292	s	l
6284	6297	s	L
6284	5068	<1s>	<>
6285	6283	<>	<aphaerese>
6285	6283	<>	<elision3>
6285	6283	<>	<elision2>
6285	6283	<>	<elision1>
6285	6286	s	κ
6285	6286	s	k
6285	6289	s	K
6285	6286	s	λ
6285	6293	s	l
6285	6295	s	L
6285	5066	<1s>	<>
6286	6287	<>	<name>
6286	6286	<>	<aphaerese>
6286	6286	<>	<elision3>
6286	6286	<>	<elision2>
6286	6286	<>	<elision1>
6286	6030	s	κ
6286	5959	s	k
6286	6014	s	K
6286	6030	s	λ
6286	5959	s	l
6286	6021	s	L
6286	5242	<2s>	<>
6287	6288	<>	<aphaerese>
6287	6288	<>	<elision3>
6287	6288	<>	<elision2>
6287	6288	<>	<elision1>
6287	6032	s	κ
6287	5961	s	k
6287	6016	s	K
6287	6032	s	λ
6287	5961	s	l
6287	6023	s	L
6287	5243	<2s>	<>
6288	6286	<>	<aphaerese>
6288	6286	<>	<elision3>
6288	6286	<>	<elision2>
6288	6286	<>	<elision1>
6288	6030	s	κ
6288	5959	s	k
6288	6014	s	K
6288	6030	s	λ
6288	5959	s	l
6288	6021	s	L
6288	5241	<2s>	<>
6289	6290	<>	<name>
6289	6289	<>	<aphaerese>
6289	6289	<>	<elision3>
6289	6289	<>	<elision2>
6289	6289	<>	<elision1>
6289	6293	<K2kl>	<>
6290	6291	<>	<aphaerese>
6290	6291	<>	<elision3>
6290	6291	<>	<elision2>
6290	6291	<>	<elision1>
6290	6294	<K2kl>	<>
6291	6289	<>	<aphaerese>
6291	6289	<>	<elision3>
6291	6289	<>	<elision2>
6291	6289	<>	<elision1>
6291	6292	<K2kl>	<>
6292	6293	<>	<aphaerese>
6292	6293	<>	<elision3>
6292	6293	<>	<elision2>
6292	6293	<>	<elision1>
6292	5241	<2s>	<>
6293	6294	<>	<name>
6293	6293	<>	<aphaerese>
6293	6293	<>	<elision3>
6293	6293	<>	<elision2>
6293	6293	<>	<elision1>
6293	5242	<2s>	<>
6294	6292	<>	<aphaerese>
6294	6292	<>	<elision3>
6294	6292	<>	<elision2>
6294	6292	<>	<elision1>
6294	5243	<2s>	<>
6295	6296	<>	<name>
6295	6295	<>	<aphaerese>
6295	6295	<>	<elision3>
6295	6295	<>	<elision2>
6295	6295	<>	<elision1>
6295	6293	<L2kl>	<>
6296	6297	<>	<aphaerese>
6296	6297	<>	<elision3>
6296	6297	<>	<elision2>
6296	6297	<>	<elision1>
6296	6294	<L2kl>	<>
6297	6295	<>	<aphaerese>
6297	6295	<>	<elision3>
6297	6295	<>	<elision2>
6297	6295	<>	<elision1>
6297	6292	<L2kl>	<>
6298	5909	.	.
6298	5910	 	 
6298	5909	<~>	<~>
6298	5909	<split-s>	<split-s>
6298	5909	<split-h>	<split-h>
6298	5909	<name2>	<name2>
6298	6299	<>	<name>
6298	5913	<aphaerese>	<aphaerese>
6298	6298	<>	<aphaerese>
6298	6301	<elision3>	<elision3>
6298	6298	<>	<elision3>
6298	6301	<elision2>	<elision2>
6298	6298	<>	<elision2>
6298	6301	<elision1>	<elision1>
6298	6298	<>	<elision1>
6298	5917	.	υ
6298	5920	s	υ
6298	5917	.	u
6298	5920	s	u
6298	5917	.	κ
6298	6030	s	κ
6298	5959	s	k
6298	5962	s	U
6298	6014	s	K
6298	5917	.	α
6298	5920	s	α
6298	5917	.	a
6298	5920	s	a
6298	5992	s	A
6298	5917	.	λ
6298	6030	s	λ
6298	5959	s	l
6298	6021	s	L
6298	5407	<2s>	<>
6299	5912	.	.
6299	5915	 	 
6299	5912	<~>	<~>
6299	5912	<split-s>	<split-s>
6299	5912	<split-h>	<split-h>
6299	5912	<name2>	<name2>
6299	6013	<aphaerese>	<aphaerese>
6299	6300	<>	<aphaerese>
6299	6303	<elision3>	<elision3>
6299	6300	<>	<elision3>
6299	6303	<elision2>	<elision2>
6299	6300	<>	<elision2>
6299	6303	<elision1>	<elision1>
6299	6300	<>	<elision1>
6299	5919	.	υ
6299	5937	s	υ
6299	5919	.	u
6299	5937	s	u
6299	5919	.	κ
6299	6032	s	κ
6299	5961	s	k
6299	5964	s	U
6299	6016	s	K
6299	5919	.	α
6299	5937	s	α
6299	5919	.	a
6299	5937	s	a
6299	5994	s	A
6299	5919	.	λ
6299	6032	s	λ
6299	5961	s	l
6299	6023	s	L
6299	5408	<2s>	<>
6300	5909	.	.
6300	5910	 	 
6300	5909	<~>	<~>
6300	5909	<split-s>	<split-s>
6300	5909	<split-h>	<split-h>
6300	5909	<name2>	<name2>
6300	5913	<aphaerese>	<aphaerese>
6300	6298	<>	<aphaerese>
6300	6301	<elision3>	<elision3>
6300	6298	<>	<elision3>
6300	6301	<elision2>	<elision2>
6300	6298	<>	<elision2>
6300	6301	<elision1>	<elision1>
6300	6298	<>	<elision1>
6300	5917	.	υ
6300	5920	s	υ
6300	5917	.	u
6300	5920	s	u
6300	5917	.	κ
6300	6030	s	κ
6300	5959	s	k
6300	5962	s	U
6300	6014	s	K
6300	5917	.	α
6300	5920	s	α
6300	5917	.	a
6300	5920	s	a
6300	5992	s	A
6300	5917	.	λ
6300	6030	s	λ
6300	5959	s	l
6300	6021	s	L
6300	5406	<2s>	<>
6301	5909	.	.
6301	5910	 	 
6301	5909	<~>	<~>
6301	5909	<split-s>	<split-s>
6301	5909	<split-h>	<split-h>
6301	5909	<name2>	<name2>
6301	6302	<>	<name>
6301	5913	<aphaerese>	<aphaerese>
6301	6301	<>	<aphaerese>
6301	5909	<elision3>	<elision3>
6301	6301	<>	<elision3>
6301	5909	<elision2>	<elision2>
6301	6301	<>	<elision2>
6301	5909	<elision1>	<elision1>
6301	6301	<>	<elision1>
6301	5917	.	υ
6301	5920	s	υ
6301	5917	.	u
6301	5920	s	u
6301	5938	.	κ
6301	6304	s	κ
6301	6307	s	k
6301	5962	s	U
6301	6310	s	K
6301	5917	.	α
6301	5920	s	α
6301	5917	.	a
6301	5920	s	a
6301	5992	s	A
6301	6307	s	λ
6301	6307	s	l
6301	6318	s	L
6301	5310	<2s>	<>
6302	5912	.	.
6302	5915	 	 
6302	5912	<~>	<~>
6302	5912	<split-s>	<split-s>
6302	5912	<split-h>	<split-h>
6302	5912	<name2>	<name2>
6302	6013	<aphaerese>	<aphaerese>
6302	6303	<>	<aphaerese>
6302	5912	<elision3>	<elision3>
6302	6303	<>	<elision3>
6302	5912	<elision2>	<elision2>
6302	6303	<>	<elision2>
6302	5912	<elision1>	<elision1>
6302	6303	<>	<elision1>
6302	5919	.	υ
6302	5937	s	υ
6302	5919	.	u
6302	5937	s	u
6302	5940	.	κ
6302	6306	s	κ
6302	6309	s	k
6302	5964	s	U
6302	6312	s	K
6302	5919	.	α
6302	5937	s	α
6302	5919	.	a
6302	5937	s	a
6302	5994	s	A
6302	6309	s	λ
6302	6309	s	l
6302	6320	s	L
6302	5311	<2s>	<>
6303	5909	.	.
6303	5910	 	 
6303	5909	<~>	<~>
6303	5909	<split-s>	<split-s>
6303	5909	<split-h>	<split-h>
6303	5909	<name2>	<name2>
6303	5913	<aphaerese>	<aphaerese>
6303	6301	<>	<aphaerese>
6303	5909	<elision3>	<elision3>
6303	6301	<>	<elision3>
6303	5909	<elision2>	<elision2>
6303	6301	<>	<elision2>
6303	5909	<elision1>	<elision1>
6303	6301	<>	<elision1>
6303	5917	.	υ
6303	5920	s	υ
6303	5917	.	u
6303	5920	s	u
6303	5938	.	κ
6303	6304	s	κ
6303	6307	s	k
6303	5962	s	U
6303	6310	s	K
6303	5917	.	α
6303	5920	s	α
6303	5917	.	a
6303	5920	s	a
6303	5992	s	A
6303	6307	s	λ
6303	6307	s	l
6303	6318	s	L
6303	5309	<2s>	<>
6304	5921	.	.
6304	5921	 	 
6304	5921	<~>	<~>
6304	5921	<split-s>	<split-s>
6304	5921	<split-h>	<split-h>
6304	5921	<name2>	<name2>
6304	6305	<>	<name>
6304	5924	<aphaerese>	<aphaerese>
6304	6304	<>	<aphaerese>
6304	5956	<elision3>	<elision3>
6304	6304	<>	<elision3>
6304	5956	<elision2>	<elision2>
6304	6304	<>	<elision2>
6304	5956	<elision1>	<elision1>
6304	6304	<>	<elision1>
6304	5933	.	υ
6304	5933	.	u
6304	5933	.	κ
6304	5933	.	α
6304	5933	.	a
6304	5933	.	λ
6304	6142	<split-s>	<>
6305	5923	.	.
6305	5923	 	 
6305	5923	<~>	<~>
6305	5923	<split-s>	<split-s>
6305	5923	<split-h>	<split-h>
6305	5923	<name2>	<name2>
6305	5926	<aphaerese>	<aphaerese>
6305	6306	<>	<aphaerese>
6305	5958	<elision3>	<elision3>
6305	6306	<>	<elision3>
6305	5958	<elision2>	<elision2>
6305	6306	<>	<elision2>
6305	5958	<elision1>	<elision1>
6305	6306	<>	<elision1>
6305	5935	.	υ
6305	5935	.	u
6305	5935	.	κ
6305	5935	.	α
6305	5935	.	a
6305	5935	.	λ
6305	6143	<split-s>	<>
6306	5921	.	.
6306	5921	 	 
6306	5921	<~>	<~>
6306	5921	<split-s>	<split-s>
6306	5921	<split-h>	<split-h>
6306	5921	<name2>	<name2>
6306	5924	<aphaerese>	<aphaerese>
6306	6304	<>	<aphaerese>
6306	5956	<elision3>	<elision3>
6306	6304	<>	<elision3>
6306	5956	<elision2>	<elision2>
6306	6304	<>	<elision2>
6306	5956	<elision1>	<elision1>
6306	6304	<>	<elision1>
6306	5933	.	υ
6306	5933	.	u
6306	5933	.	κ
6306	5933	.	α
6306	5933	.	a
6306	5933	.	λ
6306	6141	<split-s>	<>
6307	5921	.	.
6307	5921	 	 
6307	5921	<~>	<~>
6307	5921	<split-s>	<split-s>
6307	5921	<split-h>	<split-h>
6307	5921	<name2>	<name2>
6307	6308	<>	<name>
6307	5924	<aphaerese>	<aphaerese>
6307	6307	<>	<aphaerese>
6307	5921	<elision3>	<elision3>
6307	6307	<>	<elision3>
6307	5921	<elision2>	<elision2>
6307	6307	<>	<elision2>
6307	5921	<elision1>	<elision1>
6307	6307	<>	<elision1>
6307	5933	.	υ
6307	5933	.	u
6307	5933	.	κ
6307	5933	.	α
6307	5933	.	a
6307	5933	.	λ
6307	6148	<split-s>	<>
6308	5923	.	.
6308	5923	 	 
6308	5923	<~>	<~>
6308	5923	<split-s>	<split-s>
6308	5923	<split-h>	<split-h>
6308	5923	<name2>	<name2>
6308	5926	<aphaerese>	<aphaerese>
6308	6309	<>	<aphaerese>
6308	5923	<elision3>	<elision3>
6308	6309	<>	<elision3>
6308	5923	<elision2>	<elision2>
6308	6309	<>	<elision2>
6308	5923	<elision1>	<elision1>
6308	6309	<>	<elision1>
6308	5935	.	υ
6308	5935	.	u
6308	5935	.	κ
6308	5935	.	α
6308	5935	.	a
6308	5935	.	λ
6308	6149	<split-s>	<>
6309	5921	.	.
6309	5921	 	 
6309	5921	<~>	<~>
6309	5921	<split-s>	<split-s>
6309	5921	<split-h>	<split-h>
6309	5921	<name2>	<name2>
6309	5924	<aphaerese>	<aphaerese>
6309	6307	<>	<aphaerese>
6309	5921	<elision3>	<elision3>
6309	6307	<>	<elision3>
6309	5921	<elision2>	<elision2>
6309	6307	<>	<elision2>
6309	5921	<elision1>	<elision1>
6309	6307	<>	<elision1>
6309	5933	.	υ
6309	5933	.	u
6309	5933	.	κ
6309	5933	.	α
6309	5933	.	a
6309	5933	.	λ
6309	6147	<split-s>	<>
6310	5966	<name>	<name>
6310	6311	<>	<name>
6310	6313	<>	<aphaerese>
6310	6313	<>	<elision3>
6310	6313	<>	<elision2>
6310	6313	<>	<elision1>
6310	5775	<split-s>	<>
6310	6018	<L2kl>	<>
6310	6317	<K2kl>	<>
6311	6312	<>	<aphaerese>
6311	6312	<>	<elision3>
6311	6312	<>	<elision2>
6311	6312	<>	<elision1>
6311	6019	<L2kl>	<>
6311	6315	<K2kl>	<>
6312	6313	<>	<aphaerese>
6312	6313	<>	<elision3>
6312	6313	<>	<elision2>
6312	6313	<>	<elision1>
6312	6020	<L2kl>	<>
6312	6316	<K2kl>	<>
6313	6311	<>	<name>
6313	6313	<>	<aphaerese>
6313	6313	<>	<elision3>
6313	6313	<>	<elision2>
6313	6313	<>	<elision1>
6313	6018	<L2kl>	<>
6313	6314	<K2kl>	<>
6314	5921	.	.
6314	5921	 	 
6314	5921	<~>	<~>
6314	5921	<split-s>	<split-s>
6314	5921	<split-h>	<split-h>
6314	5921	<name2>	<name2>
6314	6315	<>	<name>
6314	5924	<aphaerese>	<aphaerese>
6314	6314	<>	<aphaerese>
6314	5921	<elision3>	<elision3>
6314	6314	<>	<elision3>
6314	5921	<elision2>	<elision2>
6314	6314	<>	<elision2>
6314	5921	<elision1>	<elision1>
6314	6314	<>	<elision1>
6314	5933	.	υ
6314	5933	.	u
6314	5933	.	α
6314	5933	.	a
6314	6158	<split-s>	<>
6315	5923	.	.
6315	5923	 	 
6315	5923	<~>	<~>
6315	5923	<split-s>	<split-s>
6315	5923	<split-h>	<split-h>
6315	5923	<name2>	<name2>
6315	5926	<aphaerese>	<aphaerese>
6315	6316	<>	<aphaerese>
6315	5923	<elision3>	<elision3>
6315	6316	<>	<elision3>
6315	5923	<elision2>	<elision2>
6315	6316	<>	<elision2>
6315	5923	<elision1>	<elision1>
6315	6316	<>	<elision1>
6315	5935	.	υ
6315	5935	.	u
6315	5935	.	α
6315	5935	.	a
6315	6159	<split-s>	<>
6316	5921	.	.
6316	5921	 	 
6316	5921	<~>	<~>
6316	5921	<split-s>	<split-s>
6316	5921	<split-h>	<split-h>
6316	5921	<name2>	<name2>
6316	5924	<aphaerese>	<aphaerese>
6316	6314	<>	<aphaerese>
6316	5921	<elision3>	<elision3>
6316	6314	<>	<elision3>
6316	5921	<elision2>	<elision2>
6316	6314	<>	<elision2>
6316	5921	<elision1>	<elision1>
6316	6314	<>	<elision1>
6316	5933	.	υ
6316	5933	.	u
6316	5933	.	α
6316	5933	.	a
6316	6157	<split-s>	<>
6317	5921	.	.
6317	5921	 	 
6317	5921	<~>	<~>
6317	5921	<split-s>	<split-s>
6317	5921	<split-h>	<split-h>
6317	5921	<name2>	<name2>
6317	5966	<name2>	<name>
6317	6315	<>	<name>
6317	5924	<aphaerese>	<aphaerese>
6317	6314	<>	<aphaerese>
6317	5921	<elision3>	<elision3>
6317	6314	<>	<elision3>
6317	5921	<elision2>	<elision2>
6317	6314	<>	<elision2>
6317	5921	<elision1>	<elision1>
6317	6314	<>	<elision1>
6317	5933	.	υ
6317	5933	.	u
6317	5933	.	α
6317	5933	.	a
6317	6161	<split-s>	<>
6318	5966	<name>	<name>
6318	6319	<>	<name>
6318	6321	<>	<aphaerese>
6318	6321	<>	<elision3>
6318	6321	<>	<elision2>
6318	6321	<>	<elision1>
6318	5775	<split-s>	<>
6318	6322	<L2kl>	<>
6319	6320	<>	<aphaerese>
6319	6320	<>	<elision3>
6319	6320	<>	<elision2>
6319	6320	<>	<elision1>
6319	6308	<L2kl>	<>
6320	6321	<>	<aphaerese>
6320	6321	<>	<elision3>
6320	6321	<>	<elision2>
6320	6321	<>	<elision1>
6320	6309	<L2kl>	<>
6321	6319	<>	<name>
6321	6321	<>	<aphaerese>
6321	6321	<>	<elision3>
6321	6321	<>	<elision2>
6321	6321	<>	<elision1>
6321	6307	<L2kl>	<>
6322	5921	.	.
6322	5921	 	 
6322	5921	<~>	<~>
6322	5921	<split-s>	<split-s>
6322	5921	<split-h>	<split-h>
6322	5921	<name2>	<name2>
6322	5966	<name2>	<name>
6322	6308	<>	<name>
6322	5924	<aphaerese>	<aphaerese>
6322	6307	<>	<aphaerese>
6322	5921	<elision3>	<elision3>
6322	6307	<>	<elision3>
6322	5921	<elision2>	<elision2>
6322	6307	<>	<elision2>
6322	5921	<elision1>	<elision1>
6322	6307	<>	<elision1>
6322	5933	.	υ
6322	5933	.	u
6322	5933	.	κ
6322	5933	.	α
6322	5933	.	a
6322	5933	.	λ
6322	6173	<split-s>	<>
6323	6324	<>	<name>
6323	6323	<>	<aphaerese>
6323	6323	<>	<elision3>
6323	6323	<>	<elision2>
6323	6323	<>	<elision1>
6323	6039	<U2kl>	<>
6324	6325	<>	<aphaerese>
6324	6325	<>	<elision3>
6324	6325	<>	<elision2>
6324	6325	<>	<elision1>
6324	6040	<U2kl>	<>
6325	6323	<>	<aphaerese>
6325	6323	<>	<elision3>
6325	6323	<>	<elision2>
6325	6323	<>	<elision1>
6325	6041	<U2kl>	<>
6326	6052	<name>	<name>
6326	6327	<>	<name>
6326	6329	<>	<aphaerese>
6326	6329	<>	<elision3>
6326	6329	<>	<elision2>
6326	6329	<>	<elision1>
6326	5539	<2s>	<>
6326	6330	<A2kl>	<>
6326	6339	<L2kl>	<>
6326	6062	<K2kl>	<>
6327	6328	<>	<aphaerese>
6327	6328	<>	<elision3>
6327	6328	<>	<elision2>
6327	6328	<>	<elision1>
6327	6331	<A2kl>	<>
6327	6340	<L2kl>	<>
6327	6060	<K2kl>	<>
6328	6329	<>	<aphaerese>
6328	6329	<>	<elision3>
6328	6329	<>	<elision2>
6328	6329	<>	<elision1>
6328	6332	<A2kl>	<>
6328	6341	<L2kl>	<>
6328	6061	<K2kl>	<>
6329	6327	<>	<name>
6329	6329	<>	<aphaerese>
6329	6329	<>	<elision3>
6329	6329	<>	<elision2>
6329	6329	<>	<elision1>
6329	6330	<A2kl>	<>
6329	6339	<L2kl>	<>
6329	6059	<K2kl>	<>
6330	6331	<>	<name>
6330	6330	<>	<aphaerese>
6330	6330	<>	<elision3>
6330	6330	<>	<elision2>
6330	6330	<>	<elision1>
6330	6333	.	κ
6330	6333	.	λ
6330	5489	<2s>	<>
6331	6332	<>	<aphaerese>
6331	6332	<>	<elision3>
6331	6332	<>	<elision2>
6331	6332	<>	<elision1>
6331	6335	.	κ
6331	6335	.	λ
6331	5490	<2s>	<>
6332	6330	<>	<aphaerese>
6332	6330	<>	<elision3>
6332	6330	<>	<elision2>
6332	6330	<>	<elision1>
6332	6333	.	κ
6332	6333	.	λ
6332	5488	<2s>	<>
6333	6334	<>	<name>
6333	6333	<>	<aphaerese>
6333	6336	<elision3>	<elision3>
6333	6333	<>	<elision3>
6333	6336	<elision2>	<elision2>
6333	6333	<>	<elision2>
6333	6336	<elision1>	<elision1>
6333	6333	<>	<elision1>
6333	5480	<2s>	<>
6334	6335	<>	<aphaerese>
6334	6338	<elision3>	<elision3>
6334	6335	<>	<elision3>
6334	6338	<elision2>	<elision2>
6334	6335	<>	<elision2>
6334	6338	<elision1>	<elision1>
6334	6335	<>	<elision1>
6334	5481	<2s>	<>
6335	6333	<>	<aphaerese>
6335	6336	<elision3>	<elision3>
6335	6333	<>	<elision3>
6335	6336	<elision2>	<elision2>
6335	6333	<>	<elision2>
6335	6336	<elision1>	<elision1>
6335	6333	<>	<elision1>
6335	5479	<2s>	<>
6336	6039	.	.
6336	6039	 	 
6336	6039	<~>	<~>
6336	6039	<split-s>	<split-s>
6336	6039	<split-h>	<split-h>
6336	6039	<name2>	<name2>
6336	6337	<>	<name>
6336	6042	<aphaerese>	<aphaerese>
6336	6336	<>	<aphaerese>
6336	6039	<elision3>	<elision3>
6336	6336	<>	<elision3>
6336	6039	<elision2>	<elision2>
6336	6336	<>	<elision2>
6336	6039	<elision1>	<elision1>
6336	6336	<>	<elision1>
6336	6036	.	υ
6336	6036	.	u
6336	6036	.	α
6336	6036	.	a
6336	5444	<2s>	<>
6337	6041	.	.
6337	6041	 	 
6337	6041	<~>	<~>
6337	6041	<split-s>	<split-s>
6337	6041	<split-h>	<split-h>
6337	6041	<name2>	<name2>
6337	6044	<aphaerese>	<aphaerese>
6337	6338	<>	<aphaerese>
6337	6041	<elision3>	<elision3>
6337	6338	<>	<elision3>
6337	6041	<elision2>	<elision2>
6337	6338	<>	<elision2>
6337	6041	<elision1>	<elision1>
6337	6338	<>	<elision1>
6337	6038	.	υ
6337	6038	.	u
6337	6038	.	α
6337	6038	.	a
6337	5445	<2s>	<>
6338	6039	.	.
6338	6039	 	 
6338	6039	<~>	<~>
6338	6039	<split-s>	<split-s>
6338	6039	<split-h>	<split-h>
6338	6039	<name2>	<name2>
6338	6042	<aphaerese>	<aphaerese>
6338	6336	<>	<aphaerese>
6338	6039	<elision3>	<elision3>
6338	6336	<>	<elision3>
6338	6039	<elision2>	<elision2>
6338	6336	<>	<elision2>
6338	6039	<elision1>	<elision1>
6338	6336	<>	<elision1>
6338	6036	.	υ
6338	6036	.	u
6338	6036	.	α
6338	6036	.	a
6338	5443	<2s>	<>
6339	6340	<>	<name>
6339	6339	<>	<aphaerese>
6339	6339	<>	<elision3>
6339	6339	<>	<elision2>
6339	6339	<>	<elision1>
6339	6342	.	κ
6339	6342	.	λ
6339	5522	<2s>	<>
6340	6341	<>	<aphaerese>
6340	6341	<>	<elision3>
6340	6341	<>	<elision2>
6340	6341	<>	<elision1>
6340	6344	.	κ
6340	6344	.	λ
6340	5523	<2s>	<>
6341	6339	<>	<aphaerese>
6341	6339	<>	<elision3>
6341	6339	<>	<elision2>
6341	6339	<>	<elision1>
6341	6342	.	κ
6341	6342	.	λ
6341	5521	<2s>	<>
6342	6343	<>	<name>
6342	6342	<>	<aphaerese>
6342	6345	<elision3>	<elision3>
6342	6342	<>	<elision3>
6342	6345	<elision2>	<elision2>
6342	6342	<>	<elision2>
6342	6345	<elision1>	<elision1>
6342	6342	<>	<elision1>
6342	5513	<2s>	<>
6343	6344	<>	<aphaerese>
6343	6347	<elision3>	<elision3>
6343	6344	<>	<elision3>
6343	6347	<elision2>	<elision2>
6343	6344	<>	<elision2>
6343	6347	<elision1>	<elision1>
6343	6344	<>	<elision1>
6343	5514	<2s>	<>
6344	6342	<>	<aphaerese>
6344	6345	<elision3>	<elision3>
6344	6342	<>	<elision3>
6344	6345	<elision2>	<elision2>
6344	6342	<>	<elision2>
6344	6345	<elision1>	<elision1>
6344	6342	<>	<elision1>
6344	5512	<2s>	<>
6345	6346	<>	<name>
6345	6345	<>	<aphaerese>
6345	6345	<>	<elision3>
6345	6345	<>	<elision2>
6345	6345	<>	<elision1>
6345	6045	.	κ
6345	5507	<2s>	<>
6346	6347	<>	<aphaerese>
6346	6347	<>	<elision3>
6346	6347	<>	<elision2>
6346	6347	<>	<elision1>
6346	6047	.	κ
6346	5508	<2s>	<>
6347	6345	<>	<aphaerese>
6347	6345	<>	<elision3>
6347	6345	<>	<elision2>
6347	6345	<>	<elision1>
6347	6045	.	κ
6347	5506	<2s>	<>
6348	6039	.	.
6348	6039	 	 
6348	6039	<~>	<~>
6348	6039	<split-s>	<split-s>
6348	6039	<split-h>	<split-h>
6348	6039	<name2>	<name2>
6348	6349	<>	<name>
6348	6042	<aphaerese>	<aphaerese>
6348	6348	<>	<aphaerese>
6348	6348	<>	<elision3>
6348	6348	<>	<elision2>
6348	6348	<>	<elision1>
6348	6036	.	υ
6348	6036	.	u
6348	6045	.	κ
6348	6036	.	α
6348	6036	.	a
6348	5227	<2s>	<>
6349	6041	.	.
6349	6041	 	 
6349	6041	<~>	<~>
6349	6041	<split-s>	<split-s>
6349	6041	<split-h>	<split-h>
6349	6041	<name2>	<name2>
6349	6044	<aphaerese>	<aphaerese>
6349	6350	<>	<aphaerese>
6349	6350	<>	<elision3>
6349	6350	<>	<elision2>
6349	6350	<>	<elision1>
6349	6038	.	υ
6349	6038	.	u
6349	6047	.	κ
6349	6038	.	α
6349	6038	.	a
6349	5228	<2s>	<>
6350	6039	.	.
6350	6039	 	 
6350	6039	<~>	<~>
6350	6039	<split-s>	<split-s>
6350	6039	<split-h>	<split-h>
6350	6039	<name2>	<name2>
6350	6042	<aphaerese>	<aphaerese>
6350	6348	<>	<aphaerese>
6350	6348	<>	<elision3>
6350	6348	<>	<elision2>
6350	6348	<>	<elision1>
6350	6036	.	υ
6350	6036	.	u
6350	6045	.	κ
6350	6036	.	α
6350	6036	.	a
6350	5226	<2s>	<>
6351	6352	<>	<name>
6351	6351	<>	<aphaerese>
6351	6351	<>	<elision3>
6351	6351	<>	<elision2>
6351	6351	<>	<elision1>
6351	6039	<A2kl>	<>
6352	6353	<>	<aphaerese>
6352	6353	<>	<elision3>
6352	6353	<>	<elision2>
6352	6353	<>	<elision1>
6352	6040	<A2kl>	<>
6353	6351	<>	<aphaerese>
6353	6351	<>	<elision3>
6353	6351	<>	<elision2>
6353	6351	<>	<elision1>
6353	6041	<A2kl>	<>
6354	5909	.	.
6354	5910	 	 
6354	5909	<~>	<~>
6354	5909	<split-s>	<split-s>
6354	5909	<split-h>	<split-h>
6354	5909	<name2>	<name2>
6354	6355	<>	<name>
6354	5913	<aphaerese>	<aphaerese>
6354	6354	<>	<aphaerese>
6354	5909	<elision3>	<elision3>
6354	6354	<>	<elision3>
6354	5909	<elision2>	<elision2>
6354	6354	<>	<elision2>
6354	5909	<elision1>	<elision1>
6354	6354	<>	<elision1>
6354	5917	.	υ
6354	5920	s	υ
6354	5917	.	u
6354	5920	s	u
6354	5917	.	κ
6354	6030	s	κ
6354	5959	s	k
6354	5962	s	U
6354	6014	s	K
6354	5917	.	α
6354	5920	s	α
6354	5917	.	a
6354	5920	s	a
6354	5992	s	A
6354	5917	.	λ
6354	6030	s	λ
6354	5959	s	l
6354	6021	s	L
6354	5419	<2s>	<>
6355	5912	.	.
6355	5915	 	 
6355	5912	<~>	<~>
6355	5912	<split-s>	<split-s>
6355	5912	<split-h>	<split-h>
6355	5912	<name2>	<name2>
6355	6013	<aphaerese>	<aphaerese>
6355	6356	<>	<aphaerese>
6355	5912	<elision3>	<elision3>
6355	6356	<>	<elision3>
6355	5912	<elision2>	<elision2>
6355	6356	<>	<elision2>
6355	5912	<elision1>	<elision1>
6355	6356	<>	<elision1>
6355	5919	.	υ
6355	5937	s	υ
6355	5919	.	u
6355	5937	s	u
6355	5919	.	κ
6355	6032	s	κ
6355	5961	s	k
6355	5964	s	U
6355	6016	s	K
6355	5919	.	α
6355	5937	s	α
6355	5919	.	a
6355	5937	s	a
6355	5994	s	A
6355	5919	.	λ
6355	6032	s	λ
6355	5961	s	l
6355	6023	s	L
6355	5420	<2s>	<>
6356	5909	.	.
6356	5910	 	 
6356	5909	<~>	<~>
6356	5909	<split-s>	<split-s>
6356	5909	<split-h>	<split-h>
6356	5909	<name2>	<name2>
6356	5913	<aphaerese>	<aphaerese>
6356	6354	<>	<aphaerese>
6356	5909	<elision3>	<elision3>
6356	6354	<>	<elision3>
6356	5909	<elision2>	<elision2>
6356	6354	<>	<elision2>
6356	5909	<elision1>	<elision1>
6356	6354	<>	<elision1>
6356	5917	.	υ
6356	5920	s	υ
6356	5917	.	u
6356	5920	s	u
6356	5917	.	κ
6356	6030	s	κ
6356	5959	s	k
6356	5962	s	U
6356	6014	s	K
6356	5917	.	α
6356	5920	s	α
6356	5917	.	a
6356	5920	s	a
6356	5992	s	A
6356	5917	.	λ
6356	6030	s	λ
6356	5959	s	l
6356	6021	s	L
6356	5418	<2s>	<>
6357	6063	<name>	<name>
6357	6358	<>	<name>
6357	6360	<>	<aphaerese>
6357	6360	<>	<elision3>
6357	6360	<>	<elision2>
6357	6360	<>	<elision1>
6357	5539	<2s>	<>
6357	6330	<A2kl>	<>
6357	6364	<L2kl>	<>
6358	6359	<>	<aphaerese>
6358	6359	<>	<elision3>
6358	6359	<>	<elision2>
6358	6359	<>	<elision1>
6358	6331	<A2kl>	<>
6358	6362	<L2kl>	<>
6359	6360	<>	<aphaerese>
6359	6360	<>	<elision3>
6359	6360	<>	<elision2>
6359	6360	<>	<elision1>
6359	6332	<A2kl>	<>
6359	6363	<L2kl>	<>
6360	6358	<>	<name>
6360	6360	<>	<aphaerese>
6360	6360	<>	<elision3>
6360	6360	<>	<elision2>
6360	6360	<>	<elision1>
6360	6330	<A2kl>	<>
6360	6361	<L2kl>	<>
6361	6039	.	.
6361	6039	 	 
6361	6039	<~>	<~>
6361	6039	<split-s>	<split-s>
6361	6039	<split-h>	<split-h>
6361	6039	<name2>	<name2>
6361	6362	<>	<name>
6361	6042	<aphaerese>	<aphaerese>
6361	6361	<>	<aphaerese>
6361	6039	<elision3>	<elision3>
6361	6361	<>	<elision3>
6361	6039	<elision2>	<elision2>
6361	6361	<>	<elision2>
6361	6039	<elision1>	<elision1>
6361	6361	<>	<elision1>
6361	6036	.	υ
6361	6036	.	u
6361	6342	.	κ
6361	6036	.	α
6361	6036	.	a
6361	6342	.	λ
6361	5556	<2s>	<>
6362	6041	.	.
6362	6041	 	 
6362	6041	<~>	<~>
6362	6041	<split-s>	<split-s>
6362	6041	<split-h>	<split-h>
6362	6041	<name2>	<name2>
6362	6044	<aphaerese>	<aphaerese>
6362	6363	<>	<aphaerese>
6362	6041	<elision3>	<elision3>
6362	6363	<>	<elision3>
6362	6041	<elision2>	<elision2>
6362	6363	<>	<elision2>
6362	6041	<elision1>	<elision1>
6362	6363	<>	<elision1>
6362	6038	.	υ
6362	6038	.	u
6362	6344	.	κ
6362	6038	.	α
6362	6038	.	a
6362	6344	.	λ
6362	5557	<2s>	<>
6363	6039	.	.
6363	6039	 	 
6363	6039	<~>	<~>
6363	6039	<split-s>	<split-s>
6363	6039	<split-h>	<split-h>
6363	6039	<name2>	<name2>
6363	6042	<aphaerese>	<aphaerese>
6363	6361	<>	<aphaerese>
6363	6039	<elision3>	<elision3>
6363	6361	<>	<elision3>
6363	6039	<elision2>	<elision2>
6363	6361	<>	<elision2>
6363	6039	<elision1>	<elision1>
6363	6361	<>	<elision1>
6363	6036	.	υ
6363	6036	.	u
6363	6342	.	κ
6363	6036	.	α
6363	6036	.	a
6363	6342	.	λ
6363	5555	<2s>	<>
6364	6039	.	.
6364	6039	 	 
6364	6039	<~>	<~>
6364	6039	<split-s>	<split-s>
6364	6039	<split-h>	<split-h>
6364	6039	<name2>	<name2>
6364	6063	<name2>	<name>
6364	6362	<>	<name>
6364	6042	<aphaerese>	<aphaerese>
6364	6361	<>	<aphaerese>
6364	6039	<elision3>	<elision3>
6364	6361	<>	<elision3>
6364	6039	<elision2>	<elision2>
6364	6361	<>	<elision2>
6364	6039	<elision1>	<elision1>
6364	6361	<>	<elision1>
6364	6036	.	υ
6364	6036	.	u
6364	6342	.	κ
6364	6036	.	α
6364	6036	.	a
6364	6342	.	λ
6364	5562	<2s>	<>
6365	5909	.	.
6365	5910	 	 
6365	5909	<~>	<~>
6365	5909	<split-s>	<split-s>
6365	5909	<split-h>	<split-h>
6365	5909	<name2>	<name2>
6365	6278	<>	<name>
6365	5913	<aphaerese>	<aphaerese>
6365	6277	<>	<aphaerese>
6365	6277	<>	<elision3>
6365	6277	<>	<elision2>
6365	6277	<>	<elision1>
6365	5917	.	υ
6365	5920	s	υ
6365	5917	.	u
6365	5920	s	u
6365	5938	.	κ
6365	5953	s	κ
6365	5959	s	k
6365	5962	s	U
6365	6014	s	K
6365	5917	.	α
6365	5920	s	α
6365	5917	.	a
6365	5920	s	a
6365	5992	s	A
6365	5959	s	λ
6365	5959	s	l
6365	6021	s	L
6365	5568	<2s>	<>
6366	5909	.	.
6366	5910	 	 
6366	5909	<~>	<~>
6366	5909	<split-s>	<split-s>
6366	5909	<split-h>	<split-h>
6366	5909	<name2>	<name2>
6366	6299	<>	<name>
6366	5913	<aphaerese>	<aphaerese>
6366	6298	<>	<aphaerese>
6366	6301	<elision3>	<elision3>
6366	6298	<>	<elision3>
6366	6301	<elision2>	<elision2>
6366	6298	<>	<elision2>
6366	6301	<elision1>	<elision1>
6366	6298	<>	<elision1>
6366	5917	.	υ
6366	5920	s	υ
6366	5917	.	u
6366	5920	s	u
6366	5917	.	κ
6366	6030	s	κ
6366	5959	s	k
6366	5962	s	U
6366	6014	s	K
6366	5917	.	α
6366	5920	s	α
6366	5917	.	a
6366	5920	s	a
6366	5992	s	A
6366	5917	.	λ
6366	6030	s	λ
6366	5959	s	l
6366	6021	s	L
6366	5571	<2s>	<>
6367	5909	.	.
6367	5910	 	 
6367	5909	<~>	<~>
6367	5909	<split-s>	<split-s>
6367	5909	<split-h>	<split-h>
6367	5909	<name2>	<name2>
6367	6034	<>	<name>
6367	5913	<aphaerese>	<aphaerese>
6367	6033	<>	<aphaerese>
6367	5909	<elision3>	<elision3>
6367	6033	<>	<elision3>
6367	5909	<elision2>	<elision2>
6367	6033	<>	<elision2>
6367	5909	<elision1>	<elision1>
6367	6033	<>	<elision1>
6367	5917	.	υ
6367	5920	s	υ
6367	5917	.	u
6367	5920	s	u
6367	6036	.	κ
6367	6030	s	κ
6367	5959	s	k
6367	5962	s	U
6367	6014	s	K
6367	5917	.	α
6367	5920	s	α
6367	5917	.	a
6367	5920	s	a
6367	5992	s	A
6367	6036	.	λ
6367	6030	s	λ
6367	5959	s	l
6367	6021	s	L
6367	5574	<2s>	<>
6368	6324	<>	<name>
6368	6323	<>	<aphaerese>
6368	6323	<>	<elision3>
6368	6323	<>	<elision2>
6368	6323	<>	<elision1>
6368	6369	<U2kl>	<>
6369	6039	.	.
6369	6039	 	 
6369	6039	<~>	<~>
6369	6039	<split-s>	<split-s>
6369	6039	<split-h>	<split-h>
6369	6039	<name2>	<name2>
6369	6040	<>	<name>
6369	6042	<aphaerese>	<aphaerese>
6369	6039	<>	<aphaerese>
6369	6039	<elision3>	<elision3>
6369	6039	<>	<elision3>
6369	6039	<elision2>	<elision2>
6369	6039	<>	<elision2>
6369	6039	<elision1>	<elision1>
6369	6039	<>	<elision1>
6369	6036	.	υ
6369	6036	.	u
6369	6045	.	κ
6369	6036	.	α
6369	6036	.	a
6369	5578	<2s>	<>
6370	6052	<name>	<name>
6370	6327	<>	<name>
6370	6329	<>	<aphaerese>
6370	6329	<>	<elision3>
6370	6329	<>	<elision2>
6370	6329	<>	<elision1>
6370	5539	<2s>	<>
6370	6330	<A2kl>	<>
6370	6339	<L2kl>	<>
6370	6371	<K2kl>	<>
6371	6039	.	.
6371	6039	 	 
6371	6039	<~>	<~>
6371	6039	<split-s>	<split-s>
6371	6039	<split-h>	<split-h>
6371	6039	<name2>	<name2>
6371	6063	<name2>	<name>
6371	6060	<>	<name>
6371	6042	<aphaerese>	<aphaerese>
6371	6059	<>	<aphaerese>
6371	6039	<elision3>	<elision3>
6371	6059	<>	<elision3>
6371	6039	<elision2>	<elision2>
6371	6059	<>	<elision2>
6371	6039	<elision1>	<elision1>
6371	6059	<>	<elision1>
6371	6036	.	υ
6371	6036	.	u
6371	6036	.	α
6371	6036	.	a
6371	5582	<2s>	<>
6372	6039	.	.
6372	6039	 	 
6372	6039	<~>	<~>
6372	6039	<split-s>	<split-s>
6372	6039	<split-h>	<split-h>
6372	6039	<name2>	<name2>
6372	6349	<>	<name>
6372	6042	<aphaerese>	<aphaerese>
6372	6348	<>	<aphaerese>
6372	6348	<>	<elision3>
6372	6348	<>	<elision2>
6372	6348	<>	<elision1>
6372	6036	.	υ
6372	6036	.	u
6372	6045	.	κ
6372	6036	.	α
6372	6036	.	a
6372	5568	<2s>	<>
6373	6352	<>	<name>
6373	6351	<>	<aphaerese>
6373	6351	<>	<elision3>
6373	6351	<>	<elision2>
6373	6351	<>	<elision1>
6373	6369	<A2kl>	<>
6374	5909	.	.
6374	5910	 	 
6374	5909	<~>	<~>
6374	5909	<split-s>	<split-s>
6374	5909	<split-h>	<split-h>
6374	5909	<name2>	<name2>
6374	6355	<>	<name>
6374	5913	<aphaerese>	<aphaerese>
6374	6354	<>	<aphaerese>
6374	5909	<elision3>	<elision3>
6374	6354	<>	<elision3>
6374	5909	<elision2>	<elision2>
6374	6354	<>	<elision2>
6374	5909	<elision1>	<elision1>
6374	6354	<>	<elision1>
6374	5917	.	υ
6374	5920	s	υ
6374	5917	.	u
6374	5920	s	u
6374	5917	.	κ
6374	6030	s	κ
6374	5959	s	k
6374	5962	s	U
6374	6014	s	K
6374	5917	.	α
6374	5920	s	α
6374	5917	.	a
6374	5920	s	a
6374	5992	s	A
6374	5917	.	λ
6374	6030	s	λ
6374	5959	s	l
6374	6021	s	L
6374	5574	<2s>	<>
6375	6039	.	.
6375	6039	 	 
6375	6039	<~>	<~>
6375	6039	<split-s>	<split-s>
6375	6039	<split-h>	<split-h>
6375	6039	<name2>	<name2>
6375	6065	<>	<name>
6375	6042	<aphaerese>	<aphaerese>
6375	6064	<>	<aphaerese>
6375	6039	<elision3>	<elision3>
6375	6064	<>	<elision3>
6375	6039	<elision2>	<elision2>
6375	6064	<>	<elision2>
6375	6039	<elision1>	<elision1>
6375	6064	<>	<elision1>
6375	6036	.	υ
6375	6036	.	u
6375	6036	.	κ
6375	6036	.	α
6375	6036	.	a
6375	6036	.	λ
6375	5574	<2s>	<>
6376	6063	<name>	<name>
6376	6358	<>	<name>
6376	6360	<>	<aphaerese>
6376	6360	<>	<elision3>
6376	6360	<>	<elision2>
6376	6360	<>	<elision1>
6376	5539	<2s>	<>
6376	6330	<A2kl>	<>
6376	6377	<L2kl>	<>
6377	6039	.	.
6377	6039	 	 
6377	6039	<~>	<~>
6377	6039	<split-s>	<split-s>
6377	6039	<split-h>	<split-h>
6377	6039	<name2>	<name2>
6377	6063	<name2>	<name>
6377	6362	<>	<name>
6377	6042	<aphaerese>	<aphaerese>
6377	6361	<>	<aphaerese>
6377	6039	<elision3>	<elision3>
6377	6361	<>	<elision3>
6377	6039	<elision2>	<elision2>
6377	6361	<>	<elision2>
6377	6039	<elision1>	<elision1>
6377	6361	<>	<elision1>
6377	6036	.	υ
6377	6036	.	u
6377	6342	.	κ
6377	6036	.	α
6377	6036	.	a
6377	6342	.	λ
6377	5587	<2s>	<>
6378	6266	.	.
6378	6267	 	 
6378	6266	<~>	<~>
6378	6266	<split-s>	<split-s>
6378	6266	<split-h>	<split-h>
6378	6266	<name2>	<name2>
6378	6270	<aphaerese>	<aphaerese>
6378	6270	<>	<aphaerese>
6378	6266	<elision3>	<elision3>
6378	6270	<>	<elision3>
6378	6266	<elision2>	<elision2>
6378	6270	<>	<elision2>
6378	6266	<elision1>	<elision1>
6378	6270	<>	<elision1>
6378	6266	.	υ
6378	6266	.	u
6378	6280	.	κ
6378	6298	s	κ
6378	6033	s	k
6378	6323	s	U
6378	6051	s	K
6378	6266	.	α
6378	6266	.	a
6378	6351	s	A
6378	6354	s	λ
6378	6064	s	l
6378	6067	s	L
6378	5208	<1s>	<>
6379	6266	.	.
6379	6267	 	 
6379	6266	<~>	<~>
6379	6266	<split-s>	<split-s>
6379	6266	<split-h>	<split-h>
6379	6266	<name2>	<name2>
6379	6270	<aphaerese>	<aphaerese>
6379	6273	<>	<aphaerese>
6379	6266	<elision3>	<elision3>
6379	6273	<>	<elision3>
6379	6266	<elision2>	<elision2>
6379	6273	<>	<elision2>
6379	6266	<elision1>	<elision1>
6379	6273	<>	<elision1>
6379	6274	.	υ
6379	6277	s	υ
6379	6274	.	u
6379	6277	s	u
6379	6280	.	κ
6379	6298	s	κ
6379	6033	s	k
6379	6323	s	U
6379	6326	s	K
6379	6274	.	α
6379	6348	s	α
6379	6274	.	a
6379	6348	s	a
6379	6351	s	A
6379	6354	s	λ
6379	6064	s	l
6379	6357	s	L
6379	5221	<1s>	<>
6380	6269	.	.
6380	6272	 	 
6380	6269	<~>	<~>
6380	6269	<split-s>	<split-s>
6380	6269	<split-h>	<split-h>
6380	6269	<name2>	<name2>
6380	6378	<aphaerese>	<aphaerese>
6380	6269	<>	<aphaerese>
6380	6269	<elision3>	<elision3>
6380	6269	<>	<elision3>
6380	6269	<elision2>	<elision2>
6380	6269	<>	<elision2>
6380	6269	<elision1>	<elision1>
6380	6269	<>	<elision1>
6380	6276	.	υ
6380	6279	s	υ
6380	6276	.	u
6380	6279	s	u
6380	6282	.	κ
6380	6300	s	κ
6380	6035	s	k
6380	6325	s	U
6380	6054	s	K
6380	6276	.	α
6380	6350	s	α
6380	6276	.	a
6380	6350	s	a
6380	6353	s	A
6380	6356	s	λ
6380	6066	s	l
6380	6069	s	L
6380	5223	<1s>	<>
6381	6269	.	.
6381	6272	 	 
6381	6269	<~>	<~>
6381	6269	<split-s>	<split-s>
6381	6269	<split-h>	<split-h>
6381	6269	<name2>	<name2>
6381	6378	<aphaerese>	<aphaerese>
6381	6382	<>	<aphaerese>
6381	6385	<elision3>	<elision3>
6381	6382	<>	<elision3>
6381	6385	<elision2>	<elision2>
6381	6382	<>	<elision2>
6381	6385	<elision1>	<elision1>
6381	6382	<>	<elision1>
6381	6276	.	υ
6381	6279	s	υ
6381	6276	.	u
6381	6279	s	u
6381	6029	s	κ
6381	6035	s	k
6381	6325	s	U
6381	6054	s	K
6381	6276	.	α
6381	6350	s	α
6381	6276	.	a
6381	6350	s	a
6381	6353	s	A
6381	6029	s	λ
6381	6066	s	l
6381	6069	s	L
6381	6413	<1s>	<>
6382	6266	.	.
6382	6267	 	 
6382	6266	<~>	<~>
6382	6266	<split-s>	<split-s>
6382	6266	<split-h>	<split-h>
6382	6266	<name2>	<name2>
6382	6270	<aphaerese>	<aphaerese>
6382	6265	<>	<aphaerese>
6382	6383	<elision3>	<elision3>
6382	6265	<>	<elision3>
6382	6383	<elision2>	<elision2>
6382	6265	<>	<elision2>
6382	6383	<elision1>	<elision1>
6382	6265	<>	<elision1>
6382	6274	.	υ
6382	6277	s	υ
6382	6274	.	u
6382	6277	s	u
6382	5908	s	κ
6382	6033	s	k
6382	6323	s	U
6382	6051	s	K
6382	6274	.	α
6382	6348	s	α
6382	6274	.	a
6382	6348	s	a
6382	6351	s	A
6382	5908	s	λ
6382	6064	s	l
6382	6067	s	L
6382	6411	<1s>	<>
6383	6266	.	.
6383	6267	 	 
6383	6266	<~>	<~>
6383	6266	<split-s>	<split-s>
6383	6266	<split-h>	<split-h>
6383	6266	<name2>	<name2>
6383	6384	<>	<name>
6383	6270	<aphaerese>	<aphaerese>
6383	6383	<>	<aphaerese>
6383	6266	<elision3>	<elision3>
6383	6383	<>	<elision3>
6383	6266	<elision2>	<elision2>
6383	6383	<>	<elision2>
6383	6266	<elision1>	<elision1>
6383	6383	<>	<elision1>
6383	6274	.	υ
6383	6277	s	υ
6383	6274	.	u
6383	6277	s	u
6383	6280	.	κ
6383	6386	s	κ
6383	6389	s	k
6383	6323	s	U
6383	6392	s	K
6383	6274	.	α
6383	6348	s	α
6383	6274	.	a
6383	6348	s	a
6383	6351	s	A
6383	6400	s	λ
6383	6403	s	l
6383	6406	s	L
6383	5310	<1s>	<>
6384	6269	.	.
6384	6272	 	 
6384	6269	<~>	<~>
6384	6269	<split-s>	<split-s>
6384	6269	<split-h>	<split-h>
6384	6269	<name2>	<name2>
6384	6378	<aphaerese>	<aphaerese>
6384	6385	<>	<aphaerese>
6384	6269	<elision3>	<elision3>
6384	6385	<>	<elision3>
6384	6269	<elision2>	<elision2>
6384	6385	<>	<elision2>
6384	6269	<elision1>	<elision1>
6384	6385	<>	<elision1>
6384	6276	.	υ
6384	6279	s	υ
6384	6276	.	u
6384	6279	s	u
6384	6282	.	κ
6384	6388	s	κ
6384	6391	s	k
6384	6325	s	U
6384	6394	s	K
6384	6276	.	α
6384	6350	s	α
6384	6276	.	a
6384	6350	s	a
6384	6353	s	A
6384	6402	s	λ
6384	6405	s	l
6384	6408	s	L
6384	5311	<1s>	<>
6385	6266	.	.
6385	6267	 	 
6385	6266	<~>	<~>
6385	6266	<split-s>	<split-s>
6385	6266	<split-h>	<split-h>
6385	6266	<name2>	<name2>
6385	6270	<aphaerese>	<aphaerese>
6385	6383	<>	<aphaerese>
6385	6266	<elision3>	<elision3>
6385	6383	<>	<elision3>
6385	6266	<elision2>	<elision2>
6385	6383	<>	<elision2>
6385	6266	<elision1>	<elision1>
6385	6383	<>	<elision1>
6385	6274	.	υ
6385	6277	s	υ
6385	6274	.	u
6385	6277	s	u
6385	6280	.	κ
6385	6386	s	κ
6385	6389	s	k
6385	6323	s	U
6385	6392	s	K
6385	6274	.	α
6385	6348	s	α
6385	6274	.	a
6385	6348	s	a
6385	6351	s	A
6385	6400	s	λ
6385	6403	s	l
6385	6406	s	L
6385	5309	<1s>	<>
6386	5909	.	.
6386	5910	 	 
6386	5909	<~>	<~>
6386	5909	<split-s>	<split-s>
6386	5909	<split-h>	<split-h>
6386	5909	<name2>	<name2>
6386	6387	<>	<name>
6386	5913	<aphaerese>	<aphaerese>
6386	6386	<>	<aphaerese>
6386	6301	<elision3>	<elision3>
6386	6386	<>	<elision3>
6386	6301	<elision2>	<elision2>
6386	6386	<>	<elision2>
6386	6301	<elision1>	<elision1>
6386	6386	<>	<elision1>
6386	5917	.	υ
6386	5920	s	υ
6386	5917	.	u
6386	5920	s	u
6386	5917	.	κ
6386	5962	s	U
6386	5917	.	α
6386	5920	s	α
6386	5917	.	a
6386	5920	s	a
6386	5992	s	A
6386	5917	.	λ
6386	5660	<2s>	<>
6387	5912	.	.
6387	5915	 	 
6387	5912	<~>	<~>
6387	5912	<split-s>	<split-s>
6387	5912	<split-h>	<split-h>
6387	5912	<name2>	<name2>
6387	6013	<aphaerese>	<aphaerese>
6387	6388	<>	<aphaerese>
6387	6303	<elision3>	<elision3>
6387	6388	<>	<elision3>
6387	6303	<elision2>	<elision2>
6387	6388	<>	<elision2>
6387	6303	<elision1>	<elision1>
6387	6388	<>	<elision1>
6387	5919	.	υ
6387	5937	s	υ
6387	5919	.	u
6387	5937	s	u
6387	5919	.	κ
6387	5964	s	U
6387	5919	.	α
6387	5937	s	α
6387	5919	.	a
6387	5937	s	a
6387	5994	s	A
6387	5919	.	λ
6387	5661	<2s>	<>
6388	5909	.	.
6388	5910	 	 
6388	5909	<~>	<~>
6388	5909	<split-s>	<split-s>
6388	5909	<split-h>	<split-h>
6388	5909	<name2>	<name2>
6388	5913	<aphaerese>	<aphaerese>
6388	6386	<>	<aphaerese>
6388	6301	<elision3>	<elision3>
6388	6386	<>	<elision3>
6388	6301	<elision2>	<elision2>
6388	6386	<>	<elision2>
6388	6301	<elision1>	<elision1>
6388	6386	<>	<elision1>
6388	5917	.	υ
6388	5920	s	υ
6388	5917	.	u
6388	5920	s	u
6388	5917	.	κ
6388	5962	s	U
6388	5917	.	α
6388	5920	s	α
6388	5917	.	a
6388	5920	s	a
6388	5992	s	A
6388	5917	.	λ
6388	5659	<2s>	<>
6389	5909	.	.
6389	5910	 	 
6389	5909	<~>	<~>
6389	5909	<split-s>	<split-s>
6389	5909	<split-h>	<split-h>
6389	5909	<name2>	<name2>
6389	6390	<>	<name>
6389	5913	<aphaerese>	<aphaerese>
6389	6389	<>	<aphaerese>
6389	5909	<elision3>	<elision3>
6389	6389	<>	<elision3>
6389	5909	<elision2>	<elision2>
6389	6389	<>	<elision2>
6389	5909	<elision1>	<elision1>
6389	6389	<>	<elision1>
6389	5917	.	υ
6389	5920	s	υ
6389	5917	.	u
6389	5920	s	u
6389	6036	.	κ
6389	5962	s	U
6389	5917	.	α
6389	5920	s	α
6389	5917	.	a
6389	5920	s	a
6389	5992	s	A
6389	6036	.	λ
6389	5669	<2s>	<>
6390	5912	.	.
6390	5915	 	 
6390	5912	<~>	<~>
6390	5912	<split-s>	<split-s>
6390	5912	<split-h>	<split-h>
6390	5912	<name2>	<name2>
6390	6013	<aphaerese>	<aphaerese>
6390	6391	<>	<aphaerese>
6390	5912	<elision3>	<elision3>
6390	6391	<>	<elision3>
6390	5912	<elision2>	<elision2>
6390	6391	<>	<elision2>
6390	5912	<elision1>	<elision1>
6390	6391	<>	<elision1>
6390	5919	.	υ
6390	5937	s	υ
6390	5919	.	u
6390	5937	s	u
6390	6038	.	κ
6390	5964	s	U
6390	5919	.	α
6390	5937	s	α
6390	5919	.	a
6390	5937	s	a
6390	5994	s	A
6390	6038	.	λ
6390	5670	<2s>	<>
6391	5909	.	.
6391	5910	 	 
6391	5909	<~>	<~>
6391	5909	<split-s>	<split-s>
6391	5909	<split-h>	<split-h>
6391	5909	<name2>	<name2>
6391	5913	<aphaerese>	<aphaerese>
6391	6389	<>	<aphaerese>
6391	5909	<elision3>	<elision3>
6391	6389	<>	<elision3>
6391	5909	<elision2>	<elision2>
6391	6389	<>	<elision2>
6391	5909	<elision1>	<elision1>
6391	6389	<>	<elision1>
6391	5917	.	υ
6391	5920	s	υ
6391	5917	.	u
6391	5920	s	u
6391	6036	.	κ
6391	5962	s	U
6391	5917	.	α
6391	5920	s	α
6391	5917	.	a
6391	5920	s	a
6391	5992	s	A
6391	6036	.	λ
6391	5668	<2s>	<>
6392	6052	<name>	<name>
6392	6393	<>	<name>
6392	6395	<>	<aphaerese>
6392	6395	<>	<elision3>
6392	6395	<>	<elision2>
6392	6395	<>	<elision1>
6392	5539	<2s>	<>
6392	6056	<L2kl>	<>
6392	6399	<K2kl>	<>
6393	6394	<>	<aphaerese>
6393	6394	<>	<elision3>
6393	6394	<>	<elision2>
6393	6394	<>	<elision1>
6393	6057	<L2kl>	<>
6393	6397	<K2kl>	<>
6394	6395	<>	<aphaerese>
6394	6395	<>	<elision3>
6394	6395	<>	<elision2>
6394	6395	<>	<elision1>
6394	6058	<L2kl>	<>
6394	6398	<K2kl>	<>
6395	6393	<>	<name>
6395	6395	<>	<aphaerese>
6395	6395	<>	<elision3>
6395	6395	<>	<elision2>
6395	6395	<>	<elision1>
6395	6056	<L2kl>	<>
6395	6396	<K2kl>	<>
6396	6039	.	.
6396	6039	 	 
6396	6039	<~>	<~>
6396	6039	<split-s>	<split-s>
6396	6039	<split-h>	<split-h>
6396	6039	<name2>	<name2>
6396	6397	<>	<name>
6396	6042	<aphaerese>	<aphaerese>
6396	6396	<>	<aphaerese>
6396	6039	<elision3>	<elision3>
6396	6396	<>	<elision3>
6396	6039	<elision2>	<elision2>
6396	6396	<>	<elision2>
6396	6039	<elision1>	<elision1>
6396	6396	<>	<elision1>
6396	6036	.	υ
6396	6036	.	u
6396	6036	.	α
6396	6036	.	a
6396	5682	<2s>	<>
6397	6041	.	.
6397	6041	 	 
6397	6041	<~>	<~>
6397	6041	<split-s>	<split-s>
6397	6041	<split-h>	<split-h>
6397	6041	<name2>	<name2>
6397	6044	<aphaerese>	<aphaerese>
6397	6398	<>	<aphaerese>
6397	6041	<elision3>	<elision3>
6397	6398	<>	<elision3>
6397	6041	<elision2>	<elision2>
6397	6398	<>	<elision2>
6397	6041	<elision1>	<elision1>
6397	6398	<>	<elision1>
6397	6038	.	υ
6397	6038	.	u
6397	6038	.	α
6397	6038	.	a
6397	5683	<2s>	<>
6398	6039	.	.
6398	6039	 	 
6398	6039	<~>	<~>
6398	6039	<split-s>	<split-s>
6398	6039	<split-h>	<split-h>
6398	6039	<name2>	<name2>
6398	6042	<aphaerese>	<aphaerese>
6398	6396	<>	<aphaerese>
6398	6039	<elision3>	<elision3>
6398	6396	<>	<elision3>
6398	6039	<elision2>	<elision2>
6398	6396	<>	<elision2>
6398	6039	<elision1>	<elision1>
6398	6396	<>	<elision1>
6398	6036	.	υ
6398	6036	.	u
6398	6036	.	α
6398	6036	.	a
6398	5681	<2s>	<>
6399	6039	.	.
6399	6039	 	 
6399	6039	<~>	<~>
6399	6039	<split-s>	<split-s>
6399	6039	<split-h>	<split-h>
6399	6039	<name2>	<name2>
6399	6063	<name2>	<name>
6399	6397	<>	<name>
6399	6042	<aphaerese>	<aphaerese>
6399	6396	<>	<aphaerese>
6399	6039	<elision3>	<elision3>
6399	6396	<>	<elision3>
6399	6039	<elision2>	<elision2>
6399	6396	<>	<elision2>
6399	6039	<elision1>	<elision1>
6399	6396	<>	<elision1>
6399	6036	.	υ
6399	6036	.	u
6399	6036	.	α
6399	6036	.	a
6399	5688	<2s>	<>
6400	5909	.	.
6400	5910	 	 
6400	5909	<~>	<~>
6400	5909	<split-s>	<split-s>
6400	5909	<split-h>	<split-h>
6400	5909	<name2>	<name2>
6400	6401	<>	<name>
6400	5913	<aphaerese>	<aphaerese>
6400	6400	<>	<aphaerese>
6400	5909	<elision3>	<elision3>
6400	6400	<>	<elision3>
6400	5909	<elision2>	<elision2>
6400	6400	<>	<elision2>
6400	5909	<elision1>	<elision1>
6400	6400	<>	<elision1>
6400	5917	.	υ
6400	5920	s	υ
6400	5917	.	u
6400	5920	s	u
6400	5917	.	κ
6400	5962	s	U
6400	5917	.	α
6400	5920	s	α
6400	5917	.	a
6400	5920	s	a
6400	5992	s	A
6400	5917	.	λ
6400	5669	<2s>	<>
6401	5912	.	.
6401	5915	 	 
6401	5912	<~>	<~>
6401	5912	<split-s>	<split-s>
6401	5912	<split-h>	<split-h>
6401	5912	<name2>	<name2>
6401	6013	<aphaerese>	<aphaerese>
6401	6402	<>	<aphaerese>
6401	5912	<elision3>	<elision3>
6401	6402	<>	<elision3>
6401	5912	<elision2>	<elision2>
6401	6402	<>	<elision2>
6401	5912	<elision1>	<elision1>
6401	6402	<>	<elision1>
6401	5919	.	υ
6401	5937	s	υ
6401	5919	.	u
6401	5937	s	u
6401	5919	.	κ
6401	5964	s	U
6401	5919	.	α
6401	5937	s	α
6401	5919	.	a
6401	5937	s	a
6401	5994	s	A
6401	5919	.	λ
6401	5670	<2s>	<>
6402	5909	.	.
6402	5910	 	 
6402	5909	<~>	<~>
6402	5909	<split-s>	<split-s>
6402	5909	<split-h>	<split-h>
6402	5909	<name2>	<name2>
6402	5913	<aphaerese>	<aphaerese>
6402	6400	<>	<aphaerese>
6402	5909	<elision3>	<elision3>
6402	6400	<>	<elision3>
6402	5909	<elision2>	<elision2>
6402	6400	<>	<elision2>
6402	5909	<elision1>	<elision1>
6402	6400	<>	<elision1>
6402	5917	.	υ
6402	5920	s	υ
6402	5917	.	u
6402	5920	s	u
6402	5917	.	κ
6402	5962	s	U
6402	5917	.	α
6402	5920	s	α
6402	5917	.	a
6402	5920	s	a
6402	5992	s	A
6402	5917	.	λ
6402	5668	<2s>	<>
6403	6039	.	.
6403	6039	 	 
6403	6039	<~>	<~>
6403	6039	<split-s>	<split-s>
6403	6039	<split-h>	<split-h>
6403	6039	<name2>	<name2>
6403	6404	<>	<name>
6403	6042	<aphaerese>	<aphaerese>
6403	6403	<>	<aphaerese>
6403	6039	<elision3>	<elision3>
6403	6403	<>	<elision3>
6403	6039	<elision2>	<elision2>
6403	6403	<>	<elision2>
6403	6039	<elision1>	<elision1>
6403	6403	<>	<elision1>
6403	6036	.	υ
6403	6036	.	u
6403	6036	.	κ
6403	6036	.	α
6403	6036	.	a
6403	6036	.	λ
6403	5669	<2s>	<>
6404	6041	.	.
6404	6041	 	 
6404	6041	<~>	<~>
6404	6041	<split-s>	<split-s>
6404	6041	<split-h>	<split-h>
6404	6041	<name2>	<name2>
6404	6044	<aphaerese>	<aphaerese>
6404	6405	<>	<aphaerese>
6404	6041	<elision3>	<elision3>
6404	6405	<>	<elision3>
6404	6041	<elision2>	<elision2>
6404	6405	<>	<elision2>
6404	6041	<elision1>	<elision1>
6404	6405	<>	<elision1>
6404	6038	.	υ
6404	6038	.	u
6404	6038	.	κ
6404	6038	.	α
6404	6038	.	a
6404	6038	.	λ
6404	5670	<2s>	<>
6405	6039	.	.
6405	6039	 	 
6405	6039	<~>	<~>
6405	6039	<split-s>	<split-s>
6405	6039	<split-h>	<split-h>
6405	6039	<name2>	<name2>
6405	6042	<aphaerese>	<aphaerese>
6405	6403	<>	<aphaerese>
6405	6039	<elision3>	<elision3>
6405	6403	<>	<elision3>
6405	6039	<elision2>	<elision2>
6405	6403	<>	<elision2>
6405	6039	<elision1>	<elision1>
6405	6403	<>	<elision1>
6405	6036	.	υ
6405	6036	.	u
6405	6036	.	κ
6405	6036	.	α
6405	6036	.	a
6405	6036	.	λ
6405	5668	<2s>	<>
6406	6063	<name>	<name>
6406	6407	<>	<name>
6406	6409	<>	<aphaerese>
6406	6409	<>	<elision3>
6406	6409	<>	<elision2>
6406	6409	<>	<elision1>
6406	5539	<2s>	<>
6406	6410	<L2kl>	<>
6407	6408	<>	<aphaerese>
6407	6408	<>	<elision3>
6407	6408	<>	<elision2>
6407	6408	<>	<elision1>
6407	6404	<L2kl>	<>
6408	6409	<>	<aphaerese>
6408	6409	<>	<elision3>
6408	6409	<>	<elision2>
6408	6409	<>	<elision1>
6408	6405	<L2kl>	<>
6409	6407	<>	<name>
6409	6409	<>	<aphaerese>
6409	6409	<>	<elision3>
6409	6409	<>	<elision2>
6409	6409	<>	<elision1>
6409	6403	<L2kl>	<>
6410	6039	.	.
6410	6039	 	 
6410	6039	<~>	<~>
6410	6039	<split-s>	<split-s>
6410	6039	<split-h>	<split-h>
6410	6039	<name2>	<name2>
6410	6063	<name2>	<name>
6410	6404	<>	<name>
6410	6042	<aphaerese>	<aphaerese>
6410	6403	<>	<aphaerese>
6410	6039	<elision3>	<elision3>
6410	6403	<>	<elision3>
6410	6039	<elision2>	<elision2>
6410	6403	<>	<elision2>
6410	6039	<elision1>	<elision1>
6410	6403	<>	<elision1>
6410	6036	.	υ
6410	6036	.	u
6410	6036	.	κ
6410	6036	.	α
6410	6036	.	a
6410	6036	.	λ
6410	5695	<2s>	<>
6411	179	.	.
6411	180	 	 
6411	179	<~>	<~>
6411	179	<split-s>	<split-s>
6411	179	<split-h>	<split-h>
6411	179	<name2>	<name2>
6411	183	<aphaerese>	<aphaerese>
6411	6412	<>	<aphaerese>
6411	5410	<elision3>	<elision3>
6411	6412	<>	<elision3>
6411	5410	<elision2>	<elision2>
6411	6412	<>	<elision2>
6411	5410	<elision1>	<elision1>
6411	6412	<>	<elision1>
6411	4828	.	υ
6411	4872	H	υ
6411	4828	.	u
6411	4874	H	u
6411	5287	H	κ
6411	4782	H	k
6411	4795	H	U
6411	4798	H	K
6411	4828	.	α
6411	4858	H	α
6411	4828	.	a
6411	4863	H	a
6411	4625	H	A
6411	5264	H	λ
6411	5212	H	l
6411	5217	H	L
6411	6415	<K>	<>
6412	179	.	.
6412	180	 	 
6412	179	<~>	<~>
6412	179	<split-s>	<split-s>
6412	179	<split-h>	<split-h>
6412	179	<name2>	<name2>
6412	6413	<>	<name>
6412	183	<aphaerese>	<aphaerese>
6412	6412	<>	<aphaerese>
6412	5410	<elision3>	<elision3>
6412	6412	<>	<elision3>
6412	5410	<elision2>	<elision2>
6412	6412	<>	<elision2>
6412	5410	<elision1>	<elision1>
6412	6412	<>	<elision1>
6412	4828	.	υ
6412	4872	H	υ
6412	4828	.	u
6412	4874	H	u
6412	5287	H	κ
6412	4782	H	k
6412	4795	H	U
6412	4798	H	K
6412	4828	.	α
6412	4858	H	α
6412	4828	.	a
6412	4863	H	a
6412	4625	H	A
6412	5264	H	λ
6412	5212	H	l
6412	5217	H	L
6412	6416	<K>	<>
6413	178	.	.
6413	182	 	 
6413	178	<~>	<~>
6413	178	<split-s>	<split-s>
6413	178	<split-h>	<split-h>
6413	178	<name2>	<name2>
6413	185	<aphaerese>	<aphaerese>
6413	6411	<>	<aphaerese>
6413	5409	<elision3>	<elision3>
6413	6411	<>	<elision3>
6413	5409	<elision2>	<elision2>
6413	6411	<>	<elision2>
6413	5409	<elision1>	<elision1>
6413	6411	<>	<elision1>
6413	4830	.	υ
6413	4867	H	υ
6413	4830	.	u
6413	4871	H	u
6413	5244	H	κ
6413	4823	H	k
6413	4797	H	U
6413	4827	H	K
6413	4830	.	α
6413	4857	H	α
6413	4830	.	a
6413	4862	H	a
6413	4628	H	A
6413	5263	H	λ
6413	5211	H	l
6413	5214	H	L
6413	6414	<K>	<>
6414	4880	.	.
6414	4880	<~>	<~>
6414	4880	<split-s>	<split-s>
6414	4880	<split-h>	<split-h>
6414	4880	<name2>	<name2>
6414	4883	<aphaerese>	<aphaerese>
6414	6415	<>	<aphaerese>
6414	5358	<elision3>	<elision3>
6414	6415	<>	<elision3>
6414	5358	<elision2>	<elision2>
6414	6415	<>	<elision2>
6414	5358	<elision1>	<elision1>
6414	6415	<>	<elision1>
6414	4876	.	υ
6414	5022	H	υ
6414	4876	.	u
6414	5031	H	u
6414	5274	H	κ
6414	4991	H	k
6414	5000	H	U
6414	5004	H	K
6414	4876	.	α
6414	5034	H	α
6414	4876	.	a
6414	5037	H	a
6414	4971	H	A
6414	5283	H	λ
6414	5018	H	l
6414	5013	H	L
6415	4878	.	.
6415	4878	<~>	<~>
6415	4878	<split-s>	<split-s>
6415	4878	<split-h>	<split-h>
6415	4878	<name2>	<name2>
6415	4881	<aphaerese>	<aphaerese>
6415	6416	<>	<aphaerese>
6415	5359	<elision3>	<elision3>
6415	6416	<>	<elision3>
6415	5359	<elision2>	<elision2>
6415	6416	<>	<elision2>
6415	5359	<elision1>	<elision1>
6415	6416	<>	<elision1>
6415	4877	.	υ
6415	5020	H	υ
6415	4877	.	u
6415	5029	H	u
6415	5272	H	κ
6415	4989	H	k
6415	4998	H	U
6415	5001	H	K
6415	4877	.	α
6415	5032	H	α
6415	4877	.	a
6415	5035	H	a
6415	4969	H	A
6415	5281	H	λ
6415	5016	H	l
6415	5019	H	L
6416	4878	.	.
6416	4878	<~>	<~>
6416	4878	<split-s>	<split-s>
6416	4878	<split-h>	<split-h>
6416	4878	<name2>	<name2>
6416	6414	<>	<name>
6416	4881	<aphaerese>	<aphaerese>
6416	6416	<>	<aphaerese>
6416	5359	<elision3>	<elision3>
6416	6416	<>	<elision3>
6416	5359	<elision2>	<elision2>
6416	6416	<>	<elision2>
6416	5359	<elision1>	<elision1>
6416	6416	<>	<elision1>
6416	4877	.	υ
6416	5020	H	υ
6416	4877	.	u
6416	5029	H	u
6416	5272	H	κ
6416	4989	H	k
6416	4998	H	U
6416	5001	H	K
6416	4877	.	α
6416	5032	H	α
6416	4877	.	a
6416	5035	H	a
6416	4969	H	A
6416	5281	H	λ
6416	5016	H	l
6416	5019	H	L
6417	6418	<>	<name>
6417	6417	<>	<aphaerese>
6417	6417	<>	<elision3>
6417	6417	<>	<elision2>
6417	6417	<>	<elision1>
6417	6274	.	κ
6417	6274	.	λ
6417	5598	<1s>	<>
6418	6419	<>	<aphaerese>
6418	6419	<>	<elision3>
6418	6419	<>	<elision2>
6418	6419	<>	<elision1>
6418	6276	.	κ
6418	6276	.	λ
6418	5599	<1s>	<>
6419	6417	<>	<aphaerese>
6419	6417	<>	<elision3>
6419	6417	<>	<elision2>
6419	6417	<>	<elision1>
6419	6274	.	κ
6419	6274	.	λ
6419	5597	<1s>	<>
6420	6266	.	.
6420	6267	 	 
6420	6266	<~>	<~>
6420	6266	<split-s>	<split-s>
6420	6266	<split-h>	<split-h>
6420	6266	<name2>	<name2>
6420	6381	<>	<name>
6420	6270	<aphaerese>	<aphaerese>
6420	6265	<>	<aphaerese>
6420	6383	<elision3>	<elision3>
6420	6265	<>	<elision3>
6420	6383	<elision2>	<elision2>
6420	6265	<>	<elision2>
6420	6383	<elision1>	<elision1>
6420	6265	<>	<elision1>
6420	6274	.	υ
6420	6277	s	υ
6420	6274	.	u
6420	6277	s	u
6420	5908	s	κ
6420	6033	s	k
6420	6323	s	U
6420	6051	s	K
6420	6274	.	α
6420	6348	s	α
6420	6274	.	a
6420	6348	s	a
6420	6351	s	A
6420	5908	s	λ
6420	6064	s	l
6420	6067	s	L
6420	6421	<1s>	<>
6421	179	.	.
6421	180	 	 
6421	179	<~>	<~>
6421	179	<split-s>	<split-s>
6421	179	<split-h>	<split-h>
6421	179	<name2>	<name2>
6421	6413	<>	<name>
6421	183	<aphaerese>	<aphaerese>
6421	6412	<>	<aphaerese>
6421	5410	<elision3>	<elision3>
6421	6412	<>	<elision3>
6421	5410	<elision2>	<elision2>
6421	6412	<>	<elision2>
6421	5410	<elision1>	<elision1>
6421	6412	<>	<elision1>
6421	4828	.	υ
6421	4828	.	u
6421	4828	.	α
6421	4828	.	a
6421	6422	<K>	<>
6422	4878	.	.
6422	4878	<~>	<~>
6422	4878	<split-s>	<split-s>
6422	4878	<split-h>	<split-h>
6422	4878	<name2>	<name2>
6422	6414	<>	<name>
6422	4881	<aphaerese>	<aphaerese>
6422	6416	<>	<aphaerese>
6422	5359	<elision3>	<elision3>
6422	6416	<>	<elision3>
6422	5359	<elision2>	<elision2>
6422	6416	<>	<elision2>
6422	5359	<elision1>	<elision1>
6422	6416	<>	<elision1>
6422	4877	.	υ
6422	4877	.	u
6422	4877	.	α
6422	4877	.	a
6423	6424	<>	<name>
6423	6426	<>	<aphaerese>
6423	6426	<>	<elision3>
6423	6426	<>	<elision2>
6423	6426	<>	<elision1>
6423	6427	<k2K>	<>
6423	6433	<k2L>	<>
6423	6417	<l2L>	<>
6424	6425	<>	<aphaerese>
6424	6425	<>	<elision3>
6424	6425	<>	<elision2>
6424	6425	<>	<elision1>
6424	6428	<k2K>	<>
6424	6431	<k2L>	<>
6424	6418	<l2L>	<>
6425	6426	<>	<aphaerese>
6425	6426	<>	<elision3>
6425	6426	<>	<elision2>
6425	6426	<>	<elision1>
6425	6429	<k2K>	<>
6425	6432	<k2L>	<>
6425	6419	<l2L>	<>
6426	6424	<>	<name>
6426	6426	<>	<aphaerese>
6426	6426	<>	<elision3>
6426	6426	<>	<elision2>
6426	6426	<>	<elision1>
6426	6427	<k2K>	<>
6426	6430	<k2L>	<>
6426	6417	<l2L>	<>
6427	6100	.	.
6427	6101	 	 
6427	6100	<~>	<~>
6427	6100	<split-s>	<split-s>
6427	6100	<split-h>	<split-h>
6427	6100	<name2>	<name2>
6427	6428	<>	<name>
6427	6104	<aphaerese>	<aphaerese>
6427	6427	<>	<aphaerese>
6427	6100	<elision3>	<elision3>
6427	6427	<>	<elision3>
6427	6100	<elision2>	<elision2>
6427	6427	<>	<elision2>
6427	6100	<elision1>	<elision1>
6427	6427	<>	<elision1>
6427	6108	.	υ
6427	6111	s	υ
6427	6108	.	u
6427	6111	s	u
6427	163	s	κ
6427	5849	s	k
6427	6174	s	U
6427	5882	s	K
6427	6108	.	α
6427	6202	s	α
6427	6108	.	a
6427	6202	s	a
6427	6205	s	A
6427	163	s	λ
6427	5897	s	l
6427	5900	s	L
6428	6103	.	.
6428	6106	 	 
6428	6103	<~>	<~>
6428	6103	<split-s>	<split-s>
6428	6103	<split-h>	<split-h>
6428	6103	<name2>	<name2>
6428	6232	<aphaerese>	<aphaerese>
6428	6429	<>	<aphaerese>
6428	6103	<elision3>	<elision3>
6428	6429	<>	<elision3>
6428	6103	<elision2>	<elision2>
6428	6429	<>	<elision2>
6428	6103	<elision1>	<elision1>
6428	6429	<>	<elision1>
6428	6110	.	υ
6428	6113	s	υ
6428	6110	.	u
6428	6113	s	u
6428	5842	s	κ
6428	5851	s	k
6428	6176	s	U
6428	5885	s	K
6428	6110	.	α
6428	6204	s	α
6428	6110	.	a
6428	6204	s	a
6428	6207	s	A
6428	5842	s	λ
6428	5899	s	l
6428	5902	s	L
6429	6100	.	.
6429	6101	 	 
6429	6100	<~>	<~>
6429	6100	<split-s>	<split-s>
6429	6100	<split-h>	<split-h>
6429	6100	<name2>	<name2>
6429	6104	<aphaerese>	<aphaerese>
6429	6427	<>	<aphaerese>
6429	6100	<elision3>	<elision3>
6429	6427	<>	<elision3>
6429	6100	<elision2>	<elision2>
6429	6427	<>	<elision2>
6429	6100	<elision1>	<elision1>
6429	6427	<>	<elision1>
6429	6108	.	υ
6429	6111	s	υ
6429	6108	.	u
6429	6111	s	u
6429	163	s	κ
6429	5849	s	k
6429	6174	s	U
6429	5882	s	K
6429	6108	.	α
6429	6202	s	α
6429	6108	.	a
6429	6202	s	a
6429	6205	s	A
6429	163	s	λ
6429	5897	s	l
6429	5900	s	L
6430	6266	.	.
6430	6267	 	 
6430	6266	<~>	<~>
6430	6266	<split-s>	<split-s>
6430	6266	<split-h>	<split-h>
6430	6266	<name2>	<name2>
6430	6431	<>	<name>
6430	6270	<aphaerese>	<aphaerese>
6430	6430	<>	<aphaerese>
6430	6266	<elision3>	<elision3>
6430	6430	<>	<elision3>
6430	6266	<elision2>	<elision2>
6430	6430	<>	<elision2>
6430	6266	<elision1>	<elision1>
6430	6430	<>	<elision1>
6430	6274	.	υ
6430	6277	s	υ
6430	6274	.	u
6430	6277	s	u
6430	5908	s	κ
6430	6033	s	k
6430	6323	s	U
6430	6051	s	K
6430	6274	.	α
6430	6348	s	α
6430	6274	.	a
6430	6348	s	a
6430	6351	s	A
6430	5908	s	λ
6430	6064	s	l
6430	6067	s	L
6430	5534	<1s>	<>
6431	6269	.	.
6431	6272	 	 
6431	6269	<~>	<~>
6431	6269	<split-s>	<split-s>
6431	6269	<split-h>	<split-h>
6431	6269	<name2>	<name2>
6431	6378	<aphaerese>	<aphaerese>
6431	6432	<>	<aphaerese>
6431	6269	<elision3>	<elision3>
6431	6432	<>	<elision3>
6431	6269	<elision2>	<elision2>
6431	6432	<>	<elision2>
6431	6269	<elision1>	<elision1>
6431	6432	<>	<elision1>
6431	6276	.	υ
6431	6279	s	υ
6431	6276	.	u
6431	6279	s	u
6431	6029	s	κ
6431	6035	s	k
6431	6325	s	U
6431	6054	s	K
6431	6276	.	α
6431	6350	s	α
6431	6276	.	a
6431	6350	s	a
6431	6353	s	A
6431	6029	s	λ
6431	6066	s	l
6431	6069	s	L
6431	5535	<1s>	<>
6432	6266	.	.
6432	6267	 	 
6432	6266	<~>	<~>
6432	6266	<split-s>	<split-s>
6432	6266	<split-h>	<split-h>
6432	6266	<name2>	<name2>
6432	6270	<aphaerese>	<aphaerese>
6432	6430	<>	<aphaerese>
6432	6266	<elision3>	<elision3>
6432	6430	<>	<elision3>
6432	6266	<elision2>	<elision2>
6432	6430	<>	<elision2>
6432	6266	<elision1>	<elision1>
6432	6430	<>	<elision1>
6432	6274	.	υ
6432	6277	s	υ
6432	6274	.	u
6432	6277	s	u
6432	5908	s	κ
6432	6033	s	k
6432	6323	s	U
6432	6051	s	K
6432	6274	.	α
6432	6348	s	α
6432	6274	.	a
6432	6348	s	a
6432	6351	s	A
6432	5908	s	λ
6432	6064	s	l
6432	6067	s	L
6432	5533	<1s>	<>
6433	6266	.	.
6433	6267	 	 
6433	6266	<~>	<~>
6433	6266	<split-s>	<split-s>
6433	6266	<split-h>	<split-h>
6433	6266	<name2>	<name2>
6433	6431	<>	<name>
6433	6270	<aphaerese>	<aphaerese>
6433	6430	<>	<aphaerese>
6433	6266	<elision3>	<elision3>
6433	6430	<>	<elision3>
6433	6266	<elision2>	<elision2>
6433	6430	<>	<elision2>
6433	6266	<elision1>	<elision1>
6433	6430	<>	<elision1>
6433	6274	.	υ
6433	6277	s	υ
6433	6274	.	u
6433	6277	s	u
6433	5908	s	κ
6433	6033	s	k
6433	6323	s	U
6433	6051	s	K
6433	6274	.	α
6433	6348	s	α
6433	6274	.	a
6433	6348	s	a
6433	6351	s	A
6433	5908	s	λ
6433	6064	s	l
6433	6067	s	L
6433	6434	<1s>	<>
6434	179	.	.
6434	180	 	 
6434	179	<~>	<~>
6434	179	<split-s>	<split-s>
6434	179	<split-h>	<split-h>
6434	179	<name2>	<name2>
6434	5535	<>	<name>
6434	183	<aphaerese>	<aphaerese>
6434	5534	<>	<aphaerese>
6434	179	<elision3>	<elision3>
6434	5534	<>	<elision3>
6434	179	<elision2>	<elision2>
6434	5534	<>	<elision2>
6434	179	<elision1>	<elision1>
6434	5534	<>	<elision1>
6434	4828	.	υ
6434	4828	.	u
6434	4828	.	α
6434	4828	.	a
6434	6435	<K>	<>
6435	4878	.	.
6435	4878	<~>	<~>
6435	4878	<split-s>	<split-s>
6435	4878	<split-h>	<split-h>
6435	4878	<name2>	<name2>
6435	5536	<>	<name>
6435	4881	<aphaerese>	<aphaerese>
6435	5538	<>	<aphaerese>
6435	4878	<elision3>	<elision3>
6435	5538	<>	<elision3>
6435	4878	<elision2>	<elision2>
6435	5538	<>	<elision2>
6435	4878	<elision1>	<elision1>
6435	5538	<>	<elision1>
6435	4877	.	υ
6435	4877	.	u
6435	4877	.	α
6435	4877	.	a
6436	6100	.	.
6436	6101	 	 
6436	6100	<~>	<~>
6436	6100	<split-s>	<split-s>
6436	6100	<split-h>	<split-h>
6436	6100	<name2>	<name2>
6436	6437	<>	<name>
6436	6104	<aphaerese>	<aphaerese>
6436	6436	<>	<aphaerese>
6436	6100	<elision3>	<elision3>
6436	6436	<>	<elision3>
6436	6100	<elision2>	<elision2>
6436	6436	<>	<elision2>
6436	6100	<elision1>	<elision1>
6436	6436	<>	<elision1>
6436	6108	.	υ
6436	6111	s	υ
6436	6108	.	u
6436	6111	s	u
6436	6114	.	κ
6436	6132	s	κ
6436	5849	s	k
6436	6174	s	U
6436	5882	s	K
6436	6108	.	α
6436	6202	s	α
6436	6108	.	a
6436	6202	s	a
6436	6205	s	A
6436	6208	s	λ
6436	5897	s	l
6436	5900	s	L
6436	6266	<U2L>	<>
6437	6103	.	.
6437	6106	 	 
6437	6103	<~>	<~>
6437	6103	<split-s>	<split-s>
6437	6103	<split-h>	<split-h>
6437	6103	<name2>	<name2>
6437	6232	<aphaerese>	<aphaerese>
6437	6438	<>	<aphaerese>
6437	6103	<elision3>	<elision3>
6437	6438	<>	<elision3>
6437	6103	<elision2>	<elision2>
6437	6438	<>	<elision2>
6437	6103	<elision1>	<elision1>
6437	6438	<>	<elision1>
6437	6110	.	υ
6437	6113	s	υ
6437	6110	.	u
6437	6113	s	u
6437	6116	.	κ
6437	6134	s	κ
6437	5851	s	k
6437	6176	s	U
6437	5885	s	K
6437	6110	.	α
6437	6204	s	α
6437	6110	.	a
6437	6204	s	a
6437	6207	s	A
6437	6210	s	λ
6437	5899	s	l
6437	5902	s	L
6437	6380	<U2L>	<>
6438	6100	.	.
6438	6101	 	 
6438	6100	<~>	<~>
6438	6100	<split-s>	<split-s>
6438	6100	<split-h>	<split-h>
6438	6100	<name2>	<name2>
6438	6104	<aphaerese>	<aphaerese>
6438	6436	<>	<aphaerese>
6438	6100	<elision3>	<elision3>
6438	6436	<>	<elision3>
6438	6100	<elision2>	<elision2>
6438	6436	<>	<elision2>
6438	6100	<elision1>	<elision1>
6438	6436	<>	<elision1>
6438	6108	.	υ
6438	6111	s	υ
6438	6108	.	u
6438	6111	s	u
6438	6114	.	κ
6438	6132	s	κ
6438	5849	s	k
6438	6174	s	U
6438	5882	s	K
6438	6108	.	α
6438	6202	s	α
6438	6108	.	a
6438	6202	s	a
6438	6205	s	A
6438	6208	s	λ
6438	5897	s	l
6438	5900	s	L
6438	6269	<U2L>	<>
6439	6100	.	.
6439	6101	 	 
6439	6100	<~>	<~>
6439	6100	<split-s>	<split-s>
6439	6100	<split-h>	<split-h>
6439	6100	<name2>	<name2>
6439	6440	<name2>	<name>
6439	6441	<>	<name>
6439	6104	<aphaerese>	<aphaerese>
6439	6443	<>	<aphaerese>
6439	6100	<elision3>	<elision3>
6439	6443	<>	<elision3>
6439	6100	<elision2>	<elision2>
6439	6443	<>	<elision2>
6439	6100	<elision1>	<elision1>
6439	6443	<>	<elision1>
6439	6108	.	υ
6439	6111	s	υ
6439	6108	.	u
6439	6111	s	u
6439	6274	.	κ
6439	163	s	κ
6439	5849	s	k
6439	6174	s	U
6439	5882	s	K
6439	6108	.	α
6439	6202	s	α
6439	6108	.	a
6439	6202	s	a
6439	6205	s	A
6439	6274	.	λ
6439	163	s	λ
6439	5897	s	l
6439	5900	s	L
6439	5598	<1s>	<>
6439	6444	<k2K>	<>
6439	6445	<k2L>	<>
6439	6447	<K2L>	<>
6440	5885	s	k
6440	5902	s	l
6441	6103	.	.
6441	6106	 	 
6441	6103	<~>	<~>
6441	6103	<split-s>	<split-s>
6441	6103	<split-h>	<split-h>
6441	6103	<name2>	<name2>
6441	6232	<aphaerese>	<aphaerese>
6441	6442	<>	<aphaerese>
6441	6103	<elision3>	<elision3>
6441	6442	<>	<elision3>
6441	6103	<elision2>	<elision2>
6441	6442	<>	<elision2>
6441	6103	<elision1>	<elision1>
6441	6442	<>	<elision1>
6441	6110	.	υ
6441	6113	s	υ
6441	6110	.	u
6441	6113	s	u
6441	6276	.	κ
6441	5842	s	κ
6441	5851	s	k
6441	6176	s	U
6441	5885	s	K
6441	6110	.	α
6441	6204	s	α
6441	6110	.	a
6441	6204	s	a
6441	6207	s	A
6441	6276	.	λ
6441	5842	s	λ
6441	5899	s	l
6441	5902	s	L
6441	5599	<1s>	<>
6441	6431	<K2L>	<>
6442	6100	.	.
6442	6101	 	 
6442	6100	<~>	<~>
6442	6100	<split-s>	<split-s>
6442	6100	<split-h>	<split-h>
6442	6100	<name2>	<name2>
6442	6104	<aphaerese>	<aphaerese>
6442	6443	<>	<aphaerese>
6442	6100	<elision3>	<elision3>
6442	6443	<>	<elision3>
6442	6100	<elision2>	<elision2>
6442	6443	<>	<elision2>
6442	6100	<elision1>	<elision1>
6442	6443	<>	<elision1>
6442	6108	.	υ
6442	6111	s	υ
6442	6108	.	u
6442	6111	s	u
6442	6274	.	κ
6442	163	s	κ
6442	5849	s	k
6442	6174	s	U
6442	5882	s	K
6442	6108	.	α
6442	6202	s	α
6442	6108	.	a
6442	6202	s	a
6442	6205	s	A
6442	6274	.	λ
6442	163	s	λ
6442	5897	s	l
6442	5900	s	L
6442	5597	<1s>	<>
6442	6432	<K2L>	<>
6443	6100	.	.
6443	6101	 	 
6443	6100	<~>	<~>
6443	6100	<split-s>	<split-s>
6443	6100	<split-h>	<split-h>
6443	6100	<name2>	<name2>
6443	6441	<>	<name>
6443	6104	<aphaerese>	<aphaerese>
6443	6443	<>	<aphaerese>
6443	6100	<elision3>	<elision3>
6443	6443	<>	<elision3>
6443	6100	<elision2>	<elision2>
6443	6443	<>	<elision2>
6443	6100	<elision1>	<elision1>
6443	6443	<>	<elision1>
6443	6108	.	υ
6443	6111	s	υ
6443	6108	.	u
6443	6111	s	u
6443	6274	.	κ
6443	163	s	κ
6443	5849	s	k
6443	6174	s	U
6443	5882	s	K
6443	6108	.	α
6443	6202	s	α
6443	6108	.	a
6443	6202	s	a
6443	6205	s	A
6443	6274	.	λ
6443	163	s	λ
6443	5897	s	l
6443	5900	s	L
6443	5598	<1s>	<>
6443	6430	<K2L>	<>
6444	6440	<name>	<name>
6445	6446	<name>	<name>
6445	5539	<1s>	<>
6446	6054	s	k
6446	6069	s	l
6446	5429	<1s>	<>
6447	6266	.	.
6447	6267	 	 
6447	6266	<~>	<~>
6447	6266	<split-s>	<split-s>
6447	6266	<split-h>	<split-h>
6447	6266	<name2>	<name2>
6447	6446	<name2>	<name>
6447	6431	<>	<name>
6447	6270	<aphaerese>	<aphaerese>
6447	6430	<>	<aphaerese>
6447	6266	<elision3>	<elision3>
6447	6430	<>	<elision3>
6447	6266	<elision2>	<elision2>
6447	6430	<>	<elision2>
6447	6266	<elision1>	<elision1>
6447	6430	<>	<elision1>
6447	6274	.	υ
6447	6277	s	υ
6447	6274	.	u
6447	6277	s	u
6447	5908	s	κ
6447	6033	s	k
6447	6323	s	U
6447	6051	s	K
6447	6274	.	α
6447	6348	s	α
6447	6274	.	a
6447	6348	s	a
6447	6351	s	A
6447	5908	s	λ
6447	6064	s	l
6447	6067	s	L
6447	6448	<1s>	<>
6448	179	.	.
6448	180	 	 
6448	179	<~>	<~>
6448	179	<split-s>	<split-s>
6448	179	<split-h>	<split-h>
6448	179	<name2>	<name2>
6448	5540	<name2>	<name>
6448	5535	<>	<name>
6448	183	<aphaerese>	<aphaerese>
6448	5534	<>	<aphaerese>
6448	179	<elision3>	<elision3>
6448	5534	<>	<elision3>
6448	179	<elision2>	<elision2>
6448	5534	<>	<elision2>
6448	179	<elision1>	<elision1>
6448	5534	<>	<elision1>
6448	4828	.	υ
6448	4828	.	u
6448	4828	.	α
6448	4828	.	a
6448	6449	<K>	<>
6449	4878	.	.
6449	4878	<~>	<~>
6449	4878	<split-s>	<split-s>
6449	4878	<split-h>	<split-h>
6449	4878	<name2>	<name2>
6449	5430	<name2>	<name>
6449	5536	<>	<name>
6449	4881	<aphaerese>	<aphaerese>
6449	5538	<>	<aphaerese>
6449	4878	<elision3>	<elision3>
6449	5538	<>	<elision3>
6449	4878	<elision2>	<elision2>
6449	5538	<>	<elision2>
6449	4878	<elision1>	<elision1>
6449	5538	<>	<elision1>
6449	4877	.	υ
6449	4877	.	u
6449	4877	.	α
6449	4877	.	a
6450	6451	<>	<name>
6450	6450	<>	<aphaerese>
6450	6450	<>	<elision3>
6450	6450	<>	<elision2>
6450	6450	<>	<elision1>
6450	6454	<lambda2L>	<>
6451	6452	<>	<aphaerese>
6451	6452	<>	<elision3>
6451	6452	<>	<elision2>
6451	6452	<>	<elision1>
6451	6455	<lambda2L>	<>
6452	6450	<>	<aphaerese>
6452	6450	<>	<elision3>
6452	6450	<>	<elision2>
6452	6450	<>	<elision1>
6452	6453	<lambda2L>	<>
6453	6266	.	.
6453	6267	 	 
6453	6266	<~>	<~>
6453	6266	<split-s>	<split-s>
6453	6266	<split-h>	<split-h>
6453	6266	<name2>	<name2>
6453	6270	<aphaerese>	<aphaerese>
6453	6454	<>	<aphaerese>
6453	6266	<elision3>	<elision3>
6453	6454	<>	<elision3>
6453	6266	<elision2>	<elision2>
6453	6454	<>	<elision2>
6453	6266	<elision1>	<elision1>
6453	6454	<>	<elision1>
6453	6274	.	υ
6453	6277	s	υ
6453	6274	.	u
6453	6277	s	u
6453	6274	.	κ
6453	5908	s	κ
6453	6033	s	k
6453	6323	s	U
6453	6051	s	K
6453	6274	.	α
6453	6348	s	α
6453	6274	.	a
6453	6348	s	a
6453	6351	s	A
6453	6274	.	λ
6453	5908	s	λ
6453	6064	s	l
6453	6067	s	L
6453	5418	<1s>	<>
6454	6266	.	.
6454	6267	 	 
6454	6266	<~>	<~>
6454	6266	<split-s>	<split-s>
6454	6266	<split-h>	<split-h>
6454	6266	<name2>	<name2>
6454	6455	<>	<name>
6454	6270	<aphaerese>	<aphaerese>
6454	6454	<>	<aphaerese>
6454	6266	<elision3>	<elision3>
6454	6454	<>	<elision3>
6454	6266	<elision2>	<elision2>
6454	6454	<>	<elision2>
6454	6266	<elision1>	<elision1>
6454	6454	<>	<elision1>
6454	6274	.	υ
6454	6277	s	υ
6454	6274	.	u
6454	6277	s	u
6454	6274	.	κ
6454	5908	s	κ
6454	6033	s	k
6454	6323	s	U
6454	6051	s	K
6454	6274	.	α
6454	6348	s	α
6454	6274	.	a
6454	6348	s	a
6454	6351	s	A
6454	6274	.	λ
6454	5908	s	λ
6454	6064	s	l
6454	6067	s	L
6454	5419	<1s>	<>
6455	6269	.	.
6455	6272	 	 
6455	6269	<~>	<~>
6455	6269	<split-s>	<split-s>
6455	6269	<split-h>	<split-h>
6455	6269	<name2>	<name2>
6455	6378	<aphaerese>	<aphaerese>
6455	6453	<>	<aphaerese>
6455	6269	<elision3>	<elision3>
6455	6453	<>	<elision3>
6455	6269	<elision2>	<elision2>
6455	6453	<>	<elision2>
6455	6269	<elision1>	<elision1>
6455	6453	<>	<elision1>
6455	6276	.	υ
6455	6279	s	υ
6455	6276	.	u
6455	6279	s	u
6455	6276	.	κ
6455	6029	s	κ
6455	6035	s	k
6455	6325	s	U
6455	6054	s	K
6455	6276	.	α
6455	6350	s	α
6455	6276	.	a
6455	6350	s	a
6455	6353	s	A
6455	6276	.	λ
6455	6029	s	λ
6455	6066	s	l
6455	6069	s	L
6455	5420	<1s>	<>
6456	6457	<>	<name>
6456	6456	<>	<aphaerese>
6456	6456	<>	<elision3>
6456	6456	<>	<elision2>
6456	6456	<>	<elision1>
6456	6454	<l2L>	<>
6457	6458	<>	<aphaerese>
6457	6458	<>	<elision3>
6457	6458	<>	<elision2>
6457	6458	<>	<elision1>
6457	6455	<l2L>	<>
6458	6456	<>	<aphaerese>
6458	6456	<>	<elision3>
6458	6456	<>	<elision2>
6458	6456	<>	<elision1>
6458	6453	<l2L>	<>
6459	6266	.	.
6459	6267	 	 
6459	6266	<~>	<~>
6459	6266	<split-s>	<split-s>
6459	6266	<split-h>	<split-h>
6459	6266	<name2>	<name2>
6459	6446	<name2>	<name>
6459	6455	<>	<name>
6459	6270	<aphaerese>	<aphaerese>
6459	6454	<>	<aphaerese>
6459	6266	<elision3>	<elision3>
6459	6454	<>	<elision3>
6459	6266	<elision2>	<elision2>
6459	6454	<>	<elision2>
6459	6266	<elision1>	<elision1>
6459	6454	<>	<elision1>
6459	6274	.	υ
6459	6277	s	υ
6459	6274	.	u
6459	6277	s	u
6459	6274	.	κ
6459	5908	s	κ
6459	6033	s	k
6459	6323	s	U
6459	6051	s	K
6459	6274	.	α
6459	6348	s	α
6459	6274	.	a
6459	6348	s	a
6459	6351	s	A
6459	6274	.	λ
6459	5908	s	λ
6459	6064	s	l
6459	6067	s	L
6459	5608	<1s>	<>
6459	6445	<l2L>	<>
6460	6098	<>	<aphaerese>
6460	6098	<>	<elision3>
6460	6098	<>	<elision2>
6460	6098	<>	<elision1>
6460	6236	<kappa2K>	<>
6460	6461	<kappa2L>	<>
6460	6419	<lambda2L>	<>
6461	6266	.	.
6461	6267	 	 
6461	6266	<~>	<~>
6461	6266	<split-s>	<split-s>
6461	6266	<split-h>	<split-h>
6461	6266	<name2>	<name2>
6461	6270	<aphaerese>	<aphaerese>
6461	6265	<>	<aphaerese>
6461	6383	<elision3>	<elision3>
6461	6265	<>	<elision3>
6461	6383	<elision2>	<elision2>
6461	6265	<>	<elision2>
6461	6383	<elision1>	<elision1>
6461	6265	<>	<elision1>
6461	6274	.	υ
6461	6277	s	υ
6461	6274	.	u
6461	6277	s	u
6461	5908	s	κ
6461	6033	s	k
6461	6323	s	U
6461	6051	s	K
6461	6274	.	α
6461	6348	s	α
6461	6274	.	a
6461	6348	s	a
6461	6351	s	A
6461	5908	s	λ
6461	6064	s	l
6461	6067	s	L
6461	6462	<1s>	<>
6462	179	.	.
6462	180	 	 
6462	179	<~>	<~>
6462	179	<split-s>	<split-s>
6462	179	<split-h>	<split-h>
6462	179	<name2>	<name2>
6462	183	<aphaerese>	<aphaerese>
6462	6412	<>	<aphaerese>
6462	5410	<elision3>	<elision3>
6462	6412	<>	<elision3>
6462	5410	<elision2>	<elision2>
6462	6412	<>	<elision2>
6462	5410	<elision1>	<elision1>
6462	6412	<>	<elision1>
6462	4828	.	υ
6462	4828	.	u
6462	4828	.	α
6462	4828	.	a
6462	6463	<K>	<>
6463	4878	.	.
6463	4878	<~>	<~>
6463	4878	<split-s>	<split-s>
6463	4878	<split-h>	<split-h>
6463	4878	<name2>	<name2>
6463	4881	<aphaerese>	<aphaerese>
6463	6416	<>	<aphaerese>
6463	5359	<elision3>	<elision3>
6463	6416	<>	<elision3>
6463	5359	<elision2>	<elision2>
6463	6416	<>	<elision2>
6463	5359	<elision1>	<elision1>
6463	6416	<>	<elision1>
6463	4877	.	υ
6463	4877	.	u
6463	4877	.	α
6463	4877	.	a
6464	6426	<>	<aphaerese>
6464	6426	<>	<elision3>
6464	6426	<>	<elision2>
6464	6426	<>	<elision1>
6464	6429	<k2K>	<>
6464	6465	<k2L>	<>
6464	6419	<l2L>	<>
6465	6266	.	.
6465	6267	 	 
6465	6266	<~>	<~>
6465	6266	<split-s>	<split-s>
6465	6266	<split-h>	<split-h>
6465	6266	<name2>	<name2>
6465	6270	<aphaerese>	<aphaerese>
6465	6430	<>	<aphaerese>
6465	6266	<elision3>	<elision3>
6465	6430	<>	<elision3>
6465	6266	<elision2>	<elision2>
6465	6430	<>	<elision2>
6465	6266	<elision1>	<elision1>
6465	6430	<>	<elision1>
6465	6274	.	υ
6465	6277	s	υ
6465	6274	.	u
6465	6277	s	u
6465	5908	s	κ
6465	6033	s	k
6465	6323	s	U
6465	6051	s	K
6465	6274	.	α
6465	6348	s	α
6465	6274	.	a
6465	6348	s	a
6465	6351	s	A
6465	5908	s	λ
6465	6064	s	l
6465	6067	s	L
6465	6466	<1s>	<>
6466	179	.	.
6466	180	 	 
6466	179	<~>	<~>
6466	179	<split-s>	<split-s>
6466	179	<split-h>	<split-h>
6466	179	<name2>	<name2>
6466	183	<aphaerese>	<aphaerese>
6466	5534	<>	<aphaerese>
6466	179	<elision3>	<elision3>
6466	5534	<>	<elision3>
6466	179	<elision2>	<elision2>
6466	5534	<>	<elision2>
6466	179	<elision1>	<elision1>
6466	5534	<>	<elision1>
6466	4828	.	υ
6466	4828	.	u
6466	4828	.	α
6466	4828	.	a
6466	6467	<K>	<>
6467	4878	.	.
6467	4878	<~>	<~>
6467	4878	<split-s>	<split-s>
6467	4878	<split-h>	<split-h>
6467	4878	<name2>	<name2>
6467	4881	<aphaerese>	<aphaerese>
6467	5538	<>	<aphaerese>
6467	4878	<elision3>	<elision3>
6467	5538	<>	<elision3>
6467	4878	<elision2>	<elision2>
6467	5538	<>	<elision2>
6467	4878	<elision1>	<elision1>
6467	5538	<>	<elision1>
6467	4877	.	υ
6467	4877	.	u
6467	4877	.	α
6467	4877	.	a
6468	6100	.	.
6468	6101	 	 
6468	6100	<~>	<~>
6468	6100	<split-s>	<split-s>
6468	6100	<split-h>	<split-h>
6468	6100	<name2>	<name2>
6468	6104	<aphaerese>	<aphaerese>
6468	6443	<>	<aphaerese>
6468	6100	<elision3>	<elision3>
6468	6443	<>	<elision3>
6468	6100	<elision2>	<elision2>
6468	6443	<>	<elision2>
6468	6100	<elision1>	<elision1>
6468	6443	<>	<elision1>
6468	6108	.	υ
6468	6111	s	υ
6468	6108	.	u
6468	6111	s	u
6468	6274	.	κ
6468	163	s	κ
6468	5849	s	k
6468	6174	s	U
6468	5882	s	K
6468	6108	.	α
6468	6202	s	α
6468	6108	.	a
6468	6202	s	a
6468	6205	s	A
6468	6274	.	λ
6468	163	s	λ
6468	5897	s	l
6468	5900	s	L
6468	5597	<1s>	<>
6468	6465	<K2L>	<>
6469	6470	<>	<name>
6469	6469	<>	<aphaerese>
6469	143	<elision3>	<elision3>
6469	6469	<>	<elision3>
6469	143	<elision2>	<elision2>
6469	6469	<>	<elision2>
6469	143	<elision1>	<elision1>
6469	6469	<>	<elision1>
6470	6471	<>	<aphaerese>
6470	142	<elision3>	<elision3>
6470	6471	<>	<elision3>
6470	142	<elision2>	<elision2>
6470	6471	<>	<elision2>
6470	142	<elision1>	<elision1>
6470	6471	<>	<elision1>
6471	6469	<>	<aphaerese>
6471	143	<elision3>	<elision3>
6471	6469	<>	<elision3>
6471	143	<elision2>	<elision2>
6471	6469	<>	<elision2>
6471	143	<elision1>	<elision1>
6471	6469	<>	<elision1>
6472	6473	<>	<name>
6472	6475	<>	<aphaerese>
6472	6475	<>	<elision3>
6472	6475	<>	<elision2>
6472	6475	<>	<elision1>
6472	6482	<ypsilon2K>	<>
6472	6483	<ypsilon2L>	<>
6473	6474	<>	<aphaerese>
6473	6474	<>	<elision3>
6473	6474	<>	<elision2>
6473	6474	<>	<elision1>
6473	6477	<ypsilon2K>	<>
6473	6480	<ypsilon2L>	<>
6474	6475	<>	<aphaerese>
6474	6475	<>	<elision3>
6474	6475	<>	<elision2>
6474	6475	<>	<elision1>
6474	6478	<ypsilon2K>	<>
6474	6481	<ypsilon2L>	<>
6475	6473	<>	<name>
6475	6475	<>	<aphaerese>
6475	6475	<>	<elision3>
6475	6475	<>	<elision2>
6475	6475	<>	<elision1>
6475	6476	<ypsilon2K>	<>
6475	6479	<ypsilon2L>	<>
6476	6100	.	.
6476	6101	 	 
6476	6100	<~>	<~>
6476	6100	<split-s>	<split-s>
6476	6100	<split-h>	<split-h>
6476	6100	<name2>	<name2>
6476	6477	<>	<name>
6476	6104	<aphaerese>	<aphaerese>
6476	6476	<>	<aphaerese>
6476	6476	<>	<elision3>
6476	6476	<>	<elision2>
6476	6476	<>	<elision1>
6476	6108	.	υ
6476	6111	s	υ
6476	6108	.	u
6476	6111	s	u
6476	6114	.	κ
6476	6132	s	κ
6476	5849	s	k
6476	6174	s	U
6476	5882	s	K
6476	6108	.	α
6476	6202	s	α
6476	6108	.	a
6476	6202	s	a
6476	6205	s	A
6476	6208	s	λ
6476	5897	s	l
6476	5900	s	L
6477	6103	.	.
6477	6106	 	 
6477	6103	<~>	<~>
6477	6103	<split-s>	<split-s>
6477	6103	<split-h>	<split-h>
6477	6103	<name2>	<name2>
6477	6232	<aphaerese>	<aphaerese>
6477	6478	<>	<aphaerese>
6477	6478	<>	<elision3>
6477	6478	<>	<elision2>
6477	6478	<>	<elision1>
6477	6110	.	υ
6477	6113	s	υ
6477	6110	.	u
6477	6113	s	u
6477	6116	.	κ
6477	6134	s	κ
6477	5851	s	k
6477	6176	s	U
6477	5885	s	K
6477	6110	.	α
6477	6204	s	α
6477	6110	.	a
6477	6204	s	a
6477	6207	s	A
6477	6210	s	λ
6477	5899	s	l
6477	5902	s	L
6478	6100	.	.
6478	6101	 	 
6478	6100	<~>	<~>
6478	6100	<split-s>	<split-s>
6478	6100	<split-h>	<split-h>
6478	6100	<name2>	<name2>
6478	6104	<aphaerese>	<aphaerese>
6478	6476	<>	<aphaerese>
6478	6476	<>	<elision3>
6478	6476	<>	<elision2>
6478	6476	<>	<elision1>
6478	6108	.	υ
6478	6111	s	υ
6478	6108	.	u
6478	6111	s	u
6478	6114	.	κ
6478	6132	s	κ
6478	5849	s	k
6478	6174	s	U
6478	5882	s	K
6478	6108	.	α
6478	6202	s	α
6478	6108	.	a
6478	6202	s	a
6478	6205	s	A
6478	6208	s	λ
6478	5897	s	l
6478	5900	s	L
6479	6266	.	.
6479	6267	 	 
6479	6266	<~>	<~>
6479	6266	<split-s>	<split-s>
6479	6266	<split-h>	<split-h>
6479	6266	<name2>	<name2>
6479	6480	<>	<name>
6479	6270	<aphaerese>	<aphaerese>
6479	6479	<>	<aphaerese>
6479	6479	<>	<elision3>
6479	6479	<>	<elision2>
6479	6479	<>	<elision1>
6479	6274	.	υ
6479	6277	s	υ
6479	6274	.	u
6479	6277	s	u
6479	6280	.	κ
6479	6298	s	κ
6479	6033	s	k
6479	6323	s	U
6479	6051	s	K
6479	6274	.	α
6479	6348	s	α
6479	6274	.	a
6479	6348	s	a
6479	6351	s	A
6479	6354	s	λ
6479	6064	s	l
6479	6067	s	L
6479	5227	<1s>	<>
6480	6269	.	.
6480	6272	 	 
6480	6269	<~>	<~>
6480	6269	<split-s>	<split-s>
6480	6269	<split-h>	<split-h>
6480	6269	<name2>	<name2>
6480	6378	<aphaerese>	<aphaerese>
6480	6481	<>	<aphaerese>
6480	6481	<>	<elision3>
6480	6481	<>	<elision2>
6480	6481	<>	<elision1>
6480	6276	.	υ
6480	6279	s	υ
6480	6276	.	u
6480	6279	s	u
6480	6282	.	κ
6480	6300	s	κ
6480	6035	s	k
6480	6325	s	U
6480	6054	s	K
6480	6276	.	α
6480	6350	s	α
6480	6276	.	a
6480	6350	s	a
6480	6353	s	A
6480	6356	s	λ
6480	6066	s	l
6480	6069	s	L
6480	5228	<1s>	<>
6481	6266	.	.
6481	6267	 	 
6481	6266	<~>	<~>
6481	6266	<split-s>	<split-s>
6481	6266	<split-h>	<split-h>
6481	6266	<name2>	<name2>
6481	6270	<aphaerese>	<aphaerese>
6481	6479	<>	<aphaerese>
6481	6479	<>	<elision3>
6481	6479	<>	<elision2>
6481	6479	<>	<elision1>
6481	6274	.	υ
6481	6277	s	υ
6481	6274	.	u
6481	6277	s	u
6481	6280	.	κ
6481	6298	s	κ
6481	6033	s	k
6481	6323	s	U
6481	6051	s	K
6481	6274	.	α
6481	6348	s	α
6481	6274	.	a
6481	6348	s	a
6481	6351	s	A
6481	6354	s	λ
6481	6064	s	l
6481	6067	s	L
6481	5226	<1s>	<>
6482	6100	.	.
6482	6101	 	 
6482	6100	<~>	<~>
6482	6100	<split-s>	<split-s>
6482	6100	<split-h>	<split-h>
6482	6100	<name2>	<name2>
6482	6477	<>	<name>
6482	6104	<aphaerese>	<aphaerese>
6482	6476	<>	<aphaerese>
6482	6476	<>	<elision3>
6482	6476	<>	<elision2>
6482	6476	<>	<elision1>
6482	6108	.	υ
6482	6111	s	υ
6482	6108	.	u
6482	6111	s	u
6482	6114	.	κ
6482	6132	s	κ
6482	5849	s	k
6482	6108	.	α
6482	6202	s	α
6482	6108	.	a
6482	6202	s	a
6482	6208	s	λ
6482	5897	s	l
6483	6266	.	.
6483	6267	 	 
6483	6266	<~>	<~>
6483	6266	<split-s>	<split-s>
6483	6266	<split-h>	<split-h>
6483	6266	<name2>	<name2>
6483	6480	<>	<name>
6483	6270	<aphaerese>	<aphaerese>
6483	6479	<>	<aphaerese>
6483	6479	<>	<elision3>
6483	6479	<>	<elision2>
6483	6479	<>	<elision1>
6483	6274	.	υ
6483	6277	s	υ
6483	6274	.	u
6483	6277	s	u
6483	6280	.	κ
6483	6298	s	κ
6483	6033	s	k
6483	6274	.	α
6483	6348	s	α
6483	6274	.	a
6483	6348	s	a
6483	6354	s	λ
6483	6064	s	l
6483	6484	<1s>	<>
6484	179	.	.
6484	180	 	 
6484	179	<~>	<~>
6484	179	<split-s>	<split-s>
6484	179	<split-h>	<split-h>
6484	179	<name2>	<name2>
6484	5228	<>	<name>
6484	183	<aphaerese>	<aphaerese>
6484	5227	<>	<aphaerese>
6484	5227	<>	<elision3>
6484	5227	<>	<elision2>
6484	5227	<>	<elision1>
6484	4828	.	υ
6484	4828	.	u
6484	186	.	κ
6484	4828	.	α
6484	4828	.	a
6484	6485	<K>	<>
6485	4878	.	.
6485	4878	<~>	<~>
6485	4878	<split-s>	<split-s>
6485	4878	<split-h>	<split-h>
6485	4878	<name2>	<name2>
6485	5229	<>	<name>
6485	4881	<aphaerese>	<aphaerese>
6485	5231	<>	<aphaerese>
6485	5231	<>	<elision3>
6485	5231	<>	<elision2>
6485	5231	<>	<elision1>
6485	4877	.	υ
6485	4877	.	u
6485	4884	.	κ
6485	4877	.	α
6485	4877	.	a
6486	6487	<>	<name>
6486	6489	<>	<aphaerese>
6486	6489	<>	<elision3>
6486	6489	<>	<elision2>
6486	6489	<>	<elision1>
6486	6482	<u2K>	<>
6486	6483	<u2L>	<>
6487	6488	<>	<aphaerese>
6487	6488	<>	<elision3>
6487	6488	<>	<elision2>
6487	6488	<>	<elision1>
6487	6477	<u2K>	<>
6487	6480	<u2L>	<>
6488	6489	<>	<aphaerese>
6488	6489	<>	<elision3>
6488	6489	<>	<elision2>
6488	6489	<>	<elision1>
6488	6478	<u2K>	<>
6488	6481	<u2L>	<>
6489	6487	<>	<name>
6489	6489	<>	<aphaerese>
6489	6489	<>	<elision3>
6489	6489	<>	<elision2>
6489	6489	<>	<elision1>
6489	6476	<u2K>	<>
6489	6479	<u2L>	<>
6490	6096	<>	<name>
6490	6098	<>	<aphaerese>
6490	6098	<>	<elision3>
6490	6098	<>	<elision2>
6490	6098	<>	<elision1>
6490	6491	<kappa2K>	<>
6490	6492	<kappa2L>	<>
6490	6417	<lambda2L>	<>
6491	6100	.	.
6491	6101	 	 
6491	6100	<~>	<~>
6491	6100	<split-s>	<split-s>
6491	6100	<split-h>	<split-h>
6491	6100	<name2>	<name2>
6491	6235	<>	<name>
6491	6104	<aphaerese>	<aphaerese>
6491	6099	<>	<aphaerese>
6491	6237	<elision3>	<elision3>
6491	6099	<>	<elision3>
6491	6237	<elision2>	<elision2>
6491	6099	<>	<elision2>
6491	6237	<elision1>	<elision1>
6491	6099	<>	<elision1>
6491	6108	.	υ
6491	6111	s	υ
6491	6108	.	u
6491	6111	s	u
6491	163	s	κ
6491	5849	s	k
6491	6108	.	α
6491	6202	s	α
6491	6108	.	a
6491	6202	s	a
6491	163	s	λ
6491	5897	s	l
6492	6266	.	.
6492	6267	 	 
6492	6266	<~>	<~>
6492	6266	<split-s>	<split-s>
6492	6266	<split-h>	<split-h>
6492	6266	<name2>	<name2>
6492	6381	<>	<name>
6492	6270	<aphaerese>	<aphaerese>
6492	6265	<>	<aphaerese>
6492	6383	<elision3>	<elision3>
6492	6265	<>	<elision3>
6492	6383	<elision2>	<elision2>
6492	6265	<>	<elision2>
6492	6383	<elision1>	<elision1>
6492	6265	<>	<elision1>
6492	6274	.	υ
6492	6277	s	υ
6492	6274	.	u
6492	6277	s	u
6492	5908	s	κ
6492	6033	s	k
6492	6274	.	α
6492	6348	s	α
6492	6274	.	a
6492	6348	s	a
6492	5908	s	λ
6492	6064	s	l
6492	6421	<1s>	<>
6493	6424	<>	<name>
6493	6426	<>	<aphaerese>
6493	6426	<>	<elision3>
6493	6426	<>	<elision2>
6493	6426	<>	<elision1>
6493	6494	<k2K>	<>
6493	6495	<k2L>	<>
6493	6417	<l2L>	<>
6494	6100	.	.
6494	6101	 	 
6494	6100	<~>	<~>
6494	6100	<split-s>	<split-s>
6494	6100	<split-h>	<split-h>
6494	6100	<name2>	<name2>
6494	6428	<>	<name>
6494	6104	<aphaerese>	<aphaerese>
6494	6427	<>	<aphaerese>
6494	6100	<elision3>	<elision3>
6494	6427	<>	<elision3>
6494	6100	<elision2>	<elision2>
6494	6427	<>	<elision2>
6494	6100	<elision1>	<elision1>
6494	6427	<>	<elision1>
6494	6108	.	υ
6494	6111	s	υ
6494	6108	.	u
6494	6111	s	u
6494	163	s	κ
6494	5849	s	k
6494	6108	.	α
6494	6202	s	α
6494	6108	.	a
6494	6202	s	a
6494	163	s	λ
6494	5897	s	l
6495	6266	.	.
6495	6267	 	 
6495	6266	<~>	<~>
6495	6266	<split-s>	<split-s>
6495	6266	<split-h>	<split-h>
6495	6266	<name2>	<name2>
6495	6431	<>	<name>
6495	6270	<aphaerese>	<aphaerese>
6495	6430	<>	<aphaerese>
6495	6266	<elision3>	<elision3>
6495	6430	<>	<elision3>
6495	6266	<elision2>	<elision2>
6495	6430	<>	<elision2>
6495	6266	<elision1>	<elision1>
6495	6430	<>	<elision1>
6495	6274	.	υ
6495	6277	s	υ
6495	6274	.	u
6495	6277	s	u
6495	5908	s	κ
6495	6033	s	k
6495	6274	.	α
6495	6348	s	α
6495	6274	.	a
6495	6348	s	a
6495	5908	s	λ
6495	6064	s	l
6495	6434	<1s>	<>
6496	6497	<>	<name>
6496	6499	<>	<aphaerese>
6496	6499	<>	<elision3>
6496	6499	<>	<elision2>
6496	6499	<>	<elision1>
6496	6500	<alpha2L>	<>
6497	6498	<>	<aphaerese>
6497	6498	<>	<elision3>
6497	6498	<>	<elision2>
6497	6498	<>	<elision1>
6497	6480	<alpha2L>	<>
6498	6499	<>	<aphaerese>
6498	6499	<>	<elision3>
6498	6499	<>	<elision2>
6498	6499	<>	<elision1>
6498	6481	<alpha2L>	<>
6499	6497	<>	<name>
6499	6499	<>	<aphaerese>
6499	6499	<>	<elision3>
6499	6499	<>	<elision2>
6499	6499	<>	<elision1>
6499	6479	<alpha2L>	<>
6500	6266	.	.
6500	6267	 	 
6500	6266	<~>	<~>
6500	6266	<split-s>	<split-s>
6500	6266	<split-h>	<split-h>
6500	6266	<name2>	<name2>
6500	6480	<>	<name>
6500	6270	<aphaerese>	<aphaerese>
6500	6479	<>	<aphaerese>
6500	6479	<>	<elision3>
6500	6479	<>	<elision2>
6500	6479	<>	<elision1>
6500	6274	.	υ
6500	6277	s	υ
6500	6274	.	u
6500	6277	s	u
6500	6280	.	κ
6500	6298	s	κ
6500	6033	s	k
6500	6274	.	α
6500	6348	s	α
6500	6274	.	a
6500	6348	s	a
6500	6354	s	λ
6500	6064	s	l
6500	5227	<1s>	<>
6501	6502	<>	<name>
6501	6504	<>	<aphaerese>
6501	6504	<>	<elision3>
6501	6504	<>	<elision2>
6501	6504	<>	<elision1>
6501	6500	<a2L>	<>
6502	6503	<>	<aphaerese>
6502	6503	<>	<elision3>
6502	6503	<>	<elision2>
6502	6503	<>	<elision1>
6502	6480	<a2L>	<>
6503	6504	<>	<aphaerese>
6503	6504	<>	<elision3>
6503	6504	<>	<elision2>
6503	6504	<>	<elision1>
6503	6481	<a2L>	<>
6504	6502	<>	<name>
6504	6504	<>	<aphaerese>
6504	6504	<>	<elision3>
6504	6504	<>	<elision2>
6504	6504	<>	<elision1>
6504	6479	<a2L>	<>
6505	6451	<>	<name>
6505	6450	<>	<aphaerese>
6505	6450	<>	<elision3>
6505	6450	<>	<elision2>
6505	6450	<>	<elision1>
6505	6506	<lambda2L>	<>
6506	6266	.	.
6506	6267	 	 
6506	6266	<~>	<~>
6506	6266	<split-s>	<split-s>
6506	6266	<split-h>	<split-h>
6506	6266	<name2>	<name2>
6506	6455	<>	<name>
6506	6270	<aphaerese>	<aphaerese>
6506	6454	<>	<aphaerese>
6506	6266	<elision3>	<elision3>
6506	6454	<>	<elision3>
6506	6266	<elision2>	<elision2>
6506	6454	<>	<elision2>
6506	6266	<elision1>	<elision1>
6506	6454	<>	<elision1>
6506	6274	.	υ
6506	6277	s	υ
6506	6274	.	u
6506	6277	s	u
6506	6274	.	κ
6506	5908	s	κ
6506	6033	s	k
6506	6274	.	α
6506	6348	s	α
6506	6274	.	a
6506	6348	s	a
6506	6274	.	λ
6506	5908	s	λ
6506	6064	s	l
6506	5419	<1s>	<>
6507	6457	<>	<name>
6507	6456	<>	<aphaerese>
6507	6456	<>	<elision3>
6507	6456	<>	<elision2>
6507	6456	<>	<elision1>
6507	6506	<l2L>	<>
6508	6475	<>	<aphaerese>
6508	6475	<>	<elision3>
6508	6475	<>	<elision2>
6508	6475	<>	<elision1>
6508	6478	<ypsilon2K>	<>
6508	6509	<ypsilon2L>	<>
6509	6266	.	.
6509	6267	 	 
6509	6266	<~>	<~>
6509	6266	<split-s>	<split-s>
6509	6266	<split-h>	<split-h>
6509	6266	<name2>	<name2>
6509	6270	<aphaerese>	<aphaerese>
6509	6479	<>	<aphaerese>
6509	6479	<>	<elision3>
6509	6479	<>	<elision2>
6509	6479	<>	<elision1>
6509	6274	.	υ
6509	6277	s	υ
6509	6274	.	u
6509	6277	s	u
6509	6280	.	κ
6509	6298	s	κ
6509	6033	s	k
6509	6323	s	U
6509	6051	s	K
6509	6274	.	α
6509	6348	s	α
6509	6274	.	a
6509	6348	s	a
6509	6351	s	A
6509	6354	s	λ
6509	6064	s	l
6509	6067	s	L
6509	6510	<1s>	<>
6510	179	.	.
6510	180	 	 
6510	179	<~>	<~>
6510	179	<split-s>	<split-s>
6510	179	<split-h>	<split-h>
6510	179	<name2>	<name2>
6510	183	<aphaerese>	<aphaerese>
6510	5227	<>	<aphaerese>
6510	5227	<>	<elision3>
6510	5227	<>	<elision2>
6510	5227	<>	<elision1>
6510	4828	.	υ
6510	4828	.	u
6510	186	.	κ
6510	4828	.	α
6510	4828	.	a
6510	6511	<K>	<>
6511	4878	.	.
6511	4878	<~>	<~>
6511	4878	<split-s>	<split-s>
6511	4878	<split-h>	<split-h>
6511	4878	<name2>	<name2>
6511	4881	<aphaerese>	<aphaerese>
6511	5231	<>	<aphaerese>
6511	5231	<>	<elision3>
6511	5231	<>	<elision2>
6511	5231	<>	<elision1>
6511	4877	.	υ
6511	4877	.	u
6511	4884	.	κ
6511	4877	.	α
6511	4877	.	a
6512	6489	<>	<aphaerese>
6512	6489	<>	<elision3>
6512	6489	<>	<elision2>
6512	6489	<>	<elision1>
6512	6478	<u2K>	<>
6512	6509	<u2L>	<>
6513	6473	<>	<name>
6513	6475	<>	<aphaerese>
6513	6475	<>	<elision3>
6513	6475	<>	<elision2>
6513	6475	<>	<elision1>
6513	6476	<ypsilon2K>	<>
6513	6514	<ypsilon2L>	<>
6514	6266	.	.
6514	6267	 	 
6514	6266	<~>	<~>
6514	6266	<split-s>	<split-s>
6514	6266	<split-h>	<split-h>
6514	6266	<name2>	<name2>
6514	6480	<>	<name>
6514	6270	<aphaerese>	<aphaerese>
6514	6479	<>	<aphaerese>
6514	6479	<>	<elision3>
6514	6479	<>	<elision2>
6514	6479	<>	<elision1>
6514	6274	.	υ
6514	6277	s	υ
6514	6274	.	u
6514	6277	s	u
6514	6280	.	κ
6514	6298	s	κ
6514	6033	s	k
6514	6323	s	U
6514	6051	s	K
6514	6274	.	α
6514	6348	s	α
6514	6274	.	a
6514	6348	s	a
6514	6351	s	A
6514	6354	s	λ
6514	6064	s	l
6514	6067	s	L
6514	6484	<1s>	<>
6515	6487	<>	<name>
6515	6489	<>	<aphaerese>
6515	6489	<>	<elision3>
6515	6489	<>	<elision2>
6515	6489	<>	<elision1>
6515	6476	<u2K>	<>
6515	6514	<u2L>	<>
6516	6517	<>	<aphaerese>
6516	6521	<elision3>	<elision3>
6516	6517	<>	<elision3>
6516	6521	<elision2>	<elision2>
6516	6517	<>	<elision2>
6516	6521	<elision1>	<elision1>
6516	6517	<>	<elision1>
6517	6518	<>	<aphaerese>
6517	6519	<elision3>	<elision3>
6517	6518	<>	<elision3>
6517	6519	<elision2>	<elision2>
6517	6518	<>	<elision2>
6517	6519	<elision1>	<elision1>
6517	6518	<>	<elision1>
6518	6516	<>	<name>
6518	6518	<>	<aphaerese>
6518	6519	<elision3>	<elision3>
6518	6518	<>	<elision3>
6518	6519	<elision2>	<elision2>
6518	6518	<>	<elision2>
6518	6519	<elision1>	<elision1>
6518	6518	<>	<elision1>
6519	6519	.	.
6519	6519	<~>	<~>
6519	6519	<split-s>	<split-s>
6519	6519	<split-h>	<split-h>
6519	6519	<name2>	<name2>
6519	6520	<>	<name>
6519	6522	<aphaerese>	<aphaerese>
6519	6519	<>	<aphaerese>
6519	6519	<elision3>	<elision3>
6519	6519	<>	<elision3>
6519	6519	<elision2>	<elision2>
6519	6519	<>	<elision2>
6519	6519	<elision1>	<elision1>
6519	6519	<>	<elision1>
6519	6518	.	υ
6519	6661	H	υ
6519	6518	.	u
6519	6670	H	u
6519	6525	.	κ
6519	6576	H	κ
6519	6630	H	k
6519	6639	H	U
6519	6642	H	K
6519	6518	.	α
6519	6673	H	α
6519	6518	.	a
6519	6676	H	a
6519	6610	H	A
6519	6651	H	λ
6519	6657	H	l
6519	6660	H	L
6520	6521	.	.
6520	6521	<~>	<~>
6520	6521	<split-s>	<split-s>
6520	6521	<split-h>	<split-h>
6520	6521	<name2>	<name2>
6520	6524	<aphaerese>	<aphaerese>
6520	6521	<>	<aphaerese>
6520	6521	<elision3>	<elision3>
6520	6521	<>	<elision3>
6520	6521	<elision2>	<elision2>
6520	6521	<>	<elision2>
6520	6521	<elision1>	<elision1>
6520	6521	<>	<elision1>
6520	6517	.	υ
6520	6663	H	υ
6520	6517	.	u
6520	6672	H	u
6520	6527	.	κ
6520	6578	H	κ
6520	6632	H	k
6520	6641	H	U
6520	6645	H	K
6520	6517	.	α
6520	6675	H	α
6520	6517	.	a
6520	6678	H	a
6520	6612	H	A
6520	6653	H	λ
6520	6659	H	l
6520	6654	H	L
6521	6519	.	.
6521	6519	<~>	<~>
6521	6519	<split-s>	<split-s>
6521	6519	<split-h>	<split-h>
6521	6519	<name2>	<name2>
6521	6522	<aphaerese>	<aphaerese>
6521	6519	<>	<aphaerese>
6521	6519	<elision3>	<elision3>
6521	6519	<>	<elision3>
6521	6519	<elision2>	<elision2>
6521	6519	<>	<elision2>
6521	6519	<elision1>	<elision1>
6521	6519	<>	<elision1>
6521	6518	.	υ
6521	6661	H	υ
6521	6518	.	u
6521	6670	H	u
6521	6525	.	κ
6521	6576	H	κ
6521	6630	H	k
6521	6639	H	U
6521	6642	H	K
6521	6518	.	α
6521	6673	H	α
6521	6518	.	a
6521	6676	H	a
6521	6610	H	A
6521	6651	H	λ
6521	6657	H	l
6521	6660	H	L
6522	6519	.	.
6522	6519	<~>	<~>
6522	6519	<split-s>	<split-s>
6522	6519	<split-h>	<split-h>
6522	6519	<name2>	<name2>
6522	6523	<>	<name>
6522	6522	<aphaerese>	<aphaerese>
6522	6522	<>	<aphaerese>
6522	6519	<elision3>	<elision3>
6522	6522	<>	<elision3>
6522	6519	<elision2>	<elision2>
6522	6522	<>	<elision2>
6522	6519	<elision1>	<elision1>
6522	6522	<>	<elision1>
6522	6519	.	υ
6522	6519	.	u
6522	6525	.	κ
6522	6576	H	κ
6522	6630	H	k
6522	6639	H	U
6522	6642	H	K
6522	6519	.	α
6522	6519	.	a
6522	6610	H	A
6522	6651	H	λ
6522	6657	H	l
6522	6660	H	L
6523	6521	.	.
6523	6521	<~>	<~>
6523	6521	<split-s>	<split-s>
6523	6521	<split-h>	<split-h>
6523	6521	<name2>	<name2>
6523	6524	<aphaerese>	<aphaerese>
6523	6524	<>	<aphaerese>
6523	6521	<elision3>	<elision3>
6523	6524	<>	<elision3>
6523	6521	<elision2>	<elision2>
6523	6524	<>	<elision2>
6523	6521	<elision1>	<elision1>
6523	6524	<>	<elision1>
6523	6521	.	υ
6523	6521	.	u
6523	6527	.	κ
6523	6578	H	κ
6523	6632	H	k
6523	6641	H	U
6523	6645	H	K
6523	6521	.	α
6523	6521	.	a
6523	6612	H	A
6523	6653	H	λ
6523	6659	H	l
6523	6654	H	L
6524	6519	.	.
6524	6519	<~>	<~>
6524	6519	<split-s>	<split-s>
6524	6519	<split-h>	<split-h>
6524	6519	<name2>	<name2>
6524	6522	<aphaerese>	<aphaerese>
6524	6522	<>	<aphaerese>
6524	6519	<elision3>	<elision3>
6524	6522	<>	<elision3>
6524	6519	<elision2>	<elision2>
6524	6522	<>	<elision2>
6524	6519	<elision1>	<elision1>
6524	6522	<>	<elision1>
6524	6519	.	υ
6524	6519	.	u
6524	6525	.	κ
6524	6576	H	κ
6524	6630	H	k
6524	6639	H	U
6524	6642	H	K
6524	6519	.	α
6524	6519	.	a
6524	6610	H	A
6524	6651	H	λ
6524	6657	H	l
6524	6660	H	L
6525	6526	<>	<name>
6525	6525	<>	<aphaerese>
6525	6528	<elision3>	<elision3>
6525	6525	<>	<elision3>
6525	6528	<elision2>	<elision2>
6525	6525	<>	<elision2>
6525	6528	<elision1>	<elision1>
6525	6525	<>	<elision1>
6526	6527	<>	<aphaerese>
6526	6530	<elision3>	<elision3>
6526	6527	<>	<elision3>
6526	6530	<elision2>	<elision2>
6526	6527	<>	<elision2>
6526	6530	<elision1>	<elision1>
6526	6527	<>	<elision1>
6527	6525	<>	<aphaerese>
6527	6528	<elision3>	<elision3>
6527	6525	<>	<elision3>
6527	6528	<elision2>	<elision2>
6527	6525	<>	<elision2>
6527	6528	<elision1>	<elision1>
6527	6525	<>	<elision1>
6528	6529	<>	<name>
6528	6528	<>	<aphaerese>
6528	6528	<>	<elision3>
6528	6528	<>	<elision2>
6528	6528	<>	<elision1>
6528	6531	H	κ
6528	6564	H	k
6528	6567	H	K
6528	6570	H	λ
6528	6573	H	l
6528	6556	H	L
6529	6530	<>	<aphaerese>
6529	6530	<>	<elision3>
6529	6530	<>	<elision2>
6529	6530	<>	<elision1>
6529	6533	H	κ
6529	6566	H	k
6529	6569	H	K
6529	6572	H	λ
6529	6575	H	l
6529	6555	H	L
6530	6528	<>	<aphaerese>
6530	6528	<>	<elision3>
6530	6528	<>	<elision2>
6530	6528	<>	<elision1>
6530	6531	H	κ
6530	6564	H	k
6530	6567	H	K
6530	6570	H	λ
6530	6573	H	l
6530	6556	H	L
6531	6532	<>	<name>
6531	6531	<>	<aphaerese>
6531	6531	<>	<elision3>
6531	6531	<>	<elision2>
6531	6531	<>	<elision1>
6531	6535	<kappa2K>	<>
6531	6556	<kappa2L>	<>
6532	6533	<>	<aphaerese>
6532	6533	<>	<elision3>
6532	6533	<>	<elision2>
6532	6533	<>	<elision1>
6532	6536	<kappa2K>	<>
6532	6557	<kappa2L>	<>
6533	6531	<>	<aphaerese>
6533	6531	<>	<elision3>
6533	6531	<>	<elision2>
6533	6531	<>	<elision1>
6533	6534	<kappa2K>	<>
6533	6555	<kappa2L>	<>
6534	6535	<>	<aphaerese>
6534	6535	<>	<elision3>
6534	6535	<>	<elision2>
6534	6535	<>	<elision1>
6534	6538	s	κ
6534	6538	s	k
6534	6547	s	K
6534	6538	s	λ
6534	6538	s	l
6534	6553	s	L
6535	6536	<>	<name>
6535	6535	<>	<aphaerese>
6535	6535	<>	<elision3>
6535	6535	<>	<elision2>
6535	6535	<>	<elision1>
6535	6538	s	κ
6535	6538	s	k
6535	6547	s	K
6535	6538	s	λ
6535	6538	s	l
6535	6553	s	L
6536	6534	<>	<aphaerese>
6536	6534	<>	<elision3>
6536	6534	<>	<elision2>
6536	6534	<>	<elision1>
6536	6537	s	κ
6536	6537	s	k
6536	6546	s	K
6536	6537	s	λ
6536	6537	s	l
6536	6552	s	L
6537	6538	<>	<aphaerese>
6537	6538	<>	<elision3>
6537	6538	<>	<elision2>
6537	6538	<>	<elision1>
6537	6541	H	κ
6537	6541	H	k
6537	6541	H	K
6537	6541	H	λ
6537	6541	H	l
6537	6541	H	L
6537	6544	<2m>	<>
6538	6539	<>	<name>
6538	6538	<>	<aphaerese>
6538	6538	<>	<elision3>
6538	6538	<>	<elision2>
6538	6538	<>	<elision1>
6538	6541	H	κ
6538	6541	H	k
6538	6541	H	K
6538	6541	H	λ
6538	6541	H	l
6538	6541	H	L
6538	6545	<2m>	<>
6539	6537	<>	<aphaerese>
6539	6537	<>	<elision3>
6539	6537	<>	<elision2>
6539	6537	<>	<elision1>
6539	6540	H	κ
6539	6540	H	k
6539	6540	H	K
6539	6540	H	λ
6539	6540	H	l
6539	6540	H	L
6539	6543	<2m>	<>
6540	6541	<>	<aphaerese>
6540	6541	<>	<elision3>
6540	6541	<>	<elision2>
6540	6541	<>	<elision1>
6540	4903	<3k>	<>
6541	6542	<>	<name>
6541	6541	<>	<aphaerese>
6541	6541	<>	<elision3>
6541	6541	<>	<elision2>
6541	6541	<>	<elision1>
6541	4904	<3k>	<>
6542	6540	<>	<aphaerese>
6542	6540	<>	<elision3>
6542	6540	<>	<elision2>
6542	6540	<>	<elision1>
6542	4902	<3k>	<>
6543	6544	<>	<aphaerese>
6543	6544	<>	<elision3>
6543	6544	<>	<elision2>
6543	6544	<>	<elision1>
6543	314	<4h>	<>
6544	6545	<>	<aphaerese>
6544	6545	<>	<elision3>
6544	6545	<>	<elision2>
6544	6545	<>	<elision1>
6544	315	<4h>	<>
6545	6543	<>	<name>
6545	6545	<>	<aphaerese>
6545	6545	<>	<elision3>
6545	6545	<>	<elision2>
6545	6545	<>	<elision1>
6545	313	<4h>	<>
6546	6547	<>	<aphaerese>
6546	6547	<>	<elision3>
6546	6547	<>	<elision2>
6546	6547	<>	<elision1>
6546	6550	<K2kl>	<>
6547	6548	<>	<name>
6547	6547	<>	<aphaerese>
6547	6547	<>	<elision3>
6547	6547	<>	<elision2>
6547	6547	<>	<elision1>
6547	6551	<K2kl>	<>
6548	6546	<>	<aphaerese>
6548	6546	<>	<elision3>
6548	6546	<>	<elision2>
6548	6546	<>	<elision1>
6548	6549	<K2kl>	<>
6549	6550	<>	<aphaerese>
6549	6550	<>	<elision3>
6549	6550	<>	<elision2>
6549	6550	<>	<elision1>
6549	6540	H	κ
6549	6540	H	k
6549	6540	H	K
6549	6540	H	λ
6549	6540	H	l
6549	6540	H	L
6550	6551	<>	<aphaerese>
6550	6551	<>	<elision3>
6550	6551	<>	<elision2>
6550	6551	<>	<elision1>
6550	6541	H	κ
6550	6541	H	k
6550	6541	H	K
6550	6541	H	λ
6550	6541	H	l
6550	6541	H	L
6551	6549	<>	<name>
6551	6551	<>	<aphaerese>
6551	6551	<>	<elision3>
6551	6551	<>	<elision2>
6551	6551	<>	<elision1>
6551	6541	H	κ
6551	6541	H	k
6551	6541	H	K
6551	6541	H	λ
6551	6541	H	l
6551	6541	H	L
6552	6553	<>	<aphaerese>
6552	6553	<>	<elision3>
6552	6553	<>	<elision2>
6552	6553	<>	<elision1>
6552	6550	<L2kl>	<>
6553	6554	<>	<name>
6553	6553	<>	<aphaerese>
6553	6553	<>	<elision3>
6553	6553	<>	<elision2>
6553	6553	<>	<elision1>
6553	6551	<L2kl>	<>
6554	6552	<>	<aphaerese>
6554	6552	<>	<elision3>
6554	6552	<>	<elision2>
6554	6552	<>	<elision1>
6554	6549	<L2kl>	<>
6555	6556	<>	<aphaerese>
6555	6556	<>	<elision3>
6555	6556	<>	<elision2>
6555	6556	<>	<elision1>
6555	6559	s	κ
6555	6562	H	κ
6555	6559	s	k
6555	6562	H	k
6555	6547	s	K
6555	6562	H	K
6555	6559	s	λ
6555	6562	H	λ
6555	6559	s	l
6555	6562	H	l
6555	6553	s	L
6555	6562	H	L
6556	6557	<>	<name>
6556	6556	<>	<aphaerese>
6556	6556	<>	<elision3>
6556	6556	<>	<elision2>
6556	6556	<>	<elision1>
6556	6559	s	κ
6556	6562	H	κ
6556	6559	s	k
6556	6562	H	k
6556	6547	s	K
6556	6562	H	K
6556	6559	s	λ
6556	6562	H	λ
6556	6559	s	l
6556	6562	H	l
6556	6553	s	L
6556	6562	H	L
6557	6555	<>	<aphaerese>
6557	6555	<>	<elision3>
6557	6555	<>	<elision2>
6557	6555	<>	<elision1>
6557	6558	s	κ
6557	6561	H	κ
6557	6558	s	k
6557	6561	H	k
6557	6546	s	K
6557	6561	H	K
6557	6558	s	λ
6557	6561	H	λ
6557	6558	s	l
6557	6561	H	l
6557	6552	s	L
6557	6561	H	L
6558	6559	<>	<aphaerese>
6558	6559	<>	<elision3>
6558	6559	<>	<elision2>
6558	6559	<>	<elision1>
6558	6541	H	κ
6558	6541	H	k
6558	6541	H	K
6558	6541	H	λ
6558	6541	H	l
6558	6541	H	L
6558	6544	<w>	<>
6559	6560	<>	<name>
6559	6559	<>	<aphaerese>
6559	6559	<>	<elision3>
6559	6559	<>	<elision2>
6559	6559	<>	<elision1>
6559	6541	H	κ
6559	6541	H	k
6559	6541	H	K
6559	6541	H	λ
6559	6541	H	l
6559	6541	H	L
6559	6545	<w>	<>
6560	6558	<>	<aphaerese>
6560	6558	<>	<elision3>
6560	6558	<>	<elision2>
6560	6558	<>	<elision1>
6560	6540	H	κ
6560	6540	H	k
6560	6540	H	K
6560	6540	H	λ
6560	6540	H	l
6560	6540	H	L
6560	6543	<w>	<>
6561	6562	<>	<aphaerese>
6561	6562	<>	<elision3>
6561	6562	<>	<elision2>
6561	6562	<>	<elision1>
6561	4903	<2k>	<>
6562	6563	<>	<name>
6562	6562	<>	<aphaerese>
6562	6562	<>	<elision3>
6562	6562	<>	<elision2>
6562	6562	<>	<elision1>
6562	4904	<2k>	<>
6563	6561	<>	<aphaerese>
6563	6561	<>	<elision3>
6563	6561	<>	<elision2>
6563	6561	<>	<elision1>
6563	4902	<2k>	<>
6564	6565	<>	<name>
6564	6564	<>	<aphaerese>
6564	6564	<>	<elision3>
6564	6564	<>	<elision2>
6564	6564	<>	<elision1>
6564	6535	<k2K>	<>
6564	6556	<k2L>	<>
6565	6566	<>	<aphaerese>
6565	6566	<>	<elision3>
6565	6566	<>	<elision2>
6565	6566	<>	<elision1>
6565	6536	<k2K>	<>
6565	6557	<k2L>	<>
6566	6564	<>	<aphaerese>
6566	6564	<>	<elision3>
6566	6564	<>	<elision2>
6566	6564	<>	<elision1>
6566	6534	<k2K>	<>
6566	6555	<k2L>	<>
6567	6568	<>	<name>
6567	6567	<>	<aphaerese>
6567	6567	<>	<elision3>
6567	6567	<>	<elision2>
6567	6567	<>	<elision1>
6567	6538	s	κ
6567	6538	s	k
6567	6547	s	K
6567	6538	s	λ
6567	6538	s	l
6567	6553	s	L
6567	6556	<K2L>	<>
6568	6569	<>	<aphaerese>
6568	6569	<>	<elision3>
6568	6569	<>	<elision2>
6568	6569	<>	<elision1>
6568	6537	s	κ
6568	6537	s	k
6568	6546	s	K
6568	6537	s	λ
6568	6537	s	l
6568	6552	s	L
6568	6557	<K2L>	<>
6569	6567	<>	<aphaerese>
6569	6567	<>	<elision3>
6569	6567	<>	<elision2>
6569	6567	<>	<elision1>
6569	6538	s	κ
6569	6538	s	k
6569	6547	s	K
6569	6538	s	λ
6569	6538	s	l
6569	6553	s	L
6569	6555	<K2L>	<>
6570	6571	<>	<name>
6570	6570	<>	<aphaerese>
6570	6570	<>	<elision3>
6570	6570	<>	<elision2>
6570	6570	<>	<elision1>
6570	6556	<lambda2L>	<>
6571	6572	<>	<aphaerese>
6571	6572	<>	<elision3>
6571	6572	<>	<elision2>
6571	6572	<>	<elision1>
6571	6557	<lambda2L>	<>
6572	6570	<>	<aphaerese>
6572	6570	<>	<elision3>
6572	6570	<>	<elision2>
6572	6570	<>	<elision1>
6572	6555	<lambda2L>	<>
6573	6574	<>	<name>
6573	6573	<>	<aphaerese>
6573	6573	<>	<elision3>
6573	6573	<>	<elision2>
6573	6573	<>	<elision1>
6573	6556	<l2L>	<>
6574	6575	<>	<aphaerese>
6574	6575	<>	<elision3>
6574	6575	<>	<elision2>
6574	6575	<>	<elision1>
6574	6557	<l2L>	<>
6575	6573	<>	<aphaerese>
6575	6573	<>	<elision3>
6575	6573	<>	<elision2>
6575	6573	<>	<elision1>
6575	6555	<l2L>	<>
6576	6577	<>	<name>
6576	6576	<>	<aphaerese>
6576	6576	<>	<elision3>
6576	6576	<>	<elision2>
6576	6576	<>	<elision1>
6576	6601	<kappa2K>	<>
6576	6619	<kappa2L>	<>
6576	6628	<lambda2L>	<>
6577	6578	<>	<aphaerese>
6577	6578	<>	<elision3>
6577	6578	<>	<elision2>
6577	6578	<>	<elision1>
6577	6602	<kappa2K>	<>
6577	6620	<kappa2L>	<>
6577	6629	<lambda2L>	<>
6578	6576	<>	<aphaerese>
6578	6576	<>	<elision3>
6578	6576	<>	<elision2>
6578	6576	<>	<elision1>
6578	6579	<kappa2K>	<>
6578	6609	<kappa2L>	<>
6578	6627	<lambda2L>	<>
6579	6580	.	.
6579	6580	<~>	<~>
6579	6580	<split-s>	<split-s>
6579	6580	<split-h>	<split-h>
6579	6580	<name2>	<name2>
6579	6583	<aphaerese>	<aphaerese>
6579	6601	<>	<aphaerese>
6579	6604	<elision3>	<elision3>
6579	6601	<>	<elision3>
6579	6604	<elision2>	<elision2>
6579	6601	<>	<elision2>
6579	6604	<elision1>	<elision1>
6579	6601	<>	<elision1>
6579	6598	.	υ
6579	6551	s	υ
6579	6598	.	u
6579	6551	s	u
6579	6538	s	κ
6579	6538	s	k
6579	6592	s	U
6579	6547	s	K
6579	6598	.	α
6579	6551	s	α
6579	6598	.	a
6579	6551	s	a
6579	6595	s	A
6579	6538	s	λ
6579	6538	s	l
6579	6553	s	L
6579	6544	<1m>	<>
6580	6580	.	.
6580	6580	<~>	<~>
6580	6580	<split-s>	<split-s>
6580	6580	<split-h>	<split-h>
6580	6580	<name2>	<name2>
6580	6581	<>	<name>
6580	6583	<aphaerese>	<aphaerese>
6580	6580	<>	<aphaerese>
6580	6580	<elision3>	<elision3>
6580	6580	<>	<elision3>
6580	6580	<elision2>	<elision2>
6580	6580	<>	<elision2>
6580	6580	<elision1>	<elision1>
6580	6580	<>	<elision1>
6580	6598	.	υ
6580	6551	s	υ
6580	6598	.	u
6580	6551	s	u
6580	6586	.	κ
6580	6538	s	κ
6580	6538	s	k
6580	6592	s	U
6580	6547	s	K
6580	6598	.	α
6580	6551	s	α
6580	6598	.	a
6580	6551	s	a
6580	6595	s	A
6580	6538	s	λ
6580	6538	s	l
6580	6553	s	L
6580	6545	<1m>	<>
6581	6582	.	.
6581	6582	<~>	<~>
6581	6582	<split-s>	<split-s>
6581	6582	<split-h>	<split-h>
6581	6582	<name2>	<name2>
6581	6585	<aphaerese>	<aphaerese>
6581	6582	<>	<aphaerese>
6581	6582	<elision3>	<elision3>
6581	6582	<>	<elision3>
6581	6582	<elision2>	<elision2>
6581	6582	<>	<elision2>
6581	6582	<elision1>	<elision1>
6581	6582	<>	<elision1>
6581	6600	.	υ
6581	6550	s	υ
6581	6600	.	u
6581	6550	s	u
6581	6588	.	κ
6581	6537	s	κ
6581	6537	s	k
6581	6594	s	U
6581	6546	s	K
6581	6600	.	α
6581	6550	s	α
6581	6600	.	a
6581	6550	s	a
6581	6597	s	A
6581	6537	s	λ
6581	6537	s	l
6581	6552	s	L
6581	6543	<1m>	<>
6582	6580	.	.
6582	6580	<~>	<~>
6582	6580	<split-s>	<split-s>
6582	6580	<split-h>	<split-h>
6582	6580	<name2>	<name2>
6582	6583	<aphaerese>	<aphaerese>
6582	6580	<>	<aphaerese>
6582	6580	<elision3>	<elision3>
6582	6580	<>	<elision3>
6582	6580	<elision2>	<elision2>
6582	6580	<>	<elision2>
6582	6580	<elision1>	<elision1>
6582	6580	<>	<elision1>
6582	6598	.	υ
6582	6551	s	υ
6582	6598	.	u
6582	6551	s	u
6582	6586	.	κ
6582	6538	s	κ
6582	6538	s	k
6582	6592	s	U
6582	6547	s	K
6582	6598	.	α
6582	6551	s	α
6582	6598	.	a
6582	6551	s	a
6582	6595	s	A
6582	6538	s	λ
6582	6538	s	l
6582	6553	s	L
6582	6544	<1m>	<>
6583	6580	.	.
6583	6580	<~>	<~>
6583	6580	<split-s>	<split-s>
6583	6580	<split-h>	<split-h>
6583	6580	<name2>	<name2>
6583	6584	<>	<name>
6583	6583	<aphaerese>	<aphaerese>
6583	6583	<>	<aphaerese>
6583	6580	<elision3>	<elision3>
6583	6583	<>	<elision3>
6583	6580	<elision2>	<elision2>
6583	6583	<>	<elision2>
6583	6580	<elision1>	<elision1>
6583	6583	<>	<elision1>
6583	6580	.	υ
6583	6580	.	u
6583	6586	.	κ
6583	6538	s	κ
6583	6538	s	k
6583	6592	s	U
6583	6547	s	K
6583	6580	.	α
6583	6580	.	a
6583	6595	s	A
6583	6538	s	λ
6583	6538	s	l
6583	6553	s	L
6583	6545	<1m>	<>
6584	6582	.	.
6584	6582	<~>	<~>
6584	6582	<split-s>	<split-s>
6584	6582	<split-h>	<split-h>
6584	6582	<name2>	<name2>
6584	6585	<aphaerese>	<aphaerese>
6584	6585	<>	<aphaerese>
6584	6582	<elision3>	<elision3>
6584	6585	<>	<elision3>
6584	6582	<elision2>	<elision2>
6584	6585	<>	<elision2>
6584	6582	<elision1>	<elision1>
6584	6585	<>	<elision1>
6584	6582	.	υ
6584	6582	.	u
6584	6588	.	κ
6584	6537	s	κ
6584	6537	s	k
6584	6594	s	U
6584	6546	s	K
6584	6582	.	α
6584	6582	.	a
6584	6597	s	A
6584	6537	s	λ
6584	6537	s	l
6584	6552	s	L
6584	6543	<1m>	<>
6585	6580	.	.
6585	6580	<~>	<~>
6585	6580	<split-s>	<split-s>
6585	6580	<split-h>	<split-h>
6585	6580	<name2>	<name2>
6585	6583	<aphaerese>	<aphaerese>
6585	6583	<>	<aphaerese>
6585	6580	<elision3>	<elision3>
6585	6583	<>	<elision3>
6585	6580	<elision2>	<elision2>
6585	6583	<>	<elision2>
6585	6580	<elision1>	<elision1>
6585	6583	<>	<elision1>
6585	6580	.	υ
6585	6580	.	u
6585	6586	.	κ
6585	6538	s	κ
6585	6538	s	k
6585	6592	s	U
6585	6547	s	K
6585	6580	.	α
6585	6580	.	a
6585	6595	s	A
6585	6538	s	λ
6585	6538	s	l
6585	6553	s	L
6585	6544	<1m>	<>
6586	6587	<>	<name>
6586	6586	<>	<aphaerese>
6586	6589	<elision3>	<elision3>
6586	6586	<>	<elision3>
6586	6589	<elision2>	<elision2>
6586	6586	<>	<elision2>
6586	6589	<elision1>	<elision1>
6586	6586	<>	<elision1>
6587	6588	<>	<aphaerese>
6587	6591	<elision3>	<elision3>
6587	6588	<>	<elision3>
6587	6591	<elision2>	<elision2>
6587	6588	<>	<elision2>
6587	6591	<elision1>	<elision1>
6587	6588	<>	<elision1>
6588	6586	<>	<aphaerese>
6588	6589	<elision3>	<elision3>
6588	6586	<>	<elision3>
6588	6589	<elision2>	<elision2>
6588	6586	<>	<elision2>
6588	6589	<elision1>	<elision1>
6588	6586	<>	<elision1>
6589	6590	<>	<name>
6589	6589	<>	<aphaerese>
6589	6589	<>	<elision3>
6589	6589	<>	<elision2>
6589	6589	<>	<elision1>
6589	6551	s	κ
6589	6551	s	k
6589	6547	s	K
6589	6551	s	λ
6589	6551	s	l
6589	6553	s	L
6590	6591	<>	<aphaerese>
6590	6591	<>	<elision3>
6590	6591	<>	<elision2>
6590	6591	<>	<elision1>
6590	6550	s	κ
6590	6550	s	k
6590	6546	s	K
6590	6550	s	λ
6590	6550	s	l
6590	6552	s	L
6591	6589	<>	<aphaerese>
6591	6589	<>	<elision3>
6591	6589	<>	<elision2>
6591	6589	<>	<elision1>
6591	6551	s	κ
6591	6551	s	k
6591	6547	s	K
6591	6551	s	λ
6591	6551	s	l
6591	6553	s	L
6592	6593	<>	<name>
6592	6592	<>	<aphaerese>
6592	6592	<>	<elision3>
6592	6592	<>	<elision2>
6592	6592	<>	<elision1>
6592	6551	<U2kl>	<>
6593	6594	<>	<aphaerese>
6593	6594	<>	<elision3>
6593	6594	<>	<elision2>
6593	6594	<>	<elision1>
6593	6549	<U2kl>	<>
6594	6592	<>	<aphaerese>
6594	6592	<>	<elision3>
6594	6592	<>	<elision2>
6594	6592	<>	<elision1>
6594	6550	<U2kl>	<>
6595	6596	<>	<name>
6595	6595	<>	<aphaerese>
6595	6595	<>	<elision3>
6595	6595	<>	<elision2>
6595	6595	<>	<elision1>
6595	6551	<A2kl>	<>
6596	6597	<>	<aphaerese>
6596	6597	<>	<elision3>
6596	6597	<>	<elision2>
6596	6597	<>	<elision1>
6596	6549	<A2kl>	<>
6597	6595	<>	<aphaerese>
6597	6595	<>	<elision3>
6597	6595	<>	<elision2>
6597	6595	<>	<elision1>
6597	6550	<A2kl>	<>
6598	6599	<>	<name>
6598	6598	<>	<aphaerese>
6598	6580	<elision3>	<elision3>
6598	6598	<>	<elision3>
6598	6580	<elision2>	<elision2>
6598	6598	<>	<elision2>
6598	6580	<elision1>	<elision1>
6598	6598	<>	<elision1>
6599	6600	<>	<aphaerese>
6599	6582	<elision3>	<elision3>
6599	6600	<>	<elision3>
6599	6582	<elision2>	<elision2>
6599	6600	<>	<elision2>
6599	6582	<elision1>	<elision1>
6599	6600	<>	<elision1>
6600	6598	<>	<aphaerese>
6600	6580	<elision3>	<elision3>
6600	6598	<>	<elision3>
6600	6580	<elision2>	<elision2>
6600	6598	<>	<elision2>
6600	6580	<elision1>	<elision1>
6600	6598	<>	<elision1>
6601	6580	.	.
6601	6580	<~>	<~>
6601	6580	<split-s>	<split-s>
6601	6580	<split-h>	<split-h>
6601	6580	<name2>	<name2>
6601	6602	<>	<name>
6601	6583	<aphaerese>	<aphaerese>
6601	6601	<>	<aphaerese>
6601	6604	<elision3>	<elision3>
6601	6601	<>	<elision3>
6601	6604	<elision2>	<elision2>
6601	6601	<>	<elision2>
6601	6604	<elision1>	<elision1>
6601	6601	<>	<elision1>
6601	6598	.	υ
6601	6551	s	υ
6601	6598	.	u
6601	6551	s	u
6601	6538	s	κ
6601	6538	s	k
6601	6592	s	U
6601	6547	s	K
6601	6598	.	α
6601	6551	s	α
6601	6598	.	a
6601	6551	s	a
6601	6595	s	A
6601	6538	s	λ
6601	6538	s	l
6601	6553	s	L
6601	6545	<1m>	<>
6602	6582	.	.
6602	6582	<~>	<~>
6602	6582	<split-s>	<split-s>
6602	6582	<split-h>	<split-h>
6602	6582	<name2>	<name2>
6602	6585	<aphaerese>	<aphaerese>
6602	6579	<>	<aphaerese>
6602	6603	<elision3>	<elision3>
6602	6579	<>	<elision3>
6602	6603	<elision2>	<elision2>
6602	6579	<>	<elision2>
6602	6603	<elision1>	<elision1>
6602	6579	<>	<elision1>
6602	6600	.	υ
6602	6550	s	υ
6602	6600	.	u
6602	6550	s	u
6602	6537	s	κ
6602	6537	s	k
6602	6594	s	U
6602	6546	s	K
6602	6600	.	α
6602	6550	s	α
6602	6600	.	a
6602	6550	s	a
6602	6597	s	A
6602	6537	s	λ
6602	6537	s	l
6602	6552	s	L
6602	6543	<1m>	<>
6603	6580	.	.
6603	6580	<~>	<~>
6603	6580	<split-s>	<split-s>
6603	6580	<split-h>	<split-h>
6603	6580	<name2>	<name2>
6603	6583	<aphaerese>	<aphaerese>
6603	6604	<>	<aphaerese>
6603	6580	<elision3>	<elision3>
6603	6604	<>	<elision3>
6603	6580	<elision2>	<elision2>
6603	6604	<>	<elision2>
6603	6580	<elision1>	<elision1>
6603	6604	<>	<elision1>
6603	6598	.	υ
6603	6551	s	υ
6603	6598	.	u
6603	6551	s	u
6603	6586	.	κ
6603	6607	s	κ
6603	6607	s	k
6603	6592	s	U
6603	6598	.	α
6603	6551	s	α
6603	6598	.	a
6603	6551	s	a
6603	6595	s	A
6603	6607	s	λ
6603	6607	s	l
6603	6544	<1m>	<>
6604	6580	.	.
6604	6580	<~>	<~>
6604	6580	<split-s>	<split-s>
6604	6580	<split-h>	<split-h>
6604	6580	<name2>	<name2>
6604	6605	<>	<name>
6604	6583	<aphaerese>	<aphaerese>
6604	6604	<>	<aphaerese>
6604	6580	<elision3>	<elision3>
6604	6604	<>	<elision3>
6604	6580	<elision2>	<elision2>
6604	6604	<>	<elision2>
6604	6580	<elision1>	<elision1>
6604	6604	<>	<elision1>
6604	6598	.	υ
6604	6551	s	υ
6604	6598	.	u
6604	6551	s	u
6604	6586	.	κ
6604	6607	s	κ
6604	6607	s	k
6604	6592	s	U
6604	6598	.	α
6604	6551	s	α
6604	6598	.	a
6604	6551	s	a
6604	6595	s	A
6604	6607	s	λ
6604	6607	s	l
6604	6545	<1m>	<>
6605	6582	.	.
6605	6582	<~>	<~>
6605	6582	<split-s>	<split-s>
6605	6582	<split-h>	<split-h>
6605	6582	<name2>	<name2>
6605	6585	<aphaerese>	<aphaerese>
6605	6603	<>	<aphaerese>
6605	6582	<elision3>	<elision3>
6605	6603	<>	<elision3>
6605	6582	<elision2>	<elision2>
6605	6603	<>	<elision2>
6605	6582	<elision1>	<elision1>
6605	6603	<>	<elision1>
6605	6600	.	υ
6605	6550	s	υ
6605	6600	.	u
6605	6550	s	u
6605	6588	.	κ
6605	6606	s	κ
6605	6606	s	k
6605	6594	s	U
6605	6600	.	α
6605	6550	s	α
6605	6600	.	a
6605	6550	s	a
6605	6597	s	A
6605	6606	s	λ
6605	6606	s	l
6605	6543	<1m>	<>
6606	6607	<>	<aphaerese>
6606	6607	<>	<elision3>
6606	6607	<>	<elision2>
6606	6607	<>	<elision1>
6606	6544	<2m>	<>
6607	6608	<>	<name>
6607	6607	<>	<aphaerese>
6607	6607	<>	<elision3>
6607	6607	<>	<elision2>
6607	6607	<>	<elision1>
6607	6545	<2m>	<>
6608	6606	<>	<aphaerese>
6608	6606	<>	<elision3>
6608	6606	<>	<elision2>
6608	6606	<>	<elision1>
6608	6543	<2m>	<>
6609	6610	.	.
6609	6610	<~>	<~>
6609	6610	<split-s>	<split-s>
6609	6610	<split-h>	<split-h>
6609	6610	<name2>	<name2>
6609	6613	<aphaerese>	<aphaerese>
6609	6619	<>	<aphaerese>
6609	6622	<elision3>	<elision3>
6609	6619	<>	<elision3>
6609	6622	<elision2>	<elision2>
6609	6619	<>	<elision2>
6609	6622	<elision1>	<elision1>
6609	6619	<>	<elision1>
6609	6616	.	υ
6609	6551	s	υ
6609	6616	.	u
6609	6551	s	u
6609	6559	s	κ
6609	6562	H	κ
6609	6559	s	k
6609	6562	H	k
6609	6592	s	U
6609	6547	s	K
6609	6562	H	K
6609	6616	.	α
6609	6551	s	α
6609	6616	.	a
6609	6551	s	a
6609	6595	s	A
6609	6559	s	λ
6609	6562	H	λ
6609	6559	s	l
6609	6562	H	l
6609	6553	s	L
6609	6562	H	L
6609	6544	<1m>	<>
6610	6610	.	.
6610	6610	<~>	<~>
6610	6610	<split-s>	<split-s>
6610	6610	<split-h>	<split-h>
6610	6610	<name2>	<name2>
6610	6611	<>	<name>
6610	6613	<aphaerese>	<aphaerese>
6610	6610	<>	<aphaerese>
6610	6610	<elision3>	<elision3>
6610	6610	<>	<elision3>
6610	6610	<elision2>	<elision2>
6610	6610	<>	<elision2>
6610	6610	<elision1>	<elision1>
6610	6610	<>	<elision1>
6610	6616	.	υ
6610	6551	s	υ
6610	6616	.	u
6610	6551	s	u
6610	6586	.	κ
6610	6559	s	κ
6610	6562	H	κ
6610	6559	s	k
6610	6562	H	k
6610	6592	s	U
6610	6547	s	K
6610	6562	H	K
6610	6616	.	α
6610	6551	s	α
6610	6616	.	a
6610	6551	s	a
6610	6595	s	A
6610	6559	s	λ
6610	6562	H	λ
6610	6559	s	l
6610	6562	H	l
6610	6553	s	L
6610	6562	H	L
6610	6545	<1m>	<>
6611	6612	.	.
6611	6612	<~>	<~>
6611	6612	<split-s>	<split-s>
6611	6612	<split-h>	<split-h>
6611	6612	<name2>	<name2>
6611	6615	<aphaerese>	<aphaerese>
6611	6612	<>	<aphaerese>
6611	6612	<elision3>	<elision3>
6611	6612	<>	<elision3>
6611	6612	<elision2>	<elision2>
6611	6612	<>	<elision2>
6611	6612	<elision1>	<elision1>
6611	6612	<>	<elision1>
6611	6618	.	υ
6611	6550	s	υ
6611	6618	.	u
6611	6550	s	u
6611	6588	.	κ
6611	6558	s	κ
6611	6561	H	κ
6611	6558	s	k
6611	6561	H	k
6611	6594	s	U
6611	6546	s	K
6611	6561	H	K
6611	6618	.	α
6611	6550	s	α
6611	6618	.	a
6611	6550	s	a
6611	6597	s	A
6611	6558	s	λ
6611	6561	H	λ
6611	6558	s	l
6611	6561	H	l
6611	6552	s	L
6611	6561	H	L
6611	6543	<1m>	<>
6612	6610	.	.
6612	6610	<~>	<~>
6612	6610	<split-s>	<split-s>
6612	6610	<split-h>	<split-h>
6612	6610	<name2>	<name2>
6612	6613	<aphaerese>	<aphaerese>
6612	6610	<>	<aphaerese>
6612	6610	<elision3>	<elision3>
6612	6610	<>	<elision3>
6612	6610	<elision2>	<elision2>
6612	6610	<>	<elision2>
6612	6610	<elision1>	<elision1>
6612	6610	<>	<elision1>
6612	6616	.	υ
6612	6551	s	υ
6612	6616	.	u
6612	6551	s	u
6612	6586	.	κ
6612	6559	s	κ
6612	6562	H	κ
6612	6559	s	k
6612	6562	H	k
6612	6592	s	U
6612	6547	s	K
6612	6562	H	K
6612	6616	.	α
6612	6551	s	α
6612	6616	.	a
6612	6551	s	a
6612	6595	s	A
6612	6559	s	λ
6612	6562	H	λ
6612	6559	s	l
6612	6562	H	l
6612	6553	s	L
6612	6562	H	L
6612	6544	<1m>	<>
6613	6610	.	.
6613	6610	<~>	<~>
6613	6610	<split-s>	<split-s>
6613	6610	<split-h>	<split-h>
6613	6610	<name2>	<name2>
6613	6614	<>	<name>
6613	6613	<aphaerese>	<aphaerese>
6613	6613	<>	<aphaerese>
6613	6610	<elision3>	<elision3>
6613	6613	<>	<elision3>
6613	6610	<elision2>	<elision2>
6613	6613	<>	<elision2>
6613	6610	<elision1>	<elision1>
6613	6613	<>	<elision1>
6613	6610	.	υ
6613	6610	.	u
6613	6586	.	κ
6613	6559	s	κ
6613	6562	H	κ
6613	6559	s	k
6613	6562	H	k
6613	6592	s	U
6613	6547	s	K
6613	6562	H	K
6613	6610	.	α
6613	6610	.	a
6613	6595	s	A
6613	6559	s	λ
6613	6562	H	λ
6613	6559	s	l
6613	6562	H	l
6613	6553	s	L
6613	6562	H	L
6613	6545	<1m>	<>
6614	6612	.	.
6614	6612	<~>	<~>
6614	6612	<split-s>	<split-s>
6614	6612	<split-h>	<split-h>
6614	6612	<name2>	<name2>
6614	6615	<aphaerese>	<aphaerese>
6614	6615	<>	<aphaerese>
6614	6612	<elision3>	<elision3>
6614	6615	<>	<elision3>
6614	6612	<elision2>	<elision2>
6614	6615	<>	<elision2>
6614	6612	<elision1>	<elision1>
6614	6615	<>	<elision1>
6614	6612	.	υ
6614	6612	.	u
6614	6588	.	κ
6614	6558	s	κ
6614	6561	H	κ
6614	6558	s	k
6614	6561	H	k
6614	6594	s	U
6614	6546	s	K
6614	6561	H	K
6614	6612	.	α
6614	6612	.	a
6614	6597	s	A
6614	6558	s	λ
6614	6561	H	λ
6614	6558	s	l
6614	6561	H	l
6614	6552	s	L
6614	6561	H	L
6614	6543	<1m>	<>
6615	6610	.	.
6615	6610	<~>	<~>
6615	6610	<split-s>	<split-s>
6615	6610	<split-h>	<split-h>
6615	6610	<name2>	<name2>
6615	6613	<aphaerese>	<aphaerese>
6615	6613	<>	<aphaerese>
6615	6610	<elision3>	<elision3>
6615	6613	<>	<elision3>
6615	6610	<elision2>	<elision2>
6615	6613	<>	<elision2>
6615	6610	<elision1>	<elision1>
6615	6613	<>	<elision1>
6615	6610	.	υ
6615	6610	.	u
6615	6586	.	κ
6615	6559	s	κ
6615	6562	H	κ
6615	6559	s	k
6615	6562	H	k
6615	6592	s	U
6615	6547	s	K
6615	6562	H	K
6615	6610	.	α
6615	6610	.	a
6615	6595	s	A
6615	6559	s	λ
6615	6562	H	λ
6615	6559	s	l
6615	6562	H	l
6615	6553	s	L
6615	6562	H	L
6615	6544	<1m>	<>
6616	6617	<>	<name>
6616	6616	<>	<aphaerese>
6616	6610	<elision3>	<elision3>
6616	6616	<>	<elision3>
6616	6610	<elision2>	<elision2>
6616	6616	<>	<elision2>
6616	6610	<elision1>	<elision1>
6616	6616	<>	<elision1>
6617	6618	<>	<aphaerese>
6617	6612	<elision3>	<elision3>
6617	6618	<>	<elision3>
6617	6612	<elision2>	<elision2>
6617	6618	<>	<elision2>
6617	6612	<elision1>	<elision1>
6617	6618	<>	<elision1>
6618	6616	<>	<aphaerese>
6618	6610	<elision3>	<elision3>
6618	6616	<>	<elision3>
6618	6610	<elision2>	<elision2>
6618	6616	<>	<elision2>
6618	6610	<elision1>	<elision1>
6618	6616	<>	<elision1>
6619	6610	.	.
6619	6610	<~>	<~>
6619	6610	<split-s>	<split-s>
6619	6610	<split-h>	<split-h>
6619	6610	<name2>	<name2>
6619	6620	<>	<name>
6619	6613	<aphaerese>	<aphaerese>
6619	6619	<>	<aphaerese>
6619	6622	<elision3>	<elision3>
6619	6619	<>	<elision3>
6619	6622	<elision2>	<elision2>
6619	6619	<>	<elision2>
6619	6622	<elision1>	<elision1>
6619	6619	<>	<elision1>
6619	6616	.	υ
6619	6551	s	υ
6619	6616	.	u
6619	6551	s	u
6619	6559	s	κ
6619	6562	H	κ
6619	6559	s	k
6619	6562	H	k
6619	6592	s	U
6619	6547	s	K
6619	6562	H	K
6619	6616	.	α
6619	6551	s	α
6619	6616	.	a
6619	6551	s	a
6619	6595	s	A
6619	6559	s	λ
6619	6562	H	λ
6619	6559	s	l
6619	6562	H	l
6619	6553	s	L
6619	6562	H	L
6619	6545	<1m>	<>
6620	6612	.	.
6620	6612	<~>	<~>
6620	6612	<split-s>	<split-s>
6620	6612	<split-h>	<split-h>
6620	6612	<name2>	<name2>
6620	6615	<aphaerese>	<aphaerese>
6620	6609	<>	<aphaerese>
6620	6621	<elision3>	<elision3>
6620	6609	<>	<elision3>
6620	6621	<elision2>	<elision2>
6620	6609	<>	<elision2>
6620	6621	<elision1>	<elision1>
6620	6609	<>	<elision1>
6620	6618	.	υ
6620	6550	s	υ
6620	6618	.	u
6620	6550	s	u
6620	6558	s	κ
6620	6561	H	κ
6620	6558	s	k
6620	6561	H	k
6620	6594	s	U
6620	6546	s	K
6620	6561	H	K
6620	6618	.	α
6620	6550	s	α
6620	6618	.	a
6620	6550	s	a
6620	6597	s	A
6620	6558	s	λ
6620	6561	H	λ
6620	6558	s	l
6620	6561	H	l
6620	6552	s	L
6620	6561	H	L
6620	6543	<1m>	<>
6621	6610	.	.
6621	6610	<~>	<~>
6621	6610	<split-s>	<split-s>
6621	6610	<split-h>	<split-h>
6621	6610	<name2>	<name2>
6621	6613	<aphaerese>	<aphaerese>
6621	6622	<>	<aphaerese>
6621	6610	<elision3>	<elision3>
6621	6622	<>	<elision3>
6621	6610	<elision2>	<elision2>
6621	6622	<>	<elision2>
6621	6610	<elision1>	<elision1>
6621	6622	<>	<elision1>
6621	6616	.	υ
6621	6551	s	υ
6621	6616	.	u
6621	6551	s	u
6621	6586	.	κ
6621	6625	s	κ
6621	6562	H	κ
6621	6625	s	k
6621	6562	H	k
6621	6592	s	U
6621	6562	H	K
6621	6616	.	α
6621	6551	s	α
6621	6616	.	a
6621	6551	s	a
6621	6595	s	A
6621	6625	s	λ
6621	6562	H	λ
6621	6625	s	l
6621	6562	H	l
6621	6562	H	L
6621	6544	<1m>	<>
6622	6610	.	.
6622	6610	<~>	<~>
6622	6610	<split-s>	<split-s>
6622	6610	<split-h>	<split-h>
6622	6610	<name2>	<name2>
6622	6623	<>	<name>
6622	6613	<aphaerese>	<aphaerese>
6622	6622	<>	<aphaerese>
6622	6610	<elision3>	<elision3>
6622	6622	<>	<elision3>
6622	6610	<elision2>	<elision2>
6622	6622	<>	<elision2>
6622	6610	<elision1>	<elision1>
6622	6622	<>	<elision1>
6622	6616	.	υ
6622	6551	s	υ
6622	6616	.	u
6622	6551	s	u
6622	6586	.	κ
6622	6625	s	κ
6622	6562	H	κ
6622	6625	s	k
6622	6562	H	k
6622	6592	s	U
6622	6562	H	K
6622	6616	.	α
6622	6551	s	α
6622	6616	.	a
6622	6551	s	a
6622	6595	s	A
6622	6625	s	λ
6622	6562	H	λ
6622	6625	s	l
6622	6562	H	l
6622	6562	H	L
6622	6545	<1m>	<>
6623	6612	.	.
6623	6612	<~>	<~>
6623	6612	<split-s>	<split-s>
6623	6612	<split-h>	<split-h>
6623	6612	<name2>	<name2>
6623	6615	<aphaerese>	<aphaerese>
6623	6621	<>	<aphaerese>
6623	6612	<elision3>	<elision3>
6623	6621	<>	<elision3>
6623	6612	<elision2>	<elision2>
6623	6621	<>	<elision2>
6623	6612	<elision1>	<elision1>
6623	6621	<>	<elision1>
6623	6618	.	υ
6623	6550	s	υ
6623	6618	.	u
6623	6550	s	u
6623	6588	.	κ
6623	6624	s	κ
6623	6561	H	κ
6623	6624	s	k
6623	6561	H	k
6623	6594	s	U
6623	6561	H	K
6623	6618	.	α
6623	6550	s	α
6623	6618	.	a
6623	6550	s	a
6623	6597	s	A
6623	6624	s	λ
6623	6561	H	λ
6623	6624	s	l
6623	6561	H	l
6623	6561	H	L
6623	6543	<1m>	<>
6624	6625	<>	<aphaerese>
6624	6625	<>	<elision3>
6624	6625	<>	<elision2>
6624	6625	<>	<elision1>
6624	6544	<w>	<>
6625	6626	<>	<name>
6625	6625	<>	<aphaerese>
6625	6625	<>	<elision3>
6625	6625	<>	<elision2>
6625	6625	<>	<elision1>
6625	6545	<w>	<>
6626	6624	<>	<aphaerese>
6626	6624	<>	<elision3>
6626	6624	<>	<elision2>
6626	6624	<>	<elision1>
6626	6543	<w>	<>
6627	6628	<>	<aphaerese>
6627	6628	<>	<elision3>
6627	6628	<>	<elision2>
6627	6628	<>	<elision1>
6627	6616	.	κ
6627	6616	.	λ
6628	6629	<>	<name>
6628	6628	<>	<aphaerese>
6628	6628	<>	<elision3>
6628	6628	<>	<elision2>
6628	6628	<>	<elision1>
6628	6616	.	κ
6628	6616	.	λ
6629	6627	<>	<aphaerese>
6629	6627	<>	<elision3>
6629	6627	<>	<elision2>
6629	6627	<>	<elision1>
6629	6618	.	κ
6629	6618	.	λ
6630	6631	<>	<name>
6630	6630	<>	<aphaerese>
6630	6630	<>	<elision3>
6630	6630	<>	<elision2>
6630	6630	<>	<elision1>
6630	6634	<k2K>	<>
6630	6637	<k2L>	<>
6630	6628	<l2L>	<>
6631	6632	<>	<aphaerese>
6631	6632	<>	<elision3>
6631	6632	<>	<elision2>
6631	6632	<>	<elision1>
6631	6635	<k2K>	<>
6631	6638	<k2L>	<>
6631	6629	<l2L>	<>
6632	6630	<>	<aphaerese>
6632	6630	<>	<elision3>
6632	6630	<>	<elision2>
6632	6630	<>	<elision1>
6632	6633	<k2K>	<>
6632	6636	<k2L>	<>
6632	6627	<l2L>	<>
6633	6580	.	.
6633	6580	<~>	<~>
6633	6580	<split-s>	<split-s>
6633	6580	<split-h>	<split-h>
6633	6580	<name2>	<name2>
6633	6583	<aphaerese>	<aphaerese>
6633	6634	<>	<aphaerese>
6633	6580	<elision3>	<elision3>
6633	6634	<>	<elision3>
6633	6580	<elision2>	<elision2>
6633	6634	<>	<elision2>
6633	6580	<elision1>	<elision1>
6633	6634	<>	<elision1>
6633	6598	.	υ
6633	6551	s	υ
6633	6598	.	u
6633	6551	s	u
6633	6538	s	κ
6633	6538	s	k
6633	6592	s	U
6633	6547	s	K
6633	6598	.	α
6633	6551	s	α
6633	6598	.	a
6633	6551	s	a
6633	6595	s	A
6633	6538	s	λ
6633	6538	s	l
6633	6553	s	L
6633	6544	<1m>	<>
6634	6580	.	.
6634	6580	<~>	<~>
6634	6580	<split-s>	<split-s>
6634	6580	<split-h>	<split-h>
6634	6580	<name2>	<name2>
6634	6635	<>	<name>
6634	6583	<aphaerese>	<aphaerese>
6634	6634	<>	<aphaerese>
6634	6580	<elision3>	<elision3>
6634	6634	<>	<elision3>
6634	6580	<elision2>	<elision2>
6634	6634	<>	<elision2>
6634	6580	<elision1>	<elision1>
6634	6634	<>	<elision1>
6634	6598	.	υ
6634	6551	s	υ
6634	6598	.	u
6634	6551	s	u
6634	6538	s	κ
6634	6538	s	k
6634	6592	s	U
6634	6547	s	K
6634	6598	.	α
6634	6551	s	α
6634	6598	.	a
6634	6551	s	a
6634	6595	s	A
6634	6538	s	λ
6634	6538	s	l
6634	6553	s	L
6634	6545	<1m>	<>
6635	6582	.	.
6635	6582	<~>	<~>
6635	6582	<split-s>	<split-s>
6635	6582	<split-h>	<split-h>
6635	6582	<name2>	<name2>
6635	6585	<aphaerese>	<aphaerese>
6635	6633	<>	<aphaerese>
6635	6582	<elision3>	<elision3>
6635	6633	<>	<elision3>
6635	6582	<elision2>	<elision2>
6635	6633	<>	<elision2>
6635	6582	<elision1>	<elision1>
6635	6633	<>	<elision1>
6635	6600	.	υ
6635	6550	s	υ
6635	6600	.	u
6635	6550	s	u
6635	6537	s	κ
6635	6537	s	k
6635	6594	s	U
6635	6546	s	K
6635	6600	.	α
6635	6550	s	α
6635	6600	.	a
6635	6550	s	a
6635	6597	s	A
6635	6537	s	λ
6635	6537	s	l
6635	6552	s	L
6635	6543	<1m>	<>
6636	6610	.	.
6636	6610	<~>	<~>
6636	6610	<split-s>	<split-s>
6636	6610	<split-h>	<split-h>
6636	6610	<name2>	<name2>
6636	6613	<aphaerese>	<aphaerese>
6636	6637	<>	<aphaerese>
6636	6610	<elision3>	<elision3>
6636	6637	<>	<elision3>
6636	6610	<elision2>	<elision2>
6636	6637	<>	<elision2>
6636	6610	<elision1>	<elision1>
6636	6637	<>	<elision1>
6636	6616	.	υ
6636	6551	s	υ
6636	6616	.	u
6636	6551	s	u
6636	6559	s	κ
6636	6562	H	κ
6636	6559	s	k
6636	6562	H	k
6636	6592	s	U
6636	6547	s	K
6636	6562	H	K
6636	6616	.	α
6636	6551	s	α
6636	6616	.	a
6636	6551	s	a
6636	6595	s	A
6636	6559	s	λ
6636	6562	H	λ
6636	6559	s	l
6636	6562	H	l
6636	6553	s	L
6636	6562	H	L
6636	6544	<1m>	<>
6637	6610	.	.
6637	6610	<~>	<~>
6637	6610	<split-s>	<split-s>
6637	6610	<split-h>	<split-h>
6637	6610	<name2>	<name2>
6637	6638	<>	<name>
6637	6613	<aphaerese>	<aphaerese>
6637	6637	<>	<aphaerese>
6637	6610	<elision3>	<elision3>
6637	6637	<>	<elision3>
6637	6610	<elision2>	<elision2>
6637	6637	<>	<elision2>
6637	6610	<elision1>	<elision1>
6637	6637	<>	<elision1>
6637	6616	.	υ
6637	6551	s	υ
6637	6616	.	u
6637	6551	s	u
6637	6559	s	κ
6637	6562	H	κ
6637	6559	s	k
6637	6562	H	k
6637	6592	s	U
6637	6547	s	K
6637	6562	H	K
6637	6616	.	α
6637	6551	s	α
6637	6616	.	a
6637	6551	s	a
6637	6595	s	A
6637	6559	s	λ
6637	6562	H	λ
6637	6559	s	l
6637	6562	H	l
6637	6553	s	L
6637	6562	H	L
6637	6545	<1m>	<>
6638	6612	.	.
6638	6612	<~>	<~>
6638	6612	<split-s>	<split-s>
6638	6612	<split-h>	<split-h>
6638	6612	<name2>	<name2>
6638	6615	<aphaerese>	<aphaerese>
6638	6636	<>	<aphaerese>
6638	6612	<elision3>	<elision3>
6638	6636	<>	<elision3>
6638	6612	<elision2>	<elision2>
6638	6636	<>	<elision2>
6638	6612	<elision1>	<elision1>
6638	6636	<>	<elision1>
6638	6618	.	υ
6638	6550	s	υ
6638	6618	.	u
6638	6550	s	u
6638	6558	s	κ
6638	6561	H	κ
6638	6558	s	k
6638	6561	H	k
6638	6594	s	U
6638	6546	s	K
6638	6561	H	K
6638	6618	.	α
6638	6550	s	α
6638	6618	.	a
6638	6550	s	a
6638	6597	s	A
6638	6558	s	λ
6638	6561	H	λ
6638	6558	s	l
6638	6561	H	l
6638	6552	s	L
6638	6561	H	L
6638	6543	<1m>	<>
6639	6580	.	.
6639	6580	<~>	<~>
6639	6580	<split-s>	<split-s>
6639	6580	<split-h>	<split-h>
6639	6580	<name2>	<name2>
6639	6640	<>	<name>
6639	6583	<aphaerese>	<aphaerese>
6639	6639	<>	<aphaerese>
6639	6580	<elision3>	<elision3>
6639	6639	<>	<elision3>
6639	6580	<elision2>	<elision2>
6639	6639	<>	<elision2>
6639	6580	<elision1>	<elision1>
6639	6639	<>	<elision1>
6639	6598	.	υ
6639	6551	s	υ
6639	6598	.	u
6639	6551	s	u
6639	6586	.	κ
6639	6538	s	κ
6639	6538	s	k
6639	6592	s	U
6639	6547	s	K
6639	6598	.	α
6639	6551	s	α
6639	6598	.	a
6639	6551	s	a
6639	6595	s	A
6639	6538	s	λ
6639	6538	s	l
6639	6553	s	L
6639	6545	<1m>	<>
6639	6610	<U2L>	<>
6640	6582	.	.
6640	6582	<~>	<~>
6640	6582	<split-s>	<split-s>
6640	6582	<split-h>	<split-h>
6640	6582	<name2>	<name2>
6640	6585	<aphaerese>	<aphaerese>
6640	6641	<>	<aphaerese>
6640	6582	<elision3>	<elision3>
6640	6641	<>	<elision3>
6640	6582	<elision2>	<elision2>
6640	6641	<>	<elision2>
6640	6582	<elision1>	<elision1>
6640	6641	<>	<elision1>
6640	6600	.	υ
6640	6550	s	υ
6640	6600	.	u
6640	6550	s	u
6640	6588	.	κ
6640	6537	s	κ
6640	6537	s	k
6640	6594	s	U
6640	6546	s	K
6640	6600	.	α
6640	6550	s	α
6640	6600	.	a
6640	6550	s	a
6640	6597	s	A
6640	6537	s	λ
6640	6537	s	l
6640	6552	s	L
6640	6543	<1m>	<>
6640	6611	<U2L>	<>
6641	6580	.	.
6641	6580	<~>	<~>
6641	6580	<split-s>	<split-s>
6641	6580	<split-h>	<split-h>
6641	6580	<name2>	<name2>
6641	6583	<aphaerese>	<aphaerese>
6641	6639	<>	<aphaerese>
6641	6580	<elision3>	<elision3>
6641	6639	<>	<elision3>
6641	6580	<elision2>	<elision2>
6641	6639	<>	<elision2>
6641	6580	<elision1>	<elision1>
6641	6639	<>	<elision1>
6641	6598	.	υ
6641	6551	s	υ
6641	6598	.	u
6641	6551	s	u
6641	6586	.	κ
6641	6538	s	κ
6641	6538	s	k
6641	6592	s	U
6641	6547	s	K
6641	6598	.	α
6641	6551	s	α
6641	6598	.	a
6641	6551	s	a
6641	6595	s	A
6641	6538	s	λ
6641	6538	s	l
6641	6553	s	L
6641	6544	<1m>	<>
6641	6612	<U2L>	<>
6642	6580	.	.
6642	6580	<~>	<~>
6642	6580	<split-s>	<split-s>
6642	6580	<split-h>	<split-h>
6642	6580	<name2>	<name2>
6642	6643	<name2>	<name>
6642	6644	<>	<name>
6642	6583	<aphaerese>	<aphaerese>
6642	6646	<>	<aphaerese>
6642	6580	<elision3>	<elision3>
6642	6646	<>	<elision3>
6642	6580	<elision2>	<elision2>
6642	6646	<>	<elision2>
6642	6580	<elision1>	<elision1>
6642	6646	<>	<elision1>
6642	6598	.	υ
6642	6551	s	υ
6642	6598	.	u
6642	6551	s	u
6642	6616	.	κ
6642	6538	s	κ
6642	6538	s	k
6642	6592	s	U
6642	6547	s	K
6642	6598	.	α
6642	6551	s	α
6642	6598	.	a
6642	6551	s	a
6642	6595	s	A
6642	6616	.	λ
6642	6538	s	λ
6642	6538	s	l
6642	6553	s	L
6642	6545	<1m>	<>
6642	6647	<k2K>	<>
6642	6648	<k2L>	<>
6642	6650	<K2L>	<>
6643	6546	s	k
6643	6552	s	l
6644	6582	.	.
6644	6582	<~>	<~>
6644	6582	<split-s>	<split-s>
6644	6582	<split-h>	<split-h>
6644	6582	<name2>	<name2>
6644	6585	<aphaerese>	<aphaerese>
6644	6645	<>	<aphaerese>
6644	6582	<elision3>	<elision3>
6644	6645	<>	<elision3>
6644	6582	<elision2>	<elision2>
6644	6645	<>	<elision2>
6644	6582	<elision1>	<elision1>
6644	6645	<>	<elision1>
6644	6600	.	υ
6644	6550	s	υ
6644	6600	.	u
6644	6550	s	u
6644	6618	.	κ
6644	6537	s	κ
6644	6537	s	k
6644	6594	s	U
6644	6546	s	K
6644	6600	.	α
6644	6550	s	α
6644	6600	.	a
6644	6550	s	a
6644	6597	s	A
6644	6618	.	λ
6644	6537	s	λ
6644	6537	s	l
6644	6552	s	L
6644	6543	<1m>	<>
6644	6638	<K2L>	<>
6645	6580	.	.
6645	6580	<~>	<~>
6645	6580	<split-s>	<split-s>
6645	6580	<split-h>	<split-h>
6645	6580	<name2>	<name2>
6645	6583	<aphaerese>	<aphaerese>
6645	6646	<>	<aphaerese>
6645	6580	<elision3>	<elision3>
6645	6646	<>	<elision3>
6645	6580	<elision2>	<elision2>
6645	6646	<>	<elision2>
6645	6580	<elision1>	<elision1>
6645	6646	<>	<elision1>
6645	6598	.	υ
6645	6551	s	υ
6645	6598	.	u
6645	6551	s	u
6645	6616	.	κ
6645	6538	s	κ
6645	6538	s	k
6645	6592	s	U
6645	6547	s	K
6645	6598	.	α
6645	6551	s	α
6645	6598	.	a
6645	6551	s	a
6645	6595	s	A
6645	6616	.	λ
6645	6538	s	λ
6645	6538	s	l
6645	6553	s	L
6645	6544	<1m>	<>
6645	6636	<K2L>	<>
6646	6580	.	.
6646	6580	<~>	<~>
6646	6580	<split-s>	<split-s>
6646	6580	<split-h>	<split-h>
6646	6580	<name2>	<name2>
6646	6644	<>	<name>
6646	6583	<aphaerese>	<aphaerese>
6646	6646	<>	<aphaerese>
6646	6580	<elision3>	<elision3>
6646	6646	<>	<elision3>
6646	6580	<elision2>	<elision2>
6646	6646	<>	<elision2>
6646	6580	<elision1>	<elision1>
6646	6646	<>	<elision1>
6646	6598	.	υ
6646	6551	s	υ
6646	6598	.	u
6646	6551	s	u
6646	6616	.	κ
6646	6538	s	κ
6646	6538	s	k
6646	6592	s	U
6646	6547	s	K
6646	6598	.	α
6646	6551	s	α
6646	6598	.	a
6646	6551	s	a
6646	6595	s	A
6646	6616	.	λ
6646	6538	s	λ
6646	6538	s	l
6646	6553	s	L
6646	6545	<1m>	<>
6646	6637	<K2L>	<>
6647	6643	<name>	<name>
6648	6649	<name>	<name>
6649	6546	s	k
6649	6561	H	k
6649	6552	s	l
6649	6561	H	l
6650	6610	.	.
6650	6610	<~>	<~>
6650	6610	<split-s>	<split-s>
6650	6610	<split-h>	<split-h>
6650	6610	<name2>	<name2>
6650	6649	<name2>	<name>
6650	6638	<>	<name>
6650	6613	<aphaerese>	<aphaerese>
6650	6637	<>	<aphaerese>
6650	6610	<elision3>	<elision3>
6650	6637	<>	<elision3>
6650	6610	<elision2>	<elision2>
6650	6637	<>	<elision2>
6650	6610	<elision1>	<elision1>
6650	6637	<>	<elision1>
6650	6616	.	υ
6650	6551	s	υ
6650	6616	.	u
6650	6551	s	u
6650	6559	s	κ
6650	6562	H	κ
6650	6559	s	k
6650	6562	H	k
6650	6592	s	U
6650	6547	s	K
6650	6562	H	K
6650	6616	.	α
6650	6551	s	α
6650	6616	.	a
6650	6551	s	a
6650	6595	s	A
6650	6559	s	λ
6650	6562	H	λ
6650	6559	s	l
6650	6562	H	l
6650	6553	s	L
6650	6562	H	L
6650	6545	<1m>	<>
6651	6652	<>	<name>
6651	6651	<>	<aphaerese>
6651	6651	<>	<elision3>
6651	6651	<>	<elision2>
6651	6651	<>	<elision1>
6651	6655	<lambda2L>	<>
6652	6653	<>	<aphaerese>
6652	6653	<>	<elision3>
6652	6653	<>	<elision2>
6652	6653	<>	<elision1>
6652	6656	<lambda2L>	<>
6653	6651	<>	<aphaerese>
6653	6651	<>	<elision3>
6653	6651	<>	<elision2>
6653	6651	<>	<elision1>
6653	6654	<lambda2L>	<>
6654	6610	.	.
6654	6610	<~>	<~>
6654	6610	<split-s>	<split-s>
6654	6610	<split-h>	<split-h>
6654	6610	<name2>	<name2>
6654	6613	<aphaerese>	<aphaerese>
6654	6655	<>	<aphaerese>
6654	6610	<elision3>	<elision3>
6654	6655	<>	<elision3>
6654	6610	<elision2>	<elision2>
6654	6655	<>	<elision2>
6654	6610	<elision1>	<elision1>
6654	6655	<>	<elision1>
6654	6616	.	υ
6654	6551	s	υ
6654	6616	.	u
6654	6551	s	u
6654	6616	.	κ
6654	6559	s	κ
6654	6562	H	κ
6654	6559	s	k
6654	6562	H	k
6654	6592	s	U
6654	6547	s	K
6654	6562	H	K
6654	6616	.	α
6654	6551	s	α
6654	6616	.	a
6654	6551	s	a
6654	6595	s	A
6654	6616	.	λ
6654	6559	s	λ
6654	6562	H	λ
6654	6559	s	l
6654	6562	H	l
6654	6553	s	L
6654	6562	H	L
6654	6544	<1m>	<>
6655	6610	.	.
6655	6610	<~>	<~>
6655	6610	<split-s>	<split-s>
6655	6610	<split-h>	<split-h>
6655	6610	<name2>	<name2>
6655	6656	<>	<name>
6655	6613	<aphaerese>	<aphaerese>
6655	6655	<>	<aphaerese>
6655	6610	<elision3>	<elision3>
6655	6655	<>	<elision3>
6655	6610	<elision2>	<elision2>
6655	6655	<>	<elision2>
6655	6610	<elision1>	<elision1>
6655	6655	<>	<elision1>
6655	6616	.	υ
6655	6551	s	υ
6655	6616	.	u
6655	6551	s	u
6655	6616	.	κ
6655	6559	s	κ
6655	6562	H	κ
6655	6559	s	k
6655	6562	H	k
6655	6592	s	U
6655	6547	s	K
6655	6562	H	K
6655	6616	.	α
6655	6551	s	α
6655	6616	.	a
6655	6551	s	a
6655	6595	s	A
6655	6616	.	λ
6655	6559	s	λ
6655	6562	H	λ
6655	6559	s	l
6655	6562	H	l
6655	6553	s	L
6655	6562	H	L
6655	6545	<1m>	<>
6656	6612	.	.
6656	6612	<~>	<~>
6656	6612	<split-s>	<split-s>
6656	6612	<split-h>	<split-h>
6656	6612	<name2>	<name2>
6656	6615	<aphaerese>	<aphaerese>
6656	6654	<>	<aphaerese>
6656	6612	<elision3>	<elision3>
6656	6654	<>	<elision3>
6656	6612	<elision2>	<elision2>
6656	6654	<>	<elision2>
6656	6612	<elision1>	<elision1>
6656	6654	<>	<elision1>
6656	6618	.	υ
6656	6550	s	υ
6656	6618	.	u
6656	6550	s	u
6656	6618	.	κ
6656	6558	s	κ
6656	6561	H	κ
6656	6558	s	k
6656	6561	H	k
6656	6594	s	U
6656	6546	s	K
6656	6561	H	K
6656	6618	.	α
6656	6550	s	α
6656	6618	.	a
6656	6550	s	a
6656	6597	s	A
6656	6618	.	λ
6656	6558	s	λ
6656	6561	H	λ
6656	6558	s	l
6656	6561	H	l
6656	6552	s	L
6656	6561	H	L
6656	6543	<1m>	<>
6657	6658	<>	<name>
6657	6657	<>	<aphaerese>
6657	6657	<>	<elision3>
6657	6657	<>	<elision2>
6657	6657	<>	<elision1>
6657	6655	<l2L>	<>
6658	6659	<>	<aphaerese>
6658	6659	<>	<elision3>
6658	6659	<>	<elision2>
6658	6659	<>	<elision1>
6658	6656	<l2L>	<>
6659	6657	<>	<aphaerese>
6659	6657	<>	<elision3>
6659	6657	<>	<elision2>
6659	6657	<>	<elision1>
6659	6654	<l2L>	<>
6660	6610	.	.
6660	6610	<~>	<~>
6660	6610	<split-s>	<split-s>
6660	6610	<split-h>	<split-h>
6660	6610	<name2>	<name2>
6660	6649	<name2>	<name>
6660	6656	<>	<name>
6660	6613	<aphaerese>	<aphaerese>
6660	6655	<>	<aphaerese>
6660	6610	<elision3>	<elision3>
6660	6655	<>	<elision3>
6660	6610	<elision2>	<elision2>
6660	6655	<>	<elision2>
6660	6610	<elision1>	<elision1>
6660	6655	<>	<elision1>
6660	6616	.	υ
6660	6551	s	υ
6660	6616	.	u
6660	6551	s	u
6660	6616	.	κ
6660	6559	s	κ
6660	6562	H	κ
6660	6559	s	k
6660	6562	H	k
6660	6592	s	U
6660	6547	s	K
6660	6562	H	K
6660	6616	.	α
6660	6551	s	α
6660	6616	.	a
6660	6551	s	a
6660	6595	s	A
6660	6616	.	λ
6660	6559	s	λ
6660	6562	H	λ
6660	6559	s	l
6660	6562	H	l
6660	6553	s	L
6660	6562	H	L
6660	6545	<1m>	<>
6660	6648	<l2L>	<>
6661	6662	<>	<name>
6661	6661	<>	<aphaerese>
6661	6661	<>	<elision3>
6661	6661	<>	<elision2>
6661	6661	<>	<elision1>
6661	6665	<ypsilon2K>	<>
6661	6668	<ypsilon2L>	<>
6662	6663	<>	<aphaerese>
6662	6663	<>	<elision3>
6662	6663	<>	<elision2>
6662	6663	<>	<elision1>
6662	6666	<ypsilon2K>	<>
6662	6669	<ypsilon2L>	<>
6663	6661	<>	<aphaerese>
6663	6661	<>	<elision3>
6663	6661	<>	<elision2>
6663	6661	<>	<elision1>
6663	6664	<ypsilon2K>	<>
6663	6667	<ypsilon2L>	<>
6664	6580	.	.
6664	6580	<~>	<~>
6664	6580	<split-s>	<split-s>
6664	6580	<split-h>	<split-h>
6664	6580	<name2>	<name2>
6664	6583	<aphaerese>	<aphaerese>
6664	6665	<>	<aphaerese>
6664	6665	<>	<elision3>
6664	6665	<>	<elision2>
6664	6665	<>	<elision1>
6664	6598	.	υ
6664	6551	s	υ
6664	6598	.	u
6664	6551	s	u
6664	6586	.	κ
6664	6538	s	κ
6664	6538	s	k
6664	6592	s	U
6664	6547	s	K
6664	6598	.	α
6664	6551	s	α
6664	6598	.	a
6664	6551	s	a
6664	6595	s	A
6664	6538	s	λ
6664	6538	s	l
6664	6553	s	L
6664	6544	<1m>	<>
6665	6580	.	.
6665	6580	<~>	<~>
6665	6580	<split-s>	<split-s>
6665	6580	<split-h>	<split-h>
6665	6580	<name2>	<name2>
6665	6666	<>	<name>
6665	6583	<aphaerese>	<aphaerese>
6665	6665	<>	<aphaerese>
6665	6665	<>	<elision3>
6665	6665	<>	<elision2>
6665	6665	<>	<elision1>
6665	6598	.	υ
6665	6551	s	υ
6665	6598	.	u
6665	6551	s	u
6665	6586	.	κ
6665	6538	s	κ
6665	6538	s	k
6665	6592	s	U
6665	6547	s	K
6665	6598	.	α
6665	6551	s	α
6665	6598	.	a
6665	6551	s	a
6665	6595	s	A
6665	6538	s	λ
6665	6538	s	l
6665	6553	s	L
6665	6545	<1m>	<>
6666	6582	.	.
6666	6582	<~>	<~>
6666	6582	<split-s>	<split-s>
6666	6582	<split-h>	<split-h>
6666	6582	<name2>	<name2>
6666	6585	<aphaerese>	<aphaerese>
6666	6664	<>	<aphaerese>
6666	6664	<>	<elision3>
6666	6664	<>	<elision2>
6666	6664	<>	<elision1>
6666	6600	.	υ
6666	6550	s	υ
6666	6600	.	u
6666	6550	s	u
6666	6588	.	κ
6666	6537	s	κ
6666	6537	s	k
6666	6594	s	U
6666	6546	s	K
6666	6600	.	α
6666	6550	s	α
6666	6600	.	a
6666	6550	s	a
6666	6597	s	A
6666	6537	s	λ
6666	6537	s	l
6666	6552	s	L
6666	6543	<1m>	<>
6667	6610	.	.
6667	6610	<~>	<~>
6667	6610	<split-s>	<split-s>
6667	6610	<split-h>	<split-h>
6667	6610	<name2>	<name2>
6667	6613	<aphaerese>	<aphaerese>
6667	6668	<>	<aphaerese>
6667	6668	<>	<elision3>
6667	6668	<>	<elision2>
6667	6668	<>	<elision1>
6667	6616	.	υ
6667	6551	s	υ
6667	6616	.	u
6667	6551	s	u
6667	6586	.	κ
6667	6559	s	κ
6667	6562	H	κ
6667	6559	s	k
6667	6562	H	k
6667	6592	s	U
6667	6547	s	K
6667	6562	H	K
6667	6616	.	α
6667	6551	s	α
6667	6616	.	a
6667	6551	s	a
6667	6595	s	A
6667	6559	s	λ
6667	6562	H	λ
6667	6559	s	l
6667	6562	H	l
6667	6553	s	L
6667	6562	H	L
6667	6544	<1m>	<>
6668	6610	.	.
6668	6610	<~>	<~>
6668	6610	<split-s>	<split-s>
6668	6610	<split-h>	<split-h>
6668	6610	<name2>	<name2>
6668	6669	<>	<name>
6668	6613	<aphaerese>	<aphaerese>
6668	6668	<>	<aphaerese>
6668	6668	<>	<elision3>
6668	6668	<>	<elision2>
6668	6668	<>	<elision1>
6668	6616	.	υ
6668	6551	s	υ
6668	6616	.	u
6668	6551	s	u
6668	6586	.	κ
6668	6559	s	κ
6668	6562	H	κ
6668	6559	s	k
6668	6562	H	k
6668	6592	s	U
6668	6547	s	K
6668	6562	H	K
6668	6616	.	α
6668	6551	s	α
6668	6616	.	a
6668	6551	s	a
6668	6595	s	A
6668	6559	s	λ
6668	6562	H	λ
6668	6559	s	l
6668	6562	H	l
6668	6553	s	L
6668	6562	H	L
6668	6545	<1m>	<>
6669	6612	.	.
6669	6612	<~>	<~>
6669	6612	<split-s>	<split-s>
6669	6612	<split-h>	<split-h>
6669	6612	<name2>	<name2>
6669	6615	<aphaerese>	<aphaerese>
6669	6667	<>	<aphaerese>
6669	6667	<>	<elision3>
6669	6667	<>	<elision2>
6669	6667	<>	<elision1>
6669	6618	.	υ
6669	6550	s	υ
6669	6618	.	u
6669	6550	s	u
6669	6588	.	κ
6669	6558	s	κ
6669	6561	H	κ
6669	6558	s	k
6669	6561	H	k
6669	6594	s	U
6669	6546	s	K
6669	6561	H	K
6669	6618	.	α
6669	6550	s	α
6669	6618	.	a
6669	6550	s	a
6669	6597	s	A
6669	6558	s	λ
6669	6561	H	λ
6669	6558	s	l
6669	6561	H	l
6669	6552	s	L
6669	6561	H	L
6669	6543	<1m>	<>
6670	6671	<>	<name>
6670	6670	<>	<aphaerese>
6670	6670	<>	<elision3>
6670	6670	<>	<elision2>
6670	6670	<>	<elision1>
6670	6665	<u2K>	<>
6670	6668	<u2L>	<>
6671	6672	<>	<aphaerese>
6671	6672	<>	<elision3>
6671	6672	<>	<elision2>
6671	6672	<>	<elision1>
6671	6666	<u2K>	<>
6671	6669	<u2L>	<>
6672	6670	<>	<aphaerese>
6672	6670	<>	<elision3>
6672	6670	<>	<elision2>
6672	6670	<>	<elision1>
6672	6664	<u2K>	<>
6672	6667	<u2L>	<>
6673	6674	<>	<name>
6673	6673	<>	<aphaerese>
6673	6673	<>	<elision3>
6673	6673	<>	<elision2>
6673	6673	<>	<elision1>
6673	6668	<alpha2L>	<>
6674	6675	<>	<aphaerese>
6674	6675	<>	<elision3>
6674	6675	<>	<elision2>
6674	6675	<>	<elision1>
6674	6669	<alpha2L>	<>
6675	6673	<>	<aphaerese>
6675	6673	<>	<elision3>
6675	6673	<>	<elision2>
6675	6673	<>	<elision1>
6675	6667	<alpha2L>	<>
6676	6677	<>	<name>
6676	6676	<>	<aphaerese>
6676	6676	<>	<elision3>
6676	6676	<>	<elision2>
6676	6676	<>	<elision1>
6676	6668	<a2L>	<>
6677	6678	<>	<aphaerese>
6677	6678	<>	<elision3>
6677	6678	<>	<elision2>
6677	6678	<>	<elision1>
6677	6669	<a2L>	<>
6678	6676	<>	<aphaerese>
6678	6676	<>	<elision3>
6678	6676	<>	<elision2>
6678	6676	<>	<elision1>
6678	6667	<a2L>	<>
6679	6680	.	.
6679	6681	 	 
6679	6680	<~>	<~>
6679	6680	<split-s>	<split-s>
6679	6680	<split-h>	<split-h>
6679	6680	<name2>	<name2>
6679	7256	<>	<name>
6679	6684	<aphaerese>	<aphaerese>
6679	6679	<>	<aphaerese>
6679	6679	<>	<elision3>
6679	6679	<>	<elision2>
6679	6679	<>	<elision1>
6679	6688	.	υ
6679	6694	s	υ
6679	6688	.	u
6679	6694	s	u
6679	6873	.	κ
6679	6944	s	κ
6679	7056	s	k
6679	7065	s	U
6679	7231	s	K
6679	6688	.	α
6679	6694	s	α
6679	6688	.	a
6679	6694	s	a
6679	7186	s	A
6679	7056	s	λ
6679	7056	s	l
6679	7244	s	L
6679	7259	<split-h>	<>
6680	6680	.	.
6680	6681	 	 
6680	6680	<~>	<~>
6680	6680	<split-s>	<split-s>
6680	6680	<split-h>	<split-h>
6680	6680	<name2>	<name2>
6680	7255	<>	<name>
6680	6684	<aphaerese>	<aphaerese>
6680	6680	<>	<aphaerese>
6680	6680	<elision3>	<elision3>
6680	6680	<>	<elision3>
6680	6680	<elision2>	<elision2>
6680	6680	<>	<elision2>
6680	6680	<elision1>	<elision1>
6680	6680	<>	<elision1>
6680	6688	.	υ
6680	6694	s	υ
6680	6688	.	u
6680	6694	s	u
6680	6873	.	κ
6680	6944	s	κ
6680	7056	s	k
6680	7065	s	U
6680	7231	s	K
6680	6688	.	α
6680	6694	s	α
6680	6688	.	a
6680	6694	s	a
6680	7186	s	A
6680	7056	s	λ
6680	7056	s	l
6680	7244	s	L
6680	7205	<split-h>	<>
6681	6680	.	.
6681	6681	 	 
6681	6680	<~>	<~>
6681	6680	<split-s>	<split-s>
6681	6680	<split-h>	<split-h>
6681	6680	<name2>	<name2>
6681	6682	<>	<name>
6681	6684	<aphaerese>	<aphaerese>
6681	6687	<>	<aphaerese>
6681	6680	<elision3>	<elision3>
6681	6687	<>	<elision3>
6681	6680	<elision2>	<elision2>
6681	6687	<>	<elision2>
6681	6680	<elision1>	<elision1>
6681	6687	<>	<elision1>
6681	6688	.	υ
6681	7208	s	υ
6681	6688	.	u
6681	7208	s	u
6681	6873	.	κ
6681	7211	s	κ
6681	7214	s	k
6681	7217	s	U
6681	7221	s	K
6681	6688	.	α
6681	7208	s	α
6681	6688	.	a
6681	7208	s	a
6681	7225	s	A
6681	7214	s	λ
6681	7214	s	l
6681	7226	s	L
6681	7205	<split-h>	<>
6682	6683	.	.
6682	6686	 	 
6682	6683	<~>	<~>
6682	6683	<split-s>	<split-s>
6682	6683	<split-h>	<split-h>
6682	6683	<name2>	<name2>
6682	7230	<aphaerese>	<aphaerese>
6682	7254	<>	<aphaerese>
6682	6683	<elision3>	<elision3>
6682	7254	<>	<elision3>
6682	6683	<elision2>	<elision2>
6682	7254	<>	<elision2>
6682	6683	<elision1>	<elision1>
6682	7254	<>	<elision1>
6682	6690	.	υ
6682	6866	s	υ
6682	6690	.	u
6682	6866	s	u
6682	6875	.	κ
6682	6946	s	κ
6682	7058	s	k
6682	7067	s	U
6682	7073	s	K
6682	6690	.	α
6682	6866	s	α
6682	6690	.	a
6682	6866	s	a
6682	7188	s	A
6682	7058	s	λ
6682	7058	s	l
6682	7191	s	L
6682	7206	<split-h>	<>
6683	6680	.	.
6683	6681	 	 
6683	6680	<~>	<~>
6683	6680	<split-s>	<split-s>
6683	6680	<split-h>	<split-h>
6683	6680	<name2>	<name2>
6683	6684	<aphaerese>	<aphaerese>
6683	6680	<>	<aphaerese>
6683	6680	<elision3>	<elision3>
6683	6680	<>	<elision3>
6683	6680	<elision2>	<elision2>
6683	6680	<>	<elision2>
6683	6680	<elision1>	<elision1>
6683	6680	<>	<elision1>
6683	6688	.	υ
6683	6694	s	υ
6683	6688	.	u
6683	6694	s	u
6683	6873	.	κ
6683	6944	s	κ
6683	7056	s	k
6683	7065	s	U
6683	7231	s	K
6683	6688	.	α
6683	6694	s	α
6683	6688	.	a
6683	6694	s	a
6683	7186	s	A
6683	7056	s	λ
6683	7056	s	l
6683	7244	s	L
6683	7207	<split-h>	<>
6684	6680	.	.
6684	6681	 	 
6684	6680	<~>	<~>
6684	6680	<split-s>	<split-s>
6684	6680	<split-h>	<split-h>
6684	6680	<name2>	<name2>
6684	6685	<>	<name>
6684	6684	<aphaerese>	<aphaerese>
6684	6684	<>	<aphaerese>
6684	6680	<elision3>	<elision3>
6684	6684	<>	<elision3>
6684	6680	<elision2>	<elision2>
6684	6684	<>	<elision2>
6684	6680	<elision1>	<elision1>
6684	6684	<>	<elision1>
6684	6680	.	υ
6684	6680	.	u
6684	6873	.	κ
6684	6944	s	κ
6684	7056	s	k
6684	7065	s	U
6684	7231	s	K
6684	6680	.	α
6684	6680	.	a
6684	7186	s	A
6684	7056	s	λ
6684	7056	s	l
6684	7244	s	L
6684	7252	<split-h>	<>
6685	6683	.	.
6685	6686	 	 
6685	6683	<~>	<~>
6685	6683	<split-s>	<split-s>
6685	6683	<split-h>	<split-h>
6685	6683	<name2>	<name2>
6685	7230	<aphaerese>	<aphaerese>
6685	7230	<>	<aphaerese>
6685	6683	<elision3>	<elision3>
6685	7230	<>	<elision3>
6685	6683	<elision2>	<elision2>
6685	7230	<>	<elision2>
6685	6683	<elision1>	<elision1>
6685	7230	<>	<elision1>
6685	6683	.	υ
6685	6683	.	u
6685	6875	.	κ
6685	6946	s	κ
6685	7058	s	k
6685	7067	s	U
6685	7233	s	K
6685	6683	.	α
6685	6683	.	a
6685	7188	s	A
6685	7058	s	λ
6685	7058	s	l
6685	7246	s	L
6685	7253	<split-h>	<>
6686	6680	.	.
6686	6681	 	 
6686	6680	<~>	<~>
6686	6680	<split-s>	<split-s>
6686	6680	<split-h>	<split-h>
6686	6680	<name2>	<name2>
6686	6684	<aphaerese>	<aphaerese>
6686	6687	<>	<aphaerese>
6686	6680	<elision3>	<elision3>
6686	6687	<>	<elision3>
6686	6680	<elision2>	<elision2>
6686	6687	<>	<elision2>
6686	6680	<elision1>	<elision1>
6686	6687	<>	<elision1>
6686	6688	.	υ
6686	7208	s	υ
6686	6688	.	u
6686	7208	s	u
6686	6873	.	κ
6686	7211	s	κ
6686	7214	s	k
6686	7217	s	U
6686	7221	s	K
6686	6688	.	α
6686	7208	s	α
6686	6688	.	a
6686	7208	s	a
6686	7225	s	A
6686	7214	s	λ
6686	7214	s	l
6686	7226	s	L
6686	7207	<split-h>	<>
6687	6680	.	.
6687	6681	 	 
6687	6680	<~>	<~>
6687	6680	<split-s>	<split-s>
6687	6680	<split-h>	<split-h>
6687	6680	<name2>	<name2>
6687	6682	<>	<name>
6687	6684	<aphaerese>	<aphaerese>
6687	6687	<>	<aphaerese>
6687	6680	<elision3>	<elision3>
6687	6687	<>	<elision3>
6687	6680	<elision2>	<elision2>
6687	6687	<>	<elision2>
6687	6680	<elision1>	<elision1>
6687	6687	<>	<elision1>
6687	6688	.	υ
6687	6694	s	υ
6687	6688	.	u
6687	6694	s	u
6687	6873	.	κ
6687	6944	s	κ
6687	7056	s	k
6687	7065	s	U
6687	7068	s	K
6687	6688	.	α
6687	6694	s	α
6687	6688	.	a
6687	6694	s	a
6687	7186	s	A
6687	7056	s	λ
6687	7056	s	l
6687	7189	s	L
6687	7205	<split-h>	<>
6688	6689	<>	<name>
6688	6688	<>	<aphaerese>
6688	6680	<elision3>	<elision3>
6688	6688	<>	<elision3>
6688	6680	<elision2>	<elision2>
6688	6688	<>	<elision2>
6688	6680	<elision1>	<elision1>
6688	6688	<>	<elision1>
6688	6692	<split-h>	<>
6689	6690	<>	<aphaerese>
6689	6683	<elision3>	<elision3>
6689	6690	<>	<elision3>
6689	6683	<elision2>	<elision2>
6689	6690	<>	<elision2>
6689	6683	<elision1>	<elision1>
6689	6690	<>	<elision1>
6689	6693	<split-h>	<>
6690	6688	<>	<aphaerese>
6690	6680	<elision3>	<elision3>
6690	6688	<>	<elision3>
6690	6680	<elision2>	<elision2>
6690	6688	<>	<elision2>
6690	6680	<elision1>	<elision1>
6690	6688	<>	<elision1>
6690	6691	<split-h>	<>
6691	6692	<>	<aphaerese>
6691	6692	<>	<elision3>
6691	6692	<>	<elision2>
6691	6692	<>	<elision1>
6691	139	<3s>	<>
6692	6693	<>	<name>
6692	6692	<>	<aphaerese>
6692	6692	<>	<elision3>
6692	6692	<>	<elision2>
6692	6692	<>	<elision1>
6692	140	<3s>	<>
6693	6691	<>	<aphaerese>
6693	6691	<>	<elision3>
6693	6691	<>	<elision2>
6693	6691	<>	<elision1>
6693	141	<3s>	<>
6694	6695	.	.
6694	6695	 	 
6694	6695	<~>	<~>
6694	6695	<split-s>	<split-s>
6694	6695	<split-h>	<split-h>
6694	6695	<name2>	<name2>
6694	6865	<>	<name>
6694	6698	<aphaerese>	<aphaerese>
6694	6694	<>	<aphaerese>
6694	6694	<>	<elision3>
6694	6694	<>	<elision2>
6694	6694	<>	<elision1>
6694	6859	.	υ
6694	6859	.	u
6694	6701	.	κ
6694	6859	.	α
6694	6859	.	a
6694	6868	<4s>	<>
6695	6695	.	.
6695	6695	 	 
6695	6695	<~>	<~>
6695	6695	<split-s>	<split-s>
6695	6695	<split-h>	<split-h>
6695	6695	<name2>	<name2>
6695	6696	<>	<name>
6695	6698	<aphaerese>	<aphaerese>
6695	6695	<>	<aphaerese>
6695	6695	<elision3>	<elision3>
6695	6695	<>	<elision3>
6695	6695	<elision2>	<elision2>
6695	6695	<>	<elision2>
6695	6695	<elision1>	<elision1>
6695	6695	<>	<elision1>
6695	6859	.	υ
6695	6859	.	u
6695	6701	.	κ
6695	6859	.	α
6695	6859	.	a
6695	6863	<4s>	<>
6696	6697	.	.
6696	6697	 	 
6696	6697	<~>	<~>
6696	6697	<split-s>	<split-s>
6696	6697	<split-h>	<split-h>
6696	6697	<name2>	<name2>
6696	6700	<aphaerese>	<aphaerese>
6696	6697	<>	<aphaerese>
6696	6697	<elision3>	<elision3>
6696	6697	<>	<elision3>
6696	6697	<elision2>	<elision2>
6696	6697	<>	<elision2>
6696	6697	<elision1>	<elision1>
6696	6697	<>	<elision1>
6696	6861	.	υ
6696	6861	.	u
6696	6703	.	κ
6696	6861	.	α
6696	6861	.	a
6696	6864	<4s>	<>
6697	6695	.	.
6697	6695	 	 
6697	6695	<~>	<~>
6697	6695	<split-s>	<split-s>
6697	6695	<split-h>	<split-h>
6697	6695	<name2>	<name2>
6697	6698	<aphaerese>	<aphaerese>
6697	6695	<>	<aphaerese>
6697	6695	<elision3>	<elision3>
6697	6695	<>	<elision3>
6697	6695	<elision2>	<elision2>
6697	6695	<>	<elision2>
6697	6695	<elision1>	<elision1>
6697	6695	<>	<elision1>
6697	6859	.	υ
6697	6859	.	u
6697	6701	.	κ
6697	6859	.	α
6697	6859	.	a
6697	6862	<4s>	<>
6698	6695	.	.
6698	6695	 	 
6698	6695	<~>	<~>
6698	6695	<split-s>	<split-s>
6698	6695	<split-h>	<split-h>
6698	6695	<name2>	<name2>
6698	6699	<>	<name>
6698	6698	<aphaerese>	<aphaerese>
6698	6698	<>	<aphaerese>
6698	6695	<elision3>	<elision3>
6698	6698	<>	<elision3>
6698	6695	<elision2>	<elision2>
6698	6698	<>	<elision2>
6698	6695	<elision1>	<elision1>
6698	6698	<>	<elision1>
6698	6695	.	υ
6698	6695	.	u
6698	6701	.	κ
6698	6695	.	α
6698	6695	.	a
6698	6850	<4s>	<>
6699	6697	.	.
6699	6697	 	 
6699	6697	<~>	<~>
6699	6697	<split-s>	<split-s>
6699	6697	<split-h>	<split-h>
6699	6697	<name2>	<name2>
6699	6700	<aphaerese>	<aphaerese>
6699	6700	<>	<aphaerese>
6699	6697	<elision3>	<elision3>
6699	6700	<>	<elision3>
6699	6697	<elision2>	<elision2>
6699	6700	<>	<elision2>
6699	6697	<elision1>	<elision1>
6699	6700	<>	<elision1>
6699	6697	.	υ
6699	6697	.	u
6699	6703	.	κ
6699	6697	.	α
6699	6697	.	a
6699	6851	<4s>	<>
6700	6695	.	.
6700	6695	 	 
6700	6695	<~>	<~>
6700	6695	<split-s>	<split-s>
6700	6695	<split-h>	<split-h>
6700	6695	<name2>	<name2>
6700	6698	<aphaerese>	<aphaerese>
6700	6698	<>	<aphaerese>
6700	6695	<elision3>	<elision3>
6700	6698	<>	<elision3>
6700	6695	<elision2>	<elision2>
6700	6698	<>	<elision2>
6700	6695	<elision1>	<elision1>
6700	6698	<>	<elision1>
6700	6695	.	υ
6700	6695	.	u
6700	6701	.	κ
6700	6695	.	α
6700	6695	.	a
6700	6849	<4s>	<>
6701	6702	<>	<name>
6701	6701	<>	<aphaerese>
6701	6704	<elision3>	<elision3>
6701	6701	<>	<elision3>
6701	6704	<elision2>	<elision2>
6701	6701	<>	<elision2>
6701	6704	<elision1>	<elision1>
6701	6701	<>	<elision1>
6701	6847	<4s>	<>
6702	6703	<>	<aphaerese>
6702	6706	<elision3>	<elision3>
6702	6703	<>	<elision3>
6702	6706	<elision2>	<elision2>
6702	6703	<>	<elision2>
6702	6706	<elision1>	<elision1>
6702	6703	<>	<elision1>
6702	6848	<4s>	<>
6703	6701	<>	<aphaerese>
6703	6704	<elision3>	<elision3>
6703	6701	<>	<elision3>
6703	6704	<elision2>	<elision2>
6703	6701	<>	<elision2>
6703	6704	<elision1>	<elision1>
6703	6701	<>	<elision1>
6703	6846	<4s>	<>
6704	6705	<>	<name>
6704	6704	<>	<aphaerese>
6704	6704	<>	<elision3>
6704	6704	<>	<elision2>
6704	6704	<>	<elision1>
6704	6708	<4s>	<>
6705	6706	<>	<aphaerese>
6705	6706	<>	<elision3>
6705	6706	<>	<elision2>
6705	6706	<>	<elision1>
6705	6709	<4s>	<>
6706	6704	<>	<aphaerese>
6706	6704	<>	<elision3>
6706	6704	<>	<elision2>
6706	6704	<>	<elision1>
6706	6707	<4s>	<>
6707	6708	<>	<aphaerese>
6707	6708	<>	<elision3>
6707	6708	<>	<elision2>
6707	6708	<>	<elision1>
6707	156	H	κ
6707	6075	H	k
6707	6079	H	K
6707	6083	H	λ
6707	6711	H	l
6707	6840	H	L
6707	6530	<K>	<>
6708	6709	<>	<name>
6708	6708	<>	<aphaerese>
6708	6708	<>	<elision3>
6708	6708	<>	<elision2>
6708	6708	<>	<elision1>
6708	156	H	κ
6708	6075	H	k
6708	6079	H	K
6708	6083	H	λ
6708	6711	H	l
6708	6840	H	L
6708	6528	<K>	<>
6709	6707	<>	<aphaerese>
6709	6707	<>	<elision3>
6709	6707	<>	<elision2>
6709	6707	<>	<elision1>
6709	6089	H	κ
6709	6093	H	k
6709	6094	H	K
6709	6085	H	λ
6709	6710	H	l
6709	6839	H	L
6709	6529	<K>	<>
6710	6711	<>	<aphaerese>
6710	6711	<>	<elision3>
6710	6711	<>	<elision2>
6710	6711	<>	<elision1>
6710	6714	<~>	<>
6710	5907	<l2L>	<>
6711	6712	<>	<name>
6711	6711	<>	<aphaerese>
6711	6711	<>	<elision3>
6711	6711	<>	<elision2>
6711	6711	<>	<elision1>
6711	6715	<~>	<>
6711	5905	<l2L>	<>
6712	6710	<>	<aphaerese>
6712	6710	<>	<elision3>
6712	6710	<>	<elision2>
6712	6710	<>	<elision1>
6712	6713	<~>	<>
6712	5906	<l2L>	<>
6713	6714	<>	<aphaerese>
6713	6714	<>	<elision3>
6713	6714	<>	<elision2>
6713	6714	<>	<elision1>
6713	6718	h	K
6713	6834	h	L
6714	6715	<>	<aphaerese>
6714	6715	<>	<elision3>
6714	6715	<>	<elision2>
6714	6715	<>	<elision1>
6714	6716	h	K
6714	6831	h	L
6715	6713	<>	<name>
6715	6715	<>	<aphaerese>
6715	6715	<>	<elision3>
6715	6715	<>	<elision2>
6715	6715	<>	<elision1>
6715	6716	h	K
6715	6831	h	L
6716	6717	<>	<name>
6716	6716	<>	<aphaerese>
6716	6716	<>	<elision3>
6716	6716	<>	<elision2>
6716	6716	<>	<elision1>
6716	6719	.	κ
6716	6719	.	λ
6717	6718	<>	<aphaerese>
6717	6718	<>	<elision3>
6717	6718	<>	<elision2>
6717	6718	<>	<elision1>
6717	6721	.	κ
6717	6721	.	λ
6718	6716	<>	<aphaerese>
6718	6716	<>	<elision3>
6718	6716	<>	<elision2>
6718	6716	<>	<elision1>
6718	6719	.	κ
6718	6719	.	λ
6719	6720	<>	<name>
6719	6719	<>	<aphaerese>
6719	6722	<elision3>	<elision3>
6719	6719	<>	<elision3>
6719	6722	<elision2>	<elision2>
6719	6719	<>	<elision2>
6719	6722	<elision1>	<elision1>
6719	6719	<>	<elision1>
6720	6721	<>	<aphaerese>
6720	6725	<elision3>	<elision3>
6720	6721	<>	<elision3>
6720	6725	<elision2>	<elision2>
6720	6721	<>	<elision2>
6720	6725	<elision1>	<elision1>
6720	6721	<>	<elision1>
6721	6719	<>	<aphaerese>
6721	6722	<elision3>	<elision3>
6721	6719	<>	<elision3>
6721	6722	<elision2>	<elision2>
6721	6719	<>	<elision2>
6721	6722	<elision1>	<elision1>
6721	6719	<>	<elision1>
6722	6722	.	.
6722	6723	 	 
6722	6722	<~>	<~>
6722	6722	<split-s>	<split-s>
6722	6722	<split-h>	<split-h>
6722	6722	<name2>	<name2>
6722	6830	<>	<name>
6722	6726	<aphaerese>	<aphaerese>
6722	6722	<>	<aphaerese>
6722	6722	<elision3>	<elision3>
6722	6722	<>	<elision3>
6722	6722	<elision2>	<elision2>
6722	6722	<>	<elision2>
6722	6722	<elision1>	<elision1>
6722	6722	<>	<elision1>
6722	6719	.	υ
6722	6730	s	υ
6722	6719	.	u
6722	6730	s	u
6722	6745	.	κ
6722	6757	s	κ
6722	6763	s	k
6722	6766	s	U
6722	6817	s	K
6722	6719	.	α
6722	6730	s	α
6722	6719	.	a
6722	6730	s	a
6722	6795	s	A
6722	6763	s	λ
6722	6763	s	l
6722	6824	s	L
6723	6722	.	.
6723	6723	 	 
6723	6722	<~>	<~>
6723	6722	<split-s>	<split-s>
6723	6722	<split-h>	<split-h>
6723	6722	<name2>	<name2>
6723	6724	<>	<name>
6723	6726	<aphaerese>	<aphaerese>
6723	6729	<>	<aphaerese>
6723	6722	<elision3>	<elision3>
6723	6729	<>	<elision3>
6723	6722	<elision2>	<elision2>
6723	6729	<>	<elision2>
6723	6722	<elision1>	<elision1>
6723	6729	<>	<elision1>
6723	6719	.	υ
6723	6806	s	υ
6723	6719	.	u
6723	6806	s	u
6723	6745	.	κ
6723	6807	s	κ
6723	6808	s	k
6723	6809	s	U
6723	6811	s	K
6723	6719	.	α
6723	6806	s	α
6723	6719	.	a
6723	6806	s	a
6723	6813	s	A
6723	6808	s	λ
6723	6808	s	l
6723	6814	s	L
6724	6725	.	.
6724	6728	 	 
6724	6725	<~>	<~>
6724	6725	<split-s>	<split-s>
6724	6725	<split-h>	<split-h>
6724	6725	<name2>	<name2>
6724	6816	<aphaerese>	<aphaerese>
6724	6829	<>	<aphaerese>
6724	6725	<elision3>	<elision3>
6724	6829	<>	<elision3>
6724	6725	<elision2>	<elision2>
6724	6829	<>	<elision2>
6724	6725	<elision1>	<elision1>
6724	6829	<>	<elision1>
6724	6721	.	υ
6724	6744	s	υ
6724	6721	.	u
6724	6744	s	u
6724	6747	.	κ
6724	6759	s	κ
6724	6765	s	k
6724	6768	s	U
6724	6771	s	K
6724	6721	.	α
6724	6744	s	α
6724	6721	.	a
6724	6744	s	a
6724	6797	s	A
6724	6765	s	λ
6724	6765	s	l
6724	6800	s	L
6725	6722	.	.
6725	6723	 	 
6725	6722	<~>	<~>
6725	6722	<split-s>	<split-s>
6725	6722	<split-h>	<split-h>
6725	6722	<name2>	<name2>
6725	6726	<aphaerese>	<aphaerese>
6725	6722	<>	<aphaerese>
6725	6722	<elision3>	<elision3>
6725	6722	<>	<elision3>
6725	6722	<elision2>	<elision2>
6725	6722	<>	<elision2>
6725	6722	<elision1>	<elision1>
6725	6722	<>	<elision1>
6725	6719	.	υ
6725	6730	s	υ
6725	6719	.	u
6725	6730	s	u
6725	6745	.	κ
6725	6757	s	κ
6725	6763	s	k
6725	6766	s	U
6725	6817	s	K
6725	6719	.	α
6725	6730	s	α
6725	6719	.	a
6725	6730	s	a
6725	6795	s	A
6725	6763	s	λ
6725	6763	s	l
6725	6824	s	L
6726	6722	.	.
6726	6723	 	 
6726	6722	<~>	<~>
6726	6722	<split-s>	<split-s>
6726	6722	<split-h>	<split-h>
6726	6722	<name2>	<name2>
6726	6727	<>	<name>
6726	6726	<aphaerese>	<aphaerese>
6726	6726	<>	<aphaerese>
6726	6722	<elision3>	<elision3>
6726	6726	<>	<elision3>
6726	6722	<elision2>	<elision2>
6726	6726	<>	<elision2>
6726	6722	<elision1>	<elision1>
6726	6726	<>	<elision1>
6726	6722	.	υ
6726	6722	.	u
6726	6745	.	κ
6726	6757	s	κ
6726	6763	s	k
6726	6766	s	U
6726	6817	s	K
6726	6722	.	α
6726	6722	.	a
6726	6795	s	A
6726	6763	s	λ
6726	6763	s	l
6726	6824	s	L
6727	6725	.	.
6727	6728	 	 
6727	6725	<~>	<~>
6727	6725	<split-s>	<split-s>
6727	6725	<split-h>	<split-h>
6727	6725	<name2>	<name2>
6727	6816	<aphaerese>	<aphaerese>
6727	6816	<>	<aphaerese>
6727	6725	<elision3>	<elision3>
6727	6816	<>	<elision3>
6727	6725	<elision2>	<elision2>
6727	6816	<>	<elision2>
6727	6725	<elision1>	<elision1>
6727	6816	<>	<elision1>
6727	6725	.	υ
6727	6725	.	u
6727	6747	.	κ
6727	6759	s	κ
6727	6765	s	k
6727	6768	s	U
6727	6819	s	K
6727	6725	.	α
6727	6725	.	a
6727	6797	s	A
6727	6765	s	λ
6727	6765	s	l
6727	6826	s	L
6728	6722	.	.
6728	6723	 	 
6728	6722	<~>	<~>
6728	6722	<split-s>	<split-s>
6728	6722	<split-h>	<split-h>
6728	6722	<name2>	<name2>
6728	6726	<aphaerese>	<aphaerese>
6728	6729	<>	<aphaerese>
6728	6722	<elision3>	<elision3>
6728	6729	<>	<elision3>
6728	6722	<elision2>	<elision2>
6728	6729	<>	<elision2>
6728	6722	<elision1>	<elision1>
6728	6729	<>	<elision1>
6728	6719	.	υ
6728	6806	s	υ
6728	6719	.	u
6728	6806	s	u
6728	6745	.	κ
6728	6807	s	κ
6728	6808	s	k
6728	6809	s	U
6728	6811	s	K
6728	6719	.	α
6728	6806	s	α
6728	6719	.	a
6728	6806	s	a
6728	6813	s	A
6728	6808	s	λ
6728	6808	s	l
6728	6814	s	L
6729	6722	.	.
6729	6723	 	 
6729	6722	<~>	<~>
6729	6722	<split-s>	<split-s>
6729	6722	<split-h>	<split-h>
6729	6722	<name2>	<name2>
6729	6724	<>	<name>
6729	6726	<aphaerese>	<aphaerese>
6729	6729	<>	<aphaerese>
6729	6722	<elision3>	<elision3>
6729	6729	<>	<elision3>
6729	6722	<elision2>	<elision2>
6729	6729	<>	<elision2>
6729	6722	<elision1>	<elision1>
6729	6729	<>	<elision1>
6729	6719	.	υ
6729	6730	s	υ
6729	6719	.	u
6729	6730	s	u
6729	6745	.	κ
6729	6757	s	κ
6729	6763	s	k
6729	6766	s	U
6729	6769	s	K
6729	6719	.	α
6729	6730	s	α
6729	6719	.	a
6729	6730	s	a
6729	6795	s	A
6729	6763	s	λ
6729	6763	s	l
6729	6798	s	L
6730	6731	.	.
6730	6731	 	 
6730	6731	<~>	<~>
6730	6731	<split-s>	<split-s>
6730	6731	<split-h>	<split-h>
6730	6731	<name2>	<name2>
6730	6743	<>	<name>
6730	6734	<aphaerese>	<aphaerese>
6730	6730	<>	<aphaerese>
6730	6730	<>	<elision3>
6730	6730	<>	<elision2>
6730	6730	<>	<elision1>
6730	6740	.	υ
6730	6740	.	u
6730	6737	.	κ
6730	6740	.	α
6730	6740	.	a
6730	5227	<3s>	<>
6731	6731	.	.
6731	6731	 	 
6731	6731	<~>	<~>
6731	6731	<split-s>	<split-s>
6731	6731	<split-h>	<split-h>
6731	6731	<name2>	<name2>
6731	6732	<>	<name>
6731	6734	<aphaerese>	<aphaerese>
6731	6731	<>	<aphaerese>
6731	6731	<elision3>	<elision3>
6731	6731	<>	<elision3>
6731	6731	<elision2>	<elision2>
6731	6731	<>	<elision2>
6731	6731	<elision1>	<elision1>
6731	6731	<>	<elision1>
6731	6740	.	υ
6731	6740	.	u
6731	6737	.	κ
6731	6740	.	α
6731	6740	.	a
6731	5222	<3s>	<>
6732	6733	.	.
6732	6733	 	 
6732	6733	<~>	<~>
6732	6733	<split-s>	<split-s>
6732	6733	<split-h>	<split-h>
6732	6733	<name2>	<name2>
6732	6736	<aphaerese>	<aphaerese>
6732	6733	<>	<aphaerese>
6732	6733	<elision3>	<elision3>
6732	6733	<>	<elision3>
6732	6733	<elision2>	<elision2>
6732	6733	<>	<elision2>
6732	6733	<elision1>	<elision1>
6732	6733	<>	<elision1>
6732	6742	.	υ
6732	6742	.	u
6732	6739	.	κ
6732	6742	.	α
6732	6742	.	a
6732	5223	<3s>	<>
6733	6731	.	.
6733	6731	 	 
6733	6731	<~>	<~>
6733	6731	<split-s>	<split-s>
6733	6731	<split-h>	<split-h>
6733	6731	<name2>	<name2>
6733	6734	<aphaerese>	<aphaerese>
6733	6731	<>	<aphaerese>
6733	6731	<elision3>	<elision3>
6733	6731	<>	<elision3>
6733	6731	<elision2>	<elision2>
6733	6731	<>	<elision2>
6733	6731	<elision1>	<elision1>
6733	6731	<>	<elision1>
6733	6740	.	υ
6733	6740	.	u
6733	6737	.	κ
6733	6740	.	α
6733	6740	.	a
6733	5221	<3s>	<>
6734	6731	.	.
6734	6731	 	 
6734	6731	<~>	<~>
6734	6731	<split-s>	<split-s>
6734	6731	<split-h>	<split-h>
6734	6731	<name2>	<name2>
6734	6735	<>	<name>
6734	6734	<aphaerese>	<aphaerese>
6734	6734	<>	<aphaerese>
6734	6731	<elision3>	<elision3>
6734	6734	<>	<elision3>
6734	6731	<elision2>	<elision2>
6734	6734	<>	<elision2>
6734	6731	<elision1>	<elision1>
6734	6734	<>	<elision1>
6734	6731	.	υ
6734	6731	.	u
6734	6737	.	κ
6734	6731	.	α
6734	6731	.	a
6734	5209	<3s>	<>
6735	6733	.	.
6735	6733	 	 
6735	6733	<~>	<~>
6735	6733	<split-s>	<split-s>
6735	6733	<split-h>	<split-h>
6735	6733	<name2>	<name2>
6735	6736	<aphaerese>	<aphaerese>
6735	6736	<>	<aphaerese>
6735	6733	<elision3>	<elision3>
6735	6736	<>	<elision3>
6735	6733	<elision2>	<elision2>
6735	6736	<>	<elision2>
6735	6733	<elision1>	<elision1>
6735	6736	<>	<elision1>
6735	6733	.	υ
6735	6733	.	u
6735	6739	.	κ
6735	6733	.	α
6735	6733	.	a
6735	5210	<3s>	<>
6736	6731	.	.
6736	6731	 	 
6736	6731	<~>	<~>
6736	6731	<split-s>	<split-s>
6736	6731	<split-h>	<split-h>
6736	6731	<name2>	<name2>
6736	6734	<aphaerese>	<aphaerese>
6736	6734	<>	<aphaerese>
6736	6731	<elision3>	<elision3>
6736	6734	<>	<elision3>
6736	6731	<elision2>	<elision2>
6736	6734	<>	<elision2>
6736	6731	<elision1>	<elision1>
6736	6734	<>	<elision1>
6736	6731	.	υ
6736	6731	.	u
6736	6737	.	κ
6736	6731	.	α
6736	6731	.	a
6736	5208	<3s>	<>
6737	6738	<>	<name>
6737	6737	<>	<aphaerese>
6737	5298	<elision3>	<elision3>
6737	6737	<>	<elision3>
6737	5298	<elision2>	<elision2>
6737	6737	<>	<elision2>
6737	5298	<elision1>	<elision1>
6737	6737	<>	<elision1>
6737	5206	<3s>	<>
6738	6739	<>	<aphaerese>
6738	5297	<elision3>	<elision3>
6738	6739	<>	<elision3>
6738	5297	<elision2>	<elision2>
6738	6739	<>	<elision2>
6738	5297	<elision1>	<elision1>
6738	6739	<>	<elision1>
6738	5207	<3s>	<>
6739	6737	<>	<aphaerese>
6739	5298	<elision3>	<elision3>
6739	6737	<>	<elision3>
6739	5298	<elision2>	<elision2>
6739	6737	<>	<elision2>
6739	5298	<elision1>	<elision1>
6739	6737	<>	<elision1>
6739	5205	<3s>	<>
6740	6741	<>	<name>
6740	6740	<>	<aphaerese>
6740	6731	<elision3>	<elision3>
6740	6740	<>	<elision3>
6740	6731	<elision2>	<elision2>
6740	6740	<>	<elision2>
6740	6731	<elision1>	<elision1>
6740	6740	<>	<elision1>
6740	176	<3s>	<>
6741	6742	<>	<aphaerese>
6741	6733	<elision3>	<elision3>
6741	6742	<>	<elision3>
6741	6733	<elision2>	<elision2>
6741	6742	<>	<elision2>
6741	6733	<elision1>	<elision1>
6741	6742	<>	<elision1>
6741	177	<3s>	<>
6742	6740	<>	<aphaerese>
6742	6731	<elision3>	<elision3>
6742	6740	<>	<elision3>
6742	6731	<elision2>	<elision2>
6742	6740	<>	<elision2>
6742	6731	<elision1>	<elision1>
6742	6740	<>	<elision1>
6742	175	<3s>	<>
6743	6733	.	.
6743	6733	 	 
6743	6733	<~>	<~>
6743	6733	<split-s>	<split-s>
6743	6733	<split-h>	<split-h>
6743	6733	<name2>	<name2>
6743	6736	<aphaerese>	<aphaerese>
6743	6744	<>	<aphaerese>
6743	6744	<>	<elision3>
6743	6744	<>	<elision2>
6743	6744	<>	<elision1>
6743	6742	.	υ
6743	6742	.	u
6743	6739	.	κ
6743	6742	.	α
6743	6742	.	a
6743	5228	<3s>	<>
6744	6731	.	.
6744	6731	 	 
6744	6731	<~>	<~>
6744	6731	<split-s>	<split-s>
6744	6731	<split-h>	<split-h>
6744	6731	<name2>	<name2>
6744	6734	<aphaerese>	<aphaerese>
6744	6730	<>	<aphaerese>
6744	6730	<>	<elision3>
6744	6730	<>	<elision2>
6744	6730	<>	<elision1>
6744	6740	.	υ
6744	6740	.	u
6744	6737	.	κ
6744	6740	.	α
6744	6740	.	a
6744	5226	<3s>	<>
6745	6746	<>	<name>
6745	6745	<>	<aphaerese>
6745	6748	<elision3>	<elision3>
6745	6745	<>	<elision3>
6745	6748	<elision2>	<elision2>
6745	6745	<>	<elision2>
6745	6748	<elision1>	<elision1>
6745	6745	<>	<elision1>
6746	6747	<>	<aphaerese>
6746	6750	<elision3>	<elision3>
6746	6747	<>	<elision3>
6746	6750	<elision2>	<elision2>
6746	6747	<>	<elision2>
6746	6750	<elision1>	<elision1>
6746	6747	<>	<elision1>
6747	6745	<>	<aphaerese>
6747	6748	<elision3>	<elision3>
6747	6745	<>	<elision3>
6747	6748	<elision2>	<elision2>
6747	6745	<>	<elision2>
6747	6748	<elision1>	<elision1>
6747	6745	<>	<elision1>
6748	6749	<>	<name>
6748	6748	<>	<aphaerese>
6748	6748	<>	<elision3>
6748	6748	<>	<elision2>
6748	6748	<>	<elision1>
6748	5639	s	κ
6748	5639	s	k
6748	6751	s	K
6748	5639	s	λ
6748	5639	s	l
6748	6754	s	L
6749	6750	<>	<aphaerese>
6749	6750	<>	<elision3>
6749	6750	<>	<elision2>
6749	6750	<>	<elision1>
6749	5638	s	κ
6749	5638	s	k
6749	6753	s	K
6749	5638	s	λ
6749	5638	s	l
6749	6756	s	L
6750	6748	<>	<aphaerese>
6750	6748	<>	<elision3>
6750	6748	<>	<elision2>
6750	6748	<>	<elision1>
6750	5639	s	κ
6750	5639	s	k
6750	6751	s	K
6750	5639	s	λ
6750	5639	s	l
6750	6754	s	L
6751	6752	<>	<name>
6751	6751	<>	<aphaerese>
6751	6751	<>	<elision3>
6751	6751	<>	<elision2>
6751	6751	<>	<elision1>
6751	5639	<K2kl>	<>
6752	6753	<>	<aphaerese>
6752	6753	<>	<elision3>
6752	6753	<>	<elision2>
6752	6753	<>	<elision1>
6752	5640	<K2kl>	<>
6753	6751	<>	<aphaerese>
6753	6751	<>	<elision3>
6753	6751	<>	<elision2>
6753	6751	<>	<elision1>
6753	5638	<K2kl>	<>
6754	6755	<>	<name>
6754	6754	<>	<aphaerese>
6754	6754	<>	<elision3>
6754	6754	<>	<elision2>
6754	6754	<>	<elision1>
6754	5639	<L2kl>	<>
6755	6756	<>	<aphaerese>
6755	6756	<>	<elision3>
6755	6756	<>	<elision2>
6755	6756	<>	<elision1>
6755	5640	<L2kl>	<>
6756	6754	<>	<aphaerese>
6756	6754	<>	<elision3>
6756	6754	<>	<elision2>
6756	6754	<>	<elision1>
6756	5638	<L2kl>	<>
6757	6731	.	.
6757	6731	 	 
6757	6731	<~>	<~>
6757	6731	<split-s>	<split-s>
6757	6731	<split-h>	<split-h>
6757	6731	<name2>	<name2>
6757	6758	<>	<name>
6757	6734	<aphaerese>	<aphaerese>
6757	6757	<>	<aphaerese>
6757	6760	<elision3>	<elision3>
6757	6757	<>	<elision3>
6757	6760	<elision2>	<elision2>
6757	6757	<>	<elision2>
6757	6760	<elision1>	<elision1>
6757	6757	<>	<elision1>
6757	6740	.	υ
6757	6740	.	u
6757	6740	.	κ
6757	6740	.	α
6757	6740	.	a
6757	6740	.	λ
6757	5407	<3s>	<>
6758	6733	.	.
6758	6733	 	 
6758	6733	<~>	<~>
6758	6733	<split-s>	<split-s>
6758	6733	<split-h>	<split-h>
6758	6733	<name2>	<name2>
6758	6736	<aphaerese>	<aphaerese>
6758	6759	<>	<aphaerese>
6758	6762	<elision3>	<elision3>
6758	6759	<>	<elision3>
6758	6762	<elision2>	<elision2>
6758	6759	<>	<elision2>
6758	6762	<elision1>	<elision1>
6758	6759	<>	<elision1>
6758	6742	.	υ
6758	6742	.	u
6758	6742	.	κ
6758	6742	.	α
6758	6742	.	a
6758	6742	.	λ
6758	5408	<3s>	<>
6759	6731	.	.
6759	6731	 	 
6759	6731	<~>	<~>
6759	6731	<split-s>	<split-s>
6759	6731	<split-h>	<split-h>
6759	6731	<name2>	<name2>
6759	6734	<aphaerese>	<aphaerese>
6759	6757	<>	<aphaerese>
6759	6760	<elision3>	<elision3>
6759	6757	<>	<elision3>
6759	6760	<elision2>	<elision2>
6759	6757	<>	<elision2>
6759	6760	<elision1>	<elision1>
6759	6757	<>	<elision1>
6759	6740	.	υ
6759	6740	.	u
6759	6740	.	κ
6759	6740	.	α
6759	6740	.	a
6759	6740	.	λ
6759	5406	<3s>	<>
6760	6731	.	.
6760	6731	 	 
6760	6731	<~>	<~>
6760	6731	<split-s>	<split-s>
6760	6731	<split-h>	<split-h>
6760	6731	<name2>	<name2>
6760	6761	<>	<name>
6760	6734	<aphaerese>	<aphaerese>
6760	6760	<>	<aphaerese>
6760	6731	<elision3>	<elision3>
6760	6760	<>	<elision3>
6760	6731	<elision2>	<elision2>
6760	6760	<>	<elision2>
6760	6731	<elision1>	<elision1>
6760	6760	<>	<elision1>
6760	6740	.	υ
6760	6740	.	u
6760	6737	.	κ
6760	6740	.	α
6760	6740	.	a
6760	5310	<3s>	<>
6761	6733	.	.
6761	6733	 	 
6761	6733	<~>	<~>
6761	6733	<split-s>	<split-s>
6761	6733	<split-h>	<split-h>
6761	6733	<name2>	<name2>
6761	6736	<aphaerese>	<aphaerese>
6761	6762	<>	<aphaerese>
6761	6733	<elision3>	<elision3>
6761	6762	<>	<elision3>
6761	6733	<elision2>	<elision2>
6761	6762	<>	<elision2>
6761	6733	<elision1>	<elision1>
6761	6762	<>	<elision1>
6761	6742	.	υ
6761	6742	.	u
6761	6739	.	κ
6761	6742	.	α
6761	6742	.	a
6761	5311	<3s>	<>
6762	6731	.	.
6762	6731	 	 
6762	6731	<~>	<~>
6762	6731	<split-s>	<split-s>
6762	6731	<split-h>	<split-h>
6762	6731	<name2>	<name2>
6762	6734	<aphaerese>	<aphaerese>
6762	6760	<>	<aphaerese>
6762	6731	<elision3>	<elision3>
6762	6760	<>	<elision3>
6762	6731	<elision2>	<elision2>
6762	6760	<>	<elision2>
6762	6731	<elision1>	<elision1>
6762	6760	<>	<elision1>
6762	6740	.	υ
6762	6740	.	u
6762	6737	.	κ
6762	6740	.	α
6762	6740	.	a
6762	5309	<3s>	<>
6763	6731	.	.
6763	6731	 	 
6763	6731	<~>	<~>
6763	6731	<split-s>	<split-s>
6763	6731	<split-h>	<split-h>
6763	6731	<name2>	<name2>
6763	6764	<>	<name>
6763	6734	<aphaerese>	<aphaerese>
6763	6763	<>	<aphaerese>
6763	6731	<elision3>	<elision3>
6763	6763	<>	<elision3>
6763	6731	<elision2>	<elision2>
6763	6763	<>	<elision2>
6763	6731	<elision1>	<elision1>
6763	6763	<>	<elision1>
6763	6740	.	υ
6763	6740	.	u
6763	6740	.	κ
6763	6740	.	α
6763	6740	.	a
6763	6740	.	λ
6763	5419	<3s>	<>
6764	6733	.	.
6764	6733	 	 
6764	6733	<~>	<~>
6764	6733	<split-s>	<split-s>
6764	6733	<split-h>	<split-h>
6764	6733	<name2>	<name2>
6764	6736	<aphaerese>	<aphaerese>
6764	6765	<>	<aphaerese>
6764	6733	<elision3>	<elision3>
6764	6765	<>	<elision3>
6764	6733	<elision2>	<elision2>
6764	6765	<>	<elision2>
6764	6733	<elision1>	<elision1>
6764	6765	<>	<elision1>
6764	6742	.	υ
6764	6742	.	u
6764	6742	.	κ
6764	6742	.	α
6764	6742	.	a
6764	6742	.	λ
6764	5420	<3s>	<>
6765	6731	.	.
6765	6731	 	 
6765	6731	<~>	<~>
6765	6731	<split-s>	<split-s>
6765	6731	<split-h>	<split-h>
6765	6731	<name2>	<name2>
6765	6734	<aphaerese>	<aphaerese>
6765	6763	<>	<aphaerese>
6765	6731	<elision3>	<elision3>
6765	6763	<>	<elision3>
6765	6731	<elision2>	<elision2>
6765	6763	<>	<elision2>
6765	6731	<elision1>	<elision1>
6765	6763	<>	<elision1>
6765	6740	.	υ
6765	6740	.	u
6765	6740	.	κ
6765	6740	.	α
6765	6740	.	a
6765	6740	.	λ
6765	5418	<3s>	<>
6766	6767	<>	<name>
6766	6766	<>	<aphaerese>
6766	6766	<>	<elision3>
6766	6766	<>	<elision2>
6766	6766	<>	<elision1>
6766	6731	<U2kl>	<>
6767	6768	<>	<aphaerese>
6767	6768	<>	<elision3>
6767	6768	<>	<elision2>
6767	6768	<>	<elision1>
6767	6732	<U2kl>	<>
6768	6766	<>	<aphaerese>
6768	6766	<>	<elision3>
6768	6766	<>	<elision2>
6768	6766	<>	<elision1>
6768	6733	<U2kl>	<>
6769	5729	<name>	<name>
6769	6770	<>	<name>
6769	6772	<>	<aphaerese>
6769	6772	<>	<elision3>
6769	6772	<>	<elision2>
6769	6772	<>	<elision1>
6769	5539	<3s>	<>
6769	6773	<A2kl>	<>
6769	6782	<L2kl>	<>
6769	6794	<K2kl>	<>
6770	6771	<>	<aphaerese>
6770	6771	<>	<elision3>
6770	6771	<>	<elision2>
6770	6771	<>	<elision1>
6770	6774	<A2kl>	<>
6770	6783	<L2kl>	<>
6770	6792	<K2kl>	<>
6771	6772	<>	<aphaerese>
6771	6772	<>	<elision3>
6771	6772	<>	<elision2>
6771	6772	<>	<elision1>
6771	6775	<A2kl>	<>
6771	6784	<L2kl>	<>
6771	6793	<K2kl>	<>
6772	6770	<>	<name>
6772	6772	<>	<aphaerese>
6772	6772	<>	<elision3>
6772	6772	<>	<elision2>
6772	6772	<>	<elision1>
6772	6773	<A2kl>	<>
6772	6782	<L2kl>	<>
6772	6791	<K2kl>	<>
6773	6774	<>	<name>
6773	6773	<>	<aphaerese>
6773	6773	<>	<elision3>
6773	6773	<>	<elision2>
6773	6773	<>	<elision1>
6773	6776	.	κ
6773	6776	.	λ
6773	5489	<3s>	<>
6774	6775	<>	<aphaerese>
6774	6775	<>	<elision3>
6774	6775	<>	<elision2>
6774	6775	<>	<elision1>
6774	6778	.	κ
6774	6778	.	λ
6774	5490	<3s>	<>
6775	6773	<>	<aphaerese>
6775	6773	<>	<elision3>
6775	6773	<>	<elision2>
6775	6773	<>	<elision1>
6775	6776	.	κ
6775	6776	.	λ
6775	5488	<3s>	<>
6776	6777	<>	<name>
6776	6776	<>	<aphaerese>
6776	6779	<elision3>	<elision3>
6776	6776	<>	<elision3>
6776	6779	<elision2>	<elision2>
6776	6776	<>	<elision2>
6776	6779	<elision1>	<elision1>
6776	6776	<>	<elision1>
6776	5480	<3s>	<>
6777	6778	<>	<aphaerese>
6777	6781	<elision3>	<elision3>
6777	6778	<>	<elision3>
6777	6781	<elision2>	<elision2>
6777	6778	<>	<elision2>
6777	6781	<elision1>	<elision1>
6777	6778	<>	<elision1>
6777	5481	<3s>	<>
6778	6776	<>	<aphaerese>
6778	6779	<elision3>	<elision3>
6778	6776	<>	<elision3>
6778	6779	<elision2>	<elision2>
6778	6776	<>	<elision2>
6778	6779	<elision1>	<elision1>
6778	6776	<>	<elision1>
6778	5479	<3s>	<>
6779	6731	.	.
6779	6731	 	 
6779	6731	<~>	<~>
6779	6731	<split-s>	<split-s>
6779	6731	<split-h>	<split-h>
6779	6731	<name2>	<name2>
6779	6780	<>	<name>
6779	6734	<aphaerese>	<aphaerese>
6779	6779	<>	<aphaerese>
6779	6731	<elision3>	<elision3>
6779	6779	<>	<elision3>
6779	6731	<elision2>	<elision2>
6779	6779	<>	<elision2>
6779	6731	<elision1>	<elision1>
6779	6779	<>	<elision1>
6779	6740	.	υ
6779	6740	.	u
6779	6740	.	α
6779	6740	.	a
6779	5444	<3s>	<>
6780	6733	.	.
6780	6733	 	 
6780	6733	<~>	<~>
6780	6733	<split-s>	<split-s>
6780	6733	<split-h>	<split-h>
6780	6733	<name2>	<name2>
6780	6736	<aphaerese>	<aphaerese>
6780	6781	<>	<aphaerese>
6780	6733	<elision3>	<elision3>
6780	6781	<>	<elision3>
6780	6733	<elision2>	<elision2>
6780	6781	<>	<elision2>
6780	6733	<elision1>	<elision1>
6780	6781	<>	<elision1>
6780	6742	.	υ
6780	6742	.	u
6780	6742	.	α
6780	6742	.	a
6780	5445	<3s>	<>
6781	6731	.	.
6781	6731	 	 
6781	6731	<~>	<~>
6781	6731	<split-s>	<split-s>
6781	6731	<split-h>	<split-h>
6781	6731	<name2>	<name2>
6781	6734	<aphaerese>	<aphaerese>
6781	6779	<>	<aphaerese>
6781	6731	<elision3>	<elision3>
6781	6779	<>	<elision3>
6781	6731	<elision2>	<elision2>
6781	6779	<>	<elision2>
6781	6731	<elision1>	<elision1>
6781	6779	<>	<elision1>
6781	6740	.	υ
6781	6740	.	u
6781	6740	.	α
6781	6740	.	a
6781	5443	<3s>	<>
6782	6783	<>	<name>
6782	6782	<>	<aphaerese>
6782	6782	<>	<elision3>
6782	6782	<>	<elision2>
6782	6782	<>	<elision1>
6782	6785	.	κ
6782	6785	.	λ
6782	5522	<3s>	<>
6783	6784	<>	<aphaerese>
6783	6784	<>	<elision3>
6783	6784	<>	<elision2>
6783	6784	<>	<elision1>
6783	6787	.	κ
6783	6787	.	λ
6783	5523	<3s>	<>
6784	6782	<>	<aphaerese>
6784	6782	<>	<elision3>
6784	6782	<>	<elision2>
6784	6782	<>	<elision1>
6784	6785	.	κ
6784	6785	.	λ
6784	5521	<3s>	<>
6785	6786	<>	<name>
6785	6785	<>	<aphaerese>
6785	6788	<elision3>	<elision3>
6785	6785	<>	<elision3>
6785	6788	<elision2>	<elision2>
6785	6785	<>	<elision2>
6785	6788	<elision1>	<elision1>
6785	6785	<>	<elision1>
6785	5513	<3s>	<>
6786	6787	<>	<aphaerese>
6786	6790	<elision3>	<elision3>
6786	6787	<>	<elision3>
6786	6790	<elision2>	<elision2>
6786	6787	<>	<elision2>
6786	6790	<elision1>	<elision1>
6786	6787	<>	<elision1>
6786	5514	<3s>	<>
6787	6785	<>	<aphaerese>
6787	6788	<elision3>	<elision3>
6787	6785	<>	<elision3>
6787	6788	<elision2>	<elision2>
6787	6785	<>	<elision2>
6787	6788	<elision1>	<elision1>
6787	6785	<>	<elision1>
6787	5512	<3s>	<>
6788	6789	<>	<name>
6788	6788	<>	<aphaerese>
6788	6788	<>	<elision3>
6788	6788	<>	<elision2>
6788	6788	<>	<elision1>
6788	6737	.	κ
6788	5507	<3s>	<>
6789	6790	<>	<aphaerese>
6789	6790	<>	<elision3>
6789	6790	<>	<elision2>
6789	6790	<>	<elision1>
6789	6739	.	κ
6789	5508	<3s>	<>
6790	6788	<>	<aphaerese>
6790	6788	<>	<elision3>
6790	6788	<>	<elision2>
6790	6788	<>	<elision1>
6790	6737	.	κ
6790	5506	<3s>	<>
6791	6731	.	.
6791	6731	 	 
6791	6731	<~>	<~>
6791	6731	<split-s>	<split-s>
6791	6731	<split-h>	<split-h>
6791	6731	<name2>	<name2>
6791	6792	<>	<name>
6791	6734	<aphaerese>	<aphaerese>
6791	6791	<>	<aphaerese>
6791	6731	<elision3>	<elision3>
6791	6791	<>	<elision3>
6791	6731	<elision2>	<elision2>
6791	6791	<>	<elision2>
6791	6731	<elision1>	<elision1>
6791	6791	<>	<elision1>
6791	6740	.	υ
6791	6740	.	u
6791	6740	.	α
6791	6740	.	a
6791	5534	<3s>	<>
6792	6733	.	.
6792	6733	 	 
6792	6733	<~>	<~>
6792	6733	<split-s>	<split-s>
6792	6733	<split-h>	<split-h>
6792	6733	<name2>	<name2>
6792	6736	<aphaerese>	<aphaerese>
6792	6793	<>	<aphaerese>
6792	6733	<elision3>	<elision3>
6792	6793	<>	<elision3>
6792	6733	<elision2>	<elision2>
6792	6793	<>	<elision2>
6792	6733	<elision1>	<elision1>
6792	6793	<>	<elision1>
6792	6742	.	υ
6792	6742	.	u
6792	6742	.	α
6792	6742	.	a
6792	5535	<3s>	<>
6793	6731	.	.
6793	6731	 	 
6793	6731	<~>	<~>
6793	6731	<split-s>	<split-s>
6793	6731	<split-h>	<split-h>
6793	6731	<name2>	<name2>
6793	6734	<aphaerese>	<aphaerese>
6793	6791	<>	<aphaerese>
6793	6731	<elision3>	<elision3>
6793	6791	<>	<elision3>
6793	6731	<elision2>	<elision2>
6793	6791	<>	<elision2>
6793	6731	<elision1>	<elision1>
6793	6791	<>	<elision1>
6793	6740	.	υ
6793	6740	.	u
6793	6740	.	α
6793	6740	.	a
6793	5533	<3s>	<>
6794	6731	.	.
6794	6731	 	 
6794	6731	<~>	<~>
6794	6731	<split-s>	<split-s>
6794	6731	<split-h>	<split-h>
6794	6731	<name2>	<name2>
6794	5729	<name2>	<name>
6794	6792	<>	<name>
6794	6734	<aphaerese>	<aphaerese>
6794	6791	<>	<aphaerese>
6794	6731	<elision3>	<elision3>
6794	6791	<>	<elision3>
6794	6731	<elision2>	<elision2>
6794	6791	<>	<elision2>
6794	6731	<elision1>	<elision1>
6794	6791	<>	<elision1>
6794	6740	.	υ
6794	6740	.	u
6794	6740	.	α
6794	6740	.	a
6794	5543	<3s>	<>
6795	6796	<>	<name>
6795	6795	<>	<aphaerese>
6795	6795	<>	<elision3>
6795	6795	<>	<elision2>
6795	6795	<>	<elision1>
6795	6731	<A2kl>	<>
6796	6797	<>	<aphaerese>
6796	6797	<>	<elision3>
6796	6797	<>	<elision2>
6796	6797	<>	<elision1>
6796	6732	<A2kl>	<>
6797	6795	<>	<aphaerese>
6797	6795	<>	<elision3>
6797	6795	<>	<elision2>
6797	6795	<>	<elision1>
6797	6733	<A2kl>	<>
6798	5729	<name>	<name>
6798	6799	<>	<name>
6798	6801	<>	<aphaerese>
6798	6801	<>	<elision3>
6798	6801	<>	<elision2>
6798	6801	<>	<elision1>
6798	5539	<3s>	<>
6798	6773	<A2kl>	<>
6798	6805	<L2kl>	<>
6799	6800	<>	<aphaerese>
6799	6800	<>	<elision3>
6799	6800	<>	<elision2>
6799	6800	<>	<elision1>
6799	6774	<A2kl>	<>
6799	6803	<L2kl>	<>
6800	6801	<>	<aphaerese>
6800	6801	<>	<elision3>
6800	6801	<>	<elision2>
6800	6801	<>	<elision1>
6800	6775	<A2kl>	<>
6800	6804	<L2kl>	<>
6801	6799	<>	<name>
6801	6801	<>	<aphaerese>
6801	6801	<>	<elision3>
6801	6801	<>	<elision2>
6801	6801	<>	<elision1>
6801	6773	<A2kl>	<>
6801	6802	<L2kl>	<>
6802	6731	.	.
6802	6731	 	 
6802	6731	<~>	<~>
6802	6731	<split-s>	<split-s>
6802	6731	<split-h>	<split-h>
6802	6731	<name2>	<name2>
6802	6803	<>	<name>
6802	6734	<aphaerese>	<aphaerese>
6802	6802	<>	<aphaerese>
6802	6731	<elision3>	<elision3>
6802	6802	<>	<elision3>
6802	6731	<elision2>	<elision2>
6802	6802	<>	<elision2>
6802	6731	<elision1>	<elision1>
6802	6802	<>	<elision1>
6802	6740	.	υ
6802	6740	.	u
6802	6785	.	κ
6802	6740	.	α
6802	6740	.	a
6802	6785	.	λ
6802	5556	<3s>	<>
6803	6733	.	.
6803	6733	 	 
6803	6733	<~>	<~>
6803	6733	<split-s>	<split-s>
6803	6733	<split-h>	<split-h>
6803	6733	<name2>	<name2>
6803	6736	<aphaerese>	<aphaerese>
6803	6804	<>	<aphaerese>
6803	6733	<elision3>	<elision3>
6803	6804	<>	<elision3>
6803	6733	<elision2>	<elision2>
6803	6804	<>	<elision2>
6803	6733	<elision1>	<elision1>
6803	6804	<>	<elision1>
6803	6742	.	υ
6803	6742	.	u
6803	6787	.	κ
6803	6742	.	α
6803	6742	.	a
6803	6787	.	λ
6803	5557	<3s>	<>
6804	6731	.	.
6804	6731	 	 
6804	6731	<~>	<~>
6804	6731	<split-s>	<split-s>
6804	6731	<split-h>	<split-h>
6804	6731	<name2>	<name2>
6804	6734	<aphaerese>	<aphaerese>
6804	6802	<>	<aphaerese>
6804	6731	<elision3>	<elision3>
6804	6802	<>	<elision3>
6804	6731	<elision2>	<elision2>
6804	6802	<>	<elision2>
6804	6731	<elision1>	<elision1>
6804	6802	<>	<elision1>
6804	6740	.	υ
6804	6740	.	u
6804	6785	.	κ
6804	6740	.	α
6804	6740	.	a
6804	6785	.	λ
6804	5555	<3s>	<>
6805	6731	.	.
6805	6731	 	 
6805	6731	<~>	<~>
6805	6731	<split-s>	<split-s>
6805	6731	<split-h>	<split-h>
6805	6731	<name2>	<name2>
6805	5729	<name2>	<name>
6805	6803	<>	<name>
6805	6734	<aphaerese>	<aphaerese>
6805	6802	<>	<aphaerese>
6805	6731	<elision3>	<elision3>
6805	6802	<>	<elision3>
6805	6731	<elision2>	<elision2>
6805	6802	<>	<elision2>
6805	6731	<elision1>	<elision1>
6805	6802	<>	<elision1>
6805	6740	.	υ
6805	6740	.	u
6805	6785	.	κ
6805	6740	.	α
6805	6740	.	a
6805	6785	.	λ
6805	5562	<3s>	<>
6806	6731	.	.
6806	6731	 	 
6806	6731	<~>	<~>
6806	6731	<split-s>	<split-s>
6806	6731	<split-h>	<split-h>
6806	6731	<name2>	<name2>
6806	6743	<>	<name>
6806	6734	<aphaerese>	<aphaerese>
6806	6730	<>	<aphaerese>
6806	6730	<>	<elision3>
6806	6730	<>	<elision2>
6806	6730	<>	<elision1>
6806	6740	.	υ
6806	6740	.	u
6806	6737	.	κ
6806	6740	.	α
6806	6740	.	a
6806	5568	<3s>	<>
6807	6731	.	.
6807	6731	 	 
6807	6731	<~>	<~>
6807	6731	<split-s>	<split-s>
6807	6731	<split-h>	<split-h>
6807	6731	<name2>	<name2>
6807	6758	<>	<name>
6807	6734	<aphaerese>	<aphaerese>
6807	6757	<>	<aphaerese>
6807	6760	<elision3>	<elision3>
6807	6757	<>	<elision3>
6807	6760	<elision2>	<elision2>
6807	6757	<>	<elision2>
6807	6760	<elision1>	<elision1>
6807	6757	<>	<elision1>
6807	6740	.	υ
6807	6740	.	u
6807	6740	.	κ
6807	6740	.	α
6807	6740	.	a
6807	6740	.	λ
6807	5571	<3s>	<>
6808	6731	.	.
6808	6731	 	 
6808	6731	<~>	<~>
6808	6731	<split-s>	<split-s>
6808	6731	<split-h>	<split-h>
6808	6731	<name2>	<name2>
6808	6764	<>	<name>
6808	6734	<aphaerese>	<aphaerese>
6808	6763	<>	<aphaerese>
6808	6731	<elision3>	<elision3>
6808	6763	<>	<elision3>
6808	6731	<elision2>	<elision2>
6808	6763	<>	<elision2>
6808	6731	<elision1>	<elision1>
6808	6763	<>	<elision1>
6808	6740	.	υ
6808	6740	.	u
6808	6740	.	κ
6808	6740	.	α
6808	6740	.	a
6808	6740	.	λ
6808	5574	<3s>	<>
6809	6767	<>	<name>
6809	6766	<>	<aphaerese>
6809	6766	<>	<elision3>
6809	6766	<>	<elision2>
6809	6766	<>	<elision1>
6809	6810	<U2kl>	<>
6810	6731	.	.
6810	6731	 	 
6810	6731	<~>	<~>
6810	6731	<split-s>	<split-s>
6810	6731	<split-h>	<split-h>
6810	6731	<name2>	<name2>
6810	6732	<>	<name>
6810	6734	<aphaerese>	<aphaerese>
6810	6731	<>	<aphaerese>
6810	6731	<elision3>	<elision3>
6810	6731	<>	<elision3>
6810	6731	<elision2>	<elision2>
6810	6731	<>	<elision2>
6810	6731	<elision1>	<elision1>
6810	6731	<>	<elision1>
6810	6740	.	υ
6810	6740	.	u
6810	6737	.	κ
6810	6740	.	α
6810	6740	.	a
6810	5578	<3s>	<>
6811	5729	<name>	<name>
6811	6770	<>	<name>
6811	6772	<>	<aphaerese>
6811	6772	<>	<elision3>
6811	6772	<>	<elision2>
6811	6772	<>	<elision1>
6811	5539	<3s>	<>
6811	6773	<A2kl>	<>
6811	6782	<L2kl>	<>
6811	6812	<K2kl>	<>
6812	6731	.	.
6812	6731	 	 
6812	6731	<~>	<~>
6812	6731	<split-s>	<split-s>
6812	6731	<split-h>	<split-h>
6812	6731	<name2>	<name2>
6812	5729	<name2>	<name>
6812	6792	<>	<name>
6812	6734	<aphaerese>	<aphaerese>
6812	6791	<>	<aphaerese>
6812	6731	<elision3>	<elision3>
6812	6791	<>	<elision3>
6812	6731	<elision2>	<elision2>
6812	6791	<>	<elision2>
6812	6731	<elision1>	<elision1>
6812	6791	<>	<elision1>
6812	6740	.	υ
6812	6740	.	u
6812	6740	.	α
6812	6740	.	a
6812	5582	<3s>	<>
6813	6796	<>	<name>
6813	6795	<>	<aphaerese>
6813	6795	<>	<elision3>
6813	6795	<>	<elision2>
6813	6795	<>	<elision1>
6813	6810	<A2kl>	<>
6814	5729	<name>	<name>
6814	6799	<>	<name>
6814	6801	<>	<aphaerese>
6814	6801	<>	<elision3>
6814	6801	<>	<elision2>
6814	6801	<>	<elision1>
6814	5539	<3s>	<>
6814	6773	<A2kl>	<>
6814	6815	<L2kl>	<>
6815	6731	.	.
6815	6731	 	 
6815	6731	<~>	<~>
6815	6731	<split-s>	<split-s>
6815	6731	<split-h>	<split-h>
6815	6731	<name2>	<name2>
6815	5729	<name2>	<name>
6815	6803	<>	<name>
6815	6734	<aphaerese>	<aphaerese>
6815	6802	<>	<aphaerese>
6815	6731	<elision3>	<elision3>
6815	6802	<>	<elision3>
6815	6731	<elision2>	<elision2>
6815	6802	<>	<elision2>
6815	6731	<elision1>	<elision1>
6815	6802	<>	<elision1>
6815	6740	.	υ
6815	6740	.	u
6815	6785	.	κ
6815	6740	.	α
6815	6740	.	a
6815	6785	.	λ
6815	5587	<3s>	<>
6816	6722	.	.
6816	6723	 	 
6816	6722	<~>	<~>
6816	6722	<split-s>	<split-s>
6816	6722	<split-h>	<split-h>
6816	6722	<name2>	<name2>
6816	6726	<aphaerese>	<aphaerese>
6816	6726	<>	<aphaerese>
6816	6722	<elision3>	<elision3>
6816	6726	<>	<elision3>
6816	6722	<elision2>	<elision2>
6816	6726	<>	<elision2>
6816	6722	<elision1>	<elision1>
6816	6726	<>	<elision1>
6816	6722	.	υ
6816	6722	.	u
6816	6745	.	κ
6816	6757	s	κ
6816	6763	s	k
6816	6766	s	U
6816	6817	s	K
6816	6722	.	α
6816	6722	.	a
6816	6795	s	A
6816	6763	s	λ
6816	6763	s	l
6816	6824	s	L
6817	5729	<name>	<name>
6817	6818	<>	<name>
6817	6820	<>	<aphaerese>
6817	6820	<>	<elision3>
6817	6820	<>	<elision2>
6817	6820	<>	<elision1>
6817	5539	<3s>	<>
6817	6821	<L2kl>	<>
6817	6794	<K2kl>	<>
6818	6819	<>	<aphaerese>
6818	6819	<>	<elision3>
6818	6819	<>	<elision2>
6818	6819	<>	<elision1>
6818	6822	<L2kl>	<>
6818	6792	<K2kl>	<>
6819	6820	<>	<aphaerese>
6819	6820	<>	<elision3>
6819	6820	<>	<elision2>
6819	6820	<>	<elision1>
6819	6823	<L2kl>	<>
6819	6793	<K2kl>	<>
6820	6818	<>	<name>
6820	6820	<>	<aphaerese>
6820	6820	<>	<elision3>
6820	6820	<>	<elision2>
6820	6820	<>	<elision1>
6820	6821	<L2kl>	<>
6820	6791	<K2kl>	<>
6821	6822	<>	<name>
6821	6821	<>	<aphaerese>
6821	6821	<>	<elision3>
6821	6821	<>	<elision2>
6821	6821	<>	<elision1>
6821	6740	.	κ
6821	6740	.	λ
6821	5598	<3s>	<>
6822	6823	<>	<aphaerese>
6822	6823	<>	<elision3>
6822	6823	<>	<elision2>
6822	6823	<>	<elision1>
6822	6742	.	κ
6822	6742	.	λ
6822	5599	<3s>	<>
6823	6821	<>	<aphaerese>
6823	6821	<>	<elision3>
6823	6821	<>	<elision2>
6823	6821	<>	<elision1>
6823	6740	.	κ
6823	6740	.	λ
6823	5597	<3s>	<>
6824	5729	<name>	<name>
6824	6825	<>	<name>
6824	6827	<>	<aphaerese>
6824	6827	<>	<elision3>
6824	6827	<>	<elision2>
6824	6827	<>	<elision1>
6824	5539	<3s>	<>
6824	6828	<L2kl>	<>
6825	6826	<>	<aphaerese>
6825	6826	<>	<elision3>
6825	6826	<>	<elision2>
6825	6826	<>	<elision1>
6825	6764	<L2kl>	<>
6826	6827	<>	<aphaerese>
6826	6827	<>	<elision3>
6826	6827	<>	<elision2>
6826	6827	<>	<elision1>
6826	6765	<L2kl>	<>
6827	6825	<>	<name>
6827	6827	<>	<aphaerese>
6827	6827	<>	<elision3>
6827	6827	<>	<elision2>
6827	6827	<>	<elision1>
6827	6763	<L2kl>	<>
6828	6731	.	.
6828	6731	 	 
6828	6731	<~>	<~>
6828	6731	<split-s>	<split-s>
6828	6731	<split-h>	<split-h>
6828	6731	<name2>	<name2>
6828	5729	<name2>	<name>
6828	6764	<>	<name>
6828	6734	<aphaerese>	<aphaerese>
6828	6763	<>	<aphaerese>
6828	6731	<elision3>	<elision3>
6828	6763	<>	<elision3>
6828	6731	<elision2>	<elision2>
6828	6763	<>	<elision2>
6828	6731	<elision1>	<elision1>
6828	6763	<>	<elision1>
6828	6740	.	υ
6828	6740	.	u
6828	6740	.	κ
6828	6740	.	α
6828	6740	.	a
6828	6740	.	λ
6828	5608	<3s>	<>
6829	6722	.	.
6829	6723	 	 
6829	6722	<~>	<~>
6829	6722	<split-s>	<split-s>
6829	6722	<split-h>	<split-h>
6829	6722	<name2>	<name2>
6829	6726	<aphaerese>	<aphaerese>
6829	6729	<>	<aphaerese>
6829	6722	<elision3>	<elision3>
6829	6729	<>	<elision3>
6829	6722	<elision2>	<elision2>
6829	6729	<>	<elision2>
6829	6722	<elision1>	<elision1>
6829	6729	<>	<elision1>
6829	6719	.	υ
6829	6730	s	υ
6829	6719	.	u
6829	6730	s	u
6829	6745	.	κ
6829	6757	s	κ
6829	6763	s	k
6829	6766	s	U
6829	6769	s	K
6829	6719	.	α
6829	6730	s	α
6829	6719	.	a
6829	6730	s	a
6829	6795	s	A
6829	6763	s	λ
6829	6763	s	l
6829	6798	s	L
6830	6725	.	.
6830	6728	 	 
6830	6725	<~>	<~>
6830	6725	<split-s>	<split-s>
6830	6725	<split-h>	<split-h>
6830	6725	<name2>	<name2>
6830	6816	<aphaerese>	<aphaerese>
6830	6725	<>	<aphaerese>
6830	6725	<elision3>	<elision3>
6830	6725	<>	<elision3>
6830	6725	<elision2>	<elision2>
6830	6725	<>	<elision2>
6830	6725	<elision1>	<elision1>
6830	6725	<>	<elision1>
6830	6721	.	υ
6830	6744	s	υ
6830	6721	.	u
6830	6744	s	u
6830	6747	.	κ
6830	6759	s	κ
6830	6765	s	k
6830	6768	s	U
6830	6819	s	K
6830	6721	.	α
6830	6744	s	α
6830	6721	.	a
6830	6744	s	a
6830	6797	s	A
6830	6765	s	λ
6830	6765	s	l
6830	6826	s	L
6831	6722	.	.
6831	6723	 	 
6831	6722	<~>	<~>
6831	6722	<split-s>	<split-s>
6831	6722	<split-h>	<split-h>
6831	6722	<name2>	<name2>
6831	6832	<name2>	<name>
6831	6833	<>	<name>
6831	6726	<aphaerese>	<aphaerese>
6831	6835	<>	<aphaerese>
6831	6722	<elision3>	<elision3>
6831	6835	<>	<elision3>
6831	6722	<elision2>	<elision2>
6831	6835	<>	<elision2>
6831	6722	<elision1>	<elision1>
6831	6835	<>	<elision1>
6831	6719	.	υ
6831	6730	s	υ
6831	6719	.	u
6831	6730	s	u
6831	6719	.	κ
6831	6836	s	κ
6831	6763	s	k
6831	6766	s	U
6831	6817	s	K
6831	6719	.	α
6831	6730	s	α
6831	6719	.	a
6831	6730	s	a
6831	6795	s	A
6831	6719	.	λ
6831	6836	s	λ
6831	6763	s	l
6831	6824	s	L
6832	6819	s	k
6832	6826	s	l
6833	6725	.	.
6833	6728	 	 
6833	6725	<~>	<~>
6833	6725	<split-s>	<split-s>
6833	6725	<split-h>	<split-h>
6833	6725	<name2>	<name2>
6833	6816	<aphaerese>	<aphaerese>
6833	6834	<>	<aphaerese>
6833	6725	<elision3>	<elision3>
6833	6834	<>	<elision3>
6833	6725	<elision2>	<elision2>
6833	6834	<>	<elision2>
6833	6725	<elision1>	<elision1>
6833	6834	<>	<elision1>
6833	6721	.	υ
6833	6744	s	υ
6833	6721	.	u
6833	6744	s	u
6833	6721	.	κ
6833	6838	s	κ
6833	6765	s	k
6833	6768	s	U
6833	6819	s	K
6833	6721	.	α
6833	6744	s	α
6833	6721	.	a
6833	6744	s	a
6833	6797	s	A
6833	6721	.	λ
6833	6838	s	λ
6833	6765	s	l
6833	6826	s	L
6834	6722	.	.
6834	6723	 	 
6834	6722	<~>	<~>
6834	6722	<split-s>	<split-s>
6834	6722	<split-h>	<split-h>
6834	6722	<name2>	<name2>
6834	6726	<aphaerese>	<aphaerese>
6834	6835	<>	<aphaerese>
6834	6722	<elision3>	<elision3>
6834	6835	<>	<elision3>
6834	6722	<elision2>	<elision2>
6834	6835	<>	<elision2>
6834	6722	<elision1>	<elision1>
6834	6835	<>	<elision1>
6834	6719	.	υ
6834	6730	s	υ
6834	6719	.	u
6834	6730	s	u
6834	6719	.	κ
6834	6836	s	κ
6834	6763	s	k
6834	6766	s	U
6834	6817	s	K
6834	6719	.	α
6834	6730	s	α
6834	6719	.	a
6834	6730	s	a
6834	6795	s	A
6834	6719	.	λ
6834	6836	s	λ
6834	6763	s	l
6834	6824	s	L
6835	6722	.	.
6835	6723	 	 
6835	6722	<~>	<~>
6835	6722	<split-s>	<split-s>
6835	6722	<split-h>	<split-h>
6835	6722	<name2>	<name2>
6835	6833	<>	<name>
6835	6726	<aphaerese>	<aphaerese>
6835	6835	<>	<aphaerese>
6835	6722	<elision3>	<elision3>
6835	6835	<>	<elision3>
6835	6722	<elision2>	<elision2>
6835	6835	<>	<elision2>
6835	6722	<elision1>	<elision1>
6835	6835	<>	<elision1>
6835	6719	.	υ
6835	6730	s	υ
6835	6719	.	u
6835	6730	s	u
6835	6719	.	κ
6835	6836	s	κ
6835	6763	s	k
6835	6766	s	U
6835	6817	s	K
6835	6719	.	α
6835	6730	s	α
6835	6719	.	a
6835	6730	s	a
6835	6795	s	A
6835	6719	.	λ
6835	6836	s	λ
6835	6763	s	l
6835	6824	s	L
6836	6731	.	.
6836	6731	 	 
6836	6731	<~>	<~>
6836	6731	<split-s>	<split-s>
6836	6731	<split-h>	<split-h>
6836	6731	<name2>	<name2>
6836	6837	<>	<name>
6836	6734	<aphaerese>	<aphaerese>
6836	6836	<>	<aphaerese>
6836	6836	<>	<elision3>
6836	6836	<>	<elision2>
6836	6836	<>	<elision1>
6836	6740	.	υ
6836	6740	.	u
6836	6740	.	κ
6836	6740	.	α
6836	6740	.	a
6836	6740	.	λ
6836	5633	<3s>	<>
6837	6733	.	.
6837	6733	 	 
6837	6733	<~>	<~>
6837	6733	<split-s>	<split-s>
6837	6733	<split-h>	<split-h>
6837	6733	<name2>	<name2>
6837	6736	<aphaerese>	<aphaerese>
6837	6838	<>	<aphaerese>
6837	6838	<>	<elision3>
6837	6838	<>	<elision2>
6837	6838	<>	<elision1>
6837	6742	.	υ
6837	6742	.	u
6837	6742	.	κ
6837	6742	.	α
6837	6742	.	a
6837	6742	.	λ
6837	5634	<3s>	<>
6838	6731	.	.
6838	6731	 	 
6838	6731	<~>	<~>
6838	6731	<split-s>	<split-s>
6838	6731	<split-h>	<split-h>
6838	6731	<name2>	<name2>
6838	6734	<aphaerese>	<aphaerese>
6838	6836	<>	<aphaerese>
6838	6836	<>	<elision3>
6838	6836	<>	<elision2>
6838	6836	<>	<elision1>
6838	6740	.	υ
6838	6740	.	u
6838	6740	.	κ
6838	6740	.	α
6838	6740	.	a
6838	6740	.	λ
6838	5632	<3s>	<>
6839	6840	<>	<aphaerese>
6839	6840	<>	<elision3>
6839	6840	<>	<elision2>
6839	6840	<>	<elision1>
6839	5908	s	κ
6839	6033	s	k
6839	6051	s	K
6839	5908	s	λ
6839	6064	s	l
6839	6067	s	L
6839	5241	<1s>	<>
6839	6843	<~>	<>
6840	6841	<>	<name>
6840	6840	<>	<aphaerese>
6840	6840	<>	<elision3>
6840	6840	<>	<elision2>
6840	6840	<>	<elision1>
6840	5908	s	κ
6840	6033	s	k
6840	6051	s	K
6840	5908	s	λ
6840	6064	s	l
6840	6067	s	L
6840	5242	<1s>	<>
6840	6844	<~>	<>
6841	6839	<>	<aphaerese>
6841	6839	<>	<elision3>
6841	6839	<>	<elision2>
6841	6839	<>	<elision1>
6841	6029	s	κ
6841	6035	s	k
6841	6054	s	K
6841	6029	s	λ
6841	6066	s	l
6841	6069	s	L
6841	5243	<1s>	<>
6841	6842	<~>	<>
6842	6843	<>	<aphaerese>
6842	6843	<>	<elision3>
6842	6843	<>	<elision2>
6842	6843	<>	<elision1>
6842	6718	h	k
6842	6718	h	K
6842	6834	h	l
6842	6834	h	L
6843	6844	<>	<aphaerese>
6843	6844	<>	<elision3>
6843	6844	<>	<elision2>
6843	6844	<>	<elision1>
6843	6716	h	k
6843	6716	h	K
6843	6835	h	l
6843	6845	h	L
6844	6842	<>	<name>
6844	6844	<>	<aphaerese>
6844	6844	<>	<elision3>
6844	6844	<>	<elision2>
6844	6844	<>	<elision1>
6844	6716	h	k
6844	6716	h	K
6844	6835	h	l
6844	6845	h	L
6845	6722	.	.
6845	6723	 	 
6845	6722	<~>	<~>
6845	6722	<split-s>	<split-s>
6845	6722	<split-h>	<split-h>
6845	6722	<name2>	<name2>
6845	6832	<name2>	<name>
6845	6832	<name>	<name>
6845	6833	<>	<name>
6845	6726	<aphaerese>	<aphaerese>
6845	6835	<>	<aphaerese>
6845	6722	<elision3>	<elision3>
6845	6835	<>	<elision3>
6845	6722	<elision2>	<elision2>
6845	6835	<>	<elision2>
6845	6722	<elision1>	<elision1>
6845	6835	<>	<elision1>
6845	6719	.	υ
6845	6730	s	υ
6845	6719	.	u
6845	6730	s	u
6845	6719	.	κ
6845	6836	s	κ
6845	6763	s	k
6845	6766	s	U
6845	6817	s	K
6845	6719	.	α
6845	6730	s	α
6845	6719	.	a
6845	6730	s	a
6845	6795	s	A
6845	6719	.	λ
6845	6836	s	λ
6845	6763	s	l
6845	6824	s	L
6846	6847	<>	<aphaerese>
6846	153	<elision3>	<elision3>
6846	6847	<>	<elision3>
6846	153	<elision2>	<elision2>
6846	6847	<>	<elision2>
6846	153	<elision1>	<elision1>
6846	6847	<>	<elision1>
6846	6527	<K>	<>
6847	6848	<>	<name>
6847	6847	<>	<aphaerese>
6847	153	<elision3>	<elision3>
6847	6847	<>	<elision3>
6847	153	<elision2>	<elision2>
6847	6847	<>	<elision2>
6847	153	<elision1>	<elision1>
6847	6847	<>	<elision1>
6847	6525	<K>	<>
6848	6846	<>	<aphaerese>
6848	155	<elision3>	<elision3>
6848	6846	<>	<elision3>
6848	155	<elision2>	<elision2>
6848	6846	<>	<elision2>
6848	155	<elision1>	<elision1>
6848	6846	<>	<elision1>
6848	6526	<K>	<>
6849	143	.	.
6849	144	 	 
6849	143	<~>	<~>
6849	143	<split-s>	<split-s>
6849	143	<split-h>	<split-h>
6849	143	<name2>	<name2>
6849	147	<aphaerese>	<aphaerese>
6849	6850	<>	<aphaerese>
6849	143	<elision3>	<elision3>
6849	6850	<>	<elision3>
6849	143	<elision2>	<elision2>
6849	6850	<>	<elision2>
6849	143	<elision1>	<elision1>
6849	6850	<>	<elision1>
6849	143	.	υ
6849	143	.	u
6849	150	.	κ
6849	6095	H	κ
6849	6423	H	k
6849	6436	H	U
6849	6439	H	K
6849	143	.	α
6849	143	.	a
6849	6266	H	A
6849	6450	H	λ
6849	6853	H	l
6849	6858	H	L
6849	6524	<K>	<>
6850	143	.	.
6850	144	 	 
6850	143	<~>	<~>
6850	143	<split-s>	<split-s>
6850	143	<split-h>	<split-h>
6850	143	<name2>	<name2>
6850	6851	<>	<name>
6850	147	<aphaerese>	<aphaerese>
6850	6850	<>	<aphaerese>
6850	143	<elision3>	<elision3>
6850	6850	<>	<elision3>
6850	143	<elision2>	<elision2>
6850	6850	<>	<elision2>
6850	143	<elision1>	<elision1>
6850	6850	<>	<elision1>
6850	143	.	υ
6850	143	.	u
6850	150	.	κ
6850	6095	H	κ
6850	6423	H	k
6850	6436	H	U
6850	6439	H	K
6850	143	.	α
6850	143	.	a
6850	6266	H	A
6850	6450	H	λ
6850	6853	H	l
6850	6858	H	L
6850	6522	<K>	<>
6851	142	.	.
6851	146	 	 
6851	142	<~>	<~>
6851	142	<split-s>	<split-s>
6851	142	<split-h>	<split-h>
6851	142	<name2>	<name2>
6851	149	<aphaerese>	<aphaerese>
6851	6849	<>	<aphaerese>
6851	142	<elision3>	<elision3>
6851	6849	<>	<elision3>
6851	142	<elision2>	<elision2>
6851	6849	<>	<elision2>
6851	142	<elision1>	<elision1>
6851	6849	<>	<elision1>
6851	142	.	υ
6851	142	.	u
6851	152	.	κ
6851	6460	H	κ
6851	6464	H	k
6851	6438	H	U
6851	6468	H	K
6851	142	.	α
6851	142	.	a
6851	6269	H	A
6851	6452	H	λ
6851	6852	H	l
6851	6855	H	L
6851	6523	<K>	<>
6852	6853	<>	<aphaerese>
6852	6853	<>	<elision3>
6852	6853	<>	<elision2>
6852	6853	<>	<elision1>
6852	6714	<~>	<>
6852	6453	<l2L>	<>
6853	6854	<>	<name>
6853	6853	<>	<aphaerese>
6853	6853	<>	<elision3>
6853	6853	<>	<elision2>
6853	6853	<>	<elision1>
6853	6715	<~>	<>
6853	6454	<l2L>	<>
6854	6852	<>	<aphaerese>
6854	6852	<>	<elision3>
6854	6852	<>	<elision2>
6854	6852	<>	<elision1>
6854	6713	<~>	<>
6854	6455	<l2L>	<>
6855	6266	.	.
6855	6267	 	 
6855	6266	<~>	<~>
6855	6266	<split-s>	<split-s>
6855	6266	<split-h>	<split-h>
6855	6266	<name2>	<name2>
6855	6270	<aphaerese>	<aphaerese>
6855	6856	<>	<aphaerese>
6855	6266	<elision3>	<elision3>
6855	6856	<>	<elision3>
6855	6266	<elision2>	<elision2>
6855	6856	<>	<elision2>
6855	6266	<elision1>	<elision1>
6855	6856	<>	<elision1>
6855	6274	.	υ
6855	6277	s	υ
6855	6274	.	u
6855	6277	s	u
6855	6274	.	κ
6855	5908	s	κ
6855	6033	s	k
6855	6323	s	U
6855	6051	s	K
6855	6274	.	α
6855	6348	s	α
6855	6274	.	a
6855	6348	s	a
6855	6351	s	A
6855	6274	.	λ
6855	5908	s	λ
6855	6064	s	l
6855	6067	s	L
6855	5418	<1s>	<>
6855	6843	<~>	<>
6856	6266	.	.
6856	6267	 	 
6856	6266	<~>	<~>
6856	6266	<split-s>	<split-s>
6856	6266	<split-h>	<split-h>
6856	6266	<name2>	<name2>
6856	6857	<>	<name>
6856	6270	<aphaerese>	<aphaerese>
6856	6856	<>	<aphaerese>
6856	6266	<elision3>	<elision3>
6856	6856	<>	<elision3>
6856	6266	<elision2>	<elision2>
6856	6856	<>	<elision2>
6856	6266	<elision1>	<elision1>
6856	6856	<>	<elision1>
6856	6274	.	υ
6856	6277	s	υ
6856	6274	.	u
6856	6277	s	u
6856	6274	.	κ
6856	5908	s	κ
6856	6033	s	k
6856	6323	s	U
6856	6051	s	K
6856	6274	.	α
6856	6348	s	α
6856	6274	.	a
6856	6348	s	a
6856	6351	s	A
6856	6274	.	λ
6856	5908	s	λ
6856	6064	s	l
6856	6067	s	L
6856	5419	<1s>	<>
6856	6844	<~>	<>
6857	6269	.	.
6857	6272	 	 
6857	6269	<~>	<~>
6857	6269	<split-s>	<split-s>
6857	6269	<split-h>	<split-h>
6857	6269	<name2>	<name2>
6857	6378	<aphaerese>	<aphaerese>
6857	6855	<>	<aphaerese>
6857	6269	<elision3>	<elision3>
6857	6855	<>	<elision3>
6857	6269	<elision2>	<elision2>
6857	6855	<>	<elision2>
6857	6269	<elision1>	<elision1>
6857	6855	<>	<elision1>
6857	6276	.	υ
6857	6279	s	υ
6857	6276	.	u
6857	6279	s	u
6857	6276	.	κ
6857	6029	s	κ
6857	6035	s	k
6857	6325	s	U
6857	6054	s	K
6857	6276	.	α
6857	6350	s	α
6857	6276	.	a
6857	6350	s	a
6857	6353	s	A
6857	6276	.	λ
6857	6029	s	λ
6857	6066	s	l
6857	6069	s	L
6857	5420	<1s>	<>
6857	6842	<~>	<>
6858	6266	.	.
6858	6267	 	 
6858	6266	<~>	<~>
6858	6266	<split-s>	<split-s>
6858	6266	<split-h>	<split-h>
6858	6266	<name2>	<name2>
6858	6446	<name2>	<name>
6858	6857	<>	<name>
6858	6270	<aphaerese>	<aphaerese>
6858	6856	<>	<aphaerese>
6858	6266	<elision3>	<elision3>
6858	6856	<>	<elision3>
6858	6266	<elision2>	<elision2>
6858	6856	<>	<elision2>
6858	6266	<elision1>	<elision1>
6858	6856	<>	<elision1>
6858	6274	.	υ
6858	6277	s	υ
6858	6274	.	u
6858	6277	s	u
6858	6274	.	κ
6858	5908	s	κ
6858	6033	s	k
6858	6323	s	U
6858	6051	s	K
6858	6274	.	α
6858	6348	s	α
6858	6274	.	a
6858	6348	s	a
6858	6351	s	A
6858	6274	.	λ
6858	5908	s	λ
6858	6064	s	l
6858	6067	s	L
6858	5608	<1s>	<>
6858	6844	<~>	<>
6858	6445	<l2L>	<>
6859	6860	<>	<name>
6859	6859	<>	<aphaerese>
6859	6695	<elision3>	<elision3>
6859	6859	<>	<elision3>
6859	6695	<elision2>	<elision2>
6859	6859	<>	<elision2>
6859	6695	<elision1>	<elision1>
6859	6859	<>	<elision1>
6859	140	<4s>	<>
6860	6861	<>	<aphaerese>
6860	6697	<elision3>	<elision3>
6860	6861	<>	<elision3>
6860	6697	<elision2>	<elision2>
6860	6861	<>	<elision2>
6860	6697	<elision1>	<elision1>
6860	6861	<>	<elision1>
6860	141	<4s>	<>
6861	6859	<>	<aphaerese>
6861	6695	<elision3>	<elision3>
6861	6859	<>	<elision3>
6861	6695	<elision2>	<elision2>
6861	6859	<>	<elision2>
6861	6695	<elision1>	<elision1>
6861	6859	<>	<elision1>
6861	139	<4s>	<>
6862	143	.	.
6862	144	 	 
6862	143	<~>	<~>
6862	143	<split-s>	<split-s>
6862	143	<split-h>	<split-h>
6862	143	<name2>	<name2>
6862	147	<aphaerese>	<aphaerese>
6862	6863	<>	<aphaerese>
6862	143	<elision3>	<elision3>
6862	6863	<>	<elision3>
6862	143	<elision2>	<elision2>
6862	6863	<>	<elision2>
6862	143	<elision1>	<elision1>
6862	6863	<>	<elision1>
6862	6469	.	υ
6862	6513	H	υ
6862	6469	.	u
6862	6515	H	u
6862	150	.	κ
6862	6095	H	κ
6862	6423	H	k
6862	6436	H	U
6862	6439	H	K
6862	6469	.	α
6862	6499	H	α
6862	6469	.	a
6862	6504	H	a
6862	6266	H	A
6862	6450	H	λ
6862	6853	H	l
6862	6858	H	L
6862	6521	<K>	<>
6863	143	.	.
6863	144	 	 
6863	143	<~>	<~>
6863	143	<split-s>	<split-s>
6863	143	<split-h>	<split-h>
6863	143	<name2>	<name2>
6863	6864	<>	<name>
6863	147	<aphaerese>	<aphaerese>
6863	6863	<>	<aphaerese>
6863	143	<elision3>	<elision3>
6863	6863	<>	<elision3>
6863	143	<elision2>	<elision2>
6863	6863	<>	<elision2>
6863	143	<elision1>	<elision1>
6863	6863	<>	<elision1>
6863	6469	.	υ
6863	6513	H	υ
6863	6469	.	u
6863	6515	H	u
6863	150	.	κ
6863	6095	H	κ
6863	6423	H	k
6863	6436	H	U
6863	6439	H	K
6863	6469	.	α
6863	6499	H	α
6863	6469	.	a
6863	6504	H	a
6863	6266	H	A
6863	6450	H	λ
6863	6853	H	l
6863	6858	H	L
6863	6519	<K>	<>
6864	142	.	.
6864	146	 	 
6864	142	<~>	<~>
6864	142	<split-s>	<split-s>
6864	142	<split-h>	<split-h>
6864	142	<name2>	<name2>
6864	149	<aphaerese>	<aphaerese>
6864	6862	<>	<aphaerese>
6864	142	<elision3>	<elision3>
6864	6862	<>	<elision3>
6864	142	<elision2>	<elision2>
6864	6862	<>	<elision2>
6864	142	<elision1>	<elision1>
6864	6862	<>	<elision1>
6864	6471	.	υ
6864	6508	H	υ
6864	6471	.	u
6864	6512	H	u
6864	152	.	κ
6864	6460	H	κ
6864	6464	H	k
6864	6438	H	U
6864	6468	H	K
6864	6471	.	α
6864	6498	H	α
6864	6471	.	a
6864	6503	H	a
6864	6269	H	A
6864	6452	H	λ
6864	6852	H	l
6864	6855	H	L
6864	6520	<K>	<>
6865	6697	.	.
6865	6697	 	 
6865	6697	<~>	<~>
6865	6697	<split-s>	<split-s>
6865	6697	<split-h>	<split-h>
6865	6697	<name2>	<name2>
6865	6700	<aphaerese>	<aphaerese>
6865	6866	<>	<aphaerese>
6865	6866	<>	<elision3>
6865	6866	<>	<elision2>
6865	6866	<>	<elision1>
6865	6861	.	υ
6865	6861	.	u
6865	6703	.	κ
6865	6861	.	α
6865	6861	.	a
6865	6869	<4s>	<>
6866	6695	.	.
6866	6695	 	 
6866	6695	<~>	<~>
6866	6695	<split-s>	<split-s>
6866	6695	<split-h>	<split-h>
6866	6695	<name2>	<name2>
6866	6698	<aphaerese>	<aphaerese>
6866	6694	<>	<aphaerese>
6866	6694	<>	<elision3>
6866	6694	<>	<elision2>
6866	6694	<>	<elision1>
6866	6859	.	υ
6866	6859	.	u
6866	6701	.	κ
6866	6859	.	α
6866	6859	.	a
6866	6867	<4s>	<>
6867	143	.	.
6867	144	 	 
6867	143	<~>	<~>
6867	143	<split-s>	<split-s>
6867	143	<split-h>	<split-h>
6867	143	<name2>	<name2>
6867	147	<aphaerese>	<aphaerese>
6867	6868	<>	<aphaerese>
6867	6868	<>	<elision3>
6867	6868	<>	<elision2>
6867	6868	<>	<elision1>
6867	6469	.	υ
6867	6513	H	υ
6867	6469	.	u
6867	6515	H	u
6867	150	.	κ
6867	6095	H	κ
6867	6423	H	k
6867	6436	H	U
6867	6439	H	K
6867	6469	.	α
6867	6499	H	α
6867	6469	.	a
6867	6504	H	a
6867	6266	H	A
6867	6450	H	λ
6867	6853	H	l
6867	6858	H	L
6867	6871	<K>	<>
6868	143	.	.
6868	144	 	 
6868	143	<~>	<~>
6868	143	<split-s>	<split-s>
6868	143	<split-h>	<split-h>
6868	143	<name2>	<name2>
6868	6869	<>	<name>
6868	147	<aphaerese>	<aphaerese>
6868	6868	<>	<aphaerese>
6868	6868	<>	<elision3>
6868	6868	<>	<elision2>
6868	6868	<>	<elision1>
6868	6469	.	υ
6868	6513	H	υ
6868	6469	.	u
6868	6515	H	u
6868	150	.	κ
6868	6095	H	κ
6868	6423	H	k
6868	6436	H	U
6868	6439	H	K
6868	6469	.	α
6868	6499	H	α
6868	6469	.	a
6868	6504	H	a
6868	6266	H	A
6868	6450	H	λ
6868	6853	H	l
6868	6858	H	L
6868	6872	<K>	<>
6869	142	.	.
6869	146	 	 
6869	142	<~>	<~>
6869	142	<split-s>	<split-s>
6869	142	<split-h>	<split-h>
6869	142	<name2>	<name2>
6869	149	<aphaerese>	<aphaerese>
6869	6867	<>	<aphaerese>
6869	6867	<>	<elision3>
6869	6867	<>	<elision2>
6869	6867	<>	<elision1>
6869	6471	.	υ
6869	6508	H	υ
6869	6471	.	u
6869	6512	H	u
6869	152	.	κ
6869	6460	H	κ
6869	6464	H	k
6869	6438	H	U
6869	6468	H	K
6869	6471	.	α
6869	6498	H	α
6869	6471	.	a
6869	6503	H	a
6869	6269	H	A
6869	6452	H	λ
6869	6852	H	l
6869	6855	H	L
6869	6870	<K>	<>
6870	6521	.	.
6870	6521	<~>	<~>
6870	6521	<split-s>	<split-s>
6870	6521	<split-h>	<split-h>
6870	6521	<name2>	<name2>
6870	6524	<aphaerese>	<aphaerese>
6870	6871	<>	<aphaerese>
6870	6871	<>	<elision3>
6870	6871	<>	<elision2>
6870	6871	<>	<elision1>
6870	6517	.	υ
6870	6663	H	υ
6870	6517	.	u
6870	6672	H	u
6870	6527	.	κ
6870	6578	H	κ
6870	6632	H	k
6870	6641	H	U
6870	6645	H	K
6870	6517	.	α
6870	6675	H	α
6870	6517	.	a
6870	6678	H	a
6870	6612	H	A
6870	6653	H	λ
6870	6659	H	l
6870	6654	H	L
6871	6519	.	.
6871	6519	<~>	<~>
6871	6519	<split-s>	<split-s>
6871	6519	<split-h>	<split-h>
6871	6519	<name2>	<name2>
6871	6522	<aphaerese>	<aphaerese>
6871	6872	<>	<aphaerese>
6871	6872	<>	<elision3>
6871	6872	<>	<elision2>
6871	6872	<>	<elision1>
6871	6518	.	υ
6871	6661	H	υ
6871	6518	.	u
6871	6670	H	u
6871	6525	.	κ
6871	6576	H	κ
6871	6630	H	k
6871	6639	H	U
6871	6642	H	K
6871	6518	.	α
6871	6673	H	α
6871	6518	.	a
6871	6676	H	a
6871	6610	H	A
6871	6651	H	λ
6871	6657	H	l
6871	6660	H	L
6872	6519	.	.
6872	6519	<~>	<~>
6872	6519	<split-s>	<split-s>
6872	6519	<split-h>	<split-h>
6872	6519	<name2>	<name2>
6872	6870	<>	<name>
6872	6522	<aphaerese>	<aphaerese>
6872	6872	<>	<aphaerese>
6872	6872	<>	<elision3>
6872	6872	<>	<elision2>
6872	6872	<>	<elision1>
6872	6518	.	υ
6872	6661	H	υ
6872	6518	.	u
6872	6670	H	u
6872	6525	.	κ
6872	6576	H	κ
6872	6630	H	k
6872	6639	H	U
6872	6642	H	K
6872	6518	.	α
6872	6673	H	α
6872	6518	.	a
6872	6676	H	a
6872	6610	H	A
6872	6651	H	λ
6872	6657	H	l
6872	6660	H	L
6873	6874	<>	<name>
6873	6873	<>	<aphaerese>
6873	6876	<elision3>	<elision3>
6873	6873	<>	<elision3>
6873	6876	<elision2>	<elision2>
6873	6873	<>	<elision2>
6873	6876	<elision1>	<elision1>
6873	6873	<>	<elision1>
6873	6942	<split-h>	<>
6874	6875	<>	<aphaerese>
6874	6878	<elision3>	<elision3>
6874	6875	<>	<elision3>
6874	6878	<elision2>	<elision2>
6874	6875	<>	<elision2>
6874	6878	<elision1>	<elision1>
6874	6875	<>	<elision1>
6874	6943	<split-h>	<>
6875	6873	<>	<aphaerese>
6875	6876	<elision3>	<elision3>
6875	6873	<>	<elision3>
6875	6876	<elision2>	<elision2>
6875	6873	<>	<elision2>
6875	6876	<elision1>	<elision1>
6875	6873	<>	<elision1>
6875	6941	<split-h>	<>
6876	6877	<>	<name>
6876	6876	<>	<aphaerese>
6876	6876	<>	<elision3>
6876	6876	<>	<elision2>
6876	6876	<>	<elision1>
6876	6879	s	κ
6876	6879	s	k
6876	6932	s	K
6876	6879	s	λ
6876	6879	s	l
6876	6935	s	L
6876	6939	<split-h>	<>
6877	6878	<>	<aphaerese>
6877	6878	<>	<elision3>
6877	6878	<>	<elision2>
6877	6878	<>	<elision1>
6877	6881	s	κ
6877	6881	s	k
6877	6934	s	K
6877	6881	s	λ
6877	6881	s	l
6877	6937	s	L
6877	6940	<split-h>	<>
6878	6876	<>	<aphaerese>
6878	6876	<>	<elision3>
6878	6876	<>	<elision2>
6878	6876	<>	<elision1>
6878	6879	s	κ
6878	6879	s	k
6878	6932	s	K
6878	6879	s	λ
6878	6879	s	l
6878	6935	s	L
6878	6938	<split-h>	<>
6879	6880	<>	<name>
6879	6879	<>	<aphaerese>
6879	6879	<>	<elision3>
6879	6879	<>	<elision2>
6879	6879	<>	<elision1>
6879	6883	<4s>	<>
6880	6881	<>	<aphaerese>
6880	6881	<>	<elision3>
6880	6881	<>	<elision2>
6880	6881	<>	<elision1>
6880	6884	<4s>	<>
6881	6879	<>	<aphaerese>
6881	6879	<>	<elision3>
6881	6879	<>	<elision2>
6881	6879	<>	<elision1>
6881	6882	<4s>	<>
6882	6883	<>	<aphaerese>
6882	6883	<>	<elision3>
6882	6883	<>	<elision2>
6882	6883	<>	<elision1>
6882	6928	H	κ
6882	6423	H	k
6882	6439	H	K
6882	6905	H	λ
6882	6853	H	l
6882	6858	H	L
6882	6911	<K>	<>
6883	6884	<>	<name>
6883	6883	<>	<aphaerese>
6883	6883	<>	<elision3>
6883	6883	<>	<elision2>
6883	6883	<>	<elision1>
6883	6928	H	κ
6883	6423	H	k
6883	6439	H	K
6883	6905	H	λ
6883	6853	H	l
6883	6858	H	L
6883	6912	<K>	<>
6884	6882	<>	<aphaerese>
6884	6882	<>	<elision3>
6884	6882	<>	<elision2>
6884	6882	<>	<elision1>
6884	6885	H	κ
6884	6464	H	k
6884	6468	H	K
6884	6904	H	λ
6884	6852	H	l
6884	6855	H	L
6884	6910	<K>	<>
6885	6886	<>	<aphaerese>
6885	6886	<>	<elision3>
6885	6886	<>	<elision2>
6885	6886	<>	<elision1>
6885	6889	<kappa2K>	<>
6885	6901	<kappa2L>	<>
6885	6419	<lambda2L>	<>
6886	6887	<>	<name>
6886	6886	<>	<aphaerese>
6886	6886	<>	<elision3>
6886	6886	<>	<elision2>
6886	6886	<>	<elision1>
6886	6890	<kappa2K>	<>
6886	6893	<kappa2L>	<>
6886	6417	<lambda2L>	<>
6887	6888	<>	<aphaerese>
6887	6888	<>	<elision3>
6887	6888	<>	<elision2>
6887	6888	<>	<elision1>
6887	6891	<kappa2K>	<>
6887	6894	<kappa2L>	<>
6887	6418	<lambda2L>	<>
6888	6886	<>	<aphaerese>
6888	6886	<>	<elision3>
6888	6886	<>	<elision2>
6888	6886	<>	<elision1>
6888	6889	<kappa2K>	<>
6888	6892	<kappa2L>	<>
6888	6419	<lambda2L>	<>
6889	6100	.	.
6889	6101	 	 
6889	6100	<~>	<~>
6889	6100	<split-s>	<split-s>
6889	6100	<split-h>	<split-h>
6889	6100	<name2>	<name2>
6889	6104	<aphaerese>	<aphaerese>
6889	6890	<>	<aphaerese>
6889	6890	<>	<elision3>
6889	6890	<>	<elision2>
6889	6890	<>	<elision1>
6889	6108	.	υ
6889	6111	s	υ
6889	6108	.	u
6889	6111	s	u
6889	163	s	κ
6889	5849	s	k
6889	6174	s	U
6889	5882	s	K
6889	6108	.	α
6889	6202	s	α
6889	6108	.	a
6889	6202	s	a
6889	6205	s	A
6889	163	s	λ
6889	5897	s	l
6889	5900	s	L
6890	6100	.	.
6890	6101	 	 
6890	6100	<~>	<~>
6890	6100	<split-s>	<split-s>
6890	6100	<split-h>	<split-h>
6890	6100	<name2>	<name2>
6890	6891	<>	<name>
6890	6104	<aphaerese>	<aphaerese>
6890	6890	<>	<aphaerese>
6890	6890	<>	<elision3>
6890	6890	<>	<elision2>
6890	6890	<>	<elision1>
6890	6108	.	υ
6890	6111	s	υ
6890	6108	.	u
6890	6111	s	u
6890	163	s	κ
6890	5849	s	k
6890	6174	s	U
6890	5882	s	K
6890	6108	.	α
6890	6202	s	α
6890	6108	.	a
6890	6202	s	a
6890	6205	s	A
6890	163	s	λ
6890	5897	s	l
6890	5900	s	L
6891	6103	.	.
6891	6106	 	 
6891	6103	<~>	<~>
6891	6103	<split-s>	<split-s>
6891	6103	<split-h>	<split-h>
6891	6103	<name2>	<name2>
6891	6232	<aphaerese>	<aphaerese>
6891	6889	<>	<aphaerese>
6891	6889	<>	<elision3>
6891	6889	<>	<elision2>
6891	6889	<>	<elision1>
6891	6110	.	υ
6891	6113	s	υ
6891	6110	.	u
6891	6113	s	u
6891	5842	s	κ
6891	5851	s	k
6891	6176	s	U
6891	5885	s	K
6891	6110	.	α
6891	6204	s	α
6891	6110	.	a
6891	6204	s	a
6891	6207	s	A
6891	5842	s	λ
6891	5899	s	l
6891	5902	s	L
6892	6266	.	.
6892	6267	 	 
6892	6266	<~>	<~>
6892	6266	<split-s>	<split-s>
6892	6266	<split-h>	<split-h>
6892	6266	<name2>	<name2>
6892	6270	<aphaerese>	<aphaerese>
6892	6893	<>	<aphaerese>
6892	6893	<>	<elision3>
6892	6893	<>	<elision2>
6892	6893	<>	<elision1>
6892	6274	.	υ
6892	6277	s	υ
6892	6274	.	u
6892	6277	s	u
6892	5908	s	κ
6892	6033	s	k
6892	6323	s	U
6892	6051	s	K
6892	6274	.	α
6892	6348	s	α
6892	6274	.	a
6892	6348	s	a
6892	6351	s	A
6892	5908	s	λ
6892	6064	s	l
6892	6067	s	L
6892	6896	<1s>	<>
6893	6266	.	.
6893	6267	 	 
6893	6266	<~>	<~>
6893	6266	<split-s>	<split-s>
6893	6266	<split-h>	<split-h>
6893	6266	<name2>	<name2>
6893	6894	<>	<name>
6893	6270	<aphaerese>	<aphaerese>
6893	6893	<>	<aphaerese>
6893	6893	<>	<elision3>
6893	6893	<>	<elision2>
6893	6893	<>	<elision1>
6893	6274	.	υ
6893	6277	s	υ
6893	6274	.	u
6893	6277	s	u
6893	5908	s	κ
6893	6033	s	k
6893	6323	s	U
6893	6051	s	K
6893	6274	.	α
6893	6348	s	α
6893	6274	.	a
6893	6348	s	a
6893	6351	s	A
6893	5908	s	λ
6893	6064	s	l
6893	6067	s	L
6893	6897	<1s>	<>
6894	6269	.	.
6894	6272	 	 
6894	6269	<~>	<~>
6894	6269	<split-s>	<split-s>
6894	6269	<split-h>	<split-h>
6894	6269	<name2>	<name2>
6894	6378	<aphaerese>	<aphaerese>
6894	6892	<>	<aphaerese>
6894	6892	<>	<elision3>
6894	6892	<>	<elision2>
6894	6892	<>	<elision1>
6894	6276	.	υ
6894	6279	s	υ
6894	6276	.	u
6894	6279	s	u
6894	6029	s	κ
6894	6035	s	k
6894	6325	s	U
6894	6054	s	K
6894	6276	.	α
6894	6350	s	α
6894	6276	.	a
6894	6350	s	a
6894	6353	s	A
6894	6029	s	λ
6894	6066	s	l
6894	6069	s	L
6894	6895	<1s>	<>
6895	178	.	.
6895	182	 	 
6895	178	<~>	<~>
6895	178	<split-s>	<split-s>
6895	178	<split-h>	<split-h>
6895	178	<name2>	<name2>
6895	185	<aphaerese>	<aphaerese>
6895	6896	<>	<aphaerese>
6895	6896	<>	<elision3>
6895	6896	<>	<elision2>
6895	6896	<>	<elision1>
6895	4830	.	υ
6895	4867	H	υ
6895	4830	.	u
6895	4871	H	u
6895	5244	H	κ
6895	4823	H	k
6895	4797	H	U
6895	4827	H	K
6895	4830	.	α
6895	4857	H	α
6895	4830	.	a
6895	4862	H	a
6895	4628	H	A
6895	5263	H	λ
6895	5211	H	l
6895	5214	H	L
6895	6899	<K>	<>
6896	179	.	.
6896	180	 	 
6896	179	<~>	<~>
6896	179	<split-s>	<split-s>
6896	179	<split-h>	<split-h>
6896	179	<name2>	<name2>
6896	183	<aphaerese>	<aphaerese>
6896	6897	<>	<aphaerese>
6896	6897	<>	<elision3>
6896	6897	<>	<elision2>
6896	6897	<>	<elision1>
6896	4828	.	υ
6896	4872	H	υ
6896	4828	.	u
6896	4874	H	u
6896	5287	H	κ
6896	4782	H	k
6896	4795	H	U
6896	4798	H	K
6896	4828	.	α
6896	4858	H	α
6896	4828	.	a
6896	4863	H	a
6896	4625	H	A
6896	5264	H	λ
6896	5212	H	l
6896	5217	H	L
6896	6900	<K>	<>
6897	179	.	.
6897	180	 	 
6897	179	<~>	<~>
6897	179	<split-s>	<split-s>
6897	179	<split-h>	<split-h>
6897	179	<name2>	<name2>
6897	6895	<>	<name>
6897	183	<aphaerese>	<aphaerese>
6897	6897	<>	<aphaerese>
6897	6897	<>	<elision3>
6897	6897	<>	<elision2>
6897	6897	<>	<elision1>
6897	4828	.	υ
6897	4872	H	υ
6897	4828	.	u
6897	4874	H	u
6897	5287	H	κ
6897	4782	H	k
6897	4795	H	U
6897	4798	H	K
6897	4828	.	α
6897	4858	H	α
6897	4828	.	a
6897	4863	H	a
6897	4625	H	A
6897	5264	H	λ
6897	5212	H	l
6897	5217	H	L
6897	6898	<K>	<>
6898	4878	.	.
6898	4878	<~>	<~>
6898	4878	<split-s>	<split-s>
6898	4878	<split-h>	<split-h>
6898	4878	<name2>	<name2>
6898	6899	<>	<name>
6898	4881	<aphaerese>	<aphaerese>
6898	6898	<>	<aphaerese>
6898	6898	<>	<elision3>
6898	6898	<>	<elision2>
6898	6898	<>	<elision1>
6898	4877	.	υ
6898	5020	H	υ
6898	4877	.	u
6898	5029	H	u
6898	5272	H	κ
6898	4989	H	k
6898	4998	H	U
6898	5001	H	K
6898	4877	.	α
6898	5032	H	α
6898	4877	.	a
6898	5035	H	a
6898	4969	H	A
6898	5281	H	λ
6898	5016	H	l
6898	5019	H	L
6899	4880	.	.
6899	4880	<~>	<~>
6899	4880	<split-s>	<split-s>
6899	4880	<split-h>	<split-h>
6899	4880	<name2>	<name2>
6899	4883	<aphaerese>	<aphaerese>
6899	6900	<>	<aphaerese>
6899	6900	<>	<elision3>
6899	6900	<>	<elision2>
6899	6900	<>	<elision1>
6899	4876	.	υ
6899	5022	H	υ
6899	4876	.	u
6899	5031	H	u
6899	5274	H	κ
6899	4991	H	k
6899	5000	H	U
6899	5004	H	K
6899	4876	.	α
6899	5034	H	α
6899	4876	.	a
6899	5037	H	a
6899	4971	H	A
6899	5283	H	λ
6899	5018	H	l
6899	5013	H	L
6900	4878	.	.
6900	4878	<~>	<~>
6900	4878	<split-s>	<split-s>
6900	4878	<split-h>	<split-h>
6900	4878	<name2>	<name2>
6900	4881	<aphaerese>	<aphaerese>
6900	6898	<>	<aphaerese>
6900	6898	<>	<elision3>
6900	6898	<>	<elision2>
6900	6898	<>	<elision1>
6900	4877	.	υ
6900	5020	H	υ
6900	4877	.	u
6900	5029	H	u
6900	5272	H	κ
6900	4989	H	k
6900	4998	H	U
6900	5001	H	K
6900	4877	.	α
6900	5032	H	α
6900	4877	.	a
6900	5035	H	a
6900	4969	H	A
6900	5281	H	λ
6900	5016	H	l
6900	5019	H	L
6901	6266	.	.
6901	6267	 	 
6901	6266	<~>	<~>
6901	6266	<split-s>	<split-s>
6901	6266	<split-h>	<split-h>
6901	6266	<name2>	<name2>
6901	6270	<aphaerese>	<aphaerese>
6901	6893	<>	<aphaerese>
6901	6893	<>	<elision3>
6901	6893	<>	<elision2>
6901	6893	<>	<elision1>
6901	6274	.	υ
6901	6277	s	υ
6901	6274	.	u
6901	6277	s	u
6901	5908	s	κ
6901	6033	s	k
6901	6323	s	U
6901	6051	s	K
6901	6274	.	α
6901	6348	s	α
6901	6274	.	a
6901	6348	s	a
6901	6351	s	A
6901	5908	s	λ
6901	6064	s	l
6901	6067	s	L
6901	6902	<1s>	<>
6902	179	.	.
6902	180	 	 
6902	179	<~>	<~>
6902	179	<split-s>	<split-s>
6902	179	<split-h>	<split-h>
6902	179	<name2>	<name2>
6902	183	<aphaerese>	<aphaerese>
6902	6897	<>	<aphaerese>
6902	6897	<>	<elision3>
6902	6897	<>	<elision2>
6902	6897	<>	<elision1>
6902	4828	.	υ
6902	4828	.	u
6902	4828	.	α
6902	4828	.	a
6902	6903	<K>	<>
6903	4878	.	.
6903	4878	<~>	<~>
6903	4878	<split-s>	<split-s>
6903	4878	<split-h>	<split-h>
6903	4878	<name2>	<name2>
6903	4881	<aphaerese>	<aphaerese>
6903	6898	<>	<aphaerese>
6903	6898	<>	<elision3>
6903	6898	<>	<elision2>
6903	6898	<>	<elision1>
6903	4877	.	υ
6903	4877	.	u
6903	4877	.	α
6903	4877	.	a
6904	6905	<>	<aphaerese>
6904	6905	<>	<elision3>
6904	6905	<>	<elision2>
6904	6905	<>	<elision1>
6904	6908	<lambda2L>	<>
6905	6906	<>	<name>
6905	6905	<>	<aphaerese>
6905	6905	<>	<elision3>
6905	6905	<>	<elision2>
6905	6905	<>	<elision1>
6905	6909	<lambda2L>	<>
6906	6904	<>	<aphaerese>
6906	6904	<>	<elision3>
6906	6904	<>	<elision2>
6906	6904	<>	<elision1>
6906	6907	<lambda2L>	<>
6907	6269	.	.
6907	6272	 	 
6907	6269	<~>	<~>
6907	6269	<split-s>	<split-s>
6907	6269	<split-h>	<split-h>
6907	6269	<name2>	<name2>
6907	6378	<aphaerese>	<aphaerese>
6907	6908	<>	<aphaerese>
6907	6908	<>	<elision3>
6907	6908	<>	<elision2>
6907	6908	<>	<elision1>
6907	6276	.	υ
6907	6279	s	υ
6907	6276	.	u
6907	6279	s	u
6907	6276	.	κ
6907	6029	s	κ
6907	6035	s	k
6907	6325	s	U
6907	6054	s	K
6907	6276	.	α
6907	6350	s	α
6907	6276	.	a
6907	6350	s	a
6907	6353	s	A
6907	6276	.	λ
6907	6029	s	λ
6907	6066	s	l
6907	6069	s	L
6907	5634	<1s>	<>
6908	6266	.	.
6908	6267	 	 
6908	6266	<~>	<~>
6908	6266	<split-s>	<split-s>
6908	6266	<split-h>	<split-h>
6908	6266	<name2>	<name2>
6908	6270	<aphaerese>	<aphaerese>
6908	6909	<>	<aphaerese>
6908	6909	<>	<elision3>
6908	6909	<>	<elision2>
6908	6909	<>	<elision1>
6908	6274	.	υ
6908	6277	s	υ
6908	6274	.	u
6908	6277	s	u
6908	6274	.	κ
6908	5908	s	κ
6908	6033	s	k
6908	6323	s	U
6908	6051	s	K
6908	6274	.	α
6908	6348	s	α
6908	6274	.	a
6908	6348	s	a
6908	6351	s	A
6908	6274	.	λ
6908	5908	s	λ
6908	6064	s	l
6908	6067	s	L
6908	5632	<1s>	<>
6909	6266	.	.
6909	6267	 	 
6909	6266	<~>	<~>
6909	6266	<split-s>	<split-s>
6909	6266	<split-h>	<split-h>
6909	6266	<name2>	<name2>
6909	6907	<>	<name>
6909	6270	<aphaerese>	<aphaerese>
6909	6909	<>	<aphaerese>
6909	6909	<>	<elision3>
6909	6909	<>	<elision2>
6909	6909	<>	<elision1>
6909	6274	.	υ
6909	6277	s	υ
6909	6274	.	u
6909	6277	s	u
6909	6274	.	κ
6909	5908	s	κ
6909	6033	s	k
6909	6323	s	U
6909	6051	s	K
6909	6274	.	α
6909	6348	s	α
6909	6274	.	a
6909	6348	s	a
6909	6351	s	A
6909	6274	.	λ
6909	5908	s	λ
6909	6064	s	l
6909	6067	s	L
6909	5633	<1s>	<>
6910	6911	<>	<aphaerese>
6910	6911	<>	<elision3>
6910	6911	<>	<elision2>
6910	6911	<>	<elision1>
6910	6915	H	κ
6910	6632	H	k
6910	6645	H	K
6910	6924	H	λ
6910	6659	H	l
6910	6654	H	L
6911	6912	<>	<aphaerese>
6911	6912	<>	<elision3>
6911	6912	<>	<elision2>
6911	6912	<>	<elision1>
6911	6913	H	κ
6911	6630	H	k
6911	6642	H	K
6911	6922	H	λ
6911	6657	H	l
6911	6660	H	L
6912	6910	<>	<name>
6912	6912	<>	<aphaerese>
6912	6912	<>	<elision3>
6912	6912	<>	<elision2>
6912	6912	<>	<elision1>
6912	6913	H	κ
6912	6630	H	k
6912	6642	H	K
6912	6922	H	λ
6912	6657	H	l
6912	6660	H	L
6913	6914	<>	<name>
6913	6913	<>	<aphaerese>
6913	6913	<>	<elision3>
6913	6913	<>	<elision2>
6913	6913	<>	<elision1>
6913	6917	<kappa2K>	<>
6913	6920	<kappa2L>	<>
6913	6628	<lambda2L>	<>
6914	6915	<>	<aphaerese>
6914	6915	<>	<elision3>
6914	6915	<>	<elision2>
6914	6915	<>	<elision1>
6914	6918	<kappa2K>	<>
6914	6921	<kappa2L>	<>
6914	6629	<lambda2L>	<>
6915	6913	<>	<aphaerese>
6915	6913	<>	<elision3>
6915	6913	<>	<elision2>
6915	6913	<>	<elision1>
6915	6916	<kappa2K>	<>
6915	6919	<kappa2L>	<>
6915	6627	<lambda2L>	<>
6916	6580	.	.
6916	6580	<~>	<~>
6916	6580	<split-s>	<split-s>
6916	6580	<split-h>	<split-h>
6916	6580	<name2>	<name2>
6916	6583	<aphaerese>	<aphaerese>
6916	6917	<>	<aphaerese>
6916	6917	<>	<elision3>
6916	6917	<>	<elision2>
6916	6917	<>	<elision1>
6916	6598	.	υ
6916	6551	s	υ
6916	6598	.	u
6916	6551	s	u
6916	6538	s	κ
6916	6538	s	k
6916	6592	s	U
6916	6547	s	K
6916	6598	.	α
6916	6551	s	α
6916	6598	.	a
6916	6551	s	a
6916	6595	s	A
6916	6538	s	λ
6916	6538	s	l
6916	6553	s	L
6916	6544	<1m>	<>
6917	6580	.	.
6917	6580	<~>	<~>
6917	6580	<split-s>	<split-s>
6917	6580	<split-h>	<split-h>
6917	6580	<name2>	<name2>
6917	6918	<>	<name>
6917	6583	<aphaerese>	<aphaerese>
6917	6917	<>	<aphaerese>
6917	6917	<>	<elision3>
6917	6917	<>	<elision2>
6917	6917	<>	<elision1>
6917	6598	.	υ
6917	6551	s	υ
6917	6598	.	u
6917	6551	s	u
6917	6538	s	κ
6917	6538	s	k
6917	6592	s	U
6917	6547	s	K
6917	6598	.	α
6917	6551	s	α
6917	6598	.	a
6917	6551	s	a
6917	6595	s	A
6917	6538	s	λ
6917	6538	s	l
6917	6553	s	L
6917	6545	<1m>	<>
6918	6582	.	.
6918	6582	<~>	<~>
6918	6582	<split-s>	<split-s>
6918	6582	<split-h>	<split-h>
6918	6582	<name2>	<name2>
6918	6585	<aphaerese>	<aphaerese>
6918	6916	<>	<aphaerese>
6918	6916	<>	<elision3>
6918	6916	<>	<elision2>
6918	6916	<>	<elision1>
6918	6600	.	υ
6918	6550	s	υ
6918	6600	.	u
6918	6550	s	u
6918	6537	s	κ
6918	6537	s	k
6918	6594	s	U
6918	6546	s	K
6918	6600	.	α
6918	6550	s	α
6918	6600	.	a
6918	6550	s	a
6918	6597	s	A
6918	6537	s	λ
6918	6537	s	l
6918	6552	s	L
6918	6543	<1m>	<>
6919	6610	.	.
6919	6610	<~>	<~>
6919	6610	<split-s>	<split-s>
6919	6610	<split-h>	<split-h>
6919	6610	<name2>	<name2>
6919	6613	<aphaerese>	<aphaerese>
6919	6920	<>	<aphaerese>
6919	6920	<>	<elision3>
6919	6920	<>	<elision2>
6919	6920	<>	<elision1>
6919	6616	.	υ
6919	6551	s	υ
6919	6616	.	u
6919	6551	s	u
6919	6559	s	κ
6919	6562	H	κ
6919	6559	s	k
6919	6562	H	k
6919	6592	s	U
6919	6547	s	K
6919	6562	H	K
6919	6616	.	α
6919	6551	s	α
6919	6616	.	a
6919	6551	s	a
6919	6595	s	A
6919	6559	s	λ
6919	6562	H	λ
6919	6559	s	l
6919	6562	H	l
6919	6553	s	L
6919	6562	H	L
6919	6544	<1m>	<>
6920	6610	.	.
6920	6610	<~>	<~>
6920	6610	<split-s>	<split-s>
6920	6610	<split-h>	<split-h>
6920	6610	<name2>	<name2>
6920	6921	<>	<name>
6920	6613	<aphaerese>	<aphaerese>
6920	6920	<>	<aphaerese>
6920	6920	<>	<elision3>
6920	6920	<>	<elision2>
6920	6920	<>	<elision1>
6920	6616	.	υ
6920	6551	s	υ
6920	6616	.	u
6920	6551	s	u
6920	6559	s	κ
6920	6562	H	κ
6920	6559	s	k
6920	6562	H	k
6920	6592	s	U
6920	6547	s	K
6920	6562	H	K
6920	6616	.	α
6920	6551	s	α
6920	6616	.	a
6920	6551	s	a
6920	6595	s	A
6920	6559	s	λ
6920	6562	H	λ
6920	6559	s	l
6920	6562	H	l
6920	6553	s	L
6920	6562	H	L
6920	6545	<1m>	<>
6921	6612	.	.
6921	6612	<~>	<~>
6921	6612	<split-s>	<split-s>
6921	6612	<split-h>	<split-h>
6921	6612	<name2>	<name2>
6921	6615	<aphaerese>	<aphaerese>
6921	6919	<>	<aphaerese>
6921	6919	<>	<elision3>
6921	6919	<>	<elision2>
6921	6919	<>	<elision1>
6921	6618	.	υ
6921	6550	s	υ
6921	6618	.	u
6921	6550	s	u
6921	6558	s	κ
6921	6561	H	κ
6921	6558	s	k
6921	6561	H	k
6921	6594	s	U
6921	6546	s	K
6921	6561	H	K
6921	6618	.	α
6921	6550	s	α
6921	6618	.	a
6921	6550	s	a
6921	6597	s	A
6921	6558	s	λ
6921	6561	H	λ
6921	6558	s	l
6921	6561	H	l
6921	6552	s	L
6921	6561	H	L
6921	6543	<1m>	<>
6922	6923	<>	<name>
6922	6922	<>	<aphaerese>
6922	6922	<>	<elision3>
6922	6922	<>	<elision2>
6922	6922	<>	<elision1>
6922	6926	<lambda2L>	<>
6923	6924	<>	<aphaerese>
6923	6924	<>	<elision3>
6923	6924	<>	<elision2>
6923	6924	<>	<elision1>
6923	6927	<lambda2L>	<>
6924	6922	<>	<aphaerese>
6924	6922	<>	<elision3>
6924	6922	<>	<elision2>
6924	6922	<>	<elision1>
6924	6925	<lambda2L>	<>
6925	6610	.	.
6925	6610	<~>	<~>
6925	6610	<split-s>	<split-s>
6925	6610	<split-h>	<split-h>
6925	6610	<name2>	<name2>
6925	6613	<aphaerese>	<aphaerese>
6925	6926	<>	<aphaerese>
6925	6926	<>	<elision3>
6925	6926	<>	<elision2>
6925	6926	<>	<elision1>
6925	6616	.	υ
6925	6551	s	υ
6925	6616	.	u
6925	6551	s	u
6925	6616	.	κ
6925	6559	s	κ
6925	6562	H	κ
6925	6559	s	k
6925	6562	H	k
6925	6592	s	U
6925	6547	s	K
6925	6562	H	K
6925	6616	.	α
6925	6551	s	α
6925	6616	.	a
6925	6551	s	a
6925	6595	s	A
6925	6616	.	λ
6925	6559	s	λ
6925	6562	H	λ
6925	6559	s	l
6925	6562	H	l
6925	6553	s	L
6925	6562	H	L
6925	6544	<1m>	<>
6926	6610	.	.
6926	6610	<~>	<~>
6926	6610	<split-s>	<split-s>
6926	6610	<split-h>	<split-h>
6926	6610	<name2>	<name2>
6926	6927	<>	<name>
6926	6613	<aphaerese>	<aphaerese>
6926	6926	<>	<aphaerese>
6926	6926	<>	<elision3>
6926	6926	<>	<elision2>
6926	6926	<>	<elision1>
6926	6616	.	υ
6926	6551	s	υ
6926	6616	.	u
6926	6551	s	u
6926	6616	.	κ
6926	6559	s	κ
6926	6562	H	κ
6926	6559	s	k
6926	6562	H	k
6926	6592	s	U
6926	6547	s	K
6926	6562	H	K
6926	6616	.	α
6926	6551	s	α
6926	6616	.	a
6926	6551	s	a
6926	6595	s	A
6926	6616	.	λ
6926	6559	s	λ
6926	6562	H	λ
6926	6559	s	l
6926	6562	H	l
6926	6553	s	L
6926	6562	H	L
6926	6545	<1m>	<>
6927	6612	.	.
6927	6612	<~>	<~>
6927	6612	<split-s>	<split-s>
6927	6612	<split-h>	<split-h>
6927	6612	<name2>	<name2>
6927	6615	<aphaerese>	<aphaerese>
6927	6925	<>	<aphaerese>
6927	6925	<>	<elision3>
6927	6925	<>	<elision2>
6927	6925	<>	<elision1>
6927	6618	.	υ
6927	6550	s	υ
6927	6618	.	u
6927	6550	s	u
6927	6618	.	κ
6927	6558	s	κ
6927	6561	H	κ
6927	6558	s	k
6927	6561	H	k
6927	6594	s	U
6927	6546	s	K
6927	6561	H	K
6927	6618	.	α
6927	6550	s	α
6927	6618	.	a
6927	6550	s	a
6927	6597	s	A
6927	6618	.	λ
6927	6558	s	λ
6927	6561	H	λ
6927	6558	s	l
6927	6561	H	l
6927	6552	s	L
6927	6561	H	L
6927	6543	<1m>	<>
6928	6887	<>	<name>
6928	6886	<>	<aphaerese>
6928	6886	<>	<elision3>
6928	6886	<>	<elision2>
6928	6886	<>	<elision1>
6928	6890	<kappa2K>	<>
6928	6929	<kappa2L>	<>
6928	6417	<lambda2L>	<>
6929	6266	.	.
6929	6267	 	 
6929	6266	<~>	<~>
6929	6266	<split-s>	<split-s>
6929	6266	<split-h>	<split-h>
6929	6266	<name2>	<name2>
6929	6894	<>	<name>
6929	6270	<aphaerese>	<aphaerese>
6929	6893	<>	<aphaerese>
6929	6893	<>	<elision3>
6929	6893	<>	<elision2>
6929	6893	<>	<elision1>
6929	6274	.	υ
6929	6277	s	υ
6929	6274	.	u
6929	6277	s	u
6929	5908	s	κ
6929	6033	s	k
6929	6323	s	U
6929	6051	s	K
6929	6274	.	α
6929	6348	s	α
6929	6274	.	a
6929	6348	s	a
6929	6351	s	A
6929	5908	s	λ
6929	6064	s	l
6929	6067	s	L
6929	6930	<1s>	<>
6930	179	.	.
6930	180	 	 
6930	179	<~>	<~>
6930	179	<split-s>	<split-s>
6930	179	<split-h>	<split-h>
6930	179	<name2>	<name2>
6930	6895	<>	<name>
6930	183	<aphaerese>	<aphaerese>
6930	6897	<>	<aphaerese>
6930	6897	<>	<elision3>
6930	6897	<>	<elision2>
6930	6897	<>	<elision1>
6930	4828	.	υ
6930	4828	.	u
6930	4828	.	α
6930	4828	.	a
6930	6931	<K>	<>
6931	4878	.	.
6931	4878	<~>	<~>
6931	4878	<split-s>	<split-s>
6931	4878	<split-h>	<split-h>
6931	4878	<name2>	<name2>
6931	6899	<>	<name>
6931	4881	<aphaerese>	<aphaerese>
6931	6898	<>	<aphaerese>
6931	6898	<>	<elision3>
6931	6898	<>	<elision2>
6931	6898	<>	<elision1>
6931	4877	.	υ
6931	4877	.	u
6931	4877	.	α
6931	4877	.	a
6932	6933	<>	<name>
6932	6932	<>	<aphaerese>
6932	6932	<>	<elision3>
6932	6932	<>	<elision2>
6932	6932	<>	<elision1>
6932	6879	<K2kl>	<>
6933	6934	<>	<aphaerese>
6933	6934	<>	<elision3>
6933	6934	<>	<elision2>
6933	6934	<>	<elision1>
6933	6880	<K2kl>	<>
6934	6932	<>	<aphaerese>
6934	6932	<>	<elision3>
6934	6932	<>	<elision2>
6934	6932	<>	<elision1>
6934	6881	<K2kl>	<>
6935	6936	<>	<name>
6935	6935	<>	<aphaerese>
6935	6935	<>	<elision3>
6935	6935	<>	<elision2>
6935	6935	<>	<elision1>
6935	6879	<L2kl>	<>
6936	6937	<>	<aphaerese>
6936	6937	<>	<elision3>
6936	6937	<>	<elision2>
6936	6937	<>	<elision1>
6936	6880	<L2kl>	<>
6937	6935	<>	<aphaerese>
6937	6935	<>	<elision3>
6937	6935	<>	<elision2>
6937	6935	<>	<elision1>
6937	6881	<L2kl>	<>
6938	6939	<>	<aphaerese>
6938	6939	<>	<elision3>
6938	6939	<>	<elision2>
6938	6939	<>	<elision1>
6938	6707	<3s>	<>
6939	6940	<>	<name>
6939	6939	<>	<aphaerese>
6939	6939	<>	<elision3>
6939	6939	<>	<elision2>
6939	6939	<>	<elision1>
6939	6708	<3s>	<>
6940	6938	<>	<aphaerese>
6940	6938	<>	<elision3>
6940	6938	<>	<elision2>
6940	6938	<>	<elision1>
6940	6709	<3s>	<>
6941	6942	<>	<aphaerese>
6941	6942	<>	<elision3>
6941	6942	<>	<elision2>
6941	6942	<>	<elision1>
6941	6846	<3s>	<>
6942	6943	<>	<name>
6942	6942	<>	<aphaerese>
6942	6942	<>	<elision3>
6942	6942	<>	<elision2>
6942	6942	<>	<elision1>
6942	6847	<3s>	<>
6943	6941	<>	<aphaerese>
6943	6941	<>	<elision3>
6943	6941	<>	<elision2>
6943	6941	<>	<elision1>
6943	6848	<3s>	<>
6944	6695	.	.
6944	6695	 	 
6944	6695	<~>	<~>
6944	6695	<split-s>	<split-s>
6944	6695	<split-h>	<split-h>
6944	6695	<name2>	<name2>
6944	6945	<>	<name>
6944	6698	<aphaerese>	<aphaerese>
6944	6944	<>	<aphaerese>
6944	6947	<elision3>	<elision3>
6944	6944	<>	<elision3>
6944	6947	<elision2>	<elision2>
6944	6944	<>	<elision2>
6944	6947	<elision1>	<elision1>
6944	6944	<>	<elision1>
6944	6859	.	υ
6944	6859	.	u
6944	6859	.	κ
6944	6859	.	α
6944	6859	.	a
6944	6859	.	λ
6944	7048	<4s>	<>
6945	6697	.	.
6945	6697	 	 
6945	6697	<~>	<~>
6945	6697	<split-s>	<split-s>
6945	6697	<split-h>	<split-h>
6945	6697	<name2>	<name2>
6945	6700	<aphaerese>	<aphaerese>
6945	6946	<>	<aphaerese>
6945	6949	<elision3>	<elision3>
6945	6946	<>	<elision3>
6945	6949	<elision2>	<elision2>
6945	6946	<>	<elision2>
6945	6949	<elision1>	<elision1>
6945	6946	<>	<elision1>
6945	6861	.	υ
6945	6861	.	u
6945	6861	.	κ
6945	6861	.	α
6945	6861	.	a
6945	6861	.	λ
6945	7049	<4s>	<>
6946	6695	.	.
6946	6695	 	 
6946	6695	<~>	<~>
6946	6695	<split-s>	<split-s>
6946	6695	<split-h>	<split-h>
6946	6695	<name2>	<name2>
6946	6698	<aphaerese>	<aphaerese>
6946	6944	<>	<aphaerese>
6946	6947	<elision3>	<elision3>
6946	6944	<>	<elision3>
6946	6947	<elision2>	<elision2>
6946	6944	<>	<elision2>
6946	6947	<elision1>	<elision1>
6946	6944	<>	<elision1>
6946	6859	.	υ
6946	6859	.	u
6946	6859	.	κ
6946	6859	.	α
6946	6859	.	a
6946	6859	.	λ
6946	7047	<4s>	<>
6947	6695	.	.
6947	6695	 	 
6947	6695	<~>	<~>
6947	6695	<split-s>	<split-s>
6947	6695	<split-h>	<split-h>
6947	6695	<name2>	<name2>
6947	6948	<>	<name>
6947	6698	<aphaerese>	<aphaerese>
6947	6947	<>	<aphaerese>
6947	6695	<elision3>	<elision3>
6947	6947	<>	<elision3>
6947	6695	<elision2>	<elision2>
6947	6947	<>	<elision2>
6947	6695	<elision1>	<elision1>
6947	6947	<>	<elision1>
6947	6859	.	υ
6947	6859	.	u
6947	6701	.	κ
6947	6859	.	α
6947	6859	.	a
6947	6951	<4s>	<>
6948	6697	.	.
6948	6697	 	 
6948	6697	<~>	<~>
6948	6697	<split-s>	<split-s>
6948	6697	<split-h>	<split-h>
6948	6697	<name2>	<name2>
6948	6700	<aphaerese>	<aphaerese>
6948	6949	<>	<aphaerese>
6948	6697	<elision3>	<elision3>
6948	6949	<>	<elision3>
6948	6697	<elision2>	<elision2>
6948	6949	<>	<elision2>
6948	6697	<elision1>	<elision1>
6948	6949	<>	<elision1>
6948	6861	.	υ
6948	6861	.	u
6948	6703	.	κ
6948	6861	.	α
6948	6861	.	a
6948	6952	<4s>	<>
6949	6695	.	.
6949	6695	 	 
6949	6695	<~>	<~>
6949	6695	<split-s>	<split-s>
6949	6695	<split-h>	<split-h>
6949	6695	<name2>	<name2>
6949	6698	<aphaerese>	<aphaerese>
6949	6947	<>	<aphaerese>
6949	6695	<elision3>	<elision3>
6949	6947	<>	<elision3>
6949	6695	<elision2>	<elision2>
6949	6947	<>	<elision2>
6949	6695	<elision1>	<elision1>
6949	6947	<>	<elision1>
6949	6859	.	υ
6949	6859	.	u
6949	6701	.	κ
6949	6859	.	α
6949	6859	.	a
6949	6950	<4s>	<>
6950	143	.	.
6950	144	 	 
6950	143	<~>	<~>
6950	143	<split-s>	<split-s>
6950	143	<split-h>	<split-h>
6950	143	<name2>	<name2>
6950	147	<aphaerese>	<aphaerese>
6950	6951	<>	<aphaerese>
6950	143	<elision3>	<elision3>
6950	6951	<>	<elision3>
6950	143	<elision2>	<elision2>
6950	6951	<>	<elision2>
6950	143	<elision1>	<elision1>
6950	6951	<>	<elision1>
6950	6469	.	υ
6950	6513	H	υ
6950	6469	.	u
6950	6515	H	u
6950	150	.	κ
6950	7034	H	κ
6950	7038	H	k
6950	6436	H	U
6950	7042	H	K
6950	6469	.	α
6950	6499	H	α
6950	6469	.	a
6950	6504	H	a
6950	6266	H	A
6950	6990	H	λ
6950	6996	H	l
6950	7046	H	L
6950	6999	<K>	<>
6951	143	.	.
6951	144	 	 
6951	143	<~>	<~>
6951	143	<split-s>	<split-s>
6951	143	<split-h>	<split-h>
6951	143	<name2>	<name2>
6951	6952	<>	<name>
6951	147	<aphaerese>	<aphaerese>
6951	6951	<>	<aphaerese>
6951	143	<elision3>	<elision3>
6951	6951	<>	<elision3>
6951	143	<elision2>	<elision2>
6951	6951	<>	<elision2>
6951	143	<elision1>	<elision1>
6951	6951	<>	<elision1>
6951	6469	.	υ
6951	6513	H	υ
6951	6469	.	u
6951	6515	H	u
6951	150	.	κ
6951	7034	H	κ
6951	7038	H	k
6951	6436	H	U
6951	7042	H	K
6951	6469	.	α
6951	6499	H	α
6951	6469	.	a
6951	6504	H	a
6951	6266	H	A
6951	6990	H	λ
6951	6996	H	l
6951	7046	H	L
6951	7000	<K>	<>
6952	142	.	.
6952	146	 	 
6952	142	<~>	<~>
6952	142	<split-s>	<split-s>
6952	142	<split-h>	<split-h>
6952	142	<name2>	<name2>
6952	149	<aphaerese>	<aphaerese>
6952	6950	<>	<aphaerese>
6952	142	<elision3>	<elision3>
6952	6950	<>	<elision3>
6952	142	<elision2>	<elision2>
6952	6950	<>	<elision2>
6952	142	<elision1>	<elision1>
6952	6950	<>	<elision1>
6952	6471	.	υ
6952	6508	H	υ
6952	6471	.	u
6952	6512	H	u
6952	152	.	κ
6952	6953	H	κ
6952	6972	H	k
6952	6438	H	U
6952	6985	H	K
6952	6471	.	α
6952	6498	H	α
6952	6471	.	a
6952	6503	H	a
6952	6269	H	A
6952	6989	H	λ
6952	6995	H	l
6952	6993	H	L
6952	6998	<K>	<>
6953	6954	<>	<aphaerese>
6953	6954	<>	<elision3>
6953	6954	<>	<elision2>
6953	6954	<>	<elision1>
6953	6957	<kappa2K>	<>
6953	6969	<kappa2L>	<>
6953	6419	<lambda2L>	<>
6954	6955	<>	<name>
6954	6954	<>	<aphaerese>
6954	6954	<>	<elision3>
6954	6954	<>	<elision2>
6954	6954	<>	<elision1>
6954	6958	<kappa2K>	<>
6954	6961	<kappa2L>	<>
6954	6417	<lambda2L>	<>
6955	6956	<>	<aphaerese>
6955	6956	<>	<elision3>
6955	6956	<>	<elision2>
6955	6956	<>	<elision1>
6955	6959	<kappa2K>	<>
6955	6962	<kappa2L>	<>
6955	6418	<lambda2L>	<>
6956	6954	<>	<aphaerese>
6956	6954	<>	<elision3>
6956	6954	<>	<elision2>
6956	6954	<>	<elision1>
6956	6957	<kappa2K>	<>
6956	6960	<kappa2L>	<>
6956	6419	<lambda2L>	<>
6957	6100	.	.
6957	6101	 	 
6957	6100	<~>	<~>
6957	6100	<split-s>	<split-s>
6957	6100	<split-h>	<split-h>
6957	6100	<name2>	<name2>
6957	6104	<aphaerese>	<aphaerese>
6957	6958	<>	<aphaerese>
6957	6237	<elision3>	<elision3>
6957	6958	<>	<elision3>
6957	6237	<elision2>	<elision2>
6957	6958	<>	<elision2>
6957	6237	<elision1>	<elision1>
6957	6958	<>	<elision1>
6957	6108	.	υ
6957	6111	s	υ
6957	6108	.	u
6957	6111	s	u
6957	6174	s	U
6957	6108	.	α
6957	6202	s	α
6957	6108	.	a
6957	6202	s	a
6957	6205	s	A
6958	6100	.	.
6958	6101	 	 
6958	6100	<~>	<~>
6958	6100	<split-s>	<split-s>
6958	6100	<split-h>	<split-h>
6958	6100	<name2>	<name2>
6958	6959	<>	<name>
6958	6104	<aphaerese>	<aphaerese>
6958	6958	<>	<aphaerese>
6958	6237	<elision3>	<elision3>
6958	6958	<>	<elision3>
6958	6237	<elision2>	<elision2>
6958	6958	<>	<elision2>
6958	6237	<elision1>	<elision1>
6958	6958	<>	<elision1>
6958	6108	.	υ
6958	6111	s	υ
6958	6108	.	u
6958	6111	s	u
6958	6174	s	U
6958	6108	.	α
6958	6202	s	α
6958	6108	.	a
6958	6202	s	a
6958	6205	s	A
6959	6103	.	.
6959	6106	 	 
6959	6103	<~>	<~>
6959	6103	<split-s>	<split-s>
6959	6103	<split-h>	<split-h>
6959	6103	<name2>	<name2>
6959	6232	<aphaerese>	<aphaerese>
6959	6957	<>	<aphaerese>
6959	6239	<elision3>	<elision3>
6959	6957	<>	<elision3>
6959	6239	<elision2>	<elision2>
6959	6957	<>	<elision2>
6959	6239	<elision1>	<elision1>
6959	6957	<>	<elision1>
6959	6110	.	υ
6959	6113	s	υ
6959	6110	.	u
6959	6113	s	u
6959	6176	s	U
6959	6110	.	α
6959	6204	s	α
6959	6110	.	a
6959	6204	s	a
6959	6207	s	A
6960	6266	.	.
6960	6267	 	 
6960	6266	<~>	<~>
6960	6266	<split-s>	<split-s>
6960	6266	<split-h>	<split-h>
6960	6266	<name2>	<name2>
6960	6270	<aphaerese>	<aphaerese>
6960	6961	<>	<aphaerese>
6960	6383	<elision3>	<elision3>
6960	6961	<>	<elision3>
6960	6383	<elision2>	<elision2>
6960	6961	<>	<elision2>
6960	6383	<elision1>	<elision1>
6960	6961	<>	<elision1>
6960	6274	.	υ
6960	6277	s	υ
6960	6274	.	u
6960	6277	s	u
6960	6323	s	U
6960	6274	.	α
6960	6348	s	α
6960	6274	.	a
6960	6348	s	a
6960	6351	s	A
6960	6964	<1s>	<>
6961	6266	.	.
6961	6267	 	 
6961	6266	<~>	<~>
6961	6266	<split-s>	<split-s>
6961	6266	<split-h>	<split-h>
6961	6266	<name2>	<name2>
6961	6962	<>	<name>
6961	6270	<aphaerese>	<aphaerese>
6961	6961	<>	<aphaerese>
6961	6383	<elision3>	<elision3>
6961	6961	<>	<elision3>
6961	6383	<elision2>	<elision2>
6961	6961	<>	<elision2>
6961	6383	<elision1>	<elision1>
6961	6961	<>	<elision1>
6961	6274	.	υ
6961	6277	s	υ
6961	6274	.	u
6961	6277	s	u
6961	6323	s	U
6961	6274	.	α
6961	6348	s	α
6961	6274	.	a
6961	6348	s	a
6961	6351	s	A
6961	6965	<1s>	<>
6962	6269	.	.
6962	6272	 	 
6962	6269	<~>	<~>
6962	6269	<split-s>	<split-s>
6962	6269	<split-h>	<split-h>
6962	6269	<name2>	<name2>
6962	6378	<aphaerese>	<aphaerese>
6962	6960	<>	<aphaerese>
6962	6385	<elision3>	<elision3>
6962	6960	<>	<elision3>
6962	6385	<elision2>	<elision2>
6962	6960	<>	<elision2>
6962	6385	<elision1>	<elision1>
6962	6960	<>	<elision1>
6962	6276	.	υ
6962	6279	s	υ
6962	6276	.	u
6962	6279	s	u
6962	6325	s	U
6962	6276	.	α
6962	6350	s	α
6962	6276	.	a
6962	6350	s	a
6962	6353	s	A
6962	6963	<1s>	<>
6963	178	.	.
6963	182	 	 
6963	178	<~>	<~>
6963	178	<split-s>	<split-s>
6963	178	<split-h>	<split-h>
6963	178	<name2>	<name2>
6963	185	<aphaerese>	<aphaerese>
6963	6964	<>	<aphaerese>
6963	5409	<elision3>	<elision3>
6963	6964	<>	<elision3>
6963	5409	<elision2>	<elision2>
6963	6964	<>	<elision2>
6963	5409	<elision1>	<elision1>
6963	6964	<>	<elision1>
6963	4830	.	υ
6963	4867	H	υ
6963	4830	.	u
6963	4871	H	u
6963	4797	H	U
6963	4830	.	α
6963	4857	H	α
6963	4830	.	a
6963	4862	H	a
6963	4628	H	A
6963	6967	<K>	<>
6964	179	.	.
6964	180	 	 
6964	179	<~>	<~>
6964	179	<split-s>	<split-s>
6964	179	<split-h>	<split-h>
6964	179	<name2>	<name2>
6964	183	<aphaerese>	<aphaerese>
6964	6965	<>	<aphaerese>
6964	5410	<elision3>	<elision3>
6964	6965	<>	<elision3>
6964	5410	<elision2>	<elision2>
6964	6965	<>	<elision2>
6964	5410	<elision1>	<elision1>
6964	6965	<>	<elision1>
6964	4828	.	υ
6964	4872	H	υ
6964	4828	.	u
6964	4874	H	u
6964	4795	H	U
6964	4828	.	α
6964	4858	H	α
6964	4828	.	a
6964	4863	H	a
6964	4625	H	A
6964	6968	<K>	<>
6965	179	.	.
6965	180	 	 
6965	179	<~>	<~>
6965	179	<split-s>	<split-s>
6965	179	<split-h>	<split-h>
6965	179	<name2>	<name2>
6965	6963	<>	<name>
6965	183	<aphaerese>	<aphaerese>
6965	6965	<>	<aphaerese>
6965	5410	<elision3>	<elision3>
6965	6965	<>	<elision3>
6965	5410	<elision2>	<elision2>
6965	6965	<>	<elision2>
6965	5410	<elision1>	<elision1>
6965	6965	<>	<elision1>
6965	4828	.	υ
6965	4872	H	υ
6965	4828	.	u
6965	4874	H	u
6965	4795	H	U
6965	4828	.	α
6965	4858	H	α
6965	4828	.	a
6965	4863	H	a
6965	4625	H	A
6965	6966	<K>	<>
6966	4878	.	.
6966	4878	<~>	<~>
6966	4878	<split-s>	<split-s>
6966	4878	<split-h>	<split-h>
6966	4878	<name2>	<name2>
6966	6967	<>	<name>
6966	4881	<aphaerese>	<aphaerese>
6966	6966	<>	<aphaerese>
6966	5359	<elision3>	<elision3>
6966	6966	<>	<elision3>
6966	5359	<elision2>	<elision2>
6966	6966	<>	<elision2>
6966	5359	<elision1>	<elision1>
6966	6966	<>	<elision1>
6966	4877	.	υ
6966	5020	H	υ
6966	4877	.	u
6966	5029	H	u
6966	4998	H	U
6966	4877	.	α
6966	5032	H	α
6966	4877	.	a
6966	5035	H	a
6966	4969	H	A
6967	4880	.	.
6967	4880	<~>	<~>
6967	4880	<split-s>	<split-s>
6967	4880	<split-h>	<split-h>
6967	4880	<name2>	<name2>
6967	4883	<aphaerese>	<aphaerese>
6967	6968	<>	<aphaerese>
6967	5358	<elision3>	<elision3>
6967	6968	<>	<elision3>
6967	5358	<elision2>	<elision2>
6967	6968	<>	<elision2>
6967	5358	<elision1>	<elision1>
6967	6968	<>	<elision1>
6967	4876	.	υ
6967	5022	H	υ
6967	4876	.	u
6967	5031	H	u
6967	5000	H	U
6967	4876	.	α
6967	5034	H	α
6967	4876	.	a
6967	5037	H	a
6967	4971	H	A
6968	4878	.	.
6968	4878	<~>	<~>
6968	4878	<split-s>	<split-s>
6968	4878	<split-h>	<split-h>
6968	4878	<name2>	<name2>
6968	4881	<aphaerese>	<aphaerese>
6968	6966	<>	<aphaerese>
6968	5359	<elision3>	<elision3>
6968	6966	<>	<elision3>
6968	5359	<elision2>	<elision2>
6968	6966	<>	<elision2>
6968	5359	<elision1>	<elision1>
6968	6966	<>	<elision1>
6968	4877	.	υ
6968	5020	H	υ
6968	4877	.	u
6968	5029	H	u
6968	4998	H	U
6968	4877	.	α
6968	5032	H	α
6968	4877	.	a
6968	5035	H	a
6968	4969	H	A
6969	6266	.	.
6969	6267	 	 
6969	6266	<~>	<~>
6969	6266	<split-s>	<split-s>
6969	6266	<split-h>	<split-h>
6969	6266	<name2>	<name2>
6969	6270	<aphaerese>	<aphaerese>
6969	6961	<>	<aphaerese>
6969	6383	<elision3>	<elision3>
6969	6961	<>	<elision3>
6969	6383	<elision2>	<elision2>
6969	6961	<>	<elision2>
6969	6383	<elision1>	<elision1>
6969	6961	<>	<elision1>
6969	6274	.	υ
6969	6277	s	υ
6969	6274	.	u
6969	6277	s	u
6969	6323	s	U
6969	6274	.	α
6969	6348	s	α
6969	6274	.	a
6969	6348	s	a
6969	6351	s	A
6969	6970	<1s>	<>
6970	179	.	.
6970	180	 	 
6970	179	<~>	<~>
6970	179	<split-s>	<split-s>
6970	179	<split-h>	<split-h>
6970	179	<name2>	<name2>
6970	183	<aphaerese>	<aphaerese>
6970	6965	<>	<aphaerese>
6970	5410	<elision3>	<elision3>
6970	6965	<>	<elision3>
6970	5410	<elision2>	<elision2>
6970	6965	<>	<elision2>
6970	5410	<elision1>	<elision1>
6970	6965	<>	<elision1>
6970	4828	.	υ
6970	4828	.	u
6970	4828	.	α
6970	4828	.	a
6970	6971	<K>	<>
6971	4878	.	.
6971	4878	<~>	<~>
6971	4878	<split-s>	<split-s>
6971	4878	<split-h>	<split-h>
6971	4878	<name2>	<name2>
6971	4881	<aphaerese>	<aphaerese>
6971	6966	<>	<aphaerese>
6971	5359	<elision3>	<elision3>
6971	6966	<>	<elision3>
6971	5359	<elision2>	<elision2>
6971	6966	<>	<elision2>
6971	5359	<elision1>	<elision1>
6971	6966	<>	<elision1>
6971	4877	.	υ
6971	4877	.	u
6971	4877	.	α
6971	4877	.	a
6972	6973	<>	<aphaerese>
6972	6973	<>	<elision3>
6972	6973	<>	<elision2>
6972	6973	<>	<elision1>
6972	6976	<k2K>	<>
6972	6982	<k2L>	<>
6972	6419	<l2L>	<>
6973	6974	<>	<name>
6973	6973	<>	<aphaerese>
6973	6973	<>	<elision3>
6973	6973	<>	<elision2>
6973	6973	<>	<elision1>
6973	6977	<k2K>	<>
6973	6980	<k2L>	<>
6973	6417	<l2L>	<>
6974	6975	<>	<aphaerese>
6974	6975	<>	<elision3>
6974	6975	<>	<elision2>
6974	6975	<>	<elision1>
6974	6978	<k2K>	<>
6974	6981	<k2L>	<>
6974	6418	<l2L>	<>
6975	6973	<>	<aphaerese>
6975	6973	<>	<elision3>
6975	6973	<>	<elision2>
6975	6973	<>	<elision1>
6975	6976	<k2K>	<>
6975	6979	<k2L>	<>
6975	6419	<l2L>	<>
6976	6100	.	.
6976	6101	 	 
6976	6100	<~>	<~>
6976	6100	<split-s>	<split-s>
6976	6100	<split-h>	<split-h>
6976	6100	<name2>	<name2>
6976	6104	<aphaerese>	<aphaerese>
6976	6977	<>	<aphaerese>
6976	6100	<elision3>	<elision3>
6976	6977	<>	<elision3>
6976	6100	<elision2>	<elision2>
6976	6977	<>	<elision2>
6976	6100	<elision1>	<elision1>
6976	6977	<>	<elision1>
6976	6108	.	υ
6976	6111	s	υ
6976	6108	.	u
6976	6111	s	u
6976	6174	s	U
6976	6108	.	α
6976	6202	s	α
6976	6108	.	a
6976	6202	s	a
6976	6205	s	A
6977	6100	.	.
6977	6101	 	 
6977	6100	<~>	<~>
6977	6100	<split-s>	<split-s>
6977	6100	<split-h>	<split-h>
6977	6100	<name2>	<name2>
6977	6978	<>	<name>
6977	6104	<aphaerese>	<aphaerese>
6977	6977	<>	<aphaerese>
6977	6100	<elision3>	<elision3>
6977	6977	<>	<elision3>
6977	6100	<elision2>	<elision2>
6977	6977	<>	<elision2>
6977	6100	<elision1>	<elision1>
6977	6977	<>	<elision1>
6977	6108	.	υ
6977	6111	s	υ
6977	6108	.	u
6977	6111	s	u
6977	6174	s	U
6977	6108	.	α
6977	6202	s	α
6977	6108	.	a
6977	6202	s	a
6977	6205	s	A
6978	6103	.	.
6978	6106	 	 
6978	6103	<~>	<~>
6978	6103	<split-s>	<split-s>
6978	6103	<split-h>	<split-h>
6978	6103	<name2>	<name2>
6978	6232	<aphaerese>	<aphaerese>
6978	6976	<>	<aphaerese>
6978	6103	<elision3>	<elision3>
6978	6976	<>	<elision3>
6978	6103	<elision2>	<elision2>
6978	6976	<>	<elision2>
6978	6103	<elision1>	<elision1>
6978	6976	<>	<elision1>
6978	6110	.	υ
6978	6113	s	υ
6978	6110	.	u
6978	6113	s	u
6978	6176	s	U
6978	6110	.	α
6978	6204	s	α
6978	6110	.	a
6978	6204	s	a
6978	6207	s	A
6979	6266	.	.
6979	6267	 	 
6979	6266	<~>	<~>
6979	6266	<split-s>	<split-s>
6979	6266	<split-h>	<split-h>
6979	6266	<name2>	<name2>
6979	6270	<aphaerese>	<aphaerese>
6979	6980	<>	<aphaerese>
6979	6266	<elision3>	<elision3>
6979	6980	<>	<elision3>
6979	6266	<elision2>	<elision2>
6979	6980	<>	<elision2>
6979	6266	<elision1>	<elision1>
6979	6980	<>	<elision1>
6979	6274	.	υ
6979	6277	s	υ
6979	6274	.	u
6979	6277	s	u
6979	6323	s	U
6979	6274	.	α
6979	6348	s	α
6979	6274	.	a
6979	6348	s	a
6979	6351	s	A
6979	5681	<1s>	<>
6980	6266	.	.
6980	6267	 	 
6980	6266	<~>	<~>
6980	6266	<split-s>	<split-s>
6980	6266	<split-h>	<split-h>
6980	6266	<name2>	<name2>
6980	6981	<>	<name>
6980	6270	<aphaerese>	<aphaerese>
6980	6980	<>	<aphaerese>
6980	6266	<elision3>	<elision3>
6980	6980	<>	<elision3>
6980	6266	<elision2>	<elision2>
6980	6980	<>	<elision2>
6980	6266	<elision1>	<elision1>
6980	6980	<>	<elision1>
6980	6274	.	υ
6980	6277	s	υ
6980	6274	.	u
6980	6277	s	u
6980	6323	s	U
6980	6274	.	α
6980	6348	s	α
6980	6274	.	a
6980	6348	s	a
6980	6351	s	A
6980	5682	<1s>	<>
6981	6269	.	.
6981	6272	 	 
6981	6269	<~>	<~>
6981	6269	<split-s>	<split-s>
6981	6269	<split-h>	<split-h>
6981	6269	<name2>	<name2>
6981	6378	<aphaerese>	<aphaerese>
6981	6979	<>	<aphaerese>
6981	6269	<elision3>	<elision3>
6981	6979	<>	<elision3>
6981	6269	<elision2>	<elision2>
6981	6979	<>	<elision2>
6981	6269	<elision1>	<elision1>
6981	6979	<>	<elision1>
6981	6276	.	υ
6981	6279	s	υ
6981	6276	.	u
6981	6279	s	u
6981	6325	s	U
6981	6276	.	α
6981	6350	s	α
6981	6276	.	a
6981	6350	s	a
6981	6353	s	A
6981	5683	<1s>	<>
6982	6266	.	.
6982	6267	 	 
6982	6266	<~>	<~>
6982	6266	<split-s>	<split-s>
6982	6266	<split-h>	<split-h>
6982	6266	<name2>	<name2>
6982	6270	<aphaerese>	<aphaerese>
6982	6980	<>	<aphaerese>
6982	6266	<elision3>	<elision3>
6982	6980	<>	<elision3>
6982	6266	<elision2>	<elision2>
6982	6980	<>	<elision2>
6982	6266	<elision1>	<elision1>
6982	6980	<>	<elision1>
6982	6274	.	υ
6982	6277	s	υ
6982	6274	.	u
6982	6277	s	u
6982	6323	s	U
6982	6274	.	α
6982	6348	s	α
6982	6274	.	a
6982	6348	s	a
6982	6351	s	A
6982	6983	<1s>	<>
6983	179	.	.
6983	180	 	 
6983	179	<~>	<~>
6983	179	<split-s>	<split-s>
6983	179	<split-h>	<split-h>
6983	179	<name2>	<name2>
6983	183	<aphaerese>	<aphaerese>
6983	5682	<>	<aphaerese>
6983	179	<elision3>	<elision3>
6983	5682	<>	<elision3>
6983	179	<elision2>	<elision2>
6983	5682	<>	<elision2>
6983	179	<elision1>	<elision1>
6983	5682	<>	<elision1>
6983	4828	.	υ
6983	4828	.	u
6983	4828	.	α
6983	4828	.	a
6983	6984	<K>	<>
6984	4878	.	.
6984	4878	<~>	<~>
6984	4878	<split-s>	<split-s>
6984	4878	<split-h>	<split-h>
6984	4878	<name2>	<name2>
6984	4881	<aphaerese>	<aphaerese>
6984	5686	<>	<aphaerese>
6984	4878	<elision3>	<elision3>
6984	5686	<>	<elision3>
6984	4878	<elision2>	<elision2>
6984	5686	<>	<elision2>
6984	4878	<elision1>	<elision1>
6984	5686	<>	<elision1>
6984	4877	.	υ
6984	4877	.	u
6984	4877	.	α
6984	4877	.	a
6985	6100	.	.
6985	6101	 	 
6985	6100	<~>	<~>
6985	6100	<split-s>	<split-s>
6985	6100	<split-h>	<split-h>
6985	6100	<name2>	<name2>
6985	6104	<aphaerese>	<aphaerese>
6985	6986	<>	<aphaerese>
6985	6100	<elision3>	<elision3>
6985	6986	<>	<elision3>
6985	6100	<elision2>	<elision2>
6985	6986	<>	<elision2>
6985	6100	<elision1>	<elision1>
6985	6986	<>	<elision1>
6985	6108	.	υ
6985	6111	s	υ
6985	6108	.	u
6985	6111	s	u
6985	6274	.	κ
6985	6174	s	U
6985	6108	.	α
6985	6202	s	α
6985	6108	.	a
6985	6202	s	a
6985	6205	s	A
6985	6274	.	λ
6985	5597	<1s>	<>
6985	6982	<K2L>	<>
6986	6100	.	.
6986	6101	 	 
6986	6100	<~>	<~>
6986	6100	<split-s>	<split-s>
6986	6100	<split-h>	<split-h>
6986	6100	<name2>	<name2>
6986	6987	<>	<name>
6986	6104	<aphaerese>	<aphaerese>
6986	6986	<>	<aphaerese>
6986	6100	<elision3>	<elision3>
6986	6986	<>	<elision3>
6986	6100	<elision2>	<elision2>
6986	6986	<>	<elision2>
6986	6100	<elision1>	<elision1>
6986	6986	<>	<elision1>
6986	6108	.	υ
6986	6111	s	υ
6986	6108	.	u
6986	6111	s	u
6986	6274	.	κ
6986	6174	s	U
6986	6108	.	α
6986	6202	s	α
6986	6108	.	a
6986	6202	s	a
6986	6205	s	A
6986	6274	.	λ
6986	5598	<1s>	<>
6986	6980	<K2L>	<>
6987	6103	.	.
6987	6106	 	 
6987	6103	<~>	<~>
6987	6103	<split-s>	<split-s>
6987	6103	<split-h>	<split-h>
6987	6103	<name2>	<name2>
6987	6232	<aphaerese>	<aphaerese>
6987	6988	<>	<aphaerese>
6987	6103	<elision3>	<elision3>
6987	6988	<>	<elision3>
6987	6103	<elision2>	<elision2>
6987	6988	<>	<elision2>
6987	6103	<elision1>	<elision1>
6987	6988	<>	<elision1>
6987	6110	.	υ
6987	6113	s	υ
6987	6110	.	u
6987	6113	s	u
6987	6276	.	κ
6987	6176	s	U
6987	6110	.	α
6987	6204	s	α
6987	6110	.	a
6987	6204	s	a
6987	6207	s	A
6987	6276	.	λ
6987	5599	<1s>	<>
6987	6981	<K2L>	<>
6988	6100	.	.
6988	6101	 	 
6988	6100	<~>	<~>
6988	6100	<split-s>	<split-s>
6988	6100	<split-h>	<split-h>
6988	6100	<name2>	<name2>
6988	6104	<aphaerese>	<aphaerese>
6988	6986	<>	<aphaerese>
6988	6100	<elision3>	<elision3>
6988	6986	<>	<elision3>
6988	6100	<elision2>	<elision2>
6988	6986	<>	<elision2>
6988	6100	<elision1>	<elision1>
6988	6986	<>	<elision1>
6988	6108	.	υ
6988	6111	s	υ
6988	6108	.	u
6988	6111	s	u
6988	6274	.	κ
6988	6174	s	U
6988	6108	.	α
6988	6202	s	α
6988	6108	.	a
6988	6202	s	a
6988	6205	s	A
6988	6274	.	λ
6988	5597	<1s>	<>
6988	6979	<K2L>	<>
6989	6990	<>	<aphaerese>
6989	6990	<>	<elision3>
6989	6990	<>	<elision2>
6989	6990	<>	<elision1>
6989	6993	<lambda2L>	<>
6990	6991	<>	<name>
6990	6990	<>	<aphaerese>
6990	6990	<>	<elision3>
6990	6990	<>	<elision2>
6990	6990	<>	<elision1>
6990	6994	<lambda2L>	<>
6991	6989	<>	<aphaerese>
6991	6989	<>	<elision3>
6991	6989	<>	<elision2>
6991	6989	<>	<elision1>
6991	6992	<lambda2L>	<>
6992	6269	.	.
6992	6272	 	 
6992	6269	<~>	<~>
6992	6269	<split-s>	<split-s>
6992	6269	<split-h>	<split-h>
6992	6269	<name2>	<name2>
6992	6378	<aphaerese>	<aphaerese>
6992	6993	<>	<aphaerese>
6992	6269	<elision3>	<elision3>
6992	6993	<>	<elision3>
6992	6269	<elision2>	<elision2>
6992	6993	<>	<elision2>
6992	6269	<elision1>	<elision1>
6992	6993	<>	<elision1>
6992	6276	.	υ
6992	6279	s	υ
6992	6276	.	u
6992	6279	s	u
6992	6276	.	κ
6992	6325	s	U
6992	6276	.	α
6992	6350	s	α
6992	6276	.	a
6992	6350	s	a
6992	6353	s	A
6992	6276	.	λ
6992	5670	<1s>	<>
6993	6266	.	.
6993	6267	 	 
6993	6266	<~>	<~>
6993	6266	<split-s>	<split-s>
6993	6266	<split-h>	<split-h>
6993	6266	<name2>	<name2>
6993	6270	<aphaerese>	<aphaerese>
6993	6994	<>	<aphaerese>
6993	6266	<elision3>	<elision3>
6993	6994	<>	<elision3>
6993	6266	<elision2>	<elision2>
6993	6994	<>	<elision2>
6993	6266	<elision1>	<elision1>
6993	6994	<>	<elision1>
6993	6274	.	υ
6993	6277	s	υ
6993	6274	.	u
6993	6277	s	u
6993	6274	.	κ
6993	6323	s	U
6993	6274	.	α
6993	6348	s	α
6993	6274	.	a
6993	6348	s	a
6993	6351	s	A
6993	6274	.	λ
6993	5668	<1s>	<>
6994	6266	.	.
6994	6267	 	 
6994	6266	<~>	<~>
6994	6266	<split-s>	<split-s>
6994	6266	<split-h>	<split-h>
6994	6266	<name2>	<name2>
6994	6992	<>	<name>
6994	6270	<aphaerese>	<aphaerese>
6994	6994	<>	<aphaerese>
6994	6266	<elision3>	<elision3>
6994	6994	<>	<elision3>
6994	6266	<elision2>	<elision2>
6994	6994	<>	<elision2>
6994	6266	<elision1>	<elision1>
6994	6994	<>	<elision1>
6994	6274	.	υ
6994	6277	s	υ
6994	6274	.	u
6994	6277	s	u
6994	6274	.	κ
6994	6323	s	U
6994	6274	.	α
6994	6348	s	α
6994	6274	.	a
6994	6348	s	a
6994	6351	s	A
6994	6274	.	λ
6994	5669	<1s>	<>
6995	6996	<>	<aphaerese>
6995	6996	<>	<elision3>
6995	6996	<>	<elision2>
6995	6996	<>	<elision1>
6995	6993	<l2L>	<>
6996	6997	<>	<name>
6996	6996	<>	<aphaerese>
6996	6996	<>	<elision3>
6996	6996	<>	<elision2>
6996	6996	<>	<elision1>
6996	6994	<l2L>	<>
6997	6995	<>	<aphaerese>
6997	6995	<>	<elision3>
6997	6995	<>	<elision2>
6997	6995	<>	<elision1>
6997	6992	<l2L>	<>
6998	6521	.	.
6998	6521	<~>	<~>
6998	6521	<split-s>	<split-s>
6998	6521	<split-h>	<split-h>
6998	6521	<name2>	<name2>
6998	6524	<aphaerese>	<aphaerese>
6998	6999	<>	<aphaerese>
6998	6521	<elision3>	<elision3>
6998	6999	<>	<elision3>
6998	6521	<elision2>	<elision2>
6998	6999	<>	<elision2>
6998	6521	<elision1>	<elision1>
6998	6999	<>	<elision1>
6998	6517	.	υ
6998	6663	H	υ
6998	6517	.	u
6998	6672	H	u
6998	6527	.	κ
6998	7003	H	κ
6998	7012	H	k
6998	6641	H	U
6998	7021	H	K
6998	6517	.	α
6998	6675	H	α
6998	6517	.	a
6998	6678	H	a
6998	6612	H	A
6998	7026	H	λ
6998	7032	H	l
6998	7027	H	L
6999	6519	.	.
6999	6519	<~>	<~>
6999	6519	<split-s>	<split-s>
6999	6519	<split-h>	<split-h>
6999	6519	<name2>	<name2>
6999	6522	<aphaerese>	<aphaerese>
6999	7000	<>	<aphaerese>
6999	6519	<elision3>	<elision3>
6999	7000	<>	<elision3>
6999	6519	<elision2>	<elision2>
6999	7000	<>	<elision2>
6999	6519	<elision1>	<elision1>
6999	7000	<>	<elision1>
6999	6518	.	υ
6999	6661	H	υ
6999	6518	.	u
6999	6670	H	u
6999	6525	.	κ
6999	7001	H	κ
6999	7010	H	k
6999	6639	H	U
6999	7019	H	K
6999	6518	.	α
6999	6673	H	α
6999	6518	.	a
6999	6676	H	a
6999	6610	H	A
6999	7024	H	λ
6999	7030	H	l
6999	7033	H	L
7000	6519	.	.
7000	6519	<~>	<~>
7000	6519	<split-s>	<split-s>
7000	6519	<split-h>	<split-h>
7000	6519	<name2>	<name2>
7000	6998	<>	<name>
7000	6522	<aphaerese>	<aphaerese>
7000	7000	<>	<aphaerese>
7000	6519	<elision3>	<elision3>
7000	7000	<>	<elision3>
7000	6519	<elision2>	<elision2>
7000	7000	<>	<elision2>
7000	6519	<elision1>	<elision1>
7000	7000	<>	<elision1>
7000	6518	.	υ
7000	6661	H	υ
7000	6518	.	u
7000	6670	H	u
7000	6525	.	κ
7000	7001	H	κ
7000	7010	H	k
7000	6639	H	U
7000	7019	H	K
7000	6518	.	α
7000	6673	H	α
7000	6518	.	a
7000	6676	H	a
7000	6610	H	A
7000	7024	H	λ
7000	7030	H	l
7000	7033	H	L
7001	7002	<>	<name>
7001	7001	<>	<aphaerese>
7001	7001	<>	<elision3>
7001	7001	<>	<elision2>
7001	7001	<>	<elision1>
7001	7005	<kappa2K>	<>
7001	7008	<kappa2L>	<>
7001	6628	<lambda2L>	<>
7002	7003	<>	<aphaerese>
7002	7003	<>	<elision3>
7002	7003	<>	<elision2>
7002	7003	<>	<elision1>
7002	7006	<kappa2K>	<>
7002	7009	<kappa2L>	<>
7002	6629	<lambda2L>	<>
7003	7001	<>	<aphaerese>
7003	7001	<>	<elision3>
7003	7001	<>	<elision2>
7003	7001	<>	<elision1>
7003	7004	<kappa2K>	<>
7003	7007	<kappa2L>	<>
7003	6627	<lambda2L>	<>
7004	6580	.	.
7004	6580	<~>	<~>
7004	6580	<split-s>	<split-s>
7004	6580	<split-h>	<split-h>
7004	6580	<name2>	<name2>
7004	6583	<aphaerese>	<aphaerese>
7004	7005	<>	<aphaerese>
7004	6604	<elision3>	<elision3>
7004	7005	<>	<elision3>
7004	6604	<elision2>	<elision2>
7004	7005	<>	<elision2>
7004	6604	<elision1>	<elision1>
7004	7005	<>	<elision1>
7004	6598	.	υ
7004	6551	s	υ
7004	6598	.	u
7004	6551	s	u
7004	6592	s	U
7004	6598	.	α
7004	6551	s	α
7004	6598	.	a
7004	6551	s	a
7004	6595	s	A
7004	6544	<1m>	<>
7005	6580	.	.
7005	6580	<~>	<~>
7005	6580	<split-s>	<split-s>
7005	6580	<split-h>	<split-h>
7005	6580	<name2>	<name2>
7005	7006	<>	<name>
7005	6583	<aphaerese>	<aphaerese>
7005	7005	<>	<aphaerese>
7005	6604	<elision3>	<elision3>
7005	7005	<>	<elision3>
7005	6604	<elision2>	<elision2>
7005	7005	<>	<elision2>
7005	6604	<elision1>	<elision1>
7005	7005	<>	<elision1>
7005	6598	.	υ
7005	6551	s	υ
7005	6598	.	u
7005	6551	s	u
7005	6592	s	U
7005	6598	.	α
7005	6551	s	α
7005	6598	.	a
7005	6551	s	a
7005	6595	s	A
7005	6545	<1m>	<>
7006	6582	.	.
7006	6582	<~>	<~>
7006	6582	<split-s>	<split-s>
7006	6582	<split-h>	<split-h>
7006	6582	<name2>	<name2>
7006	6585	<aphaerese>	<aphaerese>
7006	7004	<>	<aphaerese>
7006	6603	<elision3>	<elision3>
7006	7004	<>	<elision3>
7006	6603	<elision2>	<elision2>
7006	7004	<>	<elision2>
7006	6603	<elision1>	<elision1>
7006	7004	<>	<elision1>
7006	6600	.	υ
7006	6550	s	υ
7006	6600	.	u
7006	6550	s	u
7006	6594	s	U
7006	6600	.	α
7006	6550	s	α
7006	6600	.	a
7006	6550	s	a
7006	6597	s	A
7006	6543	<1m>	<>
7007	6610	.	.
7007	6610	<~>	<~>
7007	6610	<split-s>	<split-s>
7007	6610	<split-h>	<split-h>
7007	6610	<name2>	<name2>
7007	6613	<aphaerese>	<aphaerese>
7007	7008	<>	<aphaerese>
7007	6622	<elision3>	<elision3>
7007	7008	<>	<elision3>
7007	6622	<elision2>	<elision2>
7007	7008	<>	<elision2>
7007	6622	<elision1>	<elision1>
7007	7008	<>	<elision1>
7007	6616	.	υ
7007	6551	s	υ
7007	6616	.	u
7007	6551	s	u
7007	6592	s	U
7007	6616	.	α
7007	6551	s	α
7007	6616	.	a
7007	6551	s	a
7007	6595	s	A
7007	6544	<1m>	<>
7008	6610	.	.
7008	6610	<~>	<~>
7008	6610	<split-s>	<split-s>
7008	6610	<split-h>	<split-h>
7008	6610	<name2>	<name2>
7008	7009	<>	<name>
7008	6613	<aphaerese>	<aphaerese>
7008	7008	<>	<aphaerese>
7008	6622	<elision3>	<elision3>
7008	7008	<>	<elision3>
7008	6622	<elision2>	<elision2>
7008	7008	<>	<elision2>
7008	6622	<elision1>	<elision1>
7008	7008	<>	<elision1>
7008	6616	.	υ
7008	6551	s	υ
7008	6616	.	u
7008	6551	s	u
7008	6592	s	U
7008	6616	.	α
7008	6551	s	α
7008	6616	.	a
7008	6551	s	a
7008	6595	s	A
7008	6545	<1m>	<>
7009	6612	.	.
7009	6612	<~>	<~>
7009	6612	<split-s>	<split-s>
7009	6612	<split-h>	<split-h>
7009	6612	<name2>	<name2>
7009	6615	<aphaerese>	<aphaerese>
7009	7007	<>	<aphaerese>
7009	6621	<elision3>	<elision3>
7009	7007	<>	<elision3>
7009	6621	<elision2>	<elision2>
7009	7007	<>	<elision2>
7009	6621	<elision1>	<elision1>
7009	7007	<>	<elision1>
7009	6618	.	υ
7009	6550	s	υ
7009	6618	.	u
7009	6550	s	u
7009	6594	s	U
7009	6618	.	α
7009	6550	s	α
7009	6618	.	a
7009	6550	s	a
7009	6597	s	A
7009	6543	<1m>	<>
7010	7011	<>	<name>
7010	7010	<>	<aphaerese>
7010	7010	<>	<elision3>
7010	7010	<>	<elision2>
7010	7010	<>	<elision1>
7010	7014	<k2K>	<>
7010	7017	<k2L>	<>
7010	6628	<l2L>	<>
7011	7012	<>	<aphaerese>
7011	7012	<>	<elision3>
7011	7012	<>	<elision2>
7011	7012	<>	<elision1>
7011	7015	<k2K>	<>
7011	7018	<k2L>	<>
7011	6629	<l2L>	<>
7012	7010	<>	<aphaerese>
7012	7010	<>	<elision3>
7012	7010	<>	<elision2>
7012	7010	<>	<elision1>
7012	7013	<k2K>	<>
7012	7016	<k2L>	<>
7012	6627	<l2L>	<>
7013	6580	.	.
7013	6580	<~>	<~>
7013	6580	<split-s>	<split-s>
7013	6580	<split-h>	<split-h>
7013	6580	<name2>	<name2>
7013	6583	<aphaerese>	<aphaerese>
7013	7014	<>	<aphaerese>
7013	6580	<elision3>	<elision3>
7013	7014	<>	<elision3>
7013	6580	<elision2>	<elision2>
7013	7014	<>	<elision2>
7013	6580	<elision1>	<elision1>
7013	7014	<>	<elision1>
7013	6598	.	υ
7013	6551	s	υ
7013	6598	.	u
7013	6551	s	u
7013	6592	s	U
7013	6598	.	α
7013	6551	s	α
7013	6598	.	a
7013	6551	s	a
7013	6595	s	A
7013	6544	<1m>	<>
7014	6580	.	.
7014	6580	<~>	<~>
7014	6580	<split-s>	<split-s>
7014	6580	<split-h>	<split-h>
7014	6580	<name2>	<name2>
7014	7015	<>	<name>
7014	6583	<aphaerese>	<aphaerese>
7014	7014	<>	<aphaerese>
7014	6580	<elision3>	<elision3>
7014	7014	<>	<elision3>
7014	6580	<elision2>	<elision2>
7014	7014	<>	<elision2>
7014	6580	<elision1>	<elision1>
7014	7014	<>	<elision1>
7014	6598	.	υ
7014	6551	s	υ
7014	6598	.	u
7014	6551	s	u
7014	6592	s	U
7014	6598	.	α
7014	6551	s	α
7014	6598	.	a
7014	6551	s	a
7014	6595	s	A
7014	6545	<1m>	<>
7015	6582	.	.
7015	6582	<~>	<~>
7015	6582	<split-s>	<split-s>
7015	6582	<split-h>	<split-h>
7015	6582	<name2>	<name2>
7015	6585	<aphaerese>	<aphaerese>
7015	7013	<>	<aphaerese>
7015	6582	<elision3>	<elision3>
7015	7013	<>	<elision3>
7015	6582	<elision2>	<elision2>
7015	7013	<>	<elision2>
7015	6582	<elision1>	<elision1>
7015	7013	<>	<elision1>
7015	6600	.	υ
7015	6550	s	υ
7015	6600	.	u
7015	6550	s	u
7015	6594	s	U
7015	6600	.	α
7015	6550	s	α
7015	6600	.	a
7015	6550	s	a
7015	6597	s	A
7015	6543	<1m>	<>
7016	6610	.	.
7016	6610	<~>	<~>
7016	6610	<split-s>	<split-s>
7016	6610	<split-h>	<split-h>
7016	6610	<name2>	<name2>
7016	6613	<aphaerese>	<aphaerese>
7016	7017	<>	<aphaerese>
7016	6610	<elision3>	<elision3>
7016	7017	<>	<elision3>
7016	6610	<elision2>	<elision2>
7016	7017	<>	<elision2>
7016	6610	<elision1>	<elision1>
7016	7017	<>	<elision1>
7016	6616	.	υ
7016	6551	s	υ
7016	6616	.	u
7016	6551	s	u
7016	6592	s	U
7016	6616	.	α
7016	6551	s	α
7016	6616	.	a
7016	6551	s	a
7016	6595	s	A
7016	6544	<1m>	<>
7017	6610	.	.
7017	6610	<~>	<~>
7017	6610	<split-s>	<split-s>
7017	6610	<split-h>	<split-h>
7017	6610	<name2>	<name2>
7017	7018	<>	<name>
7017	6613	<aphaerese>	<aphaerese>
7017	7017	<>	<aphaerese>
7017	6610	<elision3>	<elision3>
7017	7017	<>	<elision3>
7017	6610	<elision2>	<elision2>
7017	7017	<>	<elision2>
7017	6610	<elision1>	<elision1>
7017	7017	<>	<elision1>
7017	6616	.	υ
7017	6551	s	υ
7017	6616	.	u
7017	6551	s	u
7017	6592	s	U
7017	6616	.	α
7017	6551	s	α
7017	6616	.	a
7017	6551	s	a
7017	6595	s	A
7017	6545	<1m>	<>
7018	6612	.	.
7018	6612	<~>	<~>
7018	6612	<split-s>	<split-s>
7018	6612	<split-h>	<split-h>
7018	6612	<name2>	<name2>
7018	6615	<aphaerese>	<aphaerese>
7018	7016	<>	<aphaerese>
7018	6612	<elision3>	<elision3>
7018	7016	<>	<elision3>
7018	6612	<elision2>	<elision2>
7018	7016	<>	<elision2>
7018	6612	<elision1>	<elision1>
7018	7016	<>	<elision1>
7018	6618	.	υ
7018	6550	s	υ
7018	6618	.	u
7018	6550	s	u
7018	6594	s	U
7018	6618	.	α
7018	6550	s	α
7018	6618	.	a
7018	6550	s	a
7018	6597	s	A
7018	6543	<1m>	<>
7019	6580	.	.
7019	6580	<~>	<~>
7019	6580	<split-s>	<split-s>
7019	6580	<split-h>	<split-h>
7019	6580	<name2>	<name2>
7019	6643	<name2>	<name>
7019	7020	<>	<name>
7019	6583	<aphaerese>	<aphaerese>
7019	7022	<>	<aphaerese>
7019	6580	<elision3>	<elision3>
7019	7022	<>	<elision3>
7019	6580	<elision2>	<elision2>
7019	7022	<>	<elision2>
7019	6580	<elision1>	<elision1>
7019	7022	<>	<elision1>
7019	6598	.	υ
7019	6551	s	υ
7019	6598	.	u
7019	6551	s	u
7019	6616	.	κ
7019	6592	s	U
7019	6598	.	α
7019	6551	s	α
7019	6598	.	a
7019	6551	s	a
7019	6595	s	A
7019	6616	.	λ
7019	6545	<1m>	<>
7019	6647	<k2K>	<>
7019	6648	<k2L>	<>
7019	7023	<K2L>	<>
7020	6582	.	.
7020	6582	<~>	<~>
7020	6582	<split-s>	<split-s>
7020	6582	<split-h>	<split-h>
7020	6582	<name2>	<name2>
7020	6585	<aphaerese>	<aphaerese>
7020	7021	<>	<aphaerese>
7020	6582	<elision3>	<elision3>
7020	7021	<>	<elision3>
7020	6582	<elision2>	<elision2>
7020	7021	<>	<elision2>
7020	6582	<elision1>	<elision1>
7020	7021	<>	<elision1>
7020	6600	.	υ
7020	6550	s	υ
7020	6600	.	u
7020	6550	s	u
7020	6618	.	κ
7020	6594	s	U
7020	6600	.	α
7020	6550	s	α
7020	6600	.	a
7020	6550	s	a
7020	6597	s	A
7020	6618	.	λ
7020	6543	<1m>	<>
7020	7018	<K2L>	<>
7021	6580	.	.
7021	6580	<~>	<~>
7021	6580	<split-s>	<split-s>
7021	6580	<split-h>	<split-h>
7021	6580	<name2>	<name2>
7021	6583	<aphaerese>	<aphaerese>
7021	7022	<>	<aphaerese>
7021	6580	<elision3>	<elision3>
7021	7022	<>	<elision3>
7021	6580	<elision2>	<elision2>
7021	7022	<>	<elision2>
7021	6580	<elision1>	<elision1>
7021	7022	<>	<elision1>
7021	6598	.	υ
7021	6551	s	υ
7021	6598	.	u
7021	6551	s	u
7021	6616	.	κ
7021	6592	s	U
7021	6598	.	α
7021	6551	s	α
7021	6598	.	a
7021	6551	s	a
7021	6595	s	A
7021	6616	.	λ
7021	6544	<1m>	<>
7021	7016	<K2L>	<>
7022	6580	.	.
7022	6580	<~>	<~>
7022	6580	<split-s>	<split-s>
7022	6580	<split-h>	<split-h>
7022	6580	<name2>	<name2>
7022	7020	<>	<name>
7022	6583	<aphaerese>	<aphaerese>
7022	7022	<>	<aphaerese>
7022	6580	<elision3>	<elision3>
7022	7022	<>	<elision3>
7022	6580	<elision2>	<elision2>
7022	7022	<>	<elision2>
7022	6580	<elision1>	<elision1>
7022	7022	<>	<elision1>
7022	6598	.	υ
7022	6551	s	υ
7022	6598	.	u
7022	6551	s	u
7022	6616	.	κ
7022	6592	s	U
7022	6598	.	α
7022	6551	s	α
7022	6598	.	a
7022	6551	s	a
7022	6595	s	A
7022	6616	.	λ
7022	6545	<1m>	<>
7022	7017	<K2L>	<>
7023	6610	.	.
7023	6610	<~>	<~>
7023	6610	<split-s>	<split-s>
7023	6610	<split-h>	<split-h>
7023	6610	<name2>	<name2>
7023	6649	<name2>	<name>
7023	7018	<>	<name>
7023	6613	<aphaerese>	<aphaerese>
7023	7017	<>	<aphaerese>
7023	6610	<elision3>	<elision3>
7023	7017	<>	<elision3>
7023	6610	<elision2>	<elision2>
7023	7017	<>	<elision2>
7023	6610	<elision1>	<elision1>
7023	7017	<>	<elision1>
7023	6616	.	υ
7023	6551	s	υ
7023	6616	.	u
7023	6551	s	u
7023	6592	s	U
7023	6616	.	α
7023	6551	s	α
7023	6616	.	a
7023	6551	s	a
7023	6595	s	A
7023	6545	<1m>	<>
7024	7025	<>	<name>
7024	7024	<>	<aphaerese>
7024	7024	<>	<elision3>
7024	7024	<>	<elision2>
7024	7024	<>	<elision1>
7024	7028	<lambda2L>	<>
7025	7026	<>	<aphaerese>
7025	7026	<>	<elision3>
7025	7026	<>	<elision2>
7025	7026	<>	<elision1>
7025	7029	<lambda2L>	<>
7026	7024	<>	<aphaerese>
7026	7024	<>	<elision3>
7026	7024	<>	<elision2>
7026	7024	<>	<elision1>
7026	7027	<lambda2L>	<>
7027	6610	.	.
7027	6610	<~>	<~>
7027	6610	<split-s>	<split-s>
7027	6610	<split-h>	<split-h>
7027	6610	<name2>	<name2>
7027	6613	<aphaerese>	<aphaerese>
7027	7028	<>	<aphaerese>
7027	6610	<elision3>	<elision3>
7027	7028	<>	<elision3>
7027	6610	<elision2>	<elision2>
7027	7028	<>	<elision2>
7027	6610	<elision1>	<elision1>
7027	7028	<>	<elision1>
7027	6616	.	υ
7027	6551	s	υ
7027	6616	.	u
7027	6551	s	u
7027	6616	.	κ
7027	6592	s	U
7027	6616	.	α
7027	6551	s	α
7027	6616	.	a
7027	6551	s	a
7027	6595	s	A
7027	6616	.	λ
7027	6544	<1m>	<>
7028	6610	.	.
7028	6610	<~>	<~>
7028	6610	<split-s>	<split-s>
7028	6610	<split-h>	<split-h>
7028	6610	<name2>	<name2>
7028	7029	<>	<name>
7028	6613	<aphaerese>	<aphaerese>
7028	7028	<>	<aphaerese>
7028	6610	<elision3>	<elision3>
7028	7028	<>	<elision3>
7028	6610	<elision2>	<elision2>
7028	7028	<>	<elision2>
7028	6610	<elision1>	<elision1>
7028	7028	<>	<elision1>
7028	6616	.	υ
7028	6551	s	υ
7028	6616	.	u
7028	6551	s	u
7028	6616	.	κ
7028	6592	s	U
7028	6616	.	α
7028	6551	s	α
7028	6616	.	a
7028	6551	s	a
7028	6595	s	A
7028	6616	.	λ
7028	6545	<1m>	<>
7029	6612	.	.
7029	6612	<~>	<~>
7029	6612	<split-s>	<split-s>
7029	6612	<split-h>	<split-h>
7029	6612	<name2>	<name2>
7029	6615	<aphaerese>	<aphaerese>
7029	7027	<>	<aphaerese>
7029	6612	<elision3>	<elision3>
7029	7027	<>	<elision3>
7029	6612	<elision2>	<elision2>
7029	7027	<>	<elision2>
7029	6612	<elision1>	<elision1>
7029	7027	<>	<elision1>
7029	6618	.	υ
7029	6550	s	υ
7029	6618	.	u
7029	6550	s	u
7029	6618	.	κ
7029	6594	s	U
7029	6618	.	α
7029	6550	s	α
7029	6618	.	a
7029	6550	s	a
7029	6597	s	A
7029	6618	.	λ
7029	6543	<1m>	<>
7030	7031	<>	<name>
7030	7030	<>	<aphaerese>
7030	7030	<>	<elision3>
7030	7030	<>	<elision2>
7030	7030	<>	<elision1>
7030	7028	<l2L>	<>
7031	7032	<>	<aphaerese>
7031	7032	<>	<elision3>
7031	7032	<>	<elision2>
7031	7032	<>	<elision1>
7031	7029	<l2L>	<>
7032	7030	<>	<aphaerese>
7032	7030	<>	<elision3>
7032	7030	<>	<elision2>
7032	7030	<>	<elision1>
7032	7027	<l2L>	<>
7033	6610	.	.
7033	6610	<~>	<~>
7033	6610	<split-s>	<split-s>
7033	6610	<split-h>	<split-h>
7033	6610	<name2>	<name2>
7033	6649	<name2>	<name>
7033	7029	<>	<name>
7033	6613	<aphaerese>	<aphaerese>
7033	7028	<>	<aphaerese>
7033	6610	<elision3>	<elision3>
7033	7028	<>	<elision3>
7033	6610	<elision2>	<elision2>
7033	7028	<>	<elision2>
7033	6610	<elision1>	<elision1>
7033	7028	<>	<elision1>
7033	6616	.	υ
7033	6551	s	υ
7033	6616	.	u
7033	6551	s	u
7033	6616	.	κ
7033	6592	s	U
7033	6616	.	α
7033	6551	s	α
7033	6616	.	a
7033	6551	s	a
7033	6595	s	A
7033	6616	.	λ
7033	6545	<1m>	<>
7033	6648	<l2L>	<>
7034	6955	<>	<name>
7034	6954	<>	<aphaerese>
7034	6954	<>	<elision3>
7034	6954	<>	<elision2>
7034	6954	<>	<elision1>
7034	6958	<kappa2K>	<>
7034	7035	<kappa2L>	<>
7034	6417	<lambda2L>	<>
7035	6266	.	.
7035	6267	 	 
7035	6266	<~>	<~>
7035	6266	<split-s>	<split-s>
7035	6266	<split-h>	<split-h>
7035	6266	<name2>	<name2>
7035	6962	<>	<name>
7035	6270	<aphaerese>	<aphaerese>
7035	6961	<>	<aphaerese>
7035	6383	<elision3>	<elision3>
7035	6961	<>	<elision3>
7035	6383	<elision2>	<elision2>
7035	6961	<>	<elision2>
7035	6383	<elision1>	<elision1>
7035	6961	<>	<elision1>
7035	6274	.	υ
7035	6277	s	υ
7035	6274	.	u
7035	6277	s	u
7035	6323	s	U
7035	6274	.	α
7035	6348	s	α
7035	6274	.	a
7035	6348	s	a
7035	6351	s	A
7035	7036	<1s>	<>
7036	179	.	.
7036	180	 	 
7036	179	<~>	<~>
7036	179	<split-s>	<split-s>
7036	179	<split-h>	<split-h>
7036	179	<name2>	<name2>
7036	6963	<>	<name>
7036	183	<aphaerese>	<aphaerese>
7036	6965	<>	<aphaerese>
7036	5410	<elision3>	<elision3>
7036	6965	<>	<elision3>
7036	5410	<elision2>	<elision2>
7036	6965	<>	<elision2>
7036	5410	<elision1>	<elision1>
7036	6965	<>	<elision1>
7036	4828	.	υ
7036	4828	.	u
7036	4828	.	α
7036	4828	.	a
7036	7037	<K>	<>
7037	4878	.	.
7037	4878	<~>	<~>
7037	4878	<split-s>	<split-s>
7037	4878	<split-h>	<split-h>
7037	4878	<name2>	<name2>
7037	6967	<>	<name>
7037	4881	<aphaerese>	<aphaerese>
7037	6966	<>	<aphaerese>
7037	5359	<elision3>	<elision3>
7037	6966	<>	<elision3>
7037	5359	<elision2>	<elision2>
7037	6966	<>	<elision2>
7037	5359	<elision1>	<elision1>
7037	6966	<>	<elision1>
7037	4877	.	υ
7037	4877	.	u
7037	4877	.	α
7037	4877	.	a
7038	6974	<>	<name>
7038	6973	<>	<aphaerese>
7038	6973	<>	<elision3>
7038	6973	<>	<elision2>
7038	6973	<>	<elision1>
7038	6977	<k2K>	<>
7038	7039	<k2L>	<>
7038	6417	<l2L>	<>
7039	6266	.	.
7039	6267	 	 
7039	6266	<~>	<~>
7039	6266	<split-s>	<split-s>
7039	6266	<split-h>	<split-h>
7039	6266	<name2>	<name2>
7039	6981	<>	<name>
7039	6270	<aphaerese>	<aphaerese>
7039	6980	<>	<aphaerese>
7039	6266	<elision3>	<elision3>
7039	6980	<>	<elision3>
7039	6266	<elision2>	<elision2>
7039	6980	<>	<elision2>
7039	6266	<elision1>	<elision1>
7039	6980	<>	<elision1>
7039	6274	.	υ
7039	6277	s	υ
7039	6274	.	u
7039	6277	s	u
7039	6323	s	U
7039	6274	.	α
7039	6348	s	α
7039	6274	.	a
7039	6348	s	a
7039	6351	s	A
7039	7040	<1s>	<>
7040	179	.	.
7040	180	 	 
7040	179	<~>	<~>
7040	179	<split-s>	<split-s>
7040	179	<split-h>	<split-h>
7040	179	<name2>	<name2>
7040	5683	<>	<name>
7040	183	<aphaerese>	<aphaerese>
7040	5682	<>	<aphaerese>
7040	179	<elision3>	<elision3>
7040	5682	<>	<elision3>
7040	179	<elision2>	<elision2>
7040	5682	<>	<elision2>
7040	179	<elision1>	<elision1>
7040	5682	<>	<elision1>
7040	4828	.	υ
7040	4828	.	u
7040	4828	.	α
7040	4828	.	a
7040	7041	<K>	<>
7041	4878	.	.
7041	4878	<~>	<~>
7041	4878	<split-s>	<split-s>
7041	4878	<split-h>	<split-h>
7041	4878	<name2>	<name2>
7041	5684	<>	<name>
7041	4881	<aphaerese>	<aphaerese>
7041	5686	<>	<aphaerese>
7041	4878	<elision3>	<elision3>
7041	5686	<>	<elision3>
7041	4878	<elision2>	<elision2>
7041	5686	<>	<elision2>
7041	4878	<elision1>	<elision1>
7041	5686	<>	<elision1>
7041	4877	.	υ
7041	4877	.	u
7041	4877	.	α
7041	4877	.	a
7042	6100	.	.
7042	6101	 	 
7042	6100	<~>	<~>
7042	6100	<split-s>	<split-s>
7042	6100	<split-h>	<split-h>
7042	6100	<name2>	<name2>
7042	6440	<name2>	<name>
7042	6987	<>	<name>
7042	6104	<aphaerese>	<aphaerese>
7042	6986	<>	<aphaerese>
7042	6100	<elision3>	<elision3>
7042	6986	<>	<elision3>
7042	6100	<elision2>	<elision2>
7042	6986	<>	<elision2>
7042	6100	<elision1>	<elision1>
7042	6986	<>	<elision1>
7042	6108	.	υ
7042	6111	s	υ
7042	6108	.	u
7042	6111	s	u
7042	6274	.	κ
7042	6174	s	U
7042	6108	.	α
7042	6202	s	α
7042	6108	.	a
7042	6202	s	a
7042	6205	s	A
7042	6274	.	λ
7042	5598	<1s>	<>
7042	6444	<k2K>	<>
7042	6445	<k2L>	<>
7042	7043	<K2L>	<>
7043	6266	.	.
7043	6267	 	 
7043	6266	<~>	<~>
7043	6266	<split-s>	<split-s>
7043	6266	<split-h>	<split-h>
7043	6266	<name2>	<name2>
7043	6446	<name2>	<name>
7043	6981	<>	<name>
7043	6270	<aphaerese>	<aphaerese>
7043	6980	<>	<aphaerese>
7043	6266	<elision3>	<elision3>
7043	6980	<>	<elision3>
7043	6266	<elision2>	<elision2>
7043	6980	<>	<elision2>
7043	6266	<elision1>	<elision1>
7043	6980	<>	<elision1>
7043	6274	.	υ
7043	6277	s	υ
7043	6274	.	u
7043	6277	s	u
7043	6323	s	U
7043	6274	.	α
7043	6348	s	α
7043	6274	.	a
7043	6348	s	a
7043	6351	s	A
7043	7044	<1s>	<>
7044	179	.	.
7044	180	 	 
7044	179	<~>	<~>
7044	179	<split-s>	<split-s>
7044	179	<split-h>	<split-h>
7044	179	<name2>	<name2>
7044	5540	<name2>	<name>
7044	5683	<>	<name>
7044	183	<aphaerese>	<aphaerese>
7044	5682	<>	<aphaerese>
7044	179	<elision3>	<elision3>
7044	5682	<>	<elision3>
7044	179	<elision2>	<elision2>
7044	5682	<>	<elision2>
7044	179	<elision1>	<elision1>
7044	5682	<>	<elision1>
7044	4828	.	υ
7044	4828	.	u
7044	4828	.	α
7044	4828	.	a
7044	7045	<K>	<>
7045	4878	.	.
7045	4878	<~>	<~>
7045	4878	<split-s>	<split-s>
7045	4878	<split-h>	<split-h>
7045	4878	<name2>	<name2>
7045	5430	<name2>	<name>
7045	5684	<>	<name>
7045	4881	<aphaerese>	<aphaerese>
7045	5686	<>	<aphaerese>
7045	4878	<elision3>	<elision3>
7045	5686	<>	<elision3>
7045	4878	<elision2>	<elision2>
7045	5686	<>	<elision2>
7045	4878	<elision1>	<elision1>
7045	5686	<>	<elision1>
7045	4877	.	υ
7045	4877	.	u
7045	4877	.	α
7045	4877	.	a
7046	6266	.	.
7046	6267	 	 
7046	6266	<~>	<~>
7046	6266	<split-s>	<split-s>
7046	6266	<split-h>	<split-h>
7046	6266	<name2>	<name2>
7046	6446	<name2>	<name>
7046	6992	<>	<name>
7046	6270	<aphaerese>	<aphaerese>
7046	6994	<>	<aphaerese>
7046	6266	<elision3>	<elision3>
7046	6994	<>	<elision3>
7046	6266	<elision2>	<elision2>
7046	6994	<>	<elision2>
7046	6266	<elision1>	<elision1>
7046	6994	<>	<elision1>
7046	6274	.	υ
7046	6277	s	υ
7046	6274	.	u
7046	6277	s	u
7046	6274	.	κ
7046	6323	s	U
7046	6274	.	α
7046	6348	s	α
7046	6274	.	a
7046	6348	s	a
7046	6351	s	A
7046	6274	.	λ
7046	5695	<1s>	<>
7046	6445	<l2L>	<>
7047	143	.	.
7047	144	 	 
7047	143	<~>	<~>
7047	143	<split-s>	<split-s>
7047	143	<split-h>	<split-h>
7047	143	<name2>	<name2>
7047	147	<aphaerese>	<aphaerese>
7047	7048	<>	<aphaerese>
7047	7051	<elision3>	<elision3>
7047	7048	<>	<elision3>
7047	7051	<elision2>	<elision2>
7047	7048	<>	<elision2>
7047	7051	<elision1>	<elision1>
7047	7048	<>	<elision1>
7047	6469	.	υ
7047	6513	H	υ
7047	6469	.	u
7047	6515	H	u
7047	6469	.	κ
7047	6928	H	κ
7047	6423	H	k
7047	6436	H	U
7047	6439	H	K
7047	6469	.	α
7047	6499	H	α
7047	6469	.	a
7047	6504	H	a
7047	6266	H	A
7047	6469	.	λ
7047	6905	H	λ
7047	6853	H	l
7047	6858	H	L
7047	7054	<K>	<>
7048	143	.	.
7048	144	 	 
7048	143	<~>	<~>
7048	143	<split-s>	<split-s>
7048	143	<split-h>	<split-h>
7048	143	<name2>	<name2>
7048	7049	<>	<name>
7048	147	<aphaerese>	<aphaerese>
7048	7048	<>	<aphaerese>
7048	7051	<elision3>	<elision3>
7048	7048	<>	<elision3>
7048	7051	<elision2>	<elision2>
7048	7048	<>	<elision2>
7048	7051	<elision1>	<elision1>
7048	7048	<>	<elision1>
7048	6469	.	υ
7048	6513	H	υ
7048	6469	.	u
7048	6515	H	u
7048	6469	.	κ
7048	6928	H	κ
7048	6423	H	k
7048	6436	H	U
7048	6439	H	K
7048	6469	.	α
7048	6499	H	α
7048	6469	.	a
7048	6504	H	a
7048	6266	H	A
7048	6469	.	λ
7048	6905	H	λ
7048	6853	H	l
7048	6858	H	L
7048	7055	<K>	<>
7049	142	.	.
7049	146	 	 
7049	142	<~>	<~>
7049	142	<split-s>	<split-s>
7049	142	<split-h>	<split-h>
7049	142	<name2>	<name2>
7049	149	<aphaerese>	<aphaerese>
7049	7047	<>	<aphaerese>
7049	7050	<elision3>	<elision3>
7049	7047	<>	<elision3>
7049	7050	<elision2>	<elision2>
7049	7047	<>	<elision2>
7049	7050	<elision1>	<elision1>
7049	7047	<>	<elision1>
7049	6471	.	υ
7049	6508	H	υ
7049	6471	.	u
7049	6512	H	u
7049	6471	.	κ
7049	6885	H	κ
7049	6464	H	k
7049	6438	H	U
7049	6468	H	K
7049	6471	.	α
7049	6498	H	α
7049	6471	.	a
7049	6503	H	a
7049	6269	H	A
7049	6471	.	λ
7049	6904	H	λ
7049	6852	H	l
7049	6855	H	L
7049	7053	<K>	<>
7050	143	.	.
7050	144	 	 
7050	143	<~>	<~>
7050	143	<split-s>	<split-s>
7050	143	<split-h>	<split-h>
7050	143	<name2>	<name2>
7050	147	<aphaerese>	<aphaerese>
7050	7051	<>	<aphaerese>
7050	143	<elision3>	<elision3>
7050	7051	<>	<elision3>
7050	143	<elision2>	<elision2>
7050	7051	<>	<elision2>
7050	143	<elision1>	<elision1>
7050	7051	<>	<elision1>
7050	6469	.	υ
7050	6513	H	υ
7050	6469	.	u
7050	6515	H	u
7050	150	.	κ
7050	7034	H	κ
7050	7038	H	k
7050	6436	H	U
7050	7042	H	K
7050	6469	.	α
7050	6499	H	α
7050	6469	.	a
7050	6504	H	a
7050	6266	H	A
7050	6990	H	λ
7050	6996	H	l
7050	7046	H	L
7051	143	.	.
7051	144	 	 
7051	143	<~>	<~>
7051	143	<split-s>	<split-s>
7051	143	<split-h>	<split-h>
7051	143	<name2>	<name2>
7051	7052	<>	<name>
7051	147	<aphaerese>	<aphaerese>
7051	7051	<>	<aphaerese>
7051	143	<elision3>	<elision3>
7051	7051	<>	<elision3>
7051	143	<elision2>	<elision2>
7051	7051	<>	<elision2>
7051	143	<elision1>	<elision1>
7051	7051	<>	<elision1>
7051	6469	.	υ
7051	6513	H	υ
7051	6469	.	u
7051	6515	H	u
7051	150	.	κ
7051	7034	H	κ
7051	7038	H	k
7051	6436	H	U
7051	7042	H	K
7051	6469	.	α
7051	6499	H	α
7051	6469	.	a
7051	6504	H	a
7051	6266	H	A
7051	6990	H	λ
7051	6996	H	l
7051	7046	H	L
7052	142	.	.
7052	146	 	 
7052	142	<~>	<~>
7052	142	<split-s>	<split-s>
7052	142	<split-h>	<split-h>
7052	142	<name2>	<name2>
7052	149	<aphaerese>	<aphaerese>
7052	7050	<>	<aphaerese>
7052	142	<elision3>	<elision3>
7052	7050	<>	<elision3>
7052	142	<elision2>	<elision2>
7052	7050	<>	<elision2>
7052	142	<elision1>	<elision1>
7052	7050	<>	<elision1>
7052	6471	.	υ
7052	6508	H	υ
7052	6471	.	u
7052	6512	H	u
7052	152	.	κ
7052	6953	H	κ
7052	6972	H	k
7052	6438	H	U
7052	6985	H	K
7052	6471	.	α
7052	6498	H	α
7052	6471	.	a
7052	6503	H	a
7052	6269	H	A
7052	6989	H	λ
7052	6995	H	l
7052	6993	H	L
7053	6521	.	.
7053	6521	<~>	<~>
7053	6521	<split-s>	<split-s>
7053	6521	<split-h>	<split-h>
7053	6521	<name2>	<name2>
7053	6524	<aphaerese>	<aphaerese>
7053	7054	<>	<aphaerese>
7053	6999	<elision3>	<elision3>
7053	7054	<>	<elision3>
7053	6999	<elision2>	<elision2>
7053	7054	<>	<elision2>
7053	6999	<elision1>	<elision1>
7053	7054	<>	<elision1>
7053	6517	.	υ
7053	6663	H	υ
7053	6517	.	u
7053	6672	H	u
7053	6517	.	κ
7053	6915	H	κ
7053	6632	H	k
7053	6641	H	U
7053	6645	H	K
7053	6517	.	α
7053	6675	H	α
7053	6517	.	a
7053	6678	H	a
7053	6612	H	A
7053	6517	.	λ
7053	6924	H	λ
7053	6659	H	l
7053	6654	H	L
7054	6519	.	.
7054	6519	<~>	<~>
7054	6519	<split-s>	<split-s>
7054	6519	<split-h>	<split-h>
7054	6519	<name2>	<name2>
7054	6522	<aphaerese>	<aphaerese>
7054	7055	<>	<aphaerese>
7054	7000	<elision3>	<elision3>
7054	7055	<>	<elision3>
7054	7000	<elision2>	<elision2>
7054	7055	<>	<elision2>
7054	7000	<elision1>	<elision1>
7054	7055	<>	<elision1>
7054	6518	.	υ
7054	6661	H	υ
7054	6518	.	u
7054	6670	H	u
7054	6518	.	κ
7054	6913	H	κ
7054	6630	H	k
7054	6639	H	U
7054	6642	H	K
7054	6518	.	α
7054	6673	H	α
7054	6518	.	a
7054	6676	H	a
7054	6610	H	A
7054	6518	.	λ
7054	6922	H	λ
7054	6657	H	l
7054	6660	H	L
7055	6519	.	.
7055	6519	<~>	<~>
7055	6519	<split-s>	<split-s>
7055	6519	<split-h>	<split-h>
7055	6519	<name2>	<name2>
7055	7053	<>	<name>
7055	6522	<aphaerese>	<aphaerese>
7055	7055	<>	<aphaerese>
7055	7000	<elision3>	<elision3>
7055	7055	<>	<elision3>
7055	7000	<elision2>	<elision2>
7055	7055	<>	<elision2>
7055	7000	<elision1>	<elision1>
7055	7055	<>	<elision1>
7055	6518	.	υ
7055	6661	H	υ
7055	6518	.	u
7055	6670	H	u
7055	6518	.	κ
7055	6913	H	κ
7055	6630	H	k
7055	6639	H	U
7055	6642	H	K
7055	6518	.	α
7055	6673	H	α
7055	6518	.	a
7055	6676	H	a
7055	6610	H	A
7055	6518	.	λ
7055	6922	H	λ
7055	6657	H	l
7055	6660	H	L
7056	6695	.	.
7056	6695	 	 
7056	6695	<~>	<~>
7056	6695	<split-s>	<split-s>
7056	6695	<split-h>	<split-h>
7056	6695	<name2>	<name2>
7056	7057	<>	<name>
7056	6698	<aphaerese>	<aphaerese>
7056	7056	<>	<aphaerese>
7056	6695	<elision3>	<elision3>
7056	7056	<>	<elision3>
7056	6695	<elision2>	<elision2>
7056	7056	<>	<elision2>
7056	6695	<elision1>	<elision1>
7056	7056	<>	<elision1>
7056	6859	.	υ
7056	6859	.	u
7056	6859	.	κ
7056	6859	.	α
7056	6859	.	a
7056	6859	.	λ
7056	7060	<4s>	<>
7057	6697	.	.
7057	6697	 	 
7057	6697	<~>	<~>
7057	6697	<split-s>	<split-s>
7057	6697	<split-h>	<split-h>
7057	6697	<name2>	<name2>
7057	6700	<aphaerese>	<aphaerese>
7057	7058	<>	<aphaerese>
7057	6697	<elision3>	<elision3>
7057	7058	<>	<elision3>
7057	6697	<elision2>	<elision2>
7057	7058	<>	<elision2>
7057	6697	<elision1>	<elision1>
7057	7058	<>	<elision1>
7057	6861	.	υ
7057	6861	.	u
7057	6861	.	κ
7057	6861	.	α
7057	6861	.	a
7057	6861	.	λ
7057	7061	<4s>	<>
7058	6695	.	.
7058	6695	 	 
7058	6695	<~>	<~>
7058	6695	<split-s>	<split-s>
7058	6695	<split-h>	<split-h>
7058	6695	<name2>	<name2>
7058	6698	<aphaerese>	<aphaerese>
7058	7056	<>	<aphaerese>
7058	6695	<elision3>	<elision3>
7058	7056	<>	<elision3>
7058	6695	<elision2>	<elision2>
7058	7056	<>	<elision2>
7058	6695	<elision1>	<elision1>
7058	7056	<>	<elision1>
7058	6859	.	υ
7058	6859	.	u
7058	6859	.	κ
7058	6859	.	α
7058	6859	.	a
7058	6859	.	λ
7058	7059	<4s>	<>
7059	143	.	.
7059	144	 	 
7059	143	<~>	<~>
7059	143	<split-s>	<split-s>
7059	143	<split-h>	<split-h>
7059	143	<name2>	<name2>
7059	147	<aphaerese>	<aphaerese>
7059	7060	<>	<aphaerese>
7059	143	<elision3>	<elision3>
7059	7060	<>	<elision3>
7059	143	<elision2>	<elision2>
7059	7060	<>	<elision2>
7059	143	<elision1>	<elision1>
7059	7060	<>	<elision1>
7059	6469	.	υ
7059	6513	H	υ
7059	6469	.	u
7059	6515	H	u
7059	6469	.	κ
7059	6928	H	κ
7059	6423	H	k
7059	6436	H	U
7059	6439	H	K
7059	6469	.	α
7059	6499	H	α
7059	6469	.	a
7059	6504	H	a
7059	6266	H	A
7059	6469	.	λ
7059	6905	H	λ
7059	6853	H	l
7059	6858	H	L
7059	7063	<K>	<>
7060	143	.	.
7060	144	 	 
7060	143	<~>	<~>
7060	143	<split-s>	<split-s>
7060	143	<split-h>	<split-h>
7060	143	<name2>	<name2>
7060	7061	<>	<name>
7060	147	<aphaerese>	<aphaerese>
7060	7060	<>	<aphaerese>
7060	143	<elision3>	<elision3>
7060	7060	<>	<elision3>
7060	143	<elision2>	<elision2>
7060	7060	<>	<elision2>
7060	143	<elision1>	<elision1>
7060	7060	<>	<elision1>
7060	6469	.	υ
7060	6513	H	υ
7060	6469	.	u
7060	6515	H	u
7060	6469	.	κ
7060	6928	H	κ
7060	6423	H	k
7060	6436	H	U
7060	6439	H	K
7060	6469	.	α
7060	6499	H	α
7060	6469	.	a
7060	6504	H	a
7060	6266	H	A
7060	6469	.	λ
7060	6905	H	λ
7060	6853	H	l
7060	6858	H	L
7060	7064	<K>	<>
7061	142	.	.
7061	146	 	 
7061	142	<~>	<~>
7061	142	<split-s>	<split-s>
7061	142	<split-h>	<split-h>
7061	142	<name2>	<name2>
7061	149	<aphaerese>	<aphaerese>
7061	7059	<>	<aphaerese>
7061	142	<elision3>	<elision3>
7061	7059	<>	<elision3>
7061	142	<elision2>	<elision2>
7061	7059	<>	<elision2>
7061	142	<elision1>	<elision1>
7061	7059	<>	<elision1>
7061	6471	.	υ
7061	6508	H	υ
7061	6471	.	u
7061	6512	H	u
7061	6471	.	κ
7061	6885	H	κ
7061	6464	H	k
7061	6438	H	U
7061	6468	H	K
7061	6471	.	α
7061	6498	H	α
7061	6471	.	a
7061	6503	H	a
7061	6269	H	A
7061	6471	.	λ
7061	6904	H	λ
7061	6852	H	l
7061	6855	H	L
7061	7062	<K>	<>
7062	6521	.	.
7062	6521	<~>	<~>
7062	6521	<split-s>	<split-s>
7062	6521	<split-h>	<split-h>
7062	6521	<name2>	<name2>
7062	6524	<aphaerese>	<aphaerese>
7062	7063	<>	<aphaerese>
7062	6521	<elision3>	<elision3>
7062	7063	<>	<elision3>
7062	6521	<elision2>	<elision2>
7062	7063	<>	<elision2>
7062	6521	<elision1>	<elision1>
7062	7063	<>	<elision1>
7062	6517	.	υ
7062	6663	H	υ
7062	6517	.	u
7062	6672	H	u
7062	6517	.	κ
7062	6915	H	κ
7062	6632	H	k
7062	6641	H	U
7062	6645	H	K
7062	6517	.	α
7062	6675	H	α
7062	6517	.	a
7062	6678	H	a
7062	6612	H	A
7062	6517	.	λ
7062	6924	H	λ
7062	6659	H	l
7062	6654	H	L
7063	6519	.	.
7063	6519	<~>	<~>
7063	6519	<split-s>	<split-s>
7063	6519	<split-h>	<split-h>
7063	6519	<name2>	<name2>
7063	6522	<aphaerese>	<aphaerese>
7063	7064	<>	<aphaerese>
7063	6519	<elision3>	<elision3>
7063	7064	<>	<elision3>
7063	6519	<elision2>	<elision2>
7063	7064	<>	<elision2>
7063	6519	<elision1>	<elision1>
7063	7064	<>	<elision1>
7063	6518	.	υ
7063	6661	H	υ
7063	6518	.	u
7063	6670	H	u
7063	6518	.	κ
7063	6913	H	κ
7063	6630	H	k
7063	6639	H	U
7063	6642	H	K
7063	6518	.	α
7063	6673	H	α
7063	6518	.	a
7063	6676	H	a
7063	6610	H	A
7063	6518	.	λ
7063	6922	H	λ
7063	6657	H	l
7063	6660	H	L
7064	6519	.	.
7064	6519	<~>	<~>
7064	6519	<split-s>	<split-s>
7064	6519	<split-h>	<split-h>
7064	6519	<name2>	<name2>
7064	7062	<>	<name>
7064	6522	<aphaerese>	<aphaerese>
7064	7064	<>	<aphaerese>
7064	6519	<elision3>	<elision3>
7064	7064	<>	<elision3>
7064	6519	<elision2>	<elision2>
7064	7064	<>	<elision2>
7064	6519	<elision1>	<elision1>
7064	7064	<>	<elision1>
7064	6518	.	υ
7064	6661	H	υ
7064	6518	.	u
7064	6670	H	u
7064	6518	.	κ
7064	6913	H	κ
7064	6630	H	k
7064	6639	H	U
7064	6642	H	K
7064	6518	.	α
7064	6673	H	α
7064	6518	.	a
7064	6676	H	a
7064	6610	H	A
7064	6518	.	λ
7064	6922	H	λ
7064	6657	H	l
7064	6660	H	L
7065	7066	<>	<name>
7065	7065	<>	<aphaerese>
7065	7065	<>	<elision3>
7065	7065	<>	<elision2>
7065	7065	<>	<elision1>
7065	6695	<U2kl>	<>
7066	7067	<>	<aphaerese>
7066	7067	<>	<elision3>
7066	7067	<>	<elision2>
7066	7067	<>	<elision1>
7066	6696	<U2kl>	<>
7067	7065	<>	<aphaerese>
7067	7065	<>	<elision3>
7067	7065	<>	<elision2>
7067	7065	<>	<elision1>
7067	6697	<U2kl>	<>
7068	7069	<name>	<name>
7068	7072	<>	<name>
7068	7074	<>	<aphaerese>
7068	7074	<>	<elision3>
7068	7074	<>	<elision2>
7068	7074	<>	<elision1>
7068	7180	<4s>	<>
7068	7075	<A2kl>	<>
7068	7138	<L2kl>	<>
7068	7183	<K2kl>	<>
7069	7070	<4s>	<>
7070	6468	H	k
7070	6855	H	l
7070	7071	<K>	<>
7071	6645	H	k
7071	6654	H	l
7072	7073	<>	<aphaerese>
7072	7073	<>	<elision3>
7072	7073	<>	<elision2>
7072	7073	<>	<elision1>
7072	7076	<A2kl>	<>
7072	7139	<L2kl>	<>
7072	7172	<K2kl>	<>
7073	7074	<>	<aphaerese>
7073	7074	<>	<elision3>
7073	7074	<>	<elision2>
7073	7074	<>	<elision1>
7073	7077	<A2kl>	<>
7073	7140	<L2kl>	<>
7073	7173	<K2kl>	<>
7074	7072	<>	<name>
7074	7074	<>	<aphaerese>
7074	7074	<>	<elision3>
7074	7074	<>	<elision2>
7074	7074	<>	<elision1>
7074	7075	<A2kl>	<>
7074	7138	<L2kl>	<>
7074	7171	<K2kl>	<>
7075	7076	<>	<name>
7075	7075	<>	<aphaerese>
7075	7075	<>	<elision3>
7075	7075	<>	<elision2>
7075	7075	<>	<elision1>
7075	7078	.	κ
7075	7078	.	λ
7075	7130	<4s>	<>
7076	7077	<>	<aphaerese>
7076	7077	<>	<elision3>
7076	7077	<>	<elision2>
7076	7077	<>	<elision1>
7076	7080	.	κ
7076	7080	.	λ
7076	7131	<4s>	<>
7077	7075	<>	<aphaerese>
7077	7075	<>	<elision3>
7077	7075	<>	<elision2>
7077	7075	<>	<elision1>
7077	7078	.	κ
7077	7078	.	λ
7077	7129	<4s>	<>
7078	7079	<>	<name>
7078	7078	<>	<aphaerese>
7078	7081	<elision3>	<elision3>
7078	7078	<>	<elision3>
7078	7081	<elision2>	<elision2>
7078	7078	<>	<elision2>
7078	7081	<elision1>	<elision1>
7078	7078	<>	<elision1>
7078	7121	<4s>	<>
7079	7080	<>	<aphaerese>
7079	7083	<elision3>	<elision3>
7079	7080	<>	<elision3>
7079	7083	<elision2>	<elision2>
7079	7080	<>	<elision2>
7079	7083	<elision1>	<elision1>
7079	7080	<>	<elision1>
7079	7122	<4s>	<>
7080	7078	<>	<aphaerese>
7080	7081	<elision3>	<elision3>
7080	7078	<>	<elision3>
7080	7081	<elision2>	<elision2>
7080	7078	<>	<elision2>
7080	7081	<elision1>	<elision1>
7080	7078	<>	<elision1>
7080	7120	<4s>	<>
7081	6695	.	.
7081	6695	 	 
7081	6695	<~>	<~>
7081	6695	<split-s>	<split-s>
7081	6695	<split-h>	<split-h>
7081	6695	<name2>	<name2>
7081	7082	<>	<name>
7081	6698	<aphaerese>	<aphaerese>
7081	7081	<>	<aphaerese>
7081	6695	<elision3>	<elision3>
7081	7081	<>	<elision3>
7081	6695	<elision2>	<elision2>
7081	7081	<>	<elision2>
7081	6695	<elision1>	<elision1>
7081	7081	<>	<elision1>
7081	6859	.	υ
7081	6859	.	u
7081	6859	.	α
7081	6859	.	a
7081	7085	<4s>	<>
7082	6697	.	.
7082	6697	 	 
7082	6697	<~>	<~>
7082	6697	<split-s>	<split-s>
7082	6697	<split-h>	<split-h>
7082	6697	<name2>	<name2>
7082	6700	<aphaerese>	<aphaerese>
7082	7083	<>	<aphaerese>
7082	6697	<elision3>	<elision3>
7082	7083	<>	<elision3>
7082	6697	<elision2>	<elision2>
7082	7083	<>	<elision2>
7082	6697	<elision1>	<elision1>
7082	7083	<>	<elision1>
7082	6861	.	υ
7082	6861	.	u
7082	6861	.	α
7082	6861	.	a
7082	7086	<4s>	<>
7083	6695	.	.
7083	6695	 	 
7083	6695	<~>	<~>
7083	6695	<split-s>	<split-s>
7083	6695	<split-h>	<split-h>
7083	6695	<name2>	<name2>
7083	6698	<aphaerese>	<aphaerese>
7083	7081	<>	<aphaerese>
7083	6695	<elision3>	<elision3>
7083	7081	<>	<elision3>
7083	6695	<elision2>	<elision2>
7083	7081	<>	<elision2>
7083	6695	<elision1>	<elision1>
7083	7081	<>	<elision1>
7083	6859	.	υ
7083	6859	.	u
7083	6859	.	α
7083	6859	.	a
7083	7084	<4s>	<>
7084	143	.	.
7084	144	 	 
7084	143	<~>	<~>
7084	143	<split-s>	<split-s>
7084	143	<split-h>	<split-h>
7084	143	<name2>	<name2>
7084	147	<aphaerese>	<aphaerese>
7084	7085	<>	<aphaerese>
7084	143	<elision3>	<elision3>
7084	7085	<>	<elision3>
7084	143	<elision2>	<elision2>
7084	7085	<>	<elision2>
7084	143	<elision1>	<elision1>
7084	7085	<>	<elision1>
7084	6469	.	υ
7084	6513	H	υ
7084	6469	.	u
7084	6515	H	u
7084	7088	H	κ
7084	7100	H	k
7084	6436	H	U
7084	7092	H	K
7084	6469	.	α
7084	6499	H	α
7084	6469	.	a
7084	6504	H	a
7084	6266	H	A
7084	7088	H	λ
7084	7100	H	l
7084	7092	H	L
7084	7103	<K>	<>
7085	143	.	.
7085	144	 	 
7085	143	<~>	<~>
7085	143	<split-s>	<split-s>
7085	143	<split-h>	<split-h>
7085	143	<name2>	<name2>
7085	7086	<>	<name>
7085	147	<aphaerese>	<aphaerese>
7085	7085	<>	<aphaerese>
7085	143	<elision3>	<elision3>
7085	7085	<>	<elision3>
7085	143	<elision2>	<elision2>
7085	7085	<>	<elision2>
7085	143	<elision1>	<elision1>
7085	7085	<>	<elision1>
7085	6469	.	υ
7085	6513	H	υ
7085	6469	.	u
7085	6515	H	u
7085	7088	H	κ
7085	7100	H	k
7085	6436	H	U
7085	7092	H	K
7085	6469	.	α
7085	6499	H	α
7085	6469	.	a
7085	6504	H	a
7085	6266	H	A
7085	7088	H	λ
7085	7100	H	l
7085	7092	H	L
7085	7104	<K>	<>
7086	142	.	.
7086	146	 	 
7086	142	<~>	<~>
7086	142	<split-s>	<split-s>
7086	142	<split-h>	<split-h>
7086	142	<name2>	<name2>
7086	149	<aphaerese>	<aphaerese>
7086	7084	<>	<aphaerese>
7086	142	<elision3>	<elision3>
7086	7084	<>	<elision3>
7086	142	<elision2>	<elision2>
7086	7084	<>	<elision2>
7086	142	<elision1>	<elision1>
7086	7084	<>	<elision1>
7086	6471	.	υ
7086	6508	H	υ
7086	6471	.	u
7086	6512	H	u
7086	7087	H	κ
7086	7099	H	k
7086	6438	H	U
7086	7091	H	K
7086	6471	.	α
7086	6498	H	α
7086	6471	.	a
7086	6503	H	a
7086	6269	H	A
7086	7087	H	λ
7086	7099	H	l
7086	7091	H	L
7086	7102	<K>	<>
7087	7088	<>	<aphaerese>
7087	7088	<>	<elision3>
7087	7088	<>	<elision2>
7087	7088	<>	<elision1>
7087	7091	<lambda2L>	<>
7088	7089	<>	<name>
7088	7088	<>	<aphaerese>
7088	7088	<>	<elision3>
7088	7088	<>	<elision2>
7088	7088	<>	<elision1>
7088	7092	<lambda2L>	<>
7089	7087	<>	<aphaerese>
7089	7087	<>	<elision3>
7089	7087	<>	<elision2>
7089	7087	<>	<elision1>
7089	7090	<lambda2L>	<>
7090	7091	<>	<aphaerese>
7090	7091	<>	<elision3>
7090	7091	<>	<elision2>
7090	7091	<>	<elision1>
7090	7095	.	κ
7090	7095	.	λ
7090	5523	<1s>	<>
7091	7092	<>	<aphaerese>
7091	7092	<>	<elision3>
7091	7092	<>	<elision2>
7091	7092	<>	<elision1>
7091	7093	.	κ
7091	7093	.	λ
7091	5521	<1s>	<>
7092	7090	<>	<name>
7092	7092	<>	<aphaerese>
7092	7092	<>	<elision3>
7092	7092	<>	<elision2>
7092	7092	<>	<elision1>
7092	7093	.	κ
7092	7093	.	λ
7092	5522	<1s>	<>
7093	7094	<>	<name>
7093	7093	<>	<aphaerese>
7093	7096	<elision3>	<elision3>
7093	7093	<>	<elision3>
7093	7096	<elision2>	<elision2>
7093	7093	<>	<elision2>
7093	7096	<elision1>	<elision1>
7093	7093	<>	<elision1>
7093	5513	<1s>	<>
7094	7095	<>	<aphaerese>
7094	7098	<elision3>	<elision3>
7094	7095	<>	<elision3>
7094	7098	<elision2>	<elision2>
7094	7095	<>	<elision2>
7094	7098	<elision1>	<elision1>
7094	7095	<>	<elision1>
7094	5514	<1s>	<>
7095	7093	<>	<aphaerese>
7095	7096	<elision3>	<elision3>
7095	7093	<>	<elision3>
7095	7096	<elision2>	<elision2>
7095	7093	<>	<elision2>
7095	7096	<elision1>	<elision1>
7095	7093	<>	<elision1>
7095	5512	<1s>	<>
7096	7097	<>	<name>
7096	7096	<>	<aphaerese>
7096	7096	<>	<elision3>
7096	7096	<>	<elision2>
7096	7096	<>	<elision1>
7096	6280	.	κ
7096	6298	s	κ
7096	6033	s	k
7096	6051	s	K
7096	6354	s	λ
7096	6064	s	l
7096	6067	s	L
7096	5507	<1s>	<>
7097	7098	<>	<aphaerese>
7097	7098	<>	<elision3>
7097	7098	<>	<elision2>
7097	7098	<>	<elision1>
7097	6282	.	κ
7097	6300	s	κ
7097	6035	s	k
7097	6054	s	K
7097	6356	s	λ
7097	6066	s	l
7097	6069	s	L
7097	5508	<1s>	<>
7098	7096	<>	<aphaerese>
7098	7096	<>	<elision3>
7098	7096	<>	<elision2>
7098	7096	<>	<elision1>
7098	6280	.	κ
7098	6298	s	κ
7098	6033	s	k
7098	6051	s	K
7098	6354	s	λ
7098	6064	s	l
7098	6067	s	L
7098	5506	<1s>	<>
7099	7100	<>	<aphaerese>
7099	7100	<>	<elision3>
7099	7100	<>	<elision2>
7099	7100	<>	<elision1>
7099	7091	<l2L>	<>
7100	7101	<>	<name>
7100	7100	<>	<aphaerese>
7100	7100	<>	<elision3>
7100	7100	<>	<elision2>
7100	7100	<>	<elision1>
7100	7092	<l2L>	<>
7101	7099	<>	<aphaerese>
7101	7099	<>	<elision3>
7101	7099	<>	<elision2>
7101	7099	<>	<elision1>
7101	7090	<l2L>	<>
7102	6521	.	.
7102	6521	<~>	<~>
7102	6521	<split-s>	<split-s>
7102	6521	<split-h>	<split-h>
7102	6521	<name2>	<name2>
7102	6524	<aphaerese>	<aphaerese>
7102	7103	<>	<aphaerese>
7102	6521	<elision3>	<elision3>
7102	7103	<>	<elision3>
7102	6521	<elision2>	<elision2>
7102	7103	<>	<elision2>
7102	6521	<elision1>	<elision1>
7102	7103	<>	<elision1>
7102	6517	.	υ
7102	6663	H	υ
7102	6517	.	u
7102	6672	H	u
7102	7107	H	κ
7102	7119	H	k
7102	6641	H	U
7102	7108	H	K
7102	6517	.	α
7102	6675	H	α
7102	6517	.	a
7102	6678	H	a
7102	6612	H	A
7102	7107	H	λ
7102	7119	H	l
7102	7108	H	L
7103	6519	.	.
7103	6519	<~>	<~>
7103	6519	<split-s>	<split-s>
7103	6519	<split-h>	<split-h>
7103	6519	<name2>	<name2>
7103	6522	<aphaerese>	<aphaerese>
7103	7104	<>	<aphaerese>
7103	6519	<elision3>	<elision3>
7103	7104	<>	<elision3>
7103	6519	<elision2>	<elision2>
7103	7104	<>	<elision2>
7103	6519	<elision1>	<elision1>
7103	7104	<>	<elision1>
7103	6518	.	υ
7103	6661	H	υ
7103	6518	.	u
7103	6670	H	u
7103	7105	H	κ
7103	7117	H	k
7103	6639	H	U
7103	7109	H	K
7103	6518	.	α
7103	6673	H	α
7103	6518	.	a
7103	6676	H	a
7103	6610	H	A
7103	7105	H	λ
7103	7117	H	l
7103	7109	H	L
7104	6519	.	.
7104	6519	<~>	<~>
7104	6519	<split-s>	<split-s>
7104	6519	<split-h>	<split-h>
7104	6519	<name2>	<name2>
7104	7102	<>	<name>
7104	6522	<aphaerese>	<aphaerese>
7104	7104	<>	<aphaerese>
7104	6519	<elision3>	<elision3>
7104	7104	<>	<elision3>
7104	6519	<elision2>	<elision2>
7104	7104	<>	<elision2>
7104	6519	<elision1>	<elision1>
7104	7104	<>	<elision1>
7104	6518	.	υ
7104	6661	H	υ
7104	6518	.	u
7104	6670	H	u
7104	7105	H	κ
7104	7117	H	k
7104	6639	H	U
7104	7109	H	K
7104	6518	.	α
7104	6673	H	α
7104	6518	.	a
7104	6676	H	a
7104	6610	H	A
7104	7105	H	λ
7104	7117	H	l
7104	7109	H	L
7105	7106	<>	<name>
7105	7105	<>	<aphaerese>
7105	7105	<>	<elision3>
7105	7105	<>	<elision2>
7105	7105	<>	<elision1>
7105	7109	<lambda2L>	<>
7106	7107	<>	<aphaerese>
7106	7107	<>	<elision3>
7106	7107	<>	<elision2>
7106	7107	<>	<elision1>
7106	7110	<lambda2L>	<>
7107	7105	<>	<aphaerese>
7107	7105	<>	<elision3>
7107	7105	<>	<elision2>
7107	7105	<>	<elision1>
7107	7108	<lambda2L>	<>
7108	7109	<>	<aphaerese>
7108	7109	<>	<elision3>
7108	7109	<>	<elision2>
7108	7109	<>	<elision1>
7108	7112	.	κ
7108	7112	.	λ
7109	7110	<>	<name>
7109	7109	<>	<aphaerese>
7109	7109	<>	<elision3>
7109	7109	<>	<elision2>
7109	7109	<>	<elision1>
7109	7112	.	κ
7109	7112	.	λ
7110	7108	<>	<aphaerese>
7110	7108	<>	<elision3>
7110	7108	<>	<elision2>
7110	7108	<>	<elision1>
7110	7111	.	κ
7110	7111	.	λ
7111	7112	<>	<aphaerese>
7111	7115	<elision3>	<elision3>
7111	7112	<>	<elision3>
7111	7115	<elision2>	<elision2>
7111	7112	<>	<elision2>
7111	7115	<elision1>	<elision1>
7111	7112	<>	<elision1>
7112	7113	<>	<name>
7112	7112	<>	<aphaerese>
7112	7115	<elision3>	<elision3>
7112	7112	<>	<elision3>
7112	7115	<elision2>	<elision2>
7112	7112	<>	<elision2>
7112	7115	<elision1>	<elision1>
7112	7112	<>	<elision1>
7113	7111	<>	<aphaerese>
7113	7114	<elision3>	<elision3>
7113	7111	<>	<elision3>
7113	7114	<elision2>	<elision2>
7113	7111	<>	<elision2>
7113	7114	<elision1>	<elision1>
7113	7111	<>	<elision1>
7114	7115	<>	<aphaerese>
7114	7115	<>	<elision3>
7114	7115	<>	<elision2>
7114	7115	<>	<elision1>
7114	6586	.	κ
7114	6559	s	κ
7114	6562	H	κ
7114	6559	s	k
7114	6562	H	k
7114	6547	s	K
7114	6562	H	K
7114	6559	s	λ
7114	6562	H	λ
7114	6559	s	l
7114	6562	H	l
7114	6553	s	L
7114	6562	H	L
7115	7116	<>	<name>
7115	7115	<>	<aphaerese>
7115	7115	<>	<elision3>
7115	7115	<>	<elision2>
7115	7115	<>	<elision1>
7115	6586	.	κ
7115	6559	s	κ
7115	6562	H	κ
7115	6559	s	k
7115	6562	H	k
7115	6547	s	K
7115	6562	H	K
7115	6559	s	λ
7115	6562	H	λ
7115	6559	s	l
7115	6562	H	l
7115	6553	s	L
7115	6562	H	L
7116	7114	<>	<aphaerese>
7116	7114	<>	<elision3>
7116	7114	<>	<elision2>
7116	7114	<>	<elision1>
7116	6588	.	κ
7116	6558	s	κ
7116	6561	H	κ
7116	6558	s	k
7116	6561	H	k
7116	6546	s	K
7116	6561	H	K
7116	6558	s	λ
7116	6561	H	λ
7116	6558	s	l
7116	6561	H	l
7116	6552	s	L
7116	6561	H	L
7117	7118	<>	<name>
7117	7117	<>	<aphaerese>
7117	7117	<>	<elision3>
7117	7117	<>	<elision2>
7117	7117	<>	<elision1>
7117	7109	<l2L>	<>
7118	7119	<>	<aphaerese>
7118	7119	<>	<elision3>
7118	7119	<>	<elision2>
7118	7119	<>	<elision1>
7118	7110	<l2L>	<>
7119	7117	<>	<aphaerese>
7119	7117	<>	<elision3>
7119	7117	<>	<elision2>
7119	7117	<>	<elision1>
7119	7108	<l2L>	<>
7120	7121	<>	<aphaerese>
7120	7124	<elision3>	<elision3>
7120	7121	<>	<elision3>
7120	7124	<elision2>	<elision2>
7120	7121	<>	<elision2>
7120	7124	<elision1>	<elision1>
7120	7121	<>	<elision1>
7120	7127	<K>	<>
7121	7122	<>	<name>
7121	7121	<>	<aphaerese>
7121	7124	<elision3>	<elision3>
7121	7121	<>	<elision3>
7121	7124	<elision2>	<elision2>
7121	7121	<>	<elision2>
7121	7124	<elision1>	<elision1>
7121	7121	<>	<elision1>
7121	7128	<K>	<>
7122	7120	<>	<aphaerese>
7122	7123	<elision3>	<elision3>
7122	7120	<>	<elision3>
7122	7123	<elision2>	<elision2>
7122	7120	<>	<elision2>
7122	7123	<elision1>	<elision1>
7122	7120	<>	<elision1>
7122	7126	<K>	<>
7123	143	.	.
7123	144	 	 
7123	143	<~>	<~>
7123	143	<split-s>	<split-s>
7123	143	<split-h>	<split-h>
7123	143	<name2>	<name2>
7123	147	<aphaerese>	<aphaerese>
7123	7124	<>	<aphaerese>
7123	143	<elision3>	<elision3>
7123	7124	<>	<elision3>
7123	143	<elision2>	<elision2>
7123	7124	<>	<elision2>
7123	143	<elision1>	<elision1>
7123	7124	<>	<elision1>
7123	6469	.	υ
7123	6513	H	υ
7123	6469	.	u
7123	6515	H	u
7123	7088	H	κ
7123	7100	H	k
7123	6436	H	U
7123	7092	H	K
7123	6469	.	α
7123	6499	H	α
7123	6469	.	a
7123	6504	H	a
7123	6266	H	A
7123	7088	H	λ
7123	7100	H	l
7123	7092	H	L
7124	143	.	.
7124	144	 	 
7124	143	<~>	<~>
7124	143	<split-s>	<split-s>
7124	143	<split-h>	<split-h>
7124	143	<name2>	<name2>
7124	7125	<>	<name>
7124	147	<aphaerese>	<aphaerese>
7124	7124	<>	<aphaerese>
7124	143	<elision3>	<elision3>
7124	7124	<>	<elision3>
7124	143	<elision2>	<elision2>
7124	7124	<>	<elision2>
7124	143	<elision1>	<elision1>
7124	7124	<>	<elision1>
7124	6469	.	υ
7124	6513	H	υ
7124	6469	.	u
7124	6515	H	u
7124	7088	H	κ
7124	7100	H	k
7124	6436	H	U
7124	7092	H	K
7124	6469	.	α
7124	6499	H	α
7124	6469	.	a
7124	6504	H	a
7124	6266	H	A
7124	7088	H	λ
7124	7100	H	l
7124	7092	H	L
7125	142	.	.
7125	146	 	 
7125	142	<~>	<~>
7125	142	<split-s>	<split-s>
7125	142	<split-h>	<split-h>
7125	142	<name2>	<name2>
7125	149	<aphaerese>	<aphaerese>
7125	7123	<>	<aphaerese>
7125	142	<elision3>	<elision3>
7125	7123	<>	<elision3>
7125	142	<elision2>	<elision2>
7125	7123	<>	<elision2>
7125	142	<elision1>	<elision1>
7125	7123	<>	<elision1>
7125	6471	.	υ
7125	6508	H	υ
7125	6471	.	u
7125	6512	H	u
7125	7087	H	κ
7125	7099	H	k
7125	6438	H	U
7125	7091	H	K
7125	6471	.	α
7125	6498	H	α
7125	6471	.	a
7125	6503	H	a
7125	6269	H	A
7125	7087	H	λ
7125	7099	H	l
7125	7091	H	L
7126	7127	<>	<aphaerese>
7126	7103	<elision3>	<elision3>
7126	7127	<>	<elision3>
7126	7103	<elision2>	<elision2>
7126	7127	<>	<elision2>
7126	7103	<elision1>	<elision1>
7126	7127	<>	<elision1>
7127	7128	<>	<aphaerese>
7127	7104	<elision3>	<elision3>
7127	7128	<>	<elision3>
7127	7104	<elision2>	<elision2>
7127	7128	<>	<elision2>
7127	7104	<elision1>	<elision1>
7127	7128	<>	<elision1>
7128	7126	<>	<name>
7128	7128	<>	<aphaerese>
7128	7104	<elision3>	<elision3>
7128	7128	<>	<elision3>
7128	7104	<elision2>	<elision2>
7128	7128	<>	<elision2>
7128	7104	<elision1>	<elision1>
7128	7128	<>	<elision1>
7129	7130	<>	<aphaerese>
7129	7130	<>	<elision3>
7129	7130	<>	<elision2>
7129	7130	<>	<elision1>
7129	7133	.	κ
7129	7133	.	λ
7129	7136	<K>	<>
7130	7131	<>	<name>
7130	7130	<>	<aphaerese>
7130	7130	<>	<elision3>
7130	7130	<>	<elision2>
7130	7130	<>	<elision1>
7130	7133	.	κ
7130	7133	.	λ
7130	7137	<K>	<>
7131	7129	<>	<aphaerese>
7131	7129	<>	<elision3>
7131	7129	<>	<elision2>
7131	7129	<>	<elision1>
7131	7132	.	κ
7131	7132	.	λ
7131	7135	<K>	<>
7132	7133	<>	<aphaerese>
7132	7124	<elision3>	<elision3>
7132	7133	<>	<elision3>
7132	7124	<elision2>	<elision2>
7132	7133	<>	<elision2>
7132	7124	<elision1>	<elision1>
7132	7133	<>	<elision1>
7133	7134	<>	<name>
7133	7133	<>	<aphaerese>
7133	7124	<elision3>	<elision3>
7133	7133	<>	<elision3>
7133	7124	<elision2>	<elision2>
7133	7133	<>	<elision2>
7133	7124	<elision1>	<elision1>
7133	7133	<>	<elision1>
7134	7132	<>	<aphaerese>
7134	7123	<elision3>	<elision3>
7134	7132	<>	<elision3>
7134	7123	<elision2>	<elision2>
7134	7132	<>	<elision2>
7134	7123	<elision1>	<elision1>
7134	7132	<>	<elision1>
7135	7136	<>	<aphaerese>
7135	7136	<>	<elision3>
7135	7136	<>	<elision2>
7135	7136	<>	<elision1>
7135	7127	.	κ
7135	7127	.	λ
7136	7137	<>	<aphaerese>
7136	7137	<>	<elision3>
7136	7137	<>	<elision2>
7136	7137	<>	<elision1>
7136	7128	.	κ
7136	7128	.	λ
7137	7135	<>	<name>
7137	7137	<>	<aphaerese>
7137	7137	<>	<elision3>
7137	7137	<>	<elision2>
7137	7137	<>	<elision1>
7137	7128	.	κ
7137	7128	.	λ
7138	7139	<>	<name>
7138	7138	<>	<aphaerese>
7138	7138	<>	<elision3>
7138	7138	<>	<elision2>
7138	7138	<>	<elision1>
7138	7141	.	κ
7138	7141	.	λ
7138	7163	<4s>	<>
7139	7140	<>	<aphaerese>
7139	7140	<>	<elision3>
7139	7140	<>	<elision2>
7139	7140	<>	<elision1>
7139	7143	.	κ
7139	7143	.	λ
7139	7164	<4s>	<>
7140	7138	<>	<aphaerese>
7140	7138	<>	<elision3>
7140	7138	<>	<elision2>
7140	7138	<>	<elision1>
7140	7141	.	κ
7140	7141	.	λ
7140	7162	<4s>	<>
7141	7142	<>	<name>
7141	7141	<>	<aphaerese>
7141	7144	<elision3>	<elision3>
7141	7141	<>	<elision3>
7141	7144	<elision2>	<elision2>
7141	7141	<>	<elision2>
7141	7144	<elision1>	<elision1>
7141	7141	<>	<elision1>
7141	7154	<4s>	<>
7142	7143	<>	<aphaerese>
7142	7146	<elision3>	<elision3>
7142	7143	<>	<elision3>
7142	7146	<elision2>	<elision2>
7142	7143	<>	<elision2>
7142	7146	<elision1>	<elision1>
7142	7143	<>	<elision1>
7142	7155	<4s>	<>
7143	7141	<>	<aphaerese>
7143	7144	<elision3>	<elision3>
7143	7141	<>	<elision3>
7143	7144	<elision2>	<elision2>
7143	7141	<>	<elision2>
7143	7144	<elision1>	<elision1>
7143	7141	<>	<elision1>
7143	7153	<4s>	<>
7144	7145	<>	<name>
7144	7144	<>	<aphaerese>
7144	7144	<>	<elision3>
7144	7144	<>	<elision2>
7144	7144	<>	<elision1>
7144	6701	.	κ
7144	7148	<4s>	<>
7145	7146	<>	<aphaerese>
7145	7146	<>	<elision3>
7145	7146	<>	<elision2>
7145	7146	<>	<elision1>
7145	6703	.	κ
7145	7149	<4s>	<>
7146	7144	<>	<aphaerese>
7146	7144	<>	<elision3>
7146	7144	<>	<elision2>
7146	7144	<>	<elision1>
7146	6701	.	κ
7146	7147	<4s>	<>
7147	7148	<>	<aphaerese>
7147	7148	<>	<elision3>
7147	7148	<>	<elision2>
7147	7148	<>	<elision1>
7147	150	.	κ
7147	6095	H	κ
7147	6423	H	k
7147	6439	H	K
7147	6450	H	λ
7147	6853	H	l
7147	6858	H	L
7147	7151	<K>	<>
7148	7149	<>	<name>
7148	7148	<>	<aphaerese>
7148	7148	<>	<elision3>
7148	7148	<>	<elision2>
7148	7148	<>	<elision1>
7148	150	.	κ
7148	6095	H	κ
7148	6423	H	k
7148	6439	H	K
7148	6450	H	λ
7148	6853	H	l
7148	6858	H	L
7148	7152	<K>	<>
7149	7147	<>	<aphaerese>
7149	7147	<>	<elision3>
7149	7147	<>	<elision2>
7149	7147	<>	<elision1>
7149	152	.	κ
7149	6460	H	κ
7149	6464	H	k
7149	6468	H	K
7149	6452	H	λ
7149	6852	H	l
7149	6855	H	L
7149	7150	<K>	<>
7150	7151	<>	<aphaerese>
7150	7151	<>	<elision3>
7150	7151	<>	<elision2>
7150	7151	<>	<elision1>
7150	6527	.	κ
7150	6578	H	κ
7150	6632	H	k
7150	6645	H	K
7150	6653	H	λ
7150	6659	H	l
7150	6654	H	L
7151	7152	<>	<aphaerese>
7151	7152	<>	<elision3>
7151	7152	<>	<elision2>
7151	7152	<>	<elision1>
7151	6525	.	κ
7151	6576	H	κ
7151	6630	H	k
7151	6642	H	K
7151	6651	H	λ
7151	6657	H	l
7151	6660	H	L
7152	7150	<>	<name>
7152	7152	<>	<aphaerese>
7152	7152	<>	<elision3>
7152	7152	<>	<elision2>
7152	7152	<>	<elision1>
7152	6525	.	κ
7152	6576	H	κ
7152	6630	H	k
7152	6642	H	K
7152	6651	H	λ
7152	6657	H	l
7152	6660	H	L
7153	7154	<>	<aphaerese>
7153	7157	<elision3>	<elision3>
7153	7154	<>	<elision3>
7153	7157	<elision2>	<elision2>
7153	7154	<>	<elision2>
7153	7157	<elision1>	<elision1>
7153	7154	<>	<elision1>
7153	7160	<K>	<>
7154	7155	<>	<name>
7154	7154	<>	<aphaerese>
7154	7157	<elision3>	<elision3>
7154	7154	<>	<elision3>
7154	7157	<elision2>	<elision2>
7154	7154	<>	<elision2>
7154	7157	<elision1>	<elision1>
7154	7154	<>	<elision1>
7154	7161	<K>	<>
7155	7153	<>	<aphaerese>
7155	7156	<elision3>	<elision3>
7155	7153	<>	<elision3>
7155	7156	<elision2>	<elision2>
7155	7153	<>	<elision2>
7155	7156	<elision1>	<elision1>
7155	7153	<>	<elision1>
7155	7159	<K>	<>
7156	7157	<>	<aphaerese>
7156	7157	<>	<elision3>
7156	7157	<>	<elision2>
7156	7157	<>	<elision1>
7156	150	.	κ
7156	6095	H	κ
7156	6423	H	k
7156	6439	H	K
7156	6450	H	λ
7156	6456	H	l
7156	6459	H	L
7157	7158	<>	<name>
7157	7157	<>	<aphaerese>
7157	7157	<>	<elision3>
7157	7157	<>	<elision2>
7157	7157	<>	<elision1>
7157	150	.	κ
7157	6095	H	κ
7157	6423	H	k
7157	6439	H	K
7157	6450	H	λ
7157	6456	H	l
7157	6459	H	L
7158	7156	<>	<aphaerese>
7158	7156	<>	<elision3>
7158	7156	<>	<elision2>
7158	7156	<>	<elision1>
7158	152	.	κ
7158	6460	H	κ
7158	6464	H	k
7158	6468	H	K
7158	6452	H	λ
7158	6458	H	l
7158	6453	H	L
7159	7160	<>	<aphaerese>
7159	7151	<elision3>	<elision3>
7159	7160	<>	<elision3>
7159	7151	<elision2>	<elision2>
7159	7160	<>	<elision2>
7159	7151	<elision1>	<elision1>
7159	7160	<>	<elision1>
7160	7161	<>	<aphaerese>
7160	7152	<elision3>	<elision3>
7160	7161	<>	<elision3>
7160	7152	<elision2>	<elision2>
7160	7161	<>	<elision2>
7160	7152	<elision1>	<elision1>
7160	7161	<>	<elision1>
7161	7159	<>	<name>
7161	7161	<>	<aphaerese>
7161	7152	<elision3>	<elision3>
7161	7161	<>	<elision3>
7161	7152	<elision2>	<elision2>
7161	7161	<>	<elision2>
7161	7152	<elision1>	<elision1>
7161	7161	<>	<elision1>
7162	7163	<>	<aphaerese>
7162	7163	<>	<elision3>
7162	7163	<>	<elision2>
7162	7163	<>	<elision1>
7162	7166	.	κ
7162	7166	.	λ
7162	7169	<K>	<>
7163	7164	<>	<name>
7163	7163	<>	<aphaerese>
7163	7163	<>	<elision3>
7163	7163	<>	<elision2>
7163	7163	<>	<elision1>
7163	7166	.	κ
7163	7166	.	λ
7163	7170	<K>	<>
7164	7162	<>	<aphaerese>
7164	7162	<>	<elision3>
7164	7162	<>	<elision2>
7164	7162	<>	<elision1>
7164	7165	.	κ
7164	7165	.	λ
7164	7168	<K>	<>
7165	7166	<>	<aphaerese>
7165	7157	<elision3>	<elision3>
7165	7166	<>	<elision3>
7165	7157	<elision2>	<elision2>
7165	7166	<>	<elision2>
7165	7157	<elision1>	<elision1>
7165	7166	<>	<elision1>
7166	7167	<>	<name>
7166	7166	<>	<aphaerese>
7166	7157	<elision3>	<elision3>
7166	7166	<>	<elision3>
7166	7157	<elision2>	<elision2>
7166	7166	<>	<elision2>
7166	7157	<elision1>	<elision1>
7166	7166	<>	<elision1>
7167	7165	<>	<aphaerese>
7167	7156	<elision3>	<elision3>
7167	7165	<>	<elision3>
7167	7156	<elision2>	<elision2>
7167	7165	<>	<elision2>
7167	7156	<elision1>	<elision1>
7167	7165	<>	<elision1>
7168	7169	<>	<aphaerese>
7168	7169	<>	<elision3>
7168	7169	<>	<elision2>
7168	7169	<>	<elision1>
7168	7160	.	κ
7168	7160	.	λ
7169	7170	<>	<aphaerese>
7169	7170	<>	<elision3>
7169	7170	<>	<elision2>
7169	7170	<>	<elision1>
7169	7161	.	κ
7169	7161	.	λ
7170	7168	<>	<name>
7170	7170	<>	<aphaerese>
7170	7170	<>	<elision3>
7170	7170	<>	<elision2>
7170	7170	<>	<elision1>
7170	7161	.	κ
7170	7161	.	λ
7171	6695	.	.
7171	6695	 	 
7171	6695	<~>	<~>
7171	6695	<split-s>	<split-s>
7171	6695	<split-h>	<split-h>
7171	6695	<name2>	<name2>
7171	7172	<>	<name>
7171	6698	<aphaerese>	<aphaerese>
7171	7171	<>	<aphaerese>
7171	6695	<elision3>	<elision3>
7171	7171	<>	<elision3>
7171	6695	<elision2>	<elision2>
7171	7171	<>	<elision2>
7171	6695	<elision1>	<elision1>
7171	7171	<>	<elision1>
7171	6859	.	υ
7171	6859	.	u
7171	6859	.	α
7171	6859	.	a
7171	7175	<4s>	<>
7172	6697	.	.
7172	6697	 	 
7172	6697	<~>	<~>
7172	6697	<split-s>	<split-s>
7172	6697	<split-h>	<split-h>
7172	6697	<name2>	<name2>
7172	6700	<aphaerese>	<aphaerese>
7172	7173	<>	<aphaerese>
7172	6697	<elision3>	<elision3>
7172	7173	<>	<elision3>
7172	6697	<elision2>	<elision2>
7172	7173	<>	<elision2>
7172	6697	<elision1>	<elision1>
7172	7173	<>	<elision1>
7172	6861	.	υ
7172	6861	.	u
7172	6861	.	α
7172	6861	.	a
7172	7176	<4s>	<>
7173	6695	.	.
7173	6695	 	 
7173	6695	<~>	<~>
7173	6695	<split-s>	<split-s>
7173	6695	<split-h>	<split-h>
7173	6695	<name2>	<name2>
7173	6698	<aphaerese>	<aphaerese>
7173	7171	<>	<aphaerese>
7173	6695	<elision3>	<elision3>
7173	7171	<>	<elision3>
7173	6695	<elision2>	<elision2>
7173	7171	<>	<elision2>
7173	6695	<elision1>	<elision1>
7173	7171	<>	<elision1>
7173	6859	.	υ
7173	6859	.	u
7173	6859	.	α
7173	6859	.	a
7173	7174	<4s>	<>
7174	143	.	.
7174	144	 	 
7174	143	<~>	<~>
7174	143	<split-s>	<split-s>
7174	143	<split-h>	<split-h>
7174	143	<name2>	<name2>
7174	147	<aphaerese>	<aphaerese>
7174	7175	<>	<aphaerese>
7174	143	<elision3>	<elision3>
7174	7175	<>	<elision3>
7174	143	<elision2>	<elision2>
7174	7175	<>	<elision2>
7174	143	<elision1>	<elision1>
7174	7175	<>	<elision1>
7174	6469	.	υ
7174	6513	H	υ
7174	6469	.	u
7174	6515	H	u
7174	6928	H	κ
7174	6423	H	k
7174	6436	H	U
7174	6439	H	K
7174	6469	.	α
7174	6499	H	α
7174	6469	.	a
7174	6504	H	a
7174	6266	H	A
7174	6905	H	λ
7174	6853	H	l
7174	6858	H	L
7174	7178	<K>	<>
7175	143	.	.
7175	144	 	 
7175	143	<~>	<~>
7175	143	<split-s>	<split-s>
7175	143	<split-h>	<split-h>
7175	143	<name2>	<name2>
7175	7176	<>	<name>
7175	147	<aphaerese>	<aphaerese>
7175	7175	<>	<aphaerese>
7175	143	<elision3>	<elision3>
7175	7175	<>	<elision3>
7175	143	<elision2>	<elision2>
7175	7175	<>	<elision2>
7175	143	<elision1>	<elision1>
7175	7175	<>	<elision1>
7175	6469	.	υ
7175	6513	H	υ
7175	6469	.	u
7175	6515	H	u
7175	6928	H	κ
7175	6423	H	k
7175	6436	H	U
7175	6439	H	K
7175	6469	.	α
7175	6499	H	α
7175	6469	.	a
7175	6504	H	a
7175	6266	H	A
7175	6905	H	λ
7175	6853	H	l
7175	6858	H	L
7175	7179	<K>	<>
7176	142	.	.
7176	146	 	 
7176	142	<~>	<~>
7176	142	<split-s>	<split-s>
7176	142	<split-h>	<split-h>
7176	142	<name2>	<name2>
7176	149	<aphaerese>	<aphaerese>
7176	7174	<>	<aphaerese>
7176	142	<elision3>	<elision3>
7176	7174	<>	<elision3>
7176	142	<elision2>	<elision2>
7176	7174	<>	<elision2>
7176	142	<elision1>	<elision1>
7176	7174	<>	<elision1>
7176	6471	.	υ
7176	6508	H	υ
7176	6471	.	u
7176	6512	H	u
7176	6885	H	κ
7176	6464	H	k
7176	6438	H	U
7176	6468	H	K
7176	6471	.	α
7176	6498	H	α
7176	6471	.	a
7176	6503	H	a
7176	6269	H	A
7176	6904	H	λ
7176	6852	H	l
7176	6855	H	L
7176	7177	<K>	<>
7177	6521	.	.
7177	6521	<~>	<~>
7177	6521	<split-s>	<split-s>
7177	6521	<split-h>	<split-h>
7177	6521	<name2>	<name2>
7177	6524	<aphaerese>	<aphaerese>
7177	7178	<>	<aphaerese>
7177	6521	<elision3>	<elision3>
7177	7178	<>	<elision3>
7177	6521	<elision2>	<elision2>
7177	7178	<>	<elision2>
7177	6521	<elision1>	<elision1>
7177	7178	<>	<elision1>
7177	6517	.	υ
7177	6663	H	υ
7177	6517	.	u
7177	6672	H	u
7177	6915	H	κ
7177	6632	H	k
7177	6641	H	U
7177	6645	H	K
7177	6517	.	α
7177	6675	H	α
7177	6517	.	a
7177	6678	H	a
7177	6612	H	A
7177	6924	H	λ
7177	6659	H	l
7177	6654	H	L
7178	6519	.	.
7178	6519	<~>	<~>
7178	6519	<split-s>	<split-s>
7178	6519	<split-h>	<split-h>
7178	6519	<name2>	<name2>
7178	6522	<aphaerese>	<aphaerese>
7178	7179	<>	<aphaerese>
7178	6519	<elision3>	<elision3>
7178	7179	<>	<elision3>
7178	6519	<elision2>	<elision2>
7178	7179	<>	<elision2>
7178	6519	<elision1>	<elision1>
7178	7179	<>	<elision1>
7178	6518	.	υ
7178	6661	H	υ
7178	6518	.	u
7178	6670	H	u
7178	6913	H	κ
7178	6630	H	k
7178	6639	H	U
7178	6642	H	K
7178	6518	.	α
7178	6673	H	α
7178	6518	.	a
7178	6676	H	a
7178	6610	H	A
7178	6922	H	λ
7178	6657	H	l
7178	6660	H	L
7179	6519	.	.
7179	6519	<~>	<~>
7179	6519	<split-s>	<split-s>
7179	6519	<split-h>	<split-h>
7179	6519	<name2>	<name2>
7179	7177	<>	<name>
7179	6522	<aphaerese>	<aphaerese>
7179	7179	<>	<aphaerese>
7179	6519	<elision3>	<elision3>
7179	7179	<>	<elision3>
7179	6519	<elision2>	<elision2>
7179	7179	<>	<elision2>
7179	6519	<elision1>	<elision1>
7179	7179	<>	<elision1>
7179	6518	.	υ
7179	6661	H	υ
7179	6518	.	u
7179	6670	H	u
7179	6913	H	κ
7179	6630	H	k
7179	6639	H	U
7179	6642	H	K
7179	6518	.	α
7179	6673	H	α
7179	6518	.	a
7179	6676	H	a
7179	6610	H	A
7179	6922	H	λ
7179	6657	H	l
7179	6660	H	L
7180	7181	<name>	<name>
7180	7182	<K>	<>
7181	6468	H	k
7181	6453	H	l
7182	7071	<name>	<name>
7183	6695	.	.
7183	6695	 	 
7183	6695	<~>	<~>
7183	6695	<split-s>	<split-s>
7183	6695	<split-h>	<split-h>
7183	6695	<name2>	<name2>
7183	7069	<name2>	<name>
7183	7172	<>	<name>
7183	6698	<aphaerese>	<aphaerese>
7183	7171	<>	<aphaerese>
7183	6695	<elision3>	<elision3>
7183	7171	<>	<elision3>
7183	6695	<elision2>	<elision2>
7183	7171	<>	<elision2>
7183	6695	<elision1>	<elision1>
7183	7171	<>	<elision1>
7183	6859	.	υ
7183	6859	.	u
7183	6859	.	α
7183	6859	.	a
7183	7184	<4s>	<>
7184	143	.	.
7184	144	 	 
7184	143	<~>	<~>
7184	143	<split-s>	<split-s>
7184	143	<split-h>	<split-h>
7184	143	<name2>	<name2>
7184	7181	<name2>	<name>
7184	7176	<>	<name>
7184	147	<aphaerese>	<aphaerese>
7184	7175	<>	<aphaerese>
7184	143	<elision3>	<elision3>
7184	7175	<>	<elision3>
7184	143	<elision2>	<elision2>
7184	7175	<>	<elision2>
7184	143	<elision1>	<elision1>
7184	7175	<>	<elision1>
7184	6469	.	υ
7184	6513	H	υ
7184	6469	.	u
7184	6515	H	u
7184	6928	H	κ
7184	6423	H	k
7184	6436	H	U
7184	6439	H	K
7184	6469	.	α
7184	6499	H	α
7184	6469	.	a
7184	6504	H	a
7184	6266	H	A
7184	6905	H	λ
7184	6853	H	l
7184	6858	H	L
7184	7185	<K>	<>
7185	6519	.	.
7185	6519	<~>	<~>
7185	6519	<split-s>	<split-s>
7185	6519	<split-h>	<split-h>
7185	6519	<name2>	<name2>
7185	7071	<name2>	<name>
7185	7177	<>	<name>
7185	6522	<aphaerese>	<aphaerese>
7185	7179	<>	<aphaerese>
7185	6519	<elision3>	<elision3>
7185	7179	<>	<elision3>
7185	6519	<elision2>	<elision2>
7185	7179	<>	<elision2>
7185	6519	<elision1>	<elision1>
7185	7179	<>	<elision1>
7185	6518	.	υ
7185	6661	H	υ
7185	6518	.	u
7185	6670	H	u
7185	6913	H	κ
7185	6630	H	k
7185	6639	H	U
7185	6642	H	K
7185	6518	.	α
7185	6673	H	α
7185	6518	.	a
7185	6676	H	a
7185	6610	H	A
7185	6922	H	λ
7185	6657	H	l
7185	6660	H	L
7186	7187	<>	<name>
7186	7186	<>	<aphaerese>
7186	7186	<>	<elision3>
7186	7186	<>	<elision2>
7186	7186	<>	<elision1>
7186	6695	<A2kl>	<>
7187	7188	<>	<aphaerese>
7187	7188	<>	<elision3>
7187	7188	<>	<elision2>
7187	7188	<>	<elision1>
7187	6696	<A2kl>	<>
7188	7186	<>	<aphaerese>
7188	7186	<>	<elision3>
7188	7186	<>	<elision2>
7188	7186	<>	<elision1>
7188	6697	<A2kl>	<>
7189	7069	<name>	<name>
7189	7190	<>	<name>
7189	7192	<>	<aphaerese>
7189	7192	<>	<elision3>
7189	7192	<>	<elision2>
7189	7192	<>	<elision1>
7189	7180	<4s>	<>
7189	7075	<A2kl>	<>
7189	7202	<L2kl>	<>
7190	7191	<>	<aphaerese>
7190	7191	<>	<elision3>
7190	7191	<>	<elision2>
7190	7191	<>	<elision1>
7190	7076	<A2kl>	<>
7190	7194	<L2kl>	<>
7191	7192	<>	<aphaerese>
7191	7192	<>	<elision3>
7191	7192	<>	<elision2>
7191	7192	<>	<elision1>
7191	7077	<A2kl>	<>
7191	7195	<L2kl>	<>
7192	7190	<>	<name>
7192	7192	<>	<aphaerese>
7192	7192	<>	<elision3>
7192	7192	<>	<elision2>
7192	7192	<>	<elision1>
7192	7075	<A2kl>	<>
7192	7193	<L2kl>	<>
7193	6695	.	.
7193	6695	 	 
7193	6695	<~>	<~>
7193	6695	<split-s>	<split-s>
7193	6695	<split-h>	<split-h>
7193	6695	<name2>	<name2>
7193	7194	<>	<name>
7193	6698	<aphaerese>	<aphaerese>
7193	7193	<>	<aphaerese>
7193	6695	<elision3>	<elision3>
7193	7193	<>	<elision3>
7193	6695	<elision2>	<elision2>
7193	7193	<>	<elision2>
7193	6695	<elision1>	<elision1>
7193	7193	<>	<elision1>
7193	6859	.	υ
7193	6859	.	u
7193	7141	.	κ
7193	6859	.	α
7193	6859	.	a
7193	7141	.	λ
7193	7197	<4s>	<>
7194	6697	.	.
7194	6697	 	 
7194	6697	<~>	<~>
7194	6697	<split-s>	<split-s>
7194	6697	<split-h>	<split-h>
7194	6697	<name2>	<name2>
7194	6700	<aphaerese>	<aphaerese>
7194	7195	<>	<aphaerese>
7194	6697	<elision3>	<elision3>
7194	7195	<>	<elision3>
7194	6697	<elision2>	<elision2>
7194	7195	<>	<elision2>
7194	6697	<elision1>	<elision1>
7194	7195	<>	<elision1>
7194	6861	.	υ
7194	6861	.	u
7194	7143	.	κ
7194	6861	.	α
7194	6861	.	a
7194	7143	.	λ
7194	7198	<4s>	<>
7195	6695	.	.
7195	6695	 	 
7195	6695	<~>	<~>
7195	6695	<split-s>	<split-s>
7195	6695	<split-h>	<split-h>
7195	6695	<name2>	<name2>
7195	6698	<aphaerese>	<aphaerese>
7195	7193	<>	<aphaerese>
7195	6695	<elision3>	<elision3>
7195	7193	<>	<elision3>
7195	6695	<elision2>	<elision2>
7195	7193	<>	<elision2>
7195	6695	<elision1>	<elision1>
7195	7193	<>	<elision1>
7195	6859	.	υ
7195	6859	.	u
7195	7141	.	κ
7195	6859	.	α
7195	6859	.	a
7195	7141	.	λ
7195	7196	<4s>	<>
7196	143	.	.
7196	144	 	 
7196	143	<~>	<~>
7196	143	<split-s>	<split-s>
7196	143	<split-h>	<split-h>
7196	143	<name2>	<name2>
7196	147	<aphaerese>	<aphaerese>
7196	7197	<>	<aphaerese>
7196	143	<elision3>	<elision3>
7196	7197	<>	<elision3>
7196	143	<elision2>	<elision2>
7196	7197	<>	<elision2>
7196	143	<elision1>	<elision1>
7196	7197	<>	<elision1>
7196	6469	.	υ
7196	6513	H	υ
7196	6469	.	u
7196	6515	H	u
7196	7166	.	κ
7196	6928	H	κ
7196	6423	H	k
7196	6436	H	U
7196	6439	H	K
7196	6469	.	α
7196	6499	H	α
7196	6469	.	a
7196	6504	H	a
7196	6266	H	A
7196	7166	.	λ
7196	6905	H	λ
7196	6853	H	l
7196	6858	H	L
7196	7200	<K>	<>
7197	143	.	.
7197	144	 	 
7197	143	<~>	<~>
7197	143	<split-s>	<split-s>
7197	143	<split-h>	<split-h>
7197	143	<name2>	<name2>
7197	7198	<>	<name>
7197	147	<aphaerese>	<aphaerese>
7197	7197	<>	<aphaerese>
7197	143	<elision3>	<elision3>
7197	7197	<>	<elision3>
7197	143	<elision2>	<elision2>
7197	7197	<>	<elision2>
7197	143	<elision1>	<elision1>
7197	7197	<>	<elision1>
7197	6469	.	υ
7197	6513	H	υ
7197	6469	.	u
7197	6515	H	u
7197	7166	.	κ
7197	6928	H	κ
7197	6423	H	k
7197	6436	H	U
7197	6439	H	K
7197	6469	.	α
7197	6499	H	α
7197	6469	.	a
7197	6504	H	a
7197	6266	H	A
7197	7166	.	λ
7197	6905	H	λ
7197	6853	H	l
7197	6858	H	L
7197	7201	<K>	<>
7198	142	.	.
7198	146	 	 
7198	142	<~>	<~>
7198	142	<split-s>	<split-s>
7198	142	<split-h>	<split-h>
7198	142	<name2>	<name2>
7198	149	<aphaerese>	<aphaerese>
7198	7196	<>	<aphaerese>
7198	142	<elision3>	<elision3>
7198	7196	<>	<elision3>
7198	142	<elision2>	<elision2>
7198	7196	<>	<elision2>
7198	142	<elision1>	<elision1>
7198	7196	<>	<elision1>
7198	6471	.	υ
7198	6508	H	υ
7198	6471	.	u
7198	6512	H	u
7198	7165	.	κ
7198	6885	H	κ
7198	6464	H	k
7198	6438	H	U
7198	6468	H	K
7198	6471	.	α
7198	6498	H	α
7198	6471	.	a
7198	6503	H	a
7198	6269	H	A
7198	7165	.	λ
7198	6904	H	λ
7198	6852	H	l
7198	6855	H	L
7198	7199	<K>	<>
7199	6521	.	.
7199	6521	<~>	<~>
7199	6521	<split-s>	<split-s>
7199	6521	<split-h>	<split-h>
7199	6521	<name2>	<name2>
7199	6524	<aphaerese>	<aphaerese>
7199	7200	<>	<aphaerese>
7199	6521	<elision3>	<elision3>
7199	7200	<>	<elision3>
7199	6521	<elision2>	<elision2>
7199	7200	<>	<elision2>
7199	6521	<elision1>	<elision1>
7199	7200	<>	<elision1>
7199	6517	.	υ
7199	6663	H	υ
7199	6517	.	u
7199	6672	H	u
7199	7160	.	κ
7199	6915	H	κ
7199	6632	H	k
7199	6641	H	U
7199	6645	H	K
7199	6517	.	α
7199	6675	H	α
7199	6517	.	a
7199	6678	H	a
7199	6612	H	A
7199	7160	.	λ
7199	6924	H	λ
7199	6659	H	l
7199	6654	H	L
7200	6519	.	.
7200	6519	<~>	<~>
7200	6519	<split-s>	<split-s>
7200	6519	<split-h>	<split-h>
7200	6519	<name2>	<name2>
7200	6522	<aphaerese>	<aphaerese>
7200	7201	<>	<aphaerese>
7200	6519	<elision3>	<elision3>
7200	7201	<>	<elision3>
7200	6519	<elision2>	<elision2>
7200	7201	<>	<elision2>
7200	6519	<elision1>	<elision1>
7200	7201	<>	<elision1>
7200	6518	.	υ
7200	6661	H	υ
7200	6518	.	u
7200	6670	H	u
7200	7161	.	κ
7200	6913	H	κ
7200	6630	H	k
7200	6639	H	U
7200	6642	H	K
7200	6518	.	α
7200	6673	H	α
7200	6518	.	a
7200	6676	H	a
7200	6610	H	A
7200	7161	.	λ
7200	6922	H	λ
7200	6657	H	l
7200	6660	H	L
7201	6519	.	.
7201	6519	<~>	<~>
7201	6519	<split-s>	<split-s>
7201	6519	<split-h>	<split-h>
7201	6519	<name2>	<name2>
7201	7199	<>	<name>
7201	6522	<aphaerese>	<aphaerese>
7201	7201	<>	<aphaerese>
7201	6519	<elision3>	<elision3>
7201	7201	<>	<elision3>
7201	6519	<elision2>	<elision2>
7201	7201	<>	<elision2>
7201	6519	<elision1>	<elision1>
7201	7201	<>	<elision1>
7201	6518	.	υ
7201	6661	H	υ
7201	6518	.	u
7201	6670	H	u
7201	7161	.	κ
7201	6913	H	κ
7201	6630	H	k
7201	6639	H	U
7201	6642	H	K
7201	6518	.	α
7201	6673	H	α
7201	6518	.	a
7201	6676	H	a
7201	6610	H	A
7201	7161	.	λ
7201	6922	H	λ
7201	6657	H	l
7201	6660	H	L
7202	6695	.	.
7202	6695	 	 
7202	6695	<~>	<~>
7202	6695	<split-s>	<split-s>
7202	6695	<split-h>	<split-h>
7202	6695	<name2>	<name2>
7202	7069	<name2>	<name>
7202	7194	<>	<name>
7202	6698	<aphaerese>	<aphaerese>
7202	7193	<>	<aphaerese>
7202	6695	<elision3>	<elision3>
7202	7193	<>	<elision3>
7202	6695	<elision2>	<elision2>
7202	7193	<>	<elision2>
7202	6695	<elision1>	<elision1>
7202	7193	<>	<elision1>
7202	6859	.	υ
7202	6859	.	u
7202	7141	.	κ
7202	6859	.	α
7202	6859	.	a
7202	7141	.	λ
7202	7203	<4s>	<>
7203	143	.	.
7203	144	 	 
7203	143	<~>	<~>
7203	143	<split-s>	<split-s>
7203	143	<split-h>	<split-h>
7203	143	<name2>	<name2>
7203	7181	<name2>	<name>
7203	7198	<>	<name>
7203	147	<aphaerese>	<aphaerese>
7203	7197	<>	<aphaerese>
7203	143	<elision3>	<elision3>
7203	7197	<>	<elision3>
7203	143	<elision2>	<elision2>
7203	7197	<>	<elision2>
7203	143	<elision1>	<elision1>
7203	7197	<>	<elision1>
7203	6469	.	υ
7203	6513	H	υ
7203	6469	.	u
7203	6515	H	u
7203	7166	.	κ
7203	6928	H	κ
7203	6423	H	k
7203	6436	H	U
7203	6439	H	K
7203	6469	.	α
7203	6499	H	α
7203	6469	.	a
7203	6504	H	a
7203	6266	H	A
7203	7166	.	λ
7203	6905	H	λ
7203	6853	H	l
7203	6858	H	L
7203	7204	<K>	<>
7204	6519	.	.
7204	6519	<~>	<~>
7204	6519	<split-s>	<split-s>
7204	6519	<split-h>	<split-h>
7204	6519	<name2>	<name2>
7204	7071	<name2>	<name>
7204	7199	<>	<name>
7204	6522	<aphaerese>	<aphaerese>
7204	7201	<>	<aphaerese>
7204	6519	<elision3>	<elision3>
7204	7201	<>	<elision3>
7204	6519	<elision2>	<elision2>
7204	7201	<>	<elision2>
7204	6519	<elision1>	<elision1>
7204	7201	<>	<elision1>
7204	6518	.	υ
7204	6661	H	υ
7204	6518	.	u
7204	6670	H	u
7204	7161	.	κ
7204	6913	H	κ
7204	6630	H	k
7204	6639	H	U
7204	6642	H	K
7204	6518	.	α
7204	6673	H	α
7204	6518	.	a
7204	6676	H	a
7204	6610	H	A
7204	7161	.	λ
7204	6922	H	λ
7204	6657	H	l
7204	6660	H	L
7205	7206	<>	<name>
7205	7205	<>	<aphaerese>
7205	7205	<>	<elision3>
7205	7205	<>	<elision2>
7205	7205	<>	<elision1>
7205	6863	<3s>	<>
7206	7207	<>	<aphaerese>
7206	7207	<>	<elision3>
7206	7207	<>	<elision2>
7206	7207	<>	<elision1>
7206	6864	<3s>	<>
7207	7205	<>	<aphaerese>
7207	7205	<>	<elision3>
7207	7205	<>	<elision2>
7207	7205	<>	<elision1>
7207	6862	<3s>	<>
7208	6695	.	.
7208	6695	 	 
7208	6695	<~>	<~>
7208	6695	<split-s>	<split-s>
7208	6695	<split-h>	<split-h>
7208	6695	<name2>	<name2>
7208	6865	<>	<name>
7208	6698	<aphaerese>	<aphaerese>
7208	6694	<>	<aphaerese>
7208	6694	<>	<elision3>
7208	6694	<>	<elision2>
7208	6694	<>	<elision1>
7208	6859	.	υ
7208	6859	.	u
7208	6701	.	κ
7208	6859	.	α
7208	6859	.	a
7208	7209	<4s>	<>
7209	143	.	.
7209	144	 	 
7209	143	<~>	<~>
7209	143	<split-s>	<split-s>
7209	143	<split-h>	<split-h>
7209	143	<name2>	<name2>
7209	6869	<>	<name>
7209	147	<aphaerese>	<aphaerese>
7209	6868	<>	<aphaerese>
7209	6868	<>	<elision3>
7209	6868	<>	<elision2>
7209	6868	<>	<elision1>
7209	6469	.	υ
7209	6469	.	u
7209	150	.	κ
7209	6436	H	U
7209	6439	H	K
7209	6469	.	α
7209	6469	.	a
7209	6266	H	A
7209	6858	H	L
7209	7210	<K>	<>
7210	6519	.	.
7210	6519	<~>	<~>
7210	6519	<split-s>	<split-s>
7210	6519	<split-h>	<split-h>
7210	6519	<name2>	<name2>
7210	6870	<>	<name>
7210	6522	<aphaerese>	<aphaerese>
7210	6872	<>	<aphaerese>
7210	6872	<>	<elision3>
7210	6872	<>	<elision2>
7210	6872	<>	<elision1>
7210	6518	.	υ
7210	6518	.	u
7210	6525	.	κ
7210	6639	H	U
7210	6642	H	K
7210	6518	.	α
7210	6518	.	a
7210	6610	H	A
7210	6660	H	L
7211	6695	.	.
7211	6695	 	 
7211	6695	<~>	<~>
7211	6695	<split-s>	<split-s>
7211	6695	<split-h>	<split-h>
7211	6695	<name2>	<name2>
7211	6945	<>	<name>
7211	6698	<aphaerese>	<aphaerese>
7211	6944	<>	<aphaerese>
7211	6947	<elision3>	<elision3>
7211	6944	<>	<elision3>
7211	6947	<elision2>	<elision2>
7211	6944	<>	<elision2>
7211	6947	<elision1>	<elision1>
7211	6944	<>	<elision1>
7211	6859	.	υ
7211	6859	.	u
7211	6859	.	κ
7211	6859	.	α
7211	6859	.	a
7211	6859	.	λ
7211	7212	<4s>	<>
7212	143	.	.
7212	144	 	 
7212	143	<~>	<~>
7212	143	<split-s>	<split-s>
7212	143	<split-h>	<split-h>
7212	143	<name2>	<name2>
7212	7049	<>	<name>
7212	147	<aphaerese>	<aphaerese>
7212	7048	<>	<aphaerese>
7212	7051	<elision3>	<elision3>
7212	7048	<>	<elision3>
7212	7051	<elision2>	<elision2>
7212	7048	<>	<elision2>
7212	7051	<elision1>	<elision1>
7212	7048	<>	<elision1>
7212	6469	.	υ
7212	6469	.	u
7212	6469	.	κ
7212	6436	H	U
7212	6439	H	K
7212	6469	.	α
7212	6469	.	a
7212	6266	H	A
7212	6469	.	λ
7212	6858	H	L
7212	7213	<K>	<>
7213	6519	.	.
7213	6519	<~>	<~>
7213	6519	<split-s>	<split-s>
7213	6519	<split-h>	<split-h>
7213	6519	<name2>	<name2>
7213	7053	<>	<name>
7213	6522	<aphaerese>	<aphaerese>
7213	7055	<>	<aphaerese>
7213	7000	<elision3>	<elision3>
7213	7055	<>	<elision3>
7213	7000	<elision2>	<elision2>
7213	7055	<>	<elision2>
7213	7000	<elision1>	<elision1>
7213	7055	<>	<elision1>
7213	6518	.	υ
7213	6518	.	u
7213	6518	.	κ
7213	6639	H	U
7213	6642	H	K
7213	6518	.	α
7213	6518	.	a
7213	6610	H	A
7213	6518	.	λ
7213	6660	H	L
7214	6695	.	.
7214	6695	 	 
7214	6695	<~>	<~>
7214	6695	<split-s>	<split-s>
7214	6695	<split-h>	<split-h>
7214	6695	<name2>	<name2>
7214	7057	<>	<name>
7214	6698	<aphaerese>	<aphaerese>
7214	7056	<>	<aphaerese>
7214	6695	<elision3>	<elision3>
7214	7056	<>	<elision3>
7214	6695	<elision2>	<elision2>
7214	7056	<>	<elision2>
7214	6695	<elision1>	<elision1>
7214	7056	<>	<elision1>
7214	6859	.	υ
7214	6859	.	u
7214	6859	.	κ
7214	6859	.	α
7214	6859	.	a
7214	6859	.	λ
7214	7215	<4s>	<>
7215	143	.	.
7215	144	 	 
7215	143	<~>	<~>
7215	143	<split-s>	<split-s>
7215	143	<split-h>	<split-h>
7215	143	<name2>	<name2>
7215	7061	<>	<name>
7215	147	<aphaerese>	<aphaerese>
7215	7060	<>	<aphaerese>
7215	143	<elision3>	<elision3>
7215	7060	<>	<elision3>
7215	143	<elision2>	<elision2>
7215	7060	<>	<elision2>
7215	143	<elision1>	<elision1>
7215	7060	<>	<elision1>
7215	6469	.	υ
7215	6469	.	u
7215	6469	.	κ
7215	6436	H	U
7215	6439	H	K
7215	6469	.	α
7215	6469	.	a
7215	6266	H	A
7215	6469	.	λ
7215	6858	H	L
7215	7216	<K>	<>
7216	6519	.	.
7216	6519	<~>	<~>
7216	6519	<split-s>	<split-s>
7216	6519	<split-h>	<split-h>
7216	6519	<name2>	<name2>
7216	7062	<>	<name>
7216	6522	<aphaerese>	<aphaerese>
7216	7064	<>	<aphaerese>
7216	6519	<elision3>	<elision3>
7216	7064	<>	<elision3>
7216	6519	<elision2>	<elision2>
7216	7064	<>	<elision2>
7216	6519	<elision1>	<elision1>
7216	7064	<>	<elision1>
7216	6518	.	υ
7216	6518	.	u
7216	6518	.	κ
7216	6639	H	U
7216	6642	H	K
7216	6518	.	α
7216	6518	.	a
7216	6610	H	A
7216	6518	.	λ
7216	6660	H	L
7217	7066	<>	<name>
7217	7065	<>	<aphaerese>
7217	7065	<>	<elision3>
7217	7065	<>	<elision2>
7217	7065	<>	<elision1>
7217	7218	<U2kl>	<>
7218	6695	.	.
7218	6695	 	 
7218	6695	<~>	<~>
7218	6695	<split-s>	<split-s>
7218	6695	<split-h>	<split-h>
7218	6695	<name2>	<name2>
7218	6696	<>	<name>
7218	6698	<aphaerese>	<aphaerese>
7218	6695	<>	<aphaerese>
7218	6695	<elision3>	<elision3>
7218	6695	<>	<elision3>
7218	6695	<elision2>	<elision2>
7218	6695	<>	<elision2>
7218	6695	<elision1>	<elision1>
7218	6695	<>	<elision1>
7218	6859	.	υ
7218	6859	.	u
7218	6701	.	κ
7218	6859	.	α
7218	6859	.	a
7218	7219	<4s>	<>
7219	143	.	.
7219	144	 	 
7219	143	<~>	<~>
7219	143	<split-s>	<split-s>
7219	143	<split-h>	<split-h>
7219	143	<name2>	<name2>
7219	6864	<>	<name>
7219	147	<aphaerese>	<aphaerese>
7219	6863	<>	<aphaerese>
7219	143	<elision3>	<elision3>
7219	6863	<>	<elision3>
7219	143	<elision2>	<elision2>
7219	6863	<>	<elision2>
7219	143	<elision1>	<elision1>
7219	6863	<>	<elision1>
7219	6469	.	υ
7219	6469	.	u
7219	150	.	κ
7219	6436	H	U
7219	6439	H	K
7219	6469	.	α
7219	6469	.	a
7219	6266	H	A
7219	6858	H	L
7219	7220	<K>	<>
7220	6519	.	.
7220	6519	<~>	<~>
7220	6519	<split-s>	<split-s>
7220	6519	<split-h>	<split-h>
7220	6519	<name2>	<name2>
7220	6520	<>	<name>
7220	6522	<aphaerese>	<aphaerese>
7220	6519	<>	<aphaerese>
7220	6519	<elision3>	<elision3>
7220	6519	<>	<elision3>
7220	6519	<elision2>	<elision2>
7220	6519	<>	<elision2>
7220	6519	<elision1>	<elision1>
7220	6519	<>	<elision1>
7220	6518	.	υ
7220	6518	.	u
7220	6525	.	κ
7220	6639	H	U
7220	6642	H	K
7220	6518	.	α
7220	6518	.	a
7220	6610	H	A
7220	6660	H	L
7221	7069	<name>	<name>
7221	7072	<>	<name>
7221	7074	<>	<aphaerese>
7221	7074	<>	<elision3>
7221	7074	<>	<elision2>
7221	7074	<>	<elision1>
7221	7180	<4s>	<>
7221	7075	<A2kl>	<>
7221	7138	<L2kl>	<>
7221	7222	<K2kl>	<>
7222	6695	.	.
7222	6695	 	 
7222	6695	<~>	<~>
7222	6695	<split-s>	<split-s>
7222	6695	<split-h>	<split-h>
7222	6695	<name2>	<name2>
7222	7069	<name2>	<name>
7222	7172	<>	<name>
7222	6698	<aphaerese>	<aphaerese>
7222	7171	<>	<aphaerese>
7222	6695	<elision3>	<elision3>
7222	7171	<>	<elision3>
7222	6695	<elision2>	<elision2>
7222	7171	<>	<elision2>
7222	6695	<elision1>	<elision1>
7222	7171	<>	<elision1>
7222	6859	.	υ
7222	6859	.	u
7222	6859	.	α
7222	6859	.	a
7222	7223	<4s>	<>
7223	143	.	.
7223	144	 	 
7223	143	<~>	<~>
7223	143	<split-s>	<split-s>
7223	143	<split-h>	<split-h>
7223	143	<name2>	<name2>
7223	7181	<name2>	<name>
7223	7176	<>	<name>
7223	147	<aphaerese>	<aphaerese>
7223	7175	<>	<aphaerese>
7223	143	<elision3>	<elision3>
7223	7175	<>	<elision3>
7223	143	<elision2>	<elision2>
7223	7175	<>	<elision2>
7223	143	<elision1>	<elision1>
7223	7175	<>	<elision1>
7223	6469	.	υ
7223	6469	.	u
7223	6436	H	U
7223	6439	H	K
7223	6469	.	α
7223	6469	.	a
7223	6266	H	A
7223	6858	H	L
7223	7224	<K>	<>
7224	6519	.	.
7224	6519	<~>	<~>
7224	6519	<split-s>	<split-s>
7224	6519	<split-h>	<split-h>
7224	6519	<name2>	<name2>
7224	7071	<name2>	<name>
7224	7177	<>	<name>
7224	6522	<aphaerese>	<aphaerese>
7224	7179	<>	<aphaerese>
7224	6519	<elision3>	<elision3>
7224	7179	<>	<elision3>
7224	6519	<elision2>	<elision2>
7224	7179	<>	<elision2>
7224	6519	<elision1>	<elision1>
7224	7179	<>	<elision1>
7224	6518	.	υ
7224	6518	.	u
7224	6639	H	U
7224	6642	H	K
7224	6518	.	α
7224	6518	.	a
7224	6610	H	A
7224	6660	H	L
7225	7187	<>	<name>
7225	7186	<>	<aphaerese>
7225	7186	<>	<elision3>
7225	7186	<>	<elision2>
7225	7186	<>	<elision1>
7225	7218	<A2kl>	<>
7226	7069	<name>	<name>
7226	7190	<>	<name>
7226	7192	<>	<aphaerese>
7226	7192	<>	<elision3>
7226	7192	<>	<elision2>
7226	7192	<>	<elision1>
7226	7180	<4s>	<>
7226	7075	<A2kl>	<>
7226	7227	<L2kl>	<>
7227	6695	.	.
7227	6695	 	 
7227	6695	<~>	<~>
7227	6695	<split-s>	<split-s>
7227	6695	<split-h>	<split-h>
7227	6695	<name2>	<name2>
7227	7069	<name2>	<name>
7227	7194	<>	<name>
7227	6698	<aphaerese>	<aphaerese>
7227	7193	<>	<aphaerese>
7227	6695	<elision3>	<elision3>
7227	7193	<>	<elision3>
7227	6695	<elision2>	<elision2>
7227	7193	<>	<elision2>
7227	6695	<elision1>	<elision1>
7227	7193	<>	<elision1>
7227	6859	.	υ
7227	6859	.	u
7227	7141	.	κ
7227	6859	.	α
7227	6859	.	a
7227	7141	.	λ
7227	7228	<4s>	<>
7228	143	.	.
7228	144	 	 
7228	143	<~>	<~>
7228	143	<split-s>	<split-s>
7228	143	<split-h>	<split-h>
7228	143	<name2>	<name2>
7228	7181	<name2>	<name>
7228	7198	<>	<name>
7228	147	<aphaerese>	<aphaerese>
7228	7197	<>	<aphaerese>
7228	143	<elision3>	<elision3>
7228	7197	<>	<elision3>
7228	143	<elision2>	<elision2>
7228	7197	<>	<elision2>
7228	143	<elision1>	<elision1>
7228	7197	<>	<elision1>
7228	6469	.	υ
7228	6469	.	u
7228	7166	.	κ
7228	6436	H	U
7228	6439	H	K
7228	6469	.	α
7228	6469	.	a
7228	6266	H	A
7228	7166	.	λ
7228	6858	H	L
7228	7229	<K>	<>
7229	6519	.	.
7229	6519	<~>	<~>
7229	6519	<split-s>	<split-s>
7229	6519	<split-h>	<split-h>
7229	6519	<name2>	<name2>
7229	7071	<name2>	<name>
7229	7199	<>	<name>
7229	6522	<aphaerese>	<aphaerese>
7229	7201	<>	<aphaerese>
7229	6519	<elision3>	<elision3>
7229	7201	<>	<elision3>
7229	6519	<elision2>	<elision2>
7229	7201	<>	<elision2>
7229	6519	<elision1>	<elision1>
7229	7201	<>	<elision1>
7229	6518	.	υ
7229	6518	.	u
7229	7161	.	κ
7229	6639	H	U
7229	6642	H	K
7229	6518	.	α
7229	6518	.	a
7229	6610	H	A
7229	7161	.	λ
7229	6660	H	L
7230	6680	.	.
7230	6681	 	 
7230	6680	<~>	<~>
7230	6680	<split-s>	<split-s>
7230	6680	<split-h>	<split-h>
7230	6680	<name2>	<name2>
7230	6684	<aphaerese>	<aphaerese>
7230	6684	<>	<aphaerese>
7230	6680	<elision3>	<elision3>
7230	6684	<>	<elision3>
7230	6680	<elision2>	<elision2>
7230	6684	<>	<elision2>
7230	6680	<elision1>	<elision1>
7230	6684	<>	<elision1>
7230	6680	.	υ
7230	6680	.	u
7230	6873	.	κ
7230	6944	s	κ
7230	7056	s	k
7230	7065	s	U
7230	7231	s	K
7230	6680	.	α
7230	6680	.	a
7230	7186	s	A
7230	7056	s	λ
7230	7056	s	l
7230	7244	s	L
7230	7251	<split-h>	<>
7231	7069	<name>	<name>
7231	7232	<>	<name>
7231	7234	<>	<aphaerese>
7231	7234	<>	<elision3>
7231	7234	<>	<elision2>
7231	7234	<>	<elision1>
7231	7180	<4s>	<>
7231	7235	<L2kl>	<>
7231	7183	<K2kl>	<>
7232	7233	<>	<aphaerese>
7232	7233	<>	<elision3>
7232	7233	<>	<elision2>
7232	7233	<>	<elision1>
7232	7236	<L2kl>	<>
7232	7172	<K2kl>	<>
7233	7234	<>	<aphaerese>
7233	7234	<>	<elision3>
7233	7234	<>	<elision2>
7233	7234	<>	<elision1>
7233	7237	<L2kl>	<>
7233	7173	<K2kl>	<>
7234	7232	<>	<name>
7234	7234	<>	<aphaerese>
7234	7234	<>	<elision3>
7234	7234	<>	<elision2>
7234	7234	<>	<elision1>
7234	7235	<L2kl>	<>
7234	7171	<K2kl>	<>
7235	7236	<>	<name>
7235	7235	<>	<aphaerese>
7235	7235	<>	<elision3>
7235	7235	<>	<elision2>
7235	7235	<>	<elision1>
7235	6859	.	κ
7235	6859	.	λ
7235	7239	<4s>	<>
7236	7237	<>	<aphaerese>
7236	7237	<>	<elision3>
7236	7237	<>	<elision2>
7236	7237	<>	<elision1>
7236	6861	.	κ
7236	6861	.	λ
7236	7240	<4s>	<>
7237	7235	<>	<aphaerese>
7237	7235	<>	<elision3>
7237	7235	<>	<elision2>
7237	7235	<>	<elision1>
7237	6859	.	κ
7237	6859	.	λ
7237	7238	<4s>	<>
7238	7239	<>	<aphaerese>
7238	7239	<>	<elision3>
7238	7239	<>	<elision2>
7238	7239	<>	<elision1>
7238	6469	.	κ
7238	6469	.	λ
7238	7242	<K>	<>
7239	7240	<>	<name>
7239	7239	<>	<aphaerese>
7239	7239	<>	<elision3>
7239	7239	<>	<elision2>
7239	7239	<>	<elision1>
7239	6469	.	κ
7239	6469	.	λ
7239	7243	<K>	<>
7240	7238	<>	<aphaerese>
7240	7238	<>	<elision3>
7240	7238	<>	<elision2>
7240	7238	<>	<elision1>
7240	6471	.	κ
7240	6471	.	λ
7240	7241	<K>	<>
7241	7242	<>	<aphaerese>
7241	7242	<>	<elision3>
7241	7242	<>	<elision2>
7241	7242	<>	<elision1>
7241	6517	.	κ
7241	6517	.	λ
7242	7243	<>	<aphaerese>
7242	7243	<>	<elision3>
7242	7243	<>	<elision2>
7242	7243	<>	<elision1>
7242	6518	.	κ
7242	6518	.	λ
7243	7241	<>	<name>
7243	7243	<>	<aphaerese>
7243	7243	<>	<elision3>
7243	7243	<>	<elision2>
7243	7243	<>	<elision1>
7243	6518	.	κ
7243	6518	.	λ
7244	7069	<name>	<name>
7244	7245	<>	<name>
7244	7247	<>	<aphaerese>
7244	7247	<>	<elision3>
7244	7247	<>	<elision2>
7244	7247	<>	<elision1>
7244	7180	<4s>	<>
7244	7248	<L2kl>	<>
7245	7246	<>	<aphaerese>
7245	7246	<>	<elision3>
7245	7246	<>	<elision2>
7245	7246	<>	<elision1>
7245	7057	<L2kl>	<>
7246	7247	<>	<aphaerese>
7246	7247	<>	<elision3>
7246	7247	<>	<elision2>
7246	7247	<>	<elision1>
7246	7058	<L2kl>	<>
7247	7245	<>	<name>
7247	7247	<>	<aphaerese>
7247	7247	<>	<elision3>
7247	7247	<>	<elision2>
7247	7247	<>	<elision1>
7247	7056	<L2kl>	<>
7248	6695	.	.
7248	6695	 	 
7248	6695	<~>	<~>
7248	6695	<split-s>	<split-s>
7248	6695	<split-h>	<split-h>
7248	6695	<name2>	<name2>
7248	7069	<name2>	<name>
7248	7057	<>	<name>
7248	6698	<aphaerese>	<aphaerese>
7248	7056	<>	<aphaerese>
7248	6695	<elision3>	<elision3>
7248	7056	<>	<elision3>
7248	6695	<elision2>	<elision2>
7248	7056	<>	<elision2>
7248	6695	<elision1>	<elision1>
7248	7056	<>	<elision1>
7248	6859	.	υ
7248	6859	.	u
7248	6859	.	κ
7248	6859	.	α
7248	6859	.	a
7248	6859	.	λ
7248	7249	<4s>	<>
7249	143	.	.
7249	144	 	 
7249	143	<~>	<~>
7249	143	<split-s>	<split-s>
7249	143	<split-h>	<split-h>
7249	143	<name2>	<name2>
7249	7181	<name2>	<name>
7249	7061	<>	<name>
7249	147	<aphaerese>	<aphaerese>
7249	7060	<>	<aphaerese>
7249	143	<elision3>	<elision3>
7249	7060	<>	<elision3>
7249	143	<elision2>	<elision2>
7249	7060	<>	<elision2>
7249	143	<elision1>	<elision1>
7249	7060	<>	<elision1>
7249	6469	.	υ
7249	6513	H	υ
7249	6469	.	u
7249	6515	H	u
7249	6469	.	κ
7249	6928	H	κ
7249	6423	H	k
7249	6436	H	U
7249	6439	H	K
7249	6469	.	α
7249	6499	H	α
7249	6469	.	a
7249	6504	H	a
7249	6266	H	A
7249	6469	.	λ
7249	6905	H	λ
7249	6853	H	l
7249	6858	H	L
7249	7250	<K>	<>
7250	6519	.	.
7250	6519	<~>	<~>
7250	6519	<split-s>	<split-s>
7250	6519	<split-h>	<split-h>
7250	6519	<name2>	<name2>
7250	7071	<name2>	<name>
7250	7062	<>	<name>
7250	6522	<aphaerese>	<aphaerese>
7250	7064	<>	<aphaerese>
7250	6519	<elision3>	<elision3>
7250	7064	<>	<elision3>
7250	6519	<elision2>	<elision2>
7250	7064	<>	<elision2>
7250	6519	<elision1>	<elision1>
7250	7064	<>	<elision1>
7250	6518	.	υ
7250	6661	H	υ
7250	6518	.	u
7250	6670	H	u
7250	6518	.	κ
7250	6913	H	κ
7250	6630	H	k
7250	6639	H	U
7250	6642	H	K
7250	6518	.	α
7250	6673	H	α
7250	6518	.	a
7250	6676	H	a
7250	6610	H	A
7250	6518	.	λ
7250	6922	H	λ
7250	6657	H	l
7250	6660	H	L
7251	7252	<>	<aphaerese>
7251	7252	<>	<elision3>
7251	7252	<>	<elision2>
7251	7252	<>	<elision1>
7251	6849	<3s>	<>
7252	7253	<>	<name>
7252	7252	<>	<aphaerese>
7252	7252	<>	<elision3>
7252	7252	<>	<elision2>
7252	7252	<>	<elision1>
7252	6850	<3s>	<>
7253	7251	<>	<aphaerese>
7253	7251	<>	<elision3>
7253	7251	<>	<elision2>
7253	7251	<>	<elision1>
7253	6851	<3s>	<>
7254	6680	.	.
7254	6681	 	 
7254	6680	<~>	<~>
7254	6680	<split-s>	<split-s>
7254	6680	<split-h>	<split-h>
7254	6680	<name2>	<name2>
7254	6684	<aphaerese>	<aphaerese>
7254	6687	<>	<aphaerese>
7254	6680	<elision3>	<elision3>
7254	6687	<>	<elision3>
7254	6680	<elision2>	<elision2>
7254	6687	<>	<elision2>
7254	6680	<elision1>	<elision1>
7254	6687	<>	<elision1>
7254	6688	.	υ
7254	6694	s	υ
7254	6688	.	u
7254	6694	s	u
7254	6873	.	κ
7254	6944	s	κ
7254	7056	s	k
7254	7065	s	U
7254	7068	s	K
7254	6688	.	α
7254	6694	s	α
7254	6688	.	a
7254	6694	s	a
7254	7186	s	A
7254	7056	s	λ
7254	7056	s	l
7254	7189	s	L
7254	7207	<split-h>	<>
7255	6683	.	.
7255	6686	 	 
7255	6683	<~>	<~>
7255	6683	<split-s>	<split-s>
7255	6683	<split-h>	<split-h>
7255	6683	<name2>	<name2>
7255	7230	<aphaerese>	<aphaerese>
7255	6683	<>	<aphaerese>
7255	6683	<elision3>	<elision3>
7255	6683	<>	<elision3>
7255	6683	<elision2>	<elision2>
7255	6683	<>	<elision2>
7255	6683	<elision1>	<elision1>
7255	6683	<>	<elision1>
7255	6690	.	υ
7255	6866	s	υ
7255	6690	.	u
7255	6866	s	u
7255	6875	.	κ
7255	6946	s	κ
7255	7058	s	k
7255	7067	s	U
7255	7233	s	K
7255	6690	.	α
7255	6866	s	α
7255	6690	.	a
7255	6866	s	a
7255	7188	s	A
7255	7058	s	λ
7255	7058	s	l
7255	7246	s	L
7255	7206	<split-h>	<>
7256	6683	.	.
7256	6686	 	 
7256	6683	<~>	<~>
7256	6683	<split-s>	<split-s>
7256	6683	<split-h>	<split-h>
7256	6683	<name2>	<name2>
7256	7230	<aphaerese>	<aphaerese>
7256	7257	<>	<aphaerese>
7256	7257	<>	<elision3>
7256	7257	<>	<elision2>
7256	7257	<>	<elision1>
7256	6690	.	υ
7256	6866	s	υ
7256	6690	.	u
7256	6866	s	u
7256	6875	.	κ
7256	6946	s	κ
7256	7058	s	k
7256	7067	s	U
7256	7233	s	K
7256	6690	.	α
7256	6866	s	α
7256	6690	.	a
7256	6866	s	a
7256	7188	s	A
7256	7058	s	λ
7256	7058	s	l
7256	7246	s	L
7256	7260	<split-h>	<>
7257	6680	.	.
7257	6681	 	 
7257	6680	<~>	<~>
7257	6680	<split-s>	<split-s>
7257	6680	<split-h>	<split-h>
7257	6680	<name2>	<name2>
7257	6684	<aphaerese>	<aphaerese>
7257	6679	<>	<aphaerese>
7257	6679	<>	<elision3>
7257	6679	<>	<elision2>
7257	6679	<>	<elision1>
7257	6688	.	υ
7257	6694	s	υ
7257	6688	.	u
7257	6694	s	u
7257	6873	.	κ
7257	6944	s	κ
7257	7056	s	k
7257	7065	s	U
7257	7231	s	K
7257	6688	.	α
7257	6694	s	α
7257	6688	.	a
7257	6694	s	a
7257	7186	s	A
7257	7056	s	λ
7257	7056	s	l
7257	7244	s	L
7257	7258	<split-h>	<>
7258	7259	<>	<aphaerese>
7258	7259	<>	<elision3>
7258	7259	<>	<elision2>
7258	7259	<>	<elision1>
7258	6867	<3s>	<>
7259	7260	<>	<name>
7259	7259	<>	<aphaerese>
7259	7259	<>	<elision3>
7259	7259	<>	<elision2>
7259	7259	<>	<elision1>
7259	6868	<3s>	<>
7260	7258	<>	<aphaerese>
7260	7258	<>	<elision3>
7260	7258	<>	<elision2>
7260	7258	<>	<elision1>
7260	6869	<3s>	<>
7261	7262	<>	<name>
7261	7261	<>	<aphaerese>
7261	7264	<elision3>	<elision3>
7261	7261	<>	<elision3>
7261	7264	<elision2>	<elision2>
7261	7261	<>	<elision2>
7261	7264	<elision1>	<elision1>
7261	7261	<>	<elision1>
7261	6847	<2s>	<>
7262	7263	<>	<aphaerese>
7262	7266	<elision3>	<elision3>
7262	7263	<>	<elision3>
7262	7266	<elision2>	<elision2>
7262	7263	<>	<elision2>
7262	7266	<elision1>	<elision1>
7262	7263	<>	<elision1>
7262	6848	<2s>	<>
7263	7261	<>	<aphaerese>
7263	7264	<elision3>	<elision3>
7263	7261	<>	<elision3>
7263	7264	<elision2>	<elision2>
7263	7261	<>	<elision2>
7263	7264	<elision1>	<elision1>
7263	7261	<>	<elision1>
7263	6846	<2s>	<>
7264	7265	<>	<name>
7264	7264	<>	<aphaerese>
7264	7264	<>	<elision3>
7264	7264	<>	<elision2>
7264	7264	<>	<elision1>
7264	7267	s	κ
7264	7267	s	k
7264	7282	s	K
7264	7267	s	λ
7264	7286	s	l
7264	7288	s	L
7264	6708	<2s>	<>
7265	7266	<>	<aphaerese>
7265	7266	<>	<elision3>
7265	7266	<>	<elision2>
7265	7266	<>	<elision1>
7265	7269	s	κ
7265	7269	s	k
7265	7284	s	K
7265	7269	s	λ
7265	7285	s	l
7265	7290	s	L
7265	6709	<2s>	<>
7266	7264	<>	<aphaerese>
7266	7264	<>	<elision3>
7266	7264	<>	<elision2>
7266	7264	<>	<elision1>
7266	7267	s	κ
7266	7267	s	k
7266	7282	s	K
7266	7267	s	λ
7266	7286	s	l
7266	7288	s	L
7266	6707	<2s>	<>
7267	7268	<>	<name>
7267	7267	<>	<aphaerese>
7267	7267	<>	<elision3>
7267	7267	<>	<elision2>
7267	7267	<>	<elision1>
7267	7270	s	κ
7267	7056	s	k
7267	7231	s	K
7267	7270	s	λ
7267	7056	s	l
7267	7244	s	L
7267	7280	<split-h>	<>
7268	7269	<>	<aphaerese>
7268	7269	<>	<elision3>
7268	7269	<>	<elision2>
7268	7269	<>	<elision1>
7268	7272	s	κ
7268	7058	s	k
7268	7233	s	K
7268	7272	s	λ
7268	7058	s	l
7268	7246	s	L
7268	7281	<split-h>	<>
7269	7267	<>	<aphaerese>
7269	7267	<>	<elision3>
7269	7267	<>	<elision2>
7269	7267	<>	<elision1>
7269	7270	s	κ
7269	7056	s	k
7269	7231	s	K
7269	7270	s	λ
7269	7056	s	l
7269	7244	s	L
7269	7279	<split-h>	<>
7270	6695	.	.
7270	6695	 	 
7270	6695	<~>	<~>
7270	6695	<split-s>	<split-s>
7270	6695	<split-h>	<split-h>
7270	6695	<name2>	<name2>
7270	7271	<>	<name>
7270	6698	<aphaerese>	<aphaerese>
7270	7270	<>	<aphaerese>
7270	7270	<>	<elision3>
7270	7270	<>	<elision2>
7270	7270	<>	<elision1>
7270	6859	.	υ
7270	6859	.	u
7270	6859	.	κ
7270	6859	.	α
7270	6859	.	a
7270	6859	.	λ
7270	7274	<4s>	<>
7271	6697	.	.
7271	6697	 	 
7271	6697	<~>	<~>
7271	6697	<split-s>	<split-s>
7271	6697	<split-h>	<split-h>
7271	6697	<name2>	<name2>
7271	6700	<aphaerese>	<aphaerese>
7271	7272	<>	<aphaerese>
7271	7272	<>	<elision3>
7271	7272	<>	<elision2>
7271	7272	<>	<elision1>
7271	6861	.	υ
7271	6861	.	u
7271	6861	.	κ
7271	6861	.	α
7271	6861	.	a
7271	6861	.	λ
7271	7275	<4s>	<>
7272	6695	.	.
7272	6695	 	 
7272	6695	<~>	<~>
7272	6695	<split-s>	<split-s>
7272	6695	<split-h>	<split-h>
7272	6695	<name2>	<name2>
7272	6698	<aphaerese>	<aphaerese>
7272	7270	<>	<aphaerese>
7272	7270	<>	<elision3>
7272	7270	<>	<elision2>
7272	7270	<>	<elision1>
7272	6859	.	υ
7272	6859	.	u
7272	6859	.	κ
7272	6859	.	α
7272	6859	.	a
7272	6859	.	λ
7272	7273	<4s>	<>
7273	143	.	.
7273	144	 	 
7273	143	<~>	<~>
7273	143	<split-s>	<split-s>
7273	143	<split-h>	<split-h>
7273	143	<name2>	<name2>
7273	147	<aphaerese>	<aphaerese>
7273	7274	<>	<aphaerese>
7273	7274	<>	<elision3>
7273	7274	<>	<elision2>
7273	7274	<>	<elision1>
7273	6469	.	υ
7273	6513	H	υ
7273	6469	.	u
7273	6515	H	u
7273	6469	.	κ
7273	6928	H	κ
7273	6423	H	k
7273	6436	H	U
7273	6439	H	K
7273	6469	.	α
7273	6499	H	α
7273	6469	.	a
7273	6504	H	a
7273	6266	H	A
7273	6469	.	λ
7273	6905	H	λ
7273	6853	H	l
7273	6858	H	L
7273	7277	<K>	<>
7274	143	.	.
7274	144	 	 
7274	143	<~>	<~>
7274	143	<split-s>	<split-s>
7274	143	<split-h>	<split-h>
7274	143	<name2>	<name2>
7274	7275	<>	<name>
7274	147	<aphaerese>	<aphaerese>
7274	7274	<>	<aphaerese>
7274	7274	<>	<elision3>
7274	7274	<>	<elision2>
7274	7274	<>	<elision1>
7274	6469	.	υ
7274	6513	H	υ
7274	6469	.	u
7274	6515	H	u
7274	6469	.	κ
7274	6928	H	κ
7274	6423	H	k
7274	6436	H	U
7274	6439	H	K
7274	6469	.	α
7274	6499	H	α
7274	6469	.	a
7274	6504	H	a
7274	6266	H	A
7274	6469	.	λ
7274	6905	H	λ
7274	6853	H	l
7274	6858	H	L
7274	7278	<K>	<>
7275	142	.	.
7275	146	 	 
7275	142	<~>	<~>
7275	142	<split-s>	<split-s>
7275	142	<split-h>	<split-h>
7275	142	<name2>	<name2>
7275	149	<aphaerese>	<aphaerese>
7275	7273	<>	<aphaerese>
7275	7273	<>	<elision3>
7275	7273	<>	<elision2>
7275	7273	<>	<elision1>
7275	6471	.	υ
7275	6508	H	υ
7275	6471	.	u
7275	6512	H	u
7275	6471	.	κ
7275	6885	H	κ
7275	6464	H	k
7275	6438	H	U
7275	6468	H	K
7275	6471	.	α
7275	6498	H	α
7275	6471	.	a
7275	6503	H	a
7275	6269	H	A
7275	6471	.	λ
7275	6904	H	λ
7275	6852	H	l
7275	6855	H	L
7275	7276	<K>	<>
7276	6521	.	.
7276	6521	<~>	<~>
7276	6521	<split-s>	<split-s>
7276	6521	<split-h>	<split-h>
7276	6521	<name2>	<name2>
7276	6524	<aphaerese>	<aphaerese>
7276	7277	<>	<aphaerese>
7276	7277	<>	<elision3>
7276	7277	<>	<elision2>
7276	7277	<>	<elision1>
7276	6517	.	υ
7276	6663	H	υ
7276	6517	.	u
7276	6672	H	u
7276	6517	.	κ
7276	6915	H	κ
7276	6632	H	k
7276	6641	H	U
7276	6645	H	K
7276	6517	.	α
7276	6675	H	α
7276	6517	.	a
7276	6678	H	a
7276	6612	H	A
7276	6517	.	λ
7276	6924	H	λ
7276	6659	H	l
7276	6654	H	L
7277	6519	.	.
7277	6519	<~>	<~>
7277	6519	<split-s>	<split-s>
7277	6519	<split-h>	<split-h>
7277	6519	<name2>	<name2>
7277	6522	<aphaerese>	<aphaerese>
7277	7278	<>	<aphaerese>
7277	7278	<>	<elision3>
7277	7278	<>	<elision2>
7277	7278	<>	<elision1>
7277	6518	.	υ
7277	6661	H	υ
7277	6518	.	u
7277	6670	H	u
7277	6518	.	κ
7277	6913	H	κ
7277	6630	H	k
7277	6639	H	U
7277	6642	H	K
7277	6518	.	α
7277	6673	H	α
7277	6518	.	a
7277	6676	H	a
7277	6610	H	A
7277	6518	.	λ
7277	6922	H	λ
7277	6657	H	l
7277	6660	H	L
7278	6519	.	.
7278	6519	<~>	<~>
7278	6519	<split-s>	<split-s>
7278	6519	<split-h>	<split-h>
7278	6519	<name2>	<name2>
7278	7276	<>	<name>
7278	6522	<aphaerese>	<aphaerese>
7278	7278	<>	<aphaerese>
7278	7278	<>	<elision3>
7278	7278	<>	<elision2>
7278	7278	<>	<elision1>
7278	6518	.	υ
7278	6661	H	υ
7278	6518	.	u
7278	6670	H	u
7278	6518	.	κ
7278	6913	H	κ
7278	6630	H	k
7278	6639	H	U
7278	6642	H	K
7278	6518	.	α
7278	6673	H	α
7278	6518	.	a
7278	6676	H	a
7278	6610	H	A
7278	6518	.	λ
7278	6922	H	λ
7278	6657	H	l
7278	6660	H	L
7279	7280	<>	<aphaerese>
7279	7280	<>	<elision3>
7279	7280	<>	<elision2>
7279	7280	<>	<elision1>
7279	6882	<3s>	<>
7280	7281	<>	<name>
7280	7280	<>	<aphaerese>
7280	7280	<>	<elision3>
7280	7280	<>	<elision2>
7280	7280	<>	<elision1>
7280	6883	<3s>	<>
7281	7279	<>	<aphaerese>
7281	7279	<>	<elision3>
7281	7279	<>	<elision2>
7281	7279	<>	<elision1>
7281	6884	<3s>	<>
7282	7283	<>	<name>
7282	7282	<>	<aphaerese>
7282	7282	<>	<elision3>
7282	7282	<>	<elision2>
7282	7282	<>	<elision1>
7282	7286	<K2kl>	<>
7283	7284	<>	<aphaerese>
7283	7284	<>	<elision3>
7283	7284	<>	<elision2>
7283	7284	<>	<elision1>
7283	7287	<K2kl>	<>
7284	7282	<>	<aphaerese>
7284	7282	<>	<elision3>
7284	7282	<>	<elision2>
7284	7282	<>	<elision1>
7284	7285	<K2kl>	<>
7285	7286	<>	<aphaerese>
7285	7286	<>	<elision3>
7285	7286	<>	<elision2>
7285	7286	<>	<elision1>
7285	7279	<split-h>	<>
7286	7287	<>	<name>
7286	7286	<>	<aphaerese>
7286	7286	<>	<elision3>
7286	7286	<>	<elision2>
7286	7286	<>	<elision1>
7286	7280	<split-h>	<>
7287	7285	<>	<aphaerese>
7287	7285	<>	<elision3>
7287	7285	<>	<elision2>
7287	7285	<>	<elision1>
7287	7281	<split-h>	<>
7288	7289	<>	<name>
7288	7288	<>	<aphaerese>
7288	7288	<>	<elision3>
7288	7288	<>	<elision2>
7288	7288	<>	<elision1>
7288	7286	<L2kl>	<>
7289	7290	<>	<aphaerese>
7289	7290	<>	<elision3>
7289	7290	<>	<elision2>
7289	7290	<>	<elision1>
7289	7287	<L2kl>	<>
7290	7288	<>	<aphaerese>
7290	7288	<>	<elision3>
7290	7288	<>	<elision2>
7290	7288	<>	<elision1>
7290	7285	<L2kl>	<>
7291	6680	.	.
7291	6681	 	 
7291	6680	<~>	<~>
7291	6680	<split-s>	<split-s>
7291	6680	<split-h>	<split-h>
7291	6680	<name2>	<name2>
7291	7292	<>	<name>
7291	6684	<aphaerese>	<aphaerese>
7291	7291	<>	<aphaerese>
7291	7294	<elision3>	<elision3>
7291	7291	<>	<elision3>
7291	7294	<elision2>	<elision2>
7291	7291	<>	<elision2>
7291	7294	<elision1>	<elision1>
7291	7291	<>	<elision1>
7291	6688	.	υ
7291	6694	s	υ
7291	6688	.	u
7291	6694	s	u
7291	6688	.	κ
7291	7270	s	κ
7291	7056	s	k
7291	7065	s	U
7291	7231	s	K
7291	6688	.	α
7291	6694	s	α
7291	6688	.	a
7291	6694	s	a
7291	7186	s	A
7291	6688	.	λ
7291	7270	s	λ
7291	7056	s	l
7291	7244	s	L
7291	7342	<split-h>	<>
7292	6683	.	.
7292	6686	 	 
7292	6683	<~>	<~>
7292	6683	<split-s>	<split-s>
7292	6683	<split-h>	<split-h>
7292	6683	<name2>	<name2>
7292	7230	<aphaerese>	<aphaerese>
7292	7293	<>	<aphaerese>
7292	7296	<elision3>	<elision3>
7292	7293	<>	<elision3>
7292	7296	<elision2>	<elision2>
7292	7293	<>	<elision2>
7292	7296	<elision1>	<elision1>
7292	7293	<>	<elision1>
7292	6690	.	υ
7292	6866	s	υ
7292	6690	.	u
7292	6866	s	u
7292	6690	.	κ
7292	7272	s	κ
7292	7058	s	k
7292	7067	s	U
7292	7233	s	K
7292	6690	.	α
7292	6866	s	α
7292	6690	.	a
7292	6866	s	a
7292	7188	s	A
7292	6690	.	λ
7292	7272	s	λ
7292	7058	s	l
7292	7246	s	L
7292	7343	<split-h>	<>
7293	6680	.	.
7293	6681	 	 
7293	6680	<~>	<~>
7293	6680	<split-s>	<split-s>
7293	6680	<split-h>	<split-h>
7293	6680	<name2>	<name2>
7293	6684	<aphaerese>	<aphaerese>
7293	7291	<>	<aphaerese>
7293	7294	<elision3>	<elision3>
7293	7291	<>	<elision3>
7293	7294	<elision2>	<elision2>
7293	7291	<>	<elision2>
7293	7294	<elision1>	<elision1>
7293	7291	<>	<elision1>
7293	6688	.	υ
7293	6694	s	υ
7293	6688	.	u
7293	6694	s	u
7293	6688	.	κ
7293	7270	s	κ
7293	7056	s	k
7293	7065	s	U
7293	7231	s	K
7293	6688	.	α
7293	6694	s	α
7293	6688	.	a
7293	6694	s	a
7293	7186	s	A
7293	6688	.	λ
7293	7270	s	λ
7293	7056	s	l
7293	7244	s	L
7293	7341	<split-h>	<>
7294	6680	.	.
7294	6681	 	 
7294	6680	<~>	<~>
7294	6680	<split-s>	<split-s>
7294	6680	<split-h>	<split-h>
7294	6680	<name2>	<name2>
7294	7295	<>	<name>
7294	6684	<aphaerese>	<aphaerese>
7294	7294	<>	<aphaerese>
7294	6680	<elision3>	<elision3>
7294	7294	<>	<elision3>
7294	6680	<elision2>	<elision2>
7294	7294	<>	<elision2>
7294	6680	<elision1>	<elision1>
7294	7294	<>	<elision1>
7294	6688	.	υ
7294	6694	s	υ
7294	6688	.	u
7294	6694	s	u
7294	6873	.	κ
7294	7297	s	κ
7294	7306	s	k
7294	7065	s	U
7294	7315	s	K
7294	6688	.	α
7294	6694	s	α
7294	6688	.	a
7294	6694	s	a
7294	7186	s	A
7294	7306	s	λ
7294	7306	s	l
7294	7331	s	L
7294	7339	<split-h>	<>
7295	6683	.	.
7295	6686	 	 
7295	6683	<~>	<~>
7295	6683	<split-s>	<split-s>
7295	6683	<split-h>	<split-h>
7295	6683	<name2>	<name2>
7295	7230	<aphaerese>	<aphaerese>
7295	7296	<>	<aphaerese>
7295	6683	<elision3>	<elision3>
7295	7296	<>	<elision3>
7295	6683	<elision2>	<elision2>
7295	7296	<>	<elision2>
7295	6683	<elision1>	<elision1>
7295	7296	<>	<elision1>
7295	6690	.	υ
7295	6866	s	υ
7295	6690	.	u
7295	6866	s	u
7295	6875	.	κ
7295	7299	s	κ
7295	7308	s	k
7295	7067	s	U
7295	7317	s	K
7295	6690	.	α
7295	6866	s	α
7295	6690	.	a
7295	6866	s	a
7295	7188	s	A
7295	7308	s	λ
7295	7308	s	l
7295	7333	s	L
7295	7340	<split-h>	<>
7296	6680	.	.
7296	6681	 	 
7296	6680	<~>	<~>
7296	6680	<split-s>	<split-s>
7296	6680	<split-h>	<split-h>
7296	6680	<name2>	<name2>
7296	6684	<aphaerese>	<aphaerese>
7296	7294	<>	<aphaerese>
7296	6680	<elision3>	<elision3>
7296	7294	<>	<elision3>
7296	6680	<elision2>	<elision2>
7296	7294	<>	<elision2>
7296	6680	<elision1>	<elision1>
7296	7294	<>	<elision1>
7296	6688	.	υ
7296	6694	s	υ
7296	6688	.	u
7296	6694	s	u
7296	6873	.	κ
7296	7297	s	κ
7296	7306	s	k
7296	7065	s	U
7296	7315	s	K
7296	6688	.	α
7296	6694	s	α
7296	6688	.	a
7296	6694	s	a
7296	7186	s	A
7296	7306	s	λ
7296	7306	s	l
7296	7331	s	L
7296	7338	<split-h>	<>
7297	6695	.	.
7297	6695	 	 
7297	6695	<~>	<~>
7297	6695	<split-s>	<split-s>
7297	6695	<split-h>	<split-h>
7297	6695	<name2>	<name2>
7297	7298	<>	<name>
7297	6698	<aphaerese>	<aphaerese>
7297	7297	<>	<aphaerese>
7297	6947	<elision3>	<elision3>
7297	7297	<>	<elision3>
7297	6947	<elision2>	<elision2>
7297	7297	<>	<elision2>
7297	6947	<elision1>	<elision1>
7297	7297	<>	<elision1>
7297	6859	.	υ
7297	6859	.	u
7297	6859	.	κ
7297	6859	.	α
7297	6859	.	a
7297	6859	.	λ
7297	7301	<4s>	<>
7298	6697	.	.
7298	6697	 	 
7298	6697	<~>	<~>
7298	6697	<split-s>	<split-s>
7298	6697	<split-h>	<split-h>
7298	6697	<name2>	<name2>
7298	6700	<aphaerese>	<aphaerese>
7298	7299	<>	<aphaerese>
7298	6949	<elision3>	<elision3>
7298	7299	<>	<elision3>
7298	6949	<elision2>	<elision2>
7298	7299	<>	<elision2>
7298	6949	<elision1>	<elision1>
7298	7299	<>	<elision1>
7298	6861	.	υ
7298	6861	.	u
7298	6861	.	κ
7298	6861	.	α
7298	6861	.	a
7298	6861	.	λ
7298	7302	<4s>	<>
7299	6695	.	.
7299	6695	 	 
7299	6695	<~>	<~>
7299	6695	<split-s>	<split-s>
7299	6695	<split-h>	<split-h>
7299	6695	<name2>	<name2>
7299	6698	<aphaerese>	<aphaerese>
7299	7297	<>	<aphaerese>
7299	6947	<elision3>	<elision3>
7299	7297	<>	<elision3>
7299	6947	<elision2>	<elision2>
7299	7297	<>	<elision2>
7299	6947	<elision1>	<elision1>
7299	7297	<>	<elision1>
7299	6859	.	υ
7299	6859	.	u
7299	6859	.	κ
7299	6859	.	α
7299	6859	.	a
7299	6859	.	λ
7299	7300	<4s>	<>
7300	143	.	.
7300	144	 	 
7300	143	<~>	<~>
7300	143	<split-s>	<split-s>
7300	143	<split-h>	<split-h>
7300	143	<name2>	<name2>
7300	147	<aphaerese>	<aphaerese>
7300	7301	<>	<aphaerese>
7300	7051	<elision3>	<elision3>
7300	7301	<>	<elision3>
7300	7051	<elision2>	<elision2>
7300	7301	<>	<elision2>
7300	7051	<elision1>	<elision1>
7300	7301	<>	<elision1>
7300	6469	.	υ
7300	6513	H	υ
7300	6469	.	u
7300	6515	H	u
7300	6469	.	κ
7300	6436	H	U
7300	6469	.	α
7300	6499	H	α
7300	6469	.	a
7300	6504	H	a
7300	6266	H	A
7300	6469	.	λ
7300	7304	<K>	<>
7301	143	.	.
7301	144	 	 
7301	143	<~>	<~>
7301	143	<split-s>	<split-s>
7301	143	<split-h>	<split-h>
7301	143	<name2>	<name2>
7301	7302	<>	<name>
7301	147	<aphaerese>	<aphaerese>
7301	7301	<>	<aphaerese>
7301	7051	<elision3>	<elision3>
7301	7301	<>	<elision3>
7301	7051	<elision2>	<elision2>
7301	7301	<>	<elision2>
7301	7051	<elision1>	<elision1>
7301	7301	<>	<elision1>
7301	6469	.	υ
7301	6513	H	υ
7301	6469	.	u
7301	6515	H	u
7301	6469	.	κ
7301	6436	H	U
7301	6469	.	α
7301	6499	H	α
7301	6469	.	a
7301	6504	H	a
7301	6266	H	A
7301	6469	.	λ
7301	7305	<K>	<>
7302	142	.	.
7302	146	 	 
7302	142	<~>	<~>
7302	142	<split-s>	<split-s>
7302	142	<split-h>	<split-h>
7302	142	<name2>	<name2>
7302	149	<aphaerese>	<aphaerese>
7302	7300	<>	<aphaerese>
7302	7050	<elision3>	<elision3>
7302	7300	<>	<elision3>
7302	7050	<elision2>	<elision2>
7302	7300	<>	<elision2>
7302	7050	<elision1>	<elision1>
7302	7300	<>	<elision1>
7302	6471	.	υ
7302	6508	H	υ
7302	6471	.	u
7302	6512	H	u
7302	6471	.	κ
7302	6438	H	U
7302	6471	.	α
7302	6498	H	α
7302	6471	.	a
7302	6503	H	a
7302	6269	H	A
7302	6471	.	λ
7302	7303	<K>	<>
7303	6521	.	.
7303	6521	<~>	<~>
7303	6521	<split-s>	<split-s>
7303	6521	<split-h>	<split-h>
7303	6521	<name2>	<name2>
7303	6524	<aphaerese>	<aphaerese>
7303	7304	<>	<aphaerese>
7303	6999	<elision3>	<elision3>
7303	7304	<>	<elision3>
7303	6999	<elision2>	<elision2>
7303	7304	<>	<elision2>
7303	6999	<elision1>	<elision1>
7303	7304	<>	<elision1>
7303	6517	.	υ
7303	6663	H	υ
7303	6517	.	u
7303	6672	H	u
7303	6517	.	κ
7303	6641	H	U
7303	6517	.	α
7303	6675	H	α
7303	6517	.	a
7303	6678	H	a
7303	6612	H	A
7303	6517	.	λ
7304	6519	.	.
7304	6519	<~>	<~>
7304	6519	<split-s>	<split-s>
7304	6519	<split-h>	<split-h>
7304	6519	<name2>	<name2>
7304	6522	<aphaerese>	<aphaerese>
7304	7305	<>	<aphaerese>
7304	7000	<elision3>	<elision3>
7304	7305	<>	<elision3>
7304	7000	<elision2>	<elision2>
7304	7305	<>	<elision2>
7304	7000	<elision1>	<elision1>
7304	7305	<>	<elision1>
7304	6518	.	υ
7304	6661	H	υ
7304	6518	.	u
7304	6670	H	u
7304	6518	.	κ
7304	6639	H	U
7304	6518	.	α
7304	6673	H	α
7304	6518	.	a
7304	6676	H	a
7304	6610	H	A
7304	6518	.	λ
7305	6519	.	.
7305	6519	<~>	<~>
7305	6519	<split-s>	<split-s>
7305	6519	<split-h>	<split-h>
7305	6519	<name2>	<name2>
7305	7303	<>	<name>
7305	6522	<aphaerese>	<aphaerese>
7305	7305	<>	<aphaerese>
7305	7000	<elision3>	<elision3>
7305	7305	<>	<elision3>
7305	7000	<elision2>	<elision2>
7305	7305	<>	<elision2>
7305	7000	<elision1>	<elision1>
7305	7305	<>	<elision1>
7305	6518	.	υ
7305	6661	H	υ
7305	6518	.	u
7305	6670	H	u
7305	6518	.	κ
7305	6639	H	U
7305	6518	.	α
7305	6673	H	α
7305	6518	.	a
7305	6676	H	a
7305	6610	H	A
7305	6518	.	λ
7306	6695	.	.
7306	6695	 	 
7306	6695	<~>	<~>
7306	6695	<split-s>	<split-s>
7306	6695	<split-h>	<split-h>
7306	6695	<name2>	<name2>
7306	7307	<>	<name>
7306	6698	<aphaerese>	<aphaerese>
7306	7306	<>	<aphaerese>
7306	6695	<elision3>	<elision3>
7306	7306	<>	<elision3>
7306	6695	<elision2>	<elision2>
7306	7306	<>	<elision2>
7306	6695	<elision1>	<elision1>
7306	7306	<>	<elision1>
7306	6859	.	υ
7306	6859	.	u
7306	6859	.	κ
7306	6859	.	α
7306	6859	.	a
7306	6859	.	λ
7306	7310	<4s>	<>
7307	6697	.	.
7307	6697	 	 
7307	6697	<~>	<~>
7307	6697	<split-s>	<split-s>
7307	6697	<split-h>	<split-h>
7307	6697	<name2>	<name2>
7307	6700	<aphaerese>	<aphaerese>
7307	7308	<>	<aphaerese>
7307	6697	<elision3>	<elision3>
7307	7308	<>	<elision3>
7307	6697	<elision2>	<elision2>
7307	7308	<>	<elision2>
7307	6697	<elision1>	<elision1>
7307	7308	<>	<elision1>
7307	6861	.	υ
7307	6861	.	u
7307	6861	.	κ
7307	6861	.	α
7307	6861	.	a
7307	6861	.	λ
7307	7311	<4s>	<>
7308	6695	.	.
7308	6695	 	 
7308	6695	<~>	<~>
7308	6695	<split-s>	<split-s>
7308	6695	<split-h>	<split-h>
7308	6695	<name2>	<name2>
7308	6698	<aphaerese>	<aphaerese>
7308	7306	<>	<aphaerese>
7308	6695	<elision3>	<elision3>
7308	7306	<>	<elision3>
7308	6695	<elision2>	<elision2>
7308	7306	<>	<elision2>
7308	6695	<elision1>	<elision1>
7308	7306	<>	<elision1>
7308	6859	.	υ
7308	6859	.	u
7308	6859	.	κ
7308	6859	.	α
7308	6859	.	a
7308	6859	.	λ
7308	7309	<4s>	<>
7309	143	.	.
7309	144	 	 
7309	143	<~>	<~>
7309	143	<split-s>	<split-s>
7309	143	<split-h>	<split-h>
7309	143	<name2>	<name2>
7309	147	<aphaerese>	<aphaerese>
7309	7310	<>	<aphaerese>
7309	143	<elision3>	<elision3>
7309	7310	<>	<elision3>
7309	143	<elision2>	<elision2>
7309	7310	<>	<elision2>
7309	143	<elision1>	<elision1>
7309	7310	<>	<elision1>
7309	6469	.	υ
7309	6513	H	υ
7309	6469	.	u
7309	6515	H	u
7309	6469	.	κ
7309	6436	H	U
7309	6469	.	α
7309	6499	H	α
7309	6469	.	a
7309	6504	H	a
7309	6266	H	A
7309	6469	.	λ
7309	7313	<K>	<>
7310	143	.	.
7310	144	 	 
7310	143	<~>	<~>
7310	143	<split-s>	<split-s>
7310	143	<split-h>	<split-h>
7310	143	<name2>	<name2>
7310	7311	<>	<name>
7310	147	<aphaerese>	<aphaerese>
7310	7310	<>	<aphaerese>
7310	143	<elision3>	<elision3>
7310	7310	<>	<elision3>
7310	143	<elision2>	<elision2>
7310	7310	<>	<elision2>
7310	143	<elision1>	<elision1>
7310	7310	<>	<elision1>
7310	6469	.	υ
7310	6513	H	υ
7310	6469	.	u
7310	6515	H	u
7310	6469	.	κ
7310	6436	H	U
7310	6469	.	α
7310	6499	H	α
7310	6469	.	a
7310	6504	H	a
7310	6266	H	A
7310	6469	.	λ
7310	7314	<K>	<>
7311	142	.	.
7311	146	 	 
7311	142	<~>	<~>
7311	142	<split-s>	<split-s>
7311	142	<split-h>	<split-h>
7311	142	<name2>	<name2>
7311	149	<aphaerese>	<aphaerese>
7311	7309	<>	<aphaerese>
7311	142	<elision3>	<elision3>
7311	7309	<>	<elision3>
7311	142	<elision2>	<elision2>
7311	7309	<>	<elision2>
7311	142	<elision1>	<elision1>
7311	7309	<>	<elision1>
7311	6471	.	υ
7311	6508	H	υ
7311	6471	.	u
7311	6512	H	u
7311	6471	.	κ
7311	6438	H	U
7311	6471	.	α
7311	6498	H	α
7311	6471	.	a
7311	6503	H	a
7311	6269	H	A
7311	6471	.	λ
7311	7312	<K>	<>
7312	6521	.	.
7312	6521	<~>	<~>
7312	6521	<split-s>	<split-s>
7312	6521	<split-h>	<split-h>
7312	6521	<name2>	<name2>
7312	6524	<aphaerese>	<aphaerese>
7312	7313	<>	<aphaerese>
7312	6521	<elision3>	<elision3>
7312	7313	<>	<elision3>
7312	6521	<elision2>	<elision2>
7312	7313	<>	<elision2>
7312	6521	<elision1>	<elision1>
7312	7313	<>	<elision1>
7312	6517	.	υ
7312	6663	H	υ
7312	6517	.	u
7312	6672	H	u
7312	6517	.	κ
7312	6641	H	U
7312	6517	.	α
7312	6675	H	α
7312	6517	.	a
7312	6678	H	a
7312	6612	H	A
7312	6517	.	λ
7313	6519	.	.
7313	6519	<~>	<~>
7313	6519	<split-s>	<split-s>
7313	6519	<split-h>	<split-h>
7313	6519	<name2>	<name2>
7313	6522	<aphaerese>	<aphaerese>
7313	7314	<>	<aphaerese>
7313	6519	<elision3>	<elision3>
7313	7314	<>	<elision3>
7313	6519	<elision2>	<elision2>
7313	7314	<>	<elision2>
7313	6519	<elision1>	<elision1>
7313	7314	<>	<elision1>
7313	6518	.	υ
7313	6661	H	υ
7313	6518	.	u
7313	6670	H	u
7313	6518	.	κ
7313	6639	H	U
7313	6518	.	α
7313	6673	H	α
7313	6518	.	a
7313	6676	H	a
7313	6610	H	A
7313	6518	.	λ
7314	6519	.	.
7314	6519	<~>	<~>
7314	6519	<split-s>	<split-s>
7314	6519	<split-h>	<split-h>
7314	6519	<name2>	<name2>
7314	7312	<>	<name>
7314	6522	<aphaerese>	<aphaerese>
7314	7314	<>	<aphaerese>
7314	6519	<elision3>	<elision3>
7314	7314	<>	<elision3>
7314	6519	<elision2>	<elision2>
7314	7314	<>	<elision2>
7314	6519	<elision1>	<elision1>
7314	7314	<>	<elision1>
7314	6518	.	υ
7314	6661	H	υ
7314	6518	.	u
7314	6670	H	u
7314	6518	.	κ
7314	6639	H	U
7314	6518	.	α
7314	6673	H	α
7314	6518	.	a
7314	6676	H	a
7314	6610	H	A
7314	6518	.	λ
7315	7069	<name>	<name>
7315	7316	<>	<name>
7315	7318	<>	<aphaerese>
7315	7318	<>	<elision3>
7315	7318	<>	<elision2>
7315	7318	<>	<elision1>
7315	7180	<4s>	<>
7315	7235	<L2kl>	<>
7315	7328	<K2kl>	<>
7316	7317	<>	<aphaerese>
7316	7317	<>	<elision3>
7316	7317	<>	<elision2>
7316	7317	<>	<elision1>
7316	7236	<L2kl>	<>
7316	7320	<K2kl>	<>
7317	7318	<>	<aphaerese>
7317	7318	<>	<elision3>
7317	7318	<>	<elision2>
7317	7318	<>	<elision1>
7317	7237	<L2kl>	<>
7317	7321	<K2kl>	<>
7318	7316	<>	<name>
7318	7318	<>	<aphaerese>
7318	7318	<>	<elision3>
7318	7318	<>	<elision2>
7318	7318	<>	<elision1>
7318	7235	<L2kl>	<>
7318	7319	<K2kl>	<>
7319	6695	.	.
7319	6695	 	 
7319	6695	<~>	<~>
7319	6695	<split-s>	<split-s>
7319	6695	<split-h>	<split-h>
7319	6695	<name2>	<name2>
7319	7320	<>	<name>
7319	6698	<aphaerese>	<aphaerese>
7319	7319	<>	<aphaerese>
7319	6695	<elision3>	<elision3>
7319	7319	<>	<elision3>
7319	6695	<elision2>	<elision2>
7319	7319	<>	<elision2>
7319	6695	<elision1>	<elision1>
7319	7319	<>	<elision1>
7319	6859	.	υ
7319	6859	.	u
7319	6859	.	α
7319	6859	.	a
7319	7323	<4s>	<>
7320	6697	.	.
7320	6697	 	 
7320	6697	<~>	<~>
7320	6697	<split-s>	<split-s>
7320	6697	<split-h>	<split-h>
7320	6697	<name2>	<name2>
7320	6700	<aphaerese>	<aphaerese>
7320	7321	<>	<aphaerese>
7320	6697	<elision3>	<elision3>
7320	7321	<>	<elision3>
7320	6697	<elision2>	<elision2>
7320	7321	<>	<elision2>
7320	6697	<elision1>	<elision1>
7320	7321	<>	<elision1>
7320	6861	.	υ
7320	6861	.	u
7320	6861	.	α
7320	6861	.	a
7320	7324	<4s>	<>
7321	6695	.	.
7321	6695	 	 
7321	6695	<~>	<~>
7321	6695	<split-s>	<split-s>
7321	6695	<split-h>	<split-h>
7321	6695	<name2>	<name2>
7321	6698	<aphaerese>	<aphaerese>
7321	7319	<>	<aphaerese>
7321	6695	<elision3>	<elision3>
7321	7319	<>	<elision3>
7321	6695	<elision2>	<elision2>
7321	7319	<>	<elision2>
7321	6695	<elision1>	<elision1>
7321	7319	<>	<elision1>
7321	6859	.	υ
7321	6859	.	u
7321	6859	.	α
7321	6859	.	a
7321	7322	<4s>	<>
7322	143	.	.
7322	144	 	 
7322	143	<~>	<~>
7322	143	<split-s>	<split-s>
7322	143	<split-h>	<split-h>
7322	143	<name2>	<name2>
7322	147	<aphaerese>	<aphaerese>
7322	7323	<>	<aphaerese>
7322	143	<elision3>	<elision3>
7322	7323	<>	<elision3>
7322	143	<elision2>	<elision2>
7322	7323	<>	<elision2>
7322	143	<elision1>	<elision1>
7322	7323	<>	<elision1>
7322	6469	.	υ
7322	6513	H	υ
7322	6469	.	u
7322	6515	H	u
7322	6436	H	U
7322	6469	.	α
7322	6499	H	α
7322	6469	.	a
7322	6504	H	a
7322	6266	H	A
7322	7326	<K>	<>
7323	143	.	.
7323	144	 	 
7323	143	<~>	<~>
7323	143	<split-s>	<split-s>
7323	143	<split-h>	<split-h>
7323	143	<name2>	<name2>
7323	7324	<>	<name>
7323	147	<aphaerese>	<aphaerese>
7323	7323	<>	<aphaerese>
7323	143	<elision3>	<elision3>
7323	7323	<>	<elision3>
7323	143	<elision2>	<elision2>
7323	7323	<>	<elision2>
7323	143	<elision1>	<elision1>
7323	7323	<>	<elision1>
7323	6469	.	υ
7323	6513	H	υ
7323	6469	.	u
7323	6515	H	u
7323	6436	H	U
7323	6469	.	α
7323	6499	H	α
7323	6469	.	a
7323	6504	H	a
7323	6266	H	A
7323	7327	<K>	<>
7324	142	.	.
7324	146	 	 
7324	142	<~>	<~>
7324	142	<split-s>	<split-s>
7324	142	<split-h>	<split-h>
7324	142	<name2>	<name2>
7324	149	<aphaerese>	<aphaerese>
7324	7322	<>	<aphaerese>
7324	142	<elision3>	<elision3>
7324	7322	<>	<elision3>
7324	142	<elision2>	<elision2>
7324	7322	<>	<elision2>
7324	142	<elision1>	<elision1>
7324	7322	<>	<elision1>
7324	6471	.	υ
7324	6508	H	υ
7324	6471	.	u
7324	6512	H	u
7324	6438	H	U
7324	6471	.	α
7324	6498	H	α
7324	6471	.	a
7324	6503	H	a
7324	6269	H	A
7324	7325	<K>	<>
7325	6521	.	.
7325	6521	<~>	<~>
7325	6521	<split-s>	<split-s>
7325	6521	<split-h>	<split-h>
7325	6521	<name2>	<name2>
7325	6524	<aphaerese>	<aphaerese>
7325	7326	<>	<aphaerese>
7325	6521	<elision3>	<elision3>
7325	7326	<>	<elision3>
7325	6521	<elision2>	<elision2>
7325	7326	<>	<elision2>
7325	6521	<elision1>	<elision1>
7325	7326	<>	<elision1>
7325	6517	.	υ
7325	6663	H	υ
7325	6517	.	u
7325	6672	H	u
7325	6641	H	U
7325	6517	.	α
7325	6675	H	α
7325	6517	.	a
7325	6678	H	a
7325	6612	H	A
7326	6519	.	.
7326	6519	<~>	<~>
7326	6519	<split-s>	<split-s>
7326	6519	<split-h>	<split-h>
7326	6519	<name2>	<name2>
7326	6522	<aphaerese>	<aphaerese>
7326	7327	<>	<aphaerese>
7326	6519	<elision3>	<elision3>
7326	7327	<>	<elision3>
7326	6519	<elision2>	<elision2>
7326	7327	<>	<elision2>
7326	6519	<elision1>	<elision1>
7326	7327	<>	<elision1>
7326	6518	.	υ
7326	6661	H	υ
7326	6518	.	u
7326	6670	H	u
7326	6639	H	U
7326	6518	.	α
7326	6673	H	α
7326	6518	.	a
7326	6676	H	a
7326	6610	H	A
7327	6519	.	.
7327	6519	<~>	<~>
7327	6519	<split-s>	<split-s>
7327	6519	<split-h>	<split-h>
7327	6519	<name2>	<name2>
7327	7325	<>	<name>
7327	6522	<aphaerese>	<aphaerese>
7327	7327	<>	<aphaerese>
7327	6519	<elision3>	<elision3>
7327	7327	<>	<elision3>
7327	6519	<elision2>	<elision2>
7327	7327	<>	<elision2>
7327	6519	<elision1>	<elision1>
7327	7327	<>	<elision1>
7327	6518	.	υ
7327	6661	H	υ
7327	6518	.	u
7327	6670	H	u
7327	6639	H	U
7327	6518	.	α
7327	6673	H	α
7327	6518	.	a
7327	6676	H	a
7327	6610	H	A
7328	6695	.	.
7328	6695	 	 
7328	6695	<~>	<~>
7328	6695	<split-s>	<split-s>
7328	6695	<split-h>	<split-h>
7328	6695	<name2>	<name2>
7328	7069	<name2>	<name>
7328	7320	<>	<name>
7328	6698	<aphaerese>	<aphaerese>
7328	7319	<>	<aphaerese>
7328	6695	<elision3>	<elision3>
7328	7319	<>	<elision3>
7328	6695	<elision2>	<elision2>
7328	7319	<>	<elision2>
7328	6695	<elision1>	<elision1>
7328	7319	<>	<elision1>
7328	6859	.	υ
7328	6859	.	u
7328	6859	.	α
7328	6859	.	a
7328	7329	<4s>	<>
7329	143	.	.
7329	144	 	 
7329	143	<~>	<~>
7329	143	<split-s>	<split-s>
7329	143	<split-h>	<split-h>
7329	143	<name2>	<name2>
7329	7181	<name2>	<name>
7329	7324	<>	<name>
7329	147	<aphaerese>	<aphaerese>
7329	7323	<>	<aphaerese>
7329	143	<elision3>	<elision3>
7329	7323	<>	<elision3>
7329	143	<elision2>	<elision2>
7329	7323	<>	<elision2>
7329	143	<elision1>	<elision1>
7329	7323	<>	<elision1>
7329	6469	.	υ
7329	6513	H	υ
7329	6469	.	u
7329	6515	H	u
7329	6436	H	U
7329	6469	.	α
7329	6499	H	α
7329	6469	.	a
7329	6504	H	a
7329	6266	H	A
7329	7330	<K>	<>
7330	6519	.	.
7330	6519	<~>	<~>
7330	6519	<split-s>	<split-s>
7330	6519	<split-h>	<split-h>
7330	6519	<name2>	<name2>
7330	7071	<name2>	<name>
7330	7325	<>	<name>
7330	6522	<aphaerese>	<aphaerese>
7330	7327	<>	<aphaerese>
7330	6519	<elision3>	<elision3>
7330	7327	<>	<elision3>
7330	6519	<elision2>	<elision2>
7330	7327	<>	<elision2>
7330	6519	<elision1>	<elision1>
7330	7327	<>	<elision1>
7330	6518	.	υ
7330	6661	H	υ
7330	6518	.	u
7330	6670	H	u
7330	6639	H	U
7330	6518	.	α
7330	6673	H	α
7330	6518	.	a
7330	6676	H	a
7330	6610	H	A
7331	7069	<name>	<name>
7331	7332	<>	<name>
7331	7334	<>	<aphaerese>
7331	7334	<>	<elision3>
7331	7334	<>	<elision2>
7331	7334	<>	<elision1>
7331	7180	<4s>	<>
7331	7335	<L2kl>	<>
7332	7333	<>	<aphaerese>
7332	7333	<>	<elision3>
7332	7333	<>	<elision2>
7332	7333	<>	<elision1>
7332	7307	<L2kl>	<>
7333	7334	<>	<aphaerese>
7333	7334	<>	<elision3>
7333	7334	<>	<elision2>
7333	7334	<>	<elision1>
7333	7308	<L2kl>	<>
7334	7332	<>	<name>
7334	7334	<>	<aphaerese>
7334	7334	<>	<elision3>
7334	7334	<>	<elision2>
7334	7334	<>	<elision1>
7334	7306	<L2kl>	<>
7335	6695	.	.
7335	6695	 	 
7335	6695	<~>	<~>
7335	6695	<split-s>	<split-s>
7335	6695	<split-h>	<split-h>
7335	6695	<name2>	<name2>
7335	7069	<name2>	<name>
7335	7307	<>	<name>
7335	6698	<aphaerese>	<aphaerese>
7335	7306	<>	<aphaerese>
7335	6695	<elision3>	<elision3>
7335	7306	<>	<elision3>
7335	6695	<elision2>	<elision2>
7335	7306	<>	<elision2>
7335	6695	<elision1>	<elision1>
7335	7306	<>	<elision1>
7335	6859	.	υ
7335	6859	.	u
7335	6859	.	κ
7335	6859	.	α
7335	6859	.	a
7335	6859	.	λ
7335	7336	<4s>	<>
7336	143	.	.
7336	144	 	 
7336	143	<~>	<~>
7336	143	<split-s>	<split-s>
7336	143	<split-h>	<split-h>
7336	143	<name2>	<name2>
7336	7181	<name2>	<name>
7336	7311	<>	<name>
7336	147	<aphaerese>	<aphaerese>
7336	7310	<>	<aphaerese>
7336	143	<elision3>	<elision3>
7336	7310	<>	<elision3>
7336	143	<elision2>	<elision2>
7336	7310	<>	<elision2>
7336	143	<elision1>	<elision1>
7336	7310	<>	<elision1>
7336	6469	.	υ
7336	6513	H	υ
7336	6469	.	u
7336	6515	H	u
7336	6469	.	κ
7336	6436	H	U
7336	6469	.	α
7336	6499	H	α
7336	6469	.	a
7336	6504	H	a
7336	6266	H	A
7336	6469	.	λ
7336	7337	<K>	<>
7337	6519	.	.
7337	6519	<~>	<~>
7337	6519	<split-s>	<split-s>
7337	6519	<split-h>	<split-h>
7337	6519	<name2>	<name2>
7337	7071	<name2>	<name>
7337	7312	<>	<name>
7337	6522	<aphaerese>	<aphaerese>
7337	7314	<>	<aphaerese>
7337	6519	<elision3>	<elision3>
7337	7314	<>	<elision3>
7337	6519	<elision2>	<elision2>
7337	7314	<>	<elision2>
7337	6519	<elision1>	<elision1>
7337	7314	<>	<elision1>
7337	6518	.	υ
7337	6661	H	υ
7337	6518	.	u
7337	6670	H	u
7337	6518	.	κ
7337	6639	H	U
7337	6518	.	α
7337	6673	H	α
7337	6518	.	a
7337	6676	H	a
7337	6610	H	A
7337	6518	.	λ
7338	7339	<>	<aphaerese>
7338	7339	<>	<elision3>
7338	7339	<>	<elision2>
7338	7339	<>	<elision1>
7338	6950	<3s>	<>
7339	7340	<>	<name>
7339	7339	<>	<aphaerese>
7339	7339	<>	<elision3>
7339	7339	<>	<elision2>
7339	7339	<>	<elision1>
7339	6951	<3s>	<>
7340	7338	<>	<aphaerese>
7340	7338	<>	<elision3>
7340	7338	<>	<elision2>
7340	7338	<>	<elision1>
7340	6952	<3s>	<>
7341	7342	<>	<aphaerese>
7341	7342	<>	<elision3>
7341	7342	<>	<elision2>
7341	7342	<>	<elision1>
7341	7047	<3s>	<>
7342	7343	<>	<name>
7342	7342	<>	<aphaerese>
7342	7342	<>	<elision3>
7342	7342	<>	<elision2>
7342	7342	<>	<elision1>
7342	7048	<3s>	<>
7343	7341	<>	<aphaerese>
7343	7341	<>	<elision3>
7343	7341	<>	<elision2>
7343	7341	<>	<elision1>
7343	7049	<3s>	<>
7344	6680	.	.
7344	6681	 	 
7344	6680	<~>	<~>
7344	6680	<split-s>	<split-s>
7344	6680	<split-h>	<split-h>
7344	6680	<name2>	<name2>
7344	7345	<>	<name>
7344	6684	<aphaerese>	<aphaerese>
7344	7344	<>	<aphaerese>
7344	6680	<elision3>	<elision3>
7344	7344	<>	<elision3>
7344	6680	<elision2>	<elision2>
7344	7344	<>	<elision2>
7344	6680	<elision1>	<elision1>
7344	7344	<>	<elision1>
7344	6688	.	υ
7344	6694	s	υ
7344	6688	.	u
7344	6694	s	u
7344	7347	.	κ
7344	7270	s	κ
7344	7056	s	k
7344	7065	s	U
7344	7231	s	K
7344	6688	.	α
7344	6694	s	α
7344	6688	.	a
7344	6694	s	a
7344	7186	s	A
7344	7347	.	λ
7344	7270	s	λ
7344	7056	s	l
7344	7244	s	L
7344	7363	<split-h>	<>
7345	6683	.	.
7345	6686	 	 
7345	6683	<~>	<~>
7345	6683	<split-s>	<split-s>
7345	6683	<split-h>	<split-h>
7345	6683	<name2>	<name2>
7345	7230	<aphaerese>	<aphaerese>
7345	7346	<>	<aphaerese>
7345	6683	<elision3>	<elision3>
7345	7346	<>	<elision3>
7345	6683	<elision2>	<elision2>
7345	7346	<>	<elision2>
7345	6683	<elision1>	<elision1>
7345	7346	<>	<elision1>
7345	6690	.	υ
7345	6866	s	υ
7345	6690	.	u
7345	6866	s	u
7345	7349	.	κ
7345	7272	s	κ
7345	7058	s	k
7345	7067	s	U
7345	7233	s	K
7345	6690	.	α
7345	6866	s	α
7345	6690	.	a
7345	6866	s	a
7345	7188	s	A
7345	7349	.	λ
7345	7272	s	λ
7345	7058	s	l
7345	7246	s	L
7345	7364	<split-h>	<>
7346	6680	.	.
7346	6681	 	 
7346	6680	<~>	<~>
7346	6680	<split-s>	<split-s>
7346	6680	<split-h>	<split-h>
7346	6680	<name2>	<name2>
7346	6684	<aphaerese>	<aphaerese>
7346	7344	<>	<aphaerese>
7346	6680	<elision3>	<elision3>
7346	7344	<>	<elision3>
7346	6680	<elision2>	<elision2>
7346	7344	<>	<elision2>
7346	6680	<elision1>	<elision1>
7346	7344	<>	<elision1>
7346	6688	.	υ
7346	6694	s	υ
7346	6688	.	u
7346	6694	s	u
7346	7347	.	κ
7346	7270	s	κ
7346	7056	s	k
7346	7065	s	U
7346	7231	s	K
7346	6688	.	α
7346	6694	s	α
7346	6688	.	a
7346	6694	s	a
7346	7186	s	A
7346	7347	.	λ
7346	7270	s	λ
7346	7056	s	l
7346	7244	s	L
7346	7362	<split-h>	<>
7347	7348	<>	<name>
7347	7347	<>	<aphaerese>
7347	7350	<elision3>	<elision3>
7347	7347	<>	<elision3>
7347	7350	<elision2>	<elision2>
7347	7347	<>	<elision2>
7347	7350	<elision1>	<elision1>
7347	7347	<>	<elision1>
7347	6692	<split-h>	<>
7348	7349	<>	<aphaerese>
7348	7352	<elision3>	<elision3>
7348	7349	<>	<elision3>
7348	7352	<elision2>	<elision2>
7348	7349	<>	<elision2>
7348	7352	<elision1>	<elision1>
7348	7349	<>	<elision1>
7348	6693	<split-h>	<>
7349	7347	<>	<aphaerese>
7349	7350	<elision3>	<elision3>
7349	7347	<>	<elision3>
7349	7350	<elision2>	<elision2>
7349	7347	<>	<elision2>
7349	7350	<elision1>	<elision1>
7349	7347	<>	<elision1>
7349	6691	<split-h>	<>
7350	7350	.	.
7350	7350	 	 
7350	7350	<~>	<~>
7350	7350	<split-s>	<split-s>
7350	7350	<split-h>	<split-h>
7350	7350	<name2>	<name2>
7350	7351	<>	<name>
7350	7353	<aphaerese>	<aphaerese>
7350	7350	<>	<aphaerese>
7350	7350	<elision3>	<elision3>
7350	7350	<>	<elision3>
7350	7350	<elision2>	<elision2>
7350	7350	<>	<elision2>
7350	7350	<elision1>	<elision1>
7350	7350	<>	<elision1>
7350	7347	.	υ
7350	7347	.	u
7350	7356	.	κ
7350	7347	.	α
7350	7347	.	a
7350	7205	<split-h>	<>
7351	7352	.	.
7351	7352	 	 
7351	7352	<~>	<~>
7351	7352	<split-s>	<split-s>
7351	7352	<split-h>	<split-h>
7351	7352	<name2>	<name2>
7351	7355	<aphaerese>	<aphaerese>
7351	7352	<>	<aphaerese>
7351	7352	<elision3>	<elision3>
7351	7352	<>	<elision3>
7351	7352	<elision2>	<elision2>
7351	7352	<>	<elision2>
7351	7352	<elision1>	<elision1>
7351	7352	<>	<elision1>
7351	7349	.	υ
7351	7349	.	u
7351	7358	.	κ
7351	7349	.	α
7351	7349	.	a
7351	7206	<split-h>	<>
7352	7350	.	.
7352	7350	 	 
7352	7350	<~>	<~>
7352	7350	<split-s>	<split-s>
7352	7350	<split-h>	<split-h>
7352	7350	<name2>	<name2>
7352	7353	<aphaerese>	<aphaerese>
7352	7350	<>	<aphaerese>
7352	7350	<elision3>	<elision3>
7352	7350	<>	<elision3>
7352	7350	<elision2>	<elision2>
7352	7350	<>	<elision2>
7352	7350	<elision1>	<elision1>
7352	7350	<>	<elision1>
7352	7347	.	υ
7352	7347	.	u
7352	7356	.	κ
7352	7347	.	α
7352	7347	.	a
7352	7207	<split-h>	<>
7353	7350	.	.
7353	7350	 	 
7353	7350	<~>	<~>
7353	7350	<split-s>	<split-s>
7353	7350	<split-h>	<split-h>
7353	7350	<name2>	<name2>
7353	7354	<>	<name>
7353	7353	<aphaerese>	<aphaerese>
7353	7353	<>	<aphaerese>
7353	7350	<elision3>	<elision3>
7353	7353	<>	<elision3>
7353	7350	<elision2>	<elision2>
7353	7353	<>	<elision2>
7353	7350	<elision1>	<elision1>
7353	7353	<>	<elision1>
7353	7350	.	υ
7353	7350	.	u
7353	7356	.	κ
7353	7350	.	α
7353	7350	.	a
7353	7252	<split-h>	<>
7354	7352	.	.
7354	7352	 	 
7354	7352	<~>	<~>
7354	7352	<split-s>	<split-s>
7354	7352	<split-h>	<split-h>
7354	7352	<name2>	<name2>
7354	7355	<aphaerese>	<aphaerese>
7354	7355	<>	<aphaerese>
7354	7352	<elision3>	<elision3>
7354	7355	<>	<elision3>
7354	7352	<elision2>	<elision2>
7354	7355	<>	<elision2>
7354	7352	<elision1>	<elision1>
7354	7355	<>	<elision1>
7354	7352	.	υ
7354	7352	.	u
7354	7358	.	κ
7354	7352	.	α
7354	7352	.	a
7354	7253	<split-h>	<>
7355	7350	.	.
7355	7350	 	 
7355	7350	<~>	<~>
7355	7350	<split-s>	<split-s>
7355	7350	<split-h>	<split-h>
7355	7350	<name2>	<name2>
7355	7353	<aphaerese>	<aphaerese>
7355	7353	<>	<aphaerese>
7355	7350	<elision3>	<elision3>
7355	7353	<>	<elision3>
7355	7350	<elision2>	<elision2>
7355	7353	<>	<elision2>
7355	7350	<elision1>	<elision1>
7355	7353	<>	<elision1>
7355	7350	.	υ
7355	7350	.	u
7355	7356	.	κ
7355	7350	.	α
7355	7350	.	a
7355	7251	<split-h>	<>
7356	7357	<>	<name>
7356	7356	<>	<aphaerese>
7356	7359	<elision3>	<elision3>
7356	7356	<>	<elision3>
7356	7359	<elision2>	<elision2>
7356	7356	<>	<elision2>
7356	7359	<elision1>	<elision1>
7356	7356	<>	<elision1>
7356	6942	<split-h>	<>
7357	7358	<>	<aphaerese>
7357	7361	<elision3>	<elision3>
7357	7358	<>	<elision3>
7357	7361	<elision2>	<elision2>
7357	7358	<>	<elision2>
7357	7361	<elision1>	<elision1>
7357	7358	<>	<elision1>
7357	6943	<split-h>	<>
7358	7356	<>	<aphaerese>
7358	7359	<elision3>	<elision3>
7358	7356	<>	<elision3>
7358	7359	<elision2>	<elision2>
7358	7356	<>	<elision2>
7358	7359	<elision1>	<elision1>
7358	7356	<>	<elision1>
7358	6941	<split-h>	<>
7359	7360	<>	<name>
7359	7359	<>	<aphaerese>
7359	7359	<>	<elision3>
7359	7359	<>	<elision2>
7359	7359	<>	<elision1>
7359	6939	<split-h>	<>
7360	7361	<>	<aphaerese>
7360	7361	<>	<elision3>
7360	7361	<>	<elision2>
7360	7361	<>	<elision1>
7360	6940	<split-h>	<>
7361	7359	<>	<aphaerese>
7361	7359	<>	<elision3>
7361	7359	<>	<elision2>
7361	7359	<>	<elision1>
7361	6938	<split-h>	<>
7362	7363	<>	<aphaerese>
7362	7363	<>	<elision3>
7362	7363	<>	<elision2>
7362	7363	<>	<elision1>
7362	7059	<3s>	<>
7363	7364	<>	<name>
7363	7363	<>	<aphaerese>
7363	7363	<>	<elision3>
7363	7363	<>	<elision2>
7363	7363	<>	<elision1>
7363	7060	<3s>	<>
7364	7362	<>	<aphaerese>
7364	7362	<>	<elision3>
7364	7362	<>	<elision2>
7364	7362	<>	<elision1>
7364	7061	<3s>	<>
7365	7366	<>	<name>
7365	7365	<>	<aphaerese>
7365	7365	<>	<elision3>
7365	7365	<>	<elision2>
7365	7365	<>	<elision1>
7365	7350	<U2kl>	<>
7366	7367	<>	<aphaerese>
7366	7367	<>	<elision3>
7366	7367	<>	<elision2>
7366	7367	<>	<elision1>
7366	7351	<U2kl>	<>
7367	7365	<>	<aphaerese>
7367	7365	<>	<elision3>
7367	7365	<>	<elision2>
7367	7365	<>	<elision1>
7367	7352	<U2kl>	<>
7368	7369	<name>	<name>
7368	7371	<>	<name>
7368	7373	<>	<aphaerese>
7368	7373	<>	<elision3>
7368	7373	<>	<elision2>
7368	7373	<>	<elision1>
7368	7416	<split-h>	<>
7368	7374	<A2kl>	<>
7368	7392	<L2kl>	<>
7368	7417	<K2kl>	<>
7369	7233	s	k
7369	7246	s	l
7369	7370	<split-h>	<>
7370	7070	<3s>	<>
7371	7372	<>	<aphaerese>
7371	7372	<>	<elision3>
7371	7372	<>	<elision2>
7371	7372	<>	<elision1>
7371	7375	<A2kl>	<>
7371	7393	<L2kl>	<>
7371	7411	<K2kl>	<>
7372	7373	<>	<aphaerese>
7372	7373	<>	<elision3>
7372	7373	<>	<elision2>
7372	7373	<>	<elision1>
7372	7376	<A2kl>	<>
7372	7394	<L2kl>	<>
7372	7412	<K2kl>	<>
7373	7371	<>	<name>
7373	7373	<>	<aphaerese>
7373	7373	<>	<elision3>
7373	7373	<>	<elision2>
7373	7373	<>	<elision1>
7373	7374	<A2kl>	<>
7373	7392	<L2kl>	<>
7373	7410	<K2kl>	<>
7374	7375	<>	<name>
7374	7374	<>	<aphaerese>
7374	7374	<>	<elision3>
7374	7374	<>	<elision2>
7374	7374	<>	<elision1>
7374	7377	.	κ
7374	7377	.	λ
7374	7390	<split-h>	<>
7375	7376	<>	<aphaerese>
7375	7376	<>	<elision3>
7375	7376	<>	<elision2>
7375	7376	<>	<elision1>
7375	7379	.	κ
7375	7379	.	λ
7375	7391	<split-h>	<>
7376	7374	<>	<aphaerese>
7376	7374	<>	<elision3>
7376	7374	<>	<elision2>
7376	7374	<>	<elision1>
7376	7377	.	κ
7376	7377	.	λ
7376	7389	<split-h>	<>
7377	7378	<>	<name>
7377	7377	<>	<aphaerese>
7377	7380	<elision3>	<elision3>
7377	7377	<>	<elision3>
7377	7380	<elision2>	<elision2>
7377	7377	<>	<elision2>
7377	7380	<elision1>	<elision1>
7377	7377	<>	<elision1>
7377	7387	<split-h>	<>
7378	7379	<>	<aphaerese>
7378	7382	<elision3>	<elision3>
7378	7379	<>	<elision3>
7378	7382	<elision2>	<elision2>
7378	7379	<>	<elision2>
7378	7382	<elision1>	<elision1>
7378	7379	<>	<elision1>
7378	7388	<split-h>	<>
7379	7377	<>	<aphaerese>
7379	7380	<elision3>	<elision3>
7379	7377	<>	<elision3>
7379	7380	<elision2>	<elision2>
7379	7377	<>	<elision2>
7379	7380	<elision1>	<elision1>
7379	7377	<>	<elision1>
7379	7386	<split-h>	<>
7380	7350	.	.
7380	7350	 	 
7380	7350	<~>	<~>
7380	7350	<split-s>	<split-s>
7380	7350	<split-h>	<split-h>
7380	7350	<name2>	<name2>
7380	7381	<>	<name>
7380	7353	<aphaerese>	<aphaerese>
7380	7380	<>	<aphaerese>
7380	7350	<elision3>	<elision3>
7380	7380	<>	<elision3>
7380	7350	<elision2>	<elision2>
7380	7380	<>	<elision2>
7380	7350	<elision1>	<elision1>
7380	7380	<>	<elision1>
7380	7347	.	υ
7380	7347	.	u
7380	7347	.	α
7380	7347	.	a
7380	7384	<split-h>	<>
7381	7352	.	.
7381	7352	 	 
7381	7352	<~>	<~>
7381	7352	<split-s>	<split-s>
7381	7352	<split-h>	<split-h>
7381	7352	<name2>	<name2>
7381	7355	<aphaerese>	<aphaerese>
7381	7382	<>	<aphaerese>
7381	7352	<elision3>	<elision3>
7381	7382	<>	<elision3>
7381	7352	<elision2>	<elision2>
7381	7382	<>	<elision2>
7381	7352	<elision1>	<elision1>
7381	7382	<>	<elision1>
7381	7349	.	υ
7381	7349	.	u
7381	7349	.	α
7381	7349	.	a
7381	7385	<split-h>	<>
7382	7350	.	.
7382	7350	 	 
7382	7350	<~>	<~>
7382	7350	<split-s>	<split-s>
7382	7350	<split-h>	<split-h>
7382	7350	<name2>	<name2>
7382	7353	<aphaerese>	<aphaerese>
7382	7380	<>	<aphaerese>
7382	7350	<elision3>	<elision3>
7382	7380	<>	<elision3>
7382	7350	<elision2>	<elision2>
7382	7380	<>	<elision2>
7382	7350	<elision1>	<elision1>
7382	7380	<>	<elision1>
7382	7347	.	υ
7382	7347	.	u
7382	7347	.	α
7382	7347	.	a
7382	7383	<split-h>	<>
7383	7384	<>	<aphaerese>
7383	7384	<>	<elision3>
7383	7384	<>	<elision2>
7383	7384	<>	<elision1>
7383	7084	<3s>	<>
7384	7385	<>	<name>
7384	7384	<>	<aphaerese>
7384	7384	<>	<elision3>
7384	7384	<>	<elision2>
7384	7384	<>	<elision1>
7384	7085	<3s>	<>
7385	7383	<>	<aphaerese>
7385	7383	<>	<elision3>
7385	7383	<>	<elision2>
7385	7383	<>	<elision1>
7385	7086	<3s>	<>
7386	7387	<>	<aphaerese>
7386	7387	<>	<elision3>
7386	7387	<>	<elision2>
7386	7387	<>	<elision1>
7386	7120	<3s>	<>
7387	7388	<>	<name>
7387	7387	<>	<aphaerese>
7387	7387	<>	<elision3>
7387	7387	<>	<elision2>
7387	7387	<>	<elision1>
7387	7121	<3s>	<>
7388	7386	<>	<aphaerese>
7388	7386	<>	<elision3>
7388	7386	<>	<elision2>
7388	7386	<>	<elision1>
7388	7122	<3s>	<>
7389	7390	<>	<aphaerese>
7389	7390	<>	<elision3>
7389	7390	<>	<elision2>
7389	7390	<>	<elision1>
7389	7129	<3s>	<>
7390	7391	<>	<name>
7390	7390	<>	<aphaerese>
7390	7390	<>	<elision3>
7390	7390	<>	<elision2>
7390	7390	<>	<elision1>
7390	7130	<3s>	<>
7391	7389	<>	<aphaerese>
7391	7389	<>	<elision3>
7391	7389	<>	<elision2>
7391	7389	<>	<elision1>
7391	7131	<3s>	<>
7392	7393	<>	<name>
7392	7392	<>	<aphaerese>
7392	7392	<>	<elision3>
7392	7392	<>	<elision2>
7392	7392	<>	<elision1>
7392	7395	.	κ
7392	7395	.	λ
7392	7408	<split-h>	<>
7393	7394	<>	<aphaerese>
7393	7394	<>	<elision3>
7393	7394	<>	<elision2>
7393	7394	<>	<elision1>
7393	7397	.	κ
7393	7397	.	λ
7393	7409	<split-h>	<>
7394	7392	<>	<aphaerese>
7394	7392	<>	<elision3>
7394	7392	<>	<elision2>
7394	7392	<>	<elision1>
7394	7395	.	κ
7394	7395	.	λ
7394	7407	<split-h>	<>
7395	7396	<>	<name>
7395	7395	<>	<aphaerese>
7395	7398	<elision3>	<elision3>
7395	7395	<>	<elision3>
7395	7398	<elision2>	<elision2>
7395	7395	<>	<elision2>
7395	7398	<elision1>	<elision1>
7395	7395	<>	<elision1>
7395	7405	<split-h>	<>
7396	7397	<>	<aphaerese>
7396	7400	<elision3>	<elision3>
7396	7397	<>	<elision3>
7396	7400	<elision2>	<elision2>
7396	7397	<>	<elision2>
7396	7400	<elision1>	<elision1>
7396	7397	<>	<elision1>
7396	7406	<split-h>	<>
7397	7395	<>	<aphaerese>
7397	7398	<elision3>	<elision3>
7397	7395	<>	<elision3>
7397	7398	<elision2>	<elision2>
7397	7395	<>	<elision2>
7397	7398	<elision1>	<elision1>
7397	7395	<>	<elision1>
7397	7404	<split-h>	<>
7398	7399	<>	<name>
7398	7398	<>	<aphaerese>
7398	7398	<>	<elision3>
7398	7398	<>	<elision2>
7398	7398	<>	<elision1>
7398	7356	.	κ
7398	7402	<split-h>	<>
7399	7400	<>	<aphaerese>
7399	7400	<>	<elision3>
7399	7400	<>	<elision2>
7399	7400	<>	<elision1>
7399	7358	.	κ
7399	7403	<split-h>	<>
7400	7398	<>	<aphaerese>
7400	7398	<>	<elision3>
7400	7398	<>	<elision2>
7400	7398	<>	<elision1>
7400	7356	.	κ
7400	7401	<split-h>	<>
7401	7402	<>	<aphaerese>
7401	7402	<>	<elision3>
7401	7402	<>	<elision2>
7401	7402	<>	<elision1>
7401	7147	<3s>	<>
7402	7403	<>	<name>
7402	7402	<>	<aphaerese>
7402	7402	<>	<elision3>
7402	7402	<>	<elision2>
7402	7402	<>	<elision1>
7402	7148	<3s>	<>
7403	7401	<>	<aphaerese>
7403	7401	<>	<elision3>
7403	7401	<>	<elision2>
7403	7401	<>	<elision1>
7403	7149	<3s>	<>
7404	7405	<>	<aphaerese>
7404	7405	<>	<elision3>
7404	7405	<>	<elision2>
7404	7405	<>	<elision1>
7404	7153	<3s>	<>
7405	7406	<>	<name>
7405	7405	<>	<aphaerese>
7405	7405	<>	<elision3>
7405	7405	<>	<elision2>
7405	7405	<>	<elision1>
7405	7154	<3s>	<>
7406	7404	<>	<aphaerese>
7406	7404	<>	<elision3>
7406	7404	<>	<elision2>
7406	7404	<>	<elision1>
7406	7155	<3s>	<>
7407	7408	<>	<aphaerese>
7407	7408	<>	<elision3>
7407	7408	<>	<elision2>
7407	7408	<>	<elision1>
7407	7162	<3s>	<>
7408	7409	<>	<name>
7408	7408	<>	<aphaerese>
7408	7408	<>	<elision3>
7408	7408	<>	<elision2>
7408	7408	<>	<elision1>
7408	7163	<3s>	<>
7409	7407	<>	<aphaerese>
7409	7407	<>	<elision3>
7409	7407	<>	<elision2>
7409	7407	<>	<elision1>
7409	7164	<3s>	<>
7410	7350	.	.
7410	7350	 	 
7410	7350	<~>	<~>
7410	7350	<split-s>	<split-s>
7410	7350	<split-h>	<split-h>
7410	7350	<name2>	<name2>
7410	7411	<>	<name>
7410	7353	<aphaerese>	<aphaerese>
7410	7410	<>	<aphaerese>
7410	7350	<elision3>	<elision3>
7410	7410	<>	<elision3>
7410	7350	<elision2>	<elision2>
7410	7410	<>	<elision2>
7410	7350	<elision1>	<elision1>
7410	7410	<>	<elision1>
7410	7347	.	υ
7410	7347	.	u
7410	7347	.	α
7410	7347	.	a
7410	7414	<split-h>	<>
7411	7352	.	.
7411	7352	 	 
7411	7352	<~>	<~>
7411	7352	<split-s>	<split-s>
7411	7352	<split-h>	<split-h>
7411	7352	<name2>	<name2>
7411	7355	<aphaerese>	<aphaerese>
7411	7412	<>	<aphaerese>
7411	7352	<elision3>	<elision3>
7411	7412	<>	<elision3>
7411	7352	<elision2>	<elision2>
7411	7412	<>	<elision2>
7411	7352	<elision1>	<elision1>
7411	7412	<>	<elision1>
7411	7349	.	υ
7411	7349	.	u
7411	7349	.	α
7411	7349	.	a
7411	7415	<split-h>	<>
7412	7350	.	.
7412	7350	 	 
7412	7350	<~>	<~>
7412	7350	<split-s>	<split-s>
7412	7350	<split-h>	<split-h>
7412	7350	<name2>	<name2>
7412	7353	<aphaerese>	<aphaerese>
7412	7410	<>	<aphaerese>
7412	7350	<elision3>	<elision3>
7412	7410	<>	<elision3>
7412	7350	<elision2>	<elision2>
7412	7410	<>	<elision2>
7412	7350	<elision1>	<elision1>
7412	7410	<>	<elision1>
7412	7347	.	υ
7412	7347	.	u
7412	7347	.	α
7412	7347	.	a
7412	7413	<split-h>	<>
7413	7414	<>	<aphaerese>
7413	7414	<>	<elision3>
7413	7414	<>	<elision2>
7413	7414	<>	<elision1>
7413	7174	<3s>	<>
7414	7415	<>	<name>
7414	7414	<>	<aphaerese>
7414	7414	<>	<elision3>
7414	7414	<>	<elision2>
7414	7414	<>	<elision1>
7414	7175	<3s>	<>
7415	7413	<>	<aphaerese>
7415	7413	<>	<elision3>
7415	7413	<>	<elision2>
7415	7413	<>	<elision1>
7415	7176	<3s>	<>
7416	7180	<3s>	<>
7417	7350	.	.
7417	7350	 	 
7417	7350	<~>	<~>
7417	7350	<split-s>	<split-s>
7417	7350	<split-h>	<split-h>
7417	7350	<name2>	<name2>
7417	7418	<name2>	<name>
7417	7411	<>	<name>
7417	7353	<aphaerese>	<aphaerese>
7417	7410	<>	<aphaerese>
7417	7350	<elision3>	<elision3>
7417	7410	<>	<elision3>
7417	7350	<elision2>	<elision2>
7417	7410	<>	<elision2>
7417	7350	<elision1>	<elision1>
7417	7410	<>	<elision1>
7417	7347	.	υ
7417	7347	.	u
7417	7347	.	α
7417	7347	.	a
7417	7419	<split-h>	<>
7418	7370	<split-h>	<>
7419	7415	<>	<name>
7419	7414	<>	<aphaerese>
7419	7414	<>	<elision3>
7419	7414	<>	<elision2>
7419	7414	<>	<elision1>
7419	7184	<3s>	<>
7420	7350	.	.
7420	7350	 	 
7420	7350	<~>	<~>
7420	7350	<split-s>	<split-s>
7420	7350	<split-h>	<split-h>
7420	7350	<name2>	<name2>
7420	7421	<>	<name>
7420	7353	<aphaerese>	<aphaerese>
7420	7420	<>	<aphaerese>
7420	7420	<>	<elision3>
7420	7420	<>	<elision2>
7420	7420	<>	<elision1>
7420	7347	.	υ
7420	7347	.	u
7420	7356	.	κ
7420	7347	.	α
7420	7347	.	a
7420	7259	<split-h>	<>
7421	7352	.	.
7421	7352	 	 
7421	7352	<~>	<~>
7421	7352	<split-s>	<split-s>
7421	7352	<split-h>	<split-h>
7421	7352	<name2>	<name2>
7421	7355	<aphaerese>	<aphaerese>
7421	7422	<>	<aphaerese>
7421	7422	<>	<elision3>
7421	7422	<>	<elision2>
7421	7422	<>	<elision1>
7421	7349	.	υ
7421	7349	.	u
7421	7358	.	κ
7421	7349	.	α
7421	7349	.	a
7421	7260	<split-h>	<>
7422	7350	.	.
7422	7350	 	 
7422	7350	<~>	<~>
7422	7350	<split-s>	<split-s>
7422	7350	<split-h>	<split-h>
7422	7350	<name2>	<name2>
7422	7353	<aphaerese>	<aphaerese>
7422	7420	<>	<aphaerese>
7422	7420	<>	<elision3>
7422	7420	<>	<elision2>
7422	7420	<>	<elision1>
7422	7347	.	υ
7422	7347	.	u
7422	7356	.	κ
7422	7347	.	α
7422	7347	.	a
7422	7258	<split-h>	<>
7423	7424	<>	<name>
7423	7423	<>	<aphaerese>
7423	7423	<>	<elision3>
7423	7423	<>	<elision2>
7423	7423	<>	<elision1>
7423	7350	<A2kl>	<>
7424	7425	<>	<aphaerese>
7424	7425	<>	<elision3>
7424	7425	<>	<elision2>
7424	7425	<>	<elision1>
7424	7351	<A2kl>	<>
7425	7423	<>	<aphaerese>
7425	7423	<>	<elision3>
7425	7423	<>	<elision2>
7425	7423	<>	<elision1>
7425	7352	<A2kl>	<>
7426	6680	.	.
7426	6681	 	 
7426	6680	<~>	<~>
7426	6680	<split-s>	<split-s>
7426	6680	<split-h>	<split-h>
7426	6680	<name2>	<name2>
7426	7427	<>	<name>
7426	6684	<aphaerese>	<aphaerese>
7426	7426	<>	<aphaerese>
7426	6680	<elision3>	<elision3>
7426	7426	<>	<elision3>
7426	6680	<elision2>	<elision2>
7426	7426	<>	<elision2>
7426	6680	<elision1>	<elision1>
7426	7426	<>	<elision1>
7426	6688	.	υ
7426	6694	s	υ
7426	6688	.	u
7426	6694	s	u
7426	6688	.	κ
7426	7270	s	κ
7426	7056	s	k
7426	7065	s	U
7426	7231	s	K
7426	6688	.	α
7426	6694	s	α
7426	6688	.	a
7426	6694	s	a
7426	7186	s	A
7426	6688	.	λ
7426	7270	s	λ
7426	7056	s	l
7426	7244	s	L
7426	7363	<split-h>	<>
7427	6683	.	.
7427	6686	 	 
7427	6683	<~>	<~>
7427	6683	<split-s>	<split-s>
7427	6683	<split-h>	<split-h>
7427	6683	<name2>	<name2>
7427	7230	<aphaerese>	<aphaerese>
7427	7428	<>	<aphaerese>
7427	6683	<elision3>	<elision3>
7427	7428	<>	<elision3>
7427	6683	<elision2>	<elision2>
7427	7428	<>	<elision2>
7427	6683	<elision1>	<elision1>
7427	7428	<>	<elision1>
7427	6690	.	υ
7427	6866	s	υ
7427	6690	.	u
7427	6866	s	u
7427	6690	.	κ
7427	7272	s	κ
7427	7058	s	k
7427	7067	s	U
7427	7233	s	K
7427	6690	.	α
7427	6866	s	α
7427	6690	.	a
7427	6866	s	a
7427	7188	s	A
7427	6690	.	λ
7427	7272	s	λ
7427	7058	s	l
7427	7246	s	L
7427	7364	<split-h>	<>
7428	6680	.	.
7428	6681	 	 
7428	6680	<~>	<~>
7428	6680	<split-s>	<split-s>
7428	6680	<split-h>	<split-h>
7428	6680	<name2>	<name2>
7428	6684	<aphaerese>	<aphaerese>
7428	7426	<>	<aphaerese>
7428	6680	<elision3>	<elision3>
7428	7426	<>	<elision3>
7428	6680	<elision2>	<elision2>
7428	7426	<>	<elision2>
7428	6680	<elision1>	<elision1>
7428	7426	<>	<elision1>
7428	6688	.	υ
7428	6694	s	υ
7428	6688	.	u
7428	6694	s	u
7428	6688	.	κ
7428	7270	s	κ
7428	7056	s	k
7428	7065	s	U
7428	7231	s	K
7428	6688	.	α
7428	6694	s	α
7428	6688	.	a
7428	6694	s	a
7428	7186	s	A
7428	6688	.	λ
7428	7270	s	λ
7428	7056	s	l
7428	7244	s	L
7428	7362	<split-h>	<>
7429	7350	.	.
7429	7350	 	 
7429	7350	<~>	<~>
7429	7350	<split-s>	<split-s>
7429	7350	<split-h>	<split-h>
7429	7350	<name2>	<name2>
7429	7430	<>	<name>
7429	7353	<aphaerese>	<aphaerese>
7429	7429	<>	<aphaerese>
7429	7350	<elision3>	<elision3>
7429	7429	<>	<elision3>
7429	7350	<elision2>	<elision2>
7429	7429	<>	<elision2>
7429	7350	<elision1>	<elision1>
7429	7429	<>	<elision1>
7429	7347	.	υ
7429	7347	.	u
7429	7347	.	κ
7429	7347	.	α
7429	7347	.	a
7429	7347	.	λ
7429	7363	<split-h>	<>
7430	7352	.	.
7430	7352	 	 
7430	7352	<~>	<~>
7430	7352	<split-s>	<split-s>
7430	7352	<split-h>	<split-h>
7430	7352	<name2>	<name2>
7430	7355	<aphaerese>	<aphaerese>
7430	7431	<>	<aphaerese>
7430	7352	<elision3>	<elision3>
7430	7431	<>	<elision3>
7430	7352	<elision2>	<elision2>
7430	7431	<>	<elision2>
7430	7352	<elision1>	<elision1>
7430	7431	<>	<elision1>
7430	7349	.	υ
7430	7349	.	u
7430	7349	.	κ
7430	7349	.	α
7430	7349	.	a
7430	7349	.	λ
7430	7364	<split-h>	<>
7431	7350	.	.
7431	7350	 	 
7431	7350	<~>	<~>
7431	7350	<split-s>	<split-s>
7431	7350	<split-h>	<split-h>
7431	7350	<name2>	<name2>
7431	7353	<aphaerese>	<aphaerese>
7431	7429	<>	<aphaerese>
7431	7350	<elision3>	<elision3>
7431	7429	<>	<elision3>
7431	7350	<elision2>	<elision2>
7431	7429	<>	<elision2>
7431	7350	<elision1>	<elision1>
7431	7429	<>	<elision1>
7431	7347	.	υ
7431	7347	.	u
7431	7347	.	κ
7431	7347	.	α
7431	7347	.	a
7431	7347	.	λ
7431	7362	<split-h>	<>
7432	7418	<name>	<name>
7432	7433	<>	<name>
7432	7435	<>	<aphaerese>
7432	7435	<>	<elision3>
7432	7435	<>	<elision2>
7432	7435	<>	<elision1>
7432	7416	<split-h>	<>
7432	7374	<A2kl>	<>
7432	7442	<L2kl>	<>
7433	7434	<>	<aphaerese>
7433	7434	<>	<elision3>
7433	7434	<>	<elision2>
7433	7434	<>	<elision1>
7433	7375	<A2kl>	<>
7433	7437	<L2kl>	<>
7434	7435	<>	<aphaerese>
7434	7435	<>	<elision3>
7434	7435	<>	<elision2>
7434	7435	<>	<elision1>
7434	7376	<A2kl>	<>
7434	7438	<L2kl>	<>
7435	7433	<>	<name>
7435	7435	<>	<aphaerese>
7435	7435	<>	<elision3>
7435	7435	<>	<elision2>
7435	7435	<>	<elision1>
7435	7374	<A2kl>	<>
7435	7436	<L2kl>	<>
7436	7350	.	.
7436	7350	 	 
7436	7350	<~>	<~>
7436	7350	<split-s>	<split-s>
7436	7350	<split-h>	<split-h>
7436	7350	<name2>	<name2>
7436	7437	<>	<name>
7436	7353	<aphaerese>	<aphaerese>
7436	7436	<>	<aphaerese>
7436	7350	<elision3>	<elision3>
7436	7436	<>	<elision3>
7436	7350	<elision2>	<elision2>
7436	7436	<>	<elision2>
7436	7350	<elision1>	<elision1>
7436	7436	<>	<elision1>
7436	7347	.	υ
7436	7347	.	u
7436	7395	.	κ
7436	7347	.	α
7436	7347	.	a
7436	7395	.	λ
7436	7440	<split-h>	<>
7437	7352	.	.
7437	7352	 	 
7437	7352	<~>	<~>
7437	7352	<split-s>	<split-s>
7437	7352	<split-h>	<split-h>
7437	7352	<name2>	<name2>
7437	7355	<aphaerese>	<aphaerese>
7437	7438	<>	<aphaerese>
7437	7352	<elision3>	<elision3>
7437	7438	<>	<elision3>
7437	7352	<elision2>	<elision2>
7437	7438	<>	<elision2>
7437	7352	<elision1>	<elision1>
7437	7438	<>	<elision1>
7437	7349	.	υ
7437	7349	.	u
7437	7397	.	κ
7437	7349	.	α
7437	7349	.	a
7437	7397	.	λ
7437	7441	<split-h>	<>
7438	7350	.	.
7438	7350	 	 
7438	7350	<~>	<~>
7438	7350	<split-s>	<split-s>
7438	7350	<split-h>	<split-h>
7438	7350	<name2>	<name2>
7438	7353	<aphaerese>	<aphaerese>
7438	7436	<>	<aphaerese>
7438	7350	<elision3>	<elision3>
7438	7436	<>	<elision3>
7438	7350	<elision2>	<elision2>
7438	7436	<>	<elision2>
7438	7350	<elision1>	<elision1>
7438	7436	<>	<elision1>
7438	7347	.	υ
7438	7347	.	u
7438	7395	.	κ
7438	7347	.	α
7438	7347	.	a
7438	7395	.	λ
7438	7439	<split-h>	<>
7439	7440	<>	<aphaerese>
7439	7440	<>	<elision3>
7439	7440	<>	<elision2>
7439	7440	<>	<elision1>
7439	7196	<3s>	<>
7440	7441	<>	<name>
7440	7440	<>	<aphaerese>
7440	7440	<>	<elision3>
7440	7440	<>	<elision2>
7440	7440	<>	<elision1>
7440	7197	<3s>	<>
7441	7439	<>	<aphaerese>
7441	7439	<>	<elision3>
7441	7439	<>	<elision2>
7441	7439	<>	<elision1>
7441	7198	<3s>	<>
7442	7350	.	.
7442	7350	 	 
7442	7350	<~>	<~>
7442	7350	<split-s>	<split-s>
7442	7350	<split-h>	<split-h>
7442	7350	<name2>	<name2>
7442	7418	<name2>	<name>
7442	7437	<>	<name>
7442	7353	<aphaerese>	<aphaerese>
7442	7436	<>	<aphaerese>
7442	7350	<elision3>	<elision3>
7442	7436	<>	<elision3>
7442	7350	<elision2>	<elision2>
7442	7436	<>	<elision2>
7442	7350	<elision1>	<elision1>
7442	7436	<>	<elision1>
7442	7347	.	υ
7442	7347	.	u
7442	7395	.	κ
7442	7347	.	α
7442	7347	.	a
7442	7395	.	λ
7442	7443	<split-h>	<>
7443	7441	<>	<name>
7443	7440	<>	<aphaerese>
7443	7440	<>	<elision3>
7443	7440	<>	<elision2>
7443	7440	<>	<elision1>
7443	7203	<3s>	<>
7444	6680	.	.
7444	6681	 	 
7444	6680	<~>	<~>
7444	6680	<split-s>	<split-s>
7444	6680	<split-h>	<split-h>
7444	6680	<name2>	<name2>
7444	7256	<>	<name>
7444	6684	<aphaerese>	<aphaerese>
7444	6679	<>	<aphaerese>
7444	6679	<>	<elision3>
7444	6679	<>	<elision2>
7444	6679	<>	<elision1>
7444	6688	.	υ
7444	6694	s	υ
7444	6688	.	u
7444	6694	s	u
7444	6873	.	κ
7444	6944	s	κ
7444	7056	s	k
7444	7065	s	U
7444	7231	s	K
7444	6688	.	α
7444	6694	s	α
7444	6688	.	a
7444	6694	s	a
7444	7186	s	A
7444	7056	s	λ
7444	7056	s	l
7444	7244	s	L
7444	7445	<split-h>	<>
7445	7260	<>	<name>
7445	7259	<>	<aphaerese>
7445	7259	<>	<elision3>
7445	7259	<>	<elision2>
7445	7259	<>	<elision1>
7445	7209	<3s>	<>
7446	6680	.	.
7446	6681	 	 
7446	6680	<~>	<~>
7446	6680	<split-s>	<split-s>
7446	6680	<split-h>	<split-h>
7446	6680	<name2>	<name2>
7446	7292	<>	<name>
7446	6684	<aphaerese>	<aphaerese>
7446	7291	<>	<aphaerese>
7446	7294	<elision3>	<elision3>
7446	7291	<>	<elision3>
7446	7294	<elision2>	<elision2>
7446	7291	<>	<elision2>
7446	7294	<elision1>	<elision1>
7446	7291	<>	<elision1>
7446	6688	.	υ
7446	6694	s	υ
7446	6688	.	u
7446	6694	s	u
7446	6688	.	κ
7446	7270	s	κ
7446	7056	s	k
7446	7065	s	U
7446	7231	s	K
7446	6688	.	α
7446	6694	s	α
7446	6688	.	a
7446	6694	s	a
7446	7186	s	A
7446	6688	.	λ
7446	7270	s	λ
7446	7056	s	l
7446	7244	s	L
7446	7447	<split-h>	<>
7447	7343	<>	<name>
7447	7342	<>	<aphaerese>
7447	7342	<>	<elision3>
7447	7342	<>	<elision2>
7447	7342	<>	<elision1>
7447	7212	<3s>	<>
7448	6680	.	.
7448	6681	 	 
7448	6680	<~>	<~>
7448	6680	<split-s>	<split-s>
7448	6680	<split-h>	<split-h>
7448	6680	<name2>	<name2>
7448	7345	<>	<name>
7448	6684	<aphaerese>	<aphaerese>
7448	7344	<>	<aphaerese>
7448	6680	<elision3>	<elision3>
7448	7344	<>	<elision3>
7448	6680	<elision2>	<elision2>
7448	7344	<>	<elision2>
7448	6680	<elision1>	<elision1>
7448	7344	<>	<elision1>
7448	6688	.	υ
7448	6694	s	υ
7448	6688	.	u
7448	6694	s	u
7448	7347	.	κ
7448	7270	s	κ
7448	7056	s	k
7448	7065	s	U
7448	7231	s	K
7448	6688	.	α
7448	6694	s	α
7448	6688	.	a
7448	6694	s	a
7448	7186	s	A
7448	7347	.	λ
7448	7270	s	λ
7448	7056	s	l
7448	7244	s	L
7448	7449	<split-h>	<>
7449	7364	<>	<name>
7449	7363	<>	<aphaerese>
7449	7363	<>	<elision3>
7449	7363	<>	<elision2>
7449	7363	<>	<elision1>
7449	7215	<3s>	<>
7450	7366	<>	<name>
7450	7365	<>	<aphaerese>
7450	7365	<>	<elision3>
7450	7365	<>	<elision2>
7450	7365	<>	<elision1>
7450	7451	<U2kl>	<>
7451	7350	.	.
7451	7350	 	 
7451	7350	<~>	<~>
7451	7350	<split-s>	<split-s>
7451	7350	<split-h>	<split-h>
7451	7350	<name2>	<name2>
7451	7351	<>	<name>
7451	7353	<aphaerese>	<aphaerese>
7451	7350	<>	<aphaerese>
7451	7350	<elision3>	<elision3>
7451	7350	<>	<elision3>
7451	7350	<elision2>	<elision2>
7451	7350	<>	<elision2>
7451	7350	<elision1>	<elision1>
7451	7350	<>	<elision1>
7451	7347	.	υ
7451	7347	.	u
7451	7356	.	κ
7451	7347	.	α
7451	7347	.	a
7451	7452	<split-h>	<>
7452	7206	<>	<name>
7452	7205	<>	<aphaerese>
7452	7205	<>	<elision3>
7452	7205	<>	<elision2>
7452	7205	<>	<elision1>
7452	7219	<3s>	<>
7453	7369	<name>	<name>
7453	7371	<>	<name>
7453	7373	<>	<aphaerese>
7453	7373	<>	<elision3>
7453	7373	<>	<elision2>
7453	7373	<>	<elision1>
7453	7416	<split-h>	<>
7453	7374	<A2kl>	<>
7453	7392	<L2kl>	<>
7453	7454	<K2kl>	<>
7454	7350	.	.
7454	7350	 	 
7454	7350	<~>	<~>
7454	7350	<split-s>	<split-s>
7454	7350	<split-h>	<split-h>
7454	7350	<name2>	<name2>
7454	7418	<name2>	<name>
7454	7411	<>	<name>
7454	7353	<aphaerese>	<aphaerese>
7454	7410	<>	<aphaerese>
7454	7350	<elision3>	<elision3>
7454	7410	<>	<elision3>
7454	7350	<elision2>	<elision2>
7454	7410	<>	<elision2>
7454	7350	<elision1>	<elision1>
7454	7410	<>	<elision1>
7454	7347	.	υ
7454	7347	.	u
7454	7347	.	α
7454	7347	.	a
7454	7455	<split-h>	<>
7455	7415	<>	<name>
7455	7414	<>	<aphaerese>
7455	7414	<>	<elision3>
7455	7414	<>	<elision2>
7455	7414	<>	<elision1>
7455	7223	<3s>	<>
7456	7350	.	.
7456	7350	 	 
7456	7350	<~>	<~>
7456	7350	<split-s>	<split-s>
7456	7350	<split-h>	<split-h>
7456	7350	<name2>	<name2>
7456	7421	<>	<name>
7456	7353	<aphaerese>	<aphaerese>
7456	7420	<>	<aphaerese>
7456	7420	<>	<elision3>
7456	7420	<>	<elision2>
7456	7420	<>	<elision1>
7456	7347	.	υ
7456	7347	.	u
7456	7356	.	κ
7456	7347	.	α
7456	7347	.	a
7456	7445	<split-h>	<>
7457	7424	<>	<name>
7457	7423	<>	<aphaerese>
7457	7423	<>	<elision3>
7457	7423	<>	<elision2>
7457	7423	<>	<elision1>
7457	7451	<A2kl>	<>
7458	6680	.	.
7458	6681	 	 
7458	6680	<~>	<~>
7458	6680	<split-s>	<split-s>
7458	6680	<split-h>	<split-h>
7458	6680	<name2>	<name2>
7458	7427	<>	<name>
7458	6684	<aphaerese>	<aphaerese>
7458	7426	<>	<aphaerese>
7458	6680	<elision3>	<elision3>
7458	7426	<>	<elision3>
7458	6680	<elision2>	<elision2>
7458	7426	<>	<elision2>
7458	6680	<elision1>	<elision1>
7458	7426	<>	<elision1>
7458	6688	.	υ
7458	6694	s	υ
7458	6688	.	u
7458	6694	s	u
7458	6688	.	κ
7458	7270	s	κ
7458	7056	s	k
7458	7065	s	U
7458	7231	s	K
7458	6688	.	α
7458	6694	s	α
7458	6688	.	a
7458	6694	s	a
7458	7186	s	A
7458	6688	.	λ
7458	7270	s	λ
7458	7056	s	l
7458	7244	s	L
7458	7449	<split-h>	<>
7459	7350	.	.
7459	7350	 	 
7459	7350	<~>	<~>
7459	7350	<split-s>	<split-s>
7459	7350	<split-h>	<split-h>
7459	7350	<name2>	<name2>
7459	7430	<>	<name>
7459	7353	<aphaerese>	<aphaerese>
7459	7429	<>	<aphaerese>
7459	7350	<elision3>	<elision3>
7459	7429	<>	<elision3>
7459	7350	<elision2>	<elision2>
7459	7429	<>	<elision2>
7459	7350	<elision1>	<elision1>
7459	7429	<>	<elision1>
7459	7347	.	υ
7459	7347	.	u
7459	7347	.	κ
7459	7347	.	α
7459	7347	.	a
7459	7347	.	λ
7459	7449	<split-h>	<>
7460	7418	<name>	<name>
7460	7433	<>	<name>
7460	7435	<>	<aphaerese>
7460	7435	<>	<elision3>
7460	7435	<>	<elision2>
7460	7435	<>	<elision1>
7460	7416	<split-h>	<>
7460	7374	<A2kl>	<>
7460	7461	<L2kl>	<>
7461	7350	.	.
7461	7350	 	 
7461	7350	<~>	<~>
7461	7350	<split-s>	<split-s>
7461	7350	<split-h>	<split-h>
7461	7350	<name2>	<name2>
7461	7418	<name2>	<name>
7461	7437	<>	<name>
7461	7353	<aphaerese>	<aphaerese>
7461	7436	<>	<aphaerese>
7461	7350	<elision3>	<elision3>
7461	7436	<>	<elision3>
7461	7350	<elision2>	<elision2>
7461	7436	<>	<elision2>
7461	7350	<elision1>	<elision1>
7461	7436	<>	<elision1>
7461	7347	.	υ
7461	7347	.	u
7461	7395	.	κ
7461	7347	.	α
7461	7347	.	a
7461	7395	.	λ
7461	7462	<split-h>	<>
7462	7441	<>	<name>
7462	7440	<>	<aphaerese>
7462	7440	<>	<elision3>
7462	7440	<>	<elision2>
7462	7440	<>	<elision1>
7462	7228	<3s>	<>
7463	128	.	.
7463	129	 	 
7463	128	<~>	<~>
7463	128	<split-s>	<split-s>
7463	128	<split-h>	<split-h>
7463	128	<name2>	<name2>
7463	132	<aphaerese>	<aphaerese>
7463	132	<>	<aphaerese>
7463	128	<elision3>	<elision3>
7463	132	<>	<elision3>
7463	128	<elision2>	<elision2>
7463	132	<>	<elision2>
7463	128	<elision1>	<elision1>
7463	132	<>	<elision1>
7463	128	.	υ
7463	128	.	u
7463	7261	.	κ
7463	7291	s	κ
7463	7344	s	k
7463	7365	s	U
7463	7464	s	K
7463	128	.	α
7463	128	.	a
7463	7423	s	A
7463	7426	s	λ
7463	7429	s	l
7463	7474	s	L
7463	6849	<2s>	<>
7464	7369	<name>	<name>
7464	7465	<>	<name>
7464	7467	<>	<aphaerese>
7464	7467	<>	<elision3>
7464	7467	<>	<elision2>
7464	7467	<>	<elision1>
7464	7416	<split-h>	<>
7464	7468	<L2kl>	<>
7464	7417	<K2kl>	<>
7465	7466	<>	<aphaerese>
7465	7466	<>	<elision3>
7465	7466	<>	<elision2>
7465	7466	<>	<elision1>
7465	7469	<L2kl>	<>
7465	7411	<K2kl>	<>
7466	7467	<>	<aphaerese>
7466	7467	<>	<elision3>
7466	7467	<>	<elision2>
7466	7467	<>	<elision1>
7466	7470	<L2kl>	<>
7466	7412	<K2kl>	<>
7467	7465	<>	<name>
7467	7467	<>	<aphaerese>
7467	7467	<>	<elision3>
7467	7467	<>	<elision2>
7467	7467	<>	<elision1>
7467	7468	<L2kl>	<>
7467	7410	<K2kl>	<>
7468	7469	<>	<name>
7468	7468	<>	<aphaerese>
7468	7468	<>	<elision3>
7468	7468	<>	<elision2>
7468	7468	<>	<elision1>
7468	7347	.	κ
7468	7347	.	λ
7468	7472	<split-h>	<>
7469	7470	<>	<aphaerese>
7469	7470	<>	<elision3>
7469	7470	<>	<elision2>
7469	7470	<>	<elision1>
7469	7349	.	κ
7469	7349	.	λ
7469	7473	<split-h>	<>
7470	7468	<>	<aphaerese>
7470	7468	<>	<elision3>
7470	7468	<>	<elision2>
7470	7468	<>	<elision1>
7470	7347	.	κ
7470	7347	.	λ
7470	7471	<split-h>	<>
7471	7472	<>	<aphaerese>
7471	7472	<>	<elision3>
7471	7472	<>	<elision2>
7471	7472	<>	<elision1>
7471	7238	<3s>	<>
7472	7473	<>	<name>
7472	7472	<>	<aphaerese>
7472	7472	<>	<elision3>
7472	7472	<>	<elision2>
7472	7472	<>	<elision1>
7472	7239	<3s>	<>
7473	7471	<>	<aphaerese>
7473	7471	<>	<elision3>
7473	7471	<>	<elision2>
7473	7471	<>	<elision1>
7473	7240	<3s>	<>
7474	7418	<name>	<name>
7474	7475	<>	<name>
7474	7477	<>	<aphaerese>
7474	7477	<>	<elision3>
7474	7477	<>	<elision2>
7474	7477	<>	<elision1>
7474	7416	<split-h>	<>
7474	7478	<L2kl>	<>
7475	7476	<>	<aphaerese>
7475	7476	<>	<elision3>
7475	7476	<>	<elision2>
7475	7476	<>	<elision1>
7475	7430	<L2kl>	<>
7476	7477	<>	<aphaerese>
7476	7477	<>	<elision3>
7476	7477	<>	<elision2>
7476	7477	<>	<elision1>
7476	7431	<L2kl>	<>
7477	7475	<>	<name>
7477	7477	<>	<aphaerese>
7477	7477	<>	<elision3>
7477	7477	<>	<elision2>
7477	7477	<>	<elision1>
7477	7429	<L2kl>	<>
7478	7350	.	.
7478	7350	 	 
7478	7350	<~>	<~>
7478	7350	<split-s>	<split-s>
7478	7350	<split-h>	<split-h>
7478	7350	<name2>	<name2>
7478	7418	<name2>	<name>
7478	7430	<>	<name>
7478	7353	<aphaerese>	<aphaerese>
7478	7429	<>	<aphaerese>
7478	7350	<elision3>	<elision3>
7478	7429	<>	<elision3>
7478	7350	<elision2>	<elision2>
7478	7429	<>	<elision2>
7478	7350	<elision1>	<elision1>
7478	7429	<>	<elision1>
7478	7347	.	υ
7478	7347	.	u
7478	7347	.	κ
7478	7347	.	α
7478	7347	.	a
7478	7347	.	λ
7478	7479	<split-h>	<>
7479	7364	<>	<name>
7479	7363	<>	<aphaerese>
7479	7363	<>	<elision3>
7479	7363	<>	<elision2>
7479	7363	<>	<elision1>
7479	7249	<3s>	<>
7480	128	.	.
7480	129	 	 
7480	128	<~>	<~>
7480	128	<split-s>	<split-s>
7480	128	<split-h>	<split-h>
7480	128	<name2>	<name2>
7480	132	<aphaerese>	<aphaerese>
7480	135	<>	<aphaerese>
7480	128	<elision3>	<elision3>
7480	135	<>	<elision3>
7480	128	<elision2>	<elision2>
7480	135	<>	<elision2>
7480	128	<elision1>	<elision1>
7480	135	<>	<elision1>
7480	136	.	υ
7480	6679	s	υ
7480	136	.	u
7480	6679	s	u
7480	7261	.	κ
7480	7291	s	κ
7480	7344	s	k
7480	7365	s	U
7480	7368	s	K
7480	136	.	α
7480	7420	s	α
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7480	7420	s	a
7480	7423	s	A
7480	7426	s	λ
7480	7429	s	l
7480	7432	s	L
7480	6862	<2s>	<>
7481	131	.	.
7481	134	 	 
7481	131	<~>	<~>
7481	131	<split-s>	<split-s>
7481	131	<split-h>	<split-h>
7481	131	<name2>	<name2>
7481	7463	<aphaerese>	<aphaerese>
7481	131	<>	<aphaerese>
7481	131	<elision3>	<elision3>
7481	131	<>	<elision3>
7481	131	<elision2>	<elision2>
7481	131	<>	<elision2>
7481	131	<elision1>	<elision1>
7481	131	<>	<elision1>
7481	138	.	υ
7481	7257	s	υ
7481	138	.	u
7481	7257	s	u
7481	7263	.	κ
7481	7293	s	κ
7481	7346	s	k
7481	7367	s	U
7481	7466	s	K
7481	138	.	α
7481	7422	s	α
7481	138	.	a
7481	7422	s	a
7481	7425	s	A
7481	7428	s	λ
7481	7431	s	l
7481	7476	s	L
7481	6864	<2s>	<>
7482	131	.	.
7482	134	 	 
7482	131	<~>	<~>
7482	131	<split-s>	<split-s>
7482	131	<split-h>	<split-h>
7482	131	<name2>	<name2>
7482	7463	<aphaerese>	<aphaerese>
7482	7483	<>	<aphaerese>
7482	7483	<>	<elision3>
7482	7483	<>	<elision2>
7482	7483	<>	<elision1>
7482	138	.	υ
7482	7257	s	υ
7482	138	.	u
7482	7257	s	u
7482	138	.	κ
7482	7486	s	κ
7482	7346	s	k
7482	7367	s	U
7482	7466	s	K
7482	138	.	α
7482	7422	s	α
7482	138	.	a
7482	7422	s	a
7482	7425	s	A
7482	138	.	λ
7482	7486	s	λ
7482	7431	s	l
7482	7476	s	L
7482	7275	<2s>	<>
7483	128	.	.
7483	129	 	 
7483	128	<~>	<~>
7483	128	<split-s>	<split-s>
7483	128	<split-h>	<split-h>
7483	128	<name2>	<name2>
7483	132	<aphaerese>	<aphaerese>
7483	127	<>	<aphaerese>
7483	127	<>	<elision3>
7483	127	<>	<elision2>
7483	127	<>	<elision1>
7483	136	.	υ
7483	6679	s	υ
7483	136	.	u
7483	6679	s	u
7483	136	.	κ
7483	7484	s	κ
7483	7344	s	k
7483	7365	s	U
7483	7464	s	K
7483	136	.	α
7483	7420	s	α
7483	136	.	a
7483	7420	s	a
7483	7423	s	A
7483	136	.	λ
7483	7484	s	λ
7483	7429	s	l
7483	7474	s	L
7483	7273	<2s>	<>
7484	6680	.	.
7484	6681	 	 
7484	6680	<~>	<~>
7484	6680	<split-s>	<split-s>
7484	6680	<split-h>	<split-h>
7484	6680	<name2>	<name2>
7484	7485	<>	<name>
7484	6684	<aphaerese>	<aphaerese>
7484	7484	<>	<aphaerese>
7484	7484	<>	<elision3>
7484	7484	<>	<elision2>
7484	7484	<>	<elision1>
7484	6688	.	υ
7484	6694	s	υ
7484	6688	.	u
7484	6694	s	u
7484	6688	.	κ
7484	7270	s	κ
7484	7056	s	k
7484	7065	s	U
7484	7231	s	K
7484	6688	.	α
7484	6694	s	α
7484	6688	.	a
7484	6694	s	a
7484	7186	s	A
7484	6688	.	λ
7484	7270	s	λ
7484	7056	s	l
7484	7244	s	L
7484	7488	<split-h>	<>
7485	6683	.	.
7485	6686	 	 
7485	6683	<~>	<~>
7485	6683	<split-s>	<split-s>
7485	6683	<split-h>	<split-h>
7485	6683	<name2>	<name2>
7485	7230	<aphaerese>	<aphaerese>
7485	7486	<>	<aphaerese>
7485	7486	<>	<elision3>
7485	7486	<>	<elision2>
7485	7486	<>	<elision1>
7485	6690	.	υ
7485	6866	s	υ
7485	6690	.	u
7485	6866	s	u
7485	6690	.	κ
7485	7272	s	κ
7485	7058	s	k
7485	7067	s	U
7485	7233	s	K
7485	6690	.	α
7485	6866	s	α
7485	6690	.	a
7485	6866	s	a
7485	7188	s	A
7485	6690	.	λ
7485	7272	s	λ
7485	7058	s	l
7485	7246	s	L
7485	7489	<split-h>	<>
7486	6680	.	.
7486	6681	 	 
7486	6680	<~>	<~>
7486	6680	<split-s>	<split-s>
7486	6680	<split-h>	<split-h>
7486	6680	<name2>	<name2>
7486	6684	<aphaerese>	<aphaerese>
7486	7484	<>	<aphaerese>
7486	7484	<>	<elision3>
7486	7484	<>	<elision2>
7486	7484	<>	<elision1>
7486	6688	.	υ
7486	6694	s	υ
7486	6688	.	u
7486	6694	s	u
7486	6688	.	κ
7486	7270	s	κ
7486	7056	s	k
7486	7065	s	U
7486	7231	s	K
7486	6688	.	α
7486	6694	s	α
7486	6688	.	a
7486	6694	s	a
7486	7186	s	A
7486	6688	.	λ
7486	7270	s	λ
7486	7056	s	l
7486	7244	s	L
7486	7487	<split-h>	<>
7487	7488	<>	<aphaerese>
7487	7488	<>	<elision3>
7487	7488	<>	<elision2>
7487	7488	<>	<elision1>
7487	7273	<3s>	<>
7488	7489	<>	<name>
7488	7488	<>	<aphaerese>
7488	7488	<>	<elision3>
7488	7488	<>	<elision2>
7488	7488	<>	<elision1>
7488	7274	<3s>	<>
7489	7487	<>	<aphaerese>
7489	7487	<>	<elision3>
7489	7487	<>	<elision2>
7489	7487	<>	<elision1>
7489	7275	<3s>	<>
7490	128	.	.
7490	129	 	 
7490	128	<~>	<~>
7490	128	<split-s>	<split-s>
7490	128	<split-h>	<split-h>
7490	128	<name2>	<name2>
7490	7491	<>	<name>
7490	132	<aphaerese>	<aphaerese>
7490	7490	<>	<aphaerese>
7490	128	<elision3>	<elision3>
7490	7490	<>	<elision3>
7490	128	<elision2>	<elision2>
7490	7490	<>	<elision2>
7490	128	<elision1>	<elision1>
7490	7490	<>	<elision1>
7490	136	.	υ
7490	6679	s	υ
7490	136	.	u
7490	6679	s	u
7490	7493	.	κ
7490	7484	s	κ
7490	7344	s	k
7490	7365	s	U
7490	7464	s	K
7490	136	.	α
7490	7420	s	α
7490	136	.	a
7490	7420	s	a
7490	7423	s	A
7490	7493	.	λ
7490	7484	s	λ
7490	7429	s	l
7490	7474	s	L
7490	7060	<2s>	<>
7491	131	.	.
7491	134	 	 
7491	131	<~>	<~>
7491	131	<split-s>	<split-s>
7491	131	<split-h>	<split-h>
7491	131	<name2>	<name2>
7491	7463	<aphaerese>	<aphaerese>
7491	7492	<>	<aphaerese>
7491	131	<elision3>	<elision3>
7491	7492	<>	<elision3>
7491	131	<elision2>	<elision2>
7491	7492	<>	<elision2>
7491	131	<elision1>	<elision1>
7491	7492	<>	<elision1>
7491	138	.	υ
7491	7257	s	υ
7491	138	.	u
7491	7257	s	u
7491	7495	.	κ
7491	7486	s	κ
7491	7346	s	k
7491	7367	s	U
7491	7466	s	K
7491	138	.	α
7491	7422	s	α
7491	138	.	a
7491	7422	s	a
7491	7425	s	A
7491	7495	.	λ
7491	7486	s	λ
7491	7431	s	l
7491	7476	s	L
7491	7061	<2s>	<>
7492	128	.	.
7492	129	 	 
7492	128	<~>	<~>
7492	128	<split-s>	<split-s>
7492	128	<split-h>	<split-h>
7492	128	<name2>	<name2>
7492	132	<aphaerese>	<aphaerese>
7492	7490	<>	<aphaerese>
7492	128	<elision3>	<elision3>
7492	7490	<>	<elision3>
7492	128	<elision2>	<elision2>
7492	7490	<>	<elision2>
7492	128	<elision1>	<elision1>
7492	7490	<>	<elision1>
7492	136	.	υ
7492	6679	s	υ
7492	136	.	u
7492	6679	s	u
7492	7493	.	κ
7492	7484	s	κ
7492	7344	s	k
7492	7365	s	U
7492	7464	s	K
7492	136	.	α
7492	7420	s	α
7492	136	.	a
7492	7420	s	a
7492	7423	s	A
7492	7493	.	λ
7492	7484	s	λ
7492	7429	s	l
7492	7474	s	L
7492	7059	<2s>	<>
7493	7494	<>	<name>
7493	7493	<>	<aphaerese>
7493	7496	<elision3>	<elision3>
7493	7493	<>	<elision3>
7493	7496	<elision2>	<elision2>
7493	7493	<>	<elision2>
7493	7496	<elision1>	<elision1>
7493	7493	<>	<elision1>
7493	140	<2s>	<>
7494	7495	<>	<aphaerese>
7494	7499	<elision3>	<elision3>
7494	7495	<>	<elision3>
7494	7499	<elision2>	<elision2>
7494	7495	<>	<elision2>
7494	7499	<elision1>	<elision1>
7494	7495	<>	<elision1>
7494	141	<2s>	<>
7495	7493	<>	<aphaerese>
7495	7496	<elision3>	<elision3>
7495	7493	<>	<elision3>
7495	7496	<elision2>	<elision2>
7495	7493	<>	<elision2>
7495	7496	<elision1>	<elision1>
7495	7493	<>	<elision1>
7495	139	<2s>	<>
7496	7496	.	.
7496	7497	 	 
7496	7496	<~>	<~>
7496	7496	<split-s>	<split-s>
7496	7496	<split-h>	<split-h>
7496	7496	<name2>	<name2>
7496	7522	<>	<name>
7496	7500	<aphaerese>	<aphaerese>
7496	7496	<>	<aphaerese>
7496	7496	<elision3>	<elision3>
7496	7496	<>	<elision3>
7496	7496	<elision2>	<elision2>
7496	7496	<>	<elision2>
7496	7496	<elision1>	<elision1>
7496	7496	<>	<elision1>
7496	7493	.	υ
7496	7420	s	υ
7496	7493	.	u
7496	7420	s	u
7496	7504	.	κ
7496	7510	s	κ
7496	7429	s	k
7496	7365	s	U
7496	7520	s	K
7496	7493	.	α
7496	7420	s	α
7496	7493	.	a
7496	7420	s	a
7496	7423	s	A
7496	7429	s	λ
7496	7429	s	l
7496	7474	s	L
7496	6863	<2s>	<>
7497	7496	.	.
7497	7497	 	 
7497	7496	<~>	<~>
7497	7496	<split-s>	<split-s>
7497	7496	<split-h>	<split-h>
7497	7496	<name2>	<name2>
7497	7498	<>	<name>
7497	7500	<aphaerese>	<aphaerese>
7497	7503	<>	<aphaerese>
7497	7496	<elision3>	<elision3>
7497	7503	<>	<elision3>
7497	7496	<elision2>	<elision2>
7497	7503	<>	<elision2>
7497	7496	<elision1>	<elision1>
7497	7503	<>	<elision1>
7497	7493	.	υ
7497	7456	s	υ
7497	7493	.	u
7497	7456	s	u
7497	7504	.	κ
7497	7517	s	κ
7497	7459	s	k
7497	7450	s	U
7497	7518	s	K
7497	7493	.	α
7497	7456	s	α
7497	7493	.	a
7497	7456	s	a
7497	7457	s	A
7497	7459	s	λ
7497	7459	s	l
7497	7460	s	L
7497	6863	<2s>	<>
7498	7499	.	.
7498	7502	 	 
7498	7499	<~>	<~>
7498	7499	<split-s>	<split-s>
7498	7499	<split-h>	<split-h>
7498	7499	<name2>	<name2>
7498	7519	<aphaerese>	<aphaerese>
7498	7521	<>	<aphaerese>
7498	7499	<elision3>	<elision3>
7498	7521	<>	<elision3>
7498	7499	<elision2>	<elision2>
7498	7521	<>	<elision2>
7498	7499	<elision1>	<elision1>
7498	7521	<>	<elision1>
7498	7495	.	υ
7498	7422	s	υ
7498	7495	.	u
7498	7422	s	u
7498	7506	.	κ
7498	7512	s	κ
7498	7431	s	k
7498	7367	s	U
7498	7372	s	K
7498	7495	.	α
7498	7422	s	α
7498	7495	.	a
7498	7422	s	a
7498	7425	s	A
7498	7431	s	λ
7498	7431	s	l
7498	7434	s	L
7498	6864	<2s>	<>
7499	7496	.	.
7499	7497	 	 
7499	7496	<~>	<~>
7499	7496	<split-s>	<split-s>
7499	7496	<split-h>	<split-h>
7499	7496	<name2>	<name2>
7499	7500	<aphaerese>	<aphaerese>
7499	7496	<>	<aphaerese>
7499	7496	<elision3>	<elision3>
7499	7496	<>	<elision3>
7499	7496	<elision2>	<elision2>
7499	7496	<>	<elision2>
7499	7496	<elision1>	<elision1>
7499	7496	<>	<elision1>
7499	7493	.	υ
7499	7420	s	υ
7499	7493	.	u
7499	7420	s	u
7499	7504	.	κ
7499	7510	s	κ
7499	7429	s	k
7499	7365	s	U
7499	7520	s	K
7499	7493	.	α
7499	7420	s	α
7499	7493	.	a
7499	7420	s	a
7499	7423	s	A
7499	7429	s	λ
7499	7429	s	l
7499	7474	s	L
7499	6862	<2s>	<>
7500	7496	.	.
7500	7497	 	 
7500	7496	<~>	<~>
7500	7496	<split-s>	<split-s>
7500	7496	<split-h>	<split-h>
7500	7496	<name2>	<name2>
7500	7501	<>	<name>
7500	7500	<aphaerese>	<aphaerese>
7500	7500	<>	<aphaerese>
7500	7496	<elision3>	<elision3>
7500	7500	<>	<elision3>
7500	7496	<elision2>	<elision2>
7500	7500	<>	<elision2>
7500	7496	<elision1>	<elision1>
7500	7500	<>	<elision1>
7500	7496	.	υ
7500	7496	.	u
7500	7504	.	κ
7500	7510	s	κ
7500	7429	s	k
7500	7365	s	U
7500	7520	s	K
7500	7496	.	α
7500	7496	.	a
7500	7423	s	A
7500	7429	s	λ
7500	7429	s	l
7500	7474	s	L
7500	6850	<2s>	<>
7501	7499	.	.
7501	7502	 	 
7501	7499	<~>	<~>
7501	7499	<split-s>	<split-s>
7501	7499	<split-h>	<split-h>
7501	7499	<name2>	<name2>
7501	7519	<aphaerese>	<aphaerese>
7501	7519	<>	<aphaerese>
7501	7499	<elision3>	<elision3>
7501	7519	<>	<elision3>
7501	7499	<elision2>	<elision2>
7501	7519	<>	<elision2>
7501	7499	<elision1>	<elision1>
7501	7519	<>	<elision1>
7501	7499	.	υ
7501	7499	.	u
7501	7506	.	κ
7501	7512	s	κ
7501	7431	s	k
7501	7367	s	U
7501	7466	s	K
7501	7499	.	α
7501	7499	.	a
7501	7425	s	A
7501	7431	s	λ
7501	7431	s	l
7501	7476	s	L
7501	6851	<2s>	<>
7502	7496	.	.
7502	7497	 	 
7502	7496	<~>	<~>
7502	7496	<split-s>	<split-s>
7502	7496	<split-h>	<split-h>
7502	7496	<name2>	<name2>
7502	7500	<aphaerese>	<aphaerese>
7502	7503	<>	<aphaerese>
7502	7496	<elision3>	<elision3>
7502	7503	<>	<elision3>
7502	7496	<elision2>	<elision2>
7502	7503	<>	<elision2>
7502	7496	<elision1>	<elision1>
7502	7503	<>	<elision1>
7502	7493	.	υ
7502	7456	s	υ
7502	7493	.	u
7502	7456	s	u
7502	7504	.	κ
7502	7517	s	κ
7502	7459	s	k
7502	7450	s	U
7502	7518	s	K
7502	7493	.	α
7502	7456	s	α
7502	7493	.	a
7502	7456	s	a
7502	7457	s	A
7502	7459	s	λ
7502	7459	s	l
7502	7460	s	L
7502	6862	<2s>	<>
7503	7496	.	.
7503	7497	 	 
7503	7496	<~>	<~>
7503	7496	<split-s>	<split-s>
7503	7496	<split-h>	<split-h>
7503	7496	<name2>	<name2>
7503	7498	<>	<name>
7503	7500	<aphaerese>	<aphaerese>
7503	7503	<>	<aphaerese>
7503	7496	<elision3>	<elision3>
7503	7503	<>	<elision3>
7503	7496	<elision2>	<elision2>
7503	7503	<>	<elision2>
7503	7496	<elision1>	<elision1>
7503	7503	<>	<elision1>
7503	7493	.	υ
7503	7420	s	υ
7503	7493	.	u
7503	7420	s	u
7503	7504	.	κ
7503	7510	s	κ
7503	7429	s	k
7503	7365	s	U
7503	7516	s	K
7503	7493	.	α
7503	7420	s	α
7503	7493	.	a
7503	7420	s	a
7503	7423	s	A
7503	7429	s	λ
7503	7429	s	l
7503	7432	s	L
7503	6863	<2s>	<>
7504	7505	<>	<name>
7504	7504	<>	<aphaerese>
7504	7507	<elision3>	<elision3>
7504	7504	<>	<elision3>
7504	7507	<elision2>	<elision2>
7504	7504	<>	<elision2>
7504	7507	<elision1>	<elision1>
7504	7504	<>	<elision1>
7504	6847	<2s>	<>
7505	7506	<>	<aphaerese>
7505	7509	<elision3>	<elision3>
7505	7506	<>	<elision3>
7505	7509	<elision2>	<elision2>
7505	7506	<>	<elision2>
7505	7509	<elision1>	<elision1>
7505	7506	<>	<elision1>
7505	6848	<2s>	<>
7506	7504	<>	<aphaerese>
7506	7507	<elision3>	<elision3>
7506	7504	<>	<elision3>
7506	7507	<elision2>	<elision2>
7506	7504	<>	<elision2>
7506	7507	<elision1>	<elision1>
7506	7504	<>	<elision1>
7506	6846	<2s>	<>
7507	7508	<>	<name>
7507	7507	<>	<aphaerese>
7507	7507	<>	<elision3>
7507	7507	<>	<elision2>
7507	7507	<>	<elision1>
7507	7286	s	κ
7507	7286	s	k
7507	7282	s	K
7507	7286	s	λ
7507	7286	s	l
7507	7288	s	L
7507	6708	<2s>	<>
7508	7509	<>	<aphaerese>
7508	7509	<>	<elision3>
7508	7509	<>	<elision2>
7508	7509	<>	<elision1>
7508	7285	s	κ
7508	7285	s	k
7508	7284	s	K
7508	7285	s	λ
7508	7285	s	l
7508	7290	s	L
7508	6709	<2s>	<>
7509	7507	<>	<aphaerese>
7509	7507	<>	<elision3>
7509	7507	<>	<elision2>
7509	7507	<>	<elision1>
7509	7286	s	κ
7509	7286	s	k
7509	7282	s	K
7509	7286	s	λ
7509	7286	s	l
7509	7288	s	L
7509	6707	<2s>	<>
7510	7350	.	.
7510	7350	 	 
7510	7350	<~>	<~>
7510	7350	<split-s>	<split-s>
7510	7350	<split-h>	<split-h>
7510	7350	<name2>	<name2>
7510	7511	<>	<name>
7510	7353	<aphaerese>	<aphaerese>
7510	7510	<>	<aphaerese>
7510	7513	<elision3>	<elision3>
7510	7510	<>	<elision3>
7510	7513	<elision2>	<elision2>
7510	7510	<>	<elision2>
7510	7513	<elision1>	<elision1>
7510	7510	<>	<elision1>
7510	7347	.	υ
7510	7347	.	u
7510	7347	.	κ
7510	7347	.	α
7510	7347	.	a
7510	7347	.	λ
7510	7342	<split-h>	<>
7511	7352	.	.
7511	7352	 	 
7511	7352	<~>	<~>
7511	7352	<split-s>	<split-s>
7511	7352	<split-h>	<split-h>
7511	7352	<name2>	<name2>
7511	7355	<aphaerese>	<aphaerese>
7511	7512	<>	<aphaerese>
7511	7515	<elision3>	<elision3>
7511	7512	<>	<elision3>
7511	7515	<elision2>	<elision2>
7511	7512	<>	<elision2>
7511	7515	<elision1>	<elision1>
7511	7512	<>	<elision1>
7511	7349	.	υ
7511	7349	.	u
7511	7349	.	κ
7511	7349	.	α
7511	7349	.	a
7511	7349	.	λ
7511	7343	<split-h>	<>
7512	7350	.	.
7512	7350	 	 
7512	7350	<~>	<~>
7512	7350	<split-s>	<split-s>
7512	7350	<split-h>	<split-h>
7512	7350	<name2>	<name2>
7512	7353	<aphaerese>	<aphaerese>
7512	7510	<>	<aphaerese>
7512	7513	<elision3>	<elision3>
7512	7510	<>	<elision3>
7512	7513	<elision2>	<elision2>
7512	7510	<>	<elision2>
7512	7513	<elision1>	<elision1>
7512	7510	<>	<elision1>
7512	7347	.	υ
7512	7347	.	u
7512	7347	.	κ
7512	7347	.	α
7512	7347	.	a
7512	7347	.	λ
7512	7341	<split-h>	<>
7513	7350	.	.
7513	7350	 	 
7513	7350	<~>	<~>
7513	7350	<split-s>	<split-s>
7513	7350	<split-h>	<split-h>
7513	7350	<name2>	<name2>
7513	7514	<>	<name>
7513	7353	<aphaerese>	<aphaerese>
7513	7513	<>	<aphaerese>
7513	7350	<elision3>	<elision3>
7513	7513	<>	<elision3>
7513	7350	<elision2>	<elision2>
7513	7513	<>	<elision2>
7513	7350	<elision1>	<elision1>
7513	7513	<>	<elision1>
7513	7347	.	υ
7513	7347	.	u
7513	7356	.	κ
7513	7347	.	α
7513	7347	.	a
7513	7339	<split-h>	<>
7514	7352	.	.
7514	7352	 	 
7514	7352	<~>	<~>
7514	7352	<split-s>	<split-s>
7514	7352	<split-h>	<split-h>
7514	7352	<name2>	<name2>
7514	7355	<aphaerese>	<aphaerese>
7514	7515	<>	<aphaerese>
7514	7352	<elision3>	<elision3>
7514	7515	<>	<elision3>
7514	7352	<elision2>	<elision2>
7514	7515	<>	<elision2>
7514	7352	<elision1>	<elision1>
7514	7515	<>	<elision1>
7514	7349	.	υ
7514	7349	.	u
7514	7358	.	κ
7514	7349	.	α
7514	7349	.	a
7514	7340	<split-h>	<>
7515	7350	.	.
7515	7350	 	 
7515	7350	<~>	<~>
7515	7350	<split-s>	<split-s>
7515	7350	<split-h>	<split-h>
7515	7350	<name2>	<name2>
7515	7353	<aphaerese>	<aphaerese>
7515	7513	<>	<aphaerese>
7515	7350	<elision3>	<elision3>
7515	7513	<>	<elision3>
7515	7350	<elision2>	<elision2>
7515	7513	<>	<elision2>
7515	7350	<elision1>	<elision1>
7515	7513	<>	<elision1>
7515	7347	.	υ
7515	7347	.	u
7515	7356	.	κ
7515	7347	.	α
7515	7347	.	a
7515	7338	<split-h>	<>
7516	7418	<name>	<name>
7516	7371	<>	<name>
7516	7373	<>	<aphaerese>
7516	7373	<>	<elision3>
7516	7373	<>	<elision2>
7516	7373	<>	<elision1>
7516	7416	<split-h>	<>
7516	7374	<A2kl>	<>
7516	7392	<L2kl>	<>
7516	7417	<K2kl>	<>
7517	7350	.	.
7517	7350	 	 
7517	7350	<~>	<~>
7517	7350	<split-s>	<split-s>
7517	7350	<split-h>	<split-h>
7517	7350	<name2>	<name2>
7517	7511	<>	<name>
7517	7353	<aphaerese>	<aphaerese>
7517	7510	<>	<aphaerese>
7517	7513	<elision3>	<elision3>
7517	7510	<>	<elision3>
7517	7513	<elision2>	<elision2>
7517	7510	<>	<elision2>
7517	7513	<elision1>	<elision1>
7517	7510	<>	<elision1>
7517	7347	.	υ
7517	7347	.	u
7517	7347	.	κ
7517	7347	.	α
7517	7347	.	a
7517	7347	.	λ
7517	7447	<split-h>	<>
7518	7418	<name>	<name>
7518	7371	<>	<name>
7518	7373	<>	<aphaerese>
7518	7373	<>	<elision3>
7518	7373	<>	<elision2>
7518	7373	<>	<elision1>
7518	7416	<split-h>	<>
7518	7374	<A2kl>	<>
7518	7392	<L2kl>	<>
7518	7454	<K2kl>	<>
7519	7496	.	.
7519	7497	 	 
7519	7496	<~>	<~>
7519	7496	<split-s>	<split-s>
7519	7496	<split-h>	<split-h>
7519	7496	<name2>	<name2>
7519	7500	<aphaerese>	<aphaerese>
7519	7500	<>	<aphaerese>
7519	7496	<elision3>	<elision3>
7519	7500	<>	<elision3>
7519	7496	<elision2>	<elision2>
7519	7500	<>	<elision2>
7519	7496	<elision1>	<elision1>
7519	7500	<>	<elision1>
7519	7496	.	υ
7519	7496	.	u
7519	7504	.	κ
7519	7510	s	κ
7519	7429	s	k
7519	7365	s	U
7519	7520	s	K
7519	7496	.	α
7519	7496	.	a
7519	7423	s	A
7519	7429	s	λ
7519	7429	s	l
7519	7474	s	L
7519	6849	<2s>	<>
7520	7418	<name>	<name>
7520	7465	<>	<name>
7520	7467	<>	<aphaerese>
7520	7467	<>	<elision3>
7520	7467	<>	<elision2>
7520	7467	<>	<elision1>
7520	7416	<split-h>	<>
7520	7468	<L2kl>	<>
7520	7417	<K2kl>	<>
7521	7496	.	.
7521	7497	 	 
7521	7496	<~>	<~>
7521	7496	<split-s>	<split-s>
7521	7496	<split-h>	<split-h>
7521	7496	<name2>	<name2>
7521	7500	<aphaerese>	<aphaerese>
7521	7503	<>	<aphaerese>
7521	7496	<elision3>	<elision3>
7521	7503	<>	<elision3>
7521	7496	<elision2>	<elision2>
7521	7503	<>	<elision2>
7521	7496	<elision1>	<elision1>
7521	7503	<>	<elision1>
7521	7493	.	υ
7521	7420	s	υ
7521	7493	.	u
7521	7420	s	u
7521	7504	.	κ
7521	7510	s	κ
7521	7429	s	k
7521	7365	s	U
7521	7516	s	K
7521	7493	.	α
7521	7420	s	α
7521	7493	.	a
7521	7420	s	a
7521	7423	s	A
7521	7429	s	λ
7521	7429	s	l
7521	7432	s	L
7521	6862	<2s>	<>
7522	7499	.	.
7522	7502	 	 
7522	7499	<~>	<~>
7522	7499	<split-s>	<split-s>
7522	7499	<split-h>	<split-h>
7522	7499	<name2>	<name2>
7522	7519	<aphaerese>	<aphaerese>
7522	7499	<>	<aphaerese>
7522	7499	<elision3>	<elision3>
7522	7499	<>	<elision3>
7522	7499	<elision2>	<elision2>
7522	7499	<>	<elision2>
7522	7499	<elision1>	<elision1>
7522	7499	<>	<elision1>
7522	7495	.	υ
7522	7422	s	υ
7522	7495	.	u
7522	7422	s	u
7522	7506	.	κ
7522	7512	s	κ
7522	7431	s	k
7522	7367	s	U
7522	7466	s	K
7522	7495	.	α
7522	7422	s	α
7522	7495	.	a
7522	7422	s	a
7522	7425	s	A
7522	7431	s	λ
7522	7431	s	l
7522	7476	s	L
7522	6864	<2s>	<>
7523	7524	<name>	<name>
7523	7525	<>	<name>
7523	7527	<>	<aphaerese>
7523	7527	<>	<elision3>
7523	7527	<>	<elision2>
7523	7527	<>	<elision1>
7523	7180	<2s>	<>
7523	7528	<L2kl>	<>
7523	7537	<K2kl>	<>
7524	7466	s	k
7524	7476	s	l
7524	7070	<2s>	<>
7525	7526	<>	<aphaerese>
7525	7526	<>	<elision3>
7525	7526	<>	<elision2>
7525	7526	<>	<elision1>
7525	7529	<L2kl>	<>
7525	7532	<K2kl>	<>
7526	7527	<>	<aphaerese>
7526	7527	<>	<elision3>
7526	7527	<>	<elision2>
7526	7527	<>	<elision1>
7526	7530	<L2kl>	<>
7526	7533	<K2kl>	<>
7527	7525	<>	<name>
7527	7527	<>	<aphaerese>
7527	7527	<>	<elision3>
7527	7527	<>	<elision2>
7527	7527	<>	<elision1>
7527	7528	<L2kl>	<>
7527	7531	<K2kl>	<>
7528	7529	<>	<name>
7528	7528	<>	<aphaerese>
7528	7528	<>	<elision3>
7528	7528	<>	<elision2>
7528	7528	<>	<elision1>
7528	7493	.	κ
7528	7493	.	λ
7528	7239	<2s>	<>
7529	7530	<>	<aphaerese>
7529	7530	<>	<elision3>
7529	7530	<>	<elision2>
7529	7530	<>	<elision1>
7529	7495	.	κ
7529	7495	.	λ
7529	7240	<2s>	<>
7530	7528	<>	<aphaerese>
7530	7528	<>	<elision3>
7530	7528	<>	<elision2>
7530	7528	<>	<elision1>
7530	7493	.	κ
7530	7493	.	λ
7530	7238	<2s>	<>
7531	7496	.	.
7531	7497	 	 
7531	7496	<~>	<~>
7531	7496	<split-s>	<split-s>
7531	7496	<split-h>	<split-h>
7531	7496	<name2>	<name2>
7531	7532	<>	<name>
7531	7500	<aphaerese>	<aphaerese>
7531	7531	<>	<aphaerese>
7531	7496	<elision3>	<elision3>
7531	7531	<>	<elision3>
7531	7496	<elision2>	<elision2>
7531	7531	<>	<elision2>
7531	7496	<elision1>	<elision1>
7531	7531	<>	<elision1>
7531	7493	.	υ
7531	7420	s	υ
7531	7493	.	u
7531	7420	s	u
7531	7534	s	κ
7531	7429	s	k
7531	7365	s	U
7531	7520	s	K
7531	7493	.	α
7531	7420	s	α
7531	7493	.	a
7531	7420	s	a
7531	7423	s	A
7531	7534	s	λ
7531	7429	s	l
7531	7474	s	L
7531	7175	<2s>	<>
7532	7499	.	.
7532	7502	 	 
7532	7499	<~>	<~>
7532	7499	<split-s>	<split-s>
7532	7499	<split-h>	<split-h>
7532	7499	<name2>	<name2>
7532	7519	<aphaerese>	<aphaerese>
7532	7533	<>	<aphaerese>
7532	7499	<elision3>	<elision3>
7532	7533	<>	<elision3>
7532	7499	<elision2>	<elision2>
7532	7533	<>	<elision2>
7532	7499	<elision1>	<elision1>
7532	7533	<>	<elision1>
7532	7495	.	υ
7532	7422	s	υ
7532	7495	.	u
7532	7422	s	u
7532	7536	s	κ
7532	7431	s	k
7532	7367	s	U
7532	7466	s	K
7532	7495	.	α
7532	7422	s	α
7532	7495	.	a
7532	7422	s	a
7532	7425	s	A
7532	7536	s	λ
7532	7431	s	l
7532	7476	s	L
7532	7176	<2s>	<>
7533	7496	.	.
7533	7497	 	 
7533	7496	<~>	<~>
7533	7496	<split-s>	<split-s>
7533	7496	<split-h>	<split-h>
7533	7496	<name2>	<name2>
7533	7500	<aphaerese>	<aphaerese>
7533	7531	<>	<aphaerese>
7533	7496	<elision3>	<elision3>
7533	7531	<>	<elision3>
7533	7496	<elision2>	<elision2>
7533	7531	<>	<elision2>
7533	7496	<elision1>	<elision1>
7533	7531	<>	<elision1>
7533	7493	.	υ
7533	7420	s	υ
7533	7493	.	u
7533	7420	s	u
7533	7534	s	κ
7533	7429	s	k
7533	7365	s	U
7533	7520	s	K
7533	7493	.	α
7533	7420	s	α
7533	7493	.	a
7533	7420	s	a
7533	7423	s	A
7533	7534	s	λ
7533	7429	s	l
7533	7474	s	L
7533	7174	<2s>	<>
7534	7350	.	.
7534	7350	 	 
7534	7350	<~>	<~>
7534	7350	<split-s>	<split-s>
7534	7350	<split-h>	<split-h>
7534	7350	<name2>	<name2>
7534	7535	<>	<name>
7534	7353	<aphaerese>	<aphaerese>
7534	7534	<>	<aphaerese>
7534	7534	<>	<elision3>
7534	7534	<>	<elision2>
7534	7534	<>	<elision1>
7534	7347	.	υ
7534	7347	.	u
7534	7347	.	κ
7534	7347	.	α
7534	7347	.	a
7534	7347	.	λ
7534	7488	<split-h>	<>
7535	7352	.	.
7535	7352	 	 
7535	7352	<~>	<~>
7535	7352	<split-s>	<split-s>
7535	7352	<split-h>	<split-h>
7535	7352	<name2>	<name2>
7535	7355	<aphaerese>	<aphaerese>
7535	7536	<>	<aphaerese>
7535	7536	<>	<elision3>
7535	7536	<>	<elision2>
7535	7536	<>	<elision1>
7535	7349	.	υ
7535	7349	.	u
7535	7349	.	κ
7535	7349	.	α
7535	7349	.	a
7535	7349	.	λ
7535	7489	<split-h>	<>
7536	7350	.	.
7536	7350	 	 
7536	7350	<~>	<~>
7536	7350	<split-s>	<split-s>
7536	7350	<split-h>	<split-h>
7536	7350	<name2>	<name2>
7536	7353	<aphaerese>	<aphaerese>
7536	7534	<>	<aphaerese>
7536	7534	<>	<elision3>
7536	7534	<>	<elision2>
7536	7534	<>	<elision1>
7536	7347	.	υ
7536	7347	.	u
7536	7347	.	κ
7536	7347	.	α
7536	7347	.	a
7536	7347	.	λ
7536	7487	<split-h>	<>
7537	7496	.	.
7537	7497	 	 
7537	7496	<~>	<~>
7537	7496	<split-s>	<split-s>
7537	7496	<split-h>	<split-h>
7537	7496	<name2>	<name2>
7537	7524	<name2>	<name>
7537	7532	<>	<name>
7537	7500	<aphaerese>	<aphaerese>
7537	7531	<>	<aphaerese>
7537	7496	<elision3>	<elision3>
7537	7531	<>	<elision3>
7537	7496	<elision2>	<elision2>
7537	7531	<>	<elision2>
7537	7496	<elision1>	<elision1>
7537	7531	<>	<elision1>
7537	7493	.	υ
7537	7420	s	υ
7537	7493	.	u
7537	7420	s	u
7537	7534	s	κ
7537	7429	s	k
7537	7365	s	U
7537	7520	s	K
7537	7493	.	α
7537	7420	s	α
7537	7493	.	a
7537	7420	s	a
7537	7423	s	A
7537	7534	s	λ
7537	7429	s	l
7537	7474	s	L
7537	7184	<2s>	<>
7538	7496	.	.
7538	7497	 	 
7538	7496	<~>	<~>
7538	7496	<split-s>	<split-s>
7538	7496	<split-h>	<split-h>
7538	7496	<name2>	<name2>
7538	7539	<>	<name>
7538	7500	<aphaerese>	<aphaerese>
7538	7538	<>	<aphaerese>
7538	7496	<elision3>	<elision3>
7538	7538	<>	<elision3>
7538	7496	<elision2>	<elision2>
7538	7538	<>	<elision2>
7538	7496	<elision1>	<elision1>
7538	7538	<>	<elision1>
7538	7493	.	υ
7538	7420	s	υ
7538	7493	.	u
7538	7420	s	u
7538	7493	.	κ
7538	7534	s	κ
7538	7429	s	k
7538	7365	s	U
7538	7520	s	K
7538	7493	.	α
7538	7420	s	α
7538	7493	.	a
7538	7420	s	a
7538	7423	s	A
7538	7493	.	λ
7538	7534	s	λ
7538	7429	s	l
7538	7474	s	L
7538	7060	<2s>	<>
7539	7499	.	.
7539	7502	 	 
7539	7499	<~>	<~>
7539	7499	<split-s>	<split-s>
7539	7499	<split-h>	<split-h>
7539	7499	<name2>	<name2>
7539	7519	<aphaerese>	<aphaerese>
7539	7540	<>	<aphaerese>
7539	7499	<elision3>	<elision3>
7539	7540	<>	<elision3>
7539	7499	<elision2>	<elision2>
7539	7540	<>	<elision2>
7539	7499	<elision1>	<elision1>
7539	7540	<>	<elision1>
7539	7495	.	υ
7539	7422	s	υ
7539	7495	.	u
7539	7422	s	u
7539	7495	.	κ
7539	7536	s	κ
7539	7431	s	k
7539	7367	s	U
7539	7466	s	K
7539	7495	.	α
7539	7422	s	α
7539	7495	.	a
7539	7422	s	a
7539	7425	s	A
7539	7495	.	λ
7539	7536	s	λ
7539	7431	s	l
7539	7476	s	L
7539	7061	<2s>	<>
7540	7496	.	.
7540	7497	 	 
7540	7496	<~>	<~>
7540	7496	<split-s>	<split-s>
7540	7496	<split-h>	<split-h>
7540	7496	<name2>	<name2>
7540	7500	<aphaerese>	<aphaerese>
7540	7538	<>	<aphaerese>
7540	7496	<elision3>	<elision3>
7540	7538	<>	<elision3>
7540	7496	<elision2>	<elision2>
7540	7538	<>	<elision2>
7540	7496	<elision1>	<elision1>
7540	7538	<>	<elision1>
7540	7493	.	υ
7540	7420	s	υ
7540	7493	.	u
7540	7420	s	u
7540	7493	.	κ
7540	7534	s	κ
7540	7429	s	k
7540	7365	s	U
7540	7520	s	K
7540	7493	.	α
7540	7420	s	α
7540	7493	.	a
7540	7420	s	a
7540	7423	s	A
7540	7493	.	λ
7540	7534	s	λ
7540	7429	s	l
7540	7474	s	L
7540	7059	<2s>	<>
7541	7524	<name>	<name>
7541	7542	<>	<name>
7541	7544	<>	<aphaerese>
7541	7544	<>	<elision3>
7541	7544	<>	<elision2>
7541	7544	<>	<elision1>
7541	7180	<2s>	<>
7541	7545	<L2kl>	<>
7542	7543	<>	<aphaerese>
7542	7543	<>	<elision3>
7542	7543	<>	<elision2>
7542	7543	<>	<elision1>
7542	7539	<L2kl>	<>
7543	7544	<>	<aphaerese>
7543	7544	<>	<elision3>
7543	7544	<>	<elision2>
7543	7544	<>	<elision1>
7543	7540	<L2kl>	<>
7544	7542	<>	<name>
7544	7544	<>	<aphaerese>
7544	7544	<>	<elision3>
7544	7544	<>	<elision2>
7544	7544	<>	<elision1>
7544	7538	<L2kl>	<>
7545	7496	.	.
7545	7497	 	 
7545	7496	<~>	<~>
7545	7496	<split-s>	<split-s>
7545	7496	<split-h>	<split-h>
7545	7496	<name2>	<name2>
7545	7524	<name2>	<name>
7545	7539	<>	<name>
7545	7500	<aphaerese>	<aphaerese>
7545	7538	<>	<aphaerese>
7545	7496	<elision3>	<elision3>
7545	7538	<>	<elision3>
7545	7496	<elision2>	<elision2>
7545	7538	<>	<elision2>
7545	7496	<elision1>	<elision1>
7545	7538	<>	<elision1>
7545	7493	.	υ
7545	7420	s	υ
7545	7493	.	u
7545	7420	s	u
7545	7493	.	κ
7545	7534	s	κ
7545	7429	s	k
7545	7365	s	U
7545	7520	s	K
7545	7493	.	α
7545	7420	s	α
7545	7493	.	a
7545	7420	s	a
7545	7423	s	A
7545	7493	.	λ
7545	7534	s	λ
7545	7429	s	l
7545	7474	s	L
7545	7249	<2s>	<>
7546	7547	<>	<name>
7546	7546	<>	<aphaerese>
7546	7546	<>	<elision3>
7546	7546	<>	<elision2>
7546	7546	<>	<elision1>
7546	7549	s	κ
7546	7674	s	k
7546	7692	s	K
7546	7549	s	λ
7546	7705	s	l
7546	7708	s	L
7546	6883	<1s>	<>
7547	7548	<>	<aphaerese>
7547	7548	<>	<elision3>
7547	7548	<>	<elision2>
7547	7548	<>	<elision1>
7547	7670	s	κ
7547	7676	s	k
7547	7695	s	K
7547	7670	s	λ
7547	7707	s	l
7547	7710	s	L
7547	6884	<1s>	<>
7548	7546	<>	<aphaerese>
7548	7546	<>	<elision3>
7548	7546	<>	<elision2>
7548	7546	<>	<elision1>
7548	7549	s	κ
7548	7674	s	k
7548	7692	s	K
7548	7549	s	λ
7548	7705	s	l
7548	7708	s	L
7548	6882	<1s>	<>
7549	7550	.	.
7549	7551	 	 
7549	7550	<~>	<~>
7549	7550	<split-s>	<split-s>
7549	7550	<split-h>	<split-h>
7549	7550	<name2>	<name2>
7549	7669	<>	<name>
7549	7554	<aphaerese>	<aphaerese>
7549	7549	<>	<aphaerese>
7549	7549	<>	<elision3>
7549	7549	<>	<elision2>
7549	7549	<>	<elision1>
7549	7558	.	υ
7549	7561	s	υ
7549	7558	.	u
7549	7561	s	u
7549	7558	.	κ
7549	7671	s	κ
7549	7600	s	k
7549	7603	s	U
7549	7655	s	K
7549	7558	.	α
7549	7561	s	α
7549	7558	.	a
7549	7561	s	a
7549	7633	s	A
7549	7558	.	λ
7549	7671	s	λ
7549	7600	s	l
7549	7662	s	L
7549	7274	<2s>	<>
7550	7550	.	.
7550	7551	 	 
7550	7550	<~>	<~>
7550	7550	<split-s>	<split-s>
7550	7550	<split-h>	<split-h>
7550	7550	<name2>	<name2>
7550	7668	<>	<name>
7550	7554	<aphaerese>	<aphaerese>
7550	7550	<>	<aphaerese>
7550	7550	<elision3>	<elision3>
7550	7550	<>	<elision3>
7550	7550	<elision2>	<elision2>
7550	7550	<>	<elision2>
7550	7550	<elision1>	<elision1>
7550	7550	<>	<elision1>
7550	7558	.	υ
7550	7561	s	υ
7550	7558	.	u
7550	7561	s	u
7550	7579	.	κ
7550	7594	s	κ
7550	7600	s	k
7550	7603	s	U
7550	7655	s	K
7550	7558	.	α
7550	7561	s	α
7550	7558	.	a
7550	7561	s	a
7550	7633	s	A
7550	7600	s	λ
7550	7600	s	l
7550	7662	s	L
7550	6863	<2s>	<>
7551	7550	.	.
7551	7551	 	 
7551	7550	<~>	<~>
7551	7550	<split-s>	<split-s>
7551	7550	<split-h>	<split-h>
7551	7550	<name2>	<name2>
7551	7552	<>	<name>
7551	7554	<aphaerese>	<aphaerese>
7551	7557	<>	<aphaerese>
7551	7550	<elision3>	<elision3>
7551	7557	<>	<elision3>
7551	7550	<elision2>	<elision2>
7551	7557	<>	<elision2>
7551	7550	<elision1>	<elision1>
7551	7557	<>	<elision1>
7551	7558	.	υ
7551	7644	s	υ
7551	7558	.	u
7551	7644	s	u
7551	7579	.	κ
7551	7645	s	κ
7551	7646	s	k
7551	7647	s	U
7551	7649	s	K
7551	7558	.	α
7551	7644	s	α
7551	7558	.	a
7551	7644	s	a
7551	7651	s	A
7551	7646	s	λ
7551	7646	s	l
7551	7652	s	L
7551	6863	<2s>	<>
7552	7553	.	.
7552	7556	 	 
7552	7553	<~>	<~>
7552	7553	<split-s>	<split-s>
7552	7553	<split-h>	<split-h>
7552	7553	<name2>	<name2>
7552	7654	<aphaerese>	<aphaerese>
7552	7667	<>	<aphaerese>
7552	7553	<elision3>	<elision3>
7552	7667	<>	<elision3>
7552	7553	<elision2>	<elision2>
7552	7667	<>	<elision2>
7552	7553	<elision1>	<elision1>
7552	7667	<>	<elision1>
7552	7560	.	υ
7552	7578	s	υ
7552	7560	.	u
7552	7578	s	u
7552	7581	.	κ
7552	7596	s	κ
7552	7602	s	k
7552	7605	s	U
7552	7609	s	K
7552	7560	.	α
7552	7578	s	α
7552	7560	.	a
7552	7578	s	a
7552	7635	s	A
7552	7602	s	λ
7552	7602	s	l
7552	7638	s	L
7552	6864	<2s>	<>
7553	7550	.	.
7553	7551	 	 
7553	7550	<~>	<~>
7553	7550	<split-s>	<split-s>
7553	7550	<split-h>	<split-h>
7553	7550	<name2>	<name2>
7553	7554	<aphaerese>	<aphaerese>
7553	7550	<>	<aphaerese>
7553	7550	<elision3>	<elision3>
7553	7550	<>	<elision3>
7553	7550	<elision2>	<elision2>
7553	7550	<>	<elision2>
7553	7550	<elision1>	<elision1>
7553	7550	<>	<elision1>
7553	7558	.	υ
7553	7561	s	υ
7553	7558	.	u
7553	7561	s	u
7553	7579	.	κ
7553	7594	s	κ
7553	7600	s	k
7553	7603	s	U
7553	7655	s	K
7553	7558	.	α
7553	7561	s	α
7553	7558	.	a
7553	7561	s	a
7553	7633	s	A
7553	7600	s	λ
7553	7600	s	l
7553	7662	s	L
7553	6862	<2s>	<>
7554	7550	.	.
7554	7551	 	 
7554	7550	<~>	<~>
7554	7550	<split-s>	<split-s>
7554	7550	<split-h>	<split-h>
7554	7550	<name2>	<name2>
7554	7555	<>	<name>
7554	7554	<aphaerese>	<aphaerese>
7554	7554	<>	<aphaerese>
7554	7550	<elision3>	<elision3>
7554	7554	<>	<elision3>
7554	7550	<elision2>	<elision2>
7554	7554	<>	<elision2>
7554	7550	<elision1>	<elision1>
7554	7554	<>	<elision1>
7554	7550	.	υ
7554	7550	.	u
7554	7579	.	κ
7554	7594	s	κ
7554	7600	s	k
7554	7603	s	U
7554	7655	s	K
7554	7550	.	α
7554	7550	.	a
7554	7633	s	A
7554	7600	s	λ
7554	7600	s	l
7554	7662	s	L
7554	6850	<2s>	<>
7555	7553	.	.
7555	7556	 	 
7555	7553	<~>	<~>
7555	7553	<split-s>	<split-s>
7555	7553	<split-h>	<split-h>
7555	7553	<name2>	<name2>
7555	7654	<aphaerese>	<aphaerese>
7555	7654	<>	<aphaerese>
7555	7553	<elision3>	<elision3>
7555	7654	<>	<elision3>
7555	7553	<elision2>	<elision2>
7555	7654	<>	<elision2>
7555	7553	<elision1>	<elision1>
7555	7654	<>	<elision1>
7555	7553	.	υ
7555	7553	.	u
7555	7581	.	κ
7555	7596	s	κ
7555	7602	s	k
7555	7605	s	U
7555	7657	s	K
7555	7553	.	α
7555	7553	.	a
7555	7635	s	A
7555	7602	s	λ
7555	7602	s	l
7555	7664	s	L
7555	6851	<2s>	<>
7556	7550	.	.
7556	7551	 	 
7556	7550	<~>	<~>
7556	7550	<split-s>	<split-s>
7556	7550	<split-h>	<split-h>
7556	7550	<name2>	<name2>
7556	7554	<aphaerese>	<aphaerese>
7556	7557	<>	<aphaerese>
7556	7550	<elision3>	<elision3>
7556	7557	<>	<elision3>
7556	7550	<elision2>	<elision2>
7556	7557	<>	<elision2>
7556	7550	<elision1>	<elision1>
7556	7557	<>	<elision1>
7556	7558	.	υ
7556	7644	s	υ
7556	7558	.	u
7556	7644	s	u
7556	7579	.	κ
7556	7645	s	κ
7556	7646	s	k
7556	7647	s	U
7556	7649	s	K
7556	7558	.	α
7556	7644	s	α
7556	7558	.	a
7556	7644	s	a
7556	7651	s	A
7556	7646	s	λ
7556	7646	s	l
7556	7652	s	L
7556	6862	<2s>	<>
7557	7550	.	.
7557	7551	 	 
7557	7550	<~>	<~>
7557	7550	<split-s>	<split-s>
7557	7550	<split-h>	<split-h>
7557	7550	<name2>	<name2>
7557	7552	<>	<name>
7557	7554	<aphaerese>	<aphaerese>
7557	7557	<>	<aphaerese>
7557	7550	<elision3>	<elision3>
7557	7557	<>	<elision3>
7557	7550	<elision2>	<elision2>
7557	7557	<>	<elision2>
7557	7550	<elision1>	<elision1>
7557	7557	<>	<elision1>
7557	7558	.	υ
7557	7561	s	υ
7557	7558	.	u
7557	7561	s	u
7557	7579	.	κ
7557	7594	s	κ
7557	7600	s	k
7557	7603	s	U
7557	7606	s	K
7557	7558	.	α
7557	7561	s	α
7557	7558	.	a
7557	7561	s	a
7557	7633	s	A
7557	7600	s	λ
7557	7600	s	l
7557	7636	s	L
7557	6863	<2s>	<>
7558	7559	<>	<name>
7558	7558	<>	<aphaerese>
7558	7550	<elision3>	<elision3>
7558	7558	<>	<elision3>
7558	7550	<elision2>	<elision2>
7558	7558	<>	<elision2>
7558	7550	<elision1>	<elision1>
7558	7558	<>	<elision1>
7558	140	<2s>	<>
7559	7560	<>	<aphaerese>
7559	7553	<elision3>	<elision3>
7559	7560	<>	<elision3>
7559	7553	<elision2>	<elision2>
7559	7560	<>	<elision2>
7559	7553	<elision1>	<elision1>
7559	7560	<>	<elision1>
7559	141	<2s>	<>
7560	7558	<>	<aphaerese>
7560	7550	<elision3>	<elision3>
7560	7558	<>	<elision3>
7560	7550	<elision2>	<elision2>
7560	7558	<>	<elision2>
7560	7550	<elision1>	<elision1>
7560	7558	<>	<elision1>
7560	139	<2s>	<>
7561	7562	.	.
7561	7562	 	 
7561	7562	<~>	<~>
7561	7562	<split-s>	<split-s>
7561	7562	<split-h>	<split-h>
7561	7562	<name2>	<name2>
7561	7577	<>	<name>
7561	7565	<aphaerese>	<aphaerese>
7561	7561	<>	<aphaerese>
7561	7561	<>	<elision3>
7561	7561	<>	<elision2>
7561	7561	<>	<elision1>
7561	7574	.	υ
7561	7574	.	u
7561	7568	.	κ
7561	7574	.	α
7561	7574	.	a
7561	7259	<split-s>	<>
7562	7562	.	.
7562	7562	 	 
7562	7562	<~>	<~>
7562	7562	<split-s>	<split-s>
7562	7562	<split-h>	<split-h>
7562	7562	<name2>	<name2>
7562	7563	<>	<name>
7562	7565	<aphaerese>	<aphaerese>
7562	7562	<>	<aphaerese>
7562	7562	<elision3>	<elision3>
7562	7562	<>	<elision3>
7562	7562	<elision2>	<elision2>
7562	7562	<>	<elision2>
7562	7562	<elision1>	<elision1>
7562	7562	<>	<elision1>
7562	7574	.	υ
7562	7574	.	u
7562	7568	.	κ
7562	7574	.	α
7562	7574	.	a
7562	7205	<split-s>	<>
7563	7564	.	.
7563	7564	 	 
7563	7564	<~>	<~>
7563	7564	<split-s>	<split-s>
7563	7564	<split-h>	<split-h>
7563	7564	<name2>	<name2>
7563	7567	<aphaerese>	<aphaerese>
7563	7564	<>	<aphaerese>
7563	7564	<elision3>	<elision3>
7563	7564	<>	<elision3>
7563	7564	<elision2>	<elision2>
7563	7564	<>	<elision2>
7563	7564	<elision1>	<elision1>
7563	7564	<>	<elision1>
7563	7576	.	υ
7563	7576	.	u
7563	7570	.	κ
7563	7576	.	α
7563	7576	.	a
7563	7206	<split-s>	<>
7564	7562	.	.
7564	7562	 	 
7564	7562	<~>	<~>
7564	7562	<split-s>	<split-s>
7564	7562	<split-h>	<split-h>
7564	7562	<name2>	<name2>
7564	7565	<aphaerese>	<aphaerese>
7564	7562	<>	<aphaerese>
7564	7562	<elision3>	<elision3>
7564	7562	<>	<elision3>
7564	7562	<elision2>	<elision2>
7564	7562	<>	<elision2>
7564	7562	<elision1>	<elision1>
7564	7562	<>	<elision1>
7564	7574	.	υ
7564	7574	.	u
7564	7568	.	κ
7564	7574	.	α
7564	7574	.	a
7564	7207	<split-s>	<>
7565	7562	.	.
7565	7562	 	 
7565	7562	<~>	<~>
7565	7562	<split-s>	<split-s>
7565	7562	<split-h>	<split-h>
7565	7562	<name2>	<name2>
7565	7566	<>	<name>
7565	7565	<aphaerese>	<aphaerese>
7565	7565	<>	<aphaerese>
7565	7562	<elision3>	<elision3>
7565	7565	<>	<elision3>
7565	7562	<elision2>	<elision2>
7565	7565	<>	<elision2>
7565	7562	<elision1>	<elision1>
7565	7565	<>	<elision1>
7565	7562	.	υ
7565	7562	.	u
7565	7568	.	κ
7565	7562	.	α
7565	7562	.	a
7565	7252	<split-s>	<>
7566	7564	.	.
7566	7564	 	 
7566	7564	<~>	<~>
7566	7564	<split-s>	<split-s>
7566	7564	<split-h>	<split-h>
7566	7564	<name2>	<name2>
7566	7567	<aphaerese>	<aphaerese>
7566	7567	<>	<aphaerese>
7566	7564	<elision3>	<elision3>
7566	7567	<>	<elision3>
7566	7564	<elision2>	<elision2>
7566	7567	<>	<elision2>
7566	7564	<elision1>	<elision1>
7566	7567	<>	<elision1>
7566	7564	.	υ
7566	7564	.	u
7566	7570	.	κ
7566	7564	.	α
7566	7564	.	a
7566	7253	<split-s>	<>
7567	7562	.	.
7567	7562	 	 
7567	7562	<~>	<~>
7567	7562	<split-s>	<split-s>
7567	7562	<split-h>	<split-h>
7567	7562	<name2>	<name2>
7567	7565	<aphaerese>	<aphaerese>
7567	7565	<>	<aphaerese>
7567	7562	<elision3>	<elision3>
7567	7565	<>	<elision3>
7567	7562	<elision2>	<elision2>
7567	7565	<>	<elision2>
7567	7562	<elision1>	<elision1>
7567	7565	<>	<elision1>
7567	7562	.	υ
7567	7562	.	u
7567	7568	.	κ
7567	7562	.	α
7567	7562	.	a
7567	7251	<split-s>	<>
7568	7569	<>	<name>
7568	7568	<>	<aphaerese>
7568	7571	<elision3>	<elision3>
7568	7568	<>	<elision3>
7568	7571	<elision2>	<elision2>
7568	7568	<>	<elision2>
7568	7571	<elision1>	<elision1>
7568	7568	<>	<elision1>
7568	6942	<split-s>	<>
7569	7570	<>	<aphaerese>
7569	7573	<elision3>	<elision3>
7569	7570	<>	<elision3>
7569	7573	<elision2>	<elision2>
7569	7570	<>	<elision2>
7569	7573	<elision1>	<elision1>
7569	7570	<>	<elision1>
7569	6943	<split-s>	<>
7570	7568	<>	<aphaerese>
7570	7571	<elision3>	<elision3>
7570	7568	<>	<elision3>
7570	7571	<elision2>	<elision2>
7570	7568	<>	<elision2>
7570	7571	<elision1>	<elision1>
7570	7568	<>	<elision1>
7570	6941	<split-s>	<>
7571	7572	<>	<name>
7571	7571	<>	<aphaerese>
7571	7571	<>	<elision3>
7571	7571	<>	<elision2>
7571	7571	<>	<elision1>
7571	6939	<split-s>	<>
7572	7573	<>	<aphaerese>
7572	7573	<>	<elision3>
7572	7573	<>	<elision2>
7572	7573	<>	<elision1>
7572	6940	<split-s>	<>
7573	7571	<>	<aphaerese>
7573	7571	<>	<elision3>
7573	7571	<>	<elision2>
7573	7571	<>	<elision1>
7573	6938	<split-s>	<>
7574	7575	<>	<name>
7574	7574	<>	<aphaerese>
7574	7562	<elision3>	<elision3>
7574	7574	<>	<elision3>
7574	7562	<elision2>	<elision2>
7574	7574	<>	<elision2>
7574	7562	<elision1>	<elision1>
7574	7574	<>	<elision1>
7574	6692	<split-s>	<>
7575	7576	<>	<aphaerese>
7575	7564	<elision3>	<elision3>
7575	7576	<>	<elision3>
7575	7564	<elision2>	<elision2>
7575	7576	<>	<elision2>
7575	7564	<elision1>	<elision1>
7575	7576	<>	<elision1>
7575	6693	<split-s>	<>
7576	7574	<>	<aphaerese>
7576	7562	<elision3>	<elision3>
7576	7574	<>	<elision3>
7576	7562	<elision2>	<elision2>
7576	7574	<>	<elision2>
7576	7562	<elision1>	<elision1>
7576	7574	<>	<elision1>
7576	6691	<split-s>	<>
7577	7564	.	.
7577	7564	 	 
7577	7564	<~>	<~>
7577	7564	<split-s>	<split-s>
7577	7564	<split-h>	<split-h>
7577	7564	<name2>	<name2>
7577	7567	<aphaerese>	<aphaerese>
7577	7578	<>	<aphaerese>
7577	7578	<>	<elision3>
7577	7578	<>	<elision2>
7577	7578	<>	<elision1>
7577	7576	.	υ
7577	7576	.	u
7577	7570	.	κ
7577	7576	.	α
7577	7576	.	a
7577	7260	<split-s>	<>
7578	7562	.	.
7578	7562	 	 
7578	7562	<~>	<~>
7578	7562	<split-s>	<split-s>
7578	7562	<split-h>	<split-h>
7578	7562	<name2>	<name2>
7578	7565	<aphaerese>	<aphaerese>
7578	7561	<>	<aphaerese>
7578	7561	<>	<elision3>
7578	7561	<>	<elision2>
7578	7561	<>	<elision1>
7578	7574	.	υ
7578	7574	.	u
7578	7568	.	κ
7578	7574	.	α
7578	7574	.	a
7578	7258	<split-s>	<>
7579	7580	<>	<name>
7579	7579	<>	<aphaerese>
7579	7582	<elision3>	<elision3>
7579	7579	<>	<elision3>
7579	7582	<elision2>	<elision2>
7579	7579	<>	<elision2>
7579	7582	<elision1>	<elision1>
7579	7579	<>	<elision1>
7579	6847	<2s>	<>
7580	7581	<>	<aphaerese>
7580	7584	<elision3>	<elision3>
7580	7581	<>	<elision3>
7580	7584	<elision2>	<elision2>
7580	7581	<>	<elision2>
7580	7584	<elision1>	<elision1>
7580	7581	<>	<elision1>
7580	6848	<2s>	<>
7581	7579	<>	<aphaerese>
7581	7582	<elision3>	<elision3>
7581	7579	<>	<elision3>
7581	7582	<elision2>	<elision2>
7581	7579	<>	<elision2>
7581	7582	<elision1>	<elision1>
7581	7579	<>	<elision1>
7581	6846	<2s>	<>
7582	7583	<>	<name>
7582	7582	<>	<aphaerese>
7582	7582	<>	<elision3>
7582	7582	<>	<elision2>
7582	7582	<>	<elision1>
7582	7585	s	κ
7582	7585	s	k
7582	7588	s	K
7582	7585	s	λ
7582	7585	s	l
7582	7591	s	L
7582	6708	<2s>	<>
7583	7584	<>	<aphaerese>
7583	7584	<>	<elision3>
7583	7584	<>	<elision2>
7583	7584	<>	<elision1>
7583	7587	s	κ
7583	7587	s	k
7583	7590	s	K
7583	7587	s	λ
7583	7587	s	l
7583	7593	s	L
7583	6709	<2s>	<>
7584	7582	<>	<aphaerese>
7584	7582	<>	<elision3>
7584	7582	<>	<elision2>
7584	7582	<>	<elision1>
7584	7585	s	κ
7584	7585	s	k
7584	7588	s	K
7584	7585	s	λ
7584	7585	s	l
7584	7591	s	L
7584	6707	<2s>	<>
7585	7586	<>	<name>
7585	7585	<>	<aphaerese>
7585	7585	<>	<elision3>
7585	7585	<>	<elision2>
7585	7585	<>	<elision1>
7585	7280	<split-s>	<>
7586	7587	<>	<aphaerese>
7586	7587	<>	<elision3>
7586	7587	<>	<elision2>
7586	7587	<>	<elision1>
7586	7281	<split-s>	<>
7587	7585	<>	<aphaerese>
7587	7585	<>	<elision3>
7587	7585	<>	<elision2>
7587	7585	<>	<elision1>
7587	7279	<split-s>	<>
7588	7589	<>	<name>
7588	7588	<>	<aphaerese>
7588	7588	<>	<elision3>
7588	7588	<>	<elision2>
7588	7588	<>	<elision1>
7588	7585	<K2kl>	<>
7589	7590	<>	<aphaerese>
7589	7590	<>	<elision3>
7589	7590	<>	<elision2>
7589	7590	<>	<elision1>
7589	7586	<K2kl>	<>
7590	7588	<>	<aphaerese>
7590	7588	<>	<elision3>
7590	7588	<>	<elision2>
7590	7588	<>	<elision1>
7590	7587	<K2kl>	<>
7591	7592	<>	<name>
7591	7591	<>	<aphaerese>
7591	7591	<>	<elision3>
7591	7591	<>	<elision2>
7591	7591	<>	<elision1>
7591	7585	<L2kl>	<>
7592	7593	<>	<aphaerese>
7592	7593	<>	<elision3>
7592	7593	<>	<elision2>
7592	7593	<>	<elision1>
7592	7586	<L2kl>	<>
7593	7591	<>	<aphaerese>
7593	7591	<>	<elision3>
7593	7591	<>	<elision2>
7593	7591	<>	<elision1>
7593	7587	<L2kl>	<>
7594	7562	.	.
7594	7562	 	 
7594	7562	<~>	<~>
7594	7562	<split-s>	<split-s>
7594	7562	<split-h>	<split-h>
7594	7562	<name2>	<name2>
7594	7595	<>	<name>
7594	7565	<aphaerese>	<aphaerese>
7594	7594	<>	<aphaerese>
7594	7597	<elision3>	<elision3>
7594	7594	<>	<elision3>
7594	7597	<elision2>	<elision2>
7594	7594	<>	<elision2>
7594	7597	<elision1>	<elision1>
7594	7594	<>	<elision1>
7594	7574	.	υ
7594	7574	.	u
7594	7574	.	κ
7594	7574	.	α
7594	7574	.	a
7594	7574	.	λ
7594	7342	<split-s>	<>
7595	7564	.	.
7595	7564	 	 
7595	7564	<~>	<~>
7595	7564	<split-s>	<split-s>
7595	7564	<split-h>	<split-h>
7595	7564	<name2>	<name2>
7595	7567	<aphaerese>	<aphaerese>
7595	7596	<>	<aphaerese>
7595	7599	<elision3>	<elision3>
7595	7596	<>	<elision3>
7595	7599	<elision2>	<elision2>
7595	7596	<>	<elision2>
7595	7599	<elision1>	<elision1>
7595	7596	<>	<elision1>
7595	7576	.	υ
7595	7576	.	u
7595	7576	.	κ
7595	7576	.	α
7595	7576	.	a
7595	7576	.	λ
7595	7343	<split-s>	<>
7596	7562	.	.
7596	7562	 	 
7596	7562	<~>	<~>
7596	7562	<split-s>	<split-s>
7596	7562	<split-h>	<split-h>
7596	7562	<name2>	<name2>
7596	7565	<aphaerese>	<aphaerese>
7596	7594	<>	<aphaerese>
7596	7597	<elision3>	<elision3>
7596	7594	<>	<elision3>
7596	7597	<elision2>	<elision2>
7596	7594	<>	<elision2>
7596	7597	<elision1>	<elision1>
7596	7594	<>	<elision1>
7596	7574	.	υ
7596	7574	.	u
7596	7574	.	κ
7596	7574	.	α
7596	7574	.	a
7596	7574	.	λ
7596	7341	<split-s>	<>
7597	7562	.	.
7597	7562	 	 
7597	7562	<~>	<~>
7597	7562	<split-s>	<split-s>
7597	7562	<split-h>	<split-h>
7597	7562	<name2>	<name2>
7597	7598	<>	<name>
7597	7565	<aphaerese>	<aphaerese>
7597	7597	<>	<aphaerese>
7597	7562	<elision3>	<elision3>
7597	7597	<>	<elision3>
7597	7562	<elision2>	<elision2>
7597	7597	<>	<elision2>
7597	7562	<elision1>	<elision1>
7597	7597	<>	<elision1>
7597	7574	.	υ
7597	7574	.	u
7597	7568	.	κ
7597	7574	.	α
7597	7574	.	a
7597	7339	<split-s>	<>
7598	7564	.	.
7598	7564	 	 
7598	7564	<~>	<~>
7598	7564	<split-s>	<split-s>
7598	7564	<split-h>	<split-h>
7598	7564	<name2>	<name2>
7598	7567	<aphaerese>	<aphaerese>
7598	7599	<>	<aphaerese>
7598	7564	<elision3>	<elision3>
7598	7599	<>	<elision3>
7598	7564	<elision2>	<elision2>
7598	7599	<>	<elision2>
7598	7564	<elision1>	<elision1>
7598	7599	<>	<elision1>
7598	7576	.	υ
7598	7576	.	u
7598	7570	.	κ
7598	7576	.	α
7598	7576	.	a
7598	7340	<split-s>	<>
7599	7562	.	.
7599	7562	 	 
7599	7562	<~>	<~>
7599	7562	<split-s>	<split-s>
7599	7562	<split-h>	<split-h>
7599	7562	<name2>	<name2>
7599	7565	<aphaerese>	<aphaerese>
7599	7597	<>	<aphaerese>
7599	7562	<elision3>	<elision3>
7599	7597	<>	<elision3>
7599	7562	<elision2>	<elision2>
7599	7597	<>	<elision2>
7599	7562	<elision1>	<elision1>
7599	7597	<>	<elision1>
7599	7574	.	υ
7599	7574	.	u
7599	7568	.	κ
7599	7574	.	α
7599	7574	.	a
7599	7338	<split-s>	<>
7600	7562	.	.
7600	7562	 	 
7600	7562	<~>	<~>
7600	7562	<split-s>	<split-s>
7600	7562	<split-h>	<split-h>
7600	7562	<name2>	<name2>
7600	7601	<>	<name>
7600	7565	<aphaerese>	<aphaerese>
7600	7600	<>	<aphaerese>
7600	7562	<elision3>	<elision3>
7600	7600	<>	<elision3>
7600	7562	<elision2>	<elision2>
7600	7600	<>	<elision2>
7600	7562	<elision1>	<elision1>
7600	7600	<>	<elision1>
7600	7574	.	υ
7600	7574	.	u
7600	7574	.	κ
7600	7574	.	α
7600	7574	.	a
7600	7574	.	λ
7600	7363	<split-s>	<>
7601	7564	.	.
7601	7564	 	 
7601	7564	<~>	<~>
7601	7564	<split-s>	<split-s>
7601	7564	<split-h>	<split-h>
7601	7564	<name2>	<name2>
7601	7567	<aphaerese>	<aphaerese>
7601	7602	<>	<aphaerese>
7601	7564	<elision3>	<elision3>
7601	7602	<>	<elision3>
7601	7564	<elision2>	<elision2>
7601	7602	<>	<elision2>
7601	7564	<elision1>	<elision1>
7601	7602	<>	<elision1>
7601	7576	.	υ
7601	7576	.	u
7601	7576	.	κ
7601	7576	.	α
7601	7576	.	a
7601	7576	.	λ
7601	7364	<split-s>	<>
7602	7562	.	.
7602	7562	 	 
7602	7562	<~>	<~>
7602	7562	<split-s>	<split-s>
7602	7562	<split-h>	<split-h>
7602	7562	<name2>	<name2>
7602	7565	<aphaerese>	<aphaerese>
7602	7600	<>	<aphaerese>
7602	7562	<elision3>	<elision3>
7602	7600	<>	<elision3>
7602	7562	<elision2>	<elision2>
7602	7600	<>	<elision2>
7602	7562	<elision1>	<elision1>
7602	7600	<>	<elision1>
7602	7574	.	υ
7602	7574	.	u
7602	7574	.	κ
7602	7574	.	α
7602	7574	.	a
7602	7574	.	λ
7602	7362	<split-s>	<>
7603	7604	<>	<name>
7603	7603	<>	<aphaerese>
7603	7603	<>	<elision3>
7603	7603	<>	<elision2>
7603	7603	<>	<elision1>
7603	7562	<U2kl>	<>
7604	7605	<>	<aphaerese>
7604	7605	<>	<elision3>
7604	7605	<>	<elision2>
7604	7605	<>	<elision1>
7604	7563	<U2kl>	<>
7605	7603	<>	<aphaerese>
7605	7603	<>	<elision3>
7605	7603	<>	<elision2>
7605	7603	<>	<elision1>
7605	7564	<U2kl>	<>
7606	7607	<name>	<name>
7606	7608	<>	<name>
7606	7610	<>	<aphaerese>
7606	7610	<>	<elision3>
7606	7610	<>	<elision2>
7606	7610	<>	<elision1>
7606	7416	<split-s>	<>
7606	7611	<A2kl>	<>
7606	7620	<L2kl>	<>
7606	7632	<K2kl>	<>
7607	7370	<split-s>	<>
7608	7609	<>	<aphaerese>
7608	7609	<>	<elision3>
7608	7609	<>	<elision2>
7608	7609	<>	<elision1>
7608	7612	<A2kl>	<>
7608	7621	<L2kl>	<>
7608	7630	<K2kl>	<>
7609	7610	<>	<aphaerese>
7609	7610	<>	<elision3>
7609	7610	<>	<elision2>
7609	7610	<>	<elision1>
7609	7613	<A2kl>	<>
7609	7622	<L2kl>	<>
7609	7631	<K2kl>	<>
7610	7608	<>	<name>
7610	7610	<>	<aphaerese>
7610	7610	<>	<elision3>
7610	7610	<>	<elision2>
7610	7610	<>	<elision1>
7610	7611	<A2kl>	<>
7610	7620	<L2kl>	<>
7610	7629	<K2kl>	<>
7611	7612	<>	<name>
7611	7611	<>	<aphaerese>
7611	7611	<>	<elision3>
7611	7611	<>	<elision2>
7611	7611	<>	<elision1>
7611	7614	.	κ
7611	7614	.	λ
7611	7390	<split-s>	<>
7612	7613	<>	<aphaerese>
7612	7613	<>	<elision3>
7612	7613	<>	<elision2>
7612	7613	<>	<elision1>
7612	7616	.	κ
7612	7616	.	λ
7612	7391	<split-s>	<>
7613	7611	<>	<aphaerese>
7613	7611	<>	<elision3>
7613	7611	<>	<elision2>
7613	7611	<>	<elision1>
7613	7614	.	κ
7613	7614	.	λ
7613	7389	<split-s>	<>
7614	7615	<>	<name>
7614	7614	<>	<aphaerese>
7614	7617	<elision3>	<elision3>
7614	7614	<>	<elision3>
7614	7617	<elision2>	<elision2>
7614	7614	<>	<elision2>
7614	7617	<elision1>	<elision1>
7614	7614	<>	<elision1>
7614	7387	<split-s>	<>
7615	7616	<>	<aphaerese>
7615	7619	<elision3>	<elision3>
7615	7616	<>	<elision3>
7615	7619	<elision2>	<elision2>
7615	7616	<>	<elision2>
7615	7619	<elision1>	<elision1>
7615	7616	<>	<elision1>
7615	7388	<split-s>	<>
7616	7614	<>	<aphaerese>
7616	7617	<elision3>	<elision3>
7616	7614	<>	<elision3>
7616	7617	<elision2>	<elision2>
7616	7614	<>	<elision2>
7616	7617	<elision1>	<elision1>
7616	7614	<>	<elision1>
7616	7386	<split-s>	<>
7617	7562	.	.
7617	7562	 	 
7617	7562	<~>	<~>
7617	7562	<split-s>	<split-s>
7617	7562	<split-h>	<split-h>
7617	7562	<name2>	<name2>
7617	7618	<>	<name>
7617	7565	<aphaerese>	<aphaerese>
7617	7617	<>	<aphaerese>
7617	7562	<elision3>	<elision3>
7617	7617	<>	<elision3>
7617	7562	<elision2>	<elision2>
7617	7617	<>	<elision2>
7617	7562	<elision1>	<elision1>
7617	7617	<>	<elision1>
7617	7574	.	υ
7617	7574	.	u
7617	7574	.	α
7617	7574	.	a
7617	7384	<split-s>	<>
7618	7564	.	.
7618	7564	 	 
7618	7564	<~>	<~>
7618	7564	<split-s>	<split-s>
7618	7564	<split-h>	<split-h>
7618	7564	<name2>	<name2>
7618	7567	<aphaerese>	<aphaerese>
7618	7619	<>	<aphaerese>
7618	7564	<elision3>	<elision3>
7618	7619	<>	<elision3>
7618	7564	<elision2>	<elision2>
7618	7619	<>	<elision2>
7618	7564	<elision1>	<elision1>
7618	7619	<>	<elision1>
7618	7576	.	υ
7618	7576	.	u
7618	7576	.	α
7618	7576	.	a
7618	7385	<split-s>	<>
7619	7562	.	.
7619	7562	 	 
7619	7562	<~>	<~>
7619	7562	<split-s>	<split-s>
7619	7562	<split-h>	<split-h>
7619	7562	<name2>	<name2>
7619	7565	<aphaerese>	<aphaerese>
7619	7617	<>	<aphaerese>
7619	7562	<elision3>	<elision3>
7619	7617	<>	<elision3>
7619	7562	<elision2>	<elision2>
7619	7617	<>	<elision2>
7619	7562	<elision1>	<elision1>
7619	7617	<>	<elision1>
7619	7574	.	υ
7619	7574	.	u
7619	7574	.	α
7619	7574	.	a
7619	7383	<split-s>	<>
7620	7621	<>	<name>
7620	7620	<>	<aphaerese>
7620	7620	<>	<elision3>
7620	7620	<>	<elision2>
7620	7620	<>	<elision1>
7620	7623	.	κ
7620	7623	.	λ
7620	7408	<split-s>	<>
7621	7622	<>	<aphaerese>
7621	7622	<>	<elision3>
7621	7622	<>	<elision2>
7621	7622	<>	<elision1>
7621	7625	.	κ
7621	7625	.	λ
7621	7409	<split-s>	<>
7622	7620	<>	<aphaerese>
7622	7620	<>	<elision3>
7622	7620	<>	<elision2>
7622	7620	<>	<elision1>
7622	7623	.	κ
7622	7623	.	λ
7622	7407	<split-s>	<>
7623	7624	<>	<name>
7623	7623	<>	<aphaerese>
7623	7626	<elision3>	<elision3>
7623	7623	<>	<elision3>
7623	7626	<elision2>	<elision2>
7623	7623	<>	<elision2>
7623	7626	<elision1>	<elision1>
7623	7623	<>	<elision1>
7623	7405	<split-s>	<>
7624	7625	<>	<aphaerese>
7624	7628	<elision3>	<elision3>
7624	7625	<>	<elision3>
7624	7628	<elision2>	<elision2>
7624	7625	<>	<elision2>
7624	7628	<elision1>	<elision1>
7624	7625	<>	<elision1>
7624	7406	<split-s>	<>
7625	7623	<>	<aphaerese>
7625	7626	<elision3>	<elision3>
7625	7623	<>	<elision3>
7625	7626	<elision2>	<elision2>
7625	7623	<>	<elision2>
7625	7626	<elision1>	<elision1>
7625	7623	<>	<elision1>
7625	7404	<split-s>	<>
7626	7627	<>	<name>
7626	7626	<>	<aphaerese>
7626	7626	<>	<elision3>
7626	7626	<>	<elision2>
7626	7626	<>	<elision1>
7626	7568	.	κ
7626	7402	<split-s>	<>
7627	7628	<>	<aphaerese>
7627	7628	<>	<elision3>
7627	7628	<>	<elision2>
7627	7628	<>	<elision1>
7627	7570	.	κ
7627	7403	<split-s>	<>
7628	7626	<>	<aphaerese>
7628	7626	<>	<elision3>
7628	7626	<>	<elision2>
7628	7626	<>	<elision1>
7628	7568	.	κ
7628	7401	<split-s>	<>
7629	7562	.	.
7629	7562	 	 
7629	7562	<~>	<~>
7629	7562	<split-s>	<split-s>
7629	7562	<split-h>	<split-h>
7629	7562	<name2>	<name2>
7629	7630	<>	<name>
7629	7565	<aphaerese>	<aphaerese>
7629	7629	<>	<aphaerese>
7629	7562	<elision3>	<elision3>
7629	7629	<>	<elision3>
7629	7562	<elision2>	<elision2>
7629	7629	<>	<elision2>
7629	7562	<elision1>	<elision1>
7629	7629	<>	<elision1>
7629	7574	.	υ
7629	7574	.	u
7629	7574	.	α
7629	7574	.	a
7629	7414	<split-s>	<>
7630	7564	.	.
7630	7564	 	 
7630	7564	<~>	<~>
7630	7564	<split-s>	<split-s>
7630	7564	<split-h>	<split-h>
7630	7564	<name2>	<name2>
7630	7567	<aphaerese>	<aphaerese>
7630	7631	<>	<aphaerese>
7630	7564	<elision3>	<elision3>
7630	7631	<>	<elision3>
7630	7564	<elision2>	<elision2>
7630	7631	<>	<elision2>
7630	7564	<elision1>	<elision1>
7630	7631	<>	<elision1>
7630	7576	.	υ
7630	7576	.	u
7630	7576	.	α
7630	7576	.	a
7630	7415	<split-s>	<>
7631	7562	.	.
7631	7562	 	 
7631	7562	<~>	<~>
7631	7562	<split-s>	<split-s>
7631	7562	<split-h>	<split-h>
7631	7562	<name2>	<name2>
7631	7565	<aphaerese>	<aphaerese>
7631	7629	<>	<aphaerese>
7631	7562	<elision3>	<elision3>
7631	7629	<>	<elision3>
7631	7562	<elision2>	<elision2>
7631	7629	<>	<elision2>
7631	7562	<elision1>	<elision1>
7631	7629	<>	<elision1>
7631	7574	.	υ
7631	7574	.	u
7631	7574	.	α
7631	7574	.	a
7631	7413	<split-s>	<>
7632	7562	.	.
7632	7562	 	 
7632	7562	<~>	<~>
7632	7562	<split-s>	<split-s>
7632	7562	<split-h>	<split-h>
7632	7562	<name2>	<name2>
7632	7607	<name2>	<name>
7632	7630	<>	<name>
7632	7565	<aphaerese>	<aphaerese>
7632	7629	<>	<aphaerese>
7632	7562	<elision3>	<elision3>
7632	7629	<>	<elision3>
7632	7562	<elision2>	<elision2>
7632	7629	<>	<elision2>
7632	7562	<elision1>	<elision1>
7632	7629	<>	<elision1>
7632	7574	.	υ
7632	7574	.	u
7632	7574	.	α
7632	7574	.	a
7632	7419	<split-s>	<>
7633	7634	<>	<name>
7633	7633	<>	<aphaerese>
7633	7633	<>	<elision3>
7633	7633	<>	<elision2>
7633	7633	<>	<elision1>
7633	7562	<A2kl>	<>
7634	7635	<>	<aphaerese>
7634	7635	<>	<elision3>
7634	7635	<>	<elision2>
7634	7635	<>	<elision1>
7634	7563	<A2kl>	<>
7635	7633	<>	<aphaerese>
7635	7633	<>	<elision3>
7635	7633	<>	<elision2>
7635	7633	<>	<elision1>
7635	7564	<A2kl>	<>
7636	7607	<name>	<name>
7636	7637	<>	<name>
7636	7639	<>	<aphaerese>
7636	7639	<>	<elision3>
7636	7639	<>	<elision2>
7636	7639	<>	<elision1>
7636	7416	<split-s>	<>
7636	7611	<A2kl>	<>
7636	7643	<L2kl>	<>
7637	7638	<>	<aphaerese>
7637	7638	<>	<elision3>
7637	7638	<>	<elision2>
7637	7638	<>	<elision1>
7637	7612	<A2kl>	<>
7637	7641	<L2kl>	<>
7638	7639	<>	<aphaerese>
7638	7639	<>	<elision3>
7638	7639	<>	<elision2>
7638	7639	<>	<elision1>
7638	7613	<A2kl>	<>
7638	7642	<L2kl>	<>
7639	7637	<>	<name>
7639	7639	<>	<aphaerese>
7639	7639	<>	<elision3>
7639	7639	<>	<elision2>
7639	7639	<>	<elision1>
7639	7611	<A2kl>	<>
7639	7640	<L2kl>	<>
7640	7562	.	.
7640	7562	 	 
7640	7562	<~>	<~>
7640	7562	<split-s>	<split-s>
7640	7562	<split-h>	<split-h>
7640	7562	<name2>	<name2>
7640	7641	<>	<name>
7640	7565	<aphaerese>	<aphaerese>
7640	7640	<>	<aphaerese>
7640	7562	<elision3>	<elision3>
7640	7640	<>	<elision3>
7640	7562	<elision2>	<elision2>
7640	7640	<>	<elision2>
7640	7562	<elision1>	<elision1>
7640	7640	<>	<elision1>
7640	7574	.	υ
7640	7574	.	u
7640	7623	.	κ
7640	7574	.	α
7640	7574	.	a
7640	7623	.	λ
7640	7440	<split-s>	<>
7641	7564	.	.
7641	7564	 	 
7641	7564	<~>	<~>
7641	7564	<split-s>	<split-s>
7641	7564	<split-h>	<split-h>
7641	7564	<name2>	<name2>
7641	7567	<aphaerese>	<aphaerese>
7641	7642	<>	<aphaerese>
7641	7564	<elision3>	<elision3>
7641	7642	<>	<elision3>
7641	7564	<elision2>	<elision2>
7641	7642	<>	<elision2>
7641	7564	<elision1>	<elision1>
7641	7642	<>	<elision1>
7641	7576	.	υ
7641	7576	.	u
7641	7625	.	κ
7641	7576	.	α
7641	7576	.	a
7641	7625	.	λ
7641	7441	<split-s>	<>
7642	7562	.	.
7642	7562	 	 
7642	7562	<~>	<~>
7642	7562	<split-s>	<split-s>
7642	7562	<split-h>	<split-h>
7642	7562	<name2>	<name2>
7642	7565	<aphaerese>	<aphaerese>
7642	7640	<>	<aphaerese>
7642	7562	<elision3>	<elision3>
7642	7640	<>	<elision3>
7642	7562	<elision2>	<elision2>
7642	7640	<>	<elision2>
7642	7562	<elision1>	<elision1>
7642	7640	<>	<elision1>
7642	7574	.	υ
7642	7574	.	u
7642	7623	.	κ
7642	7574	.	α
7642	7574	.	a
7642	7623	.	λ
7642	7439	<split-s>	<>
7643	7562	.	.
7643	7562	 	 
7643	7562	<~>	<~>
7643	7562	<split-s>	<split-s>
7643	7562	<split-h>	<split-h>
7643	7562	<name2>	<name2>
7643	7607	<name2>	<name>
7643	7641	<>	<name>
7643	7565	<aphaerese>	<aphaerese>
7643	7640	<>	<aphaerese>
7643	7562	<elision3>	<elision3>
7643	7640	<>	<elision3>
7643	7562	<elision2>	<elision2>
7643	7640	<>	<elision2>
7643	7562	<elision1>	<elision1>
7643	7640	<>	<elision1>
7643	7574	.	υ
7643	7574	.	u
7643	7623	.	κ
7643	7574	.	α
7643	7574	.	a
7643	7623	.	λ
7643	7443	<split-s>	<>
7644	7562	.	.
7644	7562	 	 
7644	7562	<~>	<~>
7644	7562	<split-s>	<split-s>
7644	7562	<split-h>	<split-h>
7644	7562	<name2>	<name2>
7644	7577	<>	<name>
7644	7565	<aphaerese>	<aphaerese>
7644	7561	<>	<aphaerese>
7644	7561	<>	<elision3>
7644	7561	<>	<elision2>
7644	7561	<>	<elision1>
7644	7574	.	υ
7644	7574	.	u
7644	7568	.	κ
7644	7574	.	α
7644	7574	.	a
7644	7445	<split-s>	<>
7645	7562	.	.
7645	7562	 	 
7645	7562	<~>	<~>
7645	7562	<split-s>	<split-s>
7645	7562	<split-h>	<split-h>
7645	7562	<name2>	<name2>
7645	7595	<>	<name>
7645	7565	<aphaerese>	<aphaerese>
7645	7594	<>	<aphaerese>
7645	7597	<elision3>	<elision3>
7645	7594	<>	<elision3>
7645	7597	<elision2>	<elision2>
7645	7594	<>	<elision2>
7645	7597	<elision1>	<elision1>
7645	7594	<>	<elision1>
7645	7574	.	υ
7645	7574	.	u
7645	7574	.	κ
7645	7574	.	α
7645	7574	.	a
7645	7574	.	λ
7645	7447	<split-s>	<>
7646	7562	.	.
7646	7562	 	 
7646	7562	<~>	<~>
7646	7562	<split-s>	<split-s>
7646	7562	<split-h>	<split-h>
7646	7562	<name2>	<name2>
7646	7601	<>	<name>
7646	7565	<aphaerese>	<aphaerese>
7646	7600	<>	<aphaerese>
7646	7562	<elision3>	<elision3>
7646	7600	<>	<elision3>
7646	7562	<elision2>	<elision2>
7646	7600	<>	<elision2>
7646	7562	<elision1>	<elision1>
7646	7600	<>	<elision1>
7646	7574	.	υ
7646	7574	.	u
7646	7574	.	κ
7646	7574	.	α
7646	7574	.	a
7646	7574	.	λ
7646	7449	<split-s>	<>
7647	7604	<>	<name>
7647	7603	<>	<aphaerese>
7647	7603	<>	<elision3>
7647	7603	<>	<elision2>
7647	7603	<>	<elision1>
7647	7648	<U2kl>	<>
7648	7562	.	.
7648	7562	 	 
7648	7562	<~>	<~>
7648	7562	<split-s>	<split-s>
7648	7562	<split-h>	<split-h>
7648	7562	<name2>	<name2>
7648	7563	<>	<name>
7648	7565	<aphaerese>	<aphaerese>
7648	7562	<>	<aphaerese>
7648	7562	<elision3>	<elision3>
7648	7562	<>	<elision3>
7648	7562	<elision2>	<elision2>
7648	7562	<>	<elision2>
7648	7562	<elision1>	<elision1>
7648	7562	<>	<elision1>
7648	7574	.	υ
7648	7574	.	u
7648	7568	.	κ
7648	7574	.	α
7648	7574	.	a
7648	7452	<split-s>	<>
7649	7607	<name>	<name>
7649	7608	<>	<name>
7649	7610	<>	<aphaerese>
7649	7610	<>	<elision3>
7649	7610	<>	<elision2>
7649	7610	<>	<elision1>
7649	7416	<split-s>	<>
7649	7611	<A2kl>	<>
7649	7620	<L2kl>	<>
7649	7650	<K2kl>	<>
7650	7562	.	.
7650	7562	 	 
7650	7562	<~>	<~>
7650	7562	<split-s>	<split-s>
7650	7562	<split-h>	<split-h>
7650	7562	<name2>	<name2>
7650	7607	<name2>	<name>
7650	7630	<>	<name>
7650	7565	<aphaerese>	<aphaerese>
7650	7629	<>	<aphaerese>
7650	7562	<elision3>	<elision3>
7650	7629	<>	<elision3>
7650	7562	<elision2>	<elision2>
7650	7629	<>	<elision2>
7650	7562	<elision1>	<elision1>
7650	7629	<>	<elision1>
7650	7574	.	υ
7650	7574	.	u
7650	7574	.	α
7650	7574	.	a
7650	7455	<split-s>	<>
7651	7634	<>	<name>
7651	7633	<>	<aphaerese>
7651	7633	<>	<elision3>
7651	7633	<>	<elision2>
7651	7633	<>	<elision1>
7651	7648	<A2kl>	<>
7652	7607	<name>	<name>
7652	7637	<>	<name>
7652	7639	<>	<aphaerese>
7652	7639	<>	<elision3>
7652	7639	<>	<elision2>
7652	7639	<>	<elision1>
7652	7416	<split-s>	<>
7652	7611	<A2kl>	<>
7652	7653	<L2kl>	<>
7653	7562	.	.
7653	7562	 	 
7653	7562	<~>	<~>
7653	7562	<split-s>	<split-s>
7653	7562	<split-h>	<split-h>
7653	7562	<name2>	<name2>
7653	7607	<name2>	<name>
7653	7641	<>	<name>
7653	7565	<aphaerese>	<aphaerese>
7653	7640	<>	<aphaerese>
7653	7562	<elision3>	<elision3>
7653	7640	<>	<elision3>
7653	7562	<elision2>	<elision2>
7653	7640	<>	<elision2>
7653	7562	<elision1>	<elision1>
7653	7640	<>	<elision1>
7653	7574	.	υ
7653	7574	.	u
7653	7623	.	κ
7653	7574	.	α
7653	7574	.	a
7653	7623	.	λ
7653	7462	<split-s>	<>
7654	7550	.	.
7654	7551	 	 
7654	7550	<~>	<~>
7654	7550	<split-s>	<split-s>
7654	7550	<split-h>	<split-h>
7654	7550	<name2>	<name2>
7654	7554	<aphaerese>	<aphaerese>
7654	7554	<>	<aphaerese>
7654	7550	<elision3>	<elision3>
7654	7554	<>	<elision3>
7654	7550	<elision2>	<elision2>
7654	7554	<>	<elision2>
7654	7550	<elision1>	<elision1>
7654	7554	<>	<elision1>
7654	7550	.	υ
7654	7550	.	u
7654	7579	.	κ
7654	7594	s	κ
7654	7600	s	k
7654	7603	s	U
7654	7655	s	K
7654	7550	.	α
7654	7550	.	a
7654	7633	s	A
7654	7600	s	λ
7654	7600	s	l
7654	7662	s	L
7654	6849	<2s>	<>
7655	7607	<name>	<name>
7655	7656	<>	<name>
7655	7658	<>	<aphaerese>
7655	7658	<>	<elision3>
7655	7658	<>	<elision2>
7655	7658	<>	<elision1>
7655	7416	<split-s>	<>
7655	7659	<L2kl>	<>
7655	7632	<K2kl>	<>
7656	7657	<>	<aphaerese>
7656	7657	<>	<elision3>
7656	7657	<>	<elision2>
7656	7657	<>	<elision1>
7656	7660	<L2kl>	<>
7656	7630	<K2kl>	<>
7657	7658	<>	<aphaerese>
7657	7658	<>	<elision3>
7657	7658	<>	<elision2>
7657	7658	<>	<elision1>
7657	7661	<L2kl>	<>
7657	7631	<K2kl>	<>
7658	7656	<>	<name>
7658	7658	<>	<aphaerese>
7658	7658	<>	<elision3>
7658	7658	<>	<elision2>
7658	7658	<>	<elision1>
7658	7659	<L2kl>	<>
7658	7629	<K2kl>	<>
7659	7660	<>	<name>
7659	7659	<>	<aphaerese>
7659	7659	<>	<elision3>
7659	7659	<>	<elision2>
7659	7659	<>	<elision1>
7659	7574	.	κ
7659	7574	.	λ
7659	7472	<split-s>	<>
7660	7661	<>	<aphaerese>
7660	7661	<>	<elision3>
7660	7661	<>	<elision2>
7660	7661	<>	<elision1>
7660	7576	.	κ
7660	7576	.	λ
7660	7473	<split-s>	<>
7661	7659	<>	<aphaerese>
7661	7659	<>	<elision3>
7661	7659	<>	<elision2>
7661	7659	<>	<elision1>
7661	7574	.	κ
7661	7574	.	λ
7661	7471	<split-s>	<>
7662	7607	<name>	<name>
7662	7663	<>	<name>
7662	7665	<>	<aphaerese>
7662	7665	<>	<elision3>
7662	7665	<>	<elision2>
7662	7665	<>	<elision1>
7662	7416	<split-s>	<>
7662	7666	<L2kl>	<>
7663	7664	<>	<aphaerese>
7663	7664	<>	<elision3>
7663	7664	<>	<elision2>
7663	7664	<>	<elision1>
7663	7601	<L2kl>	<>
7664	7665	<>	<aphaerese>
7664	7665	<>	<elision3>
7664	7665	<>	<elision2>
7664	7665	<>	<elision1>
7664	7602	<L2kl>	<>
7665	7663	<>	<name>
7665	7665	<>	<aphaerese>
7665	7665	<>	<elision3>
7665	7665	<>	<elision2>
7665	7665	<>	<elision1>
7665	7600	<L2kl>	<>
7666	7562	.	.
7666	7562	 	 
7666	7562	<~>	<~>
7666	7562	<split-s>	<split-s>
7666	7562	<split-h>	<split-h>
7666	7562	<name2>	<name2>
7666	7607	<name2>	<name>
7666	7601	<>	<name>
7666	7565	<aphaerese>	<aphaerese>
7666	7600	<>	<aphaerese>
7666	7562	<elision3>	<elision3>
7666	7600	<>	<elision3>
7666	7562	<elision2>	<elision2>
7666	7600	<>	<elision2>
7666	7562	<elision1>	<elision1>
7666	7600	<>	<elision1>
7666	7574	.	υ
7666	7574	.	u
7666	7574	.	κ
7666	7574	.	α
7666	7574	.	a
7666	7574	.	λ
7666	7479	<split-s>	<>
7667	7550	.	.
7667	7551	 	 
7667	7550	<~>	<~>
7667	7550	<split-s>	<split-s>
7667	7550	<split-h>	<split-h>
7667	7550	<name2>	<name2>
7667	7554	<aphaerese>	<aphaerese>
7667	7557	<>	<aphaerese>
7667	7550	<elision3>	<elision3>
7667	7557	<>	<elision3>
7667	7550	<elision2>	<elision2>
7667	7557	<>	<elision2>
7667	7550	<elision1>	<elision1>
7667	7557	<>	<elision1>
7667	7558	.	υ
7667	7561	s	υ
7667	7558	.	u
7667	7561	s	u
7667	7579	.	κ
7667	7594	s	κ
7667	7600	s	k
7667	7603	s	U
7667	7606	s	K
7667	7558	.	α
7667	7561	s	α
7667	7558	.	a
7667	7561	s	a
7667	7633	s	A
7667	7600	s	λ
7667	7600	s	l
7667	7636	s	L
7667	6862	<2s>	<>
7668	7553	.	.
7668	7556	 	 
7668	7553	<~>	<~>
7668	7553	<split-s>	<split-s>
7668	7553	<split-h>	<split-h>
7668	7553	<name2>	<name2>
7668	7654	<aphaerese>	<aphaerese>
7668	7553	<>	<aphaerese>
7668	7553	<elision3>	<elision3>
7668	7553	<>	<elision3>
7668	7553	<elision2>	<elision2>
7668	7553	<>	<elision2>
7668	7553	<elision1>	<elision1>
7668	7553	<>	<elision1>
7668	7560	.	υ
7668	7578	s	υ
7668	7560	.	u
7668	7578	s	u
7668	7581	.	κ
7668	7596	s	κ
7668	7602	s	k
7668	7605	s	U
7668	7657	s	K
7668	7560	.	α
7668	7578	s	α
7668	7560	.	a
7668	7578	s	a
7668	7635	s	A
7668	7602	s	λ
7668	7602	s	l
7668	7664	s	L
7668	6864	<2s>	<>
7669	7553	.	.
7669	7556	 	 
7669	7553	<~>	<~>
7669	7553	<split-s>	<split-s>
7669	7553	<split-h>	<split-h>
7669	7553	<name2>	<name2>
7669	7654	<aphaerese>	<aphaerese>
7669	7670	<>	<aphaerese>
7669	7670	<>	<elision3>
7669	7670	<>	<elision2>
7669	7670	<>	<elision1>
7669	7560	.	υ
7669	7578	s	υ
7669	7560	.	u
7669	7578	s	u
7669	7560	.	κ
7669	7673	s	κ
7669	7602	s	k
7669	7605	s	U
7669	7657	s	K
7669	7560	.	α
7669	7578	s	α
7669	7560	.	a
7669	7578	s	a
7669	7635	s	A
7669	7560	.	λ
7669	7673	s	λ
7669	7602	s	l
7669	7664	s	L
7669	7275	<2s>	<>
7670	7550	.	.
7670	7551	 	 
7670	7550	<~>	<~>
7670	7550	<split-s>	<split-s>
7670	7550	<split-h>	<split-h>
7670	7550	<name2>	<name2>
7670	7554	<aphaerese>	<aphaerese>
7670	7549	<>	<aphaerese>
7670	7549	<>	<elision3>
7670	7549	<>	<elision2>
7670	7549	<>	<elision1>
7670	7558	.	υ
7670	7561	s	υ
7670	7558	.	u
7670	7561	s	u
7670	7558	.	κ
7670	7671	s	κ
7670	7600	s	k
7670	7603	s	U
7670	7655	s	K
7670	7558	.	α
7670	7561	s	α
7670	7558	.	a
7670	7561	s	a
7670	7633	s	A
7670	7558	.	λ
7670	7671	s	λ
7670	7600	s	l
7670	7662	s	L
7670	7273	<2s>	<>
7671	7562	.	.
7671	7562	 	 
7671	7562	<~>	<~>
7671	7562	<split-s>	<split-s>
7671	7562	<split-h>	<split-h>
7671	7562	<name2>	<name2>
7671	7672	<>	<name>
7671	7565	<aphaerese>	<aphaerese>
7671	7671	<>	<aphaerese>
7671	7671	<>	<elision3>
7671	7671	<>	<elision2>
7671	7671	<>	<elision1>
7671	7574	.	υ
7671	7574	.	u
7671	7574	.	κ
7671	7574	.	α
7671	7574	.	a
7671	7574	.	λ
7671	7488	<split-s>	<>
7672	7564	.	.
7672	7564	 	 
7672	7564	<~>	<~>
7672	7564	<split-s>	<split-s>
7672	7564	<split-h>	<split-h>
7672	7564	<name2>	<name2>
7672	7567	<aphaerese>	<aphaerese>
7672	7673	<>	<aphaerese>
7672	7673	<>	<elision3>
7672	7673	<>	<elision2>
7672	7673	<>	<elision1>
7672	7576	.	υ
7672	7576	.	u
7672	7576	.	κ
7672	7576	.	α
7672	7576	.	a
7672	7576	.	λ
7672	7489	<split-s>	<>
7673	7562	.	.
7673	7562	 	 
7673	7562	<~>	<~>
7673	7562	<split-s>	<split-s>
7673	7562	<split-h>	<split-h>
7673	7562	<name2>	<name2>
7673	7565	<aphaerese>	<aphaerese>
7673	7671	<>	<aphaerese>
7673	7671	<>	<elision3>
7673	7671	<>	<elision2>
7673	7671	<>	<elision1>
7673	7574	.	υ
7673	7574	.	u
7673	7574	.	κ
7673	7574	.	α
7673	7574	.	a
7673	7574	.	λ
7673	7487	<split-s>	<>
7674	7550	.	.
7674	7551	 	 
7674	7550	<~>	<~>
7674	7550	<split-s>	<split-s>
7674	7550	<split-h>	<split-h>
7674	7550	<name2>	<name2>
7674	7675	<>	<name>
7674	7554	<aphaerese>	<aphaerese>
7674	7674	<>	<aphaerese>
7674	7550	<elision3>	<elision3>
7674	7674	<>	<elision3>
7674	7550	<elision2>	<elision2>
7674	7674	<>	<elision2>
7674	7550	<elision1>	<elision1>
7674	7674	<>	<elision1>
7674	7558	.	υ
7674	7561	s	υ
7674	7558	.	u
7674	7561	s	u
7674	7677	.	κ
7674	7671	s	κ
7674	7600	s	k
7674	7603	s	U
7674	7655	s	K
7674	7558	.	α
7674	7561	s	α
7674	7558	.	a
7674	7561	s	a
7674	7633	s	A
7674	7677	.	λ
7674	7671	s	λ
7674	7600	s	l
7674	7662	s	L
7674	7060	<2s>	<>
7675	7553	.	.
7675	7556	 	 
7675	7553	<~>	<~>
7675	7553	<split-s>	<split-s>
7675	7553	<split-h>	<split-h>
7675	7553	<name2>	<name2>
7675	7654	<aphaerese>	<aphaerese>
7675	7676	<>	<aphaerese>
7675	7553	<elision3>	<elision3>
7675	7676	<>	<elision3>
7675	7553	<elision2>	<elision2>
7675	7676	<>	<elision2>
7675	7553	<elision1>	<elision1>
7675	7676	<>	<elision1>
7675	7560	.	υ
7675	7578	s	υ
7675	7560	.	u
7675	7578	s	u
7675	7679	.	κ
7675	7673	s	κ
7675	7602	s	k
7675	7605	s	U
7675	7657	s	K
7675	7560	.	α
7675	7578	s	α
7675	7560	.	a
7675	7578	s	a
7675	7635	s	A
7675	7679	.	λ
7675	7673	s	λ
7675	7602	s	l
7675	7664	s	L
7675	7061	<2s>	<>
7676	7550	.	.
7676	7551	 	 
7676	7550	<~>	<~>
7676	7550	<split-s>	<split-s>
7676	7550	<split-h>	<split-h>
7676	7550	<name2>	<name2>
7676	7554	<aphaerese>	<aphaerese>
7676	7674	<>	<aphaerese>
7676	7550	<elision3>	<elision3>
7676	7674	<>	<elision3>
7676	7550	<elision2>	<elision2>
7676	7674	<>	<elision2>
7676	7550	<elision1>	<elision1>
7676	7674	<>	<elision1>
7676	7558	.	υ
7676	7561	s	υ
7676	7558	.	u
7676	7561	s	u
7676	7677	.	κ
7676	7671	s	κ
7676	7600	s	k
7676	7603	s	U
7676	7655	s	K
7676	7558	.	α
7676	7561	s	α
7676	7558	.	a
7676	7561	s	a
7676	7633	s	A
7676	7677	.	λ
7676	7671	s	λ
7676	7600	s	l
7676	7662	s	L
7676	7059	<2s>	<>
7677	7678	<>	<name>
7677	7677	<>	<aphaerese>
7677	7680	<elision3>	<elision3>
7677	7677	<>	<elision3>
7677	7680	<elision2>	<elision2>
7677	7677	<>	<elision2>
7677	7680	<elision1>	<elision1>
7677	7677	<>	<elision1>
7677	140	<2s>	<>
7678	7679	<>	<aphaerese>
7678	7682	<elision3>	<elision3>
7678	7679	<>	<elision3>
7678	7682	<elision2>	<elision2>
7678	7679	<>	<elision2>
7678	7682	<elision1>	<elision1>
7678	7679	<>	<elision1>
7678	141	<2s>	<>
7679	7677	<>	<aphaerese>
7679	7680	<elision3>	<elision3>
7679	7677	<>	<elision3>
7679	7680	<elision2>	<elision2>
7679	7677	<>	<elision2>
7679	7680	<elision1>	<elision1>
7679	7677	<>	<elision1>
7679	139	<2s>	<>
7680	7680	.	.
7680	7680	 	 
7680	7680	<~>	<~>
7680	7680	<split-s>	<split-s>
7680	7680	<split-h>	<split-h>
7680	7680	<name2>	<name2>
7680	7681	<>	<name>
7680	7683	<aphaerese>	<aphaerese>
7680	7680	<>	<aphaerese>
7680	7680	<elision3>	<elision3>
7680	7680	<>	<elision3>
7680	7680	<elision2>	<elision2>
7680	7680	<>	<elision2>
7680	7680	<elision1>	<elision1>
7680	7680	<>	<elision1>
7680	7677	.	υ
7680	7677	.	u
7680	7686	.	κ
7680	7677	.	α
7680	7677	.	a
7680	6863	<2s>	<>
7681	7682	.	.
7681	7682	 	 
7681	7682	<~>	<~>
7681	7682	<split-s>	<split-s>
7681	7682	<split-h>	<split-h>
7681	7682	<name2>	<name2>
7681	7685	<aphaerese>	<aphaerese>
7681	7682	<>	<aphaerese>
7681	7682	<elision3>	<elision3>
7681	7682	<>	<elision3>
7681	7682	<elision2>	<elision2>
7681	7682	<>	<elision2>
7681	7682	<elision1>	<elision1>
7681	7682	<>	<elision1>
7681	7679	.	υ
7681	7679	.	u
7681	7688	.	κ
7681	7679	.	α
7681	7679	.	a
7681	6864	<2s>	<>
7682	7680	.	.
7682	7680	 	 
7682	7680	<~>	<~>
7682	7680	<split-s>	<split-s>
7682	7680	<split-h>	<split-h>
7682	7680	<name2>	<name2>
7682	7683	<aphaerese>	<aphaerese>
7682	7680	<>	<aphaerese>
7682	7680	<elision3>	<elision3>
7682	7680	<>	<elision3>
7682	7680	<elision2>	<elision2>
7682	7680	<>	<elision2>
7682	7680	<elision1>	<elision1>
7682	7680	<>	<elision1>
7682	7677	.	υ
7682	7677	.	u
7682	7686	.	κ
7682	7677	.	α
7682	7677	.	a
7682	6862	<2s>	<>
7683	7680	.	.
7683	7680	 	 
7683	7680	<~>	<~>
7683	7680	<split-s>	<split-s>
7683	7680	<split-h>	<split-h>
7683	7680	<name2>	<name2>
7683	7684	<>	<name>
7683	7683	<aphaerese>	<aphaerese>
7683	7683	<>	<aphaerese>
7683	7680	<elision3>	<elision3>
7683	7683	<>	<elision3>
7683	7680	<elision2>	<elision2>
7683	7683	<>	<elision2>
7683	7680	<elision1>	<elision1>
7683	7683	<>	<elision1>
7683	7680	.	υ
7683	7680	.	u
7683	7686	.	κ
7683	7680	.	α
7683	7680	.	a
7683	6850	<2s>	<>
7684	7682	.	.
7684	7682	 	 
7684	7682	<~>	<~>
7684	7682	<split-s>	<split-s>
7684	7682	<split-h>	<split-h>
7684	7682	<name2>	<name2>
7684	7685	<aphaerese>	<aphaerese>
7684	7685	<>	<aphaerese>
7684	7682	<elision3>	<elision3>
7684	7685	<>	<elision3>
7684	7682	<elision2>	<elision2>
7684	7685	<>	<elision2>
7684	7682	<elision1>	<elision1>
7684	7685	<>	<elision1>
7684	7682	.	υ
7684	7682	.	u
7684	7688	.	κ
7684	7682	.	α
7684	7682	.	a
7684	6851	<2s>	<>
7685	7680	.	.
7685	7680	 	 
7685	7680	<~>	<~>
7685	7680	<split-s>	<split-s>
7685	7680	<split-h>	<split-h>
7685	7680	<name2>	<name2>
7685	7683	<aphaerese>	<aphaerese>
7685	7683	<>	<aphaerese>
7685	7680	<elision3>	<elision3>
7685	7683	<>	<elision3>
7685	7680	<elision2>	<elision2>
7685	7683	<>	<elision2>
7685	7680	<elision1>	<elision1>
7685	7683	<>	<elision1>
7685	7680	.	υ
7685	7680	.	u
7685	7686	.	κ
7685	7680	.	α
7685	7680	.	a
7685	6849	<2s>	<>
7686	7687	<>	<name>
7686	7686	<>	<aphaerese>
7686	7689	<elision3>	<elision3>
7686	7686	<>	<elision3>
7686	7689	<elision2>	<elision2>
7686	7686	<>	<elision2>
7686	7689	<elision1>	<elision1>
7686	7686	<>	<elision1>
7686	6847	<2s>	<>
7687	7688	<>	<aphaerese>
7687	7691	<elision3>	<elision3>
7687	7688	<>	<elision3>
7687	7691	<elision2>	<elision2>
7687	7688	<>	<elision2>
7687	7691	<elision1>	<elision1>
7687	7688	<>	<elision1>
7687	6848	<2s>	<>
7688	7686	<>	<aphaerese>
7688	7689	<elision3>	<elision3>
7688	7686	<>	<elision3>
7688	7689	<elision2>	<elision2>
7688	7686	<>	<elision2>
7688	7689	<elision1>	<elision1>
7688	7686	<>	<elision1>
7688	6846	<2s>	<>
7689	7690	<>	<name>
7689	7689	<>	<aphaerese>
7689	7689	<>	<elision3>
7689	7689	<>	<elision2>
7689	7689	<>	<elision1>
7689	6708	<2s>	<>
7690	7691	<>	<aphaerese>
7690	7691	<>	<elision3>
7690	7691	<>	<elision2>
7690	7691	<>	<elision1>
7690	6709	<2s>	<>
7691	7689	<>	<aphaerese>
7691	7689	<>	<elision3>
7691	7689	<>	<elision2>
7691	7689	<>	<elision1>
7691	6707	<2s>	<>
7692	7693	<name>	<name>
7692	7694	<>	<name>
7692	7696	<>	<aphaerese>
7692	7696	<>	<elision3>
7692	7696	<>	<elision2>
7692	7696	<>	<elision1>
7692	7180	<2s>	<>
7692	7697	<L2kl>	<>
7692	7703	<K2kl>	<>
7693	7657	s	k
7693	7664	s	l
7693	7070	<2s>	<>
7694	7695	<>	<aphaerese>
7694	7695	<>	<elision3>
7694	7695	<>	<elision2>
7694	7695	<>	<elision1>
7694	7698	<L2kl>	<>
7694	7701	<K2kl>	<>
7695	7696	<>	<aphaerese>
7695	7696	<>	<elision3>
7695	7696	<>	<elision2>
7695	7696	<>	<elision1>
7695	7699	<L2kl>	<>
7695	7702	<K2kl>	<>
7696	7694	<>	<name>
7696	7696	<>	<aphaerese>
7696	7696	<>	<elision3>
7696	7696	<>	<elision2>
7696	7696	<>	<elision1>
7696	7697	<L2kl>	<>
7696	7700	<K2kl>	<>
7697	7698	<>	<name>
7697	7697	<>	<aphaerese>
7697	7697	<>	<elision3>
7697	7697	<>	<elision2>
7697	7697	<>	<elision1>
7697	7677	.	κ
7697	7677	.	λ
7697	7239	<2s>	<>
7698	7699	<>	<aphaerese>
7698	7699	<>	<elision3>
7698	7699	<>	<elision2>
7698	7699	<>	<elision1>
7698	7679	.	κ
7698	7679	.	λ
7698	7240	<2s>	<>
7699	7697	<>	<aphaerese>
7699	7697	<>	<elision3>
7699	7697	<>	<elision2>
7699	7697	<>	<elision1>
7699	7677	.	κ
7699	7677	.	λ
7699	7238	<2s>	<>
7700	7680	.	.
7700	7680	 	 
7700	7680	<~>	<~>
7700	7680	<split-s>	<split-s>
7700	7680	<split-h>	<split-h>
7700	7680	<name2>	<name2>
7700	7701	<>	<name>
7700	7683	<aphaerese>	<aphaerese>
7700	7700	<>	<aphaerese>
7700	7680	<elision3>	<elision3>
7700	7700	<>	<elision3>
7700	7680	<elision2>	<elision2>
7700	7700	<>	<elision2>
7700	7680	<elision1>	<elision1>
7700	7700	<>	<elision1>
7700	7677	.	υ
7700	7677	.	u
7700	7677	.	α
7700	7677	.	a
7700	7175	<2s>	<>
7701	7682	.	.
7701	7682	 	 
7701	7682	<~>	<~>
7701	7682	<split-s>	<split-s>
7701	7682	<split-h>	<split-h>
7701	7682	<name2>	<name2>
7701	7685	<aphaerese>	<aphaerese>
7701	7702	<>	<aphaerese>
7701	7682	<elision3>	<elision3>
7701	7702	<>	<elision3>
7701	7682	<elision2>	<elision2>
7701	7702	<>	<elision2>
7701	7682	<elision1>	<elision1>
7701	7702	<>	<elision1>
7701	7679	.	υ
7701	7679	.	u
7701	7679	.	α
7701	7679	.	a
7701	7176	<2s>	<>
7702	7680	.	.
7702	7680	 	 
7702	7680	<~>	<~>
7702	7680	<split-s>	<split-s>
7702	7680	<split-h>	<split-h>
7702	7680	<name2>	<name2>
7702	7683	<aphaerese>	<aphaerese>
7702	7700	<>	<aphaerese>
7702	7680	<elision3>	<elision3>
7702	7700	<>	<elision3>
7702	7680	<elision2>	<elision2>
7702	7700	<>	<elision2>
7702	7680	<elision1>	<elision1>
7702	7700	<>	<elision1>
7702	7677	.	υ
7702	7677	.	u
7702	7677	.	α
7702	7677	.	a
7702	7174	<2s>	<>
7703	7680	.	.
7703	7680	 	 
7703	7680	<~>	<~>
7703	7680	<split-s>	<split-s>
7703	7680	<split-h>	<split-h>
7703	7680	<name2>	<name2>
7703	7704	<name2>	<name>
7703	7701	<>	<name>
7703	7683	<aphaerese>	<aphaerese>
7703	7700	<>	<aphaerese>
7703	7680	<elision3>	<elision3>
7703	7700	<>	<elision3>
7703	7680	<elision2>	<elision2>
7703	7700	<>	<elision2>
7703	7680	<elision1>	<elision1>
7703	7700	<>	<elision1>
7703	7677	.	υ
7703	7677	.	u
7703	7677	.	α
7703	7677	.	a
7703	7184	<2s>	<>
7704	7070	<2s>	<>
7705	7680	.	.
7705	7680	 	 
7705	7680	<~>	<~>
7705	7680	<split-s>	<split-s>
7705	7680	<split-h>	<split-h>
7705	7680	<name2>	<name2>
7705	7706	<>	<name>
7705	7683	<aphaerese>	<aphaerese>
7705	7705	<>	<aphaerese>
7705	7680	<elision3>	<elision3>
7705	7705	<>	<elision3>
7705	7680	<elision2>	<elision2>
7705	7705	<>	<elision2>
7705	7680	<elision1>	<elision1>
7705	7705	<>	<elision1>
7705	7677	.	υ
7705	7677	.	u
7705	7677	.	κ
7705	7677	.	α
7705	7677	.	a
7705	7677	.	λ
7705	7060	<2s>	<>
7706	7682	.	.
7706	7682	 	 
7706	7682	<~>	<~>
7706	7682	<split-s>	<split-s>
7706	7682	<split-h>	<split-h>
7706	7682	<name2>	<name2>
7706	7685	<aphaerese>	<aphaerese>
7706	7707	<>	<aphaerese>
7706	7682	<elision3>	<elision3>
7706	7707	<>	<elision3>
7706	7682	<elision2>	<elision2>
7706	7707	<>	<elision2>
7706	7682	<elision1>	<elision1>
7706	7707	<>	<elision1>
7706	7679	.	υ
7706	7679	.	u
7706	7679	.	κ
7706	7679	.	α
7706	7679	.	a
7706	7679	.	λ
7706	7061	<2s>	<>
7707	7680	.	.
7707	7680	 	 
7707	7680	<~>	<~>
7707	7680	<split-s>	<split-s>
7707	7680	<split-h>	<split-h>
7707	7680	<name2>	<name2>
7707	7683	<aphaerese>	<aphaerese>
7707	7705	<>	<aphaerese>
7707	7680	<elision3>	<elision3>
7707	7705	<>	<elision3>
7707	7680	<elision2>	<elision2>
7707	7705	<>	<elision2>
7707	7680	<elision1>	<elision1>
7707	7705	<>	<elision1>
7707	7677	.	υ
7707	7677	.	u
7707	7677	.	κ
7707	7677	.	α
7707	7677	.	a
7707	7677	.	λ
7707	7059	<2s>	<>
7708	7704	<name>	<name>
7708	7709	<>	<name>
7708	7711	<>	<aphaerese>
7708	7711	<>	<elision3>
7708	7711	<>	<elision2>
7708	7711	<>	<elision1>
7708	7180	<2s>	<>
7708	7712	<L2kl>	<>
7709	7710	<>	<aphaerese>
7709	7710	<>	<elision3>
7709	7710	<>	<elision2>
7709	7710	<>	<elision1>
7709	7706	<L2kl>	<>
7710	7711	<>	<aphaerese>
7710	7711	<>	<elision3>
7710	7711	<>	<elision2>
7710	7711	<>	<elision1>
7710	7707	<L2kl>	<>
7711	7709	<>	<name>
7711	7711	<>	<aphaerese>
7711	7711	<>	<elision3>
7711	7711	<>	<elision2>
7711	7711	<>	<elision1>
7711	7705	<L2kl>	<>
7712	7680	.	.
7712	7680	 	 
7712	7680	<~>	<~>
7712	7680	<split-s>	<split-s>
7712	7680	<split-h>	<split-h>
7712	7680	<name2>	<name2>
7712	7704	<name2>	<name>
7712	7706	<>	<name>
7712	7683	<aphaerese>	<aphaerese>
7712	7705	<>	<aphaerese>
7712	7680	<elision3>	<elision3>
7712	7705	<>	<elision3>
7712	7680	<elision2>	<elision2>
7712	7705	<>	<elision2>
7712	7680	<elision1>	<elision1>
7712	7705	<>	<elision1>
7712	7677	.	υ
7712	7677	.	u
7712	7677	.	κ
7712	7677	.	α
7712	7677	.	a
7712	7677	.	λ
7712	7249	<2s>	<>
7713	7547	<>	<name>
7713	7546	<>	<aphaerese>
7713	7546	<>	<elision3>
7713	7546	<>	<elision2>
7713	7546	<>	<elision1>
7713	7549	s	κ
7713	7674	s	k
7713	7692	s	K
7713	7549	s	λ
7713	7705	s	l
7713	7708	s	L
7713	7714	<1s>	<>
7714	6884	<>	<name>
7714	6883	<>	<aphaerese>
7714	6883	<>	<elision3>
7714	6883	<>	<elision2>
7714	6883	<>	<elision1>
7714	7715	<K>	<>
7715	6910	<>	<name>
7715	6912	<>	<aphaerese>
7715	6912	<>	<elision3>
7715	6912	<>	<elision2>
7715	6912	<>	<elision1>
7716	7717	<>	<name>
7716	7719	<>	<aphaerese>
7716	7719	<>	<elision3>
7716	7719	<>	<elision2>
7716	7719	<>	<elision1>
7716	124	<k2K>	<>
7716	7713	<k2L>	<>
7717	7718	<>	<aphaerese>
7717	7718	<>	<elision3>
7717	7718	<>	<elision2>
7717	7718	<>	<elision1>
7717	125	<k2K>	<>
7717	7547	<k2L>	<>
7718	7719	<>	<aphaerese>
7718	7719	<>	<elision3>
7718	7719	<>	<elision2>
7718	7719	<>	<elision1>
7718	126	<k2K>	<>
7718	7548	<k2L>	<>
7719	7717	<>	<name>
7719	7719	<>	<aphaerese>
7719	7719	<>	<elision3>
7719	7719	<>	<elision2>
7719	7719	<>	<elision1>
7719	124	<k2K>	<>
7719	7546	<k2L>	<>
7720	7721	<>	<name>
7720	7723	<>	<aphaerese>
7720	7723	<>	<elision3>
7720	7723	<>	<elision2>
7720	7723	<>	<elision1>
7720	127	s	κ
7720	7490	s	k
7720	7523	s	K
7720	127	s	λ
7720	7538	s	l
7720	7541	s	L
7720	7713	<K2L>	<>
7721	7722	<>	<aphaerese>
7721	7722	<>	<elision3>
7721	7722	<>	<elision2>
7721	7722	<>	<elision1>
7721	7483	s	κ
7721	7492	s	k
7721	7526	s	K
7721	7483	s	λ
7721	7540	s	l
7721	7543	s	L
7721	7547	<K2L>	<>
7722	7723	<>	<aphaerese>
7722	7723	<>	<elision3>
7722	7723	<>	<elision2>
7722	7723	<>	<elision1>
7722	127	s	κ
7722	7490	s	k
7722	7523	s	K
7722	127	s	λ
7722	7538	s	l
7722	7541	s	L
7722	7548	<K2L>	<>
7723	7721	<>	<name>
7723	7723	<>	<aphaerese>
7723	7723	<>	<elision3>
7723	7723	<>	<elision2>
7723	7723	<>	<elision1>
7723	127	s	κ
7723	7490	s	k
7723	7523	s	K
7723	127	s	λ
7723	7538	s	l
7723	7541	s	L
7723	7546	<K2L>	<>
7724	7725	<>	<name>
7724	7724	<>	<aphaerese>
7724	7724	<>	<elision3>
7724	7724	<>	<elision2>
7724	7724	<>	<elision1>
7724	7546	<lambda2L>	<>
7725	7726	<>	<aphaerese>
7725	7726	<>	<elision3>
7725	7726	<>	<elision2>
7725	7726	<>	<elision1>
7725	7547	<lambda2L>	<>
7726	7724	<>	<aphaerese>
7726	7724	<>	<elision3>
7726	7724	<>	<elision2>
7726	7724	<>	<elision1>
7726	7548	<lambda2L>	<>
7727	7728	<>	<name>
7727	7727	<>	<aphaerese>
7727	7727	<>	<elision3>
7727	7727	<>	<elision2>
7727	7727	<>	<elision1>
7727	7546	<l2L>	<>
7728	7729	<>	<aphaerese>
7728	7729	<>	<elision3>
7728	7729	<>	<elision2>
7728	7729	<>	<elision1>
7728	7547	<l2L>	<>
7729	7727	<>	<aphaerese>
7729	7727	<>	<elision3>
7729	7727	<>	<elision2>
7729	7727	<>	<elision1>
7729	7548	<l2L>	<>
7730	123	<>	<aphaerese>
7730	123	<>	<elision3>
7730	123	<>	<elision2>
7730	123	<>	<elision1>
7730	126	<kappa2K>	<>
7730	7731	<kappa2L>	<>
7731	7546	<>	<aphaerese>
7731	7546	<>	<elision3>
7731	7546	<>	<elision2>
7731	7546	<>	<elision1>
7731	7549	s	κ
7731	7674	s	k
7731	7692	s	K
7731	7549	s	λ
7731	7705	s	l
7731	7708	s	L
7731	7732	<1s>	<>
7732	6883	<>	<aphaerese>
7732	6883	<>	<elision3>
7732	6883	<>	<elision2>
7732	6883	<>	<elision1>
7732	7733	<K>	<>
7733	6912	<>	<aphaerese>
7733	6912	<>	<elision3>
7733	6912	<>	<elision2>
7733	6912	<>	<elision1>
7734	7719	<>	<aphaerese>
7734	7719	<>	<elision3>
7734	7719	<>	<elision2>
7734	7719	<>	<elision1>
7734	126	<k2K>	<>
7734	7731	<k2L>	<>
7735	7723	<>	<aphaerese>
7735	7723	<>	<elision3>
7735	7723	<>	<elision2>
7735	7723	<>	<elision1>
7735	127	s	κ
7735	7490	s	k
7735	7523	s	K
7735	127	s	λ
7735	7538	s	l
7735	7541	s	L
7735	7731	<K2L>	<>
7736	7737	<>	<name>
7736	7739	<>	<aphaerese>
7736	7739	<>	<elision3>
7736	7739	<>	<elision2>
7736	7739	<>	<elision1>
7736	7740	<kappa2K>	<>
7736	8061	<kappa2L>	<>
7736	8058	<lambda2L>	<>
7737	7738	<>	<aphaerese>
7737	7738	<>	<elision3>
7737	7738	<>	<elision2>
7737	7738	<>	<elision1>
7737	7876	<kappa2K>	<>
7737	8022	<kappa2L>	<>
7737	8059	<lambda2L>	<>
7738	7739	<>	<aphaerese>
7738	7739	<>	<elision3>
7738	7739	<>	<elision2>
7738	7739	<>	<elision1>
7738	7877	<kappa2K>	<>
7738	8023	<kappa2L>	<>
7738	8060	<lambda2L>	<>
7739	7737	<>	<name>
7739	7739	<>	<aphaerese>
7739	7739	<>	<elision3>
7739	7739	<>	<elision2>
7739	7739	<>	<elision1>
7739	7740	<kappa2K>	<>
7739	7906	<kappa2L>	<>
7739	8058	<lambda2L>	<>
7740	7741	.	.
7740	7742	 	 
7740	7741	<~>	<~>
7740	7741	<split-s>	<split-s>
7740	7741	<split-h>	<split-h>
7740	7741	<name2>	<name2>
7740	7876	<>	<name>
7740	7745	<aphaerese>	<aphaerese>
7740	7740	<>	<aphaerese>
7740	7878	<elision3>	<elision3>
7740	7740	<>	<elision3>
7740	7878	<elision2>	<elision2>
7740	7740	<>	<elision2>
7740	7878	<elision1>	<elision1>
7740	7740	<>	<elision1>
7740	7749	.	υ
7740	7752	s	υ
7740	7749	.	u
7740	7752	s	u
7740	127	s	κ
7740	7490	s	k
7740	7815	s	U
7740	7523	s	K
7740	7749	.	α
7740	7843	s	α
7740	7749	.	a
7740	7843	s	a
7740	7846	s	A
7740	127	s	λ
7740	7538	s	l
7740	7541	s	L
7741	7741	.	.
7741	7742	 	 
7741	7741	<~>	<~>
7741	7741	<split-s>	<split-s>
7741	7741	<split-h>	<split-h>
7741	7741	<name2>	<name2>
7741	7875	<>	<name>
7741	7745	<aphaerese>	<aphaerese>
7741	7741	<>	<aphaerese>
7741	7741	<elision3>	<elision3>
7741	7741	<>	<elision3>
7741	7741	<elision2>	<elision2>
7741	7741	<>	<elision2>
7741	7741	<elision1>	<elision1>
7741	7741	<>	<elision1>
7741	7749	.	υ
7741	7752	s	υ
7741	7749	.	u
7741	7752	s	u
7741	7755	.	κ
7741	7773	s	κ
7741	7490	s	k
7741	7815	s	U
7741	7523	s	K
7741	7749	.	α
7741	7843	s	α
7741	7749	.	a
7741	7843	s	a
7741	7846	s	A
7741	7849	s	λ
7741	7538	s	l
7741	7541	s	L
7742	7741	.	.
7742	7742	 	 
7742	7741	<~>	<~>
7742	7741	<split-s>	<split-s>
7742	7741	<split-h>	<split-h>
7742	7741	<name2>	<name2>
7742	7743	<>	<name>
7742	7745	<aphaerese>	<aphaerese>
7742	7748	<>	<aphaerese>
7742	7741	<elision3>	<elision3>
7742	7748	<>	<elision3>
7742	7741	<elision2>	<elision2>
7742	7748	<>	<elision2>
7742	7741	<elision1>	<elision1>
7742	7748	<>	<elision1>
7742	7749	.	υ
7742	7860	s	υ
7742	7749	.	u
7742	7860	s	u
7742	7755	.	κ
7742	7861	s	κ
7742	7862	s	k
7742	7863	s	U
7742	7865	s	K
7742	7749	.	α
7742	7867	s	α
7742	7749	.	a
7742	7867	s	a
7742	7868	s	A
7742	7869	s	λ
7742	7870	s	l
7742	7871	s	L
7743	7744	.	.
7743	7747	 	 
7743	7744	<~>	<~>
7743	7744	<split-s>	<split-s>
7743	7744	<split-h>	<split-h>
7743	7744	<name2>	<name2>
7743	7873	<aphaerese>	<aphaerese>
7743	7874	<>	<aphaerese>
7743	7744	<elision3>	<elision3>
7743	7874	<>	<elision3>
7743	7744	<elision2>	<elision2>
7743	7874	<>	<elision2>
7743	7744	<elision1>	<elision1>
7743	7874	<>	<elision1>
7743	7751	.	υ
7743	7754	s	υ
7743	7751	.	u
7743	7754	s	u
7743	7757	.	κ
7743	7775	s	κ
7743	7492	s	k
7743	7817	s	U
7743	7820	s	K
7743	7751	.	α
7743	7845	s	α
7743	7751	.	a
7743	7845	s	a
7743	7848	s	A
7743	7851	s	λ
7743	7540	s	l
7743	7854	s	L
7744	7741	.	.
7744	7742	 	 
7744	7741	<~>	<~>
7744	7741	<split-s>	<split-s>
7744	7741	<split-h>	<split-h>
7744	7741	<name2>	<name2>
7744	7745	<aphaerese>	<aphaerese>
7744	7741	<>	<aphaerese>
7744	7741	<elision3>	<elision3>
7744	7741	<>	<elision3>
7744	7741	<elision2>	<elision2>
7744	7741	<>	<elision2>
7744	7741	<elision1>	<elision1>
7744	7741	<>	<elision1>
7744	7749	.	υ
7744	7752	s	υ
7744	7749	.	u
7744	7752	s	u
7744	7755	.	κ
7744	7773	s	κ
7744	7490	s	k
7744	7815	s	U
7744	7523	s	K
7744	7749	.	α
7744	7843	s	α
7744	7749	.	a
7744	7843	s	a
7744	7846	s	A
7744	7849	s	λ
7744	7538	s	l
7744	7541	s	L
7745	7741	.	.
7745	7742	 	 
7745	7741	<~>	<~>
7745	7741	<split-s>	<split-s>
7745	7741	<split-h>	<split-h>
7745	7741	<name2>	<name2>
7745	7746	<>	<name>
7745	7745	<aphaerese>	<aphaerese>
7745	7745	<>	<aphaerese>
7745	7741	<elision3>	<elision3>
7745	7745	<>	<elision3>
7745	7741	<elision2>	<elision2>
7745	7745	<>	<elision2>
7745	7741	<elision1>	<elision1>
7745	7745	<>	<elision1>
7745	7741	.	υ
7745	7741	.	u
7745	7755	.	κ
7745	7773	s	κ
7745	7490	s	k
7745	7815	s	U
7745	7523	s	K
7745	7741	.	α
7745	7741	.	a
7745	7846	s	A
7745	7849	s	λ
7745	7538	s	l
7745	7541	s	L
7746	7744	.	.
7746	7747	 	 
7746	7744	<~>	<~>
7746	7744	<split-s>	<split-s>
7746	7744	<split-h>	<split-h>
7746	7744	<name2>	<name2>
7746	7873	<aphaerese>	<aphaerese>
7746	7873	<>	<aphaerese>
7746	7744	<elision3>	<elision3>
7746	7873	<>	<elision3>
7746	7744	<elision2>	<elision2>
7746	7873	<>	<elision2>
7746	7744	<elision1>	<elision1>
7746	7873	<>	<elision1>
7746	7744	.	υ
7746	7744	.	u
7746	7757	.	κ
7746	7775	s	κ
7746	7492	s	k
7746	7817	s	U
7746	7526	s	K
7746	7744	.	α
7746	7744	.	a
7746	7848	s	A
7746	7851	s	λ
7746	7540	s	l
7746	7543	s	L
7747	7741	.	.
7747	7742	 	 
7747	7741	<~>	<~>
7747	7741	<split-s>	<split-s>
7747	7741	<split-h>	<split-h>
7747	7741	<name2>	<name2>
7747	7745	<aphaerese>	<aphaerese>
7747	7748	<>	<aphaerese>
7747	7741	<elision3>	<elision3>
7747	7748	<>	<elision3>
7747	7741	<elision2>	<elision2>
7747	7748	<>	<elision2>
7747	7741	<elision1>	<elision1>
7747	7748	<>	<elision1>
7747	7749	.	υ
7747	7860	s	υ
7747	7749	.	u
7747	7860	s	u
7747	7755	.	κ
7747	7861	s	κ
7747	7862	s	k
7747	7863	s	U
7747	7865	s	K
7747	7749	.	α
7747	7867	s	α
7747	7749	.	a
7747	7867	s	a
7747	7868	s	A
7747	7869	s	λ
7747	7870	s	l
7747	7871	s	L
7748	7741	.	.
7748	7742	 	 
7748	7741	<~>	<~>
7748	7741	<split-s>	<split-s>
7748	7741	<split-h>	<split-h>
7748	7741	<name2>	<name2>
7748	7743	<>	<name>
7748	7745	<aphaerese>	<aphaerese>
7748	7748	<>	<aphaerese>
7748	7741	<elision3>	<elision3>
7748	7748	<>	<elision3>
7748	7741	<elision2>	<elision2>
7748	7748	<>	<elision2>
7748	7741	<elision1>	<elision1>
7748	7748	<>	<elision1>
7748	7749	.	υ
7748	7752	s	υ
7748	7749	.	u
7748	7752	s	u
7748	7755	.	κ
7748	7773	s	κ
7748	7490	s	k
7748	7815	s	U
7748	7818	s	K
7748	7749	.	α
7748	7843	s	α
7748	7749	.	a
7748	7843	s	a
7748	7846	s	A
7748	7849	s	λ
7748	7538	s	l
7748	7852	s	L
7749	7750	<>	<name>
7749	7749	<>	<aphaerese>
7749	7741	<elision3>	<elision3>
7749	7749	<>	<elision3>
7749	7741	<elision2>	<elision2>
7749	7749	<>	<elision2>
7749	7741	<elision1>	<elision1>
7749	7749	<>	<elision1>
7750	7751	<>	<aphaerese>
7750	7744	<elision3>	<elision3>
7750	7751	<>	<elision3>
7750	7744	<elision2>	<elision2>
7750	7751	<>	<elision2>
7750	7744	<elision1>	<elision1>
7750	7751	<>	<elision1>
7751	7749	<>	<aphaerese>
7751	7741	<elision3>	<elision3>
7751	7749	<>	<elision3>
7751	7741	<elision2>	<elision2>
7751	7749	<>	<elision2>
7751	7741	<elision1>	<elision1>
7751	7749	<>	<elision1>
7752	128	.	.
7752	129	 	 
7752	128	<~>	<~>
7752	128	<split-s>	<split-s>
7752	128	<split-h>	<split-h>
7752	128	<name2>	<name2>
7752	7753	<>	<name>
7752	132	<aphaerese>	<aphaerese>
7752	7752	<>	<aphaerese>
7752	7752	<>	<elision3>
7752	7752	<>	<elision2>
7752	7752	<>	<elision1>
7752	136	.	υ
7752	6679	s	υ
7752	136	.	u
7752	6679	s	u
7752	7261	.	κ
7752	7291	s	κ
7752	7344	s	k
7752	7365	s	U
7752	7464	s	K
7752	136	.	α
7752	7420	s	α
7752	136	.	a
7752	7420	s	a
7752	7423	s	A
7752	7426	s	λ
7752	7429	s	l
7752	7474	s	L
7752	6868	<2s>	<>
7753	131	.	.
7753	134	 	 
7753	131	<~>	<~>
7753	131	<split-s>	<split-s>
7753	131	<split-h>	<split-h>
7753	131	<name2>	<name2>
7753	7463	<aphaerese>	<aphaerese>
7753	7754	<>	<aphaerese>
7753	7754	<>	<elision3>
7753	7754	<>	<elision2>
7753	7754	<>	<elision1>
7753	138	.	υ
7753	7257	s	υ
7753	138	.	u
7753	7257	s	u
7753	7263	.	κ
7753	7293	s	κ
7753	7346	s	k
7753	7367	s	U
7753	7466	s	K
7753	138	.	α
7753	7422	s	α
7753	138	.	a
7753	7422	s	a
7753	7425	s	A
7753	7428	s	λ
7753	7431	s	l
7753	7476	s	L
7753	6869	<2s>	<>
7754	128	.	.
7754	129	 	 
7754	128	<~>	<~>
7754	128	<split-s>	<split-s>
7754	128	<split-h>	<split-h>
7754	128	<name2>	<name2>
7754	132	<aphaerese>	<aphaerese>
7754	7752	<>	<aphaerese>
7754	7752	<>	<elision3>
7754	7752	<>	<elision2>
7754	7752	<>	<elision1>
7754	136	.	υ
7754	6679	s	υ
7754	136	.	u
7754	6679	s	u
7754	7261	.	κ
7754	7291	s	κ
7754	7344	s	k
7754	7365	s	U
7754	7464	s	K
7754	136	.	α
7754	7420	s	α
7754	136	.	a
7754	7420	s	a
7754	7423	s	A
7754	7426	s	λ
7754	7429	s	l
7754	7474	s	L
7754	6867	<2s>	<>
7755	7756	<>	<name>
7755	7755	<>	<aphaerese>
7755	7758	<elision3>	<elision3>
7755	7755	<>	<elision3>
7755	7758	<elision2>	<elision2>
7755	7755	<>	<elision2>
7755	7758	<elision1>	<elision1>
7755	7755	<>	<elision1>
7756	7757	<>	<aphaerese>
7756	7760	<elision3>	<elision3>
7756	7757	<>	<elision3>
7756	7760	<elision2>	<elision2>
7756	7757	<>	<elision2>
7756	7760	<elision1>	<elision1>
7756	7757	<>	<elision1>
7757	7755	<>	<aphaerese>
7757	7758	<elision3>	<elision3>
7757	7755	<>	<elision3>
7757	7758	<elision2>	<elision2>
7757	7755	<>	<elision2>
7757	7758	<elision1>	<elision1>
7757	7755	<>	<elision1>
7758	7759	<>	<name>
7758	7758	<>	<aphaerese>
7758	7758	<>	<elision3>
7758	7758	<>	<elision2>
7758	7758	<>	<elision1>
7758	7761	s	κ
7758	7761	s	k
7758	7764	s	K
7758	7761	s	λ
7758	7768	s	l
7758	7770	s	L
7759	7760	<>	<aphaerese>
7759	7760	<>	<elision3>
7759	7760	<>	<elision2>
7759	7760	<>	<elision1>
7759	7763	s	κ
7759	7763	s	k
7759	7766	s	K
7759	7763	s	λ
7759	7767	s	l
7759	7772	s	L
7760	7758	<>	<aphaerese>
7760	7758	<>	<elision3>
7760	7758	<>	<elision2>
7760	7758	<>	<elision1>
7760	7761	s	κ
7760	7761	s	k
7760	7764	s	K
7760	7761	s	λ
7760	7768	s	l
7760	7770	s	L
7761	7762	<>	<name>
7761	7761	<>	<aphaerese>
7761	7761	<>	<elision3>
7761	7761	<>	<elision2>
7761	7761	<>	<elision1>
7761	7484	s	κ
7761	7344	s	k
7761	7464	s	K
7761	7484	s	λ
7761	7429	s	l
7761	7474	s	L
7761	6883	<2s>	<>
7762	7763	<>	<aphaerese>
7762	7763	<>	<elision3>
7762	7763	<>	<elision2>
7762	7763	<>	<elision1>
7762	7486	s	κ
7762	7346	s	k
7762	7466	s	K
7762	7486	s	λ
7762	7431	s	l
7762	7476	s	L
7762	6884	<2s>	<>
7763	7761	<>	<aphaerese>
7763	7761	<>	<elision3>
7763	7761	<>	<elision2>
7763	7761	<>	<elision1>
7763	7484	s	κ
7763	7344	s	k
7763	7464	s	K
7763	7484	s	λ
7763	7429	s	l
7763	7474	s	L
7763	6882	<2s>	<>
7764	7765	<>	<name>
7764	7764	<>	<aphaerese>
7764	7764	<>	<elision3>
7764	7764	<>	<elision2>
7764	7764	<>	<elision1>
7764	7768	<K2kl>	<>
7765	7766	<>	<aphaerese>
7765	7766	<>	<elision3>
7765	7766	<>	<elision2>
7765	7766	<>	<elision1>
7765	7769	<K2kl>	<>
7766	7764	<>	<aphaerese>
7766	7764	<>	<elision3>
7766	7764	<>	<elision2>
7766	7764	<>	<elision1>
7766	7767	<K2kl>	<>
7767	7768	<>	<aphaerese>
7767	7768	<>	<elision3>
7767	7768	<>	<elision2>
7767	7768	<>	<elision1>
7767	7534	s	κ
7767	7429	s	k
7767	7520	s	K
7767	7534	s	λ
7767	7429	s	l
7767	7474	s	L
7767	6882	<2s>	<>
7768	7769	<>	<name>
7768	7768	<>	<aphaerese>
7768	7768	<>	<elision3>
7768	7768	<>	<elision2>
7768	7768	<>	<elision1>
7768	7534	s	κ
7768	7429	s	k
7768	7520	s	K
7768	7534	s	λ
7768	7429	s	l
7768	7474	s	L
7768	6883	<2s>	<>
7769	7767	<>	<aphaerese>
7769	7767	<>	<elision3>
7769	7767	<>	<elision2>
7769	7767	<>	<elision1>
7769	7536	s	κ
7769	7431	s	k
7769	7466	s	K
7769	7536	s	λ
7769	7431	s	l
7769	7476	s	L
7769	6884	<2s>	<>
7770	7771	<>	<name>
7770	7770	<>	<aphaerese>
7770	7770	<>	<elision3>
7770	7770	<>	<elision2>
7770	7770	<>	<elision1>
7770	7768	<L2kl>	<>
7771	7772	<>	<aphaerese>
7771	7772	<>	<elision3>
7771	7772	<>	<elision2>
7771	7772	<>	<elision1>
7771	7769	<L2kl>	<>
7772	7770	<>	<aphaerese>
7772	7770	<>	<elision3>
7772	7770	<>	<elision2>
7772	7770	<>	<elision1>
7772	7767	<L2kl>	<>
7773	128	.	.
7773	129	 	 
7773	128	<~>	<~>
7773	128	<split-s>	<split-s>
7773	128	<split-h>	<split-h>
7773	128	<name2>	<name2>
7773	7774	<>	<name>
7773	132	<aphaerese>	<aphaerese>
7773	7773	<>	<aphaerese>
7773	7776	<elision3>	<elision3>
7773	7773	<>	<elision3>
7773	7776	<elision2>	<elision2>
7773	7773	<>	<elision2>
7773	7776	<elision1>	<elision1>
7773	7773	<>	<elision1>
7773	136	.	υ
7773	6679	s	υ
7773	136	.	u
7773	6679	s	u
7773	136	.	κ
7773	7484	s	κ
7773	7344	s	k
7773	7365	s	U
7773	7464	s	K
7773	136	.	α
7773	7420	s	α
7773	136	.	a
7773	7420	s	a
7773	7423	s	A
7773	136	.	λ
7773	7484	s	λ
7773	7429	s	l
7773	7474	s	L
7773	7048	<2s>	<>
7774	131	.	.
7774	134	 	 
7774	131	<~>	<~>
7774	131	<split-s>	<split-s>
7774	131	<split-h>	<split-h>
7774	131	<name2>	<name2>
7774	7463	<aphaerese>	<aphaerese>
7774	7775	<>	<aphaerese>
7774	7778	<elision3>	<elision3>
7774	7775	<>	<elision3>
7774	7778	<elision2>	<elision2>
7774	7775	<>	<elision2>
7774	7778	<elision1>	<elision1>
7774	7775	<>	<elision1>
7774	138	.	υ
7774	7257	s	υ
7774	138	.	u
7774	7257	s	u
7774	138	.	κ
7774	7486	s	κ
7774	7346	s	k
7774	7367	s	U
7774	7466	s	K
7774	138	.	α
7774	7422	s	α
7774	138	.	a
7774	7422	s	a
7774	7425	s	A
7774	138	.	λ
7774	7486	s	λ
7774	7431	s	l
7774	7476	s	L
7774	7049	<2s>	<>
7775	128	.	.
7775	129	 	 
7775	128	<~>	<~>
7775	128	<split-s>	<split-s>
7775	128	<split-h>	<split-h>
7775	128	<name2>	<name2>
7775	132	<aphaerese>	<aphaerese>
7775	7773	<>	<aphaerese>
7775	7776	<elision3>	<elision3>
7775	7773	<>	<elision3>
7775	7776	<elision2>	<elision2>
7775	7773	<>	<elision2>
7775	7776	<elision1>	<elision1>
7775	7773	<>	<elision1>
7775	136	.	υ
7775	6679	s	υ
7775	136	.	u
7775	6679	s	u
7775	136	.	κ
7775	7484	s	κ
7775	7344	s	k
7775	7365	s	U
7775	7464	s	K
7775	136	.	α
7775	7420	s	α
7775	136	.	a
7775	7420	s	a
7775	7423	s	A
7775	136	.	λ
7775	7484	s	λ
7775	7429	s	l
7775	7474	s	L
7775	7047	<2s>	<>
7776	128	.	.
7776	129	 	 
7776	128	<~>	<~>
7776	128	<split-s>	<split-s>
7776	128	<split-h>	<split-h>
7776	128	<name2>	<name2>
7776	7777	<>	<name>
7776	132	<aphaerese>	<aphaerese>
7776	7776	<>	<aphaerese>
7776	128	<elision3>	<elision3>
7776	7776	<>	<elision3>
7776	128	<elision2>	<elision2>
7776	7776	<>	<elision2>
7776	128	<elision1>	<elision1>
7776	7776	<>	<elision1>
7776	136	.	υ
7776	6679	s	υ
7776	136	.	u
7776	6679	s	u
7776	7261	.	κ
7776	7779	s	κ
7776	7785	s	k
7776	7365	s	U
7776	7791	s	K
7776	136	.	α
7776	7420	s	α
7776	136	.	a
7776	7420	s	a
7776	7423	s	A
7776	7803	s	λ
7776	7806	s	l
7776	7809	s	L
7776	6951	<2s>	<>
7777	131	.	.
7777	134	 	 
7777	131	<~>	<~>
7777	131	<split-s>	<split-s>
7777	131	<split-h>	<split-h>
7777	131	<name2>	<name2>
7777	7463	<aphaerese>	<aphaerese>
7777	7778	<>	<aphaerese>
7777	131	<elision3>	<elision3>
7777	7778	<>	<elision3>
7777	131	<elision2>	<elision2>
7777	7778	<>	<elision2>
7777	131	<elision1>	<elision1>
7777	7778	<>	<elision1>
7777	138	.	υ
7777	7257	s	υ
7777	138	.	u
7777	7257	s	u
7777	7263	.	κ
7777	7781	s	κ
7777	7787	s	k
7777	7367	s	U
7777	7793	s	K
7777	138	.	α
7777	7422	s	α
7777	138	.	a
7777	7422	s	a
7777	7425	s	A
7777	7805	s	λ
7777	7808	s	l
7777	7811	s	L
7777	6952	<2s>	<>
7778	128	.	.
7778	129	 	 
7778	128	<~>	<~>
7778	128	<split-s>	<split-s>
7778	128	<split-h>	<split-h>
7778	128	<name2>	<name2>
7778	132	<aphaerese>	<aphaerese>
7778	7776	<>	<aphaerese>
7778	128	<elision3>	<elision3>
7778	7776	<>	<elision3>
7778	128	<elision2>	<elision2>
7778	7776	<>	<elision2>
7778	128	<elision1>	<elision1>
7778	7776	<>	<elision1>
7778	136	.	υ
7778	6679	s	υ
7778	136	.	u
7778	6679	s	u
7778	7261	.	κ
7778	7779	s	κ
7778	7785	s	k
7778	7365	s	U
7778	7791	s	K
7778	136	.	α
7778	7420	s	α
7778	136	.	a
7778	7420	s	a
7778	7423	s	A
7778	7803	s	λ
7778	7806	s	l
7778	7809	s	L
7778	6950	<2s>	<>
7779	6680	.	.
7779	6681	 	 
7779	6680	<~>	<~>
7779	6680	<split-s>	<split-s>
7779	6680	<split-h>	<split-h>
7779	6680	<name2>	<name2>
7779	7780	<>	<name>
7779	6684	<aphaerese>	<aphaerese>
7779	7779	<>	<aphaerese>
7779	7294	<elision3>	<elision3>
7779	7779	<>	<elision3>
7779	7294	<elision2>	<elision2>
7779	7779	<>	<elision2>
7779	7294	<elision1>	<elision1>
7779	7779	<>	<elision1>
7779	6688	.	υ
7779	6694	s	υ
7779	6688	.	u
7779	6694	s	u
7779	6688	.	κ
7779	7065	s	U
7779	6688	.	α
7779	6694	s	α
7779	6688	.	a
7779	6694	s	a
7779	7186	s	A
7779	6688	.	λ
7779	7783	<split-h>	<>
7780	6683	.	.
7780	6686	 	 
7780	6683	<~>	<~>
7780	6683	<split-s>	<split-s>
7780	6683	<split-h>	<split-h>
7780	6683	<name2>	<name2>
7780	7230	<aphaerese>	<aphaerese>
7780	7781	<>	<aphaerese>
7780	7296	<elision3>	<elision3>
7780	7781	<>	<elision3>
7780	7296	<elision2>	<elision2>
7780	7781	<>	<elision2>
7780	7296	<elision1>	<elision1>
7780	7781	<>	<elision1>
7780	6690	.	υ
7780	6866	s	υ
7780	6690	.	u
7780	6866	s	u
7780	6690	.	κ
7780	7067	s	U
7780	6690	.	α
7780	6866	s	α
7780	6690	.	a
7780	6866	s	a
7780	7188	s	A
7780	6690	.	λ
7780	7784	<split-h>	<>
7781	6680	.	.
7781	6681	 	 
7781	6680	<~>	<~>
7781	6680	<split-s>	<split-s>
7781	6680	<split-h>	<split-h>
7781	6680	<name2>	<name2>
7781	6684	<aphaerese>	<aphaerese>
7781	7779	<>	<aphaerese>
7781	7294	<elision3>	<elision3>
7781	7779	<>	<elision3>
7781	7294	<elision2>	<elision2>
7781	7779	<>	<elision2>
7781	7294	<elision1>	<elision1>
7781	7779	<>	<elision1>
7781	6688	.	υ
7781	6694	s	υ
7781	6688	.	u
7781	6694	s	u
7781	6688	.	κ
7781	7065	s	U
7781	6688	.	α
7781	6694	s	α
7781	6688	.	a
7781	6694	s	a
7781	7186	s	A
7781	6688	.	λ
7781	7782	<split-h>	<>
7782	7783	<>	<aphaerese>
7782	7783	<>	<elision3>
7782	7783	<>	<elision2>
7782	7783	<>	<elision1>
7782	7300	<3s>	<>
7783	7784	<>	<name>
7783	7783	<>	<aphaerese>
7783	7783	<>	<elision3>
7783	7783	<>	<elision2>
7783	7783	<>	<elision1>
7783	7301	<3s>	<>
7784	7782	<>	<aphaerese>
7784	7782	<>	<elision3>
7784	7782	<>	<elision2>
7784	7782	<>	<elision1>
7784	7302	<3s>	<>
7785	6680	.	.
7785	6681	 	 
7785	6680	<~>	<~>
7785	6680	<split-s>	<split-s>
7785	6680	<split-h>	<split-h>
7785	6680	<name2>	<name2>
7785	7786	<>	<name>
7785	6684	<aphaerese>	<aphaerese>
7785	7785	<>	<aphaerese>
7785	6680	<elision3>	<elision3>
7785	7785	<>	<elision3>
7785	6680	<elision2>	<elision2>
7785	7785	<>	<elision2>
7785	6680	<elision1>	<elision1>
7785	7785	<>	<elision1>
7785	6688	.	υ
7785	6694	s	υ
7785	6688	.	u
7785	6694	s	u
7785	7347	.	κ
7785	7065	s	U
7785	6688	.	α
7785	6694	s	α
7785	6688	.	a
7785	6694	s	a
7785	7186	s	A
7785	7347	.	λ
7785	7789	<split-h>	<>
7786	6683	.	.
7786	6686	 	 
7786	6683	<~>	<~>
7786	6683	<split-s>	<split-s>
7786	6683	<split-h>	<split-h>
7786	6683	<name2>	<name2>
7786	7230	<aphaerese>	<aphaerese>
7786	7787	<>	<aphaerese>
7786	6683	<elision3>	<elision3>
7786	7787	<>	<elision3>
7786	6683	<elision2>	<elision2>
7786	7787	<>	<elision2>
7786	6683	<elision1>	<elision1>
7786	7787	<>	<elision1>
7786	6690	.	υ
7786	6866	s	υ
7786	6690	.	u
7786	6866	s	u
7786	7349	.	κ
7786	7067	s	U
7786	6690	.	α
7786	6866	s	α
7786	6690	.	a
7786	6866	s	a
7786	7188	s	A
7786	7349	.	λ
7786	7790	<split-h>	<>
7787	6680	.	.
7787	6681	 	 
7787	6680	<~>	<~>
7787	6680	<split-s>	<split-s>
7787	6680	<split-h>	<split-h>
7787	6680	<name2>	<name2>
7787	6684	<aphaerese>	<aphaerese>
7787	7785	<>	<aphaerese>
7787	6680	<elision3>	<elision3>
7787	7785	<>	<elision3>
7787	6680	<elision2>	<elision2>
7787	7785	<>	<elision2>
7787	6680	<elision1>	<elision1>
7787	7785	<>	<elision1>
7787	6688	.	υ
7787	6694	s	υ
7787	6688	.	u
7787	6694	s	u
7787	7347	.	κ
7787	7065	s	U
7787	6688	.	α
7787	6694	s	α
7787	6688	.	a
7787	6694	s	a
7787	7186	s	A
7787	7347	.	λ
7787	7788	<split-h>	<>
7788	7789	<>	<aphaerese>
7788	7789	<>	<elision3>
7788	7789	<>	<elision2>
7788	7789	<>	<elision1>
7788	7309	<3s>	<>
7789	7790	<>	<name>
7789	7789	<>	<aphaerese>
7789	7789	<>	<elision3>
7789	7789	<>	<elision2>
7789	7789	<>	<elision1>
7789	7310	<3s>	<>
7790	7788	<>	<aphaerese>
7790	7788	<>	<elision3>
7790	7788	<>	<elision2>
7790	7788	<>	<elision1>
7790	7311	<3s>	<>
7791	7369	<name>	<name>
7791	7792	<>	<name>
7791	7794	<>	<aphaerese>
7791	7794	<>	<elision3>
7791	7794	<>	<elision2>
7791	7794	<>	<elision1>
7791	7416	<split-h>	<>
7791	7468	<L2kl>	<>
7791	7801	<K2kl>	<>
7792	7793	<>	<aphaerese>
7792	7793	<>	<elision3>
7792	7793	<>	<elision2>
7792	7793	<>	<elision1>
7792	7469	<L2kl>	<>
7792	7796	<K2kl>	<>
7793	7794	<>	<aphaerese>
7793	7794	<>	<elision3>
7793	7794	<>	<elision2>
7793	7794	<>	<elision1>
7793	7470	<L2kl>	<>
7793	7797	<K2kl>	<>
7794	7792	<>	<name>
7794	7794	<>	<aphaerese>
7794	7794	<>	<elision3>
7794	7794	<>	<elision2>
7794	7794	<>	<elision1>
7794	7468	<L2kl>	<>
7794	7795	<K2kl>	<>
7795	7350	.	.
7795	7350	 	 
7795	7350	<~>	<~>
7795	7350	<split-s>	<split-s>
7795	7350	<split-h>	<split-h>
7795	7350	<name2>	<name2>
7795	7796	<>	<name>
7795	7353	<aphaerese>	<aphaerese>
7795	7795	<>	<aphaerese>
7795	7350	<elision3>	<elision3>
7795	7795	<>	<elision3>
7795	7350	<elision2>	<elision2>
7795	7795	<>	<elision2>
7795	7350	<elision1>	<elision1>
7795	7795	<>	<elision1>
7795	7347	.	υ
7795	7347	.	u
7795	7347	.	α
7795	7347	.	a
7795	7799	<split-h>	<>
7796	7352	.	.
7796	7352	 	 
7796	7352	<~>	<~>
7796	7352	<split-s>	<split-s>
7796	7352	<split-h>	<split-h>
7796	7352	<name2>	<name2>
7796	7355	<aphaerese>	<aphaerese>
7796	7797	<>	<aphaerese>
7796	7352	<elision3>	<elision3>
7796	7797	<>	<elision3>
7796	7352	<elision2>	<elision2>
7796	7797	<>	<elision2>
7796	7352	<elision1>	<elision1>
7796	7797	<>	<elision1>
7796	7349	.	υ
7796	7349	.	u
7796	7349	.	α
7796	7349	.	a
7796	7800	<split-h>	<>
7797	7350	.	.
7797	7350	 	 
7797	7350	<~>	<~>
7797	7350	<split-s>	<split-s>
7797	7350	<split-h>	<split-h>
7797	7350	<name2>	<name2>
7797	7353	<aphaerese>	<aphaerese>
7797	7795	<>	<aphaerese>
7797	7350	<elision3>	<elision3>
7797	7795	<>	<elision3>
7797	7350	<elision2>	<elision2>
7797	7795	<>	<elision2>
7797	7350	<elision1>	<elision1>
7797	7795	<>	<elision1>
7797	7347	.	υ
7797	7347	.	u
7797	7347	.	α
7797	7347	.	a
7797	7798	<split-h>	<>
7798	7799	<>	<aphaerese>
7798	7799	<>	<elision3>
7798	7799	<>	<elision2>
7798	7799	<>	<elision1>
7798	7322	<3s>	<>
7799	7800	<>	<name>
7799	7799	<>	<aphaerese>
7799	7799	<>	<elision3>
7799	7799	<>	<elision2>
7799	7799	<>	<elision1>
7799	7323	<3s>	<>
7800	7798	<>	<aphaerese>
7800	7798	<>	<elision3>
7800	7798	<>	<elision2>
7800	7798	<>	<elision1>
7800	7324	<3s>	<>
7801	7350	.	.
7801	7350	 	 
7801	7350	<~>	<~>
7801	7350	<split-s>	<split-s>
7801	7350	<split-h>	<split-h>
7801	7350	<name2>	<name2>
7801	7418	<name2>	<name>
7801	7796	<>	<name>
7801	7353	<aphaerese>	<aphaerese>
7801	7795	<>	<aphaerese>
7801	7350	<elision3>	<elision3>
7801	7795	<>	<elision3>
7801	7350	<elision2>	<elision2>
7801	7795	<>	<elision2>
7801	7350	<elision1>	<elision1>
7801	7795	<>	<elision1>
7801	7347	.	υ
7801	7347	.	u
7801	7347	.	α
7801	7347	.	a
7801	7802	<split-h>	<>
7802	7800	<>	<name>
7802	7799	<>	<aphaerese>
7802	7799	<>	<elision3>
7802	7799	<>	<elision2>
7802	7799	<>	<elision1>
7802	7329	<3s>	<>
7803	6680	.	.
7803	6681	 	 
7803	6680	<~>	<~>
7803	6680	<split-s>	<split-s>
7803	6680	<split-h>	<split-h>
7803	6680	<name2>	<name2>
7803	7804	<>	<name>
7803	6684	<aphaerese>	<aphaerese>
7803	7803	<>	<aphaerese>
7803	6680	<elision3>	<elision3>
7803	7803	<>	<elision3>
7803	6680	<elision2>	<elision2>
7803	7803	<>	<elision2>
7803	6680	<elision1>	<elision1>
7803	7803	<>	<elision1>
7803	6688	.	υ
7803	6694	s	υ
7803	6688	.	u
7803	6694	s	u
7803	6688	.	κ
7803	7065	s	U
7803	6688	.	α
7803	6694	s	α
7803	6688	.	a
7803	6694	s	a
7803	7186	s	A
7803	6688	.	λ
7803	7789	<split-h>	<>
7804	6683	.	.
7804	6686	 	 
7804	6683	<~>	<~>
7804	6683	<split-s>	<split-s>
7804	6683	<split-h>	<split-h>
7804	6683	<name2>	<name2>
7804	7230	<aphaerese>	<aphaerese>
7804	7805	<>	<aphaerese>
7804	6683	<elision3>	<elision3>
7804	7805	<>	<elision3>
7804	6683	<elision2>	<elision2>
7804	7805	<>	<elision2>
7804	6683	<elision1>	<elision1>
7804	7805	<>	<elision1>
7804	6690	.	υ
7804	6866	s	υ
7804	6690	.	u
7804	6866	s	u
7804	6690	.	κ
7804	7067	s	U
7804	6690	.	α
7804	6866	s	α
7804	6690	.	a
7804	6866	s	a
7804	7188	s	A
7804	6690	.	λ
7804	7790	<split-h>	<>
7805	6680	.	.
7805	6681	 	 
7805	6680	<~>	<~>
7805	6680	<split-s>	<split-s>
7805	6680	<split-h>	<split-h>
7805	6680	<name2>	<name2>
7805	6684	<aphaerese>	<aphaerese>
7805	7803	<>	<aphaerese>
7805	6680	<elision3>	<elision3>
7805	7803	<>	<elision3>
7805	6680	<elision2>	<elision2>
7805	7803	<>	<elision2>
7805	6680	<elision1>	<elision1>
7805	7803	<>	<elision1>
7805	6688	.	υ
7805	6694	s	υ
7805	6688	.	u
7805	6694	s	u
7805	6688	.	κ
7805	7065	s	U
7805	6688	.	α
7805	6694	s	α
7805	6688	.	a
7805	6694	s	a
7805	7186	s	A
7805	6688	.	λ
7805	7788	<split-h>	<>
7806	7350	.	.
7806	7350	 	 
7806	7350	<~>	<~>
7806	7350	<split-s>	<split-s>
7806	7350	<split-h>	<split-h>
7806	7350	<name2>	<name2>
7806	7807	<>	<name>
7806	7353	<aphaerese>	<aphaerese>
7806	7806	<>	<aphaerese>
7806	7350	<elision3>	<elision3>
7806	7806	<>	<elision3>
7806	7350	<elision2>	<elision2>
7806	7806	<>	<elision2>
7806	7350	<elision1>	<elision1>
7806	7806	<>	<elision1>
7806	7347	.	υ
7806	7347	.	u
7806	7347	.	κ
7806	7347	.	α
7806	7347	.	a
7806	7347	.	λ
7806	7789	<split-h>	<>
7807	7352	.	.
7807	7352	 	 
7807	7352	<~>	<~>
7807	7352	<split-s>	<split-s>
7807	7352	<split-h>	<split-h>
7807	7352	<name2>	<name2>
7807	7355	<aphaerese>	<aphaerese>
7807	7808	<>	<aphaerese>
7807	7352	<elision3>	<elision3>
7807	7808	<>	<elision3>
7807	7352	<elision2>	<elision2>
7807	7808	<>	<elision2>
7807	7352	<elision1>	<elision1>
7807	7808	<>	<elision1>
7807	7349	.	υ
7807	7349	.	u
7807	7349	.	κ
7807	7349	.	α
7807	7349	.	a
7807	7349	.	λ
7807	7790	<split-h>	<>
7808	7350	.	.
7808	7350	 	 
7808	7350	<~>	<~>
7808	7350	<split-s>	<split-s>
7808	7350	<split-h>	<split-h>
7808	7350	<name2>	<name2>
7808	7353	<aphaerese>	<aphaerese>
7808	7806	<>	<aphaerese>
7808	7350	<elision3>	<elision3>
7808	7806	<>	<elision3>
7808	7350	<elision2>	<elision2>
7808	7806	<>	<elision2>
7808	7350	<elision1>	<elision1>
7808	7806	<>	<elision1>
7808	7347	.	υ
7808	7347	.	u
7808	7347	.	κ
7808	7347	.	α
7808	7347	.	a
7808	7347	.	λ
7808	7788	<split-h>	<>
7809	7418	<name>	<name>
7809	7810	<>	<name>
7809	7812	<>	<aphaerese>
7809	7812	<>	<elision3>
7809	7812	<>	<elision2>
7809	7812	<>	<elision1>
7809	7416	<split-h>	<>
7809	7813	<L2kl>	<>
7810	7811	<>	<aphaerese>
7810	7811	<>	<elision3>
7810	7811	<>	<elision2>
7810	7811	<>	<elision1>
7810	7807	<L2kl>	<>
7811	7812	<>	<aphaerese>
7811	7812	<>	<elision3>
7811	7812	<>	<elision2>
7811	7812	<>	<elision1>
7811	7808	<L2kl>	<>
7812	7810	<>	<name>
7812	7812	<>	<aphaerese>
7812	7812	<>	<elision3>
7812	7812	<>	<elision2>
7812	7812	<>	<elision1>
7812	7806	<L2kl>	<>
7813	7350	.	.
7813	7350	 	 
7813	7350	<~>	<~>
7813	7350	<split-s>	<split-s>
7813	7350	<split-h>	<split-h>
7813	7350	<name2>	<name2>
7813	7418	<name2>	<name>
7813	7807	<>	<name>
7813	7353	<aphaerese>	<aphaerese>
7813	7806	<>	<aphaerese>
7813	7350	<elision3>	<elision3>
7813	7806	<>	<elision3>
7813	7350	<elision2>	<elision2>
7813	7806	<>	<elision2>
7813	7350	<elision1>	<elision1>
7813	7806	<>	<elision1>
7813	7347	.	υ
7813	7347	.	u
7813	7347	.	κ
7813	7347	.	α
7813	7347	.	a
7813	7347	.	λ
7813	7814	<split-h>	<>
7814	7790	<>	<name>
7814	7789	<>	<aphaerese>
7814	7789	<>	<elision3>
7814	7789	<>	<elision2>
7814	7789	<>	<elision1>
7814	7336	<3s>	<>
7815	7816	<>	<name>
7815	7815	<>	<aphaerese>
7815	7815	<>	<elision3>
7815	7815	<>	<elision2>
7815	7815	<>	<elision1>
7815	7496	<U2kl>	<>
7816	7817	<>	<aphaerese>
7816	7817	<>	<elision3>
7816	7817	<>	<elision2>
7816	7817	<>	<elision1>
7816	7522	<U2kl>	<>
7817	7815	<>	<aphaerese>
7817	7815	<>	<elision3>
7817	7815	<>	<elision2>
7817	7815	<>	<elision1>
7817	7499	<U2kl>	<>
7818	7524	<name>	<name>
7818	7819	<>	<name>
7818	7821	<>	<aphaerese>
7818	7821	<>	<elision3>
7818	7821	<>	<elision2>
7818	7821	<>	<elision1>
7818	7180	<2s>	<>
7818	7822	<A2kl>	<>
7818	7834	<L2kl>	<>
7818	7537	<K2kl>	<>
7819	7820	<>	<aphaerese>
7819	7820	<>	<elision3>
7819	7820	<>	<elision2>
7819	7820	<>	<elision1>
7819	7823	<A2kl>	<>
7819	7835	<L2kl>	<>
7819	7532	<K2kl>	<>
7820	7821	<>	<aphaerese>
7820	7821	<>	<elision3>
7820	7821	<>	<elision2>
7820	7821	<>	<elision1>
7820	7824	<A2kl>	<>
7820	7836	<L2kl>	<>
7820	7533	<K2kl>	<>
7821	7819	<>	<name>
7821	7821	<>	<aphaerese>
7821	7821	<>	<elision3>
7821	7821	<>	<elision2>
7821	7821	<>	<elision1>
7821	7822	<A2kl>	<>
7821	7834	<L2kl>	<>
7821	7531	<K2kl>	<>
7822	7823	<>	<name>
7822	7822	<>	<aphaerese>
7822	7822	<>	<elision3>
7822	7822	<>	<elision2>
7822	7822	<>	<elision1>
7822	7825	.	κ
7822	7825	.	λ
7822	7130	<2s>	<>
7823	7824	<>	<aphaerese>
7823	7824	<>	<elision3>
7823	7824	<>	<elision2>
7823	7824	<>	<elision1>
7823	7827	.	κ
7823	7827	.	λ
7823	7131	<2s>	<>
7824	7822	<>	<aphaerese>
7824	7822	<>	<elision3>
7824	7822	<>	<elision2>
7824	7822	<>	<elision1>
7824	7825	.	κ
7824	7825	.	λ
7824	7129	<2s>	<>
7825	7826	<>	<name>
7825	7825	<>	<aphaerese>
7825	7828	<elision3>	<elision3>
7825	7825	<>	<elision3>
7825	7828	<elision2>	<elision2>
7825	7825	<>	<elision2>
7825	7828	<elision1>	<elision1>
7825	7825	<>	<elision1>
7825	7121	<2s>	<>
7826	7827	<>	<aphaerese>
7826	7830	<elision3>	<elision3>
7826	7827	<>	<elision3>
7826	7830	<elision2>	<elision2>
7826	7827	<>	<elision2>
7826	7830	<elision1>	<elision1>
7826	7827	<>	<elision1>
7826	7122	<2s>	<>
7827	7825	<>	<aphaerese>
7827	7828	<elision3>	<elision3>
7827	7825	<>	<elision3>
7827	7828	<elision2>	<elision2>
7827	7825	<>	<elision2>
7827	7828	<elision1>	<elision1>
7827	7825	<>	<elision1>
7827	7120	<2s>	<>
7828	7496	.	.
7828	7497	 	 
7828	7496	<~>	<~>
7828	7496	<split-s>	<split-s>
7828	7496	<split-h>	<split-h>
7828	7496	<name2>	<name2>
7828	7829	<>	<name>
7828	7500	<aphaerese>	<aphaerese>
7828	7828	<>	<aphaerese>
7828	7496	<elision3>	<elision3>
7828	7828	<>	<elision3>
7828	7496	<elision2>	<elision2>
7828	7828	<>	<elision2>
7828	7496	<elision1>	<elision1>
7828	7828	<>	<elision1>
7828	7493	.	υ
7828	7420	s	υ
7828	7493	.	u
7828	7420	s	u
7828	7392	s	κ
7828	7392	s	k
7828	7365	s	U
7828	7831	s	K
7828	7493	.	α
7828	7420	s	α
7828	7493	.	a
7828	7420	s	a
7828	7423	s	A
7828	7392	s	λ
7828	7392	s	l
7828	7831	s	L
7828	7085	<2s>	<>
7829	7499	.	.
7829	7502	 	 
7829	7499	<~>	<~>
7829	7499	<split-s>	<split-s>
7829	7499	<split-h>	<split-h>
7829	7499	<name2>	<name2>
7829	7519	<aphaerese>	<aphaerese>
7829	7830	<>	<aphaerese>
7829	7499	<elision3>	<elision3>
7829	7830	<>	<elision3>
7829	7499	<elision2>	<elision2>
7829	7830	<>	<elision2>
7829	7499	<elision1>	<elision1>
7829	7830	<>	<elision1>
7829	7495	.	υ
7829	7422	s	υ
7829	7495	.	u
7829	7422	s	u
7829	7394	s	κ
7829	7394	s	k
7829	7367	s	U
7829	7833	s	K
7829	7495	.	α
7829	7422	s	α
7829	7495	.	a
7829	7422	s	a
7829	7425	s	A
7829	7394	s	λ
7829	7394	s	l
7829	7833	s	L
7829	7086	<2s>	<>
7830	7496	.	.
7830	7497	 	 
7830	7496	<~>	<~>
7830	7496	<split-s>	<split-s>
7830	7496	<split-h>	<split-h>
7830	7496	<name2>	<name2>
7830	7500	<aphaerese>	<aphaerese>
7830	7828	<>	<aphaerese>
7830	7496	<elision3>	<elision3>
7830	7828	<>	<elision3>
7830	7496	<elision2>	<elision2>
7830	7828	<>	<elision2>
7830	7496	<elision1>	<elision1>
7830	7828	<>	<elision1>
7830	7493	.	υ
7830	7420	s	υ
7830	7493	.	u
7830	7420	s	u
7830	7392	s	κ
7830	7392	s	k
7830	7365	s	U
7830	7831	s	K
7830	7493	.	α
7830	7420	s	α
7830	7493	.	a
7830	7420	s	a
7830	7423	s	A
7830	7392	s	λ
7830	7392	s	l
7830	7831	s	L
7830	7084	<2s>	<>
7831	7832	<>	<name>
7831	7831	<>	<aphaerese>
7831	7831	<>	<elision3>
7831	7831	<>	<elision2>
7831	7831	<>	<elision1>
7831	7392	<L2kl>	<>
7832	7833	<>	<aphaerese>
7832	7833	<>	<elision3>
7832	7833	<>	<elision2>
7832	7833	<>	<elision1>
7832	7393	<L2kl>	<>
7833	7831	<>	<aphaerese>
7833	7831	<>	<elision3>
7833	7831	<>	<elision2>
7833	7831	<>	<elision1>
7833	7394	<L2kl>	<>
7834	7835	<>	<name>
7834	7834	<>	<aphaerese>
7834	7834	<>	<elision3>
7834	7834	<>	<elision2>
7834	7834	<>	<elision1>
7834	7837	.	κ
7834	7837	.	λ
7834	7163	<2s>	<>
7835	7836	<>	<aphaerese>
7835	7836	<>	<elision3>
7835	7836	<>	<elision2>
7835	7836	<>	<elision1>
7835	7839	.	κ
7835	7839	.	λ
7835	7164	<2s>	<>
7836	7834	<>	<aphaerese>
7836	7834	<>	<elision3>
7836	7834	<>	<elision2>
7836	7834	<>	<elision1>
7836	7837	.	κ
7836	7837	.	λ
7836	7162	<2s>	<>
7837	7838	<>	<name>
7837	7837	<>	<aphaerese>
7837	7840	<elision3>	<elision3>
7837	7837	<>	<elision3>
7837	7840	<elision2>	<elision2>
7837	7837	<>	<elision2>
7837	7840	<elision1>	<elision1>
7837	7837	<>	<elision1>
7837	7154	<2s>	<>
7838	7839	<>	<aphaerese>
7838	7842	<elision3>	<elision3>
7838	7839	<>	<elision3>
7838	7842	<elision2>	<elision2>
7838	7839	<>	<elision2>
7838	7842	<elision1>	<elision1>
7838	7839	<>	<elision1>
7838	7155	<2s>	<>
7839	7837	<>	<aphaerese>
7839	7840	<elision3>	<elision3>
7839	7837	<>	<elision3>
7839	7840	<elision2>	<elision2>
7839	7837	<>	<elision2>
7839	7840	<elision1>	<elision1>
7839	7837	<>	<elision1>
7839	7153	<2s>	<>
7840	7841	<>	<name>
7840	7840	<>	<aphaerese>
7840	7840	<>	<elision3>
7840	7840	<>	<elision2>
7840	7840	<>	<elision1>
7840	7504	.	κ
7840	7510	s	κ
7840	7429	s	k
7840	7520	s	K
7840	7429	s	λ
7840	7429	s	l
7840	7474	s	L
7840	7148	<2s>	<>
7841	7842	<>	<aphaerese>
7841	7842	<>	<elision3>
7841	7842	<>	<elision2>
7841	7842	<>	<elision1>
7841	7506	.	κ
7841	7512	s	κ
7841	7431	s	k
7841	7466	s	K
7841	7431	s	λ
7841	7431	s	l
7841	7476	s	L
7841	7149	<2s>	<>
7842	7840	<>	<aphaerese>
7842	7840	<>	<elision3>
7842	7840	<>	<elision2>
7842	7840	<>	<elision1>
7842	7504	.	κ
7842	7510	s	κ
7842	7429	s	k
7842	7520	s	K
7842	7429	s	λ
7842	7429	s	l
7842	7474	s	L
7842	7147	<2s>	<>
7843	7496	.	.
7843	7497	 	 
7843	7496	<~>	<~>
7843	7496	<split-s>	<split-s>
7843	7496	<split-h>	<split-h>
7843	7496	<name2>	<name2>
7843	7844	<>	<name>
7843	7500	<aphaerese>	<aphaerese>
7843	7843	<>	<aphaerese>
7843	7843	<>	<elision3>
7843	7843	<>	<elision2>
7843	7843	<>	<elision1>
7843	7493	.	υ
7843	7420	s	υ
7843	7493	.	u
7843	7420	s	u
7843	7504	.	κ
7843	7510	s	κ
7843	7429	s	k
7843	7365	s	U
7843	7520	s	K
7843	7493	.	α
7843	7420	s	α
7843	7493	.	a
7843	7420	s	a
7843	7423	s	A
7843	7429	s	λ
7843	7429	s	l
7843	7474	s	L
7843	6868	<2s>	<>
7844	7499	.	.
7844	7502	 	 
7844	7499	<~>	<~>
7844	7499	<split-s>	<split-s>
7844	7499	<split-h>	<split-h>
7844	7499	<name2>	<name2>
7844	7519	<aphaerese>	<aphaerese>
7844	7845	<>	<aphaerese>
7844	7845	<>	<elision3>
7844	7845	<>	<elision2>
7844	7845	<>	<elision1>
7844	7495	.	υ
7844	7422	s	υ
7844	7495	.	u
7844	7422	s	u
7844	7506	.	κ
7844	7512	s	κ
7844	7431	s	k
7844	7367	s	U
7844	7466	s	K
7844	7495	.	α
7844	7422	s	α
7844	7495	.	a
7844	7422	s	a
7844	7425	s	A
7844	7431	s	λ
7844	7431	s	l
7844	7476	s	L
7844	6869	<2s>	<>
7845	7496	.	.
7845	7497	 	 
7845	7496	<~>	<~>
7845	7496	<split-s>	<split-s>
7845	7496	<split-h>	<split-h>
7845	7496	<name2>	<name2>
7845	7500	<aphaerese>	<aphaerese>
7845	7843	<>	<aphaerese>
7845	7843	<>	<elision3>
7845	7843	<>	<elision2>
7845	7843	<>	<elision1>
7845	7493	.	υ
7845	7420	s	υ
7845	7493	.	u
7845	7420	s	u
7845	7504	.	κ
7845	7510	s	κ
7845	7429	s	k
7845	7365	s	U
7845	7520	s	K
7845	7493	.	α
7845	7420	s	α
7845	7493	.	a
7845	7420	s	a
7845	7423	s	A
7845	7429	s	λ
7845	7429	s	l
7845	7474	s	L
7845	6867	<2s>	<>
7846	7847	<>	<name>
7846	7846	<>	<aphaerese>
7846	7846	<>	<elision3>
7846	7846	<>	<elision2>
7846	7846	<>	<elision1>
7846	7496	<A2kl>	<>
7847	7848	<>	<aphaerese>
7847	7848	<>	<elision3>
7847	7848	<>	<elision2>
7847	7848	<>	<elision1>
7847	7522	<A2kl>	<>
7848	7846	<>	<aphaerese>
7848	7846	<>	<elision3>
7848	7846	<>	<elision2>
7848	7846	<>	<elision1>
7848	7499	<A2kl>	<>
7849	128	.	.
7849	129	 	 
7849	128	<~>	<~>
7849	128	<split-s>	<split-s>
7849	128	<split-h>	<split-h>
7849	128	<name2>	<name2>
7849	7850	<>	<name>
7849	132	<aphaerese>	<aphaerese>
7849	7849	<>	<aphaerese>
7849	128	<elision3>	<elision3>
7849	7849	<>	<elision3>
7849	128	<elision2>	<elision2>
7849	7849	<>	<elision2>
7849	128	<elision1>	<elision1>
7849	7849	<>	<elision1>
7849	136	.	υ
7849	6679	s	υ
7849	136	.	u
7849	6679	s	u
7849	136	.	κ
7849	7484	s	κ
7849	7344	s	k
7849	7365	s	U
7849	7464	s	K
7849	136	.	α
7849	7420	s	α
7849	136	.	a
7849	7420	s	a
7849	7423	s	A
7849	136	.	λ
7849	7484	s	λ
7849	7429	s	l
7849	7474	s	L
7849	7060	<2s>	<>
7850	131	.	.
7850	134	 	 
7850	131	<~>	<~>
7850	131	<split-s>	<split-s>
7850	131	<split-h>	<split-h>
7850	131	<name2>	<name2>
7850	7463	<aphaerese>	<aphaerese>
7850	7851	<>	<aphaerese>
7850	131	<elision3>	<elision3>
7850	7851	<>	<elision3>
7850	131	<elision2>	<elision2>
7850	7851	<>	<elision2>
7850	131	<elision1>	<elision1>
7850	7851	<>	<elision1>
7850	138	.	υ
7850	7257	s	υ
7850	138	.	u
7850	7257	s	u
7850	138	.	κ
7850	7486	s	κ
7850	7346	s	k
7850	7367	s	U
7850	7466	s	K
7850	138	.	α
7850	7422	s	α
7850	138	.	a
7850	7422	s	a
7850	7425	s	A
7850	138	.	λ
7850	7486	s	λ
7850	7431	s	l
7850	7476	s	L
7850	7061	<2s>	<>
7851	128	.	.
7851	129	 	 
7851	128	<~>	<~>
7851	128	<split-s>	<split-s>
7851	128	<split-h>	<split-h>
7851	128	<name2>	<name2>
7851	132	<aphaerese>	<aphaerese>
7851	7849	<>	<aphaerese>
7851	128	<elision3>	<elision3>
7851	7849	<>	<elision3>
7851	128	<elision2>	<elision2>
7851	7849	<>	<elision2>
7851	128	<elision1>	<elision1>
7851	7849	<>	<elision1>
7851	136	.	υ
7851	6679	s	υ
7851	136	.	u
7851	6679	s	u
7851	136	.	κ
7851	7484	s	κ
7851	7344	s	k
7851	7365	s	U
7851	7464	s	K
7851	136	.	α
7851	7420	s	α
7851	136	.	a
7851	7420	s	a
7851	7423	s	A
7851	136	.	λ
7851	7484	s	λ
7851	7429	s	l
7851	7474	s	L
7851	7059	<2s>	<>
7852	7524	<name>	<name>
7852	7853	<>	<name>
7852	7855	<>	<aphaerese>
7852	7855	<>	<elision3>
7852	7855	<>	<elision2>
7852	7855	<>	<elision1>
7852	7180	<2s>	<>
7852	7822	<A2kl>	<>
7852	7859	<L2kl>	<>
7853	7854	<>	<aphaerese>
7853	7854	<>	<elision3>
7853	7854	<>	<elision2>
7853	7854	<>	<elision1>
7853	7823	<A2kl>	<>
7853	7857	<L2kl>	<>
7854	7855	<>	<aphaerese>
7854	7855	<>	<elision3>
7854	7855	<>	<elision2>
7854	7855	<>	<elision1>
7854	7824	<A2kl>	<>
7854	7858	<L2kl>	<>
7855	7853	<>	<name>
7855	7855	<>	<aphaerese>
7855	7855	<>	<elision3>
7855	7855	<>	<elision2>
7855	7855	<>	<elision1>
7855	7822	<A2kl>	<>
7855	7856	<L2kl>	<>
7856	7496	.	.
7856	7497	 	 
7856	7496	<~>	<~>
7856	7496	<split-s>	<split-s>
7856	7496	<split-h>	<split-h>
7856	7496	<name2>	<name2>
7856	7857	<>	<name>
7856	7500	<aphaerese>	<aphaerese>
7856	7856	<>	<aphaerese>
7856	7496	<elision3>	<elision3>
7856	7856	<>	<elision3>
7856	7496	<elision2>	<elision2>
7856	7856	<>	<elision2>
7856	7496	<elision1>	<elision1>
7856	7856	<>	<elision1>
7856	7493	.	υ
7856	7420	s	υ
7856	7493	.	u
7856	7420	s	u
7856	7837	.	κ
7856	7534	s	κ
7856	7429	s	k
7856	7365	s	U
7856	7520	s	K
7856	7493	.	α
7856	7420	s	α
7856	7493	.	a
7856	7420	s	a
7856	7423	s	A
7856	7837	.	λ
7856	7534	s	λ
7856	7429	s	l
7856	7474	s	L
7856	7197	<2s>	<>
7857	7499	.	.
7857	7502	 	 
7857	7499	<~>	<~>
7857	7499	<split-s>	<split-s>
7857	7499	<split-h>	<split-h>
7857	7499	<name2>	<name2>
7857	7519	<aphaerese>	<aphaerese>
7857	7858	<>	<aphaerese>
7857	7499	<elision3>	<elision3>
7857	7858	<>	<elision3>
7857	7499	<elision2>	<elision2>
7857	7858	<>	<elision2>
7857	7499	<elision1>	<elision1>
7857	7858	<>	<elision1>
7857	7495	.	υ
7857	7422	s	υ
7857	7495	.	u
7857	7422	s	u
7857	7839	.	κ
7857	7536	s	κ
7857	7431	s	k
7857	7367	s	U
7857	7466	s	K
7857	7495	.	α
7857	7422	s	α
7857	7495	.	a
7857	7422	s	a
7857	7425	s	A
7857	7839	.	λ
7857	7536	s	λ
7857	7431	s	l
7857	7476	s	L
7857	7198	<2s>	<>
7858	7496	.	.
7858	7497	 	 
7858	7496	<~>	<~>
7858	7496	<split-s>	<split-s>
7858	7496	<split-h>	<split-h>
7858	7496	<name2>	<name2>
7858	7500	<aphaerese>	<aphaerese>
7858	7856	<>	<aphaerese>
7858	7496	<elision3>	<elision3>
7858	7856	<>	<elision3>
7858	7496	<elision2>	<elision2>
7858	7856	<>	<elision2>
7858	7496	<elision1>	<elision1>
7858	7856	<>	<elision1>
7858	7493	.	υ
7858	7420	s	υ
7858	7493	.	u
7858	7420	s	u
7858	7837	.	κ
7858	7534	s	κ
7858	7429	s	k
7858	7365	s	U
7858	7520	s	K
7858	7493	.	α
7858	7420	s	α
7858	7493	.	a
7858	7420	s	a
7858	7423	s	A
7858	7837	.	λ
7858	7534	s	λ
7858	7429	s	l
7858	7474	s	L
7858	7196	<2s>	<>
7859	7496	.	.
7859	7497	 	 
7859	7496	<~>	<~>
7859	7496	<split-s>	<split-s>
7859	7496	<split-h>	<split-h>
7859	7496	<name2>	<name2>
7859	7524	<name2>	<name>
7859	7857	<>	<name>
7859	7500	<aphaerese>	<aphaerese>
7859	7856	<>	<aphaerese>
7859	7496	<elision3>	<elision3>
7859	7856	<>	<elision3>
7859	7496	<elision2>	<elision2>
7859	7856	<>	<elision2>
7859	7496	<elision1>	<elision1>
7859	7856	<>	<elision1>
7859	7493	.	υ
7859	7420	s	υ
7859	7493	.	u
7859	7420	s	u
7859	7837	.	κ
7859	7534	s	κ
7859	7429	s	k
7859	7365	s	U
7859	7520	s	K
7859	7493	.	α
7859	7420	s	α
7859	7493	.	a
7859	7420	s	a
7859	7423	s	A
7859	7837	.	λ
7859	7534	s	λ
7859	7429	s	l
7859	7474	s	L
7859	7203	<2s>	<>
7860	128	.	.
7860	129	 	 
7860	128	<~>	<~>
7860	128	<split-s>	<split-s>
7860	128	<split-h>	<split-h>
7860	128	<name2>	<name2>
7860	7753	<>	<name>
7860	132	<aphaerese>	<aphaerese>
7860	7752	<>	<aphaerese>
7860	7752	<>	<elision3>
7860	7752	<>	<elision2>
7860	7752	<>	<elision1>
7860	136	.	υ
7860	6679	s	υ
7860	136	.	u
7860	6679	s	u
7860	7261	.	κ
7860	7291	s	κ
7860	7344	s	k
7860	7365	s	U
7860	7464	s	K
7860	136	.	α
7860	7420	s	α
7860	136	.	a
7860	7420	s	a
7860	7423	s	A
7860	7426	s	λ
7860	7429	s	l
7860	7474	s	L
7860	7209	<2s>	<>
7861	128	.	.
7861	129	 	 
7861	128	<~>	<~>
7861	128	<split-s>	<split-s>
7861	128	<split-h>	<split-h>
7861	128	<name2>	<name2>
7861	7774	<>	<name>
7861	132	<aphaerese>	<aphaerese>
7861	7773	<>	<aphaerese>
7861	7776	<elision3>	<elision3>
7861	7773	<>	<elision3>
7861	7776	<elision2>	<elision2>
7861	7773	<>	<elision2>
7861	7776	<elision1>	<elision1>
7861	7773	<>	<elision1>
7861	136	.	υ
7861	6679	s	υ
7861	136	.	u
7861	6679	s	u
7861	136	.	κ
7861	7484	s	κ
7861	7344	s	k
7861	7365	s	U
7861	7464	s	K
7861	136	.	α
7861	7420	s	α
7861	136	.	a
7861	7420	s	a
7861	7423	s	A
7861	136	.	λ
7861	7484	s	λ
7861	7429	s	l
7861	7474	s	L
7861	7212	<2s>	<>
7862	128	.	.
7862	129	 	 
7862	128	<~>	<~>
7862	128	<split-s>	<split-s>
7862	128	<split-h>	<split-h>
7862	128	<name2>	<name2>
7862	7491	<>	<name>
7862	132	<aphaerese>	<aphaerese>
7862	7490	<>	<aphaerese>
7862	128	<elision3>	<elision3>
7862	7490	<>	<elision3>
7862	128	<elision2>	<elision2>
7862	7490	<>	<elision2>
7862	128	<elision1>	<elision1>
7862	7490	<>	<elision1>
7862	136	.	υ
7862	6679	s	υ
7862	136	.	u
7862	6679	s	u
7862	7493	.	κ
7862	7484	s	κ
7862	7344	s	k
7862	7365	s	U
7862	7464	s	K
7862	136	.	α
7862	7420	s	α
7862	136	.	a
7862	7420	s	a
7862	7423	s	A
7862	7493	.	λ
7862	7484	s	λ
7862	7429	s	l
7862	7474	s	L
7862	7215	<2s>	<>
7863	7816	<>	<name>
7863	7815	<>	<aphaerese>
7863	7815	<>	<elision3>
7863	7815	<>	<elision2>
7863	7815	<>	<elision1>
7863	7864	<U2kl>	<>
7864	7496	.	.
7864	7497	 	 
7864	7496	<~>	<~>
7864	7496	<split-s>	<split-s>
7864	7496	<split-h>	<split-h>
7864	7496	<name2>	<name2>
7864	7522	<>	<name>
7864	7500	<aphaerese>	<aphaerese>
7864	7496	<>	<aphaerese>
7864	7496	<elision3>	<elision3>
7864	7496	<>	<elision3>
7864	7496	<elision2>	<elision2>
7864	7496	<>	<elision2>
7864	7496	<elision1>	<elision1>
7864	7496	<>	<elision1>
7864	7493	.	υ
7864	7420	s	υ
7864	7493	.	u
7864	7420	s	u
7864	7504	.	κ
7864	7510	s	κ
7864	7429	s	k
7864	7365	s	U
7864	7520	s	K
7864	7493	.	α
7864	7420	s	α
7864	7493	.	a
7864	7420	s	a
7864	7423	s	A
7864	7429	s	λ
7864	7429	s	l
7864	7474	s	L
7864	7219	<2s>	<>
7865	7524	<name>	<name>
7865	7819	<>	<name>
7865	7821	<>	<aphaerese>
7865	7821	<>	<elision3>
7865	7821	<>	<elision2>
7865	7821	<>	<elision1>
7865	7180	<2s>	<>
7865	7822	<A2kl>	<>
7865	7834	<L2kl>	<>
7865	7866	<K2kl>	<>
7866	7496	.	.
7866	7497	 	 
7866	7496	<~>	<~>
7866	7496	<split-s>	<split-s>
7866	7496	<split-h>	<split-h>
7866	7496	<name2>	<name2>
7866	7524	<name2>	<name>
7866	7532	<>	<name>
7866	7500	<aphaerese>	<aphaerese>
7866	7531	<>	<aphaerese>
7866	7496	<elision3>	<elision3>
7866	7531	<>	<elision3>
7866	7496	<elision2>	<elision2>
7866	7531	<>	<elision2>
7866	7496	<elision1>	<elision1>
7866	7531	<>	<elision1>
7866	7493	.	υ
7866	7420	s	υ
7866	7493	.	u
7866	7420	s	u
7866	7534	s	κ
7866	7429	s	k
7866	7365	s	U
7866	7520	s	K
7866	7493	.	α
7866	7420	s	α
7866	7493	.	a
7866	7420	s	a
7866	7423	s	A
7866	7534	s	λ
7866	7429	s	l
7866	7474	s	L
7866	7223	<2s>	<>
7867	7496	.	.
7867	7497	 	 
7867	7496	<~>	<~>
7867	7496	<split-s>	<split-s>
7867	7496	<split-h>	<split-h>
7867	7496	<name2>	<name2>
7867	7844	<>	<name>
7867	7500	<aphaerese>	<aphaerese>
7867	7843	<>	<aphaerese>
7867	7843	<>	<elision3>
7867	7843	<>	<elision2>
7867	7843	<>	<elision1>
7867	7493	.	υ
7867	7420	s	υ
7867	7493	.	u
7867	7420	s	u
7867	7504	.	κ
7867	7510	s	κ
7867	7429	s	k
7867	7365	s	U
7867	7520	s	K
7867	7493	.	α
7867	7420	s	α
7867	7493	.	a
7867	7420	s	a
7867	7423	s	A
7867	7429	s	λ
7867	7429	s	l
7867	7474	s	L
7867	7209	<2s>	<>
7868	7847	<>	<name>
7868	7846	<>	<aphaerese>
7868	7846	<>	<elision3>
7868	7846	<>	<elision2>
7868	7846	<>	<elision1>
7868	7864	<A2kl>	<>
7869	128	.	.
7869	129	 	 
7869	128	<~>	<~>
7869	128	<split-s>	<split-s>
7869	128	<split-h>	<split-h>
7869	128	<name2>	<name2>
7869	7850	<>	<name>
7869	132	<aphaerese>	<aphaerese>
7869	7849	<>	<aphaerese>
7869	128	<elision3>	<elision3>
7869	7849	<>	<elision3>
7869	128	<elision2>	<elision2>
7869	7849	<>	<elision2>
7869	128	<elision1>	<elision1>
7869	7849	<>	<elision1>
7869	136	.	υ
7869	6679	s	υ
7869	136	.	u
7869	6679	s	u
7869	136	.	κ
7869	7484	s	κ
7869	7344	s	k
7869	7365	s	U
7869	7464	s	K
7869	136	.	α
7869	7420	s	α
7869	136	.	a
7869	7420	s	a
7869	7423	s	A
7869	136	.	λ
7869	7484	s	λ
7869	7429	s	l
7869	7474	s	L
7869	7215	<2s>	<>
7870	7496	.	.
7870	7497	 	 
7870	7496	<~>	<~>
7870	7496	<split-s>	<split-s>
7870	7496	<split-h>	<split-h>
7870	7496	<name2>	<name2>
7870	7539	<>	<name>
7870	7500	<aphaerese>	<aphaerese>
7870	7538	<>	<aphaerese>
7870	7496	<elision3>	<elision3>
7870	7538	<>	<elision3>
7870	7496	<elision2>	<elision2>
7870	7538	<>	<elision2>
7870	7496	<elision1>	<elision1>
7870	7538	<>	<elision1>
7870	7493	.	υ
7870	7420	s	υ
7870	7493	.	u
7870	7420	s	u
7870	7493	.	κ
7870	7534	s	κ
7870	7429	s	k
7870	7365	s	U
7870	7520	s	K
7870	7493	.	α
7870	7420	s	α
7870	7493	.	a
7870	7420	s	a
7870	7423	s	A
7870	7493	.	λ
7870	7534	s	λ
7870	7429	s	l
7870	7474	s	L
7870	7215	<2s>	<>
7871	7524	<name>	<name>
7871	7853	<>	<name>
7871	7855	<>	<aphaerese>
7871	7855	<>	<elision3>
7871	7855	<>	<elision2>
7871	7855	<>	<elision1>
7871	7180	<2s>	<>
7871	7822	<A2kl>	<>
7871	7872	<L2kl>	<>
7872	7496	.	.
7872	7497	 	 
7872	7496	<~>	<~>
7872	7496	<split-s>	<split-s>
7872	7496	<split-h>	<split-h>
7872	7496	<name2>	<name2>
7872	7524	<name2>	<name>
7872	7857	<>	<name>
7872	7500	<aphaerese>	<aphaerese>
7872	7856	<>	<aphaerese>
7872	7496	<elision3>	<elision3>
7872	7856	<>	<elision3>
7872	7496	<elision2>	<elision2>
7872	7856	<>	<elision2>
7872	7496	<elision1>	<elision1>
7872	7856	<>	<elision1>
7872	7493	.	υ
7872	7420	s	υ
7872	7493	.	u
7872	7420	s	u
7872	7837	.	κ
7872	7534	s	κ
7872	7429	s	k
7872	7365	s	U
7872	7520	s	K
7872	7493	.	α
7872	7420	s	α
7872	7493	.	a
7872	7420	s	a
7872	7423	s	A
7872	7837	.	λ
7872	7534	s	λ
7872	7429	s	l
7872	7474	s	L
7872	7228	<2s>	<>
7873	7741	.	.
7873	7742	 	 
7873	7741	<~>	<~>
7873	7741	<split-s>	<split-s>
7873	7741	<split-h>	<split-h>
7873	7741	<name2>	<name2>
7873	7745	<aphaerese>	<aphaerese>
7873	7745	<>	<aphaerese>
7873	7741	<elision3>	<elision3>
7873	7745	<>	<elision3>
7873	7741	<elision2>	<elision2>
7873	7745	<>	<elision2>
7873	7741	<elision1>	<elision1>
7873	7745	<>	<elision1>
7873	7741	.	υ
7873	7741	.	u
7873	7755	.	κ
7873	7773	s	κ
7873	7490	s	k
7873	7815	s	U
7873	7523	s	K
7873	7741	.	α
7873	7741	.	a
7873	7846	s	A
7873	7849	s	λ
7873	7538	s	l
7873	7541	s	L
7874	7741	.	.
7874	7742	 	 
7874	7741	<~>	<~>
7874	7741	<split-s>	<split-s>
7874	7741	<split-h>	<split-h>
7874	7741	<name2>	<name2>
7874	7745	<aphaerese>	<aphaerese>
7874	7748	<>	<aphaerese>
7874	7741	<elision3>	<elision3>
7874	7748	<>	<elision3>
7874	7741	<elision2>	<elision2>
7874	7748	<>	<elision2>
7874	7741	<elision1>	<elision1>
7874	7748	<>	<elision1>
7874	7749	.	υ
7874	7752	s	υ
7874	7749	.	u
7874	7752	s	u
7874	7755	.	κ
7874	7773	s	κ
7874	7490	s	k
7874	7815	s	U
7874	7818	s	K
7874	7749	.	α
7874	7843	s	α
7874	7749	.	a
7874	7843	s	a
7874	7846	s	A
7874	7849	s	λ
7874	7538	s	l
7874	7852	s	L
7875	7744	.	.
7875	7747	 	 
7875	7744	<~>	<~>
7875	7744	<split-s>	<split-s>
7875	7744	<split-h>	<split-h>
7875	7744	<name2>	<name2>
7875	7873	<aphaerese>	<aphaerese>
7875	7744	<>	<aphaerese>
7875	7744	<elision3>	<elision3>
7875	7744	<>	<elision3>
7875	7744	<elision2>	<elision2>
7875	7744	<>	<elision2>
7875	7744	<elision1>	<elision1>
7875	7744	<>	<elision1>
7875	7751	.	υ
7875	7754	s	υ
7875	7751	.	u
7875	7754	s	u
7875	7757	.	κ
7875	7775	s	κ
7875	7492	s	k
7875	7817	s	U
7875	7526	s	K
7875	7751	.	α
7875	7845	s	α
7875	7751	.	a
7875	7845	s	a
7875	7848	s	A
7875	7851	s	λ
7875	7540	s	l
7875	7543	s	L
7876	7744	.	.
7876	7747	 	 
7876	7744	<~>	<~>
7876	7744	<split-s>	<split-s>
7876	7744	<split-h>	<split-h>
7876	7744	<name2>	<name2>
7876	7873	<aphaerese>	<aphaerese>
7876	7877	<>	<aphaerese>
7876	7880	<elision3>	<elision3>
7876	7877	<>	<elision3>
7876	7880	<elision2>	<elision2>
7876	7877	<>	<elision2>
7876	7880	<elision1>	<elision1>
7876	7877	<>	<elision1>
7876	7751	.	υ
7876	7754	s	υ
7876	7751	.	u
7876	7754	s	u
7876	7483	s	κ
7876	7492	s	k
7876	7817	s	U
7876	7526	s	K
7876	7751	.	α
7876	7845	s	α
7876	7751	.	a
7876	7845	s	a
7876	7848	s	A
7876	7483	s	λ
7876	7540	s	l
7876	7543	s	L
7877	7741	.	.
7877	7742	 	 
7877	7741	<~>	<~>
7877	7741	<split-s>	<split-s>
7877	7741	<split-h>	<split-h>
7877	7741	<name2>	<name2>
7877	7745	<aphaerese>	<aphaerese>
7877	7740	<>	<aphaerese>
7877	7878	<elision3>	<elision3>
7877	7740	<>	<elision3>
7877	7878	<elision2>	<elision2>
7877	7740	<>	<elision2>
7877	7878	<elision1>	<elision1>
7877	7740	<>	<elision1>
7877	7749	.	υ
7877	7752	s	υ
7877	7749	.	u
7877	7752	s	u
7877	127	s	κ
7877	7490	s	k
7877	7815	s	U
7877	7523	s	K
7877	7749	.	α
7877	7843	s	α
7877	7749	.	a
7877	7843	s	a
7877	7846	s	A
7877	127	s	λ
7877	7538	s	l
7877	7541	s	L
7878	7741	.	.
7878	7742	 	 
7878	7741	<~>	<~>
7878	7741	<split-s>	<split-s>
7878	7741	<split-h>	<split-h>
7878	7741	<name2>	<name2>
7878	7879	<>	<name>
7878	7745	<aphaerese>	<aphaerese>
7878	7878	<>	<aphaerese>
7878	7741	<elision3>	<elision3>
7878	7878	<>	<elision3>
7878	7741	<elision2>	<elision2>
7878	7878	<>	<elision2>
7878	7741	<elision1>	<elision1>
7878	7878	<>	<elision1>
7878	7749	.	υ
7878	7752	s	υ
7878	7749	.	u
7878	7752	s	u
7878	7755	.	κ
7878	7881	s	κ
7878	7884	s	k
7878	7815	s	U
7878	7887	s	K
7878	7749	.	α
7878	7843	s	α
7878	7749	.	a
7878	7843	s	a
7878	7846	s	A
7878	7895	s	λ
7878	7898	s	l
7878	7901	s	L
7879	7744	.	.
7879	7747	 	 
7879	7744	<~>	<~>
7879	7744	<split-s>	<split-s>
7879	7744	<split-h>	<split-h>
7879	7744	<name2>	<name2>
7879	7873	<aphaerese>	<aphaerese>
7879	7880	<>	<aphaerese>
7879	7744	<elision3>	<elision3>
7879	7880	<>	<elision3>
7879	7744	<elision2>	<elision2>
7879	7880	<>	<elision2>
7879	7744	<elision1>	<elision1>
7879	7880	<>	<elision1>
7879	7751	.	υ
7879	7754	s	υ
7879	7751	.	u
7879	7754	s	u
7879	7757	.	κ
7879	7883	s	κ
7879	7886	s	k
7879	7817	s	U
7879	7889	s	K
7879	7751	.	α
7879	7845	s	α
7879	7751	.	a
7879	7845	s	a
7879	7848	s	A
7879	7897	s	λ
7879	7900	s	l
7879	7903	s	L
7880	7741	.	.
7880	7742	 	 
7880	7741	<~>	<~>
7880	7741	<split-s>	<split-s>
7880	7741	<split-h>	<split-h>
7880	7741	<name2>	<name2>
7880	7745	<aphaerese>	<aphaerese>
7880	7878	<>	<aphaerese>
7880	7741	<elision3>	<elision3>
7880	7878	<>	<elision3>
7880	7741	<elision2>	<elision2>
7880	7878	<>	<elision2>
7880	7741	<elision1>	<elision1>
7880	7878	<>	<elision1>
7880	7749	.	υ
7880	7752	s	υ
7880	7749	.	u
7880	7752	s	u
7880	7755	.	κ
7880	7881	s	κ
7880	7884	s	k
7880	7815	s	U
7880	7887	s	K
7880	7749	.	α
7880	7843	s	α
7880	7749	.	a
7880	7843	s	a
7880	7846	s	A
7880	7895	s	λ
7880	7898	s	l
7880	7901	s	L
7881	128	.	.
7881	129	 	 
7881	128	<~>	<~>
7881	128	<split-s>	<split-s>
7881	128	<split-h>	<split-h>
7881	128	<name2>	<name2>
7881	7882	<>	<name>
7881	132	<aphaerese>	<aphaerese>
7881	7881	<>	<aphaerese>
7881	7776	<elision3>	<elision3>
7881	7881	<>	<elision3>
7881	7776	<elision2>	<elision2>
7881	7881	<>	<elision2>
7881	7776	<elision1>	<elision1>
7881	7881	<>	<elision1>
7881	136	.	υ
7881	6679	s	υ
7881	136	.	u
7881	6679	s	u
7881	136	.	κ
7881	7365	s	U
7881	136	.	α
7881	7420	s	α
7881	136	.	a
7881	7420	s	a
7881	7423	s	A
7881	136	.	λ
7881	7301	<2s>	<>
7882	131	.	.
7882	134	 	 
7882	131	<~>	<~>
7882	131	<split-s>	<split-s>
7882	131	<split-h>	<split-h>
7882	131	<name2>	<name2>
7882	7463	<aphaerese>	<aphaerese>
7882	7883	<>	<aphaerese>
7882	7778	<elision3>	<elision3>
7882	7883	<>	<elision3>
7882	7778	<elision2>	<elision2>
7882	7883	<>	<elision2>
7882	7778	<elision1>	<elision1>
7882	7883	<>	<elision1>
7882	138	.	υ
7882	7257	s	υ
7882	138	.	u
7882	7257	s	u
7882	138	.	κ
7882	7367	s	U
7882	138	.	α
7882	7422	s	α
7882	138	.	a
7882	7422	s	a
7882	7425	s	A
7882	138	.	λ
7882	7302	<2s>	<>
7883	128	.	.
7883	129	 	 
7883	128	<~>	<~>
7883	128	<split-s>	<split-s>
7883	128	<split-h>	<split-h>
7883	128	<name2>	<name2>
7883	132	<aphaerese>	<aphaerese>
7883	7881	<>	<aphaerese>
7883	7776	<elision3>	<elision3>
7883	7881	<>	<elision3>
7883	7776	<elision2>	<elision2>
7883	7881	<>	<elision2>
7883	7776	<elision1>	<elision1>
7883	7881	<>	<elision1>
7883	136	.	υ
7883	6679	s	υ
7883	136	.	u
7883	6679	s	u
7883	136	.	κ
7883	7365	s	U
7883	136	.	α
7883	7420	s	α
7883	136	.	a
7883	7420	s	a
7883	7423	s	A
7883	136	.	λ
7883	7300	<2s>	<>
7884	128	.	.
7884	129	 	 
7884	128	<~>	<~>
7884	128	<split-s>	<split-s>
7884	128	<split-h>	<split-h>
7884	128	<name2>	<name2>
7884	7885	<>	<name>
7884	132	<aphaerese>	<aphaerese>
7884	7884	<>	<aphaerese>
7884	128	<elision3>	<elision3>
7884	7884	<>	<elision3>
7884	128	<elision2>	<elision2>
7884	7884	<>	<elision2>
7884	128	<elision1>	<elision1>
7884	7884	<>	<elision1>
7884	136	.	υ
7884	6679	s	υ
7884	136	.	u
7884	6679	s	u
7884	7493	.	κ
7884	7365	s	U
7884	136	.	α
7884	7420	s	α
7884	136	.	a
7884	7420	s	a
7884	7423	s	A
7884	7493	.	λ
7884	7310	<2s>	<>
7885	131	.	.
7885	134	 	 
7885	131	<~>	<~>
7885	131	<split-s>	<split-s>
7885	131	<split-h>	<split-h>
7885	131	<name2>	<name2>
7885	7463	<aphaerese>	<aphaerese>
7885	7886	<>	<aphaerese>
7885	131	<elision3>	<elision3>
7885	7886	<>	<elision3>
7885	131	<elision2>	<elision2>
7885	7886	<>	<elision2>
7885	131	<elision1>	<elision1>
7885	7886	<>	<elision1>
7885	138	.	υ
7885	7257	s	υ
7885	138	.	u
7885	7257	s	u
7885	7495	.	κ
7885	7367	s	U
7885	138	.	α
7885	7422	s	α
7885	138	.	a
7885	7422	s	a
7885	7425	s	A
7885	7495	.	λ
7885	7311	<2s>	<>
7886	128	.	.
7886	129	 	 
7886	128	<~>	<~>
7886	128	<split-s>	<split-s>
7886	128	<split-h>	<split-h>
7886	128	<name2>	<name2>
7886	132	<aphaerese>	<aphaerese>
7886	7884	<>	<aphaerese>
7886	128	<elision3>	<elision3>
7886	7884	<>	<elision3>
7886	128	<elision2>	<elision2>
7886	7884	<>	<elision2>
7886	128	<elision1>	<elision1>
7886	7884	<>	<elision1>
7886	136	.	υ
7886	6679	s	υ
7886	136	.	u
7886	6679	s	u
7886	7493	.	κ
7886	7365	s	U
7886	136	.	α
7886	7420	s	α
7886	136	.	a
7886	7420	s	a
7886	7423	s	A
7886	7493	.	λ
7886	7309	<2s>	<>
7887	7524	<name>	<name>
7887	7888	<>	<name>
7887	7890	<>	<aphaerese>
7887	7890	<>	<elision3>
7887	7890	<>	<elision2>
7887	7890	<>	<elision1>
7887	7180	<2s>	<>
7887	7528	<L2kl>	<>
7887	7894	<K2kl>	<>
7888	7889	<>	<aphaerese>
7888	7889	<>	<elision3>
7888	7889	<>	<elision2>
7888	7889	<>	<elision1>
7888	7529	<L2kl>	<>
7888	7892	<K2kl>	<>
7889	7890	<>	<aphaerese>
7889	7890	<>	<elision3>
7889	7890	<>	<elision2>
7889	7890	<>	<elision1>
7889	7530	<L2kl>	<>
7889	7893	<K2kl>	<>
7890	7888	<>	<name>
7890	7890	<>	<aphaerese>
7890	7890	<>	<elision3>
7890	7890	<>	<elision2>
7890	7890	<>	<elision1>
7890	7528	<L2kl>	<>
7890	7891	<K2kl>	<>
7891	7496	.	.
7891	7497	 	 
7891	7496	<~>	<~>
7891	7496	<split-s>	<split-s>
7891	7496	<split-h>	<split-h>
7891	7496	<name2>	<name2>
7891	7892	<>	<name>
7891	7500	<aphaerese>	<aphaerese>
7891	7891	<>	<aphaerese>
7891	7496	<elision3>	<elision3>
7891	7891	<>	<elision3>
7891	7496	<elision2>	<elision2>
7891	7891	<>	<elision2>
7891	7496	<elision1>	<elision1>
7891	7891	<>	<elision1>
7891	7493	.	υ
7891	7420	s	υ
7891	7493	.	u
7891	7420	s	u
7891	7365	s	U
7891	7493	.	α
7891	7420	s	α
7891	7493	.	a
7891	7420	s	a
7891	7423	s	A
7891	7323	<2s>	<>
7892	7499	.	.
7892	7502	 	 
7892	7499	<~>	<~>
7892	7499	<split-s>	<split-s>
7892	7499	<split-h>	<split-h>
7892	7499	<name2>	<name2>
7892	7519	<aphaerese>	<aphaerese>
7892	7893	<>	<aphaerese>
7892	7499	<elision3>	<elision3>
7892	7893	<>	<elision3>
7892	7499	<elision2>	<elision2>
7892	7893	<>	<elision2>
7892	7499	<elision1>	<elision1>
7892	7893	<>	<elision1>
7892	7495	.	υ
7892	7422	s	υ
7892	7495	.	u
7892	7422	s	u
7892	7367	s	U
7892	7495	.	α
7892	7422	s	α
7892	7495	.	a
7892	7422	s	a
7892	7425	s	A
7892	7324	<2s>	<>
7893	7496	.	.
7893	7497	 	 
7893	7496	<~>	<~>
7893	7496	<split-s>	<split-s>
7893	7496	<split-h>	<split-h>
7893	7496	<name2>	<name2>
7893	7500	<aphaerese>	<aphaerese>
7893	7891	<>	<aphaerese>
7893	7496	<elision3>	<elision3>
7893	7891	<>	<elision3>
7893	7496	<elision2>	<elision2>
7893	7891	<>	<elision2>
7893	7496	<elision1>	<elision1>
7893	7891	<>	<elision1>
7893	7493	.	υ
7893	7420	s	υ
7893	7493	.	u
7893	7420	s	u
7893	7365	s	U
7893	7493	.	α
7893	7420	s	α
7893	7493	.	a
7893	7420	s	a
7893	7423	s	A
7893	7322	<2s>	<>
7894	7496	.	.
7894	7497	 	 
7894	7496	<~>	<~>
7894	7496	<split-s>	<split-s>
7894	7496	<split-h>	<split-h>
7894	7496	<name2>	<name2>
7894	7524	<name2>	<name>
7894	7892	<>	<name>
7894	7500	<aphaerese>	<aphaerese>
7894	7891	<>	<aphaerese>
7894	7496	<elision3>	<elision3>
7894	7891	<>	<elision3>
7894	7496	<elision2>	<elision2>
7894	7891	<>	<elision2>
7894	7496	<elision1>	<elision1>
7894	7891	<>	<elision1>
7894	7493	.	υ
7894	7420	s	υ
7894	7493	.	u
7894	7420	s	u
7894	7365	s	U
7894	7493	.	α
7894	7420	s	α
7894	7493	.	a
7894	7420	s	a
7894	7423	s	A
7894	7329	<2s>	<>
7895	128	.	.
7895	129	 	 
7895	128	<~>	<~>
7895	128	<split-s>	<split-s>
7895	128	<split-h>	<split-h>
7895	128	<name2>	<name2>
7895	7896	<>	<name>
7895	132	<aphaerese>	<aphaerese>
7895	7895	<>	<aphaerese>
7895	128	<elision3>	<elision3>
7895	7895	<>	<elision3>
7895	128	<elision2>	<elision2>
7895	7895	<>	<elision2>
7895	128	<elision1>	<elision1>
7895	7895	<>	<elision1>
7895	136	.	υ
7895	6679	s	υ
7895	136	.	u
7895	6679	s	u
7895	136	.	κ
7895	7365	s	U
7895	136	.	α
7895	7420	s	α
7895	136	.	a
7895	7420	s	a
7895	7423	s	A
7895	136	.	λ
7895	7310	<2s>	<>
7896	131	.	.
7896	134	 	 
7896	131	<~>	<~>
7896	131	<split-s>	<split-s>
7896	131	<split-h>	<split-h>
7896	131	<name2>	<name2>
7896	7463	<aphaerese>	<aphaerese>
7896	7897	<>	<aphaerese>
7896	131	<elision3>	<elision3>
7896	7897	<>	<elision3>
7896	131	<elision2>	<elision2>
7896	7897	<>	<elision2>
7896	131	<elision1>	<elision1>
7896	7897	<>	<elision1>
7896	138	.	υ
7896	7257	s	υ
7896	138	.	u
7896	7257	s	u
7896	138	.	κ
7896	7367	s	U
7896	138	.	α
7896	7422	s	α
7896	138	.	a
7896	7422	s	a
7896	7425	s	A
7896	138	.	λ
7896	7311	<2s>	<>
7897	128	.	.
7897	129	 	 
7897	128	<~>	<~>
7897	128	<split-s>	<split-s>
7897	128	<split-h>	<split-h>
7897	128	<name2>	<name2>
7897	132	<aphaerese>	<aphaerese>
7897	7895	<>	<aphaerese>
7897	128	<elision3>	<elision3>
7897	7895	<>	<elision3>
7897	128	<elision2>	<elision2>
7897	7895	<>	<elision2>
7897	128	<elision1>	<elision1>
7897	7895	<>	<elision1>
7897	136	.	υ
7897	6679	s	υ
7897	136	.	u
7897	6679	s	u
7897	136	.	κ
7897	7365	s	U
7897	136	.	α
7897	7420	s	α
7897	136	.	a
7897	7420	s	a
7897	7423	s	A
7897	136	.	λ
7897	7309	<2s>	<>
7898	7496	.	.
7898	7497	 	 
7898	7496	<~>	<~>
7898	7496	<split-s>	<split-s>
7898	7496	<split-h>	<split-h>
7898	7496	<name2>	<name2>
7898	7899	<>	<name>
7898	7500	<aphaerese>	<aphaerese>
7898	7898	<>	<aphaerese>
7898	7496	<elision3>	<elision3>
7898	7898	<>	<elision3>
7898	7496	<elision2>	<elision2>
7898	7898	<>	<elision2>
7898	7496	<elision1>	<elision1>
7898	7898	<>	<elision1>
7898	7493	.	υ
7898	7420	s	υ
7898	7493	.	u
7898	7420	s	u
7898	7493	.	κ
7898	7365	s	U
7898	7493	.	α
7898	7420	s	α
7898	7493	.	a
7898	7420	s	a
7898	7423	s	A
7898	7493	.	λ
7898	7310	<2s>	<>
7899	7499	.	.
7899	7502	 	 
7899	7499	<~>	<~>
7899	7499	<split-s>	<split-s>
7899	7499	<split-h>	<split-h>
7899	7499	<name2>	<name2>
7899	7519	<aphaerese>	<aphaerese>
7899	7900	<>	<aphaerese>
7899	7499	<elision3>	<elision3>
7899	7900	<>	<elision3>
7899	7499	<elision2>	<elision2>
7899	7900	<>	<elision2>
7899	7499	<elision1>	<elision1>
7899	7900	<>	<elision1>
7899	7495	.	υ
7899	7422	s	υ
7899	7495	.	u
7899	7422	s	u
7899	7495	.	κ
7899	7367	s	U
7899	7495	.	α
7899	7422	s	α
7899	7495	.	a
7899	7422	s	a
7899	7425	s	A
7899	7495	.	λ
7899	7311	<2s>	<>
7900	7496	.	.
7900	7497	 	 
7900	7496	<~>	<~>
7900	7496	<split-s>	<split-s>
7900	7496	<split-h>	<split-h>
7900	7496	<name2>	<name2>
7900	7500	<aphaerese>	<aphaerese>
7900	7898	<>	<aphaerese>
7900	7496	<elision3>	<elision3>
7900	7898	<>	<elision3>
7900	7496	<elision2>	<elision2>
7900	7898	<>	<elision2>
7900	7496	<elision1>	<elision1>
7900	7898	<>	<elision1>
7900	7493	.	υ
7900	7420	s	υ
7900	7493	.	u
7900	7420	s	u
7900	7493	.	κ
7900	7365	s	U
7900	7493	.	α
7900	7420	s	α
7900	7493	.	a
7900	7420	s	a
7900	7423	s	A
7900	7493	.	λ
7900	7309	<2s>	<>
7901	7524	<name>	<name>
7901	7902	<>	<name>
7901	7904	<>	<aphaerese>
7901	7904	<>	<elision3>
7901	7904	<>	<elision2>
7901	7904	<>	<elision1>
7901	7180	<2s>	<>
7901	7905	<L2kl>	<>
7902	7903	<>	<aphaerese>
7902	7903	<>	<elision3>
7902	7903	<>	<elision2>
7902	7903	<>	<elision1>
7902	7899	<L2kl>	<>
7903	7904	<>	<aphaerese>
7903	7904	<>	<elision3>
7903	7904	<>	<elision2>
7903	7904	<>	<elision1>
7903	7900	<L2kl>	<>
7904	7902	<>	<name>
7904	7904	<>	<aphaerese>
7904	7904	<>	<elision3>
7904	7904	<>	<elision2>
7904	7904	<>	<elision1>
7904	7898	<L2kl>	<>
7905	7496	.	.
7905	7497	 	 
7905	7496	<~>	<~>
7905	7496	<split-s>	<split-s>
7905	7496	<split-h>	<split-h>
7905	7496	<name2>	<name2>
7905	7524	<name2>	<name>
7905	7899	<>	<name>
7905	7500	<aphaerese>	<aphaerese>
7905	7898	<>	<aphaerese>
7905	7496	<elision3>	<elision3>
7905	7898	<>	<elision3>
7905	7496	<elision2>	<elision2>
7905	7898	<>	<elision2>
7905	7496	<elision1>	<elision1>
7905	7898	<>	<elision1>
7905	7493	.	υ
7905	7420	s	υ
7905	7493	.	u
7905	7420	s	u
7905	7493	.	κ
7905	7365	s	U
7905	7493	.	α
7905	7420	s	α
7905	7493	.	a
7905	7420	s	a
7905	7423	s	A
7905	7493	.	λ
7905	7336	<2s>	<>
7906	7907	.	.
7906	7908	 	 
7906	7907	<~>	<~>
7906	7907	<split-s>	<split-s>
7906	7907	<split-h>	<split-h>
7906	7907	<name2>	<name2>
7906	8022	<>	<name>
7906	7911	<aphaerese>	<aphaerese>
7906	7906	<>	<aphaerese>
7906	8024	<elision3>	<elision3>
7906	7906	<>	<elision3>
7906	8024	<elision2>	<elision2>
7906	7906	<>	<elision2>
7906	8024	<elision1>	<elision1>
7906	7906	<>	<elision1>
7906	7915	.	υ
7906	7918	s	υ
7906	7915	.	u
7906	7918	s	u
7906	7549	s	κ
7906	7674	s	k
7906	7964	s	U
7906	7692	s	K
7906	7915	.	α
7906	7989	s	α
7906	7915	.	a
7906	7989	s	a
7906	7992	s	A
7906	7549	s	λ
7906	7705	s	l
7906	7708	s	L
7906	8053	<1s>	<>
7907	7907	.	.
7907	7908	 	 
7907	7907	<~>	<~>
7907	7907	<split-s>	<split-s>
7907	7907	<split-h>	<split-h>
7907	7907	<name2>	<name2>
7907	8021	<>	<name>
7907	7911	<aphaerese>	<aphaerese>
7907	7907	<>	<aphaerese>
7907	7907	<elision3>	<elision3>
7907	7907	<>	<elision3>
7907	7907	<elision2>	<elision2>
7907	7907	<>	<elision2>
7907	7907	<elision1>	<elision1>
7907	7907	<>	<elision1>
7907	7915	.	υ
7907	7918	s	υ
7907	7915	.	u
7907	7918	s	u
7907	7921	.	κ
7907	7939	s	κ
7907	7674	s	k
7907	7964	s	U
7907	7692	s	K
7907	7915	.	α
7907	7989	s	α
7907	7915	.	a
7907	7989	s	a
7907	7992	s	A
7907	7995	s	λ
7907	7705	s	l
7907	7708	s	L
7907	6863	<1s>	<>
7908	7907	.	.
7908	7908	 	 
7908	7907	<~>	<~>
7908	7907	<split-s>	<split-s>
7908	7907	<split-h>	<split-h>
7908	7907	<name2>	<name2>
7908	7909	<>	<name>
7908	7911	<aphaerese>	<aphaerese>
7908	7914	<>	<aphaerese>
7908	7907	<elision3>	<elision3>
7908	7914	<>	<elision3>
7908	7907	<elision2>	<elision2>
7908	7914	<>	<elision2>
7908	7907	<elision1>	<elision1>
7908	7914	<>	<elision1>
7908	7915	.	υ
7908	8006	s	υ
7908	7915	.	u
7908	8006	s	u
7908	7921	.	κ
7908	8007	s	κ
7908	8008	s	k
7908	8009	s	U
7908	8011	s	K
7908	7915	.	α
7908	8013	s	α
7908	7915	.	a
7908	8013	s	a
7908	8014	s	A
7908	8015	s	λ
7908	8016	s	l
7908	8017	s	L
7908	6863	<1s>	<>
7909	7910	.	.
7909	7913	 	 
7909	7910	<~>	<~>
7909	7910	<split-s>	<split-s>
7909	7910	<split-h>	<split-h>
7909	7910	<name2>	<name2>
7909	8019	<aphaerese>	<aphaerese>
7909	8020	<>	<aphaerese>
7909	7910	<elision3>	<elision3>
7909	8020	<>	<elision3>
7909	7910	<elision2>	<elision2>
7909	8020	<>	<elision2>
7909	7910	<elision1>	<elision1>
7909	8020	<>	<elision1>
7909	7917	.	υ
7909	7920	s	υ
7909	7917	.	u
7909	7920	s	u
7909	7923	.	κ
7909	7941	s	κ
7909	7676	s	k
7909	7966	s	U
7909	7969	s	K
7909	7917	.	α
7909	7991	s	α
7909	7917	.	a
7909	7991	s	a
7909	7994	s	A
7909	7997	s	λ
7909	7707	s	l
7909	8000	s	L
7909	6864	<1s>	<>
7910	7907	.	.
7910	7908	 	 
7910	7907	<~>	<~>
7910	7907	<split-s>	<split-s>
7910	7907	<split-h>	<split-h>
7910	7907	<name2>	<name2>
7910	7911	<aphaerese>	<aphaerese>
7910	7907	<>	<aphaerese>
7910	7907	<elision3>	<elision3>
7910	7907	<>	<elision3>
7910	7907	<elision2>	<elision2>
7910	7907	<>	<elision2>
7910	7907	<elision1>	<elision1>
7910	7907	<>	<elision1>
7910	7915	.	υ
7910	7918	s	υ
7910	7915	.	u
7910	7918	s	u
7910	7921	.	κ
7910	7939	s	κ
7910	7674	s	k
7910	7964	s	U
7910	7692	s	K
7910	7915	.	α
7910	7989	s	α
7910	7915	.	a
7910	7989	s	a
7910	7992	s	A
7910	7995	s	λ
7910	7705	s	l
7910	7708	s	L
7910	6862	<1s>	<>
7911	7907	.	.
7911	7908	 	 
7911	7907	<~>	<~>
7911	7907	<split-s>	<split-s>
7911	7907	<split-h>	<split-h>
7911	7907	<name2>	<name2>
7911	7912	<>	<name>
7911	7911	<aphaerese>	<aphaerese>
7911	7911	<>	<aphaerese>
7911	7907	<elision3>	<elision3>
7911	7911	<>	<elision3>
7911	7907	<elision2>	<elision2>
7911	7911	<>	<elision2>
7911	7907	<elision1>	<elision1>
7911	7911	<>	<elision1>
7911	7907	.	υ
7911	7907	.	u
7911	7921	.	κ
7911	7939	s	κ
7911	7674	s	k
7911	7964	s	U
7911	7692	s	K
7911	7907	.	α
7911	7907	.	a
7911	7992	s	A
7911	7995	s	λ
7911	7705	s	l
7911	7708	s	L
7911	6850	<1s>	<>
7912	7910	.	.
7912	7913	 	 
7912	7910	<~>	<~>
7912	7910	<split-s>	<split-s>
7912	7910	<split-h>	<split-h>
7912	7910	<name2>	<name2>
7912	8019	<aphaerese>	<aphaerese>
7912	8019	<>	<aphaerese>
7912	7910	<elision3>	<elision3>
7912	8019	<>	<elision3>
7912	7910	<elision2>	<elision2>
7912	8019	<>	<elision2>
7912	7910	<elision1>	<elision1>
7912	8019	<>	<elision1>
7912	7910	.	υ
7912	7910	.	u
7912	7923	.	κ
7912	7941	s	κ
7912	7676	s	k
7912	7966	s	U
7912	7695	s	K
7912	7910	.	α
7912	7910	.	a
7912	7994	s	A
7912	7997	s	λ
7912	7707	s	l
7912	7710	s	L
7912	6851	<1s>	<>
7913	7907	.	.
7913	7908	 	 
7913	7907	<~>	<~>
7913	7907	<split-s>	<split-s>
7913	7907	<split-h>	<split-h>
7913	7907	<name2>	<name2>
7913	7911	<aphaerese>	<aphaerese>
7913	7914	<>	<aphaerese>
7913	7907	<elision3>	<elision3>
7913	7914	<>	<elision3>
7913	7907	<elision2>	<elision2>
7913	7914	<>	<elision2>
7913	7907	<elision1>	<elision1>
7913	7914	<>	<elision1>
7913	7915	.	υ
7913	8006	s	υ
7913	7915	.	u
7913	8006	s	u
7913	7921	.	κ
7913	8007	s	κ
7913	8008	s	k
7913	8009	s	U
7913	8011	s	K
7913	7915	.	α
7913	8013	s	α
7913	7915	.	a
7913	8013	s	a
7913	8014	s	A
7913	8015	s	λ
7913	8016	s	l
7913	8017	s	L
7913	6862	<1s>	<>
7914	7907	.	.
7914	7908	 	 
7914	7907	<~>	<~>
7914	7907	<split-s>	<split-s>
7914	7907	<split-h>	<split-h>
7914	7907	<name2>	<name2>
7914	7909	<>	<name>
7914	7911	<aphaerese>	<aphaerese>
7914	7914	<>	<aphaerese>
7914	7907	<elision3>	<elision3>
7914	7914	<>	<elision3>
7914	7907	<elision2>	<elision2>
7914	7914	<>	<elision2>
7914	7907	<elision1>	<elision1>
7914	7914	<>	<elision1>
7914	7915	.	υ
7914	7918	s	υ
7914	7915	.	u
7914	7918	s	u
7914	7921	.	κ
7914	7939	s	κ
7914	7674	s	k
7914	7964	s	U
7914	7967	s	K
7914	7915	.	α
7914	7989	s	α
7914	7915	.	a
7914	7989	s	a
7914	7992	s	A
7914	7995	s	λ
7914	7705	s	l
7914	7998	s	L
7914	6863	<1s>	<>
7915	7916	<>	<name>
7915	7915	<>	<aphaerese>
7915	7907	<elision3>	<elision3>
7915	7915	<>	<elision3>
7915	7907	<elision2>	<elision2>
7915	7915	<>	<elision2>
7915	7907	<elision1>	<elision1>
7915	7915	<>	<elision1>
7915	140	<1s>	<>
7916	7917	<>	<aphaerese>
7916	7910	<elision3>	<elision3>
7916	7917	<>	<elision3>
7916	7910	<elision2>	<elision2>
7916	7917	<>	<elision2>
7916	7910	<elision1>	<elision1>
7916	7917	<>	<elision1>
7916	141	<1s>	<>
7917	7915	<>	<aphaerese>
7917	7907	<elision3>	<elision3>
7917	7915	<>	<elision3>
7917	7907	<elision2>	<elision2>
7917	7915	<>	<elision2>
7917	7907	<elision1>	<elision1>
7917	7915	<>	<elision1>
7917	139	<1s>	<>
7918	7550	.	.
7918	7551	 	 
7918	7550	<~>	<~>
7918	7550	<split-s>	<split-s>
7918	7550	<split-h>	<split-h>
7918	7550	<name2>	<name2>
7918	7919	<>	<name>
7918	7554	<aphaerese>	<aphaerese>
7918	7918	<>	<aphaerese>
7918	7918	<>	<elision3>
7918	7918	<>	<elision2>
7918	7918	<>	<elision1>
7918	7558	.	υ
7918	7561	s	υ
7918	7558	.	u
7918	7561	s	u
7918	7579	.	κ
7918	7594	s	κ
7918	7600	s	k
7918	7603	s	U
7918	7655	s	K
7918	7558	.	α
7918	7561	s	α
7918	7558	.	a
7918	7561	s	a
7918	7633	s	A
7918	7600	s	λ
7918	7600	s	l
7918	7662	s	L
7918	6868	<2s>	<>
7919	7553	.	.
7919	7556	 	 
7919	7553	<~>	<~>
7919	7553	<split-s>	<split-s>
7919	7553	<split-h>	<split-h>
7919	7553	<name2>	<name2>
7919	7654	<aphaerese>	<aphaerese>
7919	7920	<>	<aphaerese>
7919	7920	<>	<elision3>
7919	7920	<>	<elision2>
7919	7920	<>	<elision1>
7919	7560	.	υ
7919	7578	s	υ
7919	7560	.	u
7919	7578	s	u
7919	7581	.	κ
7919	7596	s	κ
7919	7602	s	k
7919	7605	s	U
7919	7657	s	K
7919	7560	.	α
7919	7578	s	α
7919	7560	.	a
7919	7578	s	a
7919	7635	s	A
7919	7602	s	λ
7919	7602	s	l
7919	7664	s	L
7919	6869	<2s>	<>
7920	7550	.	.
7920	7551	 	 
7920	7550	<~>	<~>
7920	7550	<split-s>	<split-s>
7920	7550	<split-h>	<split-h>
7920	7550	<name2>	<name2>
7920	7554	<aphaerese>	<aphaerese>
7920	7918	<>	<aphaerese>
7920	7918	<>	<elision3>
7920	7918	<>	<elision2>
7920	7918	<>	<elision1>
7920	7558	.	υ
7920	7561	s	υ
7920	7558	.	u
7920	7561	s	u
7920	7579	.	κ
7920	7594	s	κ
7920	7600	s	k
7920	7603	s	U
7920	7655	s	K
7920	7558	.	α
7920	7561	s	α
7920	7558	.	a
7920	7561	s	a
7920	7633	s	A
7920	7600	s	λ
7920	7600	s	l
7920	7662	s	L
7920	6867	<2s>	<>
7921	7922	<>	<name>
7921	7921	<>	<aphaerese>
7921	7924	<elision3>	<elision3>
7921	7921	<>	<elision3>
7921	7924	<elision2>	<elision2>
7921	7921	<>	<elision2>
7921	7924	<elision1>	<elision1>
7921	7921	<>	<elision1>
7921	6847	<1s>	<>
7922	7923	<>	<aphaerese>
7922	7926	<elision3>	<elision3>
7922	7923	<>	<elision3>
7922	7926	<elision2>	<elision2>
7922	7923	<>	<elision2>
7922	7926	<elision1>	<elision1>
7922	7923	<>	<elision1>
7922	6848	<1s>	<>
7923	7921	<>	<aphaerese>
7923	7924	<elision3>	<elision3>
7923	7921	<>	<elision3>
7923	7924	<elision2>	<elision2>
7923	7921	<>	<elision2>
7923	7924	<elision1>	<elision1>
7923	7921	<>	<elision1>
7923	6846	<1s>	<>
7924	7925	<>	<name>
7924	7924	<>	<aphaerese>
7924	7924	<>	<elision3>
7924	7924	<>	<elision2>
7924	7924	<>	<elision1>
7924	7927	s	κ
7924	7927	s	k
7924	7930	s	K
7924	7927	s	λ
7924	7934	s	l
7924	7936	s	L
7924	6708	<1s>	<>
7925	7926	<>	<aphaerese>
7925	7926	<>	<elision3>
7925	7926	<>	<elision2>
7925	7926	<>	<elision1>
7925	7929	s	κ
7925	7929	s	k
7925	7932	s	K
7925	7929	s	λ
7925	7933	s	l
7925	7938	s	L
7925	6709	<1s>	<>
7926	7924	<>	<aphaerese>
7926	7924	<>	<elision3>
7926	7924	<>	<elision2>
7926	7924	<>	<elision1>
7926	7927	s	κ
7926	7927	s	k
7926	7930	s	K
7926	7927	s	λ
7926	7934	s	l
7926	7936	s	L
7926	6707	<1s>	<>
7927	7928	<>	<name>
7927	7927	<>	<aphaerese>
7927	7927	<>	<elision3>
7927	7927	<>	<elision2>
7927	7927	<>	<elision1>
7927	7671	s	κ
7927	7600	s	k
7927	7655	s	K
7927	7671	s	λ
7927	7600	s	l
7927	7662	s	L
7927	6883	<2s>	<>
7928	7929	<>	<aphaerese>
7928	7929	<>	<elision3>
7928	7929	<>	<elision2>
7928	7929	<>	<elision1>
7928	7673	s	κ
7928	7602	s	k
7928	7657	s	K
7928	7673	s	λ
7928	7602	s	l
7928	7664	s	L
7928	6884	<2s>	<>
7929	7927	<>	<aphaerese>
7929	7927	<>	<elision3>
7929	7927	<>	<elision2>
7929	7927	<>	<elision1>
7929	7671	s	κ
7929	7600	s	k
7929	7655	s	K
7929	7671	s	λ
7929	7600	s	l
7929	7662	s	L
7929	6882	<2s>	<>
7930	7931	<>	<name>
7930	7930	<>	<aphaerese>
7930	7930	<>	<elision3>
7930	7930	<>	<elision2>
7930	7930	<>	<elision1>
7930	7934	<K2kl>	<>
7931	7932	<>	<aphaerese>
7931	7932	<>	<elision3>
7931	7932	<>	<elision2>
7931	7932	<>	<elision1>
7931	7935	<K2kl>	<>
7932	7930	<>	<aphaerese>
7932	7930	<>	<elision3>
7932	7930	<>	<elision2>
7932	7930	<>	<elision1>
7932	7933	<K2kl>	<>
7933	7934	<>	<aphaerese>
7933	7934	<>	<elision3>
7933	7934	<>	<elision2>
7933	7934	<>	<elision1>
7933	6882	<2s>	<>
7934	7935	<>	<name>
7934	7934	<>	<aphaerese>
7934	7934	<>	<elision3>
7934	7934	<>	<elision2>
7934	7934	<>	<elision1>
7934	6883	<2s>	<>
7935	7933	<>	<aphaerese>
7935	7933	<>	<elision3>
7935	7933	<>	<elision2>
7935	7933	<>	<elision1>
7935	6884	<2s>	<>
7936	7937	<>	<name>
7936	7936	<>	<aphaerese>
7936	7936	<>	<elision3>
7936	7936	<>	<elision2>
7936	7936	<>	<elision1>
7936	7934	<L2kl>	<>
7937	7938	<>	<aphaerese>
7937	7938	<>	<elision3>
7937	7938	<>	<elision2>
7937	7938	<>	<elision1>
7937	7935	<L2kl>	<>
7938	7936	<>	<aphaerese>
7938	7936	<>	<elision3>
7938	7936	<>	<elision2>
7938	7936	<>	<elision1>
7938	7933	<L2kl>	<>
7939	7550	.	.
7939	7551	 	 
7939	7550	<~>	<~>
7939	7550	<split-s>	<split-s>
7939	7550	<split-h>	<split-h>
7939	7550	<name2>	<name2>
7939	7940	<>	<name>
7939	7554	<aphaerese>	<aphaerese>
7939	7939	<>	<aphaerese>
7939	7942	<elision3>	<elision3>
7939	7939	<>	<elision3>
7939	7942	<elision2>	<elision2>
7939	7939	<>	<elision2>
7939	7942	<elision1>	<elision1>
7939	7939	<>	<elision1>
7939	7558	.	υ
7939	7561	s	υ
7939	7558	.	u
7939	7561	s	u
7939	7558	.	κ
7939	7671	s	κ
7939	7600	s	k
7939	7603	s	U
7939	7655	s	K
7939	7558	.	α
7939	7561	s	α
7939	7558	.	a
7939	7561	s	a
7939	7633	s	A
7939	7558	.	λ
7939	7671	s	λ
7939	7600	s	l
7939	7662	s	L
7939	7048	<2s>	<>
7940	7553	.	.
7940	7556	 	 
7940	7553	<~>	<~>
7940	7553	<split-s>	<split-s>
7940	7553	<split-h>	<split-h>
7940	7553	<name2>	<name2>
7940	7654	<aphaerese>	<aphaerese>
7940	7941	<>	<aphaerese>
7940	7944	<elision3>	<elision3>
7940	7941	<>	<elision3>
7940	7944	<elision2>	<elision2>
7940	7941	<>	<elision2>
7940	7944	<elision1>	<elision1>
7940	7941	<>	<elision1>
7940	7560	.	υ
7940	7578	s	υ
7940	7560	.	u
7940	7578	s	u
7940	7560	.	κ
7940	7673	s	κ
7940	7602	s	k
7940	7605	s	U
7940	7657	s	K
7940	7560	.	α
7940	7578	s	α
7940	7560	.	a
7940	7578	s	a
7940	7635	s	A
7940	7560	.	λ
7940	7673	s	λ
7940	7602	s	l
7940	7664	s	L
7940	7049	<2s>	<>
7941	7550	.	.
7941	7551	 	 
7941	7550	<~>	<~>
7941	7550	<split-s>	<split-s>
7941	7550	<split-h>	<split-h>
7941	7550	<name2>	<name2>
7941	7554	<aphaerese>	<aphaerese>
7941	7939	<>	<aphaerese>
7941	7942	<elision3>	<elision3>
7941	7939	<>	<elision3>
7941	7942	<elision2>	<elision2>
7941	7939	<>	<elision2>
7941	7942	<elision1>	<elision1>
7941	7939	<>	<elision1>
7941	7558	.	υ
7941	7561	s	υ
7941	7558	.	u
7941	7561	s	u
7941	7558	.	κ
7941	7671	s	κ
7941	7600	s	k
7941	7603	s	U
7941	7655	s	K
7941	7558	.	α
7941	7561	s	α
7941	7558	.	a
7941	7561	s	a
7941	7633	s	A
7941	7558	.	λ
7941	7671	s	λ
7941	7600	s	l
7941	7662	s	L
7941	7047	<2s>	<>
7942	7550	.	.
7942	7551	 	 
7942	7550	<~>	<~>
7942	7550	<split-s>	<split-s>
7942	7550	<split-h>	<split-h>
7942	7550	<name2>	<name2>
7942	7943	<>	<name>
7942	7554	<aphaerese>	<aphaerese>
7942	7942	<>	<aphaerese>
7942	7550	<elision3>	<elision3>
7942	7942	<>	<elision3>
7942	7550	<elision2>	<elision2>
7942	7942	<>	<elision2>
7942	7550	<elision1>	<elision1>
7942	7942	<>	<elision1>
7942	7558	.	υ
7942	7561	s	υ
7942	7558	.	u
7942	7561	s	u
7942	7579	.	κ
7942	7945	s	κ
7942	7948	s	k
7942	7603	s	U
7942	7951	s	K
7942	7558	.	α
7942	7561	s	α
7942	7558	.	a
7942	7561	s	a
7942	7633	s	A
7942	7948	s	λ
7942	7948	s	l
7942	7959	s	L
7942	6951	<2s>	<>
7943	7553	.	.
7943	7556	 	 
7943	7553	<~>	<~>
7943	7553	<split-s>	<split-s>
7943	7553	<split-h>	<split-h>
7943	7553	<name2>	<name2>
7943	7654	<aphaerese>	<aphaerese>
7943	7944	<>	<aphaerese>
7943	7553	<elision3>	<elision3>
7943	7944	<>	<elision3>
7943	7553	<elision2>	<elision2>
7943	7944	<>	<elision2>
7943	7553	<elision1>	<elision1>
7943	7944	<>	<elision1>
7943	7560	.	υ
7943	7578	s	υ
7943	7560	.	u
7943	7578	s	u
7943	7581	.	κ
7943	7947	s	κ
7943	7950	s	k
7943	7605	s	U
7943	7953	s	K
7943	7560	.	α
7943	7578	s	α
7943	7560	.	a
7943	7578	s	a
7943	7635	s	A
7943	7950	s	λ
7943	7950	s	l
7943	7961	s	L
7943	6952	<2s>	<>
7944	7550	.	.
7944	7551	 	 
7944	7550	<~>	<~>
7944	7550	<split-s>	<split-s>
7944	7550	<split-h>	<split-h>
7944	7550	<name2>	<name2>
7944	7554	<aphaerese>	<aphaerese>
7944	7942	<>	<aphaerese>
7944	7550	<elision3>	<elision3>
7944	7942	<>	<elision3>
7944	7550	<elision2>	<elision2>
7944	7942	<>	<elision2>
7944	7550	<elision1>	<elision1>
7944	7942	<>	<elision1>
7944	7558	.	υ
7944	7561	s	υ
7944	7558	.	u
7944	7561	s	u
7944	7579	.	κ
7944	7945	s	κ
7944	7948	s	k
7944	7603	s	U
7944	7951	s	K
7944	7558	.	α
7944	7561	s	α
7944	7558	.	a
7944	7561	s	a
7944	7633	s	A
7944	7948	s	λ
7944	7948	s	l
7944	7959	s	L
7944	6950	<2s>	<>
7945	7562	.	.
7945	7562	 	 
7945	7562	<~>	<~>
7945	7562	<split-s>	<split-s>
7945	7562	<split-h>	<split-h>
7945	7562	<name2>	<name2>
7945	7946	<>	<name>
7945	7565	<aphaerese>	<aphaerese>
7945	7945	<>	<aphaerese>
7945	7597	<elision3>	<elision3>
7945	7945	<>	<elision3>
7945	7597	<elision2>	<elision2>
7945	7945	<>	<elision2>
7945	7597	<elision1>	<elision1>
7945	7945	<>	<elision1>
7945	7574	.	υ
7945	7574	.	u
7945	7574	.	κ
7945	7574	.	α
7945	7574	.	a
7945	7574	.	λ
7945	7783	<split-s>	<>
7946	7564	.	.
7946	7564	 	 
7946	7564	<~>	<~>
7946	7564	<split-s>	<split-s>
7946	7564	<split-h>	<split-h>
7946	7564	<name2>	<name2>
7946	7567	<aphaerese>	<aphaerese>
7946	7947	<>	<aphaerese>
7946	7599	<elision3>	<elision3>
7946	7947	<>	<elision3>
7946	7599	<elision2>	<elision2>
7946	7947	<>	<elision2>
7946	7599	<elision1>	<elision1>
7946	7947	<>	<elision1>
7946	7576	.	υ
7946	7576	.	u
7946	7576	.	κ
7946	7576	.	α
7946	7576	.	a
7946	7576	.	λ
7946	7784	<split-s>	<>
7947	7562	.	.
7947	7562	 	 
7947	7562	<~>	<~>
7947	7562	<split-s>	<split-s>
7947	7562	<split-h>	<split-h>
7947	7562	<name2>	<name2>
7947	7565	<aphaerese>	<aphaerese>
7947	7945	<>	<aphaerese>
7947	7597	<elision3>	<elision3>
7947	7945	<>	<elision3>
7947	7597	<elision2>	<elision2>
7947	7945	<>	<elision2>
7947	7597	<elision1>	<elision1>
7947	7945	<>	<elision1>
7947	7574	.	υ
7947	7574	.	u
7947	7574	.	κ
7947	7574	.	α
7947	7574	.	a
7947	7574	.	λ
7947	7782	<split-s>	<>
7948	7562	.	.
7948	7562	 	 
7948	7562	<~>	<~>
7948	7562	<split-s>	<split-s>
7948	7562	<split-h>	<split-h>
7948	7562	<name2>	<name2>
7948	7949	<>	<name>
7948	7565	<aphaerese>	<aphaerese>
7948	7948	<>	<aphaerese>
7948	7562	<elision3>	<elision3>
7948	7948	<>	<elision3>
7948	7562	<elision2>	<elision2>
7948	7948	<>	<elision2>
7948	7562	<elision1>	<elision1>
7948	7948	<>	<elision1>
7948	7574	.	υ
7948	7574	.	u
7948	7574	.	κ
7948	7574	.	α
7948	7574	.	a
7948	7574	.	λ
7948	7789	<split-s>	<>
7949	7564	.	.
7949	7564	 	 
7949	7564	<~>	<~>
7949	7564	<split-s>	<split-s>
7949	7564	<split-h>	<split-h>
7949	7564	<name2>	<name2>
7949	7567	<aphaerese>	<aphaerese>
7949	7950	<>	<aphaerese>
7949	7564	<elision3>	<elision3>
7949	7950	<>	<elision3>
7949	7564	<elision2>	<elision2>
7949	7950	<>	<elision2>
7949	7564	<elision1>	<elision1>
7949	7950	<>	<elision1>
7949	7576	.	υ
7949	7576	.	u
7949	7576	.	κ
7949	7576	.	α
7949	7576	.	a
7949	7576	.	λ
7949	7790	<split-s>	<>
7950	7562	.	.
7950	7562	 	 
7950	7562	<~>	<~>
7950	7562	<split-s>	<split-s>
7950	7562	<split-h>	<split-h>
7950	7562	<name2>	<name2>
7950	7565	<aphaerese>	<aphaerese>
7950	7948	<>	<aphaerese>
7950	7562	<elision3>	<elision3>
7950	7948	<>	<elision3>
7950	7562	<elision2>	<elision2>
7950	7948	<>	<elision2>
7950	7562	<elision1>	<elision1>
7950	7948	<>	<elision1>
7950	7574	.	υ
7950	7574	.	u
7950	7574	.	κ
7950	7574	.	α
7950	7574	.	a
7950	7574	.	λ
7950	7788	<split-s>	<>
7951	7607	<name>	<name>
7951	7952	<>	<name>
7951	7954	<>	<aphaerese>
7951	7954	<>	<elision3>
7951	7954	<>	<elision2>
7951	7954	<>	<elision1>
7951	7416	<split-s>	<>
7951	7659	<L2kl>	<>
7951	7958	<K2kl>	<>
7952	7953	<>	<aphaerese>
7952	7953	<>	<elision3>
7952	7953	<>	<elision2>
7952	7953	<>	<elision1>
7952	7660	<L2kl>	<>
7952	7956	<K2kl>	<>
7953	7954	<>	<aphaerese>
7953	7954	<>	<elision3>
7953	7954	<>	<elision2>
7953	7954	<>	<elision1>
7953	7661	<L2kl>	<>
7953	7957	<K2kl>	<>
7954	7952	<>	<name>
7954	7954	<>	<aphaerese>
7954	7954	<>	<elision3>
7954	7954	<>	<elision2>
7954	7954	<>	<elision1>
7954	7659	<L2kl>	<>
7954	7955	<K2kl>	<>
7955	7562	.	.
7955	7562	 	 
7955	7562	<~>	<~>
7955	7562	<split-s>	<split-s>
7955	7562	<split-h>	<split-h>
7955	7562	<name2>	<name2>
7955	7956	<>	<name>
7955	7565	<aphaerese>	<aphaerese>
7955	7955	<>	<aphaerese>
7955	7562	<elision3>	<elision3>
7955	7955	<>	<elision3>
7955	7562	<elision2>	<elision2>
7955	7955	<>	<elision2>
7955	7562	<elision1>	<elision1>
7955	7955	<>	<elision1>
7955	7574	.	υ
7955	7574	.	u
7955	7574	.	α
7955	7574	.	a
7955	7799	<split-s>	<>
7956	7564	.	.
7956	7564	 	 
7956	7564	<~>	<~>
7956	7564	<split-s>	<split-s>
7956	7564	<split-h>	<split-h>
7956	7564	<name2>	<name2>
7956	7567	<aphaerese>	<aphaerese>
7956	7957	<>	<aphaerese>
7956	7564	<elision3>	<elision3>
7956	7957	<>	<elision3>
7956	7564	<elision2>	<elision2>
7956	7957	<>	<elision2>
7956	7564	<elision1>	<elision1>
7956	7957	<>	<elision1>
7956	7576	.	υ
7956	7576	.	u
7956	7576	.	α
7956	7576	.	a
7956	7800	<split-s>	<>
7957	7562	.	.
7957	7562	 	 
7957	7562	<~>	<~>
7957	7562	<split-s>	<split-s>
7957	7562	<split-h>	<split-h>
7957	7562	<name2>	<name2>
7957	7565	<aphaerese>	<aphaerese>
7957	7955	<>	<aphaerese>
7957	7562	<elision3>	<elision3>
7957	7955	<>	<elision3>
7957	7562	<elision2>	<elision2>
7957	7955	<>	<elision2>
7957	7562	<elision1>	<elision1>
7957	7955	<>	<elision1>
7957	7574	.	υ
7957	7574	.	u
7957	7574	.	α
7957	7574	.	a
7957	7798	<split-s>	<>
7958	7562	.	.
7958	7562	 	 
7958	7562	<~>	<~>
7958	7562	<split-s>	<split-s>
7958	7562	<split-h>	<split-h>
7958	7562	<name2>	<name2>
7958	7607	<name2>	<name>
7958	7956	<>	<name>
7958	7565	<aphaerese>	<aphaerese>
7958	7955	<>	<aphaerese>
7958	7562	<elision3>	<elision3>
7958	7955	<>	<elision3>
7958	7562	<elision2>	<elision2>
7958	7955	<>	<elision2>
7958	7562	<elision1>	<elision1>
7958	7955	<>	<elision1>
7958	7574	.	υ
7958	7574	.	u
7958	7574	.	α
7958	7574	.	a
7958	7802	<split-s>	<>
7959	7607	<name>	<name>
7959	7960	<>	<name>
7959	7962	<>	<aphaerese>
7959	7962	<>	<elision3>
7959	7962	<>	<elision2>
7959	7962	<>	<elision1>
7959	7416	<split-s>	<>
7959	7963	<L2kl>	<>
7960	7961	<>	<aphaerese>
7960	7961	<>	<elision3>
7960	7961	<>	<elision2>
7960	7961	<>	<elision1>
7960	7949	<L2kl>	<>
7961	7962	<>	<aphaerese>
7961	7962	<>	<elision3>
7961	7962	<>	<elision2>
7961	7962	<>	<elision1>
7961	7950	<L2kl>	<>
7962	7960	<>	<name>
7962	7962	<>	<aphaerese>
7962	7962	<>	<elision3>
7962	7962	<>	<elision2>
7962	7962	<>	<elision1>
7962	7948	<L2kl>	<>
7963	7562	.	.
7963	7562	 	 
7963	7562	<~>	<~>
7963	7562	<split-s>	<split-s>
7963	7562	<split-h>	<split-h>
7963	7562	<name2>	<name2>
7963	7607	<name2>	<name>
7963	7949	<>	<name>
7963	7565	<aphaerese>	<aphaerese>
7963	7948	<>	<aphaerese>
7963	7562	<elision3>	<elision3>
7963	7948	<>	<elision3>
7963	7562	<elision2>	<elision2>
7963	7948	<>	<elision2>
7963	7562	<elision1>	<elision1>
7963	7948	<>	<elision1>
7963	7574	.	υ
7963	7574	.	u
7963	7574	.	κ
7963	7574	.	α
7963	7574	.	a
7963	7574	.	λ
7963	7814	<split-s>	<>
7964	7965	<>	<name>
7964	7964	<>	<aphaerese>
7964	7964	<>	<elision3>
7964	7964	<>	<elision2>
7964	7964	<>	<elision1>
7964	7680	<U2kl>	<>
7965	7966	<>	<aphaerese>
7965	7966	<>	<elision3>
7965	7966	<>	<elision2>
7965	7966	<>	<elision1>
7965	7681	<U2kl>	<>
7966	7964	<>	<aphaerese>
7966	7964	<>	<elision3>
7966	7964	<>	<elision2>
7966	7964	<>	<elision1>
7966	7682	<U2kl>	<>
7967	7693	<name>	<name>
7967	7968	<>	<name>
7967	7970	<>	<aphaerese>
7967	7970	<>	<elision3>
7967	7970	<>	<elision2>
7967	7970	<>	<elision1>
7967	7180	<2s>	<>
7967	7971	<A2kl>	<>
7967	7980	<L2kl>	<>
7967	7703	<K2kl>	<>
7968	7969	<>	<aphaerese>
7968	7969	<>	<elision3>
7968	7969	<>	<elision2>
7968	7969	<>	<elision1>
7968	7972	<A2kl>	<>
7968	7981	<L2kl>	<>
7968	7701	<K2kl>	<>
7969	7970	<>	<aphaerese>
7969	7970	<>	<elision3>
7969	7970	<>	<elision2>
7969	7970	<>	<elision1>
7969	7973	<A2kl>	<>
7969	7982	<L2kl>	<>
7969	7702	<K2kl>	<>
7970	7968	<>	<name>
7970	7970	<>	<aphaerese>
7970	7970	<>	<elision3>
7970	7970	<>	<elision2>
7970	7970	<>	<elision1>
7970	7971	<A2kl>	<>
7970	7980	<L2kl>	<>
7970	7700	<K2kl>	<>
7971	7972	<>	<name>
7971	7971	<>	<aphaerese>
7971	7971	<>	<elision3>
7971	7971	<>	<elision2>
7971	7971	<>	<elision1>
7971	7974	.	κ
7971	7974	.	λ
7971	7130	<2s>	<>
7972	7973	<>	<aphaerese>
7972	7973	<>	<elision3>
7972	7973	<>	<elision2>
7972	7973	<>	<elision1>
7972	7976	.	κ
7972	7976	.	λ
7972	7131	<2s>	<>
7973	7971	<>	<aphaerese>
7973	7971	<>	<elision3>
7973	7971	<>	<elision2>
7973	7971	<>	<elision1>
7973	7974	.	κ
7973	7974	.	λ
7973	7129	<2s>	<>
7974	7975	<>	<name>
7974	7974	<>	<aphaerese>
7974	7977	<elision3>	<elision3>
7974	7974	<>	<elision3>
7974	7977	<elision2>	<elision2>
7974	7974	<>	<elision2>
7974	7977	<elision1>	<elision1>
7974	7974	<>	<elision1>
7974	7121	<2s>	<>
7975	7976	<>	<aphaerese>
7975	7979	<elision3>	<elision3>
7975	7976	<>	<elision3>
7975	7979	<elision2>	<elision2>
7975	7976	<>	<elision2>
7975	7979	<elision1>	<elision1>
7975	7976	<>	<elision1>
7975	7122	<2s>	<>
7976	7974	<>	<aphaerese>
7976	7977	<elision3>	<elision3>
7976	7974	<>	<elision3>
7976	7977	<elision2>	<elision2>
7976	7974	<>	<elision2>
7976	7977	<elision1>	<elision1>
7976	7974	<>	<elision1>
7976	7120	<2s>	<>
7977	7680	.	.
7977	7680	 	 
7977	7680	<~>	<~>
7977	7680	<split-s>	<split-s>
7977	7680	<split-h>	<split-h>
7977	7680	<name2>	<name2>
7977	7978	<>	<name>
7977	7683	<aphaerese>	<aphaerese>
7977	7977	<>	<aphaerese>
7977	7680	<elision3>	<elision3>
7977	7977	<>	<elision3>
7977	7680	<elision2>	<elision2>
7977	7977	<>	<elision2>
7977	7680	<elision1>	<elision1>
7977	7977	<>	<elision1>
7977	7677	.	υ
7977	7677	.	u
7977	7677	.	α
7977	7677	.	a
7977	7085	<2s>	<>
7978	7682	.	.
7978	7682	 	 
7978	7682	<~>	<~>
7978	7682	<split-s>	<split-s>
7978	7682	<split-h>	<split-h>
7978	7682	<name2>	<name2>
7978	7685	<aphaerese>	<aphaerese>
7978	7979	<>	<aphaerese>
7978	7682	<elision3>	<elision3>
7978	7979	<>	<elision3>
7978	7682	<elision2>	<elision2>
7978	7979	<>	<elision2>
7978	7682	<elision1>	<elision1>
7978	7979	<>	<elision1>
7978	7679	.	υ
7978	7679	.	u
7978	7679	.	α
7978	7679	.	a
7978	7086	<2s>	<>
7979	7680	.	.
7979	7680	 	 
7979	7680	<~>	<~>
7979	7680	<split-s>	<split-s>
7979	7680	<split-h>	<split-h>
7979	7680	<name2>	<name2>
7979	7683	<aphaerese>	<aphaerese>
7979	7977	<>	<aphaerese>
7979	7680	<elision3>	<elision3>
7979	7977	<>	<elision3>
7979	7680	<elision2>	<elision2>
7979	7977	<>	<elision2>
7979	7680	<elision1>	<elision1>
7979	7977	<>	<elision1>
7979	7677	.	υ
7979	7677	.	u
7979	7677	.	α
7979	7677	.	a
7979	7084	<2s>	<>
7980	7981	<>	<name>
7980	7980	<>	<aphaerese>
7980	7980	<>	<elision3>
7980	7980	<>	<elision2>
7980	7980	<>	<elision1>
7980	7983	.	κ
7980	7983	.	λ
7980	7163	<2s>	<>
7981	7982	<>	<aphaerese>
7981	7982	<>	<elision3>
7981	7982	<>	<elision2>
7981	7982	<>	<elision1>
7981	7985	.	κ
7981	7985	.	λ
7981	7164	<2s>	<>
7982	7980	<>	<aphaerese>
7982	7980	<>	<elision3>
7982	7980	<>	<elision2>
7982	7980	<>	<elision1>
7982	7983	.	κ
7982	7983	.	λ
7982	7162	<2s>	<>
7983	7984	<>	<name>
7983	7983	<>	<aphaerese>
7983	7986	<elision3>	<elision3>
7983	7983	<>	<elision3>
7983	7986	<elision2>	<elision2>
7983	7983	<>	<elision2>
7983	7986	<elision1>	<elision1>
7983	7983	<>	<elision1>
7983	7154	<2s>	<>
7984	7985	<>	<aphaerese>
7984	7988	<elision3>	<elision3>
7984	7985	<>	<elision3>
7984	7988	<elision2>	<elision2>
7984	7985	<>	<elision2>
7984	7988	<elision1>	<elision1>
7984	7985	<>	<elision1>
7984	7155	<2s>	<>
7985	7983	<>	<aphaerese>
7985	7986	<elision3>	<elision3>
7985	7983	<>	<elision3>
7985	7986	<elision2>	<elision2>
7985	7983	<>	<elision2>
7985	7986	<elision1>	<elision1>
7985	7983	<>	<elision1>
7985	7153	<2s>	<>
7986	7987	<>	<name>
7986	7986	<>	<aphaerese>
7986	7986	<>	<elision3>
7986	7986	<>	<elision2>
7986	7986	<>	<elision1>
7986	7686	.	κ
7986	7148	<2s>	<>
7987	7988	<>	<aphaerese>
7987	7988	<>	<elision3>
7987	7988	<>	<elision2>
7987	7988	<>	<elision1>
7987	7688	.	κ
7987	7149	<2s>	<>
7988	7986	<>	<aphaerese>
7988	7986	<>	<elision3>
7988	7986	<>	<elision2>
7988	7986	<>	<elision1>
7988	7686	.	κ
7988	7147	<2s>	<>
7989	7680	.	.
7989	7680	 	 
7989	7680	<~>	<~>
7989	7680	<split-s>	<split-s>
7989	7680	<split-h>	<split-h>
7989	7680	<name2>	<name2>
7989	7990	<>	<name>
7989	7683	<aphaerese>	<aphaerese>
7989	7989	<>	<aphaerese>
7989	7989	<>	<elision3>
7989	7989	<>	<elision2>
7989	7989	<>	<elision1>
7989	7677	.	υ
7989	7677	.	u
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7992	7680	<A2kl>	<>
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7993	7994	<>	<elision2>
7993	7994	<>	<elision1>
7993	7681	<A2kl>	<>
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7994	7992	<>	<elision2>
7994	7992	<>	<elision1>
7994	7682	<A2kl>	<>
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7998	8001	<>	<aphaerese>
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7998	8001	<>	<elision2>
7998	8001	<>	<elision1>
7998	7180	<2s>	<>
7998	7971	<A2kl>	<>
7998	8005	<L2kl>	<>
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7999	8000	<>	<elision2>
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7999	7972	<A2kl>	<>
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8000	8001	<>	<aphaerese>
8000	8001	<>	<elision3>
8000	8001	<>	<elision2>
8000	8001	<>	<elision1>
8000	7973	<A2kl>	<>
8000	8004	<L2kl>	<>
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8001	8001	<>	<aphaerese>
8001	8001	<>	<elision3>
8001	8001	<>	<elision2>
8001	8001	<>	<elision1>
8001	7971	<A2kl>	<>
8001	8002	<L2kl>	<>
8002	7680	.	.
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8002	7680	<elision1>	<elision1>
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8002	7677	.	υ
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8005	7677	.	υ
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8011	7980	<L2kl>	<>
8011	8012	<K2kl>	<>
8012	7680	.	.
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8012	7677	.	υ
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8017	7971	<A2kl>	<>
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8018	7680	.	.
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8019	7907	<elision1>	<elision1>
8019	7911	<>	<elision1>
8019	7907	.	υ
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8020	7907	.	.
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8020	7907	<split-h>	<split-h>
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8020	7907	<elision2>	<elision2>
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8020	7907	<elision1>	<elision1>
8020	7914	<>	<elision1>
8020	7915	.	υ
8020	7918	s	υ
8020	7915	.	u
8020	7918	s	u
8020	7921	.	κ
8020	7939	s	κ
8020	7674	s	k
8020	7964	s	U
8020	7967	s	K
8020	7915	.	α
8020	7989	s	α
8020	7915	.	a
8020	7989	s	a
8020	7992	s	A
8020	7995	s	λ
8020	7705	s	l
8020	7998	s	L
8020	6862	<1s>	<>
8021	7910	.	.
8021	7913	 	 
8021	7910	<~>	<~>
8021	7910	<split-s>	<split-s>
8021	7910	<split-h>	<split-h>
8021	7910	<name2>	<name2>
8021	8019	<aphaerese>	<aphaerese>
8021	7910	<>	<aphaerese>
8021	7910	<elision3>	<elision3>
8021	7910	<>	<elision3>
8021	7910	<elision2>	<elision2>
8021	7910	<>	<elision2>
8021	7910	<elision1>	<elision1>
8021	7910	<>	<elision1>
8021	7917	.	υ
8021	7920	s	υ
8021	7917	.	u
8021	7920	s	u
8021	7923	.	κ
8021	7941	s	κ
8021	7676	s	k
8021	7966	s	U
8021	7695	s	K
8021	7917	.	α
8021	7991	s	α
8021	7917	.	a
8021	7991	s	a
8021	7994	s	A
8021	7997	s	λ
8021	7707	s	l
8021	7710	s	L
8021	6864	<1s>	<>
8022	7910	.	.
8022	7913	 	 
8022	7910	<~>	<~>
8022	7910	<split-s>	<split-s>
8022	7910	<split-h>	<split-h>
8022	7910	<name2>	<name2>
8022	8019	<aphaerese>	<aphaerese>
8022	8023	<>	<aphaerese>
8022	8026	<elision3>	<elision3>
8022	8023	<>	<elision3>
8022	8026	<elision2>	<elision2>
8022	8023	<>	<elision2>
8022	8026	<elision1>	<elision1>
8022	8023	<>	<elision1>
8022	7917	.	υ
8022	7920	s	υ
8022	7917	.	u
8022	7920	s	u
8022	7670	s	κ
8022	7676	s	k
8022	7966	s	U
8022	7695	s	K
8022	7917	.	α
8022	7991	s	α
8022	7917	.	a
8022	7991	s	a
8022	7994	s	A
8022	7670	s	λ
8022	7707	s	l
8022	7710	s	L
8022	8054	<1s>	<>
8023	7907	.	.
8023	7908	 	 
8023	7907	<~>	<~>
8023	7907	<split-s>	<split-s>
8023	7907	<split-h>	<split-h>
8023	7907	<name2>	<name2>
8023	7911	<aphaerese>	<aphaerese>
8023	7906	<>	<aphaerese>
8023	8024	<elision3>	<elision3>
8023	7906	<>	<elision3>
8023	8024	<elision2>	<elision2>
8023	7906	<>	<elision2>
8023	8024	<elision1>	<elision1>
8023	7906	<>	<elision1>
8023	7915	.	υ
8023	7918	s	υ
8023	7915	.	u
8023	7918	s	u
8023	7549	s	κ
8023	7674	s	k
8023	7964	s	U
8023	7692	s	K
8023	7915	.	α
8023	7989	s	α
8023	7915	.	a
8023	7989	s	a
8023	7992	s	A
8023	7549	s	λ
8023	7705	s	l
8023	7708	s	L
8023	8052	<1s>	<>
8024	7907	.	.
8024	7908	 	 
8024	7907	<~>	<~>
8024	7907	<split-s>	<split-s>
8024	7907	<split-h>	<split-h>
8024	7907	<name2>	<name2>
8024	8025	<>	<name>
8024	7911	<aphaerese>	<aphaerese>
8024	8024	<>	<aphaerese>
8024	7907	<elision3>	<elision3>
8024	8024	<>	<elision3>
8024	7907	<elision2>	<elision2>
8024	8024	<>	<elision2>
8024	7907	<elision1>	<elision1>
8024	8024	<>	<elision1>
8024	7915	.	υ
8024	7918	s	υ
8024	7915	.	u
8024	7918	s	u
8024	7921	.	κ
8024	8027	s	κ
8024	8030	s	k
8024	7964	s	U
8024	8033	s	K
8024	7915	.	α
8024	7989	s	α
8024	7915	.	a
8024	7989	s	a
8024	7992	s	A
8024	8041	s	λ
8024	8044	s	l
8024	8047	s	L
8024	6951	<1s>	<>
8025	7910	.	.
8025	7913	 	 
8025	7910	<~>	<~>
8025	7910	<split-s>	<split-s>
8025	7910	<split-h>	<split-h>
8025	7910	<name2>	<name2>
8025	8019	<aphaerese>	<aphaerese>
8025	8026	<>	<aphaerese>
8025	7910	<elision3>	<elision3>
8025	8026	<>	<elision3>
8025	7910	<elision2>	<elision2>
8025	8026	<>	<elision2>
8025	7910	<elision1>	<elision1>
8025	8026	<>	<elision1>
8025	7917	.	υ
8025	7920	s	υ
8025	7917	.	u
8025	7920	s	u
8025	7923	.	κ
8025	8029	s	κ
8025	8032	s	k
8025	7966	s	U
8025	8035	s	K
8025	7917	.	α
8025	7991	s	α
8025	7917	.	a
8025	7991	s	a
8025	7994	s	A
8025	8043	s	λ
8025	8046	s	l
8025	8049	s	L
8025	6952	<1s>	<>
8026	7907	.	.
8026	7908	 	 
8026	7907	<~>	<~>
8026	7907	<split-s>	<split-s>
8026	7907	<split-h>	<split-h>
8026	7907	<name2>	<name2>
8026	7911	<aphaerese>	<aphaerese>
8026	8024	<>	<aphaerese>
8026	7907	<elision3>	<elision3>
8026	8024	<>	<elision3>
8026	7907	<elision2>	<elision2>
8026	8024	<>	<elision2>
8026	7907	<elision1>	<elision1>
8026	8024	<>	<elision1>
8026	7915	.	υ
8026	7918	s	υ
8026	7915	.	u
8026	7918	s	u
8026	7921	.	κ
8026	8027	s	κ
8026	8030	s	k
8026	7964	s	U
8026	8033	s	K
8026	7915	.	α
8026	7989	s	α
8026	7915	.	a
8026	7989	s	a
8026	7992	s	A
8026	8041	s	λ
8026	8044	s	l
8026	8047	s	L
8026	6950	<1s>	<>
8027	7550	.	.
8027	7551	 	 
8027	7550	<~>	<~>
8027	7550	<split-s>	<split-s>
8027	7550	<split-h>	<split-h>
8027	7550	<name2>	<name2>
8027	8028	<>	<name>
8027	7554	<aphaerese>	<aphaerese>
8027	8027	<>	<aphaerese>
8027	7942	<elision3>	<elision3>
8027	8027	<>	<elision3>
8027	7942	<elision2>	<elision2>
8027	8027	<>	<elision2>
8027	7942	<elision1>	<elision1>
8027	8027	<>	<elision1>
8027	7558	.	υ
8027	7561	s	υ
8027	7558	.	u
8027	7561	s	u
8027	7558	.	κ
8027	7603	s	U
8027	7558	.	α
8027	7561	s	α
8027	7558	.	a
8027	7561	s	a
8027	7633	s	A
8027	7558	.	λ
8027	7301	<2s>	<>
8028	7553	.	.
8028	7556	 	 
8028	7553	<~>	<~>
8028	7553	<split-s>	<split-s>
8028	7553	<split-h>	<split-h>
8028	7553	<name2>	<name2>
8028	7654	<aphaerese>	<aphaerese>
8028	8029	<>	<aphaerese>
8028	7944	<elision3>	<elision3>
8028	8029	<>	<elision3>
8028	7944	<elision2>	<elision2>
8028	8029	<>	<elision2>
8028	7944	<elision1>	<elision1>
8028	8029	<>	<elision1>
8028	7560	.	υ
8028	7578	s	υ
8028	7560	.	u
8028	7578	s	u
8028	7560	.	κ
8028	7605	s	U
8028	7560	.	α
8028	7578	s	α
8028	7560	.	a
8028	7578	s	a
8028	7635	s	A
8028	7560	.	λ
8028	7302	<2s>	<>
8029	7550	.	.
8029	7551	 	 
8029	7550	<~>	<~>
8029	7550	<split-s>	<split-s>
8029	7550	<split-h>	<split-h>
8029	7550	<name2>	<name2>
8029	7554	<aphaerese>	<aphaerese>
8029	8027	<>	<aphaerese>
8029	7942	<elision3>	<elision3>
8029	8027	<>	<elision3>
8029	7942	<elision2>	<elision2>
8029	8027	<>	<elision2>
8029	7942	<elision1>	<elision1>
8029	8027	<>	<elision1>
8029	7558	.	υ
8029	7561	s	υ
8029	7558	.	u
8029	7561	s	u
8029	7558	.	κ
8029	7603	s	U
8029	7558	.	α
8029	7561	s	α
8029	7558	.	a
8029	7561	s	a
8029	7633	s	A
8029	7558	.	λ
8029	7300	<2s>	<>
8030	7550	.	.
8030	7551	 	 
8030	7550	<~>	<~>
8030	7550	<split-s>	<split-s>
8030	7550	<split-h>	<split-h>
8030	7550	<name2>	<name2>
8030	8031	<>	<name>
8030	7554	<aphaerese>	<aphaerese>
8030	8030	<>	<aphaerese>
8030	7550	<elision3>	<elision3>
8030	8030	<>	<elision3>
8030	7550	<elision2>	<elision2>
8030	8030	<>	<elision2>
8030	7550	<elision1>	<elision1>
8030	8030	<>	<elision1>
8030	7558	.	υ
8030	7561	s	υ
8030	7558	.	u
8030	7561	s	u
8030	7677	.	κ
8030	7603	s	U
8030	7558	.	α
8030	7561	s	α
8030	7558	.	a
8030	7561	s	a
8030	7633	s	A
8030	7677	.	λ
8030	7310	<2s>	<>
8031	7553	.	.
8031	7556	 	 
8031	7553	<~>	<~>
8031	7553	<split-s>	<split-s>
8031	7553	<split-h>	<split-h>
8031	7553	<name2>	<name2>
8031	7654	<aphaerese>	<aphaerese>
8031	8032	<>	<aphaerese>
8031	7553	<elision3>	<elision3>
8031	8032	<>	<elision3>
8031	7553	<elision2>	<elision2>
8031	8032	<>	<elision2>
8031	7553	<elision1>	<elision1>
8031	8032	<>	<elision1>
8031	7560	.	υ
8031	7578	s	υ
8031	7560	.	u
8031	7578	s	u
8031	7679	.	κ
8031	7605	s	U
8031	7560	.	α
8031	7578	s	α
8031	7560	.	a
8031	7578	s	a
8031	7635	s	A
8031	7679	.	λ
8031	7311	<2s>	<>
8032	7550	.	.
8032	7551	 	 
8032	7550	<~>	<~>
8032	7550	<split-s>	<split-s>
8032	7550	<split-h>	<split-h>
8032	7550	<name2>	<name2>
8032	7554	<aphaerese>	<aphaerese>
8032	8030	<>	<aphaerese>
8032	7550	<elision3>	<elision3>
8032	8030	<>	<elision3>
8032	7550	<elision2>	<elision2>
8032	8030	<>	<elision2>
8032	7550	<elision1>	<elision1>
8032	8030	<>	<elision1>
8032	7558	.	υ
8032	7561	s	υ
8032	7558	.	u
8032	7561	s	u
8032	7677	.	κ
8032	7603	s	U
8032	7558	.	α
8032	7561	s	α
8032	7558	.	a
8032	7561	s	a
8032	7633	s	A
8032	7677	.	λ
8032	7309	<2s>	<>
8033	7693	<name>	<name>
8033	8034	<>	<name>
8033	8036	<>	<aphaerese>
8033	8036	<>	<elision3>
8033	8036	<>	<elision2>
8033	8036	<>	<elision1>
8033	7180	<2s>	<>
8033	7697	<L2kl>	<>
8033	8040	<K2kl>	<>
8034	8035	<>	<aphaerese>
8034	8035	<>	<elision3>
8034	8035	<>	<elision2>
8034	8035	<>	<elision1>
8034	7698	<L2kl>	<>
8034	8038	<K2kl>	<>
8035	8036	<>	<aphaerese>
8035	8036	<>	<elision3>
8035	8036	<>	<elision2>
8035	8036	<>	<elision1>
8035	7699	<L2kl>	<>
8035	8039	<K2kl>	<>
8036	8034	<>	<name>
8036	8036	<>	<aphaerese>
8036	8036	<>	<elision3>
8036	8036	<>	<elision2>
8036	8036	<>	<elision1>
8036	7697	<L2kl>	<>
8036	8037	<K2kl>	<>
8037	7680	.	.
8037	7680	 	 
8037	7680	<~>	<~>
8037	7680	<split-s>	<split-s>
8037	7680	<split-h>	<split-h>
8037	7680	<name2>	<name2>
8037	8038	<>	<name>
8037	7683	<aphaerese>	<aphaerese>
8037	8037	<>	<aphaerese>
8037	7680	<elision3>	<elision3>
8037	8037	<>	<elision3>
8037	7680	<elision2>	<elision2>
8037	8037	<>	<elision2>
8037	7680	<elision1>	<elision1>
8037	8037	<>	<elision1>
8037	7677	.	υ
8037	7677	.	u
8037	7677	.	α
8037	7677	.	a
8037	7323	<2s>	<>
8038	7682	.	.
8038	7682	 	 
8038	7682	<~>	<~>
8038	7682	<split-s>	<split-s>
8038	7682	<split-h>	<split-h>
8038	7682	<name2>	<name2>
8038	7685	<aphaerese>	<aphaerese>
8038	8039	<>	<aphaerese>
8038	7682	<elision3>	<elision3>
8038	8039	<>	<elision3>
8038	7682	<elision2>	<elision2>
8038	8039	<>	<elision2>
8038	7682	<elision1>	<elision1>
8038	8039	<>	<elision1>
8038	7679	.	υ
8038	7679	.	u
8038	7679	.	α
8038	7679	.	a
8038	7324	<2s>	<>
8039	7680	.	.
8039	7680	 	 
8039	7680	<~>	<~>
8039	7680	<split-s>	<split-s>
8039	7680	<split-h>	<split-h>
8039	7680	<name2>	<name2>
8039	7683	<aphaerese>	<aphaerese>
8039	8037	<>	<aphaerese>
8039	7680	<elision3>	<elision3>
8039	8037	<>	<elision3>
8039	7680	<elision2>	<elision2>
8039	8037	<>	<elision2>
8039	7680	<elision1>	<elision1>
8039	8037	<>	<elision1>
8039	7677	.	υ
8039	7677	.	u
8039	7677	.	α
8039	7677	.	a
8039	7322	<2s>	<>
8040	7680	.	.
8040	7680	 	 
8040	7680	<~>	<~>
8040	7680	<split-s>	<split-s>
8040	7680	<split-h>	<split-h>
8040	7680	<name2>	<name2>
8040	7704	<name2>	<name>
8040	8038	<>	<name>
8040	7683	<aphaerese>	<aphaerese>
8040	8037	<>	<aphaerese>
8040	7680	<elision3>	<elision3>
8040	8037	<>	<elision3>
8040	7680	<elision2>	<elision2>
8040	8037	<>	<elision2>
8040	7680	<elision1>	<elision1>
8040	8037	<>	<elision1>
8040	7677	.	υ
8040	7677	.	u
8040	7677	.	α
8040	7677	.	a
8040	7329	<2s>	<>
8041	7550	.	.
8041	7551	 	 
8041	7550	<~>	<~>
8041	7550	<split-s>	<split-s>
8041	7550	<split-h>	<split-h>
8041	7550	<name2>	<name2>
8041	8042	<>	<name>
8041	7554	<aphaerese>	<aphaerese>
8041	8041	<>	<aphaerese>
8041	7550	<elision3>	<elision3>
8041	8041	<>	<elision3>
8041	7550	<elision2>	<elision2>
8041	8041	<>	<elision2>
8041	7550	<elision1>	<elision1>
8041	8041	<>	<elision1>
8041	7558	.	υ
8041	7561	s	υ
8041	7558	.	u
8041	7561	s	u
8041	7558	.	κ
8041	7603	s	U
8041	7558	.	α
8041	7561	s	α
8041	7558	.	a
8041	7561	s	a
8041	7633	s	A
8041	7558	.	λ
8041	7310	<2s>	<>
8042	7553	.	.
8042	7556	 	 
8042	7553	<~>	<~>
8042	7553	<split-s>	<split-s>
8042	7553	<split-h>	<split-h>
8042	7553	<name2>	<name2>
8042	7654	<aphaerese>	<aphaerese>
8042	8043	<>	<aphaerese>
8042	7553	<elision3>	<elision3>
8042	8043	<>	<elision3>
8042	7553	<elision2>	<elision2>
8042	8043	<>	<elision2>
8042	7553	<elision1>	<elision1>
8042	8043	<>	<elision1>
8042	7560	.	υ
8042	7578	s	υ
8042	7560	.	u
8042	7578	s	u
8042	7560	.	κ
8042	7605	s	U
8042	7560	.	α
8042	7578	s	α
8042	7560	.	a
8042	7578	s	a
8042	7635	s	A
8042	7560	.	λ
8042	7311	<2s>	<>
8043	7550	.	.
8043	7551	 	 
8043	7550	<~>	<~>
8043	7550	<split-s>	<split-s>
8043	7550	<split-h>	<split-h>
8043	7550	<name2>	<name2>
8043	7554	<aphaerese>	<aphaerese>
8043	8041	<>	<aphaerese>
8043	7550	<elision3>	<elision3>
8043	8041	<>	<elision3>
8043	7550	<elision2>	<elision2>
8043	8041	<>	<elision2>
8043	7550	<elision1>	<elision1>
8043	8041	<>	<elision1>
8043	7558	.	υ
8043	7561	s	υ
8043	7558	.	u
8043	7561	s	u
8043	7558	.	κ
8043	7603	s	U
8043	7558	.	α
8043	7561	s	α
8043	7558	.	a
8043	7561	s	a
8043	7633	s	A
8043	7558	.	λ
8043	7309	<2s>	<>
8044	7680	.	.
8044	7680	 	 
8044	7680	<~>	<~>
8044	7680	<split-s>	<split-s>
8044	7680	<split-h>	<split-h>
8044	7680	<name2>	<name2>
8044	8045	<>	<name>
8044	7683	<aphaerese>	<aphaerese>
8044	8044	<>	<aphaerese>
8044	7680	<elision3>	<elision3>
8044	8044	<>	<elision3>
8044	7680	<elision2>	<elision2>
8044	8044	<>	<elision2>
8044	7680	<elision1>	<elision1>
8044	8044	<>	<elision1>
8044	7677	.	υ
8044	7677	.	u
8044	7677	.	κ
8044	7677	.	α
8044	7677	.	a
8044	7677	.	λ
8044	7310	<2s>	<>
8045	7682	.	.
8045	7682	 	 
8045	7682	<~>	<~>
8045	7682	<split-s>	<split-s>
8045	7682	<split-h>	<split-h>
8045	7682	<name2>	<name2>
8045	7685	<aphaerese>	<aphaerese>
8045	8046	<>	<aphaerese>
8045	7682	<elision3>	<elision3>
8045	8046	<>	<elision3>
8045	7682	<elision2>	<elision2>
8045	8046	<>	<elision2>
8045	7682	<elision1>	<elision1>
8045	8046	<>	<elision1>
8045	7679	.	υ
8045	7679	.	u
8045	7679	.	κ
8045	7679	.	α
8045	7679	.	a
8045	7679	.	λ
8045	7311	<2s>	<>
8046	7680	.	.
8046	7680	 	 
8046	7680	<~>	<~>
8046	7680	<split-s>	<split-s>
8046	7680	<split-h>	<split-h>
8046	7680	<name2>	<name2>
8046	7683	<aphaerese>	<aphaerese>
8046	8044	<>	<aphaerese>
8046	7680	<elision3>	<elision3>
8046	8044	<>	<elision3>
8046	7680	<elision2>	<elision2>
8046	8044	<>	<elision2>
8046	7680	<elision1>	<elision1>
8046	8044	<>	<elision1>
8046	7677	.	υ
8046	7677	.	u
8046	7677	.	κ
8046	7677	.	α
8046	7677	.	a
8046	7677	.	λ
8046	7309	<2s>	<>
8047	7704	<name>	<name>
8047	8048	<>	<name>
8047	8050	<>	<aphaerese>
8047	8050	<>	<elision3>
8047	8050	<>	<elision2>
8047	8050	<>	<elision1>
8047	7180	<2s>	<>
8047	8051	<L2kl>	<>
8048	8049	<>	<aphaerese>
8048	8049	<>	<elision3>
8048	8049	<>	<elision2>
8048	8049	<>	<elision1>
8048	8045	<L2kl>	<>
8049	8050	<>	<aphaerese>
8049	8050	<>	<elision3>
8049	8050	<>	<elision2>
8049	8050	<>	<elision1>
8049	8046	<L2kl>	<>
8050	8048	<>	<name>
8050	8050	<>	<aphaerese>
8050	8050	<>	<elision3>
8050	8050	<>	<elision2>
8050	8050	<>	<elision1>
8050	8044	<L2kl>	<>
8051	7680	.	.
8051	7680	 	 
8051	7680	<~>	<~>
8051	7680	<split-s>	<split-s>
8051	7680	<split-h>	<split-h>
8051	7680	<name2>	<name2>
8051	7704	<name2>	<name>
8051	8045	<>	<name>
8051	7683	<aphaerese>	<aphaerese>
8051	8044	<>	<aphaerese>
8051	7680	<elision3>	<elision3>
8051	8044	<>	<elision3>
8051	7680	<elision2>	<elision2>
8051	8044	<>	<elision2>
8051	7680	<elision1>	<elision1>
8051	8044	<>	<elision1>
8051	7677	.	υ
8051	7677	.	u
8051	7677	.	κ
8051	7677	.	α
8051	7677	.	a
8051	7677	.	λ
8051	7336	<2s>	<>
8052	143	.	.
8052	144	 	 
8052	143	<~>	<~>
8052	143	<split-s>	<split-s>
8052	143	<split-h>	<split-h>
8052	143	<name2>	<name2>
8052	147	<aphaerese>	<aphaerese>
8052	8053	<>	<aphaerese>
8052	7051	<elision3>	<elision3>
8052	8053	<>	<elision3>
8052	7051	<elision2>	<elision2>
8052	8053	<>	<elision2>
8052	7051	<elision1>	<elision1>
8052	8053	<>	<elision1>
8052	6469	.	υ
8052	6513	H	υ
8052	6469	.	u
8052	6515	H	u
8052	6928	H	κ
8052	6423	H	k
8052	6436	H	U
8052	6439	H	K
8052	6469	.	α
8052	6499	H	α
8052	6469	.	a
8052	6504	H	a
8052	6266	H	A
8052	6905	H	λ
8052	6853	H	l
8052	6858	H	L
8052	8056	<K>	<>
8053	143	.	.
8053	144	 	 
8053	143	<~>	<~>
8053	143	<split-s>	<split-s>
8053	143	<split-h>	<split-h>
8053	143	<name2>	<name2>
8053	8054	<>	<name>
8053	147	<aphaerese>	<aphaerese>
8053	8053	<>	<aphaerese>
8053	7051	<elision3>	<elision3>
8053	8053	<>	<elision3>
8053	7051	<elision2>	<elision2>
8053	8053	<>	<elision2>
8053	7051	<elision1>	<elision1>
8053	8053	<>	<elision1>
8053	6469	.	υ
8053	6513	H	υ
8053	6469	.	u
8053	6515	H	u
8053	6928	H	κ
8053	6423	H	k
8053	6436	H	U
8053	6439	H	K
8053	6469	.	α
8053	6499	H	α
8053	6469	.	a
8053	6504	H	a
8053	6266	H	A
8053	6905	H	λ
8053	6853	H	l
8053	6858	H	L
8053	8057	<K>	<>
8054	142	.	.
8054	146	 	 
8054	142	<~>	<~>
8054	142	<split-s>	<split-s>
8054	142	<split-h>	<split-h>
8054	142	<name2>	<name2>
8054	149	<aphaerese>	<aphaerese>
8054	8052	<>	<aphaerese>
8054	7050	<elision3>	<elision3>
8054	8052	<>	<elision3>
8054	7050	<elision2>	<elision2>
8054	8052	<>	<elision2>
8054	7050	<elision1>	<elision1>
8054	8052	<>	<elision1>
8054	6471	.	υ
8054	6508	H	υ
8054	6471	.	u
8054	6512	H	u
8054	6885	H	κ
8054	6464	H	k
8054	6438	H	U
8054	6468	H	K
8054	6471	.	α
8054	6498	H	α
8054	6471	.	a
8054	6503	H	a
8054	6269	H	A
8054	6904	H	λ
8054	6852	H	l
8054	6855	H	L
8054	8055	<K>	<>
8055	6521	.	.
8055	6521	<~>	<~>
8055	6521	<split-s>	<split-s>
8055	6521	<split-h>	<split-h>
8055	6521	<name2>	<name2>
8055	6524	<aphaerese>	<aphaerese>
8055	8056	<>	<aphaerese>
8055	6999	<elision3>	<elision3>
8055	8056	<>	<elision3>
8055	6999	<elision2>	<elision2>
8055	8056	<>	<elision2>
8055	6999	<elision1>	<elision1>
8055	8056	<>	<elision1>
8055	6517	.	υ
8055	6663	H	υ
8055	6517	.	u
8055	6672	H	u
8055	6915	H	κ
8055	6632	H	k
8055	6641	H	U
8055	6645	H	K
8055	6517	.	α
8055	6675	H	α
8055	6517	.	a
8055	6678	H	a
8055	6612	H	A
8055	6924	H	λ
8055	6659	H	l
8055	6654	H	L
8056	6519	.	.
8056	6519	<~>	<~>
8056	6519	<split-s>	<split-s>
8056	6519	<split-h>	<split-h>
8056	6519	<name2>	<name2>
8056	6522	<aphaerese>	<aphaerese>
8056	8057	<>	<aphaerese>
8056	7000	<elision3>	<elision3>
8056	8057	<>	<elision3>
8056	7000	<elision2>	<elision2>
8056	8057	<>	<elision2>
8056	7000	<elision1>	<elision1>
8056	8057	<>	<elision1>
8056	6518	.	υ
8056	6661	H	υ
8056	6518	.	u
8056	6670	H	u
8056	6913	H	κ
8056	6630	H	k
8056	6639	H	U
8056	6642	H	K
8056	6518	.	α
8056	6673	H	α
8056	6518	.	a
8056	6676	H	a
8056	6610	H	A
8056	6922	H	λ
8056	6657	H	l
8056	6660	H	L
8057	6519	.	.
8057	6519	<~>	<~>
8057	6519	<split-s>	<split-s>
8057	6519	<split-h>	<split-h>
8057	6519	<name2>	<name2>
8057	8055	<>	<name>
8057	6522	<aphaerese>	<aphaerese>
8057	8057	<>	<aphaerese>
8057	7000	<elision3>	<elision3>
8057	8057	<>	<elision3>
8057	7000	<elision2>	<elision2>
8057	8057	<>	<elision2>
8057	7000	<elision1>	<elision1>
8057	8057	<>	<elision1>
8057	6518	.	υ
8057	6661	H	υ
8057	6518	.	u
8057	6670	H	u
8057	6913	H	κ
8057	6630	H	k
8057	6639	H	U
8057	6642	H	K
8057	6518	.	α
8057	6673	H	α
8057	6518	.	a
8057	6676	H	a
8057	6610	H	A
8057	6922	H	λ
8057	6657	H	l
8057	6660	H	L
8058	8059	<>	<name>
8058	8058	<>	<aphaerese>
8058	8058	<>	<elision3>
8058	8058	<>	<elision2>
8058	8058	<>	<elision1>
8058	7915	.	κ
8058	7915	.	λ
8058	7239	<1s>	<>
8059	8060	<>	<aphaerese>
8059	8060	<>	<elision3>
8059	8060	<>	<elision2>
8059	8060	<>	<elision1>
8059	7917	.	κ
8059	7917	.	λ
8059	7240	<1s>	<>
8060	8058	<>	<aphaerese>
8060	8058	<>	<elision3>
8060	8058	<>	<elision2>
8060	8058	<>	<elision1>
8060	7915	.	κ
8060	7915	.	λ
8060	7238	<1s>	<>
8061	7907	.	.
8061	7908	 	 
8061	7907	<~>	<~>
8061	7907	<split-s>	<split-s>
8061	7907	<split-h>	<split-h>
8061	7907	<name2>	<name2>
8061	8022	<>	<name>
8061	7911	<aphaerese>	<aphaerese>
8061	7906	<>	<aphaerese>
8061	8024	<elision3>	<elision3>
8061	7906	<>	<elision3>
8061	8024	<elision2>	<elision2>
8061	7906	<>	<elision2>
8061	8024	<elision1>	<elision1>
8061	7906	<>	<elision1>
8061	7915	.	υ
8061	7918	s	υ
8061	7915	.	u
8061	7918	s	u
8061	7549	s	κ
8061	7674	s	k
8061	7964	s	U
8061	7692	s	K
8061	7915	.	α
8061	7989	s	α
8061	7915	.	a
8061	7989	s	a
8061	7992	s	A
8061	7549	s	λ
8061	7705	s	l
8061	7708	s	L
8061	8062	<1s>	<>
8062	143	.	.
8062	144	 	 
8062	143	<~>	<~>
8062	143	<split-s>	<split-s>
8062	143	<split-h>	<split-h>
8062	143	<name2>	<name2>
8062	8054	<>	<name>
8062	147	<aphaerese>	<aphaerese>
8062	8053	<>	<aphaerese>
8062	7051	<elision3>	<elision3>
8062	8053	<>	<elision3>
8062	7051	<elision2>	<elision2>
8062	8053	<>	<elision2>
8062	7051	<elision1>	<elision1>
8062	8053	<>	<elision1>
8062	6469	.	υ
8062	6469	.	u
8062	6469	.	α
8062	6469	.	a
8062	8063	<K>	<>
8063	6519	.	.
8063	6519	<~>	<~>
8063	6519	<split-s>	<split-s>
8063	6519	<split-h>	<split-h>
8063	6519	<name2>	<name2>
8063	8055	<>	<name>
8063	6522	<aphaerese>	<aphaerese>
8063	8057	<>	<aphaerese>
8063	7000	<elision3>	<elision3>
8063	8057	<>	<elision3>
8063	7000	<elision2>	<elision2>
8063	8057	<>	<elision2>
8063	7000	<elision1>	<elision1>
8063	8057	<>	<elision1>
8063	6518	.	υ
8063	6518	.	u
8063	6518	.	α
8063	6518	.	a
8064	8065	<>	<name>
8064	8067	<>	<aphaerese>
8064	8067	<>	<elision3>
8064	8067	<>	<elision2>
8064	8067	<>	<elision1>
8064	8068	<k2K>	<>
8064	8074	<k2L>	<>
8064	8058	<l2L>	<>
8065	8066	<>	<aphaerese>
8065	8066	<>	<elision3>
8065	8066	<>	<elision2>
8065	8066	<>	<elision1>
8065	8069	<k2K>	<>
8065	8072	<k2L>	<>
8065	8059	<l2L>	<>
8066	8067	<>	<aphaerese>
8066	8067	<>	<elision3>
8066	8067	<>	<elision2>
8066	8067	<>	<elision1>
8066	8070	<k2K>	<>
8066	8073	<k2L>	<>
8066	8060	<l2L>	<>
8067	8065	<>	<name>
8067	8067	<>	<aphaerese>
8067	8067	<>	<elision3>
8067	8067	<>	<elision2>
8067	8067	<>	<elision1>
8067	8068	<k2K>	<>
8067	8071	<k2L>	<>
8067	8058	<l2L>	<>
8068	7741	.	.
8068	7742	 	 
8068	7741	<~>	<~>
8068	7741	<split-s>	<split-s>
8068	7741	<split-h>	<split-h>
8068	7741	<name2>	<name2>
8068	8069	<>	<name>
8068	7745	<aphaerese>	<aphaerese>
8068	8068	<>	<aphaerese>
8068	7741	<elision3>	<elision3>
8068	8068	<>	<elision3>
8068	7741	<elision2>	<elision2>
8068	8068	<>	<elision2>
8068	7741	<elision1>	<elision1>
8068	8068	<>	<elision1>
8068	7749	.	υ
8068	7752	s	υ
8068	7749	.	u
8068	7752	s	u
8068	127	s	κ
8068	7490	s	k
8068	7815	s	U
8068	7523	s	K
8068	7749	.	α
8068	7843	s	α
8068	7749	.	a
8068	7843	s	a
8068	7846	s	A
8068	127	s	λ
8068	7538	s	l
8068	7541	s	L
8069	7744	.	.
8069	7747	 	 
8069	7744	<~>	<~>
8069	7744	<split-s>	<split-s>
8069	7744	<split-h>	<split-h>
8069	7744	<name2>	<name2>
8069	7873	<aphaerese>	<aphaerese>
8069	8070	<>	<aphaerese>
8069	7744	<elision3>	<elision3>
8069	8070	<>	<elision3>
8069	7744	<elision2>	<elision2>
8069	8070	<>	<elision2>
8069	7744	<elision1>	<elision1>
8069	8070	<>	<elision1>
8069	7751	.	υ
8069	7754	s	υ
8069	7751	.	u
8069	7754	s	u
8069	7483	s	κ
8069	7492	s	k
8069	7817	s	U
8069	7526	s	K
8069	7751	.	α
8069	7845	s	α
8069	7751	.	a
8069	7845	s	a
8069	7848	s	A
8069	7483	s	λ
8069	7540	s	l
8069	7543	s	L
8070	7741	.	.
8070	7742	 	 
8070	7741	<~>	<~>
8070	7741	<split-s>	<split-s>
8070	7741	<split-h>	<split-h>
8070	7741	<name2>	<name2>
8070	7745	<aphaerese>	<aphaerese>
8070	8068	<>	<aphaerese>
8070	7741	<elision3>	<elision3>
8070	8068	<>	<elision3>
8070	7741	<elision2>	<elision2>
8070	8068	<>	<elision2>
8070	7741	<elision1>	<elision1>
8070	8068	<>	<elision1>
8070	7749	.	υ
8070	7752	s	υ
8070	7749	.	u
8070	7752	s	u
8070	127	s	κ
8070	7490	s	k
8070	7815	s	U
8070	7523	s	K
8070	7749	.	α
8070	7843	s	α
8070	7749	.	a
8070	7843	s	a
8070	7846	s	A
8070	127	s	λ
8070	7538	s	l
8070	7541	s	L
8071	7907	.	.
8071	7908	 	 
8071	7907	<~>	<~>
8071	7907	<split-s>	<split-s>
8071	7907	<split-h>	<split-h>
8071	7907	<name2>	<name2>
8071	8072	<>	<name>
8071	7911	<aphaerese>	<aphaerese>
8071	8071	<>	<aphaerese>
8071	7907	<elision3>	<elision3>
8071	8071	<>	<elision3>
8071	7907	<elision2>	<elision2>
8071	8071	<>	<elision2>
8071	7907	<elision1>	<elision1>
8071	8071	<>	<elision1>
8071	7915	.	υ
8071	7918	s	υ
8071	7915	.	u
8071	7918	s	u
8071	7549	s	κ
8071	7674	s	k
8071	7964	s	U
8071	7692	s	K
8071	7915	.	α
8071	7989	s	α
8071	7915	.	a
8071	7989	s	a
8071	7992	s	A
8071	7549	s	λ
8071	7705	s	l
8071	7708	s	L
8071	7175	<1s>	<>
8072	7910	.	.
8072	7913	 	 
8072	7910	<~>	<~>
8072	7910	<split-s>	<split-s>
8072	7910	<split-h>	<split-h>
8072	7910	<name2>	<name2>
8072	8019	<aphaerese>	<aphaerese>
8072	8073	<>	<aphaerese>
8072	7910	<elision3>	<elision3>
8072	8073	<>	<elision3>
8072	7910	<elision2>	<elision2>
8072	8073	<>	<elision2>
8072	7910	<elision1>	<elision1>
8072	8073	<>	<elision1>
8072	7917	.	υ
8072	7920	s	υ
8072	7917	.	u
8072	7920	s	u
8072	7670	s	κ
8072	7676	s	k
8072	7966	s	U
8072	7695	s	K
8072	7917	.	α
8072	7991	s	α
8072	7917	.	a
8072	7991	s	a
8072	7994	s	A
8072	7670	s	λ
8072	7707	s	l
8072	7710	s	L
8072	7176	<1s>	<>
8073	7907	.	.
8073	7908	 	 
8073	7907	<~>	<~>
8073	7907	<split-s>	<split-s>
8073	7907	<split-h>	<split-h>
8073	7907	<name2>	<name2>
8073	7911	<aphaerese>	<aphaerese>
8073	8071	<>	<aphaerese>
8073	7907	<elision3>	<elision3>
8073	8071	<>	<elision3>
8073	7907	<elision2>	<elision2>
8073	8071	<>	<elision2>
8073	7907	<elision1>	<elision1>
8073	8071	<>	<elision1>
8073	7915	.	υ
8073	7918	s	υ
8073	7915	.	u
8073	7918	s	u
8073	7549	s	κ
8073	7674	s	k
8073	7964	s	U
8073	7692	s	K
8073	7915	.	α
8073	7989	s	α
8073	7915	.	a
8073	7989	s	a
8073	7992	s	A
8073	7549	s	λ
8073	7705	s	l
8073	7708	s	L
8073	7174	<1s>	<>
8074	7907	.	.
8074	7908	 	 
8074	7907	<~>	<~>
8074	7907	<split-s>	<split-s>
8074	7907	<split-h>	<split-h>
8074	7907	<name2>	<name2>
8074	8072	<>	<name>
8074	7911	<aphaerese>	<aphaerese>
8074	8071	<>	<aphaerese>
8074	7907	<elision3>	<elision3>
8074	8071	<>	<elision3>
8074	7907	<elision2>	<elision2>
8074	8071	<>	<elision2>
8074	7907	<elision1>	<elision1>
8074	8071	<>	<elision1>
8074	7915	.	υ
8074	7918	s	υ
8074	7915	.	u
8074	7918	s	u
8074	7549	s	κ
8074	7674	s	k
8074	7964	s	U
8074	7692	s	K
8074	7915	.	α
8074	7989	s	α
8074	7915	.	a
8074	7989	s	a
8074	7992	s	A
8074	7549	s	λ
8074	7705	s	l
8074	7708	s	L
8074	8075	<1s>	<>
8075	143	.	.
8075	144	 	 
8075	143	<~>	<~>
8075	143	<split-s>	<split-s>
8075	143	<split-h>	<split-h>
8075	143	<name2>	<name2>
8075	7176	<>	<name>
8075	147	<aphaerese>	<aphaerese>
8075	7175	<>	<aphaerese>
8075	143	<elision3>	<elision3>
8075	7175	<>	<elision3>
8075	143	<elision2>	<elision2>
8075	7175	<>	<elision2>
8075	143	<elision1>	<elision1>
8075	7175	<>	<elision1>
8075	6469	.	υ
8075	6469	.	u
8075	6469	.	α
8075	6469	.	a
8075	8076	<K>	<>
8076	6519	.	.
8076	6519	<~>	<~>
8076	6519	<split-s>	<split-s>
8076	6519	<split-h>	<split-h>
8076	6519	<name2>	<name2>
8076	7177	<>	<name>
8076	6522	<aphaerese>	<aphaerese>
8076	7179	<>	<aphaerese>
8076	6519	<elision3>	<elision3>
8076	7179	<>	<elision3>
8076	6519	<elision2>	<elision2>
8076	7179	<>	<elision2>
8076	6519	<elision1>	<elision1>
8076	7179	<>	<elision1>
8076	6518	.	υ
8076	6518	.	u
8076	6518	.	α
8076	6518	.	a
8077	7741	.	.
8077	7742	 	 
8077	7741	<~>	<~>
8077	7741	<split-s>	<split-s>
8077	7741	<split-h>	<split-h>
8077	7741	<name2>	<name2>
8077	8078	<>	<name>
8077	7745	<aphaerese>	<aphaerese>
8077	8077	<>	<aphaerese>
8077	7741	<elision3>	<elision3>
8077	8077	<>	<elision3>
8077	7741	<elision2>	<elision2>
8077	8077	<>	<elision2>
8077	7741	<elision1>	<elision1>
8077	8077	<>	<elision1>
8077	7749	.	υ
8077	7752	s	υ
8077	7749	.	u
8077	7752	s	u
8077	7755	.	κ
8077	7773	s	κ
8077	7490	s	k
8077	7815	s	U
8077	7523	s	K
8077	7749	.	α
8077	7843	s	α
8077	7749	.	a
8077	7843	s	a
8077	7846	s	A
8077	7849	s	λ
8077	7538	s	l
8077	7541	s	L
8077	7907	<U2L>	<>
8078	7744	.	.
8078	7747	 	 
8078	7744	<~>	<~>
8078	7744	<split-s>	<split-s>
8078	7744	<split-h>	<split-h>
8078	7744	<name2>	<name2>
8078	7873	<aphaerese>	<aphaerese>
8078	8079	<>	<aphaerese>
8078	7744	<elision3>	<elision3>
8078	8079	<>	<elision3>
8078	7744	<elision2>	<elision2>
8078	8079	<>	<elision2>
8078	7744	<elision1>	<elision1>
8078	8079	<>	<elision1>
8078	7751	.	υ
8078	7754	s	υ
8078	7751	.	u
8078	7754	s	u
8078	7757	.	κ
8078	7775	s	κ
8078	7492	s	k
8078	7817	s	U
8078	7526	s	K
8078	7751	.	α
8078	7845	s	α
8078	7751	.	a
8078	7845	s	a
8078	7848	s	A
8078	7851	s	λ
8078	7540	s	l
8078	7543	s	L
8078	8021	<U2L>	<>
8079	7741	.	.
8079	7742	 	 
8079	7741	<~>	<~>
8079	7741	<split-s>	<split-s>
8079	7741	<split-h>	<split-h>
8079	7741	<name2>	<name2>
8079	7745	<aphaerese>	<aphaerese>
8079	8077	<>	<aphaerese>
8079	7741	<elision3>	<elision3>
8079	8077	<>	<elision3>
8079	7741	<elision2>	<elision2>
8079	8077	<>	<elision2>
8079	7741	<elision1>	<elision1>
8079	8077	<>	<elision1>
8079	7749	.	υ
8079	7752	s	υ
8079	7749	.	u
8079	7752	s	u
8079	7755	.	κ
8079	7773	s	κ
8079	7490	s	k
8079	7815	s	U
8079	7523	s	K
8079	7749	.	α
8079	7843	s	α
8079	7749	.	a
8079	7843	s	a
8079	7846	s	A
8079	7849	s	λ
8079	7538	s	l
8079	7541	s	L
8079	7910	<U2L>	<>
8080	7741	.	.
8080	7742	 	 
8080	7741	<~>	<~>
8080	7741	<split-s>	<split-s>
8080	7741	<split-h>	<split-h>
8080	7741	<name2>	<name2>
8080	8081	<name2>	<name>
8080	8082	<>	<name>
8080	7745	<aphaerese>	<aphaerese>
8080	8084	<>	<aphaerese>
8080	7741	<elision3>	<elision3>
8080	8084	<>	<elision3>
8080	7741	<elision2>	<elision2>
8080	8084	<>	<elision2>
8080	7741	<elision1>	<elision1>
8080	8084	<>	<elision1>
8080	7749	.	υ
8080	7752	s	υ
8080	7749	.	u
8080	7752	s	u
8080	7915	.	κ
8080	127	s	κ
8080	7490	s	k
8080	7815	s	U
8080	7523	s	K
8080	7749	.	α
8080	7843	s	α
8080	7749	.	a
8080	7843	s	a
8080	7846	s	A
8080	7915	.	λ
8080	127	s	λ
8080	7538	s	l
8080	7541	s	L
8080	7239	<1s>	<>
8080	8085	<k2K>	<>
8080	8086	<k2L>	<>
8080	8088	<K2L>	<>
8081	7526	s	k
8081	7543	s	l
8082	7744	.	.
8082	7747	 	 
8082	7744	<~>	<~>
8082	7744	<split-s>	<split-s>
8082	7744	<split-h>	<split-h>
8082	7744	<name2>	<name2>
8082	7873	<aphaerese>	<aphaerese>
8082	8083	<>	<aphaerese>
8082	7744	<elision3>	<elision3>
8082	8083	<>	<elision3>
8082	7744	<elision2>	<elision2>
8082	8083	<>	<elision2>
8082	7744	<elision1>	<elision1>
8082	8083	<>	<elision1>
8082	7751	.	υ
8082	7754	s	υ
8082	7751	.	u
8082	7754	s	u
8082	7917	.	κ
8082	7483	s	κ
8082	7492	s	k
8082	7817	s	U
8082	7526	s	K
8082	7751	.	α
8082	7845	s	α
8082	7751	.	a
8082	7845	s	a
8082	7848	s	A
8082	7917	.	λ
8082	7483	s	λ
8082	7540	s	l
8082	7543	s	L
8082	7240	<1s>	<>
8082	8072	<K2L>	<>
8083	7741	.	.
8083	7742	 	 
8083	7741	<~>	<~>
8083	7741	<split-s>	<split-s>
8083	7741	<split-h>	<split-h>
8083	7741	<name2>	<name2>
8083	7745	<aphaerese>	<aphaerese>
8083	8084	<>	<aphaerese>
8083	7741	<elision3>	<elision3>
8083	8084	<>	<elision3>
8083	7741	<elision2>	<elision2>
8083	8084	<>	<elision2>
8083	7741	<elision1>	<elision1>
8083	8084	<>	<elision1>
8083	7749	.	υ
8083	7752	s	υ
8083	7749	.	u
8083	7752	s	u
8083	7915	.	κ
8083	127	s	κ
8083	7490	s	k
8083	7815	s	U
8083	7523	s	K
8083	7749	.	α
8083	7843	s	α
8083	7749	.	a
8083	7843	s	a
8083	7846	s	A
8083	7915	.	λ
8083	127	s	λ
8083	7538	s	l
8083	7541	s	L
8083	7238	<1s>	<>
8083	8073	<K2L>	<>
8084	7741	.	.
8084	7742	 	 
8084	7741	<~>	<~>
8084	7741	<split-s>	<split-s>
8084	7741	<split-h>	<split-h>
8084	7741	<name2>	<name2>
8084	8082	<>	<name>
8084	7745	<aphaerese>	<aphaerese>
8084	8084	<>	<aphaerese>
8084	7741	<elision3>	<elision3>
8084	8084	<>	<elision3>
8084	7741	<elision2>	<elision2>
8084	8084	<>	<elision2>
8084	7741	<elision1>	<elision1>
8084	8084	<>	<elision1>
8084	7749	.	υ
8084	7752	s	υ
8084	7749	.	u
8084	7752	s	u
8084	7915	.	κ
8084	127	s	κ
8084	7490	s	k
8084	7815	s	U
8084	7523	s	K
8084	7749	.	α
8084	7843	s	α
8084	7749	.	a
8084	7843	s	a
8084	7846	s	A
8084	7915	.	λ
8084	127	s	λ
8084	7538	s	l
8084	7541	s	L
8084	7239	<1s>	<>
8084	8071	<K2L>	<>
8085	8081	<name>	<name>
8086	8087	<name>	<name>
8086	7180	<1s>	<>
8087	7695	s	k
8087	7710	s	l
8087	7070	<1s>	<>
8088	7907	.	.
8088	7908	 	 
8088	7907	<~>	<~>
8088	7907	<split-s>	<split-s>
8088	7907	<split-h>	<split-h>
8088	7907	<name2>	<name2>
8088	8087	<name2>	<name>
8088	8072	<>	<name>
8088	7911	<aphaerese>	<aphaerese>
8088	8071	<>	<aphaerese>
8088	7907	<elision3>	<elision3>
8088	8071	<>	<elision3>
8088	7907	<elision2>	<elision2>
8088	8071	<>	<elision2>
8088	7907	<elision1>	<elision1>
8088	8071	<>	<elision1>
8088	7915	.	υ
8088	7918	s	υ
8088	7915	.	u
8088	7918	s	u
8088	7549	s	κ
8088	7674	s	k
8088	7964	s	U
8088	7692	s	K
8088	7915	.	α
8088	7989	s	α
8088	7915	.	a
8088	7989	s	a
8088	7992	s	A
8088	7549	s	λ
8088	7705	s	l
8088	7708	s	L
8088	8089	<1s>	<>
8089	143	.	.
8089	144	 	 
8089	143	<~>	<~>
8089	143	<split-s>	<split-s>
8089	143	<split-h>	<split-h>
8089	143	<name2>	<name2>
8089	7181	<name2>	<name>
8089	7176	<>	<name>
8089	147	<aphaerese>	<aphaerese>
8089	7175	<>	<aphaerese>
8089	143	<elision3>	<elision3>
8089	7175	<>	<elision3>
8089	143	<elision2>	<elision2>
8089	7175	<>	<elision2>
8089	143	<elision1>	<elision1>
8089	7175	<>	<elision1>
8089	6469	.	υ
8089	6469	.	u
8089	6469	.	α
8089	6469	.	a
8089	8090	<K>	<>
8090	6519	.	.
8090	6519	<~>	<~>
8090	6519	<split-s>	<split-s>
8090	6519	<split-h>	<split-h>
8090	6519	<name2>	<name2>
8090	7071	<name2>	<name>
8090	7177	<>	<name>
8090	6522	<aphaerese>	<aphaerese>
8090	7179	<>	<aphaerese>
8090	6519	<elision3>	<elision3>
8090	7179	<>	<elision3>
8090	6519	<elision2>	<elision2>
8090	7179	<>	<elision2>
8090	6519	<elision1>	<elision1>
8090	7179	<>	<elision1>
8090	6518	.	υ
8090	6518	.	u
8090	6518	.	α
8090	6518	.	a
8091	8092	<>	<name>
8091	8091	<>	<aphaerese>
8091	8091	<>	<elision3>
8091	8091	<>	<elision2>
8091	8091	<>	<elision1>
8091	8095	<lambda2L>	<>
8092	8093	<>	<aphaerese>
8092	8093	<>	<elision3>
8092	8093	<>	<elision2>
8092	8093	<>	<elision1>
8092	8096	<lambda2L>	<>
8093	8091	<>	<aphaerese>
8093	8091	<>	<elision3>
8093	8091	<>	<elision2>
8093	8091	<>	<elision1>
8093	8094	<lambda2L>	<>
8094	7907	.	.
8094	7908	 	 
8094	7907	<~>	<~>
8094	7907	<split-s>	<split-s>
8094	7907	<split-h>	<split-h>
8094	7907	<name2>	<name2>
8094	7911	<aphaerese>	<aphaerese>
8094	8095	<>	<aphaerese>
8094	7907	<elision3>	<elision3>
8094	8095	<>	<elision3>
8094	7907	<elision2>	<elision2>
8094	8095	<>	<elision2>
8094	7907	<elision1>	<elision1>
8094	8095	<>	<elision1>
8094	7915	.	υ
8094	7918	s	υ
8094	7915	.	u
8094	7918	s	u
8094	7915	.	κ
8094	7549	s	κ
8094	7674	s	k
8094	7964	s	U
8094	7692	s	K
8094	7915	.	α
8094	7989	s	α
8094	7915	.	a
8094	7989	s	a
8094	7992	s	A
8094	7915	.	λ
8094	7549	s	λ
8094	7705	s	l
8094	7708	s	L
8094	7059	<1s>	<>
8095	7907	.	.
8095	7908	 	 
8095	7907	<~>	<~>
8095	7907	<split-s>	<split-s>
8095	7907	<split-h>	<split-h>
8095	7907	<name2>	<name2>
8095	8096	<>	<name>
8095	7911	<aphaerese>	<aphaerese>
8095	8095	<>	<aphaerese>
8095	7907	<elision3>	<elision3>
8095	8095	<>	<elision3>
8095	7907	<elision2>	<elision2>
8095	8095	<>	<elision2>
8095	7907	<elision1>	<elision1>
8095	8095	<>	<elision1>
8095	7915	.	υ
8095	7918	s	υ
8095	7915	.	u
8095	7918	s	u
8095	7915	.	κ
8095	7549	s	κ
8095	7674	s	k
8095	7964	s	U
8095	7692	s	K
8095	7915	.	α
8095	7989	s	α
8095	7915	.	a
8095	7989	s	a
8095	7992	s	A
8095	7915	.	λ
8095	7549	s	λ
8095	7705	s	l
8095	7708	s	L
8095	7060	<1s>	<>
8096	7910	.	.
8096	7913	 	 
8096	7910	<~>	<~>
8096	7910	<split-s>	<split-s>
8096	7910	<split-h>	<split-h>
8096	7910	<name2>	<name2>
8096	8019	<aphaerese>	<aphaerese>
8096	8094	<>	<aphaerese>
8096	7910	<elision3>	<elision3>
8096	8094	<>	<elision3>
8096	7910	<elision2>	<elision2>
8096	8094	<>	<elision2>
8096	7910	<elision1>	<elision1>
8096	8094	<>	<elision1>
8096	7917	.	υ
8096	7920	s	υ
8096	7917	.	u
8096	7920	s	u
8096	7917	.	κ
8096	7670	s	κ
8096	7676	s	k
8096	7966	s	U
8096	7695	s	K
8096	7917	.	α
8096	7991	s	α
8096	7917	.	a
8096	7991	s	a
8096	7994	s	A
8096	7917	.	λ
8096	7670	s	λ
8096	7707	s	l
8096	7710	s	L
8096	7061	<1s>	<>
8097	8098	<>	<name>
8097	8097	<>	<aphaerese>
8097	8097	<>	<elision3>
8097	8097	<>	<elision2>
8097	8097	<>	<elision1>
8097	8095	<l2L>	<>
8098	8099	<>	<aphaerese>
8098	8099	<>	<elision3>
8098	8099	<>	<elision2>
8098	8099	<>	<elision1>
8098	8096	<l2L>	<>
8099	8097	<>	<aphaerese>
8099	8097	<>	<elision3>
8099	8097	<>	<elision2>
8099	8097	<>	<elision1>
8099	8094	<l2L>	<>
8100	7907	.	.
8100	7908	 	 
8100	7907	<~>	<~>
8100	7907	<split-s>	<split-s>
8100	7907	<split-h>	<split-h>
8100	7907	<name2>	<name2>
8100	8087	<name2>	<name>
8100	8096	<>	<name>
8100	7911	<aphaerese>	<aphaerese>
8100	8095	<>	<aphaerese>
8100	7907	<elision3>	<elision3>
8100	8095	<>	<elision3>
8100	7907	<elision2>	<elision2>
8100	8095	<>	<elision2>
8100	7907	<elision1>	<elision1>
8100	8095	<>	<elision1>
8100	7915	.	υ
8100	7918	s	υ
8100	7915	.	u
8100	7918	s	u
8100	7915	.	κ
8100	7549	s	κ
8100	7674	s	k
8100	7964	s	U
8100	7692	s	K
8100	7915	.	α
8100	7989	s	α
8100	7915	.	a
8100	7989	s	a
8100	7992	s	A
8100	7915	.	λ
8100	7549	s	λ
8100	7705	s	l
8100	7708	s	L
8100	7249	<1s>	<>
8100	8086	<l2L>	<>
8101	7739	<>	<aphaerese>
8101	7739	<>	<elision3>
8101	7739	<>	<elision2>
8101	7739	<>	<elision1>
8101	7877	<kappa2K>	<>
8101	8102	<kappa2L>	<>
8101	8060	<lambda2L>	<>
8102	7907	.	.
8102	7908	 	 
8102	7907	<~>	<~>
8102	7907	<split-s>	<split-s>
8102	7907	<split-h>	<split-h>
8102	7907	<name2>	<name2>
8102	7911	<aphaerese>	<aphaerese>
8102	7906	<>	<aphaerese>
8102	8024	<elision3>	<elision3>
8102	7906	<>	<elision3>
8102	8024	<elision2>	<elision2>
8102	7906	<>	<elision2>
8102	8024	<elision1>	<elision1>
8102	7906	<>	<elision1>
8102	7915	.	υ
8102	7918	s	υ
8102	7915	.	u
8102	7918	s	u
8102	7549	s	κ
8102	7674	s	k
8102	7964	s	U
8102	7692	s	K
8102	7915	.	α
8102	7989	s	α
8102	7915	.	a
8102	7989	s	a
8102	7992	s	A
8102	7549	s	λ
8102	7705	s	l
8102	7708	s	L
8102	8103	<1s>	<>
8103	143	.	.
8103	144	 	 
8103	143	<~>	<~>
8103	143	<split-s>	<split-s>
8103	143	<split-h>	<split-h>
8103	143	<name2>	<name2>
8103	147	<aphaerese>	<aphaerese>
8103	8053	<>	<aphaerese>
8103	7051	<elision3>	<elision3>
8103	8053	<>	<elision3>
8103	7051	<elision2>	<elision2>
8103	8053	<>	<elision2>
8103	7051	<elision1>	<elision1>
8103	8053	<>	<elision1>
8103	6469	.	υ
8103	6469	.	u
8103	6469	.	α
8103	6469	.	a
8103	8104	<K>	<>
8104	6519	.	.
8104	6519	<~>	<~>
8104	6519	<split-s>	<split-s>
8104	6519	<split-h>	<split-h>
8104	6519	<name2>	<name2>
8104	6522	<aphaerese>	<aphaerese>
8104	8057	<>	<aphaerese>
8104	7000	<elision3>	<elision3>
8104	8057	<>	<elision3>
8104	7000	<elision2>	<elision2>
8104	8057	<>	<elision2>
8104	7000	<elision1>	<elision1>
8104	8057	<>	<elision1>
8104	6518	.	υ
8104	6518	.	u
8104	6518	.	α
8104	6518	.	a
8105	8067	<>	<aphaerese>
8105	8067	<>	<elision3>
8105	8067	<>	<elision2>
8105	8067	<>	<elision1>
8105	8070	<k2K>	<>
8105	8106	<k2L>	<>
8105	8060	<l2L>	<>
8106	7907	.	.
8106	7908	 	 
8106	7907	<~>	<~>
8106	7907	<split-s>	<split-s>
8106	7907	<split-h>	<split-h>
8106	7907	<name2>	<name2>
8106	7911	<aphaerese>	<aphaerese>
8106	8071	<>	<aphaerese>
8106	7907	<elision3>	<elision3>
8106	8071	<>	<elision3>
8106	7907	<elision2>	<elision2>
8106	8071	<>	<elision2>
8106	7907	<elision1>	<elision1>
8106	8071	<>	<elision1>
8106	7915	.	υ
8106	7918	s	υ
8106	7915	.	u
8106	7918	s	u
8106	7549	s	κ
8106	7674	s	k
8106	7964	s	U
8106	7692	s	K
8106	7915	.	α
8106	7989	s	α
8106	7915	.	a
8106	7989	s	a
8106	7992	s	A
8106	7549	s	λ
8106	7705	s	l
8106	7708	s	L
8106	8107	<1s>	<>
8107	143	.	.
8107	144	 	 
8107	143	<~>	<~>
8107	143	<split-s>	<split-s>
8107	143	<split-h>	<split-h>
8107	143	<name2>	<name2>
8107	147	<aphaerese>	<aphaerese>
8107	7175	<>	<aphaerese>
8107	143	<elision3>	<elision3>
8107	7175	<>	<elision3>
8107	143	<elision2>	<elision2>
8107	7175	<>	<elision2>
8107	143	<elision1>	<elision1>
8107	7175	<>	<elision1>
8107	6469	.	υ
8107	6469	.	u
8107	6469	.	α
8107	6469	.	a
8107	8108	<K>	<>
8108	6519	.	.
8108	6519	<~>	<~>
8108	6519	<split-s>	<split-s>
8108	6519	<split-h>	<split-h>
8108	6519	<name2>	<name2>
8108	6522	<aphaerese>	<aphaerese>
8108	7179	<>	<aphaerese>
8108	6519	<elision3>	<elision3>
8108	7179	<>	<elision3>
8108	6519	<elision2>	<elision2>
8108	7179	<>	<elision2>
8108	6519	<elision1>	<elision1>
8108	7179	<>	<elision1>
8108	6518	.	υ
8108	6518	.	u
8108	6518	.	α
8108	6518	.	a
8109	7741	.	.
8109	7742	 	 
8109	7741	<~>	<~>
8109	7741	<split-s>	<split-s>
8109	7741	<split-h>	<split-h>
8109	7741	<name2>	<name2>
8109	7745	<aphaerese>	<aphaerese>
8109	8084	<>	<aphaerese>
8109	7741	<elision3>	<elision3>
8109	8084	<>	<elision3>
8109	7741	<elision2>	<elision2>
8109	8084	<>	<elision2>
8109	7741	<elision1>	<elision1>
8109	8084	<>	<elision1>
8109	7749	.	υ
8109	7752	s	υ
8109	7749	.	u
8109	7752	s	u
8109	7915	.	κ
8109	127	s	κ
8109	7490	s	k
8109	7815	s	U
8109	7523	s	K
8109	7749	.	α
8109	7843	s	α
8109	7749	.	a
8109	7843	s	a
8109	7846	s	A
8109	7915	.	λ
8109	127	s	λ
8109	7538	s	l
8109	7541	s	L
8109	7238	<1s>	<>
8109	8106	<K2L>	<>
8110	8111	<>	<name>
8110	8110	<>	<aphaerese>
8110	107	<elision3>	<elision3>
8110	8110	<>	<elision3>
8110	107	<elision2>	<elision2>
8110	8110	<>	<elision2>
8110	107	<elision1>	<elision1>
8110	8110	<>	<elision1>
8111	8112	<>	<aphaerese>
8111	106	<elision3>	<elision3>
8111	8112	<>	<elision3>
8111	106	<elision2>	<elision2>
8111	8112	<>	<elision2>
8111	106	<elision1>	<elision1>
8111	8112	<>	<elision1>
8112	8110	<>	<aphaerese>
8112	107	<elision3>	<elision3>
8112	8110	<>	<elision3>
8112	107	<elision2>	<elision2>
8112	8110	<>	<elision2>
8112	107	<elision1>	<elision1>
8112	8110	<>	<elision1>
8113	8114	<>	<name>
8113	8116	<>	<aphaerese>
8113	8116	<>	<elision3>
8113	8116	<>	<elision2>
8113	8116	<>	<elision1>
8113	8123	<ypsilon2K>	<>
8113	8124	<ypsilon2L>	<>
8114	8115	<>	<aphaerese>
8114	8115	<>	<elision3>
8114	8115	<>	<elision2>
8114	8115	<>	<elision1>
8114	8118	<ypsilon2K>	<>
8114	8121	<ypsilon2L>	<>
8115	8116	<>	<aphaerese>
8115	8116	<>	<elision3>
8115	8116	<>	<elision2>
8115	8116	<>	<elision1>
8115	8119	<ypsilon2K>	<>
8115	8122	<ypsilon2L>	<>
8116	8114	<>	<name>
8116	8116	<>	<aphaerese>
8116	8116	<>	<elision3>
8116	8116	<>	<elision2>
8116	8116	<>	<elision1>
8116	8117	<ypsilon2K>	<>
8116	8120	<ypsilon2L>	<>
8117	7741	.	.
8117	7742	 	 
8117	7741	<~>	<~>
8117	7741	<split-s>	<split-s>
8117	7741	<split-h>	<split-h>
8117	7741	<name2>	<name2>
8117	8118	<>	<name>
8117	7745	<aphaerese>	<aphaerese>
8117	8117	<>	<aphaerese>
8117	8117	<>	<elision3>
8117	8117	<>	<elision2>
8117	8117	<>	<elision1>
8117	7749	.	υ
8117	7752	s	υ
8117	7749	.	u
8117	7752	s	u
8117	7755	.	κ
8117	7773	s	κ
8117	7490	s	k
8117	7815	s	U
8117	7523	s	K
8117	7749	.	α
8117	7843	s	α
8117	7749	.	a
8117	7843	s	a
8117	7846	s	A
8117	7849	s	λ
8117	7538	s	l
8117	7541	s	L
8118	7744	.	.
8118	7747	 	 
8118	7744	<~>	<~>
8118	7744	<split-s>	<split-s>
8118	7744	<split-h>	<split-h>
8118	7744	<name2>	<name2>
8118	7873	<aphaerese>	<aphaerese>
8118	8119	<>	<aphaerese>
8118	8119	<>	<elision3>
8118	8119	<>	<elision2>
8118	8119	<>	<elision1>
8118	7751	.	υ
8118	7754	s	υ
8118	7751	.	u
8118	7754	s	u
8118	7757	.	κ
8118	7775	s	κ
8118	7492	s	k
8118	7817	s	U
8118	7526	s	K
8118	7751	.	α
8118	7845	s	α
8118	7751	.	a
8118	7845	s	a
8118	7848	s	A
8118	7851	s	λ
8118	7540	s	l
8118	7543	s	L
8119	7741	.	.
8119	7742	 	 
8119	7741	<~>	<~>
8119	7741	<split-s>	<split-s>
8119	7741	<split-h>	<split-h>
8119	7741	<name2>	<name2>
8119	7745	<aphaerese>	<aphaerese>
8119	8117	<>	<aphaerese>
8119	8117	<>	<elision3>
8119	8117	<>	<elision2>
8119	8117	<>	<elision1>
8119	7749	.	υ
8119	7752	s	υ
8119	7749	.	u
8119	7752	s	u
8119	7755	.	κ
8119	7773	s	κ
8119	7490	s	k
8119	7815	s	U
8119	7523	s	K
8119	7749	.	α
8119	7843	s	α
8119	7749	.	a
8119	7843	s	a
8119	7846	s	A
8119	7849	s	λ
8119	7538	s	l
8119	7541	s	L
8120	7907	.	.
8120	7908	 	 
8120	7907	<~>	<~>
8120	7907	<split-s>	<split-s>
8120	7907	<split-h>	<split-h>
8120	7907	<name2>	<name2>
8120	8121	<>	<name>
8120	7911	<aphaerese>	<aphaerese>
8120	8120	<>	<aphaerese>
8120	8120	<>	<elision3>
8120	8120	<>	<elision2>
8120	8120	<>	<elision1>
8120	7915	.	υ
8120	7918	s	υ
8120	7915	.	u
8120	7918	s	u
8120	7921	.	κ
8120	7939	s	κ
8120	7674	s	k
8120	7964	s	U
8120	7692	s	K
8120	7915	.	α
8120	7989	s	α
8120	7915	.	a
8120	7989	s	a
8120	7992	s	A
8120	7995	s	λ
8120	7705	s	l
8120	7708	s	L
8120	6868	<1s>	<>
8121	7910	.	.
8121	7913	 	 
8121	7910	<~>	<~>
8121	7910	<split-s>	<split-s>
8121	7910	<split-h>	<split-h>
8121	7910	<name2>	<name2>
8121	8019	<aphaerese>	<aphaerese>
8121	8122	<>	<aphaerese>
8121	8122	<>	<elision3>
8121	8122	<>	<elision2>
8121	8122	<>	<elision1>
8121	7917	.	υ
8121	7920	s	υ
8121	7917	.	u
8121	7920	s	u
8121	7923	.	κ
8121	7941	s	κ
8121	7676	s	k
8121	7966	s	U
8121	7695	s	K
8121	7917	.	α
8121	7991	s	α
8121	7917	.	a
8121	7991	s	a
8121	7994	s	A
8121	7997	s	λ
8121	7707	s	l
8121	7710	s	L
8121	6869	<1s>	<>
8122	7907	.	.
8122	7908	 	 
8122	7907	<~>	<~>
8122	7907	<split-s>	<split-s>
8122	7907	<split-h>	<split-h>
8122	7907	<name2>	<name2>
8122	7911	<aphaerese>	<aphaerese>
8122	8120	<>	<aphaerese>
8122	8120	<>	<elision3>
8122	8120	<>	<elision2>
8122	8120	<>	<elision1>
8122	7915	.	υ
8122	7918	s	υ
8122	7915	.	u
8122	7918	s	u
8122	7921	.	κ
8122	7939	s	κ
8122	7674	s	k
8122	7964	s	U
8122	7692	s	K
8122	7915	.	α
8122	7989	s	α
8122	7915	.	a
8122	7989	s	a
8122	7992	s	A
8122	7995	s	λ
8122	7705	s	l
8122	7708	s	L
8122	6867	<1s>	<>
8123	7741	.	.
8123	7742	 	 
8123	7741	<~>	<~>
8123	7741	<split-s>	<split-s>
8123	7741	<split-h>	<split-h>
8123	7741	<name2>	<name2>
8123	8118	<>	<name>
8123	7745	<aphaerese>	<aphaerese>
8123	8117	<>	<aphaerese>
8123	8117	<>	<elision3>
8123	8117	<>	<elision2>
8123	8117	<>	<elision1>
8123	7749	.	υ
8123	7752	s	υ
8123	7749	.	u
8123	7752	s	u
8123	7755	.	κ
8123	7773	s	κ
8123	7490	s	k
8123	7749	.	α
8123	7843	s	α
8123	7749	.	a
8123	7843	s	a
8123	7849	s	λ
8123	7538	s	l
8124	7907	.	.
8124	7908	 	 
8124	7907	<~>	<~>
8124	7907	<split-s>	<split-s>
8124	7907	<split-h>	<split-h>
8124	7907	<name2>	<name2>
8124	8121	<>	<name>
8124	7911	<aphaerese>	<aphaerese>
8124	8120	<>	<aphaerese>
8124	8120	<>	<elision3>
8124	8120	<>	<elision2>
8124	8120	<>	<elision1>
8124	7915	.	υ
8124	7918	s	υ
8124	7915	.	u
8124	7918	s	u
8124	7921	.	κ
8124	7939	s	κ
8124	7674	s	k
8124	7915	.	α
8124	7989	s	α
8124	7915	.	a
8124	7989	s	a
8124	7995	s	λ
8124	7705	s	l
8124	8125	<1s>	<>
8125	143	.	.
8125	144	 	 
8125	143	<~>	<~>
8125	143	<split-s>	<split-s>
8125	143	<split-h>	<split-h>
8125	143	<name2>	<name2>
8125	6869	<>	<name>
8125	147	<aphaerese>	<aphaerese>
8125	6868	<>	<aphaerese>
8125	6868	<>	<elision3>
8125	6868	<>	<elision2>
8125	6868	<>	<elision1>
8125	6469	.	υ
8125	6469	.	u
8125	150	.	κ
8125	6469	.	α
8125	6469	.	a
8125	8126	<K>	<>
8126	6519	.	.
8126	6519	<~>	<~>
8126	6519	<split-s>	<split-s>
8126	6519	<split-h>	<split-h>
8126	6519	<name2>	<name2>
8126	6870	<>	<name>
8126	6522	<aphaerese>	<aphaerese>
8126	6872	<>	<aphaerese>
8126	6872	<>	<elision3>
8126	6872	<>	<elision2>
8126	6872	<>	<elision1>
8126	6518	.	υ
8126	6518	.	u
8126	6525	.	κ
8126	6518	.	α
8126	6518	.	a
8127	8128	<>	<name>
8127	8130	<>	<aphaerese>
8127	8130	<>	<elision3>
8127	8130	<>	<elision2>
8127	8130	<>	<elision1>
8127	8123	<u2K>	<>
8127	8124	<u2L>	<>
8128	8129	<>	<aphaerese>
8128	8129	<>	<elision3>
8128	8129	<>	<elision2>
8128	8129	<>	<elision1>
8128	8118	<u2K>	<>
8128	8121	<u2L>	<>
8129	8130	<>	<aphaerese>
8129	8130	<>	<elision3>
8129	8130	<>	<elision2>
8129	8130	<>	<elision1>
8129	8119	<u2K>	<>
8129	8122	<u2L>	<>
8130	8128	<>	<name>
8130	8130	<>	<aphaerese>
8130	8130	<>	<elision3>
8130	8130	<>	<elision2>
8130	8130	<>	<elision1>
8130	8117	<u2K>	<>
8130	8120	<u2L>	<>
8131	7737	<>	<name>
8131	7739	<>	<aphaerese>
8131	7739	<>	<elision3>
8131	7739	<>	<elision2>
8131	7739	<>	<elision1>
8131	8132	<kappa2K>	<>
8131	8133	<kappa2L>	<>
8131	8058	<lambda2L>	<>
8132	7741	.	.
8132	7742	 	 
8132	7741	<~>	<~>
8132	7741	<split-s>	<split-s>
8132	7741	<split-h>	<split-h>
8132	7741	<name2>	<name2>
8132	7876	<>	<name>
8132	7745	<aphaerese>	<aphaerese>
8132	7740	<>	<aphaerese>
8132	7878	<elision3>	<elision3>
8132	7740	<>	<elision3>
8132	7878	<elision2>	<elision2>
8132	7740	<>	<elision2>
8132	7878	<elision1>	<elision1>
8132	7740	<>	<elision1>
8132	7749	.	υ
8132	7752	s	υ
8132	7749	.	u
8132	7752	s	u
8132	127	s	κ
8132	7490	s	k
8132	7749	.	α
8132	7843	s	α
8132	7749	.	a
8132	7843	s	a
8132	127	s	λ
8132	7538	s	l
8133	7907	.	.
8133	7908	 	 
8133	7907	<~>	<~>
8133	7907	<split-s>	<split-s>
8133	7907	<split-h>	<split-h>
8133	7907	<name2>	<name2>
8133	8022	<>	<name>
8133	7911	<aphaerese>	<aphaerese>
8133	7906	<>	<aphaerese>
8133	8024	<elision3>	<elision3>
8133	7906	<>	<elision3>
8133	8024	<elision2>	<elision2>
8133	7906	<>	<elision2>
8133	8024	<elision1>	<elision1>
8133	7906	<>	<elision1>
8133	7915	.	υ
8133	7918	s	υ
8133	7915	.	u
8133	7918	s	u
8133	7549	s	κ
8133	7674	s	k
8133	7915	.	α
8133	7989	s	α
8133	7915	.	a
8133	7989	s	a
8133	7549	s	λ
8133	7705	s	l
8133	8062	<1s>	<>
8134	8065	<>	<name>
8134	8067	<>	<aphaerese>
8134	8067	<>	<elision3>
8134	8067	<>	<elision2>
8134	8067	<>	<elision1>
8134	8135	<k2K>	<>
8134	8136	<k2L>	<>
8134	8058	<l2L>	<>
8135	7741	.	.
8135	7742	 	 
8135	7741	<~>	<~>
8135	7741	<split-s>	<split-s>
8135	7741	<split-h>	<split-h>
8135	7741	<name2>	<name2>
8135	8069	<>	<name>
8135	7745	<aphaerese>	<aphaerese>
8135	8068	<>	<aphaerese>
8135	7741	<elision3>	<elision3>
8135	8068	<>	<elision3>
8135	7741	<elision2>	<elision2>
8135	8068	<>	<elision2>
8135	7741	<elision1>	<elision1>
8135	8068	<>	<elision1>
8135	7749	.	υ
8135	7752	s	υ
8135	7749	.	u
8135	7752	s	u
8135	127	s	κ
8135	7490	s	k
8135	7749	.	α
8135	7843	s	α
8135	7749	.	a
8135	7843	s	a
8135	127	s	λ
8135	7538	s	l
8136	7907	.	.
8136	7908	 	 
8136	7907	<~>	<~>
8136	7907	<split-s>	<split-s>
8136	7907	<split-h>	<split-h>
8136	7907	<name2>	<name2>
8136	8072	<>	<name>
8136	7911	<aphaerese>	<aphaerese>
8136	8071	<>	<aphaerese>
8136	7907	<elision3>	<elision3>
8136	8071	<>	<elision3>
8136	7907	<elision2>	<elision2>
8136	8071	<>	<elision2>
8136	7907	<elision1>	<elision1>
8136	8071	<>	<elision1>
8136	7915	.	υ
8136	7918	s	υ
8136	7915	.	u
8136	7918	s	u
8136	7549	s	κ
8136	7674	s	k
8136	7915	.	α
8136	7989	s	α
8136	7915	.	a
8136	7989	s	a
8136	7549	s	λ
8136	7705	s	l
8136	8075	<1s>	<>
8137	8138	<>	<name>
8137	8140	<>	<aphaerese>
8137	8140	<>	<elision3>
8137	8140	<>	<elision2>
8137	8140	<>	<elision1>
8137	8141	<alpha2L>	<>
8138	8139	<>	<aphaerese>
8138	8139	<>	<elision3>
8138	8139	<>	<elision2>
8138	8139	<>	<elision1>
8138	8121	<alpha2L>	<>
8139	8140	<>	<aphaerese>
8139	8140	<>	<elision3>
8139	8140	<>	<elision2>
8139	8140	<>	<elision1>
8139	8122	<alpha2L>	<>
8140	8138	<>	<name>
8140	8140	<>	<aphaerese>
8140	8140	<>	<elision3>
8140	8140	<>	<elision2>
8140	8140	<>	<elision1>
8140	8120	<alpha2L>	<>
8141	7907	.	.
8141	7908	 	 
8141	7907	<~>	<~>
8141	7907	<split-s>	<split-s>
8141	7907	<split-h>	<split-h>
8141	7907	<name2>	<name2>
8141	8121	<>	<name>
8141	7911	<aphaerese>	<aphaerese>
8141	8120	<>	<aphaerese>
8141	8120	<>	<elision3>
8141	8120	<>	<elision2>
8141	8120	<>	<elision1>
8141	7915	.	υ
8141	7918	s	υ
8141	7915	.	u
8141	7918	s	u
8141	7921	.	κ
8141	7939	s	κ
8141	7674	s	k
8141	7915	.	α
8141	7989	s	α
8141	7915	.	a
8141	7989	s	a
8141	7995	s	λ
8141	7705	s	l
8141	6868	<1s>	<>
8142	8143	<>	<name>
8142	8145	<>	<aphaerese>
8142	8145	<>	<elision3>
8142	8145	<>	<elision2>
8142	8145	<>	<elision1>
8142	8141	<a2L>	<>
8143	8144	<>	<aphaerese>
8143	8144	<>	<elision3>
8143	8144	<>	<elision2>
8143	8144	<>	<elision1>
8143	8121	<a2L>	<>
8144	8145	<>	<aphaerese>
8144	8145	<>	<elision3>
8144	8145	<>	<elision2>
8144	8145	<>	<elision1>
8144	8122	<a2L>	<>
8145	8143	<>	<name>
8145	8145	<>	<aphaerese>
8145	8145	<>	<elision3>
8145	8145	<>	<elision2>
8145	8145	<>	<elision1>
8145	8120	<a2L>	<>
8146	8092	<>	<name>
8146	8091	<>	<aphaerese>
8146	8091	<>	<elision3>
8146	8091	<>	<elision2>
8146	8091	<>	<elision1>
8146	8147	<lambda2L>	<>
8147	7907	.	.
8147	7908	 	 
8147	7907	<~>	<~>
8147	7907	<split-s>	<split-s>
8147	7907	<split-h>	<split-h>
8147	7907	<name2>	<name2>
8147	8096	<>	<name>
8147	7911	<aphaerese>	<aphaerese>
8147	8095	<>	<aphaerese>
8147	7907	<elision3>	<elision3>
8147	8095	<>	<elision3>
8147	7907	<elision2>	<elision2>
8147	8095	<>	<elision2>
8147	7907	<elision1>	<elision1>
8147	8095	<>	<elision1>
8147	7915	.	υ
8147	7918	s	υ
8147	7915	.	u
8147	7918	s	u
8147	7915	.	κ
8147	7549	s	κ
8147	7674	s	k
8147	7915	.	α
8147	7989	s	α
8147	7915	.	a
8147	7989	s	a
8147	7915	.	λ
8147	7549	s	λ
8147	7705	s	l
8147	7060	<1s>	<>
8148	8098	<>	<name>
8148	8097	<>	<aphaerese>
8148	8097	<>	<elision3>
8148	8097	<>	<elision2>
8148	8097	<>	<elision1>
8148	8147	<l2L>	<>
8149	8116	<>	<aphaerese>
8149	8116	<>	<elision3>
8149	8116	<>	<elision2>
8149	8116	<>	<elision1>
8149	8119	<ypsilon2K>	<>
8149	8150	<ypsilon2L>	<>
8150	7907	.	.
8150	7908	 	 
8150	7907	<~>	<~>
8150	7907	<split-s>	<split-s>
8150	7907	<split-h>	<split-h>
8150	7907	<name2>	<name2>
8150	7911	<aphaerese>	<aphaerese>
8150	8120	<>	<aphaerese>
8150	8120	<>	<elision3>
8150	8120	<>	<elision2>
8150	8120	<>	<elision1>
8150	7915	.	υ
8150	7918	s	υ
8150	7915	.	u
8150	7918	s	u
8150	7921	.	κ
8150	7939	s	κ
8150	7674	s	k
8150	7964	s	U
8150	7692	s	K
8150	7915	.	α
8150	7989	s	α
8150	7915	.	a
8150	7989	s	a
8150	7992	s	A
8150	7995	s	λ
8150	7705	s	l
8150	7708	s	L
8150	8151	<1s>	<>
8151	143	.	.
8151	144	 	 
8151	143	<~>	<~>
8151	143	<split-s>	<split-s>
8151	143	<split-h>	<split-h>
8151	143	<name2>	<name2>
8151	147	<aphaerese>	<aphaerese>
8151	6868	<>	<aphaerese>
8151	6868	<>	<elision3>
8151	6868	<>	<elision2>
8151	6868	<>	<elision1>
8151	6469	.	υ
8151	6469	.	u
8151	150	.	κ
8151	6469	.	α
8151	6469	.	a
8151	8152	<K>	<>
8152	6519	.	.
8152	6519	<~>	<~>
8152	6519	<split-s>	<split-s>
8152	6519	<split-h>	<split-h>
8152	6519	<name2>	<name2>
8152	6522	<aphaerese>	<aphaerese>
8152	6872	<>	<aphaerese>
8152	6872	<>	<elision3>
8152	6872	<>	<elision2>
8152	6872	<>	<elision1>
8152	6518	.	υ
8152	6518	.	u
8152	6525	.	κ
8152	6518	.	α
8152	6518	.	a
8153	8130	<>	<aphaerese>
8153	8130	<>	<elision3>
8153	8130	<>	<elision2>
8153	8130	<>	<elision1>
8153	8119	<u2K>	<>
8153	8150	<u2L>	<>
8154	8114	<>	<name>
8154	8116	<>	<aphaerese>
8154	8116	<>	<elision3>
8154	8116	<>	<elision2>
8154	8116	<>	<elision1>
8154	8117	<ypsilon2K>	<>
8154	8155	<ypsilon2L>	<>
8155	7907	.	.
8155	7908	 	 
8155	7907	<~>	<~>
8155	7907	<split-s>	<split-s>
8155	7907	<split-h>	<split-h>
8155	7907	<name2>	<name2>
8155	8121	<>	<name>
8155	7911	<aphaerese>	<aphaerese>
8155	8120	<>	<aphaerese>
8155	8120	<>	<elision3>
8155	8120	<>	<elision2>
8155	8120	<>	<elision1>
8155	7915	.	υ
8155	7918	s	υ
8155	7915	.	u
8155	7918	s	u
8155	7921	.	κ
8155	7939	s	κ
8155	7674	s	k
8155	7964	s	U
8155	7692	s	K
8155	7915	.	α
8155	7989	s	α
8155	7915	.	a
8155	7989	s	a
8155	7992	s	A
8155	7995	s	λ
8155	7705	s	l
8155	7708	s	L
8155	8125	<1s>	<>
8156	8128	<>	<name>
8156	8130	<>	<aphaerese>
8156	8130	<>	<elision3>
8156	8130	<>	<elision2>
8156	8130	<>	<elision1>
8156	8117	<u2K>	<>
8156	8155	<u2L>	<>
8157	8158	<>	<aphaerese>
8157	8162	<elision3>	<elision3>
8157	8158	<>	<elision3>
8157	8162	<elision2>	<elision2>
8157	8158	<>	<elision2>
8157	8162	<elision1>	<elision1>
8157	8158	<>	<elision1>
8158	8159	<>	<aphaerese>
8158	8160	<elision3>	<elision3>
8158	8159	<>	<elision3>
8158	8160	<elision2>	<elision2>
8158	8159	<>	<elision2>
8158	8160	<elision1>	<elision1>
8158	8159	<>	<elision1>
8159	8157	<>	<name>
8159	8159	<>	<aphaerese>
8159	8160	<elision3>	<elision3>
8159	8159	<>	<elision3>
8159	8160	<elision2>	<elision2>
8159	8159	<>	<elision2>
8159	8160	<elision1>	<elision1>
8159	8159	<>	<elision1>
8160	8160	.	.
8160	8160	<~>	<~>
8160	8160	<split-s>	<split-s>
8160	8160	<split-h>	<split-h>
8160	8160	<name2>	<name2>
8160	8161	<>	<name>
8160	8163	<aphaerese>	<aphaerese>
8160	8160	<>	<aphaerese>
8160	8160	<elision3>	<elision3>
8160	8160	<>	<elision3>
8160	8160	<elision2>	<elision2>
8160	8160	<>	<elision2>
8160	8160	<elision1>	<elision1>
8160	8160	<>	<elision1>
8160	8159	.	υ
8160	8302	H	υ
8160	8159	.	u
8160	8311	H	u
8160	8166	.	κ
8160	8217	H	κ
8160	8271	H	k
8160	8280	H	U
8160	8283	H	K
8160	8159	.	α
8160	8314	H	α
8160	8159	.	a
8160	8317	H	a
8160	8251	H	A
8160	8292	H	λ
8160	8298	H	l
8160	8301	H	L
8161	8162	.	.
8161	8162	<~>	<~>
8161	8162	<split-s>	<split-s>
8161	8162	<split-h>	<split-h>
8161	8162	<name2>	<name2>
8161	8165	<aphaerese>	<aphaerese>
8161	8162	<>	<aphaerese>
8161	8162	<elision3>	<elision3>
8161	8162	<>	<elision3>
8161	8162	<elision2>	<elision2>
8161	8162	<>	<elision2>
8161	8162	<elision1>	<elision1>
8161	8162	<>	<elision1>
8161	8158	.	υ
8161	8304	H	υ
8161	8158	.	u
8161	8313	H	u
8161	8168	.	κ
8161	8219	H	κ
8161	8273	H	k
8161	8282	H	U
8161	8286	H	K
8161	8158	.	α
8161	8316	H	α
8161	8158	.	a
8161	8319	H	a
8161	8253	H	A
8161	8294	H	λ
8161	8300	H	l
8161	8295	H	L
8162	8160	.	.
8162	8160	<~>	<~>
8162	8160	<split-s>	<split-s>
8162	8160	<split-h>	<split-h>
8162	8160	<name2>	<name2>
8162	8163	<aphaerese>	<aphaerese>
8162	8160	<>	<aphaerese>
8162	8160	<elision3>	<elision3>
8162	8160	<>	<elision3>
8162	8160	<elision2>	<elision2>
8162	8160	<>	<elision2>
8162	8160	<elision1>	<elision1>
8162	8160	<>	<elision1>
8162	8159	.	υ
8162	8302	H	υ
8162	8159	.	u
8162	8311	H	u
8162	8166	.	κ
8162	8217	H	κ
8162	8271	H	k
8162	8280	H	U
8162	8283	H	K
8162	8159	.	α
8162	8314	H	α
8162	8159	.	a
8162	8317	H	a
8162	8251	H	A
8162	8292	H	λ
8162	8298	H	l
8162	8301	H	L
8163	8160	.	.
8163	8160	<~>	<~>
8163	8160	<split-s>	<split-s>
8163	8160	<split-h>	<split-h>
8163	8160	<name2>	<name2>
8163	8164	<>	<name>
8163	8163	<aphaerese>	<aphaerese>
8163	8163	<>	<aphaerese>
8163	8160	<elision3>	<elision3>
8163	8163	<>	<elision3>
8163	8160	<elision2>	<elision2>
8163	8163	<>	<elision2>
8163	8160	<elision1>	<elision1>
8163	8163	<>	<elision1>
8163	8160	.	υ
8163	8160	.	u
8163	8166	.	κ
8163	8217	H	κ
8163	8271	H	k
8163	8280	H	U
8163	8283	H	K
8163	8160	.	α
8163	8160	.	a
8163	8251	H	A
8163	8292	H	λ
8163	8298	H	l
8163	8301	H	L
8164	8162	.	.
8164	8162	<~>	<~>
8164	8162	<split-s>	<split-s>
8164	8162	<split-h>	<split-h>
8164	8162	<name2>	<name2>
8164	8165	<aphaerese>	<aphaerese>
8164	8165	<>	<aphaerese>
8164	8162	<elision3>	<elision3>
8164	8165	<>	<elision3>
8164	8162	<elision2>	<elision2>
8164	8165	<>	<elision2>
8164	8162	<elision1>	<elision1>
8164	8165	<>	<elision1>
8164	8162	.	υ
8164	8162	.	u
8164	8168	.	κ
8164	8219	H	κ
8164	8273	H	k
8164	8282	H	U
8164	8286	H	K
8164	8162	.	α
8164	8162	.	a
8164	8253	H	A
8164	8294	H	λ
8164	8300	H	l
8164	8295	H	L
8165	8160	.	.
8165	8160	<~>	<~>
8165	8160	<split-s>	<split-s>
8165	8160	<split-h>	<split-h>
8165	8160	<name2>	<name2>
8165	8163	<aphaerese>	<aphaerese>
8165	8163	<>	<aphaerese>
8165	8160	<elision3>	<elision3>
8165	8163	<>	<elision3>
8165	8160	<elision2>	<elision2>
8165	8163	<>	<elision2>
8165	8160	<elision1>	<elision1>
8165	8163	<>	<elision1>
8165	8160	.	υ
8165	8160	.	u
8165	8166	.	κ
8165	8217	H	κ
8165	8271	H	k
8165	8280	H	U
8165	8283	H	K
8165	8160	.	α
8165	8160	.	a
8165	8251	H	A
8165	8292	H	λ
8165	8298	H	l
8165	8301	H	L
8166	8167	<>	<name>
8166	8166	<>	<aphaerese>
8166	8169	<elision3>	<elision3>
8166	8166	<>	<elision3>
8166	8169	<elision2>	<elision2>
8166	8166	<>	<elision2>
8166	8169	<elision1>	<elision1>
8166	8166	<>	<elision1>
8167	8168	<>	<aphaerese>
8167	8171	<elision3>	<elision3>
8167	8168	<>	<elision3>
8167	8171	<elision2>	<elision2>
8167	8168	<>	<elision2>
8167	8171	<elision1>	<elision1>
8167	8168	<>	<elision1>
8168	8166	<>	<aphaerese>
8168	8169	<elision3>	<elision3>
8168	8166	<>	<elision3>
8168	8169	<elision2>	<elision2>
8168	8166	<>	<elision2>
8168	8169	<elision1>	<elision1>
8168	8166	<>	<elision1>
8169	8170	<>	<name>
8169	8169	<>	<aphaerese>
8169	8169	<>	<elision3>
8169	8169	<>	<elision2>
8169	8169	<>	<elision1>
8169	8172	H	κ
8169	8205	H	k
8169	8208	H	K
8169	8211	H	λ
8169	8214	H	l
8169	8197	H	L
8170	8171	<>	<aphaerese>
8170	8171	<>	<elision3>
8170	8171	<>	<elision2>
8170	8171	<>	<elision1>
8170	8174	H	κ
8170	8207	H	k
8170	8210	H	K
8170	8213	H	λ
8170	8216	H	l
8170	8196	H	L
8171	8169	<>	<aphaerese>
8171	8169	<>	<elision3>
8171	8169	<>	<elision2>
8171	8169	<>	<elision1>
8171	8172	H	κ
8171	8205	H	k
8171	8208	H	K
8171	8211	H	λ
8171	8214	H	l
8171	8197	H	L
8172	8173	<>	<name>
8172	8172	<>	<aphaerese>
8172	8172	<>	<elision3>
8172	8172	<>	<elision2>
8172	8172	<>	<elision1>
8172	8176	<kappa2K>	<>
8172	8197	<kappa2L>	<>
8173	8174	<>	<aphaerese>
8173	8174	<>	<elision3>
8173	8174	<>	<elision2>
8173	8174	<>	<elision1>
8173	8177	<kappa2K>	<>
8173	8198	<kappa2L>	<>
8174	8172	<>	<aphaerese>
8174	8172	<>	<elision3>
8174	8172	<>	<elision2>
8174	8172	<>	<elision1>
8174	8175	<kappa2K>	<>
8174	8196	<kappa2L>	<>
8175	8176	<>	<aphaerese>
8175	8176	<>	<elision3>
8175	8176	<>	<elision2>
8175	8176	<>	<elision1>
8175	8179	s	κ
8175	8179	s	k
8175	8188	s	K
8175	8179	s	λ
8175	8179	s	l
8175	8194	s	L
8176	8177	<>	<name>
8176	8176	<>	<aphaerese>
8176	8176	<>	<elision3>
8176	8176	<>	<elision2>
8176	8176	<>	<elision1>
8176	8179	s	κ
8176	8179	s	k
8176	8188	s	K
8176	8179	s	λ
8176	8179	s	l
8176	8194	s	L
8177	8175	<>	<aphaerese>
8177	8175	<>	<elision3>
8177	8175	<>	<elision2>
8177	8175	<>	<elision1>
8177	8178	s	κ
8177	8178	s	k
8177	8187	s	K
8177	8178	s	λ
8177	8178	s	l
8177	8193	s	L
8178	8179	<>	<aphaerese>
8178	8179	<>	<elision3>
8178	8179	<>	<elision2>
8178	8179	<>	<elision1>
8178	8182	H	κ
8178	8182	H	k
8178	8182	H	K
8178	8182	H	λ
8178	8182	H	l
8178	8182	H	L
8178	8185	<2m>	<>
8179	8180	<>	<name>
8179	8179	<>	<aphaerese>
8179	8179	<>	<elision3>
8179	8179	<>	<elision2>
8179	8179	<>	<elision1>
8179	8182	H	κ
8179	8182	H	k
8179	8182	H	K
8179	8182	H	λ
8179	8182	H	l
8179	8182	H	L
8179	8186	<2m>	<>
8180	8178	<>	<aphaerese>
8180	8178	<>	<elision3>
8180	8178	<>	<elision2>
8180	8178	<>	<elision1>
8180	8181	H	κ
8180	8181	H	k
8180	8181	H	K
8180	8181	H	λ
8180	8181	H	l
8180	8181	H	L
8180	8184	<2m>	<>
8181	8182	<>	<aphaerese>
8181	8182	<>	<elision3>
8181	8182	<>	<elision2>
8181	8182	<>	<elision1>
8181	6544	<3k>	<>
8182	8183	<>	<name>
8182	8182	<>	<aphaerese>
8182	8182	<>	<elision3>
8182	8182	<>	<elision2>
8182	8182	<>	<elision1>
8182	6545	<3k>	<>
8183	8181	<>	<aphaerese>
8183	8181	<>	<elision3>
8183	8181	<>	<elision2>
8183	8181	<>	<elision1>
8183	6543	<3k>	<>
8184	8185	<>	<aphaerese>
8184	8185	<>	<elision3>
8184	8185	<>	<elision2>
8184	8185	<>	<elision1>
8184	314	<3h>	<>
8185	8186	<>	<aphaerese>
8185	8186	<>	<elision3>
8185	8186	<>	<elision2>
8185	8186	<>	<elision1>
8185	315	<3h>	<>
8186	8184	<>	<name>
8186	8186	<>	<aphaerese>
8186	8186	<>	<elision3>
8186	8186	<>	<elision2>
8186	8186	<>	<elision1>
8186	313	<3h>	<>
8187	8188	<>	<aphaerese>
8187	8188	<>	<elision3>
8187	8188	<>	<elision2>
8187	8188	<>	<elision1>
8187	8191	<K2kl>	<>
8188	8189	<>	<name>
8188	8188	<>	<aphaerese>
8188	8188	<>	<elision3>
8188	8188	<>	<elision2>
8188	8188	<>	<elision1>
8188	8192	<K2kl>	<>
8189	8187	<>	<aphaerese>
8189	8187	<>	<elision3>
8189	8187	<>	<elision2>
8189	8187	<>	<elision1>
8189	8190	<K2kl>	<>
8190	8191	<>	<aphaerese>
8190	8191	<>	<elision3>
8190	8191	<>	<elision2>
8190	8191	<>	<elision1>
8190	8181	H	κ
8190	8181	H	k
8190	8181	H	K
8190	8181	H	λ
8190	8181	H	l
8190	8181	H	L
8191	8192	<>	<aphaerese>
8191	8192	<>	<elision3>
8191	8192	<>	<elision2>
8191	8192	<>	<elision1>
8191	8182	H	κ
8191	8182	H	k
8191	8182	H	K
8191	8182	H	λ
8191	8182	H	l
8191	8182	H	L
8192	8190	<>	<name>
8192	8192	<>	<aphaerese>
8192	8192	<>	<elision3>
8192	8192	<>	<elision2>
8192	8192	<>	<elision1>
8192	8182	H	κ
8192	8182	H	k
8192	8182	H	K
8192	8182	H	λ
8192	8182	H	l
8192	8182	H	L
8193	8194	<>	<aphaerese>
8193	8194	<>	<elision3>
8193	8194	<>	<elision2>
8193	8194	<>	<elision1>
8193	8191	<L2kl>	<>
8194	8195	<>	<name>
8194	8194	<>	<aphaerese>
8194	8194	<>	<elision3>
8194	8194	<>	<elision2>
8194	8194	<>	<elision1>
8194	8192	<L2kl>	<>
8195	8193	<>	<aphaerese>
8195	8193	<>	<elision3>
8195	8193	<>	<elision2>
8195	8193	<>	<elision1>
8195	8190	<L2kl>	<>
8196	8197	<>	<aphaerese>
8196	8197	<>	<elision3>
8196	8197	<>	<elision2>
8196	8197	<>	<elision1>
8196	8200	s	κ
8196	8203	H	κ
8196	8200	s	k
8196	8203	H	k
8196	8188	s	K
8196	8203	H	K
8196	8200	s	λ
8196	8203	H	λ
8196	8200	s	l
8196	8203	H	l
8196	8194	s	L
8196	8203	H	L
8197	8198	<>	<name>
8197	8197	<>	<aphaerese>
8197	8197	<>	<elision3>
8197	8197	<>	<elision2>
8197	8197	<>	<elision1>
8197	8200	s	κ
8197	8203	H	κ
8197	8200	s	k
8197	8203	H	k
8197	8188	s	K
8197	8203	H	K
8197	8200	s	λ
8197	8203	H	λ
8197	8200	s	l
8197	8203	H	l
8197	8194	s	L
8197	8203	H	L
8198	8196	<>	<aphaerese>
8198	8196	<>	<elision3>
8198	8196	<>	<elision2>
8198	8196	<>	<elision1>
8198	8199	s	κ
8198	8202	H	κ
8198	8199	s	k
8198	8202	H	k
8198	8187	s	K
8198	8202	H	K
8198	8199	s	λ
8198	8202	H	λ
8198	8199	s	l
8198	8202	H	l
8198	8193	s	L
8198	8202	H	L
8199	8200	<>	<aphaerese>
8199	8200	<>	<elision3>
8199	8200	<>	<elision2>
8199	8200	<>	<elision1>
8199	8182	H	κ
8199	8182	H	k
8199	8182	H	K
8199	8182	H	λ
8199	8182	H	l
8199	8182	H	L
8199	8185	<w>	<>
8200	8201	<>	<name>
8200	8200	<>	<aphaerese>
8200	8200	<>	<elision3>
8200	8200	<>	<elision2>
8200	8200	<>	<elision1>
8200	8182	H	κ
8200	8182	H	k
8200	8182	H	K
8200	8182	H	λ
8200	8182	H	l
8200	8182	H	L
8200	8186	<w>	<>
8201	8199	<>	<aphaerese>
8201	8199	<>	<elision3>
8201	8199	<>	<elision2>
8201	8199	<>	<elision1>
8201	8181	H	κ
8201	8181	H	k
8201	8181	H	K
8201	8181	H	λ
8201	8181	H	l
8201	8181	H	L
8201	8184	<w>	<>
8202	8203	<>	<aphaerese>
8202	8203	<>	<elision3>
8202	8203	<>	<elision2>
8202	8203	<>	<elision1>
8202	6544	<2k>	<>
8203	8204	<>	<name>
8203	8203	<>	<aphaerese>
8203	8203	<>	<elision3>
8203	8203	<>	<elision2>
8203	8203	<>	<elision1>
8203	6545	<2k>	<>
8204	8202	<>	<aphaerese>
8204	8202	<>	<elision3>
8204	8202	<>	<elision2>
8204	8202	<>	<elision1>
8204	6543	<2k>	<>
8205	8206	<>	<name>
8205	8205	<>	<aphaerese>
8205	8205	<>	<elision3>
8205	8205	<>	<elision2>
8205	8205	<>	<elision1>
8205	8176	<k2K>	<>
8205	8197	<k2L>	<>
8206	8207	<>	<aphaerese>
8206	8207	<>	<elision3>
8206	8207	<>	<elision2>
8206	8207	<>	<elision1>
8206	8177	<k2K>	<>
8206	8198	<k2L>	<>
8207	8205	<>	<aphaerese>
8207	8205	<>	<elision3>
8207	8205	<>	<elision2>
8207	8205	<>	<elision1>
8207	8175	<k2K>	<>
8207	8196	<k2L>	<>
8208	8209	<>	<name>
8208	8208	<>	<aphaerese>
8208	8208	<>	<elision3>
8208	8208	<>	<elision2>
8208	8208	<>	<elision1>
8208	8179	s	κ
8208	8179	s	k
8208	8188	s	K
8208	8179	s	λ
8208	8179	s	l
8208	8194	s	L
8208	8197	<K2L>	<>
8209	8210	<>	<aphaerese>
8209	8210	<>	<elision3>
8209	8210	<>	<elision2>
8209	8210	<>	<elision1>
8209	8178	s	κ
8209	8178	s	k
8209	8187	s	K
8209	8178	s	λ
8209	8178	s	l
8209	8193	s	L
8209	8198	<K2L>	<>
8210	8208	<>	<aphaerese>
8210	8208	<>	<elision3>
8210	8208	<>	<elision2>
8210	8208	<>	<elision1>
8210	8179	s	κ
8210	8179	s	k
8210	8188	s	K
8210	8179	s	λ
8210	8179	s	l
8210	8194	s	L
8210	8196	<K2L>	<>
8211	8212	<>	<name>
8211	8211	<>	<aphaerese>
8211	8211	<>	<elision3>
8211	8211	<>	<elision2>
8211	8211	<>	<elision1>
8211	8197	<lambda2L>	<>
8212	8213	<>	<aphaerese>
8212	8213	<>	<elision3>
8212	8213	<>	<elision2>
8212	8213	<>	<elision1>
8212	8198	<lambda2L>	<>
8213	8211	<>	<aphaerese>
8213	8211	<>	<elision3>
8213	8211	<>	<elision2>
8213	8211	<>	<elision1>
8213	8196	<lambda2L>	<>
8214	8215	<>	<name>
8214	8214	<>	<aphaerese>
8214	8214	<>	<elision3>
8214	8214	<>	<elision2>
8214	8214	<>	<elision1>
8214	8197	<l2L>	<>
8215	8216	<>	<aphaerese>
8215	8216	<>	<elision3>
8215	8216	<>	<elision2>
8215	8216	<>	<elision1>
8215	8198	<l2L>	<>
8216	8214	<>	<aphaerese>
8216	8214	<>	<elision3>
8216	8214	<>	<elision2>
8216	8214	<>	<elision1>
8216	8196	<l2L>	<>
8217	8218	<>	<name>
8217	8217	<>	<aphaerese>
8217	8217	<>	<elision3>
8217	8217	<>	<elision2>
8217	8217	<>	<elision1>
8217	8242	<kappa2K>	<>
8217	8260	<kappa2L>	<>
8217	8269	<lambda2L>	<>
8218	8219	<>	<aphaerese>
8218	8219	<>	<elision3>
8218	8219	<>	<elision2>
8218	8219	<>	<elision1>
8218	8243	<kappa2K>	<>
8218	8261	<kappa2L>	<>
8218	8270	<lambda2L>	<>
8219	8217	<>	<aphaerese>
8219	8217	<>	<elision3>
8219	8217	<>	<elision2>
8219	8217	<>	<elision1>
8219	8220	<kappa2K>	<>
8219	8250	<kappa2L>	<>
8219	8268	<lambda2L>	<>
8220	8221	.	.
8220	8221	<~>	<~>
8220	8221	<split-s>	<split-s>
8220	8221	<split-h>	<split-h>
8220	8221	<name2>	<name2>
8220	8224	<aphaerese>	<aphaerese>
8220	8242	<>	<aphaerese>
8220	8245	<elision3>	<elision3>
8220	8242	<>	<elision3>
8220	8245	<elision2>	<elision2>
8220	8242	<>	<elision2>
8220	8245	<elision1>	<elision1>
8220	8242	<>	<elision1>
8220	8239	.	υ
8220	8192	s	υ
8220	8239	.	u
8220	8192	s	u
8220	8179	s	κ
8220	8179	s	k
8220	8233	s	U
8220	8188	s	K
8220	8239	.	α
8220	8192	s	α
8220	8239	.	a
8220	8192	s	a
8220	8236	s	A
8220	8179	s	λ
8220	8179	s	l
8220	8194	s	L
8220	8185	<1m>	<>
8221	8221	.	.
8221	8221	<~>	<~>
8221	8221	<split-s>	<split-s>
8221	8221	<split-h>	<split-h>
8221	8221	<name2>	<name2>
8221	8222	<>	<name>
8221	8224	<aphaerese>	<aphaerese>
8221	8221	<>	<aphaerese>
8221	8221	<elision3>	<elision3>
8221	8221	<>	<elision3>
8221	8221	<elision2>	<elision2>
8221	8221	<>	<elision2>
8221	8221	<elision1>	<elision1>
8221	8221	<>	<elision1>
8221	8239	.	υ
8221	8192	s	υ
8221	8239	.	u
8221	8192	s	u
8221	8227	.	κ
8221	8179	s	κ
8221	8179	s	k
8221	8233	s	U
8221	8188	s	K
8221	8239	.	α
8221	8192	s	α
8221	8239	.	a
8221	8192	s	a
8221	8236	s	A
8221	8179	s	λ
8221	8179	s	l
8221	8194	s	L
8221	8186	<1m>	<>
8222	8223	.	.
8222	8223	<~>	<~>
8222	8223	<split-s>	<split-s>
8222	8223	<split-h>	<split-h>
8222	8223	<name2>	<name2>
8222	8226	<aphaerese>	<aphaerese>
8222	8223	<>	<aphaerese>
8222	8223	<elision3>	<elision3>
8222	8223	<>	<elision3>
8222	8223	<elision2>	<elision2>
8222	8223	<>	<elision2>
8222	8223	<elision1>	<elision1>
8222	8223	<>	<elision1>
8222	8241	.	υ
8222	8191	s	υ
8222	8241	.	u
8222	8191	s	u
8222	8229	.	κ
8222	8178	s	κ
8222	8178	s	k
8222	8235	s	U
8222	8187	s	K
8222	8241	.	α
8222	8191	s	α
8222	8241	.	a
8222	8191	s	a
8222	8238	s	A
8222	8178	s	λ
8222	8178	s	l
8222	8193	s	L
8222	8184	<1m>	<>
8223	8221	.	.
8223	8221	<~>	<~>
8223	8221	<split-s>	<split-s>
8223	8221	<split-h>	<split-h>
8223	8221	<name2>	<name2>
8223	8224	<aphaerese>	<aphaerese>
8223	8221	<>	<aphaerese>
8223	8221	<elision3>	<elision3>
8223	8221	<>	<elision3>
8223	8221	<elision2>	<elision2>
8223	8221	<>	<elision2>
8223	8221	<elision1>	<elision1>
8223	8221	<>	<elision1>
8223	8239	.	υ
8223	8192	s	υ
8223	8239	.	u
8223	8192	s	u
8223	8227	.	κ
8223	8179	s	κ
8223	8179	s	k
8223	8233	s	U
8223	8188	s	K
8223	8239	.	α
8223	8192	s	α
8223	8239	.	a
8223	8192	s	a
8223	8236	s	A
8223	8179	s	λ
8223	8179	s	l
8223	8194	s	L
8223	8185	<1m>	<>
8224	8221	.	.
8224	8221	<~>	<~>
8224	8221	<split-s>	<split-s>
8224	8221	<split-h>	<split-h>
8224	8221	<name2>	<name2>
8224	8225	<>	<name>
8224	8224	<aphaerese>	<aphaerese>
8224	8224	<>	<aphaerese>
8224	8221	<elision3>	<elision3>
8224	8224	<>	<elision3>
8224	8221	<elision2>	<elision2>
8224	8224	<>	<elision2>
8224	8221	<elision1>	<elision1>
8224	8224	<>	<elision1>
8224	8221	.	υ
8224	8221	.	u
8224	8227	.	κ
8224	8179	s	κ
8224	8179	s	k
8224	8233	s	U
8224	8188	s	K
8224	8221	.	α
8224	8221	.	a
8224	8236	s	A
8224	8179	s	λ
8224	8179	s	l
8224	8194	s	L
8224	8186	<1m>	<>
8225	8223	.	.
8225	8223	<~>	<~>
8225	8223	<split-s>	<split-s>
8225	8223	<split-h>	<split-h>
8225	8223	<name2>	<name2>
8225	8226	<aphaerese>	<aphaerese>
8225	8226	<>	<aphaerese>
8225	8223	<elision3>	<elision3>
8225	8226	<>	<elision3>
8225	8223	<elision2>	<elision2>
8225	8226	<>	<elision2>
8225	8223	<elision1>	<elision1>
8225	8226	<>	<elision1>
8225	8223	.	υ
8225	8223	.	u
8225	8229	.	κ
8225	8178	s	κ
8225	8178	s	k
8225	8235	s	U
8225	8187	s	K
8225	8223	.	α
8225	8223	.	a
8225	8238	s	A
8225	8178	s	λ
8225	8178	s	l
8225	8193	s	L
8225	8184	<1m>	<>
8226	8221	.	.
8226	8221	<~>	<~>
8226	8221	<split-s>	<split-s>
8226	8221	<split-h>	<split-h>
8226	8221	<name2>	<name2>
8226	8224	<aphaerese>	<aphaerese>
8226	8224	<>	<aphaerese>
8226	8221	<elision3>	<elision3>
8226	8224	<>	<elision3>
8226	8221	<elision2>	<elision2>
8226	8224	<>	<elision2>
8226	8221	<elision1>	<elision1>
8226	8224	<>	<elision1>
8226	8221	.	υ
8226	8221	.	u
8226	8227	.	κ
8226	8179	s	κ
8226	8179	s	k
8226	8233	s	U
8226	8188	s	K
8226	8221	.	α
8226	8221	.	a
8226	8236	s	A
8226	8179	s	λ
8226	8179	s	l
8226	8194	s	L
8226	8185	<1m>	<>
8227	8228	<>	<name>
8227	8227	<>	<aphaerese>
8227	8230	<elision3>	<elision3>
8227	8227	<>	<elision3>
8227	8230	<elision2>	<elision2>
8227	8227	<>	<elision2>
8227	8230	<elision1>	<elision1>
8227	8227	<>	<elision1>
8228	8229	<>	<aphaerese>
8228	8232	<elision3>	<elision3>
8228	8229	<>	<elision3>
8228	8232	<elision2>	<elision2>
8228	8229	<>	<elision2>
8228	8232	<elision1>	<elision1>
8228	8229	<>	<elision1>
8229	8227	<>	<aphaerese>
8229	8230	<elision3>	<elision3>
8229	8227	<>	<elision3>
8229	8230	<elision2>	<elision2>
8229	8227	<>	<elision2>
8229	8230	<elision1>	<elision1>
8229	8227	<>	<elision1>
8230	8231	<>	<name>
8230	8230	<>	<aphaerese>
8230	8230	<>	<elision3>
8230	8230	<>	<elision2>
8230	8230	<>	<elision1>
8230	8192	s	κ
8230	8192	s	k
8230	8188	s	K
8230	8192	s	λ
8230	8192	s	l
8230	8194	s	L
8231	8232	<>	<aphaerese>
8231	8232	<>	<elision3>
8231	8232	<>	<elision2>
8231	8232	<>	<elision1>
8231	8191	s	κ
8231	8191	s	k
8231	8187	s	K
8231	8191	s	λ
8231	8191	s	l
8231	8193	s	L
8232	8230	<>	<aphaerese>
8232	8230	<>	<elision3>
8232	8230	<>	<elision2>
8232	8230	<>	<elision1>
8232	8192	s	κ
8232	8192	s	k
8232	8188	s	K
8232	8192	s	λ
8232	8192	s	l
8232	8194	s	L
8233	8234	<>	<name>
8233	8233	<>	<aphaerese>
8233	8233	<>	<elision3>
8233	8233	<>	<elision2>
8233	8233	<>	<elision1>
8233	8192	<U2kl>	<>
8234	8235	<>	<aphaerese>
8234	8235	<>	<elision3>
8234	8235	<>	<elision2>
8234	8235	<>	<elision1>
8234	8190	<U2kl>	<>
8235	8233	<>	<aphaerese>
8235	8233	<>	<elision3>
8235	8233	<>	<elision2>
8235	8233	<>	<elision1>
8235	8191	<U2kl>	<>
8236	8237	<>	<name>
8236	8236	<>	<aphaerese>
8236	8236	<>	<elision3>
8236	8236	<>	<elision2>
8236	8236	<>	<elision1>
8236	8192	<A2kl>	<>
8237	8238	<>	<aphaerese>
8237	8238	<>	<elision3>
8237	8238	<>	<elision2>
8237	8238	<>	<elision1>
8237	8190	<A2kl>	<>
8238	8236	<>	<aphaerese>
8238	8236	<>	<elision3>
8238	8236	<>	<elision2>
8238	8236	<>	<elision1>
8238	8191	<A2kl>	<>
8239	8240	<>	<name>
8239	8239	<>	<aphaerese>
8239	8221	<elision3>	<elision3>
8239	8239	<>	<elision3>
8239	8221	<elision2>	<elision2>
8239	8239	<>	<elision2>
8239	8221	<elision1>	<elision1>
8239	8239	<>	<elision1>
8240	8241	<>	<aphaerese>
8240	8223	<elision3>	<elision3>
8240	8241	<>	<elision3>
8240	8223	<elision2>	<elision2>
8240	8241	<>	<elision2>
8240	8223	<elision1>	<elision1>
8240	8241	<>	<elision1>
8241	8239	<>	<aphaerese>
8241	8221	<elision3>	<elision3>
8241	8239	<>	<elision3>
8241	8221	<elision2>	<elision2>
8241	8239	<>	<elision2>
8241	8221	<elision1>	<elision1>
8241	8239	<>	<elision1>
8242	8221	.	.
8242	8221	<~>	<~>
8242	8221	<split-s>	<split-s>
8242	8221	<split-h>	<split-h>
8242	8221	<name2>	<name2>
8242	8243	<>	<name>
8242	8224	<aphaerese>	<aphaerese>
8242	8242	<>	<aphaerese>
8242	8245	<elision3>	<elision3>
8242	8242	<>	<elision3>
8242	8245	<elision2>	<elision2>
8242	8242	<>	<elision2>
8242	8245	<elision1>	<elision1>
8242	8242	<>	<elision1>
8242	8239	.	υ
8242	8192	s	υ
8242	8239	.	u
8242	8192	s	u
8242	8179	s	κ
8242	8179	s	k
8242	8233	s	U
8242	8188	s	K
8242	8239	.	α
8242	8192	s	α
8242	8239	.	a
8242	8192	s	a
8242	8236	s	A
8242	8179	s	λ
8242	8179	s	l
8242	8194	s	L
8242	8186	<1m>	<>
8243	8223	.	.
8243	8223	<~>	<~>
8243	8223	<split-s>	<split-s>
8243	8223	<split-h>	<split-h>
8243	8223	<name2>	<name2>
8243	8226	<aphaerese>	<aphaerese>
8243	8220	<>	<aphaerese>
8243	8244	<elision3>	<elision3>
8243	8220	<>	<elision3>
8243	8244	<elision2>	<elision2>
8243	8220	<>	<elision2>
8243	8244	<elision1>	<elision1>
8243	8220	<>	<elision1>
8243	8241	.	υ
8243	8191	s	υ
8243	8241	.	u
8243	8191	s	u
8243	8178	s	κ
8243	8178	s	k
8243	8235	s	U
8243	8187	s	K
8243	8241	.	α
8243	8191	s	α
8243	8241	.	a
8243	8191	s	a
8243	8238	s	A
8243	8178	s	λ
8243	8178	s	l
8243	8193	s	L
8243	8184	<1m>	<>
8244	8221	.	.
8244	8221	<~>	<~>
8244	8221	<split-s>	<split-s>
8244	8221	<split-h>	<split-h>
8244	8221	<name2>	<name2>
8244	8224	<aphaerese>	<aphaerese>
8244	8245	<>	<aphaerese>
8244	8221	<elision3>	<elision3>
8244	8245	<>	<elision3>
8244	8221	<elision2>	<elision2>
8244	8245	<>	<elision2>
8244	8221	<elision1>	<elision1>
8244	8245	<>	<elision1>
8244	8239	.	υ
8244	8192	s	υ
8244	8239	.	u
8244	8192	s	u
8244	8227	.	κ
8244	8248	s	κ
8244	8248	s	k
8244	8233	s	U
8244	8239	.	α
8244	8192	s	α
8244	8239	.	a
8244	8192	s	a
8244	8236	s	A
8244	8248	s	λ
8244	8248	s	l
8244	8185	<1m>	<>
8245	8221	.	.
8245	8221	<~>	<~>
8245	8221	<split-s>	<split-s>
8245	8221	<split-h>	<split-h>
8245	8221	<name2>	<name2>
8245	8246	<>	<name>
8245	8224	<aphaerese>	<aphaerese>
8245	8245	<>	<aphaerese>
8245	8221	<elision3>	<elision3>
8245	8245	<>	<elision3>
8245	8221	<elision2>	<elision2>
8245	8245	<>	<elision2>
8245	8221	<elision1>	<elision1>
8245	8245	<>	<elision1>
8245	8239	.	υ
8245	8192	s	υ
8245	8239	.	u
8245	8192	s	u
8245	8227	.	κ
8245	8248	s	κ
8245	8248	s	k
8245	8233	s	U
8245	8239	.	α
8245	8192	s	α
8245	8239	.	a
8245	8192	s	a
8245	8236	s	A
8245	8248	s	λ
8245	8248	s	l
8245	8186	<1m>	<>
8246	8223	.	.
8246	8223	<~>	<~>
8246	8223	<split-s>	<split-s>
8246	8223	<split-h>	<split-h>
8246	8223	<name2>	<name2>
8246	8226	<aphaerese>	<aphaerese>
8246	8244	<>	<aphaerese>
8246	8223	<elision3>	<elision3>
8246	8244	<>	<elision3>
8246	8223	<elision2>	<elision2>
8246	8244	<>	<elision2>
8246	8223	<elision1>	<elision1>
8246	8244	<>	<elision1>
8246	8241	.	υ
8246	8191	s	υ
8246	8241	.	u
8246	8191	s	u
8246	8229	.	κ
8246	8247	s	κ
8246	8247	s	k
8246	8235	s	U
8246	8241	.	α
8246	8191	s	α
8246	8241	.	a
8246	8191	s	a
8246	8238	s	A
8246	8247	s	λ
8246	8247	s	l
8246	8184	<1m>	<>
8247	8248	<>	<aphaerese>
8247	8248	<>	<elision3>
8247	8248	<>	<elision2>
8247	8248	<>	<elision1>
8247	8185	<2m>	<>
8248	8249	<>	<name>
8248	8248	<>	<aphaerese>
8248	8248	<>	<elision3>
8248	8248	<>	<elision2>
8248	8248	<>	<elision1>
8248	8186	<2m>	<>
8249	8247	<>	<aphaerese>
8249	8247	<>	<elision3>
8249	8247	<>	<elision2>
8249	8247	<>	<elision1>
8249	8184	<2m>	<>
8250	8251	.	.
8250	8251	<~>	<~>
8250	8251	<split-s>	<split-s>
8250	8251	<split-h>	<split-h>
8250	8251	<name2>	<name2>
8250	8254	<aphaerese>	<aphaerese>
8250	8260	<>	<aphaerese>
8250	8263	<elision3>	<elision3>
8250	8260	<>	<elision3>
8250	8263	<elision2>	<elision2>
8250	8260	<>	<elision2>
8250	8263	<elision1>	<elision1>
8250	8260	<>	<elision1>
8250	8257	.	υ
8250	8192	s	υ
8250	8257	.	u
8250	8192	s	u
8250	8200	s	κ
8250	8203	H	κ
8250	8200	s	k
8250	8203	H	k
8250	8233	s	U
8250	8188	s	K
8250	8203	H	K
8250	8257	.	α
8250	8192	s	α
8250	8257	.	a
8250	8192	s	a
8250	8236	s	A
8250	8200	s	λ
8250	8203	H	λ
8250	8200	s	l
8250	8203	H	l
8250	8194	s	L
8250	8203	H	L
8250	8185	<1m>	<>
8251	8251	.	.
8251	8251	<~>	<~>
8251	8251	<split-s>	<split-s>
8251	8251	<split-h>	<split-h>
8251	8251	<name2>	<name2>
8251	8252	<>	<name>
8251	8254	<aphaerese>	<aphaerese>
8251	8251	<>	<aphaerese>
8251	8251	<elision3>	<elision3>
8251	8251	<>	<elision3>
8251	8251	<elision2>	<elision2>
8251	8251	<>	<elision2>
8251	8251	<elision1>	<elision1>
8251	8251	<>	<elision1>
8251	8257	.	υ
8251	8192	s	υ
8251	8257	.	u
8251	8192	s	u
8251	8227	.	κ
8251	8200	s	κ
8251	8203	H	κ
8251	8200	s	k
8251	8203	H	k
8251	8233	s	U
8251	8188	s	K
8251	8203	H	K
8251	8257	.	α
8251	8192	s	α
8251	8257	.	a
8251	8192	s	a
8251	8236	s	A
8251	8200	s	λ
8251	8203	H	λ
8251	8200	s	l
8251	8203	H	l
8251	8194	s	L
8251	8203	H	L
8251	8186	<1m>	<>
8252	8253	.	.
8252	8253	<~>	<~>
8252	8253	<split-s>	<split-s>
8252	8253	<split-h>	<split-h>
8252	8253	<name2>	<name2>
8252	8256	<aphaerese>	<aphaerese>
8252	8253	<>	<aphaerese>
8252	8253	<elision3>	<elision3>
8252	8253	<>	<elision3>
8252	8253	<elision2>	<elision2>
8252	8253	<>	<elision2>
8252	8253	<elision1>	<elision1>
8252	8253	<>	<elision1>
8252	8259	.	υ
8252	8191	s	υ
8252	8259	.	u
8252	8191	s	u
8252	8229	.	κ
8252	8199	s	κ
8252	8202	H	κ
8252	8199	s	k
8252	8202	H	k
8252	8235	s	U
8252	8187	s	K
8252	8202	H	K
8252	8259	.	α
8252	8191	s	α
8252	8259	.	a
8252	8191	s	a
8252	8238	s	A
8252	8199	s	λ
8252	8202	H	λ
8252	8199	s	l
8252	8202	H	l
8252	8193	s	L
8252	8202	H	L
8252	8184	<1m>	<>
8253	8251	.	.
8253	8251	<~>	<~>
8253	8251	<split-s>	<split-s>
8253	8251	<split-h>	<split-h>
8253	8251	<name2>	<name2>
8253	8254	<aphaerese>	<aphaerese>
8253	8251	<>	<aphaerese>
8253	8251	<elision3>	<elision3>
8253	8251	<>	<elision3>
8253	8251	<elision2>	<elision2>
8253	8251	<>	<elision2>
8253	8251	<elision1>	<elision1>
8253	8251	<>	<elision1>
8253	8257	.	υ
8253	8192	s	υ
8253	8257	.	u
8253	8192	s	u
8253	8227	.	κ
8253	8200	s	κ
8253	8203	H	κ
8253	8200	s	k
8253	8203	H	k
8253	8233	s	U
8253	8188	s	K
8253	8203	H	K
8253	8257	.	α
8253	8192	s	α
8253	8257	.	a
8253	8192	s	a
8253	8236	s	A
8253	8200	s	λ
8253	8203	H	λ
8253	8200	s	l
8253	8203	H	l
8253	8194	s	L
8253	8203	H	L
8253	8185	<1m>	<>
8254	8251	.	.
8254	8251	<~>	<~>
8254	8251	<split-s>	<split-s>
8254	8251	<split-h>	<split-h>
8254	8251	<name2>	<name2>
8254	8255	<>	<name>
8254	8254	<aphaerese>	<aphaerese>
8254	8254	<>	<aphaerese>
8254	8251	<elision3>	<elision3>
8254	8254	<>	<elision3>
8254	8251	<elision2>	<elision2>
8254	8254	<>	<elision2>
8254	8251	<elision1>	<elision1>
8254	8254	<>	<elision1>
8254	8251	.	υ
8254	8251	.	u
8254	8227	.	κ
8254	8200	s	κ
8254	8203	H	κ
8254	8200	s	k
8254	8203	H	k
8254	8233	s	U
8254	8188	s	K
8254	8203	H	K
8254	8251	.	α
8254	8251	.	a
8254	8236	s	A
8254	8200	s	λ
8254	8203	H	λ
8254	8200	s	l
8254	8203	H	l
8254	8194	s	L
8254	8203	H	L
8254	8186	<1m>	<>
8255	8253	.	.
8255	8253	<~>	<~>
8255	8253	<split-s>	<split-s>
8255	8253	<split-h>	<split-h>
8255	8253	<name2>	<name2>
8255	8256	<aphaerese>	<aphaerese>
8255	8256	<>	<aphaerese>
8255	8253	<elision3>	<elision3>
8255	8256	<>	<elision3>
8255	8253	<elision2>	<elision2>
8255	8256	<>	<elision2>
8255	8253	<elision1>	<elision1>
8255	8256	<>	<elision1>
8255	8253	.	υ
8255	8253	.	u
8255	8229	.	κ
8255	8199	s	κ
8255	8202	H	κ
8255	8199	s	k
8255	8202	H	k
8255	8235	s	U
8255	8187	s	K
8255	8202	H	K
8255	8253	.	α
8255	8253	.	a
8255	8238	s	A
8255	8199	s	λ
8255	8202	H	λ
8255	8199	s	l
8255	8202	H	l
8255	8193	s	L
8255	8202	H	L
8255	8184	<1m>	<>
8256	8251	.	.
8256	8251	<~>	<~>
8256	8251	<split-s>	<split-s>
8256	8251	<split-h>	<split-h>
8256	8251	<name2>	<name2>
8256	8254	<aphaerese>	<aphaerese>
8256	8254	<>	<aphaerese>
8256	8251	<elision3>	<elision3>
8256	8254	<>	<elision3>
8256	8251	<elision2>	<elision2>
8256	8254	<>	<elision2>
8256	8251	<elision1>	<elision1>
8256	8254	<>	<elision1>
8256	8251	.	υ
8256	8251	.	u
8256	8227	.	κ
8256	8200	s	κ
8256	8203	H	κ
8256	8200	s	k
8256	8203	H	k
8256	8233	s	U
8256	8188	s	K
8256	8203	H	K
8256	8251	.	α
8256	8251	.	a
8256	8236	s	A
8256	8200	s	λ
8256	8203	H	λ
8256	8200	s	l
8256	8203	H	l
8256	8194	s	L
8256	8203	H	L
8256	8185	<1m>	<>
8257	8258	<>	<name>
8257	8257	<>	<aphaerese>
8257	8251	<elision3>	<elision3>
8257	8257	<>	<elision3>
8257	8251	<elision2>	<elision2>
8257	8257	<>	<elision2>
8257	8251	<elision1>	<elision1>
8257	8257	<>	<elision1>
8258	8259	<>	<aphaerese>
8258	8253	<elision3>	<elision3>
8258	8259	<>	<elision3>
8258	8253	<elision2>	<elision2>
8258	8259	<>	<elision2>
8258	8253	<elision1>	<elision1>
8258	8259	<>	<elision1>
8259	8257	<>	<aphaerese>
8259	8251	<elision3>	<elision3>
8259	8257	<>	<elision3>
8259	8251	<elision2>	<elision2>
8259	8257	<>	<elision2>
8259	8251	<elision1>	<elision1>
8259	8257	<>	<elision1>
8260	8251	.	.
8260	8251	<~>	<~>
8260	8251	<split-s>	<split-s>
8260	8251	<split-h>	<split-h>
8260	8251	<name2>	<name2>
8260	8261	<>	<name>
8260	8254	<aphaerese>	<aphaerese>
8260	8260	<>	<aphaerese>
8260	8263	<elision3>	<elision3>
8260	8260	<>	<elision3>
8260	8263	<elision2>	<elision2>
8260	8260	<>	<elision2>
8260	8263	<elision1>	<elision1>
8260	8260	<>	<elision1>
8260	8257	.	υ
8260	8192	s	υ
8260	8257	.	u
8260	8192	s	u
8260	8200	s	κ
8260	8203	H	κ
8260	8200	s	k
8260	8203	H	k
8260	8233	s	U
8260	8188	s	K
8260	8203	H	K
8260	8257	.	α
8260	8192	s	α
8260	8257	.	a
8260	8192	s	a
8260	8236	s	A
8260	8200	s	λ
8260	8203	H	λ
8260	8200	s	l
8260	8203	H	l
8260	8194	s	L
8260	8203	H	L
8260	8186	<1m>	<>
8261	8253	.	.
8261	8253	<~>	<~>
8261	8253	<split-s>	<split-s>
8261	8253	<split-h>	<split-h>
8261	8253	<name2>	<name2>
8261	8256	<aphaerese>	<aphaerese>
8261	8250	<>	<aphaerese>
8261	8262	<elision3>	<elision3>
8261	8250	<>	<elision3>
8261	8262	<elision2>	<elision2>
8261	8250	<>	<elision2>
8261	8262	<elision1>	<elision1>
8261	8250	<>	<elision1>
8261	8259	.	υ
8261	8191	s	υ
8261	8259	.	u
8261	8191	s	u
8261	8199	s	κ
8261	8202	H	κ
8261	8199	s	k
8261	8202	H	k
8261	8235	s	U
8261	8187	s	K
8261	8202	H	K
8261	8259	.	α
8261	8191	s	α
8261	8259	.	a
8261	8191	s	a
8261	8238	s	A
8261	8199	s	λ
8261	8202	H	λ
8261	8199	s	l
8261	8202	H	l
8261	8193	s	L
8261	8202	H	L
8261	8184	<1m>	<>
8262	8251	.	.
8262	8251	<~>	<~>
8262	8251	<split-s>	<split-s>
8262	8251	<split-h>	<split-h>
8262	8251	<name2>	<name2>
8262	8254	<aphaerese>	<aphaerese>
8262	8263	<>	<aphaerese>
8262	8251	<elision3>	<elision3>
8262	8263	<>	<elision3>
8262	8251	<elision2>	<elision2>
8262	8263	<>	<elision2>
8262	8251	<elision1>	<elision1>
8262	8263	<>	<elision1>
8262	8257	.	υ
8262	8192	s	υ
8262	8257	.	u
8262	8192	s	u
8262	8227	.	κ
8262	8266	s	κ
8262	8203	H	κ
8262	8266	s	k
8262	8203	H	k
8262	8233	s	U
8262	8203	H	K
8262	8257	.	α
8262	8192	s	α
8262	8257	.	a
8262	8192	s	a
8262	8236	s	A
8262	8266	s	λ
8262	8203	H	λ
8262	8266	s	l
8262	8203	H	l
8262	8203	H	L
8262	8185	<1m>	<>
8263	8251	.	.
8263	8251	<~>	<~>
8263	8251	<split-s>	<split-s>
8263	8251	<split-h>	<split-h>
8263	8251	<name2>	<name2>
8263	8264	<>	<name>
8263	8254	<aphaerese>	<aphaerese>
8263	8263	<>	<aphaerese>
8263	8251	<elision3>	<elision3>
8263	8263	<>	<elision3>
8263	8251	<elision2>	<elision2>
8263	8263	<>	<elision2>
8263	8251	<elision1>	<elision1>
8263	8263	<>	<elision1>
8263	8257	.	υ
8263	8192	s	υ
8263	8257	.	u
8263	8192	s	u
8263	8227	.	κ
8263	8266	s	κ
8263	8203	H	κ
8263	8266	s	k
8263	8203	H	k
8263	8233	s	U
8263	8203	H	K
8263	8257	.	α
8263	8192	s	α
8263	8257	.	a
8263	8192	s	a
8263	8236	s	A
8263	8266	s	λ
8263	8203	H	λ
8263	8266	s	l
8263	8203	H	l
8263	8203	H	L
8263	8186	<1m>	<>
8264	8253	.	.
8264	8253	<~>	<~>
8264	8253	<split-s>	<split-s>
8264	8253	<split-h>	<split-h>
8264	8253	<name2>	<name2>
8264	8256	<aphaerese>	<aphaerese>
8264	8262	<>	<aphaerese>
8264	8253	<elision3>	<elision3>
8264	8262	<>	<elision3>
8264	8253	<elision2>	<elision2>
8264	8262	<>	<elision2>
8264	8253	<elision1>	<elision1>
8264	8262	<>	<elision1>
8264	8259	.	υ
8264	8191	s	υ
8264	8259	.	u
8264	8191	s	u
8264	8229	.	κ
8264	8265	s	κ
8264	8202	H	κ
8264	8265	s	k
8264	8202	H	k
8264	8235	s	U
8264	8202	H	K
8264	8259	.	α
8264	8191	s	α
8264	8259	.	a
8264	8191	s	a
8264	8238	s	A
8264	8265	s	λ
8264	8202	H	λ
8264	8265	s	l
8264	8202	H	l
8264	8202	H	L
8264	8184	<1m>	<>
8265	8266	<>	<aphaerese>
8265	8266	<>	<elision3>
8265	8266	<>	<elision2>
8265	8266	<>	<elision1>
8265	8185	<w>	<>
8266	8267	<>	<name>
8266	8266	<>	<aphaerese>
8266	8266	<>	<elision3>
8266	8266	<>	<elision2>
8266	8266	<>	<elision1>
8266	8186	<w>	<>
8267	8265	<>	<aphaerese>
8267	8265	<>	<elision3>
8267	8265	<>	<elision2>
8267	8265	<>	<elision1>
8267	8184	<w>	<>
8268	8269	<>	<aphaerese>
8268	8269	<>	<elision3>
8268	8269	<>	<elision2>
8268	8269	<>	<elision1>
8268	8257	.	κ
8268	8257	.	λ
8269	8270	<>	<name>
8269	8269	<>	<aphaerese>
8269	8269	<>	<elision3>
8269	8269	<>	<elision2>
8269	8269	<>	<elision1>
8269	8257	.	κ
8269	8257	.	λ
8270	8268	<>	<aphaerese>
8270	8268	<>	<elision3>
8270	8268	<>	<elision2>
8270	8268	<>	<elision1>
8270	8259	.	κ
8270	8259	.	λ
8271	8272	<>	<name>
8271	8271	<>	<aphaerese>
8271	8271	<>	<elision3>
8271	8271	<>	<elision2>
8271	8271	<>	<elision1>
8271	8275	<k2K>	<>
8271	8278	<k2L>	<>
8271	8269	<l2L>	<>
8272	8273	<>	<aphaerese>
8272	8273	<>	<elision3>
8272	8273	<>	<elision2>
8272	8273	<>	<elision1>
8272	8276	<k2K>	<>
8272	8279	<k2L>	<>
8272	8270	<l2L>	<>
8273	8271	<>	<aphaerese>
8273	8271	<>	<elision3>
8273	8271	<>	<elision2>
8273	8271	<>	<elision1>
8273	8274	<k2K>	<>
8273	8277	<k2L>	<>
8273	8268	<l2L>	<>
8274	8221	.	.
8274	8221	<~>	<~>
8274	8221	<split-s>	<split-s>
8274	8221	<split-h>	<split-h>
8274	8221	<name2>	<name2>
8274	8224	<aphaerese>	<aphaerese>
8274	8275	<>	<aphaerese>
8274	8221	<elision3>	<elision3>
8274	8275	<>	<elision3>
8274	8221	<elision2>	<elision2>
8274	8275	<>	<elision2>
8274	8221	<elision1>	<elision1>
8274	8275	<>	<elision1>
8274	8239	.	υ
8274	8192	s	υ
8274	8239	.	u
8274	8192	s	u
8274	8179	s	κ
8274	8179	s	k
8274	8233	s	U
8274	8188	s	K
8274	8239	.	α
8274	8192	s	α
8274	8239	.	a
8274	8192	s	a
8274	8236	s	A
8274	8179	s	λ
8274	8179	s	l
8274	8194	s	L
8274	8185	<1m>	<>
8275	8221	.	.
8275	8221	<~>	<~>
8275	8221	<split-s>	<split-s>
8275	8221	<split-h>	<split-h>
8275	8221	<name2>	<name2>
8275	8276	<>	<name>
8275	8224	<aphaerese>	<aphaerese>
8275	8275	<>	<aphaerese>
8275	8221	<elision3>	<elision3>
8275	8275	<>	<elision3>
8275	8221	<elision2>	<elision2>
8275	8275	<>	<elision2>
8275	8221	<elision1>	<elision1>
8275	8275	<>	<elision1>
8275	8239	.	υ
8275	8192	s	υ
8275	8239	.	u
8275	8192	s	u
8275	8179	s	κ
8275	8179	s	k
8275	8233	s	U
8275	8188	s	K
8275	8239	.	α
8275	8192	s	α
8275	8239	.	a
8275	8192	s	a
8275	8236	s	A
8275	8179	s	λ
8275	8179	s	l
8275	8194	s	L
8275	8186	<1m>	<>
8276	8223	.	.
8276	8223	<~>	<~>
8276	8223	<split-s>	<split-s>
8276	8223	<split-h>	<split-h>
8276	8223	<name2>	<name2>
8276	8226	<aphaerese>	<aphaerese>
8276	8274	<>	<aphaerese>
8276	8223	<elision3>	<elision3>
8276	8274	<>	<elision3>
8276	8223	<elision2>	<elision2>
8276	8274	<>	<elision2>
8276	8223	<elision1>	<elision1>
8276	8274	<>	<elision1>
8276	8241	.	υ
8276	8191	s	υ
8276	8241	.	u
8276	8191	s	u
8276	8178	s	κ
8276	8178	s	k
8276	8235	s	U
8276	8187	s	K
8276	8241	.	α
8276	8191	s	α
8276	8241	.	a
8276	8191	s	a
8276	8238	s	A
8276	8178	s	λ
8276	8178	s	l
8276	8193	s	L
8276	8184	<1m>	<>
8277	8251	.	.
8277	8251	<~>	<~>
8277	8251	<split-s>	<split-s>
8277	8251	<split-h>	<split-h>
8277	8251	<name2>	<name2>
8277	8254	<aphaerese>	<aphaerese>
8277	8278	<>	<aphaerese>
8277	8251	<elision3>	<elision3>
8277	8278	<>	<elision3>
8277	8251	<elision2>	<elision2>
8277	8278	<>	<elision2>
8277	8251	<elision1>	<elision1>
8277	8278	<>	<elision1>
8277	8257	.	υ
8277	8192	s	υ
8277	8257	.	u
8277	8192	s	u
8277	8200	s	κ
8277	8203	H	κ
8277	8200	s	k
8277	8203	H	k
8277	8233	s	U
8277	8188	s	K
8277	8203	H	K
8277	8257	.	α
8277	8192	s	α
8277	8257	.	a
8277	8192	s	a
8277	8236	s	A
8277	8200	s	λ
8277	8203	H	λ
8277	8200	s	l
8277	8203	H	l
8277	8194	s	L
8277	8203	H	L
8277	8185	<1m>	<>
8278	8251	.	.
8278	8251	<~>	<~>
8278	8251	<split-s>	<split-s>
8278	8251	<split-h>	<split-h>
8278	8251	<name2>	<name2>
8278	8279	<>	<name>
8278	8254	<aphaerese>	<aphaerese>
8278	8278	<>	<aphaerese>
8278	8251	<elision3>	<elision3>
8278	8278	<>	<elision3>
8278	8251	<elision2>	<elision2>
8278	8278	<>	<elision2>
8278	8251	<elision1>	<elision1>
8278	8278	<>	<elision1>
8278	8257	.	υ
8278	8192	s	υ
8278	8257	.	u
8278	8192	s	u
8278	8200	s	κ
8278	8203	H	κ
8278	8200	s	k
8278	8203	H	k
8278	8233	s	U
8278	8188	s	K
8278	8203	H	K
8278	8257	.	α
8278	8192	s	α
8278	8257	.	a
8278	8192	s	a
8278	8236	s	A
8278	8200	s	λ
8278	8203	H	λ
8278	8200	s	l
8278	8203	H	l
8278	8194	s	L
8278	8203	H	L
8278	8186	<1m>	<>
8279	8253	.	.
8279	8253	<~>	<~>
8279	8253	<split-s>	<split-s>
8279	8253	<split-h>	<split-h>
8279	8253	<name2>	<name2>
8279	8256	<aphaerese>	<aphaerese>
8279	8277	<>	<aphaerese>
8279	8253	<elision3>	<elision3>
8279	8277	<>	<elision3>
8279	8253	<elision2>	<elision2>
8279	8277	<>	<elision2>
8279	8253	<elision1>	<elision1>
8279	8277	<>	<elision1>
8279	8259	.	υ
8279	8191	s	υ
8279	8259	.	u
8279	8191	s	u
8279	8199	s	κ
8279	8202	H	κ
8279	8199	s	k
8279	8202	H	k
8279	8235	s	U
8279	8187	s	K
8279	8202	H	K
8279	8259	.	α
8279	8191	s	α
8279	8259	.	a
8279	8191	s	a
8279	8238	s	A
8279	8199	s	λ
8279	8202	H	λ
8279	8199	s	l
8279	8202	H	l
8279	8193	s	L
8279	8202	H	L
8279	8184	<1m>	<>
8280	8221	.	.
8280	8221	<~>	<~>
8280	8221	<split-s>	<split-s>
8280	8221	<split-h>	<split-h>
8280	8221	<name2>	<name2>
8280	8281	<>	<name>
8280	8224	<aphaerese>	<aphaerese>
8280	8280	<>	<aphaerese>
8280	8221	<elision3>	<elision3>
8280	8280	<>	<elision3>
8280	8221	<elision2>	<elision2>
8280	8280	<>	<elision2>
8280	8221	<elision1>	<elision1>
8280	8280	<>	<elision1>
8280	8239	.	υ
8280	8192	s	υ
8280	8239	.	u
8280	8192	s	u
8280	8227	.	κ
8280	8179	s	κ
8280	8179	s	k
8280	8233	s	U
8280	8188	s	K
8280	8239	.	α
8280	8192	s	α
8280	8239	.	a
8280	8192	s	a
8280	8236	s	A
8280	8179	s	λ
8280	8179	s	l
8280	8194	s	L
8280	8186	<1m>	<>
8280	8251	<U2L>	<>
8281	8223	.	.
8281	8223	<~>	<~>
8281	8223	<split-s>	<split-s>
8281	8223	<split-h>	<split-h>
8281	8223	<name2>	<name2>
8281	8226	<aphaerese>	<aphaerese>
8281	8282	<>	<aphaerese>
8281	8223	<elision3>	<elision3>
8281	8282	<>	<elision3>
8281	8223	<elision2>	<elision2>
8281	8282	<>	<elision2>
8281	8223	<elision1>	<elision1>
8281	8282	<>	<elision1>
8281	8241	.	υ
8281	8191	s	υ
8281	8241	.	u
8281	8191	s	u
8281	8229	.	κ
8281	8178	s	κ
8281	8178	s	k
8281	8235	s	U
8281	8187	s	K
8281	8241	.	α
8281	8191	s	α
8281	8241	.	a
8281	8191	s	a
8281	8238	s	A
8281	8178	s	λ
8281	8178	s	l
8281	8193	s	L
8281	8184	<1m>	<>
8281	8252	<U2L>	<>
8282	8221	.	.
8282	8221	<~>	<~>
8282	8221	<split-s>	<split-s>
8282	8221	<split-h>	<split-h>
8282	8221	<name2>	<name2>
8282	8224	<aphaerese>	<aphaerese>
8282	8280	<>	<aphaerese>
8282	8221	<elision3>	<elision3>
8282	8280	<>	<elision3>
8282	8221	<elision2>	<elision2>
8282	8280	<>	<elision2>
8282	8221	<elision1>	<elision1>
8282	8280	<>	<elision1>
8282	8239	.	υ
8282	8192	s	υ
8282	8239	.	u
8282	8192	s	u
8282	8227	.	κ
8282	8179	s	κ
8282	8179	s	k
8282	8233	s	U
8282	8188	s	K
8282	8239	.	α
8282	8192	s	α
8282	8239	.	a
8282	8192	s	a
8282	8236	s	A
8282	8179	s	λ
8282	8179	s	l
8282	8194	s	L
8282	8185	<1m>	<>
8282	8253	<U2L>	<>
8283	8221	.	.
8283	8221	<~>	<~>
8283	8221	<split-s>	<split-s>
8283	8221	<split-h>	<split-h>
8283	8221	<name2>	<name2>
8283	8284	<name2>	<name>
8283	8285	<>	<name>
8283	8224	<aphaerese>	<aphaerese>
8283	8287	<>	<aphaerese>
8283	8221	<elision3>	<elision3>
8283	8287	<>	<elision3>
8283	8221	<elision2>	<elision2>
8283	8287	<>	<elision2>
8283	8221	<elision1>	<elision1>
8283	8287	<>	<elision1>
8283	8239	.	υ
8283	8192	s	υ
8283	8239	.	u
8283	8192	s	u
8283	8257	.	κ
8283	8179	s	κ
8283	8179	s	k
8283	8233	s	U
8283	8188	s	K
8283	8239	.	α
8283	8192	s	α
8283	8239	.	a
8283	8192	s	a
8283	8236	s	A
8283	8257	.	λ
8283	8179	s	λ
8283	8179	s	l
8283	8194	s	L
8283	8186	<1m>	<>
8283	8288	<k2K>	<>
8283	8289	<k2L>	<>
8283	8291	<K2L>	<>
8284	8187	s	k
8284	8193	s	l
8285	8223	.	.
8285	8223	<~>	<~>
8285	8223	<split-s>	<split-s>
8285	8223	<split-h>	<split-h>
8285	8223	<name2>	<name2>
8285	8226	<aphaerese>	<aphaerese>
8285	8286	<>	<aphaerese>
8285	8223	<elision3>	<elision3>
8285	8286	<>	<elision3>
8285	8223	<elision2>	<elision2>
8285	8286	<>	<elision2>
8285	8223	<elision1>	<elision1>
8285	8286	<>	<elision1>
8285	8241	.	υ
8285	8191	s	υ
8285	8241	.	u
8285	8191	s	u
8285	8259	.	κ
8285	8178	s	κ
8285	8178	s	k
8285	8235	s	U
8285	8187	s	K
8285	8241	.	α
8285	8191	s	α
8285	8241	.	a
8285	8191	s	a
8285	8238	s	A
8285	8259	.	λ
8285	8178	s	λ
8285	8178	s	l
8285	8193	s	L
8285	8184	<1m>	<>
8285	8279	<K2L>	<>
8286	8221	.	.
8286	8221	<~>	<~>
8286	8221	<split-s>	<split-s>
8286	8221	<split-h>	<split-h>
8286	8221	<name2>	<name2>
8286	8224	<aphaerese>	<aphaerese>
8286	8287	<>	<aphaerese>
8286	8221	<elision3>	<elision3>
8286	8287	<>	<elision3>
8286	8221	<elision2>	<elision2>
8286	8287	<>	<elision2>
8286	8221	<elision1>	<elision1>
8286	8287	<>	<elision1>
8286	8239	.	υ
8286	8192	s	υ
8286	8239	.	u
8286	8192	s	u
8286	8257	.	κ
8286	8179	s	κ
8286	8179	s	k
8286	8233	s	U
8286	8188	s	K
8286	8239	.	α
8286	8192	s	α
8286	8239	.	a
8286	8192	s	a
8286	8236	s	A
8286	8257	.	λ
8286	8179	s	λ
8286	8179	s	l
8286	8194	s	L
8286	8185	<1m>	<>
8286	8277	<K2L>	<>
8287	8221	.	.
8287	8221	<~>	<~>
8287	8221	<split-s>	<split-s>
8287	8221	<split-h>	<split-h>
8287	8221	<name2>	<name2>
8287	8285	<>	<name>
8287	8224	<aphaerese>	<aphaerese>
8287	8287	<>	<aphaerese>
8287	8221	<elision3>	<elision3>
8287	8287	<>	<elision3>
8287	8221	<elision2>	<elision2>
8287	8287	<>	<elision2>
8287	8221	<elision1>	<elision1>
8287	8287	<>	<elision1>
8287	8239	.	υ
8287	8192	s	υ
8287	8239	.	u
8287	8192	s	u
8287	8257	.	κ
8287	8179	s	κ
8287	8179	s	k
8287	8233	s	U
8287	8188	s	K
8287	8239	.	α
8287	8192	s	α
8287	8239	.	a
8287	8192	s	a
8287	8236	s	A
8287	8257	.	λ
8287	8179	s	λ
8287	8179	s	l
8287	8194	s	L
8287	8186	<1m>	<>
8287	8278	<K2L>	<>
8288	8284	<name>	<name>
8289	8290	<name>	<name>
8290	8187	s	k
8290	8202	H	k
8290	8193	s	l
8290	8202	H	l
8291	8251	.	.
8291	8251	<~>	<~>
8291	8251	<split-s>	<split-s>
8291	8251	<split-h>	<split-h>
8291	8251	<name2>	<name2>
8291	8290	<name2>	<name>
8291	8279	<>	<name>
8291	8254	<aphaerese>	<aphaerese>
8291	8278	<>	<aphaerese>
8291	8251	<elision3>	<elision3>
8291	8278	<>	<elision3>
8291	8251	<elision2>	<elision2>
8291	8278	<>	<elision2>
8291	8251	<elision1>	<elision1>
8291	8278	<>	<elision1>
8291	8257	.	υ
8291	8192	s	υ
8291	8257	.	u
8291	8192	s	u
8291	8200	s	κ
8291	8203	H	κ
8291	8200	s	k
8291	8203	H	k
8291	8233	s	U
8291	8188	s	K
8291	8203	H	K
8291	8257	.	α
8291	8192	s	α
8291	8257	.	a
8291	8192	s	a
8291	8236	s	A
8291	8200	s	λ
8291	8203	H	λ
8291	8200	s	l
8291	8203	H	l
8291	8194	s	L
8291	8203	H	L
8291	8186	<1m>	<>
8292	8293	<>	<name>
8292	8292	<>	<aphaerese>
8292	8292	<>	<elision3>
8292	8292	<>	<elision2>
8292	8292	<>	<elision1>
8292	8296	<lambda2L>	<>
8293	8294	<>	<aphaerese>
8293	8294	<>	<elision3>
8293	8294	<>	<elision2>
8293	8294	<>	<elision1>
8293	8297	<lambda2L>	<>
8294	8292	<>	<aphaerese>
8294	8292	<>	<elision3>
8294	8292	<>	<elision2>
8294	8292	<>	<elision1>
8294	8295	<lambda2L>	<>
8295	8251	.	.
8295	8251	<~>	<~>
8295	8251	<split-s>	<split-s>
8295	8251	<split-h>	<split-h>
8295	8251	<name2>	<name2>
8295	8254	<aphaerese>	<aphaerese>
8295	8296	<>	<aphaerese>
8295	8251	<elision3>	<elision3>
8295	8296	<>	<elision3>
8295	8251	<elision2>	<elision2>
8295	8296	<>	<elision2>
8295	8251	<elision1>	<elision1>
8295	8296	<>	<elision1>
8295	8257	.	υ
8295	8192	s	υ
8295	8257	.	u
8295	8192	s	u
8295	8257	.	κ
8295	8200	s	κ
8295	8203	H	κ
8295	8200	s	k
8295	8203	H	k
8295	8233	s	U
8295	8188	s	K
8295	8203	H	K
8295	8257	.	α
8295	8192	s	α
8295	8257	.	a
8295	8192	s	a
8295	8236	s	A
8295	8257	.	λ
8295	8200	s	λ
8295	8203	H	λ
8295	8200	s	l
8295	8203	H	l
8295	8194	s	L
8295	8203	H	L
8295	8185	<1m>	<>
8296	8251	.	.
8296	8251	<~>	<~>
8296	8251	<split-s>	<split-s>
8296	8251	<split-h>	<split-h>
8296	8251	<name2>	<name2>
8296	8297	<>	<name>
8296	8254	<aphaerese>	<aphaerese>
8296	8296	<>	<aphaerese>
8296	8251	<elision3>	<elision3>
8296	8296	<>	<elision3>
8296	8251	<elision2>	<elision2>
8296	8296	<>	<elision2>
8296	8251	<elision1>	<elision1>
8296	8296	<>	<elision1>
8296	8257	.	υ
8296	8192	s	υ
8296	8257	.	u
8296	8192	s	u
8296	8257	.	κ
8296	8200	s	κ
8296	8203	H	κ
8296	8200	s	k
8296	8203	H	k
8296	8233	s	U
8296	8188	s	K
8296	8203	H	K
8296	8257	.	α
8296	8192	s	α
8296	8257	.	a
8296	8192	s	a
8296	8236	s	A
8296	8257	.	λ
8296	8200	s	λ
8296	8203	H	λ
8296	8200	s	l
8296	8203	H	l
8296	8194	s	L
8296	8203	H	L
8296	8186	<1m>	<>
8297	8253	.	.
8297	8253	<~>	<~>
8297	8253	<split-s>	<split-s>
8297	8253	<split-h>	<split-h>
8297	8253	<name2>	<name2>
8297	8256	<aphaerese>	<aphaerese>
8297	8295	<>	<aphaerese>
8297	8253	<elision3>	<elision3>
8297	8295	<>	<elision3>
8297	8253	<elision2>	<elision2>
8297	8295	<>	<elision2>
8297	8253	<elision1>	<elision1>
8297	8295	<>	<elision1>
8297	8259	.	υ
8297	8191	s	υ
8297	8259	.	u
8297	8191	s	u
8297	8259	.	κ
8297	8199	s	κ
8297	8202	H	κ
8297	8199	s	k
8297	8202	H	k
8297	8235	s	U
8297	8187	s	K
8297	8202	H	K
8297	8259	.	α
8297	8191	s	α
8297	8259	.	a
8297	8191	s	a
8297	8238	s	A
8297	8259	.	λ
8297	8199	s	λ
8297	8202	H	λ
8297	8199	s	l
8297	8202	H	l
8297	8193	s	L
8297	8202	H	L
8297	8184	<1m>	<>
8298	8299	<>	<name>
8298	8298	<>	<aphaerese>
8298	8298	<>	<elision3>
8298	8298	<>	<elision2>
8298	8298	<>	<elision1>
8298	8296	<l2L>	<>
8299	8300	<>	<aphaerese>
8299	8300	<>	<elision3>
8299	8300	<>	<elision2>
8299	8300	<>	<elision1>
8299	8297	<l2L>	<>
8300	8298	<>	<aphaerese>
8300	8298	<>	<elision3>
8300	8298	<>	<elision2>
8300	8298	<>	<elision1>
8300	8295	<l2L>	<>
8301	8251	.	.
8301	8251	<~>	<~>
8301	8251	<split-s>	<split-s>
8301	8251	<split-h>	<split-h>
8301	8251	<name2>	<name2>
8301	8290	<name2>	<name>
8301	8297	<>	<name>
8301	8254	<aphaerese>	<aphaerese>
8301	8296	<>	<aphaerese>
8301	8251	<elision3>	<elision3>
8301	8296	<>	<elision3>
8301	8251	<elision2>	<elision2>
8301	8296	<>	<elision2>
8301	8251	<elision1>	<elision1>
8301	8296	<>	<elision1>
8301	8257	.	υ
8301	8192	s	υ
8301	8257	.	u
8301	8192	s	u
8301	8257	.	κ
8301	8200	s	κ
8301	8203	H	κ
8301	8200	s	k
8301	8203	H	k
8301	8233	s	U
8301	8188	s	K
8301	8203	H	K
8301	8257	.	α
8301	8192	s	α
8301	8257	.	a
8301	8192	s	a
8301	8236	s	A
8301	8257	.	λ
8301	8200	s	λ
8301	8203	H	λ
8301	8200	s	l
8301	8203	H	l
8301	8194	s	L
8301	8203	H	L
8301	8186	<1m>	<>
8301	8289	<l2L>	<>
8302	8303	<>	<name>
8302	8302	<>	<aphaerese>
8302	8302	<>	<elision3>
8302	8302	<>	<elision2>
8302	8302	<>	<elision1>
8302	8306	<ypsilon2K>	<>
8302	8309	<ypsilon2L>	<>
8303	8304	<>	<aphaerese>
8303	8304	<>	<elision3>
8303	8304	<>	<elision2>
8303	8304	<>	<elision1>
8303	8307	<ypsilon2K>	<>
8303	8310	<ypsilon2L>	<>
8304	8302	<>	<aphaerese>
8304	8302	<>	<elision3>
8304	8302	<>	<elision2>
8304	8302	<>	<elision1>
8304	8305	<ypsilon2K>	<>
8304	8308	<ypsilon2L>	<>
8305	8221	.	.
8305	8221	<~>	<~>
8305	8221	<split-s>	<split-s>
8305	8221	<split-h>	<split-h>
8305	8221	<name2>	<name2>
8305	8224	<aphaerese>	<aphaerese>
8305	8306	<>	<aphaerese>
8305	8306	<>	<elision3>
8305	8306	<>	<elision2>
8305	8306	<>	<elision1>
8305	8239	.	υ
8305	8192	s	υ
8305	8239	.	u
8305	8192	s	u
8305	8227	.	κ
8305	8179	s	κ
8305	8179	s	k
8305	8233	s	U
8305	8188	s	K
8305	8239	.	α
8305	8192	s	α
8305	8239	.	a
8305	8192	s	a
8305	8236	s	A
8305	8179	s	λ
8305	8179	s	l
8305	8194	s	L
8305	8185	<1m>	<>
8306	8221	.	.
8306	8221	<~>	<~>
8306	8221	<split-s>	<split-s>
8306	8221	<split-h>	<split-h>
8306	8221	<name2>	<name2>
8306	8307	<>	<name>
8306	8224	<aphaerese>	<aphaerese>
8306	8306	<>	<aphaerese>
8306	8306	<>	<elision3>
8306	8306	<>	<elision2>
8306	8306	<>	<elision1>
8306	8239	.	υ
8306	8192	s	υ
8306	8239	.	u
8306	8192	s	u
8306	8227	.	κ
8306	8179	s	κ
8306	8179	s	k
8306	8233	s	U
8306	8188	s	K
8306	8239	.	α
8306	8192	s	α
8306	8239	.	a
8306	8192	s	a
8306	8236	s	A
8306	8179	s	λ
8306	8179	s	l
8306	8194	s	L
8306	8186	<1m>	<>
8307	8223	.	.
8307	8223	<~>	<~>
8307	8223	<split-s>	<split-s>
8307	8223	<split-h>	<split-h>
8307	8223	<name2>	<name2>
8307	8226	<aphaerese>	<aphaerese>
8307	8305	<>	<aphaerese>
8307	8305	<>	<elision3>
8307	8305	<>	<elision2>
8307	8305	<>	<elision1>
8307	8241	.	υ
8307	8191	s	υ
8307	8241	.	u
8307	8191	s	u
8307	8229	.	κ
8307	8178	s	κ
8307	8178	s	k
8307	8235	s	U
8307	8187	s	K
8307	8241	.	α
8307	8191	s	α
8307	8241	.	a
8307	8191	s	a
8307	8238	s	A
8307	8178	s	λ
8307	8178	s	l
8307	8193	s	L
8307	8184	<1m>	<>
8308	8251	.	.
8308	8251	<~>	<~>
8308	8251	<split-s>	<split-s>
8308	8251	<split-h>	<split-h>
8308	8251	<name2>	<name2>
8308	8254	<aphaerese>	<aphaerese>
8308	8309	<>	<aphaerese>
8308	8309	<>	<elision3>
8308	8309	<>	<elision2>
8308	8309	<>	<elision1>
8308	8257	.	υ
8308	8192	s	υ
8308	8257	.	u
8308	8192	s	u
8308	8227	.	κ
8308	8200	s	κ
8308	8203	H	κ
8308	8200	s	k
8308	8203	H	k
8308	8233	s	U
8308	8188	s	K
8308	8203	H	K
8308	8257	.	α
8308	8192	s	α
8308	8257	.	a
8308	8192	s	a
8308	8236	s	A
8308	8200	s	λ
8308	8203	H	λ
8308	8200	s	l
8308	8203	H	l
8308	8194	s	L
8308	8203	H	L
8308	8185	<1m>	<>
8309	8251	.	.
8309	8251	<~>	<~>
8309	8251	<split-s>	<split-s>
8309	8251	<split-h>	<split-h>
8309	8251	<name2>	<name2>
8309	8310	<>	<name>
8309	8254	<aphaerese>	<aphaerese>
8309	8309	<>	<aphaerese>
8309	8309	<>	<elision3>
8309	8309	<>	<elision2>
8309	8309	<>	<elision1>
8309	8257	.	υ
8309	8192	s	υ
8309	8257	.	u
8309	8192	s	u
8309	8227	.	κ
8309	8200	s	κ
8309	8203	H	κ
8309	8200	s	k
8309	8203	H	k
8309	8233	s	U
8309	8188	s	K
8309	8203	H	K
8309	8257	.	α
8309	8192	s	α
8309	8257	.	a
8309	8192	s	a
8309	8236	s	A
8309	8200	s	λ
8309	8203	H	λ
8309	8200	s	l
8309	8203	H	l
8309	8194	s	L
8309	8203	H	L
8309	8186	<1m>	<>
8310	8253	.	.
8310	8253	<~>	<~>
8310	8253	<split-s>	<split-s>
8310	8253	<split-h>	<split-h>
8310	8253	<name2>	<name2>
8310	8256	<aphaerese>	<aphaerese>
8310	8308	<>	<aphaerese>
8310	8308	<>	<elision3>
8310	8308	<>	<elision2>
8310	8308	<>	<elision1>
8310	8259	.	υ
8310	8191	s	υ
8310	8259	.	u
8310	8191	s	u
8310	8229	.	κ
8310	8199	s	κ
8310	8202	H	κ
8310	8199	s	k
8310	8202	H	k
8310	8235	s	U
8310	8187	s	K
8310	8202	H	K
8310	8259	.	α
8310	8191	s	α
8310	8259	.	a
8310	8191	s	a
8310	8238	s	A
8310	8199	s	λ
8310	8202	H	λ
8310	8199	s	l
8310	8202	H	l
8310	8193	s	L
8310	8202	H	L
8310	8184	<1m>	<>
8311	8312	<>	<name>
8311	8311	<>	<aphaerese>
8311	8311	<>	<elision3>
8311	8311	<>	<elision2>
8311	8311	<>	<elision1>
8311	8306	<u2K>	<>
8311	8309	<u2L>	<>
8312	8313	<>	<aphaerese>
8312	8313	<>	<elision3>
8312	8313	<>	<elision2>
8312	8313	<>	<elision1>
8312	8307	<u2K>	<>
8312	8310	<u2L>	<>
8313	8311	<>	<aphaerese>
8313	8311	<>	<elision3>
8313	8311	<>	<elision2>
8313	8311	<>	<elision1>
8313	8305	<u2K>	<>
8313	8308	<u2L>	<>
8314	8315	<>	<name>
8314	8314	<>	<aphaerese>
8314	8314	<>	<elision3>
8314	8314	<>	<elision2>
8314	8314	<>	<elision1>
8314	8309	<alpha2L>	<>
8315	8316	<>	<aphaerese>
8315	8316	<>	<elision3>
8315	8316	<>	<elision2>
8315	8316	<>	<elision1>
8315	8310	<alpha2L>	<>
8316	8314	<>	<aphaerese>
8316	8314	<>	<elision3>
8316	8314	<>	<elision2>
8316	8314	<>	<elision1>
8316	8308	<alpha2L>	<>
8317	8318	<>	<name>
8317	8317	<>	<aphaerese>
8317	8317	<>	<elision3>
8317	8317	<>	<elision2>
8317	8317	<>	<elision1>
8317	8309	<a2L>	<>
8318	8319	<>	<aphaerese>
8318	8319	<>	<elision3>
8318	8319	<>	<elision2>
8318	8319	<>	<elision1>
8318	8310	<a2L>	<>
8319	8317	<>	<aphaerese>
8319	8317	<>	<elision3>
8319	8317	<>	<elision2>
8319	8317	<>	<elision1>
8319	8308	<a2L>	<>
8320	8321	.	.
8320	8322	 	 
8320	8321	<~>	<~>
8320	8321	<split-s>	<split-s>
8320	8321	<split-h>	<split-h>
8320	8321	<name2>	<name2>
8320	8897	<>	<name>
8320	8325	<aphaerese>	<aphaerese>
8320	8320	<>	<aphaerese>
8320	8320	<>	<elision3>
8320	8320	<>	<elision2>
8320	8320	<>	<elision1>
8320	8329	.	υ
8320	8335	s	υ
8320	8329	.	u
8320	8335	s	u
8320	8514	.	κ
8320	8585	s	κ
8320	8697	s	k
8320	8706	s	U
8320	8872	s	K
8320	8329	.	α
8320	8335	s	α
8320	8329	.	a
8320	8335	s	a
8320	8827	s	A
8320	8697	s	λ
8320	8697	s	l
8320	8885	s	L
8320	8900	<split-h>	<>
8321	8321	.	.
8321	8322	 	 
8321	8321	<~>	<~>
8321	8321	<split-s>	<split-s>
8321	8321	<split-h>	<split-h>
8321	8321	<name2>	<name2>
8321	8896	<>	<name>
8321	8325	<aphaerese>	<aphaerese>
8321	8321	<>	<aphaerese>
8321	8321	<elision3>	<elision3>
8321	8321	<>	<elision3>
8321	8321	<elision2>	<elision2>
8321	8321	<>	<elision2>
8321	8321	<elision1>	<elision1>
8321	8321	<>	<elision1>
8321	8329	.	υ
8321	8335	s	υ
8321	8329	.	u
8321	8335	s	u
8321	8514	.	κ
8321	8585	s	κ
8321	8697	s	k
8321	8706	s	U
8321	8872	s	K
8321	8329	.	α
8321	8335	s	α
8321	8329	.	a
8321	8335	s	a
8321	8827	s	A
8321	8697	s	λ
8321	8697	s	l
8321	8885	s	L
8321	8846	<split-h>	<>
8322	8321	.	.
8322	8322	 	 
8322	8321	<~>	<~>
8322	8321	<split-s>	<split-s>
8322	8321	<split-h>	<split-h>
8322	8321	<name2>	<name2>
8322	8323	<>	<name>
8322	8325	<aphaerese>	<aphaerese>
8322	8328	<>	<aphaerese>
8322	8321	<elision3>	<elision3>
8322	8328	<>	<elision3>
8322	8321	<elision2>	<elision2>
8322	8328	<>	<elision2>
8322	8321	<elision1>	<elision1>
8322	8328	<>	<elision1>
8322	8329	.	υ
8322	8849	s	υ
8322	8329	.	u
8322	8849	s	u
8322	8514	.	κ
8322	8852	s	κ
8322	8855	s	k
8322	8858	s	U
8322	8862	s	K
8322	8329	.	α
8322	8849	s	α
8322	8329	.	a
8322	8849	s	a
8322	8866	s	A
8322	8855	s	λ
8322	8855	s	l
8322	8867	s	L
8322	8846	<split-h>	<>
8323	8324	.	.
8323	8327	 	 
8323	8324	<~>	<~>
8323	8324	<split-s>	<split-s>
8323	8324	<split-h>	<split-h>
8323	8324	<name2>	<name2>
8323	8871	<aphaerese>	<aphaerese>
8323	8895	<>	<aphaerese>
8323	8324	<elision3>	<elision3>
8323	8895	<>	<elision3>
8323	8324	<elision2>	<elision2>
8323	8895	<>	<elision2>
8323	8324	<elision1>	<elision1>
8323	8895	<>	<elision1>
8323	8331	.	υ
8323	8507	s	υ
8323	8331	.	u
8323	8507	s	u
8323	8516	.	κ
8323	8587	s	κ
8323	8699	s	k
8323	8708	s	U
8323	8714	s	K
8323	8331	.	α
8323	8507	s	α
8323	8331	.	a
8323	8507	s	a
8323	8829	s	A
8323	8699	s	λ
8323	8699	s	l
8323	8832	s	L
8323	8847	<split-h>	<>
8324	8321	.	.
8324	8322	 	 
8324	8321	<~>	<~>
8324	8321	<split-s>	<split-s>
8324	8321	<split-h>	<split-h>
8324	8321	<name2>	<name2>
8324	8325	<aphaerese>	<aphaerese>
8324	8321	<>	<aphaerese>
8324	8321	<elision3>	<elision3>
8324	8321	<>	<elision3>
8324	8321	<elision2>	<elision2>
8324	8321	<>	<elision2>
8324	8321	<elision1>	<elision1>
8324	8321	<>	<elision1>
8324	8329	.	υ
8324	8335	s	υ
8324	8329	.	u
8324	8335	s	u
8324	8514	.	κ
8324	8585	s	κ
8324	8697	s	k
8324	8706	s	U
8324	8872	s	K
8324	8329	.	α
8324	8335	s	α
8324	8329	.	a
8324	8335	s	a
8324	8827	s	A
8324	8697	s	λ
8324	8697	s	l
8324	8885	s	L
8324	8848	<split-h>	<>
8325	8321	.	.
8325	8322	 	 
8325	8321	<~>	<~>
8325	8321	<split-s>	<split-s>
8325	8321	<split-h>	<split-h>
8325	8321	<name2>	<name2>
8325	8326	<>	<name>
8325	8325	<aphaerese>	<aphaerese>
8325	8325	<>	<aphaerese>
8325	8321	<elision3>	<elision3>
8325	8325	<>	<elision3>
8325	8321	<elision2>	<elision2>
8325	8325	<>	<elision2>
8325	8321	<elision1>	<elision1>
8325	8325	<>	<elision1>
8325	8321	.	υ
8325	8321	.	u
8325	8514	.	κ
8325	8585	s	κ
8325	8697	s	k
8325	8706	s	U
8325	8872	s	K
8325	8321	.	α
8325	8321	.	a
8325	8827	s	A
8325	8697	s	λ
8325	8697	s	l
8325	8885	s	L
8325	8893	<split-h>	<>
8326	8324	.	.
8326	8327	 	 
8326	8324	<~>	<~>
8326	8324	<split-s>	<split-s>
8326	8324	<split-h>	<split-h>
8326	8324	<name2>	<name2>
8326	8871	<aphaerese>	<aphaerese>
8326	8871	<>	<aphaerese>
8326	8324	<elision3>	<elision3>
8326	8871	<>	<elision3>
8326	8324	<elision2>	<elision2>
8326	8871	<>	<elision2>
8326	8324	<elision1>	<elision1>
8326	8871	<>	<elision1>
8326	8324	.	υ
8326	8324	.	u
8326	8516	.	κ
8326	8587	s	κ
8326	8699	s	k
8326	8708	s	U
8326	8874	s	K
8326	8324	.	α
8326	8324	.	a
8326	8829	s	A
8326	8699	s	λ
8326	8699	s	l
8326	8887	s	L
8326	8894	<split-h>	<>
8327	8321	.	.
8327	8322	 	 
8327	8321	<~>	<~>
8327	8321	<split-s>	<split-s>
8327	8321	<split-h>	<split-h>
8327	8321	<name2>	<name2>
8327	8325	<aphaerese>	<aphaerese>
8327	8328	<>	<aphaerese>
8327	8321	<elision3>	<elision3>
8327	8328	<>	<elision3>
8327	8321	<elision2>	<elision2>
8327	8328	<>	<elision2>
8327	8321	<elision1>	<elision1>
8327	8328	<>	<elision1>
8327	8329	.	υ
8327	8849	s	υ
8327	8329	.	u
8327	8849	s	u
8327	8514	.	κ
8327	8852	s	κ
8327	8855	s	k
8327	8858	s	U
8327	8862	s	K
8327	8329	.	α
8327	8849	s	α
8327	8329	.	a
8327	8849	s	a
8327	8866	s	A
8327	8855	s	λ
8327	8855	s	l
8327	8867	s	L
8327	8848	<split-h>	<>
8328	8321	.	.
8328	8322	 	 
8328	8321	<~>	<~>
8328	8321	<split-s>	<split-s>
8328	8321	<split-h>	<split-h>
8328	8321	<name2>	<name2>
8328	8323	<>	<name>
8328	8325	<aphaerese>	<aphaerese>
8328	8328	<>	<aphaerese>
8328	8321	<elision3>	<elision3>
8328	8328	<>	<elision3>
8328	8321	<elision2>	<elision2>
8328	8328	<>	<elision2>
8328	8321	<elision1>	<elision1>
8328	8328	<>	<elision1>
8328	8329	.	υ
8328	8335	s	υ
8328	8329	.	u
8328	8335	s	u
8328	8514	.	κ
8328	8585	s	κ
8328	8697	s	k
8328	8706	s	U
8328	8709	s	K
8328	8329	.	α
8328	8335	s	α
8328	8329	.	a
8328	8335	s	a
8328	8827	s	A
8328	8697	s	λ
8328	8697	s	l
8328	8830	s	L
8328	8846	<split-h>	<>
8329	8330	<>	<name>
8329	8329	<>	<aphaerese>
8329	8321	<elision3>	<elision3>
8329	8329	<>	<elision3>
8329	8321	<elision2>	<elision2>
8329	8329	<>	<elision2>
8329	8321	<elision1>	<elision1>
8329	8329	<>	<elision1>
8329	8333	<split-h>	<>
8330	8331	<>	<aphaerese>
8330	8324	<elision3>	<elision3>
8330	8331	<>	<elision3>
8330	8324	<elision2>	<elision2>
8330	8331	<>	<elision2>
8330	8324	<elision1>	<elision1>
8330	8331	<>	<elision1>
8330	8334	<split-h>	<>
8331	8329	<>	<aphaerese>
8331	8321	<elision3>	<elision3>
8331	8329	<>	<elision3>
8331	8321	<elision2>	<elision2>
8331	8329	<>	<elision2>
8331	8321	<elision1>	<elision1>
8331	8329	<>	<elision1>
8331	8332	<split-h>	<>
8332	8333	<>	<aphaerese>
8332	8333	<>	<elision3>
8332	8333	<>	<elision2>
8332	8333	<>	<elision1>
8332	103	<3s>	<>
8333	8334	<>	<name>
8333	8333	<>	<aphaerese>
8333	8333	<>	<elision3>
8333	8333	<>	<elision2>
8333	8333	<>	<elision1>
8333	104	<3s>	<>
8334	8332	<>	<aphaerese>
8334	8332	<>	<elision3>
8334	8332	<>	<elision2>
8334	8332	<>	<elision1>
8334	105	<3s>	<>
8335	8336	.	.
8335	8336	 	 
8335	8336	<~>	<~>
8335	8336	<split-s>	<split-s>
8335	8336	<split-h>	<split-h>
8335	8336	<name2>	<name2>
8335	8506	<>	<name>
8335	8339	<aphaerese>	<aphaerese>
8335	8335	<>	<aphaerese>
8335	8335	<>	<elision3>
8335	8335	<>	<elision2>
8335	8335	<>	<elision1>
8335	8500	.	υ
8335	8500	.	u
8335	8342	.	κ
8335	8500	.	α
8335	8500	.	a
8335	8509	<4s>	<>
8336	8336	.	.
8336	8336	 	 
8336	8336	<~>	<~>
8336	8336	<split-s>	<split-s>
8336	8336	<split-h>	<split-h>
8336	8336	<name2>	<name2>
8336	8337	<>	<name>
8336	8339	<aphaerese>	<aphaerese>
8336	8336	<>	<aphaerese>
8336	8336	<elision3>	<elision3>
8336	8336	<>	<elision3>
8336	8336	<elision2>	<elision2>
8336	8336	<>	<elision2>
8336	8336	<elision1>	<elision1>
8336	8336	<>	<elision1>
8336	8500	.	υ
8336	8500	.	u
8336	8342	.	κ
8336	8500	.	α
8336	8500	.	a
8336	8504	<4s>	<>
8337	8338	.	.
8337	8338	 	 
8337	8338	<~>	<~>
8337	8338	<split-s>	<split-s>
8337	8338	<split-h>	<split-h>
8337	8338	<name2>	<name2>
8337	8341	<aphaerese>	<aphaerese>
8337	8338	<>	<aphaerese>
8337	8338	<elision3>	<elision3>
8337	8338	<>	<elision3>
8337	8338	<elision2>	<elision2>
8337	8338	<>	<elision2>
8337	8338	<elision1>	<elision1>
8337	8338	<>	<elision1>
8337	8502	.	υ
8337	8502	.	u
8337	8344	.	κ
8337	8502	.	α
8337	8502	.	a
8337	8505	<4s>	<>
8338	8336	.	.
8338	8336	 	 
8338	8336	<~>	<~>
8338	8336	<split-s>	<split-s>
8338	8336	<split-h>	<split-h>
8338	8336	<name2>	<name2>
8338	8339	<aphaerese>	<aphaerese>
8338	8336	<>	<aphaerese>
8338	8336	<elision3>	<elision3>
8338	8336	<>	<elision3>
8338	8336	<elision2>	<elision2>
8338	8336	<>	<elision2>
8338	8336	<elision1>	<elision1>
8338	8336	<>	<elision1>
8338	8500	.	υ
8338	8500	.	u
8338	8342	.	κ
8338	8500	.	α
8338	8500	.	a
8338	8503	<4s>	<>
8339	8336	.	.
8339	8336	 	 
8339	8336	<~>	<~>
8339	8336	<split-s>	<split-s>
8339	8336	<split-h>	<split-h>
8339	8336	<name2>	<name2>
8339	8340	<>	<name>
8339	8339	<aphaerese>	<aphaerese>
8339	8339	<>	<aphaerese>
8339	8336	<elision3>	<elision3>
8339	8339	<>	<elision3>
8339	8336	<elision2>	<elision2>
8339	8339	<>	<elision2>
8339	8336	<elision1>	<elision1>
8339	8339	<>	<elision1>
8339	8336	.	υ
8339	8336	.	u
8339	8342	.	κ
8339	8336	.	α
8339	8336	.	a
8339	8491	<4s>	<>
8340	8338	.	.
8340	8338	 	 
8340	8338	<~>	<~>
8340	8338	<split-s>	<split-s>
8340	8338	<split-h>	<split-h>
8340	8338	<name2>	<name2>
8340	8341	<aphaerese>	<aphaerese>
8340	8341	<>	<aphaerese>
8340	8338	<elision3>	<elision3>
8340	8341	<>	<elision3>
8340	8338	<elision2>	<elision2>
8340	8341	<>	<elision2>
8340	8338	<elision1>	<elision1>
8340	8341	<>	<elision1>
8340	8338	.	υ
8340	8338	.	u
8340	8344	.	κ
8340	8338	.	α
8340	8338	.	a
8340	8492	<4s>	<>
8341	8336	.	.
8341	8336	 	 
8341	8336	<~>	<~>
8341	8336	<split-s>	<split-s>
8341	8336	<split-h>	<split-h>
8341	8336	<name2>	<name2>
8341	8339	<aphaerese>	<aphaerese>
8341	8339	<>	<aphaerese>
8341	8336	<elision3>	<elision3>
8341	8339	<>	<elision3>
8341	8336	<elision2>	<elision2>
8341	8339	<>	<elision2>
8341	8336	<elision1>	<elision1>
8341	8339	<>	<elision1>
8341	8336	.	υ
8341	8336	.	u
8341	8342	.	κ
8341	8336	.	α
8341	8336	.	a
8341	8490	<4s>	<>
8342	8343	<>	<name>
8342	8342	<>	<aphaerese>
8342	8345	<elision3>	<elision3>
8342	8342	<>	<elision3>
8342	8345	<elision2>	<elision2>
8342	8342	<>	<elision2>
8342	8345	<elision1>	<elision1>
8342	8342	<>	<elision1>
8342	8488	<4s>	<>
8343	8344	<>	<aphaerese>
8343	8347	<elision3>	<elision3>
8343	8344	<>	<elision3>
8343	8347	<elision2>	<elision2>
8343	8344	<>	<elision2>
8343	8347	<elision1>	<elision1>
8343	8344	<>	<elision1>
8343	8489	<4s>	<>
8344	8342	<>	<aphaerese>
8344	8345	<elision3>	<elision3>
8344	8342	<>	<elision3>
8344	8345	<elision2>	<elision2>
8344	8342	<>	<elision2>
8344	8345	<elision1>	<elision1>
8344	8342	<>	<elision1>
8344	8487	<4s>	<>
8345	8346	<>	<name>
8345	8345	<>	<aphaerese>
8345	8345	<>	<elision3>
8345	8345	<>	<elision2>
8345	8345	<>	<elision1>
8345	8349	<4s>	<>
8346	8347	<>	<aphaerese>
8346	8347	<>	<elision3>
8346	8347	<>	<elision2>
8346	8347	<>	<elision1>
8346	8350	<4s>	<>
8347	8345	<>	<aphaerese>
8347	8345	<>	<elision3>
8347	8345	<>	<elision2>
8347	8345	<>	<elision1>
8347	8348	<4s>	<>
8348	8349	<>	<aphaerese>
8348	8349	<>	<elision3>
8348	8349	<>	<elision2>
8348	8349	<>	<elision1>
8348	120	H	κ
8348	7716	H	k
8348	7720	H	K
8348	7724	H	λ
8348	8352	H	l
8348	8481	H	L
8348	8171	<K>	<>
8349	8350	<>	<name>
8349	8349	<>	<aphaerese>
8349	8349	<>	<elision3>
8349	8349	<>	<elision2>
8349	8349	<>	<elision1>
8349	120	H	κ
8349	7716	H	k
8349	7720	H	K
8349	7724	H	λ
8349	8352	H	l
8349	8481	H	L
8349	8169	<K>	<>
8350	8348	<>	<aphaerese>
8350	8348	<>	<elision3>
8350	8348	<>	<elision2>
8350	8348	<>	<elision1>
8350	7730	H	κ
8350	7734	H	k
8350	7735	H	K
8350	7726	H	λ
8350	8351	H	l
8350	8480	H	L
8350	8170	<K>	<>
8351	8352	<>	<aphaerese>
8351	8352	<>	<elision3>
8351	8352	<>	<elision2>
8351	8352	<>	<elision1>
8351	8355	<~>	<>
8351	7548	<l2L>	<>
8352	8353	<>	<name>
8352	8352	<>	<aphaerese>
8352	8352	<>	<elision3>
8352	8352	<>	<elision2>
8352	8352	<>	<elision1>
8352	8356	<~>	<>
8352	7546	<l2L>	<>
8353	8351	<>	<aphaerese>
8353	8351	<>	<elision3>
8353	8351	<>	<elision2>
8353	8351	<>	<elision1>
8353	8354	<~>	<>
8353	7547	<l2L>	<>
8354	8355	<>	<aphaerese>
8354	8355	<>	<elision3>
8354	8355	<>	<elision2>
8354	8355	<>	<elision1>
8354	8359	h	K
8354	8475	h	L
8355	8356	<>	<aphaerese>
8355	8356	<>	<elision3>
8355	8356	<>	<elision2>
8355	8356	<>	<elision1>
8355	8357	h	K
8355	8472	h	L
8356	8354	<>	<name>
8356	8356	<>	<aphaerese>
8356	8356	<>	<elision3>
8356	8356	<>	<elision2>
8356	8356	<>	<elision1>
8356	8357	h	K
8356	8472	h	L
8357	8358	<>	<name>
8357	8357	<>	<aphaerese>
8357	8357	<>	<elision3>
8357	8357	<>	<elision2>
8357	8357	<>	<elision1>
8357	8360	.	κ
8357	8360	.	λ
8358	8359	<>	<aphaerese>
8358	8359	<>	<elision3>
8358	8359	<>	<elision2>
8358	8359	<>	<elision1>
8358	8362	.	κ
8358	8362	.	λ
8359	8357	<>	<aphaerese>
8359	8357	<>	<elision3>
8359	8357	<>	<elision2>
8359	8357	<>	<elision1>
8359	8360	.	κ
8359	8360	.	λ
8360	8361	<>	<name>
8360	8360	<>	<aphaerese>
8360	8363	<elision3>	<elision3>
8360	8360	<>	<elision3>
8360	8363	<elision2>	<elision2>
8360	8360	<>	<elision2>
8360	8363	<elision1>	<elision1>
8360	8360	<>	<elision1>
8361	8362	<>	<aphaerese>
8361	8366	<elision3>	<elision3>
8361	8362	<>	<elision3>
8361	8366	<elision2>	<elision2>
8361	8362	<>	<elision2>
8361	8366	<elision1>	<elision1>
8361	8362	<>	<elision1>
8362	8360	<>	<aphaerese>
8362	8363	<elision3>	<elision3>
8362	8360	<>	<elision3>
8362	8363	<elision2>	<elision2>
8362	8360	<>	<elision2>
8362	8363	<elision1>	<elision1>
8362	8360	<>	<elision1>
8363	8363	.	.
8363	8364	 	 
8363	8363	<~>	<~>
8363	8363	<split-s>	<split-s>
8363	8363	<split-h>	<split-h>
8363	8363	<name2>	<name2>
8363	8471	<>	<name>
8363	8367	<aphaerese>	<aphaerese>
8363	8363	<>	<aphaerese>
8363	8363	<elision3>	<elision3>
8363	8363	<>	<elision3>
8363	8363	<elision2>	<elision2>
8363	8363	<>	<elision2>
8363	8363	<elision1>	<elision1>
8363	8363	<>	<elision1>
8363	8360	.	υ
8363	8371	s	υ
8363	8360	.	u
8363	8371	s	u
8363	8386	.	κ
8363	8398	s	κ
8363	8404	s	k
8363	8407	s	U
8363	8458	s	K
8363	8360	.	α
8363	8371	s	α
8363	8360	.	a
8363	8371	s	a
8363	8436	s	A
8363	8404	s	λ
8363	8404	s	l
8363	8465	s	L
8364	8363	.	.
8364	8364	 	 
8364	8363	<~>	<~>
8364	8363	<split-s>	<split-s>
8364	8363	<split-h>	<split-h>
8364	8363	<name2>	<name2>
8364	8365	<>	<name>
8364	8367	<aphaerese>	<aphaerese>
8364	8370	<>	<aphaerese>
8364	8363	<elision3>	<elision3>
8364	8370	<>	<elision3>
8364	8363	<elision2>	<elision2>
8364	8370	<>	<elision2>
8364	8363	<elision1>	<elision1>
8364	8370	<>	<elision1>
8364	8360	.	υ
8364	8447	s	υ
8364	8360	.	u
8364	8447	s	u
8364	8386	.	κ
8364	8448	s	κ
8364	8449	s	k
8364	8450	s	U
8364	8452	s	K
8364	8360	.	α
8364	8447	s	α
8364	8360	.	a
8364	8447	s	a
8364	8454	s	A
8364	8449	s	λ
8364	8449	s	l
8364	8455	s	L
8365	8366	.	.
8365	8369	 	 
8365	8366	<~>	<~>
8365	8366	<split-s>	<split-s>
8365	8366	<split-h>	<split-h>
8365	8366	<name2>	<name2>
8365	8457	<aphaerese>	<aphaerese>
8365	8470	<>	<aphaerese>
8365	8366	<elision3>	<elision3>
8365	8470	<>	<elision3>
8365	8366	<elision2>	<elision2>
8365	8470	<>	<elision2>
8365	8366	<elision1>	<elision1>
8365	8470	<>	<elision1>
8365	8362	.	υ
8365	8385	s	υ
8365	8362	.	u
8365	8385	s	u
8365	8388	.	κ
8365	8400	s	κ
8365	8406	s	k
8365	8409	s	U
8365	8412	s	K
8365	8362	.	α
8365	8385	s	α
8365	8362	.	a
8365	8385	s	a
8365	8438	s	A
8365	8406	s	λ
8365	8406	s	l
8365	8441	s	L
8366	8363	.	.
8366	8364	 	 
8366	8363	<~>	<~>
8366	8363	<split-s>	<split-s>
8366	8363	<split-h>	<split-h>
8366	8363	<name2>	<name2>
8366	8367	<aphaerese>	<aphaerese>
8366	8363	<>	<aphaerese>
8366	8363	<elision3>	<elision3>
8366	8363	<>	<elision3>
8366	8363	<elision2>	<elision2>
8366	8363	<>	<elision2>
8366	8363	<elision1>	<elision1>
8366	8363	<>	<elision1>
8366	8360	.	υ
8366	8371	s	υ
8366	8360	.	u
8366	8371	s	u
8366	8386	.	κ
8366	8398	s	κ
8366	8404	s	k
8366	8407	s	U
8366	8458	s	K
8366	8360	.	α
8366	8371	s	α
8366	8360	.	a
8366	8371	s	a
8366	8436	s	A
8366	8404	s	λ
8366	8404	s	l
8366	8465	s	L
8367	8363	.	.
8367	8364	 	 
8367	8363	<~>	<~>
8367	8363	<split-s>	<split-s>
8367	8363	<split-h>	<split-h>
8367	8363	<name2>	<name2>
8367	8368	<>	<name>
8367	8367	<aphaerese>	<aphaerese>
8367	8367	<>	<aphaerese>
8367	8363	<elision3>	<elision3>
8367	8367	<>	<elision3>
8367	8363	<elision2>	<elision2>
8367	8367	<>	<elision2>
8367	8363	<elision1>	<elision1>
8367	8367	<>	<elision1>
8367	8363	.	υ
8367	8363	.	u
8367	8386	.	κ
8367	8398	s	κ
8367	8404	s	k
8367	8407	s	U
8367	8458	s	K
8367	8363	.	α
8367	8363	.	a
8367	8436	s	A
8367	8404	s	λ
8367	8404	s	l
8367	8465	s	L
8368	8366	.	.
8368	8369	 	 
8368	8366	<~>	<~>
8368	8366	<split-s>	<split-s>
8368	8366	<split-h>	<split-h>
8368	8366	<name2>	<name2>
8368	8457	<aphaerese>	<aphaerese>
8368	8457	<>	<aphaerese>
8368	8366	<elision3>	<elision3>
8368	8457	<>	<elision3>
8368	8366	<elision2>	<elision2>
8368	8457	<>	<elision2>
8368	8366	<elision1>	<elision1>
8368	8457	<>	<elision1>
8368	8366	.	υ
8368	8366	.	u
8368	8388	.	κ
8368	8400	s	κ
8368	8406	s	k
8368	8409	s	U
8368	8460	s	K
8368	8366	.	α
8368	8366	.	a
8368	8438	s	A
8368	8406	s	λ
8368	8406	s	l
8368	8467	s	L
8369	8363	.	.
8369	8364	 	 
8369	8363	<~>	<~>
8369	8363	<split-s>	<split-s>
8369	8363	<split-h>	<split-h>
8369	8363	<name2>	<name2>
8369	8367	<aphaerese>	<aphaerese>
8369	8370	<>	<aphaerese>
8369	8363	<elision3>	<elision3>
8369	8370	<>	<elision3>
8369	8363	<elision2>	<elision2>
8369	8370	<>	<elision2>
8369	8363	<elision1>	<elision1>
8369	8370	<>	<elision1>
8369	8360	.	υ
8369	8447	s	υ
8369	8360	.	u
8369	8447	s	u
8369	8386	.	κ
8369	8448	s	κ
8369	8449	s	k
8369	8450	s	U
8369	8452	s	K
8369	8360	.	α
8369	8447	s	α
8369	8360	.	a
8369	8447	s	a
8369	8454	s	A
8369	8449	s	λ
8369	8449	s	l
8369	8455	s	L
8370	8363	.	.
8370	8364	 	 
8370	8363	<~>	<~>
8370	8363	<split-s>	<split-s>
8370	8363	<split-h>	<split-h>
8370	8363	<name2>	<name2>
8370	8365	<>	<name>
8370	8367	<aphaerese>	<aphaerese>
8370	8370	<>	<aphaerese>
8370	8363	<elision3>	<elision3>
8370	8370	<>	<elision3>
8370	8363	<elision2>	<elision2>
8370	8370	<>	<elision2>
8370	8363	<elision1>	<elision1>
8370	8370	<>	<elision1>
8370	8360	.	υ
8370	8371	s	υ
8370	8360	.	u
8370	8371	s	u
8370	8386	.	κ
8370	8398	s	κ
8370	8404	s	k
8370	8407	s	U
8370	8410	s	K
8370	8360	.	α
8370	8371	s	α
8370	8360	.	a
8370	8371	s	a
8370	8436	s	A
8370	8404	s	λ
8370	8404	s	l
8370	8439	s	L
8371	8372	.	.
8371	8372	 	 
8371	8372	<~>	<~>
8371	8372	<split-s>	<split-s>
8371	8372	<split-h>	<split-h>
8371	8372	<name2>	<name2>
8371	8384	<>	<name>
8371	8375	<aphaerese>	<aphaerese>
8371	8371	<>	<aphaerese>
8371	8371	<>	<elision3>
8371	8371	<>	<elision2>
8371	8371	<>	<elision1>
8371	8381	.	υ
8371	8381	.	u
8371	8378	.	κ
8371	8381	.	α
8371	8381	.	a
8371	6868	<3s>	<>
8372	8372	.	.
8372	8372	 	 
8372	8372	<~>	<~>
8372	8372	<split-s>	<split-s>
8372	8372	<split-h>	<split-h>
8372	8372	<name2>	<name2>
8372	8373	<>	<name>
8372	8375	<aphaerese>	<aphaerese>
8372	8372	<>	<aphaerese>
8372	8372	<elision3>	<elision3>
8372	8372	<>	<elision3>
8372	8372	<elision2>	<elision2>
8372	8372	<>	<elision2>
8372	8372	<elision1>	<elision1>
8372	8372	<>	<elision1>
8372	8381	.	υ
8372	8381	.	u
8372	8378	.	κ
8372	8381	.	α
8372	8381	.	a
8372	6863	<3s>	<>
8373	8374	.	.
8373	8374	 	 
8373	8374	<~>	<~>
8373	8374	<split-s>	<split-s>
8373	8374	<split-h>	<split-h>
8373	8374	<name2>	<name2>
8373	8377	<aphaerese>	<aphaerese>
8373	8374	<>	<aphaerese>
8373	8374	<elision3>	<elision3>
8373	8374	<>	<elision3>
8373	8374	<elision2>	<elision2>
8373	8374	<>	<elision2>
8373	8374	<elision1>	<elision1>
8373	8374	<>	<elision1>
8373	8383	.	υ
8373	8383	.	u
8373	8380	.	κ
8373	8383	.	α
8373	8383	.	a
8373	6864	<3s>	<>
8374	8372	.	.
8374	8372	 	 
8374	8372	<~>	<~>
8374	8372	<split-s>	<split-s>
8374	8372	<split-h>	<split-h>
8374	8372	<name2>	<name2>
8374	8375	<aphaerese>	<aphaerese>
8374	8372	<>	<aphaerese>
8374	8372	<elision3>	<elision3>
8374	8372	<>	<elision3>
8374	8372	<elision2>	<elision2>
8374	8372	<>	<elision2>
8374	8372	<elision1>	<elision1>
8374	8372	<>	<elision1>
8374	8381	.	υ
8374	8381	.	u
8374	8378	.	κ
8374	8381	.	α
8374	8381	.	a
8374	6862	<3s>	<>
8375	8372	.	.
8375	8372	 	 
8375	8372	<~>	<~>
8375	8372	<split-s>	<split-s>
8375	8372	<split-h>	<split-h>
8375	8372	<name2>	<name2>
8375	8376	<>	<name>
8375	8375	<aphaerese>	<aphaerese>
8375	8375	<>	<aphaerese>
8375	8372	<elision3>	<elision3>
8375	8375	<>	<elision3>
8375	8372	<elision2>	<elision2>
8375	8375	<>	<elision2>
8375	8372	<elision1>	<elision1>
8375	8375	<>	<elision1>
8375	8372	.	υ
8375	8372	.	u
8375	8378	.	κ
8375	8372	.	α
8375	8372	.	a
8375	6850	<3s>	<>
8376	8374	.	.
8376	8374	 	 
8376	8374	<~>	<~>
8376	8374	<split-s>	<split-s>
8376	8374	<split-h>	<split-h>
8376	8374	<name2>	<name2>
8376	8377	<aphaerese>	<aphaerese>
8376	8377	<>	<aphaerese>
8376	8374	<elision3>	<elision3>
8376	8377	<>	<elision3>
8376	8374	<elision2>	<elision2>
8376	8377	<>	<elision2>
8376	8374	<elision1>	<elision1>
8376	8377	<>	<elision1>
8376	8374	.	υ
8376	8374	.	u
8376	8380	.	κ
8376	8374	.	α
8376	8374	.	a
8376	6851	<3s>	<>
8377	8372	.	.
8377	8372	 	 
8377	8372	<~>	<~>
8377	8372	<split-s>	<split-s>
8377	8372	<split-h>	<split-h>
8377	8372	<name2>	<name2>
8377	8375	<aphaerese>	<aphaerese>
8377	8375	<>	<aphaerese>
8377	8372	<elision3>	<elision3>
8377	8375	<>	<elision3>
8377	8372	<elision2>	<elision2>
8377	8375	<>	<elision2>
8377	8372	<elision1>	<elision1>
8377	8375	<>	<elision1>
8377	8372	.	υ
8377	8372	.	u
8377	8378	.	κ
8377	8372	.	α
8377	8372	.	a
8377	6849	<3s>	<>
8378	8379	<>	<name>
8378	8378	<>	<aphaerese>
8378	6939	<elision3>	<elision3>
8378	8378	<>	<elision3>
8378	6939	<elision2>	<elision2>
8378	8378	<>	<elision2>
8378	6939	<elision1>	<elision1>
8378	8378	<>	<elision1>
8378	6847	<3s>	<>
8379	8380	<>	<aphaerese>
8379	6938	<elision3>	<elision3>
8379	8380	<>	<elision3>
8379	6938	<elision2>	<elision2>
8379	8380	<>	<elision2>
8379	6938	<elision1>	<elision1>
8379	8380	<>	<elision1>
8379	6848	<3s>	<>
8380	8378	<>	<aphaerese>
8380	6939	<elision3>	<elision3>
8380	8378	<>	<elision3>
8380	6939	<elision2>	<elision2>
8380	8378	<>	<elision2>
8380	6939	<elision1>	<elision1>
8380	8378	<>	<elision1>
8380	6846	<3s>	<>
8381	8382	<>	<name>
8381	8381	<>	<aphaerese>
8381	8372	<elision3>	<elision3>
8381	8381	<>	<elision3>
8381	8372	<elision2>	<elision2>
8381	8381	<>	<elision2>
8381	8372	<elision1>	<elision1>
8381	8381	<>	<elision1>
8381	140	<3s>	<>
8382	8383	<>	<aphaerese>
8382	8374	<elision3>	<elision3>
8382	8383	<>	<elision3>
8382	8374	<elision2>	<elision2>
8382	8383	<>	<elision2>
8382	8374	<elision1>	<elision1>
8382	8383	<>	<elision1>
8382	141	<3s>	<>
8383	8381	<>	<aphaerese>
8383	8372	<elision3>	<elision3>
8383	8381	<>	<elision3>
8383	8372	<elision2>	<elision2>
8383	8381	<>	<elision2>
8383	8372	<elision1>	<elision1>
8383	8381	<>	<elision1>
8383	139	<3s>	<>
8384	8374	.	.
8384	8374	 	 
8384	8374	<~>	<~>
8384	8374	<split-s>	<split-s>
8384	8374	<split-h>	<split-h>
8384	8374	<name2>	<name2>
8384	8377	<aphaerese>	<aphaerese>
8384	8385	<>	<aphaerese>
8384	8385	<>	<elision3>
8384	8385	<>	<elision2>
8384	8385	<>	<elision1>
8384	8383	.	υ
8384	8383	.	u
8384	8380	.	κ
8384	8383	.	α
8384	8383	.	a
8384	6869	<3s>	<>
8385	8372	.	.
8385	8372	 	 
8385	8372	<~>	<~>
8385	8372	<split-s>	<split-s>
8385	8372	<split-h>	<split-h>
8385	8372	<name2>	<name2>
8385	8375	<aphaerese>	<aphaerese>
8385	8371	<>	<aphaerese>
8385	8371	<>	<elision3>
8385	8371	<>	<elision2>
8385	8371	<>	<elision1>
8385	8381	.	υ
8385	8381	.	u
8385	8378	.	κ
8385	8381	.	α
8385	8381	.	a
8385	6867	<3s>	<>
8386	8387	<>	<name>
8386	8386	<>	<aphaerese>
8386	8389	<elision3>	<elision3>
8386	8386	<>	<elision3>
8386	8389	<elision2>	<elision2>
8386	8386	<>	<elision2>
8386	8389	<elision1>	<elision1>
8386	8386	<>	<elision1>
8387	8388	<>	<aphaerese>
8387	8391	<elision3>	<elision3>
8387	8388	<>	<elision3>
8387	8391	<elision2>	<elision2>
8387	8388	<>	<elision2>
8387	8391	<elision1>	<elision1>
8387	8388	<>	<elision1>
8388	8386	<>	<aphaerese>
8388	8389	<elision3>	<elision3>
8388	8386	<>	<elision3>
8388	8389	<elision2>	<elision2>
8388	8386	<>	<elision2>
8388	8389	<elision1>	<elision1>
8388	8386	<>	<elision1>
8389	8390	<>	<name>
8389	8389	<>	<aphaerese>
8389	8389	<>	<elision3>
8389	8389	<>	<elision2>
8389	8389	<>	<elision1>
8389	7280	s	κ
8389	7280	s	k
8389	8392	s	K
8389	7280	s	λ
8389	7280	s	l
8389	8395	s	L
8390	8391	<>	<aphaerese>
8390	8391	<>	<elision3>
8390	8391	<>	<elision2>
8390	8391	<>	<elision1>
8390	7279	s	κ
8390	7279	s	k
8390	8394	s	K
8390	7279	s	λ
8390	7279	s	l
8390	8397	s	L
8391	8389	<>	<aphaerese>
8391	8389	<>	<elision3>
8391	8389	<>	<elision2>
8391	8389	<>	<elision1>
8391	7280	s	κ
8391	7280	s	k
8391	8392	s	K
8391	7280	s	λ
8391	7280	s	l
8391	8395	s	L
8392	8393	<>	<name>
8392	8392	<>	<aphaerese>
8392	8392	<>	<elision3>
8392	8392	<>	<elision2>
8392	8392	<>	<elision1>
8392	7280	<K2kl>	<>
8393	8394	<>	<aphaerese>
8393	8394	<>	<elision3>
8393	8394	<>	<elision2>
8393	8394	<>	<elision1>
8393	7281	<K2kl>	<>
8394	8392	<>	<aphaerese>
8394	8392	<>	<elision3>
8394	8392	<>	<elision2>
8394	8392	<>	<elision1>
8394	7279	<K2kl>	<>
8395	8396	<>	<name>
8395	8395	<>	<aphaerese>
8395	8395	<>	<elision3>
8395	8395	<>	<elision2>
8395	8395	<>	<elision1>
8395	7280	<L2kl>	<>
8396	8397	<>	<aphaerese>
8396	8397	<>	<elision3>
8396	8397	<>	<elision2>
8396	8397	<>	<elision1>
8396	7281	<L2kl>	<>
8397	8395	<>	<aphaerese>
8397	8395	<>	<elision3>
8397	8395	<>	<elision2>
8397	8395	<>	<elision1>
8397	7279	<L2kl>	<>
8398	8372	.	.
8398	8372	 	 
8398	8372	<~>	<~>
8398	8372	<split-s>	<split-s>
8398	8372	<split-h>	<split-h>
8398	8372	<name2>	<name2>
8398	8399	<>	<name>
8398	8375	<aphaerese>	<aphaerese>
8398	8398	<>	<aphaerese>
8398	8401	<elision3>	<elision3>
8398	8398	<>	<elision3>
8398	8401	<elision2>	<elision2>
8398	8398	<>	<elision2>
8398	8401	<elision1>	<elision1>
8398	8398	<>	<elision1>
8398	8381	.	υ
8398	8381	.	u
8398	8381	.	κ
8398	8381	.	α
8398	8381	.	a
8398	8381	.	λ
8398	7048	<3s>	<>
8399	8374	.	.
8399	8374	 	 
8399	8374	<~>	<~>
8399	8374	<split-s>	<split-s>
8399	8374	<split-h>	<split-h>
8399	8374	<name2>	<name2>
8399	8377	<aphaerese>	<aphaerese>
8399	8400	<>	<aphaerese>
8399	8403	<elision3>	<elision3>
8399	8400	<>	<elision3>
8399	8403	<elision2>	<elision2>
8399	8400	<>	<elision2>
8399	8403	<elision1>	<elision1>
8399	8400	<>	<elision1>
8399	8383	.	υ
8399	8383	.	u
8399	8383	.	κ
8399	8383	.	α
8399	8383	.	a
8399	8383	.	λ
8399	7049	<3s>	<>
8400	8372	.	.
8400	8372	 	 
8400	8372	<~>	<~>
8400	8372	<split-s>	<split-s>
8400	8372	<split-h>	<split-h>
8400	8372	<name2>	<name2>
8400	8375	<aphaerese>	<aphaerese>
8400	8398	<>	<aphaerese>
8400	8401	<elision3>	<elision3>
8400	8398	<>	<elision3>
8400	8401	<elision2>	<elision2>
8400	8398	<>	<elision2>
8400	8401	<elision1>	<elision1>
8400	8398	<>	<elision1>
8400	8381	.	υ
8400	8381	.	u
8400	8381	.	κ
8400	8381	.	α
8400	8381	.	a
8400	8381	.	λ
8400	7047	<3s>	<>
8401	8372	.	.
8401	8372	 	 
8401	8372	<~>	<~>
8401	8372	<split-s>	<split-s>
8401	8372	<split-h>	<split-h>
8401	8372	<name2>	<name2>
8401	8402	<>	<name>
8401	8375	<aphaerese>	<aphaerese>
8401	8401	<>	<aphaerese>
8401	8372	<elision3>	<elision3>
8401	8401	<>	<elision3>
8401	8372	<elision2>	<elision2>
8401	8401	<>	<elision2>
8401	8372	<elision1>	<elision1>
8401	8401	<>	<elision1>
8401	8381	.	υ
8401	8381	.	u
8401	8378	.	κ
8401	8381	.	α
8401	8381	.	a
8401	6951	<3s>	<>
8402	8374	.	.
8402	8374	 	 
8402	8374	<~>	<~>
8402	8374	<split-s>	<split-s>
8402	8374	<split-h>	<split-h>
8402	8374	<name2>	<name2>
8402	8377	<aphaerese>	<aphaerese>
8402	8403	<>	<aphaerese>
8402	8374	<elision3>	<elision3>
8402	8403	<>	<elision3>
8402	8374	<elision2>	<elision2>
8402	8403	<>	<elision2>
8402	8374	<elision1>	<elision1>
8402	8403	<>	<elision1>
8402	8383	.	υ
8402	8383	.	u
8402	8380	.	κ
8402	8383	.	α
8402	8383	.	a
8402	6952	<3s>	<>
8403	8372	.	.
8403	8372	 	 
8403	8372	<~>	<~>
8403	8372	<split-s>	<split-s>
8403	8372	<split-h>	<split-h>
8403	8372	<name2>	<name2>
8403	8375	<aphaerese>	<aphaerese>
8403	8401	<>	<aphaerese>
8403	8372	<elision3>	<elision3>
8403	8401	<>	<elision3>
8403	8372	<elision2>	<elision2>
8403	8401	<>	<elision2>
8403	8372	<elision1>	<elision1>
8403	8401	<>	<elision1>
8403	8381	.	υ
8403	8381	.	u
8403	8378	.	κ
8403	8381	.	α
8403	8381	.	a
8403	6950	<3s>	<>
8404	8372	.	.
8404	8372	 	 
8404	8372	<~>	<~>
8404	8372	<split-s>	<split-s>
8404	8372	<split-h>	<split-h>
8404	8372	<name2>	<name2>
8404	8405	<>	<name>
8404	8375	<aphaerese>	<aphaerese>
8404	8404	<>	<aphaerese>
8404	8372	<elision3>	<elision3>
8404	8404	<>	<elision3>
8404	8372	<elision2>	<elision2>
8404	8404	<>	<elision2>
8404	8372	<elision1>	<elision1>
8404	8404	<>	<elision1>
8404	8381	.	υ
8404	8381	.	u
8404	8381	.	κ
8404	8381	.	α
8404	8381	.	a
8404	8381	.	λ
8404	7060	<3s>	<>
8405	8374	.	.
8405	8374	 	 
8405	8374	<~>	<~>
8405	8374	<split-s>	<split-s>
8405	8374	<split-h>	<split-h>
8405	8374	<name2>	<name2>
8405	8377	<aphaerese>	<aphaerese>
8405	8406	<>	<aphaerese>
8405	8374	<elision3>	<elision3>
8405	8406	<>	<elision3>
8405	8374	<elision2>	<elision2>
8405	8406	<>	<elision2>
8405	8374	<elision1>	<elision1>
8405	8406	<>	<elision1>
8405	8383	.	υ
8405	8383	.	u
8405	8383	.	κ
8405	8383	.	α
8405	8383	.	a
8405	8383	.	λ
8405	7061	<3s>	<>
8406	8372	.	.
8406	8372	 	 
8406	8372	<~>	<~>
8406	8372	<split-s>	<split-s>
8406	8372	<split-h>	<split-h>
8406	8372	<name2>	<name2>
8406	8375	<aphaerese>	<aphaerese>
8406	8404	<>	<aphaerese>
8406	8372	<elision3>	<elision3>
8406	8404	<>	<elision3>
8406	8372	<elision2>	<elision2>
8406	8404	<>	<elision2>
8406	8372	<elision1>	<elision1>
8406	8404	<>	<elision1>
8406	8381	.	υ
8406	8381	.	u
8406	8381	.	κ
8406	8381	.	α
8406	8381	.	a
8406	8381	.	λ
8406	7059	<3s>	<>
8407	8408	<>	<name>
8407	8407	<>	<aphaerese>
8407	8407	<>	<elision3>
8407	8407	<>	<elision2>
8407	8407	<>	<elision1>
8407	8372	<U2kl>	<>
8408	8409	<>	<aphaerese>
8408	8409	<>	<elision3>
8408	8409	<>	<elision2>
8408	8409	<>	<elision1>
8408	8373	<U2kl>	<>
8409	8407	<>	<aphaerese>
8409	8407	<>	<elision3>
8409	8407	<>	<elision2>
8409	8407	<>	<elision1>
8409	8374	<U2kl>	<>
8410	7370	<name>	<name>
8410	8411	<>	<name>
8410	8413	<>	<aphaerese>
8410	8413	<>	<elision3>
8410	8413	<>	<elision2>
8410	8413	<>	<elision1>
8410	7180	<3s>	<>
8410	8414	<A2kl>	<>
8410	8423	<L2kl>	<>
8410	8435	<K2kl>	<>
8411	8412	<>	<aphaerese>
8411	8412	<>	<elision3>
8411	8412	<>	<elision2>
8411	8412	<>	<elision1>
8411	8415	<A2kl>	<>
8411	8424	<L2kl>	<>
8411	8433	<K2kl>	<>
8412	8413	<>	<aphaerese>
8412	8413	<>	<elision3>
8412	8413	<>	<elision2>
8412	8413	<>	<elision1>
8412	8416	<A2kl>	<>
8412	8425	<L2kl>	<>
8412	8434	<K2kl>	<>
8413	8411	<>	<name>
8413	8413	<>	<aphaerese>
8413	8413	<>	<elision3>
8413	8413	<>	<elision2>
8413	8413	<>	<elision1>
8413	8414	<A2kl>	<>
8413	8423	<L2kl>	<>
8413	8432	<K2kl>	<>
8414	8415	<>	<name>
8414	8414	<>	<aphaerese>
8414	8414	<>	<elision3>
8414	8414	<>	<elision2>
8414	8414	<>	<elision1>
8414	8417	.	κ
8414	8417	.	λ
8414	7130	<3s>	<>
8415	8416	<>	<aphaerese>
8415	8416	<>	<elision3>
8415	8416	<>	<elision2>
8415	8416	<>	<elision1>
8415	8419	.	κ
8415	8419	.	λ
8415	7131	<3s>	<>
8416	8414	<>	<aphaerese>
8416	8414	<>	<elision3>
8416	8414	<>	<elision2>
8416	8414	<>	<elision1>
8416	8417	.	κ
8416	8417	.	λ
8416	7129	<3s>	<>
8417	8418	<>	<name>
8417	8417	<>	<aphaerese>
8417	8420	<elision3>	<elision3>
8417	8417	<>	<elision3>
8417	8420	<elision2>	<elision2>
8417	8417	<>	<elision2>
8417	8420	<elision1>	<elision1>
8417	8417	<>	<elision1>
8417	7121	<3s>	<>
8418	8419	<>	<aphaerese>
8418	8422	<elision3>	<elision3>
8418	8419	<>	<elision3>
8418	8422	<elision2>	<elision2>
8418	8419	<>	<elision2>
8418	8422	<elision1>	<elision1>
8418	8419	<>	<elision1>
8418	7122	<3s>	<>
8419	8417	<>	<aphaerese>
8419	8420	<elision3>	<elision3>
8419	8417	<>	<elision3>
8419	8420	<elision2>	<elision2>
8419	8417	<>	<elision2>
8419	8420	<elision1>	<elision1>
8419	8417	<>	<elision1>
8419	7120	<3s>	<>
8420	8372	.	.
8420	8372	 	 
8420	8372	<~>	<~>
8420	8372	<split-s>	<split-s>
8420	8372	<split-h>	<split-h>
8420	8372	<name2>	<name2>
8420	8421	<>	<name>
8420	8375	<aphaerese>	<aphaerese>
8420	8420	<>	<aphaerese>
8420	8372	<elision3>	<elision3>
8420	8420	<>	<elision3>
8420	8372	<elision2>	<elision2>
8420	8420	<>	<elision2>
8420	8372	<elision1>	<elision1>
8420	8420	<>	<elision1>
8420	8381	.	υ
8420	8381	.	u
8420	8381	.	α
8420	8381	.	a
8420	7085	<3s>	<>
8421	8374	.	.
8421	8374	 	 
8421	8374	<~>	<~>
8421	8374	<split-s>	<split-s>
8421	8374	<split-h>	<split-h>
8421	8374	<name2>	<name2>
8421	8377	<aphaerese>	<aphaerese>
8421	8422	<>	<aphaerese>
8421	8374	<elision3>	<elision3>
8421	8422	<>	<elision3>
8421	8374	<elision2>	<elision2>
8421	8422	<>	<elision2>
8421	8374	<elision1>	<elision1>
8421	8422	<>	<elision1>
8421	8383	.	υ
8421	8383	.	u
8421	8383	.	α
8421	8383	.	a
8421	7086	<3s>	<>
8422	8372	.	.
8422	8372	 	 
8422	8372	<~>	<~>
8422	8372	<split-s>	<split-s>
8422	8372	<split-h>	<split-h>
8422	8372	<name2>	<name2>
8422	8375	<aphaerese>	<aphaerese>
8422	8420	<>	<aphaerese>
8422	8372	<elision3>	<elision3>
8422	8420	<>	<elision3>
8422	8372	<elision2>	<elision2>
8422	8420	<>	<elision2>
8422	8372	<elision1>	<elision1>
8422	8420	<>	<elision1>
8422	8381	.	υ
8422	8381	.	u
8422	8381	.	α
8422	8381	.	a
8422	7084	<3s>	<>
8423	8424	<>	<name>
8423	8423	<>	<aphaerese>
8423	8423	<>	<elision3>
8423	8423	<>	<elision2>
8423	8423	<>	<elision1>
8423	8426	.	κ
8423	8426	.	λ
8423	7163	<3s>	<>
8424	8425	<>	<aphaerese>
8424	8425	<>	<elision3>
8424	8425	<>	<elision2>
8424	8425	<>	<elision1>
8424	8428	.	κ
8424	8428	.	λ
8424	7164	<3s>	<>
8425	8423	<>	<aphaerese>
8425	8423	<>	<elision3>
8425	8423	<>	<elision2>
8425	8423	<>	<elision1>
8425	8426	.	κ
8425	8426	.	λ
8425	7162	<3s>	<>
8426	8427	<>	<name>
8426	8426	<>	<aphaerese>
8426	8429	<elision3>	<elision3>
8426	8426	<>	<elision3>
8426	8429	<elision2>	<elision2>
8426	8426	<>	<elision2>
8426	8429	<elision1>	<elision1>
8426	8426	<>	<elision1>
8426	7154	<3s>	<>
8427	8428	<>	<aphaerese>
8427	8431	<elision3>	<elision3>
8427	8428	<>	<elision3>
8427	8431	<elision2>	<elision2>
8427	8428	<>	<elision2>
8427	8431	<elision1>	<elision1>
8427	8428	<>	<elision1>
8427	7155	<3s>	<>
8428	8426	<>	<aphaerese>
8428	8429	<elision3>	<elision3>
8428	8426	<>	<elision3>
8428	8429	<elision2>	<elision2>
8428	8426	<>	<elision2>
8428	8429	<elision1>	<elision1>
8428	8426	<>	<elision1>
8428	7153	<3s>	<>
8429	8430	<>	<name>
8429	8429	<>	<aphaerese>
8429	8429	<>	<elision3>
8429	8429	<>	<elision2>
8429	8429	<>	<elision1>
8429	8378	.	κ
8429	7148	<3s>	<>
8430	8431	<>	<aphaerese>
8430	8431	<>	<elision3>
8430	8431	<>	<elision2>
8430	8431	<>	<elision1>
8430	8380	.	κ
8430	7149	<3s>	<>
8431	8429	<>	<aphaerese>
8431	8429	<>	<elision3>
8431	8429	<>	<elision2>
8431	8429	<>	<elision1>
8431	8378	.	κ
8431	7147	<3s>	<>
8432	8372	.	.
8432	8372	 	 
8432	8372	<~>	<~>
8432	8372	<split-s>	<split-s>
8432	8372	<split-h>	<split-h>
8432	8372	<name2>	<name2>
8432	8433	<>	<name>
8432	8375	<aphaerese>	<aphaerese>
8432	8432	<>	<aphaerese>
8432	8372	<elision3>	<elision3>
8432	8432	<>	<elision3>
8432	8372	<elision2>	<elision2>
8432	8432	<>	<elision2>
8432	8372	<elision1>	<elision1>
8432	8432	<>	<elision1>
8432	8381	.	υ
8432	8381	.	u
8432	8381	.	α
8432	8381	.	a
8432	7175	<3s>	<>
8433	8374	.	.
8433	8374	 	 
8433	8374	<~>	<~>
8433	8374	<split-s>	<split-s>
8433	8374	<split-h>	<split-h>
8433	8374	<name2>	<name2>
8433	8377	<aphaerese>	<aphaerese>
8433	8434	<>	<aphaerese>
8433	8374	<elision3>	<elision3>
8433	8434	<>	<elision3>
8433	8374	<elision2>	<elision2>
8433	8434	<>	<elision2>
8433	8374	<elision1>	<elision1>
8433	8434	<>	<elision1>
8433	8383	.	υ
8433	8383	.	u
8433	8383	.	α
8433	8383	.	a
8433	7176	<3s>	<>
8434	8372	.	.
8434	8372	 	 
8434	8372	<~>	<~>
8434	8372	<split-s>	<split-s>
8434	8372	<split-h>	<split-h>
8434	8372	<name2>	<name2>
8434	8375	<aphaerese>	<aphaerese>
8434	8432	<>	<aphaerese>
8434	8372	<elision3>	<elision3>
8434	8432	<>	<elision3>
8434	8372	<elision2>	<elision2>
8434	8432	<>	<elision2>
8434	8372	<elision1>	<elision1>
8434	8432	<>	<elision1>
8434	8381	.	υ
8434	8381	.	u
8434	8381	.	α
8434	8381	.	a
8434	7174	<3s>	<>
8435	8372	.	.
8435	8372	 	 
8435	8372	<~>	<~>
8435	8372	<split-s>	<split-s>
8435	8372	<split-h>	<split-h>
8435	8372	<name2>	<name2>
8435	7370	<name2>	<name>
8435	8433	<>	<name>
8435	8375	<aphaerese>	<aphaerese>
8435	8432	<>	<aphaerese>
8435	8372	<elision3>	<elision3>
8435	8432	<>	<elision3>
8435	8372	<elision2>	<elision2>
8435	8432	<>	<elision2>
8435	8372	<elision1>	<elision1>
8435	8432	<>	<elision1>
8435	8381	.	υ
8435	8381	.	u
8435	8381	.	α
8435	8381	.	a
8435	7184	<3s>	<>
8436	8437	<>	<name>
8436	8436	<>	<aphaerese>
8436	8436	<>	<elision3>
8436	8436	<>	<elision2>
8436	8436	<>	<elision1>
8436	8372	<A2kl>	<>
8437	8438	<>	<aphaerese>
8437	8438	<>	<elision3>
8437	8438	<>	<elision2>
8437	8438	<>	<elision1>
8437	8373	<A2kl>	<>
8438	8436	<>	<aphaerese>
8438	8436	<>	<elision3>
8438	8436	<>	<elision2>
8438	8436	<>	<elision1>
8438	8374	<A2kl>	<>
8439	7370	<name>	<name>
8439	8440	<>	<name>
8439	8442	<>	<aphaerese>
8439	8442	<>	<elision3>
8439	8442	<>	<elision2>
8439	8442	<>	<elision1>
8439	7180	<3s>	<>
8439	8414	<A2kl>	<>
8439	8446	<L2kl>	<>
8440	8441	<>	<aphaerese>
8440	8441	<>	<elision3>
8440	8441	<>	<elision2>
8440	8441	<>	<elision1>
8440	8415	<A2kl>	<>
8440	8444	<L2kl>	<>
8441	8442	<>	<aphaerese>
8441	8442	<>	<elision3>
8441	8442	<>	<elision2>
8441	8442	<>	<elision1>
8441	8416	<A2kl>	<>
8441	8445	<L2kl>	<>
8442	8440	<>	<name>
8442	8442	<>	<aphaerese>
8442	8442	<>	<elision3>
8442	8442	<>	<elision2>
8442	8442	<>	<elision1>
8442	8414	<A2kl>	<>
8442	8443	<L2kl>	<>
8443	8372	.	.
8443	8372	 	 
8443	8372	<~>	<~>
8443	8372	<split-s>	<split-s>
8443	8372	<split-h>	<split-h>
8443	8372	<name2>	<name2>
8443	8444	<>	<name>
8443	8375	<aphaerese>	<aphaerese>
8443	8443	<>	<aphaerese>
8443	8372	<elision3>	<elision3>
8443	8443	<>	<elision3>
8443	8372	<elision2>	<elision2>
8443	8443	<>	<elision2>
8443	8372	<elision1>	<elision1>
8443	8443	<>	<elision1>
8443	8381	.	υ
8443	8381	.	u
8443	8426	.	κ
8443	8381	.	α
8443	8381	.	a
8443	8426	.	λ
8443	7197	<3s>	<>
8444	8374	.	.
8444	8374	 	 
8444	8374	<~>	<~>
8444	8374	<split-s>	<split-s>
8444	8374	<split-h>	<split-h>
8444	8374	<name2>	<name2>
8444	8377	<aphaerese>	<aphaerese>
8444	8445	<>	<aphaerese>
8444	8374	<elision3>	<elision3>
8444	8445	<>	<elision3>
8444	8374	<elision2>	<elision2>
8444	8445	<>	<elision2>
8444	8374	<elision1>	<elision1>
8444	8445	<>	<elision1>
8444	8383	.	υ
8444	8383	.	u
8444	8428	.	κ
8444	8383	.	α
8444	8383	.	a
8444	8428	.	λ
8444	7198	<3s>	<>
8445	8372	.	.
8445	8372	 	 
8445	8372	<~>	<~>
8445	8372	<split-s>	<split-s>
8445	8372	<split-h>	<split-h>
8445	8372	<name2>	<name2>
8445	8375	<aphaerese>	<aphaerese>
8445	8443	<>	<aphaerese>
8445	8372	<elision3>	<elision3>
8445	8443	<>	<elision3>
8445	8372	<elision2>	<elision2>
8445	8443	<>	<elision2>
8445	8372	<elision1>	<elision1>
8445	8443	<>	<elision1>
8445	8381	.	υ
8445	8381	.	u
8445	8426	.	κ
8445	8381	.	α
8445	8381	.	a
8445	8426	.	λ
8445	7196	<3s>	<>
8446	8372	.	.
8446	8372	 	 
8446	8372	<~>	<~>
8446	8372	<split-s>	<split-s>
8446	8372	<split-h>	<split-h>
8446	8372	<name2>	<name2>
8446	7370	<name2>	<name>
8446	8444	<>	<name>
8446	8375	<aphaerese>	<aphaerese>
8446	8443	<>	<aphaerese>
8446	8372	<elision3>	<elision3>
8446	8443	<>	<elision3>
8446	8372	<elision2>	<elision2>
8446	8443	<>	<elision2>
8446	8372	<elision1>	<elision1>
8446	8443	<>	<elision1>
8446	8381	.	υ
8446	8381	.	u
8446	8426	.	κ
8446	8381	.	α
8446	8381	.	a
8446	8426	.	λ
8446	7203	<3s>	<>
8447	8372	.	.
8447	8372	 	 
8447	8372	<~>	<~>
8447	8372	<split-s>	<split-s>
8447	8372	<split-h>	<split-h>
8447	8372	<name2>	<name2>
8447	8384	<>	<name>
8447	8375	<aphaerese>	<aphaerese>
8447	8371	<>	<aphaerese>
8447	8371	<>	<elision3>
8447	8371	<>	<elision2>
8447	8371	<>	<elision1>
8447	8381	.	υ
8447	8381	.	u
8447	8378	.	κ
8447	8381	.	α
8447	8381	.	a
8447	7209	<3s>	<>
8448	8372	.	.
8448	8372	 	 
8448	8372	<~>	<~>
8448	8372	<split-s>	<split-s>
8448	8372	<split-h>	<split-h>
8448	8372	<name2>	<name2>
8448	8399	<>	<name>
8448	8375	<aphaerese>	<aphaerese>
8448	8398	<>	<aphaerese>
8448	8401	<elision3>	<elision3>
8448	8398	<>	<elision3>
8448	8401	<elision2>	<elision2>
8448	8398	<>	<elision2>
8448	8401	<elision1>	<elision1>
8448	8398	<>	<elision1>
8448	8381	.	υ
8448	8381	.	u
8448	8381	.	κ
8448	8381	.	α
8448	8381	.	a
8448	8381	.	λ
8448	7212	<3s>	<>
8449	8372	.	.
8449	8372	 	 
8449	8372	<~>	<~>
8449	8372	<split-s>	<split-s>
8449	8372	<split-h>	<split-h>
8449	8372	<name2>	<name2>
8449	8405	<>	<name>
8449	8375	<aphaerese>	<aphaerese>
8449	8404	<>	<aphaerese>
8449	8372	<elision3>	<elision3>
8449	8404	<>	<elision3>
8449	8372	<elision2>	<elision2>
8449	8404	<>	<elision2>
8449	8372	<elision1>	<elision1>
8449	8404	<>	<elision1>
8449	8381	.	υ
8449	8381	.	u
8449	8381	.	κ
8449	8381	.	α
8449	8381	.	a
8449	8381	.	λ
8449	7215	<3s>	<>
8450	8408	<>	<name>
8450	8407	<>	<aphaerese>
8450	8407	<>	<elision3>
8450	8407	<>	<elision2>
8450	8407	<>	<elision1>
8450	8451	<U2kl>	<>
8451	8372	.	.
8451	8372	 	 
8451	8372	<~>	<~>
8451	8372	<split-s>	<split-s>
8451	8372	<split-h>	<split-h>
8451	8372	<name2>	<name2>
8451	8373	<>	<name>
8451	8375	<aphaerese>	<aphaerese>
8451	8372	<>	<aphaerese>
8451	8372	<elision3>	<elision3>
8451	8372	<>	<elision3>
8451	8372	<elision2>	<elision2>
8451	8372	<>	<elision2>
8451	8372	<elision1>	<elision1>
8451	8372	<>	<elision1>
8451	8381	.	υ
8451	8381	.	u
8451	8378	.	κ
8451	8381	.	α
8451	8381	.	a
8451	7219	<3s>	<>
8452	7370	<name>	<name>
8452	8411	<>	<name>
8452	8413	<>	<aphaerese>
8452	8413	<>	<elision3>
8452	8413	<>	<elision2>
8452	8413	<>	<elision1>
8452	7180	<3s>	<>
8452	8414	<A2kl>	<>
8452	8423	<L2kl>	<>
8452	8453	<K2kl>	<>
8453	8372	.	.
8453	8372	 	 
8453	8372	<~>	<~>
8453	8372	<split-s>	<split-s>
8453	8372	<split-h>	<split-h>
8453	8372	<name2>	<name2>
8453	7370	<name2>	<name>
8453	8433	<>	<name>
8453	8375	<aphaerese>	<aphaerese>
8453	8432	<>	<aphaerese>
8453	8372	<elision3>	<elision3>
8453	8432	<>	<elision3>
8453	8372	<elision2>	<elision2>
8453	8432	<>	<elision2>
8453	8372	<elision1>	<elision1>
8453	8432	<>	<elision1>
8453	8381	.	υ
8453	8381	.	u
8453	8381	.	α
8453	8381	.	a
8453	7223	<3s>	<>
8454	8437	<>	<name>
8454	8436	<>	<aphaerese>
8454	8436	<>	<elision3>
8454	8436	<>	<elision2>
8454	8436	<>	<elision1>
8454	8451	<A2kl>	<>
8455	7370	<name>	<name>
8455	8440	<>	<name>
8455	8442	<>	<aphaerese>
8455	8442	<>	<elision3>
8455	8442	<>	<elision2>
8455	8442	<>	<elision1>
8455	7180	<3s>	<>
8455	8414	<A2kl>	<>
8455	8456	<L2kl>	<>
8456	8372	.	.
8456	8372	 	 
8456	8372	<~>	<~>
8456	8372	<split-s>	<split-s>
8456	8372	<split-h>	<split-h>
8456	8372	<name2>	<name2>
8456	7370	<name2>	<name>
8456	8444	<>	<name>
8456	8375	<aphaerese>	<aphaerese>
8456	8443	<>	<aphaerese>
8456	8372	<elision3>	<elision3>
8456	8443	<>	<elision3>
8456	8372	<elision2>	<elision2>
8456	8443	<>	<elision2>
8456	8372	<elision1>	<elision1>
8456	8443	<>	<elision1>
8456	8381	.	υ
8456	8381	.	u
8456	8426	.	κ
8456	8381	.	α
8456	8381	.	a
8456	8426	.	λ
8456	7228	<3s>	<>
8457	8363	.	.
8457	8364	 	 
8457	8363	<~>	<~>
8457	8363	<split-s>	<split-s>
8457	8363	<split-h>	<split-h>
8457	8363	<name2>	<name2>
8457	8367	<aphaerese>	<aphaerese>
8457	8367	<>	<aphaerese>
8457	8363	<elision3>	<elision3>
8457	8367	<>	<elision3>
8457	8363	<elision2>	<elision2>
8457	8367	<>	<elision2>
8457	8363	<elision1>	<elision1>
8457	8367	<>	<elision1>
8457	8363	.	υ
8457	8363	.	u
8457	8386	.	κ
8457	8398	s	κ
8457	8404	s	k
8457	8407	s	U
8457	8458	s	K
8457	8363	.	α
8457	8363	.	a
8457	8436	s	A
8457	8404	s	λ
8457	8404	s	l
8457	8465	s	L
8458	7370	<name>	<name>
8458	8459	<>	<name>
8458	8461	<>	<aphaerese>
8458	8461	<>	<elision3>
8458	8461	<>	<elision2>
8458	8461	<>	<elision1>
8458	7180	<3s>	<>
8458	8462	<L2kl>	<>
8458	8435	<K2kl>	<>
8459	8460	<>	<aphaerese>
8459	8460	<>	<elision3>
8459	8460	<>	<elision2>
8459	8460	<>	<elision1>
8459	8463	<L2kl>	<>
8459	8433	<K2kl>	<>
8460	8461	<>	<aphaerese>
8460	8461	<>	<elision3>
8460	8461	<>	<elision2>
8460	8461	<>	<elision1>
8460	8464	<L2kl>	<>
8460	8434	<K2kl>	<>
8461	8459	<>	<name>
8461	8461	<>	<aphaerese>
8461	8461	<>	<elision3>
8461	8461	<>	<elision2>
8461	8461	<>	<elision1>
8461	8462	<L2kl>	<>
8461	8432	<K2kl>	<>
8462	8463	<>	<name>
8462	8462	<>	<aphaerese>
8462	8462	<>	<elision3>
8462	8462	<>	<elision2>
8462	8462	<>	<elision1>
8462	8381	.	κ
8462	8381	.	λ
8462	7239	<3s>	<>
8463	8464	<>	<aphaerese>
8463	8464	<>	<elision3>
8463	8464	<>	<elision2>
8463	8464	<>	<elision1>
8463	8383	.	κ
8463	8383	.	λ
8463	7240	<3s>	<>
8464	8462	<>	<aphaerese>
8464	8462	<>	<elision3>
8464	8462	<>	<elision2>
8464	8462	<>	<elision1>
8464	8381	.	κ
8464	8381	.	λ
8464	7238	<3s>	<>
8465	7370	<name>	<name>
8465	8466	<>	<name>
8465	8468	<>	<aphaerese>
8465	8468	<>	<elision3>
8465	8468	<>	<elision2>
8465	8468	<>	<elision1>
8465	7180	<3s>	<>
8465	8469	<L2kl>	<>
8466	8467	<>	<aphaerese>
8466	8467	<>	<elision3>
8466	8467	<>	<elision2>
8466	8467	<>	<elision1>
8466	8405	<L2kl>	<>
8467	8468	<>	<aphaerese>
8467	8468	<>	<elision3>
8467	8468	<>	<elision2>
8467	8468	<>	<elision1>
8467	8406	<L2kl>	<>
8468	8466	<>	<name>
8468	8468	<>	<aphaerese>
8468	8468	<>	<elision3>
8468	8468	<>	<elision2>
8468	8468	<>	<elision1>
8468	8404	<L2kl>	<>
8469	8372	.	.
8469	8372	 	 
8469	8372	<~>	<~>
8469	8372	<split-s>	<split-s>
8469	8372	<split-h>	<split-h>
8469	8372	<name2>	<name2>
8469	7370	<name2>	<name>
8469	8405	<>	<name>
8469	8375	<aphaerese>	<aphaerese>
8469	8404	<>	<aphaerese>
8469	8372	<elision3>	<elision3>
8469	8404	<>	<elision3>
8469	8372	<elision2>	<elision2>
8469	8404	<>	<elision2>
8469	8372	<elision1>	<elision1>
8469	8404	<>	<elision1>
8469	8381	.	υ
8469	8381	.	u
8469	8381	.	κ
8469	8381	.	α
8469	8381	.	a
8469	8381	.	λ
8469	7249	<3s>	<>
8470	8363	.	.
8470	8364	 	 
8470	8363	<~>	<~>
8470	8363	<split-s>	<split-s>
8470	8363	<split-h>	<split-h>
8470	8363	<name2>	<name2>
8470	8367	<aphaerese>	<aphaerese>
8470	8370	<>	<aphaerese>
8470	8363	<elision3>	<elision3>
8470	8370	<>	<elision3>
8470	8363	<elision2>	<elision2>
8470	8370	<>	<elision2>
8470	8363	<elision1>	<elision1>
8470	8370	<>	<elision1>
8470	8360	.	υ
8470	8371	s	υ
8470	8360	.	u
8470	8371	s	u
8470	8386	.	κ
8470	8398	s	κ
8470	8404	s	k
8470	8407	s	U
8470	8410	s	K
8470	8360	.	α
8470	8371	s	α
8470	8360	.	a
8470	8371	s	a
8470	8436	s	A
8470	8404	s	λ
8470	8404	s	l
8470	8439	s	L
8471	8366	.	.
8471	8369	 	 
8471	8366	<~>	<~>
8471	8366	<split-s>	<split-s>
8471	8366	<split-h>	<split-h>
8471	8366	<name2>	<name2>
8471	8457	<aphaerese>	<aphaerese>
8471	8366	<>	<aphaerese>
8471	8366	<elision3>	<elision3>
8471	8366	<>	<elision3>
8471	8366	<elision2>	<elision2>
8471	8366	<>	<elision2>
8471	8366	<elision1>	<elision1>
8471	8366	<>	<elision1>
8471	8362	.	υ
8471	8385	s	υ
8471	8362	.	u
8471	8385	s	u
8471	8388	.	κ
8471	8400	s	κ
8471	8406	s	k
8471	8409	s	U
8471	8460	s	K
8471	8362	.	α
8471	8385	s	α
8471	8362	.	a
8471	8385	s	a
8471	8438	s	A
8471	8406	s	λ
8471	8406	s	l
8471	8467	s	L
8472	8363	.	.
8472	8364	 	 
8472	8363	<~>	<~>
8472	8363	<split-s>	<split-s>
8472	8363	<split-h>	<split-h>
8472	8363	<name2>	<name2>
8472	8473	<name2>	<name>
8472	8474	<>	<name>
8472	8367	<aphaerese>	<aphaerese>
8472	8476	<>	<aphaerese>
8472	8363	<elision3>	<elision3>
8472	8476	<>	<elision3>
8472	8363	<elision2>	<elision2>
8472	8476	<>	<elision2>
8472	8363	<elision1>	<elision1>
8472	8476	<>	<elision1>
8472	8360	.	υ
8472	8371	s	υ
8472	8360	.	u
8472	8371	s	u
8472	8360	.	κ
8472	8477	s	κ
8472	8404	s	k
8472	8407	s	U
8472	8458	s	K
8472	8360	.	α
8472	8371	s	α
8472	8360	.	a
8472	8371	s	a
8472	8436	s	A
8472	8360	.	λ
8472	8477	s	λ
8472	8404	s	l
8472	8465	s	L
8473	8460	s	k
8473	8467	s	l
8474	8366	.	.
8474	8369	 	 
8474	8366	<~>	<~>
8474	8366	<split-s>	<split-s>
8474	8366	<split-h>	<split-h>
8474	8366	<name2>	<name2>
8474	8457	<aphaerese>	<aphaerese>
8474	8475	<>	<aphaerese>
8474	8366	<elision3>	<elision3>
8474	8475	<>	<elision3>
8474	8366	<elision2>	<elision2>
8474	8475	<>	<elision2>
8474	8366	<elision1>	<elision1>
8474	8475	<>	<elision1>
8474	8362	.	υ
8474	8385	s	υ
8474	8362	.	u
8474	8385	s	u
8474	8362	.	κ
8474	8479	s	κ
8474	8406	s	k
8474	8409	s	U
8474	8460	s	K
8474	8362	.	α
8474	8385	s	α
8474	8362	.	a
8474	8385	s	a
8474	8438	s	A
8474	8362	.	λ
8474	8479	s	λ
8474	8406	s	l
8474	8467	s	L
8475	8363	.	.
8475	8364	 	 
8475	8363	<~>	<~>
8475	8363	<split-s>	<split-s>
8475	8363	<split-h>	<split-h>
8475	8363	<name2>	<name2>
8475	8367	<aphaerese>	<aphaerese>
8475	8476	<>	<aphaerese>
8475	8363	<elision3>	<elision3>
8475	8476	<>	<elision3>
8475	8363	<elision2>	<elision2>
8475	8476	<>	<elision2>
8475	8363	<elision1>	<elision1>
8475	8476	<>	<elision1>
8475	8360	.	υ
8475	8371	s	υ
8475	8360	.	u
8475	8371	s	u
8475	8360	.	κ
8475	8477	s	κ
8475	8404	s	k
8475	8407	s	U
8475	8458	s	K
8475	8360	.	α
8475	8371	s	α
8475	8360	.	a
8475	8371	s	a
8475	8436	s	A
8475	8360	.	λ
8475	8477	s	λ
8475	8404	s	l
8475	8465	s	L
8476	8363	.	.
8476	8364	 	 
8476	8363	<~>	<~>
8476	8363	<split-s>	<split-s>
8476	8363	<split-h>	<split-h>
8476	8363	<name2>	<name2>
8476	8474	<>	<name>
8476	8367	<aphaerese>	<aphaerese>
8476	8476	<>	<aphaerese>
8476	8363	<elision3>	<elision3>
8476	8476	<>	<elision3>
8476	8363	<elision2>	<elision2>
8476	8476	<>	<elision2>
8476	8363	<elision1>	<elision1>
8476	8476	<>	<elision1>
8476	8360	.	υ
8476	8371	s	υ
8476	8360	.	u
8476	8371	s	u
8476	8360	.	κ
8476	8477	s	κ
8476	8404	s	k
8476	8407	s	U
8476	8458	s	K
8476	8360	.	α
8476	8371	s	α
8476	8360	.	a
8476	8371	s	a
8476	8436	s	A
8476	8360	.	λ
8476	8477	s	λ
8476	8404	s	l
8476	8465	s	L
8477	8372	.	.
8477	8372	 	 
8477	8372	<~>	<~>
8477	8372	<split-s>	<split-s>
8477	8372	<split-h>	<split-h>
8477	8372	<name2>	<name2>
8477	8478	<>	<name>
8477	8375	<aphaerese>	<aphaerese>
8477	8477	<>	<aphaerese>
8477	8477	<>	<elision3>
8477	8477	<>	<elision2>
8477	8477	<>	<elision1>
8477	8381	.	υ
8477	8381	.	u
8477	8381	.	κ
8477	8381	.	α
8477	8381	.	a
8477	8381	.	λ
8477	7274	<3s>	<>
8478	8374	.	.
8478	8374	 	 
8478	8374	<~>	<~>
8478	8374	<split-s>	<split-s>
8478	8374	<split-h>	<split-h>
8478	8374	<name2>	<name2>
8478	8377	<aphaerese>	<aphaerese>
8478	8479	<>	<aphaerese>
8478	8479	<>	<elision3>
8478	8479	<>	<elision2>
8478	8479	<>	<elision1>
8478	8383	.	υ
8478	8383	.	u
8478	8383	.	κ
8478	8383	.	α
8478	8383	.	a
8478	8383	.	λ
8478	7275	<3s>	<>
8479	8372	.	.
8479	8372	 	 
8479	8372	<~>	<~>
8479	8372	<split-s>	<split-s>
8479	8372	<split-h>	<split-h>
8479	8372	<name2>	<name2>
8479	8375	<aphaerese>	<aphaerese>
8479	8477	<>	<aphaerese>
8479	8477	<>	<elision3>
8479	8477	<>	<elision2>
8479	8477	<>	<elision1>
8479	8381	.	υ
8479	8381	.	u
8479	8381	.	κ
8479	8381	.	α
8479	8381	.	a
8479	8381	.	λ
8479	7273	<3s>	<>
8480	8481	<>	<aphaerese>
8480	8481	<>	<elision3>
8480	8481	<>	<elision2>
8480	8481	<>	<elision1>
8480	7549	s	κ
8480	7674	s	k
8480	7692	s	K
8480	7549	s	λ
8480	7705	s	l
8480	7708	s	L
8480	6882	<1s>	<>
8480	8484	<~>	<>
8481	8482	<>	<name>
8481	8481	<>	<aphaerese>
8481	8481	<>	<elision3>
8481	8481	<>	<elision2>
8481	8481	<>	<elision1>
8481	7549	s	κ
8481	7674	s	k
8481	7692	s	K
8481	7549	s	λ
8481	7705	s	l
8481	7708	s	L
8481	6883	<1s>	<>
8481	8485	<~>	<>
8482	8480	<>	<aphaerese>
8482	8480	<>	<elision3>
8482	8480	<>	<elision2>
8482	8480	<>	<elision1>
8482	7670	s	κ
8482	7676	s	k
8482	7695	s	K
8482	7670	s	λ
8482	7707	s	l
8482	7710	s	L
8482	6884	<1s>	<>
8482	8483	<~>	<>
8483	8484	<>	<aphaerese>
8483	8484	<>	<elision3>
8483	8484	<>	<elision2>
8483	8484	<>	<elision1>
8483	8359	h	k
8483	8359	h	K
8483	8475	h	l
8483	8475	h	L
8484	8485	<>	<aphaerese>
8484	8485	<>	<elision3>
8484	8485	<>	<elision2>
8484	8485	<>	<elision1>
8484	8357	h	k
8484	8357	h	K
8484	8476	h	l
8484	8486	h	L
8485	8483	<>	<name>
8485	8485	<>	<aphaerese>
8485	8485	<>	<elision3>
8485	8485	<>	<elision2>
8485	8485	<>	<elision1>
8485	8357	h	k
8485	8357	h	K
8485	8476	h	l
8485	8486	h	L
8486	8363	.	.
8486	8364	 	 
8486	8363	<~>	<~>
8486	8363	<split-s>	<split-s>
8486	8363	<split-h>	<split-h>
8486	8363	<name2>	<name2>
8486	8473	<name2>	<name>
8486	8473	<name>	<name>
8486	8474	<>	<name>
8486	8367	<aphaerese>	<aphaerese>
8486	8476	<>	<aphaerese>
8486	8363	<elision3>	<elision3>
8486	8476	<>	<elision3>
8486	8363	<elision2>	<elision2>
8486	8476	<>	<elision2>
8486	8363	<elision1>	<elision1>
8486	8476	<>	<elision1>
8486	8360	.	υ
8486	8371	s	υ
8486	8360	.	u
8486	8371	s	u
8486	8360	.	κ
8486	8477	s	κ
8486	8404	s	k
8486	8407	s	U
8486	8458	s	K
8486	8360	.	α
8486	8371	s	α
8486	8360	.	a
8486	8371	s	a
8486	8436	s	A
8486	8360	.	λ
8486	8477	s	λ
8486	8404	s	l
8486	8465	s	L
8487	8488	<>	<aphaerese>
8487	117	<elision3>	<elision3>
8487	8488	<>	<elision3>
8487	117	<elision2>	<elision2>
8487	8488	<>	<elision2>
8487	117	<elision1>	<elision1>
8487	8488	<>	<elision1>
8487	8168	<K>	<>
8488	8489	<>	<name>
8488	8488	<>	<aphaerese>
8488	117	<elision3>	<elision3>
8488	8488	<>	<elision3>
8488	117	<elision2>	<elision2>
8488	8488	<>	<elision2>
8488	117	<elision1>	<elision1>
8488	8488	<>	<elision1>
8488	8166	<K>	<>
8489	8487	<>	<aphaerese>
8489	119	<elision3>	<elision3>
8489	8487	<>	<elision3>
8489	119	<elision2>	<elision2>
8489	8487	<>	<elision2>
8489	119	<elision1>	<elision1>
8489	8487	<>	<elision1>
8489	8167	<K>	<>
8490	107	.	.
8490	108	 	 
8490	107	<~>	<~>
8490	107	<split-s>	<split-s>
8490	107	<split-h>	<split-h>
8490	107	<name2>	<name2>
8490	111	<aphaerese>	<aphaerese>
8490	8491	<>	<aphaerese>
8490	107	<elision3>	<elision3>
8490	8491	<>	<elision3>
8490	107	<elision2>	<elision2>
8490	8491	<>	<elision2>
8490	107	<elision1>	<elision1>
8490	8491	<>	<elision1>
8490	107	.	υ
8490	107	.	u
8490	114	.	κ
8490	7736	H	κ
8490	8064	H	k
8490	8077	H	U
8490	8080	H	K
8490	107	.	α
8490	107	.	a
8490	7907	H	A
8490	8091	H	λ
8490	8494	H	l
8490	8499	H	L
8490	8165	<K>	<>
8491	107	.	.
8491	108	 	 
8491	107	<~>	<~>
8491	107	<split-s>	<split-s>
8491	107	<split-h>	<split-h>
8491	107	<name2>	<name2>
8491	8492	<>	<name>
8491	111	<aphaerese>	<aphaerese>
8491	8491	<>	<aphaerese>
8491	107	<elision3>	<elision3>
8491	8491	<>	<elision3>
8491	107	<elision2>	<elision2>
8491	8491	<>	<elision2>
8491	107	<elision1>	<elision1>
8491	8491	<>	<elision1>
8491	107	.	υ
8491	107	.	u
8491	114	.	κ
8491	7736	H	κ
8491	8064	H	k
8491	8077	H	U
8491	8080	H	K
8491	107	.	α
8491	107	.	a
8491	7907	H	A
8491	8091	H	λ
8491	8494	H	l
8491	8499	H	L
8491	8163	<K>	<>
8492	106	.	.
8492	110	 	 
8492	106	<~>	<~>
8492	106	<split-s>	<split-s>
8492	106	<split-h>	<split-h>
8492	106	<name2>	<name2>
8492	113	<aphaerese>	<aphaerese>
8492	8490	<>	<aphaerese>
8492	106	<elision3>	<elision3>
8492	8490	<>	<elision3>
8492	106	<elision2>	<elision2>
8492	8490	<>	<elision2>
8492	106	<elision1>	<elision1>
8492	8490	<>	<elision1>
8492	106	.	υ
8492	106	.	u
8492	116	.	κ
8492	8101	H	κ
8492	8105	H	k
8492	8079	H	U
8492	8109	H	K
8492	106	.	α
8492	106	.	a
8492	7910	H	A
8492	8093	H	λ
8492	8493	H	l
8492	8496	H	L
8492	8164	<K>	<>
8493	8494	<>	<aphaerese>
8493	8494	<>	<elision3>
8493	8494	<>	<elision2>
8493	8494	<>	<elision1>
8493	8355	<~>	<>
8493	8094	<l2L>	<>
8494	8495	<>	<name>
8494	8494	<>	<aphaerese>
8494	8494	<>	<elision3>
8494	8494	<>	<elision2>
8494	8494	<>	<elision1>
8494	8356	<~>	<>
8494	8095	<l2L>	<>
8495	8493	<>	<aphaerese>
8495	8493	<>	<elision3>
8495	8493	<>	<elision2>
8495	8493	<>	<elision1>
8495	8354	<~>	<>
8495	8096	<l2L>	<>
8496	7907	.	.
8496	7908	 	 
8496	7907	<~>	<~>
8496	7907	<split-s>	<split-s>
8496	7907	<split-h>	<split-h>
8496	7907	<name2>	<name2>
8496	7911	<aphaerese>	<aphaerese>
8496	8497	<>	<aphaerese>
8496	7907	<elision3>	<elision3>
8496	8497	<>	<elision3>
8496	7907	<elision2>	<elision2>
8496	8497	<>	<elision2>
8496	7907	<elision1>	<elision1>
8496	8497	<>	<elision1>
8496	7915	.	υ
8496	7918	s	υ
8496	7915	.	u
8496	7918	s	u
8496	7915	.	κ
8496	7549	s	κ
8496	7674	s	k
8496	7964	s	U
8496	7692	s	K
8496	7915	.	α
8496	7989	s	α
8496	7915	.	a
8496	7989	s	a
8496	7992	s	A
8496	7915	.	λ
8496	7549	s	λ
8496	7705	s	l
8496	7708	s	L
8496	7059	<1s>	<>
8496	8484	<~>	<>
8497	7907	.	.
8497	7908	 	 
8497	7907	<~>	<~>
8497	7907	<split-s>	<split-s>
8497	7907	<split-h>	<split-h>
8497	7907	<name2>	<name2>
8497	8498	<>	<name>
8497	7911	<aphaerese>	<aphaerese>
8497	8497	<>	<aphaerese>
8497	7907	<elision3>	<elision3>
8497	8497	<>	<elision3>
8497	7907	<elision2>	<elision2>
8497	8497	<>	<elision2>
8497	7907	<elision1>	<elision1>
8497	8497	<>	<elision1>
8497	7915	.	υ
8497	7918	s	υ
8497	7915	.	u
8497	7918	s	u
8497	7915	.	κ
8497	7549	s	κ
8497	7674	s	k
8497	7964	s	U
8497	7692	s	K
8497	7915	.	α
8497	7989	s	α
8497	7915	.	a
8497	7989	s	a
8497	7992	s	A
8497	7915	.	λ
8497	7549	s	λ
8497	7705	s	l
8497	7708	s	L
8497	7060	<1s>	<>
8497	8485	<~>	<>
8498	7910	.	.
8498	7913	 	 
8498	7910	<~>	<~>
8498	7910	<split-s>	<split-s>
8498	7910	<split-h>	<split-h>
8498	7910	<name2>	<name2>
8498	8019	<aphaerese>	<aphaerese>
8498	8496	<>	<aphaerese>
8498	7910	<elision3>	<elision3>
8498	8496	<>	<elision3>
8498	7910	<elision2>	<elision2>
8498	8496	<>	<elision2>
8498	7910	<elision1>	<elision1>
8498	8496	<>	<elision1>
8498	7917	.	υ
8498	7920	s	υ
8498	7917	.	u
8498	7920	s	u
8498	7917	.	κ
8498	7670	s	κ
8498	7676	s	k
8498	7966	s	U
8498	7695	s	K
8498	7917	.	α
8498	7991	s	α
8498	7917	.	a
8498	7991	s	a
8498	7994	s	A
8498	7917	.	λ
8498	7670	s	λ
8498	7707	s	l
8498	7710	s	L
8498	7061	<1s>	<>
8498	8483	<~>	<>
8499	7907	.	.
8499	7908	 	 
8499	7907	<~>	<~>
8499	7907	<split-s>	<split-s>
8499	7907	<split-h>	<split-h>
8499	7907	<name2>	<name2>
8499	8087	<name2>	<name>
8499	8498	<>	<name>
8499	7911	<aphaerese>	<aphaerese>
8499	8497	<>	<aphaerese>
8499	7907	<elision3>	<elision3>
8499	8497	<>	<elision3>
8499	7907	<elision2>	<elision2>
8499	8497	<>	<elision2>
8499	7907	<elision1>	<elision1>
8499	8497	<>	<elision1>
8499	7915	.	υ
8499	7918	s	υ
8499	7915	.	u
8499	7918	s	u
8499	7915	.	κ
8499	7549	s	κ
8499	7674	s	k
8499	7964	s	U
8499	7692	s	K
8499	7915	.	α
8499	7989	s	α
8499	7915	.	a
8499	7989	s	a
8499	7992	s	A
8499	7915	.	λ
8499	7549	s	λ
8499	7705	s	l
8499	7708	s	L
8499	7249	<1s>	<>
8499	8485	<~>	<>
8499	8086	<l2L>	<>
8500	8501	<>	<name>
8500	8500	<>	<aphaerese>
8500	8336	<elision3>	<elision3>
8500	8500	<>	<elision3>
8500	8336	<elision2>	<elision2>
8500	8500	<>	<elision2>
8500	8336	<elision1>	<elision1>
8500	8500	<>	<elision1>
8500	104	<4s>	<>
8501	8502	<>	<aphaerese>
8501	8338	<elision3>	<elision3>
8501	8502	<>	<elision3>
8501	8338	<elision2>	<elision2>
8501	8502	<>	<elision2>
8501	8338	<elision1>	<elision1>
8501	8502	<>	<elision1>
8501	105	<4s>	<>
8502	8500	<>	<aphaerese>
8502	8336	<elision3>	<elision3>
8502	8500	<>	<elision3>
8502	8336	<elision2>	<elision2>
8502	8500	<>	<elision2>
8502	8336	<elision1>	<elision1>
8502	8500	<>	<elision1>
8502	103	<4s>	<>
8503	107	.	.
8503	108	 	 
8503	107	<~>	<~>
8503	107	<split-s>	<split-s>
8503	107	<split-h>	<split-h>
8503	107	<name2>	<name2>
8503	111	<aphaerese>	<aphaerese>
8503	8504	<>	<aphaerese>
8503	107	<elision3>	<elision3>
8503	8504	<>	<elision3>
8503	107	<elision2>	<elision2>
8503	8504	<>	<elision2>
8503	107	<elision1>	<elision1>
8503	8504	<>	<elision1>
8503	8110	.	υ
8503	8154	H	υ
8503	8110	.	u
8503	8156	H	u
8503	114	.	κ
8503	7736	H	κ
8503	8064	H	k
8503	8077	H	U
8503	8080	H	K
8503	8110	.	α
8503	8140	H	α
8503	8110	.	a
8503	8145	H	a
8503	7907	H	A
8503	8091	H	λ
8503	8494	H	l
8503	8499	H	L
8503	8162	<K>	<>
8504	107	.	.
8504	108	 	 
8504	107	<~>	<~>
8504	107	<split-s>	<split-s>
8504	107	<split-h>	<split-h>
8504	107	<name2>	<name2>
8504	8505	<>	<name>
8504	111	<aphaerese>	<aphaerese>
8504	8504	<>	<aphaerese>
8504	107	<elision3>	<elision3>
8504	8504	<>	<elision3>
8504	107	<elision2>	<elision2>
8504	8504	<>	<elision2>
8504	107	<elision1>	<elision1>
8504	8504	<>	<elision1>
8504	8110	.	υ
8504	8154	H	υ
8504	8110	.	u
8504	8156	H	u
8504	114	.	κ
8504	7736	H	κ
8504	8064	H	k
8504	8077	H	U
8504	8080	H	K
8504	8110	.	α
8504	8140	H	α
8504	8110	.	a
8504	8145	H	a
8504	7907	H	A
8504	8091	H	λ
8504	8494	H	l
8504	8499	H	L
8504	8160	<K>	<>
8505	106	.	.
8505	110	 	 
8505	106	<~>	<~>
8505	106	<split-s>	<split-s>
8505	106	<split-h>	<split-h>
8505	106	<name2>	<name2>
8505	113	<aphaerese>	<aphaerese>
8505	8503	<>	<aphaerese>
8505	106	<elision3>	<elision3>
8505	8503	<>	<elision3>
8505	106	<elision2>	<elision2>
8505	8503	<>	<elision2>
8505	106	<elision1>	<elision1>
8505	8503	<>	<elision1>
8505	8112	.	υ
8505	8149	H	υ
8505	8112	.	u
8505	8153	H	u
8505	116	.	κ
8505	8101	H	κ
8505	8105	H	k
8505	8079	H	U
8505	8109	H	K
8505	8112	.	α
8505	8139	H	α
8505	8112	.	a
8505	8144	H	a
8505	7910	H	A
8505	8093	H	λ
8505	8493	H	l
8505	8496	H	L
8505	8161	<K>	<>
8506	8338	.	.
8506	8338	 	 
8506	8338	<~>	<~>
8506	8338	<split-s>	<split-s>
8506	8338	<split-h>	<split-h>
8506	8338	<name2>	<name2>
8506	8341	<aphaerese>	<aphaerese>
8506	8507	<>	<aphaerese>
8506	8507	<>	<elision3>
8506	8507	<>	<elision2>
8506	8507	<>	<elision1>
8506	8502	.	υ
8506	8502	.	u
8506	8344	.	κ
8506	8502	.	α
8506	8502	.	a
8506	8510	<4s>	<>
8507	8336	.	.
8507	8336	 	 
8507	8336	<~>	<~>
8507	8336	<split-s>	<split-s>
8507	8336	<split-h>	<split-h>
8507	8336	<name2>	<name2>
8507	8339	<aphaerese>	<aphaerese>
8507	8335	<>	<aphaerese>
8507	8335	<>	<elision3>
8507	8335	<>	<elision2>
8507	8335	<>	<elision1>
8507	8500	.	υ
8507	8500	.	u
8507	8342	.	κ
8507	8500	.	α
8507	8500	.	a
8507	8508	<4s>	<>
8508	107	.	.
8508	108	 	 
8508	107	<~>	<~>
8508	107	<split-s>	<split-s>
8508	107	<split-h>	<split-h>
8508	107	<name2>	<name2>
8508	111	<aphaerese>	<aphaerese>
8508	8509	<>	<aphaerese>
8508	8509	<>	<elision3>
8508	8509	<>	<elision2>
8508	8509	<>	<elision1>
8508	8110	.	υ
8508	8154	H	υ
8508	8110	.	u
8508	8156	H	u
8508	114	.	κ
8508	7736	H	κ
8508	8064	H	k
8508	8077	H	U
8508	8080	H	K
8508	8110	.	α
8508	8140	H	α
8508	8110	.	a
8508	8145	H	a
8508	7907	H	A
8508	8091	H	λ
8508	8494	H	l
8508	8499	H	L
8508	8512	<K>	<>
8509	107	.	.
8509	108	 	 
8509	107	<~>	<~>
8509	107	<split-s>	<split-s>
8509	107	<split-h>	<split-h>
8509	107	<name2>	<name2>
8509	8510	<>	<name>
8509	111	<aphaerese>	<aphaerese>
8509	8509	<>	<aphaerese>
8509	8509	<>	<elision3>
8509	8509	<>	<elision2>
8509	8509	<>	<elision1>
8509	8110	.	υ
8509	8154	H	υ
8509	8110	.	u
8509	8156	H	u
8509	114	.	κ
8509	7736	H	κ
8509	8064	H	k
8509	8077	H	U
8509	8080	H	K
8509	8110	.	α
8509	8140	H	α
8509	8110	.	a
8509	8145	H	a
8509	7907	H	A
8509	8091	H	λ
8509	8494	H	l
8509	8499	H	L
8509	8513	<K>	<>
8510	106	.	.
8510	110	 	 
8510	106	<~>	<~>
8510	106	<split-s>	<split-s>
8510	106	<split-h>	<split-h>
8510	106	<name2>	<name2>
8510	113	<aphaerese>	<aphaerese>
8510	8508	<>	<aphaerese>
8510	8508	<>	<elision3>
8510	8508	<>	<elision2>
8510	8508	<>	<elision1>
8510	8112	.	υ
8510	8149	H	υ
8510	8112	.	u
8510	8153	H	u
8510	116	.	κ
8510	8101	H	κ
8510	8105	H	k
8510	8079	H	U
8510	8109	H	K
8510	8112	.	α
8510	8139	H	α
8510	8112	.	a
8510	8144	H	a
8510	7910	H	A
8510	8093	H	λ
8510	8493	H	l
8510	8496	H	L
8510	8511	<K>	<>
8511	8162	.	.
8511	8162	<~>	<~>
8511	8162	<split-s>	<split-s>
8511	8162	<split-h>	<split-h>
8511	8162	<name2>	<name2>
8511	8165	<aphaerese>	<aphaerese>
8511	8512	<>	<aphaerese>
8511	8512	<>	<elision3>
8511	8512	<>	<elision2>
8511	8512	<>	<elision1>
8511	8158	.	υ
8511	8304	H	υ
8511	8158	.	u
8511	8313	H	u
8511	8168	.	κ
8511	8219	H	κ
8511	8273	H	k
8511	8282	H	U
8511	8286	H	K
8511	8158	.	α
8511	8316	H	α
8511	8158	.	a
8511	8319	H	a
8511	8253	H	A
8511	8294	H	λ
8511	8300	H	l
8511	8295	H	L
8512	8160	.	.
8512	8160	<~>	<~>
8512	8160	<split-s>	<split-s>
8512	8160	<split-h>	<split-h>
8512	8160	<name2>	<name2>
8512	8163	<aphaerese>	<aphaerese>
8512	8513	<>	<aphaerese>
8512	8513	<>	<elision3>
8512	8513	<>	<elision2>
8512	8513	<>	<elision1>
8512	8159	.	υ
8512	8302	H	υ
8512	8159	.	u
8512	8311	H	u
8512	8166	.	κ
8512	8217	H	κ
8512	8271	H	k
8512	8280	H	U
8512	8283	H	K
8512	8159	.	α
8512	8314	H	α
8512	8159	.	a
8512	8317	H	a
8512	8251	H	A
8512	8292	H	λ
8512	8298	H	l
8512	8301	H	L
8513	8160	.	.
8513	8160	<~>	<~>
8513	8160	<split-s>	<split-s>
8513	8160	<split-h>	<split-h>
8513	8160	<name2>	<name2>
8513	8511	<>	<name>
8513	8163	<aphaerese>	<aphaerese>
8513	8513	<>	<aphaerese>
8513	8513	<>	<elision3>
8513	8513	<>	<elision2>
8513	8513	<>	<elision1>
8513	8159	.	υ
8513	8302	H	υ
8513	8159	.	u
8513	8311	H	u
8513	8166	.	κ
8513	8217	H	κ
8513	8271	H	k
8513	8280	H	U
8513	8283	H	K
8513	8159	.	α
8513	8314	H	α
8513	8159	.	a
8513	8317	H	a
8513	8251	H	A
8513	8292	H	λ
8513	8298	H	l
8513	8301	H	L
8514	8515	<>	<name>
8514	8514	<>	<aphaerese>
8514	8517	<elision3>	<elision3>
8514	8514	<>	<elision3>
8514	8517	<elision2>	<elision2>
8514	8514	<>	<elision2>
8514	8517	<elision1>	<elision1>
8514	8514	<>	<elision1>
8514	8583	<split-h>	<>
8515	8516	<>	<aphaerese>
8515	8519	<elision3>	<elision3>
8515	8516	<>	<elision3>
8515	8519	<elision2>	<elision2>
8515	8516	<>	<elision2>
8515	8519	<elision1>	<elision1>
8515	8516	<>	<elision1>
8515	8584	<split-h>	<>
8516	8514	<>	<aphaerese>
8516	8517	<elision3>	<elision3>
8516	8514	<>	<elision3>
8516	8517	<elision2>	<elision2>
8516	8514	<>	<elision2>
8516	8517	<elision1>	<elision1>
8516	8514	<>	<elision1>
8516	8582	<split-h>	<>
8517	8518	<>	<name>
8517	8517	<>	<aphaerese>
8517	8517	<>	<elision3>
8517	8517	<>	<elision2>
8517	8517	<>	<elision1>
8517	8520	s	κ
8517	8520	s	k
8517	8573	s	K
8517	8520	s	λ
8517	8520	s	l
8517	8576	s	L
8517	8580	<split-h>	<>
8518	8519	<>	<aphaerese>
8518	8519	<>	<elision3>
8518	8519	<>	<elision2>
8518	8519	<>	<elision1>
8518	8522	s	κ
8518	8522	s	k
8518	8575	s	K
8518	8522	s	λ
8518	8522	s	l
8518	8578	s	L
8518	8581	<split-h>	<>
8519	8517	<>	<aphaerese>
8519	8517	<>	<elision3>
8519	8517	<>	<elision2>
8519	8517	<>	<elision1>
8519	8520	s	κ
8519	8520	s	k
8519	8573	s	K
8519	8520	s	λ
8519	8520	s	l
8519	8576	s	L
8519	8579	<split-h>	<>
8520	8521	<>	<name>
8520	8520	<>	<aphaerese>
8520	8520	<>	<elision3>
8520	8520	<>	<elision2>
8520	8520	<>	<elision1>
8520	8524	<4s>	<>
8521	8522	<>	<aphaerese>
8521	8522	<>	<elision3>
8521	8522	<>	<elision2>
8521	8522	<>	<elision1>
8521	8525	<4s>	<>
8522	8520	<>	<aphaerese>
8522	8520	<>	<elision3>
8522	8520	<>	<elision2>
8522	8520	<>	<elision1>
8522	8523	<4s>	<>
8523	8524	<>	<aphaerese>
8523	8524	<>	<elision3>
8523	8524	<>	<elision2>
8523	8524	<>	<elision1>
8523	8569	H	κ
8523	8064	H	k
8523	8080	H	K
8523	8546	H	λ
8523	8494	H	l
8523	8499	H	L
8523	8552	<K>	<>
8524	8525	<>	<name>
8524	8524	<>	<aphaerese>
8524	8524	<>	<elision3>
8524	8524	<>	<elision2>
8524	8524	<>	<elision1>
8524	8569	H	κ
8524	8064	H	k
8524	8080	H	K
8524	8546	H	λ
8524	8494	H	l
8524	8499	H	L
8524	8553	<K>	<>
8525	8523	<>	<aphaerese>
8525	8523	<>	<elision3>
8525	8523	<>	<elision2>
8525	8523	<>	<elision1>
8525	8526	H	κ
8525	8105	H	k
8525	8109	H	K
8525	8545	H	λ
8525	8493	H	l
8525	8496	H	L
8525	8551	<K>	<>
8526	8527	<>	<aphaerese>
8526	8527	<>	<elision3>
8526	8527	<>	<elision2>
8526	8527	<>	<elision1>
8526	8530	<kappa2K>	<>
8526	8542	<kappa2L>	<>
8526	8060	<lambda2L>	<>
8527	8528	<>	<name>
8527	8527	<>	<aphaerese>
8527	8527	<>	<elision3>
8527	8527	<>	<elision2>
8527	8527	<>	<elision1>
8527	8531	<kappa2K>	<>
8527	8534	<kappa2L>	<>
8527	8058	<lambda2L>	<>
8528	8529	<>	<aphaerese>
8528	8529	<>	<elision3>
8528	8529	<>	<elision2>
8528	8529	<>	<elision1>
8528	8532	<kappa2K>	<>
8528	8535	<kappa2L>	<>
8528	8059	<lambda2L>	<>
8529	8527	<>	<aphaerese>
8529	8527	<>	<elision3>
8529	8527	<>	<elision2>
8529	8527	<>	<elision1>
8529	8530	<kappa2K>	<>
8529	8533	<kappa2L>	<>
8529	8060	<lambda2L>	<>
8530	7741	.	.
8530	7742	 	 
8530	7741	<~>	<~>
8530	7741	<split-s>	<split-s>
8530	7741	<split-h>	<split-h>
8530	7741	<name2>	<name2>
8530	7745	<aphaerese>	<aphaerese>
8530	8531	<>	<aphaerese>
8530	8531	<>	<elision3>
8530	8531	<>	<elision2>
8530	8531	<>	<elision1>
8530	7749	.	υ
8530	7752	s	υ
8530	7749	.	u
8530	7752	s	u
8530	127	s	κ
8530	7490	s	k
8530	7815	s	U
8530	7523	s	K
8530	7749	.	α
8530	7843	s	α
8530	7749	.	a
8530	7843	s	a
8530	7846	s	A
8530	127	s	λ
8530	7538	s	l
8530	7541	s	L
8531	7741	.	.
8531	7742	 	 
8531	7741	<~>	<~>
8531	7741	<split-s>	<split-s>
8531	7741	<split-h>	<split-h>
8531	7741	<name2>	<name2>
8531	8532	<>	<name>
8531	7745	<aphaerese>	<aphaerese>
8531	8531	<>	<aphaerese>
8531	8531	<>	<elision3>
8531	8531	<>	<elision2>
8531	8531	<>	<elision1>
8531	7749	.	υ
8531	7752	s	υ
8531	7749	.	u
8531	7752	s	u
8531	127	s	κ
8531	7490	s	k
8531	7815	s	U
8531	7523	s	K
8531	7749	.	α
8531	7843	s	α
8531	7749	.	a
8531	7843	s	a
8531	7846	s	A
8531	127	s	λ
8531	7538	s	l
8531	7541	s	L
8532	7744	.	.
8532	7747	 	 
8532	7744	<~>	<~>
8532	7744	<split-s>	<split-s>
8532	7744	<split-h>	<split-h>
8532	7744	<name2>	<name2>
8532	7873	<aphaerese>	<aphaerese>
8532	8530	<>	<aphaerese>
8532	8530	<>	<elision3>
8532	8530	<>	<elision2>
8532	8530	<>	<elision1>
8532	7751	.	υ
8532	7754	s	υ
8532	7751	.	u
8532	7754	s	u
8532	7483	s	κ
8532	7492	s	k
8532	7817	s	U
8532	7526	s	K
8532	7751	.	α
8532	7845	s	α
8532	7751	.	a
8532	7845	s	a
8532	7848	s	A
8532	7483	s	λ
8532	7540	s	l
8532	7543	s	L
8533	7907	.	.
8533	7908	 	 
8533	7907	<~>	<~>
8533	7907	<split-s>	<split-s>
8533	7907	<split-h>	<split-h>
8533	7907	<name2>	<name2>
8533	7911	<aphaerese>	<aphaerese>
8533	8534	<>	<aphaerese>
8533	8534	<>	<elision3>
8533	8534	<>	<elision2>
8533	8534	<>	<elision1>
8533	7915	.	υ
8533	7918	s	υ
8533	7915	.	u
8533	7918	s	u
8533	7549	s	κ
8533	7674	s	k
8533	7964	s	U
8533	7692	s	K
8533	7915	.	α
8533	7989	s	α
8533	7915	.	a
8533	7989	s	a
8533	7992	s	A
8533	7549	s	λ
8533	7705	s	l
8533	7708	s	L
8533	8537	<1s>	<>
8534	7907	.	.
8534	7908	 	 
8534	7907	<~>	<~>
8534	7907	<split-s>	<split-s>
8534	7907	<split-h>	<split-h>
8534	7907	<name2>	<name2>
8534	8535	<>	<name>
8534	7911	<aphaerese>	<aphaerese>
8534	8534	<>	<aphaerese>
8534	8534	<>	<elision3>
8534	8534	<>	<elision2>
8534	8534	<>	<elision1>
8534	7915	.	υ
8534	7918	s	υ
8534	7915	.	u
8534	7918	s	u
8534	7549	s	κ
8534	7674	s	k
8534	7964	s	U
8534	7692	s	K
8534	7915	.	α
8534	7989	s	α
8534	7915	.	a
8534	7989	s	a
8534	7992	s	A
8534	7549	s	λ
8534	7705	s	l
8534	7708	s	L
8534	8538	<1s>	<>
8535	7910	.	.
8535	7913	 	 
8535	7910	<~>	<~>
8535	7910	<split-s>	<split-s>
8535	7910	<split-h>	<split-h>
8535	7910	<name2>	<name2>
8535	8019	<aphaerese>	<aphaerese>
8535	8533	<>	<aphaerese>
8535	8533	<>	<elision3>
8535	8533	<>	<elision2>
8535	8533	<>	<elision1>
8535	7917	.	υ
8535	7920	s	υ
8535	7917	.	u
8535	7920	s	u
8535	7670	s	κ
8535	7676	s	k
8535	7966	s	U
8535	7695	s	K
8535	7917	.	α
8535	7991	s	α
8535	7917	.	a
8535	7991	s	a
8535	7994	s	A
8535	7670	s	λ
8535	7707	s	l
8535	7710	s	L
8535	8536	<1s>	<>
8536	142	.	.
8536	146	 	 
8536	142	<~>	<~>
8536	142	<split-s>	<split-s>
8536	142	<split-h>	<split-h>
8536	142	<name2>	<name2>
8536	149	<aphaerese>	<aphaerese>
8536	8537	<>	<aphaerese>
8536	8537	<>	<elision3>
8536	8537	<>	<elision2>
8536	8537	<>	<elision1>
8536	6471	.	υ
8536	6508	H	υ
8536	6471	.	u
8536	6512	H	u
8536	6885	H	κ
8536	6464	H	k
8536	6438	H	U
8536	6468	H	K
8536	6471	.	α
8536	6498	H	α
8536	6471	.	a
8536	6503	H	a
8536	6269	H	A
8536	6904	H	λ
8536	6852	H	l
8536	6855	H	L
8536	8540	<K>	<>
8537	143	.	.
8537	144	 	 
8537	143	<~>	<~>
8537	143	<split-s>	<split-s>
8537	143	<split-h>	<split-h>
8537	143	<name2>	<name2>
8537	147	<aphaerese>	<aphaerese>
8537	8538	<>	<aphaerese>
8537	8538	<>	<elision3>
8537	8538	<>	<elision2>
8537	8538	<>	<elision1>
8537	6469	.	υ
8537	6513	H	υ
8537	6469	.	u
8537	6515	H	u
8537	6928	H	κ
8537	6423	H	k
8537	6436	H	U
8537	6439	H	K
8537	6469	.	α
8537	6499	H	α
8537	6469	.	a
8537	6504	H	a
8537	6266	H	A
8537	6905	H	λ
8537	6853	H	l
8537	6858	H	L
8537	8541	<K>	<>
8538	143	.	.
8538	144	 	 
8538	143	<~>	<~>
8538	143	<split-s>	<split-s>
8538	143	<split-h>	<split-h>
8538	143	<name2>	<name2>
8538	8536	<>	<name>
8538	147	<aphaerese>	<aphaerese>
8538	8538	<>	<aphaerese>
8538	8538	<>	<elision3>
8538	8538	<>	<elision2>
8538	8538	<>	<elision1>
8538	6469	.	υ
8538	6513	H	υ
8538	6469	.	u
8538	6515	H	u
8538	6928	H	κ
8538	6423	H	k
8538	6436	H	U
8538	6439	H	K
8538	6469	.	α
8538	6499	H	α
8538	6469	.	a
8538	6504	H	a
8538	6266	H	A
8538	6905	H	λ
8538	6853	H	l
8538	6858	H	L
8538	8539	<K>	<>
8539	6519	.	.
8539	6519	<~>	<~>
8539	6519	<split-s>	<split-s>
8539	6519	<split-h>	<split-h>
8539	6519	<name2>	<name2>
8539	8540	<>	<name>
8539	6522	<aphaerese>	<aphaerese>
8539	8539	<>	<aphaerese>
8539	8539	<>	<elision3>
8539	8539	<>	<elision2>
8539	8539	<>	<elision1>
8539	6518	.	υ
8539	6661	H	υ
8539	6518	.	u
8539	6670	H	u
8539	6913	H	κ
8539	6630	H	k
8539	6639	H	U
8539	6642	H	K
8539	6518	.	α
8539	6673	H	α
8539	6518	.	a
8539	6676	H	a
8539	6610	H	A
8539	6922	H	λ
8539	6657	H	l
8539	6660	H	L
8540	6521	.	.
8540	6521	<~>	<~>
8540	6521	<split-s>	<split-s>
8540	6521	<split-h>	<split-h>
8540	6521	<name2>	<name2>
8540	6524	<aphaerese>	<aphaerese>
8540	8541	<>	<aphaerese>
8540	8541	<>	<elision3>
8540	8541	<>	<elision2>
8540	8541	<>	<elision1>
8540	6517	.	υ
8540	6663	H	υ
8540	6517	.	u
8540	6672	H	u
8540	6915	H	κ
8540	6632	H	k
8540	6641	H	U
8540	6645	H	K
8540	6517	.	α
8540	6675	H	α
8540	6517	.	a
8540	6678	H	a
8540	6612	H	A
8540	6924	H	λ
8540	6659	H	l
8540	6654	H	L
8541	6519	.	.
8541	6519	<~>	<~>
8541	6519	<split-s>	<split-s>
8541	6519	<split-h>	<split-h>
8541	6519	<name2>	<name2>
8541	6522	<aphaerese>	<aphaerese>
8541	8539	<>	<aphaerese>
8541	8539	<>	<elision3>
8541	8539	<>	<elision2>
8541	8539	<>	<elision1>
8541	6518	.	υ
8541	6661	H	υ
8541	6518	.	u
8541	6670	H	u
8541	6913	H	κ
8541	6630	H	k
8541	6639	H	U
8541	6642	H	K
8541	6518	.	α
8541	6673	H	α
8541	6518	.	a
8541	6676	H	a
8541	6610	H	A
8541	6922	H	λ
8541	6657	H	l
8541	6660	H	L
8542	7907	.	.
8542	7908	 	 
8542	7907	<~>	<~>
8542	7907	<split-s>	<split-s>
8542	7907	<split-h>	<split-h>
8542	7907	<name2>	<name2>
8542	7911	<aphaerese>	<aphaerese>
8542	8534	<>	<aphaerese>
8542	8534	<>	<elision3>
8542	8534	<>	<elision2>
8542	8534	<>	<elision1>
8542	7915	.	υ
8542	7918	s	υ
8542	7915	.	u
8542	7918	s	u
8542	7549	s	κ
8542	7674	s	k
8542	7964	s	U
8542	7692	s	K
8542	7915	.	α
8542	7989	s	α
8542	7915	.	a
8542	7989	s	a
8542	7992	s	A
8542	7549	s	λ
8542	7705	s	l
8542	7708	s	L
8542	8543	<1s>	<>
8543	143	.	.
8543	144	 	 
8543	143	<~>	<~>
8543	143	<split-s>	<split-s>
8543	143	<split-h>	<split-h>
8543	143	<name2>	<name2>
8543	147	<aphaerese>	<aphaerese>
8543	8538	<>	<aphaerese>
8543	8538	<>	<elision3>
8543	8538	<>	<elision2>
8543	8538	<>	<elision1>
8543	6469	.	υ
8543	6469	.	u
8543	6469	.	α
8543	6469	.	a
8543	8544	<K>	<>
8544	6519	.	.
8544	6519	<~>	<~>
8544	6519	<split-s>	<split-s>
8544	6519	<split-h>	<split-h>
8544	6519	<name2>	<name2>
8544	6522	<aphaerese>	<aphaerese>
8544	8539	<>	<aphaerese>
8544	8539	<>	<elision3>
8544	8539	<>	<elision2>
8544	8539	<>	<elision1>
8544	6518	.	υ
8544	6518	.	u
8544	6518	.	α
8544	6518	.	a
8545	8546	<>	<aphaerese>
8545	8546	<>	<elision3>
8545	8546	<>	<elision2>
8545	8546	<>	<elision1>
8545	8549	<lambda2L>	<>
8546	8547	<>	<name>
8546	8546	<>	<aphaerese>
8546	8546	<>	<elision3>
8546	8546	<>	<elision2>
8546	8546	<>	<elision1>
8546	8550	<lambda2L>	<>
8547	8545	<>	<aphaerese>
8547	8545	<>	<elision3>
8547	8545	<>	<elision2>
8547	8545	<>	<elision1>
8547	8548	<lambda2L>	<>
8548	7910	.	.
8548	7913	 	 
8548	7910	<~>	<~>
8548	7910	<split-s>	<split-s>
8548	7910	<split-h>	<split-h>
8548	7910	<name2>	<name2>
8548	8019	<aphaerese>	<aphaerese>
8548	8549	<>	<aphaerese>
8548	8549	<>	<elision3>
8548	8549	<>	<elision2>
8548	8549	<>	<elision1>
8548	7917	.	υ
8548	7920	s	υ
8548	7917	.	u
8548	7920	s	u
8548	7917	.	κ
8548	7670	s	κ
8548	7676	s	k
8548	7966	s	U
8548	7695	s	K
8548	7917	.	α
8548	7991	s	α
8548	7917	.	a
8548	7991	s	a
8548	7994	s	A
8548	7917	.	λ
8548	7670	s	λ
8548	7707	s	l
8548	7710	s	L
8548	7275	<1s>	<>
8549	7907	.	.
8549	7908	 	 
8549	7907	<~>	<~>
8549	7907	<split-s>	<split-s>
8549	7907	<split-h>	<split-h>
8549	7907	<name2>	<name2>
8549	7911	<aphaerese>	<aphaerese>
8549	8550	<>	<aphaerese>
8549	8550	<>	<elision3>
8549	8550	<>	<elision2>
8549	8550	<>	<elision1>
8549	7915	.	υ
8549	7918	s	υ
8549	7915	.	u
8549	7918	s	u
8549	7915	.	κ
8549	7549	s	κ
8549	7674	s	k
8549	7964	s	U
8549	7692	s	K
8549	7915	.	α
8549	7989	s	α
8549	7915	.	a
8549	7989	s	a
8549	7992	s	A
8549	7915	.	λ
8549	7549	s	λ
8549	7705	s	l
8549	7708	s	L
8549	7273	<1s>	<>
8550	7907	.	.
8550	7908	 	 
8550	7907	<~>	<~>
8550	7907	<split-s>	<split-s>
8550	7907	<split-h>	<split-h>
8550	7907	<name2>	<name2>
8550	8548	<>	<name>
8550	7911	<aphaerese>	<aphaerese>
8550	8550	<>	<aphaerese>
8550	8550	<>	<elision3>
8550	8550	<>	<elision2>
8550	8550	<>	<elision1>
8550	7915	.	υ
8550	7918	s	υ
8550	7915	.	u
8550	7918	s	u
8550	7915	.	κ
8550	7549	s	κ
8550	7674	s	k
8550	7964	s	U
8550	7692	s	K
8550	7915	.	α
8550	7989	s	α
8550	7915	.	a
8550	7989	s	a
8550	7992	s	A
8550	7915	.	λ
8550	7549	s	λ
8550	7705	s	l
8550	7708	s	L
8550	7274	<1s>	<>
8551	8552	<>	<aphaerese>
8551	8552	<>	<elision3>
8551	8552	<>	<elision2>
8551	8552	<>	<elision1>
8551	8556	H	κ
8551	8273	H	k
8551	8286	H	K
8551	8565	H	λ
8551	8300	H	l
8551	8295	H	L
8552	8553	<>	<aphaerese>
8552	8553	<>	<elision3>
8552	8553	<>	<elision2>
8552	8553	<>	<elision1>
8552	8554	H	κ
8552	8271	H	k
8552	8283	H	K
8552	8563	H	λ
8552	8298	H	l
8552	8301	H	L
8553	8551	<>	<name>
8553	8553	<>	<aphaerese>
8553	8553	<>	<elision3>
8553	8553	<>	<elision2>
8553	8553	<>	<elision1>
8553	8554	H	κ
8553	8271	H	k
8553	8283	H	K
8553	8563	H	λ
8553	8298	H	l
8553	8301	H	L
8554	8555	<>	<name>
8554	8554	<>	<aphaerese>
8554	8554	<>	<elision3>
8554	8554	<>	<elision2>
8554	8554	<>	<elision1>
8554	8558	<kappa2K>	<>
8554	8561	<kappa2L>	<>
8554	8269	<lambda2L>	<>
8555	8556	<>	<aphaerese>
8555	8556	<>	<elision3>
8555	8556	<>	<elision2>
8555	8556	<>	<elision1>
8555	8559	<kappa2K>	<>
8555	8562	<kappa2L>	<>
8555	8270	<lambda2L>	<>
8556	8554	<>	<aphaerese>
8556	8554	<>	<elision3>
8556	8554	<>	<elision2>
8556	8554	<>	<elision1>
8556	8557	<kappa2K>	<>
8556	8560	<kappa2L>	<>
8556	8268	<lambda2L>	<>
8557	8221	.	.
8557	8221	<~>	<~>
8557	8221	<split-s>	<split-s>
8557	8221	<split-h>	<split-h>
8557	8221	<name2>	<name2>
8557	8224	<aphaerese>	<aphaerese>
8557	8558	<>	<aphaerese>
8557	8558	<>	<elision3>
8557	8558	<>	<elision2>
8557	8558	<>	<elision1>
8557	8239	.	υ
8557	8192	s	υ
8557	8239	.	u
8557	8192	s	u
8557	8179	s	κ
8557	8179	s	k
8557	8233	s	U
8557	8188	s	K
8557	8239	.	α
8557	8192	s	α
8557	8239	.	a
8557	8192	s	a
8557	8236	s	A
8557	8179	s	λ
8557	8179	s	l
8557	8194	s	L
8557	8185	<1m>	<>
8558	8221	.	.
8558	8221	<~>	<~>
8558	8221	<split-s>	<split-s>
8558	8221	<split-h>	<split-h>
8558	8221	<name2>	<name2>
8558	8559	<>	<name>
8558	8224	<aphaerese>	<aphaerese>
8558	8558	<>	<aphaerese>
8558	8558	<>	<elision3>
8558	8558	<>	<elision2>
8558	8558	<>	<elision1>
8558	8239	.	υ
8558	8192	s	υ
8558	8239	.	u
8558	8192	s	u
8558	8179	s	κ
8558	8179	s	k
8558	8233	s	U
8558	8188	s	K
8558	8239	.	α
8558	8192	s	α
8558	8239	.	a
8558	8192	s	a
8558	8236	s	A
8558	8179	s	λ
8558	8179	s	l
8558	8194	s	L
8558	8186	<1m>	<>
8559	8223	.	.
8559	8223	<~>	<~>
8559	8223	<split-s>	<split-s>
8559	8223	<split-h>	<split-h>
8559	8223	<name2>	<name2>
8559	8226	<aphaerese>	<aphaerese>
8559	8557	<>	<aphaerese>
8559	8557	<>	<elision3>
8559	8557	<>	<elision2>
8559	8557	<>	<elision1>
8559	8241	.	υ
8559	8191	s	υ
8559	8241	.	u
8559	8191	s	u
8559	8178	s	κ
8559	8178	s	k
8559	8235	s	U
8559	8187	s	K
8559	8241	.	α
8559	8191	s	α
8559	8241	.	a
8559	8191	s	a
8559	8238	s	A
8559	8178	s	λ
8559	8178	s	l
8559	8193	s	L
8559	8184	<1m>	<>
8560	8251	.	.
8560	8251	<~>	<~>
8560	8251	<split-s>	<split-s>
8560	8251	<split-h>	<split-h>
8560	8251	<name2>	<name2>
8560	8254	<aphaerese>	<aphaerese>
8560	8561	<>	<aphaerese>
8560	8561	<>	<elision3>
8560	8561	<>	<elision2>
8560	8561	<>	<elision1>
8560	8257	.	υ
8560	8192	s	υ
8560	8257	.	u
8560	8192	s	u
8560	8200	s	κ
8560	8203	H	κ
8560	8200	s	k
8560	8203	H	k
8560	8233	s	U
8560	8188	s	K
8560	8203	H	K
8560	8257	.	α
8560	8192	s	α
8560	8257	.	a
8560	8192	s	a
8560	8236	s	A
8560	8200	s	λ
8560	8203	H	λ
8560	8200	s	l
8560	8203	H	l
8560	8194	s	L
8560	8203	H	L
8560	8185	<1m>	<>
8561	8251	.	.
8561	8251	<~>	<~>
8561	8251	<split-s>	<split-s>
8561	8251	<split-h>	<split-h>
8561	8251	<name2>	<name2>
8561	8562	<>	<name>
8561	8254	<aphaerese>	<aphaerese>
8561	8561	<>	<aphaerese>
8561	8561	<>	<elision3>
8561	8561	<>	<elision2>
8561	8561	<>	<elision1>
8561	8257	.	υ
8561	8192	s	υ
8561	8257	.	u
8561	8192	s	u
8561	8200	s	κ
8561	8203	H	κ
8561	8200	s	k
8561	8203	H	k
8561	8233	s	U
8561	8188	s	K
8561	8203	H	K
8561	8257	.	α
8561	8192	s	α
8561	8257	.	a
8561	8192	s	a
8561	8236	s	A
8561	8200	s	λ
8561	8203	H	λ
8561	8200	s	l
8561	8203	H	l
8561	8194	s	L
8561	8203	H	L
8561	8186	<1m>	<>
8562	8253	.	.
8562	8253	<~>	<~>
8562	8253	<split-s>	<split-s>
8562	8253	<split-h>	<split-h>
8562	8253	<name2>	<name2>
8562	8256	<aphaerese>	<aphaerese>
8562	8560	<>	<aphaerese>
8562	8560	<>	<elision3>
8562	8560	<>	<elision2>
8562	8560	<>	<elision1>
8562	8259	.	υ
8562	8191	s	υ
8562	8259	.	u
8562	8191	s	u
8562	8199	s	κ
8562	8202	H	κ
8562	8199	s	k
8562	8202	H	k
8562	8235	s	U
8562	8187	s	K
8562	8202	H	K
8562	8259	.	α
8562	8191	s	α
8562	8259	.	a
8562	8191	s	a
8562	8238	s	A
8562	8199	s	λ
8562	8202	H	λ
8562	8199	s	l
8562	8202	H	l
8562	8193	s	L
8562	8202	H	L
8562	8184	<1m>	<>
8563	8564	<>	<name>
8563	8563	<>	<aphaerese>
8563	8563	<>	<elision3>
8563	8563	<>	<elision2>
8563	8563	<>	<elision1>
8563	8567	<lambda2L>	<>
8564	8565	<>	<aphaerese>
8564	8565	<>	<elision3>
8564	8565	<>	<elision2>
8564	8565	<>	<elision1>
8564	8568	<lambda2L>	<>
8565	8563	<>	<aphaerese>
8565	8563	<>	<elision3>
8565	8563	<>	<elision2>
8565	8563	<>	<elision1>
8565	8566	<lambda2L>	<>
8566	8251	.	.
8566	8251	<~>	<~>
8566	8251	<split-s>	<split-s>
8566	8251	<split-h>	<split-h>
8566	8251	<name2>	<name2>
8566	8254	<aphaerese>	<aphaerese>
8566	8567	<>	<aphaerese>
8566	8567	<>	<elision3>
8566	8567	<>	<elision2>
8566	8567	<>	<elision1>
8566	8257	.	υ
8566	8192	s	υ
8566	8257	.	u
8566	8192	s	u
8566	8257	.	κ
8566	8200	s	κ
8566	8203	H	κ
8566	8200	s	k
8566	8203	H	k
8566	8233	s	U
8566	8188	s	K
8566	8203	H	K
8566	8257	.	α
8566	8192	s	α
8566	8257	.	a
8566	8192	s	a
8566	8236	s	A
8566	8257	.	λ
8566	8200	s	λ
8566	8203	H	λ
8566	8200	s	l
8566	8203	H	l
8566	8194	s	L
8566	8203	H	L
8566	8185	<1m>	<>
8567	8251	.	.
8567	8251	<~>	<~>
8567	8251	<split-s>	<split-s>
8567	8251	<split-h>	<split-h>
8567	8251	<name2>	<name2>
8567	8568	<>	<name>
8567	8254	<aphaerese>	<aphaerese>
8567	8567	<>	<aphaerese>
8567	8567	<>	<elision3>
8567	8567	<>	<elision2>
8567	8567	<>	<elision1>
8567	8257	.	υ
8567	8192	s	υ
8567	8257	.	u
8567	8192	s	u
8567	8257	.	κ
8567	8200	s	κ
8567	8203	H	κ
8567	8200	s	k
8567	8203	H	k
8567	8233	s	U
8567	8188	s	K
8567	8203	H	K
8567	8257	.	α
8567	8192	s	α
8567	8257	.	a
8567	8192	s	a
8567	8236	s	A
8567	8257	.	λ
8567	8200	s	λ
8567	8203	H	λ
8567	8200	s	l
8567	8203	H	l
8567	8194	s	L
8567	8203	H	L
8567	8186	<1m>	<>
8568	8253	.	.
8568	8253	<~>	<~>
8568	8253	<split-s>	<split-s>
8568	8253	<split-h>	<split-h>
8568	8253	<name2>	<name2>
8568	8256	<aphaerese>	<aphaerese>
8568	8566	<>	<aphaerese>
8568	8566	<>	<elision3>
8568	8566	<>	<elision2>
8568	8566	<>	<elision1>
8568	8259	.	υ
8568	8191	s	υ
8568	8259	.	u
8568	8191	s	u
8568	8259	.	κ
8568	8199	s	κ
8568	8202	H	κ
8568	8199	s	k
8568	8202	H	k
8568	8235	s	U
8568	8187	s	K
8568	8202	H	K
8568	8259	.	α
8568	8191	s	α
8568	8259	.	a
8568	8191	s	a
8568	8238	s	A
8568	8259	.	λ
8568	8199	s	λ
8568	8202	H	λ
8568	8199	s	l
8568	8202	H	l
8568	8193	s	L
8568	8202	H	L
8568	8184	<1m>	<>
8569	8528	<>	<name>
8569	8527	<>	<aphaerese>
8569	8527	<>	<elision3>
8569	8527	<>	<elision2>
8569	8527	<>	<elision1>
8569	8531	<kappa2K>	<>
8569	8570	<kappa2L>	<>
8569	8058	<lambda2L>	<>
8570	7907	.	.
8570	7908	 	 
8570	7907	<~>	<~>
8570	7907	<split-s>	<split-s>
8570	7907	<split-h>	<split-h>
8570	7907	<name2>	<name2>
8570	8535	<>	<name>
8570	7911	<aphaerese>	<aphaerese>
8570	8534	<>	<aphaerese>
8570	8534	<>	<elision3>
8570	8534	<>	<elision2>
8570	8534	<>	<elision1>
8570	7915	.	υ
8570	7918	s	υ
8570	7915	.	u
8570	7918	s	u
8570	7549	s	κ
8570	7674	s	k
8570	7964	s	U
8570	7692	s	K
8570	7915	.	α
8570	7989	s	α
8570	7915	.	a
8570	7989	s	a
8570	7992	s	A
8570	7549	s	λ
8570	7705	s	l
8570	7708	s	L
8570	8571	<1s>	<>
8571	143	.	.
8571	144	 	 
8571	143	<~>	<~>
8571	143	<split-s>	<split-s>
8571	143	<split-h>	<split-h>
8571	143	<name2>	<name2>
8571	8536	<>	<name>
8571	147	<aphaerese>	<aphaerese>
8571	8538	<>	<aphaerese>
8571	8538	<>	<elision3>
8571	8538	<>	<elision2>
8571	8538	<>	<elision1>
8571	6469	.	υ
8571	6469	.	u
8571	6469	.	α
8571	6469	.	a
8571	8572	<K>	<>
8572	6519	.	.
8572	6519	<~>	<~>
8572	6519	<split-s>	<split-s>
8572	6519	<split-h>	<split-h>
8572	6519	<name2>	<name2>
8572	8540	<>	<name>
8572	6522	<aphaerese>	<aphaerese>
8572	8539	<>	<aphaerese>
8572	8539	<>	<elision3>
8572	8539	<>	<elision2>
8572	8539	<>	<elision1>
8572	6518	.	υ
8572	6518	.	u
8572	6518	.	α
8572	6518	.	a
8573	8574	<>	<name>
8573	8573	<>	<aphaerese>
8573	8573	<>	<elision3>
8573	8573	<>	<elision2>
8573	8573	<>	<elision1>
8573	8520	<K2kl>	<>
8574	8575	<>	<aphaerese>
8574	8575	<>	<elision3>
8574	8575	<>	<elision2>
8574	8575	<>	<elision1>
8574	8521	<K2kl>	<>
8575	8573	<>	<aphaerese>
8575	8573	<>	<elision3>
8575	8573	<>	<elision2>
8575	8573	<>	<elision1>
8575	8522	<K2kl>	<>
8576	8577	<>	<name>
8576	8576	<>	<aphaerese>
8576	8576	<>	<elision3>
8576	8576	<>	<elision2>
8576	8576	<>	<elision1>
8576	8520	<L2kl>	<>
8577	8578	<>	<aphaerese>
8577	8578	<>	<elision3>
8577	8578	<>	<elision2>
8577	8578	<>	<elision1>
8577	8521	<L2kl>	<>
8578	8576	<>	<aphaerese>
8578	8576	<>	<elision3>
8578	8576	<>	<elision2>
8578	8576	<>	<elision1>
8578	8522	<L2kl>	<>
8579	8580	<>	<aphaerese>
8579	8580	<>	<elision3>
8579	8580	<>	<elision2>
8579	8580	<>	<elision1>
8579	8348	<3s>	<>
8580	8581	<>	<name>
8580	8580	<>	<aphaerese>
8580	8580	<>	<elision3>
8580	8580	<>	<elision2>
8580	8580	<>	<elision1>
8580	8349	<3s>	<>
8581	8579	<>	<aphaerese>
8581	8579	<>	<elision3>
8581	8579	<>	<elision2>
8581	8579	<>	<elision1>
8581	8350	<3s>	<>
8582	8583	<>	<aphaerese>
8582	8583	<>	<elision3>
8582	8583	<>	<elision2>
8582	8583	<>	<elision1>
8582	8487	<3s>	<>
8583	8584	<>	<name>
8583	8583	<>	<aphaerese>
8583	8583	<>	<elision3>
8583	8583	<>	<elision2>
8583	8583	<>	<elision1>
8583	8488	<3s>	<>
8584	8582	<>	<aphaerese>
8584	8582	<>	<elision3>
8584	8582	<>	<elision2>
8584	8582	<>	<elision1>
8584	8489	<3s>	<>
8585	8336	.	.
8585	8336	 	 
8585	8336	<~>	<~>
8585	8336	<split-s>	<split-s>
8585	8336	<split-h>	<split-h>
8585	8336	<name2>	<name2>
8585	8586	<>	<name>
8585	8339	<aphaerese>	<aphaerese>
8585	8585	<>	<aphaerese>
8585	8588	<elision3>	<elision3>
8585	8585	<>	<elision3>
8585	8588	<elision2>	<elision2>
8585	8585	<>	<elision2>
8585	8588	<elision1>	<elision1>
8585	8585	<>	<elision1>
8585	8500	.	υ
8585	8500	.	u
8585	8500	.	κ
8585	8500	.	α
8585	8500	.	a
8585	8500	.	λ
8585	8689	<4s>	<>
8586	8338	.	.
8586	8338	 	 
8586	8338	<~>	<~>
8586	8338	<split-s>	<split-s>
8586	8338	<split-h>	<split-h>
8586	8338	<name2>	<name2>
8586	8341	<aphaerese>	<aphaerese>
8586	8587	<>	<aphaerese>
8586	8590	<elision3>	<elision3>
8586	8587	<>	<elision3>
8586	8590	<elision2>	<elision2>
8586	8587	<>	<elision2>
8586	8590	<elision1>	<elision1>
8586	8587	<>	<elision1>
8586	8502	.	υ
8586	8502	.	u
8586	8502	.	κ
8586	8502	.	α
8586	8502	.	a
8586	8502	.	λ
8586	8690	<4s>	<>
8587	8336	.	.
8587	8336	 	 
8587	8336	<~>	<~>
8587	8336	<split-s>	<split-s>
8587	8336	<split-h>	<split-h>
8587	8336	<name2>	<name2>
8587	8339	<aphaerese>	<aphaerese>
8587	8585	<>	<aphaerese>
8587	8588	<elision3>	<elision3>
8587	8585	<>	<elision3>
8587	8588	<elision2>	<elision2>
8587	8585	<>	<elision2>
8587	8588	<elision1>	<elision1>
8587	8585	<>	<elision1>
8587	8500	.	υ
8587	8500	.	u
8587	8500	.	κ
8587	8500	.	α
8587	8500	.	a
8587	8500	.	λ
8587	8688	<4s>	<>
8588	8336	.	.
8588	8336	 	 
8588	8336	<~>	<~>
8588	8336	<split-s>	<split-s>
8588	8336	<split-h>	<split-h>
8588	8336	<name2>	<name2>
8588	8589	<>	<name>
8588	8339	<aphaerese>	<aphaerese>
8588	8588	<>	<aphaerese>
8588	8336	<elision3>	<elision3>
8588	8588	<>	<elision3>
8588	8336	<elision2>	<elision2>
8588	8588	<>	<elision2>
8588	8336	<elision1>	<elision1>
8588	8588	<>	<elision1>
8588	8500	.	υ
8588	8500	.	u
8588	8342	.	κ
8588	8500	.	α
8588	8500	.	a
8588	8592	<4s>	<>
8589	8338	.	.
8589	8338	 	 
8589	8338	<~>	<~>
8589	8338	<split-s>	<split-s>
8589	8338	<split-h>	<split-h>
8589	8338	<name2>	<name2>
8589	8341	<aphaerese>	<aphaerese>
8589	8590	<>	<aphaerese>
8589	8338	<elision3>	<elision3>
8589	8590	<>	<elision3>
8589	8338	<elision2>	<elision2>
8589	8590	<>	<elision2>
8589	8338	<elision1>	<elision1>
8589	8590	<>	<elision1>
8589	8502	.	υ
8589	8502	.	u
8589	8344	.	κ
8589	8502	.	α
8589	8502	.	a
8589	8593	<4s>	<>
8590	8336	.	.
8590	8336	 	 
8590	8336	<~>	<~>
8590	8336	<split-s>	<split-s>
8590	8336	<split-h>	<split-h>
8590	8336	<name2>	<name2>
8590	8339	<aphaerese>	<aphaerese>
8590	8588	<>	<aphaerese>
8590	8336	<elision3>	<elision3>
8590	8588	<>	<elision3>
8590	8336	<elision2>	<elision2>
8590	8588	<>	<elision2>
8590	8336	<elision1>	<elision1>
8590	8588	<>	<elision1>
8590	8500	.	υ
8590	8500	.	u
8590	8342	.	κ
8590	8500	.	α
8590	8500	.	a
8590	8591	<4s>	<>
8591	107	.	.
8591	108	 	 
8591	107	<~>	<~>
8591	107	<split-s>	<split-s>
8591	107	<split-h>	<split-h>
8591	107	<name2>	<name2>
8591	111	<aphaerese>	<aphaerese>
8591	8592	<>	<aphaerese>
8591	107	<elision3>	<elision3>
8591	8592	<>	<elision3>
8591	107	<elision2>	<elision2>
8591	8592	<>	<elision2>
8591	107	<elision1>	<elision1>
8591	8592	<>	<elision1>
8591	8110	.	υ
8591	8154	H	υ
8591	8110	.	u
8591	8156	H	u
8591	114	.	κ
8591	8675	H	κ
8591	8679	H	k
8591	8077	H	U
8591	8683	H	K
8591	8110	.	α
8591	8140	H	α
8591	8110	.	a
8591	8145	H	a
8591	7907	H	A
8591	8631	H	λ
8591	8637	H	l
8591	8687	H	L
8591	8640	<K>	<>
8592	107	.	.
8592	108	 	 
8592	107	<~>	<~>
8592	107	<split-s>	<split-s>
8592	107	<split-h>	<split-h>
8592	107	<name2>	<name2>
8592	8593	<>	<name>
8592	111	<aphaerese>	<aphaerese>
8592	8592	<>	<aphaerese>
8592	107	<elision3>	<elision3>
8592	8592	<>	<elision3>
8592	107	<elision2>	<elision2>
8592	8592	<>	<elision2>
8592	107	<elision1>	<elision1>
8592	8592	<>	<elision1>
8592	8110	.	υ
8592	8154	H	υ
8592	8110	.	u
8592	8156	H	u
8592	114	.	κ
8592	8675	H	κ
8592	8679	H	k
8592	8077	H	U
8592	8683	H	K
8592	8110	.	α
8592	8140	H	α
8592	8110	.	a
8592	8145	H	a
8592	7907	H	A
8592	8631	H	λ
8592	8637	H	l
8592	8687	H	L
8592	8641	<K>	<>
8593	106	.	.
8593	110	 	 
8593	106	<~>	<~>
8593	106	<split-s>	<split-s>
8593	106	<split-h>	<split-h>
8593	106	<name2>	<name2>
8593	113	<aphaerese>	<aphaerese>
8593	8591	<>	<aphaerese>
8593	106	<elision3>	<elision3>
8593	8591	<>	<elision3>
8593	106	<elision2>	<elision2>
8593	8591	<>	<elision2>
8593	106	<elision1>	<elision1>
8593	8591	<>	<elision1>
8593	8112	.	υ
8593	8149	H	υ
8593	8112	.	u
8593	8153	H	u
8593	116	.	κ
8593	8594	H	κ
8593	8613	H	k
8593	8079	H	U
8593	8626	H	K
8593	8112	.	α
8593	8139	H	α
8593	8112	.	a
8593	8144	H	a
8593	7910	H	A
8593	8630	H	λ
8593	8636	H	l
8593	8634	H	L
8593	8639	<K>	<>
8594	8595	<>	<aphaerese>
8594	8595	<>	<elision3>
8594	8595	<>	<elision2>
8594	8595	<>	<elision1>
8594	8598	<kappa2K>	<>
8594	8610	<kappa2L>	<>
8594	8060	<lambda2L>	<>
8595	8596	<>	<name>
8595	8595	<>	<aphaerese>
8595	8595	<>	<elision3>
8595	8595	<>	<elision2>
8595	8595	<>	<elision1>
8595	8599	<kappa2K>	<>
8595	8602	<kappa2L>	<>
8595	8058	<lambda2L>	<>
8596	8597	<>	<aphaerese>
8596	8597	<>	<elision3>
8596	8597	<>	<elision2>
8596	8597	<>	<elision1>
8596	8600	<kappa2K>	<>
8596	8603	<kappa2L>	<>
8596	8059	<lambda2L>	<>
8597	8595	<>	<aphaerese>
8597	8595	<>	<elision3>
8597	8595	<>	<elision2>
8597	8595	<>	<elision1>
8597	8598	<kappa2K>	<>
8597	8601	<kappa2L>	<>
8597	8060	<lambda2L>	<>
8598	7741	.	.
8598	7742	 	 
8598	7741	<~>	<~>
8598	7741	<split-s>	<split-s>
8598	7741	<split-h>	<split-h>
8598	7741	<name2>	<name2>
8598	7745	<aphaerese>	<aphaerese>
8598	8599	<>	<aphaerese>
8598	7878	<elision3>	<elision3>
8598	8599	<>	<elision3>
8598	7878	<elision2>	<elision2>
8598	8599	<>	<elision2>
8598	7878	<elision1>	<elision1>
8598	8599	<>	<elision1>
8598	7749	.	υ
8598	7752	s	υ
8598	7749	.	u
8598	7752	s	u
8598	7815	s	U
8598	7749	.	α
8598	7843	s	α
8598	7749	.	a
8598	7843	s	a
8598	7846	s	A
8599	7741	.	.
8599	7742	 	 
8599	7741	<~>	<~>
8599	7741	<split-s>	<split-s>
8599	7741	<split-h>	<split-h>
8599	7741	<name2>	<name2>
8599	8600	<>	<name>
8599	7745	<aphaerese>	<aphaerese>
8599	8599	<>	<aphaerese>
8599	7878	<elision3>	<elision3>
8599	8599	<>	<elision3>
8599	7878	<elision2>	<elision2>
8599	8599	<>	<elision2>
8599	7878	<elision1>	<elision1>
8599	8599	<>	<elision1>
8599	7749	.	υ
8599	7752	s	υ
8599	7749	.	u
8599	7752	s	u
8599	7815	s	U
8599	7749	.	α
8599	7843	s	α
8599	7749	.	a
8599	7843	s	a
8599	7846	s	A
8600	7744	.	.
8600	7747	 	 
8600	7744	<~>	<~>
8600	7744	<split-s>	<split-s>
8600	7744	<split-h>	<split-h>
8600	7744	<name2>	<name2>
8600	7873	<aphaerese>	<aphaerese>
8600	8598	<>	<aphaerese>
8600	7880	<elision3>	<elision3>
8600	8598	<>	<elision3>
8600	7880	<elision2>	<elision2>
8600	8598	<>	<elision2>
8600	7880	<elision1>	<elision1>
8600	8598	<>	<elision1>
8600	7751	.	υ
8600	7754	s	υ
8600	7751	.	u
8600	7754	s	u
8600	7817	s	U
8600	7751	.	α
8600	7845	s	α
8600	7751	.	a
8600	7845	s	a
8600	7848	s	A
8601	7907	.	.
8601	7908	 	 
8601	7907	<~>	<~>
8601	7907	<split-s>	<split-s>
8601	7907	<split-h>	<split-h>
8601	7907	<name2>	<name2>
8601	7911	<aphaerese>	<aphaerese>
8601	8602	<>	<aphaerese>
8601	8024	<elision3>	<elision3>
8601	8602	<>	<elision3>
8601	8024	<elision2>	<elision2>
8601	8602	<>	<elision2>
8601	8024	<elision1>	<elision1>
8601	8602	<>	<elision1>
8601	7915	.	υ
8601	7918	s	υ
8601	7915	.	u
8601	7918	s	u
8601	7964	s	U
8601	7915	.	α
8601	7989	s	α
8601	7915	.	a
8601	7989	s	a
8601	7992	s	A
8601	8605	<1s>	<>
8602	7907	.	.
8602	7908	 	 
8602	7907	<~>	<~>
8602	7907	<split-s>	<split-s>
8602	7907	<split-h>	<split-h>
8602	7907	<name2>	<name2>
8602	8603	<>	<name>
8602	7911	<aphaerese>	<aphaerese>
8602	8602	<>	<aphaerese>
8602	8024	<elision3>	<elision3>
8602	8602	<>	<elision3>
8602	8024	<elision2>	<elision2>
8602	8602	<>	<elision2>
8602	8024	<elision1>	<elision1>
8602	8602	<>	<elision1>
8602	7915	.	υ
8602	7918	s	υ
8602	7915	.	u
8602	7918	s	u
8602	7964	s	U
8602	7915	.	α
8602	7989	s	α
8602	7915	.	a
8602	7989	s	a
8602	7992	s	A
8602	8606	<1s>	<>
8603	7910	.	.
8603	7913	 	 
8603	7910	<~>	<~>
8603	7910	<split-s>	<split-s>
8603	7910	<split-h>	<split-h>
8603	7910	<name2>	<name2>
8603	8019	<aphaerese>	<aphaerese>
8603	8601	<>	<aphaerese>
8603	8026	<elision3>	<elision3>
8603	8601	<>	<elision3>
8603	8026	<elision2>	<elision2>
8603	8601	<>	<elision2>
8603	8026	<elision1>	<elision1>
8603	8601	<>	<elision1>
8603	7917	.	υ
8603	7920	s	υ
8603	7917	.	u
8603	7920	s	u
8603	7966	s	U
8603	7917	.	α
8603	7991	s	α
8603	7917	.	a
8603	7991	s	a
8603	7994	s	A
8603	8604	<1s>	<>
8604	142	.	.
8604	146	 	 
8604	142	<~>	<~>
8604	142	<split-s>	<split-s>
8604	142	<split-h>	<split-h>
8604	142	<name2>	<name2>
8604	149	<aphaerese>	<aphaerese>
8604	8605	<>	<aphaerese>
8604	7050	<elision3>	<elision3>
8604	8605	<>	<elision3>
8604	7050	<elision2>	<elision2>
8604	8605	<>	<elision2>
8604	7050	<elision1>	<elision1>
8604	8605	<>	<elision1>
8604	6471	.	υ
8604	6508	H	υ
8604	6471	.	u
8604	6512	H	u
8604	6438	H	U
8604	6471	.	α
8604	6498	H	α
8604	6471	.	a
8604	6503	H	a
8604	6269	H	A
8604	8608	<K>	<>
8605	143	.	.
8605	144	 	 
8605	143	<~>	<~>
8605	143	<split-s>	<split-s>
8605	143	<split-h>	<split-h>
8605	143	<name2>	<name2>
8605	147	<aphaerese>	<aphaerese>
8605	8606	<>	<aphaerese>
8605	7051	<elision3>	<elision3>
8605	8606	<>	<elision3>
8605	7051	<elision2>	<elision2>
8605	8606	<>	<elision2>
8605	7051	<elision1>	<elision1>
8605	8606	<>	<elision1>
8605	6469	.	υ
8605	6513	H	υ
8605	6469	.	u
8605	6515	H	u
8605	6436	H	U
8605	6469	.	α
8605	6499	H	α
8605	6469	.	a
8605	6504	H	a
8605	6266	H	A
8605	8609	<K>	<>
8606	143	.	.
8606	144	 	 
8606	143	<~>	<~>
8606	143	<split-s>	<split-s>
8606	143	<split-h>	<split-h>
8606	143	<name2>	<name2>
8606	8604	<>	<name>
8606	147	<aphaerese>	<aphaerese>
8606	8606	<>	<aphaerese>
8606	7051	<elision3>	<elision3>
8606	8606	<>	<elision3>
8606	7051	<elision2>	<elision2>
8606	8606	<>	<elision2>
8606	7051	<elision1>	<elision1>
8606	8606	<>	<elision1>
8606	6469	.	υ
8606	6513	H	υ
8606	6469	.	u
8606	6515	H	u
8606	6436	H	U
8606	6469	.	α
8606	6499	H	α
8606	6469	.	a
8606	6504	H	a
8606	6266	H	A
8606	8607	<K>	<>
8607	6519	.	.
8607	6519	<~>	<~>
8607	6519	<split-s>	<split-s>
8607	6519	<split-h>	<split-h>
8607	6519	<name2>	<name2>
8607	8608	<>	<name>
8607	6522	<aphaerese>	<aphaerese>
8607	8607	<>	<aphaerese>
8607	7000	<elision3>	<elision3>
8607	8607	<>	<elision3>
8607	7000	<elision2>	<elision2>
8607	8607	<>	<elision2>
8607	7000	<elision1>	<elision1>
8607	8607	<>	<elision1>
8607	6518	.	υ
8607	6661	H	υ
8607	6518	.	u
8607	6670	H	u
8607	6639	H	U
8607	6518	.	α
8607	6673	H	α
8607	6518	.	a
8607	6676	H	a
8607	6610	H	A
8608	6521	.	.
8608	6521	<~>	<~>
8608	6521	<split-s>	<split-s>
8608	6521	<split-h>	<split-h>
8608	6521	<name2>	<name2>
8608	6524	<aphaerese>	<aphaerese>
8608	8609	<>	<aphaerese>
8608	6999	<elision3>	<elision3>
8608	8609	<>	<elision3>
8608	6999	<elision2>	<elision2>
8608	8609	<>	<elision2>
8608	6999	<elision1>	<elision1>
8608	8609	<>	<elision1>
8608	6517	.	υ
8608	6663	H	υ
8608	6517	.	u
8608	6672	H	u
8608	6641	H	U
8608	6517	.	α
8608	6675	H	α
8608	6517	.	a
8608	6678	H	a
8608	6612	H	A
8609	6519	.	.
8609	6519	<~>	<~>
8609	6519	<split-s>	<split-s>
8609	6519	<split-h>	<split-h>
8609	6519	<name2>	<name2>
8609	6522	<aphaerese>	<aphaerese>
8609	8607	<>	<aphaerese>
8609	7000	<elision3>	<elision3>
8609	8607	<>	<elision3>
8609	7000	<elision2>	<elision2>
8609	8607	<>	<elision2>
8609	7000	<elision1>	<elision1>
8609	8607	<>	<elision1>
8609	6518	.	υ
8609	6661	H	υ
8609	6518	.	u
8609	6670	H	u
8609	6639	H	U
8609	6518	.	α
8609	6673	H	α
8609	6518	.	a
8609	6676	H	a
8609	6610	H	A
8610	7907	.	.
8610	7908	 	 
8610	7907	<~>	<~>
8610	7907	<split-s>	<split-s>
8610	7907	<split-h>	<split-h>
8610	7907	<name2>	<name2>
8610	7911	<aphaerese>	<aphaerese>
8610	8602	<>	<aphaerese>
8610	8024	<elision3>	<elision3>
8610	8602	<>	<elision3>
8610	8024	<elision2>	<elision2>
8610	8602	<>	<elision2>
8610	8024	<elision1>	<elision1>
8610	8602	<>	<elision1>
8610	7915	.	υ
8610	7918	s	υ
8610	7915	.	u
8610	7918	s	u
8610	7964	s	U
8610	7915	.	α
8610	7989	s	α
8610	7915	.	a
8610	7989	s	a
8610	7992	s	A
8610	8611	<1s>	<>
8611	143	.	.
8611	144	 	 
8611	143	<~>	<~>
8611	143	<split-s>	<split-s>
8611	143	<split-h>	<split-h>
8611	143	<name2>	<name2>
8611	147	<aphaerese>	<aphaerese>
8611	8606	<>	<aphaerese>
8611	7051	<elision3>	<elision3>
8611	8606	<>	<elision3>
8611	7051	<elision2>	<elision2>
8611	8606	<>	<elision2>
8611	7051	<elision1>	<elision1>
8611	8606	<>	<elision1>
8611	6469	.	υ
8611	6469	.	u
8611	6469	.	α
8611	6469	.	a
8611	8612	<K>	<>
8612	6519	.	.
8612	6519	<~>	<~>
8612	6519	<split-s>	<split-s>
8612	6519	<split-h>	<split-h>
8612	6519	<name2>	<name2>
8612	6522	<aphaerese>	<aphaerese>
8612	8607	<>	<aphaerese>
8612	7000	<elision3>	<elision3>
8612	8607	<>	<elision3>
8612	7000	<elision2>	<elision2>
8612	8607	<>	<elision2>
8612	7000	<elision1>	<elision1>
8612	8607	<>	<elision1>
8612	6518	.	υ
8612	6518	.	u
8612	6518	.	α
8612	6518	.	a
8613	8614	<>	<aphaerese>
8613	8614	<>	<elision3>
8613	8614	<>	<elision2>
8613	8614	<>	<elision1>
8613	8617	<k2K>	<>
8613	8623	<k2L>	<>
8613	8060	<l2L>	<>
8614	8615	<>	<name>
8614	8614	<>	<aphaerese>
8614	8614	<>	<elision3>
8614	8614	<>	<elision2>
8614	8614	<>	<elision1>
8614	8618	<k2K>	<>
8614	8621	<k2L>	<>
8614	8058	<l2L>	<>
8615	8616	<>	<aphaerese>
8615	8616	<>	<elision3>
8615	8616	<>	<elision2>
8615	8616	<>	<elision1>
8615	8619	<k2K>	<>
8615	8622	<k2L>	<>
8615	8059	<l2L>	<>
8616	8614	<>	<aphaerese>
8616	8614	<>	<elision3>
8616	8614	<>	<elision2>
8616	8614	<>	<elision1>
8616	8617	<k2K>	<>
8616	8620	<k2L>	<>
8616	8060	<l2L>	<>
8617	7741	.	.
8617	7742	 	 
8617	7741	<~>	<~>
8617	7741	<split-s>	<split-s>
8617	7741	<split-h>	<split-h>
8617	7741	<name2>	<name2>
8617	7745	<aphaerese>	<aphaerese>
8617	8618	<>	<aphaerese>
8617	7741	<elision3>	<elision3>
8617	8618	<>	<elision3>
8617	7741	<elision2>	<elision2>
8617	8618	<>	<elision2>
8617	7741	<elision1>	<elision1>
8617	8618	<>	<elision1>
8617	7749	.	υ
8617	7752	s	υ
8617	7749	.	u
8617	7752	s	u
8617	7815	s	U
8617	7749	.	α
8617	7843	s	α
8617	7749	.	a
8617	7843	s	a
8617	7846	s	A
8618	7741	.	.
8618	7742	 	 
8618	7741	<~>	<~>
8618	7741	<split-s>	<split-s>
8618	7741	<split-h>	<split-h>
8618	7741	<name2>	<name2>
8618	8619	<>	<name>
8618	7745	<aphaerese>	<aphaerese>
8618	8618	<>	<aphaerese>
8618	7741	<elision3>	<elision3>
8618	8618	<>	<elision3>
8618	7741	<elision2>	<elision2>
8618	8618	<>	<elision2>
8618	7741	<elision1>	<elision1>
8618	8618	<>	<elision1>
8618	7749	.	υ
8618	7752	s	υ
8618	7749	.	u
8618	7752	s	u
8618	7815	s	U
8618	7749	.	α
8618	7843	s	α
8618	7749	.	a
8618	7843	s	a
8618	7846	s	A
8619	7744	.	.
8619	7747	 	 
8619	7744	<~>	<~>
8619	7744	<split-s>	<split-s>
8619	7744	<split-h>	<split-h>
8619	7744	<name2>	<name2>
8619	7873	<aphaerese>	<aphaerese>
8619	8617	<>	<aphaerese>
8619	7744	<elision3>	<elision3>
8619	8617	<>	<elision3>
8619	7744	<elision2>	<elision2>
8619	8617	<>	<elision2>
8619	7744	<elision1>	<elision1>
8619	8617	<>	<elision1>
8619	7751	.	υ
8619	7754	s	υ
8619	7751	.	u
8619	7754	s	u
8619	7817	s	U
8619	7751	.	α
8619	7845	s	α
8619	7751	.	a
8619	7845	s	a
8619	7848	s	A
8620	7907	.	.
8620	7908	 	 
8620	7907	<~>	<~>
8620	7907	<split-s>	<split-s>
8620	7907	<split-h>	<split-h>
8620	7907	<name2>	<name2>
8620	7911	<aphaerese>	<aphaerese>
8620	8621	<>	<aphaerese>
8620	7907	<elision3>	<elision3>
8620	8621	<>	<elision3>
8620	7907	<elision2>	<elision2>
8620	8621	<>	<elision2>
8620	7907	<elision1>	<elision1>
8620	8621	<>	<elision1>
8620	7915	.	υ
8620	7918	s	υ
8620	7915	.	u
8620	7918	s	u
8620	7964	s	U
8620	7915	.	α
8620	7989	s	α
8620	7915	.	a
8620	7989	s	a
8620	7992	s	A
8620	7322	<1s>	<>
8621	7907	.	.
8621	7908	 	 
8621	7907	<~>	<~>
8621	7907	<split-s>	<split-s>
8621	7907	<split-h>	<split-h>
8621	7907	<name2>	<name2>
8621	8622	<>	<name>
8621	7911	<aphaerese>	<aphaerese>
8621	8621	<>	<aphaerese>
8621	7907	<elision3>	<elision3>
8621	8621	<>	<elision3>
8621	7907	<elision2>	<elision2>
8621	8621	<>	<elision2>
8621	7907	<elision1>	<elision1>
8621	8621	<>	<elision1>
8621	7915	.	υ
8621	7918	s	υ
8621	7915	.	u
8621	7918	s	u
8621	7964	s	U
8621	7915	.	α
8621	7989	s	α
8621	7915	.	a
8621	7989	s	a
8621	7992	s	A
8621	7323	<1s>	<>
8622	7910	.	.
8622	7913	 	 
8622	7910	<~>	<~>
8622	7910	<split-s>	<split-s>
8622	7910	<split-h>	<split-h>
8622	7910	<name2>	<name2>
8622	8019	<aphaerese>	<aphaerese>
8622	8620	<>	<aphaerese>
8622	7910	<elision3>	<elision3>
8622	8620	<>	<elision3>
8622	7910	<elision2>	<elision2>
8622	8620	<>	<elision2>
8622	7910	<elision1>	<elision1>
8622	8620	<>	<elision1>
8622	7917	.	υ
8622	7920	s	υ
8622	7917	.	u
8622	7920	s	u
8622	7966	s	U
8622	7917	.	α
8622	7991	s	α
8622	7917	.	a
8622	7991	s	a
8622	7994	s	A
8622	7324	<1s>	<>
8623	7907	.	.
8623	7908	 	 
8623	7907	<~>	<~>
8623	7907	<split-s>	<split-s>
8623	7907	<split-h>	<split-h>
8623	7907	<name2>	<name2>
8623	7911	<aphaerese>	<aphaerese>
8623	8621	<>	<aphaerese>
8623	7907	<elision3>	<elision3>
8623	8621	<>	<elision3>
8623	7907	<elision2>	<elision2>
8623	8621	<>	<elision2>
8623	7907	<elision1>	<elision1>
8623	8621	<>	<elision1>
8623	7915	.	υ
8623	7918	s	υ
8623	7915	.	u
8623	7918	s	u
8623	7964	s	U
8623	7915	.	α
8623	7989	s	α
8623	7915	.	a
8623	7989	s	a
8623	7992	s	A
8623	8624	<1s>	<>
8624	143	.	.
8624	144	 	 
8624	143	<~>	<~>
8624	143	<split-s>	<split-s>
8624	143	<split-h>	<split-h>
8624	143	<name2>	<name2>
8624	147	<aphaerese>	<aphaerese>
8624	7323	<>	<aphaerese>
8624	143	<elision3>	<elision3>
8624	7323	<>	<elision3>
8624	143	<elision2>	<elision2>
8624	7323	<>	<elision2>
8624	143	<elision1>	<elision1>
8624	7323	<>	<elision1>
8624	6469	.	υ
8624	6469	.	u
8624	6469	.	α
8624	6469	.	a
8624	8625	<K>	<>
8625	6519	.	.
8625	6519	<~>	<~>
8625	6519	<split-s>	<split-s>
8625	6519	<split-h>	<split-h>
8625	6519	<name2>	<name2>
8625	6522	<aphaerese>	<aphaerese>
8625	7327	<>	<aphaerese>
8625	6519	<elision3>	<elision3>
8625	7327	<>	<elision3>
8625	6519	<elision2>	<elision2>
8625	7327	<>	<elision2>
8625	6519	<elision1>	<elision1>
8625	7327	<>	<elision1>
8625	6518	.	υ
8625	6518	.	u
8625	6518	.	α
8625	6518	.	a
8626	7741	.	.
8626	7742	 	 
8626	7741	<~>	<~>
8626	7741	<split-s>	<split-s>
8626	7741	<split-h>	<split-h>
8626	7741	<name2>	<name2>
8626	7745	<aphaerese>	<aphaerese>
8626	8627	<>	<aphaerese>
8626	7741	<elision3>	<elision3>
8626	8627	<>	<elision3>
8626	7741	<elision2>	<elision2>
8626	8627	<>	<elision2>
8626	7741	<elision1>	<elision1>
8626	8627	<>	<elision1>
8626	7749	.	υ
8626	7752	s	υ
8626	7749	.	u
8626	7752	s	u
8626	7915	.	κ
8626	7815	s	U
8626	7749	.	α
8626	7843	s	α
8626	7749	.	a
8626	7843	s	a
8626	7846	s	A
8626	7915	.	λ
8626	7238	<1s>	<>
8626	8623	<K2L>	<>
8627	7741	.	.
8627	7742	 	 
8627	7741	<~>	<~>
8627	7741	<split-s>	<split-s>
8627	7741	<split-h>	<split-h>
8627	7741	<name2>	<name2>
8627	8628	<>	<name>
8627	7745	<aphaerese>	<aphaerese>
8627	8627	<>	<aphaerese>
8627	7741	<elision3>	<elision3>
8627	8627	<>	<elision3>
8627	7741	<elision2>	<elision2>
8627	8627	<>	<elision2>
8627	7741	<elision1>	<elision1>
8627	8627	<>	<elision1>
8627	7749	.	υ
8627	7752	s	υ
8627	7749	.	u
8627	7752	s	u
8627	7915	.	κ
8627	7815	s	U
8627	7749	.	α
8627	7843	s	α
8627	7749	.	a
8627	7843	s	a
8627	7846	s	A
8627	7915	.	λ
8627	7239	<1s>	<>
8627	8621	<K2L>	<>
8628	7744	.	.
8628	7747	 	 
8628	7744	<~>	<~>
8628	7744	<split-s>	<split-s>
8628	7744	<split-h>	<split-h>
8628	7744	<name2>	<name2>
8628	7873	<aphaerese>	<aphaerese>
8628	8629	<>	<aphaerese>
8628	7744	<elision3>	<elision3>
8628	8629	<>	<elision3>
8628	7744	<elision2>	<elision2>
8628	8629	<>	<elision2>
8628	7744	<elision1>	<elision1>
8628	8629	<>	<elision1>
8628	7751	.	υ
8628	7754	s	υ
8628	7751	.	u
8628	7754	s	u
8628	7917	.	κ
8628	7817	s	U
8628	7751	.	α
8628	7845	s	α
8628	7751	.	a
8628	7845	s	a
8628	7848	s	A
8628	7917	.	λ
8628	7240	<1s>	<>
8628	8622	<K2L>	<>
8629	7741	.	.
8629	7742	 	 
8629	7741	<~>	<~>
8629	7741	<split-s>	<split-s>
8629	7741	<split-h>	<split-h>
8629	7741	<name2>	<name2>
8629	7745	<aphaerese>	<aphaerese>
8629	8627	<>	<aphaerese>
8629	7741	<elision3>	<elision3>
8629	8627	<>	<elision3>
8629	7741	<elision2>	<elision2>
8629	8627	<>	<elision2>
8629	7741	<elision1>	<elision1>
8629	8627	<>	<elision1>
8629	7749	.	υ
8629	7752	s	υ
8629	7749	.	u
8629	7752	s	u
8629	7915	.	κ
8629	7815	s	U
8629	7749	.	α
8629	7843	s	α
8629	7749	.	a
8629	7843	s	a
8629	7846	s	A
8629	7915	.	λ
8629	7238	<1s>	<>
8629	8620	<K2L>	<>
8630	8631	<>	<aphaerese>
8630	8631	<>	<elision3>
8630	8631	<>	<elision2>
8630	8631	<>	<elision1>
8630	8634	<lambda2L>	<>
8631	8632	<>	<name>
8631	8631	<>	<aphaerese>
8631	8631	<>	<elision3>
8631	8631	<>	<elision2>
8631	8631	<>	<elision1>
8631	8635	<lambda2L>	<>
8632	8630	<>	<aphaerese>
8632	8630	<>	<elision3>
8632	8630	<>	<elision2>
8632	8630	<>	<elision1>
8632	8633	<lambda2L>	<>
8633	7910	.	.
8633	7913	 	 
8633	7910	<~>	<~>
8633	7910	<split-s>	<split-s>
8633	7910	<split-h>	<split-h>
8633	7910	<name2>	<name2>
8633	8019	<aphaerese>	<aphaerese>
8633	8634	<>	<aphaerese>
8633	7910	<elision3>	<elision3>
8633	8634	<>	<elision3>
8633	7910	<elision2>	<elision2>
8633	8634	<>	<elision2>
8633	7910	<elision1>	<elision1>
8633	8634	<>	<elision1>
8633	7917	.	υ
8633	7920	s	υ
8633	7917	.	u
8633	7920	s	u
8633	7917	.	κ
8633	7966	s	U
8633	7917	.	α
8633	7991	s	α
8633	7917	.	a
8633	7991	s	a
8633	7994	s	A
8633	7917	.	λ
8633	7311	<1s>	<>
8634	7907	.	.
8634	7908	 	 
8634	7907	<~>	<~>
8634	7907	<split-s>	<split-s>
8634	7907	<split-h>	<split-h>
8634	7907	<name2>	<name2>
8634	7911	<aphaerese>	<aphaerese>
8634	8635	<>	<aphaerese>
8634	7907	<elision3>	<elision3>
8634	8635	<>	<elision3>
8634	7907	<elision2>	<elision2>
8634	8635	<>	<elision2>
8634	7907	<elision1>	<elision1>
8634	8635	<>	<elision1>
8634	7915	.	υ
8634	7918	s	υ
8634	7915	.	u
8634	7918	s	u
8634	7915	.	κ
8634	7964	s	U
8634	7915	.	α
8634	7989	s	α
8634	7915	.	a
8634	7989	s	a
8634	7992	s	A
8634	7915	.	λ
8634	7309	<1s>	<>
8635	7907	.	.
8635	7908	 	 
8635	7907	<~>	<~>
8635	7907	<split-s>	<split-s>
8635	7907	<split-h>	<split-h>
8635	7907	<name2>	<name2>
8635	8633	<>	<name>
8635	7911	<aphaerese>	<aphaerese>
8635	8635	<>	<aphaerese>
8635	7907	<elision3>	<elision3>
8635	8635	<>	<elision3>
8635	7907	<elision2>	<elision2>
8635	8635	<>	<elision2>
8635	7907	<elision1>	<elision1>
8635	8635	<>	<elision1>
8635	7915	.	υ
8635	7918	s	υ
8635	7915	.	u
8635	7918	s	u
8635	7915	.	κ
8635	7964	s	U
8635	7915	.	α
8635	7989	s	α
8635	7915	.	a
8635	7989	s	a
8635	7992	s	A
8635	7915	.	λ
8635	7310	<1s>	<>
8636	8637	<>	<aphaerese>
8636	8637	<>	<elision3>
8636	8637	<>	<elision2>
8636	8637	<>	<elision1>
8636	8634	<l2L>	<>
8637	8638	<>	<name>
8637	8637	<>	<aphaerese>
8637	8637	<>	<elision3>
8637	8637	<>	<elision2>
8637	8637	<>	<elision1>
8637	8635	<l2L>	<>
8638	8636	<>	<aphaerese>
8638	8636	<>	<elision3>
8638	8636	<>	<elision2>
8638	8636	<>	<elision1>
8638	8633	<l2L>	<>
8639	8162	.	.
8639	8162	<~>	<~>
8639	8162	<split-s>	<split-s>
8639	8162	<split-h>	<split-h>
8639	8162	<name2>	<name2>
8639	8165	<aphaerese>	<aphaerese>
8639	8640	<>	<aphaerese>
8639	8162	<elision3>	<elision3>
8639	8640	<>	<elision3>
8639	8162	<elision2>	<elision2>
8639	8640	<>	<elision2>
8639	8162	<elision1>	<elision1>
8639	8640	<>	<elision1>
8639	8158	.	υ
8639	8304	H	υ
8639	8158	.	u
8639	8313	H	u
8639	8168	.	κ
8639	8644	H	κ
8639	8653	H	k
8639	8282	H	U
8639	8662	H	K
8639	8158	.	α
8639	8316	H	α
8639	8158	.	a
8639	8319	H	a
8639	8253	H	A
8639	8667	H	λ
8639	8673	H	l
8639	8668	H	L
8640	8160	.	.
8640	8160	<~>	<~>
8640	8160	<split-s>	<split-s>
8640	8160	<split-h>	<split-h>
8640	8160	<name2>	<name2>
8640	8163	<aphaerese>	<aphaerese>
8640	8641	<>	<aphaerese>
8640	8160	<elision3>	<elision3>
8640	8641	<>	<elision3>
8640	8160	<elision2>	<elision2>
8640	8641	<>	<elision2>
8640	8160	<elision1>	<elision1>
8640	8641	<>	<elision1>
8640	8159	.	υ
8640	8302	H	υ
8640	8159	.	u
8640	8311	H	u
8640	8166	.	κ
8640	8642	H	κ
8640	8651	H	k
8640	8280	H	U
8640	8660	H	K
8640	8159	.	α
8640	8314	H	α
8640	8159	.	a
8640	8317	H	a
8640	8251	H	A
8640	8665	H	λ
8640	8671	H	l
8640	8674	H	L
8641	8160	.	.
8641	8160	<~>	<~>
8641	8160	<split-s>	<split-s>
8641	8160	<split-h>	<split-h>
8641	8160	<name2>	<name2>
8641	8639	<>	<name>
8641	8163	<aphaerese>	<aphaerese>
8641	8641	<>	<aphaerese>
8641	8160	<elision3>	<elision3>
8641	8641	<>	<elision3>
8641	8160	<elision2>	<elision2>
8641	8641	<>	<elision2>
8641	8160	<elision1>	<elision1>
8641	8641	<>	<elision1>
8641	8159	.	υ
8641	8302	H	υ
8641	8159	.	u
8641	8311	H	u
8641	8166	.	κ
8641	8642	H	κ
8641	8651	H	k
8641	8280	H	U
8641	8660	H	K
8641	8159	.	α
8641	8314	H	α
8641	8159	.	a
8641	8317	H	a
8641	8251	H	A
8641	8665	H	λ
8641	8671	H	l
8641	8674	H	L
8642	8643	<>	<name>
8642	8642	<>	<aphaerese>
8642	8642	<>	<elision3>
8642	8642	<>	<elision2>
8642	8642	<>	<elision1>
8642	8646	<kappa2K>	<>
8642	8649	<kappa2L>	<>
8642	8269	<lambda2L>	<>
8643	8644	<>	<aphaerese>
8643	8644	<>	<elision3>
8643	8644	<>	<elision2>
8643	8644	<>	<elision1>
8643	8647	<kappa2K>	<>
8643	8650	<kappa2L>	<>
8643	8270	<lambda2L>	<>
8644	8642	<>	<aphaerese>
8644	8642	<>	<elision3>
8644	8642	<>	<elision2>
8644	8642	<>	<elision1>
8644	8645	<kappa2K>	<>
8644	8648	<kappa2L>	<>
8644	8268	<lambda2L>	<>
8645	8221	.	.
8645	8221	<~>	<~>
8645	8221	<split-s>	<split-s>
8645	8221	<split-h>	<split-h>
8645	8221	<name2>	<name2>
8645	8224	<aphaerese>	<aphaerese>
8645	8646	<>	<aphaerese>
8645	8245	<elision3>	<elision3>
8645	8646	<>	<elision3>
8645	8245	<elision2>	<elision2>
8645	8646	<>	<elision2>
8645	8245	<elision1>	<elision1>
8645	8646	<>	<elision1>
8645	8239	.	υ
8645	8192	s	υ
8645	8239	.	u
8645	8192	s	u
8645	8233	s	U
8645	8239	.	α
8645	8192	s	α
8645	8239	.	a
8645	8192	s	a
8645	8236	s	A
8645	8185	<1m>	<>
8646	8221	.	.
8646	8221	<~>	<~>
8646	8221	<split-s>	<split-s>
8646	8221	<split-h>	<split-h>
8646	8221	<name2>	<name2>
8646	8647	<>	<name>
8646	8224	<aphaerese>	<aphaerese>
8646	8646	<>	<aphaerese>
8646	8245	<elision3>	<elision3>
8646	8646	<>	<elision3>
8646	8245	<elision2>	<elision2>
8646	8646	<>	<elision2>
8646	8245	<elision1>	<elision1>
8646	8646	<>	<elision1>
8646	8239	.	υ
8646	8192	s	υ
8646	8239	.	u
8646	8192	s	u
8646	8233	s	U
8646	8239	.	α
8646	8192	s	α
8646	8239	.	a
8646	8192	s	a
8646	8236	s	A
8646	8186	<1m>	<>
8647	8223	.	.
8647	8223	<~>	<~>
8647	8223	<split-s>	<split-s>
8647	8223	<split-h>	<split-h>
8647	8223	<name2>	<name2>
8647	8226	<aphaerese>	<aphaerese>
8647	8645	<>	<aphaerese>
8647	8244	<elision3>	<elision3>
8647	8645	<>	<elision3>
8647	8244	<elision2>	<elision2>
8647	8645	<>	<elision2>
8647	8244	<elision1>	<elision1>
8647	8645	<>	<elision1>
8647	8241	.	υ
8647	8191	s	υ
8647	8241	.	u
8647	8191	s	u
8647	8235	s	U
8647	8241	.	α
8647	8191	s	α
8647	8241	.	a
8647	8191	s	a
8647	8238	s	A
8647	8184	<1m>	<>
8648	8251	.	.
8648	8251	<~>	<~>
8648	8251	<split-s>	<split-s>
8648	8251	<split-h>	<split-h>
8648	8251	<name2>	<name2>
8648	8254	<aphaerese>	<aphaerese>
8648	8649	<>	<aphaerese>
8648	8263	<elision3>	<elision3>
8648	8649	<>	<elision3>
8648	8263	<elision2>	<elision2>
8648	8649	<>	<elision2>
8648	8263	<elision1>	<elision1>
8648	8649	<>	<elision1>
8648	8257	.	υ
8648	8192	s	υ
8648	8257	.	u
8648	8192	s	u
8648	8233	s	U
8648	8257	.	α
8648	8192	s	α
8648	8257	.	a
8648	8192	s	a
8648	8236	s	A
8648	8185	<1m>	<>
8649	8251	.	.
8649	8251	<~>	<~>
8649	8251	<split-s>	<split-s>
8649	8251	<split-h>	<split-h>
8649	8251	<name2>	<name2>
8649	8650	<>	<name>
8649	8254	<aphaerese>	<aphaerese>
8649	8649	<>	<aphaerese>
8649	8263	<elision3>	<elision3>
8649	8649	<>	<elision3>
8649	8263	<elision2>	<elision2>
8649	8649	<>	<elision2>
8649	8263	<elision1>	<elision1>
8649	8649	<>	<elision1>
8649	8257	.	υ
8649	8192	s	υ
8649	8257	.	u
8649	8192	s	u
8649	8233	s	U
8649	8257	.	α
8649	8192	s	α
8649	8257	.	a
8649	8192	s	a
8649	8236	s	A
8649	8186	<1m>	<>
8650	8253	.	.
8650	8253	<~>	<~>
8650	8253	<split-s>	<split-s>
8650	8253	<split-h>	<split-h>
8650	8253	<name2>	<name2>
8650	8256	<aphaerese>	<aphaerese>
8650	8648	<>	<aphaerese>
8650	8262	<elision3>	<elision3>
8650	8648	<>	<elision3>
8650	8262	<elision2>	<elision2>
8650	8648	<>	<elision2>
8650	8262	<elision1>	<elision1>
8650	8648	<>	<elision1>
8650	8259	.	υ
8650	8191	s	υ
8650	8259	.	u
8650	8191	s	u
8650	8235	s	U
8650	8259	.	α
8650	8191	s	α
8650	8259	.	a
8650	8191	s	a
8650	8238	s	A
8650	8184	<1m>	<>
8651	8652	<>	<name>
8651	8651	<>	<aphaerese>
8651	8651	<>	<elision3>
8651	8651	<>	<elision2>
8651	8651	<>	<elision1>
8651	8655	<k2K>	<>
8651	8658	<k2L>	<>
8651	8269	<l2L>	<>
8652	8653	<>	<aphaerese>
8652	8653	<>	<elision3>
8652	8653	<>	<elision2>
8652	8653	<>	<elision1>
8652	8656	<k2K>	<>
8652	8659	<k2L>	<>
8652	8270	<l2L>	<>
8653	8651	<>	<aphaerese>
8653	8651	<>	<elision3>
8653	8651	<>	<elision2>
8653	8651	<>	<elision1>
8653	8654	<k2K>	<>
8653	8657	<k2L>	<>
8653	8268	<l2L>	<>
8654	8221	.	.
8654	8221	<~>	<~>
8654	8221	<split-s>	<split-s>
8654	8221	<split-h>	<split-h>
8654	8221	<name2>	<name2>
8654	8224	<aphaerese>	<aphaerese>
8654	8655	<>	<aphaerese>
8654	8221	<elision3>	<elision3>
8654	8655	<>	<elision3>
8654	8221	<elision2>	<elision2>
8654	8655	<>	<elision2>
8654	8221	<elision1>	<elision1>
8654	8655	<>	<elision1>
8654	8239	.	υ
8654	8192	s	υ
8654	8239	.	u
8654	8192	s	u
8654	8233	s	U
8654	8239	.	α
8654	8192	s	α
8654	8239	.	a
8654	8192	s	a
8654	8236	s	A
8654	8185	<1m>	<>
8655	8221	.	.
8655	8221	<~>	<~>
8655	8221	<split-s>	<split-s>
8655	8221	<split-h>	<split-h>
8655	8221	<name2>	<name2>
8655	8656	<>	<name>
8655	8224	<aphaerese>	<aphaerese>
8655	8655	<>	<aphaerese>
8655	8221	<elision3>	<elision3>
8655	8655	<>	<elision3>
8655	8221	<elision2>	<elision2>
8655	8655	<>	<elision2>
8655	8221	<elision1>	<elision1>
8655	8655	<>	<elision1>
8655	8239	.	υ
8655	8192	s	υ
8655	8239	.	u
8655	8192	s	u
8655	8233	s	U
8655	8239	.	α
8655	8192	s	α
8655	8239	.	a
8655	8192	s	a
8655	8236	s	A
8655	8186	<1m>	<>
8656	8223	.	.
8656	8223	<~>	<~>
8656	8223	<split-s>	<split-s>
8656	8223	<split-h>	<split-h>
8656	8223	<name2>	<name2>
8656	8226	<aphaerese>	<aphaerese>
8656	8654	<>	<aphaerese>
8656	8223	<elision3>	<elision3>
8656	8654	<>	<elision3>
8656	8223	<elision2>	<elision2>
8656	8654	<>	<elision2>
8656	8223	<elision1>	<elision1>
8656	8654	<>	<elision1>
8656	8241	.	υ
8656	8191	s	υ
8656	8241	.	u
8656	8191	s	u
8656	8235	s	U
8656	8241	.	α
8656	8191	s	α
8656	8241	.	a
8656	8191	s	a
8656	8238	s	A
8656	8184	<1m>	<>
8657	8251	.	.
8657	8251	<~>	<~>
8657	8251	<split-s>	<split-s>
8657	8251	<split-h>	<split-h>
8657	8251	<name2>	<name2>
8657	8254	<aphaerese>	<aphaerese>
8657	8658	<>	<aphaerese>
8657	8251	<elision3>	<elision3>
8657	8658	<>	<elision3>
8657	8251	<elision2>	<elision2>
8657	8658	<>	<elision2>
8657	8251	<elision1>	<elision1>
8657	8658	<>	<elision1>
8657	8257	.	υ
8657	8192	s	υ
8657	8257	.	u
8657	8192	s	u
8657	8233	s	U
8657	8257	.	α
8657	8192	s	α
8657	8257	.	a
8657	8192	s	a
8657	8236	s	A
8657	8185	<1m>	<>
8658	8251	.	.
8658	8251	<~>	<~>
8658	8251	<split-s>	<split-s>
8658	8251	<split-h>	<split-h>
8658	8251	<name2>	<name2>
8658	8659	<>	<name>
8658	8254	<aphaerese>	<aphaerese>
8658	8658	<>	<aphaerese>
8658	8251	<elision3>	<elision3>
8658	8658	<>	<elision3>
8658	8251	<elision2>	<elision2>
8658	8658	<>	<elision2>
8658	8251	<elision1>	<elision1>
8658	8658	<>	<elision1>
8658	8257	.	υ
8658	8192	s	υ
8658	8257	.	u
8658	8192	s	u
8658	8233	s	U
8658	8257	.	α
8658	8192	s	α
8658	8257	.	a
8658	8192	s	a
8658	8236	s	A
8658	8186	<1m>	<>
8659	8253	.	.
8659	8253	<~>	<~>
8659	8253	<split-s>	<split-s>
8659	8253	<split-h>	<split-h>
8659	8253	<name2>	<name2>
8659	8256	<aphaerese>	<aphaerese>
8659	8657	<>	<aphaerese>
8659	8253	<elision3>	<elision3>
8659	8657	<>	<elision3>
8659	8253	<elision2>	<elision2>
8659	8657	<>	<elision2>
8659	8253	<elision1>	<elision1>
8659	8657	<>	<elision1>
8659	8259	.	υ
8659	8191	s	υ
8659	8259	.	u
8659	8191	s	u
8659	8235	s	U
8659	8259	.	α
8659	8191	s	α
8659	8259	.	a
8659	8191	s	a
8659	8238	s	A
8659	8184	<1m>	<>
8660	8221	.	.
8660	8221	<~>	<~>
8660	8221	<split-s>	<split-s>
8660	8221	<split-h>	<split-h>
8660	8221	<name2>	<name2>
8660	8284	<name2>	<name>
8660	8661	<>	<name>
8660	8224	<aphaerese>	<aphaerese>
8660	8663	<>	<aphaerese>
8660	8221	<elision3>	<elision3>
8660	8663	<>	<elision3>
8660	8221	<elision2>	<elision2>
8660	8663	<>	<elision2>
8660	8221	<elision1>	<elision1>
8660	8663	<>	<elision1>
8660	8239	.	υ
8660	8192	s	υ
8660	8239	.	u
8660	8192	s	u
8660	8257	.	κ
8660	8233	s	U
8660	8239	.	α
8660	8192	s	α
8660	8239	.	a
8660	8192	s	a
8660	8236	s	A
8660	8257	.	λ
8660	8186	<1m>	<>
8660	8288	<k2K>	<>
8660	8289	<k2L>	<>
8660	8664	<K2L>	<>
8661	8223	.	.
8661	8223	<~>	<~>
8661	8223	<split-s>	<split-s>
8661	8223	<split-h>	<split-h>
8661	8223	<name2>	<name2>
8661	8226	<aphaerese>	<aphaerese>
8661	8662	<>	<aphaerese>
8661	8223	<elision3>	<elision3>
8661	8662	<>	<elision3>
8661	8223	<elision2>	<elision2>
8661	8662	<>	<elision2>
8661	8223	<elision1>	<elision1>
8661	8662	<>	<elision1>
8661	8241	.	υ
8661	8191	s	υ
8661	8241	.	u
8661	8191	s	u
8661	8259	.	κ
8661	8235	s	U
8661	8241	.	α
8661	8191	s	α
8661	8241	.	a
8661	8191	s	a
8661	8238	s	A
8661	8259	.	λ
8661	8184	<1m>	<>
8661	8659	<K2L>	<>
8662	8221	.	.
8662	8221	<~>	<~>
8662	8221	<split-s>	<split-s>
8662	8221	<split-h>	<split-h>
8662	8221	<name2>	<name2>
8662	8224	<aphaerese>	<aphaerese>
8662	8663	<>	<aphaerese>
8662	8221	<elision3>	<elision3>
8662	8663	<>	<elision3>
8662	8221	<elision2>	<elision2>
8662	8663	<>	<elision2>
8662	8221	<elision1>	<elision1>
8662	8663	<>	<elision1>
8662	8239	.	υ
8662	8192	s	υ
8662	8239	.	u
8662	8192	s	u
8662	8257	.	κ
8662	8233	s	U
8662	8239	.	α
8662	8192	s	α
8662	8239	.	a
8662	8192	s	a
8662	8236	s	A
8662	8257	.	λ
8662	8185	<1m>	<>
8662	8657	<K2L>	<>
8663	8221	.	.
8663	8221	<~>	<~>
8663	8221	<split-s>	<split-s>
8663	8221	<split-h>	<split-h>
8663	8221	<name2>	<name2>
8663	8661	<>	<name>
8663	8224	<aphaerese>	<aphaerese>
8663	8663	<>	<aphaerese>
8663	8221	<elision3>	<elision3>
8663	8663	<>	<elision3>
8663	8221	<elision2>	<elision2>
8663	8663	<>	<elision2>
8663	8221	<elision1>	<elision1>
8663	8663	<>	<elision1>
8663	8239	.	υ
8663	8192	s	υ
8663	8239	.	u
8663	8192	s	u
8663	8257	.	κ
8663	8233	s	U
8663	8239	.	α
8663	8192	s	α
8663	8239	.	a
8663	8192	s	a
8663	8236	s	A
8663	8257	.	λ
8663	8186	<1m>	<>
8663	8658	<K2L>	<>
8664	8251	.	.
8664	8251	<~>	<~>
8664	8251	<split-s>	<split-s>
8664	8251	<split-h>	<split-h>
8664	8251	<name2>	<name2>
8664	8290	<name2>	<name>
8664	8659	<>	<name>
8664	8254	<aphaerese>	<aphaerese>
8664	8658	<>	<aphaerese>
8664	8251	<elision3>	<elision3>
8664	8658	<>	<elision3>
8664	8251	<elision2>	<elision2>
8664	8658	<>	<elision2>
8664	8251	<elision1>	<elision1>
8664	8658	<>	<elision1>
8664	8257	.	υ
8664	8192	s	υ
8664	8257	.	u
8664	8192	s	u
8664	8233	s	U
8664	8257	.	α
8664	8192	s	α
8664	8257	.	a
8664	8192	s	a
8664	8236	s	A
8664	8186	<1m>	<>
8665	8666	<>	<name>
8665	8665	<>	<aphaerese>
8665	8665	<>	<elision3>
8665	8665	<>	<elision2>
8665	8665	<>	<elision1>
8665	8669	<lambda2L>	<>
8666	8667	<>	<aphaerese>
8666	8667	<>	<elision3>
8666	8667	<>	<elision2>
8666	8667	<>	<elision1>
8666	8670	<lambda2L>	<>
8667	8665	<>	<aphaerese>
8667	8665	<>	<elision3>
8667	8665	<>	<elision2>
8667	8665	<>	<elision1>
8667	8668	<lambda2L>	<>
8668	8251	.	.
8668	8251	<~>	<~>
8668	8251	<split-s>	<split-s>
8668	8251	<split-h>	<split-h>
8668	8251	<name2>	<name2>
8668	8254	<aphaerese>	<aphaerese>
8668	8669	<>	<aphaerese>
8668	8251	<elision3>	<elision3>
8668	8669	<>	<elision3>
8668	8251	<elision2>	<elision2>
8668	8669	<>	<elision2>
8668	8251	<elision1>	<elision1>
8668	8669	<>	<elision1>
8668	8257	.	υ
8668	8192	s	υ
8668	8257	.	u
8668	8192	s	u
8668	8257	.	κ
8668	8233	s	U
8668	8257	.	α
8668	8192	s	α
8668	8257	.	a
8668	8192	s	a
8668	8236	s	A
8668	8257	.	λ
8668	8185	<1m>	<>
8669	8251	.	.
8669	8251	<~>	<~>
8669	8251	<split-s>	<split-s>
8669	8251	<split-h>	<split-h>
8669	8251	<name2>	<name2>
8669	8670	<>	<name>
8669	8254	<aphaerese>	<aphaerese>
8669	8669	<>	<aphaerese>
8669	8251	<elision3>	<elision3>
8669	8669	<>	<elision3>
8669	8251	<elision2>	<elision2>
8669	8669	<>	<elision2>
8669	8251	<elision1>	<elision1>
8669	8669	<>	<elision1>
8669	8257	.	υ
8669	8192	s	υ
8669	8257	.	u
8669	8192	s	u
8669	8257	.	κ
8669	8233	s	U
8669	8257	.	α
8669	8192	s	α
8669	8257	.	a
8669	8192	s	a
8669	8236	s	A
8669	8257	.	λ
8669	8186	<1m>	<>
8670	8253	.	.
8670	8253	<~>	<~>
8670	8253	<split-s>	<split-s>
8670	8253	<split-h>	<split-h>
8670	8253	<name2>	<name2>
8670	8256	<aphaerese>	<aphaerese>
8670	8668	<>	<aphaerese>
8670	8253	<elision3>	<elision3>
8670	8668	<>	<elision3>
8670	8253	<elision2>	<elision2>
8670	8668	<>	<elision2>
8670	8253	<elision1>	<elision1>
8670	8668	<>	<elision1>
8670	8259	.	υ
8670	8191	s	υ
8670	8259	.	u
8670	8191	s	u
8670	8259	.	κ
8670	8235	s	U
8670	8259	.	α
8670	8191	s	α
8670	8259	.	a
8670	8191	s	a
8670	8238	s	A
8670	8259	.	λ
8670	8184	<1m>	<>
8671	8672	<>	<name>
8671	8671	<>	<aphaerese>
8671	8671	<>	<elision3>
8671	8671	<>	<elision2>
8671	8671	<>	<elision1>
8671	8669	<l2L>	<>
8672	8673	<>	<aphaerese>
8672	8673	<>	<elision3>
8672	8673	<>	<elision2>
8672	8673	<>	<elision1>
8672	8670	<l2L>	<>
8673	8671	<>	<aphaerese>
8673	8671	<>	<elision3>
8673	8671	<>	<elision2>
8673	8671	<>	<elision1>
8673	8668	<l2L>	<>
8674	8251	.	.
8674	8251	<~>	<~>
8674	8251	<split-s>	<split-s>
8674	8251	<split-h>	<split-h>
8674	8251	<name2>	<name2>
8674	8290	<name2>	<name>
8674	8670	<>	<name>
8674	8254	<aphaerese>	<aphaerese>
8674	8669	<>	<aphaerese>
8674	8251	<elision3>	<elision3>
8674	8669	<>	<elision3>
8674	8251	<elision2>	<elision2>
8674	8669	<>	<elision2>
8674	8251	<elision1>	<elision1>
8674	8669	<>	<elision1>
8674	8257	.	υ
8674	8192	s	υ
8674	8257	.	u
8674	8192	s	u
8674	8257	.	κ
8674	8233	s	U
8674	8257	.	α
8674	8192	s	α
8674	8257	.	a
8674	8192	s	a
8674	8236	s	A
8674	8257	.	λ
8674	8186	<1m>	<>
8674	8289	<l2L>	<>
8675	8596	<>	<name>
8675	8595	<>	<aphaerese>
8675	8595	<>	<elision3>
8675	8595	<>	<elision2>
8675	8595	<>	<elision1>
8675	8599	<kappa2K>	<>
8675	8676	<kappa2L>	<>
8675	8058	<lambda2L>	<>
8676	7907	.	.
8676	7908	 	 
8676	7907	<~>	<~>
8676	7907	<split-s>	<split-s>
8676	7907	<split-h>	<split-h>
8676	7907	<name2>	<name2>
8676	8603	<>	<name>
8676	7911	<aphaerese>	<aphaerese>
8676	8602	<>	<aphaerese>
8676	8024	<elision3>	<elision3>
8676	8602	<>	<elision3>
8676	8024	<elision2>	<elision2>
8676	8602	<>	<elision2>
8676	8024	<elision1>	<elision1>
8676	8602	<>	<elision1>
8676	7915	.	υ
8676	7918	s	υ
8676	7915	.	u
8676	7918	s	u
8676	7964	s	U
8676	7915	.	α
8676	7989	s	α
8676	7915	.	a
8676	7989	s	a
8676	7992	s	A
8676	8677	<1s>	<>
8677	143	.	.
8677	144	 	 
8677	143	<~>	<~>
8677	143	<split-s>	<split-s>
8677	143	<split-h>	<split-h>
8677	143	<name2>	<name2>
8677	8604	<>	<name>
8677	147	<aphaerese>	<aphaerese>
8677	8606	<>	<aphaerese>
8677	7051	<elision3>	<elision3>
8677	8606	<>	<elision3>
8677	7051	<elision2>	<elision2>
8677	8606	<>	<elision2>
8677	7051	<elision1>	<elision1>
8677	8606	<>	<elision1>
8677	6469	.	υ
8677	6469	.	u
8677	6469	.	α
8677	6469	.	a
8677	8678	<K>	<>
8678	6519	.	.
8678	6519	<~>	<~>
8678	6519	<split-s>	<split-s>
8678	6519	<split-h>	<split-h>
8678	6519	<name2>	<name2>
8678	8608	<>	<name>
8678	6522	<aphaerese>	<aphaerese>
8678	8607	<>	<aphaerese>
8678	7000	<elision3>	<elision3>
8678	8607	<>	<elision3>
8678	7000	<elision2>	<elision2>
8678	8607	<>	<elision2>
8678	7000	<elision1>	<elision1>
8678	8607	<>	<elision1>
8678	6518	.	υ
8678	6518	.	u
8678	6518	.	α
8678	6518	.	a
8679	8615	<>	<name>
8679	8614	<>	<aphaerese>
8679	8614	<>	<elision3>
8679	8614	<>	<elision2>
8679	8614	<>	<elision1>
8679	8618	<k2K>	<>
8679	8680	<k2L>	<>
8679	8058	<l2L>	<>
8680	7907	.	.
8680	7908	 	 
8680	7907	<~>	<~>
8680	7907	<split-s>	<split-s>
8680	7907	<split-h>	<split-h>
8680	7907	<name2>	<name2>
8680	8622	<>	<name>
8680	7911	<aphaerese>	<aphaerese>
8680	8621	<>	<aphaerese>
8680	7907	<elision3>	<elision3>
8680	8621	<>	<elision3>
8680	7907	<elision2>	<elision2>
8680	8621	<>	<elision2>
8680	7907	<elision1>	<elision1>
8680	8621	<>	<elision1>
8680	7915	.	υ
8680	7918	s	υ
8680	7915	.	u
8680	7918	s	u
8680	7964	s	U
8680	7915	.	α
8680	7989	s	α
8680	7915	.	a
8680	7989	s	a
8680	7992	s	A
8680	8681	<1s>	<>
8681	143	.	.
8681	144	 	 
8681	143	<~>	<~>
8681	143	<split-s>	<split-s>
8681	143	<split-h>	<split-h>
8681	143	<name2>	<name2>
8681	7324	<>	<name>
8681	147	<aphaerese>	<aphaerese>
8681	7323	<>	<aphaerese>
8681	143	<elision3>	<elision3>
8681	7323	<>	<elision3>
8681	143	<elision2>	<elision2>
8681	7323	<>	<elision2>
8681	143	<elision1>	<elision1>
8681	7323	<>	<elision1>
8681	6469	.	υ
8681	6469	.	u
8681	6469	.	α
8681	6469	.	a
8681	8682	<K>	<>
8682	6519	.	.
8682	6519	<~>	<~>
8682	6519	<split-s>	<split-s>
8682	6519	<split-h>	<split-h>
8682	6519	<name2>	<name2>
8682	7325	<>	<name>
8682	6522	<aphaerese>	<aphaerese>
8682	7327	<>	<aphaerese>
8682	6519	<elision3>	<elision3>
8682	7327	<>	<elision3>
8682	6519	<elision2>	<elision2>
8682	7327	<>	<elision2>
8682	6519	<elision1>	<elision1>
8682	7327	<>	<elision1>
8682	6518	.	υ
8682	6518	.	u
8682	6518	.	α
8682	6518	.	a
8683	7741	.	.
8683	7742	 	 
8683	7741	<~>	<~>
8683	7741	<split-s>	<split-s>
8683	7741	<split-h>	<split-h>
8683	7741	<name2>	<name2>
8683	8081	<name2>	<name>
8683	8628	<>	<name>
8683	7745	<aphaerese>	<aphaerese>
8683	8627	<>	<aphaerese>
8683	7741	<elision3>	<elision3>
8683	8627	<>	<elision3>
8683	7741	<elision2>	<elision2>
8683	8627	<>	<elision2>
8683	7741	<elision1>	<elision1>
8683	8627	<>	<elision1>
8683	7749	.	υ
8683	7752	s	υ
8683	7749	.	u
8683	7752	s	u
8683	7915	.	κ
8683	7815	s	U
8683	7749	.	α
8683	7843	s	α
8683	7749	.	a
8683	7843	s	a
8683	7846	s	A
8683	7915	.	λ
8683	7239	<1s>	<>
8683	8085	<k2K>	<>
8683	8086	<k2L>	<>
8683	8684	<K2L>	<>
8684	7907	.	.
8684	7908	 	 
8684	7907	<~>	<~>
8684	7907	<split-s>	<split-s>
8684	7907	<split-h>	<split-h>
8684	7907	<name2>	<name2>
8684	8087	<name2>	<name>
8684	8622	<>	<name>
8684	7911	<aphaerese>	<aphaerese>
8684	8621	<>	<aphaerese>
8684	7907	<elision3>	<elision3>
8684	8621	<>	<elision3>
8684	7907	<elision2>	<elision2>
8684	8621	<>	<elision2>
8684	7907	<elision1>	<elision1>
8684	8621	<>	<elision1>
8684	7915	.	υ
8684	7918	s	υ
8684	7915	.	u
8684	7918	s	u
8684	7964	s	U
8684	7915	.	α
8684	7989	s	α
8684	7915	.	a
8684	7989	s	a
8684	7992	s	A
8684	8685	<1s>	<>
8685	143	.	.
8685	144	 	 
8685	143	<~>	<~>
8685	143	<split-s>	<split-s>
8685	143	<split-h>	<split-h>
8685	143	<name2>	<name2>
8685	7181	<name2>	<name>
8685	7324	<>	<name>
8685	147	<aphaerese>	<aphaerese>
8685	7323	<>	<aphaerese>
8685	143	<elision3>	<elision3>
8685	7323	<>	<elision3>
8685	143	<elision2>	<elision2>
8685	7323	<>	<elision2>
8685	143	<elision1>	<elision1>
8685	7323	<>	<elision1>
8685	6469	.	υ
8685	6469	.	u
8685	6469	.	α
8685	6469	.	a
8685	8686	<K>	<>
8686	6519	.	.
8686	6519	<~>	<~>
8686	6519	<split-s>	<split-s>
8686	6519	<split-h>	<split-h>
8686	6519	<name2>	<name2>
8686	7071	<name2>	<name>
8686	7325	<>	<name>
8686	6522	<aphaerese>	<aphaerese>
8686	7327	<>	<aphaerese>
8686	6519	<elision3>	<elision3>
8686	7327	<>	<elision3>
8686	6519	<elision2>	<elision2>
8686	7327	<>	<elision2>
8686	6519	<elision1>	<elision1>
8686	7327	<>	<elision1>
8686	6518	.	υ
8686	6518	.	u
8686	6518	.	α
8686	6518	.	a
8687	7907	.	.
8687	7908	 	 
8687	7907	<~>	<~>
8687	7907	<split-s>	<split-s>
8687	7907	<split-h>	<split-h>
8687	7907	<name2>	<name2>
8687	8087	<name2>	<name>
8687	8633	<>	<name>
8687	7911	<aphaerese>	<aphaerese>
8687	8635	<>	<aphaerese>
8687	7907	<elision3>	<elision3>
8687	8635	<>	<elision3>
8687	7907	<elision2>	<elision2>
8687	8635	<>	<elision2>
8687	7907	<elision1>	<elision1>
8687	8635	<>	<elision1>
8687	7915	.	υ
8687	7918	s	υ
8687	7915	.	u
8687	7918	s	u
8687	7915	.	κ
8687	7964	s	U
8687	7915	.	α
8687	7989	s	α
8687	7915	.	a
8687	7989	s	a
8687	7992	s	A
8687	7915	.	λ
8687	7336	<1s>	<>
8687	8086	<l2L>	<>
8688	107	.	.
8688	108	 	 
8688	107	<~>	<~>
8688	107	<split-s>	<split-s>
8688	107	<split-h>	<split-h>
8688	107	<name2>	<name2>
8688	111	<aphaerese>	<aphaerese>
8688	8689	<>	<aphaerese>
8688	8692	<elision3>	<elision3>
8688	8689	<>	<elision3>
8688	8692	<elision2>	<elision2>
8688	8689	<>	<elision2>
8688	8692	<elision1>	<elision1>
8688	8689	<>	<elision1>
8688	8110	.	υ
8688	8154	H	υ
8688	8110	.	u
8688	8156	H	u
8688	8110	.	κ
8688	8569	H	κ
8688	8064	H	k
8688	8077	H	U
8688	8080	H	K
8688	8110	.	α
8688	8140	H	α
8688	8110	.	a
8688	8145	H	a
8688	7907	H	A
8688	8110	.	λ
8688	8546	H	λ
8688	8494	H	l
8688	8499	H	L
8688	8695	<K>	<>
8689	107	.	.
8689	108	 	 
8689	107	<~>	<~>
8689	107	<split-s>	<split-s>
8689	107	<split-h>	<split-h>
8689	107	<name2>	<name2>
8689	8690	<>	<name>
8689	111	<aphaerese>	<aphaerese>
8689	8689	<>	<aphaerese>
8689	8692	<elision3>	<elision3>
8689	8689	<>	<elision3>
8689	8692	<elision2>	<elision2>
8689	8689	<>	<elision2>
8689	8692	<elision1>	<elision1>
8689	8689	<>	<elision1>
8689	8110	.	υ
8689	8154	H	υ
8689	8110	.	u
8689	8156	H	u
8689	8110	.	κ
8689	8569	H	κ
8689	8064	H	k
8689	8077	H	U
8689	8080	H	K
8689	8110	.	α
8689	8140	H	α
8689	8110	.	a
8689	8145	H	a
8689	7907	H	A
8689	8110	.	λ
8689	8546	H	λ
8689	8494	H	l
8689	8499	H	L
8689	8696	<K>	<>
8690	106	.	.
8690	110	 	 
8690	106	<~>	<~>
8690	106	<split-s>	<split-s>
8690	106	<split-h>	<split-h>
8690	106	<name2>	<name2>
8690	113	<aphaerese>	<aphaerese>
8690	8688	<>	<aphaerese>
8690	8691	<elision3>	<elision3>
8690	8688	<>	<elision3>
8690	8691	<elision2>	<elision2>
8690	8688	<>	<elision2>
8690	8691	<elision1>	<elision1>
8690	8688	<>	<elision1>
8690	8112	.	υ
8690	8149	H	υ
8690	8112	.	u
8690	8153	H	u
8690	8112	.	κ
8690	8526	H	κ
8690	8105	H	k
8690	8079	H	U
8690	8109	H	K
8690	8112	.	α
8690	8139	H	α
8690	8112	.	a
8690	8144	H	a
8690	7910	H	A
8690	8112	.	λ
8690	8545	H	λ
8690	8493	H	l
8690	8496	H	L
8690	8694	<K>	<>
8691	107	.	.
8691	108	 	 
8691	107	<~>	<~>
8691	107	<split-s>	<split-s>
8691	107	<split-h>	<split-h>
8691	107	<name2>	<name2>
8691	111	<aphaerese>	<aphaerese>
8691	8692	<>	<aphaerese>
8691	107	<elision3>	<elision3>
8691	8692	<>	<elision3>
8691	107	<elision2>	<elision2>
8691	8692	<>	<elision2>
8691	107	<elision1>	<elision1>
8691	8692	<>	<elision1>
8691	8110	.	υ
8691	8154	H	υ
8691	8110	.	u
8691	8156	H	u
8691	114	.	κ
8691	8675	H	κ
8691	8679	H	k
8691	8077	H	U
8691	8683	H	K
8691	8110	.	α
8691	8140	H	α
8691	8110	.	a
8691	8145	H	a
8691	7907	H	A
8691	8631	H	λ
8691	8637	H	l
8691	8687	H	L
8692	107	.	.
8692	108	 	 
8692	107	<~>	<~>
8692	107	<split-s>	<split-s>
8692	107	<split-h>	<split-h>
8692	107	<name2>	<name2>
8692	8693	<>	<name>
8692	111	<aphaerese>	<aphaerese>
8692	8692	<>	<aphaerese>
8692	107	<elision3>	<elision3>
8692	8692	<>	<elision3>
8692	107	<elision2>	<elision2>
8692	8692	<>	<elision2>
8692	107	<elision1>	<elision1>
8692	8692	<>	<elision1>
8692	8110	.	υ
8692	8154	H	υ
8692	8110	.	u
8692	8156	H	u
8692	114	.	κ
8692	8675	H	κ
8692	8679	H	k
8692	8077	H	U
8692	8683	H	K
8692	8110	.	α
8692	8140	H	α
8692	8110	.	a
8692	8145	H	a
8692	7907	H	A
8692	8631	H	λ
8692	8637	H	l
8692	8687	H	L
8693	106	.	.
8693	110	 	 
8693	106	<~>	<~>
8693	106	<split-s>	<split-s>
8693	106	<split-h>	<split-h>
8693	106	<name2>	<name2>
8693	113	<aphaerese>	<aphaerese>
8693	8691	<>	<aphaerese>
8693	106	<elision3>	<elision3>
8693	8691	<>	<elision3>
8693	106	<elision2>	<elision2>
8693	8691	<>	<elision2>
8693	106	<elision1>	<elision1>
8693	8691	<>	<elision1>
8693	8112	.	υ
8693	8149	H	υ
8693	8112	.	u
8693	8153	H	u
8693	116	.	κ
8693	8594	H	κ
8693	8613	H	k
8693	8079	H	U
8693	8626	H	K
8693	8112	.	α
8693	8139	H	α
8693	8112	.	a
8693	8144	H	a
8693	7910	H	A
8693	8630	H	λ
8693	8636	H	l
8693	8634	H	L
8694	8162	.	.
8694	8162	<~>	<~>
8694	8162	<split-s>	<split-s>
8694	8162	<split-h>	<split-h>
8694	8162	<name2>	<name2>
8694	8165	<aphaerese>	<aphaerese>
8694	8695	<>	<aphaerese>
8694	8640	<elision3>	<elision3>
8694	8695	<>	<elision3>
8694	8640	<elision2>	<elision2>
8694	8695	<>	<elision2>
8694	8640	<elision1>	<elision1>
8694	8695	<>	<elision1>
8694	8158	.	υ
8694	8304	H	υ
8694	8158	.	u
8694	8313	H	u
8694	8158	.	κ
8694	8556	H	κ
8694	8273	H	k
8694	8282	H	U
8694	8286	H	K
8694	8158	.	α
8694	8316	H	α
8694	8158	.	a
8694	8319	H	a
8694	8253	H	A
8694	8158	.	λ
8694	8565	H	λ
8694	8300	H	l
8694	8295	H	L
8695	8160	.	.
8695	8160	<~>	<~>
8695	8160	<split-s>	<split-s>
8695	8160	<split-h>	<split-h>
8695	8160	<name2>	<name2>
8695	8163	<aphaerese>	<aphaerese>
8695	8696	<>	<aphaerese>
8695	8641	<elision3>	<elision3>
8695	8696	<>	<elision3>
8695	8641	<elision2>	<elision2>
8695	8696	<>	<elision2>
8695	8641	<elision1>	<elision1>
8695	8696	<>	<elision1>
8695	8159	.	υ
8695	8302	H	υ
8695	8159	.	u
8695	8311	H	u
8695	8159	.	κ
8695	8554	H	κ
8695	8271	H	k
8695	8280	H	U
8695	8283	H	K
8695	8159	.	α
8695	8314	H	α
8695	8159	.	a
8695	8317	H	a
8695	8251	H	A
8695	8159	.	λ
8695	8563	H	λ
8695	8298	H	l
8695	8301	H	L
8696	8160	.	.
8696	8160	<~>	<~>
8696	8160	<split-s>	<split-s>
8696	8160	<split-h>	<split-h>
8696	8160	<name2>	<name2>
8696	8694	<>	<name>
8696	8163	<aphaerese>	<aphaerese>
8696	8696	<>	<aphaerese>
8696	8641	<elision3>	<elision3>
8696	8696	<>	<elision3>
8696	8641	<elision2>	<elision2>
8696	8696	<>	<elision2>
8696	8641	<elision1>	<elision1>
8696	8696	<>	<elision1>
8696	8159	.	υ
8696	8302	H	υ
8696	8159	.	u
8696	8311	H	u
8696	8159	.	κ
8696	8554	H	κ
8696	8271	H	k
8696	8280	H	U
8696	8283	H	K
8696	8159	.	α
8696	8314	H	α
8696	8159	.	a
8696	8317	H	a
8696	8251	H	A
8696	8159	.	λ
8696	8563	H	λ
8696	8298	H	l
8696	8301	H	L
8697	8336	.	.
8697	8336	 	 
8697	8336	<~>	<~>
8697	8336	<split-s>	<split-s>
8697	8336	<split-h>	<split-h>
8697	8336	<name2>	<name2>
8697	8698	<>	<name>
8697	8339	<aphaerese>	<aphaerese>
8697	8697	<>	<aphaerese>
8697	8336	<elision3>	<elision3>
8697	8697	<>	<elision3>
8697	8336	<elision2>	<elision2>
8697	8697	<>	<elision2>
8697	8336	<elision1>	<elision1>
8697	8697	<>	<elision1>
8697	8500	.	υ
8697	8500	.	u
8697	8500	.	κ
8697	8500	.	α
8697	8500	.	a
8697	8500	.	λ
8697	8701	<4s>	<>
8698	8338	.	.
8698	8338	 	 
8698	8338	<~>	<~>
8698	8338	<split-s>	<split-s>
8698	8338	<split-h>	<split-h>
8698	8338	<name2>	<name2>
8698	8341	<aphaerese>	<aphaerese>
8698	8699	<>	<aphaerese>
8698	8338	<elision3>	<elision3>
8698	8699	<>	<elision3>
8698	8338	<elision2>	<elision2>
8698	8699	<>	<elision2>
8698	8338	<elision1>	<elision1>
8698	8699	<>	<elision1>
8698	8502	.	υ
8698	8502	.	u
8698	8502	.	κ
8698	8502	.	α
8698	8502	.	a
8698	8502	.	λ
8698	8702	<4s>	<>
8699	8336	.	.
8699	8336	 	 
8699	8336	<~>	<~>
8699	8336	<split-s>	<split-s>
8699	8336	<split-h>	<split-h>
8699	8336	<name2>	<name2>
8699	8339	<aphaerese>	<aphaerese>
8699	8697	<>	<aphaerese>
8699	8336	<elision3>	<elision3>
8699	8697	<>	<elision3>
8699	8336	<elision2>	<elision2>
8699	8697	<>	<elision2>
8699	8336	<elision1>	<elision1>
8699	8697	<>	<elision1>
8699	8500	.	υ
8699	8500	.	u
8699	8500	.	κ
8699	8500	.	α
8699	8500	.	a
8699	8500	.	λ
8699	8700	<4s>	<>
8700	107	.	.
8700	108	 	 
8700	107	<~>	<~>
8700	107	<split-s>	<split-s>
8700	107	<split-h>	<split-h>
8700	107	<name2>	<name2>
8700	111	<aphaerese>	<aphaerese>
8700	8701	<>	<aphaerese>
8700	107	<elision3>	<elision3>
8700	8701	<>	<elision3>
8700	107	<elision2>	<elision2>
8700	8701	<>	<elision2>
8700	107	<elision1>	<elision1>
8700	8701	<>	<elision1>
8700	8110	.	υ
8700	8154	H	υ
8700	8110	.	u
8700	8156	H	u
8700	8110	.	κ
8700	8569	H	κ
8700	8064	H	k
8700	8077	H	U
8700	8080	H	K
8700	8110	.	α
8700	8140	H	α
8700	8110	.	a
8700	8145	H	a
8700	7907	H	A
8700	8110	.	λ
8700	8546	H	λ
8700	8494	H	l
8700	8499	H	L
8700	8704	<K>	<>
8701	107	.	.
8701	108	 	 
8701	107	<~>	<~>
8701	107	<split-s>	<split-s>
8701	107	<split-h>	<split-h>
8701	107	<name2>	<name2>
8701	8702	<>	<name>
8701	111	<aphaerese>	<aphaerese>
8701	8701	<>	<aphaerese>
8701	107	<elision3>	<elision3>
8701	8701	<>	<elision3>
8701	107	<elision2>	<elision2>
8701	8701	<>	<elision2>
8701	107	<elision1>	<elision1>
8701	8701	<>	<elision1>
8701	8110	.	υ
8701	8154	H	υ
8701	8110	.	u
8701	8156	H	u
8701	8110	.	κ
8701	8569	H	κ
8701	8064	H	k
8701	8077	H	U
8701	8080	H	K
8701	8110	.	α
8701	8140	H	α
8701	8110	.	a
8701	8145	H	a
8701	7907	H	A
8701	8110	.	λ
8701	8546	H	λ
8701	8494	H	l
8701	8499	H	L
8701	8705	<K>	<>
8702	106	.	.
8702	110	 	 
8702	106	<~>	<~>
8702	106	<split-s>	<split-s>
8702	106	<split-h>	<split-h>
8702	106	<name2>	<name2>
8702	113	<aphaerese>	<aphaerese>
8702	8700	<>	<aphaerese>
8702	106	<elision3>	<elision3>
8702	8700	<>	<elision3>
8702	106	<elision2>	<elision2>
8702	8700	<>	<elision2>
8702	106	<elision1>	<elision1>
8702	8700	<>	<elision1>
8702	8112	.	υ
8702	8149	H	υ
8702	8112	.	u
8702	8153	H	u
8702	8112	.	κ
8702	8526	H	κ
8702	8105	H	k
8702	8079	H	U
8702	8109	H	K
8702	8112	.	α
8702	8139	H	α
8702	8112	.	a
8702	8144	H	a
8702	7910	H	A
8702	8112	.	λ
8702	8545	H	λ
8702	8493	H	l
8702	8496	H	L
8702	8703	<K>	<>
8703	8162	.	.
8703	8162	<~>	<~>
8703	8162	<split-s>	<split-s>
8703	8162	<split-h>	<split-h>
8703	8162	<name2>	<name2>
8703	8165	<aphaerese>	<aphaerese>
8703	8704	<>	<aphaerese>
8703	8162	<elision3>	<elision3>
8703	8704	<>	<elision3>
8703	8162	<elision2>	<elision2>
8703	8704	<>	<elision2>
8703	8162	<elision1>	<elision1>
8703	8704	<>	<elision1>
8703	8158	.	υ
8703	8304	H	υ
8703	8158	.	u
8703	8313	H	u
8703	8158	.	κ
8703	8556	H	κ
8703	8273	H	k
8703	8282	H	U
8703	8286	H	K
8703	8158	.	α
8703	8316	H	α
8703	8158	.	a
8703	8319	H	a
8703	8253	H	A
8703	8158	.	λ
8703	8565	H	λ
8703	8300	H	l
8703	8295	H	L
8704	8160	.	.
8704	8160	<~>	<~>
8704	8160	<split-s>	<split-s>
8704	8160	<split-h>	<split-h>
8704	8160	<name2>	<name2>
8704	8163	<aphaerese>	<aphaerese>
8704	8705	<>	<aphaerese>
8704	8160	<elision3>	<elision3>
8704	8705	<>	<elision3>
8704	8160	<elision2>	<elision2>
8704	8705	<>	<elision2>
8704	8160	<elision1>	<elision1>
8704	8705	<>	<elision1>
8704	8159	.	υ
8704	8302	H	υ
8704	8159	.	u
8704	8311	H	u
8704	8159	.	κ
8704	8554	H	κ
8704	8271	H	k
8704	8280	H	U
8704	8283	H	K
8704	8159	.	α
8704	8314	H	α
8704	8159	.	a
8704	8317	H	a
8704	8251	H	A
8704	8159	.	λ
8704	8563	H	λ
8704	8298	H	l
8704	8301	H	L
8705	8160	.	.
8705	8160	<~>	<~>
8705	8160	<split-s>	<split-s>
8705	8160	<split-h>	<split-h>
8705	8160	<name2>	<name2>
8705	8703	<>	<name>
8705	8163	<aphaerese>	<aphaerese>
8705	8705	<>	<aphaerese>
8705	8160	<elision3>	<elision3>
8705	8705	<>	<elision3>
8705	8160	<elision2>	<elision2>
8705	8705	<>	<elision2>
8705	8160	<elision1>	<elision1>
8705	8705	<>	<elision1>
8705	8159	.	υ
8705	8302	H	υ
8705	8159	.	u
8705	8311	H	u
8705	8159	.	κ
8705	8554	H	κ
8705	8271	H	k
8705	8280	H	U
8705	8283	H	K
8705	8159	.	α
8705	8314	H	α
8705	8159	.	a
8705	8317	H	a
8705	8251	H	A
8705	8159	.	λ
8705	8563	H	λ
8705	8298	H	l
8705	8301	H	L
8706	8707	<>	<name>
8706	8706	<>	<aphaerese>
8706	8706	<>	<elision3>
8706	8706	<>	<elision2>
8706	8706	<>	<elision1>
8706	8336	<U2kl>	<>
8707	8708	<>	<aphaerese>
8707	8708	<>	<elision3>
8707	8708	<>	<elision2>
8707	8708	<>	<elision1>
8707	8337	<U2kl>	<>
8708	8706	<>	<aphaerese>
8708	8706	<>	<elision3>
8708	8706	<>	<elision2>
8708	8706	<>	<elision1>
8708	8338	<U2kl>	<>
8709	8710	<name>	<name>
8709	8713	<>	<name>
8709	8715	<>	<aphaerese>
8709	8715	<>	<elision3>
8709	8715	<>	<elision2>
8709	8715	<>	<elision1>
8709	8821	<4s>	<>
8709	8716	<A2kl>	<>
8709	8779	<L2kl>	<>
8709	8824	<K2kl>	<>
8710	8711	<4s>	<>
8711	8109	H	k
8711	8496	H	l
8711	8712	<K>	<>
8712	8286	H	k
8712	8295	H	l
8713	8714	<>	<aphaerese>
8713	8714	<>	<elision3>
8713	8714	<>	<elision2>
8713	8714	<>	<elision1>
8713	8717	<A2kl>	<>
8713	8780	<L2kl>	<>
8713	8813	<K2kl>	<>
8714	8715	<>	<aphaerese>
8714	8715	<>	<elision3>
8714	8715	<>	<elision2>
8714	8715	<>	<elision1>
8714	8718	<A2kl>	<>
8714	8781	<L2kl>	<>
8714	8814	<K2kl>	<>
8715	8713	<>	<name>
8715	8715	<>	<aphaerese>
8715	8715	<>	<elision3>
8715	8715	<>	<elision2>
8715	8715	<>	<elision1>
8715	8716	<A2kl>	<>
8715	8779	<L2kl>	<>
8715	8812	<K2kl>	<>
8716	8717	<>	<name>
8716	8716	<>	<aphaerese>
8716	8716	<>	<elision3>
8716	8716	<>	<elision2>
8716	8716	<>	<elision1>
8716	8719	.	κ
8716	8719	.	λ
8716	8771	<4s>	<>
8717	8718	<>	<aphaerese>
8717	8718	<>	<elision3>
8717	8718	<>	<elision2>
8717	8718	<>	<elision1>
8717	8721	.	κ
8717	8721	.	λ
8717	8772	<4s>	<>
8718	8716	<>	<aphaerese>
8718	8716	<>	<elision3>
8718	8716	<>	<elision2>
8718	8716	<>	<elision1>
8718	8719	.	κ
8718	8719	.	λ
8718	8770	<4s>	<>
8719	8720	<>	<name>
8719	8719	<>	<aphaerese>
8719	8722	<elision3>	<elision3>
8719	8719	<>	<elision3>
8719	8722	<elision2>	<elision2>
8719	8719	<>	<elision2>
8719	8722	<elision1>	<elision1>
8719	8719	<>	<elision1>
8719	8762	<4s>	<>
8720	8721	<>	<aphaerese>
8720	8724	<elision3>	<elision3>
8720	8721	<>	<elision3>
8720	8724	<elision2>	<elision2>
8720	8721	<>	<elision2>
8720	8724	<elision1>	<elision1>
8720	8721	<>	<elision1>
8720	8763	<4s>	<>
8721	8719	<>	<aphaerese>
8721	8722	<elision3>	<elision3>
8721	8719	<>	<elision3>
8721	8722	<elision2>	<elision2>
8721	8719	<>	<elision2>
8721	8722	<elision1>	<elision1>
8721	8719	<>	<elision1>
8721	8761	<4s>	<>
8722	8336	.	.
8722	8336	 	 
8722	8336	<~>	<~>
8722	8336	<split-s>	<split-s>
8722	8336	<split-h>	<split-h>
8722	8336	<name2>	<name2>
8722	8723	<>	<name>
8722	8339	<aphaerese>	<aphaerese>
8722	8722	<>	<aphaerese>
8722	8336	<elision3>	<elision3>
8722	8722	<>	<elision3>
8722	8336	<elision2>	<elision2>
8722	8722	<>	<elision2>
8722	8336	<elision1>	<elision1>
8722	8722	<>	<elision1>
8722	8500	.	υ
8722	8500	.	u
8722	8500	.	α
8722	8500	.	a
8722	8726	<4s>	<>
8723	8338	.	.
8723	8338	 	 
8723	8338	<~>	<~>
8723	8338	<split-s>	<split-s>
8723	8338	<split-h>	<split-h>
8723	8338	<name2>	<name2>
8723	8341	<aphaerese>	<aphaerese>
8723	8724	<>	<aphaerese>
8723	8338	<elision3>	<elision3>
8723	8724	<>	<elision3>
8723	8338	<elision2>	<elision2>
8723	8724	<>	<elision2>
8723	8338	<elision1>	<elision1>
8723	8724	<>	<elision1>
8723	8502	.	υ
8723	8502	.	u
8723	8502	.	α
8723	8502	.	a
8723	8727	<4s>	<>
8724	8336	.	.
8724	8336	 	 
8724	8336	<~>	<~>
8724	8336	<split-s>	<split-s>
8724	8336	<split-h>	<split-h>
8724	8336	<name2>	<name2>
8724	8339	<aphaerese>	<aphaerese>
8724	8722	<>	<aphaerese>
8724	8336	<elision3>	<elision3>
8724	8722	<>	<elision3>
8724	8336	<elision2>	<elision2>
8724	8722	<>	<elision2>
8724	8336	<elision1>	<elision1>
8724	8722	<>	<elision1>
8724	8500	.	υ
8724	8500	.	u
8724	8500	.	α
8724	8500	.	a
8724	8725	<4s>	<>
8725	107	.	.
8725	108	 	 
8725	107	<~>	<~>
8725	107	<split-s>	<split-s>
8725	107	<split-h>	<split-h>
8725	107	<name2>	<name2>
8725	111	<aphaerese>	<aphaerese>
8725	8726	<>	<aphaerese>
8725	107	<elision3>	<elision3>
8725	8726	<>	<elision3>
8725	107	<elision2>	<elision2>
8725	8726	<>	<elision2>
8725	107	<elision1>	<elision1>
8725	8726	<>	<elision1>
8725	8110	.	υ
8725	8154	H	υ
8725	8110	.	u
8725	8156	H	u
8725	8729	H	κ
8725	8741	H	k
8725	8077	H	U
8725	8733	H	K
8725	8110	.	α
8725	8140	H	α
8725	8110	.	a
8725	8145	H	a
8725	7907	H	A
8725	8729	H	λ
8725	8741	H	l
8725	8733	H	L
8725	8744	<K>	<>
8726	107	.	.
8726	108	 	 
8726	107	<~>	<~>
8726	107	<split-s>	<split-s>
8726	107	<split-h>	<split-h>
8726	107	<name2>	<name2>
8726	8727	<>	<name>
8726	111	<aphaerese>	<aphaerese>
8726	8726	<>	<aphaerese>
8726	107	<elision3>	<elision3>
8726	8726	<>	<elision3>
8726	107	<elision2>	<elision2>
8726	8726	<>	<elision2>
8726	107	<elision1>	<elision1>
8726	8726	<>	<elision1>
8726	8110	.	υ
8726	8154	H	υ
8726	8110	.	u
8726	8156	H	u
8726	8729	H	κ
8726	8741	H	k
8726	8077	H	U
8726	8733	H	K
8726	8110	.	α
8726	8140	H	α
8726	8110	.	a
8726	8145	H	a
8726	7907	H	A
8726	8729	H	λ
8726	8741	H	l
8726	8733	H	L
8726	8745	<K>	<>
8727	106	.	.
8727	110	 	 
8727	106	<~>	<~>
8727	106	<split-s>	<split-s>
8727	106	<split-h>	<split-h>
8727	106	<name2>	<name2>
8727	113	<aphaerese>	<aphaerese>
8727	8725	<>	<aphaerese>
8727	106	<elision3>	<elision3>
8727	8725	<>	<elision3>
8727	106	<elision2>	<elision2>
8727	8725	<>	<elision2>
8727	106	<elision1>	<elision1>
8727	8725	<>	<elision1>
8727	8112	.	υ
8727	8149	H	υ
8727	8112	.	u
8727	8153	H	u
8727	8728	H	κ
8727	8740	H	k
8727	8079	H	U
8727	8732	H	K
8727	8112	.	α
8727	8139	H	α
8727	8112	.	a
8727	8144	H	a
8727	7910	H	A
8727	8728	H	λ
8727	8740	H	l
8727	8732	H	L
8727	8743	<K>	<>
8728	8729	<>	<aphaerese>
8728	8729	<>	<elision3>
8728	8729	<>	<elision2>
8728	8729	<>	<elision1>
8728	8732	<lambda2L>	<>
8729	8730	<>	<name>
8729	8729	<>	<aphaerese>
8729	8729	<>	<elision3>
8729	8729	<>	<elision2>
8729	8729	<>	<elision1>
8729	8733	<lambda2L>	<>
8730	8728	<>	<aphaerese>
8730	8728	<>	<elision3>
8730	8728	<>	<elision2>
8730	8728	<>	<elision1>
8730	8731	<lambda2L>	<>
8731	8732	<>	<aphaerese>
8731	8732	<>	<elision3>
8731	8732	<>	<elision2>
8731	8732	<>	<elision1>
8731	8736	.	κ
8731	8736	.	λ
8731	7164	<1s>	<>
8732	8733	<>	<aphaerese>
8732	8733	<>	<elision3>
8732	8733	<>	<elision2>
8732	8733	<>	<elision1>
8732	8734	.	κ
8732	8734	.	λ
8732	7162	<1s>	<>
8733	8731	<>	<name>
8733	8733	<>	<aphaerese>
8733	8733	<>	<elision3>
8733	8733	<>	<elision2>
8733	8733	<>	<elision1>
8733	8734	.	κ
8733	8734	.	λ
8733	7163	<1s>	<>
8734	8735	<>	<name>
8734	8734	<>	<aphaerese>
8734	8737	<elision3>	<elision3>
8734	8734	<>	<elision3>
8734	8737	<elision2>	<elision2>
8734	8734	<>	<elision2>
8734	8737	<elision1>	<elision1>
8734	8734	<>	<elision1>
8734	7154	<1s>	<>
8735	8736	<>	<aphaerese>
8735	8739	<elision3>	<elision3>
8735	8736	<>	<elision3>
8735	8739	<elision2>	<elision2>
8735	8736	<>	<elision2>
8735	8739	<elision1>	<elision1>
8735	8736	<>	<elision1>
8735	7155	<1s>	<>
8736	8734	<>	<aphaerese>
8736	8737	<elision3>	<elision3>
8736	8734	<>	<elision3>
8736	8737	<elision2>	<elision2>
8736	8734	<>	<elision2>
8736	8737	<elision1>	<elision1>
8736	8734	<>	<elision1>
8736	7153	<1s>	<>
8737	8738	<>	<name>
8737	8737	<>	<aphaerese>
8737	8737	<>	<elision3>
8737	8737	<>	<elision2>
8737	8737	<>	<elision1>
8737	7921	.	κ
8737	7939	s	κ
8737	7674	s	k
8737	7692	s	K
8737	7995	s	λ
8737	7705	s	l
8737	7708	s	L
8737	7148	<1s>	<>
8738	8739	<>	<aphaerese>
8738	8739	<>	<elision3>
8738	8739	<>	<elision2>
8738	8739	<>	<elision1>
8738	7923	.	κ
8738	7941	s	κ
8738	7676	s	k
8738	7695	s	K
8738	7997	s	λ
8738	7707	s	l
8738	7710	s	L
8738	7149	<1s>	<>
8739	8737	<>	<aphaerese>
8739	8737	<>	<elision3>
8739	8737	<>	<elision2>
8739	8737	<>	<elision1>
8739	7921	.	κ
8739	7939	s	κ
8739	7674	s	k
8739	7692	s	K
8739	7995	s	λ
8739	7705	s	l
8739	7708	s	L
8739	7147	<1s>	<>
8740	8741	<>	<aphaerese>
8740	8741	<>	<elision3>
8740	8741	<>	<elision2>
8740	8741	<>	<elision1>
8740	8732	<l2L>	<>
8741	8742	<>	<name>
8741	8741	<>	<aphaerese>
8741	8741	<>	<elision3>
8741	8741	<>	<elision2>
8741	8741	<>	<elision1>
8741	8733	<l2L>	<>
8742	8740	<>	<aphaerese>
8742	8740	<>	<elision3>
8742	8740	<>	<elision2>
8742	8740	<>	<elision1>
8742	8731	<l2L>	<>
8743	8162	.	.
8743	8162	<~>	<~>
8743	8162	<split-s>	<split-s>
8743	8162	<split-h>	<split-h>
8743	8162	<name2>	<name2>
8743	8165	<aphaerese>	<aphaerese>
8743	8744	<>	<aphaerese>
8743	8162	<elision3>	<elision3>
8743	8744	<>	<elision3>
8743	8162	<elision2>	<elision2>
8743	8744	<>	<elision2>
8743	8162	<elision1>	<elision1>
8743	8744	<>	<elision1>
8743	8158	.	υ
8743	8304	H	υ
8743	8158	.	u
8743	8313	H	u
8743	8748	H	κ
8743	8760	H	k
8743	8282	H	U
8743	8749	H	K
8743	8158	.	α
8743	8316	H	α
8743	8158	.	a
8743	8319	H	a
8743	8253	H	A
8743	8748	H	λ
8743	8760	H	l
8743	8749	H	L
8744	8160	.	.
8744	8160	<~>	<~>
8744	8160	<split-s>	<split-s>
8744	8160	<split-h>	<split-h>
8744	8160	<name2>	<name2>
8744	8163	<aphaerese>	<aphaerese>
8744	8745	<>	<aphaerese>
8744	8160	<elision3>	<elision3>
8744	8745	<>	<elision3>
8744	8160	<elision2>	<elision2>
8744	8745	<>	<elision2>
8744	8160	<elision1>	<elision1>
8744	8745	<>	<elision1>
8744	8159	.	υ
8744	8302	H	υ
8744	8159	.	u
8744	8311	H	u
8744	8746	H	κ
8744	8758	H	k
8744	8280	H	U
8744	8750	H	K
8744	8159	.	α
8744	8314	H	α
8744	8159	.	a
8744	8317	H	a
8744	8251	H	A
8744	8746	H	λ
8744	8758	H	l
8744	8750	H	L
8745	8160	.	.
8745	8160	<~>	<~>
8745	8160	<split-s>	<split-s>
8745	8160	<split-h>	<split-h>
8745	8160	<name2>	<name2>
8745	8743	<>	<name>
8745	8163	<aphaerese>	<aphaerese>
8745	8745	<>	<aphaerese>
8745	8160	<elision3>	<elision3>
8745	8745	<>	<elision3>
8745	8160	<elision2>	<elision2>
8745	8745	<>	<elision2>
8745	8160	<elision1>	<elision1>
8745	8745	<>	<elision1>
8745	8159	.	υ
8745	8302	H	υ
8745	8159	.	u
8745	8311	H	u
8745	8746	H	κ
8745	8758	H	k
8745	8280	H	U
8745	8750	H	K
8745	8159	.	α
8745	8314	H	α
8745	8159	.	a
8745	8317	H	a
8745	8251	H	A
8745	8746	H	λ
8745	8758	H	l
8745	8750	H	L
8746	8747	<>	<name>
8746	8746	<>	<aphaerese>
8746	8746	<>	<elision3>
8746	8746	<>	<elision2>
8746	8746	<>	<elision1>
8746	8750	<lambda2L>	<>
8747	8748	<>	<aphaerese>
8747	8748	<>	<elision3>
8747	8748	<>	<elision2>
8747	8748	<>	<elision1>
8747	8751	<lambda2L>	<>
8748	8746	<>	<aphaerese>
8748	8746	<>	<elision3>
8748	8746	<>	<elision2>
8748	8746	<>	<elision1>
8748	8749	<lambda2L>	<>
8749	8750	<>	<aphaerese>
8749	8750	<>	<elision3>
8749	8750	<>	<elision2>
8749	8750	<>	<elision1>
8749	8753	.	κ
8749	8753	.	λ
8750	8751	<>	<name>
8750	8750	<>	<aphaerese>
8750	8750	<>	<elision3>
8750	8750	<>	<elision2>
8750	8750	<>	<elision1>
8750	8753	.	κ
8750	8753	.	λ
8751	8749	<>	<aphaerese>
8751	8749	<>	<elision3>
8751	8749	<>	<elision2>
8751	8749	<>	<elision1>
8751	8752	.	κ
8751	8752	.	λ
8752	8753	<>	<aphaerese>
8752	8756	<elision3>	<elision3>
8752	8753	<>	<elision3>
8752	8756	<elision2>	<elision2>
8752	8753	<>	<elision2>
8752	8756	<elision1>	<elision1>
8752	8753	<>	<elision1>
8753	8754	<>	<name>
8753	8753	<>	<aphaerese>
8753	8756	<elision3>	<elision3>
8753	8753	<>	<elision3>
8753	8756	<elision2>	<elision2>
8753	8753	<>	<elision2>
8753	8756	<elision1>	<elision1>
8753	8753	<>	<elision1>
8754	8752	<>	<aphaerese>
8754	8755	<elision3>	<elision3>
8754	8752	<>	<elision3>
8754	8755	<elision2>	<elision2>
8754	8752	<>	<elision2>
8754	8755	<elision1>	<elision1>
8754	8752	<>	<elision1>
8755	8756	<>	<aphaerese>
8755	8756	<>	<elision3>
8755	8756	<>	<elision2>
8755	8756	<>	<elision1>
8755	8227	.	κ
8755	8200	s	κ
8755	8203	H	κ
8755	8200	s	k
8755	8203	H	k
8755	8188	s	K
8755	8203	H	K
8755	8200	s	λ
8755	8203	H	λ
8755	8200	s	l
8755	8203	H	l
8755	8194	s	L
8755	8203	H	L
8756	8757	<>	<name>
8756	8756	<>	<aphaerese>
8756	8756	<>	<elision3>
8756	8756	<>	<elision2>
8756	8756	<>	<elision1>
8756	8227	.	κ
8756	8200	s	κ
8756	8203	H	κ
8756	8200	s	k
8756	8203	H	k
8756	8188	s	K
8756	8203	H	K
8756	8200	s	λ
8756	8203	H	λ
8756	8200	s	l
8756	8203	H	l
8756	8194	s	L
8756	8203	H	L
8757	8755	<>	<aphaerese>
8757	8755	<>	<elision3>
8757	8755	<>	<elision2>
8757	8755	<>	<elision1>
8757	8229	.	κ
8757	8199	s	κ
8757	8202	H	κ
8757	8199	s	k
8757	8202	H	k
8757	8187	s	K
8757	8202	H	K
8757	8199	s	λ
8757	8202	H	λ
8757	8199	s	l
8757	8202	H	l
8757	8193	s	L
8757	8202	H	L
8758	8759	<>	<name>
8758	8758	<>	<aphaerese>
8758	8758	<>	<elision3>
8758	8758	<>	<elision2>
8758	8758	<>	<elision1>
8758	8750	<l2L>	<>
8759	8760	<>	<aphaerese>
8759	8760	<>	<elision3>
8759	8760	<>	<elision2>
8759	8760	<>	<elision1>
8759	8751	<l2L>	<>
8760	8758	<>	<aphaerese>
8760	8758	<>	<elision3>
8760	8758	<>	<elision2>
8760	8758	<>	<elision1>
8760	8749	<l2L>	<>
8761	8762	<>	<aphaerese>
8761	8765	<elision3>	<elision3>
8761	8762	<>	<elision3>
8761	8765	<elision2>	<elision2>
8761	8762	<>	<elision2>
8761	8765	<elision1>	<elision1>
8761	8762	<>	<elision1>
8761	8768	<K>	<>
8762	8763	<>	<name>
8762	8762	<>	<aphaerese>
8762	8765	<elision3>	<elision3>
8762	8762	<>	<elision3>
8762	8765	<elision2>	<elision2>
8762	8762	<>	<elision2>
8762	8765	<elision1>	<elision1>
8762	8762	<>	<elision1>
8762	8769	<K>	<>
8763	8761	<>	<aphaerese>
8763	8764	<elision3>	<elision3>
8763	8761	<>	<elision3>
8763	8764	<elision2>	<elision2>
8763	8761	<>	<elision2>
8763	8764	<elision1>	<elision1>
8763	8761	<>	<elision1>
8763	8767	<K>	<>
8764	107	.	.
8764	108	 	 
8764	107	<~>	<~>
8764	107	<split-s>	<split-s>
8764	107	<split-h>	<split-h>
8764	107	<name2>	<name2>
8764	111	<aphaerese>	<aphaerese>
8764	8765	<>	<aphaerese>
8764	107	<elision3>	<elision3>
8764	8765	<>	<elision3>
8764	107	<elision2>	<elision2>
8764	8765	<>	<elision2>
8764	107	<elision1>	<elision1>
8764	8765	<>	<elision1>
8764	8110	.	υ
8764	8154	H	υ
8764	8110	.	u
8764	8156	H	u
8764	8729	H	κ
8764	8741	H	k
8764	8077	H	U
8764	8733	H	K
8764	8110	.	α
8764	8140	H	α
8764	8110	.	a
8764	8145	H	a
8764	7907	H	A
8764	8729	H	λ
8764	8741	H	l
8764	8733	H	L
8765	107	.	.
8765	108	 	 
8765	107	<~>	<~>
8765	107	<split-s>	<split-s>
8765	107	<split-h>	<split-h>
8765	107	<name2>	<name2>
8765	8766	<>	<name>
8765	111	<aphaerese>	<aphaerese>
8765	8765	<>	<aphaerese>
8765	107	<elision3>	<elision3>
8765	8765	<>	<elision3>
8765	107	<elision2>	<elision2>
8765	8765	<>	<elision2>
8765	107	<elision1>	<elision1>
8765	8765	<>	<elision1>
8765	8110	.	υ
8765	8154	H	υ
8765	8110	.	u
8765	8156	H	u
8765	8729	H	κ
8765	8741	H	k
8765	8077	H	U
8765	8733	H	K
8765	8110	.	α
8765	8140	H	α
8765	8110	.	a
8765	8145	H	a
8765	7907	H	A
8765	8729	H	λ
8765	8741	H	l
8765	8733	H	L
8766	106	.	.
8766	110	 	 
8766	106	<~>	<~>
8766	106	<split-s>	<split-s>
8766	106	<split-h>	<split-h>
8766	106	<name2>	<name2>
8766	113	<aphaerese>	<aphaerese>
8766	8764	<>	<aphaerese>
8766	106	<elision3>	<elision3>
8766	8764	<>	<elision3>
8766	106	<elision2>	<elision2>
8766	8764	<>	<elision2>
8766	106	<elision1>	<elision1>
8766	8764	<>	<elision1>
8766	8112	.	υ
8766	8149	H	υ
8766	8112	.	u
8766	8153	H	u
8766	8728	H	κ
8766	8740	H	k
8766	8079	H	U
8766	8732	H	K
8766	8112	.	α
8766	8139	H	α
8766	8112	.	a
8766	8144	H	a
8766	7910	H	A
8766	8728	H	λ
8766	8740	H	l
8766	8732	H	L
8767	8768	<>	<aphaerese>
8767	8744	<elision3>	<elision3>
8767	8768	<>	<elision3>
8767	8744	<elision2>	<elision2>
8767	8768	<>	<elision2>
8767	8744	<elision1>	<elision1>
8767	8768	<>	<elision1>
8768	8769	<>	<aphaerese>
8768	8745	<elision3>	<elision3>
8768	8769	<>	<elision3>
8768	8745	<elision2>	<elision2>
8768	8769	<>	<elision2>
8768	8745	<elision1>	<elision1>
8768	8769	<>	<elision1>
8769	8767	<>	<name>
8769	8769	<>	<aphaerese>
8769	8745	<elision3>	<elision3>
8769	8769	<>	<elision3>
8769	8745	<elision2>	<elision2>
8769	8769	<>	<elision2>
8769	8745	<elision1>	<elision1>
8769	8769	<>	<elision1>
8770	8771	<>	<aphaerese>
8770	8771	<>	<elision3>
8770	8771	<>	<elision2>
8770	8771	<>	<elision1>
8770	8774	.	κ
8770	8774	.	λ
8770	8777	<K>	<>
8771	8772	<>	<name>
8771	8771	<>	<aphaerese>
8771	8771	<>	<elision3>
8771	8771	<>	<elision2>
8771	8771	<>	<elision1>
8771	8774	.	κ
8771	8774	.	λ
8771	8778	<K>	<>
8772	8770	<>	<aphaerese>
8772	8770	<>	<elision3>
8772	8770	<>	<elision2>
8772	8770	<>	<elision1>
8772	8773	.	κ
8772	8773	.	λ
8772	8776	<K>	<>
8773	8774	<>	<aphaerese>
8773	8765	<elision3>	<elision3>
8773	8774	<>	<elision3>
8773	8765	<elision2>	<elision2>
8773	8774	<>	<elision2>
8773	8765	<elision1>	<elision1>
8773	8774	<>	<elision1>
8774	8775	<>	<name>
8774	8774	<>	<aphaerese>
8774	8765	<elision3>	<elision3>
8774	8774	<>	<elision3>
8774	8765	<elision2>	<elision2>
8774	8774	<>	<elision2>
8774	8765	<elision1>	<elision1>
8774	8774	<>	<elision1>
8775	8773	<>	<aphaerese>
8775	8764	<elision3>	<elision3>
8775	8773	<>	<elision3>
8775	8764	<elision2>	<elision2>
8775	8773	<>	<elision2>
8775	8764	<elision1>	<elision1>
8775	8773	<>	<elision1>
8776	8777	<>	<aphaerese>
8776	8777	<>	<elision3>
8776	8777	<>	<elision2>
8776	8777	<>	<elision1>
8776	8768	.	κ
8776	8768	.	λ
8777	8778	<>	<aphaerese>
8777	8778	<>	<elision3>
8777	8778	<>	<elision2>
8777	8778	<>	<elision1>
8777	8769	.	κ
8777	8769	.	λ
8778	8776	<>	<name>
8778	8778	<>	<aphaerese>
8778	8778	<>	<elision3>
8778	8778	<>	<elision2>
8778	8778	<>	<elision1>
8778	8769	.	κ
8778	8769	.	λ
8779	8780	<>	<name>
8779	8779	<>	<aphaerese>
8779	8779	<>	<elision3>
8779	8779	<>	<elision2>
8779	8779	<>	<elision1>
8779	8782	.	κ
8779	8782	.	λ
8779	8804	<4s>	<>
8780	8781	<>	<aphaerese>
8780	8781	<>	<elision3>
8780	8781	<>	<elision2>
8780	8781	<>	<elision1>
8780	8784	.	κ
8780	8784	.	λ
8780	8805	<4s>	<>
8781	8779	<>	<aphaerese>
8781	8779	<>	<elision3>
8781	8779	<>	<elision2>
8781	8779	<>	<elision1>
8781	8782	.	κ
8781	8782	.	λ
8781	8803	<4s>	<>
8782	8783	<>	<name>
8782	8782	<>	<aphaerese>
8782	8785	<elision3>	<elision3>
8782	8782	<>	<elision3>
8782	8785	<elision2>	<elision2>
8782	8782	<>	<elision2>
8782	8785	<elision1>	<elision1>
8782	8782	<>	<elision1>
8782	8795	<4s>	<>
8783	8784	<>	<aphaerese>
8783	8787	<elision3>	<elision3>
8783	8784	<>	<elision3>
8783	8787	<elision2>	<elision2>
8783	8784	<>	<elision2>
8783	8787	<elision1>	<elision1>
8783	8784	<>	<elision1>
8783	8796	<4s>	<>
8784	8782	<>	<aphaerese>
8784	8785	<elision3>	<elision3>
8784	8782	<>	<elision3>
8784	8785	<elision2>	<elision2>
8784	8782	<>	<elision2>
8784	8785	<elision1>	<elision1>
8784	8782	<>	<elision1>
8784	8794	<4s>	<>
8785	8786	<>	<name>
8785	8785	<>	<aphaerese>
8785	8785	<>	<elision3>
8785	8785	<>	<elision2>
8785	8785	<>	<elision1>
8785	8342	.	κ
8785	8789	<4s>	<>
8786	8787	<>	<aphaerese>
8786	8787	<>	<elision3>
8786	8787	<>	<elision2>
8786	8787	<>	<elision1>
8786	8344	.	κ
8786	8790	<4s>	<>
8787	8785	<>	<aphaerese>
8787	8785	<>	<elision3>
8787	8785	<>	<elision2>
8787	8785	<>	<elision1>
8787	8342	.	κ
8787	8788	<4s>	<>
8788	8789	<>	<aphaerese>
8788	8789	<>	<elision3>
8788	8789	<>	<elision2>
8788	8789	<>	<elision1>
8788	114	.	κ
8788	7736	H	κ
8788	8064	H	k
8788	8080	H	K
8788	8091	H	λ
8788	8494	H	l
8788	8499	H	L
8788	8792	<K>	<>
8789	8790	<>	<name>
8789	8789	<>	<aphaerese>
8789	8789	<>	<elision3>
8789	8789	<>	<elision2>
8789	8789	<>	<elision1>
8789	114	.	κ
8789	7736	H	κ
8789	8064	H	k
8789	8080	H	K
8789	8091	H	λ
8789	8494	H	l
8789	8499	H	L
8789	8793	<K>	<>
8790	8788	<>	<aphaerese>
8790	8788	<>	<elision3>
8790	8788	<>	<elision2>
8790	8788	<>	<elision1>
8790	116	.	κ
8790	8101	H	κ
8790	8105	H	k
8790	8109	H	K
8790	8093	H	λ
8790	8493	H	l
8790	8496	H	L
8790	8791	<K>	<>
8791	8792	<>	<aphaerese>
8791	8792	<>	<elision3>
8791	8792	<>	<elision2>
8791	8792	<>	<elision1>
8791	8168	.	κ
8791	8219	H	κ
8791	8273	H	k
8791	8286	H	K
8791	8294	H	λ
8791	8300	H	l
8791	8295	H	L
8792	8793	<>	<aphaerese>
8792	8793	<>	<elision3>
8792	8793	<>	<elision2>
8792	8793	<>	<elision1>
8792	8166	.	κ
8792	8217	H	κ
8792	8271	H	k
8792	8283	H	K
8792	8292	H	λ
8792	8298	H	l
8792	8301	H	L
8793	8791	<>	<name>
8793	8793	<>	<aphaerese>
8793	8793	<>	<elision3>
8793	8793	<>	<elision2>
8793	8793	<>	<elision1>
8793	8166	.	κ
8793	8217	H	κ
8793	8271	H	k
8793	8283	H	K
8793	8292	H	λ
8793	8298	H	l
8793	8301	H	L
8794	8795	<>	<aphaerese>
8794	8798	<elision3>	<elision3>
8794	8795	<>	<elision3>
8794	8798	<elision2>	<elision2>
8794	8795	<>	<elision2>
8794	8798	<elision1>	<elision1>
8794	8795	<>	<elision1>
8794	8801	<K>	<>
8795	8796	<>	<name>
8795	8795	<>	<aphaerese>
8795	8798	<elision3>	<elision3>
8795	8795	<>	<elision3>
8795	8798	<elision2>	<elision2>
8795	8795	<>	<elision2>
8795	8798	<elision1>	<elision1>
8795	8795	<>	<elision1>
8795	8802	<K>	<>
8796	8794	<>	<aphaerese>
8796	8797	<elision3>	<elision3>
8796	8794	<>	<elision3>
8796	8797	<elision2>	<elision2>
8796	8794	<>	<elision2>
8796	8797	<elision1>	<elision1>
8796	8794	<>	<elision1>
8796	8800	<K>	<>
8797	8798	<>	<aphaerese>
8797	8798	<>	<elision3>
8797	8798	<>	<elision2>
8797	8798	<>	<elision1>
8797	114	.	κ
8797	7736	H	κ
8797	8064	H	k
8797	8080	H	K
8797	8091	H	λ
8797	8097	H	l
8797	8100	H	L
8798	8799	<>	<name>
8798	8798	<>	<aphaerese>
8798	8798	<>	<elision3>
8798	8798	<>	<elision2>
8798	8798	<>	<elision1>
8798	114	.	κ
8798	7736	H	κ
8798	8064	H	k
8798	8080	H	K
8798	8091	H	λ
8798	8097	H	l
8798	8100	H	L
8799	8797	<>	<aphaerese>
8799	8797	<>	<elision3>
8799	8797	<>	<elision2>
8799	8797	<>	<elision1>
8799	116	.	κ
8799	8101	H	κ
8799	8105	H	k
8799	8109	H	K
8799	8093	H	λ
8799	8099	H	l
8799	8094	H	L
8800	8801	<>	<aphaerese>
8800	8792	<elision3>	<elision3>
8800	8801	<>	<elision3>
8800	8792	<elision2>	<elision2>
8800	8801	<>	<elision2>
8800	8792	<elision1>	<elision1>
8800	8801	<>	<elision1>
8801	8802	<>	<aphaerese>
8801	8793	<elision3>	<elision3>
8801	8802	<>	<elision3>
8801	8793	<elision2>	<elision2>
8801	8802	<>	<elision2>
8801	8793	<elision1>	<elision1>
8801	8802	<>	<elision1>
8802	8800	<>	<name>
8802	8802	<>	<aphaerese>
8802	8793	<elision3>	<elision3>
8802	8802	<>	<elision3>
8802	8793	<elision2>	<elision2>
8802	8802	<>	<elision2>
8802	8793	<elision1>	<elision1>
8802	8802	<>	<elision1>
8803	8804	<>	<aphaerese>
8803	8804	<>	<elision3>
8803	8804	<>	<elision2>
8803	8804	<>	<elision1>
8803	8807	.	κ
8803	8807	.	λ
8803	8810	<K>	<>
8804	8805	<>	<name>
8804	8804	<>	<aphaerese>
8804	8804	<>	<elision3>
8804	8804	<>	<elision2>
8804	8804	<>	<elision1>
8804	8807	.	κ
8804	8807	.	λ
8804	8811	<K>	<>
8805	8803	<>	<aphaerese>
8805	8803	<>	<elision3>
8805	8803	<>	<elision2>
8805	8803	<>	<elision1>
8805	8806	.	κ
8805	8806	.	λ
8805	8809	<K>	<>
8806	8807	<>	<aphaerese>
8806	8798	<elision3>	<elision3>
8806	8807	<>	<elision3>
8806	8798	<elision2>	<elision2>
8806	8807	<>	<elision2>
8806	8798	<elision1>	<elision1>
8806	8807	<>	<elision1>
8807	8808	<>	<name>
8807	8807	<>	<aphaerese>
8807	8798	<elision3>	<elision3>
8807	8807	<>	<elision3>
8807	8798	<elision2>	<elision2>
8807	8807	<>	<elision2>
8807	8798	<elision1>	<elision1>
8807	8807	<>	<elision1>
8808	8806	<>	<aphaerese>
8808	8797	<elision3>	<elision3>
8808	8806	<>	<elision3>
8808	8797	<elision2>	<elision2>
8808	8806	<>	<elision2>
8808	8797	<elision1>	<elision1>
8808	8806	<>	<elision1>
8809	8810	<>	<aphaerese>
8809	8810	<>	<elision3>
8809	8810	<>	<elision2>
8809	8810	<>	<elision1>
8809	8801	.	κ
8809	8801	.	λ
8810	8811	<>	<aphaerese>
8810	8811	<>	<elision3>
8810	8811	<>	<elision2>
8810	8811	<>	<elision1>
8810	8802	.	κ
8810	8802	.	λ
8811	8809	<>	<name>
8811	8811	<>	<aphaerese>
8811	8811	<>	<elision3>
8811	8811	<>	<elision2>
8811	8811	<>	<elision1>
8811	8802	.	κ
8811	8802	.	λ
8812	8336	.	.
8812	8336	 	 
8812	8336	<~>	<~>
8812	8336	<split-s>	<split-s>
8812	8336	<split-h>	<split-h>
8812	8336	<name2>	<name2>
8812	8813	<>	<name>
8812	8339	<aphaerese>	<aphaerese>
8812	8812	<>	<aphaerese>
8812	8336	<elision3>	<elision3>
8812	8812	<>	<elision3>
8812	8336	<elision2>	<elision2>
8812	8812	<>	<elision2>
8812	8336	<elision1>	<elision1>
8812	8812	<>	<elision1>
8812	8500	.	υ
8812	8500	.	u
8812	8500	.	α
8812	8500	.	a
8812	8816	<4s>	<>
8813	8338	.	.
8813	8338	 	 
8813	8338	<~>	<~>
8813	8338	<split-s>	<split-s>
8813	8338	<split-h>	<split-h>
8813	8338	<name2>	<name2>
8813	8341	<aphaerese>	<aphaerese>
8813	8814	<>	<aphaerese>
8813	8338	<elision3>	<elision3>
8813	8814	<>	<elision3>
8813	8338	<elision2>	<elision2>
8813	8814	<>	<elision2>
8813	8338	<elision1>	<elision1>
8813	8814	<>	<elision1>
8813	8502	.	υ
8813	8502	.	u
8813	8502	.	α
8813	8502	.	a
8813	8817	<4s>	<>
8814	8336	.	.
8814	8336	 	 
8814	8336	<~>	<~>
8814	8336	<split-s>	<split-s>
8814	8336	<split-h>	<split-h>
8814	8336	<name2>	<name2>
8814	8339	<aphaerese>	<aphaerese>
8814	8812	<>	<aphaerese>
8814	8336	<elision3>	<elision3>
8814	8812	<>	<elision3>
8814	8336	<elision2>	<elision2>
8814	8812	<>	<elision2>
8814	8336	<elision1>	<elision1>
8814	8812	<>	<elision1>
8814	8500	.	υ
8814	8500	.	u
8814	8500	.	α
8814	8500	.	a
8814	8815	<4s>	<>
8815	107	.	.
8815	108	 	 
8815	107	<~>	<~>
8815	107	<split-s>	<split-s>
8815	107	<split-h>	<split-h>
8815	107	<name2>	<name2>
8815	111	<aphaerese>	<aphaerese>
8815	8816	<>	<aphaerese>
8815	107	<elision3>	<elision3>
8815	8816	<>	<elision3>
8815	107	<elision2>	<elision2>
8815	8816	<>	<elision2>
8815	107	<elision1>	<elision1>
8815	8816	<>	<elision1>
8815	8110	.	υ
8815	8154	H	υ
8815	8110	.	u
8815	8156	H	u
8815	8569	H	κ
8815	8064	H	k
8815	8077	H	U
8815	8080	H	K
8815	8110	.	α
8815	8140	H	α
8815	8110	.	a
8815	8145	H	a
8815	7907	H	A
8815	8546	H	λ
8815	8494	H	l
8815	8499	H	L
8815	8819	<K>	<>
8816	107	.	.
8816	108	 	 
8816	107	<~>	<~>
8816	107	<split-s>	<split-s>
8816	107	<split-h>	<split-h>
8816	107	<name2>	<name2>
8816	8817	<>	<name>
8816	111	<aphaerese>	<aphaerese>
8816	8816	<>	<aphaerese>
8816	107	<elision3>	<elision3>
8816	8816	<>	<elision3>
8816	107	<elision2>	<elision2>
8816	8816	<>	<elision2>
8816	107	<elision1>	<elision1>
8816	8816	<>	<elision1>
8816	8110	.	υ
8816	8154	H	υ
8816	8110	.	u
8816	8156	H	u
8816	8569	H	κ
8816	8064	H	k
8816	8077	H	U
8816	8080	H	K
8816	8110	.	α
8816	8140	H	α
8816	8110	.	a
8816	8145	H	a
8816	7907	H	A
8816	8546	H	λ
8816	8494	H	l
8816	8499	H	L
8816	8820	<K>	<>
8817	106	.	.
8817	110	 	 
8817	106	<~>	<~>
8817	106	<split-s>	<split-s>
8817	106	<split-h>	<split-h>
8817	106	<name2>	<name2>
8817	113	<aphaerese>	<aphaerese>
8817	8815	<>	<aphaerese>
8817	106	<elision3>	<elision3>
8817	8815	<>	<elision3>
8817	106	<elision2>	<elision2>
8817	8815	<>	<elision2>
8817	106	<elision1>	<elision1>
8817	8815	<>	<elision1>
8817	8112	.	υ
8817	8149	H	υ
8817	8112	.	u
8817	8153	H	u
8817	8526	H	κ
8817	8105	H	k
8817	8079	H	U
8817	8109	H	K
8817	8112	.	α
8817	8139	H	α
8817	8112	.	a
8817	8144	H	a
8817	7910	H	A
8817	8545	H	λ
8817	8493	H	l
8817	8496	H	L
8817	8818	<K>	<>
8818	8162	.	.
8818	8162	<~>	<~>
8818	8162	<split-s>	<split-s>
8818	8162	<split-h>	<split-h>
8818	8162	<name2>	<name2>
8818	8165	<aphaerese>	<aphaerese>
8818	8819	<>	<aphaerese>
8818	8162	<elision3>	<elision3>
8818	8819	<>	<elision3>
8818	8162	<elision2>	<elision2>
8818	8819	<>	<elision2>
8818	8162	<elision1>	<elision1>
8818	8819	<>	<elision1>
8818	8158	.	υ
8818	8304	H	υ
8818	8158	.	u
8818	8313	H	u
8818	8556	H	κ
8818	8273	H	k
8818	8282	H	U
8818	8286	H	K
8818	8158	.	α
8818	8316	H	α
8818	8158	.	a
8818	8319	H	a
8818	8253	H	A
8818	8565	H	λ
8818	8300	H	l
8818	8295	H	L
8819	8160	.	.
8819	8160	<~>	<~>
8819	8160	<split-s>	<split-s>
8819	8160	<split-h>	<split-h>
8819	8160	<name2>	<name2>
8819	8163	<aphaerese>	<aphaerese>
8819	8820	<>	<aphaerese>
8819	8160	<elision3>	<elision3>
8819	8820	<>	<elision3>
8819	8160	<elision2>	<elision2>
8819	8820	<>	<elision2>
8819	8160	<elision1>	<elision1>
8819	8820	<>	<elision1>
8819	8159	.	υ
8819	8302	H	υ
8819	8159	.	u
8819	8311	H	u
8819	8554	H	κ
8819	8271	H	k
8819	8280	H	U
8819	8283	H	K
8819	8159	.	α
8819	8314	H	α
8819	8159	.	a
8819	8317	H	a
8819	8251	H	A
8819	8563	H	λ
8819	8298	H	l
8819	8301	H	L
8820	8160	.	.
8820	8160	<~>	<~>
8820	8160	<split-s>	<split-s>
8820	8160	<split-h>	<split-h>
8820	8160	<name2>	<name2>
8820	8818	<>	<name>
8820	8163	<aphaerese>	<aphaerese>
8820	8820	<>	<aphaerese>
8820	8160	<elision3>	<elision3>
8820	8820	<>	<elision3>
8820	8160	<elision2>	<elision2>
8820	8820	<>	<elision2>
8820	8160	<elision1>	<elision1>
8820	8820	<>	<elision1>
8820	8159	.	υ
8820	8302	H	υ
8820	8159	.	u
8820	8311	H	u
8820	8554	H	κ
8820	8271	H	k
8820	8280	H	U
8820	8283	H	K
8820	8159	.	α
8820	8314	H	α
8820	8159	.	a
8820	8317	H	a
8820	8251	H	A
8820	8563	H	λ
8820	8298	H	l
8820	8301	H	L
8821	8822	<name>	<name>
8821	8823	<K>	<>
8822	8109	H	k
8822	8094	H	l
8823	8712	<name>	<name>
8824	8336	.	.
8824	8336	 	 
8824	8336	<~>	<~>
8824	8336	<split-s>	<split-s>
8824	8336	<split-h>	<split-h>
8824	8336	<name2>	<name2>
8824	8710	<name2>	<name>
8824	8813	<>	<name>
8824	8339	<aphaerese>	<aphaerese>
8824	8812	<>	<aphaerese>
8824	8336	<elision3>	<elision3>
8824	8812	<>	<elision3>
8824	8336	<elision2>	<elision2>
8824	8812	<>	<elision2>
8824	8336	<elision1>	<elision1>
8824	8812	<>	<elision1>
8824	8500	.	υ
8824	8500	.	u
8824	8500	.	α
8824	8500	.	a
8824	8825	<4s>	<>
8825	107	.	.
8825	108	 	 
8825	107	<~>	<~>
8825	107	<split-s>	<split-s>
8825	107	<split-h>	<split-h>
8825	107	<name2>	<name2>
8825	8822	<name2>	<name>
8825	8817	<>	<name>
8825	111	<aphaerese>	<aphaerese>
8825	8816	<>	<aphaerese>
8825	107	<elision3>	<elision3>
8825	8816	<>	<elision3>
8825	107	<elision2>	<elision2>
8825	8816	<>	<elision2>
8825	107	<elision1>	<elision1>
8825	8816	<>	<elision1>
8825	8110	.	υ
8825	8154	H	υ
8825	8110	.	u
8825	8156	H	u
8825	8569	H	κ
8825	8064	H	k
8825	8077	H	U
8825	8080	H	K
8825	8110	.	α
8825	8140	H	α
8825	8110	.	a
8825	8145	H	a
8825	7907	H	A
8825	8546	H	λ
8825	8494	H	l
8825	8499	H	L
8825	8826	<K>	<>
8826	8160	.	.
8826	8160	<~>	<~>
8826	8160	<split-s>	<split-s>
8826	8160	<split-h>	<split-h>
8826	8160	<name2>	<name2>
8826	8712	<name2>	<name>
8826	8818	<>	<name>
8826	8163	<aphaerese>	<aphaerese>
8826	8820	<>	<aphaerese>
8826	8160	<elision3>	<elision3>
8826	8820	<>	<elision3>
8826	8160	<elision2>	<elision2>
8826	8820	<>	<elision2>
8826	8160	<elision1>	<elision1>
8826	8820	<>	<elision1>
8826	8159	.	υ
8826	8302	H	υ
8826	8159	.	u
8826	8311	H	u
8826	8554	H	κ
8826	8271	H	k
8826	8280	H	U
8826	8283	H	K
8826	8159	.	α
8826	8314	H	α
8826	8159	.	a
8826	8317	H	a
8826	8251	H	A
8826	8563	H	λ
8826	8298	H	l
8826	8301	H	L
8827	8828	<>	<name>
8827	8827	<>	<aphaerese>
8827	8827	<>	<elision3>
8827	8827	<>	<elision2>
8827	8827	<>	<elision1>
8827	8336	<A2kl>	<>
8828	8829	<>	<aphaerese>
8828	8829	<>	<elision3>
8828	8829	<>	<elision2>
8828	8829	<>	<elision1>
8828	8337	<A2kl>	<>
8829	8827	<>	<aphaerese>
8829	8827	<>	<elision3>
8829	8827	<>	<elision2>
8829	8827	<>	<elision1>
8829	8338	<A2kl>	<>
8830	8710	<name>	<name>
8830	8831	<>	<name>
8830	8833	<>	<aphaerese>
8830	8833	<>	<elision3>
8830	8833	<>	<elision2>
8830	8833	<>	<elision1>
8830	8821	<4s>	<>
8830	8716	<A2kl>	<>
8830	8843	<L2kl>	<>
8831	8832	<>	<aphaerese>
8831	8832	<>	<elision3>
8831	8832	<>	<elision2>
8831	8832	<>	<elision1>
8831	8717	<A2kl>	<>
8831	8835	<L2kl>	<>
8832	8833	<>	<aphaerese>
8832	8833	<>	<elision3>
8832	8833	<>	<elision2>
8832	8833	<>	<elision1>
8832	8718	<A2kl>	<>
8832	8836	<L2kl>	<>
8833	8831	<>	<name>
8833	8833	<>	<aphaerese>
8833	8833	<>	<elision3>
8833	8833	<>	<elision2>
8833	8833	<>	<elision1>
8833	8716	<A2kl>	<>
8833	8834	<L2kl>	<>
8834	8336	.	.
8834	8336	 	 
8834	8336	<~>	<~>
8834	8336	<split-s>	<split-s>
8834	8336	<split-h>	<split-h>
8834	8336	<name2>	<name2>
8834	8835	<>	<name>
8834	8339	<aphaerese>	<aphaerese>
8834	8834	<>	<aphaerese>
8834	8336	<elision3>	<elision3>
8834	8834	<>	<elision3>
8834	8336	<elision2>	<elision2>
8834	8834	<>	<elision2>
8834	8336	<elision1>	<elision1>
8834	8834	<>	<elision1>
8834	8500	.	υ
8834	8500	.	u
8834	8782	.	κ
8834	8500	.	α
8834	8500	.	a
8834	8782	.	λ
8834	8838	<4s>	<>
8835	8338	.	.
8835	8338	 	 
8835	8338	<~>	<~>
8835	8338	<split-s>	<split-s>
8835	8338	<split-h>	<split-h>
8835	8338	<name2>	<name2>
8835	8341	<aphaerese>	<aphaerese>
8835	8836	<>	<aphaerese>
8835	8338	<elision3>	<elision3>
8835	8836	<>	<elision3>
8835	8338	<elision2>	<elision2>
8835	8836	<>	<elision2>
8835	8338	<elision1>	<elision1>
8835	8836	<>	<elision1>
8835	8502	.	υ
8835	8502	.	u
8835	8784	.	κ
8835	8502	.	α
8835	8502	.	a
8835	8784	.	λ
8835	8839	<4s>	<>
8836	8336	.	.
8836	8336	 	 
8836	8336	<~>	<~>
8836	8336	<split-s>	<split-s>
8836	8336	<split-h>	<split-h>
8836	8336	<name2>	<name2>
8836	8339	<aphaerese>	<aphaerese>
8836	8834	<>	<aphaerese>
8836	8336	<elision3>	<elision3>
8836	8834	<>	<elision3>
8836	8336	<elision2>	<elision2>
8836	8834	<>	<elision2>
8836	8336	<elision1>	<elision1>
8836	8834	<>	<elision1>
8836	8500	.	υ
8836	8500	.	u
8836	8782	.	κ
8836	8500	.	α
8836	8500	.	a
8836	8782	.	λ
8836	8837	<4s>	<>
8837	107	.	.
8837	108	 	 
8837	107	<~>	<~>
8837	107	<split-s>	<split-s>
8837	107	<split-h>	<split-h>
8837	107	<name2>	<name2>
8837	111	<aphaerese>	<aphaerese>
8837	8838	<>	<aphaerese>
8837	107	<elision3>	<elision3>
8837	8838	<>	<elision3>
8837	107	<elision2>	<elision2>
8837	8838	<>	<elision2>
8837	107	<elision1>	<elision1>
8837	8838	<>	<elision1>
8837	8110	.	υ
8837	8154	H	υ
8837	8110	.	u
8837	8156	H	u
8837	8807	.	κ
8837	8569	H	κ
8837	8064	H	k
8837	8077	H	U
8837	8080	H	K
8837	8110	.	α
8837	8140	H	α
8837	8110	.	a
8837	8145	H	a
8837	7907	H	A
8837	8807	.	λ
8837	8546	H	λ
8837	8494	H	l
8837	8499	H	L
8837	8841	<K>	<>
8838	107	.	.
8838	108	 	 
8838	107	<~>	<~>
8838	107	<split-s>	<split-s>
8838	107	<split-h>	<split-h>
8838	107	<name2>	<name2>
8838	8839	<>	<name>
8838	111	<aphaerese>	<aphaerese>
8838	8838	<>	<aphaerese>
8838	107	<elision3>	<elision3>
8838	8838	<>	<elision3>
8838	107	<elision2>	<elision2>
8838	8838	<>	<elision2>
8838	107	<elision1>	<elision1>
8838	8838	<>	<elision1>
8838	8110	.	υ
8838	8154	H	υ
8838	8110	.	u
8838	8156	H	u
8838	8807	.	κ
8838	8569	H	κ
8838	8064	H	k
8838	8077	H	U
8838	8080	H	K
8838	8110	.	α
8838	8140	H	α
8838	8110	.	a
8838	8145	H	a
8838	7907	H	A
8838	8807	.	λ
8838	8546	H	λ
8838	8494	H	l
8838	8499	H	L
8838	8842	<K>	<>
8839	106	.	.
8839	110	 	 
8839	106	<~>	<~>
8839	106	<split-s>	<split-s>
8839	106	<split-h>	<split-h>
8839	106	<name2>	<name2>
8839	113	<aphaerese>	<aphaerese>
8839	8837	<>	<aphaerese>
8839	106	<elision3>	<elision3>
8839	8837	<>	<elision3>
8839	106	<elision2>	<elision2>
8839	8837	<>	<elision2>
8839	106	<elision1>	<elision1>
8839	8837	<>	<elision1>
8839	8112	.	υ
8839	8149	H	υ
8839	8112	.	u
8839	8153	H	u
8839	8806	.	κ
8839	8526	H	κ
8839	8105	H	k
8839	8079	H	U
8839	8109	H	K
8839	8112	.	α
8839	8139	H	α
8839	8112	.	a
8839	8144	H	a
8839	7910	H	A
8839	8806	.	λ
8839	8545	H	λ
8839	8493	H	l
8839	8496	H	L
8839	8840	<K>	<>
8840	8162	.	.
8840	8162	<~>	<~>
8840	8162	<split-s>	<split-s>
8840	8162	<split-h>	<split-h>
8840	8162	<name2>	<name2>
8840	8165	<aphaerese>	<aphaerese>
8840	8841	<>	<aphaerese>
8840	8162	<elision3>	<elision3>
8840	8841	<>	<elision3>
8840	8162	<elision2>	<elision2>
8840	8841	<>	<elision2>
8840	8162	<elision1>	<elision1>
8840	8841	<>	<elision1>
8840	8158	.	υ
8840	8304	H	υ
8840	8158	.	u
8840	8313	H	u
8840	8801	.	κ
8840	8556	H	κ
8840	8273	H	k
8840	8282	H	U
8840	8286	H	K
8840	8158	.	α
8840	8316	H	α
8840	8158	.	a
8840	8319	H	a
8840	8253	H	A
8840	8801	.	λ
8840	8565	H	λ
8840	8300	H	l
8840	8295	H	L
8841	8160	.	.
8841	8160	<~>	<~>
8841	8160	<split-s>	<split-s>
8841	8160	<split-h>	<split-h>
8841	8160	<name2>	<name2>
8841	8163	<aphaerese>	<aphaerese>
8841	8842	<>	<aphaerese>
8841	8160	<elision3>	<elision3>
8841	8842	<>	<elision3>
8841	8160	<elision2>	<elision2>
8841	8842	<>	<elision2>
8841	8160	<elision1>	<elision1>
8841	8842	<>	<elision1>
8841	8159	.	υ
8841	8302	H	υ
8841	8159	.	u
8841	8311	H	u
8841	8802	.	κ
8841	8554	H	κ
8841	8271	H	k
8841	8280	H	U
8841	8283	H	K
8841	8159	.	α
8841	8314	H	α
8841	8159	.	a
8841	8317	H	a
8841	8251	H	A
8841	8802	.	λ
8841	8563	H	λ
8841	8298	H	l
8841	8301	H	L
8842	8160	.	.
8842	8160	<~>	<~>
8842	8160	<split-s>	<split-s>
8842	8160	<split-h>	<split-h>
8842	8160	<name2>	<name2>
8842	8840	<>	<name>
8842	8163	<aphaerese>	<aphaerese>
8842	8842	<>	<aphaerese>
8842	8160	<elision3>	<elision3>
8842	8842	<>	<elision3>
8842	8160	<elision2>	<elision2>
8842	8842	<>	<elision2>
8842	8160	<elision1>	<elision1>
8842	8842	<>	<elision1>
8842	8159	.	υ
8842	8302	H	υ
8842	8159	.	u
8842	8311	H	u
8842	8802	.	κ
8842	8554	H	κ
8842	8271	H	k
8842	8280	H	U
8842	8283	H	K
8842	8159	.	α
8842	8314	H	α
8842	8159	.	a
8842	8317	H	a
8842	8251	H	A
8842	8802	.	λ
8842	8563	H	λ
8842	8298	H	l
8842	8301	H	L
8843	8336	.	.
8843	8336	 	 
8843	8336	<~>	<~>
8843	8336	<split-s>	<split-s>
8843	8336	<split-h>	<split-h>
8843	8336	<name2>	<name2>
8843	8710	<name2>	<name>
8843	8835	<>	<name>
8843	8339	<aphaerese>	<aphaerese>
8843	8834	<>	<aphaerese>
8843	8336	<elision3>	<elision3>
8843	8834	<>	<elision3>
8843	8336	<elision2>	<elision2>
8843	8834	<>	<elision2>
8843	8336	<elision1>	<elision1>
8843	8834	<>	<elision1>
8843	8500	.	υ
8843	8500	.	u
8843	8782	.	κ
8843	8500	.	α
8843	8500	.	a
8843	8782	.	λ
8843	8844	<4s>	<>
8844	107	.	.
8844	108	 	 
8844	107	<~>	<~>
8844	107	<split-s>	<split-s>
8844	107	<split-h>	<split-h>
8844	107	<name2>	<name2>
8844	8822	<name2>	<name>
8844	8839	<>	<name>
8844	111	<aphaerese>	<aphaerese>
8844	8838	<>	<aphaerese>
8844	107	<elision3>	<elision3>
8844	8838	<>	<elision3>
8844	107	<elision2>	<elision2>
8844	8838	<>	<elision2>
8844	107	<elision1>	<elision1>
8844	8838	<>	<elision1>
8844	8110	.	υ
8844	8154	H	υ
8844	8110	.	u
8844	8156	H	u
8844	8807	.	κ
8844	8569	H	κ
8844	8064	H	k
8844	8077	H	U
8844	8080	H	K
8844	8110	.	α
8844	8140	H	α
8844	8110	.	a
8844	8145	H	a
8844	7907	H	A
8844	8807	.	λ
8844	8546	H	λ
8844	8494	H	l
8844	8499	H	L
8844	8845	<K>	<>
8845	8160	.	.
8845	8160	<~>	<~>
8845	8160	<split-s>	<split-s>
8845	8160	<split-h>	<split-h>
8845	8160	<name2>	<name2>
8845	8712	<name2>	<name>
8845	8840	<>	<name>
8845	8163	<aphaerese>	<aphaerese>
8845	8842	<>	<aphaerese>
8845	8160	<elision3>	<elision3>
8845	8842	<>	<elision3>
8845	8160	<elision2>	<elision2>
8845	8842	<>	<elision2>
8845	8160	<elision1>	<elision1>
8845	8842	<>	<elision1>
8845	8159	.	υ
8845	8302	H	υ
8845	8159	.	u
8845	8311	H	u
8845	8802	.	κ
8845	8554	H	κ
8845	8271	H	k
8845	8280	H	U
8845	8283	H	K
8845	8159	.	α
8845	8314	H	α
8845	8159	.	a
8845	8317	H	a
8845	8251	H	A
8845	8802	.	λ
8845	8563	H	λ
8845	8298	H	l
8845	8301	H	L
8846	8847	<>	<name>
8846	8846	<>	<aphaerese>
8846	8846	<>	<elision3>
8846	8846	<>	<elision2>
8846	8846	<>	<elision1>
8846	8504	<3s>	<>
8847	8848	<>	<aphaerese>
8847	8848	<>	<elision3>
8847	8848	<>	<elision2>
8847	8848	<>	<elision1>
8847	8505	<3s>	<>
8848	8846	<>	<aphaerese>
8848	8846	<>	<elision3>
8848	8846	<>	<elision2>
8848	8846	<>	<elision1>
8848	8503	<3s>	<>
8849	8336	.	.
8849	8336	 	 
8849	8336	<~>	<~>
8849	8336	<split-s>	<split-s>
8849	8336	<split-h>	<split-h>
8849	8336	<name2>	<name2>
8849	8506	<>	<name>
8849	8339	<aphaerese>	<aphaerese>
8849	8335	<>	<aphaerese>
8849	8335	<>	<elision3>
8849	8335	<>	<elision2>
8849	8335	<>	<elision1>
8849	8500	.	υ
8849	8500	.	u
8849	8342	.	κ
8849	8500	.	α
8849	8500	.	a
8849	8850	<4s>	<>
8850	107	.	.
8850	108	 	 
8850	107	<~>	<~>
8850	107	<split-s>	<split-s>
8850	107	<split-h>	<split-h>
8850	107	<name2>	<name2>
8850	8510	<>	<name>
8850	111	<aphaerese>	<aphaerese>
8850	8509	<>	<aphaerese>
8850	8509	<>	<elision3>
8850	8509	<>	<elision2>
8850	8509	<>	<elision1>
8850	8110	.	υ
8850	8110	.	u
8850	114	.	κ
8850	8077	H	U
8850	8080	H	K
8850	8110	.	α
8850	8110	.	a
8850	7907	H	A
8850	8499	H	L
8850	8851	<K>	<>
8851	8160	.	.
8851	8160	<~>	<~>
8851	8160	<split-s>	<split-s>
8851	8160	<split-h>	<split-h>
8851	8160	<name2>	<name2>
8851	8511	<>	<name>
8851	8163	<aphaerese>	<aphaerese>
8851	8513	<>	<aphaerese>
8851	8513	<>	<elision3>
8851	8513	<>	<elision2>
8851	8513	<>	<elision1>
8851	8159	.	υ
8851	8159	.	u
8851	8166	.	κ
8851	8280	H	U
8851	8283	H	K
8851	8159	.	α
8851	8159	.	a
8851	8251	H	A
8851	8301	H	L
8852	8336	.	.
8852	8336	 	 
8852	8336	<~>	<~>
8852	8336	<split-s>	<split-s>
8852	8336	<split-h>	<split-h>
8852	8336	<name2>	<name2>
8852	8586	<>	<name>
8852	8339	<aphaerese>	<aphaerese>
8852	8585	<>	<aphaerese>
8852	8588	<elision3>	<elision3>
8852	8585	<>	<elision3>
8852	8588	<elision2>	<elision2>
8852	8585	<>	<elision2>
8852	8588	<elision1>	<elision1>
8852	8585	<>	<elision1>
8852	8500	.	υ
8852	8500	.	u
8852	8500	.	κ
8852	8500	.	α
8852	8500	.	a
8852	8500	.	λ
8852	8853	<4s>	<>
8853	107	.	.
8853	108	 	 
8853	107	<~>	<~>
8853	107	<split-s>	<split-s>
8853	107	<split-h>	<split-h>
8853	107	<name2>	<name2>
8853	8690	<>	<name>
8853	111	<aphaerese>	<aphaerese>
8853	8689	<>	<aphaerese>
8853	8692	<elision3>	<elision3>
8853	8689	<>	<elision3>
8853	8692	<elision2>	<elision2>
8853	8689	<>	<elision2>
8853	8692	<elision1>	<elision1>
8853	8689	<>	<elision1>
8853	8110	.	υ
8853	8110	.	u
8853	8110	.	κ
8853	8077	H	U
8853	8080	H	K
8853	8110	.	α
8853	8110	.	a
8853	7907	H	A
8853	8110	.	λ
8853	8499	H	L
8853	8854	<K>	<>
8854	8160	.	.
8854	8160	<~>	<~>
8854	8160	<split-s>	<split-s>
8854	8160	<split-h>	<split-h>
8854	8160	<name2>	<name2>
8854	8694	<>	<name>
8854	8163	<aphaerese>	<aphaerese>
8854	8696	<>	<aphaerese>
8854	8641	<elision3>	<elision3>
8854	8696	<>	<elision3>
8854	8641	<elision2>	<elision2>
8854	8696	<>	<elision2>
8854	8641	<elision1>	<elision1>
8854	8696	<>	<elision1>
8854	8159	.	υ
8854	8159	.	u
8854	8159	.	κ
8854	8280	H	U
8854	8283	H	K
8854	8159	.	α
8854	8159	.	a
8854	8251	H	A
8854	8159	.	λ
8854	8301	H	L
8855	8336	.	.
8855	8336	 	 
8855	8336	<~>	<~>
8855	8336	<split-s>	<split-s>
8855	8336	<split-h>	<split-h>
8855	8336	<name2>	<name2>
8855	8698	<>	<name>
8855	8339	<aphaerese>	<aphaerese>
8855	8697	<>	<aphaerese>
8855	8336	<elision3>	<elision3>
8855	8697	<>	<elision3>
8855	8336	<elision2>	<elision2>
8855	8697	<>	<elision2>
8855	8336	<elision1>	<elision1>
8855	8697	<>	<elision1>
8855	8500	.	υ
8855	8500	.	u
8855	8500	.	κ
8855	8500	.	α
8855	8500	.	a
8855	8500	.	λ
8855	8856	<4s>	<>
8856	107	.	.
8856	108	 	 
8856	107	<~>	<~>
8856	107	<split-s>	<split-s>
8856	107	<split-h>	<split-h>
8856	107	<name2>	<name2>
8856	8702	<>	<name>
8856	111	<aphaerese>	<aphaerese>
8856	8701	<>	<aphaerese>
8856	107	<elision3>	<elision3>
8856	8701	<>	<elision3>
8856	107	<elision2>	<elision2>
8856	8701	<>	<elision2>
8856	107	<elision1>	<elision1>
8856	8701	<>	<elision1>
8856	8110	.	υ
8856	8110	.	u
8856	8110	.	κ
8856	8077	H	U
8856	8080	H	K
8856	8110	.	α
8856	8110	.	a
8856	7907	H	A
8856	8110	.	λ
8856	8499	H	L
8856	8857	<K>	<>
8857	8160	.	.
8857	8160	<~>	<~>
8857	8160	<split-s>	<split-s>
8857	8160	<split-h>	<split-h>
8857	8160	<name2>	<name2>
8857	8703	<>	<name>
8857	8163	<aphaerese>	<aphaerese>
8857	8705	<>	<aphaerese>
8857	8160	<elision3>	<elision3>
8857	8705	<>	<elision3>
8857	8160	<elision2>	<elision2>
8857	8705	<>	<elision2>
8857	8160	<elision1>	<elision1>
8857	8705	<>	<elision1>
8857	8159	.	υ
8857	8159	.	u
8857	8159	.	κ
8857	8280	H	U
8857	8283	H	K
8857	8159	.	α
8857	8159	.	a
8857	8251	H	A
8857	8159	.	λ
8857	8301	H	L
8858	8707	<>	<name>
8858	8706	<>	<aphaerese>
8858	8706	<>	<elision3>
8858	8706	<>	<elision2>
8858	8706	<>	<elision1>
8858	8859	<U2kl>	<>
8859	8336	.	.
8859	8336	 	 
8859	8336	<~>	<~>
8859	8336	<split-s>	<split-s>
8859	8336	<split-h>	<split-h>
8859	8336	<name2>	<name2>
8859	8337	<>	<name>
8859	8339	<aphaerese>	<aphaerese>
8859	8336	<>	<aphaerese>
8859	8336	<elision3>	<elision3>
8859	8336	<>	<elision3>
8859	8336	<elision2>	<elision2>
8859	8336	<>	<elision2>
8859	8336	<elision1>	<elision1>
8859	8336	<>	<elision1>
8859	8500	.	υ
8859	8500	.	u
8859	8342	.	κ
8859	8500	.	α
8859	8500	.	a
8859	8860	<4s>	<>
8860	107	.	.
8860	108	 	 
8860	107	<~>	<~>
8860	107	<split-s>	<split-s>
8860	107	<split-h>	<split-h>
8860	107	<name2>	<name2>
8860	8505	<>	<name>
8860	111	<aphaerese>	<aphaerese>
8860	8504	<>	<aphaerese>
8860	107	<elision3>	<elision3>
8860	8504	<>	<elision3>
8860	107	<elision2>	<elision2>
8860	8504	<>	<elision2>
8860	107	<elision1>	<elision1>
8860	8504	<>	<elision1>
8860	8110	.	υ
8860	8110	.	u
8860	114	.	κ
8860	8077	H	U
8860	8080	H	K
8860	8110	.	α
8860	8110	.	a
8860	7907	H	A
8860	8499	H	L
8860	8861	<K>	<>
8861	8160	.	.
8861	8160	<~>	<~>
8861	8160	<split-s>	<split-s>
8861	8160	<split-h>	<split-h>
8861	8160	<name2>	<name2>
8861	8161	<>	<name>
8861	8163	<aphaerese>	<aphaerese>
8861	8160	<>	<aphaerese>
8861	8160	<elision3>	<elision3>
8861	8160	<>	<elision3>
8861	8160	<elision2>	<elision2>
8861	8160	<>	<elision2>
8861	8160	<elision1>	<elision1>
8861	8160	<>	<elision1>
8861	8159	.	υ
8861	8159	.	u
8861	8166	.	κ
8861	8280	H	U
8861	8283	H	K
8861	8159	.	α
8861	8159	.	a
8861	8251	H	A
8861	8301	H	L
8862	8710	<name>	<name>
8862	8713	<>	<name>
8862	8715	<>	<aphaerese>
8862	8715	<>	<elision3>
8862	8715	<>	<elision2>
8862	8715	<>	<elision1>
8862	8821	<4s>	<>
8862	8716	<A2kl>	<>
8862	8779	<L2kl>	<>
8862	8863	<K2kl>	<>
8863	8336	.	.
8863	8336	 	 
8863	8336	<~>	<~>
8863	8336	<split-s>	<split-s>
8863	8336	<split-h>	<split-h>
8863	8336	<name2>	<name2>
8863	8710	<name2>	<name>
8863	8813	<>	<name>
8863	8339	<aphaerese>	<aphaerese>
8863	8812	<>	<aphaerese>
8863	8336	<elision3>	<elision3>
8863	8812	<>	<elision3>
8863	8336	<elision2>	<elision2>
8863	8812	<>	<elision2>
8863	8336	<elision1>	<elision1>
8863	8812	<>	<elision1>
8863	8500	.	υ
8863	8500	.	u
8863	8500	.	α
8863	8500	.	a
8863	8864	<4s>	<>
8864	107	.	.
8864	108	 	 
8864	107	<~>	<~>
8864	107	<split-s>	<split-s>
8864	107	<split-h>	<split-h>
8864	107	<name2>	<name2>
8864	8822	<name2>	<name>
8864	8817	<>	<name>
8864	111	<aphaerese>	<aphaerese>
8864	8816	<>	<aphaerese>
8864	107	<elision3>	<elision3>
8864	8816	<>	<elision3>
8864	107	<elision2>	<elision2>
8864	8816	<>	<elision2>
8864	107	<elision1>	<elision1>
8864	8816	<>	<elision1>
8864	8110	.	υ
8864	8110	.	u
8864	8077	H	U
8864	8080	H	K
8864	8110	.	α
8864	8110	.	a
8864	7907	H	A
8864	8499	H	L
8864	8865	<K>	<>
8865	8160	.	.
8865	8160	<~>	<~>
8865	8160	<split-s>	<split-s>
8865	8160	<split-h>	<split-h>
8865	8160	<name2>	<name2>
8865	8712	<name2>	<name>
8865	8818	<>	<name>
8865	8163	<aphaerese>	<aphaerese>
8865	8820	<>	<aphaerese>
8865	8160	<elision3>	<elision3>
8865	8820	<>	<elision3>
8865	8160	<elision2>	<elision2>
8865	8820	<>	<elision2>
8865	8160	<elision1>	<elision1>
8865	8820	<>	<elision1>
8865	8159	.	υ
8865	8159	.	u
8865	8280	H	U
8865	8283	H	K
8865	8159	.	α
8865	8159	.	a
8865	8251	H	A
8865	8301	H	L
8866	8828	<>	<name>
8866	8827	<>	<aphaerese>
8866	8827	<>	<elision3>
8866	8827	<>	<elision2>
8866	8827	<>	<elision1>
8866	8859	<A2kl>	<>
8867	8710	<name>	<name>
8867	8831	<>	<name>
8867	8833	<>	<aphaerese>
8867	8833	<>	<elision3>
8867	8833	<>	<elision2>
8867	8833	<>	<elision1>
8867	8821	<4s>	<>
8867	8716	<A2kl>	<>
8867	8868	<L2kl>	<>
8868	8336	.	.
8868	8336	 	 
8868	8336	<~>	<~>
8868	8336	<split-s>	<split-s>
8868	8336	<split-h>	<split-h>
8868	8336	<name2>	<name2>
8868	8710	<name2>	<name>
8868	8835	<>	<name>
8868	8339	<aphaerese>	<aphaerese>
8868	8834	<>	<aphaerese>
8868	8336	<elision3>	<elision3>
8868	8834	<>	<elision3>
8868	8336	<elision2>	<elision2>
8868	8834	<>	<elision2>
8868	8336	<elision1>	<elision1>
8868	8834	<>	<elision1>
8868	8500	.	υ
8868	8500	.	u
8868	8782	.	κ
8868	8500	.	α
8868	8500	.	a
8868	8782	.	λ
8868	8869	<4s>	<>
8869	107	.	.
8869	108	 	 
8869	107	<~>	<~>
8869	107	<split-s>	<split-s>
8869	107	<split-h>	<split-h>
8869	107	<name2>	<name2>
8869	8822	<name2>	<name>
8869	8839	<>	<name>
8869	111	<aphaerese>	<aphaerese>
8869	8838	<>	<aphaerese>
8869	107	<elision3>	<elision3>
8869	8838	<>	<elision3>
8869	107	<elision2>	<elision2>
8869	8838	<>	<elision2>
8869	107	<elision1>	<elision1>
8869	8838	<>	<elision1>
8869	8110	.	υ
8869	8110	.	u
8869	8807	.	κ
8869	8077	H	U
8869	8080	H	K
8869	8110	.	α
8869	8110	.	a
8869	7907	H	A
8869	8807	.	λ
8869	8499	H	L
8869	8870	<K>	<>
8870	8160	.	.
8870	8160	<~>	<~>
8870	8160	<split-s>	<split-s>
8870	8160	<split-h>	<split-h>
8870	8160	<name2>	<name2>
8870	8712	<name2>	<name>
8870	8840	<>	<name>
8870	8163	<aphaerese>	<aphaerese>
8870	8842	<>	<aphaerese>
8870	8160	<elision3>	<elision3>
8870	8842	<>	<elision3>
8870	8160	<elision2>	<elision2>
8870	8842	<>	<elision2>
8870	8160	<elision1>	<elision1>
8870	8842	<>	<elision1>
8870	8159	.	υ
8870	8159	.	u
8870	8802	.	κ
8870	8280	H	U
8870	8283	H	K
8870	8159	.	α
8870	8159	.	a
8870	8251	H	A
8870	8802	.	λ
8870	8301	H	L
8871	8321	.	.
8871	8322	 	 
8871	8321	<~>	<~>
8871	8321	<split-s>	<split-s>
8871	8321	<split-h>	<split-h>
8871	8321	<name2>	<name2>
8871	8325	<aphaerese>	<aphaerese>
8871	8325	<>	<aphaerese>
8871	8321	<elision3>	<elision3>
8871	8325	<>	<elision3>
8871	8321	<elision2>	<elision2>
8871	8325	<>	<elision2>
8871	8321	<elision1>	<elision1>
8871	8325	<>	<elision1>
8871	8321	.	υ
8871	8321	.	u
8871	8514	.	κ
8871	8585	s	κ
8871	8697	s	k
8871	8706	s	U
8871	8872	s	K
8871	8321	.	α
8871	8321	.	a
8871	8827	s	A
8871	8697	s	λ
8871	8697	s	l
8871	8885	s	L
8871	8892	<split-h>	<>
8872	8710	<name>	<name>
8872	8873	<>	<name>
8872	8875	<>	<aphaerese>
8872	8875	<>	<elision3>
8872	8875	<>	<elision2>
8872	8875	<>	<elision1>
8872	8821	<4s>	<>
8872	8876	<L2kl>	<>
8872	8824	<K2kl>	<>
8873	8874	<>	<aphaerese>
8873	8874	<>	<elision3>
8873	8874	<>	<elision2>
8873	8874	<>	<elision1>
8873	8877	<L2kl>	<>
8873	8813	<K2kl>	<>
8874	8875	<>	<aphaerese>
8874	8875	<>	<elision3>
8874	8875	<>	<elision2>
8874	8875	<>	<elision1>
8874	8878	<L2kl>	<>
8874	8814	<K2kl>	<>
8875	8873	<>	<name>
8875	8875	<>	<aphaerese>
8875	8875	<>	<elision3>
8875	8875	<>	<elision2>
8875	8875	<>	<elision1>
8875	8876	<L2kl>	<>
8875	8812	<K2kl>	<>
8876	8877	<>	<name>
8876	8876	<>	<aphaerese>
8876	8876	<>	<elision3>
8876	8876	<>	<elision2>
8876	8876	<>	<elision1>
8876	8500	.	κ
8876	8500	.	λ
8876	8880	<4s>	<>
8877	8878	<>	<aphaerese>
8877	8878	<>	<elision3>
8877	8878	<>	<elision2>
8877	8878	<>	<elision1>
8877	8502	.	κ
8877	8502	.	λ
8877	8881	<4s>	<>
8878	8876	<>	<aphaerese>
8878	8876	<>	<elision3>
8878	8876	<>	<elision2>
8878	8876	<>	<elision1>
8878	8500	.	κ
8878	8500	.	λ
8878	8879	<4s>	<>
8879	8880	<>	<aphaerese>
8879	8880	<>	<elision3>
8879	8880	<>	<elision2>
8879	8880	<>	<elision1>
8879	8110	.	κ
8879	8110	.	λ
8879	8883	<K>	<>
8880	8881	<>	<name>
8880	8880	<>	<aphaerese>
8880	8880	<>	<elision3>
8880	8880	<>	<elision2>
8880	8880	<>	<elision1>
8880	8110	.	κ
8880	8110	.	λ
8880	8884	<K>	<>
8881	8879	<>	<aphaerese>
8881	8879	<>	<elision3>
8881	8879	<>	<elision2>
8881	8879	<>	<elision1>
8881	8112	.	κ
8881	8112	.	λ
8881	8882	<K>	<>
8882	8883	<>	<aphaerese>
8882	8883	<>	<elision3>
8882	8883	<>	<elision2>
8882	8883	<>	<elision1>
8882	8158	.	κ
8882	8158	.	λ
8883	8884	<>	<aphaerese>
8883	8884	<>	<elision3>
8883	8884	<>	<elision2>
8883	8884	<>	<elision1>
8883	8159	.	κ
8883	8159	.	λ
8884	8882	<>	<name>
8884	8884	<>	<aphaerese>
8884	8884	<>	<elision3>
8884	8884	<>	<elision2>
8884	8884	<>	<elision1>
8884	8159	.	κ
8884	8159	.	λ
8885	8710	<name>	<name>
8885	8886	<>	<name>
8885	8888	<>	<aphaerese>
8885	8888	<>	<elision3>
8885	8888	<>	<elision2>
8885	8888	<>	<elision1>
8885	8821	<4s>	<>
8885	8889	<L2kl>	<>
8886	8887	<>	<aphaerese>
8886	8887	<>	<elision3>
8886	8887	<>	<elision2>
8886	8887	<>	<elision1>
8886	8698	<L2kl>	<>
8887	8888	<>	<aphaerese>
8887	8888	<>	<elision3>
8887	8888	<>	<elision2>
8887	8888	<>	<elision1>
8887	8699	<L2kl>	<>
8888	8886	<>	<name>
8888	8888	<>	<aphaerese>
8888	8888	<>	<elision3>
8888	8888	<>	<elision2>
8888	8888	<>	<elision1>
8888	8697	<L2kl>	<>
8889	8336	.	.
8889	8336	 	 
8889	8336	<~>	<~>
8889	8336	<split-s>	<split-s>
8889	8336	<split-h>	<split-h>
8889	8336	<name2>	<name2>
8889	8710	<name2>	<name>
8889	8698	<>	<name>
8889	8339	<aphaerese>	<aphaerese>
8889	8697	<>	<aphaerese>
8889	8336	<elision3>	<elision3>
8889	8697	<>	<elision3>
8889	8336	<elision2>	<elision2>
8889	8697	<>	<elision2>
8889	8336	<elision1>	<elision1>
8889	8697	<>	<elision1>
8889	8500	.	υ
8889	8500	.	u
8889	8500	.	κ
8889	8500	.	α
8889	8500	.	a
8889	8500	.	λ
8889	8890	<4s>	<>
8890	107	.	.
8890	108	 	 
8890	107	<~>	<~>
8890	107	<split-s>	<split-s>
8890	107	<split-h>	<split-h>
8890	107	<name2>	<name2>
8890	8822	<name2>	<name>
8890	8702	<>	<name>
8890	111	<aphaerese>	<aphaerese>
8890	8701	<>	<aphaerese>
8890	107	<elision3>	<elision3>
8890	8701	<>	<elision3>
8890	107	<elision2>	<elision2>
8890	8701	<>	<elision2>
8890	107	<elision1>	<elision1>
8890	8701	<>	<elision1>
8890	8110	.	υ
8890	8154	H	υ
8890	8110	.	u
8890	8156	H	u
8890	8110	.	κ
8890	8569	H	κ
8890	8064	H	k
8890	8077	H	U
8890	8080	H	K
8890	8110	.	α
8890	8140	H	α
8890	8110	.	a
8890	8145	H	a
8890	7907	H	A
8890	8110	.	λ
8890	8546	H	λ
8890	8494	H	l
8890	8499	H	L
8890	8891	<K>	<>
8891	8160	.	.
8891	8160	<~>	<~>
8891	8160	<split-s>	<split-s>
8891	8160	<split-h>	<split-h>
8891	8160	<name2>	<name2>
8891	8712	<name2>	<name>
8891	8703	<>	<name>
8891	8163	<aphaerese>	<aphaerese>
8891	8705	<>	<aphaerese>
8891	8160	<elision3>	<elision3>
8891	8705	<>	<elision3>
8891	8160	<elision2>	<elision2>
8891	8705	<>	<elision2>
8891	8160	<elision1>	<elision1>
8891	8705	<>	<elision1>
8891	8159	.	υ
8891	8302	H	υ
8891	8159	.	u
8891	8311	H	u
8891	8159	.	κ
8891	8554	H	κ
8891	8271	H	k
8891	8280	H	U
8891	8283	H	K
8891	8159	.	α
8891	8314	H	α
8891	8159	.	a
8891	8317	H	a
8891	8251	H	A
8891	8159	.	λ
8891	8563	H	λ
8891	8298	H	l
8891	8301	H	L
8892	8893	<>	<aphaerese>
8892	8893	<>	<elision3>
8892	8893	<>	<elision2>
8892	8893	<>	<elision1>
8892	8490	<3s>	<>
8893	8894	<>	<name>
8893	8893	<>	<aphaerese>
8893	8893	<>	<elision3>
8893	8893	<>	<elision2>
8893	8893	<>	<elision1>
8893	8491	<3s>	<>
8894	8892	<>	<aphaerese>
8894	8892	<>	<elision3>
8894	8892	<>	<elision2>
8894	8892	<>	<elision1>
8894	8492	<3s>	<>
8895	8321	.	.
8895	8322	 	 
8895	8321	<~>	<~>
8895	8321	<split-s>	<split-s>
8895	8321	<split-h>	<split-h>
8895	8321	<name2>	<name2>
8895	8325	<aphaerese>	<aphaerese>
8895	8328	<>	<aphaerese>
8895	8321	<elision3>	<elision3>
8895	8328	<>	<elision3>
8895	8321	<elision2>	<elision2>
8895	8328	<>	<elision2>
8895	8321	<elision1>	<elision1>
8895	8328	<>	<elision1>
8895	8329	.	υ
8895	8335	s	υ
8895	8329	.	u
8895	8335	s	u
8895	8514	.	κ
8895	8585	s	κ
8895	8697	s	k
8895	8706	s	U
8895	8709	s	K
8895	8329	.	α
8895	8335	s	α
8895	8329	.	a
8895	8335	s	a
8895	8827	s	A
8895	8697	s	λ
8895	8697	s	l
8895	8830	s	L
8895	8848	<split-h>	<>
8896	8324	.	.
8896	8327	 	 
8896	8324	<~>	<~>
8896	8324	<split-s>	<split-s>
8896	8324	<split-h>	<split-h>
8896	8324	<name2>	<name2>
8896	8871	<aphaerese>	<aphaerese>
8896	8324	<>	<aphaerese>
8896	8324	<elision3>	<elision3>
8896	8324	<>	<elision3>
8896	8324	<elision2>	<elision2>
8896	8324	<>	<elision2>
8896	8324	<elision1>	<elision1>
8896	8324	<>	<elision1>
8896	8331	.	υ
8896	8507	s	υ
8896	8331	.	u
8896	8507	s	u
8896	8516	.	κ
8896	8587	s	κ
8896	8699	s	k
8896	8708	s	U
8896	8874	s	K
8896	8331	.	α
8896	8507	s	α
8896	8331	.	a
8896	8507	s	a
8896	8829	s	A
8896	8699	s	λ
8896	8699	s	l
8896	8887	s	L
8896	8847	<split-h>	<>
8897	8324	.	.
8897	8327	 	 
8897	8324	<~>	<~>
8897	8324	<split-s>	<split-s>
8897	8324	<split-h>	<split-h>
8897	8324	<name2>	<name2>
8897	8871	<aphaerese>	<aphaerese>
8897	8898	<>	<aphaerese>
8897	8898	<>	<elision3>
8897	8898	<>	<elision2>
8897	8898	<>	<elision1>
8897	8331	.	υ
8897	8507	s	υ
8897	8331	.	u
8897	8507	s	u
8897	8516	.	κ
8897	8587	s	κ
8897	8699	s	k
8897	8708	s	U
8897	8874	s	K
8897	8331	.	α
8897	8507	s	α
8897	8331	.	a
8897	8507	s	a
8897	8829	s	A
8897	8699	s	λ
8897	8699	s	l
8897	8887	s	L
8897	8901	<split-h>	<>
8898	8321	.	.
8898	8322	 	 
8898	8321	<~>	<~>
8898	8321	<split-s>	<split-s>
8898	8321	<split-h>	<split-h>
8898	8321	<name2>	<name2>
8898	8325	<aphaerese>	<aphaerese>
8898	8320	<>	<aphaerese>
8898	8320	<>	<elision3>
8898	8320	<>	<elision2>
8898	8320	<>	<elision1>
8898	8329	.	υ
8898	8335	s	υ
8898	8329	.	u
8898	8335	s	u
8898	8514	.	κ
8898	8585	s	κ
8898	8697	s	k
8898	8706	s	U
8898	8872	s	K
8898	8329	.	α
8898	8335	s	α
8898	8329	.	a
8898	8335	s	a
8898	8827	s	A
8898	8697	s	λ
8898	8697	s	l
8898	8885	s	L
8898	8899	<split-h>	<>
8899	8900	<>	<aphaerese>
8899	8900	<>	<elision3>
8899	8900	<>	<elision2>
8899	8900	<>	<elision1>
8899	8508	<3s>	<>
8900	8901	<>	<name>
8900	8900	<>	<aphaerese>
8900	8900	<>	<elision3>
8900	8900	<>	<elision2>
8900	8900	<>	<elision1>
8900	8509	<3s>	<>
8901	8899	<>	<aphaerese>
8901	8899	<>	<elision3>
8901	8899	<>	<elision2>
8901	8899	<>	<elision1>
8901	8510	<3s>	<>
8902	8903	<>	<name>
8902	8902	<>	<aphaerese>
8902	8905	<elision3>	<elision3>
8902	8902	<>	<elision3>
8902	8905	<elision2>	<elision2>
8902	8902	<>	<elision2>
8902	8905	<elision1>	<elision1>
8902	8902	<>	<elision1>
8902	8488	<2s>	<>
8903	8904	<>	<aphaerese>
8903	8907	<elision3>	<elision3>
8903	8904	<>	<elision3>
8903	8907	<elision2>	<elision2>
8903	8904	<>	<elision2>
8903	8907	<elision1>	<elision1>
8903	8904	<>	<elision1>
8903	8489	<2s>	<>
8904	8902	<>	<aphaerese>
8904	8905	<elision3>	<elision3>
8904	8902	<>	<elision3>
8904	8905	<elision2>	<elision2>
8904	8902	<>	<elision2>
8904	8905	<elision1>	<elision1>
8904	8902	<>	<elision1>
8904	8487	<2s>	<>
8905	8906	<>	<name>
8905	8905	<>	<aphaerese>
8905	8905	<>	<elision3>
8905	8905	<>	<elision2>
8905	8905	<>	<elision1>
8905	8908	s	κ
8905	8908	s	k
8905	8923	s	K
8905	8908	s	λ
8905	8927	s	l
8905	8929	s	L
8905	8349	<2s>	<>
8906	8907	<>	<aphaerese>
8906	8907	<>	<elision3>
8906	8907	<>	<elision2>
8906	8907	<>	<elision1>
8906	8910	s	κ
8906	8910	s	k
8906	8925	s	K
8906	8910	s	λ
8906	8926	s	l
8906	8931	s	L
8906	8350	<2s>	<>
8907	8905	<>	<aphaerese>
8907	8905	<>	<elision3>
8907	8905	<>	<elision2>
8907	8905	<>	<elision1>
8907	8908	s	κ
8907	8908	s	k
8907	8923	s	K
8907	8908	s	λ
8907	8927	s	l
8907	8929	s	L
8907	8348	<2s>	<>
8908	8909	<>	<name>
8908	8908	<>	<aphaerese>
8908	8908	<>	<elision3>
8908	8908	<>	<elision2>
8908	8908	<>	<elision1>
8908	8911	s	κ
8908	8697	s	k
8908	8872	s	K
8908	8911	s	λ
8908	8697	s	l
8908	8885	s	L
8908	8921	<split-h>	<>
8909	8910	<>	<aphaerese>
8909	8910	<>	<elision3>
8909	8910	<>	<elision2>
8909	8910	<>	<elision1>
8909	8913	s	κ
8909	8699	s	k
8909	8874	s	K
8909	8913	s	λ
8909	8699	s	l
8909	8887	s	L
8909	8922	<split-h>	<>
8910	8908	<>	<aphaerese>
8910	8908	<>	<elision3>
8910	8908	<>	<elision2>
8910	8908	<>	<elision1>
8910	8911	s	κ
8910	8697	s	k
8910	8872	s	K
8910	8911	s	λ
8910	8697	s	l
8910	8885	s	L
8910	8920	<split-h>	<>
8911	8336	.	.
8911	8336	 	 
8911	8336	<~>	<~>
8911	8336	<split-s>	<split-s>
8911	8336	<split-h>	<split-h>
8911	8336	<name2>	<name2>
8911	8912	<>	<name>
8911	8339	<aphaerese>	<aphaerese>
8911	8911	<>	<aphaerese>
8911	8911	<>	<elision3>
8911	8911	<>	<elision2>
8911	8911	<>	<elision1>
8911	8500	.	υ
8911	8500	.	u
8911	8500	.	κ
8911	8500	.	α
8911	8500	.	a
8911	8500	.	λ
8911	8915	<4s>	<>
8912	8338	.	.
8912	8338	 	 
8912	8338	<~>	<~>
8912	8338	<split-s>	<split-s>
8912	8338	<split-h>	<split-h>
8912	8338	<name2>	<name2>
8912	8341	<aphaerese>	<aphaerese>
8912	8913	<>	<aphaerese>
8912	8913	<>	<elision3>
8912	8913	<>	<elision2>
8912	8913	<>	<elision1>
8912	8502	.	υ
8912	8502	.	u
8912	8502	.	κ
8912	8502	.	α
8912	8502	.	a
8912	8502	.	λ
8912	8916	<4s>	<>
8913	8336	.	.
8913	8336	 	 
8913	8336	<~>	<~>
8913	8336	<split-s>	<split-s>
8913	8336	<split-h>	<split-h>
8913	8336	<name2>	<name2>
8913	8339	<aphaerese>	<aphaerese>
8913	8911	<>	<aphaerese>
8913	8911	<>	<elision3>
8913	8911	<>	<elision2>
8913	8911	<>	<elision1>
8913	8500	.	υ
8913	8500	.	u
8913	8500	.	κ
8913	8500	.	α
8913	8500	.	a
8913	8500	.	λ
8913	8914	<4s>	<>
8914	107	.	.
8914	108	 	 
8914	107	<~>	<~>
8914	107	<split-s>	<split-s>
8914	107	<split-h>	<split-h>
8914	107	<name2>	<name2>
8914	111	<aphaerese>	<aphaerese>
8914	8915	<>	<aphaerese>
8914	8915	<>	<elision3>
8914	8915	<>	<elision2>
8914	8915	<>	<elision1>
8914	8110	.	υ
8914	8154	H	υ
8914	8110	.	u
8914	8156	H	u
8914	8110	.	κ
8914	8569	H	κ
8914	8064	H	k
8914	8077	H	U
8914	8080	H	K
8914	8110	.	α
8914	8140	H	α
8914	8110	.	a
8914	8145	H	a
8914	7907	H	A
8914	8110	.	λ
8914	8546	H	λ
8914	8494	H	l
8914	8499	H	L
8914	8918	<K>	<>
8915	107	.	.
8915	108	 	 
8915	107	<~>	<~>
8915	107	<split-s>	<split-s>
8915	107	<split-h>	<split-h>
8915	107	<name2>	<name2>
8915	8916	<>	<name>
8915	111	<aphaerese>	<aphaerese>
8915	8915	<>	<aphaerese>
8915	8915	<>	<elision3>
8915	8915	<>	<elision2>
8915	8915	<>	<elision1>
8915	8110	.	υ
8915	8154	H	υ
8915	8110	.	u
8915	8156	H	u
8915	8110	.	κ
8915	8569	H	κ
8915	8064	H	k
8915	8077	H	U
8915	8080	H	K
8915	8110	.	α
8915	8140	H	α
8915	8110	.	a
8915	8145	H	a
8915	7907	H	A
8915	8110	.	λ
8915	8546	H	λ
8915	8494	H	l
8915	8499	H	L
8915	8919	<K>	<>
8916	106	.	.
8916	110	 	 
8916	106	<~>	<~>
8916	106	<split-s>	<split-s>
8916	106	<split-h>	<split-h>
8916	106	<name2>	<name2>
8916	113	<aphaerese>	<aphaerese>
8916	8914	<>	<aphaerese>
8916	8914	<>	<elision3>
8916	8914	<>	<elision2>
8916	8914	<>	<elision1>
8916	8112	.	υ
8916	8149	H	υ
8916	8112	.	u
8916	8153	H	u
8916	8112	.	κ
8916	8526	H	κ
8916	8105	H	k
8916	8079	H	U
8916	8109	H	K
8916	8112	.	α
8916	8139	H	α
8916	8112	.	a
8916	8144	H	a
8916	7910	H	A
8916	8112	.	λ
8916	8545	H	λ
8916	8493	H	l
8916	8496	H	L
8916	8917	<K>	<>
8917	8162	.	.
8917	8162	<~>	<~>
8917	8162	<split-s>	<split-s>
8917	8162	<split-h>	<split-h>
8917	8162	<name2>	<name2>
8917	8165	<aphaerese>	<aphaerese>
8917	8918	<>	<aphaerese>
8917	8918	<>	<elision3>
8917	8918	<>	<elision2>
8917	8918	<>	<elision1>
8917	8158	.	υ
8917	8304	H	υ
8917	8158	.	u
8917	8313	H	u
8917	8158	.	κ
8917	8556	H	κ
8917	8273	H	k
8917	8282	H	U
8917	8286	H	K
8917	8158	.	α
8917	8316	H	α
8917	8158	.	a
8917	8319	H	a
8917	8253	H	A
8917	8158	.	λ
8917	8565	H	λ
8917	8300	H	l
8917	8295	H	L
8918	8160	.	.
8918	8160	<~>	<~>
8918	8160	<split-s>	<split-s>
8918	8160	<split-h>	<split-h>
8918	8160	<name2>	<name2>
8918	8163	<aphaerese>	<aphaerese>
8918	8919	<>	<aphaerese>
8918	8919	<>	<elision3>
8918	8919	<>	<elision2>
8918	8919	<>	<elision1>
8918	8159	.	υ
8918	8302	H	υ
8918	8159	.	u
8918	8311	H	u
8918	8159	.	κ
8918	8554	H	κ
8918	8271	H	k
8918	8280	H	U
8918	8283	H	K
8918	8159	.	α
8918	8314	H	α
8918	8159	.	a
8918	8317	H	a
8918	8251	H	A
8918	8159	.	λ
8918	8563	H	λ
8918	8298	H	l
8918	8301	H	L
8919	8160	.	.
8919	8160	<~>	<~>
8919	8160	<split-s>	<split-s>
8919	8160	<split-h>	<split-h>
8919	8160	<name2>	<name2>
8919	8917	<>	<name>
8919	8163	<aphaerese>	<aphaerese>
8919	8919	<>	<aphaerese>
8919	8919	<>	<elision3>
8919	8919	<>	<elision2>
8919	8919	<>	<elision1>
8919	8159	.	υ
8919	8302	H	υ
8919	8159	.	u
8919	8311	H	u
8919	8159	.	κ
8919	8554	H	κ
8919	8271	H	k
8919	8280	H	U
8919	8283	H	K
8919	8159	.	α
8919	8314	H	α
8919	8159	.	a
8919	8317	H	a
8919	8251	H	A
8919	8159	.	λ
8919	8563	H	λ
8919	8298	H	l
8919	8301	H	L
8920	8921	<>	<aphaerese>
8920	8921	<>	<elision3>
8920	8921	<>	<elision2>
8920	8921	<>	<elision1>
8920	8523	<3s>	<>
8921	8922	<>	<name>
8921	8921	<>	<aphaerese>
8921	8921	<>	<elision3>
8921	8921	<>	<elision2>
8921	8921	<>	<elision1>
8921	8524	<3s>	<>
8922	8920	<>	<aphaerese>
8922	8920	<>	<elision3>
8922	8920	<>	<elision2>
8922	8920	<>	<elision1>
8922	8525	<3s>	<>
8923	8924	<>	<name>
8923	8923	<>	<aphaerese>
8923	8923	<>	<elision3>
8923	8923	<>	<elision2>
8923	8923	<>	<elision1>
8923	8927	<K2kl>	<>
8924	8925	<>	<aphaerese>
8924	8925	<>	<elision3>
8924	8925	<>	<elision2>
8924	8925	<>	<elision1>
8924	8928	<K2kl>	<>
8925	8923	<>	<aphaerese>
8925	8923	<>	<elision3>
8925	8923	<>	<elision2>
8925	8923	<>	<elision1>
8925	8926	<K2kl>	<>
8926	8927	<>	<aphaerese>
8926	8927	<>	<elision3>
8926	8927	<>	<elision2>
8926	8927	<>	<elision1>
8926	8920	<split-h>	<>
8927	8928	<>	<name>
8927	8927	<>	<aphaerese>
8927	8927	<>	<elision3>
8927	8927	<>	<elision2>
8927	8927	<>	<elision1>
8927	8921	<split-h>	<>
8928	8926	<>	<aphaerese>
8928	8926	<>	<elision3>
8928	8926	<>	<elision2>
8928	8926	<>	<elision1>
8928	8922	<split-h>	<>
8929	8930	<>	<name>
8929	8929	<>	<aphaerese>
8929	8929	<>	<elision3>
8929	8929	<>	<elision2>
8929	8929	<>	<elision1>
8929	8927	<L2kl>	<>
8930	8931	<>	<aphaerese>
8930	8931	<>	<elision3>
8930	8931	<>	<elision2>
8930	8931	<>	<elision1>
8930	8928	<L2kl>	<>
8931	8929	<>	<aphaerese>
8931	8929	<>	<elision3>
8931	8929	<>	<elision2>
8931	8929	<>	<elision1>
8931	8926	<L2kl>	<>
8932	8321	.	.
8932	8322	 	 
8932	8321	<~>	<~>
8932	8321	<split-s>	<split-s>
8932	8321	<split-h>	<split-h>
8932	8321	<name2>	<name2>
8932	8933	<>	<name>
8932	8325	<aphaerese>	<aphaerese>
8932	8932	<>	<aphaerese>
8932	8935	<elision3>	<elision3>
8932	8932	<>	<elision3>
8932	8935	<elision2>	<elision2>
8932	8932	<>	<elision2>
8932	8935	<elision1>	<elision1>
8932	8932	<>	<elision1>
8932	8329	.	υ
8932	8335	s	υ
8932	8329	.	u
8932	8335	s	u
8932	8329	.	κ
8932	8911	s	κ
8932	8697	s	k
8932	8706	s	U
8932	8872	s	K
8932	8329	.	α
8932	8335	s	α
8932	8329	.	a
8932	8335	s	a
8932	8827	s	A
8932	8329	.	λ
8932	8911	s	λ
8932	8697	s	l
8932	8885	s	L
8932	8983	<split-h>	<>
8933	8324	.	.
8933	8327	 	 
8933	8324	<~>	<~>
8933	8324	<split-s>	<split-s>
8933	8324	<split-h>	<split-h>
8933	8324	<name2>	<name2>
8933	8871	<aphaerese>	<aphaerese>
8933	8934	<>	<aphaerese>
8933	8937	<elision3>	<elision3>
8933	8934	<>	<elision3>
8933	8937	<elision2>	<elision2>
8933	8934	<>	<elision2>
8933	8937	<elision1>	<elision1>
8933	8934	<>	<elision1>
8933	8331	.	υ
8933	8507	s	υ
8933	8331	.	u
8933	8507	s	u
8933	8331	.	κ
8933	8913	s	κ
8933	8699	s	k
8933	8708	s	U
8933	8874	s	K
8933	8331	.	α
8933	8507	s	α
8933	8331	.	a
8933	8507	s	a
8933	8829	s	A
8933	8331	.	λ
8933	8913	s	λ
8933	8699	s	l
8933	8887	s	L
8933	8984	<split-h>	<>
8934	8321	.	.
8934	8322	 	 
8934	8321	<~>	<~>
8934	8321	<split-s>	<split-s>
8934	8321	<split-h>	<split-h>
8934	8321	<name2>	<name2>
8934	8325	<aphaerese>	<aphaerese>
8934	8932	<>	<aphaerese>
8934	8935	<elision3>	<elision3>
8934	8932	<>	<elision3>
8934	8935	<elision2>	<elision2>
8934	8932	<>	<elision2>
8934	8935	<elision1>	<elision1>
8934	8932	<>	<elision1>
8934	8329	.	υ
8934	8335	s	υ
8934	8329	.	u
8934	8335	s	u
8934	8329	.	κ
8934	8911	s	κ
8934	8697	s	k
8934	8706	s	U
8934	8872	s	K
8934	8329	.	α
8934	8335	s	α
8934	8329	.	a
8934	8335	s	a
8934	8827	s	A
8934	8329	.	λ
8934	8911	s	λ
8934	8697	s	l
8934	8885	s	L
8934	8982	<split-h>	<>
8935	8321	.	.
8935	8322	 	 
8935	8321	<~>	<~>
8935	8321	<split-s>	<split-s>
8935	8321	<split-h>	<split-h>
8935	8321	<name2>	<name2>
8935	8936	<>	<name>
8935	8325	<aphaerese>	<aphaerese>
8935	8935	<>	<aphaerese>
8935	8321	<elision3>	<elision3>
8935	8935	<>	<elision3>
8935	8321	<elision2>	<elision2>
8935	8935	<>	<elision2>
8935	8321	<elision1>	<elision1>
8935	8935	<>	<elision1>
8935	8329	.	υ
8935	8335	s	υ
8935	8329	.	u
8935	8335	s	u
8935	8514	.	κ
8935	8938	s	κ
8935	8947	s	k
8935	8706	s	U
8935	8956	s	K
8935	8329	.	α
8935	8335	s	α
8935	8329	.	a
8935	8335	s	a
8935	8827	s	A
8935	8947	s	λ
8935	8947	s	l
8935	8972	s	L
8935	8980	<split-h>	<>
8936	8324	.	.
8936	8327	 	 
8936	8324	<~>	<~>
8936	8324	<split-s>	<split-s>
8936	8324	<split-h>	<split-h>
8936	8324	<name2>	<name2>
8936	8871	<aphaerese>	<aphaerese>
8936	8937	<>	<aphaerese>
8936	8324	<elision3>	<elision3>
8936	8937	<>	<elision3>
8936	8324	<elision2>	<elision2>
8936	8937	<>	<elision2>
8936	8324	<elision1>	<elision1>
8936	8937	<>	<elision1>
8936	8331	.	υ
8936	8507	s	υ
8936	8331	.	u
8936	8507	s	u
8936	8516	.	κ
8936	8940	s	κ
8936	8949	s	k
8936	8708	s	U
8936	8958	s	K
8936	8331	.	α
8936	8507	s	α
8936	8331	.	a
8936	8507	s	a
8936	8829	s	A
8936	8949	s	λ
8936	8949	s	l
8936	8974	s	L
8936	8981	<split-h>	<>
8937	8321	.	.
8937	8322	 	 
8937	8321	<~>	<~>
8937	8321	<split-s>	<split-s>
8937	8321	<split-h>	<split-h>
8937	8321	<name2>	<name2>
8937	8325	<aphaerese>	<aphaerese>
8937	8935	<>	<aphaerese>
8937	8321	<elision3>	<elision3>
8937	8935	<>	<elision3>
8937	8321	<elision2>	<elision2>
8937	8935	<>	<elision2>
8937	8321	<elision1>	<elision1>
8937	8935	<>	<elision1>
8937	8329	.	υ
8937	8335	s	υ
8937	8329	.	u
8937	8335	s	u
8937	8514	.	κ
8937	8938	s	κ
8937	8947	s	k
8937	8706	s	U
8937	8956	s	K
8937	8329	.	α
8937	8335	s	α
8937	8329	.	a
8937	8335	s	a
8937	8827	s	A
8937	8947	s	λ
8937	8947	s	l
8937	8972	s	L
8937	8979	<split-h>	<>
8938	8336	.	.
8938	8336	 	 
8938	8336	<~>	<~>
8938	8336	<split-s>	<split-s>
8938	8336	<split-h>	<split-h>
8938	8336	<name2>	<name2>
8938	8939	<>	<name>
8938	8339	<aphaerese>	<aphaerese>
8938	8938	<>	<aphaerese>
8938	8588	<elision3>	<elision3>
8938	8938	<>	<elision3>
8938	8588	<elision2>	<elision2>
8938	8938	<>	<elision2>
8938	8588	<elision1>	<elision1>
8938	8938	<>	<elision1>
8938	8500	.	υ
8938	8500	.	u
8938	8500	.	κ
8938	8500	.	α
8938	8500	.	a
8938	8500	.	λ
8938	8942	<4s>	<>
8939	8338	.	.
8939	8338	 	 
8939	8338	<~>	<~>
8939	8338	<split-s>	<split-s>
8939	8338	<split-h>	<split-h>
8939	8338	<name2>	<name2>
8939	8341	<aphaerese>	<aphaerese>
8939	8940	<>	<aphaerese>
8939	8590	<elision3>	<elision3>
8939	8940	<>	<elision3>
8939	8590	<elision2>	<elision2>
8939	8940	<>	<elision2>
8939	8590	<elision1>	<elision1>
8939	8940	<>	<elision1>
8939	8502	.	υ
8939	8502	.	u
8939	8502	.	κ
8939	8502	.	α
8939	8502	.	a
8939	8502	.	λ
8939	8943	<4s>	<>
8940	8336	.	.
8940	8336	 	 
8940	8336	<~>	<~>
8940	8336	<split-s>	<split-s>
8940	8336	<split-h>	<split-h>
8940	8336	<name2>	<name2>
8940	8339	<aphaerese>	<aphaerese>
8940	8938	<>	<aphaerese>
8940	8588	<elision3>	<elision3>
8940	8938	<>	<elision3>
8940	8588	<elision2>	<elision2>
8940	8938	<>	<elision2>
8940	8588	<elision1>	<elision1>
8940	8938	<>	<elision1>
8940	8500	.	υ
8940	8500	.	u
8940	8500	.	κ
8940	8500	.	α
8940	8500	.	a
8940	8500	.	λ
8940	8941	<4s>	<>
8941	107	.	.
8941	108	 	 
8941	107	<~>	<~>
8941	107	<split-s>	<split-s>
8941	107	<split-h>	<split-h>
8941	107	<name2>	<name2>
8941	111	<aphaerese>	<aphaerese>
8941	8942	<>	<aphaerese>
8941	8692	<elision3>	<elision3>
8941	8942	<>	<elision3>
8941	8692	<elision2>	<elision2>
8941	8942	<>	<elision2>
8941	8692	<elision1>	<elision1>
8941	8942	<>	<elision1>
8941	8110	.	υ
8941	8154	H	υ
8941	8110	.	u
8941	8156	H	u
8941	8110	.	κ
8941	8077	H	U
8941	8110	.	α
8941	8140	H	α
8941	8110	.	a
8941	8145	H	a
8941	7907	H	A
8941	8110	.	λ
8941	8945	<K>	<>
8942	107	.	.
8942	108	 	 
8942	107	<~>	<~>
8942	107	<split-s>	<split-s>
8942	107	<split-h>	<split-h>
8942	107	<name2>	<name2>
8942	8943	<>	<name>
8942	111	<aphaerese>	<aphaerese>
8942	8942	<>	<aphaerese>
8942	8692	<elision3>	<elision3>
8942	8942	<>	<elision3>
8942	8692	<elision2>	<elision2>
8942	8942	<>	<elision2>
8942	8692	<elision1>	<elision1>
8942	8942	<>	<elision1>
8942	8110	.	υ
8942	8154	H	υ
8942	8110	.	u
8942	8156	H	u
8942	8110	.	κ
8942	8077	H	U
8942	8110	.	α
8942	8140	H	α
8942	8110	.	a
8942	8145	H	a
8942	7907	H	A
8942	8110	.	λ
8942	8946	<K>	<>
8943	106	.	.
8943	110	 	 
8943	106	<~>	<~>
8943	106	<split-s>	<split-s>
8943	106	<split-h>	<split-h>
8943	106	<name2>	<name2>
8943	113	<aphaerese>	<aphaerese>
8943	8941	<>	<aphaerese>
8943	8691	<elision3>	<elision3>
8943	8941	<>	<elision3>
8943	8691	<elision2>	<elision2>
8943	8941	<>	<elision2>
8943	8691	<elision1>	<elision1>
8943	8941	<>	<elision1>
8943	8112	.	υ
8943	8149	H	υ
8943	8112	.	u
8943	8153	H	u
8943	8112	.	κ
8943	8079	H	U
8943	8112	.	α
8943	8139	H	α
8943	8112	.	a
8943	8144	H	a
8943	7910	H	A
8943	8112	.	λ
8943	8944	<K>	<>
8944	8162	.	.
8944	8162	<~>	<~>
8944	8162	<split-s>	<split-s>
8944	8162	<split-h>	<split-h>
8944	8162	<name2>	<name2>
8944	8165	<aphaerese>	<aphaerese>
8944	8945	<>	<aphaerese>
8944	8640	<elision3>	<elision3>
8944	8945	<>	<elision3>
8944	8640	<elision2>	<elision2>
8944	8945	<>	<elision2>
8944	8640	<elision1>	<elision1>
8944	8945	<>	<elision1>
8944	8158	.	υ
8944	8304	H	υ
8944	8158	.	u
8944	8313	H	u
8944	8158	.	κ
8944	8282	H	U
8944	8158	.	α
8944	8316	H	α
8944	8158	.	a
8944	8319	H	a
8944	8253	H	A
8944	8158	.	λ
8945	8160	.	.
8945	8160	<~>	<~>
8945	8160	<split-s>	<split-s>
8945	8160	<split-h>	<split-h>
8945	8160	<name2>	<name2>
8945	8163	<aphaerese>	<aphaerese>
8945	8946	<>	<aphaerese>
8945	8641	<elision3>	<elision3>
8945	8946	<>	<elision3>
8945	8641	<elision2>	<elision2>
8945	8946	<>	<elision2>
8945	8641	<elision1>	<elision1>
8945	8946	<>	<elision1>
8945	8159	.	υ
8945	8302	H	υ
8945	8159	.	u
8945	8311	H	u
8945	8159	.	κ
8945	8280	H	U
8945	8159	.	α
8945	8314	H	α
8945	8159	.	a
8945	8317	H	a
8945	8251	H	A
8945	8159	.	λ
8946	8160	.	.
8946	8160	<~>	<~>
8946	8160	<split-s>	<split-s>
8946	8160	<split-h>	<split-h>
8946	8160	<name2>	<name2>
8946	8944	<>	<name>
8946	8163	<aphaerese>	<aphaerese>
8946	8946	<>	<aphaerese>
8946	8641	<elision3>	<elision3>
8946	8946	<>	<elision3>
8946	8641	<elision2>	<elision2>
8946	8946	<>	<elision2>
8946	8641	<elision1>	<elision1>
8946	8946	<>	<elision1>
8946	8159	.	υ
8946	8302	H	υ
8946	8159	.	u
8946	8311	H	u
8946	8159	.	κ
8946	8280	H	U
8946	8159	.	α
8946	8314	H	α
8946	8159	.	a
8946	8317	H	a
8946	8251	H	A
8946	8159	.	λ
8947	8336	.	.
8947	8336	 	 
8947	8336	<~>	<~>
8947	8336	<split-s>	<split-s>
8947	8336	<split-h>	<split-h>
8947	8336	<name2>	<name2>
8947	8948	<>	<name>
8947	8339	<aphaerese>	<aphaerese>
8947	8947	<>	<aphaerese>
8947	8336	<elision3>	<elision3>
8947	8947	<>	<elision3>
8947	8336	<elision2>	<elision2>
8947	8947	<>	<elision2>
8947	8336	<elision1>	<elision1>
8947	8947	<>	<elision1>
8947	8500	.	υ
8947	8500	.	u
8947	8500	.	κ
8947	8500	.	α
8947	8500	.	a
8947	8500	.	λ
8947	8951	<4s>	<>
8948	8338	.	.
8948	8338	 	 
8948	8338	<~>	<~>
8948	8338	<split-s>	<split-s>
8948	8338	<split-h>	<split-h>
8948	8338	<name2>	<name2>
8948	8341	<aphaerese>	<aphaerese>
8948	8949	<>	<aphaerese>
8948	8338	<elision3>	<elision3>
8948	8949	<>	<elision3>
8948	8338	<elision2>	<elision2>
8948	8949	<>	<elision2>
8948	8338	<elision1>	<elision1>
8948	8949	<>	<elision1>
8948	8502	.	υ
8948	8502	.	u
8948	8502	.	κ
8948	8502	.	α
8948	8502	.	a
8948	8502	.	λ
8948	8952	<4s>	<>
8949	8336	.	.
8949	8336	 	 
8949	8336	<~>	<~>
8949	8336	<split-s>	<split-s>
8949	8336	<split-h>	<split-h>
8949	8336	<name2>	<name2>
8949	8339	<aphaerese>	<aphaerese>
8949	8947	<>	<aphaerese>
8949	8336	<elision3>	<elision3>
8949	8947	<>	<elision3>
8949	8336	<elision2>	<elision2>
8949	8947	<>	<elision2>
8949	8336	<elision1>	<elision1>
8949	8947	<>	<elision1>
8949	8500	.	υ
8949	8500	.	u
8949	8500	.	κ
8949	8500	.	α
8949	8500	.	a
8949	8500	.	λ
8949	8950	<4s>	<>
8950	107	.	.
8950	108	 	 
8950	107	<~>	<~>
8950	107	<split-s>	<split-s>
8950	107	<split-h>	<split-h>
8950	107	<name2>	<name2>
8950	111	<aphaerese>	<aphaerese>
8950	8951	<>	<aphaerese>
8950	107	<elision3>	<elision3>
8950	8951	<>	<elision3>
8950	107	<elision2>	<elision2>
8950	8951	<>	<elision2>
8950	107	<elision1>	<elision1>
8950	8951	<>	<elision1>
8950	8110	.	υ
8950	8154	H	υ
8950	8110	.	u
8950	8156	H	u
8950	8110	.	κ
8950	8077	H	U
8950	8110	.	α
8950	8140	H	α
8950	8110	.	a
8950	8145	H	a
8950	7907	H	A
8950	8110	.	λ
8950	8954	<K>	<>
8951	107	.	.
8951	108	 	 
8951	107	<~>	<~>
8951	107	<split-s>	<split-s>
8951	107	<split-h>	<split-h>
8951	107	<name2>	<name2>
8951	8952	<>	<name>
8951	111	<aphaerese>	<aphaerese>
8951	8951	<>	<aphaerese>
8951	107	<elision3>	<elision3>
8951	8951	<>	<elision3>
8951	107	<elision2>	<elision2>
8951	8951	<>	<elision2>
8951	107	<elision1>	<elision1>
8951	8951	<>	<elision1>
8951	8110	.	υ
8951	8154	H	υ
8951	8110	.	u
8951	8156	H	u
8951	8110	.	κ
8951	8077	H	U
8951	8110	.	α
8951	8140	H	α
8951	8110	.	a
8951	8145	H	a
8951	7907	H	A
8951	8110	.	λ
8951	8955	<K>	<>
8952	106	.	.
8952	110	 	 
8952	106	<~>	<~>
8952	106	<split-s>	<split-s>
8952	106	<split-h>	<split-h>
8952	106	<name2>	<name2>
8952	113	<aphaerese>	<aphaerese>
8952	8950	<>	<aphaerese>
8952	106	<elision3>	<elision3>
8952	8950	<>	<elision3>
8952	106	<elision2>	<elision2>
8952	8950	<>	<elision2>
8952	106	<elision1>	<elision1>
8952	8950	<>	<elision1>
8952	8112	.	υ
8952	8149	H	υ
8952	8112	.	u
8952	8153	H	u
8952	8112	.	κ
8952	8079	H	U
8952	8112	.	α
8952	8139	H	α
8952	8112	.	a
8952	8144	H	a
8952	7910	H	A
8952	8112	.	λ
8952	8953	<K>	<>
8953	8162	.	.
8953	8162	<~>	<~>
8953	8162	<split-s>	<split-s>
8953	8162	<split-h>	<split-h>
8953	8162	<name2>	<name2>
8953	8165	<aphaerese>	<aphaerese>
8953	8954	<>	<aphaerese>
8953	8162	<elision3>	<elision3>
8953	8954	<>	<elision3>
8953	8162	<elision2>	<elision2>
8953	8954	<>	<elision2>
8953	8162	<elision1>	<elision1>
8953	8954	<>	<elision1>
8953	8158	.	υ
8953	8304	H	υ
8953	8158	.	u
8953	8313	H	u
8953	8158	.	κ
8953	8282	H	U
8953	8158	.	α
8953	8316	H	α
8953	8158	.	a
8953	8319	H	a
8953	8253	H	A
8953	8158	.	λ
8954	8160	.	.
8954	8160	<~>	<~>
8954	8160	<split-s>	<split-s>
8954	8160	<split-h>	<split-h>
8954	8160	<name2>	<name2>
8954	8163	<aphaerese>	<aphaerese>
8954	8955	<>	<aphaerese>
8954	8160	<elision3>	<elision3>
8954	8955	<>	<elision3>
8954	8160	<elision2>	<elision2>
8954	8955	<>	<elision2>
8954	8160	<elision1>	<elision1>
8954	8955	<>	<elision1>
8954	8159	.	υ
8954	8302	H	υ
8954	8159	.	u
8954	8311	H	u
8954	8159	.	κ
8954	8280	H	U
8954	8159	.	α
8954	8314	H	α
8954	8159	.	a
8954	8317	H	a
8954	8251	H	A
8954	8159	.	λ
8955	8160	.	.
8955	8160	<~>	<~>
8955	8160	<split-s>	<split-s>
8955	8160	<split-h>	<split-h>
8955	8160	<name2>	<name2>
8955	8953	<>	<name>
8955	8163	<aphaerese>	<aphaerese>
8955	8955	<>	<aphaerese>
8955	8160	<elision3>	<elision3>
8955	8955	<>	<elision3>
8955	8160	<elision2>	<elision2>
8955	8955	<>	<elision2>
8955	8160	<elision1>	<elision1>
8955	8955	<>	<elision1>
8955	8159	.	υ
8955	8302	H	υ
8955	8159	.	u
8955	8311	H	u
8955	8159	.	κ
8955	8280	H	U
8955	8159	.	α
8955	8314	H	α
8955	8159	.	a
8955	8317	H	a
8955	8251	H	A
8955	8159	.	λ
8956	8710	<name>	<name>
8956	8957	<>	<name>
8956	8959	<>	<aphaerese>
8956	8959	<>	<elision3>
8956	8959	<>	<elision2>
8956	8959	<>	<elision1>
8956	8821	<4s>	<>
8956	8876	<L2kl>	<>
8956	8969	<K2kl>	<>
8957	8958	<>	<aphaerese>
8957	8958	<>	<elision3>
8957	8958	<>	<elision2>
8957	8958	<>	<elision1>
8957	8877	<L2kl>	<>
8957	8961	<K2kl>	<>
8958	8959	<>	<aphaerese>
8958	8959	<>	<elision3>
8958	8959	<>	<elision2>
8958	8959	<>	<elision1>
8958	8878	<L2kl>	<>
8958	8962	<K2kl>	<>
8959	8957	<>	<name>
8959	8959	<>	<aphaerese>
8959	8959	<>	<elision3>
8959	8959	<>	<elision2>
8959	8959	<>	<elision1>
8959	8876	<L2kl>	<>
8959	8960	<K2kl>	<>
8960	8336	.	.
8960	8336	 	 
8960	8336	<~>	<~>
8960	8336	<split-s>	<split-s>
8960	8336	<split-h>	<split-h>
8960	8336	<name2>	<name2>
8960	8961	<>	<name>
8960	8339	<aphaerese>	<aphaerese>
8960	8960	<>	<aphaerese>
8960	8336	<elision3>	<elision3>
8960	8960	<>	<elision3>
8960	8336	<elision2>	<elision2>
8960	8960	<>	<elision2>
8960	8336	<elision1>	<elision1>
8960	8960	<>	<elision1>
8960	8500	.	υ
8960	8500	.	u
8960	8500	.	α
8960	8500	.	a
8960	8964	<4s>	<>
8961	8338	.	.
8961	8338	 	 
8961	8338	<~>	<~>
8961	8338	<split-s>	<split-s>
8961	8338	<split-h>	<split-h>
8961	8338	<name2>	<name2>
8961	8341	<aphaerese>	<aphaerese>
8961	8962	<>	<aphaerese>
8961	8338	<elision3>	<elision3>
8961	8962	<>	<elision3>
8961	8338	<elision2>	<elision2>
8961	8962	<>	<elision2>
8961	8338	<elision1>	<elision1>
8961	8962	<>	<elision1>
8961	8502	.	υ
8961	8502	.	u
8961	8502	.	α
8961	8502	.	a
8961	8965	<4s>	<>
8962	8336	.	.
8962	8336	 	 
8962	8336	<~>	<~>
8962	8336	<split-s>	<split-s>
8962	8336	<split-h>	<split-h>
8962	8336	<name2>	<name2>
8962	8339	<aphaerese>	<aphaerese>
8962	8960	<>	<aphaerese>
8962	8336	<elision3>	<elision3>
8962	8960	<>	<elision3>
8962	8336	<elision2>	<elision2>
8962	8960	<>	<elision2>
8962	8336	<elision1>	<elision1>
8962	8960	<>	<elision1>
8962	8500	.	υ
8962	8500	.	u
8962	8500	.	α
8962	8500	.	a
8962	8963	<4s>	<>
8963	107	.	.
8963	108	 	 
8963	107	<~>	<~>
8963	107	<split-s>	<split-s>
8963	107	<split-h>	<split-h>
8963	107	<name2>	<name2>
8963	111	<aphaerese>	<aphaerese>
8963	8964	<>	<aphaerese>
8963	107	<elision3>	<elision3>
8963	8964	<>	<elision3>
8963	107	<elision2>	<elision2>
8963	8964	<>	<elision2>
8963	107	<elision1>	<elision1>
8963	8964	<>	<elision1>
8963	8110	.	υ
8963	8154	H	υ
8963	8110	.	u
8963	8156	H	u
8963	8077	H	U
8963	8110	.	α
8963	8140	H	α
8963	8110	.	a
8963	8145	H	a
8963	7907	H	A
8963	8967	<K>	<>
8964	107	.	.
8964	108	 	 
8964	107	<~>	<~>
8964	107	<split-s>	<split-s>
8964	107	<split-h>	<split-h>
8964	107	<name2>	<name2>
8964	8965	<>	<name>
8964	111	<aphaerese>	<aphaerese>
8964	8964	<>	<aphaerese>
8964	107	<elision3>	<elision3>
8964	8964	<>	<elision3>
8964	107	<elision2>	<elision2>
8964	8964	<>	<elision2>
8964	107	<elision1>	<elision1>
8964	8964	<>	<elision1>
8964	8110	.	υ
8964	8154	H	υ
8964	8110	.	u
8964	8156	H	u
8964	8077	H	U
8964	8110	.	α
8964	8140	H	α
8964	8110	.	a
8964	8145	H	a
8964	7907	H	A
8964	8968	<K>	<>
8965	106	.	.
8965	110	 	 
8965	106	<~>	<~>
8965	106	<split-s>	<split-s>
8965	106	<split-h>	<split-h>
8965	106	<name2>	<name2>
8965	113	<aphaerese>	<aphaerese>
8965	8963	<>	<aphaerese>
8965	106	<elision3>	<elision3>
8965	8963	<>	<elision3>
8965	106	<elision2>	<elision2>
8965	8963	<>	<elision2>
8965	106	<elision1>	<elision1>
8965	8963	<>	<elision1>
8965	8112	.	υ
8965	8149	H	υ
8965	8112	.	u
8965	8153	H	u
8965	8079	H	U
8965	8112	.	α
8965	8139	H	α
8965	8112	.	a
8965	8144	H	a
8965	7910	H	A
8965	8966	<K>	<>
8966	8162	.	.
8966	8162	<~>	<~>
8966	8162	<split-s>	<split-s>
8966	8162	<split-h>	<split-h>
8966	8162	<name2>	<name2>
8966	8165	<aphaerese>	<aphaerese>
8966	8967	<>	<aphaerese>
8966	8162	<elision3>	<elision3>
8966	8967	<>	<elision3>
8966	8162	<elision2>	<elision2>
8966	8967	<>	<elision2>
8966	8162	<elision1>	<elision1>
8966	8967	<>	<elision1>
8966	8158	.	υ
8966	8304	H	υ
8966	8158	.	u
8966	8313	H	u
8966	8282	H	U
8966	8158	.	α
8966	8316	H	α
8966	8158	.	a
8966	8319	H	a
8966	8253	H	A
8967	8160	.	.
8967	8160	<~>	<~>
8967	8160	<split-s>	<split-s>
8967	8160	<split-h>	<split-h>
8967	8160	<name2>	<name2>
8967	8163	<aphaerese>	<aphaerese>
8967	8968	<>	<aphaerese>
8967	8160	<elision3>	<elision3>
8967	8968	<>	<elision3>
8967	8160	<elision2>	<elision2>
8967	8968	<>	<elision2>
8967	8160	<elision1>	<elision1>
8967	8968	<>	<elision1>
8967	8159	.	υ
8967	8302	H	υ
8967	8159	.	u
8967	8311	H	u
8967	8280	H	U
8967	8159	.	α
8967	8314	H	α
8967	8159	.	a
8967	8317	H	a
8967	8251	H	A
8968	8160	.	.
8968	8160	<~>	<~>
8968	8160	<split-s>	<split-s>
8968	8160	<split-h>	<split-h>
8968	8160	<name2>	<name2>
8968	8966	<>	<name>
8968	8163	<aphaerese>	<aphaerese>
8968	8968	<>	<aphaerese>
8968	8160	<elision3>	<elision3>
8968	8968	<>	<elision3>
8968	8160	<elision2>	<elision2>
8968	8968	<>	<elision2>
8968	8160	<elision1>	<elision1>
8968	8968	<>	<elision1>
8968	8159	.	υ
8968	8302	H	υ
8968	8159	.	u
8968	8311	H	u
8968	8280	H	U
8968	8159	.	α
8968	8314	H	α
8968	8159	.	a
8968	8317	H	a
8968	8251	H	A
8969	8336	.	.
8969	8336	 	 
8969	8336	<~>	<~>
8969	8336	<split-s>	<split-s>
8969	8336	<split-h>	<split-h>
8969	8336	<name2>	<name2>
8969	8710	<name2>	<name>
8969	8961	<>	<name>
8969	8339	<aphaerese>	<aphaerese>
8969	8960	<>	<aphaerese>
8969	8336	<elision3>	<elision3>
8969	8960	<>	<elision3>
8969	8336	<elision2>	<elision2>
8969	8960	<>	<elision2>
8969	8336	<elision1>	<elision1>
8969	8960	<>	<elision1>
8969	8500	.	υ
8969	8500	.	u
8969	8500	.	α
8969	8500	.	a
8969	8970	<4s>	<>
8970	107	.	.
8970	108	 	 
8970	107	<~>	<~>
8970	107	<split-s>	<split-s>
8970	107	<split-h>	<split-h>
8970	107	<name2>	<name2>
8970	8822	<name2>	<name>
8970	8965	<>	<name>
8970	111	<aphaerese>	<aphaerese>
8970	8964	<>	<aphaerese>
8970	107	<elision3>	<elision3>
8970	8964	<>	<elision3>
8970	107	<elision2>	<elision2>
8970	8964	<>	<elision2>
8970	107	<elision1>	<elision1>
8970	8964	<>	<elision1>
8970	8110	.	υ
8970	8154	H	υ
8970	8110	.	u
8970	8156	H	u
8970	8077	H	U
8970	8110	.	α
8970	8140	H	α
8970	8110	.	a
8970	8145	H	a
8970	7907	H	A
8970	8971	<K>	<>
8971	8160	.	.
8971	8160	<~>	<~>
8971	8160	<split-s>	<split-s>
8971	8160	<split-h>	<split-h>
8971	8160	<name2>	<name2>
8971	8712	<name2>	<name>
8971	8966	<>	<name>
8971	8163	<aphaerese>	<aphaerese>
8971	8968	<>	<aphaerese>
8971	8160	<elision3>	<elision3>
8971	8968	<>	<elision3>
8971	8160	<elision2>	<elision2>
8971	8968	<>	<elision2>
8971	8160	<elision1>	<elision1>
8971	8968	<>	<elision1>
8971	8159	.	υ
8971	8302	H	υ
8971	8159	.	u
8971	8311	H	u
8971	8280	H	U
8971	8159	.	α
8971	8314	H	α
8971	8159	.	a
8971	8317	H	a
8971	8251	H	A
8972	8710	<name>	<name>
8972	8973	<>	<name>
8972	8975	<>	<aphaerese>
8972	8975	<>	<elision3>
8972	8975	<>	<elision2>
8972	8975	<>	<elision1>
8972	8821	<4s>	<>
8972	8976	<L2kl>	<>
8973	8974	<>	<aphaerese>
8973	8974	<>	<elision3>
8973	8974	<>	<elision2>
8973	8974	<>	<elision1>
8973	8948	<L2kl>	<>
8974	8975	<>	<aphaerese>
8974	8975	<>	<elision3>
8974	8975	<>	<elision2>
8974	8975	<>	<elision1>
8974	8949	<L2kl>	<>
8975	8973	<>	<name>
8975	8975	<>	<aphaerese>
8975	8975	<>	<elision3>
8975	8975	<>	<elision2>
8975	8975	<>	<elision1>
8975	8947	<L2kl>	<>
8976	8336	.	.
8976	8336	 	 
8976	8336	<~>	<~>
8976	8336	<split-s>	<split-s>
8976	8336	<split-h>	<split-h>
8976	8336	<name2>	<name2>
8976	8710	<name2>	<name>
8976	8948	<>	<name>
8976	8339	<aphaerese>	<aphaerese>
8976	8947	<>	<aphaerese>
8976	8336	<elision3>	<elision3>
8976	8947	<>	<elision3>
8976	8336	<elision2>	<elision2>
8976	8947	<>	<elision2>
8976	8336	<elision1>	<elision1>
8976	8947	<>	<elision1>
8976	8500	.	υ
8976	8500	.	u
8976	8500	.	κ
8976	8500	.	α
8976	8500	.	a
8976	8500	.	λ
8976	8977	<4s>	<>
8977	107	.	.
8977	108	 	 
8977	107	<~>	<~>
8977	107	<split-s>	<split-s>
8977	107	<split-h>	<split-h>
8977	107	<name2>	<name2>
8977	8822	<name2>	<name>
8977	8952	<>	<name>
8977	111	<aphaerese>	<aphaerese>
8977	8951	<>	<aphaerese>
8977	107	<elision3>	<elision3>
8977	8951	<>	<elision3>
8977	107	<elision2>	<elision2>
8977	8951	<>	<elision2>
8977	107	<elision1>	<elision1>
8977	8951	<>	<elision1>
8977	8110	.	υ
8977	8154	H	υ
8977	8110	.	u
8977	8156	H	u
8977	8110	.	κ
8977	8077	H	U
8977	8110	.	α
8977	8140	H	α
8977	8110	.	a
8977	8145	H	a
8977	7907	H	A
8977	8110	.	λ
8977	8978	<K>	<>
8978	8160	.	.
8978	8160	<~>	<~>
8978	8160	<split-s>	<split-s>
8978	8160	<split-h>	<split-h>
8978	8160	<name2>	<name2>
8978	8712	<name2>	<name>
8978	8953	<>	<name>
8978	8163	<aphaerese>	<aphaerese>
8978	8955	<>	<aphaerese>
8978	8160	<elision3>	<elision3>
8978	8955	<>	<elision3>
8978	8160	<elision2>	<elision2>
8978	8955	<>	<elision2>
8978	8160	<elision1>	<elision1>
8978	8955	<>	<elision1>
8978	8159	.	υ
8978	8302	H	υ
8978	8159	.	u
8978	8311	H	u
8978	8159	.	κ
8978	8280	H	U
8978	8159	.	α
8978	8314	H	α
8978	8159	.	a
8978	8317	H	a
8978	8251	H	A
8978	8159	.	λ
8979	8980	<>	<aphaerese>
8979	8980	<>	<elision3>
8979	8980	<>	<elision2>
8979	8980	<>	<elision1>
8979	8591	<3s>	<>
8980	8981	<>	<name>
8980	8980	<>	<aphaerese>
8980	8980	<>	<elision3>
8980	8980	<>	<elision2>
8980	8980	<>	<elision1>
8980	8592	<3s>	<>
8981	8979	<>	<aphaerese>
8981	8979	<>	<elision3>
8981	8979	<>	<elision2>
8981	8979	<>	<elision1>
8981	8593	<3s>	<>
8982	8983	<>	<aphaerese>
8982	8983	<>	<elision3>
8982	8983	<>	<elision2>
8982	8983	<>	<elision1>
8982	8688	<3s>	<>
8983	8984	<>	<name>
8983	8983	<>	<aphaerese>
8983	8983	<>	<elision3>
8983	8983	<>	<elision2>
8983	8983	<>	<elision1>
8983	8689	<3s>	<>
8984	8982	<>	<aphaerese>
8984	8982	<>	<elision3>
8984	8982	<>	<elision2>
8984	8982	<>	<elision1>
8984	8690	<3s>	<>
8985	8321	.	.
8985	8322	 	 
8985	8321	<~>	<~>
8985	8321	<split-s>	<split-s>
8985	8321	<split-h>	<split-h>
8985	8321	<name2>	<name2>
8985	8986	<>	<name>
8985	8325	<aphaerese>	<aphaerese>
8985	8985	<>	<aphaerese>
8985	8321	<elision3>	<elision3>
8985	8985	<>	<elision3>
8985	8321	<elision2>	<elision2>
8985	8985	<>	<elision2>
8985	8321	<elision1>	<elision1>
8985	8985	<>	<elision1>
8985	8329	.	υ
8985	8335	s	υ
8985	8329	.	u
8985	8335	s	u
8985	8988	.	κ
8985	8911	s	κ
8985	8697	s	k
8985	8706	s	U
8985	8872	s	K
8985	8329	.	α
8985	8335	s	α
8985	8329	.	a
8985	8335	s	a
8985	8827	s	A
8985	8988	.	λ
8985	8911	s	λ
8985	8697	s	l
8985	8885	s	L
8985	9004	<split-h>	<>
8986	8324	.	.
8986	8327	 	 
8986	8324	<~>	<~>
8986	8324	<split-s>	<split-s>
8986	8324	<split-h>	<split-h>
8986	8324	<name2>	<name2>
8986	8871	<aphaerese>	<aphaerese>
8986	8987	<>	<aphaerese>
8986	8324	<elision3>	<elision3>
8986	8987	<>	<elision3>
8986	8324	<elision2>	<elision2>
8986	8987	<>	<elision2>
8986	8324	<elision1>	<elision1>
8986	8987	<>	<elision1>
8986	8331	.	υ
8986	8507	s	υ
8986	8331	.	u
8986	8507	s	u
8986	8990	.	κ
8986	8913	s	κ
8986	8699	s	k
8986	8708	s	U
8986	8874	s	K
8986	8331	.	α
8986	8507	s	α
8986	8331	.	a
8986	8507	s	a
8986	8829	s	A
8986	8990	.	λ
8986	8913	s	λ
8986	8699	s	l
8986	8887	s	L
8986	9005	<split-h>	<>
8987	8321	.	.
8987	8322	 	 
8987	8321	<~>	<~>
8987	8321	<split-s>	<split-s>
8987	8321	<split-h>	<split-h>
8987	8321	<name2>	<name2>
8987	8325	<aphaerese>	<aphaerese>
8987	8985	<>	<aphaerese>
8987	8321	<elision3>	<elision3>
8987	8985	<>	<elision3>
8987	8321	<elision2>	<elision2>
8987	8985	<>	<elision2>
8987	8321	<elision1>	<elision1>
8987	8985	<>	<elision1>
8987	8329	.	υ
8987	8335	s	υ
8987	8329	.	u
8987	8335	s	u
8987	8988	.	κ
8987	8911	s	κ
8987	8697	s	k
8987	8706	s	U
8987	8872	s	K
8987	8329	.	α
8987	8335	s	α
8987	8329	.	a
8987	8335	s	a
8987	8827	s	A
8987	8988	.	λ
8987	8911	s	λ
8987	8697	s	l
8987	8885	s	L
8987	9003	<split-h>	<>
8988	8989	<>	<name>
8988	8988	<>	<aphaerese>
8988	8991	<elision3>	<elision3>
8988	8988	<>	<elision3>
8988	8991	<elision2>	<elision2>
8988	8988	<>	<elision2>
8988	8991	<elision1>	<elision1>
8988	8988	<>	<elision1>
8988	8333	<split-h>	<>
8989	8990	<>	<aphaerese>
8989	8993	<elision3>	<elision3>
8989	8990	<>	<elision3>
8989	8993	<elision2>	<elision2>
8989	8990	<>	<elision2>
8989	8993	<elision1>	<elision1>
8989	8990	<>	<elision1>
8989	8334	<split-h>	<>
8990	8988	<>	<aphaerese>
8990	8991	<elision3>	<elision3>
8990	8988	<>	<elision3>
8990	8991	<elision2>	<elision2>
8990	8988	<>	<elision2>
8990	8991	<elision1>	<elision1>
8990	8988	<>	<elision1>
8990	8332	<split-h>	<>
8991	8991	.	.
8991	8991	 	 
8991	8991	<~>	<~>
8991	8991	<split-s>	<split-s>
8991	8991	<split-h>	<split-h>
8991	8991	<name2>	<name2>
8991	8992	<>	<name>
8991	8994	<aphaerese>	<aphaerese>
8991	8991	<>	<aphaerese>
8991	8991	<elision3>	<elision3>
8991	8991	<>	<elision3>
8991	8991	<elision2>	<elision2>
8991	8991	<>	<elision2>
8991	8991	<elision1>	<elision1>
8991	8991	<>	<elision1>
8991	8988	.	υ
8991	8988	.	u
8991	8997	.	κ
8991	8988	.	α
8991	8988	.	a
8991	8846	<split-h>	<>
8992	8993	.	.
8992	8993	 	 
8992	8993	<~>	<~>
8992	8993	<split-s>	<split-s>
8992	8993	<split-h>	<split-h>
8992	8993	<name2>	<name2>
8992	8996	<aphaerese>	<aphaerese>
8992	8993	<>	<aphaerese>
8992	8993	<elision3>	<elision3>
8992	8993	<>	<elision3>
8992	8993	<elision2>	<elision2>
8992	8993	<>	<elision2>
8992	8993	<elision1>	<elision1>
8992	8993	<>	<elision1>
8992	8990	.	υ
8992	8990	.	u
8992	8999	.	κ
8992	8990	.	α
8992	8990	.	a
8992	8847	<split-h>	<>
8993	8991	.	.
8993	8991	 	 
8993	8991	<~>	<~>
8993	8991	<split-s>	<split-s>
8993	8991	<split-h>	<split-h>
8993	8991	<name2>	<name2>
8993	8994	<aphaerese>	<aphaerese>
8993	8991	<>	<aphaerese>
8993	8991	<elision3>	<elision3>
8993	8991	<>	<elision3>
8993	8991	<elision2>	<elision2>
8993	8991	<>	<elision2>
8993	8991	<elision1>	<elision1>
8993	8991	<>	<elision1>
8993	8988	.	υ
8993	8988	.	u
8993	8997	.	κ
8993	8988	.	α
8993	8988	.	a
8993	8848	<split-h>	<>
8994	8991	.	.
8994	8991	 	 
8994	8991	<~>	<~>
8994	8991	<split-s>	<split-s>
8994	8991	<split-h>	<split-h>
8994	8991	<name2>	<name2>
8994	8995	<>	<name>
8994	8994	<aphaerese>	<aphaerese>
8994	8994	<>	<aphaerese>
8994	8991	<elision3>	<elision3>
8994	8994	<>	<elision3>
8994	8991	<elision2>	<elision2>
8994	8994	<>	<elision2>
8994	8991	<elision1>	<elision1>
8994	8994	<>	<elision1>
8994	8991	.	υ
8994	8991	.	u
8994	8997	.	κ
8994	8991	.	α
8994	8991	.	a
8994	8893	<split-h>	<>
8995	8993	.	.
8995	8993	 	 
8995	8993	<~>	<~>
8995	8993	<split-s>	<split-s>
8995	8993	<split-h>	<split-h>
8995	8993	<name2>	<name2>
8995	8996	<aphaerese>	<aphaerese>
8995	8996	<>	<aphaerese>
8995	8993	<elision3>	<elision3>
8995	8996	<>	<elision3>
8995	8993	<elision2>	<elision2>
8995	8996	<>	<elision2>
8995	8993	<elision1>	<elision1>
8995	8996	<>	<elision1>
8995	8993	.	υ
8995	8993	.	u
8995	8999	.	κ
8995	8993	.	α
8995	8993	.	a
8995	8894	<split-h>	<>
8996	8991	.	.
8996	8991	 	 
8996	8991	<~>	<~>
8996	8991	<split-s>	<split-s>
8996	8991	<split-h>	<split-h>
8996	8991	<name2>	<name2>
8996	8994	<aphaerese>	<aphaerese>
8996	8994	<>	<aphaerese>
8996	8991	<elision3>	<elision3>
8996	8994	<>	<elision3>
8996	8991	<elision2>	<elision2>
8996	8994	<>	<elision2>
8996	8991	<elision1>	<elision1>
8996	8994	<>	<elision1>
8996	8991	.	υ
8996	8991	.	u
8996	8997	.	κ
8996	8991	.	α
8996	8991	.	a
8996	8892	<split-h>	<>
8997	8998	<>	<name>
8997	8997	<>	<aphaerese>
8997	9000	<elision3>	<elision3>
8997	8997	<>	<elision3>
8997	9000	<elision2>	<elision2>
8997	8997	<>	<elision2>
8997	9000	<elision1>	<elision1>
8997	8997	<>	<elision1>
8997	8583	<split-h>	<>
8998	8999	<>	<aphaerese>
8998	9002	<elision3>	<elision3>
8998	8999	<>	<elision3>
8998	9002	<elision2>	<elision2>
8998	8999	<>	<elision2>
8998	9002	<elision1>	<elision1>
8998	8999	<>	<elision1>
8998	8584	<split-h>	<>
8999	8997	<>	<aphaerese>
8999	9000	<elision3>	<elision3>
8999	8997	<>	<elision3>
8999	9000	<elision2>	<elision2>
8999	8997	<>	<elision2>
8999	9000	<elision1>	<elision1>
8999	8997	<>	<elision1>
8999	8582	<split-h>	<>
9000	9001	<>	<name>
9000	9000	<>	<aphaerese>
9000	9000	<>	<elision3>
9000	9000	<>	<elision2>
9000	9000	<>	<elision1>
9000	8580	<split-h>	<>
9001	9002	<>	<aphaerese>
9001	9002	<>	<elision3>
9001	9002	<>	<elision2>
9001	9002	<>	<elision1>
9001	8581	<split-h>	<>
9002	9000	<>	<aphaerese>
9002	9000	<>	<elision3>
9002	9000	<>	<elision2>
9002	9000	<>	<elision1>
9002	8579	<split-h>	<>
9003	9004	<>	<aphaerese>
9003	9004	<>	<elision3>
9003	9004	<>	<elision2>
9003	9004	<>	<elision1>
9003	8700	<3s>	<>
9004	9005	<>	<name>
9004	9004	<>	<aphaerese>
9004	9004	<>	<elision3>
9004	9004	<>	<elision2>
9004	9004	<>	<elision1>
9004	8701	<3s>	<>
9005	9003	<>	<aphaerese>
9005	9003	<>	<elision3>
9005	9003	<>	<elision2>
9005	9003	<>	<elision1>
9005	8702	<3s>	<>
9006	9007	<>	<name>
9006	9006	<>	<aphaerese>
9006	9006	<>	<elision3>
9006	9006	<>	<elision2>
9006	9006	<>	<elision1>
9006	8991	<U2kl>	<>
9007	9008	<>	<aphaerese>
9007	9008	<>	<elision3>
9007	9008	<>	<elision2>
9007	9008	<>	<elision1>
9007	8992	<U2kl>	<>
9008	9006	<>	<aphaerese>
9008	9006	<>	<elision3>
9008	9006	<>	<elision2>
9008	9006	<>	<elision1>
9008	8993	<U2kl>	<>
9009	9010	<name>	<name>
9009	9012	<>	<name>
9009	9014	<>	<aphaerese>
9009	9014	<>	<elision3>
9009	9014	<>	<elision2>
9009	9014	<>	<elision1>
9009	9057	<split-h>	<>
9009	9015	<A2kl>	<>
9009	9033	<L2kl>	<>
9009	9058	<K2kl>	<>
9010	8874	s	k
9010	8887	s	l
9010	9011	<split-h>	<>
9011	8711	<3s>	<>
9012	9013	<>	<aphaerese>
9012	9013	<>	<elision3>
9012	9013	<>	<elision2>
9012	9013	<>	<elision1>
9012	9016	<A2kl>	<>
9012	9034	<L2kl>	<>
9012	9052	<K2kl>	<>
9013	9014	<>	<aphaerese>
9013	9014	<>	<elision3>
9013	9014	<>	<elision2>
9013	9014	<>	<elision1>
9013	9017	<A2kl>	<>
9013	9035	<L2kl>	<>
9013	9053	<K2kl>	<>
9014	9012	<>	<name>
9014	9014	<>	<aphaerese>
9014	9014	<>	<elision3>
9014	9014	<>	<elision2>
9014	9014	<>	<elision1>
9014	9015	<A2kl>	<>
9014	9033	<L2kl>	<>
9014	9051	<K2kl>	<>
9015	9016	<>	<name>
9015	9015	<>	<aphaerese>
9015	9015	<>	<elision3>
9015	9015	<>	<elision2>
9015	9015	<>	<elision1>
9015	9018	.	κ
9015	9018	.	λ
9015	9031	<split-h>	<>
9016	9017	<>	<aphaerese>
9016	9017	<>	<elision3>
9016	9017	<>	<elision2>
9016	9017	<>	<elision1>
9016	9020	.	κ
9016	9020	.	λ
9016	9032	<split-h>	<>
9017	9015	<>	<aphaerese>
9017	9015	<>	<elision3>
9017	9015	<>	<elision2>
9017	9015	<>	<elision1>
9017	9018	.	κ
9017	9018	.	λ
9017	9030	<split-h>	<>
9018	9019	<>	<name>
9018	9018	<>	<aphaerese>
9018	9021	<elision3>	<elision3>
9018	9018	<>	<elision3>
9018	9021	<elision2>	<elision2>
9018	9018	<>	<elision2>
9018	9021	<elision1>	<elision1>
9018	9018	<>	<elision1>
9018	9028	<split-h>	<>
9019	9020	<>	<aphaerese>
9019	9023	<elision3>	<elision3>
9019	9020	<>	<elision3>
9019	9023	<elision2>	<elision2>
9019	9020	<>	<elision2>
9019	9023	<elision1>	<elision1>
9019	9020	<>	<elision1>
9019	9029	<split-h>	<>
9020	9018	<>	<aphaerese>
9020	9021	<elision3>	<elision3>
9020	9018	<>	<elision3>
9020	9021	<elision2>	<elision2>
9020	9018	<>	<elision2>
9020	9021	<elision1>	<elision1>
9020	9018	<>	<elision1>
9020	9027	<split-h>	<>
9021	8991	.	.
9021	8991	 	 
9021	8991	<~>	<~>
9021	8991	<split-s>	<split-s>
9021	8991	<split-h>	<split-h>
9021	8991	<name2>	<name2>
9021	9022	<>	<name>
9021	8994	<aphaerese>	<aphaerese>
9021	9021	<>	<aphaerese>
9021	8991	<elision3>	<elision3>
9021	9021	<>	<elision3>
9021	8991	<elision2>	<elision2>
9021	9021	<>	<elision2>
9021	8991	<elision1>	<elision1>
9021	9021	<>	<elision1>
9021	8988	.	υ
9021	8988	.	u
9021	8988	.	α
9021	8988	.	a
9021	9025	<split-h>	<>
9022	8993	.	.
9022	8993	 	 
9022	8993	<~>	<~>
9022	8993	<split-s>	<split-s>
9022	8993	<split-h>	<split-h>
9022	8993	<name2>	<name2>
9022	8996	<aphaerese>	<aphaerese>
9022	9023	<>	<aphaerese>
9022	8993	<elision3>	<elision3>
9022	9023	<>	<elision3>
9022	8993	<elision2>	<elision2>
9022	9023	<>	<elision2>
9022	8993	<elision1>	<elision1>
9022	9023	<>	<elision1>
9022	8990	.	υ
9022	8990	.	u
9022	8990	.	α
9022	8990	.	a
9022	9026	<split-h>	<>
9023	8991	.	.
9023	8991	 	 
9023	8991	<~>	<~>
9023	8991	<split-s>	<split-s>
9023	8991	<split-h>	<split-h>
9023	8991	<name2>	<name2>
9023	8994	<aphaerese>	<aphaerese>
9023	9021	<>	<aphaerese>
9023	8991	<elision3>	<elision3>
9023	9021	<>	<elision3>
9023	8991	<elision2>	<elision2>
9023	9021	<>	<elision2>
9023	8991	<elision1>	<elision1>
9023	9021	<>	<elision1>
9023	8988	.	υ
9023	8988	.	u
9023	8988	.	α
9023	8988	.	a
9023	9024	<split-h>	<>
9024	9025	<>	<aphaerese>
9024	9025	<>	<elision3>
9024	9025	<>	<elision2>
9024	9025	<>	<elision1>
9024	8725	<3s>	<>
9025	9026	<>	<name>
9025	9025	<>	<aphaerese>
9025	9025	<>	<elision3>
9025	9025	<>	<elision2>
9025	9025	<>	<elision1>
9025	8726	<3s>	<>
9026	9024	<>	<aphaerese>
9026	9024	<>	<elision3>
9026	9024	<>	<elision2>
9026	9024	<>	<elision1>
9026	8727	<3s>	<>
9027	9028	<>	<aphaerese>
9027	9028	<>	<elision3>
9027	9028	<>	<elision2>
9027	9028	<>	<elision1>
9027	8761	<3s>	<>
9028	9029	<>	<name>
9028	9028	<>	<aphaerese>
9028	9028	<>	<elision3>
9028	9028	<>	<elision2>
9028	9028	<>	<elision1>
9028	8762	<3s>	<>
9029	9027	<>	<aphaerese>
9029	9027	<>	<elision3>
9029	9027	<>	<elision2>
9029	9027	<>	<elision1>
9029	8763	<3s>	<>
9030	9031	<>	<aphaerese>
9030	9031	<>	<elision3>
9030	9031	<>	<elision2>
9030	9031	<>	<elision1>
9030	8770	<3s>	<>
9031	9032	<>	<name>
9031	9031	<>	<aphaerese>
9031	9031	<>	<elision3>
9031	9031	<>	<elision2>
9031	9031	<>	<elision1>
9031	8771	<3s>	<>
9032	9030	<>	<aphaerese>
9032	9030	<>	<elision3>
9032	9030	<>	<elision2>
9032	9030	<>	<elision1>
9032	8772	<3s>	<>
9033	9034	<>	<name>
9033	9033	<>	<aphaerese>
9033	9033	<>	<elision3>
9033	9033	<>	<elision2>
9033	9033	<>	<elision1>
9033	9036	.	κ
9033	9036	.	λ
9033	9049	<split-h>	<>
9034	9035	<>	<aphaerese>
9034	9035	<>	<elision3>
9034	9035	<>	<elision2>
9034	9035	<>	<elision1>
9034	9038	.	κ
9034	9038	.	λ
9034	9050	<split-h>	<>
9035	9033	<>	<aphaerese>
9035	9033	<>	<elision3>
9035	9033	<>	<elision2>
9035	9033	<>	<elision1>
9035	9036	.	κ
9035	9036	.	λ
9035	9048	<split-h>	<>
9036	9037	<>	<name>
9036	9036	<>	<aphaerese>
9036	9039	<elision3>	<elision3>
9036	9036	<>	<elision3>
9036	9039	<elision2>	<elision2>
9036	9036	<>	<elision2>
9036	9039	<elision1>	<elision1>
9036	9036	<>	<elision1>
9036	9046	<split-h>	<>
9037	9038	<>	<aphaerese>
9037	9041	<elision3>	<elision3>
9037	9038	<>	<elision3>
9037	9041	<elision2>	<elision2>
9037	9038	<>	<elision2>
9037	9041	<elision1>	<elision1>
9037	9038	<>	<elision1>
9037	9047	<split-h>	<>
9038	9036	<>	<aphaerese>
9038	9039	<elision3>	<elision3>
9038	9036	<>	<elision3>
9038	9039	<elision2>	<elision2>
9038	9036	<>	<elision2>
9038	9039	<elision1>	<elision1>
9038	9036	<>	<elision1>
9038	9045	<split-h>	<>
9039	9040	<>	<name>
9039	9039	<>	<aphaerese>
9039	9039	<>	<elision3>
9039	9039	<>	<elision2>
9039	9039	<>	<elision1>
9039	8997	.	κ
9039	9043	<split-h>	<>
9040	9041	<>	<aphaerese>
9040	9041	<>	<elision3>
9040	9041	<>	<elision2>
9040	9041	<>	<elision1>
9040	8999	.	κ
9040	9044	<split-h>	<>
9041	9039	<>	<aphaerese>
9041	9039	<>	<elision3>
9041	9039	<>	<elision2>
9041	9039	<>	<elision1>
9041	8997	.	κ
9041	9042	<split-h>	<>
9042	9043	<>	<aphaerese>
9042	9043	<>	<elision3>
9042	9043	<>	<elision2>
9042	9043	<>	<elision1>
9042	8788	<3s>	<>
9043	9044	<>	<name>
9043	9043	<>	<aphaerese>
9043	9043	<>	<elision3>
9043	9043	<>	<elision2>
9043	9043	<>	<elision1>
9043	8789	<3s>	<>
9044	9042	<>	<aphaerese>
9044	9042	<>	<elision3>
9044	9042	<>	<elision2>
9044	9042	<>	<elision1>
9044	8790	<3s>	<>
9045	9046	<>	<aphaerese>
9045	9046	<>	<elision3>
9045	9046	<>	<elision2>
9045	9046	<>	<elision1>
9045	8794	<3s>	<>
9046	9047	<>	<name>
9046	9046	<>	<aphaerese>
9046	9046	<>	<elision3>
9046	9046	<>	<elision2>
9046	9046	<>	<elision1>
9046	8795	<3s>	<>
9047	9045	<>	<aphaerese>
9047	9045	<>	<elision3>
9047	9045	<>	<elision2>
9047	9045	<>	<elision1>
9047	8796	<3s>	<>
9048	9049	<>	<aphaerese>
9048	9049	<>	<elision3>
9048	9049	<>	<elision2>
9048	9049	<>	<elision1>
9048	8803	<3s>	<>
9049	9050	<>	<name>
9049	9049	<>	<aphaerese>
9049	9049	<>	<elision3>
9049	9049	<>	<elision2>
9049	9049	<>	<elision1>
9049	8804	<3s>	<>
9050	9048	<>	<aphaerese>
9050	9048	<>	<elision3>
9050	9048	<>	<elision2>
9050	9048	<>	<elision1>
9050	8805	<3s>	<>
9051	8991	.	.
9051	8991	 	 
9051	8991	<~>	<~>
9051	8991	<split-s>	<split-s>
9051	8991	<split-h>	<split-h>
9051	8991	<name2>	<name2>
9051	9052	<>	<name>
9051	8994	<aphaerese>	<aphaerese>
9051	9051	<>	<aphaerese>
9051	8991	<elision3>	<elision3>
9051	9051	<>	<elision3>
9051	8991	<elision2>	<elision2>
9051	9051	<>	<elision2>
9051	8991	<elision1>	<elision1>
9051	9051	<>	<elision1>
9051	8988	.	υ
9051	8988	.	u
9051	8988	.	α
9051	8988	.	a
9051	9055	<split-h>	<>
9052	8993	.	.
9052	8993	 	 
9052	8993	<~>	<~>
9052	8993	<split-s>	<split-s>
9052	8993	<split-h>	<split-h>
9052	8993	<name2>	<name2>
9052	8996	<aphaerese>	<aphaerese>
9052	9053	<>	<aphaerese>
9052	8993	<elision3>	<elision3>
9052	9053	<>	<elision3>
9052	8993	<elision2>	<elision2>
9052	9053	<>	<elision2>
9052	8993	<elision1>	<elision1>
9052	9053	<>	<elision1>
9052	8990	.	υ
9052	8990	.	u
9052	8990	.	α
9052	8990	.	a
9052	9056	<split-h>	<>
9053	8991	.	.
9053	8991	 	 
9053	8991	<~>	<~>
9053	8991	<split-s>	<split-s>
9053	8991	<split-h>	<split-h>
9053	8991	<name2>	<name2>
9053	8994	<aphaerese>	<aphaerese>
9053	9051	<>	<aphaerese>
9053	8991	<elision3>	<elision3>
9053	9051	<>	<elision3>
9053	8991	<elision2>	<elision2>
9053	9051	<>	<elision2>
9053	8991	<elision1>	<elision1>
9053	9051	<>	<elision1>
9053	8988	.	υ
9053	8988	.	u
9053	8988	.	α
9053	8988	.	a
9053	9054	<split-h>	<>
9054	9055	<>	<aphaerese>
9054	9055	<>	<elision3>
9054	9055	<>	<elision2>
9054	9055	<>	<elision1>
9054	8815	<3s>	<>
9055	9056	<>	<name>
9055	9055	<>	<aphaerese>
9055	9055	<>	<elision3>
9055	9055	<>	<elision2>
9055	9055	<>	<elision1>
9055	8816	<3s>	<>
9056	9054	<>	<aphaerese>
9056	9054	<>	<elision3>
9056	9054	<>	<elision2>
9056	9054	<>	<elision1>
9056	8817	<3s>	<>
9057	8821	<3s>	<>
9058	8991	.	.
9058	8991	 	 
9058	8991	<~>	<~>
9058	8991	<split-s>	<split-s>
9058	8991	<split-h>	<split-h>
9058	8991	<name2>	<name2>
9058	9059	<name2>	<name>
9058	9052	<>	<name>
9058	8994	<aphaerese>	<aphaerese>
9058	9051	<>	<aphaerese>
9058	8991	<elision3>	<elision3>
9058	9051	<>	<elision3>
9058	8991	<elision2>	<elision2>
9058	9051	<>	<elision2>
9058	8991	<elision1>	<elision1>
9058	9051	<>	<elision1>
9058	8988	.	υ
9058	8988	.	u
9058	8988	.	α
9058	8988	.	a
9058	9060	<split-h>	<>
9059	9011	<split-h>	<>
9060	9056	<>	<name>
9060	9055	<>	<aphaerese>
9060	9055	<>	<elision3>
9060	9055	<>	<elision2>
9060	9055	<>	<elision1>
9060	8825	<3s>	<>
9061	8991	.	.
9061	8991	 	 
9061	8991	<~>	<~>
9061	8991	<split-s>	<split-s>
9061	8991	<split-h>	<split-h>
9061	8991	<name2>	<name2>
9061	9062	<>	<name>
9061	8994	<aphaerese>	<aphaerese>
9061	9061	<>	<aphaerese>
9061	9061	<>	<elision3>
9061	9061	<>	<elision2>
9061	9061	<>	<elision1>
9061	8988	.	υ
9061	8988	.	u
9061	8997	.	κ
9061	8988	.	α
9061	8988	.	a
9061	8900	<split-h>	<>
9062	8993	.	.
9062	8993	 	 
9062	8993	<~>	<~>
9062	8993	<split-s>	<split-s>
9062	8993	<split-h>	<split-h>
9062	8993	<name2>	<name2>
9062	8996	<aphaerese>	<aphaerese>
9062	9063	<>	<aphaerese>
9062	9063	<>	<elision3>
9062	9063	<>	<elision2>
9062	9063	<>	<elision1>
9062	8990	.	υ
9062	8990	.	u
9062	8999	.	κ
9062	8990	.	α
9062	8990	.	a
9062	8901	<split-h>	<>
9063	8991	.	.
9063	8991	 	 
9063	8991	<~>	<~>
9063	8991	<split-s>	<split-s>
9063	8991	<split-h>	<split-h>
9063	8991	<name2>	<name2>
9063	8994	<aphaerese>	<aphaerese>
9063	9061	<>	<aphaerese>
9063	9061	<>	<elision3>
9063	9061	<>	<elision2>
9063	9061	<>	<elision1>
9063	8988	.	υ
9063	8988	.	u
9063	8997	.	κ
9063	8988	.	α
9063	8988	.	a
9063	8899	<split-h>	<>
9064	9065	<>	<name>
9064	9064	<>	<aphaerese>
9064	9064	<>	<elision3>
9064	9064	<>	<elision2>
9064	9064	<>	<elision1>
9064	8991	<A2kl>	<>
9065	9066	<>	<aphaerese>
9065	9066	<>	<elision3>
9065	9066	<>	<elision2>
9065	9066	<>	<elision1>
9065	8992	<A2kl>	<>
9066	9064	<>	<aphaerese>
9066	9064	<>	<elision3>
9066	9064	<>	<elision2>
9066	9064	<>	<elision1>
9066	8993	<A2kl>	<>
9067	8321	.	.
9067	8322	 	 
9067	8321	<~>	<~>
9067	8321	<split-s>	<split-s>
9067	8321	<split-h>	<split-h>
9067	8321	<name2>	<name2>
9067	9068	<>	<name>
9067	8325	<aphaerese>	<aphaerese>
9067	9067	<>	<aphaerese>
9067	8321	<elision3>	<elision3>
9067	9067	<>	<elision3>
9067	8321	<elision2>	<elision2>
9067	9067	<>	<elision2>
9067	8321	<elision1>	<elision1>
9067	9067	<>	<elision1>
9067	8329	.	υ
9067	8335	s	υ
9067	8329	.	u
9067	8335	s	u
9067	8329	.	κ
9067	8911	s	κ
9067	8697	s	k
9067	8706	s	U
9067	8872	s	K
9067	8329	.	α
9067	8335	s	α
9067	8329	.	a
9067	8335	s	a
9067	8827	s	A
9067	8329	.	λ
9067	8911	s	λ
9067	8697	s	l
9067	8885	s	L
9067	9004	<split-h>	<>
9068	8324	.	.
9068	8327	 	 
9068	8324	<~>	<~>
9068	8324	<split-s>	<split-s>
9068	8324	<split-h>	<split-h>
9068	8324	<name2>	<name2>
9068	8871	<aphaerese>	<aphaerese>
9068	9069	<>	<aphaerese>
9068	8324	<elision3>	<elision3>
9068	9069	<>	<elision3>
9068	8324	<elision2>	<elision2>
9068	9069	<>	<elision2>
9068	8324	<elision1>	<elision1>
9068	9069	<>	<elision1>
9068	8331	.	υ
9068	8507	s	υ
9068	8331	.	u
9068	8507	s	u
9068	8331	.	κ
9068	8913	s	κ
9068	8699	s	k
9068	8708	s	U
9068	8874	s	K
9068	8331	.	α
9068	8507	s	α
9068	8331	.	a
9068	8507	s	a
9068	8829	s	A
9068	8331	.	λ
9068	8913	s	λ
9068	8699	s	l
9068	8887	s	L
9068	9005	<split-h>	<>
9069	8321	.	.
9069	8322	 	 
9069	8321	<~>	<~>
9069	8321	<split-s>	<split-s>
9069	8321	<split-h>	<split-h>
9069	8321	<name2>	<name2>
9069	8325	<aphaerese>	<aphaerese>
9069	9067	<>	<aphaerese>
9069	8321	<elision3>	<elision3>
9069	9067	<>	<elision3>
9069	8321	<elision2>	<elision2>
9069	9067	<>	<elision2>
9069	8321	<elision1>	<elision1>
9069	9067	<>	<elision1>
9069	8329	.	υ
9069	8335	s	υ
9069	8329	.	u
9069	8335	s	u
9069	8329	.	κ
9069	8911	s	κ
9069	8697	s	k
9069	8706	s	U
9069	8872	s	K
9069	8329	.	α
9069	8335	s	α
9069	8329	.	a
9069	8335	s	a
9069	8827	s	A
9069	8329	.	λ
9069	8911	s	λ
9069	8697	s	l
9069	8885	s	L
9069	9003	<split-h>	<>
9070	8991	.	.
9070	8991	 	 
9070	8991	<~>	<~>
9070	8991	<split-s>	<split-s>
9070	8991	<split-h>	<split-h>
9070	8991	<name2>	<name2>
9070	9071	<>	<name>
9070	8994	<aphaerese>	<aphaerese>
9070	9070	<>	<aphaerese>
9070	8991	<elision3>	<elision3>
9070	9070	<>	<elision3>
9070	8991	<elision2>	<elision2>
9070	9070	<>	<elision2>
9070	8991	<elision1>	<elision1>
9070	9070	<>	<elision1>
9070	8988	.	υ
9070	8988	.	u
9070	8988	.	κ
9070	8988	.	α
9070	8988	.	a
9070	8988	.	λ
9070	9004	<split-h>	<>
9071	8993	.	.
9071	8993	 	 
9071	8993	<~>	<~>
9071	8993	<split-s>	<split-s>
9071	8993	<split-h>	<split-h>
9071	8993	<name2>	<name2>
9071	8996	<aphaerese>	<aphaerese>
9071	9072	<>	<aphaerese>
9071	8993	<elision3>	<elision3>
9071	9072	<>	<elision3>
9071	8993	<elision2>	<elision2>
9071	9072	<>	<elision2>
9071	8993	<elision1>	<elision1>
9071	9072	<>	<elision1>
9071	8990	.	υ
9071	8990	.	u
9071	8990	.	κ
9071	8990	.	α
9071	8990	.	a
9071	8990	.	λ
9071	9005	<split-h>	<>
9072	8991	.	.
9072	8991	 	 
9072	8991	<~>	<~>
9072	8991	<split-s>	<split-s>
9072	8991	<split-h>	<split-h>
9072	8991	<name2>	<name2>
9072	8994	<aphaerese>	<aphaerese>
9072	9070	<>	<aphaerese>
9072	8991	<elision3>	<elision3>
9072	9070	<>	<elision3>
9072	8991	<elision2>	<elision2>
9072	9070	<>	<elision2>
9072	8991	<elision1>	<elision1>
9072	9070	<>	<elision1>
9072	8988	.	υ
9072	8988	.	u
9072	8988	.	κ
9072	8988	.	α
9072	8988	.	a
9072	8988	.	λ
9072	9003	<split-h>	<>
9073	9059	<name>	<name>
9073	9074	<>	<name>
9073	9076	<>	<aphaerese>
9073	9076	<>	<elision3>
9073	9076	<>	<elision2>
9073	9076	<>	<elision1>
9073	9057	<split-h>	<>
9073	9015	<A2kl>	<>
9073	9083	<L2kl>	<>
9074	9075	<>	<aphaerese>
9074	9075	<>	<elision3>
9074	9075	<>	<elision2>
9074	9075	<>	<elision1>
9074	9016	<A2kl>	<>
9074	9078	<L2kl>	<>
9075	9076	<>	<aphaerese>
9075	9076	<>	<elision3>
9075	9076	<>	<elision2>
9075	9076	<>	<elision1>
9075	9017	<A2kl>	<>
9075	9079	<L2kl>	<>
9076	9074	<>	<name>
9076	9076	<>	<aphaerese>
9076	9076	<>	<elision3>
9076	9076	<>	<elision2>
9076	9076	<>	<elision1>
9076	9015	<A2kl>	<>
9076	9077	<L2kl>	<>
9077	8991	.	.
9077	8991	 	 
9077	8991	<~>	<~>
9077	8991	<split-s>	<split-s>
9077	8991	<split-h>	<split-h>
9077	8991	<name2>	<name2>
9077	9078	<>	<name>
9077	8994	<aphaerese>	<aphaerese>
9077	9077	<>	<aphaerese>
9077	8991	<elision3>	<elision3>
9077	9077	<>	<elision3>
9077	8991	<elision2>	<elision2>
9077	9077	<>	<elision2>
9077	8991	<elision1>	<elision1>
9077	9077	<>	<elision1>
9077	8988	.	υ
9077	8988	.	u
9077	9036	.	κ
9077	8988	.	α
9077	8988	.	a
9077	9036	.	λ
9077	9081	<split-h>	<>
9078	8993	.	.
9078	8993	 	 
9078	8993	<~>	<~>
9078	8993	<split-s>	<split-s>
9078	8993	<split-h>	<split-h>
9078	8993	<name2>	<name2>
9078	8996	<aphaerese>	<aphaerese>
9078	9079	<>	<aphaerese>
9078	8993	<elision3>	<elision3>
9078	9079	<>	<elision3>
9078	8993	<elision2>	<elision2>
9078	9079	<>	<elision2>
9078	8993	<elision1>	<elision1>
9078	9079	<>	<elision1>
9078	8990	.	υ
9078	8990	.	u
9078	9038	.	κ
9078	8990	.	α
9078	8990	.	a
9078	9038	.	λ
9078	9082	<split-h>	<>
9079	8991	.	.
9079	8991	 	 
9079	8991	<~>	<~>
9079	8991	<split-s>	<split-s>
9079	8991	<split-h>	<split-h>
9079	8991	<name2>	<name2>
9079	8994	<aphaerese>	<aphaerese>
9079	9077	<>	<aphaerese>
9079	8991	<elision3>	<elision3>
9079	9077	<>	<elision3>
9079	8991	<elision2>	<elision2>
9079	9077	<>	<elision2>
9079	8991	<elision1>	<elision1>
9079	9077	<>	<elision1>
9079	8988	.	υ
9079	8988	.	u
9079	9036	.	κ
9079	8988	.	α
9079	8988	.	a
9079	9036	.	λ
9079	9080	<split-h>	<>
9080	9081	<>	<aphaerese>
9080	9081	<>	<elision3>
9080	9081	<>	<elision2>
9080	9081	<>	<elision1>
9080	8837	<3s>	<>
9081	9082	<>	<name>
9081	9081	<>	<aphaerese>
9081	9081	<>	<elision3>
9081	9081	<>	<elision2>
9081	9081	<>	<elision1>
9081	8838	<3s>	<>
9082	9080	<>	<aphaerese>
9082	9080	<>	<elision3>
9082	9080	<>	<elision2>
9082	9080	<>	<elision1>
9082	8839	<3s>	<>
9083	8991	.	.
9083	8991	 	 
9083	8991	<~>	<~>
9083	8991	<split-s>	<split-s>
9083	8991	<split-h>	<split-h>
9083	8991	<name2>	<name2>
9083	9059	<name2>	<name>
9083	9078	<>	<name>
9083	8994	<aphaerese>	<aphaerese>
9083	9077	<>	<aphaerese>
9083	8991	<elision3>	<elision3>
9083	9077	<>	<elision3>
9083	8991	<elision2>	<elision2>
9083	9077	<>	<elision2>
9083	8991	<elision1>	<elision1>
9083	9077	<>	<elision1>
9083	8988	.	υ
9083	8988	.	u
9083	9036	.	κ
9083	8988	.	α
9083	8988	.	a
9083	9036	.	λ
9083	9084	<split-h>	<>
9084	9082	<>	<name>
9084	9081	<>	<aphaerese>
9084	9081	<>	<elision3>
9084	9081	<>	<elision2>
9084	9081	<>	<elision1>
9084	8844	<3s>	<>
9085	8321	.	.
9085	8322	 	 
9085	8321	<~>	<~>
9085	8321	<split-s>	<split-s>
9085	8321	<split-h>	<split-h>
9085	8321	<name2>	<name2>
9085	8897	<>	<name>
9085	8325	<aphaerese>	<aphaerese>
9085	8320	<>	<aphaerese>
9085	8320	<>	<elision3>
9085	8320	<>	<elision2>
9085	8320	<>	<elision1>
9085	8329	.	υ
9085	8335	s	υ
9085	8329	.	u
9085	8335	s	u
9085	8514	.	κ
9085	8585	s	κ
9085	8697	s	k
9085	8706	s	U
9085	8872	s	K
9085	8329	.	α
9085	8335	s	α
9085	8329	.	a
9085	8335	s	a
9085	8827	s	A
9085	8697	s	λ
9085	8697	s	l
9085	8885	s	L
9085	9086	<split-h>	<>
9086	8901	<>	<name>
9086	8900	<>	<aphaerese>
9086	8900	<>	<elision3>
9086	8900	<>	<elision2>
9086	8900	<>	<elision1>
9086	8850	<3s>	<>
9087	8321	.	.
9087	8322	 	 
9087	8321	<~>	<~>
9087	8321	<split-s>	<split-s>
9087	8321	<split-h>	<split-h>
9087	8321	<name2>	<name2>
9087	8933	<>	<name>
9087	8325	<aphaerese>	<aphaerese>
9087	8932	<>	<aphaerese>
9087	8935	<elision3>	<elision3>
9087	8932	<>	<elision3>
9087	8935	<elision2>	<elision2>
9087	8932	<>	<elision2>
9087	8935	<elision1>	<elision1>
9087	8932	<>	<elision1>
9087	8329	.	υ
9087	8335	s	υ
9087	8329	.	u
9087	8335	s	u
9087	8329	.	κ
9087	8911	s	κ
9087	8697	s	k
9087	8706	s	U
9087	8872	s	K
9087	8329	.	α
9087	8335	s	α
9087	8329	.	a
9087	8335	s	a
9087	8827	s	A
9087	8329	.	λ
9087	8911	s	λ
9087	8697	s	l
9087	8885	s	L
9087	9088	<split-h>	<>
9088	8984	<>	<name>
9088	8983	<>	<aphaerese>
9088	8983	<>	<elision3>
9088	8983	<>	<elision2>
9088	8983	<>	<elision1>
9088	8853	<3s>	<>
9089	8321	.	.
9089	8322	 	 
9089	8321	<~>	<~>
9089	8321	<split-s>	<split-s>
9089	8321	<split-h>	<split-h>
9089	8321	<name2>	<name2>
9089	8986	<>	<name>
9089	8325	<aphaerese>	<aphaerese>
9089	8985	<>	<aphaerese>
9089	8321	<elision3>	<elision3>
9089	8985	<>	<elision3>
9089	8321	<elision2>	<elision2>
9089	8985	<>	<elision2>
9089	8321	<elision1>	<elision1>
9089	8985	<>	<elision1>
9089	8329	.	υ
9089	8335	s	υ
9089	8329	.	u
9089	8335	s	u
9089	8988	.	κ
9089	8911	s	κ
9089	8697	s	k
9089	8706	s	U
9089	8872	s	K
9089	8329	.	α
9089	8335	s	α
9089	8329	.	a
9089	8335	s	a
9089	8827	s	A
9089	8988	.	λ
9089	8911	s	λ
9089	8697	s	l
9089	8885	s	L
9089	9090	<split-h>	<>
9090	9005	<>	<name>
9090	9004	<>	<aphaerese>
9090	9004	<>	<elision3>
9090	9004	<>	<elision2>
9090	9004	<>	<elision1>
9090	8856	<3s>	<>
9091	9007	<>	<name>
9091	9006	<>	<aphaerese>
9091	9006	<>	<elision3>
9091	9006	<>	<elision2>
9091	9006	<>	<elision1>
9091	9092	<U2kl>	<>
9092	8991	.	.
9092	8991	 	 
9092	8991	<~>	<~>
9092	8991	<split-s>	<split-s>
9092	8991	<split-h>	<split-h>
9092	8991	<name2>	<name2>
9092	8992	<>	<name>
9092	8994	<aphaerese>	<aphaerese>
9092	8991	<>	<aphaerese>
9092	8991	<elision3>	<elision3>
9092	8991	<>	<elision3>
9092	8991	<elision2>	<elision2>
9092	8991	<>	<elision2>
9092	8991	<elision1>	<elision1>
9092	8991	<>	<elision1>
9092	8988	.	υ
9092	8988	.	u
9092	8997	.	κ
9092	8988	.	α
9092	8988	.	a
9092	9093	<split-h>	<>
9093	8847	<>	<name>
9093	8846	<>	<aphaerese>
9093	8846	<>	<elision3>
9093	8846	<>	<elision2>
9093	8846	<>	<elision1>
9093	8860	<3s>	<>
9094	9010	<name>	<name>
9094	9012	<>	<name>
9094	9014	<>	<aphaerese>
9094	9014	<>	<elision3>
9094	9014	<>	<elision2>
9094	9014	<>	<elision1>
9094	9057	<split-h>	<>
9094	9015	<A2kl>	<>
9094	9033	<L2kl>	<>
9094	9095	<K2kl>	<>
9095	8991	.	.
9095	8991	 	 
9095	8991	<~>	<~>
9095	8991	<split-s>	<split-s>
9095	8991	<split-h>	<split-h>
9095	8991	<name2>	<name2>
9095	9059	<name2>	<name>
9095	9052	<>	<name>
9095	8994	<aphaerese>	<aphaerese>
9095	9051	<>	<aphaerese>
9095	8991	<elision3>	<elision3>
9095	9051	<>	<elision3>
9095	8991	<elision2>	<elision2>
9095	9051	<>	<elision2>
9095	8991	<elision1>	<elision1>
9095	9051	<>	<elision1>
9095	8988	.	υ
9095	8988	.	u
9095	8988	.	α
9095	8988	.	a
9095	9096	<split-h>	<>
9096	9056	<>	<name>
9096	9055	<>	<aphaerese>
9096	9055	<>	<elision3>
9096	9055	<>	<elision2>
9096	9055	<>	<elision1>
9096	8864	<3s>	<>
9097	8991	.	.
9097	8991	 	 
9097	8991	<~>	<~>
9097	8991	<split-s>	<split-s>
9097	8991	<split-h>	<split-h>
9097	8991	<name2>	<name2>
9097	9062	<>	<name>
9097	8994	<aphaerese>	<aphaerese>
9097	9061	<>	<aphaerese>
9097	9061	<>	<elision3>
9097	9061	<>	<elision2>
9097	9061	<>	<elision1>
9097	8988	.	υ
9097	8988	.	u
9097	8997	.	κ
9097	8988	.	α
9097	8988	.	a
9097	9086	<split-h>	<>
9098	9065	<>	<name>
9098	9064	<>	<aphaerese>
9098	9064	<>	<elision3>
9098	9064	<>	<elision2>
9098	9064	<>	<elision1>
9098	9092	<A2kl>	<>
9099	8321	.	.
9099	8322	 	 
9099	8321	<~>	<~>
9099	8321	<split-s>	<split-s>
9099	8321	<split-h>	<split-h>
9099	8321	<name2>	<name2>
9099	9068	<>	<name>
9099	8325	<aphaerese>	<aphaerese>
9099	9067	<>	<aphaerese>
9099	8321	<elision3>	<elision3>
9099	9067	<>	<elision3>
9099	8321	<elision2>	<elision2>
9099	9067	<>	<elision2>
9099	8321	<elision1>	<elision1>
9099	9067	<>	<elision1>
9099	8329	.	υ
9099	8335	s	υ
9099	8329	.	u
9099	8335	s	u
9099	8329	.	κ
9099	8911	s	κ
9099	8697	s	k
9099	8706	s	U
9099	8872	s	K
9099	8329	.	α
9099	8335	s	α
9099	8329	.	a
9099	8335	s	a
9099	8827	s	A
9099	8329	.	λ
9099	8911	s	λ
9099	8697	s	l
9099	8885	s	L
9099	9090	<split-h>	<>
9100	8991	.	.
9100	8991	 	 
9100	8991	<~>	<~>
9100	8991	<split-s>	<split-s>
9100	8991	<split-h>	<split-h>
9100	8991	<name2>	<name2>
9100	9071	<>	<name>
9100	8994	<aphaerese>	<aphaerese>
9100	9070	<>	<aphaerese>
9100	8991	<elision3>	<elision3>
9100	9070	<>	<elision3>
9100	8991	<elision2>	<elision2>
9100	9070	<>	<elision2>
9100	8991	<elision1>	<elision1>
9100	9070	<>	<elision1>
9100	8988	.	υ
9100	8988	.	u
9100	8988	.	κ
9100	8988	.	α
9100	8988	.	a
9100	8988	.	λ
9100	9090	<split-h>	<>
9101	9059	<name>	<name>
9101	9074	<>	<name>
9101	9076	<>	<aphaerese>
9101	9076	<>	<elision3>
9101	9076	<>	<elision2>
9101	9076	<>	<elision1>
9101	9057	<split-h>	<>
9101	9015	<A2kl>	<>
9101	9102	<L2kl>	<>
9102	8991	.	.
9102	8991	 	 
9102	8991	<~>	<~>
9102	8991	<split-s>	<split-s>
9102	8991	<split-h>	<split-h>
9102	8991	<name2>	<name2>
9102	9059	<name2>	<name>
9102	9078	<>	<name>
9102	8994	<aphaerese>	<aphaerese>
9102	9077	<>	<aphaerese>
9102	8991	<elision3>	<elision3>
9102	9077	<>	<elision3>
9102	8991	<elision2>	<elision2>
9102	9077	<>	<elision2>
9102	8991	<elision1>	<elision1>
9102	9077	<>	<elision1>
9102	8988	.	υ
9102	8988	.	u
9102	9036	.	κ
9102	8988	.	α
9102	8988	.	a
9102	9036	.	λ
9102	9103	<split-h>	<>
9103	9082	<>	<name>
9103	9081	<>	<aphaerese>
9103	9081	<>	<elision3>
9103	9081	<>	<elision2>
9103	9081	<>	<elision1>
9103	8869	<3s>	<>
9104	92	.	.
9104	93	 	 
9104	92	<~>	<~>
9104	92	<split-s>	<split-s>
9104	92	<split-h>	<split-h>
9104	92	<name2>	<name2>
9104	96	<aphaerese>	<aphaerese>
9104	96	<>	<aphaerese>
9104	92	<elision3>	<elision3>
9104	96	<>	<elision3>
9104	92	<elision2>	<elision2>
9104	96	<>	<elision2>
9104	92	<elision1>	<elision1>
9104	96	<>	<elision1>
9104	92	.	υ
9104	92	.	u
9104	8902	.	κ
9104	8932	s	κ
9104	8985	s	k
9104	9006	s	U
9104	9105	s	K
9104	92	.	α
9104	92	.	a
9104	9064	s	A
9104	9067	s	λ
9104	9070	s	l
9104	9115	s	L
9104	8490	<2s>	<>
9105	9010	<name>	<name>
9105	9106	<>	<name>
9105	9108	<>	<aphaerese>
9105	9108	<>	<elision3>
9105	9108	<>	<elision2>
9105	9108	<>	<elision1>
9105	9057	<split-h>	<>
9105	9109	<L2kl>	<>
9105	9058	<K2kl>	<>
9106	9107	<>	<aphaerese>
9106	9107	<>	<elision3>
9106	9107	<>	<elision2>
9106	9107	<>	<elision1>
9106	9110	<L2kl>	<>
9106	9052	<K2kl>	<>
9107	9108	<>	<aphaerese>
9107	9108	<>	<elision3>
9107	9108	<>	<elision2>
9107	9108	<>	<elision1>
9107	9111	<L2kl>	<>
9107	9053	<K2kl>	<>
9108	9106	<>	<name>
9108	9108	<>	<aphaerese>
9108	9108	<>	<elision3>
9108	9108	<>	<elision2>
9108	9108	<>	<elision1>
9108	9109	<L2kl>	<>
9108	9051	<K2kl>	<>
9109	9110	<>	<name>
9109	9109	<>	<aphaerese>
9109	9109	<>	<elision3>
9109	9109	<>	<elision2>
9109	9109	<>	<elision1>
9109	8988	.	κ
9109	8988	.	λ
9109	9113	<split-h>	<>
9110	9111	<>	<aphaerese>
9110	9111	<>	<elision3>
9110	9111	<>	<elision2>
9110	9111	<>	<elision1>
9110	8990	.	κ
9110	8990	.	λ
9110	9114	<split-h>	<>
9111	9109	<>	<aphaerese>
9111	9109	<>	<elision3>
9111	9109	<>	<elision2>
9111	9109	<>	<elision1>
9111	8988	.	κ
9111	8988	.	λ
9111	9112	<split-h>	<>
9112	9113	<>	<aphaerese>
9112	9113	<>	<elision3>
9112	9113	<>	<elision2>
9112	9113	<>	<elision1>
9112	8879	<3s>	<>
9113	9114	<>	<name>
9113	9113	<>	<aphaerese>
9113	9113	<>	<elision3>
9113	9113	<>	<elision2>
9113	9113	<>	<elision1>
9113	8880	<3s>	<>
9114	9112	<>	<aphaerese>
9114	9112	<>	<elision3>
9114	9112	<>	<elision2>
9114	9112	<>	<elision1>
9114	8881	<3s>	<>
9115	9059	<name>	<name>
9115	9116	<>	<name>
9115	9118	<>	<aphaerese>
9115	9118	<>	<elision3>
9115	9118	<>	<elision2>
9115	9118	<>	<elision1>
9115	9057	<split-h>	<>
9115	9119	<L2kl>	<>
9116	9117	<>	<aphaerese>
9116	9117	<>	<elision3>
9116	9117	<>	<elision2>
9116	9117	<>	<elision1>
9116	9071	<L2kl>	<>
9117	9118	<>	<aphaerese>
9117	9118	<>	<elision3>
9117	9118	<>	<elision2>
9117	9118	<>	<elision1>
9117	9072	<L2kl>	<>
9118	9116	<>	<name>
9118	9118	<>	<aphaerese>
9118	9118	<>	<elision3>
9118	9118	<>	<elision2>
9118	9118	<>	<elision1>
9118	9070	<L2kl>	<>
9119	8991	.	.
9119	8991	 	 
9119	8991	<~>	<~>
9119	8991	<split-s>	<split-s>
9119	8991	<split-h>	<split-h>
9119	8991	<name2>	<name2>
9119	9059	<name2>	<name>
9119	9071	<>	<name>
9119	8994	<aphaerese>	<aphaerese>
9119	9070	<>	<aphaerese>
9119	8991	<elision3>	<elision3>
9119	9070	<>	<elision3>
9119	8991	<elision2>	<elision2>
9119	9070	<>	<elision2>
9119	8991	<elision1>	<elision1>
9119	9070	<>	<elision1>
9119	8988	.	υ
9119	8988	.	u
9119	8988	.	κ
9119	8988	.	α
9119	8988	.	a
9119	8988	.	λ
9119	9120	<split-h>	<>
9120	9005	<>	<name>
9120	9004	<>	<aphaerese>
9120	9004	<>	<elision3>
9120	9004	<>	<elision2>
9120	9004	<>	<elision1>
9120	8890	<3s>	<>
9121	92	.	.
9121	93	 	 
9121	92	<~>	<~>
9121	92	<split-s>	<split-s>
9121	92	<split-h>	<split-h>
9121	92	<name2>	<name2>
9121	96	<aphaerese>	<aphaerese>
9121	99	<>	<aphaerese>
9121	92	<elision3>	<elision3>
9121	99	<>	<elision3>
9121	92	<elision2>	<elision2>
9121	99	<>	<elision2>
9121	92	<elision1>	<elision1>
9121	99	<>	<elision1>
9121	100	.	υ
9121	8320	s	υ
9121	100	.	u
9121	8320	s	u
9121	8902	.	κ
9121	8932	s	κ
9121	8985	s	k
9121	9006	s	U
9121	9009	s	K
9121	100	.	α
9121	9061	s	α
9121	100	.	a
9121	9061	s	a
9121	9064	s	A
9121	9067	s	λ
9121	9070	s	l
9121	9073	s	L
9121	8503	<2s>	<>
9122	95	.	.
9122	98	 	 
9122	95	<~>	<~>
9122	95	<split-s>	<split-s>
9122	95	<split-h>	<split-h>
9122	95	<name2>	<name2>
9122	9104	<aphaerese>	<aphaerese>
9122	95	<>	<aphaerese>
9122	95	<elision3>	<elision3>
9122	95	<>	<elision3>
9122	95	<elision2>	<elision2>
9122	95	<>	<elision2>
9122	95	<elision1>	<elision1>
9122	95	<>	<elision1>
9122	102	.	υ
9122	8898	s	υ
9122	102	.	u
9122	8898	s	u
9122	8904	.	κ
9122	8934	s	κ
9122	8987	s	k
9122	9008	s	U
9122	9107	s	K
9122	102	.	α
9122	9063	s	α
9122	102	.	a
9122	9063	s	a
9122	9066	s	A
9122	9069	s	λ
9122	9072	s	l
9122	9117	s	L
9122	8505	<2s>	<>
9123	95	.	.
9123	98	 	 
9123	95	<~>	<~>
9123	95	<split-s>	<split-s>
9123	95	<split-h>	<split-h>
9123	95	<name2>	<name2>
9123	9104	<aphaerese>	<aphaerese>
9123	9124	<>	<aphaerese>
9123	9124	<>	<elision3>
9123	9124	<>	<elision2>
9123	9124	<>	<elision1>
9123	102	.	υ
9123	8898	s	υ
9123	102	.	u
9123	8898	s	u
9123	102	.	κ
9123	9127	s	κ
9123	8987	s	k
9123	9008	s	U
9123	9107	s	K
9123	102	.	α
9123	9063	s	α
9123	102	.	a
9123	9063	s	a
9123	9066	s	A
9123	102	.	λ
9123	9127	s	λ
9123	9072	s	l
9123	9117	s	L
9123	8916	<2s>	<>
9124	92	.	.
9124	93	 	 
9124	92	<~>	<~>
9124	92	<split-s>	<split-s>
9124	92	<split-h>	<split-h>
9124	92	<name2>	<name2>
9124	96	<aphaerese>	<aphaerese>
9124	91	<>	<aphaerese>
9124	91	<>	<elision3>
9124	91	<>	<elision2>
9124	91	<>	<elision1>
9124	100	.	υ
9124	8320	s	υ
9124	100	.	u
9124	8320	s	u
9124	100	.	κ
9124	9125	s	κ
9124	8985	s	k
9124	9006	s	U
9124	9105	s	K
9124	100	.	α
9124	9061	s	α
9124	100	.	a
9124	9061	s	a
9124	9064	s	A
9124	100	.	λ
9124	9125	s	λ
9124	9070	s	l
9124	9115	s	L
9124	8914	<2s>	<>
9125	8321	.	.
9125	8322	 	 
9125	8321	<~>	<~>
9125	8321	<split-s>	<split-s>
9125	8321	<split-h>	<split-h>
9125	8321	<name2>	<name2>
9125	9126	<>	<name>
9125	8325	<aphaerese>	<aphaerese>
9125	9125	<>	<aphaerese>
9125	9125	<>	<elision3>
9125	9125	<>	<elision2>
9125	9125	<>	<elision1>
9125	8329	.	υ
9125	8335	s	υ
9125	8329	.	u
9125	8335	s	u
9125	8329	.	κ
9125	8911	s	κ
9125	8697	s	k
9125	8706	s	U
9125	8872	s	K
9125	8329	.	α
9125	8335	s	α
9125	8329	.	a
9125	8335	s	a
9125	8827	s	A
9125	8329	.	λ
9125	8911	s	λ
9125	8697	s	l
9125	8885	s	L
9125	9129	<split-h>	<>
9126	8324	.	.
9126	8327	 	 
9126	8324	<~>	<~>
9126	8324	<split-s>	<split-s>
9126	8324	<split-h>	<split-h>
9126	8324	<name2>	<name2>
9126	8871	<aphaerese>	<aphaerese>
9126	9127	<>	<aphaerese>
9126	9127	<>	<elision3>
9126	9127	<>	<elision2>
9126	9127	<>	<elision1>
9126	8331	.	υ
9126	8507	s	υ
9126	8331	.	u
9126	8507	s	u
9126	8331	.	κ
9126	8913	s	κ
9126	8699	s	k
9126	8708	s	U
9126	8874	s	K
9126	8331	.	α
9126	8507	s	α
9126	8331	.	a
9126	8507	s	a
9126	8829	s	A
9126	8331	.	λ
9126	8913	s	λ
9126	8699	s	l
9126	8887	s	L
9126	9130	<split-h>	<>
9127	8321	.	.
9127	8322	 	 
9127	8321	<~>	<~>
9127	8321	<split-s>	<split-s>
9127	8321	<split-h>	<split-h>
9127	8321	<name2>	<name2>
9127	8325	<aphaerese>	<aphaerese>
9127	9125	<>	<aphaerese>
9127	9125	<>	<elision3>
9127	9125	<>	<elision2>
9127	9125	<>	<elision1>
9127	8329	.	υ
9127	8335	s	υ
9127	8329	.	u
9127	8335	s	u
9127	8329	.	κ
9127	8911	s	κ
9127	8697	s	k
9127	8706	s	U
9127	8872	s	K
9127	8329	.	α
9127	8335	s	α
9127	8329	.	a
9127	8335	s	a
9127	8827	s	A
9127	8329	.	λ
9127	8911	s	λ
9127	8697	s	l
9127	8885	s	L
9127	9128	<split-h>	<>
9128	9129	<>	<aphaerese>
9128	9129	<>	<elision3>
9128	9129	<>	<elision2>
9128	9129	<>	<elision1>
9128	8914	<3s>	<>
9129	9130	<>	<name>
9129	9129	<>	<aphaerese>
9129	9129	<>	<elision3>
9129	9129	<>	<elision2>
9129	9129	<>	<elision1>
9129	8915	<3s>	<>
9130	9128	<>	<aphaerese>
9130	9128	<>	<elision3>
9130	9128	<>	<elision2>
9130	9128	<>	<elision1>
9130	8916	<3s>	<>
9131	92	.	.
9131	93	 	 
9131	92	<~>	<~>
9131	92	<split-s>	<split-s>
9131	92	<split-h>	<split-h>
9131	92	<name2>	<name2>
9131	9132	<>	<name>
9131	96	<aphaerese>	<aphaerese>
9131	9131	<>	<aphaerese>
9131	92	<elision3>	<elision3>
9131	9131	<>	<elision3>
9131	92	<elision2>	<elision2>
9131	9131	<>	<elision2>
9131	92	<elision1>	<elision1>
9131	9131	<>	<elision1>
9131	100	.	υ
9131	8320	s	υ
9131	100	.	u
9131	8320	s	u
9131	9134	.	κ
9131	9125	s	κ
9131	8985	s	k
9131	9006	s	U
9131	9105	s	K
9131	100	.	α
9131	9061	s	α
9131	100	.	a
9131	9061	s	a
9131	9064	s	A
9131	9134	.	λ
9131	9125	s	λ
9131	9070	s	l
9131	9115	s	L
9131	8701	<2s>	<>
9132	95	.	.
9132	98	 	 
9132	95	<~>	<~>
9132	95	<split-s>	<split-s>
9132	95	<split-h>	<split-h>
9132	95	<name2>	<name2>
9132	9104	<aphaerese>	<aphaerese>
9132	9133	<>	<aphaerese>
9132	95	<elision3>	<elision3>
9132	9133	<>	<elision3>
9132	95	<elision2>	<elision2>
9132	9133	<>	<elision2>
9132	95	<elision1>	<elision1>
9132	9133	<>	<elision1>
9132	102	.	υ
9132	8898	s	υ
9132	102	.	u
9132	8898	s	u
9132	9136	.	κ
9132	9127	s	κ
9132	8987	s	k
9132	9008	s	U
9132	9107	s	K
9132	102	.	α
9132	9063	s	α
9132	102	.	a
9132	9063	s	a
9132	9066	s	A
9132	9136	.	λ
9132	9127	s	λ
9132	9072	s	l
9132	9117	s	L
9132	8702	<2s>	<>
9133	92	.	.
9133	93	 	 
9133	92	<~>	<~>
9133	92	<split-s>	<split-s>
9133	92	<split-h>	<split-h>
9133	92	<name2>	<name2>
9133	96	<aphaerese>	<aphaerese>
9133	9131	<>	<aphaerese>
9133	92	<elision3>	<elision3>
9133	9131	<>	<elision3>
9133	92	<elision2>	<elision2>
9133	9131	<>	<elision2>
9133	92	<elision1>	<elision1>
9133	9131	<>	<elision1>
9133	100	.	υ
9133	8320	s	υ
9133	100	.	u
9133	8320	s	u
9133	9134	.	κ
9133	9125	s	κ
9133	8985	s	k
9133	9006	s	U
9133	9105	s	K
9133	100	.	α
9133	9061	s	α
9133	100	.	a
9133	9061	s	a
9133	9064	s	A
9133	9134	.	λ
9133	9125	s	λ
9133	9070	s	l
9133	9115	s	L
9133	8700	<2s>	<>
9134	9135	<>	<name>
9134	9134	<>	<aphaerese>
9134	9137	<elision3>	<elision3>
9134	9134	<>	<elision3>
9134	9137	<elision2>	<elision2>
9134	9134	<>	<elision2>
9134	9137	<elision1>	<elision1>
9134	9134	<>	<elision1>
9134	104	<2s>	<>
9135	9136	<>	<aphaerese>
9135	9140	<elision3>	<elision3>
9135	9136	<>	<elision3>
9135	9140	<elision2>	<elision2>
9135	9136	<>	<elision2>
9135	9140	<elision1>	<elision1>
9135	9136	<>	<elision1>
9135	105	<2s>	<>
9136	9134	<>	<aphaerese>
9136	9137	<elision3>	<elision3>
9136	9134	<>	<elision3>
9136	9137	<elision2>	<elision2>
9136	9134	<>	<elision2>
9136	9137	<elision1>	<elision1>
9136	9134	<>	<elision1>
9136	103	<2s>	<>
9137	9137	.	.
9137	9138	 	 
9137	9137	<~>	<~>
9137	9137	<split-s>	<split-s>
9137	9137	<split-h>	<split-h>
9137	9137	<name2>	<name2>
9137	9163	<>	<name>
9137	9141	<aphaerese>	<aphaerese>
9137	9137	<>	<aphaerese>
9137	9137	<elision3>	<elision3>
9137	9137	<>	<elision3>
9137	9137	<elision2>	<elision2>
9137	9137	<>	<elision2>
9137	9137	<elision1>	<elision1>
9137	9137	<>	<elision1>
9137	9134	.	υ
9137	9061	s	υ
9137	9134	.	u
9137	9061	s	u
9137	9145	.	κ
9137	9151	s	κ
9137	9070	s	k
9137	9006	s	U
9137	9161	s	K
9137	9134	.	α
9137	9061	s	α
9137	9134	.	a
9137	9061	s	a
9137	9064	s	A
9137	9070	s	λ
9137	9070	s	l
9137	9115	s	L
9137	8504	<2s>	<>
9138	9137	.	.
9138	9138	 	 
9138	9137	<~>	<~>
9138	9137	<split-s>	<split-s>
9138	9137	<split-h>	<split-h>
9138	9137	<name2>	<name2>
9138	9139	<>	<name>
9138	9141	<aphaerese>	<aphaerese>
9138	9144	<>	<aphaerese>
9138	9137	<elision3>	<elision3>
9138	9144	<>	<elision3>
9138	9137	<elision2>	<elision2>
9138	9144	<>	<elision2>
9138	9137	<elision1>	<elision1>
9138	9144	<>	<elision1>
9138	9134	.	υ
9138	9097	s	υ
9138	9134	.	u
9138	9097	s	u
9138	9145	.	κ
9138	9158	s	κ
9138	9100	s	k
9138	9091	s	U
9138	9159	s	K
9138	9134	.	α
9138	9097	s	α
9138	9134	.	a
9138	9097	s	a
9138	9098	s	A
9138	9100	s	λ
9138	9100	s	l
9138	9101	s	L
9138	8504	<2s>	<>
9139	9140	.	.
9139	9143	 	 
9139	9140	<~>	<~>
9139	9140	<split-s>	<split-s>
9139	9140	<split-h>	<split-h>
9139	9140	<name2>	<name2>
9139	9160	<aphaerese>	<aphaerese>
9139	9162	<>	<aphaerese>
9139	9140	<elision3>	<elision3>
9139	9162	<>	<elision3>
9139	9140	<elision2>	<elision2>
9139	9162	<>	<elision2>
9139	9140	<elision1>	<elision1>
9139	9162	<>	<elision1>
9139	9136	.	υ
9139	9063	s	υ
9139	9136	.	u
9139	9063	s	u
9139	9147	.	κ
9139	9153	s	κ
9139	9072	s	k
9139	9008	s	U
9139	9013	s	K
9139	9136	.	α
9139	9063	s	α
9139	9136	.	a
9139	9063	s	a
9139	9066	s	A
9139	9072	s	λ
9139	9072	s	l
9139	9075	s	L
9139	8505	<2s>	<>
9140	9137	.	.
9140	9138	 	 
9140	9137	<~>	<~>
9140	9137	<split-s>	<split-s>
9140	9137	<split-h>	<split-h>
9140	9137	<name2>	<name2>
9140	9141	<aphaerese>	<aphaerese>
9140	9137	<>	<aphaerese>
9140	9137	<elision3>	<elision3>
9140	9137	<>	<elision3>
9140	9137	<elision2>	<elision2>
9140	9137	<>	<elision2>
9140	9137	<elision1>	<elision1>
9140	9137	<>	<elision1>
9140	9134	.	υ
9140	9061	s	υ
9140	9134	.	u
9140	9061	s	u
9140	9145	.	κ
9140	9151	s	κ
9140	9070	s	k
9140	9006	s	U
9140	9161	s	K
9140	9134	.	α
9140	9061	s	α
9140	9134	.	a
9140	9061	s	a
9140	9064	s	A
9140	9070	s	λ
9140	9070	s	l
9140	9115	s	L
9140	8503	<2s>	<>
9141	9137	.	.
9141	9138	 	 
9141	9137	<~>	<~>
9141	9137	<split-s>	<split-s>
9141	9137	<split-h>	<split-h>
9141	9137	<name2>	<name2>
9141	9142	<>	<name>
9141	9141	<aphaerese>	<aphaerese>
9141	9141	<>	<aphaerese>
9141	9137	<elision3>	<elision3>
9141	9141	<>	<elision3>
9141	9137	<elision2>	<elision2>
9141	9141	<>	<elision2>
9141	9137	<elision1>	<elision1>
9141	9141	<>	<elision1>
9141	9137	.	υ
9141	9137	.	u
9141	9145	.	κ
9141	9151	s	κ
9141	9070	s	k
9141	9006	s	U
9141	9161	s	K
9141	9137	.	α
9141	9137	.	a
9141	9064	s	A
9141	9070	s	λ
9141	9070	s	l
9141	9115	s	L
9141	8491	<2s>	<>
9142	9140	.	.
9142	9143	 	 
9142	9140	<~>	<~>
9142	9140	<split-s>	<split-s>
9142	9140	<split-h>	<split-h>
9142	9140	<name2>	<name2>
9142	9160	<aphaerese>	<aphaerese>
9142	9160	<>	<aphaerese>
9142	9140	<elision3>	<elision3>
9142	9160	<>	<elision3>
9142	9140	<elision2>	<elision2>
9142	9160	<>	<elision2>
9142	9140	<elision1>	<elision1>
9142	9160	<>	<elision1>
9142	9140	.	υ
9142	9140	.	u
9142	9147	.	κ
9142	9153	s	κ
9142	9072	s	k
9142	9008	s	U
9142	9107	s	K
9142	9140	.	α
9142	9140	.	a
9142	9066	s	A
9142	9072	s	λ
9142	9072	s	l
9142	9117	s	L
9142	8492	<2s>	<>
9143	9137	.	.
9143	9138	 	 
9143	9137	<~>	<~>
9143	9137	<split-s>	<split-s>
9143	9137	<split-h>	<split-h>
9143	9137	<name2>	<name2>
9143	9141	<aphaerese>	<aphaerese>
9143	9144	<>	<aphaerese>
9143	9137	<elision3>	<elision3>
9143	9144	<>	<elision3>
9143	9137	<elision2>	<elision2>
9143	9144	<>	<elision2>
9143	9137	<elision1>	<elision1>
9143	9144	<>	<elision1>
9143	9134	.	υ
9143	9097	s	υ
9143	9134	.	u
9143	9097	s	u
9143	9145	.	κ
9143	9158	s	κ
9143	9100	s	k
9143	9091	s	U
9143	9159	s	K
9143	9134	.	α
9143	9097	s	α
9143	9134	.	a
9143	9097	s	a
9143	9098	s	A
9143	9100	s	λ
9143	9100	s	l
9143	9101	s	L
9143	8503	<2s>	<>
9144	9137	.	.
9144	9138	 	 
9144	9137	<~>	<~>
9144	9137	<split-s>	<split-s>
9144	9137	<split-h>	<split-h>
9144	9137	<name2>	<name2>
9144	9139	<>	<name>
9144	9141	<aphaerese>	<aphaerese>
9144	9144	<>	<aphaerese>
9144	9137	<elision3>	<elision3>
9144	9144	<>	<elision3>
9144	9137	<elision2>	<elision2>
9144	9144	<>	<elision2>
9144	9137	<elision1>	<elision1>
9144	9144	<>	<elision1>
9144	9134	.	υ
9144	9061	s	υ
9144	9134	.	u
9144	9061	s	u
9144	9145	.	κ
9144	9151	s	κ
9144	9070	s	k
9144	9006	s	U
9144	9157	s	K
9144	9134	.	α
9144	9061	s	α
9144	9134	.	a
9144	9061	s	a
9144	9064	s	A
9144	9070	s	λ
9144	9070	s	l
9144	9073	s	L
9144	8504	<2s>	<>
9145	9146	<>	<name>
9145	9145	<>	<aphaerese>
9145	9148	<elision3>	<elision3>
9145	9145	<>	<elision3>
9145	9148	<elision2>	<elision2>
9145	9145	<>	<elision2>
9145	9148	<elision1>	<elision1>
9145	9145	<>	<elision1>
9145	8488	<2s>	<>
9146	9147	<>	<aphaerese>
9146	9150	<elision3>	<elision3>
9146	9147	<>	<elision3>
9146	9150	<elision2>	<elision2>
9146	9147	<>	<elision2>
9146	9150	<elision1>	<elision1>
9146	9147	<>	<elision1>
9146	8489	<2s>	<>
9147	9145	<>	<aphaerese>
9147	9148	<elision3>	<elision3>
9147	9145	<>	<elision3>
9147	9148	<elision2>	<elision2>
9147	9145	<>	<elision2>
9147	9148	<elision1>	<elision1>
9147	9145	<>	<elision1>
9147	8487	<2s>	<>
9148	9149	<>	<name>
9148	9148	<>	<aphaerese>
9148	9148	<>	<elision3>
9148	9148	<>	<elision2>
9148	9148	<>	<elision1>
9148	8927	s	κ
9148	8927	s	k
9148	8923	s	K
9148	8927	s	λ
9148	8927	s	l
9148	8929	s	L
9148	8349	<2s>	<>
9149	9150	<>	<aphaerese>
9149	9150	<>	<elision3>
9149	9150	<>	<elision2>
9149	9150	<>	<elision1>
9149	8926	s	κ
9149	8926	s	k
9149	8925	s	K
9149	8926	s	λ
9149	8926	s	l
9149	8931	s	L
9149	8350	<2s>	<>
9150	9148	<>	<aphaerese>
9150	9148	<>	<elision3>
9150	9148	<>	<elision2>
9150	9148	<>	<elision1>
9150	8927	s	κ
9150	8927	s	k
9150	8923	s	K
9150	8927	s	λ
9150	8927	s	l
9150	8929	s	L
9150	8348	<2s>	<>
9151	8991	.	.
9151	8991	 	 
9151	8991	<~>	<~>
9151	8991	<split-s>	<split-s>
9151	8991	<split-h>	<split-h>
9151	8991	<name2>	<name2>
9151	9152	<>	<name>
9151	8994	<aphaerese>	<aphaerese>
9151	9151	<>	<aphaerese>
9151	9154	<elision3>	<elision3>
9151	9151	<>	<elision3>
9151	9154	<elision2>	<elision2>
9151	9151	<>	<elision2>
9151	9154	<elision1>	<elision1>
9151	9151	<>	<elision1>
9151	8988	.	υ
9151	8988	.	u
9151	8988	.	κ
9151	8988	.	α
9151	8988	.	a
9151	8988	.	λ
9151	8983	<split-h>	<>
9152	8993	.	.
9152	8993	 	 
9152	8993	<~>	<~>
9152	8993	<split-s>	<split-s>
9152	8993	<split-h>	<split-h>
9152	8993	<name2>	<name2>
9152	8996	<aphaerese>	<aphaerese>
9152	9153	<>	<aphaerese>
9152	9156	<elision3>	<elision3>
9152	9153	<>	<elision3>
9152	9156	<elision2>	<elision2>
9152	9153	<>	<elision2>
9152	9156	<elision1>	<elision1>
9152	9153	<>	<elision1>
9152	8990	.	υ
9152	8990	.	u
9152	8990	.	κ
9152	8990	.	α
9152	8990	.	a
9152	8990	.	λ
9152	8984	<split-h>	<>
9153	8991	.	.
9153	8991	 	 
9153	8991	<~>	<~>
9153	8991	<split-s>	<split-s>
9153	8991	<split-h>	<split-h>
9153	8991	<name2>	<name2>
9153	8994	<aphaerese>	<aphaerese>
9153	9151	<>	<aphaerese>
9153	9154	<elision3>	<elision3>
9153	9151	<>	<elision3>
9153	9154	<elision2>	<elision2>
9153	9151	<>	<elision2>
9153	9154	<elision1>	<elision1>
9153	9151	<>	<elision1>
9153	8988	.	υ
9153	8988	.	u
9153	8988	.	κ
9153	8988	.	α
9153	8988	.	a
9153	8988	.	λ
9153	8982	<split-h>	<>
9154	8991	.	.
9154	8991	 	 
9154	8991	<~>	<~>
9154	8991	<split-s>	<split-s>
9154	8991	<split-h>	<split-h>
9154	8991	<name2>	<name2>
9154	9155	<>	<name>
9154	8994	<aphaerese>	<aphaerese>
9154	9154	<>	<aphaerese>
9154	8991	<elision3>	<elision3>
9154	9154	<>	<elision3>
9154	8991	<elision2>	<elision2>
9154	9154	<>	<elision2>
9154	8991	<elision1>	<elision1>
9154	9154	<>	<elision1>
9154	8988	.	υ
9154	8988	.	u
9154	8997	.	κ
9154	8988	.	α
9154	8988	.	a
9154	8980	<split-h>	<>
9155	8993	.	.
9155	8993	 	 
9155	8993	<~>	<~>
9155	8993	<split-s>	<split-s>
9155	8993	<split-h>	<split-h>
9155	8993	<name2>	<name2>
9155	8996	<aphaerese>	<aphaerese>
9155	9156	<>	<aphaerese>
9155	8993	<elision3>	<elision3>
9155	9156	<>	<elision3>
9155	8993	<elision2>	<elision2>
9155	9156	<>	<elision2>
9155	8993	<elision1>	<elision1>
9155	9156	<>	<elision1>
9155	8990	.	υ
9155	8990	.	u
9155	8999	.	κ
9155	8990	.	α
9155	8990	.	a
9155	8981	<split-h>	<>
9156	8991	.	.
9156	8991	 	 
9156	8991	<~>	<~>
9156	8991	<split-s>	<split-s>
9156	8991	<split-h>	<split-h>
9156	8991	<name2>	<name2>
9156	8994	<aphaerese>	<aphaerese>
9156	9154	<>	<aphaerese>
9156	8991	<elision3>	<elision3>
9156	9154	<>	<elision3>
9156	8991	<elision2>	<elision2>
9156	9154	<>	<elision2>
9156	8991	<elision1>	<elision1>
9156	9154	<>	<elision1>
9156	8988	.	υ
9156	8988	.	u
9156	8997	.	κ
9156	8988	.	α
9156	8988	.	a
9156	8979	<split-h>	<>
9157	9059	<name>	<name>
9157	9012	<>	<name>
9157	9014	<>	<aphaerese>
9157	9014	<>	<elision3>
9157	9014	<>	<elision2>
9157	9014	<>	<elision1>
9157	9057	<split-h>	<>
9157	9015	<A2kl>	<>
9157	9033	<L2kl>	<>
9157	9058	<K2kl>	<>
9158	8991	.	.
9158	8991	 	 
9158	8991	<~>	<~>
9158	8991	<split-s>	<split-s>
9158	8991	<split-h>	<split-h>
9158	8991	<name2>	<name2>
9158	9152	<>	<name>
9158	8994	<aphaerese>	<aphaerese>
9158	9151	<>	<aphaerese>
9158	9154	<elision3>	<elision3>
9158	9151	<>	<elision3>
9158	9154	<elision2>	<elision2>
9158	9151	<>	<elision2>
9158	9154	<elision1>	<elision1>
9158	9151	<>	<elision1>
9158	8988	.	υ
9158	8988	.	u
9158	8988	.	κ
9158	8988	.	α
9158	8988	.	a
9158	8988	.	λ
9158	9088	<split-h>	<>
9159	9059	<name>	<name>
9159	9012	<>	<name>
9159	9014	<>	<aphaerese>
9159	9014	<>	<elision3>
9159	9014	<>	<elision2>
9159	9014	<>	<elision1>
9159	9057	<split-h>	<>
9159	9015	<A2kl>	<>
9159	9033	<L2kl>	<>
9159	9095	<K2kl>	<>
9160	9137	.	.
9160	9138	 	 
9160	9137	<~>	<~>
9160	9137	<split-s>	<split-s>
9160	9137	<split-h>	<split-h>
9160	9137	<name2>	<name2>
9160	9141	<aphaerese>	<aphaerese>
9160	9141	<>	<aphaerese>
9160	9137	<elision3>	<elision3>
9160	9141	<>	<elision3>
9160	9137	<elision2>	<elision2>
9160	9141	<>	<elision2>
9160	9137	<elision1>	<elision1>
9160	9141	<>	<elision1>
9160	9137	.	υ
9160	9137	.	u
9160	9145	.	κ
9160	9151	s	κ
9160	9070	s	k
9160	9006	s	U
9160	9161	s	K
9160	9137	.	α
9160	9137	.	a
9160	9064	s	A
9160	9070	s	λ
9160	9070	s	l
9160	9115	s	L
9160	8490	<2s>	<>
9161	9059	<name>	<name>
9161	9106	<>	<name>
9161	9108	<>	<aphaerese>
9161	9108	<>	<elision3>
9161	9108	<>	<elision2>
9161	9108	<>	<elision1>
9161	9057	<split-h>	<>
9161	9109	<L2kl>	<>
9161	9058	<K2kl>	<>
9162	9137	.	.
9162	9138	 	 
9162	9137	<~>	<~>
9162	9137	<split-s>	<split-s>
9162	9137	<split-h>	<split-h>
9162	9137	<name2>	<name2>
9162	9141	<aphaerese>	<aphaerese>
9162	9144	<>	<aphaerese>
9162	9137	<elision3>	<elision3>
9162	9144	<>	<elision3>
9162	9137	<elision2>	<elision2>
9162	9144	<>	<elision2>
9162	9137	<elision1>	<elision1>
9162	9144	<>	<elision1>
9162	9134	.	υ
9162	9061	s	υ
9162	9134	.	u
9162	9061	s	u
9162	9145	.	κ
9162	9151	s	κ
9162	9070	s	k
9162	9006	s	U
9162	9157	s	K
9162	9134	.	α
9162	9061	s	α
9162	9134	.	a
9162	9061	s	a
9162	9064	s	A
9162	9070	s	λ
9162	9070	s	l
9162	9073	s	L
9162	8503	<2s>	<>
9163	9140	.	.
9163	9143	 	 
9163	9140	<~>	<~>
9163	9140	<split-s>	<split-s>
9163	9140	<split-h>	<split-h>
9163	9140	<name2>	<name2>
9163	9160	<aphaerese>	<aphaerese>
9163	9140	<>	<aphaerese>
9163	9140	<elision3>	<elision3>
9163	9140	<>	<elision3>
9163	9140	<elision2>	<elision2>
9163	9140	<>	<elision2>
9163	9140	<elision1>	<elision1>
9163	9140	<>	<elision1>
9163	9136	.	υ
9163	9063	s	υ
9163	9136	.	u
9163	9063	s	u
9163	9147	.	κ
9163	9153	s	κ
9163	9072	s	k
9163	9008	s	U
9163	9107	s	K
9163	9136	.	α
9163	9063	s	α
9163	9136	.	a
9163	9063	s	a
9163	9066	s	A
9163	9072	s	λ
9163	9072	s	l
9163	9117	s	L
9163	8505	<2s>	<>
9164	9165	<name>	<name>
9164	9166	<>	<name>
9164	9168	<>	<aphaerese>
9164	9168	<>	<elision3>
9164	9168	<>	<elision2>
9164	9168	<>	<elision1>
9164	8821	<2s>	<>
9164	9169	<L2kl>	<>
9164	9178	<K2kl>	<>
9165	9107	s	k
9165	9117	s	l
9165	8711	<2s>	<>
9166	9167	<>	<aphaerese>
9166	9167	<>	<elision3>
9166	9167	<>	<elision2>
9166	9167	<>	<elision1>
9166	9170	<L2kl>	<>
9166	9173	<K2kl>	<>
9167	9168	<>	<aphaerese>
9167	9168	<>	<elision3>
9167	9168	<>	<elision2>
9167	9168	<>	<elision1>
9167	9171	<L2kl>	<>
9167	9174	<K2kl>	<>
9168	9166	<>	<name>
9168	9168	<>	<aphaerese>
9168	9168	<>	<elision3>
9168	9168	<>	<elision2>
9168	9168	<>	<elision1>
9168	9169	<L2kl>	<>
9168	9172	<K2kl>	<>
9169	9170	<>	<name>
9169	9169	<>	<aphaerese>
9169	9169	<>	<elision3>
9169	9169	<>	<elision2>
9169	9169	<>	<elision1>
9169	9134	.	κ
9169	9134	.	λ
9169	8880	<2s>	<>
9170	9171	<>	<aphaerese>
9170	9171	<>	<elision3>
9170	9171	<>	<elision2>
9170	9171	<>	<elision1>
9170	9136	.	κ
9170	9136	.	λ
9170	8881	<2s>	<>
9171	9169	<>	<aphaerese>
9171	9169	<>	<elision3>
9171	9169	<>	<elision2>
9171	9169	<>	<elision1>
9171	9134	.	κ
9171	9134	.	λ
9171	8879	<2s>	<>
9172	9137	.	.
9172	9138	 	 
9172	9137	<~>	<~>
9172	9137	<split-s>	<split-s>
9172	9137	<split-h>	<split-h>
9172	9137	<name2>	<name2>
9172	9173	<>	<name>
9172	9141	<aphaerese>	<aphaerese>
9172	9172	<>	<aphaerese>
9172	9137	<elision3>	<elision3>
9172	9172	<>	<elision3>
9172	9137	<elision2>	<elision2>
9172	9172	<>	<elision2>
9172	9137	<elision1>	<elision1>
9172	9172	<>	<elision1>
9172	9134	.	υ
9172	9061	s	υ
9172	9134	.	u
9172	9061	s	u
9172	9175	s	κ
9172	9070	s	k
9172	9006	s	U
9172	9161	s	K
9172	9134	.	α
9172	9061	s	α
9172	9134	.	a
9172	9061	s	a
9172	9064	s	A
9172	9175	s	λ
9172	9070	s	l
9172	9115	s	L
9172	8816	<2s>	<>
9173	9140	.	.
9173	9143	 	 
9173	9140	<~>	<~>
9173	9140	<split-s>	<split-s>
9173	9140	<split-h>	<split-h>
9173	9140	<name2>	<name2>
9173	9160	<aphaerese>	<aphaerese>
9173	9174	<>	<aphaerese>
9173	9140	<elision3>	<elision3>
9173	9174	<>	<elision3>
9173	9140	<elision2>	<elision2>
9173	9174	<>	<elision2>
9173	9140	<elision1>	<elision1>
9173	9174	<>	<elision1>
9173	9136	.	υ
9173	9063	s	υ
9173	9136	.	u
9173	9063	s	u
9173	9177	s	κ
9173	9072	s	k
9173	9008	s	U
9173	9107	s	K
9173	9136	.	α
9173	9063	s	α
9173	9136	.	a
9173	9063	s	a
9173	9066	s	A
9173	9177	s	λ
9173	9072	s	l
9173	9117	s	L
9173	8817	<2s>	<>
9174	9137	.	.
9174	9138	 	 
9174	9137	<~>	<~>
9174	9137	<split-s>	<split-s>
9174	9137	<split-h>	<split-h>
9174	9137	<name2>	<name2>
9174	9141	<aphaerese>	<aphaerese>
9174	9172	<>	<aphaerese>
9174	9137	<elision3>	<elision3>
9174	9172	<>	<elision3>
9174	9137	<elision2>	<elision2>
9174	9172	<>	<elision2>
9174	9137	<elision1>	<elision1>
9174	9172	<>	<elision1>
9174	9134	.	υ
9174	9061	s	υ
9174	9134	.	u
9174	9061	s	u
9174	9175	s	κ
9174	9070	s	k
9174	9006	s	U
9174	9161	s	K
9174	9134	.	α
9174	9061	s	α
9174	9134	.	a
9174	9061	s	a
9174	9064	s	A
9174	9175	s	λ
9174	9070	s	l
9174	9115	s	L
9174	8815	<2s>	<>
9175	8991	.	.
9175	8991	 	 
9175	8991	<~>	<~>
9175	8991	<split-s>	<split-s>
9175	8991	<split-h>	<split-h>
9175	8991	<name2>	<name2>
9175	9176	<>	<name>
9175	8994	<aphaerese>	<aphaerese>
9175	9175	<>	<aphaerese>
9175	9175	<>	<elision3>
9175	9175	<>	<elision2>
9175	9175	<>	<elision1>
9175	8988	.	υ
9175	8988	.	u
9175	8988	.	κ
9175	8988	.	α
9175	8988	.	a
9175	8988	.	λ
9175	9129	<split-h>	<>
9176	8993	.	.
9176	8993	 	 
9176	8993	<~>	<~>
9176	8993	<split-s>	<split-s>
9176	8993	<split-h>	<split-h>
9176	8993	<name2>	<name2>
9176	8996	<aphaerese>	<aphaerese>
9176	9177	<>	<aphaerese>
9176	9177	<>	<elision3>
9176	9177	<>	<elision2>
9176	9177	<>	<elision1>
9176	8990	.	υ
9176	8990	.	u
9176	8990	.	κ
9176	8990	.	α
9176	8990	.	a
9176	8990	.	λ
9176	9130	<split-h>	<>
9177	8991	.	.
9177	8991	 	 
9177	8991	<~>	<~>
9177	8991	<split-s>	<split-s>
9177	8991	<split-h>	<split-h>
9177	8991	<name2>	<name2>
9177	8994	<aphaerese>	<aphaerese>
9177	9175	<>	<aphaerese>
9177	9175	<>	<elision3>
9177	9175	<>	<elision2>
9177	9175	<>	<elision1>
9177	8988	.	υ
9177	8988	.	u
9177	8988	.	κ
9177	8988	.	α
9177	8988	.	a
9177	8988	.	λ
9177	9128	<split-h>	<>
9178	9137	.	.
9178	9138	 	 
9178	9137	<~>	<~>
9178	9137	<split-s>	<split-s>
9178	9137	<split-h>	<split-h>
9178	9137	<name2>	<name2>
9178	9165	<name2>	<name>
9178	9173	<>	<name>
9178	9141	<aphaerese>	<aphaerese>
9178	9172	<>	<aphaerese>
9178	9137	<elision3>	<elision3>
9178	9172	<>	<elision3>
9178	9137	<elision2>	<elision2>
9178	9172	<>	<elision2>
9178	9137	<elision1>	<elision1>
9178	9172	<>	<elision1>
9178	9134	.	υ
9178	9061	s	υ
9178	9134	.	u
9178	9061	s	u
9178	9175	s	κ
9178	9070	s	k
9178	9006	s	U
9178	9161	s	K
9178	9134	.	α
9178	9061	s	α
9178	9134	.	a
9178	9061	s	a
9178	9064	s	A
9178	9175	s	λ
9178	9070	s	l
9178	9115	s	L
9178	8825	<2s>	<>
9179	9137	.	.
9179	9138	 	 
9179	9137	<~>	<~>
9179	9137	<split-s>	<split-s>
9179	9137	<split-h>	<split-h>
9179	9137	<name2>	<name2>
9179	9180	<>	<name>
9179	9141	<aphaerese>	<aphaerese>
9179	9179	<>	<aphaerese>
9179	9137	<elision3>	<elision3>
9179	9179	<>	<elision3>
9179	9137	<elision2>	<elision2>
9179	9179	<>	<elision2>
9179	9137	<elision1>	<elision1>
9179	9179	<>	<elision1>
9179	9134	.	υ
9179	9061	s	υ
9179	9134	.	u
9179	9061	s	u
9179	9134	.	κ
9179	9175	s	κ
9179	9070	s	k
9179	9006	s	U
9179	9161	s	K
9179	9134	.	α
9179	9061	s	α
9179	9134	.	a
9179	9061	s	a
9179	9064	s	A
9179	9134	.	λ
9179	9175	s	λ
9179	9070	s	l
9179	9115	s	L
9179	8701	<2s>	<>
9180	9140	.	.
9180	9143	 	 
9180	9140	<~>	<~>
9180	9140	<split-s>	<split-s>
9180	9140	<split-h>	<split-h>
9180	9140	<name2>	<name2>
9180	9160	<aphaerese>	<aphaerese>
9180	9181	<>	<aphaerese>
9180	9140	<elision3>	<elision3>
9180	9181	<>	<elision3>
9180	9140	<elision2>	<elision2>
9180	9181	<>	<elision2>
9180	9140	<elision1>	<elision1>
9180	9181	<>	<elision1>
9180	9136	.	υ
9180	9063	s	υ
9180	9136	.	u
9180	9063	s	u
9180	9136	.	κ
9180	9177	s	κ
9180	9072	s	k
9180	9008	s	U
9180	9107	s	K
9180	9136	.	α
9180	9063	s	α
9180	9136	.	a
9180	9063	s	a
9180	9066	s	A
9180	9136	.	λ
9180	9177	s	λ
9180	9072	s	l
9180	9117	s	L
9180	8702	<2s>	<>
9181	9137	.	.
9181	9138	 	 
9181	9137	<~>	<~>
9181	9137	<split-s>	<split-s>
9181	9137	<split-h>	<split-h>
9181	9137	<name2>	<name2>
9181	9141	<aphaerese>	<aphaerese>
9181	9179	<>	<aphaerese>
9181	9137	<elision3>	<elision3>
9181	9179	<>	<elision3>
9181	9137	<elision2>	<elision2>
9181	9179	<>	<elision2>
9181	9137	<elision1>	<elision1>
9181	9179	<>	<elision1>
9181	9134	.	υ
9181	9061	s	υ
9181	9134	.	u
9181	9061	s	u
9181	9134	.	κ
9181	9175	s	κ
9181	9070	s	k
9181	9006	s	U
9181	9161	s	K
9181	9134	.	α
9181	9061	s	α
9181	9134	.	a
9181	9061	s	a
9181	9064	s	A
9181	9134	.	λ
9181	9175	s	λ
9181	9070	s	l
9181	9115	s	L
9181	8700	<2s>	<>
9182	9165	<name>	<name>
9182	9183	<>	<name>
9182	9185	<>	<aphaerese>
9182	9185	<>	<elision3>
9182	9185	<>	<elision2>
9182	9185	<>	<elision1>
9182	8821	<2s>	<>
9182	9186	<L2kl>	<>
9183	9184	<>	<aphaerese>
9183	9184	<>	<elision3>
9183	9184	<>	<elision2>
9183	9184	<>	<elision1>
9183	9180	<L2kl>	<>
9184	9185	<>	<aphaerese>
9184	9185	<>	<elision3>
9184	9185	<>	<elision2>
9184	9185	<>	<elision1>
9184	9181	<L2kl>	<>
9185	9183	<>	<name>
9185	9185	<>	<aphaerese>
9185	9185	<>	<elision3>
9185	9185	<>	<elision2>
9185	9185	<>	<elision1>
9185	9179	<L2kl>	<>
9186	9137	.	.
9186	9138	 	 
9186	9137	<~>	<~>
9186	9137	<split-s>	<split-s>
9186	9137	<split-h>	<split-h>
9186	9137	<name2>	<name2>
9186	9165	<name2>	<name>
9186	9180	<>	<name>
9186	9141	<aphaerese>	<aphaerese>
9186	9179	<>	<aphaerese>
9186	9137	<elision3>	<elision3>
9186	9179	<>	<elision3>
9186	9137	<elision2>	<elision2>
9186	9179	<>	<elision2>
9186	9137	<elision1>	<elision1>
9186	9179	<>	<elision1>
9186	9134	.	υ
9186	9061	s	υ
9186	9134	.	u
9186	9061	s	u
9186	9134	.	κ
9186	9175	s	κ
9186	9070	s	k
9186	9006	s	U
9186	9161	s	K
9186	9134	.	α
9186	9061	s	α
9186	9134	.	a
9186	9061	s	a
9186	9064	s	A
9186	9134	.	λ
9186	9175	s	λ
9186	9070	s	l
9186	9115	s	L
9186	8890	<2s>	<>
9187	9188	<>	<name>
9187	9187	<>	<aphaerese>
9187	9187	<>	<elision3>
9187	9187	<>	<elision2>
9187	9187	<>	<elision1>
9187	9190	s	κ
9187	9315	s	k
9187	9333	s	K
9187	9190	s	λ
9187	9346	s	l
9187	9349	s	L
9187	8524	<1s>	<>
9188	9189	<>	<aphaerese>
9188	9189	<>	<elision3>
9188	9189	<>	<elision2>
9188	9189	<>	<elision1>
9188	9311	s	κ
9188	9317	s	k
9188	9336	s	K
9188	9311	s	λ
9188	9348	s	l
9188	9351	s	L
9188	8525	<1s>	<>
9189	9187	<>	<aphaerese>
9189	9187	<>	<elision3>
9189	9187	<>	<elision2>
9189	9187	<>	<elision1>
9189	9190	s	κ
9189	9315	s	k
9189	9333	s	K
9189	9190	s	λ
9189	9346	s	l
9189	9349	s	L
9189	8523	<1s>	<>
9190	9191	.	.
9190	9192	 	 
9190	9191	<~>	<~>
9190	9191	<split-s>	<split-s>
9190	9191	<split-h>	<split-h>
9190	9191	<name2>	<name2>
9190	9310	<>	<name>
9190	9195	<aphaerese>	<aphaerese>
9190	9190	<>	<aphaerese>
9190	9190	<>	<elision3>
9190	9190	<>	<elision2>
9190	9190	<>	<elision1>
9190	9199	.	υ
9190	9202	s	υ
9190	9199	.	u
9190	9202	s	u
9190	9199	.	κ
9190	9312	s	κ
9190	9241	s	k
9190	9244	s	U
9190	9296	s	K
9190	9199	.	α
9190	9202	s	α
9190	9199	.	a
9190	9202	s	a
9190	9274	s	A
9190	9199	.	λ
9190	9312	s	λ
9190	9241	s	l
9190	9303	s	L
9190	8915	<2s>	<>
9191	9191	.	.
9191	9192	 	 
9191	9191	<~>	<~>
9191	9191	<split-s>	<split-s>
9191	9191	<split-h>	<split-h>
9191	9191	<name2>	<name2>
9191	9309	<>	<name>
9191	9195	<aphaerese>	<aphaerese>
9191	9191	<>	<aphaerese>
9191	9191	<elision3>	<elision3>
9191	9191	<>	<elision3>
9191	9191	<elision2>	<elision2>
9191	9191	<>	<elision2>
9191	9191	<elision1>	<elision1>
9191	9191	<>	<elision1>
9191	9199	.	υ
9191	9202	s	υ
9191	9199	.	u
9191	9202	s	u
9191	9220	.	κ
9191	9235	s	κ
9191	9241	s	k
9191	9244	s	U
9191	9296	s	K
9191	9199	.	α
9191	9202	s	α
9191	9199	.	a
9191	9202	s	a
9191	9274	s	A
9191	9241	s	λ
9191	9241	s	l
9191	9303	s	L
9191	8504	<2s>	<>
9192	9191	.	.
9192	9192	 	 
9192	9191	<~>	<~>
9192	9191	<split-s>	<split-s>
9192	9191	<split-h>	<split-h>
9192	9191	<name2>	<name2>
9192	9193	<>	<name>
9192	9195	<aphaerese>	<aphaerese>
9192	9198	<>	<aphaerese>
9192	9191	<elision3>	<elision3>
9192	9198	<>	<elision3>
9192	9191	<elision2>	<elision2>
9192	9198	<>	<elision2>
9192	9191	<elision1>	<elision1>
9192	9198	<>	<elision1>
9192	9199	.	υ
9192	9285	s	υ
9192	9199	.	u
9192	9285	s	u
9192	9220	.	κ
9192	9286	s	κ
9192	9287	s	k
9192	9288	s	U
9192	9290	s	K
9192	9199	.	α
9192	9285	s	α
9192	9199	.	a
9192	9285	s	a
9192	9292	s	A
9192	9287	s	λ
9192	9287	s	l
9192	9293	s	L
9192	8504	<2s>	<>
9193	9194	.	.
9193	9197	 	 
9193	9194	<~>	<~>
9193	9194	<split-s>	<split-s>
9193	9194	<split-h>	<split-h>
9193	9194	<name2>	<name2>
9193	9295	<aphaerese>	<aphaerese>
9193	9308	<>	<aphaerese>
9193	9194	<elision3>	<elision3>
9193	9308	<>	<elision3>
9193	9194	<elision2>	<elision2>
9193	9308	<>	<elision2>
9193	9194	<elision1>	<elision1>
9193	9308	<>	<elision1>
9193	9201	.	υ
9193	9219	s	υ
9193	9201	.	u
9193	9219	s	u
9193	9222	.	κ
9193	9237	s	κ
9193	9243	s	k
9193	9246	s	U
9193	9250	s	K
9193	9201	.	α
9193	9219	s	α
9193	9201	.	a
9193	9219	s	a
9193	9276	s	A
9193	9243	s	λ
9193	9243	s	l
9193	9279	s	L
9193	8505	<2s>	<>
9194	9191	.	.
9194	9192	 	 
9194	9191	<~>	<~>
9194	9191	<split-s>	<split-s>
9194	9191	<split-h>	<split-h>
9194	9191	<name2>	<name2>
9194	9195	<aphaerese>	<aphaerese>
9194	9191	<>	<aphaerese>
9194	9191	<elision3>	<elision3>
9194	9191	<>	<elision3>
9194	9191	<elision2>	<elision2>
9194	9191	<>	<elision2>
9194	9191	<elision1>	<elision1>
9194	9191	<>	<elision1>
9194	9199	.	υ
9194	9202	s	υ
9194	9199	.	u
9194	9202	s	u
9194	9220	.	κ
9194	9235	s	κ
9194	9241	s	k
9194	9244	s	U
9194	9296	s	K
9194	9199	.	α
9194	9202	s	α
9194	9199	.	a
9194	9202	s	a
9194	9274	s	A
9194	9241	s	λ
9194	9241	s	l
9194	9303	s	L
9194	8503	<2s>	<>
9195	9191	.	.
9195	9192	 	 
9195	9191	<~>	<~>
9195	9191	<split-s>	<split-s>
9195	9191	<split-h>	<split-h>
9195	9191	<name2>	<name2>
9195	9196	<>	<name>
9195	9195	<aphaerese>	<aphaerese>
9195	9195	<>	<aphaerese>
9195	9191	<elision3>	<elision3>
9195	9195	<>	<elision3>
9195	9191	<elision2>	<elision2>
9195	9195	<>	<elision2>
9195	9191	<elision1>	<elision1>
9195	9195	<>	<elision1>
9195	9191	.	υ
9195	9191	.	u
9195	9220	.	κ
9195	9235	s	κ
9195	9241	s	k
9195	9244	s	U
9195	9296	s	K
9195	9191	.	α
9195	9191	.	a
9195	9274	s	A
9195	9241	s	λ
9195	9241	s	l
9195	9303	s	L
9195	8491	<2s>	<>
9196	9194	.	.
9196	9197	 	 
9196	9194	<~>	<~>
9196	9194	<split-s>	<split-s>
9196	9194	<split-h>	<split-h>
9196	9194	<name2>	<name2>
9196	9295	<aphaerese>	<aphaerese>
9196	9295	<>	<aphaerese>
9196	9194	<elision3>	<elision3>
9196	9295	<>	<elision3>
9196	9194	<elision2>	<elision2>
9196	9295	<>	<elision2>
9196	9194	<elision1>	<elision1>
9196	9295	<>	<elision1>
9196	9194	.	υ
9196	9194	.	u
9196	9222	.	κ
9196	9237	s	κ
9196	9243	s	k
9196	9246	s	U
9196	9298	s	K
9196	9194	.	α
9196	9194	.	a
9196	9276	s	A
9196	9243	s	λ
9196	9243	s	l
9196	9305	s	L
9196	8492	<2s>	<>
9197	9191	.	.
9197	9192	 	 
9197	9191	<~>	<~>
9197	9191	<split-s>	<split-s>
9197	9191	<split-h>	<split-h>
9197	9191	<name2>	<name2>
9197	9195	<aphaerese>	<aphaerese>
9197	9198	<>	<aphaerese>
9197	9191	<elision3>	<elision3>
9197	9198	<>	<elision3>
9197	9191	<elision2>	<elision2>
9197	9198	<>	<elision2>
9197	9191	<elision1>	<elision1>
9197	9198	<>	<elision1>
9197	9199	.	υ
9197	9285	s	υ
9197	9199	.	u
9197	9285	s	u
9197	9220	.	κ
9197	9286	s	κ
9197	9287	s	k
9197	9288	s	U
9197	9290	s	K
9197	9199	.	α
9197	9285	s	α
9197	9199	.	a
9197	9285	s	a
9197	9292	s	A
9197	9287	s	λ
9197	9287	s	l
9197	9293	s	L
9197	8503	<2s>	<>
9198	9191	.	.
9198	9192	 	 
9198	9191	<~>	<~>
9198	9191	<split-s>	<split-s>
9198	9191	<split-h>	<split-h>
9198	9191	<name2>	<name2>
9198	9193	<>	<name>
9198	9195	<aphaerese>	<aphaerese>
9198	9198	<>	<aphaerese>
9198	9191	<elision3>	<elision3>
9198	9198	<>	<elision3>
9198	9191	<elision2>	<elision2>
9198	9198	<>	<elision2>
9198	9191	<elision1>	<elision1>
9198	9198	<>	<elision1>
9198	9199	.	υ
9198	9202	s	υ
9198	9199	.	u
9198	9202	s	u
9198	9220	.	κ
9198	9235	s	κ
9198	9241	s	k
9198	9244	s	U
9198	9247	s	K
9198	9199	.	α
9198	9202	s	α
9198	9199	.	a
9198	9202	s	a
9198	9274	s	A
9198	9241	s	λ
9198	9241	s	l
9198	9277	s	L
9198	8504	<2s>	<>
9199	9200	<>	<name>
9199	9199	<>	<aphaerese>
9199	9191	<elision3>	<elision3>
9199	9199	<>	<elision3>
9199	9191	<elision2>	<elision2>
9199	9199	<>	<elision2>
9199	9191	<elision1>	<elision1>
9199	9199	<>	<elision1>
9199	104	<2s>	<>
9200	9201	<>	<aphaerese>
9200	9194	<elision3>	<elision3>
9200	9201	<>	<elision3>
9200	9194	<elision2>	<elision2>
9200	9201	<>	<elision2>
9200	9194	<elision1>	<elision1>
9200	9201	<>	<elision1>
9200	105	<2s>	<>
9201	9199	<>	<aphaerese>
9201	9191	<elision3>	<elision3>
9201	9199	<>	<elision3>
9201	9191	<elision2>	<elision2>
9201	9199	<>	<elision2>
9201	9191	<elision1>	<elision1>
9201	9199	<>	<elision1>
9201	103	<2s>	<>
9202	9203	.	.
9202	9203	 	 
9202	9203	<~>	<~>
9202	9203	<split-s>	<split-s>
9202	9203	<split-h>	<split-h>
9202	9203	<name2>	<name2>
9202	9218	<>	<name>
9202	9206	<aphaerese>	<aphaerese>
9202	9202	<>	<aphaerese>
9202	9202	<>	<elision3>
9202	9202	<>	<elision2>
9202	9202	<>	<elision1>
9202	9215	.	υ
9202	9215	.	u
9202	9209	.	κ
9202	9215	.	α
9202	9215	.	a
9202	8900	<split-s>	<>
9203	9203	.	.
9203	9203	 	 
9203	9203	<~>	<~>
9203	9203	<split-s>	<split-s>
9203	9203	<split-h>	<split-h>
9203	9203	<name2>	<name2>
9203	9204	<>	<name>
9203	9206	<aphaerese>	<aphaerese>
9203	9203	<>	<aphaerese>
9203	9203	<elision3>	<elision3>
9203	9203	<>	<elision3>
9203	9203	<elision2>	<elision2>
9203	9203	<>	<elision2>
9203	9203	<elision1>	<elision1>
9203	9203	<>	<elision1>
9203	9215	.	υ
9203	9215	.	u
9203	9209	.	κ
9203	9215	.	α
9203	9215	.	a
9203	8846	<split-s>	<>
9204	9205	.	.
9204	9205	 	 
9204	9205	<~>	<~>
9204	9205	<split-s>	<split-s>
9204	9205	<split-h>	<split-h>
9204	9205	<name2>	<name2>
9204	9208	<aphaerese>	<aphaerese>
9204	9205	<>	<aphaerese>
9204	9205	<elision3>	<elision3>
9204	9205	<>	<elision3>
9204	9205	<elision2>	<elision2>
9204	9205	<>	<elision2>
9204	9205	<elision1>	<elision1>
9204	9205	<>	<elision1>
9204	9217	.	υ
9204	9217	.	u
9204	9211	.	κ
9204	9217	.	α
9204	9217	.	a
9204	8847	<split-s>	<>
9205	9203	.	.
9205	9203	 	 
9205	9203	<~>	<~>
9205	9203	<split-s>	<split-s>
9205	9203	<split-h>	<split-h>
9205	9203	<name2>	<name2>
9205	9206	<aphaerese>	<aphaerese>
9205	9203	<>	<aphaerese>
9205	9203	<elision3>	<elision3>
9205	9203	<>	<elision3>
9205	9203	<elision2>	<elision2>
9205	9203	<>	<elision2>
9205	9203	<elision1>	<elision1>
9205	9203	<>	<elision1>
9205	9215	.	υ
9205	9215	.	u
9205	9209	.	κ
9205	9215	.	α
9205	9215	.	a
9205	8848	<split-s>	<>
9206	9203	.	.
9206	9203	 	 
9206	9203	<~>	<~>
9206	9203	<split-s>	<split-s>
9206	9203	<split-h>	<split-h>
9206	9203	<name2>	<name2>
9206	9207	<>	<name>
9206	9206	<aphaerese>	<aphaerese>
9206	9206	<>	<aphaerese>
9206	9203	<elision3>	<elision3>
9206	9206	<>	<elision3>
9206	9203	<elision2>	<elision2>
9206	9206	<>	<elision2>
9206	9203	<elision1>	<elision1>
9206	9206	<>	<elision1>
9206	9203	.	υ
9206	9203	.	u
9206	9209	.	κ
9206	9203	.	α
9206	9203	.	a
9206	8893	<split-s>	<>
9207	9205	.	.
9207	9205	 	 
9207	9205	<~>	<~>
9207	9205	<split-s>	<split-s>
9207	9205	<split-h>	<split-h>
9207	9205	<name2>	<name2>
9207	9208	<aphaerese>	<aphaerese>
9207	9208	<>	<aphaerese>
9207	9205	<elision3>	<elision3>
9207	9208	<>	<elision3>
9207	9205	<elision2>	<elision2>
9207	9208	<>	<elision2>
9207	9205	<elision1>	<elision1>
9207	9208	<>	<elision1>
9207	9205	.	υ
9207	9205	.	u
9207	9211	.	κ
9207	9205	.	α
9207	9205	.	a
9207	8894	<split-s>	<>
9208	9203	.	.
9208	9203	 	 
9208	9203	<~>	<~>
9208	9203	<split-s>	<split-s>
9208	9203	<split-h>	<split-h>
9208	9203	<name2>	<name2>
9208	9206	<aphaerese>	<aphaerese>
9208	9206	<>	<aphaerese>
9208	9203	<elision3>	<elision3>
9208	9206	<>	<elision3>
9208	9203	<elision2>	<elision2>
9208	9206	<>	<elision2>
9208	9203	<elision1>	<elision1>
9208	9206	<>	<elision1>
9208	9203	.	υ
9208	9203	.	u
9208	9209	.	κ
9208	9203	.	α
9208	9203	.	a
9208	8892	<split-s>	<>
9209	9210	<>	<name>
9209	9209	<>	<aphaerese>
9209	9212	<elision3>	<elision3>
9209	9209	<>	<elision3>
9209	9212	<elision2>	<elision2>
9209	9209	<>	<elision2>
9209	9212	<elision1>	<elision1>
9209	9209	<>	<elision1>
9209	8583	<split-s>	<>
9210	9211	<>	<aphaerese>
9210	9214	<elision3>	<elision3>
9210	9211	<>	<elision3>
9210	9214	<elision2>	<elision2>
9210	9211	<>	<elision2>
9210	9214	<elision1>	<elision1>
9210	9211	<>	<elision1>
9210	8584	<split-s>	<>
9211	9209	<>	<aphaerese>
9211	9212	<elision3>	<elision3>
9211	9209	<>	<elision3>
9211	9212	<elision2>	<elision2>
9211	9209	<>	<elision2>
9211	9212	<elision1>	<elision1>
9211	9209	<>	<elision1>
9211	8582	<split-s>	<>
9212	9213	<>	<name>
9212	9212	<>	<aphaerese>
9212	9212	<>	<elision3>
9212	9212	<>	<elision2>
9212	9212	<>	<elision1>
9212	8580	<split-s>	<>
9213	9214	<>	<aphaerese>
9213	9214	<>	<elision3>
9213	9214	<>	<elision2>
9213	9214	<>	<elision1>
9213	8581	<split-s>	<>
9214	9212	<>	<aphaerese>
9214	9212	<>	<elision3>
9214	9212	<>	<elision2>
9214	9212	<>	<elision1>
9214	8579	<split-s>	<>
9215	9216	<>	<name>
9215	9215	<>	<aphaerese>
9215	9203	<elision3>	<elision3>
9215	9215	<>	<elision3>
9215	9203	<elision2>	<elision2>
9215	9215	<>	<elision2>
9215	9203	<elision1>	<elision1>
9215	9215	<>	<elision1>
9215	8333	<split-s>	<>
9216	9217	<>	<aphaerese>
9216	9205	<elision3>	<elision3>
9216	9217	<>	<elision3>
9216	9205	<elision2>	<elision2>
9216	9217	<>	<elision2>
9216	9205	<elision1>	<elision1>
9216	9217	<>	<elision1>
9216	8334	<split-s>	<>
9217	9215	<>	<aphaerese>
9217	9203	<elision3>	<elision3>
9217	9215	<>	<elision3>
9217	9203	<elision2>	<elision2>
9217	9215	<>	<elision2>
9217	9203	<elision1>	<elision1>
9217	9215	<>	<elision1>
9217	8332	<split-s>	<>
9218	9205	.	.
9218	9205	 	 
9218	9205	<~>	<~>
9218	9205	<split-s>	<split-s>
9218	9205	<split-h>	<split-h>
9218	9205	<name2>	<name2>
9218	9208	<aphaerese>	<aphaerese>
9218	9219	<>	<aphaerese>
9218	9219	<>	<elision3>
9218	9219	<>	<elision2>
9218	9219	<>	<elision1>
9218	9217	.	υ
9218	9217	.	u
9218	9211	.	κ
9218	9217	.	α
9218	9217	.	a
9218	8901	<split-s>	<>
9219	9203	.	.
9219	9203	 	 
9219	9203	<~>	<~>
9219	9203	<split-s>	<split-s>
9219	9203	<split-h>	<split-h>
9219	9203	<name2>	<name2>
9219	9206	<aphaerese>	<aphaerese>
9219	9202	<>	<aphaerese>
9219	9202	<>	<elision3>
9219	9202	<>	<elision2>
9219	9202	<>	<elision1>
9219	9215	.	υ
9219	9215	.	u
9219	9209	.	κ
9219	9215	.	α
9219	9215	.	a
9219	8899	<split-s>	<>
9220	9221	<>	<name>
9220	9220	<>	<aphaerese>
9220	9223	<elision3>	<elision3>
9220	9220	<>	<elision3>
9220	9223	<elision2>	<elision2>
9220	9220	<>	<elision2>
9220	9223	<elision1>	<elision1>
9220	9220	<>	<elision1>
9220	8488	<2s>	<>
9221	9222	<>	<aphaerese>
9221	9225	<elision3>	<elision3>
9221	9222	<>	<elision3>
9221	9225	<elision2>	<elision2>
9221	9222	<>	<elision2>
9221	9225	<elision1>	<elision1>
9221	9222	<>	<elision1>
9221	8489	<2s>	<>
9222	9220	<>	<aphaerese>
9222	9223	<elision3>	<elision3>
9222	9220	<>	<elision3>
9222	9223	<elision2>	<elision2>
9222	9220	<>	<elision2>
9222	9223	<elision1>	<elision1>
9222	9220	<>	<elision1>
9222	8487	<2s>	<>
9223	9224	<>	<name>
9223	9223	<>	<aphaerese>
9223	9223	<>	<elision3>
9223	9223	<>	<elision2>
9223	9223	<>	<elision1>
9223	9226	s	κ
9223	9226	s	k
9223	9229	s	K
9223	9226	s	λ
9223	9226	s	l
9223	9232	s	L
9223	8349	<2s>	<>
9224	9225	<>	<aphaerese>
9224	9225	<>	<elision3>
9224	9225	<>	<elision2>
9224	9225	<>	<elision1>
9224	9228	s	κ
9224	9228	s	k
9224	9231	s	K
9224	9228	s	λ
9224	9228	s	l
9224	9234	s	L
9224	8350	<2s>	<>
9225	9223	<>	<aphaerese>
9225	9223	<>	<elision3>
9225	9223	<>	<elision2>
9225	9223	<>	<elision1>
9225	9226	s	κ
9225	9226	s	k
9225	9229	s	K
9225	9226	s	λ
9225	9226	s	l
9225	9232	s	L
9225	8348	<2s>	<>
9226	9227	<>	<name>
9226	9226	<>	<aphaerese>
9226	9226	<>	<elision3>
9226	9226	<>	<elision2>
9226	9226	<>	<elision1>
9226	8921	<split-s>	<>
9227	9228	<>	<aphaerese>
9227	9228	<>	<elision3>
9227	9228	<>	<elision2>
9227	9228	<>	<elision1>
9227	8922	<split-s>	<>
9228	9226	<>	<aphaerese>
9228	9226	<>	<elision3>
9228	9226	<>	<elision2>
9228	9226	<>	<elision1>
9228	8920	<split-s>	<>
9229	9230	<>	<name>
9229	9229	<>	<aphaerese>
9229	9229	<>	<elision3>
9229	9229	<>	<elision2>
9229	9229	<>	<elision1>
9229	9226	<K2kl>	<>
9230	9231	<>	<aphaerese>
9230	9231	<>	<elision3>
9230	9231	<>	<elision2>
9230	9231	<>	<elision1>
9230	9227	<K2kl>	<>
9231	9229	<>	<aphaerese>
9231	9229	<>	<elision3>
9231	9229	<>	<elision2>
9231	9229	<>	<elision1>
9231	9228	<K2kl>	<>
9232	9233	<>	<name>
9232	9232	<>	<aphaerese>
9232	9232	<>	<elision3>
9232	9232	<>	<elision2>
9232	9232	<>	<elision1>
9232	9226	<L2kl>	<>
9233	9234	<>	<aphaerese>
9233	9234	<>	<elision3>
9233	9234	<>	<elision2>
9233	9234	<>	<elision1>
9233	9227	<L2kl>	<>
9234	9232	<>	<aphaerese>
9234	9232	<>	<elision3>
9234	9232	<>	<elision2>
9234	9232	<>	<elision1>
9234	9228	<L2kl>	<>
9235	9203	.	.
9235	9203	 	 
9235	9203	<~>	<~>
9235	9203	<split-s>	<split-s>
9235	9203	<split-h>	<split-h>
9235	9203	<name2>	<name2>
9235	9236	<>	<name>
9235	9206	<aphaerese>	<aphaerese>
9235	9235	<>	<aphaerese>
9235	9238	<elision3>	<elision3>
9235	9235	<>	<elision3>
9235	9238	<elision2>	<elision2>
9235	9235	<>	<elision2>
9235	9238	<elision1>	<elision1>
9235	9235	<>	<elision1>
9235	9215	.	υ
9235	9215	.	u
9235	9215	.	κ
9235	9215	.	α
9235	9215	.	a
9235	9215	.	λ
9235	8983	<split-s>	<>
9236	9205	.	.
9236	9205	 	 
9236	9205	<~>	<~>
9236	9205	<split-s>	<split-s>
9236	9205	<split-h>	<split-h>
9236	9205	<name2>	<name2>
9236	9208	<aphaerese>	<aphaerese>
9236	9237	<>	<aphaerese>
9236	9240	<elision3>	<elision3>
9236	9237	<>	<elision3>
9236	9240	<elision2>	<elision2>
9236	9237	<>	<elision2>
9236	9240	<elision1>	<elision1>
9236	9237	<>	<elision1>
9236	9217	.	υ
9236	9217	.	u
9236	9217	.	κ
9236	9217	.	α
9236	9217	.	a
9236	9217	.	λ
9236	8984	<split-s>	<>
9237	9203	.	.
9237	9203	 	 
9237	9203	<~>	<~>
9237	9203	<split-s>	<split-s>
9237	9203	<split-h>	<split-h>
9237	9203	<name2>	<name2>
9237	9206	<aphaerese>	<aphaerese>
9237	9235	<>	<aphaerese>
9237	9238	<elision3>	<elision3>
9237	9235	<>	<elision3>
9237	9238	<elision2>	<elision2>
9237	9235	<>	<elision2>
9237	9238	<elision1>	<elision1>
9237	9235	<>	<elision1>
9237	9215	.	υ
9237	9215	.	u
9237	9215	.	κ
9237	9215	.	α
9237	9215	.	a
9237	9215	.	λ
9237	8982	<split-s>	<>
9238	9203	.	.
9238	9203	 	 
9238	9203	<~>	<~>
9238	9203	<split-s>	<split-s>
9238	9203	<split-h>	<split-h>
9238	9203	<name2>	<name2>
9238	9239	<>	<name>
9238	9206	<aphaerese>	<aphaerese>
9238	9238	<>	<aphaerese>
9238	9203	<elision3>	<elision3>
9238	9238	<>	<elision3>
9238	9203	<elision2>	<elision2>
9238	9238	<>	<elision2>
9238	9203	<elision1>	<elision1>
9238	9238	<>	<elision1>
9238	9215	.	υ
9238	9215	.	u
9238	9209	.	κ
9238	9215	.	α
9238	9215	.	a
9238	8980	<split-s>	<>
9239	9205	.	.
9239	9205	 	 
9239	9205	<~>	<~>
9239	9205	<split-s>	<split-s>
9239	9205	<split-h>	<split-h>
9239	9205	<name2>	<name2>
9239	9208	<aphaerese>	<aphaerese>
9239	9240	<>	<aphaerese>
9239	9205	<elision3>	<elision3>
9239	9240	<>	<elision3>
9239	9205	<elision2>	<elision2>
9239	9240	<>	<elision2>
9239	9205	<elision1>	<elision1>
9239	9240	<>	<elision1>
9239	9217	.	υ
9239	9217	.	u
9239	9211	.	κ
9239	9217	.	α
9239	9217	.	a
9239	8981	<split-s>	<>
9240	9203	.	.
9240	9203	 	 
9240	9203	<~>	<~>
9240	9203	<split-s>	<split-s>
9240	9203	<split-h>	<split-h>
9240	9203	<name2>	<name2>
9240	9206	<aphaerese>	<aphaerese>
9240	9238	<>	<aphaerese>
9240	9203	<elision3>	<elision3>
9240	9238	<>	<elision3>
9240	9203	<elision2>	<elision2>
9240	9238	<>	<elision2>
9240	9203	<elision1>	<elision1>
9240	9238	<>	<elision1>
9240	9215	.	υ
9240	9215	.	u
9240	9209	.	κ
9240	9215	.	α
9240	9215	.	a
9240	8979	<split-s>	<>
9241	9203	.	.
9241	9203	 	 
9241	9203	<~>	<~>
9241	9203	<split-s>	<split-s>
9241	9203	<split-h>	<split-h>
9241	9203	<name2>	<name2>
9241	9242	<>	<name>
9241	9206	<aphaerese>	<aphaerese>
9241	9241	<>	<aphaerese>
9241	9203	<elision3>	<elision3>
9241	9241	<>	<elision3>
9241	9203	<elision2>	<elision2>
9241	9241	<>	<elision2>
9241	9203	<elision1>	<elision1>
9241	9241	<>	<elision1>
9241	9215	.	υ
9241	9215	.	u
9241	9215	.	κ
9241	9215	.	α
9241	9215	.	a
9241	9215	.	λ
9241	9004	<split-s>	<>
9242	9205	.	.
9242	9205	 	 
9242	9205	<~>	<~>
9242	9205	<split-s>	<split-s>
9242	9205	<split-h>	<split-h>
9242	9205	<name2>	<name2>
9242	9208	<aphaerese>	<aphaerese>
9242	9243	<>	<aphaerese>
9242	9205	<elision3>	<elision3>
9242	9243	<>	<elision3>
9242	9205	<elision2>	<elision2>
9242	9243	<>	<elision2>
9242	9205	<elision1>	<elision1>
9242	9243	<>	<elision1>
9242	9217	.	υ
9242	9217	.	u
9242	9217	.	κ
9242	9217	.	α
9242	9217	.	a
9242	9217	.	λ
9242	9005	<split-s>	<>
9243	9203	.	.
9243	9203	 	 
9243	9203	<~>	<~>
9243	9203	<split-s>	<split-s>
9243	9203	<split-h>	<split-h>
9243	9203	<name2>	<name2>
9243	9206	<aphaerese>	<aphaerese>
9243	9241	<>	<aphaerese>
9243	9203	<elision3>	<elision3>
9243	9241	<>	<elision3>
9243	9203	<elision2>	<elision2>
9243	9241	<>	<elision2>
9243	9203	<elision1>	<elision1>
9243	9241	<>	<elision1>
9243	9215	.	υ
9243	9215	.	u
9243	9215	.	κ
9243	9215	.	α
9243	9215	.	a
9243	9215	.	λ
9243	9003	<split-s>	<>
9244	9245	<>	<name>
9244	9244	<>	<aphaerese>
9244	9244	<>	<elision3>
9244	9244	<>	<elision2>
9244	9244	<>	<elision1>
9244	9203	<U2kl>	<>
9245	9246	<>	<aphaerese>
9245	9246	<>	<elision3>
9245	9246	<>	<elision2>
9245	9246	<>	<elision1>
9245	9204	<U2kl>	<>
9246	9244	<>	<aphaerese>
9246	9244	<>	<elision3>
9246	9244	<>	<elision2>
9246	9244	<>	<elision1>
9246	9205	<U2kl>	<>
9247	9248	<name>	<name>
9247	9249	<>	<name>
9247	9251	<>	<aphaerese>
9247	9251	<>	<elision3>
9247	9251	<>	<elision2>
9247	9251	<>	<elision1>
9247	9057	<split-s>	<>
9247	9252	<A2kl>	<>
9247	9261	<L2kl>	<>
9247	9273	<K2kl>	<>
9248	9011	<split-s>	<>
9249	9250	<>	<aphaerese>
9249	9250	<>	<elision3>
9249	9250	<>	<elision2>
9249	9250	<>	<elision1>
9249	9253	<A2kl>	<>
9249	9262	<L2kl>	<>
9249	9271	<K2kl>	<>
9250	9251	<>	<aphaerese>
9250	9251	<>	<elision3>
9250	9251	<>	<elision2>
9250	9251	<>	<elision1>
9250	9254	<A2kl>	<>
9250	9263	<L2kl>	<>
9250	9272	<K2kl>	<>
9251	9249	<>	<name>
9251	9251	<>	<aphaerese>
9251	9251	<>	<elision3>
9251	9251	<>	<elision2>
9251	9251	<>	<elision1>
9251	9252	<A2kl>	<>
9251	9261	<L2kl>	<>
9251	9270	<K2kl>	<>
9252	9253	<>	<name>
9252	9252	<>	<aphaerese>
9252	9252	<>	<elision3>
9252	9252	<>	<elision2>
9252	9252	<>	<elision1>
9252	9255	.	κ
9252	9255	.	λ
9252	9031	<split-s>	<>
9253	9254	<>	<aphaerese>
9253	9254	<>	<elision3>
9253	9254	<>	<elision2>
9253	9254	<>	<elision1>
9253	9257	.	κ
9253	9257	.	λ
9253	9032	<split-s>	<>
9254	9252	<>	<aphaerese>
9254	9252	<>	<elision3>
9254	9252	<>	<elision2>
9254	9252	<>	<elision1>
9254	9255	.	κ
9254	9255	.	λ
9254	9030	<split-s>	<>
9255	9256	<>	<name>
9255	9255	<>	<aphaerese>
9255	9258	<elision3>	<elision3>
9255	9255	<>	<elision3>
9255	9258	<elision2>	<elision2>
9255	9255	<>	<elision2>
9255	9258	<elision1>	<elision1>
9255	9255	<>	<elision1>
9255	9028	<split-s>	<>
9256	9257	<>	<aphaerese>
9256	9260	<elision3>	<elision3>
9256	9257	<>	<elision3>
9256	9260	<elision2>	<elision2>
9256	9257	<>	<elision2>
9256	9260	<elision1>	<elision1>
9256	9257	<>	<elision1>
9256	9029	<split-s>	<>
9257	9255	<>	<aphaerese>
9257	9258	<elision3>	<elision3>
9257	9255	<>	<elision3>
9257	9258	<elision2>	<elision2>
9257	9255	<>	<elision2>
9257	9258	<elision1>	<elision1>
9257	9255	<>	<elision1>
9257	9027	<split-s>	<>
9258	9203	.	.
9258	9203	 	 
9258	9203	<~>	<~>
9258	9203	<split-s>	<split-s>
9258	9203	<split-h>	<split-h>
9258	9203	<name2>	<name2>
9258	9259	<>	<name>
9258	9206	<aphaerese>	<aphaerese>
9258	9258	<>	<aphaerese>
9258	9203	<elision3>	<elision3>
9258	9258	<>	<elision3>
9258	9203	<elision2>	<elision2>
9258	9258	<>	<elision2>
9258	9203	<elision1>	<elision1>
9258	9258	<>	<elision1>
9258	9215	.	υ
9258	9215	.	u
9258	9215	.	α
9258	9215	.	a
9258	9025	<split-s>	<>
9259	9205	.	.
9259	9205	 	 
9259	9205	<~>	<~>
9259	9205	<split-s>	<split-s>
9259	9205	<split-h>	<split-h>
9259	9205	<name2>	<name2>
9259	9208	<aphaerese>	<aphaerese>
9259	9260	<>	<aphaerese>
9259	9205	<elision3>	<elision3>
9259	9260	<>	<elision3>
9259	9205	<elision2>	<elision2>
9259	9260	<>	<elision2>
9259	9205	<elision1>	<elision1>
9259	9260	<>	<elision1>
9259	9217	.	υ
9259	9217	.	u
9259	9217	.	α
9259	9217	.	a
9259	9026	<split-s>	<>
9260	9203	.	.
9260	9203	 	 
9260	9203	<~>	<~>
9260	9203	<split-s>	<split-s>
9260	9203	<split-h>	<split-h>
9260	9203	<name2>	<name2>
9260	9206	<aphaerese>	<aphaerese>
9260	9258	<>	<aphaerese>
9260	9203	<elision3>	<elision3>
9260	9258	<>	<elision3>
9260	9203	<elision2>	<elision2>
9260	9258	<>	<elision2>
9260	9203	<elision1>	<elision1>
9260	9258	<>	<elision1>
9260	9215	.	υ
9260	9215	.	u
9260	9215	.	α
9260	9215	.	a
9260	9024	<split-s>	<>
9261	9262	<>	<name>
9261	9261	<>	<aphaerese>
9261	9261	<>	<elision3>
9261	9261	<>	<elision2>
9261	9261	<>	<elision1>
9261	9264	.	κ
9261	9264	.	λ
9261	9049	<split-s>	<>
9262	9263	<>	<aphaerese>
9262	9263	<>	<elision3>
9262	9263	<>	<elision2>
9262	9263	<>	<elision1>
9262	9266	.	κ
9262	9266	.	λ
9262	9050	<split-s>	<>
9263	9261	<>	<aphaerese>
9263	9261	<>	<elision3>
9263	9261	<>	<elision2>
9263	9261	<>	<elision1>
9263	9264	.	κ
9263	9264	.	λ
9263	9048	<split-s>	<>
9264	9265	<>	<name>
9264	9264	<>	<aphaerese>
9264	9267	<elision3>	<elision3>
9264	9264	<>	<elision3>
9264	9267	<elision2>	<elision2>
9264	9264	<>	<elision2>
9264	9267	<elision1>	<elision1>
9264	9264	<>	<elision1>
9264	9046	<split-s>	<>
9265	9266	<>	<aphaerese>
9265	9269	<elision3>	<elision3>
9265	9266	<>	<elision3>
9265	9269	<elision2>	<elision2>
9265	9266	<>	<elision2>
9265	9269	<elision1>	<elision1>
9265	9266	<>	<elision1>
9265	9047	<split-s>	<>
9266	9264	<>	<aphaerese>
9266	9267	<elision3>	<elision3>
9266	9264	<>	<elision3>
9266	9267	<elision2>	<elision2>
9266	9264	<>	<elision2>
9266	9267	<elision1>	<elision1>
9266	9264	<>	<elision1>
9266	9045	<split-s>	<>
9267	9268	<>	<name>
9267	9267	<>	<aphaerese>
9267	9267	<>	<elision3>
9267	9267	<>	<elision2>
9267	9267	<>	<elision1>
9267	9209	.	κ
9267	9043	<split-s>	<>
9268	9269	<>	<aphaerese>
9268	9269	<>	<elision3>
9268	9269	<>	<elision2>
9268	9269	<>	<elision1>
9268	9211	.	κ
9268	9044	<split-s>	<>
9269	9267	<>	<aphaerese>
9269	9267	<>	<elision3>
9269	9267	<>	<elision2>
9269	9267	<>	<elision1>
9269	9209	.	κ
9269	9042	<split-s>	<>
9270	9203	.	.
9270	9203	 	 
9270	9203	<~>	<~>
9270	9203	<split-s>	<split-s>
9270	9203	<split-h>	<split-h>
9270	9203	<name2>	<name2>
9270	9271	<>	<name>
9270	9206	<aphaerese>	<aphaerese>
9270	9270	<>	<aphaerese>
9270	9203	<elision3>	<elision3>
9270	9270	<>	<elision3>
9270	9203	<elision2>	<elision2>
9270	9270	<>	<elision2>
9270	9203	<elision1>	<elision1>
9270	9270	<>	<elision1>
9270	9215	.	υ
9270	9215	.	u
9270	9215	.	α
9270	9215	.	a
9270	9055	<split-s>	<>
9271	9205	.	.
9271	9205	 	 
9271	9205	<~>	<~>
9271	9205	<split-s>	<split-s>
9271	9205	<split-h>	<split-h>
9271	9205	<name2>	<name2>
9271	9208	<aphaerese>	<aphaerese>
9271	9272	<>	<aphaerese>
9271	9205	<elision3>	<elision3>
9271	9272	<>	<elision3>
9271	9205	<elision2>	<elision2>
9271	9272	<>	<elision2>
9271	9205	<elision1>	<elision1>
9271	9272	<>	<elision1>
9271	9217	.	υ
9271	9217	.	u
9271	9217	.	α
9271	9217	.	a
9271	9056	<split-s>	<>
9272	9203	.	.
9272	9203	 	 
9272	9203	<~>	<~>
9272	9203	<split-s>	<split-s>
9272	9203	<split-h>	<split-h>
9272	9203	<name2>	<name2>
9272	9206	<aphaerese>	<aphaerese>
9272	9270	<>	<aphaerese>
9272	9203	<elision3>	<elision3>
9272	9270	<>	<elision3>
9272	9203	<elision2>	<elision2>
9272	9270	<>	<elision2>
9272	9203	<elision1>	<elision1>
9272	9270	<>	<elision1>
9272	9215	.	υ
9272	9215	.	u
9272	9215	.	α
9272	9215	.	a
9272	9054	<split-s>	<>
9273	9203	.	.
9273	9203	 	 
9273	9203	<~>	<~>
9273	9203	<split-s>	<split-s>
9273	9203	<split-h>	<split-h>
9273	9203	<name2>	<name2>
9273	9248	<name2>	<name>
9273	9271	<>	<name>
9273	9206	<aphaerese>	<aphaerese>
9273	9270	<>	<aphaerese>
9273	9203	<elision3>	<elision3>
9273	9270	<>	<elision3>
9273	9203	<elision2>	<elision2>
9273	9270	<>	<elision2>
9273	9203	<elision1>	<elision1>
9273	9270	<>	<elision1>
9273	9215	.	υ
9273	9215	.	u
9273	9215	.	α
9273	9215	.	a
9273	9060	<split-s>	<>
9274	9275	<>	<name>
9274	9274	<>	<aphaerese>
9274	9274	<>	<elision3>
9274	9274	<>	<elision2>
9274	9274	<>	<elision1>
9274	9203	<A2kl>	<>
9275	9276	<>	<aphaerese>
9275	9276	<>	<elision3>
9275	9276	<>	<elision2>
9275	9276	<>	<elision1>
9275	9204	<A2kl>	<>
9276	9274	<>	<aphaerese>
9276	9274	<>	<elision3>
9276	9274	<>	<elision2>
9276	9274	<>	<elision1>
9276	9205	<A2kl>	<>
9277	9248	<name>	<name>
9277	9278	<>	<name>
9277	9280	<>	<aphaerese>
9277	9280	<>	<elision3>
9277	9280	<>	<elision2>
9277	9280	<>	<elision1>
9277	9057	<split-s>	<>
9277	9252	<A2kl>	<>
9277	9284	<L2kl>	<>
9278	9279	<>	<aphaerese>
9278	9279	<>	<elision3>
9278	9279	<>	<elision2>
9278	9279	<>	<elision1>
9278	9253	<A2kl>	<>
9278	9282	<L2kl>	<>
9279	9280	<>	<aphaerese>
9279	9280	<>	<elision3>
9279	9280	<>	<elision2>
9279	9280	<>	<elision1>
9279	9254	<A2kl>	<>
9279	9283	<L2kl>	<>
9280	9278	<>	<name>
9280	9280	<>	<aphaerese>
9280	9280	<>	<elision3>
9280	9280	<>	<elision2>
9280	9280	<>	<elision1>
9280	9252	<A2kl>	<>
9280	9281	<L2kl>	<>
9281	9203	.	.
9281	9203	 	 
9281	9203	<~>	<~>
9281	9203	<split-s>	<split-s>
9281	9203	<split-h>	<split-h>
9281	9203	<name2>	<name2>
9281	9282	<>	<name>
9281	9206	<aphaerese>	<aphaerese>
9281	9281	<>	<aphaerese>
9281	9203	<elision3>	<elision3>
9281	9281	<>	<elision3>
9281	9203	<elision2>	<elision2>
9281	9281	<>	<elision2>
9281	9203	<elision1>	<elision1>
9281	9281	<>	<elision1>
9281	9215	.	υ
9281	9215	.	u
9281	9264	.	κ
9281	9215	.	α
9281	9215	.	a
9281	9264	.	λ
9281	9081	<split-s>	<>
9282	9205	.	.
9282	9205	 	 
9282	9205	<~>	<~>
9282	9205	<split-s>	<split-s>
9282	9205	<split-h>	<split-h>
9282	9205	<name2>	<name2>
9282	9208	<aphaerese>	<aphaerese>
9282	9283	<>	<aphaerese>
9282	9205	<elision3>	<elision3>
9282	9283	<>	<elision3>
9282	9205	<elision2>	<elision2>
9282	9283	<>	<elision2>
9282	9205	<elision1>	<elision1>
9282	9283	<>	<elision1>
9282	9217	.	υ
9282	9217	.	u
9282	9266	.	κ
9282	9217	.	α
9282	9217	.	a
9282	9266	.	λ
9282	9082	<split-s>	<>
9283	9203	.	.
9283	9203	 	 
9283	9203	<~>	<~>
9283	9203	<split-s>	<split-s>
9283	9203	<split-h>	<split-h>
9283	9203	<name2>	<name2>
9283	9206	<aphaerese>	<aphaerese>
9283	9281	<>	<aphaerese>
9283	9203	<elision3>	<elision3>
9283	9281	<>	<elision3>
9283	9203	<elision2>	<elision2>
9283	9281	<>	<elision2>
9283	9203	<elision1>	<elision1>
9283	9281	<>	<elision1>
9283	9215	.	υ
9283	9215	.	u
9283	9264	.	κ
9283	9215	.	α
9283	9215	.	a
9283	9264	.	λ
9283	9080	<split-s>	<>
9284	9203	.	.
9284	9203	 	 
9284	9203	<~>	<~>
9284	9203	<split-s>	<split-s>
9284	9203	<split-h>	<split-h>
9284	9203	<name2>	<name2>
9284	9248	<name2>	<name>
9284	9282	<>	<name>
9284	9206	<aphaerese>	<aphaerese>
9284	9281	<>	<aphaerese>
9284	9203	<elision3>	<elision3>
9284	9281	<>	<elision3>
9284	9203	<elision2>	<elision2>
9284	9281	<>	<elision2>
9284	9203	<elision1>	<elision1>
9284	9281	<>	<elision1>
9284	9215	.	υ
9284	9215	.	u
9284	9264	.	κ
9284	9215	.	α
9284	9215	.	a
9284	9264	.	λ
9284	9084	<split-s>	<>
9285	9203	.	.
9285	9203	 	 
9285	9203	<~>	<~>
9285	9203	<split-s>	<split-s>
9285	9203	<split-h>	<split-h>
9285	9203	<name2>	<name2>
9285	9218	<>	<name>
9285	9206	<aphaerese>	<aphaerese>
9285	9202	<>	<aphaerese>
9285	9202	<>	<elision3>
9285	9202	<>	<elision2>
9285	9202	<>	<elision1>
9285	9215	.	υ
9285	9215	.	u
9285	9209	.	κ
9285	9215	.	α
9285	9215	.	a
9285	9086	<split-s>	<>
9286	9203	.	.
9286	9203	 	 
9286	9203	<~>	<~>
9286	9203	<split-s>	<split-s>
9286	9203	<split-h>	<split-h>
9286	9203	<name2>	<name2>
9286	9236	<>	<name>
9286	9206	<aphaerese>	<aphaerese>
9286	9235	<>	<aphaerese>
9286	9238	<elision3>	<elision3>
9286	9235	<>	<elision3>
9286	9238	<elision2>	<elision2>
9286	9235	<>	<elision2>
9286	9238	<elision1>	<elision1>
9286	9235	<>	<elision1>
9286	9215	.	υ
9286	9215	.	u
9286	9215	.	κ
9286	9215	.	α
9286	9215	.	a
9286	9215	.	λ
9286	9088	<split-s>	<>
9287	9203	.	.
9287	9203	 	 
9287	9203	<~>	<~>
9287	9203	<split-s>	<split-s>
9287	9203	<split-h>	<split-h>
9287	9203	<name2>	<name2>
9287	9242	<>	<name>
9287	9206	<aphaerese>	<aphaerese>
9287	9241	<>	<aphaerese>
9287	9203	<elision3>	<elision3>
9287	9241	<>	<elision3>
9287	9203	<elision2>	<elision2>
9287	9241	<>	<elision2>
9287	9203	<elision1>	<elision1>
9287	9241	<>	<elision1>
9287	9215	.	υ
9287	9215	.	u
9287	9215	.	κ
9287	9215	.	α
9287	9215	.	a
9287	9215	.	λ
9287	9090	<split-s>	<>
9288	9245	<>	<name>
9288	9244	<>	<aphaerese>
9288	9244	<>	<elision3>
9288	9244	<>	<elision2>
9288	9244	<>	<elision1>
9288	9289	<U2kl>	<>
9289	9203	.	.
9289	9203	 	 
9289	9203	<~>	<~>
9289	9203	<split-s>	<split-s>
9289	9203	<split-h>	<split-h>
9289	9203	<name2>	<name2>
9289	9204	<>	<name>
9289	9206	<aphaerese>	<aphaerese>
9289	9203	<>	<aphaerese>
9289	9203	<elision3>	<elision3>
9289	9203	<>	<elision3>
9289	9203	<elision2>	<elision2>
9289	9203	<>	<elision2>
9289	9203	<elision1>	<elision1>
9289	9203	<>	<elision1>
9289	9215	.	υ
9289	9215	.	u
9289	9209	.	κ
9289	9215	.	α
9289	9215	.	a
9289	9093	<split-s>	<>
9290	9248	<name>	<name>
9290	9249	<>	<name>
9290	9251	<>	<aphaerese>
9290	9251	<>	<elision3>
9290	9251	<>	<elision2>
9290	9251	<>	<elision1>
9290	9057	<split-s>	<>
9290	9252	<A2kl>	<>
9290	9261	<L2kl>	<>
9290	9291	<K2kl>	<>
9291	9203	.	.
9291	9203	 	 
9291	9203	<~>	<~>
9291	9203	<split-s>	<split-s>
9291	9203	<split-h>	<split-h>
9291	9203	<name2>	<name2>
9291	9248	<name2>	<name>
9291	9271	<>	<name>
9291	9206	<aphaerese>	<aphaerese>
9291	9270	<>	<aphaerese>
9291	9203	<elision3>	<elision3>
9291	9270	<>	<elision3>
9291	9203	<elision2>	<elision2>
9291	9270	<>	<elision2>
9291	9203	<elision1>	<elision1>
9291	9270	<>	<elision1>
9291	9215	.	υ
9291	9215	.	u
9291	9215	.	α
9291	9215	.	a
9291	9096	<split-s>	<>
9292	9275	<>	<name>
9292	9274	<>	<aphaerese>
9292	9274	<>	<elision3>
9292	9274	<>	<elision2>
9292	9274	<>	<elision1>
9292	9289	<A2kl>	<>
9293	9248	<name>	<name>
9293	9278	<>	<name>
9293	9280	<>	<aphaerese>
9293	9280	<>	<elision3>
9293	9280	<>	<elision2>
9293	9280	<>	<elision1>
9293	9057	<split-s>	<>
9293	9252	<A2kl>	<>
9293	9294	<L2kl>	<>
9294	9203	.	.
9294	9203	 	 
9294	9203	<~>	<~>
9294	9203	<split-s>	<split-s>
9294	9203	<split-h>	<split-h>
9294	9203	<name2>	<name2>
9294	9248	<name2>	<name>
9294	9282	<>	<name>
9294	9206	<aphaerese>	<aphaerese>
9294	9281	<>	<aphaerese>
9294	9203	<elision3>	<elision3>
9294	9281	<>	<elision3>
9294	9203	<elision2>	<elision2>
9294	9281	<>	<elision2>
9294	9203	<elision1>	<elision1>
9294	9281	<>	<elision1>
9294	9215	.	υ
9294	9215	.	u
9294	9264	.	κ
9294	9215	.	α
9294	9215	.	a
9294	9264	.	λ
9294	9103	<split-s>	<>
9295	9191	.	.
9295	9192	 	 
9295	9191	<~>	<~>
9295	9191	<split-s>	<split-s>
9295	9191	<split-h>	<split-h>
9295	9191	<name2>	<name2>
9295	9195	<aphaerese>	<aphaerese>
9295	9195	<>	<aphaerese>
9295	9191	<elision3>	<elision3>
9295	9195	<>	<elision3>
9295	9191	<elision2>	<elision2>
9295	9195	<>	<elision2>
9295	9191	<elision1>	<elision1>
9295	9195	<>	<elision1>
9295	9191	.	υ
9295	9191	.	u
9295	9220	.	κ
9295	9235	s	κ
9295	9241	s	k
9295	9244	s	U
9295	9296	s	K
9295	9191	.	α
9295	9191	.	a
9295	9274	s	A
9295	9241	s	λ
9295	9241	s	l
9295	9303	s	L
9295	8490	<2s>	<>
9296	9248	<name>	<name>
9296	9297	<>	<name>
9296	9299	<>	<aphaerese>
9296	9299	<>	<elision3>
9296	9299	<>	<elision2>
9296	9299	<>	<elision1>
9296	9057	<split-s>	<>
9296	9300	<L2kl>	<>
9296	9273	<K2kl>	<>
9297	9298	<>	<aphaerese>
9297	9298	<>	<elision3>
9297	9298	<>	<elision2>
9297	9298	<>	<elision1>
9297	9301	<L2kl>	<>
9297	9271	<K2kl>	<>
9298	9299	<>	<aphaerese>
9298	9299	<>	<elision3>
9298	9299	<>	<elision2>
9298	9299	<>	<elision1>
9298	9302	<L2kl>	<>
9298	9272	<K2kl>	<>
9299	9297	<>	<name>
9299	9299	<>	<aphaerese>
9299	9299	<>	<elision3>
9299	9299	<>	<elision2>
9299	9299	<>	<elision1>
9299	9300	<L2kl>	<>
9299	9270	<K2kl>	<>
9300	9301	<>	<name>
9300	9300	<>	<aphaerese>
9300	9300	<>	<elision3>
9300	9300	<>	<elision2>
9300	9300	<>	<elision1>
9300	9215	.	κ
9300	9215	.	λ
9300	9113	<split-s>	<>
9301	9302	<>	<aphaerese>
9301	9302	<>	<elision3>
9301	9302	<>	<elision2>
9301	9302	<>	<elision1>
9301	9217	.	κ
9301	9217	.	λ
9301	9114	<split-s>	<>
9302	9300	<>	<aphaerese>
9302	9300	<>	<elision3>
9302	9300	<>	<elision2>
9302	9300	<>	<elision1>
9302	9215	.	κ
9302	9215	.	λ
9302	9112	<split-s>	<>
9303	9248	<name>	<name>
9303	9304	<>	<name>
9303	9306	<>	<aphaerese>
9303	9306	<>	<elision3>
9303	9306	<>	<elision2>
9303	9306	<>	<elision1>
9303	9057	<split-s>	<>
9303	9307	<L2kl>	<>
9304	9305	<>	<aphaerese>
9304	9305	<>	<elision3>
9304	9305	<>	<elision2>
9304	9305	<>	<elision1>
9304	9242	<L2kl>	<>
9305	9306	<>	<aphaerese>
9305	9306	<>	<elision3>
9305	9306	<>	<elision2>
9305	9306	<>	<elision1>
9305	9243	<L2kl>	<>
9306	9304	<>	<name>
9306	9306	<>	<aphaerese>
9306	9306	<>	<elision3>
9306	9306	<>	<elision2>
9306	9306	<>	<elision1>
9306	9241	<L2kl>	<>
9307	9203	.	.
9307	9203	 	 
9307	9203	<~>	<~>
9307	9203	<split-s>	<split-s>
9307	9203	<split-h>	<split-h>
9307	9203	<name2>	<name2>
9307	9248	<name2>	<name>
9307	9242	<>	<name>
9307	9206	<aphaerese>	<aphaerese>
9307	9241	<>	<aphaerese>
9307	9203	<elision3>	<elision3>
9307	9241	<>	<elision3>
9307	9203	<elision2>	<elision2>
9307	9241	<>	<elision2>
9307	9203	<elision1>	<elision1>
9307	9241	<>	<elision1>
9307	9215	.	υ
9307	9215	.	u
9307	9215	.	κ
9307	9215	.	α
9307	9215	.	a
9307	9215	.	λ
9307	9120	<split-s>	<>
9308	9191	.	.
9308	9192	 	 
9308	9191	<~>	<~>
9308	9191	<split-s>	<split-s>
9308	9191	<split-h>	<split-h>
9308	9191	<name2>	<name2>
9308	9195	<aphaerese>	<aphaerese>
9308	9198	<>	<aphaerese>
9308	9191	<elision3>	<elision3>
9308	9198	<>	<elision3>
9308	9191	<elision2>	<elision2>
9308	9198	<>	<elision2>
9308	9191	<elision1>	<elision1>
9308	9198	<>	<elision1>
9308	9199	.	υ
9308	9202	s	υ
9308	9199	.	u
9308	9202	s	u
9308	9220	.	κ
9308	9235	s	κ
9308	9241	s	k
9308	9244	s	U
9308	9247	s	K
9308	9199	.	α
9308	9202	s	α
9308	9199	.	a
9308	9202	s	a
9308	9274	s	A
9308	9241	s	λ
9308	9241	s	l
9308	9277	s	L
9308	8503	<2s>	<>
9309	9194	.	.
9309	9197	 	 
9309	9194	<~>	<~>
9309	9194	<split-s>	<split-s>
9309	9194	<split-h>	<split-h>
9309	9194	<name2>	<name2>
9309	9295	<aphaerese>	<aphaerese>
9309	9194	<>	<aphaerese>
9309	9194	<elision3>	<elision3>
9309	9194	<>	<elision3>
9309	9194	<elision2>	<elision2>
9309	9194	<>	<elision2>
9309	9194	<elision1>	<elision1>
9309	9194	<>	<elision1>
9309	9201	.	υ
9309	9219	s	υ
9309	9201	.	u
9309	9219	s	u
9309	9222	.	κ
9309	9237	s	κ
9309	9243	s	k
9309	9246	s	U
9309	9298	s	K
9309	9201	.	α
9309	9219	s	α
9309	9201	.	a
9309	9219	s	a
9309	9276	s	A
9309	9243	s	λ
9309	9243	s	l
9309	9305	s	L
9309	8505	<2s>	<>
9310	9194	.	.
9310	9197	 	 
9310	9194	<~>	<~>
9310	9194	<split-s>	<split-s>
9310	9194	<split-h>	<split-h>
9310	9194	<name2>	<name2>
9310	9295	<aphaerese>	<aphaerese>
9310	9311	<>	<aphaerese>
9310	9311	<>	<elision3>
9310	9311	<>	<elision2>
9310	9311	<>	<elision1>
9310	9201	.	υ
9310	9219	s	υ
9310	9201	.	u
9310	9219	s	u
9310	9201	.	κ
9310	9314	s	κ
9310	9243	s	k
9310	9246	s	U
9310	9298	s	K
9310	9201	.	α
9310	9219	s	α
9310	9201	.	a
9310	9219	s	a
9310	9276	s	A
9310	9201	.	λ
9310	9314	s	λ
9310	9243	s	l
9310	9305	s	L
9310	8916	<2s>	<>
9311	9191	.	.
9311	9192	 	 
9311	9191	<~>	<~>
9311	9191	<split-s>	<split-s>
9311	9191	<split-h>	<split-h>
9311	9191	<name2>	<name2>
9311	9195	<aphaerese>	<aphaerese>
9311	9190	<>	<aphaerese>
9311	9190	<>	<elision3>
9311	9190	<>	<elision2>
9311	9190	<>	<elision1>
9311	9199	.	υ
9311	9202	s	υ
9311	9199	.	u
9311	9202	s	u
9311	9199	.	κ
9311	9312	s	κ
9311	9241	s	k
9311	9244	s	U
9311	9296	s	K
9311	9199	.	α
9311	9202	s	α
9311	9199	.	a
9311	9202	s	a
9311	9274	s	A
9311	9199	.	λ
9311	9312	s	λ
9311	9241	s	l
9311	9303	s	L
9311	8914	<2s>	<>
9312	9203	.	.
9312	9203	 	 
9312	9203	<~>	<~>
9312	9203	<split-s>	<split-s>
9312	9203	<split-h>	<split-h>
9312	9203	<name2>	<name2>
9312	9313	<>	<name>
9312	9206	<aphaerese>	<aphaerese>
9312	9312	<>	<aphaerese>
9312	9312	<>	<elision3>
9312	9312	<>	<elision2>
9312	9312	<>	<elision1>
9312	9215	.	υ
9312	9215	.	u
9312	9215	.	κ
9312	9215	.	α
9312	9215	.	a
9312	9215	.	λ
9312	9129	<split-s>	<>
9313	9205	.	.
9313	9205	 	 
9313	9205	<~>	<~>
9313	9205	<split-s>	<split-s>
9313	9205	<split-h>	<split-h>
9313	9205	<name2>	<name2>
9313	9208	<aphaerese>	<aphaerese>
9313	9314	<>	<aphaerese>
9313	9314	<>	<elision3>
9313	9314	<>	<elision2>
9313	9314	<>	<elision1>
9313	9217	.	υ
9313	9217	.	u
9313	9217	.	κ
9313	9217	.	α
9313	9217	.	a
9313	9217	.	λ
9313	9130	<split-s>	<>
9314	9203	.	.
9314	9203	 	 
9314	9203	<~>	<~>
9314	9203	<split-s>	<split-s>
9314	9203	<split-h>	<split-h>
9314	9203	<name2>	<name2>
9314	9206	<aphaerese>	<aphaerese>
9314	9312	<>	<aphaerese>
9314	9312	<>	<elision3>
9314	9312	<>	<elision2>
9314	9312	<>	<elision1>
9314	9215	.	υ
9314	9215	.	u
9314	9215	.	κ
9314	9215	.	α
9314	9215	.	a
9314	9215	.	λ
9314	9128	<split-s>	<>
9315	9191	.	.
9315	9192	 	 
9315	9191	<~>	<~>
9315	9191	<split-s>	<split-s>
9315	9191	<split-h>	<split-h>
9315	9191	<name2>	<name2>
9315	9316	<>	<name>
9315	9195	<aphaerese>	<aphaerese>
9315	9315	<>	<aphaerese>
9315	9191	<elision3>	<elision3>
9315	9315	<>	<elision3>
9315	9191	<elision2>	<elision2>
9315	9315	<>	<elision2>
9315	9191	<elision1>	<elision1>
9315	9315	<>	<elision1>
9315	9199	.	υ
9315	9202	s	υ
9315	9199	.	u
9315	9202	s	u
9315	9318	.	κ
9315	9312	s	κ
9315	9241	s	k
9315	9244	s	U
9315	9296	s	K
9315	9199	.	α
9315	9202	s	α
9315	9199	.	a
9315	9202	s	a
9315	9274	s	A
9315	9318	.	λ
9315	9312	s	λ
9315	9241	s	l
9315	9303	s	L
9315	8701	<2s>	<>
9316	9194	.	.
9316	9197	 	 
9316	9194	<~>	<~>
9316	9194	<split-s>	<split-s>
9316	9194	<split-h>	<split-h>
9316	9194	<name2>	<name2>
9316	9295	<aphaerese>	<aphaerese>
9316	9317	<>	<aphaerese>
9316	9194	<elision3>	<elision3>
9316	9317	<>	<elision3>
9316	9194	<elision2>	<elision2>
9316	9317	<>	<elision2>
9316	9194	<elision1>	<elision1>
9316	9317	<>	<elision1>
9316	9201	.	υ
9316	9219	s	υ
9316	9201	.	u
9316	9219	s	u
9316	9320	.	κ
9316	9314	s	κ
9316	9243	s	k
9316	9246	s	U
9316	9298	s	K
9316	9201	.	α
9316	9219	s	α
9316	9201	.	a
9316	9219	s	a
9316	9276	s	A
9316	9320	.	λ
9316	9314	s	λ
9316	9243	s	l
9316	9305	s	L
9316	8702	<2s>	<>
9317	9191	.	.
9317	9192	 	 
9317	9191	<~>	<~>
9317	9191	<split-s>	<split-s>
9317	9191	<split-h>	<split-h>
9317	9191	<name2>	<name2>
9317	9195	<aphaerese>	<aphaerese>
9317	9315	<>	<aphaerese>
9317	9191	<elision3>	<elision3>
9317	9315	<>	<elision3>
9317	9191	<elision2>	<elision2>
9317	9315	<>	<elision2>
9317	9191	<elision1>	<elision1>
9317	9315	<>	<elision1>
9317	9199	.	υ
9317	9202	s	υ
9317	9199	.	u
9317	9202	s	u
9317	9318	.	κ
9317	9312	s	κ
9317	9241	s	k
9317	9244	s	U
9317	9296	s	K
9317	9199	.	α
9317	9202	s	α
9317	9199	.	a
9317	9202	s	a
9317	9274	s	A
9317	9318	.	λ
9317	9312	s	λ
9317	9241	s	l
9317	9303	s	L
9317	8700	<2s>	<>
9318	9319	<>	<name>
9318	9318	<>	<aphaerese>
9318	9321	<elision3>	<elision3>
9318	9318	<>	<elision3>
9318	9321	<elision2>	<elision2>
9318	9318	<>	<elision2>
9318	9321	<elision1>	<elision1>
9318	9318	<>	<elision1>
9318	104	<2s>	<>
9319	9320	<>	<aphaerese>
9319	9323	<elision3>	<elision3>
9319	9320	<>	<elision3>
9319	9323	<elision2>	<elision2>
9319	9320	<>	<elision2>
9319	9323	<elision1>	<elision1>
9319	9320	<>	<elision1>
9319	105	<2s>	<>
9320	9318	<>	<aphaerese>
9320	9321	<elision3>	<elision3>
9320	9318	<>	<elision3>
9320	9321	<elision2>	<elision2>
9320	9318	<>	<elision2>
9320	9321	<elision1>	<elision1>
9320	9318	<>	<elision1>
9320	103	<2s>	<>
9321	9321	.	.
9321	9321	 	 
9321	9321	<~>	<~>
9321	9321	<split-s>	<split-s>
9321	9321	<split-h>	<split-h>
9321	9321	<name2>	<name2>
9321	9322	<>	<name>
9321	9324	<aphaerese>	<aphaerese>
9321	9321	<>	<aphaerese>
9321	9321	<elision3>	<elision3>
9321	9321	<>	<elision3>
9321	9321	<elision2>	<elision2>
9321	9321	<>	<elision2>
9321	9321	<elision1>	<elision1>
9321	9321	<>	<elision1>
9321	9318	.	υ
9321	9318	.	u
9321	9327	.	κ
9321	9318	.	α
9321	9318	.	a
9321	8504	<2s>	<>
9322	9323	.	.
9322	9323	 	 
9322	9323	<~>	<~>
9322	9323	<split-s>	<split-s>
9322	9323	<split-h>	<split-h>
9322	9323	<name2>	<name2>
9322	9326	<aphaerese>	<aphaerese>
9322	9323	<>	<aphaerese>
9322	9323	<elision3>	<elision3>
9322	9323	<>	<elision3>
9322	9323	<elision2>	<elision2>
9322	9323	<>	<elision2>
9322	9323	<elision1>	<elision1>
9322	9323	<>	<elision1>
9322	9320	.	υ
9322	9320	.	u
9322	9329	.	κ
9322	9320	.	α
9322	9320	.	a
9322	8505	<2s>	<>
9323	9321	.	.
9323	9321	 	 
9323	9321	<~>	<~>
9323	9321	<split-s>	<split-s>
9323	9321	<split-h>	<split-h>
9323	9321	<name2>	<name2>
9323	9324	<aphaerese>	<aphaerese>
9323	9321	<>	<aphaerese>
9323	9321	<elision3>	<elision3>
9323	9321	<>	<elision3>
9323	9321	<elision2>	<elision2>
9323	9321	<>	<elision2>
9323	9321	<elision1>	<elision1>
9323	9321	<>	<elision1>
9323	9318	.	υ
9323	9318	.	u
9323	9327	.	κ
9323	9318	.	α
9323	9318	.	a
9323	8503	<2s>	<>
9324	9321	.	.
9324	9321	 	 
9324	9321	<~>	<~>
9324	9321	<split-s>	<split-s>
9324	9321	<split-h>	<split-h>
9324	9321	<name2>	<name2>
9324	9325	<>	<name>
9324	9324	<aphaerese>	<aphaerese>
9324	9324	<>	<aphaerese>
9324	9321	<elision3>	<elision3>
9324	9324	<>	<elision3>
9324	9321	<elision2>	<elision2>
9324	9324	<>	<elision2>
9324	9321	<elision1>	<elision1>
9324	9324	<>	<elision1>
9324	9321	.	υ
9324	9321	.	u
9324	9327	.	κ
9324	9321	.	α
9324	9321	.	a
9324	8491	<2s>	<>
9325	9323	.	.
9325	9323	 	 
9325	9323	<~>	<~>
9325	9323	<split-s>	<split-s>
9325	9323	<split-h>	<split-h>
9325	9323	<name2>	<name2>
9325	9326	<aphaerese>	<aphaerese>
9325	9326	<>	<aphaerese>
9325	9323	<elision3>	<elision3>
9325	9326	<>	<elision3>
9325	9323	<elision2>	<elision2>
9325	9326	<>	<elision2>
9325	9323	<elision1>	<elision1>
9325	9326	<>	<elision1>
9325	9323	.	υ
9325	9323	.	u
9325	9329	.	κ
9325	9323	.	α
9325	9323	.	a
9325	8492	<2s>	<>
9326	9321	.	.
9326	9321	 	 
9326	9321	<~>	<~>
9326	9321	<split-s>	<split-s>
9326	9321	<split-h>	<split-h>
9326	9321	<name2>	<name2>
9326	9324	<aphaerese>	<aphaerese>
9326	9324	<>	<aphaerese>
9326	9321	<elision3>	<elision3>
9326	9324	<>	<elision3>
9326	9321	<elision2>	<elision2>
9326	9324	<>	<elision2>
9326	9321	<elision1>	<elision1>
9326	9324	<>	<elision1>
9326	9321	.	υ
9326	9321	.	u
9326	9327	.	κ
9326	9321	.	α
9326	9321	.	a
9326	8490	<2s>	<>
9327	9328	<>	<name>
9327	9327	<>	<aphaerese>
9327	9330	<elision3>	<elision3>
9327	9327	<>	<elision3>
9327	9330	<elision2>	<elision2>
9327	9327	<>	<elision2>
9327	9330	<elision1>	<elision1>
9327	9327	<>	<elision1>
9327	8488	<2s>	<>
9328	9329	<>	<aphaerese>
9328	9332	<elision3>	<elision3>
9328	9329	<>	<elision3>
9328	9332	<elision2>	<elision2>
9328	9329	<>	<elision2>
9328	9332	<elision1>	<elision1>
9328	9329	<>	<elision1>
9328	8489	<2s>	<>
9329	9327	<>	<aphaerese>
9329	9330	<elision3>	<elision3>
9329	9327	<>	<elision3>
9329	9330	<elision2>	<elision2>
9329	9327	<>	<elision2>
9329	9330	<elision1>	<elision1>
9329	9327	<>	<elision1>
9329	8487	<2s>	<>
9330	9331	<>	<name>
9330	9330	<>	<aphaerese>
9330	9330	<>	<elision3>
9330	9330	<>	<elision2>
9330	9330	<>	<elision1>
9330	8349	<2s>	<>
9331	9332	<>	<aphaerese>
9331	9332	<>	<elision3>
9331	9332	<>	<elision2>
9331	9332	<>	<elision1>
9331	8350	<2s>	<>
9332	9330	<>	<aphaerese>
9332	9330	<>	<elision3>
9332	9330	<>	<elision2>
9332	9330	<>	<elision1>
9332	8348	<2s>	<>
9333	9334	<name>	<name>
9333	9335	<>	<name>
9333	9337	<>	<aphaerese>
9333	9337	<>	<elision3>
9333	9337	<>	<elision2>
9333	9337	<>	<elision1>
9333	8821	<2s>	<>
9333	9338	<L2kl>	<>
9333	9344	<K2kl>	<>
9334	9298	s	k
9334	9305	s	l
9334	8711	<2s>	<>
9335	9336	<>	<aphaerese>
9335	9336	<>	<elision3>
9335	9336	<>	<elision2>
9335	9336	<>	<elision1>
9335	9339	<L2kl>	<>
9335	9342	<K2kl>	<>
9336	9337	<>	<aphaerese>
9336	9337	<>	<elision3>
9336	9337	<>	<elision2>
9336	9337	<>	<elision1>
9336	9340	<L2kl>	<>
9336	9343	<K2kl>	<>
9337	9335	<>	<name>
9337	9337	<>	<aphaerese>
9337	9337	<>	<elision3>
9337	9337	<>	<elision2>
9337	9337	<>	<elision1>
9337	9338	<L2kl>	<>
9337	9341	<K2kl>	<>
9338	9339	<>	<name>
9338	9338	<>	<aphaerese>
9338	9338	<>	<elision3>
9338	9338	<>	<elision2>
9338	9338	<>	<elision1>
9338	9318	.	κ
9338	9318	.	λ
9338	8880	<2s>	<>
9339	9340	<>	<aphaerese>
9339	9340	<>	<elision3>
9339	9340	<>	<elision2>
9339	9340	<>	<elision1>
9339	9320	.	κ
9339	9320	.	λ
9339	8881	<2s>	<>
9340	9338	<>	<aphaerese>
9340	9338	<>	<elision3>
9340	9338	<>	<elision2>
9340	9338	<>	<elision1>
9340	9318	.	κ
9340	9318	.	λ
9340	8879	<2s>	<>
9341	9321	.	.
9341	9321	 	 
9341	9321	<~>	<~>
9341	9321	<split-s>	<split-s>
9341	9321	<split-h>	<split-h>
9341	9321	<name2>	<name2>
9341	9342	<>	<name>
9341	9324	<aphaerese>	<aphaerese>
9341	9341	<>	<aphaerese>
9341	9321	<elision3>	<elision3>
9341	9341	<>	<elision3>
9341	9321	<elision2>	<elision2>
9341	9341	<>	<elision2>
9341	9321	<elision1>	<elision1>
9341	9341	<>	<elision1>
9341	9318	.	υ
9341	9318	.	u
9341	9318	.	α
9341	9318	.	a
9341	8816	<2s>	<>
9342	9323	.	.
9342	9323	 	 
9342	9323	<~>	<~>
9342	9323	<split-s>	<split-s>
9342	9323	<split-h>	<split-h>
9342	9323	<name2>	<name2>
9342	9326	<aphaerese>	<aphaerese>
9342	9343	<>	<aphaerese>
9342	9323	<elision3>	<elision3>
9342	9343	<>	<elision3>
9342	9323	<elision2>	<elision2>
9342	9343	<>	<elision2>
9342	9323	<elision1>	<elision1>
9342	9343	<>	<elision1>
9342	9320	.	υ
9342	9320	.	u
9342	9320	.	α
9342	9320	.	a
9342	8817	<2s>	<>
9343	9321	.	.
9343	9321	 	 
9343	9321	<~>	<~>
9343	9321	<split-s>	<split-s>
9343	9321	<split-h>	<split-h>
9343	9321	<name2>	<name2>
9343	9324	<aphaerese>	<aphaerese>
9343	9341	<>	<aphaerese>
9343	9321	<elision3>	<elision3>
9343	9341	<>	<elision3>
9343	9321	<elision2>	<elision2>
9343	9341	<>	<elision2>
9343	9321	<elision1>	<elision1>
9343	9341	<>	<elision1>
9343	9318	.	υ
9343	9318	.	u
9343	9318	.	α
9343	9318	.	a
9343	8815	<2s>	<>
9344	9321	.	.
9344	9321	 	 
9344	9321	<~>	<~>
9344	9321	<split-s>	<split-s>
9344	9321	<split-h>	<split-h>
9344	9321	<name2>	<name2>
9344	9345	<name2>	<name>
9344	9342	<>	<name>
9344	9324	<aphaerese>	<aphaerese>
9344	9341	<>	<aphaerese>
9344	9321	<elision3>	<elision3>
9344	9341	<>	<elision3>
9344	9321	<elision2>	<elision2>
9344	9341	<>	<elision2>
9344	9321	<elision1>	<elision1>
9344	9341	<>	<elision1>
9344	9318	.	υ
9344	9318	.	u
9344	9318	.	α
9344	9318	.	a
9344	8825	<2s>	<>
9345	8711	<2s>	<>
9346	9321	.	.
9346	9321	 	 
9346	9321	<~>	<~>
9346	9321	<split-s>	<split-s>
9346	9321	<split-h>	<split-h>
9346	9321	<name2>	<name2>
9346	9347	<>	<name>
9346	9324	<aphaerese>	<aphaerese>
9346	9346	<>	<aphaerese>
9346	9321	<elision3>	<elision3>
9346	9346	<>	<elision3>
9346	9321	<elision2>	<elision2>
9346	9346	<>	<elision2>
9346	9321	<elision1>	<elision1>
9346	9346	<>	<elision1>
9346	9318	.	υ
9346	9318	.	u
9346	9318	.	κ
9346	9318	.	α
9346	9318	.	a
9346	9318	.	λ
9346	8701	<2s>	<>
9347	9323	.	.
9347	9323	 	 
9347	9323	<~>	<~>
9347	9323	<split-s>	<split-s>
9347	9323	<split-h>	<split-h>
9347	9323	<name2>	<name2>
9347	9326	<aphaerese>	<aphaerese>
9347	9348	<>	<aphaerese>
9347	9323	<elision3>	<elision3>
9347	9348	<>	<elision3>
9347	9323	<elision2>	<elision2>
9347	9348	<>	<elision2>
9347	9323	<elision1>	<elision1>
9347	9348	<>	<elision1>
9347	9320	.	υ
9347	9320	.	u
9347	9320	.	κ
9347	9320	.	α
9347	9320	.	a
9347	9320	.	λ
9347	8702	<2s>	<>
9348	9321	.	.
9348	9321	 	 
9348	9321	<~>	<~>
9348	9321	<split-s>	<split-s>
9348	9321	<split-h>	<split-h>
9348	9321	<name2>	<name2>
9348	9324	<aphaerese>	<aphaerese>
9348	9346	<>	<aphaerese>
9348	9321	<elision3>	<elision3>
9348	9346	<>	<elision3>
9348	9321	<elision2>	<elision2>
9348	9346	<>	<elision2>
9348	9321	<elision1>	<elision1>
9348	9346	<>	<elision1>
9348	9318	.	υ
9348	9318	.	u
9348	9318	.	κ
9348	9318	.	α
9348	9318	.	a
9348	9318	.	λ
9348	8700	<2s>	<>
9349	9345	<name>	<name>
9349	9350	<>	<name>
9349	9352	<>	<aphaerese>
9349	9352	<>	<elision3>
9349	9352	<>	<elision2>
9349	9352	<>	<elision1>
9349	8821	<2s>	<>
9349	9353	<L2kl>	<>
9350	9351	<>	<aphaerese>
9350	9351	<>	<elision3>
9350	9351	<>	<elision2>
9350	9351	<>	<elision1>
9350	9347	<L2kl>	<>
9351	9352	<>	<aphaerese>
9351	9352	<>	<elision3>
9351	9352	<>	<elision2>
9351	9352	<>	<elision1>
9351	9348	<L2kl>	<>
9352	9350	<>	<name>
9352	9352	<>	<aphaerese>
9352	9352	<>	<elision3>
9352	9352	<>	<elision2>
9352	9352	<>	<elision1>
9352	9346	<L2kl>	<>
9353	9321	.	.
9353	9321	 	 
9353	9321	<~>	<~>
9353	9321	<split-s>	<split-s>
9353	9321	<split-h>	<split-h>
9353	9321	<name2>	<name2>
9353	9345	<name2>	<name>
9353	9347	<>	<name>
9353	9324	<aphaerese>	<aphaerese>
9353	9346	<>	<aphaerese>
9353	9321	<elision3>	<elision3>
9353	9346	<>	<elision3>
9353	9321	<elision2>	<elision2>
9353	9346	<>	<elision2>
9353	9321	<elision1>	<elision1>
9353	9346	<>	<elision1>
9353	9318	.	υ
9353	9318	.	u
9353	9318	.	κ
9353	9318	.	α
9353	9318	.	a
9353	9318	.	λ
9353	8890	<2s>	<>
9354	9188	<>	<name>
9354	9187	<>	<aphaerese>
9354	9187	<>	<elision3>
9354	9187	<>	<elision2>
9354	9187	<>	<elision1>
9354	9190	s	κ
9354	9315	s	k
9354	9333	s	K
9354	9190	s	λ
9354	9346	s	l
9354	9349	s	L
9354	9355	<1s>	<>
9355	8525	<>	<name>
9355	8524	<>	<aphaerese>
9355	8524	<>	<elision3>
9355	8524	<>	<elision2>
9355	8524	<>	<elision1>
9355	9356	<K>	<>
9356	8551	<>	<name>
9356	8553	<>	<aphaerese>
9356	8553	<>	<elision3>
9356	8553	<>	<elision2>
9356	8553	<>	<elision1>
9357	9358	<>	<name>
9357	9360	<>	<aphaerese>
9357	9360	<>	<elision3>
9357	9360	<>	<elision2>
9357	9360	<>	<elision1>
9357	88	<k2K>	<>
9357	9354	<k2L>	<>
9358	9359	<>	<aphaerese>
9358	9359	<>	<elision3>
9358	9359	<>	<elision2>
9358	9359	<>	<elision1>
9358	89	<k2K>	<>
9358	9188	<k2L>	<>
9359	9360	<>	<aphaerese>
9359	9360	<>	<elision3>
9359	9360	<>	<elision2>
9359	9360	<>	<elision1>
9359	90	<k2K>	<>
9359	9189	<k2L>	<>
9360	9358	<>	<name>
9360	9360	<>	<aphaerese>
9360	9360	<>	<elision3>
9360	9360	<>	<elision2>
9360	9360	<>	<elision1>
9360	88	<k2K>	<>
9360	9187	<k2L>	<>
9361	9362	<>	<name>
9361	9364	<>	<aphaerese>
9361	9364	<>	<elision3>
9361	9364	<>	<elision2>
9361	9364	<>	<elision1>
9361	91	s	κ
9361	9131	s	k
9361	9164	s	K
9361	91	s	λ
9361	9179	s	l
9361	9182	s	L
9361	9354	<K2L>	<>
9362	9363	<>	<aphaerese>
9362	9363	<>	<elision3>
9362	9363	<>	<elision2>
9362	9363	<>	<elision1>
9362	9124	s	κ
9362	9133	s	k
9362	9167	s	K
9362	9124	s	λ
9362	9181	s	l
9362	9184	s	L
9362	9188	<K2L>	<>
9363	9364	<>	<aphaerese>
9363	9364	<>	<elision3>
9363	9364	<>	<elision2>
9363	9364	<>	<elision1>
9363	91	s	κ
9363	9131	s	k
9363	9164	s	K
9363	91	s	λ
9363	9179	s	l
9363	9182	s	L
9363	9189	<K2L>	<>
9364	9362	<>	<name>
9364	9364	<>	<aphaerese>
9364	9364	<>	<elision3>
9364	9364	<>	<elision2>
9364	9364	<>	<elision1>
9364	91	s	κ
9364	9131	s	k
9364	9164	s	K
9364	91	s	λ
9364	9179	s	l
9364	9182	s	L
9364	9187	<K2L>	<>
9365	9366	<>	<name>
9365	9365	<>	<aphaerese>
9365	9365	<>	<elision3>
9365	9365	<>	<elision2>
9365	9365	<>	<elision1>
9365	9187	<lambda2L>	<>
9366	9367	<>	<aphaerese>
9366	9367	<>	<elision3>
9366	9367	<>	<elision2>
9366	9367	<>	<elision1>
9366	9188	<lambda2L>	<>
9367	9365	<>	<aphaerese>
9367	9365	<>	<elision3>
9367	9365	<>	<elision2>
9367	9365	<>	<elision1>
9367	9189	<lambda2L>	<>
9368	9369	<>	<name>
9368	9368	<>	<aphaerese>
9368	9368	<>	<elision3>
9368	9368	<>	<elision2>
9368	9368	<>	<elision1>
9368	9187	<l2L>	<>
9369	9370	<>	<aphaerese>
9369	9370	<>	<elision3>
9369	9370	<>	<elision2>
9369	9370	<>	<elision1>
9369	9188	<l2L>	<>
9370	9368	<>	<aphaerese>
9370	9368	<>	<elision3>
9370	9368	<>	<elision2>
9370	9368	<>	<elision1>
9370	9189	<l2L>	<>
9371	87	<>	<aphaerese>
9371	87	<>	<elision3>
9371	87	<>	<elision2>
9371	87	<>	<elision1>
9371	90	<kappa2K>	<>
9371	9372	<kappa2L>	<>
9372	9187	<>	<aphaerese>
9372	9187	<>	<elision3>
9372	9187	<>	<elision2>
9372	9187	<>	<elision1>
9372	9190	s	κ
9372	9315	s	k
9372	9333	s	K
9372	9190	s	λ
9372	9346	s	l
9372	9349	s	L
9372	9373	<1s>	<>
9373	8524	<>	<aphaerese>
9373	8524	<>	<elision3>
9373	8524	<>	<elision2>
9373	8524	<>	<elision1>
9373	9374	<K>	<>
9374	8553	<>	<aphaerese>
9374	8553	<>	<elision3>
9374	8553	<>	<elision2>
9374	8553	<>	<elision1>
9375	9360	<>	<aphaerese>
9375	9360	<>	<elision3>
9375	9360	<>	<elision2>
9375	9360	<>	<elision1>
9375	90	<k2K>	<>
9375	9372	<k2L>	<>
9376	9364	<>	<aphaerese>
9376	9364	<>	<elision3>
9376	9364	<>	<elision2>
9376	9364	<>	<elision1>
9376	91	s	κ
9376	9131	s	k
9376	9164	s	K
9376	91	s	λ
9376	9179	s	l
9376	9182	s	L
9376	9372	<K2L>	<>
9377	9378	<>	<name>
9377	9380	<>	<aphaerese>
9377	9380	<>	<elision3>
9377	9380	<>	<elision2>
9377	9380	<>	<elision1>
9377	9381	<kappa2K>	<>
9377	9702	<kappa2L>	<>
9377	9699	<lambda2L>	<>
9378	9379	<>	<aphaerese>
9378	9379	<>	<elision3>
9378	9379	<>	<elision2>
9378	9379	<>	<elision1>
9378	9517	<kappa2K>	<>
9378	9663	<kappa2L>	<>
9378	9700	<lambda2L>	<>
9379	9380	<>	<aphaerese>
9379	9380	<>	<elision3>
9379	9380	<>	<elision2>
9379	9380	<>	<elision1>
9379	9518	<kappa2K>	<>
9379	9664	<kappa2L>	<>
9379	9701	<lambda2L>	<>
9380	9378	<>	<name>
9380	9380	<>	<aphaerese>
9380	9380	<>	<elision3>
9380	9380	<>	<elision2>
9380	9380	<>	<elision1>
9380	9381	<kappa2K>	<>
9380	9547	<kappa2L>	<>
9380	9699	<lambda2L>	<>
9381	9382	.	.
9381	9383	 	 
9381	9382	<~>	<~>
9381	9382	<split-s>	<split-s>
9381	9382	<split-h>	<split-h>
9381	9382	<name2>	<name2>
9381	9517	<>	<name>
9381	9386	<aphaerese>	<aphaerese>
9381	9381	<>	<aphaerese>
9381	9519	<elision3>	<elision3>
9381	9381	<>	<elision3>
9381	9519	<elision2>	<elision2>
9381	9381	<>	<elision2>
9381	9519	<elision1>	<elision1>
9381	9381	<>	<elision1>
9381	9390	.	υ
9381	9393	s	υ
9381	9390	.	u
9381	9393	s	u
9381	91	s	κ
9381	9131	s	k
9381	9456	s	U
9381	9164	s	K
9381	9390	.	α
9381	9484	s	α
9381	9390	.	a
9381	9484	s	a
9381	9487	s	A
9381	91	s	λ
9381	9179	s	l
9381	9182	s	L
9382	9382	.	.
9382	9383	 	 
9382	9382	<~>	<~>
9382	9382	<split-s>	<split-s>
9382	9382	<split-h>	<split-h>
9382	9382	<name2>	<name2>
9382	9516	<>	<name>
9382	9386	<aphaerese>	<aphaerese>
9382	9382	<>	<aphaerese>
9382	9382	<elision3>	<elision3>
9382	9382	<>	<elision3>
9382	9382	<elision2>	<elision2>
9382	9382	<>	<elision2>
9382	9382	<elision1>	<elision1>
9382	9382	<>	<elision1>
9382	9390	.	υ
9382	9393	s	υ
9382	9390	.	u
9382	9393	s	u
9382	9396	.	κ
9382	9414	s	κ
9382	9131	s	k
9382	9456	s	U
9382	9164	s	K
9382	9390	.	α
9382	9484	s	α
9382	9390	.	a
9382	9484	s	a
9382	9487	s	A
9382	9490	s	λ
9382	9179	s	l
9382	9182	s	L
9383	9382	.	.
9383	9383	 	 
9383	9382	<~>	<~>
9383	9382	<split-s>	<split-s>
9383	9382	<split-h>	<split-h>
9383	9382	<name2>	<name2>
9383	9384	<>	<name>
9383	9386	<aphaerese>	<aphaerese>
9383	9389	<>	<aphaerese>
9383	9382	<elision3>	<elision3>
9383	9389	<>	<elision3>
9383	9382	<elision2>	<elision2>
9383	9389	<>	<elision2>
9383	9382	<elision1>	<elision1>
9383	9389	<>	<elision1>
9383	9390	.	υ
9383	9501	s	υ
9383	9390	.	u
9383	9501	s	u
9383	9396	.	κ
9383	9502	s	κ
9383	9503	s	k
9383	9504	s	U
9383	9506	s	K
9383	9390	.	α
9383	9508	s	α
9383	9390	.	a
9383	9508	s	a
9383	9509	s	A
9383	9510	s	λ
9383	9511	s	l
9383	9512	s	L
9384	9385	.	.
9384	9388	 	 
9384	9385	<~>	<~>
9384	9385	<split-s>	<split-s>
9384	9385	<split-h>	<split-h>
9384	9385	<name2>	<name2>
9384	9514	<aphaerese>	<aphaerese>
9384	9515	<>	<aphaerese>
9384	9385	<elision3>	<elision3>
9384	9515	<>	<elision3>
9384	9385	<elision2>	<elision2>
9384	9515	<>	<elision2>
9384	9385	<elision1>	<elision1>
9384	9515	<>	<elision1>
9384	9392	.	υ
9384	9395	s	υ
9384	9392	.	u
9384	9395	s	u
9384	9398	.	κ
9384	9416	s	κ
9384	9133	s	k
9384	9458	s	U
9384	9461	s	K
9384	9392	.	α
9384	9486	s	α
9384	9392	.	a
9384	9486	s	a
9384	9489	s	A
9384	9492	s	λ
9384	9181	s	l
9384	9495	s	L
9385	9382	.	.
9385	9383	 	 
9385	9382	<~>	<~>
9385	9382	<split-s>	<split-s>
9385	9382	<split-h>	<split-h>
9385	9382	<name2>	<name2>
9385	9386	<aphaerese>	<aphaerese>
9385	9382	<>	<aphaerese>
9385	9382	<elision3>	<elision3>
9385	9382	<>	<elision3>
9385	9382	<elision2>	<elision2>
9385	9382	<>	<elision2>
9385	9382	<elision1>	<elision1>
9385	9382	<>	<elision1>
9385	9390	.	υ
9385	9393	s	υ
9385	9390	.	u
9385	9393	s	u
9385	9396	.	κ
9385	9414	s	κ
9385	9131	s	k
9385	9456	s	U
9385	9164	s	K
9385	9390	.	α
9385	9484	s	α
9385	9390	.	a
9385	9484	s	a
9385	9487	s	A
9385	9490	s	λ
9385	9179	s	l
9385	9182	s	L
9386	9382	.	.
9386	9383	 	 
9386	9382	<~>	<~>
9386	9382	<split-s>	<split-s>
9386	9382	<split-h>	<split-h>
9386	9382	<name2>	<name2>
9386	9387	<>	<name>
9386	9386	<aphaerese>	<aphaerese>
9386	9386	<>	<aphaerese>
9386	9382	<elision3>	<elision3>
9386	9386	<>	<elision3>
9386	9382	<elision2>	<elision2>
9386	9386	<>	<elision2>
9386	9382	<elision1>	<elision1>
9386	9386	<>	<elision1>
9386	9382	.	υ
9386	9382	.	u
9386	9396	.	κ
9386	9414	s	κ
9386	9131	s	k
9386	9456	s	U
9386	9164	s	K
9386	9382	.	α
9386	9382	.	a
9386	9487	s	A
9386	9490	s	λ
9386	9179	s	l
9386	9182	s	L
9387	9385	.	.
9387	9388	 	 
9387	9385	<~>	<~>
9387	9385	<split-s>	<split-s>
9387	9385	<split-h>	<split-h>
9387	9385	<name2>	<name2>
9387	9514	<aphaerese>	<aphaerese>
9387	9514	<>	<aphaerese>
9387	9385	<elision3>	<elision3>
9387	9514	<>	<elision3>
9387	9385	<elision2>	<elision2>
9387	9514	<>	<elision2>
9387	9385	<elision1>	<elision1>
9387	9514	<>	<elision1>
9387	9385	.	υ
9387	9385	.	u
9387	9398	.	κ
9387	9416	s	κ
9387	9133	s	k
9387	9458	s	U
9387	9167	s	K
9387	9385	.	α
9387	9385	.	a
9387	9489	s	A
9387	9492	s	λ
9387	9181	s	l
9387	9184	s	L
9388	9382	.	.
9388	9383	 	 
9388	9382	<~>	<~>
9388	9382	<split-s>	<split-s>
9388	9382	<split-h>	<split-h>
9388	9382	<name2>	<name2>
9388	9386	<aphaerese>	<aphaerese>
9388	9389	<>	<aphaerese>
9388	9382	<elision3>	<elision3>
9388	9389	<>	<elision3>
9388	9382	<elision2>	<elision2>
9388	9389	<>	<elision2>
9388	9382	<elision1>	<elision1>
9388	9389	<>	<elision1>
9388	9390	.	υ
9388	9501	s	υ
9388	9390	.	u
9388	9501	s	u
9388	9396	.	κ
9388	9502	s	κ
9388	9503	s	k
9388	9504	s	U
9388	9506	s	K
9388	9390	.	α
9388	9508	s	α
9388	9390	.	a
9388	9508	s	a
9388	9509	s	A
9388	9510	s	λ
9388	9511	s	l
9388	9512	s	L
9389	9382	.	.
9389	9383	 	 
9389	9382	<~>	<~>
9389	9382	<split-s>	<split-s>
9389	9382	<split-h>	<split-h>
9389	9382	<name2>	<name2>
9389	9384	<>	<name>
9389	9386	<aphaerese>	<aphaerese>
9389	9389	<>	<aphaerese>
9389	9382	<elision3>	<elision3>
9389	9389	<>	<elision3>
9389	9382	<elision2>	<elision2>
9389	9389	<>	<elision2>
9389	9382	<elision1>	<elision1>
9389	9389	<>	<elision1>
9389	9390	.	υ
9389	9393	s	υ
9389	9390	.	u
9389	9393	s	u
9389	9396	.	κ
9389	9414	s	κ
9389	9131	s	k
9389	9456	s	U
9389	9459	s	K
9389	9390	.	α
9389	9484	s	α
9389	9390	.	a
9389	9484	s	a
9389	9487	s	A
9389	9490	s	λ
9389	9179	s	l
9389	9493	s	L
9390	9391	<>	<name>
9390	9390	<>	<aphaerese>
9390	9382	<elision3>	<elision3>
9390	9390	<>	<elision3>
9390	9382	<elision2>	<elision2>
9390	9390	<>	<elision2>
9390	9382	<elision1>	<elision1>
9390	9390	<>	<elision1>
9391	9392	<>	<aphaerese>
9391	9385	<elision3>	<elision3>
9391	9392	<>	<elision3>
9391	9385	<elision2>	<elision2>
9391	9392	<>	<elision2>
9391	9385	<elision1>	<elision1>
9391	9392	<>	<elision1>
9392	9390	<>	<aphaerese>
9392	9382	<elision3>	<elision3>
9392	9390	<>	<elision3>
9392	9382	<elision2>	<elision2>
9392	9390	<>	<elision2>
9392	9382	<elision1>	<elision1>
9392	9390	<>	<elision1>
9393	92	.	.
9393	93	 	 
9393	92	<~>	<~>
9393	92	<split-s>	<split-s>
9393	92	<split-h>	<split-h>
9393	92	<name2>	<name2>
9393	9394	<>	<name>
9393	96	<aphaerese>	<aphaerese>
9393	9393	<>	<aphaerese>
9393	9393	<>	<elision3>
9393	9393	<>	<elision2>
9393	9393	<>	<elision1>
9393	100	.	υ
9393	8320	s	υ
9393	100	.	u
9393	8320	s	u
9393	8902	.	κ
9393	8932	s	κ
9393	8985	s	k
9393	9006	s	U
9393	9105	s	K
9393	100	.	α
9393	9061	s	α
9393	100	.	a
9393	9061	s	a
9393	9064	s	A
9393	9067	s	λ
9393	9070	s	l
9393	9115	s	L
9393	8509	<2s>	<>
9394	95	.	.
9394	98	 	 
9394	95	<~>	<~>
9394	95	<split-s>	<split-s>
9394	95	<split-h>	<split-h>
9394	95	<name2>	<name2>
9394	9104	<aphaerese>	<aphaerese>
9394	9395	<>	<aphaerese>
9394	9395	<>	<elision3>
9394	9395	<>	<elision2>
9394	9395	<>	<elision1>
9394	102	.	υ
9394	8898	s	υ
9394	102	.	u
9394	8898	s	u
9394	8904	.	κ
9394	8934	s	κ
9394	8987	s	k
9394	9008	s	U
9394	9107	s	K
9394	102	.	α
9394	9063	s	α
9394	102	.	a
9394	9063	s	a
9394	9066	s	A
9394	9069	s	λ
9394	9072	s	l
9394	9117	s	L
9394	8510	<2s>	<>
9395	92	.	.
9395	93	 	 
9395	92	<~>	<~>
9395	92	<split-s>	<split-s>
9395	92	<split-h>	<split-h>
9395	92	<name2>	<name2>
9395	96	<aphaerese>	<aphaerese>
9395	9393	<>	<aphaerese>
9395	9393	<>	<elision3>
9395	9393	<>	<elision2>
9395	9393	<>	<elision1>
9395	100	.	υ
9395	8320	s	υ
9395	100	.	u
9395	8320	s	u
9395	8902	.	κ
9395	8932	s	κ
9395	8985	s	k
9395	9006	s	U
9395	9105	s	K
9395	100	.	α
9395	9061	s	α
9395	100	.	a
9395	9061	s	a
9395	9064	s	A
9395	9067	s	λ
9395	9070	s	l
9395	9115	s	L
9395	8508	<2s>	<>
9396	9397	<>	<name>
9396	9396	<>	<aphaerese>
9396	9399	<elision3>	<elision3>
9396	9396	<>	<elision3>
9396	9399	<elision2>	<elision2>
9396	9396	<>	<elision2>
9396	9399	<elision1>	<elision1>
9396	9396	<>	<elision1>
9397	9398	<>	<aphaerese>
9397	9401	<elision3>	<elision3>
9397	9398	<>	<elision3>
9397	9401	<elision2>	<elision2>
9397	9398	<>	<elision2>
9397	9401	<elision1>	<elision1>
9397	9398	<>	<elision1>
9398	9396	<>	<aphaerese>
9398	9399	<elision3>	<elision3>
9398	9396	<>	<elision3>
9398	9399	<elision2>	<elision2>
9398	9396	<>	<elision2>
9398	9399	<elision1>	<elision1>
9398	9396	<>	<elision1>
9399	9400	<>	<name>
9399	9399	<>	<aphaerese>
9399	9399	<>	<elision3>
9399	9399	<>	<elision2>
9399	9399	<>	<elision1>
9399	9402	s	κ
9399	9402	s	k
9399	9405	s	K
9399	9402	s	λ
9399	9409	s	l
9399	9411	s	L
9400	9401	<>	<aphaerese>
9400	9401	<>	<elision3>
9400	9401	<>	<elision2>
9400	9401	<>	<elision1>
9400	9404	s	κ
9400	9404	s	k
9400	9407	s	K
9400	9404	s	λ
9400	9408	s	l
9400	9413	s	L
9401	9399	<>	<aphaerese>
9401	9399	<>	<elision3>
9401	9399	<>	<elision2>
9401	9399	<>	<elision1>
9401	9402	s	κ
9401	9402	s	k
9401	9405	s	K
9401	9402	s	λ
9401	9409	s	l
9401	9411	s	L
9402	9403	<>	<name>
9402	9402	<>	<aphaerese>
9402	9402	<>	<elision3>
9402	9402	<>	<elision2>
9402	9402	<>	<elision1>
9402	9125	s	κ
9402	8985	s	k
9402	9105	s	K
9402	9125	s	λ
9402	9070	s	l
9402	9115	s	L
9402	8524	<2s>	<>
9403	9404	<>	<aphaerese>
9403	9404	<>	<elision3>
9403	9404	<>	<elision2>
9403	9404	<>	<elision1>
9403	9127	s	κ
9403	8987	s	k
9403	9107	s	K
9403	9127	s	λ
9403	9072	s	l
9403	9117	s	L
9403	8525	<2s>	<>
9404	9402	<>	<aphaerese>
9404	9402	<>	<elision3>
9404	9402	<>	<elision2>
9404	9402	<>	<elision1>
9404	9125	s	κ
9404	8985	s	k
9404	9105	s	K
9404	9125	s	λ
9404	9070	s	l
9404	9115	s	L
9404	8523	<2s>	<>
9405	9406	<>	<name>
9405	9405	<>	<aphaerese>
9405	9405	<>	<elision3>
9405	9405	<>	<elision2>
9405	9405	<>	<elision1>
9405	9409	<K2kl>	<>
9406	9407	<>	<aphaerese>
9406	9407	<>	<elision3>
9406	9407	<>	<elision2>
9406	9407	<>	<elision1>
9406	9410	<K2kl>	<>
9407	9405	<>	<aphaerese>
9407	9405	<>	<elision3>
9407	9405	<>	<elision2>
9407	9405	<>	<elision1>
9407	9408	<K2kl>	<>
9408	9409	<>	<aphaerese>
9408	9409	<>	<elision3>
9408	9409	<>	<elision2>
9408	9409	<>	<elision1>
9408	9175	s	κ
9408	9070	s	k
9408	9161	s	K
9408	9175	s	λ
9408	9070	s	l
9408	9115	s	L
9408	8523	<2s>	<>
9409	9410	<>	<name>
9409	9409	<>	<aphaerese>
9409	9409	<>	<elision3>
9409	9409	<>	<elision2>
9409	9409	<>	<elision1>
9409	9175	s	κ
9409	9070	s	k
9409	9161	s	K
9409	9175	s	λ
9409	9070	s	l
9409	9115	s	L
9409	8524	<2s>	<>
9410	9408	<>	<aphaerese>
9410	9408	<>	<elision3>
9410	9408	<>	<elision2>
9410	9408	<>	<elision1>
9410	9177	s	κ
9410	9072	s	k
9410	9107	s	K
9410	9177	s	λ
9410	9072	s	l
9410	9117	s	L
9410	8525	<2s>	<>
9411	9412	<>	<name>
9411	9411	<>	<aphaerese>
9411	9411	<>	<elision3>
9411	9411	<>	<elision2>
9411	9411	<>	<elision1>
9411	9409	<L2kl>	<>
9412	9413	<>	<aphaerese>
9412	9413	<>	<elision3>
9412	9413	<>	<elision2>
9412	9413	<>	<elision1>
9412	9410	<L2kl>	<>
9413	9411	<>	<aphaerese>
9413	9411	<>	<elision3>
9413	9411	<>	<elision2>
9413	9411	<>	<elision1>
9413	9408	<L2kl>	<>
9414	92	.	.
9414	93	 	 
9414	92	<~>	<~>
9414	92	<split-s>	<split-s>
9414	92	<split-h>	<split-h>
9414	92	<name2>	<name2>
9414	9415	<>	<name>
9414	96	<aphaerese>	<aphaerese>
9414	9414	<>	<aphaerese>
9414	9417	<elision3>	<elision3>
9414	9414	<>	<elision3>
9414	9417	<elision2>	<elision2>
9414	9414	<>	<elision2>
9414	9417	<elision1>	<elision1>
9414	9414	<>	<elision1>
9414	100	.	υ
9414	8320	s	υ
9414	100	.	u
9414	8320	s	u
9414	100	.	κ
9414	9125	s	κ
9414	8985	s	k
9414	9006	s	U
9414	9105	s	K
9414	100	.	α
9414	9061	s	α
9414	100	.	a
9414	9061	s	a
9414	9064	s	A
9414	100	.	λ
9414	9125	s	λ
9414	9070	s	l
9414	9115	s	L
9414	8689	<2s>	<>
9415	95	.	.
9415	98	 	 
9415	95	<~>	<~>
9415	95	<split-s>	<split-s>
9415	95	<split-h>	<split-h>
9415	95	<name2>	<name2>
9415	9104	<aphaerese>	<aphaerese>
9415	9416	<>	<aphaerese>
9415	9419	<elision3>	<elision3>
9415	9416	<>	<elision3>
9415	9419	<elision2>	<elision2>
9415	9416	<>	<elision2>
9415	9419	<elision1>	<elision1>
9415	9416	<>	<elision1>
9415	102	.	υ
9415	8898	s	υ
9415	102	.	u
9415	8898	s	u
9415	102	.	κ
9415	9127	s	κ
9415	8987	s	k
9415	9008	s	U
9415	9107	s	K
9415	102	.	α
9415	9063	s	α
9415	102	.	a
9415	9063	s	a
9415	9066	s	A
9415	102	.	λ
9415	9127	s	λ
9415	9072	s	l
9415	9117	s	L
9415	8690	<2s>	<>
9416	92	.	.
9416	93	 	 
9416	92	<~>	<~>
9416	92	<split-s>	<split-s>
9416	92	<split-h>	<split-h>
9416	92	<name2>	<name2>
9416	96	<aphaerese>	<aphaerese>
9416	9414	<>	<aphaerese>
9416	9417	<elision3>	<elision3>
9416	9414	<>	<elision3>
9416	9417	<elision2>	<elision2>
9416	9414	<>	<elision2>
9416	9417	<elision1>	<elision1>
9416	9414	<>	<elision1>
9416	100	.	υ
9416	8320	s	υ
9416	100	.	u
9416	8320	s	u
9416	100	.	κ
9416	9125	s	κ
9416	8985	s	k
9416	9006	s	U
9416	9105	s	K
9416	100	.	α
9416	9061	s	α
9416	100	.	a
9416	9061	s	a
9416	9064	s	A
9416	100	.	λ
9416	9125	s	λ
9416	9070	s	l
9416	9115	s	L
9416	8688	<2s>	<>
9417	92	.	.
9417	93	 	 
9417	92	<~>	<~>
9417	92	<split-s>	<split-s>
9417	92	<split-h>	<split-h>
9417	92	<name2>	<name2>
9417	9418	<>	<name>
9417	96	<aphaerese>	<aphaerese>
9417	9417	<>	<aphaerese>
9417	92	<elision3>	<elision3>
9417	9417	<>	<elision3>
9417	92	<elision2>	<elision2>
9417	9417	<>	<elision2>
9417	92	<elision1>	<elision1>
9417	9417	<>	<elision1>
9417	100	.	υ
9417	8320	s	υ
9417	100	.	u
9417	8320	s	u
9417	8902	.	κ
9417	9420	s	κ
9417	9426	s	k
9417	9006	s	U
9417	9432	s	K
9417	100	.	α
9417	9061	s	α
9417	100	.	a
9417	9061	s	a
9417	9064	s	A
9417	9444	s	λ
9417	9447	s	l
9417	9450	s	L
9417	8592	<2s>	<>
9418	95	.	.
9418	98	 	 
9418	95	<~>	<~>
9418	95	<split-s>	<split-s>
9418	95	<split-h>	<split-h>
9418	95	<name2>	<name2>
9418	9104	<aphaerese>	<aphaerese>
9418	9419	<>	<aphaerese>
9418	95	<elision3>	<elision3>
9418	9419	<>	<elision3>
9418	95	<elision2>	<elision2>
9418	9419	<>	<elision2>
9418	95	<elision1>	<elision1>
9418	9419	<>	<elision1>
9418	102	.	υ
9418	8898	s	υ
9418	102	.	u
9418	8898	s	u
9418	8904	.	κ
9418	9422	s	κ
9418	9428	s	k
9418	9008	s	U
9418	9434	s	K
9418	102	.	α
9418	9063	s	α
9418	102	.	a
9418	9063	s	a
9418	9066	s	A
9418	9446	s	λ
9418	9449	s	l
9418	9452	s	L
9418	8593	<2s>	<>
9419	92	.	.
9419	93	 	 
9419	92	<~>	<~>
9419	92	<split-s>	<split-s>
9419	92	<split-h>	<split-h>
9419	92	<name2>	<name2>
9419	96	<aphaerese>	<aphaerese>
9419	9417	<>	<aphaerese>
9419	92	<elision3>	<elision3>
9419	9417	<>	<elision3>
9419	92	<elision2>	<elision2>
9419	9417	<>	<elision2>
9419	92	<elision1>	<elision1>
9419	9417	<>	<elision1>
9419	100	.	υ
9419	8320	s	υ
9419	100	.	u
9419	8320	s	u
9419	8902	.	κ
9419	9420	s	κ
9419	9426	s	k
9419	9006	s	U
9419	9432	s	K
9419	100	.	α
9419	9061	s	α
9419	100	.	a
9419	9061	s	a
9419	9064	s	A
9419	9444	s	λ
9419	9447	s	l
9419	9450	s	L
9419	8591	<2s>	<>
9420	8321	.	.
9420	8322	 	 
9420	8321	<~>	<~>
9420	8321	<split-s>	<split-s>
9420	8321	<split-h>	<split-h>
9420	8321	<name2>	<name2>
9420	9421	<>	<name>
9420	8325	<aphaerese>	<aphaerese>
9420	9420	<>	<aphaerese>
9420	8935	<elision3>	<elision3>
9420	9420	<>	<elision3>
9420	8935	<elision2>	<elision2>
9420	9420	<>	<elision2>
9420	8935	<elision1>	<elision1>
9420	9420	<>	<elision1>
9420	8329	.	υ
9420	8335	s	υ
9420	8329	.	u
9420	8335	s	u
9420	8329	.	κ
9420	8706	s	U
9420	8329	.	α
9420	8335	s	α
9420	8329	.	a
9420	8335	s	a
9420	8827	s	A
9420	8329	.	λ
9420	9424	<split-h>	<>
9421	8324	.	.
9421	8327	 	 
9421	8324	<~>	<~>
9421	8324	<split-s>	<split-s>
9421	8324	<split-h>	<split-h>
9421	8324	<name2>	<name2>
9421	8871	<aphaerese>	<aphaerese>
9421	9422	<>	<aphaerese>
9421	8937	<elision3>	<elision3>
9421	9422	<>	<elision3>
9421	8937	<elision2>	<elision2>
9421	9422	<>	<elision2>
9421	8937	<elision1>	<elision1>
9421	9422	<>	<elision1>
9421	8331	.	υ
9421	8507	s	υ
9421	8331	.	u
9421	8507	s	u
9421	8331	.	κ
9421	8708	s	U
9421	8331	.	α
9421	8507	s	α
9421	8331	.	a
9421	8507	s	a
9421	8829	s	A
9421	8331	.	λ
9421	9425	<split-h>	<>
9422	8321	.	.
9422	8322	 	 
9422	8321	<~>	<~>
9422	8321	<split-s>	<split-s>
9422	8321	<split-h>	<split-h>
9422	8321	<name2>	<name2>
9422	8325	<aphaerese>	<aphaerese>
9422	9420	<>	<aphaerese>
9422	8935	<elision3>	<elision3>
9422	9420	<>	<elision3>
9422	8935	<elision2>	<elision2>
9422	9420	<>	<elision2>
9422	8935	<elision1>	<elision1>
9422	9420	<>	<elision1>
9422	8329	.	υ
9422	8335	s	υ
9422	8329	.	u
9422	8335	s	u
9422	8329	.	κ
9422	8706	s	U
9422	8329	.	α
9422	8335	s	α
9422	8329	.	a
9422	8335	s	a
9422	8827	s	A
9422	8329	.	λ
9422	9423	<split-h>	<>
9423	9424	<>	<aphaerese>
9423	9424	<>	<elision3>
9423	9424	<>	<elision2>
9423	9424	<>	<elision1>
9423	8941	<3s>	<>
9424	9425	<>	<name>
9424	9424	<>	<aphaerese>
9424	9424	<>	<elision3>
9424	9424	<>	<elision2>
9424	9424	<>	<elision1>
9424	8942	<3s>	<>
9425	9423	<>	<aphaerese>
9425	9423	<>	<elision3>
9425	9423	<>	<elision2>
9425	9423	<>	<elision1>
9425	8943	<3s>	<>
9426	8321	.	.
9426	8322	 	 
9426	8321	<~>	<~>
9426	8321	<split-s>	<split-s>
9426	8321	<split-h>	<split-h>
9426	8321	<name2>	<name2>
9426	9427	<>	<name>
9426	8325	<aphaerese>	<aphaerese>
9426	9426	<>	<aphaerese>
9426	8321	<elision3>	<elision3>
9426	9426	<>	<elision3>
9426	8321	<elision2>	<elision2>
9426	9426	<>	<elision2>
9426	8321	<elision1>	<elision1>
9426	9426	<>	<elision1>
9426	8329	.	υ
9426	8335	s	υ
9426	8329	.	u
9426	8335	s	u
9426	8988	.	κ
9426	8706	s	U
9426	8329	.	α
9426	8335	s	α
9426	8329	.	a
9426	8335	s	a
9426	8827	s	A
9426	8988	.	λ
9426	9430	<split-h>	<>
9427	8324	.	.
9427	8327	 	 
9427	8324	<~>	<~>
9427	8324	<split-s>	<split-s>
9427	8324	<split-h>	<split-h>
9427	8324	<name2>	<name2>
9427	8871	<aphaerese>	<aphaerese>
9427	9428	<>	<aphaerese>
9427	8324	<elision3>	<elision3>
9427	9428	<>	<elision3>
9427	8324	<elision2>	<elision2>
9427	9428	<>	<elision2>
9427	8324	<elision1>	<elision1>
9427	9428	<>	<elision1>
9427	8331	.	υ
9427	8507	s	υ
9427	8331	.	u
9427	8507	s	u
9427	8990	.	κ
9427	8708	s	U
9427	8331	.	α
9427	8507	s	α
9427	8331	.	a
9427	8507	s	a
9427	8829	s	A
9427	8990	.	λ
9427	9431	<split-h>	<>
9428	8321	.	.
9428	8322	 	 
9428	8321	<~>	<~>
9428	8321	<split-s>	<split-s>
9428	8321	<split-h>	<split-h>
9428	8321	<name2>	<name2>
9428	8325	<aphaerese>	<aphaerese>
9428	9426	<>	<aphaerese>
9428	8321	<elision3>	<elision3>
9428	9426	<>	<elision3>
9428	8321	<elision2>	<elision2>
9428	9426	<>	<elision2>
9428	8321	<elision1>	<elision1>
9428	9426	<>	<elision1>
9428	8329	.	υ
9428	8335	s	υ
9428	8329	.	u
9428	8335	s	u
9428	8988	.	κ
9428	8706	s	U
9428	8329	.	α
9428	8335	s	α
9428	8329	.	a
9428	8335	s	a
9428	8827	s	A
9428	8988	.	λ
9428	9429	<split-h>	<>
9429	9430	<>	<aphaerese>
9429	9430	<>	<elision3>
9429	9430	<>	<elision2>
9429	9430	<>	<elision1>
9429	8950	<3s>	<>
9430	9431	<>	<name>
9430	9430	<>	<aphaerese>
9430	9430	<>	<elision3>
9430	9430	<>	<elision2>
9430	9430	<>	<elision1>
9430	8951	<3s>	<>
9431	9429	<>	<aphaerese>
9431	9429	<>	<elision3>
9431	9429	<>	<elision2>
9431	9429	<>	<elision1>
9431	8952	<3s>	<>
9432	9010	<name>	<name>
9432	9433	<>	<name>
9432	9435	<>	<aphaerese>
9432	9435	<>	<elision3>
9432	9435	<>	<elision2>
9432	9435	<>	<elision1>
9432	9057	<split-h>	<>
9432	9109	<L2kl>	<>
9432	9442	<K2kl>	<>
9433	9434	<>	<aphaerese>
9433	9434	<>	<elision3>
9433	9434	<>	<elision2>
9433	9434	<>	<elision1>
9433	9110	<L2kl>	<>
9433	9437	<K2kl>	<>
9434	9435	<>	<aphaerese>
9434	9435	<>	<elision3>
9434	9435	<>	<elision2>
9434	9435	<>	<elision1>
9434	9111	<L2kl>	<>
9434	9438	<K2kl>	<>
9435	9433	<>	<name>
9435	9435	<>	<aphaerese>
9435	9435	<>	<elision3>
9435	9435	<>	<elision2>
9435	9435	<>	<elision1>
9435	9109	<L2kl>	<>
9435	9436	<K2kl>	<>
9436	8991	.	.
9436	8991	 	 
9436	8991	<~>	<~>
9436	8991	<split-s>	<split-s>
9436	8991	<split-h>	<split-h>
9436	8991	<name2>	<name2>
9436	9437	<>	<name>
9436	8994	<aphaerese>	<aphaerese>
9436	9436	<>	<aphaerese>
9436	8991	<elision3>	<elision3>
9436	9436	<>	<elision3>
9436	8991	<elision2>	<elision2>
9436	9436	<>	<elision2>
9436	8991	<elision1>	<elision1>
9436	9436	<>	<elision1>
9436	8988	.	υ
9436	8988	.	u
9436	8988	.	α
9436	8988	.	a
9436	9440	<split-h>	<>
9437	8993	.	.
9437	8993	 	 
9437	8993	<~>	<~>
9437	8993	<split-s>	<split-s>
9437	8993	<split-h>	<split-h>
9437	8993	<name2>	<name2>
9437	8996	<aphaerese>	<aphaerese>
9437	9438	<>	<aphaerese>
9437	8993	<elision3>	<elision3>
9437	9438	<>	<elision3>
9437	8993	<elision2>	<elision2>
9437	9438	<>	<elision2>
9437	8993	<elision1>	<elision1>
9437	9438	<>	<elision1>
9437	8990	.	υ
9437	8990	.	u
9437	8990	.	α
9437	8990	.	a
9437	9441	<split-h>	<>
9438	8991	.	.
9438	8991	 	 
9438	8991	<~>	<~>
9438	8991	<split-s>	<split-s>
9438	8991	<split-h>	<split-h>
9438	8991	<name2>	<name2>
9438	8994	<aphaerese>	<aphaerese>
9438	9436	<>	<aphaerese>
9438	8991	<elision3>	<elision3>
9438	9436	<>	<elision3>
9438	8991	<elision2>	<elision2>
9438	9436	<>	<elision2>
9438	8991	<elision1>	<elision1>
9438	9436	<>	<elision1>
9438	8988	.	υ
9438	8988	.	u
9438	8988	.	α
9438	8988	.	a
9438	9439	<split-h>	<>
9439	9440	<>	<aphaerese>
9439	9440	<>	<elision3>
9439	9440	<>	<elision2>
9439	9440	<>	<elision1>
9439	8963	<3s>	<>
9440	9441	<>	<name>
9440	9440	<>	<aphaerese>
9440	9440	<>	<elision3>
9440	9440	<>	<elision2>
9440	9440	<>	<elision1>
9440	8964	<3s>	<>
9441	9439	<>	<aphaerese>
9441	9439	<>	<elision3>
9441	9439	<>	<elision2>
9441	9439	<>	<elision1>
9441	8965	<3s>	<>
9442	8991	.	.
9442	8991	 	 
9442	8991	<~>	<~>
9442	8991	<split-s>	<split-s>
9442	8991	<split-h>	<split-h>
9442	8991	<name2>	<name2>
9442	9059	<name2>	<name>
9442	9437	<>	<name>
9442	8994	<aphaerese>	<aphaerese>
9442	9436	<>	<aphaerese>
9442	8991	<elision3>	<elision3>
9442	9436	<>	<elision3>
9442	8991	<elision2>	<elision2>
9442	9436	<>	<elision2>
9442	8991	<elision1>	<elision1>
9442	9436	<>	<elision1>
9442	8988	.	υ
9442	8988	.	u
9442	8988	.	α
9442	8988	.	a
9442	9443	<split-h>	<>
9443	9441	<>	<name>
9443	9440	<>	<aphaerese>
9443	9440	<>	<elision3>
9443	9440	<>	<elision2>
9443	9440	<>	<elision1>
9443	8970	<3s>	<>
9444	8321	.	.
9444	8322	 	 
9444	8321	<~>	<~>
9444	8321	<split-s>	<split-s>
9444	8321	<split-h>	<split-h>
9444	8321	<name2>	<name2>
9444	9445	<>	<name>
9444	8325	<aphaerese>	<aphaerese>
9444	9444	<>	<aphaerese>
9444	8321	<elision3>	<elision3>
9444	9444	<>	<elision3>
9444	8321	<elision2>	<elision2>
9444	9444	<>	<elision2>
9444	8321	<elision1>	<elision1>
9444	9444	<>	<elision1>
9444	8329	.	υ
9444	8335	s	υ
9444	8329	.	u
9444	8335	s	u
9444	8329	.	κ
9444	8706	s	U
9444	8329	.	α
9444	8335	s	α
9444	8329	.	a
9444	8335	s	a
9444	8827	s	A
9444	8329	.	λ
9444	9430	<split-h>	<>
9445	8324	.	.
9445	8327	 	 
9445	8324	<~>	<~>
9445	8324	<split-s>	<split-s>
9445	8324	<split-h>	<split-h>
9445	8324	<name2>	<name2>
9445	8871	<aphaerese>	<aphaerese>
9445	9446	<>	<aphaerese>
9445	8324	<elision3>	<elision3>
9445	9446	<>	<elision3>
9445	8324	<elision2>	<elision2>
9445	9446	<>	<elision2>
9445	8324	<elision1>	<elision1>
9445	9446	<>	<elision1>
9445	8331	.	υ
9445	8507	s	υ
9445	8331	.	u
9445	8507	s	u
9445	8331	.	κ
9445	8708	s	U
9445	8331	.	α
9445	8507	s	α
9445	8331	.	a
9445	8507	s	a
9445	8829	s	A
9445	8331	.	λ
9445	9431	<split-h>	<>
9446	8321	.	.
9446	8322	 	 
9446	8321	<~>	<~>
9446	8321	<split-s>	<split-s>
9446	8321	<split-h>	<split-h>
9446	8321	<name2>	<name2>
9446	8325	<aphaerese>	<aphaerese>
9446	9444	<>	<aphaerese>
9446	8321	<elision3>	<elision3>
9446	9444	<>	<elision3>
9446	8321	<elision2>	<elision2>
9446	9444	<>	<elision2>
9446	8321	<elision1>	<elision1>
9446	9444	<>	<elision1>
9446	8329	.	υ
9446	8335	s	υ
9446	8329	.	u
9446	8335	s	u
9446	8329	.	κ
9446	8706	s	U
9446	8329	.	α
9446	8335	s	α
9446	8329	.	a
9446	8335	s	a
9446	8827	s	A
9446	8329	.	λ
9446	9429	<split-h>	<>
9447	8991	.	.
9447	8991	 	 
9447	8991	<~>	<~>
9447	8991	<split-s>	<split-s>
9447	8991	<split-h>	<split-h>
9447	8991	<name2>	<name2>
9447	9448	<>	<name>
9447	8994	<aphaerese>	<aphaerese>
9447	9447	<>	<aphaerese>
9447	8991	<elision3>	<elision3>
9447	9447	<>	<elision3>
9447	8991	<elision2>	<elision2>
9447	9447	<>	<elision2>
9447	8991	<elision1>	<elision1>
9447	9447	<>	<elision1>
9447	8988	.	υ
9447	8988	.	u
9447	8988	.	κ
9447	8988	.	α
9447	8988	.	a
9447	8988	.	λ
9447	9430	<split-h>	<>
9448	8993	.	.
9448	8993	 	 
9448	8993	<~>	<~>
9448	8993	<split-s>	<split-s>
9448	8993	<split-h>	<split-h>
9448	8993	<name2>	<name2>
9448	8996	<aphaerese>	<aphaerese>
9448	9449	<>	<aphaerese>
9448	8993	<elision3>	<elision3>
9448	9449	<>	<elision3>
9448	8993	<elision2>	<elision2>
9448	9449	<>	<elision2>
9448	8993	<elision1>	<elision1>
9448	9449	<>	<elision1>
9448	8990	.	υ
9448	8990	.	u
9448	8990	.	κ
9448	8990	.	α
9448	8990	.	a
9448	8990	.	λ
9448	9431	<split-h>	<>
9449	8991	.	.
9449	8991	 	 
9449	8991	<~>	<~>
9449	8991	<split-s>	<split-s>
9449	8991	<split-h>	<split-h>
9449	8991	<name2>	<name2>
9449	8994	<aphaerese>	<aphaerese>
9449	9447	<>	<aphaerese>
9449	8991	<elision3>	<elision3>
9449	9447	<>	<elision3>
9449	8991	<elision2>	<elision2>
9449	9447	<>	<elision2>
9449	8991	<elision1>	<elision1>
9449	9447	<>	<elision1>
9449	8988	.	υ
9449	8988	.	u
9449	8988	.	κ
9449	8988	.	α
9449	8988	.	a
9449	8988	.	λ
9449	9429	<split-h>	<>
9450	9059	<name>	<name>
9450	9451	<>	<name>
9450	9453	<>	<aphaerese>
9450	9453	<>	<elision3>
9450	9453	<>	<elision2>
9450	9453	<>	<elision1>
9450	9057	<split-h>	<>
9450	9454	<L2kl>	<>
9451	9452	<>	<aphaerese>
9451	9452	<>	<elision3>
9451	9452	<>	<elision2>
9451	9452	<>	<elision1>
9451	9448	<L2kl>	<>
9452	9453	<>	<aphaerese>
9452	9453	<>	<elision3>
9452	9453	<>	<elision2>
9452	9453	<>	<elision1>
9452	9449	<L2kl>	<>
9453	9451	<>	<name>
9453	9453	<>	<aphaerese>
9453	9453	<>	<elision3>
9453	9453	<>	<elision2>
9453	9453	<>	<elision1>
9453	9447	<L2kl>	<>
9454	8991	.	.
9454	8991	 	 
9454	8991	<~>	<~>
9454	8991	<split-s>	<split-s>
9454	8991	<split-h>	<split-h>
9454	8991	<name2>	<name2>
9454	9059	<name2>	<name>
9454	9448	<>	<name>
9454	8994	<aphaerese>	<aphaerese>
9454	9447	<>	<aphaerese>
9454	8991	<elision3>	<elision3>
9454	9447	<>	<elision3>
9454	8991	<elision2>	<elision2>
9454	9447	<>	<elision2>
9454	8991	<elision1>	<elision1>
9454	9447	<>	<elision1>
9454	8988	.	υ
9454	8988	.	u
9454	8988	.	κ
9454	8988	.	α
9454	8988	.	a
9454	8988	.	λ
9454	9455	<split-h>	<>
9455	9431	<>	<name>
9455	9430	<>	<aphaerese>
9455	9430	<>	<elision3>
9455	9430	<>	<elision2>
9455	9430	<>	<elision1>
9455	8977	<3s>	<>
9456	9457	<>	<name>
9456	9456	<>	<aphaerese>
9456	9456	<>	<elision3>
9456	9456	<>	<elision2>
9456	9456	<>	<elision1>
9456	9137	<U2kl>	<>
9457	9458	<>	<aphaerese>
9457	9458	<>	<elision3>
9457	9458	<>	<elision2>
9457	9458	<>	<elision1>
9457	9163	<U2kl>	<>
9458	9456	<>	<aphaerese>
9458	9456	<>	<elision3>
9458	9456	<>	<elision2>
9458	9456	<>	<elision1>
9458	9140	<U2kl>	<>
9459	9165	<name>	<name>
9459	9460	<>	<name>
9459	9462	<>	<aphaerese>
9459	9462	<>	<elision3>
9459	9462	<>	<elision2>
9459	9462	<>	<elision1>
9459	8821	<2s>	<>
9459	9463	<A2kl>	<>
9459	9475	<L2kl>	<>
9459	9178	<K2kl>	<>
9460	9461	<>	<aphaerese>
9460	9461	<>	<elision3>
9460	9461	<>	<elision2>
9460	9461	<>	<elision1>
9460	9464	<A2kl>	<>
9460	9476	<L2kl>	<>
9460	9173	<K2kl>	<>
9461	9462	<>	<aphaerese>
9461	9462	<>	<elision3>
9461	9462	<>	<elision2>
9461	9462	<>	<elision1>
9461	9465	<A2kl>	<>
9461	9477	<L2kl>	<>
9461	9174	<K2kl>	<>
9462	9460	<>	<name>
9462	9462	<>	<aphaerese>
9462	9462	<>	<elision3>
9462	9462	<>	<elision2>
9462	9462	<>	<elision1>
9462	9463	<A2kl>	<>
9462	9475	<L2kl>	<>
9462	9172	<K2kl>	<>
9463	9464	<>	<name>
9463	9463	<>	<aphaerese>
9463	9463	<>	<elision3>
9463	9463	<>	<elision2>
9463	9463	<>	<elision1>
9463	9466	.	κ
9463	9466	.	λ
9463	8771	<2s>	<>
9464	9465	<>	<aphaerese>
9464	9465	<>	<elision3>
9464	9465	<>	<elision2>
9464	9465	<>	<elision1>
9464	9468	.	κ
9464	9468	.	λ
9464	8772	<2s>	<>
9465	9463	<>	<aphaerese>
9465	9463	<>	<elision3>
9465	9463	<>	<elision2>
9465	9463	<>	<elision1>
9465	9466	.	κ
9465	9466	.	λ
9465	8770	<2s>	<>
9466	9467	<>	<name>
9466	9466	<>	<aphaerese>
9466	9469	<elision3>	<elision3>
9466	9466	<>	<elision3>
9466	9469	<elision2>	<elision2>
9466	9466	<>	<elision2>
9466	9469	<elision1>	<elision1>
9466	9466	<>	<elision1>
9466	8762	<2s>	<>
9467	9468	<>	<aphaerese>
9467	9471	<elision3>	<elision3>
9467	9468	<>	<elision3>
9467	9471	<elision2>	<elision2>
9467	9468	<>	<elision2>
9467	9471	<elision1>	<elision1>
9467	9468	<>	<elision1>
9467	8763	<2s>	<>
9468	9466	<>	<aphaerese>
9468	9469	<elision3>	<elision3>
9468	9466	<>	<elision3>
9468	9469	<elision2>	<elision2>
9468	9466	<>	<elision2>
9468	9469	<elision1>	<elision1>
9468	9466	<>	<elision1>
9468	8761	<2s>	<>
9469	9137	.	.
9469	9138	 	 
9469	9137	<~>	<~>
9469	9137	<split-s>	<split-s>
9469	9137	<split-h>	<split-h>
9469	9137	<name2>	<name2>
9469	9470	<>	<name>
9469	9141	<aphaerese>	<aphaerese>
9469	9469	<>	<aphaerese>
9469	9137	<elision3>	<elision3>
9469	9469	<>	<elision3>
9469	9137	<elision2>	<elision2>
9469	9469	<>	<elision2>
9469	9137	<elision1>	<elision1>
9469	9469	<>	<elision1>
9469	9134	.	υ
9469	9061	s	υ
9469	9134	.	u
9469	9061	s	u
9469	9033	s	κ
9469	9033	s	k
9469	9006	s	U
9469	9472	s	K
9469	9134	.	α
9469	9061	s	α
9469	9134	.	a
9469	9061	s	a
9469	9064	s	A
9469	9033	s	λ
9469	9033	s	l
9469	9472	s	L
9469	8726	<2s>	<>
9470	9140	.	.
9470	9143	 	 
9470	9140	<~>	<~>
9470	9140	<split-s>	<split-s>
9470	9140	<split-h>	<split-h>
9470	9140	<name2>	<name2>
9470	9160	<aphaerese>	<aphaerese>
9470	9471	<>	<aphaerese>
9470	9140	<elision3>	<elision3>
9470	9471	<>	<elision3>
9470	9140	<elision2>	<elision2>
9470	9471	<>	<elision2>
9470	9140	<elision1>	<elision1>
9470	9471	<>	<elision1>
9470	9136	.	υ
9470	9063	s	υ
9470	9136	.	u
9470	9063	s	u
9470	9035	s	κ
9470	9035	s	k
9470	9008	s	U
9470	9474	s	K
9470	9136	.	α
9470	9063	s	α
9470	9136	.	a
9470	9063	s	a
9470	9066	s	A
9470	9035	s	λ
9470	9035	s	l
9470	9474	s	L
9470	8727	<2s>	<>
9471	9137	.	.
9471	9138	 	 
9471	9137	<~>	<~>
9471	9137	<split-s>	<split-s>
9471	9137	<split-h>	<split-h>
9471	9137	<name2>	<name2>
9471	9141	<aphaerese>	<aphaerese>
9471	9469	<>	<aphaerese>
9471	9137	<elision3>	<elision3>
9471	9469	<>	<elision3>
9471	9137	<elision2>	<elision2>
9471	9469	<>	<elision2>
9471	9137	<elision1>	<elision1>
9471	9469	<>	<elision1>
9471	9134	.	υ
9471	9061	s	υ
9471	9134	.	u
9471	9061	s	u
9471	9033	s	κ
9471	9033	s	k
9471	9006	s	U
9471	9472	s	K
9471	9134	.	α
9471	9061	s	α
9471	9134	.	a
9471	9061	s	a
9471	9064	s	A
9471	9033	s	λ
9471	9033	s	l
9471	9472	s	L
9471	8725	<2s>	<>
9472	9473	<>	<name>
9472	9472	<>	<aphaerese>
9472	9472	<>	<elision3>
9472	9472	<>	<elision2>
9472	9472	<>	<elision1>
9472	9033	<L2kl>	<>
9473	9474	<>	<aphaerese>
9473	9474	<>	<elision3>
9473	9474	<>	<elision2>
9473	9474	<>	<elision1>
9473	9034	<L2kl>	<>
9474	9472	<>	<aphaerese>
9474	9472	<>	<elision3>
9474	9472	<>	<elision2>
9474	9472	<>	<elision1>
9474	9035	<L2kl>	<>
9475	9476	<>	<name>
9475	9475	<>	<aphaerese>
9475	9475	<>	<elision3>
9475	9475	<>	<elision2>
9475	9475	<>	<elision1>
9475	9478	.	κ
9475	9478	.	λ
9475	8804	<2s>	<>
9476	9477	<>	<aphaerese>
9476	9477	<>	<elision3>
9476	9477	<>	<elision2>
9476	9477	<>	<elision1>
9476	9480	.	κ
9476	9480	.	λ
9476	8805	<2s>	<>
9477	9475	<>	<aphaerese>
9477	9475	<>	<elision3>
9477	9475	<>	<elision2>
9477	9475	<>	<elision1>
9477	9478	.	κ
9477	9478	.	λ
9477	8803	<2s>	<>
9478	9479	<>	<name>
9478	9478	<>	<aphaerese>
9478	9481	<elision3>	<elision3>
9478	9478	<>	<elision3>
9478	9481	<elision2>	<elision2>
9478	9478	<>	<elision2>
9478	9481	<elision1>	<elision1>
9478	9478	<>	<elision1>
9478	8795	<2s>	<>
9479	9480	<>	<aphaerese>
9479	9483	<elision3>	<elision3>
9479	9480	<>	<elision3>
9479	9483	<elision2>	<elision2>
9479	9480	<>	<elision2>
9479	9483	<elision1>	<elision1>
9479	9480	<>	<elision1>
9479	8796	<2s>	<>
9480	9478	<>	<aphaerese>
9480	9481	<elision3>	<elision3>
9480	9478	<>	<elision3>
9480	9481	<elision2>	<elision2>
9480	9478	<>	<elision2>
9480	9481	<elision1>	<elision1>
9480	9478	<>	<elision1>
9480	8794	<2s>	<>
9481	9482	<>	<name>
9481	9481	<>	<aphaerese>
9481	9481	<>	<elision3>
9481	9481	<>	<elision2>
9481	9481	<>	<elision1>
9481	9145	.	κ
9481	9151	s	κ
9481	9070	s	k
9481	9161	s	K
9481	9070	s	λ
9481	9070	s	l
9481	9115	s	L
9481	8789	<2s>	<>
9482	9483	<>	<aphaerese>
9482	9483	<>	<elision3>
9482	9483	<>	<elision2>
9482	9483	<>	<elision1>
9482	9147	.	κ
9482	9153	s	κ
9482	9072	s	k
9482	9107	s	K
9482	9072	s	λ
9482	9072	s	l
9482	9117	s	L
9482	8790	<2s>	<>
9483	9481	<>	<aphaerese>
9483	9481	<>	<elision3>
9483	9481	<>	<elision2>
9483	9481	<>	<elision1>
9483	9145	.	κ
9483	9151	s	κ
9483	9070	s	k
9483	9161	s	K
9483	9070	s	λ
9483	9070	s	l
9483	9115	s	L
9483	8788	<2s>	<>
9484	9137	.	.
9484	9138	 	 
9484	9137	<~>	<~>
9484	9137	<split-s>	<split-s>
9484	9137	<split-h>	<split-h>
9484	9137	<name2>	<name2>
9484	9485	<>	<name>
9484	9141	<aphaerese>	<aphaerese>
9484	9484	<>	<aphaerese>
9484	9484	<>	<elision3>
9484	9484	<>	<elision2>
9484	9484	<>	<elision1>
9484	9134	.	υ
9484	9061	s	υ
9484	9134	.	u
9484	9061	s	u
9484	9145	.	κ
9484	9151	s	κ
9484	9070	s	k
9484	9006	s	U
9484	9161	s	K
9484	9134	.	α
9484	9061	s	α
9484	9134	.	a
9484	9061	s	a
9484	9064	s	A
9484	9070	s	λ
9484	9070	s	l
9484	9115	s	L
9484	8509	<2s>	<>
9485	9140	.	.
9485	9143	 	 
9485	9140	<~>	<~>
9485	9140	<split-s>	<split-s>
9485	9140	<split-h>	<split-h>
9485	9140	<name2>	<name2>
9485	9160	<aphaerese>	<aphaerese>
9485	9486	<>	<aphaerese>
9485	9486	<>	<elision3>
9485	9486	<>	<elision2>
9485	9486	<>	<elision1>
9485	9136	.	υ
9485	9063	s	υ
9485	9136	.	u
9485	9063	s	u
9485	9147	.	κ
9485	9153	s	κ
9485	9072	s	k
9485	9008	s	U
9485	9107	s	K
9485	9136	.	α
9485	9063	s	α
9485	9136	.	a
9485	9063	s	a
9485	9066	s	A
9485	9072	s	λ
9485	9072	s	l
9485	9117	s	L
9485	8510	<2s>	<>
9486	9137	.	.
9486	9138	 	 
9486	9137	<~>	<~>
9486	9137	<split-s>	<split-s>
9486	9137	<split-h>	<split-h>
9486	9137	<name2>	<name2>
9486	9141	<aphaerese>	<aphaerese>
9486	9484	<>	<aphaerese>
9486	9484	<>	<elision3>
9486	9484	<>	<elision2>
9486	9484	<>	<elision1>
9486	9134	.	υ
9486	9061	s	υ
9486	9134	.	u
9486	9061	s	u
9486	9145	.	κ
9486	9151	s	κ
9486	9070	s	k
9486	9006	s	U
9486	9161	s	K
9486	9134	.	α
9486	9061	s	α
9486	9134	.	a
9486	9061	s	a
9486	9064	s	A
9486	9070	s	λ
9486	9070	s	l
9486	9115	s	L
9486	8508	<2s>	<>
9487	9488	<>	<name>
9487	9487	<>	<aphaerese>
9487	9487	<>	<elision3>
9487	9487	<>	<elision2>
9487	9487	<>	<elision1>
9487	9137	<A2kl>	<>
9488	9489	<>	<aphaerese>
9488	9489	<>	<elision3>
9488	9489	<>	<elision2>
9488	9489	<>	<elision1>
9488	9163	<A2kl>	<>
9489	9487	<>	<aphaerese>
9489	9487	<>	<elision3>
9489	9487	<>	<elision2>
9489	9487	<>	<elision1>
9489	9140	<A2kl>	<>
9490	92	.	.
9490	93	 	 
9490	92	<~>	<~>
9490	92	<split-s>	<split-s>
9490	92	<split-h>	<split-h>
9490	92	<name2>	<name2>
9490	9491	<>	<name>
9490	96	<aphaerese>	<aphaerese>
9490	9490	<>	<aphaerese>
9490	92	<elision3>	<elision3>
9490	9490	<>	<elision3>
9490	92	<elision2>	<elision2>
9490	9490	<>	<elision2>
9490	92	<elision1>	<elision1>
9490	9490	<>	<elision1>
9490	100	.	υ
9490	8320	s	υ
9490	100	.	u
9490	8320	s	u
9490	100	.	κ
9490	9125	s	κ
9490	8985	s	k
9490	9006	s	U
9490	9105	s	K
9490	100	.	α
9490	9061	s	α
9490	100	.	a
9490	9061	s	a
9490	9064	s	A
9490	100	.	λ
9490	9125	s	λ
9490	9070	s	l
9490	9115	s	L
9490	8701	<2s>	<>
9491	95	.	.
9491	98	 	 
9491	95	<~>	<~>
9491	95	<split-s>	<split-s>
9491	95	<split-h>	<split-h>
9491	95	<name2>	<name2>
9491	9104	<aphaerese>	<aphaerese>
9491	9492	<>	<aphaerese>
9491	95	<elision3>	<elision3>
9491	9492	<>	<elision3>
9491	95	<elision2>	<elision2>
9491	9492	<>	<elision2>
9491	95	<elision1>	<elision1>
9491	9492	<>	<elision1>
9491	102	.	υ
9491	8898	s	υ
9491	102	.	u
9491	8898	s	u
9491	102	.	κ
9491	9127	s	κ
9491	8987	s	k
9491	9008	s	U
9491	9107	s	K
9491	102	.	α
9491	9063	s	α
9491	102	.	a
9491	9063	s	a
9491	9066	s	A
9491	102	.	λ
9491	9127	s	λ
9491	9072	s	l
9491	9117	s	L
9491	8702	<2s>	<>
9492	92	.	.
9492	93	 	 
9492	92	<~>	<~>
9492	92	<split-s>	<split-s>
9492	92	<split-h>	<split-h>
9492	92	<name2>	<name2>
9492	96	<aphaerese>	<aphaerese>
9492	9490	<>	<aphaerese>
9492	92	<elision3>	<elision3>
9492	9490	<>	<elision3>
9492	92	<elision2>	<elision2>
9492	9490	<>	<elision2>
9492	92	<elision1>	<elision1>
9492	9490	<>	<elision1>
9492	100	.	υ
9492	8320	s	υ
9492	100	.	u
9492	8320	s	u
9492	100	.	κ
9492	9125	s	κ
9492	8985	s	k
9492	9006	s	U
9492	9105	s	K
9492	100	.	α
9492	9061	s	α
9492	100	.	a
9492	9061	s	a
9492	9064	s	A
9492	100	.	λ
9492	9125	s	λ
9492	9070	s	l
9492	9115	s	L
9492	8700	<2s>	<>
9493	9165	<name>	<name>
9493	9494	<>	<name>
9493	9496	<>	<aphaerese>
9493	9496	<>	<elision3>
9493	9496	<>	<elision2>
9493	9496	<>	<elision1>
9493	8821	<2s>	<>
9493	9463	<A2kl>	<>
9493	9500	<L2kl>	<>
9494	9495	<>	<aphaerese>
9494	9495	<>	<elision3>
9494	9495	<>	<elision2>
9494	9495	<>	<elision1>
9494	9464	<A2kl>	<>
9494	9498	<L2kl>	<>
9495	9496	<>	<aphaerese>
9495	9496	<>	<elision3>
9495	9496	<>	<elision2>
9495	9496	<>	<elision1>
9495	9465	<A2kl>	<>
9495	9499	<L2kl>	<>
9496	9494	<>	<name>
9496	9496	<>	<aphaerese>
9496	9496	<>	<elision3>
9496	9496	<>	<elision2>
9496	9496	<>	<elision1>
9496	9463	<A2kl>	<>
9496	9497	<L2kl>	<>
9497	9137	.	.
9497	9138	 	 
9497	9137	<~>	<~>
9497	9137	<split-s>	<split-s>
9497	9137	<split-h>	<split-h>
9497	9137	<name2>	<name2>
9497	9498	<>	<name>
9497	9141	<aphaerese>	<aphaerese>
9497	9497	<>	<aphaerese>
9497	9137	<elision3>	<elision3>
9497	9497	<>	<elision3>
9497	9137	<elision2>	<elision2>
9497	9497	<>	<elision2>
9497	9137	<elision1>	<elision1>
9497	9497	<>	<elision1>
9497	9134	.	υ
9497	9061	s	υ
9497	9134	.	u
9497	9061	s	u
9497	9478	.	κ
9497	9175	s	κ
9497	9070	s	k
9497	9006	s	U
9497	9161	s	K
9497	9134	.	α
9497	9061	s	α
9497	9134	.	a
9497	9061	s	a
9497	9064	s	A
9497	9478	.	λ
9497	9175	s	λ
9497	9070	s	l
9497	9115	s	L
9497	8838	<2s>	<>
9498	9140	.	.
9498	9143	 	 
9498	9140	<~>	<~>
9498	9140	<split-s>	<split-s>
9498	9140	<split-h>	<split-h>
9498	9140	<name2>	<name2>
9498	9160	<aphaerese>	<aphaerese>
9498	9499	<>	<aphaerese>
9498	9140	<elision3>	<elision3>
9498	9499	<>	<elision3>
9498	9140	<elision2>	<elision2>
9498	9499	<>	<elision2>
9498	9140	<elision1>	<elision1>
9498	9499	<>	<elision1>
9498	9136	.	υ
9498	9063	s	υ
9498	9136	.	u
9498	9063	s	u
9498	9480	.	κ
9498	9177	s	κ
9498	9072	s	k
9498	9008	s	U
9498	9107	s	K
9498	9136	.	α
9498	9063	s	α
9498	9136	.	a
9498	9063	s	a
9498	9066	s	A
9498	9480	.	λ
9498	9177	s	λ
9498	9072	s	l
9498	9117	s	L
9498	8839	<2s>	<>
9499	9137	.	.
9499	9138	 	 
9499	9137	<~>	<~>
9499	9137	<split-s>	<split-s>
9499	9137	<split-h>	<split-h>
9499	9137	<name2>	<name2>
9499	9141	<aphaerese>	<aphaerese>
9499	9497	<>	<aphaerese>
9499	9137	<elision3>	<elision3>
9499	9497	<>	<elision3>
9499	9137	<elision2>	<elision2>
9499	9497	<>	<elision2>
9499	9137	<elision1>	<elision1>
9499	9497	<>	<elision1>
9499	9134	.	υ
9499	9061	s	υ
9499	9134	.	u
9499	9061	s	u
9499	9478	.	κ
9499	9175	s	κ
9499	9070	s	k
9499	9006	s	U
9499	9161	s	K
9499	9134	.	α
9499	9061	s	α
9499	9134	.	a
9499	9061	s	a
9499	9064	s	A
9499	9478	.	λ
9499	9175	s	λ
9499	9070	s	l
9499	9115	s	L
9499	8837	<2s>	<>
9500	9137	.	.
9500	9138	 	 
9500	9137	<~>	<~>
9500	9137	<split-s>	<split-s>
9500	9137	<split-h>	<split-h>
9500	9137	<name2>	<name2>
9500	9165	<name2>	<name>
9500	9498	<>	<name>
9500	9141	<aphaerese>	<aphaerese>
9500	9497	<>	<aphaerese>
9500	9137	<elision3>	<elision3>
9500	9497	<>	<elision3>
9500	9137	<elision2>	<elision2>
9500	9497	<>	<elision2>
9500	9137	<elision1>	<elision1>
9500	9497	<>	<elision1>
9500	9134	.	υ
9500	9061	s	υ
9500	9134	.	u
9500	9061	s	u
9500	9478	.	κ
9500	9175	s	κ
9500	9070	s	k
9500	9006	s	U
9500	9161	s	K
9500	9134	.	α
9500	9061	s	α
9500	9134	.	a
9500	9061	s	a
9500	9064	s	A
9500	9478	.	λ
9500	9175	s	λ
9500	9070	s	l
9500	9115	s	L
9500	8844	<2s>	<>
9501	92	.	.
9501	93	 	 
9501	92	<~>	<~>
9501	92	<split-s>	<split-s>
9501	92	<split-h>	<split-h>
9501	92	<name2>	<name2>
9501	9394	<>	<name>
9501	96	<aphaerese>	<aphaerese>
9501	9393	<>	<aphaerese>
9501	9393	<>	<elision3>
9501	9393	<>	<elision2>
9501	9393	<>	<elision1>
9501	100	.	υ
9501	8320	s	υ
9501	100	.	u
9501	8320	s	u
9501	8902	.	κ
9501	8932	s	κ
9501	8985	s	k
9501	9006	s	U
9501	9105	s	K
9501	100	.	α
9501	9061	s	α
9501	100	.	a
9501	9061	s	a
9501	9064	s	A
9501	9067	s	λ
9501	9070	s	l
9501	9115	s	L
9501	8850	<2s>	<>
9502	92	.	.
9502	93	 	 
9502	92	<~>	<~>
9502	92	<split-s>	<split-s>
9502	92	<split-h>	<split-h>
9502	92	<name2>	<name2>
9502	9415	<>	<name>
9502	96	<aphaerese>	<aphaerese>
9502	9414	<>	<aphaerese>
9502	9417	<elision3>	<elision3>
9502	9414	<>	<elision3>
9502	9417	<elision2>	<elision2>
9502	9414	<>	<elision2>
9502	9417	<elision1>	<elision1>
9502	9414	<>	<elision1>
9502	100	.	υ
9502	8320	s	υ
9502	100	.	u
9502	8320	s	u
9502	100	.	κ
9502	9125	s	κ
9502	8985	s	k
9502	9006	s	U
9502	9105	s	K
9502	100	.	α
9502	9061	s	α
9502	100	.	a
9502	9061	s	a
9502	9064	s	A
9502	100	.	λ
9502	9125	s	λ
9502	9070	s	l
9502	9115	s	L
9502	8853	<2s>	<>
9503	92	.	.
9503	93	 	 
9503	92	<~>	<~>
9503	92	<split-s>	<split-s>
9503	92	<split-h>	<split-h>
9503	92	<name2>	<name2>
9503	9132	<>	<name>
9503	96	<aphaerese>	<aphaerese>
9503	9131	<>	<aphaerese>
9503	92	<elision3>	<elision3>
9503	9131	<>	<elision3>
9503	92	<elision2>	<elision2>
9503	9131	<>	<elision2>
9503	92	<elision1>	<elision1>
9503	9131	<>	<elision1>
9503	100	.	υ
9503	8320	s	υ
9503	100	.	u
9503	8320	s	u
9503	9134	.	κ
9503	9125	s	κ
9503	8985	s	k
9503	9006	s	U
9503	9105	s	K
9503	100	.	α
9503	9061	s	α
9503	100	.	a
9503	9061	s	a
9503	9064	s	A
9503	9134	.	λ
9503	9125	s	λ
9503	9070	s	l
9503	9115	s	L
9503	8856	<2s>	<>
9504	9457	<>	<name>
9504	9456	<>	<aphaerese>
9504	9456	<>	<elision3>
9504	9456	<>	<elision2>
9504	9456	<>	<elision1>
9504	9505	<U2kl>	<>
9505	9137	.	.
9505	9138	 	 
9505	9137	<~>	<~>
9505	9137	<split-s>	<split-s>
9505	9137	<split-h>	<split-h>
9505	9137	<name2>	<name2>
9505	9163	<>	<name>
9505	9141	<aphaerese>	<aphaerese>
9505	9137	<>	<aphaerese>
9505	9137	<elision3>	<elision3>
9505	9137	<>	<elision3>
9505	9137	<elision2>	<elision2>
9505	9137	<>	<elision2>
9505	9137	<elision1>	<elision1>
9505	9137	<>	<elision1>
9505	9134	.	υ
9505	9061	s	υ
9505	9134	.	u
9505	9061	s	u
9505	9145	.	κ
9505	9151	s	κ
9505	9070	s	k
9505	9006	s	U
9505	9161	s	K
9505	9134	.	α
9505	9061	s	α
9505	9134	.	a
9505	9061	s	a
9505	9064	s	A
9505	9070	s	λ
9505	9070	s	l
9505	9115	s	L
9505	8860	<2s>	<>
9506	9165	<name>	<name>
9506	9460	<>	<name>
9506	9462	<>	<aphaerese>
9506	9462	<>	<elision3>
9506	9462	<>	<elision2>
9506	9462	<>	<elision1>
9506	8821	<2s>	<>
9506	9463	<A2kl>	<>
9506	9475	<L2kl>	<>
9506	9507	<K2kl>	<>
9507	9137	.	.
9507	9138	 	 
9507	9137	<~>	<~>
9507	9137	<split-s>	<split-s>
9507	9137	<split-h>	<split-h>
9507	9137	<name2>	<name2>
9507	9165	<name2>	<name>
9507	9173	<>	<name>
9507	9141	<aphaerese>	<aphaerese>
9507	9172	<>	<aphaerese>
9507	9137	<elision3>	<elision3>
9507	9172	<>	<elision3>
9507	9137	<elision2>	<elision2>
9507	9172	<>	<elision2>
9507	9137	<elision1>	<elision1>
9507	9172	<>	<elision1>
9507	9134	.	υ
9507	9061	s	υ
9507	9134	.	u
9507	9061	s	u
9507	9175	s	κ
9507	9070	s	k
9507	9006	s	U
9507	9161	s	K
9507	9134	.	α
9507	9061	s	α
9507	9134	.	a
9507	9061	s	a
9507	9064	s	A
9507	9175	s	λ
9507	9070	s	l
9507	9115	s	L
9507	8864	<2s>	<>
9508	9137	.	.
9508	9138	 	 
9508	9137	<~>	<~>
9508	9137	<split-s>	<split-s>
9508	9137	<split-h>	<split-h>
9508	9137	<name2>	<name2>
9508	9485	<>	<name>
9508	9141	<aphaerese>	<aphaerese>
9508	9484	<>	<aphaerese>
9508	9484	<>	<elision3>
9508	9484	<>	<elision2>
9508	9484	<>	<elision1>
9508	9134	.	υ
9508	9061	s	υ
9508	9134	.	u
9508	9061	s	u
9508	9145	.	κ
9508	9151	s	κ
9508	9070	s	k
9508	9006	s	U
9508	9161	s	K
9508	9134	.	α
9508	9061	s	α
9508	9134	.	a
9508	9061	s	a
9508	9064	s	A
9508	9070	s	λ
9508	9070	s	l
9508	9115	s	L
9508	8850	<2s>	<>
9509	9488	<>	<name>
9509	9487	<>	<aphaerese>
9509	9487	<>	<elision3>
9509	9487	<>	<elision2>
9509	9487	<>	<elision1>
9509	9505	<A2kl>	<>
9510	92	.	.
9510	93	 	 
9510	92	<~>	<~>
9510	92	<split-s>	<split-s>
9510	92	<split-h>	<split-h>
9510	92	<name2>	<name2>
9510	9491	<>	<name>
9510	96	<aphaerese>	<aphaerese>
9510	9490	<>	<aphaerese>
9510	92	<elision3>	<elision3>
9510	9490	<>	<elision3>
9510	92	<elision2>	<elision2>
9510	9490	<>	<elision2>
9510	92	<elision1>	<elision1>
9510	9490	<>	<elision1>
9510	100	.	υ
9510	8320	s	υ
9510	100	.	u
9510	8320	s	u
9510	100	.	κ
9510	9125	s	κ
9510	8985	s	k
9510	9006	s	U
9510	9105	s	K
9510	100	.	α
9510	9061	s	α
9510	100	.	a
9510	9061	s	a
9510	9064	s	A
9510	100	.	λ
9510	9125	s	λ
9510	9070	s	l
9510	9115	s	L
9510	8856	<2s>	<>
9511	9137	.	.
9511	9138	 	 
9511	9137	<~>	<~>
9511	9137	<split-s>	<split-s>
9511	9137	<split-h>	<split-h>
9511	9137	<name2>	<name2>
9511	9180	<>	<name>
9511	9141	<aphaerese>	<aphaerese>
9511	9179	<>	<aphaerese>
9511	9137	<elision3>	<elision3>
9511	9179	<>	<elision3>
9511	9137	<elision2>	<elision2>
9511	9179	<>	<elision2>
9511	9137	<elision1>	<elision1>
9511	9179	<>	<elision1>
9511	9134	.	υ
9511	9061	s	υ
9511	9134	.	u
9511	9061	s	u
9511	9134	.	κ
9511	9175	s	κ
9511	9070	s	k
9511	9006	s	U
9511	9161	s	K
9511	9134	.	α
9511	9061	s	α
9511	9134	.	a
9511	9061	s	a
9511	9064	s	A
9511	9134	.	λ
9511	9175	s	λ
9511	9070	s	l
9511	9115	s	L
9511	8856	<2s>	<>
9512	9165	<name>	<name>
9512	9494	<>	<name>
9512	9496	<>	<aphaerese>
9512	9496	<>	<elision3>
9512	9496	<>	<elision2>
9512	9496	<>	<elision1>
9512	8821	<2s>	<>
9512	9463	<A2kl>	<>
9512	9513	<L2kl>	<>
9513	9137	.	.
9513	9138	 	 
9513	9137	<~>	<~>
9513	9137	<split-s>	<split-s>
9513	9137	<split-h>	<split-h>
9513	9137	<name2>	<name2>
9513	9165	<name2>	<name>
9513	9498	<>	<name>
9513	9141	<aphaerese>	<aphaerese>
9513	9497	<>	<aphaerese>
9513	9137	<elision3>	<elision3>
9513	9497	<>	<elision3>
9513	9137	<elision2>	<elision2>
9513	9497	<>	<elision2>
9513	9137	<elision1>	<elision1>
9513	9497	<>	<elision1>
9513	9134	.	υ
9513	9061	s	υ
9513	9134	.	u
9513	9061	s	u
9513	9478	.	κ
9513	9175	s	κ
9513	9070	s	k
9513	9006	s	U
9513	9161	s	K
9513	9134	.	α
9513	9061	s	α
9513	9134	.	a
9513	9061	s	a
9513	9064	s	A
9513	9478	.	λ
9513	9175	s	λ
9513	9070	s	l
9513	9115	s	L
9513	8869	<2s>	<>
9514	9382	.	.
9514	9383	 	 
9514	9382	<~>	<~>
9514	9382	<split-s>	<split-s>
9514	9382	<split-h>	<split-h>
9514	9382	<name2>	<name2>
9514	9386	<aphaerese>	<aphaerese>
9514	9386	<>	<aphaerese>
9514	9382	<elision3>	<elision3>
9514	9386	<>	<elision3>
9514	9382	<elision2>	<elision2>
9514	9386	<>	<elision2>
9514	9382	<elision1>	<elision1>
9514	9386	<>	<elision1>
9514	9382	.	υ
9514	9382	.	u
9514	9396	.	κ
9514	9414	s	κ
9514	9131	s	k
9514	9456	s	U
9514	9164	s	K
9514	9382	.	α
9514	9382	.	a
9514	9487	s	A
9514	9490	s	λ
9514	9179	s	l
9514	9182	s	L
9515	9382	.	.
9515	9383	 	 
9515	9382	<~>	<~>
9515	9382	<split-s>	<split-s>
9515	9382	<split-h>	<split-h>
9515	9382	<name2>	<name2>
9515	9386	<aphaerese>	<aphaerese>
9515	9389	<>	<aphaerese>
9515	9382	<elision3>	<elision3>
9515	9389	<>	<elision3>
9515	9382	<elision2>	<elision2>
9515	9389	<>	<elision2>
9515	9382	<elision1>	<elision1>
9515	9389	<>	<elision1>
9515	9390	.	υ
9515	9393	s	υ
9515	9390	.	u
9515	9393	s	u
9515	9396	.	κ
9515	9414	s	κ
9515	9131	s	k
9515	9456	s	U
9515	9459	s	K
9515	9390	.	α
9515	9484	s	α
9515	9390	.	a
9515	9484	s	a
9515	9487	s	A
9515	9490	s	λ
9515	9179	s	l
9515	9493	s	L
9516	9385	.	.
9516	9388	 	 
9516	9385	<~>	<~>
9516	9385	<split-s>	<split-s>
9516	9385	<split-h>	<split-h>
9516	9385	<name2>	<name2>
9516	9514	<aphaerese>	<aphaerese>
9516	9385	<>	<aphaerese>
9516	9385	<elision3>	<elision3>
9516	9385	<>	<elision3>
9516	9385	<elision2>	<elision2>
9516	9385	<>	<elision2>
9516	9385	<elision1>	<elision1>
9516	9385	<>	<elision1>
9516	9392	.	υ
9516	9395	s	υ
9516	9392	.	u
9516	9395	s	u
9516	9398	.	κ
9516	9416	s	κ
9516	9133	s	k
9516	9458	s	U
9516	9167	s	K
9516	9392	.	α
9516	9486	s	α
9516	9392	.	a
9516	9486	s	a
9516	9489	s	A
9516	9492	s	λ
9516	9181	s	l
9516	9184	s	L
9517	9385	.	.
9517	9388	 	 
9517	9385	<~>	<~>
9517	9385	<split-s>	<split-s>
9517	9385	<split-h>	<split-h>
9517	9385	<name2>	<name2>
9517	9514	<aphaerese>	<aphaerese>
9517	9518	<>	<aphaerese>
9517	9521	<elision3>	<elision3>
9517	9518	<>	<elision3>
9517	9521	<elision2>	<elision2>
9517	9518	<>	<elision2>
9517	9521	<elision1>	<elision1>
9517	9518	<>	<elision1>
9517	9392	.	υ
9517	9395	s	υ
9517	9392	.	u
9517	9395	s	u
9517	9124	s	κ
9517	9133	s	k
9517	9458	s	U
9517	9167	s	K
9517	9392	.	α
9517	9486	s	α
9517	9392	.	a
9517	9486	s	a
9517	9489	s	A
9517	9124	s	λ
9517	9181	s	l
9517	9184	s	L
9518	9382	.	.
9518	9383	 	 
9518	9382	<~>	<~>
9518	9382	<split-s>	<split-s>
9518	9382	<split-h>	<split-h>
9518	9382	<name2>	<name2>
9518	9386	<aphaerese>	<aphaerese>
9518	9381	<>	<aphaerese>
9518	9519	<elision3>	<elision3>
9518	9381	<>	<elision3>
9518	9519	<elision2>	<elision2>
9518	9381	<>	<elision2>
9518	9519	<elision1>	<elision1>
9518	9381	<>	<elision1>
9518	9390	.	υ
9518	9393	s	υ
9518	9390	.	u
9518	9393	s	u
9518	91	s	κ
9518	9131	s	k
9518	9456	s	U
9518	9164	s	K
9518	9390	.	α
9518	9484	s	α
9518	9390	.	a
9518	9484	s	a
9518	9487	s	A
9518	91	s	λ
9518	9179	s	l
9518	9182	s	L
9519	9382	.	.
9519	9383	 	 
9519	9382	<~>	<~>
9519	9382	<split-s>	<split-s>
9519	9382	<split-h>	<split-h>
9519	9382	<name2>	<name2>
9519	9520	<>	<name>
9519	9386	<aphaerese>	<aphaerese>
9519	9519	<>	<aphaerese>
9519	9382	<elision3>	<elision3>
9519	9519	<>	<elision3>
9519	9382	<elision2>	<elision2>
9519	9519	<>	<elision2>
9519	9382	<elision1>	<elision1>
9519	9519	<>	<elision1>
9519	9390	.	υ
9519	9393	s	υ
9519	9390	.	u
9519	9393	s	u
9519	9396	.	κ
9519	9522	s	κ
9519	9525	s	k
9519	9456	s	U
9519	9528	s	K
9519	9390	.	α
9519	9484	s	α
9519	9390	.	a
9519	9484	s	a
9519	9487	s	A
9519	9536	s	λ
9519	9539	s	l
9519	9542	s	L
9520	9385	.	.
9520	9388	 	 
9520	9385	<~>	<~>
9520	9385	<split-s>	<split-s>
9520	9385	<split-h>	<split-h>
9520	9385	<name2>	<name2>
9520	9514	<aphaerese>	<aphaerese>
9520	9521	<>	<aphaerese>
9520	9385	<elision3>	<elision3>
9520	9521	<>	<elision3>
9520	9385	<elision2>	<elision2>
9520	9521	<>	<elision2>
9520	9385	<elision1>	<elision1>
9520	9521	<>	<elision1>
9520	9392	.	υ
9520	9395	s	υ
9520	9392	.	u
9520	9395	s	u
9520	9398	.	κ
9520	9524	s	κ
9520	9527	s	k
9520	9458	s	U
9520	9530	s	K
9520	9392	.	α
9520	9486	s	α
9520	9392	.	a
9520	9486	s	a
9520	9489	s	A
9520	9538	s	λ
9520	9541	s	l
9520	9544	s	L
9521	9382	.	.
9521	9383	 	 
9521	9382	<~>	<~>
9521	9382	<split-s>	<split-s>
9521	9382	<split-h>	<split-h>
9521	9382	<name2>	<name2>
9521	9386	<aphaerese>	<aphaerese>
9521	9519	<>	<aphaerese>
9521	9382	<elision3>	<elision3>
9521	9519	<>	<elision3>
9521	9382	<elision2>	<elision2>
9521	9519	<>	<elision2>
9521	9382	<elision1>	<elision1>
9521	9519	<>	<elision1>
9521	9390	.	υ
9521	9393	s	υ
9521	9390	.	u
9521	9393	s	u
9521	9396	.	κ
9521	9522	s	κ
9521	9525	s	k
9521	9456	s	U
9521	9528	s	K
9521	9390	.	α
9521	9484	s	α
9521	9390	.	a
9521	9484	s	a
9521	9487	s	A
9521	9536	s	λ
9521	9539	s	l
9521	9542	s	L
9522	92	.	.
9522	93	 	 
9522	92	<~>	<~>
9522	92	<split-s>	<split-s>
9522	92	<split-h>	<split-h>
9522	92	<name2>	<name2>
9522	9523	<>	<name>
9522	96	<aphaerese>	<aphaerese>
9522	9522	<>	<aphaerese>
9522	9417	<elision3>	<elision3>
9522	9522	<>	<elision3>
9522	9417	<elision2>	<elision2>
9522	9522	<>	<elision2>
9522	9417	<elision1>	<elision1>
9522	9522	<>	<elision1>
9522	100	.	υ
9522	8320	s	υ
9522	100	.	u
9522	8320	s	u
9522	100	.	κ
9522	9006	s	U
9522	100	.	α
9522	9061	s	α
9522	100	.	a
9522	9061	s	a
9522	9064	s	A
9522	100	.	λ
9522	8942	<2s>	<>
9523	95	.	.
9523	98	 	 
9523	95	<~>	<~>
9523	95	<split-s>	<split-s>
9523	95	<split-h>	<split-h>
9523	95	<name2>	<name2>
9523	9104	<aphaerese>	<aphaerese>
9523	9524	<>	<aphaerese>
9523	9419	<elision3>	<elision3>
9523	9524	<>	<elision3>
9523	9419	<elision2>	<elision2>
9523	9524	<>	<elision2>
9523	9419	<elision1>	<elision1>
9523	9524	<>	<elision1>
9523	102	.	υ
9523	8898	s	υ
9523	102	.	u
9523	8898	s	u
9523	102	.	κ
9523	9008	s	U
9523	102	.	α
9523	9063	s	α
9523	102	.	a
9523	9063	s	a
9523	9066	s	A
9523	102	.	λ
9523	8943	<2s>	<>
9524	92	.	.
9524	93	 	 
9524	92	<~>	<~>
9524	92	<split-s>	<split-s>
9524	92	<split-h>	<split-h>
9524	92	<name2>	<name2>
9524	96	<aphaerese>	<aphaerese>
9524	9522	<>	<aphaerese>
9524	9417	<elision3>	<elision3>
9524	9522	<>	<elision3>
9524	9417	<elision2>	<elision2>
9524	9522	<>	<elision2>
9524	9417	<elision1>	<elision1>
9524	9522	<>	<elision1>
9524	100	.	υ
9524	8320	s	υ
9524	100	.	u
9524	8320	s	u
9524	100	.	κ
9524	9006	s	U
9524	100	.	α
9524	9061	s	α
9524	100	.	a
9524	9061	s	a
9524	9064	s	A
9524	100	.	λ
9524	8941	<2s>	<>
9525	92	.	.
9525	93	 	 
9525	92	<~>	<~>
9525	92	<split-s>	<split-s>
9525	92	<split-h>	<split-h>
9525	92	<name2>	<name2>
9525	9526	<>	<name>
9525	96	<aphaerese>	<aphaerese>
9525	9525	<>	<aphaerese>
9525	92	<elision3>	<elision3>
9525	9525	<>	<elision3>
9525	92	<elision2>	<elision2>
9525	9525	<>	<elision2>
9525	92	<elision1>	<elision1>
9525	9525	<>	<elision1>
9525	100	.	υ
9525	8320	s	υ
9525	100	.	u
9525	8320	s	u
9525	9134	.	κ
9525	9006	s	U
9525	100	.	α
9525	9061	s	α
9525	100	.	a
9525	9061	s	a
9525	9064	s	A
9525	9134	.	λ
9525	8951	<2s>	<>
9526	95	.	.
9526	98	 	 
9526	95	<~>	<~>
9526	95	<split-s>	<split-s>
9526	95	<split-h>	<split-h>
9526	95	<name2>	<name2>
9526	9104	<aphaerese>	<aphaerese>
9526	9527	<>	<aphaerese>
9526	95	<elision3>	<elision3>
9526	9527	<>	<elision3>
9526	95	<elision2>	<elision2>
9526	9527	<>	<elision2>
9526	95	<elision1>	<elision1>
9526	9527	<>	<elision1>
9526	102	.	υ
9526	8898	s	υ
9526	102	.	u
9526	8898	s	u
9526	9136	.	κ
9526	9008	s	U
9526	102	.	α
9526	9063	s	α
9526	102	.	a
9526	9063	s	a
9526	9066	s	A
9526	9136	.	λ
9526	8952	<2s>	<>
9527	92	.	.
9527	93	 	 
9527	92	<~>	<~>
9527	92	<split-s>	<split-s>
9527	92	<split-h>	<split-h>
9527	92	<name2>	<name2>
9527	96	<aphaerese>	<aphaerese>
9527	9525	<>	<aphaerese>
9527	92	<elision3>	<elision3>
9527	9525	<>	<elision3>
9527	92	<elision2>	<elision2>
9527	9525	<>	<elision2>
9527	92	<elision1>	<elision1>
9527	9525	<>	<elision1>
9527	100	.	υ
9527	8320	s	υ
9527	100	.	u
9527	8320	s	u
9527	9134	.	κ
9527	9006	s	U
9527	100	.	α
9527	9061	s	α
9527	100	.	a
9527	9061	s	a
9527	9064	s	A
9527	9134	.	λ
9527	8950	<2s>	<>
9528	9165	<name>	<name>
9528	9529	<>	<name>
9528	9531	<>	<aphaerese>
9528	9531	<>	<elision3>
9528	9531	<>	<elision2>
9528	9531	<>	<elision1>
9528	8821	<2s>	<>
9528	9169	<L2kl>	<>
9528	9535	<K2kl>	<>
9529	9530	<>	<aphaerese>
9529	9530	<>	<elision3>
9529	9530	<>	<elision2>
9529	9530	<>	<elision1>
9529	9170	<L2kl>	<>
9529	9533	<K2kl>	<>
9530	9531	<>	<aphaerese>
9530	9531	<>	<elision3>
9530	9531	<>	<elision2>
9530	9531	<>	<elision1>
9530	9171	<L2kl>	<>
9530	9534	<K2kl>	<>
9531	9529	<>	<name>
9531	9531	<>	<aphaerese>
9531	9531	<>	<elision3>
9531	9531	<>	<elision2>
9531	9531	<>	<elision1>
9531	9169	<L2kl>	<>
9531	9532	<K2kl>	<>
9532	9137	.	.
9532	9138	 	 
9532	9137	<~>	<~>
9532	9137	<split-s>	<split-s>
9532	9137	<split-h>	<split-h>
9532	9137	<name2>	<name2>
9532	9533	<>	<name>
9532	9141	<aphaerese>	<aphaerese>
9532	9532	<>	<aphaerese>
9532	9137	<elision3>	<elision3>
9532	9532	<>	<elision3>
9532	9137	<elision2>	<elision2>
9532	9532	<>	<elision2>
9532	9137	<elision1>	<elision1>
9532	9532	<>	<elision1>
9532	9134	.	υ
9532	9061	s	υ
9532	9134	.	u
9532	9061	s	u
9532	9006	s	U
9532	9134	.	α
9532	9061	s	α
9532	9134	.	a
9532	9061	s	a
9532	9064	s	A
9532	8964	<2s>	<>
9533	9140	.	.
9533	9143	 	 
9533	9140	<~>	<~>
9533	9140	<split-s>	<split-s>
9533	9140	<split-h>	<split-h>
9533	9140	<name2>	<name2>
9533	9160	<aphaerese>	<aphaerese>
9533	9534	<>	<aphaerese>
9533	9140	<elision3>	<elision3>
9533	9534	<>	<elision3>
9533	9140	<elision2>	<elision2>
9533	9534	<>	<elision2>
9533	9140	<elision1>	<elision1>
9533	9534	<>	<elision1>
9533	9136	.	υ
9533	9063	s	υ
9533	9136	.	u
9533	9063	s	u
9533	9008	s	U
9533	9136	.	α
9533	9063	s	α
9533	9136	.	a
9533	9063	s	a
9533	9066	s	A
9533	8965	<2s>	<>
9534	9137	.	.
9534	9138	 	 
9534	9137	<~>	<~>
9534	9137	<split-s>	<split-s>
9534	9137	<split-h>	<split-h>
9534	9137	<name2>	<name2>
9534	9141	<aphaerese>	<aphaerese>
9534	9532	<>	<aphaerese>
9534	9137	<elision3>	<elision3>
9534	9532	<>	<elision3>
9534	9137	<elision2>	<elision2>
9534	9532	<>	<elision2>
9534	9137	<elision1>	<elision1>
9534	9532	<>	<elision1>
9534	9134	.	υ
9534	9061	s	υ
9534	9134	.	u
9534	9061	s	u
9534	9006	s	U
9534	9134	.	α
9534	9061	s	α
9534	9134	.	a
9534	9061	s	a
9534	9064	s	A
9534	8963	<2s>	<>
9535	9137	.	.
9535	9138	 	 
9535	9137	<~>	<~>
9535	9137	<split-s>	<split-s>
9535	9137	<split-h>	<split-h>
9535	9137	<name2>	<name2>
9535	9165	<name2>	<name>
9535	9533	<>	<name>
9535	9141	<aphaerese>	<aphaerese>
9535	9532	<>	<aphaerese>
9535	9137	<elision3>	<elision3>
9535	9532	<>	<elision3>
9535	9137	<elision2>	<elision2>
9535	9532	<>	<elision2>
9535	9137	<elision1>	<elision1>
9535	9532	<>	<elision1>
9535	9134	.	υ
9535	9061	s	υ
9535	9134	.	u
9535	9061	s	u
9535	9006	s	U
9535	9134	.	α
9535	9061	s	α
9535	9134	.	a
9535	9061	s	a
9535	9064	s	A
9535	8970	<2s>	<>
9536	92	.	.
9536	93	 	 
9536	92	<~>	<~>
9536	92	<split-s>	<split-s>
9536	92	<split-h>	<split-h>
9536	92	<name2>	<name2>
9536	9537	<>	<name>
9536	96	<aphaerese>	<aphaerese>
9536	9536	<>	<aphaerese>
9536	92	<elision3>	<elision3>
9536	9536	<>	<elision3>
9536	92	<elision2>	<elision2>
9536	9536	<>	<elision2>
9536	92	<elision1>	<elision1>
9536	9536	<>	<elision1>
9536	100	.	υ
9536	8320	s	υ
9536	100	.	u
9536	8320	s	u
9536	100	.	κ
9536	9006	s	U
9536	100	.	α
9536	9061	s	α
9536	100	.	a
9536	9061	s	a
9536	9064	s	A
9536	100	.	λ
9536	8951	<2s>	<>
9537	95	.	.
9537	98	 	 
9537	95	<~>	<~>
9537	95	<split-s>	<split-s>
9537	95	<split-h>	<split-h>
9537	95	<name2>	<name2>
9537	9104	<aphaerese>	<aphaerese>
9537	9538	<>	<aphaerese>
9537	95	<elision3>	<elision3>
9537	9538	<>	<elision3>
9537	95	<elision2>	<elision2>
9537	9538	<>	<elision2>
9537	95	<elision1>	<elision1>
9537	9538	<>	<elision1>
9537	102	.	υ
9537	8898	s	υ
9537	102	.	u
9537	8898	s	u
9537	102	.	κ
9537	9008	s	U
9537	102	.	α
9537	9063	s	α
9537	102	.	a
9537	9063	s	a
9537	9066	s	A
9537	102	.	λ
9537	8952	<2s>	<>
9538	92	.	.
9538	93	 	 
9538	92	<~>	<~>
9538	92	<split-s>	<split-s>
9538	92	<split-h>	<split-h>
9538	92	<name2>	<name2>
9538	96	<aphaerese>	<aphaerese>
9538	9536	<>	<aphaerese>
9538	92	<elision3>	<elision3>
9538	9536	<>	<elision3>
9538	92	<elision2>	<elision2>
9538	9536	<>	<elision2>
9538	92	<elision1>	<elision1>
9538	9536	<>	<elision1>
9538	100	.	υ
9538	8320	s	υ
9538	100	.	u
9538	8320	s	u
9538	100	.	κ
9538	9006	s	U
9538	100	.	α
9538	9061	s	α
9538	100	.	a
9538	9061	s	a
9538	9064	s	A
9538	100	.	λ
9538	8950	<2s>	<>
9539	9137	.	.
9539	9138	 	 
9539	9137	<~>	<~>
9539	9137	<split-s>	<split-s>
9539	9137	<split-h>	<split-h>
9539	9137	<name2>	<name2>
9539	9540	<>	<name>
9539	9141	<aphaerese>	<aphaerese>
9539	9539	<>	<aphaerese>
9539	9137	<elision3>	<elision3>
9539	9539	<>	<elision3>
9539	9137	<elision2>	<elision2>
9539	9539	<>	<elision2>
9539	9137	<elision1>	<elision1>
9539	9539	<>	<elision1>
9539	9134	.	υ
9539	9061	s	υ
9539	9134	.	u
9539	9061	s	u
9539	9134	.	κ
9539	9006	s	U
9539	9134	.	α
9539	9061	s	α
9539	9134	.	a
9539	9061	s	a
9539	9064	s	A
9539	9134	.	λ
9539	8951	<2s>	<>
9540	9140	.	.
9540	9143	 	 
9540	9140	<~>	<~>
9540	9140	<split-s>	<split-s>
9540	9140	<split-h>	<split-h>
9540	9140	<name2>	<name2>
9540	9160	<aphaerese>	<aphaerese>
9540	9541	<>	<aphaerese>
9540	9140	<elision3>	<elision3>
9540	9541	<>	<elision3>
9540	9140	<elision2>	<elision2>
9540	9541	<>	<elision2>
9540	9140	<elision1>	<elision1>
9540	9541	<>	<elision1>
9540	9136	.	υ
9540	9063	s	υ
9540	9136	.	u
9540	9063	s	u
9540	9136	.	κ
9540	9008	s	U
9540	9136	.	α
9540	9063	s	α
9540	9136	.	a
9540	9063	s	a
9540	9066	s	A
9540	9136	.	λ
9540	8952	<2s>	<>
9541	9137	.	.
9541	9138	 	 
9541	9137	<~>	<~>
9541	9137	<split-s>	<split-s>
9541	9137	<split-h>	<split-h>
9541	9137	<name2>	<name2>
9541	9141	<aphaerese>	<aphaerese>
9541	9539	<>	<aphaerese>
9541	9137	<elision3>	<elision3>
9541	9539	<>	<elision3>
9541	9137	<elision2>	<elision2>
9541	9539	<>	<elision2>
9541	9137	<elision1>	<elision1>
9541	9539	<>	<elision1>
9541	9134	.	υ
9541	9061	s	υ
9541	9134	.	u
9541	9061	s	u
9541	9134	.	κ
9541	9006	s	U
9541	9134	.	α
9541	9061	s	α
9541	9134	.	a
9541	9061	s	a
9541	9064	s	A
9541	9134	.	λ
9541	8950	<2s>	<>
9542	9165	<name>	<name>
9542	9543	<>	<name>
9542	9545	<>	<aphaerese>
9542	9545	<>	<elision3>
9542	9545	<>	<elision2>
9542	9545	<>	<elision1>
9542	8821	<2s>	<>
9542	9546	<L2kl>	<>
9543	9544	<>	<aphaerese>
9543	9544	<>	<elision3>
9543	9544	<>	<elision2>
9543	9544	<>	<elision1>
9543	9540	<L2kl>	<>
9544	9545	<>	<aphaerese>
9544	9545	<>	<elision3>
9544	9545	<>	<elision2>
9544	9545	<>	<elision1>
9544	9541	<L2kl>	<>
9545	9543	<>	<name>
9545	9545	<>	<aphaerese>
9545	9545	<>	<elision3>
9545	9545	<>	<elision2>
9545	9545	<>	<elision1>
9545	9539	<L2kl>	<>
9546	9137	.	.
9546	9138	 	 
9546	9137	<~>	<~>
9546	9137	<split-s>	<split-s>
9546	9137	<split-h>	<split-h>
9546	9137	<name2>	<name2>
9546	9165	<name2>	<name>
9546	9540	<>	<name>
9546	9141	<aphaerese>	<aphaerese>
9546	9539	<>	<aphaerese>
9546	9137	<elision3>	<elision3>
9546	9539	<>	<elision3>
9546	9137	<elision2>	<elision2>
9546	9539	<>	<elision2>
9546	9137	<elision1>	<elision1>
9546	9539	<>	<elision1>
9546	9134	.	υ
9546	9061	s	υ
9546	9134	.	u
9546	9061	s	u
9546	9134	.	κ
9546	9006	s	U
9546	9134	.	α
9546	9061	s	α
9546	9134	.	a
9546	9061	s	a
9546	9064	s	A
9546	9134	.	λ
9546	8977	<2s>	<>
9547	9548	.	.
9547	9549	 	 
9547	9548	<~>	<~>
9547	9548	<split-s>	<split-s>
9547	9548	<split-h>	<split-h>
9547	9548	<name2>	<name2>
9547	9663	<>	<name>
9547	9552	<aphaerese>	<aphaerese>
9547	9547	<>	<aphaerese>
9547	9665	<elision3>	<elision3>
9547	9547	<>	<elision3>
9547	9665	<elision2>	<elision2>
9547	9547	<>	<elision2>
9547	9665	<elision1>	<elision1>
9547	9547	<>	<elision1>
9547	9556	.	υ
9547	9559	s	υ
9547	9556	.	u
9547	9559	s	u
9547	9190	s	κ
9547	9315	s	k
9547	9605	s	U
9547	9333	s	K
9547	9556	.	α
9547	9630	s	α
9547	9556	.	a
9547	9630	s	a
9547	9633	s	A
9547	9190	s	λ
9547	9346	s	l
9547	9349	s	L
9547	9694	<1s>	<>
9548	9548	.	.
9548	9549	 	 
9548	9548	<~>	<~>
9548	9548	<split-s>	<split-s>
9548	9548	<split-h>	<split-h>
9548	9548	<name2>	<name2>
9548	9662	<>	<name>
9548	9552	<aphaerese>	<aphaerese>
9548	9548	<>	<aphaerese>
9548	9548	<elision3>	<elision3>
9548	9548	<>	<elision3>
9548	9548	<elision2>	<elision2>
9548	9548	<>	<elision2>
9548	9548	<elision1>	<elision1>
9548	9548	<>	<elision1>
9548	9556	.	υ
9548	9559	s	υ
9548	9556	.	u
9548	9559	s	u
9548	9562	.	κ
9548	9580	s	κ
9548	9315	s	k
9548	9605	s	U
9548	9333	s	K
9548	9556	.	α
9548	9630	s	α
9548	9556	.	a
9548	9630	s	a
9548	9633	s	A
9548	9636	s	λ
9548	9346	s	l
9548	9349	s	L
9548	8504	<1s>	<>
9549	9548	.	.
9549	9549	 	 
9549	9548	<~>	<~>
9549	9548	<split-s>	<split-s>
9549	9548	<split-h>	<split-h>
9549	9548	<name2>	<name2>
9549	9550	<>	<name>
9549	9552	<aphaerese>	<aphaerese>
9549	9555	<>	<aphaerese>
9549	9548	<elision3>	<elision3>
9549	9555	<>	<elision3>
9549	9548	<elision2>	<elision2>
9549	9555	<>	<elision2>
9549	9548	<elision1>	<elision1>
9549	9555	<>	<elision1>
9549	9556	.	υ
9549	9647	s	υ
9549	9556	.	u
9549	9647	s	u
9549	9562	.	κ
9549	9648	s	κ
9549	9649	s	k
9549	9650	s	U
9549	9652	s	K
9549	9556	.	α
9549	9654	s	α
9549	9556	.	a
9549	9654	s	a
9549	9655	s	A
9549	9656	s	λ
9549	9657	s	l
9549	9658	s	L
9549	8504	<1s>	<>
9550	9551	.	.
9550	9554	 	 
9550	9551	<~>	<~>
9550	9551	<split-s>	<split-s>
9550	9551	<split-h>	<split-h>
9550	9551	<name2>	<name2>
9550	9660	<aphaerese>	<aphaerese>
9550	9661	<>	<aphaerese>
9550	9551	<elision3>	<elision3>
9550	9661	<>	<elision3>
9550	9551	<elision2>	<elision2>
9550	9661	<>	<elision2>
9550	9551	<elision1>	<elision1>
9550	9661	<>	<elision1>
9550	9558	.	υ
9550	9561	s	υ
9550	9558	.	u
9550	9561	s	u
9550	9564	.	κ
9550	9582	s	κ
9550	9317	s	k
9550	9607	s	U
9550	9610	s	K
9550	9558	.	α
9550	9632	s	α
9550	9558	.	a
9550	9632	s	a
9550	9635	s	A
9550	9638	s	λ
9550	9348	s	l
9550	9641	s	L
9550	8505	<1s>	<>
9551	9548	.	.
9551	9549	 	 
9551	9548	<~>	<~>
9551	9548	<split-s>	<split-s>
9551	9548	<split-h>	<split-h>
9551	9548	<name2>	<name2>
9551	9552	<aphaerese>	<aphaerese>
9551	9548	<>	<aphaerese>
9551	9548	<elision3>	<elision3>
9551	9548	<>	<elision3>
9551	9548	<elision2>	<elision2>
9551	9548	<>	<elision2>
9551	9548	<elision1>	<elision1>
9551	9548	<>	<elision1>
9551	9556	.	υ
9551	9559	s	υ
9551	9556	.	u
9551	9559	s	u
9551	9562	.	κ
9551	9580	s	κ
9551	9315	s	k
9551	9605	s	U
9551	9333	s	K
9551	9556	.	α
9551	9630	s	α
9551	9556	.	a
9551	9630	s	a
9551	9633	s	A
9551	9636	s	λ
9551	9346	s	l
9551	9349	s	L
9551	8503	<1s>	<>
9552	9548	.	.
9552	9549	 	 
9552	9548	<~>	<~>
9552	9548	<split-s>	<split-s>
9552	9548	<split-h>	<split-h>
9552	9548	<name2>	<name2>
9552	9553	<>	<name>
9552	9552	<aphaerese>	<aphaerese>
9552	9552	<>	<aphaerese>
9552	9548	<elision3>	<elision3>
9552	9552	<>	<elision3>
9552	9548	<elision2>	<elision2>
9552	9552	<>	<elision2>
9552	9548	<elision1>	<elision1>
9552	9552	<>	<elision1>
9552	9548	.	υ
9552	9548	.	u
9552	9562	.	κ
9552	9580	s	κ
9552	9315	s	k
9552	9605	s	U
9552	9333	s	K
9552	9548	.	α
9552	9548	.	a
9552	9633	s	A
9552	9636	s	λ
9552	9346	s	l
9552	9349	s	L
9552	8491	<1s>	<>
9553	9551	.	.
9553	9554	 	 
9553	9551	<~>	<~>
9553	9551	<split-s>	<split-s>
9553	9551	<split-h>	<split-h>
9553	9551	<name2>	<name2>
9553	9660	<aphaerese>	<aphaerese>
9553	9660	<>	<aphaerese>
9553	9551	<elision3>	<elision3>
9553	9660	<>	<elision3>
9553	9551	<elision2>	<elision2>
9553	9660	<>	<elision2>
9553	9551	<elision1>	<elision1>
9553	9660	<>	<elision1>
9553	9551	.	υ
9553	9551	.	u
9553	9564	.	κ
9553	9582	s	κ
9553	9317	s	k
9553	9607	s	U
9553	9336	s	K
9553	9551	.	α
9553	9551	.	a
9553	9635	s	A
9553	9638	s	λ
9553	9348	s	l
9553	9351	s	L
9553	8492	<1s>	<>
9554	9548	.	.
9554	9549	 	 
9554	9548	<~>	<~>
9554	9548	<split-s>	<split-s>
9554	9548	<split-h>	<split-h>
9554	9548	<name2>	<name2>
9554	9552	<aphaerese>	<aphaerese>
9554	9555	<>	<aphaerese>
9554	9548	<elision3>	<elision3>
9554	9555	<>	<elision3>
9554	9548	<elision2>	<elision2>
9554	9555	<>	<elision2>
9554	9548	<elision1>	<elision1>
9554	9555	<>	<elision1>
9554	9556	.	υ
9554	9647	s	υ
9554	9556	.	u
9554	9647	s	u
9554	9562	.	κ
9554	9648	s	κ
9554	9649	s	k
9554	9650	s	U
9554	9652	s	K
9554	9556	.	α
9554	9654	s	α
9554	9556	.	a
9554	9654	s	a
9554	9655	s	A
9554	9656	s	λ
9554	9657	s	l
9554	9658	s	L
9554	8503	<1s>	<>
9555	9548	.	.
9555	9549	 	 
9555	9548	<~>	<~>
9555	9548	<split-s>	<split-s>
9555	9548	<split-h>	<split-h>
9555	9548	<name2>	<name2>
9555	9550	<>	<name>
9555	9552	<aphaerese>	<aphaerese>
9555	9555	<>	<aphaerese>
9555	9548	<elision3>	<elision3>
9555	9555	<>	<elision3>
9555	9548	<elision2>	<elision2>
9555	9555	<>	<elision2>
9555	9548	<elision1>	<elision1>
9555	9555	<>	<elision1>
9555	9556	.	υ
9555	9559	s	υ
9555	9556	.	u
9555	9559	s	u
9555	9562	.	κ
9555	9580	s	κ
9555	9315	s	k
9555	9605	s	U
9555	9608	s	K
9555	9556	.	α
9555	9630	s	α
9555	9556	.	a
9555	9630	s	a
9555	9633	s	A
9555	9636	s	λ
9555	9346	s	l
9555	9639	s	L
9555	8504	<1s>	<>
9556	9557	<>	<name>
9556	9556	<>	<aphaerese>
9556	9548	<elision3>	<elision3>
9556	9556	<>	<elision3>
9556	9548	<elision2>	<elision2>
9556	9556	<>	<elision2>
9556	9548	<elision1>	<elision1>
9556	9556	<>	<elision1>
9556	104	<1s>	<>
9557	9558	<>	<aphaerese>
9557	9551	<elision3>	<elision3>
9557	9558	<>	<elision3>
9557	9551	<elision2>	<elision2>
9557	9558	<>	<elision2>
9557	9551	<elision1>	<elision1>
9557	9558	<>	<elision1>
9557	105	<1s>	<>
9558	9556	<>	<aphaerese>
9558	9548	<elision3>	<elision3>
9558	9556	<>	<elision3>
9558	9548	<elision2>	<elision2>
9558	9556	<>	<elision2>
9558	9548	<elision1>	<elision1>
9558	9556	<>	<elision1>
9558	103	<1s>	<>
9559	9191	.	.
9559	9192	 	 
9559	9191	<~>	<~>
9559	9191	<split-s>	<split-s>
9559	9191	<split-h>	<split-h>
9559	9191	<name2>	<name2>
9559	9560	<>	<name>
9559	9195	<aphaerese>	<aphaerese>
9559	9559	<>	<aphaerese>
9559	9559	<>	<elision3>
9559	9559	<>	<elision2>
9559	9559	<>	<elision1>
9559	9199	.	υ
9559	9202	s	υ
9559	9199	.	u
9559	9202	s	u
9559	9220	.	κ
9559	9235	s	κ
9559	9241	s	k
9559	9244	s	U
9559	9296	s	K
9559	9199	.	α
9559	9202	s	α
9559	9199	.	a
9559	9202	s	a
9559	9274	s	A
9559	9241	s	λ
9559	9241	s	l
9559	9303	s	L
9559	8509	<2s>	<>
9560	9194	.	.
9560	9197	 	 
9560	9194	<~>	<~>
9560	9194	<split-s>	<split-s>
9560	9194	<split-h>	<split-h>
9560	9194	<name2>	<name2>
9560	9295	<aphaerese>	<aphaerese>
9560	9561	<>	<aphaerese>
9560	9561	<>	<elision3>
9560	9561	<>	<elision2>
9560	9561	<>	<elision1>
9560	9201	.	υ
9560	9219	s	υ
9560	9201	.	u
9560	9219	s	u
9560	9222	.	κ
9560	9237	s	κ
9560	9243	s	k
9560	9246	s	U
9560	9298	s	K
9560	9201	.	α
9560	9219	s	α
9560	9201	.	a
9560	9219	s	a
9560	9276	s	A
9560	9243	s	λ
9560	9243	s	l
9560	9305	s	L
9560	8510	<2s>	<>
9561	9191	.	.
9561	9192	 	 
9561	9191	<~>	<~>
9561	9191	<split-s>	<split-s>
9561	9191	<split-h>	<split-h>
9561	9191	<name2>	<name2>
9561	9195	<aphaerese>	<aphaerese>
9561	9559	<>	<aphaerese>
9561	9559	<>	<elision3>
9561	9559	<>	<elision2>
9561	9559	<>	<elision1>
9561	9199	.	υ
9561	9202	s	υ
9561	9199	.	u
9561	9202	s	u
9561	9220	.	κ
9561	9235	s	κ
9561	9241	s	k
9561	9244	s	U
9561	9296	s	K
9561	9199	.	α
9561	9202	s	α
9561	9199	.	a
9561	9202	s	a
9561	9274	s	A
9561	9241	s	λ
9561	9241	s	l
9561	9303	s	L
9561	8508	<2s>	<>
9562	9563	<>	<name>
9562	9562	<>	<aphaerese>
9562	9565	<elision3>	<elision3>
9562	9562	<>	<elision3>
9562	9565	<elision2>	<elision2>
9562	9562	<>	<elision2>
9562	9565	<elision1>	<elision1>
9562	9562	<>	<elision1>
9562	8488	<1s>	<>
9563	9564	<>	<aphaerese>
9563	9567	<elision3>	<elision3>
9563	9564	<>	<elision3>
9563	9567	<elision2>	<elision2>
9563	9564	<>	<elision2>
9563	9567	<elision1>	<elision1>
9563	9564	<>	<elision1>
9563	8489	<1s>	<>
9564	9562	<>	<aphaerese>
9564	9565	<elision3>	<elision3>
9564	9562	<>	<elision3>
9564	9565	<elision2>	<elision2>
9564	9562	<>	<elision2>
9564	9565	<elision1>	<elision1>
9564	9562	<>	<elision1>
9564	8487	<1s>	<>
9565	9566	<>	<name>
9565	9565	<>	<aphaerese>
9565	9565	<>	<elision3>
9565	9565	<>	<elision2>
9565	9565	<>	<elision1>
9565	9568	s	κ
9565	9568	s	k
9565	9571	s	K
9565	9568	s	λ
9565	9575	s	l
9565	9577	s	L
9565	8349	<1s>	<>
9566	9567	<>	<aphaerese>
9566	9567	<>	<elision3>
9566	9567	<>	<elision2>
9566	9567	<>	<elision1>
9566	9570	s	κ
9566	9570	s	k
9566	9573	s	K
9566	9570	s	λ
9566	9574	s	l
9566	9579	s	L
9566	8350	<1s>	<>
9567	9565	<>	<aphaerese>
9567	9565	<>	<elision3>
9567	9565	<>	<elision2>
9567	9565	<>	<elision1>
9567	9568	s	κ
9567	9568	s	k
9567	9571	s	K
9567	9568	s	λ
9567	9575	s	l
9567	9577	s	L
9567	8348	<1s>	<>
9568	9569	<>	<name>
9568	9568	<>	<aphaerese>
9568	9568	<>	<elision3>
9568	9568	<>	<elision2>
9568	9568	<>	<elision1>
9568	9312	s	κ
9568	9241	s	k
9568	9296	s	K
9568	9312	s	λ
9568	9241	s	l
9568	9303	s	L
9568	8524	<2s>	<>
9569	9570	<>	<aphaerese>
9569	9570	<>	<elision3>
9569	9570	<>	<elision2>
9569	9570	<>	<elision1>
9569	9314	s	κ
9569	9243	s	k
9569	9298	s	K
9569	9314	s	λ
9569	9243	s	l
9569	9305	s	L
9569	8525	<2s>	<>
9570	9568	<>	<aphaerese>
9570	9568	<>	<elision3>
9570	9568	<>	<elision2>
9570	9568	<>	<elision1>
9570	9312	s	κ
9570	9241	s	k
9570	9296	s	K
9570	9312	s	λ
9570	9241	s	l
9570	9303	s	L
9570	8523	<2s>	<>
9571	9572	<>	<name>
9571	9571	<>	<aphaerese>
9571	9571	<>	<elision3>
9571	9571	<>	<elision2>
9571	9571	<>	<elision1>
9571	9575	<K2kl>	<>
9572	9573	<>	<aphaerese>
9572	9573	<>	<elision3>
9572	9573	<>	<elision2>
9572	9573	<>	<elision1>
9572	9576	<K2kl>	<>
9573	9571	<>	<aphaerese>
9573	9571	<>	<elision3>
9573	9571	<>	<elision2>
9573	9571	<>	<elision1>
9573	9574	<K2kl>	<>
9574	9575	<>	<aphaerese>
9574	9575	<>	<elision3>
9574	9575	<>	<elision2>
9574	9575	<>	<elision1>
9574	8523	<2s>	<>
9575	9576	<>	<name>
9575	9575	<>	<aphaerese>
9575	9575	<>	<elision3>
9575	9575	<>	<elision2>
9575	9575	<>	<elision1>
9575	8524	<2s>	<>
9576	9574	<>	<aphaerese>
9576	9574	<>	<elision3>
9576	9574	<>	<elision2>
9576	9574	<>	<elision1>
9576	8525	<2s>	<>
9577	9578	<>	<name>
9577	9577	<>	<aphaerese>
9577	9577	<>	<elision3>
9577	9577	<>	<elision2>
9577	9577	<>	<elision1>
9577	9575	<L2kl>	<>
9578	9579	<>	<aphaerese>
9578	9579	<>	<elision3>
9578	9579	<>	<elision2>
9578	9579	<>	<elision1>
9578	9576	<L2kl>	<>
9579	9577	<>	<aphaerese>
9579	9577	<>	<elision3>
9579	9577	<>	<elision2>
9579	9577	<>	<elision1>
9579	9574	<L2kl>	<>
9580	9191	.	.
9580	9192	 	 
9580	9191	<~>	<~>
9580	9191	<split-s>	<split-s>
9580	9191	<split-h>	<split-h>
9580	9191	<name2>	<name2>
9580	9581	<>	<name>
9580	9195	<aphaerese>	<aphaerese>
9580	9580	<>	<aphaerese>
9580	9583	<elision3>	<elision3>
9580	9580	<>	<elision3>
9580	9583	<elision2>	<elision2>
9580	9580	<>	<elision2>
9580	9583	<elision1>	<elision1>
9580	9580	<>	<elision1>
9580	9199	.	υ
9580	9202	s	υ
9580	9199	.	u
9580	9202	s	u
9580	9199	.	κ
9580	9312	s	κ
9580	9241	s	k
9580	9244	s	U
9580	9296	s	K
9580	9199	.	α
9580	9202	s	α
9580	9199	.	a
9580	9202	s	a
9580	9274	s	A
9580	9199	.	λ
9580	9312	s	λ
9580	9241	s	l
9580	9303	s	L
9580	8689	<2s>	<>
9581	9194	.	.
9581	9197	 	 
9581	9194	<~>	<~>
9581	9194	<split-s>	<split-s>
9581	9194	<split-h>	<split-h>
9581	9194	<name2>	<name2>
9581	9295	<aphaerese>	<aphaerese>
9581	9582	<>	<aphaerese>
9581	9585	<elision3>	<elision3>
9581	9582	<>	<elision3>
9581	9585	<elision2>	<elision2>
9581	9582	<>	<elision2>
9581	9585	<elision1>	<elision1>
9581	9582	<>	<elision1>
9581	9201	.	υ
9581	9219	s	υ
9581	9201	.	u
9581	9219	s	u
9581	9201	.	κ
9581	9314	s	κ
9581	9243	s	k
9581	9246	s	U
9581	9298	s	K
9581	9201	.	α
9581	9219	s	α
9581	9201	.	a
9581	9219	s	a
9581	9276	s	A
9581	9201	.	λ
9581	9314	s	λ
9581	9243	s	l
9581	9305	s	L
9581	8690	<2s>	<>
9582	9191	.	.
9582	9192	 	 
9582	9191	<~>	<~>
9582	9191	<split-s>	<split-s>
9582	9191	<split-h>	<split-h>
9582	9191	<name2>	<name2>
9582	9195	<aphaerese>	<aphaerese>
9582	9580	<>	<aphaerese>
9582	9583	<elision3>	<elision3>
9582	9580	<>	<elision3>
9582	9583	<elision2>	<elision2>
9582	9580	<>	<elision2>
9582	9583	<elision1>	<elision1>
9582	9580	<>	<elision1>
9582	9199	.	υ
9582	9202	s	υ
9582	9199	.	u
9582	9202	s	u
9582	9199	.	κ
9582	9312	s	κ
9582	9241	s	k
9582	9244	s	U
9582	9296	s	K
9582	9199	.	α
9582	9202	s	α
9582	9199	.	a
9582	9202	s	a
9582	9274	s	A
9582	9199	.	λ
9582	9312	s	λ
9582	9241	s	l
9582	9303	s	L
9582	8688	<2s>	<>
9583	9191	.	.
9583	9192	 	 
9583	9191	<~>	<~>
9583	9191	<split-s>	<split-s>
9583	9191	<split-h>	<split-h>
9583	9191	<name2>	<name2>
9583	9584	<>	<name>
9583	9195	<aphaerese>	<aphaerese>
9583	9583	<>	<aphaerese>
9583	9191	<elision3>	<elision3>
9583	9583	<>	<elision3>
9583	9191	<elision2>	<elision2>
9583	9583	<>	<elision2>
9583	9191	<elision1>	<elision1>
9583	9583	<>	<elision1>
9583	9199	.	υ
9583	9202	s	υ
9583	9199	.	u
9583	9202	s	u
9583	9220	.	κ
9583	9586	s	κ
9583	9589	s	k
9583	9244	s	U
9583	9592	s	K
9583	9199	.	α
9583	9202	s	α
9583	9199	.	a
9583	9202	s	a
9583	9274	s	A
9583	9589	s	λ
9583	9589	s	l
9583	9600	s	L
9583	8592	<2s>	<>
9584	9194	.	.
9584	9197	 	 
9584	9194	<~>	<~>
9584	9194	<split-s>	<split-s>
9584	9194	<split-h>	<split-h>
9584	9194	<name2>	<name2>
9584	9295	<aphaerese>	<aphaerese>
9584	9585	<>	<aphaerese>
9584	9194	<elision3>	<elision3>
9584	9585	<>	<elision3>
9584	9194	<elision2>	<elision2>
9584	9585	<>	<elision2>
9584	9194	<elision1>	<elision1>
9584	9585	<>	<elision1>
9584	9201	.	υ
9584	9219	s	υ
9584	9201	.	u
9584	9219	s	u
9584	9222	.	κ
9584	9588	s	κ
9584	9591	s	k
9584	9246	s	U
9584	9594	s	K
9584	9201	.	α
9584	9219	s	α
9584	9201	.	a
9584	9219	s	a
9584	9276	s	A
9584	9591	s	λ
9584	9591	s	l
9584	9602	s	L
9584	8593	<2s>	<>
9585	9191	.	.
9585	9192	 	 
9585	9191	<~>	<~>
9585	9191	<split-s>	<split-s>
9585	9191	<split-h>	<split-h>
9585	9191	<name2>	<name2>
9585	9195	<aphaerese>	<aphaerese>
9585	9583	<>	<aphaerese>
9585	9191	<elision3>	<elision3>
9585	9583	<>	<elision3>
9585	9191	<elision2>	<elision2>
9585	9583	<>	<elision2>
9585	9191	<elision1>	<elision1>
9585	9583	<>	<elision1>
9585	9199	.	υ
9585	9202	s	υ
9585	9199	.	u
9585	9202	s	u
9585	9220	.	κ
9585	9586	s	κ
9585	9589	s	k
9585	9244	s	U
9585	9592	s	K
9585	9199	.	α
9585	9202	s	α
9585	9199	.	a
9585	9202	s	a
9585	9274	s	A
9585	9589	s	λ
9585	9589	s	l
9585	9600	s	L
9585	8591	<2s>	<>
9586	9203	.	.
9586	9203	 	 
9586	9203	<~>	<~>
9586	9203	<split-s>	<split-s>
9586	9203	<split-h>	<split-h>
9586	9203	<name2>	<name2>
9586	9587	<>	<name>
9586	9206	<aphaerese>	<aphaerese>
9586	9586	<>	<aphaerese>
9586	9238	<elision3>	<elision3>
9586	9586	<>	<elision3>
9586	9238	<elision2>	<elision2>
9586	9586	<>	<elision2>
9586	9238	<elision1>	<elision1>
9586	9586	<>	<elision1>
9586	9215	.	υ
9586	9215	.	u
9586	9215	.	κ
9586	9215	.	α
9586	9215	.	a
9586	9215	.	λ
9586	9424	<split-s>	<>
9587	9205	.	.
9587	9205	 	 
9587	9205	<~>	<~>
9587	9205	<split-s>	<split-s>
9587	9205	<split-h>	<split-h>
9587	9205	<name2>	<name2>
9587	9208	<aphaerese>	<aphaerese>
9587	9588	<>	<aphaerese>
9587	9240	<elision3>	<elision3>
9587	9588	<>	<elision3>
9587	9240	<elision2>	<elision2>
9587	9588	<>	<elision2>
9587	9240	<elision1>	<elision1>
9587	9588	<>	<elision1>
9587	9217	.	υ
9587	9217	.	u
9587	9217	.	κ
9587	9217	.	α
9587	9217	.	a
9587	9217	.	λ
9587	9425	<split-s>	<>
9588	9203	.	.
9588	9203	 	 
9588	9203	<~>	<~>
9588	9203	<split-s>	<split-s>
9588	9203	<split-h>	<split-h>
9588	9203	<name2>	<name2>
9588	9206	<aphaerese>	<aphaerese>
9588	9586	<>	<aphaerese>
9588	9238	<elision3>	<elision3>
9588	9586	<>	<elision3>
9588	9238	<elision2>	<elision2>
9588	9586	<>	<elision2>
9588	9238	<elision1>	<elision1>
9588	9586	<>	<elision1>
9588	9215	.	υ
9588	9215	.	u
9588	9215	.	κ
9588	9215	.	α
9588	9215	.	a
9588	9215	.	λ
9588	9423	<split-s>	<>
9589	9203	.	.
9589	9203	 	 
9589	9203	<~>	<~>
9589	9203	<split-s>	<split-s>
9589	9203	<split-h>	<split-h>
9589	9203	<name2>	<name2>
9589	9590	<>	<name>
9589	9206	<aphaerese>	<aphaerese>
9589	9589	<>	<aphaerese>
9589	9203	<elision3>	<elision3>
9589	9589	<>	<elision3>
9589	9203	<elision2>	<elision2>
9589	9589	<>	<elision2>
9589	9203	<elision1>	<elision1>
9589	9589	<>	<elision1>
9589	9215	.	υ
9589	9215	.	u
9589	9215	.	κ
9589	9215	.	α
9589	9215	.	a
9589	9215	.	λ
9589	9430	<split-s>	<>
9590	9205	.	.
9590	9205	 	 
9590	9205	<~>	<~>
9590	9205	<split-s>	<split-s>
9590	9205	<split-h>	<split-h>
9590	9205	<name2>	<name2>
9590	9208	<aphaerese>	<aphaerese>
9590	9591	<>	<aphaerese>
9590	9205	<elision3>	<elision3>
9590	9591	<>	<elision3>
9590	9205	<elision2>	<elision2>
9590	9591	<>	<elision2>
9590	9205	<elision1>	<elision1>
9590	9591	<>	<elision1>
9590	9217	.	υ
9590	9217	.	u
9590	9217	.	κ
9590	9217	.	α
9590	9217	.	a
9590	9217	.	λ
9590	9431	<split-s>	<>
9591	9203	.	.
9591	9203	 	 
9591	9203	<~>	<~>
9591	9203	<split-s>	<split-s>
9591	9203	<split-h>	<split-h>
9591	9203	<name2>	<name2>
9591	9206	<aphaerese>	<aphaerese>
9591	9589	<>	<aphaerese>
9591	9203	<elision3>	<elision3>
9591	9589	<>	<elision3>
9591	9203	<elision2>	<elision2>
9591	9589	<>	<elision2>
9591	9203	<elision1>	<elision1>
9591	9589	<>	<elision1>
9591	9215	.	υ
9591	9215	.	u
9591	9215	.	κ
9591	9215	.	α
9591	9215	.	a
9591	9215	.	λ
9591	9429	<split-s>	<>
9592	9248	<name>	<name>
9592	9593	<>	<name>
9592	9595	<>	<aphaerese>
9592	9595	<>	<elision3>
9592	9595	<>	<elision2>
9592	9595	<>	<elision1>
9592	9057	<split-s>	<>
9592	9300	<L2kl>	<>
9592	9599	<K2kl>	<>
9593	9594	<>	<aphaerese>
9593	9594	<>	<elision3>
9593	9594	<>	<elision2>
9593	9594	<>	<elision1>
9593	9301	<L2kl>	<>
9593	9597	<K2kl>	<>
9594	9595	<>	<aphaerese>
9594	9595	<>	<elision3>
9594	9595	<>	<elision2>
9594	9595	<>	<elision1>
9594	9302	<L2kl>	<>
9594	9598	<K2kl>	<>
9595	9593	<>	<name>
9595	9595	<>	<aphaerese>
9595	9595	<>	<elision3>
9595	9595	<>	<elision2>
9595	9595	<>	<elision1>
9595	9300	<L2kl>	<>
9595	9596	<K2kl>	<>
9596	9203	.	.
9596	9203	 	 
9596	9203	<~>	<~>
9596	9203	<split-s>	<split-s>
9596	9203	<split-h>	<split-h>
9596	9203	<name2>	<name2>
9596	9597	<>	<name>
9596	9206	<aphaerese>	<aphaerese>
9596	9596	<>	<aphaerese>
9596	9203	<elision3>	<elision3>
9596	9596	<>	<elision3>
9596	9203	<elision2>	<elision2>
9596	9596	<>	<elision2>
9596	9203	<elision1>	<elision1>
9596	9596	<>	<elision1>
9596	9215	.	υ
9596	9215	.	u
9596	9215	.	α
9596	9215	.	a
9596	9440	<split-s>	<>
9597	9205	.	.
9597	9205	 	 
9597	9205	<~>	<~>
9597	9205	<split-s>	<split-s>
9597	9205	<split-h>	<split-h>
9597	9205	<name2>	<name2>
9597	9208	<aphaerese>	<aphaerese>
9597	9598	<>	<aphaerese>
9597	9205	<elision3>	<elision3>
9597	9598	<>	<elision3>
9597	9205	<elision2>	<elision2>
9597	9598	<>	<elision2>
9597	9205	<elision1>	<elision1>
9597	9598	<>	<elision1>
9597	9217	.	υ
9597	9217	.	u
9597	9217	.	α
9597	9217	.	a
9597	9441	<split-s>	<>
9598	9203	.	.
9598	9203	 	 
9598	9203	<~>	<~>
9598	9203	<split-s>	<split-s>
9598	9203	<split-h>	<split-h>
9598	9203	<name2>	<name2>
9598	9206	<aphaerese>	<aphaerese>
9598	9596	<>	<aphaerese>
9598	9203	<elision3>	<elision3>
9598	9596	<>	<elision3>
9598	9203	<elision2>	<elision2>
9598	9596	<>	<elision2>
9598	9203	<elision1>	<elision1>
9598	9596	<>	<elision1>
9598	9215	.	υ
9598	9215	.	u
9598	9215	.	α
9598	9215	.	a
9598	9439	<split-s>	<>
9599	9203	.	.
9599	9203	 	 
9599	9203	<~>	<~>
9599	9203	<split-s>	<split-s>
9599	9203	<split-h>	<split-h>
9599	9203	<name2>	<name2>
9599	9248	<name2>	<name>
9599	9597	<>	<name>
9599	9206	<aphaerese>	<aphaerese>
9599	9596	<>	<aphaerese>
9599	9203	<elision3>	<elision3>
9599	9596	<>	<elision3>
9599	9203	<elision2>	<elision2>
9599	9596	<>	<elision2>
9599	9203	<elision1>	<elision1>
9599	9596	<>	<elision1>
9599	9215	.	υ
9599	9215	.	u
9599	9215	.	α
9599	9215	.	a
9599	9443	<split-s>	<>
9600	9248	<name>	<name>
9600	9601	<>	<name>
9600	9603	<>	<aphaerese>
9600	9603	<>	<elision3>
9600	9603	<>	<elision2>
9600	9603	<>	<elision1>
9600	9057	<split-s>	<>
9600	9604	<L2kl>	<>
9601	9602	<>	<aphaerese>
9601	9602	<>	<elision3>
9601	9602	<>	<elision2>
9601	9602	<>	<elision1>
9601	9590	<L2kl>	<>
9602	9603	<>	<aphaerese>
9602	9603	<>	<elision3>
9602	9603	<>	<elision2>
9602	9603	<>	<elision1>
9602	9591	<L2kl>	<>
9603	9601	<>	<name>
9603	9603	<>	<aphaerese>
9603	9603	<>	<elision3>
9603	9603	<>	<elision2>
9603	9603	<>	<elision1>
9603	9589	<L2kl>	<>
9604	9203	.	.
9604	9203	 	 
9604	9203	<~>	<~>
9604	9203	<split-s>	<split-s>
9604	9203	<split-h>	<split-h>
9604	9203	<name2>	<name2>
9604	9248	<name2>	<name>
9604	9590	<>	<name>
9604	9206	<aphaerese>	<aphaerese>
9604	9589	<>	<aphaerese>
9604	9203	<elision3>	<elision3>
9604	9589	<>	<elision3>
9604	9203	<elision2>	<elision2>
9604	9589	<>	<elision2>
9604	9203	<elision1>	<elision1>
9604	9589	<>	<elision1>
9604	9215	.	υ
9604	9215	.	u
9604	9215	.	κ
9604	9215	.	α
9604	9215	.	a
9604	9215	.	λ
9604	9455	<split-s>	<>
9605	9606	<>	<name>
9605	9605	<>	<aphaerese>
9605	9605	<>	<elision3>
9605	9605	<>	<elision2>
9605	9605	<>	<elision1>
9605	9321	<U2kl>	<>
9606	9607	<>	<aphaerese>
9606	9607	<>	<elision3>
9606	9607	<>	<elision2>
9606	9607	<>	<elision1>
9606	9322	<U2kl>	<>
9607	9605	<>	<aphaerese>
9607	9605	<>	<elision3>
9607	9605	<>	<elision2>
9607	9605	<>	<elision1>
9607	9323	<U2kl>	<>
9608	9334	<name>	<name>
9608	9609	<>	<name>
9608	9611	<>	<aphaerese>
9608	9611	<>	<elision3>
9608	9611	<>	<elision2>
9608	9611	<>	<elision1>
9608	8821	<2s>	<>
9608	9612	<A2kl>	<>
9608	9621	<L2kl>	<>
9608	9344	<K2kl>	<>
9609	9610	<>	<aphaerese>
9609	9610	<>	<elision3>
9609	9610	<>	<elision2>
9609	9610	<>	<elision1>
9609	9613	<A2kl>	<>
9609	9622	<L2kl>	<>
9609	9342	<K2kl>	<>
9610	9611	<>	<aphaerese>
9610	9611	<>	<elision3>
9610	9611	<>	<elision2>
9610	9611	<>	<elision1>
9610	9614	<A2kl>	<>
9610	9623	<L2kl>	<>
9610	9343	<K2kl>	<>
9611	9609	<>	<name>
9611	9611	<>	<aphaerese>
9611	9611	<>	<elision3>
9611	9611	<>	<elision2>
9611	9611	<>	<elision1>
9611	9612	<A2kl>	<>
9611	9621	<L2kl>	<>
9611	9341	<K2kl>	<>
9612	9613	<>	<name>
9612	9612	<>	<aphaerese>
9612	9612	<>	<elision3>
9612	9612	<>	<elision2>
9612	9612	<>	<elision1>
9612	9615	.	κ
9612	9615	.	λ
9612	8771	<2s>	<>
9613	9614	<>	<aphaerese>
9613	9614	<>	<elision3>
9613	9614	<>	<elision2>
9613	9614	<>	<elision1>
9613	9617	.	κ
9613	9617	.	λ
9613	8772	<2s>	<>
9614	9612	<>	<aphaerese>
9614	9612	<>	<elision3>
9614	9612	<>	<elision2>
9614	9612	<>	<elision1>
9614	9615	.	κ
9614	9615	.	λ
9614	8770	<2s>	<>
9615	9616	<>	<name>
9615	9615	<>	<aphaerese>
9615	9618	<elision3>	<elision3>
9615	9615	<>	<elision3>
9615	9618	<elision2>	<elision2>
9615	9615	<>	<elision2>
9615	9618	<elision1>	<elision1>
9615	9615	<>	<elision1>
9615	8762	<2s>	<>
9616	9617	<>	<aphaerese>
9616	9620	<elision3>	<elision3>
9616	9617	<>	<elision3>
9616	9620	<elision2>	<elision2>
9616	9617	<>	<elision2>
9616	9620	<elision1>	<elision1>
9616	9617	<>	<elision1>
9616	8763	<2s>	<>
9617	9615	<>	<aphaerese>
9617	9618	<elision3>	<elision3>
9617	9615	<>	<elision3>
9617	9618	<elision2>	<elision2>
9617	9615	<>	<elision2>
9617	9618	<elision1>	<elision1>
9617	9615	<>	<elision1>
9617	8761	<2s>	<>
9618	9321	.	.
9618	9321	 	 
9618	9321	<~>	<~>
9618	9321	<split-s>	<split-s>
9618	9321	<split-h>	<split-h>
9618	9321	<name2>	<name2>
9618	9619	<>	<name>
9618	9324	<aphaerese>	<aphaerese>
9618	9618	<>	<aphaerese>
9618	9321	<elision3>	<elision3>
9618	9618	<>	<elision3>
9618	9321	<elision2>	<elision2>
9618	9618	<>	<elision2>
9618	9321	<elision1>	<elision1>
9618	9618	<>	<elision1>
9618	9318	.	υ
9618	9318	.	u
9618	9318	.	α
9618	9318	.	a
9618	8726	<2s>	<>
9619	9323	.	.
9619	9323	 	 
9619	9323	<~>	<~>
9619	9323	<split-s>	<split-s>
9619	9323	<split-h>	<split-h>
9619	9323	<name2>	<name2>
9619	9326	<aphaerese>	<aphaerese>
9619	9620	<>	<aphaerese>
9619	9323	<elision3>	<elision3>
9619	9620	<>	<elision3>
9619	9323	<elision2>	<elision2>
9619	9620	<>	<elision2>
9619	9323	<elision1>	<elision1>
9619	9620	<>	<elision1>
9619	9320	.	υ
9619	9320	.	u
9619	9320	.	α
9619	9320	.	a
9619	8727	<2s>	<>
9620	9321	.	.
9620	9321	 	 
9620	9321	<~>	<~>
9620	9321	<split-s>	<split-s>
9620	9321	<split-h>	<split-h>
9620	9321	<name2>	<name2>
9620	9324	<aphaerese>	<aphaerese>
9620	9618	<>	<aphaerese>
9620	9321	<elision3>	<elision3>
9620	9618	<>	<elision3>
9620	9321	<elision2>	<elision2>
9620	9618	<>	<elision2>
9620	9321	<elision1>	<elision1>
9620	9618	<>	<elision1>
9620	9318	.	υ
9620	9318	.	u
9620	9318	.	α
9620	9318	.	a
9620	8725	<2s>	<>
9621	9622	<>	<name>
9621	9621	<>	<aphaerese>
9621	9621	<>	<elision3>
9621	9621	<>	<elision2>
9621	9621	<>	<elision1>
9621	9624	.	κ
9621	9624	.	λ
9621	8804	<2s>	<>
9622	9623	<>	<aphaerese>
9622	9623	<>	<elision3>
9622	9623	<>	<elision2>
9622	9623	<>	<elision1>
9622	9626	.	κ
9622	9626	.	λ
9622	8805	<2s>	<>
9623	9621	<>	<aphaerese>
9623	9621	<>	<elision3>
9623	9621	<>	<elision2>
9623	9621	<>	<elision1>
9623	9624	.	κ
9623	9624	.	λ
9623	8803	<2s>	<>
9624	9625	<>	<name>
9624	9624	<>	<aphaerese>
9624	9627	<elision3>	<elision3>
9624	9624	<>	<elision3>
9624	9627	<elision2>	<elision2>
9624	9624	<>	<elision2>
9624	9627	<elision1>	<elision1>
9624	9624	<>	<elision1>
9624	8795	<2s>	<>
9625	9626	<>	<aphaerese>
9625	9629	<elision3>	<elision3>
9625	9626	<>	<elision3>
9625	9629	<elision2>	<elision2>
9625	9626	<>	<elision2>
9625	9629	<elision1>	<elision1>
9625	9626	<>	<elision1>
9625	8796	<2s>	<>
9626	9624	<>	<aphaerese>
9626	9627	<elision3>	<elision3>
9626	9624	<>	<elision3>
9626	9627	<elision2>	<elision2>
9626	9624	<>	<elision2>
9626	9627	<elision1>	<elision1>
9626	9624	<>	<elision1>
9626	8794	<2s>	<>
9627	9628	<>	<name>
9627	9627	<>	<aphaerese>
9627	9627	<>	<elision3>
9627	9627	<>	<elision2>
9627	9627	<>	<elision1>
9627	9327	.	κ
9627	8789	<2s>	<>
9628	9629	<>	<aphaerese>
9628	9629	<>	<elision3>
9628	9629	<>	<elision2>
9628	9629	<>	<elision1>
9628	9329	.	κ
9628	8790	<2s>	<>
9629	9627	<>	<aphaerese>
9629	9627	<>	<elision3>
9629	9627	<>	<elision2>
9629	9627	<>	<elision1>
9629	9327	.	κ
9629	8788	<2s>	<>
9630	9321	.	.
9630	9321	 	 
9630	9321	<~>	<~>
9630	9321	<split-s>	<split-s>
9630	9321	<split-h>	<split-h>
9630	9321	<name2>	<name2>
9630	9631	<>	<name>
9630	9324	<aphaerese>	<aphaerese>
9630	9630	<>	<aphaerese>
9630	9630	<>	<elision3>
9630	9630	<>	<elision2>
9630	9630	<>	<elision1>
9630	9318	.	υ
9630	9318	.	u
9630	9327	.	κ
9630	9318	.	α
9630	9318	.	a
9630	8509	<2s>	<>
9631	9323	.	.
9631	9323	 	 
9631	9323	<~>	<~>
9631	9323	<split-s>	<split-s>
9631	9323	<split-h>	<split-h>
9631	9323	<name2>	<name2>
9631	9326	<aphaerese>	<aphaerese>
9631	9632	<>	<aphaerese>
9631	9632	<>	<elision3>
9631	9632	<>	<elision2>
9631	9632	<>	<elision1>
9631	9320	.	υ
9631	9320	.	u
9631	9329	.	κ
9631	9320	.	α
9631	9320	.	a
9631	8510	<2s>	<>
9632	9321	.	.
9632	9321	 	 
9632	9321	<~>	<~>
9632	9321	<split-s>	<split-s>
9632	9321	<split-h>	<split-h>
9632	9321	<name2>	<name2>
9632	9324	<aphaerese>	<aphaerese>
9632	9630	<>	<aphaerese>
9632	9630	<>	<elision3>
9632	9630	<>	<elision2>
9632	9630	<>	<elision1>
9632	9318	.	υ
9632	9318	.	u
9632	9327	.	κ
9632	9318	.	α
9632	9318	.	a
9632	8508	<2s>	<>
9633	9634	<>	<name>
9633	9633	<>	<aphaerese>
9633	9633	<>	<elision3>
9633	9633	<>	<elision2>
9633	9633	<>	<elision1>
9633	9321	<A2kl>	<>
9634	9635	<>	<aphaerese>
9634	9635	<>	<elision3>
9634	9635	<>	<elision2>
9634	9635	<>	<elision1>
9634	9322	<A2kl>	<>
9635	9633	<>	<aphaerese>
9635	9633	<>	<elision3>
9635	9633	<>	<elision2>
9635	9633	<>	<elision1>
9635	9323	<A2kl>	<>
9636	9191	.	.
9636	9192	 	 
9636	9191	<~>	<~>
9636	9191	<split-s>	<split-s>
9636	9191	<split-h>	<split-h>
9636	9191	<name2>	<name2>
9636	9637	<>	<name>
9636	9195	<aphaerese>	<aphaerese>
9636	9636	<>	<aphaerese>
9636	9191	<elision3>	<elision3>
9636	9636	<>	<elision3>
9636	9191	<elision2>	<elision2>
9636	9636	<>	<elision2>
9636	9191	<elision1>	<elision1>
9636	9636	<>	<elision1>
9636	9199	.	υ
9636	9202	s	υ
9636	9199	.	u
9636	9202	s	u
9636	9199	.	κ
9636	9312	s	κ
9636	9241	s	k
9636	9244	s	U
9636	9296	s	K
9636	9199	.	α
9636	9202	s	α
9636	9199	.	a
9636	9202	s	a
9636	9274	s	A
9636	9199	.	λ
9636	9312	s	λ
9636	9241	s	l
9636	9303	s	L
9636	8701	<2s>	<>
9637	9194	.	.
9637	9197	 	 
9637	9194	<~>	<~>
9637	9194	<split-s>	<split-s>
9637	9194	<split-h>	<split-h>
9637	9194	<name2>	<name2>
9637	9295	<aphaerese>	<aphaerese>
9637	9638	<>	<aphaerese>
9637	9194	<elision3>	<elision3>
9637	9638	<>	<elision3>
9637	9194	<elision2>	<elision2>
9637	9638	<>	<elision2>
9637	9194	<elision1>	<elision1>
9637	9638	<>	<elision1>
9637	9201	.	υ
9637	9219	s	υ
9637	9201	.	u
9637	9219	s	u
9637	9201	.	κ
9637	9314	s	κ
9637	9243	s	k
9637	9246	s	U
9637	9298	s	K
9637	9201	.	α
9637	9219	s	α
9637	9201	.	a
9637	9219	s	a
9637	9276	s	A
9637	9201	.	λ
9637	9314	s	λ
9637	9243	s	l
9637	9305	s	L
9637	8702	<2s>	<>
9638	9191	.	.
9638	9192	 	 
9638	9191	<~>	<~>
9638	9191	<split-s>	<split-s>
9638	9191	<split-h>	<split-h>
9638	9191	<name2>	<name2>
9638	9195	<aphaerese>	<aphaerese>
9638	9636	<>	<aphaerese>
9638	9191	<elision3>	<elision3>
9638	9636	<>	<elision3>
9638	9191	<elision2>	<elision2>
9638	9636	<>	<elision2>
9638	9191	<elision1>	<elision1>
9638	9636	<>	<elision1>
9638	9199	.	υ
9638	9202	s	υ
9638	9199	.	u
9638	9202	s	u
9638	9199	.	κ
9638	9312	s	κ
9638	9241	s	k
9638	9244	s	U
9638	9296	s	K
9638	9199	.	α
9638	9202	s	α
9638	9199	.	a
9638	9202	s	a
9638	9274	s	A
9638	9199	.	λ
9638	9312	s	λ
9638	9241	s	l
9638	9303	s	L
9638	8700	<2s>	<>
9639	9345	<name>	<name>
9639	9640	<>	<name>
9639	9642	<>	<aphaerese>
9639	9642	<>	<elision3>
9639	9642	<>	<elision2>
9639	9642	<>	<elision1>
9639	8821	<2s>	<>
9639	9612	<A2kl>	<>
9639	9646	<L2kl>	<>
9640	9641	<>	<aphaerese>
9640	9641	<>	<elision3>
9640	9641	<>	<elision2>
9640	9641	<>	<elision1>
9640	9613	<A2kl>	<>
9640	9644	<L2kl>	<>
9641	9642	<>	<aphaerese>
9641	9642	<>	<elision3>
9641	9642	<>	<elision2>
9641	9642	<>	<elision1>
9641	9614	<A2kl>	<>
9641	9645	<L2kl>	<>
9642	9640	<>	<name>
9642	9642	<>	<aphaerese>
9642	9642	<>	<elision3>
9642	9642	<>	<elision2>
9642	9642	<>	<elision1>
9642	9612	<A2kl>	<>
9642	9643	<L2kl>	<>
9643	9321	.	.
9643	9321	 	 
9643	9321	<~>	<~>
9643	9321	<split-s>	<split-s>
9643	9321	<split-h>	<split-h>
9643	9321	<name2>	<name2>
9643	9644	<>	<name>
9643	9324	<aphaerese>	<aphaerese>
9643	9643	<>	<aphaerese>
9643	9321	<elision3>	<elision3>
9643	9643	<>	<elision3>
9643	9321	<elision2>	<elision2>
9643	9643	<>	<elision2>
9643	9321	<elision1>	<elision1>
9643	9643	<>	<elision1>
9643	9318	.	υ
9643	9318	.	u
9643	9624	.	κ
9643	9318	.	α
9643	9318	.	a
9643	9624	.	λ
9643	8838	<2s>	<>
9644	9323	.	.
9644	9323	 	 
9644	9323	<~>	<~>
9644	9323	<split-s>	<split-s>
9644	9323	<split-h>	<split-h>
9644	9323	<name2>	<name2>
9644	9326	<aphaerese>	<aphaerese>
9644	9645	<>	<aphaerese>
9644	9323	<elision3>	<elision3>
9644	9645	<>	<elision3>
9644	9323	<elision2>	<elision2>
9644	9645	<>	<elision2>
9644	9323	<elision1>	<elision1>
9644	9645	<>	<elision1>
9644	9320	.	υ
9644	9320	.	u
9644	9626	.	κ
9644	9320	.	α
9644	9320	.	a
9644	9626	.	λ
9644	8839	<2s>	<>
9645	9321	.	.
9645	9321	 	 
9645	9321	<~>	<~>
9645	9321	<split-s>	<split-s>
9645	9321	<split-h>	<split-h>
9645	9321	<name2>	<name2>
9645	9324	<aphaerese>	<aphaerese>
9645	9643	<>	<aphaerese>
9645	9321	<elision3>	<elision3>
9645	9643	<>	<elision3>
9645	9321	<elision2>	<elision2>
9645	9643	<>	<elision2>
9645	9321	<elision1>	<elision1>
9645	9643	<>	<elision1>
9645	9318	.	υ
9645	9318	.	u
9645	9624	.	κ
9645	9318	.	α
9645	9318	.	a
9645	9624	.	λ
9645	8837	<2s>	<>
9646	9321	.	.
9646	9321	 	 
9646	9321	<~>	<~>
9646	9321	<split-s>	<split-s>
9646	9321	<split-h>	<split-h>
9646	9321	<name2>	<name2>
9646	9345	<name2>	<name>
9646	9644	<>	<name>
9646	9324	<aphaerese>	<aphaerese>
9646	9643	<>	<aphaerese>
9646	9321	<elision3>	<elision3>
9646	9643	<>	<elision3>
9646	9321	<elision2>	<elision2>
9646	9643	<>	<elision2>
9646	9321	<elision1>	<elision1>
9646	9643	<>	<elision1>
9646	9318	.	υ
9646	9318	.	u
9646	9624	.	κ
9646	9318	.	α
9646	9318	.	a
9646	9624	.	λ
9646	8844	<2s>	<>
9647	9191	.	.
9647	9192	 	 
9647	9191	<~>	<~>
9647	9191	<split-s>	<split-s>
9647	9191	<split-h>	<split-h>
9647	9191	<name2>	<name2>
9647	9560	<>	<name>
9647	9195	<aphaerese>	<aphaerese>
9647	9559	<>	<aphaerese>
9647	9559	<>	<elision3>
9647	9559	<>	<elision2>
9647	9559	<>	<elision1>
9647	9199	.	υ
9647	9202	s	υ
9647	9199	.	u
9647	9202	s	u
9647	9220	.	κ
9647	9235	s	κ
9647	9241	s	k
9647	9244	s	U
9647	9296	s	K
9647	9199	.	α
9647	9202	s	α
9647	9199	.	a
9647	9202	s	a
9647	9274	s	A
9647	9241	s	λ
9647	9241	s	l
9647	9303	s	L
9647	8850	<2s>	<>
9648	9191	.	.
9648	9192	 	 
9648	9191	<~>	<~>
9648	9191	<split-s>	<split-s>
9648	9191	<split-h>	<split-h>
9648	9191	<name2>	<name2>
9648	9581	<>	<name>
9648	9195	<aphaerese>	<aphaerese>
9648	9580	<>	<aphaerese>
9648	9583	<elision3>	<elision3>
9648	9580	<>	<elision3>
9648	9583	<elision2>	<elision2>
9648	9580	<>	<elision2>
9648	9583	<elision1>	<elision1>
9648	9580	<>	<elision1>
9648	9199	.	υ
9648	9202	s	υ
9648	9199	.	u
9648	9202	s	u
9648	9199	.	κ
9648	9312	s	κ
9648	9241	s	k
9648	9244	s	U
9648	9296	s	K
9648	9199	.	α
9648	9202	s	α
9648	9199	.	a
9648	9202	s	a
9648	9274	s	A
9648	9199	.	λ
9648	9312	s	λ
9648	9241	s	l
9648	9303	s	L
9648	8853	<2s>	<>
9649	9191	.	.
9649	9192	 	 
9649	9191	<~>	<~>
9649	9191	<split-s>	<split-s>
9649	9191	<split-h>	<split-h>
9649	9191	<name2>	<name2>
9649	9316	<>	<name>
9649	9195	<aphaerese>	<aphaerese>
9649	9315	<>	<aphaerese>
9649	9191	<elision3>	<elision3>
9649	9315	<>	<elision3>
9649	9191	<elision2>	<elision2>
9649	9315	<>	<elision2>
9649	9191	<elision1>	<elision1>
9649	9315	<>	<elision1>
9649	9199	.	υ
9649	9202	s	υ
9649	9199	.	u
9649	9202	s	u
9649	9318	.	κ
9649	9312	s	κ
9649	9241	s	k
9649	9244	s	U
9649	9296	s	K
9649	9199	.	α
9649	9202	s	α
9649	9199	.	a
9649	9202	s	a
9649	9274	s	A
9649	9318	.	λ
9649	9312	s	λ
9649	9241	s	l
9649	9303	s	L
9649	8856	<2s>	<>
9650	9606	<>	<name>
9650	9605	<>	<aphaerese>
9650	9605	<>	<elision3>
9650	9605	<>	<elision2>
9650	9605	<>	<elision1>
9650	9651	<U2kl>	<>
9651	9321	.	.
9651	9321	 	 
9651	9321	<~>	<~>
9651	9321	<split-s>	<split-s>
9651	9321	<split-h>	<split-h>
9651	9321	<name2>	<name2>
9651	9322	<>	<name>
9651	9324	<aphaerese>	<aphaerese>
9651	9321	<>	<aphaerese>
9651	9321	<elision3>	<elision3>
9651	9321	<>	<elision3>
9651	9321	<elision2>	<elision2>
9651	9321	<>	<elision2>
9651	9321	<elision1>	<elision1>
9651	9321	<>	<elision1>
9651	9318	.	υ
9651	9318	.	u
9651	9327	.	κ
9651	9318	.	α
9651	9318	.	a
9651	8860	<2s>	<>
9652	9334	<name>	<name>
9652	9609	<>	<name>
9652	9611	<>	<aphaerese>
9652	9611	<>	<elision3>
9652	9611	<>	<elision2>
9652	9611	<>	<elision1>
9652	8821	<2s>	<>
9652	9612	<A2kl>	<>
9652	9621	<L2kl>	<>
9652	9653	<K2kl>	<>
9653	9321	.	.
9653	9321	 	 
9653	9321	<~>	<~>
9653	9321	<split-s>	<split-s>
9653	9321	<split-h>	<split-h>
9653	9321	<name2>	<name2>
9653	9345	<name2>	<name>
9653	9342	<>	<name>
9653	9324	<aphaerese>	<aphaerese>
9653	9341	<>	<aphaerese>
9653	9321	<elision3>	<elision3>
9653	9341	<>	<elision3>
9653	9321	<elision2>	<elision2>
9653	9341	<>	<elision2>
9653	9321	<elision1>	<elision1>
9653	9341	<>	<elision1>
9653	9318	.	υ
9653	9318	.	u
9653	9318	.	α
9653	9318	.	a
9653	8864	<2s>	<>
9654	9321	.	.
9654	9321	 	 
9654	9321	<~>	<~>
9654	9321	<split-s>	<split-s>
9654	9321	<split-h>	<split-h>
9654	9321	<name2>	<name2>
9654	9631	<>	<name>
9654	9324	<aphaerese>	<aphaerese>
9654	9630	<>	<aphaerese>
9654	9630	<>	<elision3>
9654	9630	<>	<elision2>
9654	9630	<>	<elision1>
9654	9318	.	υ
9654	9318	.	u
9654	9327	.	κ
9654	9318	.	α
9654	9318	.	a
9654	8850	<2s>	<>
9655	9634	<>	<name>
9655	9633	<>	<aphaerese>
9655	9633	<>	<elision3>
9655	9633	<>	<elision2>
9655	9633	<>	<elision1>
9655	9651	<A2kl>	<>
9656	9191	.	.
9656	9192	 	 
9656	9191	<~>	<~>
9656	9191	<split-s>	<split-s>
9656	9191	<split-h>	<split-h>
9656	9191	<name2>	<name2>
9656	9637	<>	<name>
9656	9195	<aphaerese>	<aphaerese>
9656	9636	<>	<aphaerese>
9656	9191	<elision3>	<elision3>
9656	9636	<>	<elision3>
9656	9191	<elision2>	<elision2>
9656	9636	<>	<elision2>
9656	9191	<elision1>	<elision1>
9656	9636	<>	<elision1>
9656	9199	.	υ
9656	9202	s	υ
9656	9199	.	u
9656	9202	s	u
9656	9199	.	κ
9656	9312	s	κ
9656	9241	s	k
9656	9244	s	U
9656	9296	s	K
9656	9199	.	α
9656	9202	s	α
9656	9199	.	a
9656	9202	s	a
9656	9274	s	A
9656	9199	.	λ
9656	9312	s	λ
9656	9241	s	l
9656	9303	s	L
9656	8856	<2s>	<>
9657	9321	.	.
9657	9321	 	 
9657	9321	<~>	<~>
9657	9321	<split-s>	<split-s>
9657	9321	<split-h>	<split-h>
9657	9321	<name2>	<name2>
9657	9347	<>	<name>
9657	9324	<aphaerese>	<aphaerese>
9657	9346	<>	<aphaerese>
9657	9321	<elision3>	<elision3>
9657	9346	<>	<elision3>
9657	9321	<elision2>	<elision2>
9657	9346	<>	<elision2>
9657	9321	<elision1>	<elision1>
9657	9346	<>	<elision1>
9657	9318	.	υ
9657	9318	.	u
9657	9318	.	κ
9657	9318	.	α
9657	9318	.	a
9657	9318	.	λ
9657	8856	<2s>	<>
9658	9345	<name>	<name>
9658	9640	<>	<name>
9658	9642	<>	<aphaerese>
9658	9642	<>	<elision3>
9658	9642	<>	<elision2>
9658	9642	<>	<elision1>
9658	8821	<2s>	<>
9658	9612	<A2kl>	<>
9658	9659	<L2kl>	<>
9659	9321	.	.
9659	9321	 	 
9659	9321	<~>	<~>
9659	9321	<split-s>	<split-s>
9659	9321	<split-h>	<split-h>
9659	9321	<name2>	<name2>
9659	9345	<name2>	<name>
9659	9644	<>	<name>
9659	9324	<aphaerese>	<aphaerese>
9659	9643	<>	<aphaerese>
9659	9321	<elision3>	<elision3>
9659	9643	<>	<elision3>
9659	9321	<elision2>	<elision2>
9659	9643	<>	<elision2>
9659	9321	<elision1>	<elision1>
9659	9643	<>	<elision1>
9659	9318	.	υ
9659	9318	.	u
9659	9624	.	κ
9659	9318	.	α
9659	9318	.	a
9659	9624	.	λ
9659	8869	<2s>	<>
9660	9548	.	.
9660	9549	 	 
9660	9548	<~>	<~>
9660	9548	<split-s>	<split-s>
9660	9548	<split-h>	<split-h>
9660	9548	<name2>	<name2>
9660	9552	<aphaerese>	<aphaerese>
9660	9552	<>	<aphaerese>
9660	9548	<elision3>	<elision3>
9660	9552	<>	<elision3>
9660	9548	<elision2>	<elision2>
9660	9552	<>	<elision2>
9660	9548	<elision1>	<elision1>
9660	9552	<>	<elision1>
9660	9548	.	υ
9660	9548	.	u
9660	9562	.	κ
9660	9580	s	κ
9660	9315	s	k
9660	9605	s	U
9660	9333	s	K
9660	9548	.	α
9660	9548	.	a
9660	9633	s	A
9660	9636	s	λ
9660	9346	s	l
9660	9349	s	L
9660	8490	<1s>	<>
9661	9548	.	.
9661	9549	 	 
9661	9548	<~>	<~>
9661	9548	<split-s>	<split-s>
9661	9548	<split-h>	<split-h>
9661	9548	<name2>	<name2>
9661	9552	<aphaerese>	<aphaerese>
9661	9555	<>	<aphaerese>
9661	9548	<elision3>	<elision3>
9661	9555	<>	<elision3>
9661	9548	<elision2>	<elision2>
9661	9555	<>	<elision2>
9661	9548	<elision1>	<elision1>
9661	9555	<>	<elision1>
9661	9556	.	υ
9661	9559	s	υ
9661	9556	.	u
9661	9559	s	u
9661	9562	.	κ
9661	9580	s	κ
9661	9315	s	k
9661	9605	s	U
9661	9608	s	K
9661	9556	.	α
9661	9630	s	α
9661	9556	.	a
9661	9630	s	a
9661	9633	s	A
9661	9636	s	λ
9661	9346	s	l
9661	9639	s	L
9661	8503	<1s>	<>
9662	9551	.	.
9662	9554	 	 
9662	9551	<~>	<~>
9662	9551	<split-s>	<split-s>
9662	9551	<split-h>	<split-h>
9662	9551	<name2>	<name2>
9662	9660	<aphaerese>	<aphaerese>
9662	9551	<>	<aphaerese>
9662	9551	<elision3>	<elision3>
9662	9551	<>	<elision3>
9662	9551	<elision2>	<elision2>
9662	9551	<>	<elision2>
9662	9551	<elision1>	<elision1>
9662	9551	<>	<elision1>
9662	9558	.	υ
9662	9561	s	υ
9662	9558	.	u
9662	9561	s	u
9662	9564	.	κ
9662	9582	s	κ
9662	9317	s	k
9662	9607	s	U
9662	9336	s	K
9662	9558	.	α
9662	9632	s	α
9662	9558	.	a
9662	9632	s	a
9662	9635	s	A
9662	9638	s	λ
9662	9348	s	l
9662	9351	s	L
9662	8505	<1s>	<>
9663	9551	.	.
9663	9554	 	 
9663	9551	<~>	<~>
9663	9551	<split-s>	<split-s>
9663	9551	<split-h>	<split-h>
9663	9551	<name2>	<name2>
9663	9660	<aphaerese>	<aphaerese>
9663	9664	<>	<aphaerese>
9663	9667	<elision3>	<elision3>
9663	9664	<>	<elision3>
9663	9667	<elision2>	<elision2>
9663	9664	<>	<elision2>
9663	9667	<elision1>	<elision1>
9663	9664	<>	<elision1>
9663	9558	.	υ
9663	9561	s	υ
9663	9558	.	u
9663	9561	s	u
9663	9311	s	κ
9663	9317	s	k
9663	9607	s	U
9663	9336	s	K
9663	9558	.	α
9663	9632	s	α
9663	9558	.	a
9663	9632	s	a
9663	9635	s	A
9663	9311	s	λ
9663	9348	s	l
9663	9351	s	L
9663	9695	<1s>	<>
9664	9548	.	.
9664	9549	 	 
9664	9548	<~>	<~>
9664	9548	<split-s>	<split-s>
9664	9548	<split-h>	<split-h>
9664	9548	<name2>	<name2>
9664	9552	<aphaerese>	<aphaerese>
9664	9547	<>	<aphaerese>
9664	9665	<elision3>	<elision3>
9664	9547	<>	<elision3>
9664	9665	<elision2>	<elision2>
9664	9547	<>	<elision2>
9664	9665	<elision1>	<elision1>
9664	9547	<>	<elision1>
9664	9556	.	υ
9664	9559	s	υ
9664	9556	.	u
9664	9559	s	u
9664	9190	s	κ
9664	9315	s	k
9664	9605	s	U
9664	9333	s	K
9664	9556	.	α
9664	9630	s	α
9664	9556	.	a
9664	9630	s	a
9664	9633	s	A
9664	9190	s	λ
9664	9346	s	l
9664	9349	s	L
9664	9693	<1s>	<>
9665	9548	.	.
9665	9549	 	 
9665	9548	<~>	<~>
9665	9548	<split-s>	<split-s>
9665	9548	<split-h>	<split-h>
9665	9548	<name2>	<name2>
9665	9666	<>	<name>
9665	9552	<aphaerese>	<aphaerese>
9665	9665	<>	<aphaerese>
9665	9548	<elision3>	<elision3>
9665	9665	<>	<elision3>
9665	9548	<elision2>	<elision2>
9665	9665	<>	<elision2>
9665	9548	<elision1>	<elision1>
9665	9665	<>	<elision1>
9665	9556	.	υ
9665	9559	s	υ
9665	9556	.	u
9665	9559	s	u
9665	9562	.	κ
9665	9668	s	κ
9665	9671	s	k
9665	9605	s	U
9665	9674	s	K
9665	9556	.	α
9665	9630	s	α
9665	9556	.	a
9665	9630	s	a
9665	9633	s	A
9665	9682	s	λ
9665	9685	s	l
9665	9688	s	L
9665	8592	<1s>	<>
9666	9551	.	.
9666	9554	 	 
9666	9551	<~>	<~>
9666	9551	<split-s>	<split-s>
9666	9551	<split-h>	<split-h>
9666	9551	<name2>	<name2>
9666	9660	<aphaerese>	<aphaerese>
9666	9667	<>	<aphaerese>
9666	9551	<elision3>	<elision3>
9666	9667	<>	<elision3>
9666	9551	<elision2>	<elision2>
9666	9667	<>	<elision2>
9666	9551	<elision1>	<elision1>
9666	9667	<>	<elision1>
9666	9558	.	υ
9666	9561	s	υ
9666	9558	.	u
9666	9561	s	u
9666	9564	.	κ
9666	9670	s	κ
9666	9673	s	k
9666	9607	s	U
9666	9676	s	K
9666	9558	.	α
9666	9632	s	α
9666	9558	.	a
9666	9632	s	a
9666	9635	s	A
9666	9684	s	λ
9666	9687	s	l
9666	9690	s	L
9666	8593	<1s>	<>
9667	9548	.	.
9667	9549	 	 
9667	9548	<~>	<~>
9667	9548	<split-s>	<split-s>
9667	9548	<split-h>	<split-h>
9667	9548	<name2>	<name2>
9667	9552	<aphaerese>	<aphaerese>
9667	9665	<>	<aphaerese>
9667	9548	<elision3>	<elision3>
9667	9665	<>	<elision3>
9667	9548	<elision2>	<elision2>
9667	9665	<>	<elision2>
9667	9548	<elision1>	<elision1>
9667	9665	<>	<elision1>
9667	9556	.	υ
9667	9559	s	υ
9667	9556	.	u
9667	9559	s	u
9667	9562	.	κ
9667	9668	s	κ
9667	9671	s	k
9667	9605	s	U
9667	9674	s	K
9667	9556	.	α
9667	9630	s	α
9667	9556	.	a
9667	9630	s	a
9667	9633	s	A
9667	9682	s	λ
9667	9685	s	l
9667	9688	s	L
9667	8591	<1s>	<>
9668	9191	.	.
9668	9192	 	 
9668	9191	<~>	<~>
9668	9191	<split-s>	<split-s>
9668	9191	<split-h>	<split-h>
9668	9191	<name2>	<name2>
9668	9669	<>	<name>
9668	9195	<aphaerese>	<aphaerese>
9668	9668	<>	<aphaerese>
9668	9583	<elision3>	<elision3>
9668	9668	<>	<elision3>
9668	9583	<elision2>	<elision2>
9668	9668	<>	<elision2>
9668	9583	<elision1>	<elision1>
9668	9668	<>	<elision1>
9668	9199	.	υ
9668	9202	s	υ
9668	9199	.	u
9668	9202	s	u
9668	9199	.	κ
9668	9244	s	U
9668	9199	.	α
9668	9202	s	α
9668	9199	.	a
9668	9202	s	a
9668	9274	s	A
9668	9199	.	λ
9668	8942	<2s>	<>
9669	9194	.	.
9669	9197	 	 
9669	9194	<~>	<~>
9669	9194	<split-s>	<split-s>
9669	9194	<split-h>	<split-h>
9669	9194	<name2>	<name2>
9669	9295	<aphaerese>	<aphaerese>
9669	9670	<>	<aphaerese>
9669	9585	<elision3>	<elision3>
9669	9670	<>	<elision3>
9669	9585	<elision2>	<elision2>
9669	9670	<>	<elision2>
9669	9585	<elision1>	<elision1>
9669	9670	<>	<elision1>
9669	9201	.	υ
9669	9219	s	υ
9669	9201	.	u
9669	9219	s	u
9669	9201	.	κ
9669	9246	s	U
9669	9201	.	α
9669	9219	s	α
9669	9201	.	a
9669	9219	s	a
9669	9276	s	A
9669	9201	.	λ
9669	8943	<2s>	<>
9670	9191	.	.
9670	9192	 	 
9670	9191	<~>	<~>
9670	9191	<split-s>	<split-s>
9670	9191	<split-h>	<split-h>
9670	9191	<name2>	<name2>
9670	9195	<aphaerese>	<aphaerese>
9670	9668	<>	<aphaerese>
9670	9583	<elision3>	<elision3>
9670	9668	<>	<elision3>
9670	9583	<elision2>	<elision2>
9670	9668	<>	<elision2>
9670	9583	<elision1>	<elision1>
9670	9668	<>	<elision1>
9670	9199	.	υ
9670	9202	s	υ
9670	9199	.	u
9670	9202	s	u
9670	9199	.	κ
9670	9244	s	U
9670	9199	.	α
9670	9202	s	α
9670	9199	.	a
9670	9202	s	a
9670	9274	s	A
9670	9199	.	λ
9670	8941	<2s>	<>
9671	9191	.	.
9671	9192	 	 
9671	9191	<~>	<~>
9671	9191	<split-s>	<split-s>
9671	9191	<split-h>	<split-h>
9671	9191	<name2>	<name2>
9671	9672	<>	<name>
9671	9195	<aphaerese>	<aphaerese>
9671	9671	<>	<aphaerese>
9671	9191	<elision3>	<elision3>
9671	9671	<>	<elision3>
9671	9191	<elision2>	<elision2>
9671	9671	<>	<elision2>
9671	9191	<elision1>	<elision1>
9671	9671	<>	<elision1>
9671	9199	.	υ
9671	9202	s	υ
9671	9199	.	u
9671	9202	s	u
9671	9318	.	κ
9671	9244	s	U
9671	9199	.	α
9671	9202	s	α
9671	9199	.	a
9671	9202	s	a
9671	9274	s	A
9671	9318	.	λ
9671	8951	<2s>	<>
9672	9194	.	.
9672	9197	 	 
9672	9194	<~>	<~>
9672	9194	<split-s>	<split-s>
9672	9194	<split-h>	<split-h>
9672	9194	<name2>	<name2>
9672	9295	<aphaerese>	<aphaerese>
9672	9673	<>	<aphaerese>
9672	9194	<elision3>	<elision3>
9672	9673	<>	<elision3>
9672	9194	<elision2>	<elision2>
9672	9673	<>	<elision2>
9672	9194	<elision1>	<elision1>
9672	9673	<>	<elision1>
9672	9201	.	υ
9672	9219	s	υ
9672	9201	.	u
9672	9219	s	u
9672	9320	.	κ
9672	9246	s	U
9672	9201	.	α
9672	9219	s	α
9672	9201	.	a
9672	9219	s	a
9672	9276	s	A
9672	9320	.	λ
9672	8952	<2s>	<>
9673	9191	.	.
9673	9192	 	 
9673	9191	<~>	<~>
9673	9191	<split-s>	<split-s>
9673	9191	<split-h>	<split-h>
9673	9191	<name2>	<name2>
9673	9195	<aphaerese>	<aphaerese>
9673	9671	<>	<aphaerese>
9673	9191	<elision3>	<elision3>
9673	9671	<>	<elision3>
9673	9191	<elision2>	<elision2>
9673	9671	<>	<elision2>
9673	9191	<elision1>	<elision1>
9673	9671	<>	<elision1>
9673	9199	.	υ
9673	9202	s	υ
9673	9199	.	u
9673	9202	s	u
9673	9318	.	κ
9673	9244	s	U
9673	9199	.	α
9673	9202	s	α
9673	9199	.	a
9673	9202	s	a
9673	9274	s	A
9673	9318	.	λ
9673	8950	<2s>	<>
9674	9334	<name>	<name>
9674	9675	<>	<name>
9674	9677	<>	<aphaerese>
9674	9677	<>	<elision3>
9674	9677	<>	<elision2>
9674	9677	<>	<elision1>
9674	8821	<2s>	<>
9674	9338	<L2kl>	<>
9674	9681	<K2kl>	<>
9675	9676	<>	<aphaerese>
9675	9676	<>	<elision3>
9675	9676	<>	<elision2>
9675	9676	<>	<elision1>
9675	9339	<L2kl>	<>
9675	9679	<K2kl>	<>
9676	9677	<>	<aphaerese>
9676	9677	<>	<elision3>
9676	9677	<>	<elision2>
9676	9677	<>	<elision1>
9676	9340	<L2kl>	<>
9676	9680	<K2kl>	<>
9677	9675	<>	<name>
9677	9677	<>	<aphaerese>
9677	9677	<>	<elision3>
9677	9677	<>	<elision2>
9677	9677	<>	<elision1>
9677	9338	<L2kl>	<>
9677	9678	<K2kl>	<>
9678	9321	.	.
9678	9321	 	 
9678	9321	<~>	<~>
9678	9321	<split-s>	<split-s>
9678	9321	<split-h>	<split-h>
9678	9321	<name2>	<name2>
9678	9679	<>	<name>
9678	9324	<aphaerese>	<aphaerese>
9678	9678	<>	<aphaerese>
9678	9321	<elision3>	<elision3>
9678	9678	<>	<elision3>
9678	9321	<elision2>	<elision2>
9678	9678	<>	<elision2>
9678	9321	<elision1>	<elision1>
9678	9678	<>	<elision1>
9678	9318	.	υ
9678	9318	.	u
9678	9318	.	α
9678	9318	.	a
9678	8964	<2s>	<>
9679	9323	.	.
9679	9323	 	 
9679	9323	<~>	<~>
9679	9323	<split-s>	<split-s>
9679	9323	<split-h>	<split-h>
9679	9323	<name2>	<name2>
9679	9326	<aphaerese>	<aphaerese>
9679	9680	<>	<aphaerese>
9679	9323	<elision3>	<elision3>
9679	9680	<>	<elision3>
9679	9323	<elision2>	<elision2>
9679	9680	<>	<elision2>
9679	9323	<elision1>	<elision1>
9679	9680	<>	<elision1>
9679	9320	.	υ
9679	9320	.	u
9679	9320	.	α
9679	9320	.	a
9679	8965	<2s>	<>
9680	9321	.	.
9680	9321	 	 
9680	9321	<~>	<~>
9680	9321	<split-s>	<split-s>
9680	9321	<split-h>	<split-h>
9680	9321	<name2>	<name2>
9680	9324	<aphaerese>	<aphaerese>
9680	9678	<>	<aphaerese>
9680	9321	<elision3>	<elision3>
9680	9678	<>	<elision3>
9680	9321	<elision2>	<elision2>
9680	9678	<>	<elision2>
9680	9321	<elision1>	<elision1>
9680	9678	<>	<elision1>
9680	9318	.	υ
9680	9318	.	u
9680	9318	.	α
9680	9318	.	a
9680	8963	<2s>	<>
9681	9321	.	.
9681	9321	 	 
9681	9321	<~>	<~>
9681	9321	<split-s>	<split-s>
9681	9321	<split-h>	<split-h>
9681	9321	<name2>	<name2>
9681	9345	<name2>	<name>
9681	9679	<>	<name>
9681	9324	<aphaerese>	<aphaerese>
9681	9678	<>	<aphaerese>
9681	9321	<elision3>	<elision3>
9681	9678	<>	<elision3>
9681	9321	<elision2>	<elision2>
9681	9678	<>	<elision2>
9681	9321	<elision1>	<elision1>
9681	9678	<>	<elision1>
9681	9318	.	υ
9681	9318	.	u
9681	9318	.	α
9681	9318	.	a
9681	8970	<2s>	<>
9682	9191	.	.
9682	9192	 	 
9682	9191	<~>	<~>
9682	9191	<split-s>	<split-s>
9682	9191	<split-h>	<split-h>
9682	9191	<name2>	<name2>
9682	9683	<>	<name>
9682	9195	<aphaerese>	<aphaerese>
9682	9682	<>	<aphaerese>
9682	9191	<elision3>	<elision3>
9682	9682	<>	<elision3>
9682	9191	<elision2>	<elision2>
9682	9682	<>	<elision2>
9682	9191	<elision1>	<elision1>
9682	9682	<>	<elision1>
9682	9199	.	υ
9682	9202	s	υ
9682	9199	.	u
9682	9202	s	u
9682	9199	.	κ
9682	9244	s	U
9682	9199	.	α
9682	9202	s	α
9682	9199	.	a
9682	9202	s	a
9682	9274	s	A
9682	9199	.	λ
9682	8951	<2s>	<>
9683	9194	.	.
9683	9197	 	 
9683	9194	<~>	<~>
9683	9194	<split-s>	<split-s>
9683	9194	<split-h>	<split-h>
9683	9194	<name2>	<name2>
9683	9295	<aphaerese>	<aphaerese>
9683	9684	<>	<aphaerese>
9683	9194	<elision3>	<elision3>
9683	9684	<>	<elision3>
9683	9194	<elision2>	<elision2>
9683	9684	<>	<elision2>
9683	9194	<elision1>	<elision1>
9683	9684	<>	<elision1>
9683	9201	.	υ
9683	9219	s	υ
9683	9201	.	u
9683	9219	s	u
9683	9201	.	κ
9683	9246	s	U
9683	9201	.	α
9683	9219	s	α
9683	9201	.	a
9683	9219	s	a
9683	9276	s	A
9683	9201	.	λ
9683	8952	<2s>	<>
9684	9191	.	.
9684	9192	 	 
9684	9191	<~>	<~>
9684	9191	<split-s>	<split-s>
9684	9191	<split-h>	<split-h>
9684	9191	<name2>	<name2>
9684	9195	<aphaerese>	<aphaerese>
9684	9682	<>	<aphaerese>
9684	9191	<elision3>	<elision3>
9684	9682	<>	<elision3>
9684	9191	<elision2>	<elision2>
9684	9682	<>	<elision2>
9684	9191	<elision1>	<elision1>
9684	9682	<>	<elision1>
9684	9199	.	υ
9684	9202	s	υ
9684	9199	.	u
9684	9202	s	u
9684	9199	.	κ
9684	9244	s	U
9684	9199	.	α
9684	9202	s	α
9684	9199	.	a
9684	9202	s	a
9684	9274	s	A
9684	9199	.	λ
9684	8950	<2s>	<>
9685	9321	.	.
9685	9321	 	 
9685	9321	<~>	<~>
9685	9321	<split-s>	<split-s>
9685	9321	<split-h>	<split-h>
9685	9321	<name2>	<name2>
9685	9686	<>	<name>
9685	9324	<aphaerese>	<aphaerese>
9685	9685	<>	<aphaerese>
9685	9321	<elision3>	<elision3>
9685	9685	<>	<elision3>
9685	9321	<elision2>	<elision2>
9685	9685	<>	<elision2>
9685	9321	<elision1>	<elision1>
9685	9685	<>	<elision1>
9685	9318	.	υ
9685	9318	.	u
9685	9318	.	κ
9685	9318	.	α
9685	9318	.	a
9685	9318	.	λ
9685	8951	<2s>	<>
9686	9323	.	.
9686	9323	 	 
9686	9323	<~>	<~>
9686	9323	<split-s>	<split-s>
9686	9323	<split-h>	<split-h>
9686	9323	<name2>	<name2>
9686	9326	<aphaerese>	<aphaerese>
9686	9687	<>	<aphaerese>
9686	9323	<elision3>	<elision3>
9686	9687	<>	<elision3>
9686	9323	<elision2>	<elision2>
9686	9687	<>	<elision2>
9686	9323	<elision1>	<elision1>
9686	9687	<>	<elision1>
9686	9320	.	υ
9686	9320	.	u
9686	9320	.	κ
9686	9320	.	α
9686	9320	.	a
9686	9320	.	λ
9686	8952	<2s>	<>
9687	9321	.	.
9687	9321	 	 
9687	9321	<~>	<~>
9687	9321	<split-s>	<split-s>
9687	9321	<split-h>	<split-h>
9687	9321	<name2>	<name2>
9687	9324	<aphaerese>	<aphaerese>
9687	9685	<>	<aphaerese>
9687	9321	<elision3>	<elision3>
9687	9685	<>	<elision3>
9687	9321	<elision2>	<elision2>
9687	9685	<>	<elision2>
9687	9321	<elision1>	<elision1>
9687	9685	<>	<elision1>
9687	9318	.	υ
9687	9318	.	u
9687	9318	.	κ
9687	9318	.	α
9687	9318	.	a
9687	9318	.	λ
9687	8950	<2s>	<>
9688	9345	<name>	<name>
9688	9689	<>	<name>
9688	9691	<>	<aphaerese>
9688	9691	<>	<elision3>
9688	9691	<>	<elision2>
9688	9691	<>	<elision1>
9688	8821	<2s>	<>
9688	9692	<L2kl>	<>
9689	9690	<>	<aphaerese>
9689	9690	<>	<elision3>
9689	9690	<>	<elision2>
9689	9690	<>	<elision1>
9689	9686	<L2kl>	<>
9690	9691	<>	<aphaerese>
9690	9691	<>	<elision3>
9690	9691	<>	<elision2>
9690	9691	<>	<elision1>
9690	9687	<L2kl>	<>
9691	9689	<>	<name>
9691	9691	<>	<aphaerese>
9691	9691	<>	<elision3>
9691	9691	<>	<elision2>
9691	9691	<>	<elision1>
9691	9685	<L2kl>	<>
9692	9321	.	.
9692	9321	 	 
9692	9321	<~>	<~>
9692	9321	<split-s>	<split-s>
9692	9321	<split-h>	<split-h>
9692	9321	<name2>	<name2>
9692	9345	<name2>	<name>
9692	9686	<>	<name>
9692	9324	<aphaerese>	<aphaerese>
9692	9685	<>	<aphaerese>
9692	9321	<elision3>	<elision3>
9692	9685	<>	<elision3>
9692	9321	<elision2>	<elision2>
9692	9685	<>	<elision2>
9692	9321	<elision1>	<elision1>
9692	9685	<>	<elision1>
9692	9318	.	υ
9692	9318	.	u
9692	9318	.	κ
9692	9318	.	α
9692	9318	.	a
9692	9318	.	λ
9692	8977	<2s>	<>
9693	107	.	.
9693	108	 	 
9693	107	<~>	<~>
9693	107	<split-s>	<split-s>
9693	107	<split-h>	<split-h>
9693	107	<name2>	<name2>
9693	111	<aphaerese>	<aphaerese>
9693	9694	<>	<aphaerese>
9693	8692	<elision3>	<elision3>
9693	9694	<>	<elision3>
9693	8692	<elision2>	<elision2>
9693	9694	<>	<elision2>
9693	8692	<elision1>	<elision1>
9693	9694	<>	<elision1>
9693	8110	.	υ
9693	8154	H	υ
9693	8110	.	u
9693	8156	H	u
9693	8569	H	κ
9693	8064	H	k
9693	8077	H	U
9693	8080	H	K
9693	8110	.	α
9693	8140	H	α
9693	8110	.	a
9693	8145	H	a
9693	7907	H	A
9693	8546	H	λ
9693	8494	H	l
9693	8499	H	L
9693	9697	<K>	<>
9694	107	.	.
9694	108	 	 
9694	107	<~>	<~>
9694	107	<split-s>	<split-s>
9694	107	<split-h>	<split-h>
9694	107	<name2>	<name2>
9694	9695	<>	<name>
9694	111	<aphaerese>	<aphaerese>
9694	9694	<>	<aphaerese>
9694	8692	<elision3>	<elision3>
9694	9694	<>	<elision3>
9694	8692	<elision2>	<elision2>
9694	9694	<>	<elision2>
9694	8692	<elision1>	<elision1>
9694	9694	<>	<elision1>
9694	8110	.	υ
9694	8154	H	υ
9694	8110	.	u
9694	8156	H	u
9694	8569	H	κ
9694	8064	H	k
9694	8077	H	U
9694	8080	H	K
9694	8110	.	α
9694	8140	H	α
9694	8110	.	a
9694	8145	H	a
9694	7907	H	A
9694	8546	H	λ
9694	8494	H	l
9694	8499	H	L
9694	9698	<K>	<>
9695	106	.	.
9695	110	 	 
9695	106	<~>	<~>
9695	106	<split-s>	<split-s>
9695	106	<split-h>	<split-h>
9695	106	<name2>	<name2>
9695	113	<aphaerese>	<aphaerese>
9695	9693	<>	<aphaerese>
9695	8691	<elision3>	<elision3>
9695	9693	<>	<elision3>
9695	8691	<elision2>	<elision2>
9695	9693	<>	<elision2>
9695	8691	<elision1>	<elision1>
9695	9693	<>	<elision1>
9695	8112	.	υ
9695	8149	H	υ
9695	8112	.	u
9695	8153	H	u
9695	8526	H	κ
9695	8105	H	k
9695	8079	H	U
9695	8109	H	K
9695	8112	.	α
9695	8139	H	α
9695	8112	.	a
9695	8144	H	a
9695	7910	H	A
9695	8545	H	λ
9695	8493	H	l
9695	8496	H	L
9695	9696	<K>	<>
9696	8162	.	.
9696	8162	<~>	<~>
9696	8162	<split-s>	<split-s>
9696	8162	<split-h>	<split-h>
9696	8162	<name2>	<name2>
9696	8165	<aphaerese>	<aphaerese>
9696	9697	<>	<aphaerese>
9696	8640	<elision3>	<elision3>
9696	9697	<>	<elision3>
9696	8640	<elision2>	<elision2>
9696	9697	<>	<elision2>
9696	8640	<elision1>	<elision1>
9696	9697	<>	<elision1>
9696	8158	.	υ
9696	8304	H	υ
9696	8158	.	u
9696	8313	H	u
9696	8556	H	κ
9696	8273	H	k
9696	8282	H	U
9696	8286	H	K
9696	8158	.	α
9696	8316	H	α
9696	8158	.	a
9696	8319	H	a
9696	8253	H	A
9696	8565	H	λ
9696	8300	H	l
9696	8295	H	L
9697	8160	.	.
9697	8160	<~>	<~>
9697	8160	<split-s>	<split-s>
9697	8160	<split-h>	<split-h>
9697	8160	<name2>	<name2>
9697	8163	<aphaerese>	<aphaerese>
9697	9698	<>	<aphaerese>
9697	8641	<elision3>	<elision3>
9697	9698	<>	<elision3>
9697	8641	<elision2>	<elision2>
9697	9698	<>	<elision2>
9697	8641	<elision1>	<elision1>
9697	9698	<>	<elision1>
9697	8159	.	υ
9697	8302	H	υ
9697	8159	.	u
9697	8311	H	u
9697	8554	H	κ
9697	8271	H	k
9697	8280	H	U
9697	8283	H	K
9697	8159	.	α
9697	8314	H	α
9697	8159	.	a
9697	8317	H	a
9697	8251	H	A
9697	8563	H	λ
9697	8298	H	l
9697	8301	H	L
9698	8160	.	.
9698	8160	<~>	<~>
9698	8160	<split-s>	<split-s>
9698	8160	<split-h>	<split-h>
9698	8160	<name2>	<name2>
9698	9696	<>	<name>
9698	8163	<aphaerese>	<aphaerese>
9698	9698	<>	<aphaerese>
9698	8641	<elision3>	<elision3>
9698	9698	<>	<elision3>
9698	8641	<elision2>	<elision2>
9698	9698	<>	<elision2>
9698	8641	<elision1>	<elision1>
9698	9698	<>	<elision1>
9698	8159	.	υ
9698	8302	H	υ
9698	8159	.	u
9698	8311	H	u
9698	8554	H	κ
9698	8271	H	k
9698	8280	H	U
9698	8283	H	K
9698	8159	.	α
9698	8314	H	α
9698	8159	.	a
9698	8317	H	a
9698	8251	H	A
9698	8563	H	λ
9698	8298	H	l
9698	8301	H	L
9699	9700	<>	<name>
9699	9699	<>	<aphaerese>
9699	9699	<>	<elision3>
9699	9699	<>	<elision2>
9699	9699	<>	<elision1>
9699	9556	.	κ
9699	9556	.	λ
9699	8880	<1s>	<>
9700	9701	<>	<aphaerese>
9700	9701	<>	<elision3>
9700	9701	<>	<elision2>
9700	9701	<>	<elision1>
9700	9558	.	κ
9700	9558	.	λ
9700	8881	<1s>	<>
9701	9699	<>	<aphaerese>
9701	9699	<>	<elision3>
9701	9699	<>	<elision2>
9701	9699	<>	<elision1>
9701	9556	.	κ
9701	9556	.	λ
9701	8879	<1s>	<>
9702	9548	.	.
9702	9549	 	 
9702	9548	<~>	<~>
9702	9548	<split-s>	<split-s>
9702	9548	<split-h>	<split-h>
9702	9548	<name2>	<name2>
9702	9663	<>	<name>
9702	9552	<aphaerese>	<aphaerese>
9702	9547	<>	<aphaerese>
9702	9665	<elision3>	<elision3>
9702	9547	<>	<elision3>
9702	9665	<elision2>	<elision2>
9702	9547	<>	<elision2>
9702	9665	<elision1>	<elision1>
9702	9547	<>	<elision1>
9702	9556	.	υ
9702	9559	s	υ
9702	9556	.	u
9702	9559	s	u
9702	9190	s	κ
9702	9315	s	k
9702	9605	s	U
9702	9333	s	K
9702	9556	.	α
9702	9630	s	α
9702	9556	.	a
9702	9630	s	a
9702	9633	s	A
9702	9190	s	λ
9702	9346	s	l
9702	9349	s	L
9702	9703	<1s>	<>
9703	107	.	.
9703	108	 	 
9703	107	<~>	<~>
9703	107	<split-s>	<split-s>
9703	107	<split-h>	<split-h>
9703	107	<name2>	<name2>
9703	9695	<>	<name>
9703	111	<aphaerese>	<aphaerese>
9703	9694	<>	<aphaerese>
9703	8692	<elision3>	<elision3>
9703	9694	<>	<elision3>
9703	8692	<elision2>	<elision2>
9703	9694	<>	<elision2>
9703	8692	<elision1>	<elision1>
9703	9694	<>	<elision1>
9703	8110	.	υ
9703	8110	.	u
9703	8110	.	α
9703	8110	.	a
9703	9704	<K>	<>
9704	8160	.	.
9704	8160	<~>	<~>
9704	8160	<split-s>	<split-s>
9704	8160	<split-h>	<split-h>
9704	8160	<name2>	<name2>
9704	9696	<>	<name>
9704	8163	<aphaerese>	<aphaerese>
9704	9698	<>	<aphaerese>
9704	8641	<elision3>	<elision3>
9704	9698	<>	<elision3>
9704	8641	<elision2>	<elision2>
9704	9698	<>	<elision2>
9704	8641	<elision1>	<elision1>
9704	9698	<>	<elision1>
9704	8159	.	υ
9704	8159	.	u
9704	8159	.	α
9704	8159	.	a
9705	9706	<>	<name>
9705	9708	<>	<aphaerese>
9705	9708	<>	<elision3>
9705	9708	<>	<elision2>
9705	9708	<>	<elision1>
9705	9709	<k2K>	<>
9705	9715	<k2L>	<>
9705	9699	<l2L>	<>
9706	9707	<>	<aphaerese>
9706	9707	<>	<elision3>
9706	9707	<>	<elision2>
9706	9707	<>	<elision1>
9706	9710	<k2K>	<>
9706	9713	<k2L>	<>
9706	9700	<l2L>	<>
9707	9708	<>	<aphaerese>
9707	9708	<>	<elision3>
9707	9708	<>	<elision2>
9707	9708	<>	<elision1>
9707	9711	<k2K>	<>
9707	9714	<k2L>	<>
9707	9701	<l2L>	<>
9708	9706	<>	<name>
9708	9708	<>	<aphaerese>
9708	9708	<>	<elision3>
9708	9708	<>	<elision2>
9708	9708	<>	<elision1>
9708	9709	<k2K>	<>
9708	9712	<k2L>	<>
9708	9699	<l2L>	<>
9709	9382	.	.
9709	9383	 	 
9709	9382	<~>	<~>
9709	9382	<split-s>	<split-s>
9709	9382	<split-h>	<split-h>
9709	9382	<name2>	<name2>
9709	9710	<>	<name>
9709	9386	<aphaerese>	<aphaerese>
9709	9709	<>	<aphaerese>
9709	9382	<elision3>	<elision3>
9709	9709	<>	<elision3>
9709	9382	<elision2>	<elision2>
9709	9709	<>	<elision2>
9709	9382	<elision1>	<elision1>
9709	9709	<>	<elision1>
9709	9390	.	υ
9709	9393	s	υ
9709	9390	.	u
9709	9393	s	u
9709	91	s	κ
9709	9131	s	k
9709	9456	s	U
9709	9164	s	K
9709	9390	.	α
9709	9484	s	α
9709	9390	.	a
9709	9484	s	a
9709	9487	s	A
9709	91	s	λ
9709	9179	s	l
9709	9182	s	L
9710	9385	.	.
9710	9388	 	 
9710	9385	<~>	<~>
9710	9385	<split-s>	<split-s>
9710	9385	<split-h>	<split-h>
9710	9385	<name2>	<name2>
9710	9514	<aphaerese>	<aphaerese>
9710	9711	<>	<aphaerese>
9710	9385	<elision3>	<elision3>
9710	9711	<>	<elision3>
9710	9385	<elision2>	<elision2>
9710	9711	<>	<elision2>
9710	9385	<elision1>	<elision1>
9710	9711	<>	<elision1>
9710	9392	.	υ
9710	9395	s	υ
9710	9392	.	u
9710	9395	s	u
9710	9124	s	κ
9710	9133	s	k
9710	9458	s	U
9710	9167	s	K
9710	9392	.	α
9710	9486	s	α
9710	9392	.	a
9710	9486	s	a
9710	9489	s	A
9710	9124	s	λ
9710	9181	s	l
9710	9184	s	L
9711	9382	.	.
9711	9383	 	 
9711	9382	<~>	<~>
9711	9382	<split-s>	<split-s>
9711	9382	<split-h>	<split-h>
9711	9382	<name2>	<name2>
9711	9386	<aphaerese>	<aphaerese>
9711	9709	<>	<aphaerese>
9711	9382	<elision3>	<elision3>
9711	9709	<>	<elision3>
9711	9382	<elision2>	<elision2>
9711	9709	<>	<elision2>
9711	9382	<elision1>	<elision1>
9711	9709	<>	<elision1>
9711	9390	.	υ
9711	9393	s	υ
9711	9390	.	u
9711	9393	s	u
9711	91	s	κ
9711	9131	s	k
9711	9456	s	U
9711	9164	s	K
9711	9390	.	α
9711	9484	s	α
9711	9390	.	a
9711	9484	s	a
9711	9487	s	A
9711	91	s	λ
9711	9179	s	l
9711	9182	s	L
9712	9548	.	.
9712	9549	 	 
9712	9548	<~>	<~>
9712	9548	<split-s>	<split-s>
9712	9548	<split-h>	<split-h>
9712	9548	<name2>	<name2>
9712	9713	<>	<name>
9712	9552	<aphaerese>	<aphaerese>
9712	9712	<>	<aphaerese>
9712	9548	<elision3>	<elision3>
9712	9712	<>	<elision3>
9712	9548	<elision2>	<elision2>
9712	9712	<>	<elision2>
9712	9548	<elision1>	<elision1>
9712	9712	<>	<elision1>
9712	9556	.	υ
9712	9559	s	υ
9712	9556	.	u
9712	9559	s	u
9712	9190	s	κ
9712	9315	s	k
9712	9605	s	U
9712	9333	s	K
9712	9556	.	α
9712	9630	s	α
9712	9556	.	a
9712	9630	s	a
9712	9633	s	A
9712	9190	s	λ
9712	9346	s	l
9712	9349	s	L
9712	8816	<1s>	<>
9713	9551	.	.
9713	9554	 	 
9713	9551	<~>	<~>
9713	9551	<split-s>	<split-s>
9713	9551	<split-h>	<split-h>
9713	9551	<name2>	<name2>
9713	9660	<aphaerese>	<aphaerese>
9713	9714	<>	<aphaerese>
9713	9551	<elision3>	<elision3>
9713	9714	<>	<elision3>
9713	9551	<elision2>	<elision2>
9713	9714	<>	<elision2>
9713	9551	<elision1>	<elision1>
9713	9714	<>	<elision1>
9713	9558	.	υ
9713	9561	s	υ
9713	9558	.	u
9713	9561	s	u
9713	9311	s	κ
9713	9317	s	k
9713	9607	s	U
9713	9336	s	K
9713	9558	.	α
9713	9632	s	α
9713	9558	.	a
9713	9632	s	a
9713	9635	s	A
9713	9311	s	λ
9713	9348	s	l
9713	9351	s	L
9713	8817	<1s>	<>
9714	9548	.	.
9714	9549	 	 
9714	9548	<~>	<~>
9714	9548	<split-s>	<split-s>
9714	9548	<split-h>	<split-h>
9714	9548	<name2>	<name2>
9714	9552	<aphaerese>	<aphaerese>
9714	9712	<>	<aphaerese>
9714	9548	<elision3>	<elision3>
9714	9712	<>	<elision3>
9714	9548	<elision2>	<elision2>
9714	9712	<>	<elision2>
9714	9548	<elision1>	<elision1>
9714	9712	<>	<elision1>
9714	9556	.	υ
9714	9559	s	υ
9714	9556	.	u
9714	9559	s	u
9714	9190	s	κ
9714	9315	s	k
9714	9605	s	U
9714	9333	s	K
9714	9556	.	α
9714	9630	s	α
9714	9556	.	a
9714	9630	s	a
9714	9633	s	A
9714	9190	s	λ
9714	9346	s	l
9714	9349	s	L
9714	8815	<1s>	<>
9715	9548	.	.
9715	9549	 	 
9715	9548	<~>	<~>
9715	9548	<split-s>	<split-s>
9715	9548	<split-h>	<split-h>
9715	9548	<name2>	<name2>
9715	9713	<>	<name>
9715	9552	<aphaerese>	<aphaerese>
9715	9712	<>	<aphaerese>
9715	9548	<elision3>	<elision3>
9715	9712	<>	<elision3>
9715	9548	<elision2>	<elision2>
9715	9712	<>	<elision2>
9715	9548	<elision1>	<elision1>
9715	9712	<>	<elision1>
9715	9556	.	υ
9715	9559	s	υ
9715	9556	.	u
9715	9559	s	u
9715	9190	s	κ
9715	9315	s	k
9715	9605	s	U
9715	9333	s	K
9715	9556	.	α
9715	9630	s	α
9715	9556	.	a
9715	9630	s	a
9715	9633	s	A
9715	9190	s	λ
9715	9346	s	l
9715	9349	s	L
9715	9716	<1s>	<>
9716	107	.	.
9716	108	 	 
9716	107	<~>	<~>
9716	107	<split-s>	<split-s>
9716	107	<split-h>	<split-h>
9716	107	<name2>	<name2>
9716	8817	<>	<name>
9716	111	<aphaerese>	<aphaerese>
9716	8816	<>	<aphaerese>
9716	107	<elision3>	<elision3>
9716	8816	<>	<elision3>
9716	107	<elision2>	<elision2>
9716	8816	<>	<elision2>
9716	107	<elision1>	<elision1>
9716	8816	<>	<elision1>
9716	8110	.	υ
9716	8110	.	u
9716	8110	.	α
9716	8110	.	a
9716	9717	<K>	<>
9717	8160	.	.
9717	8160	<~>	<~>
9717	8160	<split-s>	<split-s>
9717	8160	<split-h>	<split-h>
9717	8160	<name2>	<name2>
9717	8818	<>	<name>
9717	8163	<aphaerese>	<aphaerese>
9717	8820	<>	<aphaerese>
9717	8160	<elision3>	<elision3>
9717	8820	<>	<elision3>
9717	8160	<elision2>	<elision2>
9717	8820	<>	<elision2>
9717	8160	<elision1>	<elision1>
9717	8820	<>	<elision1>
9717	8159	.	υ
9717	8159	.	u
9717	8159	.	α
9717	8159	.	a
9718	9382	.	.
9718	9383	 	 
9718	9382	<~>	<~>
9718	9382	<split-s>	<split-s>
9718	9382	<split-h>	<split-h>
9718	9382	<name2>	<name2>
9718	9719	<>	<name>
9718	9386	<aphaerese>	<aphaerese>
9718	9718	<>	<aphaerese>
9718	9382	<elision3>	<elision3>
9718	9718	<>	<elision3>
9718	9382	<elision2>	<elision2>
9718	9718	<>	<elision2>
9718	9382	<elision1>	<elision1>
9718	9718	<>	<elision1>
9718	9390	.	υ
9718	9393	s	υ
9718	9390	.	u
9718	9393	s	u
9718	9396	.	κ
9718	9414	s	κ
9718	9131	s	k
9718	9456	s	U
9718	9164	s	K
9718	9390	.	α
9718	9484	s	α
9718	9390	.	a
9718	9484	s	a
9718	9487	s	A
9718	9490	s	λ
9718	9179	s	l
9718	9182	s	L
9718	9548	<U2L>	<>
9719	9385	.	.
9719	9388	 	 
9719	9385	<~>	<~>
9719	9385	<split-s>	<split-s>
9719	9385	<split-h>	<split-h>
9719	9385	<name2>	<name2>
9719	9514	<aphaerese>	<aphaerese>
9719	9720	<>	<aphaerese>
9719	9385	<elision3>	<elision3>
9719	9720	<>	<elision3>
9719	9385	<elision2>	<elision2>
9719	9720	<>	<elision2>
9719	9385	<elision1>	<elision1>
9719	9720	<>	<elision1>
9719	9392	.	υ
9719	9395	s	υ
9719	9392	.	u
9719	9395	s	u
9719	9398	.	κ
9719	9416	s	κ
9719	9133	s	k
9719	9458	s	U
9719	9167	s	K
9719	9392	.	α
9719	9486	s	α
9719	9392	.	a
9719	9486	s	a
9719	9489	s	A
9719	9492	s	λ
9719	9181	s	l
9719	9184	s	L
9719	9662	<U2L>	<>
9720	9382	.	.
9720	9383	 	 
9720	9382	<~>	<~>
9720	9382	<split-s>	<split-s>
9720	9382	<split-h>	<split-h>
9720	9382	<name2>	<name2>
9720	9386	<aphaerese>	<aphaerese>
9720	9718	<>	<aphaerese>
9720	9382	<elision3>	<elision3>
9720	9718	<>	<elision3>
9720	9382	<elision2>	<elision2>
9720	9718	<>	<elision2>
9720	9382	<elision1>	<elision1>
9720	9718	<>	<elision1>
9720	9390	.	υ
9720	9393	s	υ
9720	9390	.	u
9720	9393	s	u
9720	9396	.	κ
9720	9414	s	κ
9720	9131	s	k
9720	9456	s	U
9720	9164	s	K
9720	9390	.	α
9720	9484	s	α
9720	9390	.	a
9720	9484	s	a
9720	9487	s	A
9720	9490	s	λ
9720	9179	s	l
9720	9182	s	L
9720	9551	<U2L>	<>
9721	9382	.	.
9721	9383	 	 
9721	9382	<~>	<~>
9721	9382	<split-s>	<split-s>
9721	9382	<split-h>	<split-h>
9721	9382	<name2>	<name2>
9721	9722	<name2>	<name>
9721	9723	<>	<name>
9721	9386	<aphaerese>	<aphaerese>
9721	9725	<>	<aphaerese>
9721	9382	<elision3>	<elision3>
9721	9725	<>	<elision3>
9721	9382	<elision2>	<elision2>
9721	9725	<>	<elision2>
9721	9382	<elision1>	<elision1>
9721	9725	<>	<elision1>
9721	9390	.	υ
9721	9393	s	υ
9721	9390	.	u
9721	9393	s	u
9721	9556	.	κ
9721	91	s	κ
9721	9131	s	k
9721	9456	s	U
9721	9164	s	K
9721	9390	.	α
9721	9484	s	α
9721	9390	.	a
9721	9484	s	a
9721	9487	s	A
9721	9556	.	λ
9721	91	s	λ
9721	9179	s	l
9721	9182	s	L
9721	8880	<1s>	<>
9721	9726	<k2K>	<>
9721	9727	<k2L>	<>
9721	9729	<K2L>	<>
9722	9167	s	k
9722	9184	s	l
9723	9385	.	.
9723	9388	 	 
9723	9385	<~>	<~>
9723	9385	<split-s>	<split-s>
9723	9385	<split-h>	<split-h>
9723	9385	<name2>	<name2>
9723	9514	<aphaerese>	<aphaerese>
9723	9724	<>	<aphaerese>
9723	9385	<elision3>	<elision3>
9723	9724	<>	<elision3>
9723	9385	<elision2>	<elision2>
9723	9724	<>	<elision2>
9723	9385	<elision1>	<elision1>
9723	9724	<>	<elision1>
9723	9392	.	υ
9723	9395	s	υ
9723	9392	.	u
9723	9395	s	u
9723	9558	.	κ
9723	9124	s	κ
9723	9133	s	k
9723	9458	s	U
9723	9167	s	K
9723	9392	.	α
9723	9486	s	α
9723	9392	.	a
9723	9486	s	a
9723	9489	s	A
9723	9558	.	λ
9723	9124	s	λ
9723	9181	s	l
9723	9184	s	L
9723	8881	<1s>	<>
9723	9713	<K2L>	<>
9724	9382	.	.
9724	9383	 	 
9724	9382	<~>	<~>
9724	9382	<split-s>	<split-s>
9724	9382	<split-h>	<split-h>
9724	9382	<name2>	<name2>
9724	9386	<aphaerese>	<aphaerese>
9724	9725	<>	<aphaerese>
9724	9382	<elision3>	<elision3>
9724	9725	<>	<elision3>
9724	9382	<elision2>	<elision2>
9724	9725	<>	<elision2>
9724	9382	<elision1>	<elision1>
9724	9725	<>	<elision1>
9724	9390	.	υ
9724	9393	s	υ
9724	9390	.	u
9724	9393	s	u
9724	9556	.	κ
9724	91	s	κ
9724	9131	s	k
9724	9456	s	U
9724	9164	s	K
9724	9390	.	α
9724	9484	s	α
9724	9390	.	a
9724	9484	s	a
9724	9487	s	A
9724	9556	.	λ
9724	91	s	λ
9724	9179	s	l
9724	9182	s	L
9724	8879	<1s>	<>
9724	9714	<K2L>	<>
9725	9382	.	.
9725	9383	 	 
9725	9382	<~>	<~>
9725	9382	<split-s>	<split-s>
9725	9382	<split-h>	<split-h>
9725	9382	<name2>	<name2>
9725	9723	<>	<name>
9725	9386	<aphaerese>	<aphaerese>
9725	9725	<>	<aphaerese>
9725	9382	<elision3>	<elision3>
9725	9725	<>	<elision3>
9725	9382	<elision2>	<elision2>
9725	9725	<>	<elision2>
9725	9382	<elision1>	<elision1>
9725	9725	<>	<elision1>
9725	9390	.	υ
9725	9393	s	υ
9725	9390	.	u
9725	9393	s	u
9725	9556	.	κ
9725	91	s	κ
9725	9131	s	k
9725	9456	s	U
9725	9164	s	K
9725	9390	.	α
9725	9484	s	α
9725	9390	.	a
9725	9484	s	a
9725	9487	s	A
9725	9556	.	λ
9725	91	s	λ
9725	9179	s	l
9725	9182	s	L
9725	8880	<1s>	<>
9725	9712	<K2L>	<>
9726	9722	<name>	<name>
9727	9728	<name>	<name>
9727	8821	<1s>	<>
9728	9336	s	k
9728	9351	s	l
9728	8711	<1s>	<>
9729	9548	.	.
9729	9549	 	 
9729	9548	<~>	<~>
9729	9548	<split-s>	<split-s>
9729	9548	<split-h>	<split-h>
9729	9548	<name2>	<name2>
9729	9728	<name2>	<name>
9729	9713	<>	<name>
9729	9552	<aphaerese>	<aphaerese>
9729	9712	<>	<aphaerese>
9729	9548	<elision3>	<elision3>
9729	9712	<>	<elision3>
9729	9548	<elision2>	<elision2>
9729	9712	<>	<elision2>
9729	9548	<elision1>	<elision1>
9729	9712	<>	<elision1>
9729	9556	.	υ
9729	9559	s	υ
9729	9556	.	u
9729	9559	s	u
9729	9190	s	κ
9729	9315	s	k
9729	9605	s	U
9729	9333	s	K
9729	9556	.	α
9729	9630	s	α
9729	9556	.	a
9729	9630	s	a
9729	9633	s	A
9729	9190	s	λ
9729	9346	s	l
9729	9349	s	L
9729	9730	<1s>	<>
9730	107	.	.
9730	108	 	 
9730	107	<~>	<~>
9730	107	<split-s>	<split-s>
9730	107	<split-h>	<split-h>
9730	107	<name2>	<name2>
9730	8822	<name2>	<name>
9730	8817	<>	<name>
9730	111	<aphaerese>	<aphaerese>
9730	8816	<>	<aphaerese>
9730	107	<elision3>	<elision3>
9730	8816	<>	<elision3>
9730	107	<elision2>	<elision2>
9730	8816	<>	<elision2>
9730	107	<elision1>	<elision1>
9730	8816	<>	<elision1>
9730	8110	.	υ
9730	8110	.	u
9730	8110	.	α
9730	8110	.	a
9730	9731	<K>	<>
9731	8160	.	.
9731	8160	<~>	<~>
9731	8160	<split-s>	<split-s>
9731	8160	<split-h>	<split-h>
9731	8160	<name2>	<name2>
9731	8712	<name2>	<name>
9731	8818	<>	<name>
9731	8163	<aphaerese>	<aphaerese>
9731	8820	<>	<aphaerese>
9731	8160	<elision3>	<elision3>
9731	8820	<>	<elision3>
9731	8160	<elision2>	<elision2>
9731	8820	<>	<elision2>
9731	8160	<elision1>	<elision1>
9731	8820	<>	<elision1>
9731	8159	.	υ
9731	8159	.	u
9731	8159	.	α
9731	8159	.	a
9732	9733	<>	<name>
9732	9732	<>	<aphaerese>
9732	9732	<>	<elision3>
9732	9732	<>	<elision2>
9732	9732	<>	<elision1>
9732	9736	<lambda2L>	<>
9733	9734	<>	<aphaerese>
9733	9734	<>	<elision3>
9733	9734	<>	<elision2>
9733	9734	<>	<elision1>
9733	9737	<lambda2L>	<>
9734	9732	<>	<aphaerese>
9734	9732	<>	<elision3>
9734	9732	<>	<elision2>
9734	9732	<>	<elision1>
9734	9735	<lambda2L>	<>
9735	9548	.	.
9735	9549	 	 
9735	9548	<~>	<~>
9735	9548	<split-s>	<split-s>
9735	9548	<split-h>	<split-h>
9735	9548	<name2>	<name2>
9735	9552	<aphaerese>	<aphaerese>
9735	9736	<>	<aphaerese>
9735	9548	<elision3>	<elision3>
9735	9736	<>	<elision3>
9735	9548	<elision2>	<elision2>
9735	9736	<>	<elision2>
9735	9548	<elision1>	<elision1>
9735	9736	<>	<elision1>
9735	9556	.	υ
9735	9559	s	υ
9735	9556	.	u
9735	9559	s	u
9735	9556	.	κ
9735	9190	s	κ
9735	9315	s	k
9735	9605	s	U
9735	9333	s	K
9735	9556	.	α
9735	9630	s	α
9735	9556	.	a
9735	9630	s	a
9735	9633	s	A
9735	9556	.	λ
9735	9190	s	λ
9735	9346	s	l
9735	9349	s	L
9735	8700	<1s>	<>
9736	9548	.	.
9736	9549	 	 
9736	9548	<~>	<~>
9736	9548	<split-s>	<split-s>
9736	9548	<split-h>	<split-h>
9736	9548	<name2>	<name2>
9736	9737	<>	<name>
9736	9552	<aphaerese>	<aphaerese>
9736	9736	<>	<aphaerese>
9736	9548	<elision3>	<elision3>
9736	9736	<>	<elision3>
9736	9548	<elision2>	<elision2>
9736	9736	<>	<elision2>
9736	9548	<elision1>	<elision1>
9736	9736	<>	<elision1>
9736	9556	.	υ
9736	9559	s	υ
9736	9556	.	u
9736	9559	s	u
9736	9556	.	κ
9736	9190	s	κ
9736	9315	s	k
9736	9605	s	U
9736	9333	s	K
9736	9556	.	α
9736	9630	s	α
9736	9556	.	a
9736	9630	s	a
9736	9633	s	A
9736	9556	.	λ
9736	9190	s	λ
9736	9346	s	l
9736	9349	s	L
9736	8701	<1s>	<>
9737	9551	.	.
9737	9554	 	 
9737	9551	<~>	<~>
9737	9551	<split-s>	<split-s>
9737	9551	<split-h>	<split-h>
9737	9551	<name2>	<name2>
9737	9660	<aphaerese>	<aphaerese>
9737	9735	<>	<aphaerese>
9737	9551	<elision3>	<elision3>
9737	9735	<>	<elision3>
9737	9551	<elision2>	<elision2>
9737	9735	<>	<elision2>
9737	9551	<elision1>	<elision1>
9737	9735	<>	<elision1>
9737	9558	.	υ
9737	9561	s	υ
9737	9558	.	u
9737	9561	s	u
9737	9558	.	κ
9737	9311	s	κ
9737	9317	s	k
9737	9607	s	U
9737	9336	s	K
9737	9558	.	α
9737	9632	s	α
9737	9558	.	a
9737	9632	s	a
9737	9635	s	A
9737	9558	.	λ
9737	9311	s	λ
9737	9348	s	l
9737	9351	s	L
9737	8702	<1s>	<>
9738	9739	<>	<name>
9738	9738	<>	<aphaerese>
9738	9738	<>	<elision3>
9738	9738	<>	<elision2>
9738	9738	<>	<elision1>
9738	9736	<l2L>	<>
9739	9740	<>	<aphaerese>
9739	9740	<>	<elision3>
9739	9740	<>	<elision2>
9739	9740	<>	<elision1>
9739	9737	<l2L>	<>
9740	9738	<>	<aphaerese>
9740	9738	<>	<elision3>
9740	9738	<>	<elision2>
9740	9738	<>	<elision1>
9740	9735	<l2L>	<>
9741	9548	.	.
9741	9549	 	 
9741	9548	<~>	<~>
9741	9548	<split-s>	<split-s>
9741	9548	<split-h>	<split-h>
9741	9548	<name2>	<name2>
9741	9728	<name2>	<name>
9741	9737	<>	<name>
9741	9552	<aphaerese>	<aphaerese>
9741	9736	<>	<aphaerese>
9741	9548	<elision3>	<elision3>
9741	9736	<>	<elision3>
9741	9548	<elision2>	<elision2>
9741	9736	<>	<elision2>
9741	9548	<elision1>	<elision1>
9741	9736	<>	<elision1>
9741	9556	.	υ
9741	9559	s	υ
9741	9556	.	u
9741	9559	s	u
9741	9556	.	κ
9741	9190	s	κ
9741	9315	s	k
9741	9605	s	U
9741	9333	s	K
9741	9556	.	α
9741	9630	s	α
9741	9556	.	a
9741	9630	s	a
9741	9633	s	A
9741	9556	.	λ
9741	9190	s	λ
9741	9346	s	l
9741	9349	s	L
9741	8890	<1s>	<>
9741	9727	<l2L>	<>
9742	9380	<>	<aphaerese>
9742	9380	<>	<elision3>
9742	9380	<>	<elision2>
9742	9380	<>	<elision1>
9742	9518	<kappa2K>	<>
9742	9743	<kappa2L>	<>
9742	9701	<lambda2L>	<>
9743	9548	.	.
9743	9549	 	 
9743	9548	<~>	<~>
9743	9548	<split-s>	<split-s>
9743	9548	<split-h>	<split-h>
9743	9548	<name2>	<name2>
9743	9552	<aphaerese>	<aphaerese>
9743	9547	<>	<aphaerese>
9743	9665	<elision3>	<elision3>
9743	9547	<>	<elision3>
9743	9665	<elision2>	<elision2>
9743	9547	<>	<elision2>
9743	9665	<elision1>	<elision1>
9743	9547	<>	<elision1>
9743	9556	.	υ
9743	9559	s	υ
9743	9556	.	u
9743	9559	s	u
9743	9190	s	κ
9743	9315	s	k
9743	9605	s	U
9743	9333	s	K
9743	9556	.	α
9743	9630	s	α
9743	9556	.	a
9743	9630	s	a
9743	9633	s	A
9743	9190	s	λ
9743	9346	s	l
9743	9349	s	L
9743	9744	<1s>	<>
9744	107	.	.
9744	108	 	 
9744	107	<~>	<~>
9744	107	<split-s>	<split-s>
9744	107	<split-h>	<split-h>
9744	107	<name2>	<name2>
9744	111	<aphaerese>	<aphaerese>
9744	9694	<>	<aphaerese>
9744	8692	<elision3>	<elision3>
9744	9694	<>	<elision3>
9744	8692	<elision2>	<elision2>
9744	9694	<>	<elision2>
9744	8692	<elision1>	<elision1>
9744	9694	<>	<elision1>
9744	8110	.	υ
9744	8110	.	u
9744	8110	.	α
9744	8110	.	a
9744	9745	<K>	<>
9745	8160	.	.
9745	8160	<~>	<~>
9745	8160	<split-s>	<split-s>
9745	8160	<split-h>	<split-h>
9745	8160	<name2>	<name2>
9745	8163	<aphaerese>	<aphaerese>
9745	9698	<>	<aphaerese>
9745	8641	<elision3>	<elision3>
9745	9698	<>	<elision3>
9745	8641	<elision2>	<elision2>
9745	9698	<>	<elision2>
9745	8641	<elision1>	<elision1>
9745	9698	<>	<elision1>
9745	8159	.	υ
9745	8159	.	u
9745	8159	.	α
9745	8159	.	a
9746	9708	<>	<aphaerese>
9746	9708	<>	<elision3>
9746	9708	<>	<elision2>
9746	9708	<>	<elision1>
9746	9711	<k2K>	<>
9746	9747	<k2L>	<>
9746	9701	<l2L>	<>
9747	9548	.	.
9747	9549	 	 
9747	9548	<~>	<~>
9747	9548	<split-s>	<split-s>
9747	9548	<split-h>	<split-h>
9747	9548	<name2>	<name2>
9747	9552	<aphaerese>	<aphaerese>
9747	9712	<>	<aphaerese>
9747	9548	<elision3>	<elision3>
9747	9712	<>	<elision3>
9747	9548	<elision2>	<elision2>
9747	9712	<>	<elision2>
9747	9548	<elision1>	<elision1>
9747	9712	<>	<elision1>
9747	9556	.	υ
9747	9559	s	υ
9747	9556	.	u
9747	9559	s	u
9747	9190	s	κ
9747	9315	s	k
9747	9605	s	U
9747	9333	s	K
9747	9556	.	α
9747	9630	s	α
9747	9556	.	a
9747	9630	s	a
9747	9633	s	A
9747	9190	s	λ
9747	9346	s	l
9747	9349	s	L
9747	9748	<1s>	<>
9748	107	.	.
9748	108	 	 
9748	107	<~>	<~>
9748	107	<split-s>	<split-s>
9748	107	<split-h>	<split-h>
9748	107	<name2>	<name2>
9748	111	<aphaerese>	<aphaerese>
9748	8816	<>	<aphaerese>
9748	107	<elision3>	<elision3>
9748	8816	<>	<elision3>
9748	107	<elision2>	<elision2>
9748	8816	<>	<elision2>
9748	107	<elision1>	<elision1>
9748	8816	<>	<elision1>
9748	8110	.	υ
9748	8110	.	u
9748	8110	.	α
9748	8110	.	a
9748	9749	<K>	<>
9749	8160	.	.
9749	8160	<~>	<~>
9749	8160	<split-s>	<split-s>
9749	8160	<split-h>	<split-h>
9749	8160	<name2>	<name2>
9749	8163	<aphaerese>	<aphaerese>
9749	8820	<>	<aphaerese>
9749	8160	<elision3>	<elision3>
9749	8820	<>	<elision3>
9749	8160	<elision2>	<elision2>
9749	8820	<>	<elision2>
9749	8160	<elision1>	<elision1>
9749	8820	<>	<elision1>
9749	8159	.	υ
9749	8159	.	u
9749	8159	.	α
9749	8159	.	a
9750	9382	.	.
9750	9383	 	 
9750	9382	<~>	<~>
9750	9382	<split-s>	<split-s>
9750	9382	<split-h>	<split-h>
9750	9382	<name2>	<name2>
9750	9386	<aphaerese>	<aphaerese>
9750	9725	<>	<aphaerese>
9750	9382	<elision3>	<elision3>
9750	9725	<>	<elision3>
9750	9382	<elision2>	<elision2>
9750	9725	<>	<elision2>
9750	9382	<elision1>	<elision1>
9750	9725	<>	<elision1>
9750	9390	.	υ
9750	9393	s	υ
9750	9390	.	u
9750	9393	s	u
9750	9556	.	κ
9750	91	s	κ
9750	9131	s	k
9750	9456	s	U
9750	9164	s	K
9750	9390	.	α
9750	9484	s	α
9750	9390	.	a
9750	9484	s	a
9750	9487	s	A
9750	9556	.	λ
9750	91	s	λ
9750	9179	s	l
9750	9182	s	L
9750	8879	<1s>	<>
9750	9747	<K2L>	<>
9751	9752	<>	<name>
9751	9751	<>	<aphaerese>
9751	71	<elision3>	<elision3>
9751	9751	<>	<elision3>
9751	71	<elision2>	<elision2>
9751	9751	<>	<elision2>
9751	71	<elision1>	<elision1>
9751	9751	<>	<elision1>
9752	9753	<>	<aphaerese>
9752	70	<elision3>	<elision3>
9752	9753	<>	<elision3>
9752	70	<elision2>	<elision2>
9752	9753	<>	<elision2>
9752	70	<elision1>	<elision1>
9752	9753	<>	<elision1>
9753	9751	<>	<aphaerese>
9753	71	<elision3>	<elision3>
9753	9751	<>	<elision3>
9753	71	<elision2>	<elision2>
9753	9751	<>	<elision2>
9753	71	<elision1>	<elision1>
9753	9751	<>	<elision1>
9754	9755	<>	<name>
9754	9757	<>	<aphaerese>
9754	9757	<>	<elision3>
9754	9757	<>	<elision2>
9754	9757	<>	<elision1>
9754	9764	<ypsilon2K>	<>
9754	9765	<ypsilon2L>	<>
9755	9756	<>	<aphaerese>
9755	9756	<>	<elision3>
9755	9756	<>	<elision2>
9755	9756	<>	<elision1>
9755	9759	<ypsilon2K>	<>
9755	9762	<ypsilon2L>	<>
9756	9757	<>	<aphaerese>
9756	9757	<>	<elision3>
9756	9757	<>	<elision2>
9756	9757	<>	<elision1>
9756	9760	<ypsilon2K>	<>
9756	9763	<ypsilon2L>	<>
9757	9755	<>	<name>
9757	9757	<>	<aphaerese>
9757	9757	<>	<elision3>
9757	9757	<>	<elision2>
9757	9757	<>	<elision1>
9757	9758	<ypsilon2K>	<>
9757	9761	<ypsilon2L>	<>
9758	9382	.	.
9758	9383	 	 
9758	9382	<~>	<~>
9758	9382	<split-s>	<split-s>
9758	9382	<split-h>	<split-h>
9758	9382	<name2>	<name2>
9758	9759	<>	<name>
9758	9386	<aphaerese>	<aphaerese>
9758	9758	<>	<aphaerese>
9758	9758	<>	<elision3>
9758	9758	<>	<elision2>
9758	9758	<>	<elision1>
9758	9390	.	υ
9758	9393	s	υ
9758	9390	.	u
9758	9393	s	u
9758	9396	.	κ
9758	9414	s	κ
9758	9131	s	k
9758	9456	s	U
9758	9164	s	K
9758	9390	.	α
9758	9484	s	α
9758	9390	.	a
9758	9484	s	a
9758	9487	s	A
9758	9490	s	λ
9758	9179	s	l
9758	9182	s	L
9759	9385	.	.
9759	9388	 	 
9759	9385	<~>	<~>
9759	9385	<split-s>	<split-s>
9759	9385	<split-h>	<split-h>
9759	9385	<name2>	<name2>
9759	9514	<aphaerese>	<aphaerese>
9759	9760	<>	<aphaerese>
9759	9760	<>	<elision3>
9759	9760	<>	<elision2>
9759	9760	<>	<elision1>
9759	9392	.	υ
9759	9395	s	υ
9759	9392	.	u
9759	9395	s	u
9759	9398	.	κ
9759	9416	s	κ
9759	9133	s	k
9759	9458	s	U
9759	9167	s	K
9759	9392	.	α
9759	9486	s	α
9759	9392	.	a
9759	9486	s	a
9759	9489	s	A
9759	9492	s	λ
9759	9181	s	l
9759	9184	s	L
9760	9382	.	.
9760	9383	 	 
9760	9382	<~>	<~>
9760	9382	<split-s>	<split-s>
9760	9382	<split-h>	<split-h>
9760	9382	<name2>	<name2>
9760	9386	<aphaerese>	<aphaerese>
9760	9758	<>	<aphaerese>
9760	9758	<>	<elision3>
9760	9758	<>	<elision2>
9760	9758	<>	<elision1>
9760	9390	.	υ
9760	9393	s	υ
9760	9390	.	u
9760	9393	s	u
9760	9396	.	κ
9760	9414	s	κ
9760	9131	s	k
9760	9456	s	U
9760	9164	s	K
9760	9390	.	α
9760	9484	s	α
9760	9390	.	a
9760	9484	s	a
9760	9487	s	A
9760	9490	s	λ
9760	9179	s	l
9760	9182	s	L
9761	9548	.	.
9761	9549	 	 
9761	9548	<~>	<~>
9761	9548	<split-s>	<split-s>
9761	9548	<split-h>	<split-h>
9761	9548	<name2>	<name2>
9761	9762	<>	<name>
9761	9552	<aphaerese>	<aphaerese>
9761	9761	<>	<aphaerese>
9761	9761	<>	<elision3>
9761	9761	<>	<elision2>
9761	9761	<>	<elision1>
9761	9556	.	υ
9761	9559	s	υ
9761	9556	.	u
9761	9559	s	u
9761	9562	.	κ
9761	9580	s	κ
9761	9315	s	k
9761	9605	s	U
9761	9333	s	K
9761	9556	.	α
9761	9630	s	α
9761	9556	.	a
9761	9630	s	a
9761	9633	s	A
9761	9636	s	λ
9761	9346	s	l
9761	9349	s	L
9761	8509	<1s>	<>
9762	9551	.	.
9762	9554	 	 
9762	9551	<~>	<~>
9762	9551	<split-s>	<split-s>
9762	9551	<split-h>	<split-h>
9762	9551	<name2>	<name2>
9762	9660	<aphaerese>	<aphaerese>
9762	9763	<>	<aphaerese>
9762	9763	<>	<elision3>
9762	9763	<>	<elision2>
9762	9763	<>	<elision1>
9762	9558	.	υ
9762	9561	s	υ
9762	9558	.	u
9762	9561	s	u
9762	9564	.	κ
9762	9582	s	κ
9762	9317	s	k
9762	9607	s	U
9762	9336	s	K
9762	9558	.	α
9762	9632	s	α
9762	9558	.	a
9762	9632	s	a
9762	9635	s	A
9762	9638	s	λ
9762	9348	s	l
9762	9351	s	L
9762	8510	<1s>	<>
9763	9548	.	.
9763	9549	 	 
9763	9548	<~>	<~>
9763	9548	<split-s>	<split-s>
9763	9548	<split-h>	<split-h>
9763	9548	<name2>	<name2>
9763	9552	<aphaerese>	<aphaerese>
9763	9761	<>	<aphaerese>
9763	9761	<>	<elision3>
9763	9761	<>	<elision2>
9763	9761	<>	<elision1>
9763	9556	.	υ
9763	9559	s	υ
9763	9556	.	u
9763	9559	s	u
9763	9562	.	κ
9763	9580	s	κ
9763	9315	s	k
9763	9605	s	U
9763	9333	s	K
9763	9556	.	α
9763	9630	s	α
9763	9556	.	a
9763	9630	s	a
9763	9633	s	A
9763	9636	s	λ
9763	9346	s	l
9763	9349	s	L
9763	8508	<1s>	<>
9764	9382	.	.
9764	9383	 	 
9764	9382	<~>	<~>
9764	9382	<split-s>	<split-s>
9764	9382	<split-h>	<split-h>
9764	9382	<name2>	<name2>
9764	9759	<>	<name>
9764	9386	<aphaerese>	<aphaerese>
9764	9758	<>	<aphaerese>
9764	9758	<>	<elision3>
9764	9758	<>	<elision2>
9764	9758	<>	<elision1>
9764	9390	.	υ
9764	9393	s	υ
9764	9390	.	u
9764	9393	s	u
9764	9396	.	κ
9764	9414	s	κ
9764	9131	s	k
9764	9390	.	α
9764	9484	s	α
9764	9390	.	a
9764	9484	s	a
9764	9490	s	λ
9764	9179	s	l
9765	9548	.	.
9765	9549	 	 
9765	9548	<~>	<~>
9765	9548	<split-s>	<split-s>
9765	9548	<split-h>	<split-h>
9765	9548	<name2>	<name2>
9765	9762	<>	<name>
9765	9552	<aphaerese>	<aphaerese>
9765	9761	<>	<aphaerese>
9765	9761	<>	<elision3>
9765	9761	<>	<elision2>
9765	9761	<>	<elision1>
9765	9556	.	υ
9765	9559	s	υ
9765	9556	.	u
9765	9559	s	u
9765	9562	.	κ
9765	9580	s	κ
9765	9315	s	k
9765	9556	.	α
9765	9630	s	α
9765	9556	.	a
9765	9630	s	a
9765	9636	s	λ
9765	9346	s	l
9765	9766	<1s>	<>
9766	107	.	.
9766	108	 	 
9766	107	<~>	<~>
9766	107	<split-s>	<split-s>
9766	107	<split-h>	<split-h>
9766	107	<name2>	<name2>
9766	8510	<>	<name>
9766	111	<aphaerese>	<aphaerese>
9766	8509	<>	<aphaerese>
9766	8509	<>	<elision3>
9766	8509	<>	<elision2>
9766	8509	<>	<elision1>
9766	8110	.	υ
9766	8110	.	u
9766	114	.	κ
9766	8110	.	α
9766	8110	.	a
9766	9767	<K>	<>
9767	8160	.	.
9767	8160	<~>	<~>
9767	8160	<split-s>	<split-s>
9767	8160	<split-h>	<split-h>
9767	8160	<name2>	<name2>
9767	8511	<>	<name>
9767	8163	<aphaerese>	<aphaerese>
9767	8513	<>	<aphaerese>
9767	8513	<>	<elision3>
9767	8513	<>	<elision2>
9767	8513	<>	<elision1>
9767	8159	.	υ
9767	8159	.	u
9767	8166	.	κ
9767	8159	.	α
9767	8159	.	a
9768	9769	<>	<name>
9768	9771	<>	<aphaerese>
9768	9771	<>	<elision3>
9768	9771	<>	<elision2>
9768	9771	<>	<elision1>
9768	9764	<u2K>	<>
9768	9765	<u2L>	<>
9769	9770	<>	<aphaerese>
9769	9770	<>	<elision3>
9769	9770	<>	<elision2>
9769	9770	<>	<elision1>
9769	9759	<u2K>	<>
9769	9762	<u2L>	<>
9770	9771	<>	<aphaerese>
9770	9771	<>	<elision3>
9770	9771	<>	<elision2>
9770	9771	<>	<elision1>
9770	9760	<u2K>	<>
9770	9763	<u2L>	<>
9771	9769	<>	<name>
9771	9771	<>	<aphaerese>
9771	9771	<>	<elision3>
9771	9771	<>	<elision2>
9771	9771	<>	<elision1>
9771	9758	<u2K>	<>
9771	9761	<u2L>	<>
9772	9378	<>	<name>
9772	9380	<>	<aphaerese>
9772	9380	<>	<elision3>
9772	9380	<>	<elision2>
9772	9380	<>	<elision1>
9772	9773	<kappa2K>	<>
9772	9774	<kappa2L>	<>
9772	9699	<lambda2L>	<>
9773	9382	.	.
9773	9383	 	 
9773	9382	<~>	<~>
9773	9382	<split-s>	<split-s>
9773	9382	<split-h>	<split-h>
9773	9382	<name2>	<name2>
9773	9517	<>	<name>
9773	9386	<aphaerese>	<aphaerese>
9773	9381	<>	<aphaerese>
9773	9519	<elision3>	<elision3>
9773	9381	<>	<elision3>
9773	9519	<elision2>	<elision2>
9773	9381	<>	<elision2>
9773	9519	<elision1>	<elision1>
9773	9381	<>	<elision1>
9773	9390	.	υ
9773	9393	s	υ
9773	9390	.	u
9773	9393	s	u
9773	91	s	κ
9773	9131	s	k
9773	9390	.	α
9773	9484	s	α
9773	9390	.	a
9773	9484	s	a
9773	91	s	λ
9773	9179	s	l
9774	9548	.	.
9774	9549	 	 
9774	9548	<~>	<~>
9774	9548	<split-s>	<split-s>
9774	9548	<split-h>	<split-h>
9774	9548	<name2>	<name2>
9774	9663	<>	<name>
9774	9552	<aphaerese>	<aphaerese>
9774	9547	<>	<aphaerese>
9774	9665	<elision3>	<elision3>
9774	9547	<>	<elision3>
9774	9665	<elision2>	<elision2>
9774	9547	<>	<elision2>
9774	9665	<elision1>	<elision1>
9774	9547	<>	<elision1>
9774	9556	.	υ
9774	9559	s	υ
9774	9556	.	u
9774	9559	s	u
9774	9190	s	κ
9774	9315	s	k
9774	9556	.	α
9774	9630	s	α
9774	9556	.	a
9774	9630	s	a
9774	9190	s	λ
9774	9346	s	l
9774	9703	<1s>	<>
9775	9706	<>	<name>
9775	9708	<>	<aphaerese>
9775	9708	<>	<elision3>
9775	9708	<>	<elision2>
9775	9708	<>	<elision1>
9775	9776	<k2K>	<>
9775	9777	<k2L>	<>
9775	9699	<l2L>	<>
9776	9382	.	.
9776	9383	 	 
9776	9382	<~>	<~>
9776	9382	<split-s>	<split-s>
9776	9382	<split-h>	<split-h>
9776	9382	<name2>	<name2>
9776	9710	<>	<name>
9776	9386	<aphaerese>	<aphaerese>
9776	9709	<>	<aphaerese>
9776	9382	<elision3>	<elision3>
9776	9709	<>	<elision3>
9776	9382	<elision2>	<elision2>
9776	9709	<>	<elision2>
9776	9382	<elision1>	<elision1>
9776	9709	<>	<elision1>
9776	9390	.	υ
9776	9393	s	υ
9776	9390	.	u
9776	9393	s	u
9776	91	s	κ
9776	9131	s	k
9776	9390	.	α
9776	9484	s	α
9776	9390	.	a
9776	9484	s	a
9776	91	s	λ
9776	9179	s	l
9777	9548	.	.
9777	9549	 	 
9777	9548	<~>	<~>
9777	9548	<split-s>	<split-s>
9777	9548	<split-h>	<split-h>
9777	9548	<name2>	<name2>
9777	9713	<>	<name>
9777	9552	<aphaerese>	<aphaerese>
9777	9712	<>	<aphaerese>
9777	9548	<elision3>	<elision3>
9777	9712	<>	<elision3>
9777	9548	<elision2>	<elision2>
9777	9712	<>	<elision2>
9777	9548	<elision1>	<elision1>
9777	9712	<>	<elision1>
9777	9556	.	υ
9777	9559	s	υ
9777	9556	.	u
9777	9559	s	u
9777	9190	s	κ
9777	9315	s	k
9777	9556	.	α
9777	9630	s	α
9777	9556	.	a
9777	9630	s	a
9777	9190	s	λ
9777	9346	s	l
9777	9716	<1s>	<>
9778	9779	<>	<name>
9778	9781	<>	<aphaerese>
9778	9781	<>	<elision3>
9778	9781	<>	<elision2>
9778	9781	<>	<elision1>
9778	9782	<alpha2L>	<>
9779	9780	<>	<aphaerese>
9779	9780	<>	<elision3>
9779	9780	<>	<elision2>
9779	9780	<>	<elision1>
9779	9762	<alpha2L>	<>
9780	9781	<>	<aphaerese>
9780	9781	<>	<elision3>
9780	9781	<>	<elision2>
9780	9781	<>	<elision1>
9780	9763	<alpha2L>	<>
9781	9779	<>	<name>
9781	9781	<>	<aphaerese>
9781	9781	<>	<elision3>
9781	9781	<>	<elision2>
9781	9781	<>	<elision1>
9781	9761	<alpha2L>	<>
9782	9548	.	.
9782	9549	 	 
9782	9548	<~>	<~>
9782	9548	<split-s>	<split-s>
9782	9548	<split-h>	<split-h>
9782	9548	<name2>	<name2>
9782	9762	<>	<name>
9782	9552	<aphaerese>	<aphaerese>
9782	9761	<>	<aphaerese>
9782	9761	<>	<elision3>
9782	9761	<>	<elision2>
9782	9761	<>	<elision1>
9782	9556	.	υ
9782	9559	s	υ
9782	9556	.	u
9782	9559	s	u
9782	9562	.	κ
9782	9580	s	κ
9782	9315	s	k
9782	9556	.	α
9782	9630	s	α
9782	9556	.	a
9782	9630	s	a
9782	9636	s	λ
9782	9346	s	l
9782	8509	<1s>	<>
9783	9784	<>	<name>
9783	9786	<>	<aphaerese>
9783	9786	<>	<elision3>
9783	9786	<>	<elision2>
9783	9786	<>	<elision1>
9783	9782	<a2L>	<>
9784	9785	<>	<aphaerese>
9784	9785	<>	<elision3>
9784	9785	<>	<elision2>
9784	9785	<>	<elision1>
9784	9762	<a2L>	<>
9785	9786	<>	<aphaerese>
9785	9786	<>	<elision3>
9785	9786	<>	<elision2>
9785	9786	<>	<elision1>
9785	9763	<a2L>	<>
9786	9784	<>	<name>
9786	9786	<>	<aphaerese>
9786	9786	<>	<elision3>
9786	9786	<>	<elision2>
9786	9786	<>	<elision1>
9786	9761	<a2L>	<>
9787	9733	<>	<name>
9787	9732	<>	<aphaerese>
9787	9732	<>	<elision3>
9787	9732	<>	<elision2>
9787	9732	<>	<elision1>
9787	9788	<lambda2L>	<>
9788	9548	.	.
9788	9549	 	 
9788	9548	<~>	<~>
9788	9548	<split-s>	<split-s>
9788	9548	<split-h>	<split-h>
9788	9548	<name2>	<name2>
9788	9737	<>	<name>
9788	9552	<aphaerese>	<aphaerese>
9788	9736	<>	<aphaerese>
9788	9548	<elision3>	<elision3>
9788	9736	<>	<elision3>
9788	9548	<elision2>	<elision2>
9788	9736	<>	<elision2>
9788	9548	<elision1>	<elision1>
9788	9736	<>	<elision1>
9788	9556	.	υ
9788	9559	s	υ
9788	9556	.	u
9788	9559	s	u
9788	9556	.	κ
9788	9190	s	κ
9788	9315	s	k
9788	9556	.	α
9788	9630	s	α
9788	9556	.	a
9788	9630	s	a
9788	9556	.	λ
9788	9190	s	λ
9788	9346	s	l
9788	8701	<1s>	<>
9789	9739	<>	<name>
9789	9738	<>	<aphaerese>
9789	9738	<>	<elision3>
9789	9738	<>	<elision2>
9789	9738	<>	<elision1>
9789	9788	<l2L>	<>
9790	9757	<>	<aphaerese>
9790	9757	<>	<elision3>
9790	9757	<>	<elision2>
9790	9757	<>	<elision1>
9790	9760	<ypsilon2K>	<>
9790	9791	<ypsilon2L>	<>
9791	9548	.	.
9791	9549	 	 
9791	9548	<~>	<~>
9791	9548	<split-s>	<split-s>
9791	9548	<split-h>	<split-h>
9791	9548	<name2>	<name2>
9791	9552	<aphaerese>	<aphaerese>
9791	9761	<>	<aphaerese>
9791	9761	<>	<elision3>
9791	9761	<>	<elision2>
9791	9761	<>	<elision1>
9791	9556	.	υ
9791	9559	s	υ
9791	9556	.	u
9791	9559	s	u
9791	9562	.	κ
9791	9580	s	κ
9791	9315	s	k
9791	9605	s	U
9791	9333	s	K
9791	9556	.	α
9791	9630	s	α
9791	9556	.	a
9791	9630	s	a
9791	9633	s	A
9791	9636	s	λ
9791	9346	s	l
9791	9349	s	L
9791	9792	<1s>	<>
9792	107	.	.
9792	108	 	 
9792	107	<~>	<~>
9792	107	<split-s>	<split-s>
9792	107	<split-h>	<split-h>
9792	107	<name2>	<name2>
9792	111	<aphaerese>	<aphaerese>
9792	8509	<>	<aphaerese>
9792	8509	<>	<elision3>
9792	8509	<>	<elision2>
9792	8509	<>	<elision1>
9792	8110	.	υ
9792	8110	.	u
9792	114	.	κ
9792	8110	.	α
9792	8110	.	a
9792	9793	<K>	<>
9793	8160	.	.
9793	8160	<~>	<~>
9793	8160	<split-s>	<split-s>
9793	8160	<split-h>	<split-h>
9793	8160	<name2>	<name2>
9793	8163	<aphaerese>	<aphaerese>
9793	8513	<>	<aphaerese>
9793	8513	<>	<elision3>
9793	8513	<>	<elision2>
9793	8513	<>	<elision1>
9793	8159	.	υ
9793	8159	.	u
9793	8166	.	κ
9793	8159	.	α
9793	8159	.	a
9794	9771	<>	<aphaerese>
9794	9771	<>	<elision3>
9794	9771	<>	<elision2>
9794	9771	<>	<elision1>
9794	9760	<u2K>	<>
9794	9791	<u2L>	<>
9795	9755	<>	<name>
9795	9757	<>	<aphaerese>
9795	9757	<>	<elision3>
9795	9757	<>	<elision2>
9795	9757	<>	<elision1>
9795	9758	<ypsilon2K>	<>
9795	9796	<ypsilon2L>	<>
9796	9548	.	.
9796	9549	 	 
9796	9548	<~>	<~>
9796	9548	<split-s>	<split-s>
9796	9548	<split-h>	<split-h>
9796	9548	<name2>	<name2>
9796	9762	<>	<name>
9796	9552	<aphaerese>	<aphaerese>
9796	9761	<>	<aphaerese>
9796	9761	<>	<elision3>
9796	9761	<>	<elision2>
9796	9761	<>	<elision1>
9796	9556	.	υ
9796	9559	s	υ
9796	9556	.	u
9796	9559	s	u
9796	9562	.	κ
9796	9580	s	κ
9796	9315	s	k
9796	9605	s	U
9796	9333	s	K
9796	9556	.	α
9796	9630	s	α
9796	9556	.	a
9796	9630	s	a
9796	9633	s	A
9796	9636	s	λ
9796	9346	s	l
9796	9349	s	L
9796	9766	<1s>	<>
9797	9769	<>	<name>
9797	9771	<>	<aphaerese>
9797	9771	<>	<elision3>
9797	9771	<>	<elision2>
9797	9771	<>	<elision1>
9797	9758	<u2K>	<>
9797	9796	<u2L>	<>
9798	9799	<>	<aphaerese>
9798	9803	<elision3>	<elision3>
9798	9799	<>	<elision3>
9798	9803	<elision2>	<elision2>
9798	9799	<>	<elision2>
9798	9803	<elision1>	<elision1>
9798	9799	<>	<elision1>
9799	9800	<>	<aphaerese>
9799	9801	<elision3>	<elision3>
9799	9800	<>	<elision3>
9799	9801	<elision2>	<elision2>
9799	9800	<>	<elision2>
9799	9801	<elision1>	<elision1>
9799	9800	<>	<elision1>
9800	9798	<>	<name>
9800	9800	<>	<aphaerese>
9800	9801	<elision3>	<elision3>
9800	9800	<>	<elision3>
9800	9801	<elision2>	<elision2>
9800	9800	<>	<elision2>
9800	9801	<elision1>	<elision1>
9800	9800	<>	<elision1>
9801	9801	.	.
9801	9801	<~>	<~>
9801	9801	<split-s>	<split-s>
9801	9801	<split-h>	<split-h>
9801	9801	<name2>	<name2>
9801	9802	<>	<name>
9801	9804	<aphaerese>	<aphaerese>
9801	9801	<>	<aphaerese>
9801	9801	<elision3>	<elision3>
9801	9801	<>	<elision3>
9801	9801	<elision2>	<elision2>
9801	9801	<>	<elision2>
9801	9801	<elision1>	<elision1>
9801	9801	<>	<elision1>
9801	9800	.	υ
9801	9943	H	υ
9801	9800	.	u
9801	9952	H	u
9801	9807	.	κ
9801	9858	H	κ
9801	9912	H	k
9801	9921	H	U
9801	9924	H	K
9801	9800	.	α
9801	9955	H	α
9801	9800	.	a
9801	9958	H	a
9801	9892	H	A
9801	9933	H	λ
9801	9939	H	l
9801	9942	H	L
9802	9803	.	.
9802	9803	<~>	<~>
9802	9803	<split-s>	<split-s>
9802	9803	<split-h>	<split-h>
9802	9803	<name2>	<name2>
9802	9806	<aphaerese>	<aphaerese>
9802	9803	<>	<aphaerese>
9802	9803	<elision3>	<elision3>
9802	9803	<>	<elision3>
9802	9803	<elision2>	<elision2>
9802	9803	<>	<elision2>
9802	9803	<elision1>	<elision1>
9802	9803	<>	<elision1>
9802	9799	.	υ
9802	9945	H	υ
9802	9799	.	u
9802	9954	H	u
9802	9809	.	κ
9802	9860	H	κ
9802	9914	H	k
9802	9923	H	U
9802	9927	H	K
9802	9799	.	α
9802	9957	H	α
9802	9799	.	a
9802	9960	H	a
9802	9894	H	A
9802	9935	H	λ
9802	9941	H	l
9802	9936	H	L
9803	9801	.	.
9803	9801	<~>	<~>
9803	9801	<split-s>	<split-s>
9803	9801	<split-h>	<split-h>
9803	9801	<name2>	<name2>
9803	9804	<aphaerese>	<aphaerese>
9803	9801	<>	<aphaerese>
9803	9801	<elision3>	<elision3>
9803	9801	<>	<elision3>
9803	9801	<elision2>	<elision2>
9803	9801	<>	<elision2>
9803	9801	<elision1>	<elision1>
9803	9801	<>	<elision1>
9803	9800	.	υ
9803	9943	H	υ
9803	9800	.	u
9803	9952	H	u
9803	9807	.	κ
9803	9858	H	κ
9803	9912	H	k
9803	9921	H	U
9803	9924	H	K
9803	9800	.	α
9803	9955	H	α
9803	9800	.	a
9803	9958	H	a
9803	9892	H	A
9803	9933	H	λ
9803	9939	H	l
9803	9942	H	L
9804	9801	.	.
9804	9801	<~>	<~>
9804	9801	<split-s>	<split-s>
9804	9801	<split-h>	<split-h>
9804	9801	<name2>	<name2>
9804	9805	<>	<name>
9804	9804	<aphaerese>	<aphaerese>
9804	9804	<>	<aphaerese>
9804	9801	<elision3>	<elision3>
9804	9804	<>	<elision3>
9804	9801	<elision2>	<elision2>
9804	9804	<>	<elision2>
9804	9801	<elision1>	<elision1>
9804	9804	<>	<elision1>
9804	9801	.	υ
9804	9801	.	u
9804	9807	.	κ
9804	9858	H	κ
9804	9912	H	k
9804	9921	H	U
9804	9924	H	K
9804	9801	.	α
9804	9801	.	a
9804	9892	H	A
9804	9933	H	λ
9804	9939	H	l
9804	9942	H	L
9805	9803	.	.
9805	9803	<~>	<~>
9805	9803	<split-s>	<split-s>
9805	9803	<split-h>	<split-h>
9805	9803	<name2>	<name2>
9805	9806	<aphaerese>	<aphaerese>
9805	9806	<>	<aphaerese>
9805	9803	<elision3>	<elision3>
9805	9806	<>	<elision3>
9805	9803	<elision2>	<elision2>
9805	9806	<>	<elision2>
9805	9803	<elision1>	<elision1>
9805	9806	<>	<elision1>
9805	9803	.	υ
9805	9803	.	u
9805	9809	.	κ
9805	9860	H	κ
9805	9914	H	k
9805	9923	H	U
9805	9927	H	K
9805	9803	.	α
9805	9803	.	a
9805	9894	H	A
9805	9935	H	λ
9805	9941	H	l
9805	9936	H	L
9806	9801	.	.
9806	9801	<~>	<~>
9806	9801	<split-s>	<split-s>
9806	9801	<split-h>	<split-h>
9806	9801	<name2>	<name2>
9806	9804	<aphaerese>	<aphaerese>
9806	9804	<>	<aphaerese>
9806	9801	<elision3>	<elision3>
9806	9804	<>	<elision3>
9806	9801	<elision2>	<elision2>
9806	9804	<>	<elision2>
9806	9801	<elision1>	<elision1>
9806	9804	<>	<elision1>
9806	9801	.	υ
9806	9801	.	u
9806	9807	.	κ
9806	9858	H	κ
9806	9912	H	k
9806	9921	H	U
9806	9924	H	K
9806	9801	.	α
9806	9801	.	a
9806	9892	H	A
9806	9933	H	λ
9806	9939	H	l
9806	9942	H	L
9807	9808	<>	<name>
9807	9807	<>	<aphaerese>
9807	9810	<elision3>	<elision3>
9807	9807	<>	<elision3>
9807	9810	<elision2>	<elision2>
9807	9807	<>	<elision2>
9807	9810	<elision1>	<elision1>
9807	9807	<>	<elision1>
9808	9809	<>	<aphaerese>
9808	9812	<elision3>	<elision3>
9808	9809	<>	<elision3>
9808	9812	<elision2>	<elision2>
9808	9809	<>	<elision2>
9808	9812	<elision1>	<elision1>
9808	9809	<>	<elision1>
9809	9807	<>	<aphaerese>
9809	9810	<elision3>	<elision3>
9809	9807	<>	<elision3>
9809	9810	<elision2>	<elision2>
9809	9807	<>	<elision2>
9809	9810	<elision1>	<elision1>
9809	9807	<>	<elision1>
9810	9811	<>	<name>
9810	9810	<>	<aphaerese>
9810	9810	<>	<elision3>
9810	9810	<>	<elision2>
9810	9810	<>	<elision1>
9810	9813	H	κ
9810	9846	H	k
9810	9849	H	K
9810	9852	H	λ
9810	9855	H	l
9810	9838	H	L
9811	9812	<>	<aphaerese>
9811	9812	<>	<elision3>
9811	9812	<>	<elision2>
9811	9812	<>	<elision1>
9811	9815	H	κ
9811	9848	H	k
9811	9851	H	K
9811	9854	H	λ
9811	9857	H	l
9811	9837	H	L
9812	9810	<>	<aphaerese>
9812	9810	<>	<elision3>
9812	9810	<>	<elision2>
9812	9810	<>	<elision1>
9812	9813	H	κ
9812	9846	H	k
9812	9849	H	K
9812	9852	H	λ
9812	9855	H	l
9812	9838	H	L
9813	9814	<>	<name>
9813	9813	<>	<aphaerese>
9813	9813	<>	<elision3>
9813	9813	<>	<elision2>
9813	9813	<>	<elision1>
9813	9817	<kappa2K>	<>
9813	9838	<kappa2L>	<>
9814	9815	<>	<aphaerese>
9814	9815	<>	<elision3>
9814	9815	<>	<elision2>
9814	9815	<>	<elision1>
9814	9818	<kappa2K>	<>
9814	9839	<kappa2L>	<>
9815	9813	<>	<aphaerese>
9815	9813	<>	<elision3>
9815	9813	<>	<elision2>
9815	9813	<>	<elision1>
9815	9816	<kappa2K>	<>
9815	9837	<kappa2L>	<>
9816	9817	<>	<aphaerese>
9816	9817	<>	<elision3>
9816	9817	<>	<elision2>
9816	9817	<>	<elision1>
9816	9820	s	κ
9816	9820	s	k
9816	9829	s	K
9816	9820	s	λ
9816	9820	s	l
9816	9835	s	L
9817	9818	<>	<name>
9817	9817	<>	<aphaerese>
9817	9817	<>	<elision3>
9817	9817	<>	<elision2>
9817	9817	<>	<elision1>
9817	9820	s	κ
9817	9820	s	k
9817	9829	s	K
9817	9820	s	λ
9817	9820	s	l
9817	9835	s	L
9818	9816	<>	<aphaerese>
9818	9816	<>	<elision3>
9818	9816	<>	<elision2>
9818	9816	<>	<elision1>
9818	9819	s	κ
9818	9819	s	k
9818	9828	s	K
9818	9819	s	λ
9818	9819	s	l
9818	9834	s	L
9819	9820	<>	<aphaerese>
9819	9820	<>	<elision3>
9819	9820	<>	<elision2>
9819	9820	<>	<elision1>
9819	9823	H	κ
9819	9823	H	k
9819	9823	H	K
9819	9823	H	λ
9819	9823	H	l
9819	9823	H	L
9819	9826	<2m>	<>
9820	9821	<>	<name>
9820	9820	<>	<aphaerese>
9820	9820	<>	<elision3>
9820	9820	<>	<elision2>
9820	9820	<>	<elision1>
9820	9823	H	κ
9820	9823	H	k
9820	9823	H	K
9820	9823	H	λ
9820	9823	H	l
9820	9823	H	L
9820	9827	<2m>	<>
9821	9819	<>	<aphaerese>
9821	9819	<>	<elision3>
9821	9819	<>	<elision2>
9821	9819	<>	<elision1>
9821	9822	H	κ
9821	9822	H	k
9821	9822	H	K
9821	9822	H	λ
9821	9822	H	l
9821	9822	H	L
9821	9825	<2m>	<>
9822	9823	<>	<aphaerese>
9822	9823	<>	<elision3>
9822	9823	<>	<elision2>
9822	9823	<>	<elision1>
9822	8185	<3k>	<>
9823	9824	<>	<name>
9823	9823	<>	<aphaerese>
9823	9823	<>	<elision3>
9823	9823	<>	<elision2>
9823	9823	<>	<elision1>
9823	8186	<3k>	<>
9824	9822	<>	<aphaerese>
9824	9822	<>	<elision3>
9824	9822	<>	<elision2>
9824	9822	<>	<elision1>
9824	8184	<3k>	<>
9825	9826	<>	<aphaerese>
9825	9826	<>	<elision3>
9825	9826	<>	<elision2>
9825	9826	<>	<elision1>
9825	314	<2h>	<>
9826	9827	<>	<aphaerese>
9826	9827	<>	<elision3>
9826	9827	<>	<elision2>
9826	9827	<>	<elision1>
9826	315	<2h>	<>
9827	9825	<>	<name>
9827	9827	<>	<aphaerese>
9827	9827	<>	<elision3>
9827	9827	<>	<elision2>
9827	9827	<>	<elision1>
9827	313	<2h>	<>
9828	9829	<>	<aphaerese>
9828	9829	<>	<elision3>
9828	9829	<>	<elision2>
9828	9829	<>	<elision1>
9828	9832	<K2kl>	<>
9829	9830	<>	<name>
9829	9829	<>	<aphaerese>
9829	9829	<>	<elision3>
9829	9829	<>	<elision2>
9829	9829	<>	<elision1>
9829	9833	<K2kl>	<>
9830	9828	<>	<aphaerese>
9830	9828	<>	<elision3>
9830	9828	<>	<elision2>
9830	9828	<>	<elision1>
9830	9831	<K2kl>	<>
9831	9832	<>	<aphaerese>
9831	9832	<>	<elision3>
9831	9832	<>	<elision2>
9831	9832	<>	<elision1>
9831	9822	H	κ
9831	9822	H	k
9831	9822	H	K
9831	9822	H	λ
9831	9822	H	l
9831	9822	H	L
9832	9833	<>	<aphaerese>
9832	9833	<>	<elision3>
9832	9833	<>	<elision2>
9832	9833	<>	<elision1>
9832	9823	H	κ
9832	9823	H	k
9832	9823	H	K
9832	9823	H	λ
9832	9823	H	l
9832	9823	H	L
9833	9831	<>	<name>
9833	9833	<>	<aphaerese>
9833	9833	<>	<elision3>
9833	9833	<>	<elision2>
9833	9833	<>	<elision1>
9833	9823	H	κ
9833	9823	H	k
9833	9823	H	K
9833	9823	H	λ
9833	9823	H	l
9833	9823	H	L
9834	9835	<>	<aphaerese>
9834	9835	<>	<elision3>
9834	9835	<>	<elision2>
9834	9835	<>	<elision1>
9834	9832	<L2kl>	<>
9835	9836	<>	<name>
9835	9835	<>	<aphaerese>
9835	9835	<>	<elision3>
9835	9835	<>	<elision2>
9835	9835	<>	<elision1>
9835	9833	<L2kl>	<>
9836	9834	<>	<aphaerese>
9836	9834	<>	<elision3>
9836	9834	<>	<elision2>
9836	9834	<>	<elision1>
9836	9831	<L2kl>	<>
9837	9838	<>	<aphaerese>
9837	9838	<>	<elision3>
9837	9838	<>	<elision2>
9837	9838	<>	<elision1>
9837	9841	s	κ
9837	9844	H	κ
9837	9841	s	k
9837	9844	H	k
9837	9829	s	K
9837	9844	H	K
9837	9841	s	λ
9837	9844	H	λ
9837	9841	s	l
9837	9844	H	l
9837	9835	s	L
9837	9844	H	L
9838	9839	<>	<name>
9838	9838	<>	<aphaerese>
9838	9838	<>	<elision3>
9838	9838	<>	<elision2>
9838	9838	<>	<elision1>
9838	9841	s	κ
9838	9844	H	κ
9838	9841	s	k
9838	9844	H	k
9838	9829	s	K
9838	9844	H	K
9838	9841	s	λ
9838	9844	H	λ
9838	9841	s	l
9838	9844	H	l
9838	9835	s	L
9838	9844	H	L
9839	9837	<>	<aphaerese>
9839	9837	<>	<elision3>
9839	9837	<>	<elision2>
9839	9837	<>	<elision1>
9839	9840	s	κ
9839	9843	H	κ
9839	9840	s	k
9839	9843	H	k
9839	9828	s	K
9839	9843	H	K
9839	9840	s	λ
9839	9843	H	λ
9839	9840	s	l
9839	9843	H	l
9839	9834	s	L
9839	9843	H	L
9840	9841	<>	<aphaerese>
9840	9841	<>	<elision3>
9840	9841	<>	<elision2>
9840	9841	<>	<elision1>
9840	9823	H	κ
9840	9823	H	k
9840	9823	H	K
9840	9823	H	λ
9840	9823	H	l
9840	9823	H	L
9840	9826	<w>	<>
9841	9842	<>	<name>
9841	9841	<>	<aphaerese>
9841	9841	<>	<elision3>
9841	9841	<>	<elision2>
9841	9841	<>	<elision1>
9841	9823	H	κ
9841	9823	H	k
9841	9823	H	K
9841	9823	H	λ
9841	9823	H	l
9841	9823	H	L
9841	9827	<w>	<>
9842	9840	<>	<aphaerese>
9842	9840	<>	<elision3>
9842	9840	<>	<elision2>
9842	9840	<>	<elision1>
9842	9822	H	κ
9842	9822	H	k
9842	9822	H	K
9842	9822	H	λ
9842	9822	H	l
9842	9822	H	L
9842	9825	<w>	<>
9843	9844	<>	<aphaerese>
9843	9844	<>	<elision3>
9843	9844	<>	<elision2>
9843	9844	<>	<elision1>
9843	8185	<2k>	<>
9844	9845	<>	<name>
9844	9844	<>	<aphaerese>
9844	9844	<>	<elision3>
9844	9844	<>	<elision2>
9844	9844	<>	<elision1>
9844	8186	<2k>	<>
9845	9843	<>	<aphaerese>
9845	9843	<>	<elision3>
9845	9843	<>	<elision2>
9845	9843	<>	<elision1>
9845	8184	<2k>	<>
9846	9847	<>	<name>
9846	9846	<>	<aphaerese>
9846	9846	<>	<elision3>
9846	9846	<>	<elision2>
9846	9846	<>	<elision1>
9846	9817	<k2K>	<>
9846	9838	<k2L>	<>
9847	9848	<>	<aphaerese>
9847	9848	<>	<elision3>
9847	9848	<>	<elision2>
9847	9848	<>	<elision1>
9847	9818	<k2K>	<>
9847	9839	<k2L>	<>
9848	9846	<>	<aphaerese>
9848	9846	<>	<elision3>
9848	9846	<>	<elision2>
9848	9846	<>	<elision1>
9848	9816	<k2K>	<>
9848	9837	<k2L>	<>
9849	9850	<>	<name>
9849	9849	<>	<aphaerese>
9849	9849	<>	<elision3>
9849	9849	<>	<elision2>
9849	9849	<>	<elision1>
9849	9820	s	κ
9849	9820	s	k
9849	9829	s	K
9849	9820	s	λ
9849	9820	s	l
9849	9835	s	L
9849	9838	<K2L>	<>
9850	9851	<>	<aphaerese>
9850	9851	<>	<elision3>
9850	9851	<>	<elision2>
9850	9851	<>	<elision1>
9850	9819	s	κ
9850	9819	s	k
9850	9828	s	K
9850	9819	s	λ
9850	9819	s	l
9850	9834	s	L
9850	9839	<K2L>	<>
9851	9849	<>	<aphaerese>
9851	9849	<>	<elision3>
9851	9849	<>	<elision2>
9851	9849	<>	<elision1>
9851	9820	s	κ
9851	9820	s	k
9851	9829	s	K
9851	9820	s	λ
9851	9820	s	l
9851	9835	s	L
9851	9837	<K2L>	<>
9852	9853	<>	<name>
9852	9852	<>	<aphaerese>
9852	9852	<>	<elision3>
9852	9852	<>	<elision2>
9852	9852	<>	<elision1>
9852	9838	<lambda2L>	<>
9853	9854	<>	<aphaerese>
9853	9854	<>	<elision3>
9853	9854	<>	<elision2>
9853	9854	<>	<elision1>
9853	9839	<lambda2L>	<>
9854	9852	<>	<aphaerese>
9854	9852	<>	<elision3>
9854	9852	<>	<elision2>
9854	9852	<>	<elision1>
9854	9837	<lambda2L>	<>
9855	9856	<>	<name>
9855	9855	<>	<aphaerese>
9855	9855	<>	<elision3>
9855	9855	<>	<elision2>
9855	9855	<>	<elision1>
9855	9838	<l2L>	<>
9856	9857	<>	<aphaerese>
9856	9857	<>	<elision3>
9856	9857	<>	<elision2>
9856	9857	<>	<elision1>
9856	9839	<l2L>	<>
9857	9855	<>	<aphaerese>
9857	9855	<>	<elision3>
9857	9855	<>	<elision2>
9857	9855	<>	<elision1>
9857	9837	<l2L>	<>
9858	9859	<>	<name>
9858	9858	<>	<aphaerese>
9858	9858	<>	<elision3>
9858	9858	<>	<elision2>
9858	9858	<>	<elision1>
9858	9883	<kappa2K>	<>
9858	9901	<kappa2L>	<>
9858	9910	<lambda2L>	<>
9859	9860	<>	<aphaerese>
9859	9860	<>	<elision3>
9859	9860	<>	<elision2>
9859	9860	<>	<elision1>
9859	9884	<kappa2K>	<>
9859	9902	<kappa2L>	<>
9859	9911	<lambda2L>	<>
9860	9858	<>	<aphaerese>
9860	9858	<>	<elision3>
9860	9858	<>	<elision2>
9860	9858	<>	<elision1>
9860	9861	<kappa2K>	<>
9860	9891	<kappa2L>	<>
9860	9909	<lambda2L>	<>
9861	9862	.	.
9861	9862	<~>	<~>
9861	9862	<split-s>	<split-s>
9861	9862	<split-h>	<split-h>
9861	9862	<name2>	<name2>
9861	9865	<aphaerese>	<aphaerese>
9861	9883	<>	<aphaerese>
9861	9886	<elision3>	<elision3>
9861	9883	<>	<elision3>
9861	9886	<elision2>	<elision2>
9861	9883	<>	<elision2>
9861	9886	<elision1>	<elision1>
9861	9883	<>	<elision1>
9861	9880	.	υ
9861	9833	s	υ
9861	9880	.	u
9861	9833	s	u
9861	9820	s	κ
9861	9820	s	k
9861	9874	s	U
9861	9829	s	K
9861	9880	.	α
9861	9833	s	α
9861	9880	.	a
9861	9833	s	a
9861	9877	s	A
9861	9820	s	λ
9861	9820	s	l
9861	9835	s	L
9861	9826	<1m>	<>
9862	9862	.	.
9862	9862	<~>	<~>
9862	9862	<split-s>	<split-s>
9862	9862	<split-h>	<split-h>
9862	9862	<name2>	<name2>
9862	9863	<>	<name>
9862	9865	<aphaerese>	<aphaerese>
9862	9862	<>	<aphaerese>
9862	9862	<elision3>	<elision3>
9862	9862	<>	<elision3>
9862	9862	<elision2>	<elision2>
9862	9862	<>	<elision2>
9862	9862	<elision1>	<elision1>
9862	9862	<>	<elision1>
9862	9880	.	υ
9862	9833	s	υ
9862	9880	.	u
9862	9833	s	u
9862	9868	.	κ
9862	9820	s	κ
9862	9820	s	k
9862	9874	s	U
9862	9829	s	K
9862	9880	.	α
9862	9833	s	α
9862	9880	.	a
9862	9833	s	a
9862	9877	s	A
9862	9820	s	λ
9862	9820	s	l
9862	9835	s	L
9862	9827	<1m>	<>
9863	9864	.	.
9863	9864	<~>	<~>
9863	9864	<split-s>	<split-s>
9863	9864	<split-h>	<split-h>
9863	9864	<name2>	<name2>
9863	9867	<aphaerese>	<aphaerese>
9863	9864	<>	<aphaerese>
9863	9864	<elision3>	<elision3>
9863	9864	<>	<elision3>
9863	9864	<elision2>	<elision2>
9863	9864	<>	<elision2>
9863	9864	<elision1>	<elision1>
9863	9864	<>	<elision1>
9863	9882	.	υ
9863	9832	s	υ
9863	9882	.	u
9863	9832	s	u
9863	9870	.	κ
9863	9819	s	κ
9863	9819	s	k
9863	9876	s	U
9863	9828	s	K
9863	9882	.	α
9863	9832	s	α
9863	9882	.	a
9863	9832	s	a
9863	9879	s	A
9863	9819	s	λ
9863	9819	s	l
9863	9834	s	L
9863	9825	<1m>	<>
9864	9862	.	.
9864	9862	<~>	<~>
9864	9862	<split-s>	<split-s>
9864	9862	<split-h>	<split-h>
9864	9862	<name2>	<name2>
9864	9865	<aphaerese>	<aphaerese>
9864	9862	<>	<aphaerese>
9864	9862	<elision3>	<elision3>
9864	9862	<>	<elision3>
9864	9862	<elision2>	<elision2>
9864	9862	<>	<elision2>
9864	9862	<elision1>	<elision1>
9864	9862	<>	<elision1>
9864	9880	.	υ
9864	9833	s	υ
9864	9880	.	u
9864	9833	s	u
9864	9868	.	κ
9864	9820	s	κ
9864	9820	s	k
9864	9874	s	U
9864	9829	s	K
9864	9880	.	α
9864	9833	s	α
9864	9880	.	a
9864	9833	s	a
9864	9877	s	A
9864	9820	s	λ
9864	9820	s	l
9864	9835	s	L
9864	9826	<1m>	<>
9865	9862	.	.
9865	9862	<~>	<~>
9865	9862	<split-s>	<split-s>
9865	9862	<split-h>	<split-h>
9865	9862	<name2>	<name2>
9865	9866	<>	<name>
9865	9865	<aphaerese>	<aphaerese>
9865	9865	<>	<aphaerese>
9865	9862	<elision3>	<elision3>
9865	9865	<>	<elision3>
9865	9862	<elision2>	<elision2>
9865	9865	<>	<elision2>
9865	9862	<elision1>	<elision1>
9865	9865	<>	<elision1>
9865	9862	.	υ
9865	9862	.	u
9865	9868	.	κ
9865	9820	s	κ
9865	9820	s	k
9865	9874	s	U
9865	9829	s	K
9865	9862	.	α
9865	9862	.	a
9865	9877	s	A
9865	9820	s	λ
9865	9820	s	l
9865	9835	s	L
9865	9827	<1m>	<>
9866	9864	.	.
9866	9864	<~>	<~>
9866	9864	<split-s>	<split-s>
9866	9864	<split-h>	<split-h>
9866	9864	<name2>	<name2>
9866	9867	<aphaerese>	<aphaerese>
9866	9867	<>	<aphaerese>
9866	9864	<elision3>	<elision3>
9866	9867	<>	<elision3>
9866	9864	<elision2>	<elision2>
9866	9867	<>	<elision2>
9866	9864	<elision1>	<elision1>
9866	9867	<>	<elision1>
9866	9864	.	υ
9866	9864	.	u
9866	9870	.	κ
9866	9819	s	κ
9866	9819	s	k
9866	9876	s	U
9866	9828	s	K
9866	9864	.	α
9866	9864	.	a
9866	9879	s	A
9866	9819	s	λ
9866	9819	s	l
9866	9834	s	L
9866	9825	<1m>	<>
9867	9862	.	.
9867	9862	<~>	<~>
9867	9862	<split-s>	<split-s>
9867	9862	<split-h>	<split-h>
9867	9862	<name2>	<name2>
9867	9865	<aphaerese>	<aphaerese>
9867	9865	<>	<aphaerese>
9867	9862	<elision3>	<elision3>
9867	9865	<>	<elision3>
9867	9862	<elision2>	<elision2>
9867	9865	<>	<elision2>
9867	9862	<elision1>	<elision1>
9867	9865	<>	<elision1>
9867	9862	.	υ
9867	9862	.	u
9867	9868	.	κ
9867	9820	s	κ
9867	9820	s	k
9867	9874	s	U
9867	9829	s	K
9867	9862	.	α
9867	9862	.	a
9867	9877	s	A
9867	9820	s	λ
9867	9820	s	l
9867	9835	s	L
9867	9826	<1m>	<>
9868	9869	<>	<name>
9868	9868	<>	<aphaerese>
9868	9871	<elision3>	<elision3>
9868	9868	<>	<elision3>
9868	9871	<elision2>	<elision2>
9868	9868	<>	<elision2>
9868	9871	<elision1>	<elision1>
9868	9868	<>	<elision1>
9869	9870	<>	<aphaerese>
9869	9873	<elision3>	<elision3>
9869	9870	<>	<elision3>
9869	9873	<elision2>	<elision2>
9869	9870	<>	<elision2>
9869	9873	<elision1>	<elision1>
9869	9870	<>	<elision1>
9870	9868	<>	<aphaerese>
9870	9871	<elision3>	<elision3>
9870	9868	<>	<elision3>
9870	9871	<elision2>	<elision2>
9870	9868	<>	<elision2>
9870	9871	<elision1>	<elision1>
9870	9868	<>	<elision1>
9871	9872	<>	<name>
9871	9871	<>	<aphaerese>
9871	9871	<>	<elision3>
9871	9871	<>	<elision2>
9871	9871	<>	<elision1>
9871	9833	s	κ
9871	9833	s	k
9871	9829	s	K
9871	9833	s	λ
9871	9833	s	l
9871	9835	s	L
9872	9873	<>	<aphaerese>
9872	9873	<>	<elision3>
9872	9873	<>	<elision2>
9872	9873	<>	<elision1>
9872	9832	s	κ
9872	9832	s	k
9872	9828	s	K
9872	9832	s	λ
9872	9832	s	l
9872	9834	s	L
9873	9871	<>	<aphaerese>
9873	9871	<>	<elision3>
9873	9871	<>	<elision2>
9873	9871	<>	<elision1>
9873	9833	s	κ
9873	9833	s	k
9873	9829	s	K
9873	9833	s	λ
9873	9833	s	l
9873	9835	s	L
9874	9875	<>	<name>
9874	9874	<>	<aphaerese>
9874	9874	<>	<elision3>
9874	9874	<>	<elision2>
9874	9874	<>	<elision1>
9874	9833	<U2kl>	<>
9875	9876	<>	<aphaerese>
9875	9876	<>	<elision3>
9875	9876	<>	<elision2>
9875	9876	<>	<elision1>
9875	9831	<U2kl>	<>
9876	9874	<>	<aphaerese>
9876	9874	<>	<elision3>
9876	9874	<>	<elision2>
9876	9874	<>	<elision1>
9876	9832	<U2kl>	<>
9877	9878	<>	<name>
9877	9877	<>	<aphaerese>
9877	9877	<>	<elision3>
9877	9877	<>	<elision2>
9877	9877	<>	<elision1>
9877	9833	<A2kl>	<>
9878	9879	<>	<aphaerese>
9878	9879	<>	<elision3>
9878	9879	<>	<elision2>
9878	9879	<>	<elision1>
9878	9831	<A2kl>	<>
9879	9877	<>	<aphaerese>
9879	9877	<>	<elision3>
9879	9877	<>	<elision2>
9879	9877	<>	<elision1>
9879	9832	<A2kl>	<>
9880	9881	<>	<name>
9880	9880	<>	<aphaerese>
9880	9862	<elision3>	<elision3>
9880	9880	<>	<elision3>
9880	9862	<elision2>	<elision2>
9880	9880	<>	<elision2>
9880	9862	<elision1>	<elision1>
9880	9880	<>	<elision1>
9881	9882	<>	<aphaerese>
9881	9864	<elision3>	<elision3>
9881	9882	<>	<elision3>
9881	9864	<elision2>	<elision2>
9881	9882	<>	<elision2>
9881	9864	<elision1>	<elision1>
9881	9882	<>	<elision1>
9882	9880	<>	<aphaerese>
9882	9862	<elision3>	<elision3>
9882	9880	<>	<elision3>
9882	9862	<elision2>	<elision2>
9882	9880	<>	<elision2>
9882	9862	<elision1>	<elision1>
9882	9880	<>	<elision1>
9883	9862	.	.
9883	9862	<~>	<~>
9883	9862	<split-s>	<split-s>
9883	9862	<split-h>	<split-h>
9883	9862	<name2>	<name2>
9883	9884	<>	<name>
9883	9865	<aphaerese>	<aphaerese>
9883	9883	<>	<aphaerese>
9883	9886	<elision3>	<elision3>
9883	9883	<>	<elision3>
9883	9886	<elision2>	<elision2>
9883	9883	<>	<elision2>
9883	9886	<elision1>	<elision1>
9883	9883	<>	<elision1>
9883	9880	.	υ
9883	9833	s	υ
9883	9880	.	u
9883	9833	s	u
9883	9820	s	κ
9883	9820	s	k
9883	9874	s	U
9883	9829	s	K
9883	9880	.	α
9883	9833	s	α
9883	9880	.	a
9883	9833	s	a
9883	9877	s	A
9883	9820	s	λ
9883	9820	s	l
9883	9835	s	L
9883	9827	<1m>	<>
9884	9864	.	.
9884	9864	<~>	<~>
9884	9864	<split-s>	<split-s>
9884	9864	<split-h>	<split-h>
9884	9864	<name2>	<name2>
9884	9867	<aphaerese>	<aphaerese>
9884	9861	<>	<aphaerese>
9884	9885	<elision3>	<elision3>
9884	9861	<>	<elision3>
9884	9885	<elision2>	<elision2>
9884	9861	<>	<elision2>
9884	9885	<elision1>	<elision1>
9884	9861	<>	<elision1>
9884	9882	.	υ
9884	9832	s	υ
9884	9882	.	u
9884	9832	s	u
9884	9819	s	κ
9884	9819	s	k
9884	9876	s	U
9884	9828	s	K
9884	9882	.	α
9884	9832	s	α
9884	9882	.	a
9884	9832	s	a
9884	9879	s	A
9884	9819	s	λ
9884	9819	s	l
9884	9834	s	L
9884	9825	<1m>	<>
9885	9862	.	.
9885	9862	<~>	<~>
9885	9862	<split-s>	<split-s>
9885	9862	<split-h>	<split-h>
9885	9862	<name2>	<name2>
9885	9865	<aphaerese>	<aphaerese>
9885	9886	<>	<aphaerese>
9885	9862	<elision3>	<elision3>
9885	9886	<>	<elision3>
9885	9862	<elision2>	<elision2>
9885	9886	<>	<elision2>
9885	9862	<elision1>	<elision1>
9885	9886	<>	<elision1>
9885	9880	.	υ
9885	9833	s	υ
9885	9880	.	u
9885	9833	s	u
9885	9868	.	κ
9885	9889	s	κ
9885	9889	s	k
9885	9874	s	U
9885	9880	.	α
9885	9833	s	α
9885	9880	.	a
9885	9833	s	a
9885	9877	s	A
9885	9889	s	λ
9885	9889	s	l
9885	9826	<1m>	<>
9886	9862	.	.
9886	9862	<~>	<~>
9886	9862	<split-s>	<split-s>
9886	9862	<split-h>	<split-h>
9886	9862	<name2>	<name2>
9886	9887	<>	<name>
9886	9865	<aphaerese>	<aphaerese>
9886	9886	<>	<aphaerese>
9886	9862	<elision3>	<elision3>
9886	9886	<>	<elision3>
9886	9862	<elision2>	<elision2>
9886	9886	<>	<elision2>
9886	9862	<elision1>	<elision1>
9886	9886	<>	<elision1>
9886	9880	.	υ
9886	9833	s	υ
9886	9880	.	u
9886	9833	s	u
9886	9868	.	κ
9886	9889	s	κ
9886	9889	s	k
9886	9874	s	U
9886	9880	.	α
9886	9833	s	α
9886	9880	.	a
9886	9833	s	a
9886	9877	s	A
9886	9889	s	λ
9886	9889	s	l
9886	9827	<1m>	<>
9887	9864	.	.
9887	9864	<~>	<~>
9887	9864	<split-s>	<split-s>
9887	9864	<split-h>	<split-h>
9887	9864	<name2>	<name2>
9887	9867	<aphaerese>	<aphaerese>
9887	9885	<>	<aphaerese>
9887	9864	<elision3>	<elision3>
9887	9885	<>	<elision3>
9887	9864	<elision2>	<elision2>
9887	9885	<>	<elision2>
9887	9864	<elision1>	<elision1>
9887	9885	<>	<elision1>
9887	9882	.	υ
9887	9832	s	υ
9887	9882	.	u
9887	9832	s	u
9887	9870	.	κ
9887	9888	s	κ
9887	9888	s	k
9887	9876	s	U
9887	9882	.	α
9887	9832	s	α
9887	9882	.	a
9887	9832	s	a
9887	9879	s	A
9887	9888	s	λ
9887	9888	s	l
9887	9825	<1m>	<>
9888	9889	<>	<aphaerese>
9888	9889	<>	<elision3>
9888	9889	<>	<elision2>
9888	9889	<>	<elision1>
9888	9826	<2m>	<>
9889	9890	<>	<name>
9889	9889	<>	<aphaerese>
9889	9889	<>	<elision3>
9889	9889	<>	<elision2>
9889	9889	<>	<elision1>
9889	9827	<2m>	<>
9890	9888	<>	<aphaerese>
9890	9888	<>	<elision3>
9890	9888	<>	<elision2>
9890	9888	<>	<elision1>
9890	9825	<2m>	<>
9891	9892	.	.
9891	9892	<~>	<~>
9891	9892	<split-s>	<split-s>
9891	9892	<split-h>	<split-h>
9891	9892	<name2>	<name2>
9891	9895	<aphaerese>	<aphaerese>
9891	9901	<>	<aphaerese>
9891	9904	<elision3>	<elision3>
9891	9901	<>	<elision3>
9891	9904	<elision2>	<elision2>
9891	9901	<>	<elision2>
9891	9904	<elision1>	<elision1>
9891	9901	<>	<elision1>
9891	9898	.	υ
9891	9833	s	υ
9891	9898	.	u
9891	9833	s	u
9891	9841	s	κ
9891	9844	H	κ
9891	9841	s	k
9891	9844	H	k
9891	9874	s	U
9891	9829	s	K
9891	9844	H	K
9891	9898	.	α
9891	9833	s	α
9891	9898	.	a
9891	9833	s	a
9891	9877	s	A
9891	9841	s	λ
9891	9844	H	λ
9891	9841	s	l
9891	9844	H	l
9891	9835	s	L
9891	9844	H	L
9891	9826	<1m>	<>
9892	9892	.	.
9892	9892	<~>	<~>
9892	9892	<split-s>	<split-s>
9892	9892	<split-h>	<split-h>
9892	9892	<name2>	<name2>
9892	9893	<>	<name>
9892	9895	<aphaerese>	<aphaerese>
9892	9892	<>	<aphaerese>
9892	9892	<elision3>	<elision3>
9892	9892	<>	<elision3>
9892	9892	<elision2>	<elision2>
9892	9892	<>	<elision2>
9892	9892	<elision1>	<elision1>
9892	9892	<>	<elision1>
9892	9898	.	υ
9892	9833	s	υ
9892	9898	.	u
9892	9833	s	u
9892	9868	.	κ
9892	9841	s	κ
9892	9844	H	κ
9892	9841	s	k
9892	9844	H	k
9892	9874	s	U
9892	9829	s	K
9892	9844	H	K
9892	9898	.	α
9892	9833	s	α
9892	9898	.	a
9892	9833	s	a
9892	9877	s	A
9892	9841	s	λ
9892	9844	H	λ
9892	9841	s	l
9892	9844	H	l
9892	9835	s	L
9892	9844	H	L
9892	9827	<1m>	<>
9893	9894	.	.
9893	9894	<~>	<~>
9893	9894	<split-s>	<split-s>
9893	9894	<split-h>	<split-h>
9893	9894	<name2>	<name2>
9893	9897	<aphaerese>	<aphaerese>
9893	9894	<>	<aphaerese>
9893	9894	<elision3>	<elision3>
9893	9894	<>	<elision3>
9893	9894	<elision2>	<elision2>
9893	9894	<>	<elision2>
9893	9894	<elision1>	<elision1>
9893	9894	<>	<elision1>
9893	9900	.	υ
9893	9832	s	υ
9893	9900	.	u
9893	9832	s	u
9893	9870	.	κ
9893	9840	s	κ
9893	9843	H	κ
9893	9840	s	k
9893	9843	H	k
9893	9876	s	U
9893	9828	s	K
9893	9843	H	K
9893	9900	.	α
9893	9832	s	α
9893	9900	.	a
9893	9832	s	a
9893	9879	s	A
9893	9840	s	λ
9893	9843	H	λ
9893	9840	s	l
9893	9843	H	l
9893	9834	s	L
9893	9843	H	L
9893	9825	<1m>	<>
9894	9892	.	.
9894	9892	<~>	<~>
9894	9892	<split-s>	<split-s>
9894	9892	<split-h>	<split-h>
9894	9892	<name2>	<name2>
9894	9895	<aphaerese>	<aphaerese>
9894	9892	<>	<aphaerese>
9894	9892	<elision3>	<elision3>
9894	9892	<>	<elision3>
9894	9892	<elision2>	<elision2>
9894	9892	<>	<elision2>
9894	9892	<elision1>	<elision1>
9894	9892	<>	<elision1>
9894	9898	.	υ
9894	9833	s	υ
9894	9898	.	u
9894	9833	s	u
9894	9868	.	κ
9894	9841	s	κ
9894	9844	H	κ
9894	9841	s	k
9894	9844	H	k
9894	9874	s	U
9894	9829	s	K
9894	9844	H	K
9894	9898	.	α
9894	9833	s	α
9894	9898	.	a
9894	9833	s	a
9894	9877	s	A
9894	9841	s	λ
9894	9844	H	λ
9894	9841	s	l
9894	9844	H	l
9894	9835	s	L
9894	9844	H	L
9894	9826	<1m>	<>
9895	9892	.	.
9895	9892	<~>	<~>
9895	9892	<split-s>	<split-s>
9895	9892	<split-h>	<split-h>
9895	9892	<name2>	<name2>
9895	9896	<>	<name>
9895	9895	<aphaerese>	<aphaerese>
9895	9895	<>	<aphaerese>
9895	9892	<elision3>	<elision3>
9895	9895	<>	<elision3>
9895	9892	<elision2>	<elision2>
9895	9895	<>	<elision2>
9895	9892	<elision1>	<elision1>
9895	9895	<>	<elision1>
9895	9892	.	υ
9895	9892	.	u
9895	9868	.	κ
9895	9841	s	κ
9895	9844	H	κ
9895	9841	s	k
9895	9844	H	k
9895	9874	s	U
9895	9829	s	K
9895	9844	H	K
9895	9892	.	α
9895	9892	.	a
9895	9877	s	A
9895	9841	s	λ
9895	9844	H	λ
9895	9841	s	l
9895	9844	H	l
9895	9835	s	L
9895	9844	H	L
9895	9827	<1m>	<>
9896	9894	.	.
9896	9894	<~>	<~>
9896	9894	<split-s>	<split-s>
9896	9894	<split-h>	<split-h>
9896	9894	<name2>	<name2>
9896	9897	<aphaerese>	<aphaerese>
9896	9897	<>	<aphaerese>
9896	9894	<elision3>	<elision3>
9896	9897	<>	<elision3>
9896	9894	<elision2>	<elision2>
9896	9897	<>	<elision2>
9896	9894	<elision1>	<elision1>
9896	9897	<>	<elision1>
9896	9894	.	υ
9896	9894	.	u
9896	9870	.	κ
9896	9840	s	κ
9896	9843	H	κ
9896	9840	s	k
9896	9843	H	k
9896	9876	s	U
9896	9828	s	K
9896	9843	H	K
9896	9894	.	α
9896	9894	.	a
9896	9879	s	A
9896	9840	s	λ
9896	9843	H	λ
9896	9840	s	l
9896	9843	H	l
9896	9834	s	L
9896	9843	H	L
9896	9825	<1m>	<>
9897	9892	.	.
9897	9892	<~>	<~>
9897	9892	<split-s>	<split-s>
9897	9892	<split-h>	<split-h>
9897	9892	<name2>	<name2>
9897	9895	<aphaerese>	<aphaerese>
9897	9895	<>	<aphaerese>
9897	9892	<elision3>	<elision3>
9897	9895	<>	<elision3>
9897	9892	<elision2>	<elision2>
9897	9895	<>	<elision2>
9897	9892	<elision1>	<elision1>
9897	9895	<>	<elision1>
9897	9892	.	υ
9897	9892	.	u
9897	9868	.	κ
9897	9841	s	κ
9897	9844	H	κ
9897	9841	s	k
9897	9844	H	k
9897	9874	s	U
9897	9829	s	K
9897	9844	H	K
9897	9892	.	α
9897	9892	.	a
9897	9877	s	A
9897	9841	s	λ
9897	9844	H	λ
9897	9841	s	l
9897	9844	H	l
9897	9835	s	L
9897	9844	H	L
9897	9826	<1m>	<>
9898	9899	<>	<name>
9898	9898	<>	<aphaerese>
9898	9892	<elision3>	<elision3>
9898	9898	<>	<elision3>
9898	9892	<elision2>	<elision2>
9898	9898	<>	<elision2>
9898	9892	<elision1>	<elision1>
9898	9898	<>	<elision1>
9899	9900	<>	<aphaerese>
9899	9894	<elision3>	<elision3>
9899	9900	<>	<elision3>
9899	9894	<elision2>	<elision2>
9899	9900	<>	<elision2>
9899	9894	<elision1>	<elision1>
9899	9900	<>	<elision1>
9900	9898	<>	<aphaerese>
9900	9892	<elision3>	<elision3>
9900	9898	<>	<elision3>
9900	9892	<elision2>	<elision2>
9900	9898	<>	<elision2>
9900	9892	<elision1>	<elision1>
9900	9898	<>	<elision1>
9901	9892	.	.
9901	9892	<~>	<~>
9901	9892	<split-s>	<split-s>
9901	9892	<split-h>	<split-h>
9901	9892	<name2>	<name2>
9901	9902	<>	<name>
9901	9895	<aphaerese>	<aphaerese>
9901	9901	<>	<aphaerese>
9901	9904	<elision3>	<elision3>
9901	9901	<>	<elision3>
9901	9904	<elision2>	<elision2>
9901	9901	<>	<elision2>
9901	9904	<elision1>	<elision1>
9901	9901	<>	<elision1>
9901	9898	.	υ
9901	9833	s	υ
9901	9898	.	u
9901	9833	s	u
9901	9841	s	κ
9901	9844	H	κ
9901	9841	s	k
9901	9844	H	k
9901	9874	s	U
9901	9829	s	K
9901	9844	H	K
9901	9898	.	α
9901	9833	s	α
9901	9898	.	a
9901	9833	s	a
9901	9877	s	A
9901	9841	s	λ
9901	9844	H	λ
9901	9841	s	l
9901	9844	H	l
9901	9835	s	L
9901	9844	H	L
9901	9827	<1m>	<>
9902	9894	.	.
9902	9894	<~>	<~>
9902	9894	<split-s>	<split-s>
9902	9894	<split-h>	<split-h>
9902	9894	<name2>	<name2>
9902	9897	<aphaerese>	<aphaerese>
9902	9891	<>	<aphaerese>
9902	9903	<elision3>	<elision3>
9902	9891	<>	<elision3>
9902	9903	<elision2>	<elision2>
9902	9891	<>	<elision2>
9902	9903	<elision1>	<elision1>
9902	9891	<>	<elision1>
9902	9900	.	υ
9902	9832	s	υ
9902	9900	.	u
9902	9832	s	u
9902	9840	s	κ
9902	9843	H	κ
9902	9840	s	k
9902	9843	H	k
9902	9876	s	U
9902	9828	s	K
9902	9843	H	K
9902	9900	.	α
9902	9832	s	α
9902	9900	.	a
9902	9832	s	a
9902	9879	s	A
9902	9840	s	λ
9902	9843	H	λ
9902	9840	s	l
9902	9843	H	l
9902	9834	s	L
9902	9843	H	L
9902	9825	<1m>	<>
9903	9892	.	.
9903	9892	<~>	<~>
9903	9892	<split-s>	<split-s>
9903	9892	<split-h>	<split-h>
9903	9892	<name2>	<name2>
9903	9895	<aphaerese>	<aphaerese>
9903	9904	<>	<aphaerese>
9903	9892	<elision3>	<elision3>
9903	9904	<>	<elision3>
9903	9892	<elision2>	<elision2>
9903	9904	<>	<elision2>
9903	9892	<elision1>	<elision1>
9903	9904	<>	<elision1>
9903	9898	.	υ
9903	9833	s	υ
9903	9898	.	u
9903	9833	s	u
9903	9868	.	κ
9903	9907	s	κ
9903	9844	H	κ
9903	9907	s	k
9903	9844	H	k
9903	9874	s	U
9903	9844	H	K
9903	9898	.	α
9903	9833	s	α
9903	9898	.	a
9903	9833	s	a
9903	9877	s	A
9903	9907	s	λ
9903	9844	H	λ
9903	9907	s	l
9903	9844	H	l
9903	9844	H	L
9903	9826	<1m>	<>
9904	9892	.	.
9904	9892	<~>	<~>
9904	9892	<split-s>	<split-s>
9904	9892	<split-h>	<split-h>
9904	9892	<name2>	<name2>
9904	9905	<>	<name>
9904	9895	<aphaerese>	<aphaerese>
9904	9904	<>	<aphaerese>
9904	9892	<elision3>	<elision3>
9904	9904	<>	<elision3>
9904	9892	<elision2>	<elision2>
9904	9904	<>	<elision2>
9904	9892	<elision1>	<elision1>
9904	9904	<>	<elision1>
9904	9898	.	υ
9904	9833	s	υ
9904	9898	.	u
9904	9833	s	u
9904	9868	.	κ
9904	9907	s	κ
9904	9844	H	κ
9904	9907	s	k
9904	9844	H	k
9904	9874	s	U
9904	9844	H	K
9904	9898	.	α
9904	9833	s	α
9904	9898	.	a
9904	9833	s	a
9904	9877	s	A
9904	9907	s	λ
9904	9844	H	λ
9904	9907	s	l
9904	9844	H	l
9904	9844	H	L
9904	9827	<1m>	<>
9905	9894	.	.
9905	9894	<~>	<~>
9905	9894	<split-s>	<split-s>
9905	9894	<split-h>	<split-h>
9905	9894	<name2>	<name2>
9905	9897	<aphaerese>	<aphaerese>
9905	9903	<>	<aphaerese>
9905	9894	<elision3>	<elision3>
9905	9903	<>	<elision3>
9905	9894	<elision2>	<elision2>
9905	9903	<>	<elision2>
9905	9894	<elision1>	<elision1>
9905	9903	<>	<elision1>
9905	9900	.	υ
9905	9832	s	υ
9905	9900	.	u
9905	9832	s	u
9905	9870	.	κ
9905	9906	s	κ
9905	9843	H	κ
9905	9906	s	k
9905	9843	H	k
9905	9876	s	U
9905	9843	H	K
9905	9900	.	α
9905	9832	s	α
9905	9900	.	a
9905	9832	s	a
9905	9879	s	A
9905	9906	s	λ
9905	9843	H	λ
9905	9906	s	l
9905	9843	H	l
9905	9843	H	L
9905	9825	<1m>	<>
9906	9907	<>	<aphaerese>
9906	9907	<>	<elision3>
9906	9907	<>	<elision2>
9906	9907	<>	<elision1>
9906	9826	<w>	<>
9907	9908	<>	<name>
9907	9907	<>	<aphaerese>
9907	9907	<>	<elision3>
9907	9907	<>	<elision2>
9907	9907	<>	<elision1>
9907	9827	<w>	<>
9908	9906	<>	<aphaerese>
9908	9906	<>	<elision3>
9908	9906	<>	<elision2>
9908	9906	<>	<elision1>
9908	9825	<w>	<>
9909	9910	<>	<aphaerese>
9909	9910	<>	<elision3>
9909	9910	<>	<elision2>
9909	9910	<>	<elision1>
9909	9898	.	κ
9909	9898	.	λ
9910	9911	<>	<name>
9910	9910	<>	<aphaerese>
9910	9910	<>	<elision3>
9910	9910	<>	<elision2>
9910	9910	<>	<elision1>
9910	9898	.	κ
9910	9898	.	λ
9911	9909	<>	<aphaerese>
9911	9909	<>	<elision3>
9911	9909	<>	<elision2>
9911	9909	<>	<elision1>
9911	9900	.	κ
9911	9900	.	λ
9912	9913	<>	<name>
9912	9912	<>	<aphaerese>
9912	9912	<>	<elision3>
9912	9912	<>	<elision2>
9912	9912	<>	<elision1>
9912	9916	<k2K>	<>
9912	9919	<k2L>	<>
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9916	9880	.	υ
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9918	9844	H	L
9918	9826	<1m>	<>
9919	9892	.	.
9919	9892	<~>	<~>
9919	9892	<split-s>	<split-s>
9919	9892	<split-h>	<split-h>
9919	9892	<name2>	<name2>
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9919	9895	<aphaerese>	<aphaerese>
9919	9919	<>	<aphaerese>
9919	9892	<elision3>	<elision3>
9919	9919	<>	<elision3>
9919	9892	<elision2>	<elision2>
9919	9919	<>	<elision2>
9919	9892	<elision1>	<elision1>
9919	9919	<>	<elision1>
9919	9898	.	υ
9919	9833	s	υ
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9919	9841	s	k
9919	9844	H	k
9919	9874	s	U
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9919	9835	s	L
9919	9844	H	L
9919	9827	<1m>	<>
9920	9894	.	.
9920	9894	<~>	<~>
9920	9894	<split-s>	<split-s>
9920	9894	<split-h>	<split-h>
9920	9894	<name2>	<name2>
9920	9897	<aphaerese>	<aphaerese>
9920	9918	<>	<aphaerese>
9920	9894	<elision3>	<elision3>
9920	9918	<>	<elision3>
9920	9894	<elision2>	<elision2>
9920	9918	<>	<elision2>
9920	9894	<elision1>	<elision1>
9920	9918	<>	<elision1>
9920	9900	.	υ
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9920	9825	<1m>	<>
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9921	9862	<~>	<~>
9921	9862	<split-s>	<split-s>
9921	9862	<split-h>	<split-h>
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9921	9865	<aphaerese>	<aphaerese>
9921	9921	<>	<aphaerese>
9921	9862	<elision3>	<elision3>
9921	9921	<>	<elision3>
9921	9862	<elision2>	<elision2>
9921	9921	<>	<elision2>
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9921	9880	.	υ
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9921	9880	.	u
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9921	9868	.	κ
9921	9820	s	κ
9921	9820	s	k
9921	9874	s	U
9921	9829	s	K
9921	9880	.	α
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9921	9833	s	a
9921	9877	s	A
9921	9820	s	λ
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9921	9827	<1m>	<>
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9922	9864	.	.
9922	9864	<~>	<~>
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9922	9867	<aphaerese>	<aphaerese>
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9922	9864	<elision3>	<elision3>
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9922	9864	<elision2>	<elision2>
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9922	9864	<elision1>	<elision1>
9922	9923	<>	<elision1>
9922	9882	.	υ
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9922	9825	<1m>	<>
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9923	9921	<>	<elision3>
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9923	9880	.	υ
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9923	9880	.	u
9923	9833	s	u
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9923	9820	s	k
9923	9874	s	U
9923	9829	s	K
9923	9880	.	α
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9923	9880	.	a
9923	9833	s	a
9923	9877	s	A
9923	9820	s	λ
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9923	9826	<1m>	<>
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9924	9862	.	.
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9924	9862	<split-s>	<split-s>
9924	9862	<split-h>	<split-h>
9924	9862	<name2>	<name2>
9924	9925	<name2>	<name>
9924	9926	<>	<name>
9924	9865	<aphaerese>	<aphaerese>
9924	9928	<>	<aphaerese>
9924	9862	<elision3>	<elision3>
9924	9928	<>	<elision3>
9924	9862	<elision2>	<elision2>
9924	9928	<>	<elision2>
9924	9862	<elision1>	<elision1>
9924	9928	<>	<elision1>
9924	9880	.	υ
9924	9833	s	υ
9924	9880	.	u
9924	9833	s	u
9924	9898	.	κ
9924	9820	s	κ
9924	9820	s	k
9924	9874	s	U
9924	9829	s	K
9924	9880	.	α
9924	9833	s	α
9924	9880	.	a
9924	9833	s	a
9924	9877	s	A
9924	9898	.	λ
9924	9820	s	λ
9924	9820	s	l
9924	9835	s	L
9924	9827	<1m>	<>
9924	9929	<k2K>	<>
9924	9930	<k2L>	<>
9924	9932	<K2L>	<>
9925	9828	s	k
9925	9834	s	l
9926	9864	.	.
9926	9864	<~>	<~>
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9926	9864	<split-h>	<split-h>
9926	9864	<name2>	<name2>
9926	9867	<aphaerese>	<aphaerese>
9926	9927	<>	<aphaerese>
9926	9864	<elision3>	<elision3>
9926	9927	<>	<elision3>
9926	9864	<elision2>	<elision2>
9926	9927	<>	<elision2>
9926	9864	<elision1>	<elision1>
9926	9927	<>	<elision1>
9926	9882	.	υ
9926	9832	s	υ
9926	9882	.	u
9926	9832	s	u
9926	9900	.	κ
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9926	9819	s	k
9926	9876	s	U
9926	9828	s	K
9926	9882	.	α
9926	9832	s	α
9926	9882	.	a
9926	9832	s	a
9926	9879	s	A
9926	9900	.	λ
9926	9819	s	λ
9926	9819	s	l
9926	9834	s	L
9926	9825	<1m>	<>
9926	9920	<K2L>	<>
9927	9862	.	.
9927	9862	<~>	<~>
9927	9862	<split-s>	<split-s>
9927	9862	<split-h>	<split-h>
9927	9862	<name2>	<name2>
9927	9865	<aphaerese>	<aphaerese>
9927	9928	<>	<aphaerese>
9927	9862	<elision3>	<elision3>
9927	9928	<>	<elision3>
9927	9862	<elision2>	<elision2>
9927	9928	<>	<elision2>
9927	9862	<elision1>	<elision1>
9927	9928	<>	<elision1>
9927	9880	.	υ
9927	9833	s	υ
9927	9880	.	u
9927	9833	s	u
9927	9898	.	κ
9927	9820	s	κ
9927	9820	s	k
9927	9874	s	U
9927	9829	s	K
9927	9880	.	α
9927	9833	s	α
9927	9880	.	a
9927	9833	s	a
9927	9877	s	A
9927	9898	.	λ
9927	9820	s	λ
9927	9820	s	l
9927	9835	s	L
9927	9826	<1m>	<>
9927	9918	<K2L>	<>
9928	9862	.	.
9928	9862	<~>	<~>
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9928	9862	<split-h>	<split-h>
9928	9862	<name2>	<name2>
9928	9926	<>	<name>
9928	9865	<aphaerese>	<aphaerese>
9928	9928	<>	<aphaerese>
9928	9862	<elision3>	<elision3>
9928	9928	<>	<elision3>
9928	9862	<elision2>	<elision2>
9928	9928	<>	<elision2>
9928	9862	<elision1>	<elision1>
9928	9928	<>	<elision1>
9928	9880	.	υ
9928	9833	s	υ
9928	9880	.	u
9928	9833	s	u
9928	9898	.	κ
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9928	9820	s	k
9928	9874	s	U
9928	9829	s	K
9928	9880	.	α
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9928	9880	.	a
9928	9833	s	a
9928	9877	s	A
9928	9898	.	λ
9928	9820	s	λ
9928	9820	s	l
9928	9835	s	L
9928	9827	<1m>	<>
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9929	9925	<name>	<name>
9930	9931	<name>	<name>
9931	9828	s	k
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9931	9843	H	l
9932	9892	.	.
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9932	9898	.	υ
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9932	9844	H	K
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9932	9844	H	l
9932	9835	s	L
9932	9844	H	L
9932	9827	<1m>	<>
9933	9934	<>	<name>
9933	9933	<>	<aphaerese>
9933	9933	<>	<elision3>
9933	9933	<>	<elision2>
9933	9933	<>	<elision1>
9933	9937	<lambda2L>	<>
9934	9935	<>	<aphaerese>
9934	9935	<>	<elision3>
9934	9935	<>	<elision2>
9934	9935	<>	<elision1>
9934	9938	<lambda2L>	<>
9935	9933	<>	<aphaerese>
9935	9933	<>	<elision3>
9935	9933	<>	<elision2>
9935	9933	<>	<elision1>
9935	9936	<lambda2L>	<>
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9936	9892	<~>	<~>
9936	9892	<split-s>	<split-s>
9936	9892	<split-h>	<split-h>
9936	9892	<name2>	<name2>
9936	9895	<aphaerese>	<aphaerese>
9936	9937	<>	<aphaerese>
9936	9892	<elision3>	<elision3>
9936	9937	<>	<elision3>
9936	9892	<elision2>	<elision2>
9936	9937	<>	<elision2>
9936	9892	<elision1>	<elision1>
9936	9937	<>	<elision1>
9936	9898	.	υ
9936	9833	s	υ
9936	9898	.	u
9936	9833	s	u
9936	9898	.	κ
9936	9841	s	κ
9936	9844	H	κ
9936	9841	s	k
9936	9844	H	k
9936	9874	s	U
9936	9829	s	K
9936	9844	H	K
9936	9898	.	α
9936	9833	s	α
9936	9898	.	a
9936	9833	s	a
9936	9877	s	A
9936	9898	.	λ
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9936	9841	s	l
9936	9844	H	l
9936	9835	s	L
9936	9844	H	L
9936	9826	<1m>	<>
9937	9892	.	.
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9937	9892	<split-s>	<split-s>
9937	9892	<split-h>	<split-h>
9937	9892	<name2>	<name2>
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9937	9895	<aphaerese>	<aphaerese>
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9937	9892	<elision3>	<elision3>
9937	9937	<>	<elision3>
9937	9892	<elision2>	<elision2>
9937	9937	<>	<elision2>
9937	9892	<elision1>	<elision1>
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9937	9898	.	υ
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9937	9898	.	u
9937	9833	s	u
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9937	9844	H	k
9937	9874	s	U
9937	9829	s	K
9937	9844	H	K
9937	9898	.	α
9937	9833	s	α
9937	9898	.	a
9937	9833	s	a
9937	9877	s	A
9937	9898	.	λ
9937	9841	s	λ
9937	9844	H	λ
9937	9841	s	l
9937	9844	H	l
9937	9835	s	L
9937	9844	H	L
9937	9827	<1m>	<>
9938	9894	.	.
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9938	9894	<split-s>	<split-s>
9938	9894	<split-h>	<split-h>
9938	9894	<name2>	<name2>
9938	9897	<aphaerese>	<aphaerese>
9938	9936	<>	<aphaerese>
9938	9894	<elision3>	<elision3>
9938	9936	<>	<elision3>
9938	9894	<elision2>	<elision2>
9938	9936	<>	<elision2>
9938	9894	<elision1>	<elision1>
9938	9936	<>	<elision1>
9938	9900	.	υ
9938	9832	s	υ
9938	9900	.	u
9938	9832	s	u
9938	9900	.	κ
9938	9840	s	κ
9938	9843	H	κ
9938	9840	s	k
9938	9843	H	k
9938	9876	s	U
9938	9828	s	K
9938	9843	H	K
9938	9900	.	α
9938	9832	s	α
9938	9900	.	a
9938	9832	s	a
9938	9879	s	A
9938	9900	.	λ
9938	9840	s	λ
9938	9843	H	λ
9938	9840	s	l
9938	9843	H	l
9938	9834	s	L
9938	9843	H	L
9938	9825	<1m>	<>
9939	9940	<>	<name>
9939	9939	<>	<aphaerese>
9939	9939	<>	<elision3>
9939	9939	<>	<elision2>
9939	9939	<>	<elision1>
9939	9937	<l2L>	<>
9940	9941	<>	<aphaerese>
9940	9941	<>	<elision3>
9940	9941	<>	<elision2>
9940	9941	<>	<elision1>
9940	9938	<l2L>	<>
9941	9939	<>	<aphaerese>
9941	9939	<>	<elision3>
9941	9939	<>	<elision2>
9941	9939	<>	<elision1>
9941	9936	<l2L>	<>
9942	9892	.	.
9942	9892	<~>	<~>
9942	9892	<split-s>	<split-s>
9942	9892	<split-h>	<split-h>
9942	9892	<name2>	<name2>
9942	9931	<name2>	<name>
9942	9938	<>	<name>
9942	9895	<aphaerese>	<aphaerese>
9942	9937	<>	<aphaerese>
9942	9892	<elision3>	<elision3>
9942	9937	<>	<elision3>
9942	9892	<elision2>	<elision2>
9942	9937	<>	<elision2>
9942	9892	<elision1>	<elision1>
9942	9937	<>	<elision1>
9942	9898	.	υ
9942	9833	s	υ
9942	9898	.	u
9942	9833	s	u
9942	9898	.	κ
9942	9841	s	κ
9942	9844	H	κ
9942	9841	s	k
9942	9844	H	k
9942	9874	s	U
9942	9829	s	K
9942	9844	H	K
9942	9898	.	α
9942	9833	s	α
9942	9898	.	a
9942	9833	s	a
9942	9877	s	A
9942	9898	.	λ
9942	9841	s	λ
9942	9844	H	λ
9942	9841	s	l
9942	9844	H	l
9942	9835	s	L
9942	9844	H	L
9942	9827	<1m>	<>
9942	9930	<l2L>	<>
9943	9944	<>	<name>
9943	9943	<>	<aphaerese>
9943	9943	<>	<elision3>
9943	9943	<>	<elision2>
9943	9943	<>	<elision1>
9943	9947	<ypsilon2K>	<>
9943	9950	<ypsilon2L>	<>
9944	9945	<>	<aphaerese>
9944	9945	<>	<elision3>
9944	9945	<>	<elision2>
9944	9945	<>	<elision1>
9944	9948	<ypsilon2K>	<>
9944	9951	<ypsilon2L>	<>
9945	9943	<>	<aphaerese>
9945	9943	<>	<elision3>
9945	9943	<>	<elision2>
9945	9943	<>	<elision1>
9945	9946	<ypsilon2K>	<>
9945	9949	<ypsilon2L>	<>
9946	9862	.	.
9946	9862	<~>	<~>
9946	9862	<split-s>	<split-s>
9946	9862	<split-h>	<split-h>
9946	9862	<name2>	<name2>
9946	9865	<aphaerese>	<aphaerese>
9946	9947	<>	<aphaerese>
9946	9947	<>	<elision3>
9946	9947	<>	<elision2>
9946	9947	<>	<elision1>
9946	9880	.	υ
9946	9833	s	υ
9946	9880	.	u
9946	9833	s	u
9946	9868	.	κ
9946	9820	s	κ
9946	9820	s	k
9946	9874	s	U
9946	9829	s	K
9946	9880	.	α
9946	9833	s	α
9946	9880	.	a
9946	9833	s	a
9946	9877	s	A
9946	9820	s	λ
9946	9820	s	l
9946	9835	s	L
9946	9826	<1m>	<>
9947	9862	.	.
9947	9862	<~>	<~>
9947	9862	<split-s>	<split-s>
9947	9862	<split-h>	<split-h>
9947	9862	<name2>	<name2>
9947	9948	<>	<name>
9947	9865	<aphaerese>	<aphaerese>
9947	9947	<>	<aphaerese>
9947	9947	<>	<elision3>
9947	9947	<>	<elision2>
9947	9947	<>	<elision1>
9947	9880	.	υ
9947	9833	s	υ
9947	9880	.	u
9947	9833	s	u
9947	9868	.	κ
9947	9820	s	κ
9947	9820	s	k
9947	9874	s	U
9947	9829	s	K
9947	9880	.	α
9947	9833	s	α
9947	9880	.	a
9947	9833	s	a
9947	9877	s	A
9947	9820	s	λ
9947	9820	s	l
9947	9835	s	L
9947	9827	<1m>	<>
9948	9864	.	.
9948	9864	<~>	<~>
9948	9864	<split-s>	<split-s>
9948	9864	<split-h>	<split-h>
9948	9864	<name2>	<name2>
9948	9867	<aphaerese>	<aphaerese>
9948	9946	<>	<aphaerese>
9948	9946	<>	<elision3>
9948	9946	<>	<elision2>
9948	9946	<>	<elision1>
9948	9882	.	υ
9948	9832	s	υ
9948	9882	.	u
9948	9832	s	u
9948	9870	.	κ
9948	9819	s	κ
9948	9819	s	k
9948	9876	s	U
9948	9828	s	K
9948	9882	.	α
9948	9832	s	α
9948	9882	.	a
9948	9832	s	a
9948	9879	s	A
9948	9819	s	λ
9948	9819	s	l
9948	9834	s	L
9948	9825	<1m>	<>
9949	9892	.	.
9949	9892	<~>	<~>
9949	9892	<split-s>	<split-s>
9949	9892	<split-h>	<split-h>
9949	9892	<name2>	<name2>
9949	9895	<aphaerese>	<aphaerese>
9949	9950	<>	<aphaerese>
9949	9950	<>	<elision3>
9949	9950	<>	<elision2>
9949	9950	<>	<elision1>
9949	9898	.	υ
9949	9833	s	υ
9949	9898	.	u
9949	9833	s	u
9949	9868	.	κ
9949	9841	s	κ
9949	9844	H	κ
9949	9841	s	k
9949	9844	H	k
9949	9874	s	U
9949	9829	s	K
9949	9844	H	K
9949	9898	.	α
9949	9833	s	α
9949	9898	.	a
9949	9833	s	a
9949	9877	s	A
9949	9841	s	λ
9949	9844	H	λ
9949	9841	s	l
9949	9844	H	l
9949	9835	s	L
9949	9844	H	L
9949	9826	<1m>	<>
9950	9892	.	.
9950	9892	<~>	<~>
9950	9892	<split-s>	<split-s>
9950	9892	<split-h>	<split-h>
9950	9892	<name2>	<name2>
9950	9951	<>	<name>
9950	9895	<aphaerese>	<aphaerese>
9950	9950	<>	<aphaerese>
9950	9950	<>	<elision3>
9950	9950	<>	<elision2>
9950	9950	<>	<elision1>
9950	9898	.	υ
9950	9833	s	υ
9950	9898	.	u
9950	9833	s	u
9950	9868	.	κ
9950	9841	s	κ
9950	9844	H	κ
9950	9841	s	k
9950	9844	H	k
9950	9874	s	U
9950	9829	s	K
9950	9844	H	K
9950	9898	.	α
9950	9833	s	α
9950	9898	.	a
9950	9833	s	a
9950	9877	s	A
9950	9841	s	λ
9950	9844	H	λ
9950	9841	s	l
9950	9844	H	l
9950	9835	s	L
9950	9844	H	L
9950	9827	<1m>	<>
9951	9894	.	.
9951	9894	<~>	<~>
9951	9894	<split-s>	<split-s>
9951	9894	<split-h>	<split-h>
9951	9894	<name2>	<name2>
9951	9897	<aphaerese>	<aphaerese>
9951	9949	<>	<aphaerese>
9951	9949	<>	<elision3>
9951	9949	<>	<elision2>
9951	9949	<>	<elision1>
9951	9900	.	υ
9951	9832	s	υ
9951	9900	.	u
9951	9832	s	u
9951	9870	.	κ
9951	9840	s	κ
9951	9843	H	κ
9951	9840	s	k
9951	9843	H	k
9951	9876	s	U
9951	9828	s	K
9951	9843	H	K
9951	9900	.	α
9951	9832	s	α
9951	9900	.	a
9951	9832	s	a
9951	9879	s	A
9951	9840	s	λ
9951	9843	H	λ
9951	9840	s	l
9951	9843	H	l
9951	9834	s	L
9951	9843	H	L
9951	9825	<1m>	<>
9952	9953	<>	<name>
9952	9952	<>	<aphaerese>
9952	9952	<>	<elision3>
9952	9952	<>	<elision2>
9952	9952	<>	<elision1>
9952	9947	<u2K>	<>
9952	9950	<u2L>	<>
9953	9954	<>	<aphaerese>
9953	9954	<>	<elision3>
9953	9954	<>	<elision2>
9953	9954	<>	<elision1>
9953	9948	<u2K>	<>
9953	9951	<u2L>	<>
9954	9952	<>	<aphaerese>
9954	9952	<>	<elision3>
9954	9952	<>	<elision2>
9954	9952	<>	<elision1>
9954	9946	<u2K>	<>
9954	9949	<u2L>	<>
9955	9956	<>	<name>
9955	9955	<>	<aphaerese>
9955	9955	<>	<elision3>
9955	9955	<>	<elision2>
9955	9955	<>	<elision1>
9955	9950	<alpha2L>	<>
9956	9957	<>	<aphaerese>
9956	9957	<>	<elision3>
9956	9957	<>	<elision2>
9956	9957	<>	<elision1>
9956	9951	<alpha2L>	<>
9957	9955	<>	<aphaerese>
9957	9955	<>	<elision3>
9957	9955	<>	<elision2>
9957	9955	<>	<elision1>
9957	9949	<alpha2L>	<>
9958	9959	<>	<name>
9958	9958	<>	<aphaerese>
9958	9958	<>	<elision3>
9958	9958	<>	<elision2>
9958	9958	<>	<elision1>
9958	9950	<a2L>	<>
9959	9960	<>	<aphaerese>
9959	9960	<>	<elision3>
9959	9960	<>	<elision2>
9959	9960	<>	<elision1>
9959	9951	<a2L>	<>
9960	9958	<>	<aphaerese>
9960	9958	<>	<elision3>
9960	9958	<>	<elision2>
9960	9958	<>	<elision1>
9960	9949	<a2L>	<>
9961	9962	.	.
9961	9963	 	 
9961	9962	<~>	<~>
9961	9962	<split-s>	<split-s>
9961	9962	<split-h>	<split-h>
9961	9962	<name2>	<name2>
9961	10538	<>	<name>
9961	9966	<aphaerese>	<aphaerese>
9961	9961	<>	<aphaerese>
9961	9961	<>	<elision3>
9961	9961	<>	<elision2>
9961	9961	<>	<elision1>
9961	9970	.	υ
9961	9976	s	υ
9961	9970	.	u
9961	9976	s	u
9961	10155	.	κ
9961	10226	s	κ
9961	10338	s	k
9961	10347	s	U
9961	10513	s	K
9961	9970	.	α
9961	9976	s	α
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9961	9976	s	a
9961	10468	s	A
9961	10338	s	λ
9961	10338	s	l
9961	10526	s	L
9961	10541	<split-h>	<>
9962	9962	.	.
9962	9963	 	 
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9962	9962	<split-s>	<split-s>
9962	9962	<split-h>	<split-h>
9962	9962	<name2>	<name2>
9962	10537	<>	<name>
9962	9966	<aphaerese>	<aphaerese>
9962	9962	<>	<aphaerese>
9962	9962	<elision3>	<elision3>
9962	9962	<>	<elision3>
9962	9962	<elision2>	<elision2>
9962	9962	<>	<elision2>
9962	9962	<elision1>	<elision1>
9962	9962	<>	<elision1>
9962	9970	.	υ
9962	9976	s	υ
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9962	9976	s	u
9962	10155	.	κ
9962	10226	s	κ
9962	10338	s	k
9962	10347	s	U
9962	10513	s	K
9962	9970	.	α
9962	9976	s	α
9962	9970	.	a
9962	9976	s	a
9962	10468	s	A
9962	10338	s	λ
9962	10338	s	l
9962	10526	s	L
9962	10487	<split-h>	<>
9963	9962	.	.
9963	9963	 	 
9963	9962	<~>	<~>
9963	9962	<split-s>	<split-s>
9963	9962	<split-h>	<split-h>
9963	9962	<name2>	<name2>
9963	9964	<>	<name>
9963	9966	<aphaerese>	<aphaerese>
9963	9969	<>	<aphaerese>
9963	9962	<elision3>	<elision3>
9963	9969	<>	<elision3>
9963	9962	<elision2>	<elision2>
9963	9969	<>	<elision2>
9963	9962	<elision1>	<elision1>
9963	9969	<>	<elision1>
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9963	10490	s	υ
9963	9970	.	u
9963	10490	s	u
9963	10155	.	κ
9963	10493	s	κ
9963	10496	s	k
9963	10499	s	U
9963	10503	s	K
9963	9970	.	α
9963	10490	s	α
9963	9970	.	a
9963	10490	s	a
9963	10507	s	A
9963	10496	s	λ
9963	10496	s	l
9963	10508	s	L
9963	10487	<split-h>	<>
9964	9965	.	.
9964	9968	 	 
9964	9965	<~>	<~>
9964	9965	<split-s>	<split-s>
9964	9965	<split-h>	<split-h>
9964	9965	<name2>	<name2>
9964	10512	<aphaerese>	<aphaerese>
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9964	9965	<elision3>	<elision3>
9964	10536	<>	<elision3>
9964	9965	<elision2>	<elision2>
9964	10536	<>	<elision2>
9964	9965	<elision1>	<elision1>
9964	10536	<>	<elision1>
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9964	10148	s	υ
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9964	10157	.	κ
9964	10228	s	κ
9964	10340	s	k
9964	10349	s	U
9964	10355	s	K
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9964	10148	s	α
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9964	10148	s	a
9964	10470	s	A
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9964	10340	s	l
9964	10473	s	L
9964	10488	<split-h>	<>
9965	9962	.	.
9965	9963	 	 
9965	9962	<~>	<~>
9965	9962	<split-s>	<split-s>
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9965	9966	<aphaerese>	<aphaerese>
9965	9962	<>	<aphaerese>
9965	9962	<elision3>	<elision3>
9965	9962	<>	<elision3>
9965	9962	<elision2>	<elision2>
9965	9962	<>	<elision2>
9965	9962	<elision1>	<elision1>
9965	9962	<>	<elision1>
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9965	9976	s	u
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9965	10338	s	k
9965	10347	s	U
9965	10513	s	K
9965	9970	.	α
9965	9976	s	α
9965	9970	.	a
9965	9976	s	a
9965	10468	s	A
9965	10338	s	λ
9965	10338	s	l
9965	10526	s	L
9965	10489	<split-h>	<>
9966	9962	.	.
9966	9963	 	 
9966	9962	<~>	<~>
9966	9962	<split-s>	<split-s>
9966	9962	<split-h>	<split-h>
9966	9962	<name2>	<name2>
9966	9967	<>	<name>
9966	9966	<aphaerese>	<aphaerese>
9966	9966	<>	<aphaerese>
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9966	9962	<elision2>	<elision2>
9966	9966	<>	<elision2>
9966	9962	<elision1>	<elision1>
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9966	10513	s	K
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9966	10468	s	A
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9966	10338	s	l
9966	10526	s	L
9966	10534	<split-h>	<>
9967	9965	.	.
9967	9968	 	 
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9967	9965	<split-s>	<split-s>
9967	9965	<split-h>	<split-h>
9967	9965	<name2>	<name2>
9967	10512	<aphaerese>	<aphaerese>
9967	10512	<>	<aphaerese>
9967	9965	<elision3>	<elision3>
9967	10512	<>	<elision3>
9967	9965	<elision2>	<elision2>
9967	10512	<>	<elision2>
9967	9965	<elision1>	<elision1>
9967	10512	<>	<elision1>
9967	9965	.	υ
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9967	10515	s	K
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9967	10340	s	l
9967	10528	s	L
9967	10535	<split-h>	<>
9968	9962	.	.
9968	9963	 	 
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9968	9962	<split-s>	<split-s>
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9968	9962	<name2>	<name2>
9968	9966	<aphaerese>	<aphaerese>
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9968	9962	<elision3>	<elision3>
9968	9969	<>	<elision3>
9968	9962	<elision2>	<elision2>
9968	9969	<>	<elision2>
9968	9962	<elision1>	<elision1>
9968	9969	<>	<elision1>
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9968	10490	s	υ
9968	9970	.	u
9968	10490	s	u
9968	10155	.	κ
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9968	10496	s	k
9968	10499	s	U
9968	10503	s	K
9968	9970	.	α
9968	10490	s	α
9968	9970	.	a
9968	10490	s	a
9968	10507	s	A
9968	10496	s	λ
9968	10496	s	l
9968	10508	s	L
9968	10489	<split-h>	<>
9969	9962	.	.
9969	9963	 	 
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9969	9962	<split-h>	<split-h>
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9969	9964	<>	<name>
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9969	9969	<>	<elision3>
9969	9962	<elision2>	<elision2>
9969	9969	<>	<elision2>
9969	9962	<elision1>	<elision1>
9969	9969	<>	<elision1>
9969	9970	.	υ
9969	9976	s	υ
9969	9970	.	u
9969	9976	s	u
9969	10155	.	κ
9969	10226	s	κ
9969	10338	s	k
9969	10347	s	U
9969	10350	s	K
9969	9970	.	α
9969	9976	s	α
9969	9970	.	a
9969	9976	s	a
9969	10468	s	A
9969	10338	s	λ
9969	10338	s	l
9969	10471	s	L
9969	10487	<split-h>	<>
9970	9971	<>	<name>
9970	9970	<>	<aphaerese>
9970	9962	<elision3>	<elision3>
9970	9970	<>	<elision3>
9970	9962	<elision2>	<elision2>
9970	9970	<>	<elision2>
9970	9962	<elision1>	<elision1>
9970	9970	<>	<elision1>
9970	9974	<split-h>	<>
9971	9972	<>	<aphaerese>
9971	9965	<elision3>	<elision3>
9971	9972	<>	<elision3>
9971	9965	<elision2>	<elision2>
9971	9972	<>	<elision2>
9971	9965	<elision1>	<elision1>
9971	9972	<>	<elision1>
9971	9975	<split-h>	<>
9972	9970	<>	<aphaerese>
9972	9962	<elision3>	<elision3>
9972	9970	<>	<elision3>
9972	9962	<elision2>	<elision2>
9972	9970	<>	<elision2>
9972	9962	<elision1>	<elision1>
9972	9970	<>	<elision1>
9972	9973	<split-h>	<>
9973	9974	<>	<aphaerese>
9973	9974	<>	<elision3>
9973	9974	<>	<elision2>
9973	9974	<>	<elision1>
9973	67	<3s>	<>
9974	9975	<>	<name>
9974	9974	<>	<aphaerese>
9974	9974	<>	<elision3>
9974	9974	<>	<elision2>
9974	9974	<>	<elision1>
9974	68	<3s>	<>
9975	9973	<>	<aphaerese>
9975	9973	<>	<elision3>
9975	9973	<>	<elision2>
9975	9973	<>	<elision1>
9975	69	<3s>	<>
9976	9977	.	.
9976	9977	 	 
9976	9977	<~>	<~>
9976	9977	<split-s>	<split-s>
9976	9977	<split-h>	<split-h>
9976	9977	<name2>	<name2>
9976	10147	<>	<name>
9976	9980	<aphaerese>	<aphaerese>
9976	9976	<>	<aphaerese>
9976	9976	<>	<elision3>
9976	9976	<>	<elision2>
9976	9976	<>	<elision1>
9976	10141	.	υ
9976	10141	.	u
9976	9983	.	κ
9976	10141	.	α
9976	10141	.	a
9976	10150	<4s>	<>
9977	9977	.	.
9977	9977	 	 
9977	9977	<~>	<~>
9977	9977	<split-s>	<split-s>
9977	9977	<split-h>	<split-h>
9977	9977	<name2>	<name2>
9977	9978	<>	<name>
9977	9980	<aphaerese>	<aphaerese>
9977	9977	<>	<aphaerese>
9977	9977	<elision3>	<elision3>
9977	9977	<>	<elision3>
9977	9977	<elision2>	<elision2>
9977	9977	<>	<elision2>
9977	9977	<elision1>	<elision1>
9977	9977	<>	<elision1>
9977	10141	.	υ
9977	10141	.	u
9977	9983	.	κ
9977	10141	.	α
9977	10141	.	a
9977	10145	<4s>	<>
9978	9979	.	.
9978	9979	 	 
9978	9979	<~>	<~>
9978	9979	<split-s>	<split-s>
9978	9979	<split-h>	<split-h>
9978	9979	<name2>	<name2>
9978	9982	<aphaerese>	<aphaerese>
9978	9979	<>	<aphaerese>
9978	9979	<elision3>	<elision3>
9978	9979	<>	<elision3>
9978	9979	<elision2>	<elision2>
9978	9979	<>	<elision2>
9978	9979	<elision1>	<elision1>
9978	9979	<>	<elision1>
9978	10143	.	υ
9978	10143	.	u
9978	9985	.	κ
9978	10143	.	α
9978	10143	.	a
9978	10146	<4s>	<>
9979	9977	.	.
9979	9977	 	 
9979	9977	<~>	<~>
9979	9977	<split-s>	<split-s>
9979	9977	<split-h>	<split-h>
9979	9977	<name2>	<name2>
9979	9980	<aphaerese>	<aphaerese>
9979	9977	<>	<aphaerese>
9979	9977	<elision3>	<elision3>
9979	9977	<>	<elision3>
9979	9977	<elision2>	<elision2>
9979	9977	<>	<elision2>
9979	9977	<elision1>	<elision1>
9979	9977	<>	<elision1>
9979	10141	.	υ
9979	10141	.	u
9979	9983	.	κ
9979	10141	.	α
9979	10141	.	a
9979	10144	<4s>	<>
9980	9977	.	.
9980	9977	 	 
9980	9977	<~>	<~>
9980	9977	<split-s>	<split-s>
9980	9977	<split-h>	<split-h>
9980	9977	<name2>	<name2>
9980	9981	<>	<name>
9980	9980	<aphaerese>	<aphaerese>
9980	9980	<>	<aphaerese>
9980	9977	<elision3>	<elision3>
9980	9980	<>	<elision3>
9980	9977	<elision2>	<elision2>
9980	9980	<>	<elision2>
9980	9977	<elision1>	<elision1>
9980	9980	<>	<elision1>
9980	9977	.	υ
9980	9977	.	u
9980	9983	.	κ
9980	9977	.	α
9980	9977	.	a
9980	10132	<4s>	<>
9981	9979	.	.
9981	9979	 	 
9981	9979	<~>	<~>
9981	9979	<split-s>	<split-s>
9981	9979	<split-h>	<split-h>
9981	9979	<name2>	<name2>
9981	9982	<aphaerese>	<aphaerese>
9981	9982	<>	<aphaerese>
9981	9979	<elision3>	<elision3>
9981	9982	<>	<elision3>
9981	9979	<elision2>	<elision2>
9981	9982	<>	<elision2>
9981	9979	<elision1>	<elision1>
9981	9982	<>	<elision1>
9981	9979	.	υ
9981	9979	.	u
9981	9985	.	κ
9981	9979	.	α
9981	9979	.	a
9981	10133	<4s>	<>
9982	9977	.	.
9982	9977	 	 
9982	9977	<~>	<~>
9982	9977	<split-s>	<split-s>
9982	9977	<split-h>	<split-h>
9982	9977	<name2>	<name2>
9982	9980	<aphaerese>	<aphaerese>
9982	9980	<>	<aphaerese>
9982	9977	<elision3>	<elision3>
9982	9980	<>	<elision3>
9982	9977	<elision2>	<elision2>
9982	9980	<>	<elision2>
9982	9977	<elision1>	<elision1>
9982	9980	<>	<elision1>
9982	9977	.	υ
9982	9977	.	u
9982	9983	.	κ
9982	9977	.	α
9982	9977	.	a
9982	10131	<4s>	<>
9983	9984	<>	<name>
9983	9983	<>	<aphaerese>
9983	9986	<elision3>	<elision3>
9983	9983	<>	<elision3>
9983	9986	<elision2>	<elision2>
9983	9983	<>	<elision2>
9983	9986	<elision1>	<elision1>
9983	9983	<>	<elision1>
9983	10129	<4s>	<>
9984	9985	<>	<aphaerese>
9984	9988	<elision3>	<elision3>
9984	9985	<>	<elision3>
9984	9988	<elision2>	<elision2>
9984	9985	<>	<elision2>
9984	9988	<elision1>	<elision1>
9984	9985	<>	<elision1>
9984	10130	<4s>	<>
9985	9983	<>	<aphaerese>
9985	9986	<elision3>	<elision3>
9985	9983	<>	<elision3>
9985	9986	<elision2>	<elision2>
9985	9983	<>	<elision2>
9985	9986	<elision1>	<elision1>
9985	9983	<>	<elision1>
9985	10128	<4s>	<>
9986	9987	<>	<name>
9986	9986	<>	<aphaerese>
9986	9986	<>	<elision3>
9986	9986	<>	<elision2>
9986	9986	<>	<elision1>
9986	9990	<4s>	<>
9987	9988	<>	<aphaerese>
9987	9988	<>	<elision3>
9987	9988	<>	<elision2>
9987	9988	<>	<elision1>
9987	9991	<4s>	<>
9988	9986	<>	<aphaerese>
9988	9986	<>	<elision3>
9988	9986	<>	<elision2>
9988	9986	<>	<elision1>
9988	9989	<4s>	<>
9989	9990	<>	<aphaerese>
9989	9990	<>	<elision3>
9989	9990	<>	<elision2>
9989	9990	<>	<elision1>
9989	84	H	κ
9989	9357	H	k
9989	9361	H	K
9989	9365	H	λ
9989	9993	H	l
9989	10122	H	L
9989	9812	<K>	<>
9990	9991	<>	<name>
9990	9990	<>	<aphaerese>
9990	9990	<>	<elision3>
9990	9990	<>	<elision2>
9990	9990	<>	<elision1>
9990	84	H	κ
9990	9357	H	k
9990	9361	H	K
9990	9365	H	λ
9990	9993	H	l
9990	10122	H	L
9990	9810	<K>	<>
9991	9989	<>	<aphaerese>
9991	9989	<>	<elision3>
9991	9989	<>	<elision2>
9991	9989	<>	<elision1>
9991	9371	H	κ
9991	9375	H	k
9991	9376	H	K
9991	9367	H	λ
9991	9992	H	l
9991	10121	H	L
9991	9811	<K>	<>
9992	9993	<>	<aphaerese>
9992	9993	<>	<elision3>
9992	9993	<>	<elision2>
9992	9993	<>	<elision1>
9992	9996	<~>	<>
9992	9189	<l2L>	<>
9993	9994	<>	<name>
9993	9993	<>	<aphaerese>
9993	9993	<>	<elision3>
9993	9993	<>	<elision2>
9993	9993	<>	<elision1>
9993	9997	<~>	<>
9993	9187	<l2L>	<>
9994	9992	<>	<aphaerese>
9994	9992	<>	<elision3>
9994	9992	<>	<elision2>
9994	9992	<>	<elision1>
9994	9995	<~>	<>
9994	9188	<l2L>	<>
9995	9996	<>	<aphaerese>
9995	9996	<>	<elision3>
9995	9996	<>	<elision2>
9995	9996	<>	<elision1>
9995	10000	h	K
9995	10116	h	L
9996	9997	<>	<aphaerese>
9996	9997	<>	<elision3>
9996	9997	<>	<elision2>
9996	9997	<>	<elision1>
9996	9998	h	K
9996	10113	h	L
9997	9995	<>	<name>
9997	9997	<>	<aphaerese>
9997	9997	<>	<elision3>
9997	9997	<>	<elision2>
9997	9997	<>	<elision1>
9997	9998	h	K
9997	10113	h	L
9998	9999	<>	<name>
9998	9998	<>	<aphaerese>
9998	9998	<>	<elision3>
9998	9998	<>	<elision2>
9998	9998	<>	<elision1>
9998	10001	.	κ
9998	10001	.	λ
9999	10000	<>	<aphaerese>
9999	10000	<>	<elision3>
9999	10000	<>	<elision2>
9999	10000	<>	<elision1>
9999	10003	.	κ
9999	10003	.	λ
10000	9998	<>	<aphaerese>
10000	9998	<>	<elision3>
10000	9998	<>	<elision2>
10000	9998	<>	<elision1>
10000	10001	.	κ
10000	10001	.	λ
10001	10002	<>	<name>
10001	10001	<>	<aphaerese>
10001	10004	<elision3>	<elision3>
10001	10001	<>	<elision3>
10001	10004	<elision2>	<elision2>
10001	10001	<>	<elision2>
10001	10004	<elision1>	<elision1>
10001	10001	<>	<elision1>
10002	10003	<>	<aphaerese>
10002	10007	<elision3>	<elision3>
10002	10003	<>	<elision3>
10002	10007	<elision2>	<elision2>
10002	10003	<>	<elision2>
10002	10007	<elision1>	<elision1>
10002	10003	<>	<elision1>
10003	10001	<>	<aphaerese>
10003	10004	<elision3>	<elision3>
10003	10001	<>	<elision3>
10003	10004	<elision2>	<elision2>
10003	10001	<>	<elision2>
10003	10004	<elision1>	<elision1>
10003	10001	<>	<elision1>
10004	10004	.	.
10004	10005	 	 
10004	10004	<~>	<~>
10004	10004	<split-s>	<split-s>
10004	10004	<split-h>	<split-h>
10004	10004	<name2>	<name2>
10004	10112	<>	<name>
10004	10008	<aphaerese>	<aphaerese>
10004	10004	<>	<aphaerese>
10004	10004	<elision3>	<elision3>
10004	10004	<>	<elision3>
10004	10004	<elision2>	<elision2>
10004	10004	<>	<elision2>
10004	10004	<elision1>	<elision1>
10004	10004	<>	<elision1>
10004	10001	.	υ
10004	10012	s	υ
10004	10001	.	u
10004	10012	s	u
10004	10027	.	κ
10004	10039	s	κ
10004	10045	s	k
10004	10048	s	U
10004	10099	s	K
10004	10001	.	α
10004	10012	s	α
10004	10001	.	a
10004	10012	s	a
10004	10077	s	A
10004	10045	s	λ
10004	10045	s	l
10004	10106	s	L
10005	10004	.	.
10005	10005	 	 
10005	10004	<~>	<~>
10005	10004	<split-s>	<split-s>
10005	10004	<split-h>	<split-h>
10005	10004	<name2>	<name2>
10005	10006	<>	<name>
10005	10008	<aphaerese>	<aphaerese>
10005	10011	<>	<aphaerese>
10005	10004	<elision3>	<elision3>
10005	10011	<>	<elision3>
10005	10004	<elision2>	<elision2>
10005	10011	<>	<elision2>
10005	10004	<elision1>	<elision1>
10005	10011	<>	<elision1>
10005	10001	.	υ
10005	10088	s	υ
10005	10001	.	u
10005	10088	s	u
10005	10027	.	κ
10005	10089	s	κ
10005	10090	s	k
10005	10091	s	U
10005	10093	s	K
10005	10001	.	α
10005	10088	s	α
10005	10001	.	a
10005	10088	s	a
10005	10095	s	A
10005	10090	s	λ
10005	10090	s	l
10005	10096	s	L
10006	10007	.	.
10006	10010	 	 
10006	10007	<~>	<~>
10006	10007	<split-s>	<split-s>
10006	10007	<split-h>	<split-h>
10006	10007	<name2>	<name2>
10006	10098	<aphaerese>	<aphaerese>
10006	10111	<>	<aphaerese>
10006	10007	<elision3>	<elision3>
10006	10111	<>	<elision3>
10006	10007	<elision2>	<elision2>
10006	10111	<>	<elision2>
10006	10007	<elision1>	<elision1>
10006	10111	<>	<elision1>
10006	10003	.	υ
10006	10026	s	υ
10006	10003	.	u
10006	10026	s	u
10006	10029	.	κ
10006	10041	s	κ
10006	10047	s	k
10006	10050	s	U
10006	10053	s	K
10006	10003	.	α
10006	10026	s	α
10006	10003	.	a
10006	10026	s	a
10006	10079	s	A
10006	10047	s	λ
10006	10047	s	l
10006	10082	s	L
10007	10004	.	.
10007	10005	 	 
10007	10004	<~>	<~>
10007	10004	<split-s>	<split-s>
10007	10004	<split-h>	<split-h>
10007	10004	<name2>	<name2>
10007	10008	<aphaerese>	<aphaerese>
10007	10004	<>	<aphaerese>
10007	10004	<elision3>	<elision3>
10007	10004	<>	<elision3>
10007	10004	<elision2>	<elision2>
10007	10004	<>	<elision2>
10007	10004	<elision1>	<elision1>
10007	10004	<>	<elision1>
10007	10001	.	υ
10007	10012	s	υ
10007	10001	.	u
10007	10012	s	u
10007	10027	.	κ
10007	10039	s	κ
10007	10045	s	k
10007	10048	s	U
10007	10099	s	K
10007	10001	.	α
10007	10012	s	α
10007	10001	.	a
10007	10012	s	a
10007	10077	s	A
10007	10045	s	λ
10007	10045	s	l
10007	10106	s	L
10008	10004	.	.
10008	10005	 	 
10008	10004	<~>	<~>
10008	10004	<split-s>	<split-s>
10008	10004	<split-h>	<split-h>
10008	10004	<name2>	<name2>
10008	10009	<>	<name>
10008	10008	<aphaerese>	<aphaerese>
10008	10008	<>	<aphaerese>
10008	10004	<elision3>	<elision3>
10008	10008	<>	<elision3>
10008	10004	<elision2>	<elision2>
10008	10008	<>	<elision2>
10008	10004	<elision1>	<elision1>
10008	10008	<>	<elision1>
10008	10004	.	υ
10008	10004	.	u
10008	10027	.	κ
10008	10039	s	κ
10008	10045	s	k
10008	10048	s	U
10008	10099	s	K
10008	10004	.	α
10008	10004	.	a
10008	10077	s	A
10008	10045	s	λ
10008	10045	s	l
10008	10106	s	L
10009	10007	.	.
10009	10010	 	 
10009	10007	<~>	<~>
10009	10007	<split-s>	<split-s>
10009	10007	<split-h>	<split-h>
10009	10007	<name2>	<name2>
10009	10098	<aphaerese>	<aphaerese>
10009	10098	<>	<aphaerese>
10009	10007	<elision3>	<elision3>
10009	10098	<>	<elision3>
10009	10007	<elision2>	<elision2>
10009	10098	<>	<elision2>
10009	10007	<elision1>	<elision1>
10009	10098	<>	<elision1>
10009	10007	.	υ
10009	10007	.	u
10009	10029	.	κ
10009	10041	s	κ
10009	10047	s	k
10009	10050	s	U
10009	10101	s	K
10009	10007	.	α
10009	10007	.	a
10009	10079	s	A
10009	10047	s	λ
10009	10047	s	l
10009	10108	s	L
10010	10004	.	.
10010	10005	 	 
10010	10004	<~>	<~>
10010	10004	<split-s>	<split-s>
10010	10004	<split-h>	<split-h>
10010	10004	<name2>	<name2>
10010	10008	<aphaerese>	<aphaerese>
10010	10011	<>	<aphaerese>
10010	10004	<elision3>	<elision3>
10010	10011	<>	<elision3>
10010	10004	<elision2>	<elision2>
10010	10011	<>	<elision2>
10010	10004	<elision1>	<elision1>
10010	10011	<>	<elision1>
10010	10001	.	υ
10010	10088	s	υ
10010	10001	.	u
10010	10088	s	u
10010	10027	.	κ
10010	10089	s	κ
10010	10090	s	k
10010	10091	s	U
10010	10093	s	K
10010	10001	.	α
10010	10088	s	α
10010	10001	.	a
10010	10088	s	a
10010	10095	s	A
10010	10090	s	λ
10010	10090	s	l
10010	10096	s	L
10011	10004	.	.
10011	10005	 	 
10011	10004	<~>	<~>
10011	10004	<split-s>	<split-s>
10011	10004	<split-h>	<split-h>
10011	10004	<name2>	<name2>
10011	10006	<>	<name>
10011	10008	<aphaerese>	<aphaerese>
10011	10011	<>	<aphaerese>
10011	10004	<elision3>	<elision3>
10011	10011	<>	<elision3>
10011	10004	<elision2>	<elision2>
10011	10011	<>	<elision2>
10011	10004	<elision1>	<elision1>
10011	10011	<>	<elision1>
10011	10001	.	υ
10011	10012	s	υ
10011	10001	.	u
10011	10012	s	u
10011	10027	.	κ
10011	10039	s	κ
10011	10045	s	k
10011	10048	s	U
10011	10051	s	K
10011	10001	.	α
10011	10012	s	α
10011	10001	.	a
10011	10012	s	a
10011	10077	s	A
10011	10045	s	λ
10011	10045	s	l
10011	10080	s	L
10012	10013	.	.
10012	10013	 	 
10012	10013	<~>	<~>
10012	10013	<split-s>	<split-s>
10012	10013	<split-h>	<split-h>
10012	10013	<name2>	<name2>
10012	10025	<>	<name>
10012	10016	<aphaerese>	<aphaerese>
10012	10012	<>	<aphaerese>
10012	10012	<>	<elision3>
10012	10012	<>	<elision2>
10012	10012	<>	<elision1>
10012	10022	.	υ
10012	10022	.	u
10012	10019	.	κ
10012	10022	.	α
10012	10022	.	a
10012	8509	<3s>	<>
10013	10013	.	.
10013	10013	 	 
10013	10013	<~>	<~>
10013	10013	<split-s>	<split-s>
10013	10013	<split-h>	<split-h>
10013	10013	<name2>	<name2>
10013	10014	<>	<name>
10013	10016	<aphaerese>	<aphaerese>
10013	10013	<>	<aphaerese>
10013	10013	<elision3>	<elision3>
10013	10013	<>	<elision3>
10013	10013	<elision2>	<elision2>
10013	10013	<>	<elision2>
10013	10013	<elision1>	<elision1>
10013	10013	<>	<elision1>
10013	10022	.	υ
10013	10022	.	u
10013	10019	.	κ
10013	10022	.	α
10013	10022	.	a
10013	8504	<3s>	<>
10014	10015	.	.
10014	10015	 	 
10014	10015	<~>	<~>
10014	10015	<split-s>	<split-s>
10014	10015	<split-h>	<split-h>
10014	10015	<name2>	<name2>
10014	10018	<aphaerese>	<aphaerese>
10014	10015	<>	<aphaerese>
10014	10015	<elision3>	<elision3>
10014	10015	<>	<elision3>
10014	10015	<elision2>	<elision2>
10014	10015	<>	<elision2>
10014	10015	<elision1>	<elision1>
10014	10015	<>	<elision1>
10014	10024	.	υ
10014	10024	.	u
10014	10021	.	κ
10014	10024	.	α
10014	10024	.	a
10014	8505	<3s>	<>
10015	10013	.	.
10015	10013	 	 
10015	10013	<~>	<~>
10015	10013	<split-s>	<split-s>
10015	10013	<split-h>	<split-h>
10015	10013	<name2>	<name2>
10015	10016	<aphaerese>	<aphaerese>
10015	10013	<>	<aphaerese>
10015	10013	<elision3>	<elision3>
10015	10013	<>	<elision3>
10015	10013	<elision2>	<elision2>
10015	10013	<>	<elision2>
10015	10013	<elision1>	<elision1>
10015	10013	<>	<elision1>
10015	10022	.	υ
10015	10022	.	u
10015	10019	.	κ
10015	10022	.	α
10015	10022	.	a
10015	8503	<3s>	<>
10016	10013	.	.
10016	10013	 	 
10016	10013	<~>	<~>
10016	10013	<split-s>	<split-s>
10016	10013	<split-h>	<split-h>
10016	10013	<name2>	<name2>
10016	10017	<>	<name>
10016	10016	<aphaerese>	<aphaerese>
10016	10016	<>	<aphaerese>
10016	10013	<elision3>	<elision3>
10016	10016	<>	<elision3>
10016	10013	<elision2>	<elision2>
10016	10016	<>	<elision2>
10016	10013	<elision1>	<elision1>
10016	10016	<>	<elision1>
10016	10013	.	υ
10016	10013	.	u
10016	10019	.	κ
10016	10013	.	α
10016	10013	.	a
10016	8491	<3s>	<>
10017	10015	.	.
10017	10015	 	 
10017	10015	<~>	<~>
10017	10015	<split-s>	<split-s>
10017	10015	<split-h>	<split-h>
10017	10015	<name2>	<name2>
10017	10018	<aphaerese>	<aphaerese>
10017	10018	<>	<aphaerese>
10017	10015	<elision3>	<elision3>
10017	10018	<>	<elision3>
10017	10015	<elision2>	<elision2>
10017	10018	<>	<elision2>
10017	10015	<elision1>	<elision1>
10017	10018	<>	<elision1>
10017	10015	.	υ
10017	10015	.	u
10017	10021	.	κ
10017	10015	.	α
10017	10015	.	a
10017	8492	<3s>	<>
10018	10013	.	.
10018	10013	 	 
10018	10013	<~>	<~>
10018	10013	<split-s>	<split-s>
10018	10013	<split-h>	<split-h>
10018	10013	<name2>	<name2>
10018	10016	<aphaerese>	<aphaerese>
10018	10016	<>	<aphaerese>
10018	10013	<elision3>	<elision3>
10018	10016	<>	<elision3>
10018	10013	<elision2>	<elision2>
10018	10016	<>	<elision2>
10018	10013	<elision1>	<elision1>
10018	10016	<>	<elision1>
10018	10013	.	υ
10018	10013	.	u
10018	10019	.	κ
10018	10013	.	α
10018	10013	.	a
10018	8490	<3s>	<>
10019	10020	<>	<name>
10019	10019	<>	<aphaerese>
10019	8580	<elision3>	<elision3>
10019	10019	<>	<elision3>
10019	8580	<elision2>	<elision2>
10019	10019	<>	<elision2>
10019	8580	<elision1>	<elision1>
10019	10019	<>	<elision1>
10019	8488	<3s>	<>
10020	10021	<>	<aphaerese>
10020	8579	<elision3>	<elision3>
10020	10021	<>	<elision3>
10020	8579	<elision2>	<elision2>
10020	10021	<>	<elision2>
10020	8579	<elision1>	<elision1>
10020	10021	<>	<elision1>
10020	8489	<3s>	<>
10021	10019	<>	<aphaerese>
10021	8580	<elision3>	<elision3>
10021	10019	<>	<elision3>
10021	8580	<elision2>	<elision2>
10021	10019	<>	<elision2>
10021	8580	<elision1>	<elision1>
10021	10019	<>	<elision1>
10021	8487	<3s>	<>
10022	10023	<>	<name>
10022	10022	<>	<aphaerese>
10022	10013	<elision3>	<elision3>
10022	10022	<>	<elision3>
10022	10013	<elision2>	<elision2>
10022	10022	<>	<elision2>
10022	10013	<elision1>	<elision1>
10022	10022	<>	<elision1>
10022	104	<3s>	<>
10023	10024	<>	<aphaerese>
10023	10015	<elision3>	<elision3>
10023	10024	<>	<elision3>
10023	10015	<elision2>	<elision2>
10023	10024	<>	<elision2>
10023	10015	<elision1>	<elision1>
10023	10024	<>	<elision1>
10023	105	<3s>	<>
10024	10022	<>	<aphaerese>
10024	10013	<elision3>	<elision3>
10024	10022	<>	<elision3>
10024	10013	<elision2>	<elision2>
10024	10022	<>	<elision2>
10024	10013	<elision1>	<elision1>
10024	10022	<>	<elision1>
10024	103	<3s>	<>
10025	10015	.	.
10025	10015	 	 
10025	10015	<~>	<~>
10025	10015	<split-s>	<split-s>
10025	10015	<split-h>	<split-h>
10025	10015	<name2>	<name2>
10025	10018	<aphaerese>	<aphaerese>
10025	10026	<>	<aphaerese>
10025	10026	<>	<elision3>
10025	10026	<>	<elision2>
10025	10026	<>	<elision1>
10025	10024	.	υ
10025	10024	.	u
10025	10021	.	κ
10025	10024	.	α
10025	10024	.	a
10025	8510	<3s>	<>
10026	10013	.	.
10026	10013	 	 
10026	10013	<~>	<~>
10026	10013	<split-s>	<split-s>
10026	10013	<split-h>	<split-h>
10026	10013	<name2>	<name2>
10026	10016	<aphaerese>	<aphaerese>
10026	10012	<>	<aphaerese>
10026	10012	<>	<elision3>
10026	10012	<>	<elision2>
10026	10012	<>	<elision1>
10026	10022	.	υ
10026	10022	.	u
10026	10019	.	κ
10026	10022	.	α
10026	10022	.	a
10026	8508	<3s>	<>
10027	10028	<>	<name>
10027	10027	<>	<aphaerese>
10027	10030	<elision3>	<elision3>
10027	10027	<>	<elision3>
10027	10030	<elision2>	<elision2>
10027	10027	<>	<elision2>
10027	10030	<elision1>	<elision1>
10027	10027	<>	<elision1>
10028	10029	<>	<aphaerese>
10028	10032	<elision3>	<elision3>
10028	10029	<>	<elision3>
10028	10032	<elision2>	<elision2>
10028	10029	<>	<elision2>
10028	10032	<elision1>	<elision1>
10028	10029	<>	<elision1>
10029	10027	<>	<aphaerese>
10029	10030	<elision3>	<elision3>
10029	10027	<>	<elision3>
10029	10030	<elision2>	<elision2>
10029	10027	<>	<elision2>
10029	10030	<elision1>	<elision1>
10029	10027	<>	<elision1>
10030	10031	<>	<name>
10030	10030	<>	<aphaerese>
10030	10030	<>	<elision3>
10030	10030	<>	<elision2>
10030	10030	<>	<elision1>
10030	8921	s	κ
10030	8921	s	k
10030	10033	s	K
10030	8921	s	λ
10030	8921	s	l
10030	10036	s	L
10031	10032	<>	<aphaerese>
10031	10032	<>	<elision3>
10031	10032	<>	<elision2>
10031	10032	<>	<elision1>
10031	8920	s	κ
10031	8920	s	k
10031	10035	s	K
10031	8920	s	λ
10031	8920	s	l
10031	10038	s	L
10032	10030	<>	<aphaerese>
10032	10030	<>	<elision3>
10032	10030	<>	<elision2>
10032	10030	<>	<elision1>
10032	8921	s	κ
10032	8921	s	k
10032	10033	s	K
10032	8921	s	λ
10032	8921	s	l
10032	10036	s	L
10033	10034	<>	<name>
10033	10033	<>	<aphaerese>
10033	10033	<>	<elision3>
10033	10033	<>	<elision2>
10033	10033	<>	<elision1>
10033	8921	<K2kl>	<>
10034	10035	<>	<aphaerese>
10034	10035	<>	<elision3>
10034	10035	<>	<elision2>
10034	10035	<>	<elision1>
10034	8922	<K2kl>	<>
10035	10033	<>	<aphaerese>
10035	10033	<>	<elision3>
10035	10033	<>	<elision2>
10035	10033	<>	<elision1>
10035	8920	<K2kl>	<>
10036	10037	<>	<name>
10036	10036	<>	<aphaerese>
10036	10036	<>	<elision3>
10036	10036	<>	<elision2>
10036	10036	<>	<elision1>
10036	8921	<L2kl>	<>
10037	10038	<>	<aphaerese>
10037	10038	<>	<elision3>
10037	10038	<>	<elision2>
10037	10038	<>	<elision1>
10037	8922	<L2kl>	<>
10038	10036	<>	<aphaerese>
10038	10036	<>	<elision3>
10038	10036	<>	<elision2>
10038	10036	<>	<elision1>
10038	8920	<L2kl>	<>
10039	10013	.	.
10039	10013	 	 
10039	10013	<~>	<~>
10039	10013	<split-s>	<split-s>
10039	10013	<split-h>	<split-h>
10039	10013	<name2>	<name2>
10039	10040	<>	<name>
10039	10016	<aphaerese>	<aphaerese>
10039	10039	<>	<aphaerese>
10039	10042	<elision3>	<elision3>
10039	10039	<>	<elision3>
10039	10042	<elision2>	<elision2>
10039	10039	<>	<elision2>
10039	10042	<elision1>	<elision1>
10039	10039	<>	<elision1>
10039	10022	.	υ
10039	10022	.	u
10039	10022	.	κ
10039	10022	.	α
10039	10022	.	a
10039	10022	.	λ
10039	8689	<3s>	<>
10040	10015	.	.
10040	10015	 	 
10040	10015	<~>	<~>
10040	10015	<split-s>	<split-s>
10040	10015	<split-h>	<split-h>
10040	10015	<name2>	<name2>
10040	10018	<aphaerese>	<aphaerese>
10040	10041	<>	<aphaerese>
10040	10044	<elision3>	<elision3>
10040	10041	<>	<elision3>
10040	10044	<elision2>	<elision2>
10040	10041	<>	<elision2>
10040	10044	<elision1>	<elision1>
10040	10041	<>	<elision1>
10040	10024	.	υ
10040	10024	.	u
10040	10024	.	κ
10040	10024	.	α
10040	10024	.	a
10040	10024	.	λ
10040	8690	<3s>	<>
10041	10013	.	.
10041	10013	 	 
10041	10013	<~>	<~>
10041	10013	<split-s>	<split-s>
10041	10013	<split-h>	<split-h>
10041	10013	<name2>	<name2>
10041	10016	<aphaerese>	<aphaerese>
10041	10039	<>	<aphaerese>
10041	10042	<elision3>	<elision3>
10041	10039	<>	<elision3>
10041	10042	<elision2>	<elision2>
10041	10039	<>	<elision2>
10041	10042	<elision1>	<elision1>
10041	10039	<>	<elision1>
10041	10022	.	υ
10041	10022	.	u
10041	10022	.	κ
10041	10022	.	α
10041	10022	.	a
10041	10022	.	λ
10041	8688	<3s>	<>
10042	10013	.	.
10042	10013	 	 
10042	10013	<~>	<~>
10042	10013	<split-s>	<split-s>
10042	10013	<split-h>	<split-h>
10042	10013	<name2>	<name2>
10042	10043	<>	<name>
10042	10016	<aphaerese>	<aphaerese>
10042	10042	<>	<aphaerese>
10042	10013	<elision3>	<elision3>
10042	10042	<>	<elision3>
10042	10013	<elision2>	<elision2>
10042	10042	<>	<elision2>
10042	10013	<elision1>	<elision1>
10042	10042	<>	<elision1>
10042	10022	.	υ
10042	10022	.	u
10042	10019	.	κ
10042	10022	.	α
10042	10022	.	a
10042	8592	<3s>	<>
10043	10015	.	.
10043	10015	 	 
10043	10015	<~>	<~>
10043	10015	<split-s>	<split-s>
10043	10015	<split-h>	<split-h>
10043	10015	<name2>	<name2>
10043	10018	<aphaerese>	<aphaerese>
10043	10044	<>	<aphaerese>
10043	10015	<elision3>	<elision3>
10043	10044	<>	<elision3>
10043	10015	<elision2>	<elision2>
10043	10044	<>	<elision2>
10043	10015	<elision1>	<elision1>
10043	10044	<>	<elision1>
10043	10024	.	υ
10043	10024	.	u
10043	10021	.	κ
10043	10024	.	α
10043	10024	.	a
10043	8593	<3s>	<>
10044	10013	.	.
10044	10013	 	 
10044	10013	<~>	<~>
10044	10013	<split-s>	<split-s>
10044	10013	<split-h>	<split-h>
10044	10013	<name2>	<name2>
10044	10016	<aphaerese>	<aphaerese>
10044	10042	<>	<aphaerese>
10044	10013	<elision3>	<elision3>
10044	10042	<>	<elision3>
10044	10013	<elision2>	<elision2>
10044	10042	<>	<elision2>
10044	10013	<elision1>	<elision1>
10044	10042	<>	<elision1>
10044	10022	.	υ
10044	10022	.	u
10044	10019	.	κ
10044	10022	.	α
10044	10022	.	a
10044	8591	<3s>	<>
10045	10013	.	.
10045	10013	 	 
10045	10013	<~>	<~>
10045	10013	<split-s>	<split-s>
10045	10013	<split-h>	<split-h>
10045	10013	<name2>	<name2>
10045	10046	<>	<name>
10045	10016	<aphaerese>	<aphaerese>
10045	10045	<>	<aphaerese>
10045	10013	<elision3>	<elision3>
10045	10045	<>	<elision3>
10045	10013	<elision2>	<elision2>
10045	10045	<>	<elision2>
10045	10013	<elision1>	<elision1>
10045	10045	<>	<elision1>
10045	10022	.	υ
10045	10022	.	u
10045	10022	.	κ
10045	10022	.	α
10045	10022	.	a
10045	10022	.	λ
10045	8701	<3s>	<>
10046	10015	.	.
10046	10015	 	 
10046	10015	<~>	<~>
10046	10015	<split-s>	<split-s>
10046	10015	<split-h>	<split-h>
10046	10015	<name2>	<name2>
10046	10018	<aphaerese>	<aphaerese>
10046	10047	<>	<aphaerese>
10046	10015	<elision3>	<elision3>
10046	10047	<>	<elision3>
10046	10015	<elision2>	<elision2>
10046	10047	<>	<elision2>
10046	10015	<elision1>	<elision1>
10046	10047	<>	<elision1>
10046	10024	.	υ
10046	10024	.	u
10046	10024	.	κ
10046	10024	.	α
10046	10024	.	a
10046	10024	.	λ
10046	8702	<3s>	<>
10047	10013	.	.
10047	10013	 	 
10047	10013	<~>	<~>
10047	10013	<split-s>	<split-s>
10047	10013	<split-h>	<split-h>
10047	10013	<name2>	<name2>
10047	10016	<aphaerese>	<aphaerese>
10047	10045	<>	<aphaerese>
10047	10013	<elision3>	<elision3>
10047	10045	<>	<elision3>
10047	10013	<elision2>	<elision2>
10047	10045	<>	<elision2>
10047	10013	<elision1>	<elision1>
10047	10045	<>	<elision1>
10047	10022	.	υ
10047	10022	.	u
10047	10022	.	κ
10047	10022	.	α
10047	10022	.	a
10047	10022	.	λ
10047	8700	<3s>	<>
10048	10049	<>	<name>
10048	10048	<>	<aphaerese>
10048	10048	<>	<elision3>
10048	10048	<>	<elision2>
10048	10048	<>	<elision1>
10048	10013	<U2kl>	<>
10049	10050	<>	<aphaerese>
10049	10050	<>	<elision3>
10049	10050	<>	<elision2>
10049	10050	<>	<elision1>
10049	10014	<U2kl>	<>
10050	10048	<>	<aphaerese>
10050	10048	<>	<elision3>
10050	10048	<>	<elision2>
10050	10048	<>	<elision1>
10050	10015	<U2kl>	<>
10051	9011	<name>	<name>
10051	10052	<>	<name>
10051	10054	<>	<aphaerese>
10051	10054	<>	<elision3>
10051	10054	<>	<elision2>
10051	10054	<>	<elision1>
10051	8821	<3s>	<>
10051	10055	<A2kl>	<>
10051	10064	<L2kl>	<>
10051	10076	<K2kl>	<>
10052	10053	<>	<aphaerese>
10052	10053	<>	<elision3>
10052	10053	<>	<elision2>
10052	10053	<>	<elision1>
10052	10056	<A2kl>	<>
10052	10065	<L2kl>	<>
10052	10074	<K2kl>	<>
10053	10054	<>	<aphaerese>
10053	10054	<>	<elision3>
10053	10054	<>	<elision2>
10053	10054	<>	<elision1>
10053	10057	<A2kl>	<>
10053	10066	<L2kl>	<>
10053	10075	<K2kl>	<>
10054	10052	<>	<name>
10054	10054	<>	<aphaerese>
10054	10054	<>	<elision3>
10054	10054	<>	<elision2>
10054	10054	<>	<elision1>
10054	10055	<A2kl>	<>
10054	10064	<L2kl>	<>
10054	10073	<K2kl>	<>
10055	10056	<>	<name>
10055	10055	<>	<aphaerese>
10055	10055	<>	<elision3>
10055	10055	<>	<elision2>
10055	10055	<>	<elision1>
10055	10058	.	κ
10055	10058	.	λ
10055	8771	<3s>	<>
10056	10057	<>	<aphaerese>
10056	10057	<>	<elision3>
10056	10057	<>	<elision2>
10056	10057	<>	<elision1>
10056	10060	.	κ
10056	10060	.	λ
10056	8772	<3s>	<>
10057	10055	<>	<aphaerese>
10057	10055	<>	<elision3>
10057	10055	<>	<elision2>
10057	10055	<>	<elision1>
10057	10058	.	κ
10057	10058	.	λ
10057	8770	<3s>	<>
10058	10059	<>	<name>
10058	10058	<>	<aphaerese>
10058	10061	<elision3>	<elision3>
10058	10058	<>	<elision3>
10058	10061	<elision2>	<elision2>
10058	10058	<>	<elision2>
10058	10061	<elision1>	<elision1>
10058	10058	<>	<elision1>
10058	8762	<3s>	<>
10059	10060	<>	<aphaerese>
10059	10063	<elision3>	<elision3>
10059	10060	<>	<elision3>
10059	10063	<elision2>	<elision2>
10059	10060	<>	<elision2>
10059	10063	<elision1>	<elision1>
10059	10060	<>	<elision1>
10059	8763	<3s>	<>
10060	10058	<>	<aphaerese>
10060	10061	<elision3>	<elision3>
10060	10058	<>	<elision3>
10060	10061	<elision2>	<elision2>
10060	10058	<>	<elision2>
10060	10061	<elision1>	<elision1>
10060	10058	<>	<elision1>
10060	8761	<3s>	<>
10061	10013	.	.
10061	10013	 	 
10061	10013	<~>	<~>
10061	10013	<split-s>	<split-s>
10061	10013	<split-h>	<split-h>
10061	10013	<name2>	<name2>
10061	10062	<>	<name>
10061	10016	<aphaerese>	<aphaerese>
10061	10061	<>	<aphaerese>
10061	10013	<elision3>	<elision3>
10061	10061	<>	<elision3>
10061	10013	<elision2>	<elision2>
10061	10061	<>	<elision2>
10061	10013	<elision1>	<elision1>
10061	10061	<>	<elision1>
10061	10022	.	υ
10061	10022	.	u
10061	10022	.	α
10061	10022	.	a
10061	8726	<3s>	<>
10062	10015	.	.
10062	10015	 	 
10062	10015	<~>	<~>
10062	10015	<split-s>	<split-s>
10062	10015	<split-h>	<split-h>
10062	10015	<name2>	<name2>
10062	10018	<aphaerese>	<aphaerese>
10062	10063	<>	<aphaerese>
10062	10015	<elision3>	<elision3>
10062	10063	<>	<elision3>
10062	10015	<elision2>	<elision2>
10062	10063	<>	<elision2>
10062	10015	<elision1>	<elision1>
10062	10063	<>	<elision1>
10062	10024	.	υ
10062	10024	.	u
10062	10024	.	α
10062	10024	.	a
10062	8727	<3s>	<>
10063	10013	.	.
10063	10013	 	 
10063	10013	<~>	<~>
10063	10013	<split-s>	<split-s>
10063	10013	<split-h>	<split-h>
10063	10013	<name2>	<name2>
10063	10016	<aphaerese>	<aphaerese>
10063	10061	<>	<aphaerese>
10063	10013	<elision3>	<elision3>
10063	10061	<>	<elision3>
10063	10013	<elision2>	<elision2>
10063	10061	<>	<elision2>
10063	10013	<elision1>	<elision1>
10063	10061	<>	<elision1>
10063	10022	.	υ
10063	10022	.	u
10063	10022	.	α
10063	10022	.	a
10063	8725	<3s>	<>
10064	10065	<>	<name>
10064	10064	<>	<aphaerese>
10064	10064	<>	<elision3>
10064	10064	<>	<elision2>
10064	10064	<>	<elision1>
10064	10067	.	κ
10064	10067	.	λ
10064	8804	<3s>	<>
10065	10066	<>	<aphaerese>
10065	10066	<>	<elision3>
10065	10066	<>	<elision2>
10065	10066	<>	<elision1>
10065	10069	.	κ
10065	10069	.	λ
10065	8805	<3s>	<>
10066	10064	<>	<aphaerese>
10066	10064	<>	<elision3>
10066	10064	<>	<elision2>
10066	10064	<>	<elision1>
10066	10067	.	κ
10066	10067	.	λ
10066	8803	<3s>	<>
10067	10068	<>	<name>
10067	10067	<>	<aphaerese>
10067	10070	<elision3>	<elision3>
10067	10067	<>	<elision3>
10067	10070	<elision2>	<elision2>
10067	10067	<>	<elision2>
10067	10070	<elision1>	<elision1>
10067	10067	<>	<elision1>
10067	8795	<3s>	<>
10068	10069	<>	<aphaerese>
10068	10072	<elision3>	<elision3>
10068	10069	<>	<elision3>
10068	10072	<elision2>	<elision2>
10068	10069	<>	<elision2>
10068	10072	<elision1>	<elision1>
10068	10069	<>	<elision1>
10068	8796	<3s>	<>
10069	10067	<>	<aphaerese>
10069	10070	<elision3>	<elision3>
10069	10067	<>	<elision3>
10069	10070	<elision2>	<elision2>
10069	10067	<>	<elision2>
10069	10070	<elision1>	<elision1>
10069	10067	<>	<elision1>
10069	8794	<3s>	<>
10070	10071	<>	<name>
10070	10070	<>	<aphaerese>
10070	10070	<>	<elision3>
10070	10070	<>	<elision2>
10070	10070	<>	<elision1>
10070	10019	.	κ
10070	8789	<3s>	<>
10071	10072	<>	<aphaerese>
10071	10072	<>	<elision3>
10071	10072	<>	<elision2>
10071	10072	<>	<elision1>
10071	10021	.	κ
10071	8790	<3s>	<>
10072	10070	<>	<aphaerese>
10072	10070	<>	<elision3>
10072	10070	<>	<elision2>
10072	10070	<>	<elision1>
10072	10019	.	κ
10072	8788	<3s>	<>
10073	10013	.	.
10073	10013	 	 
10073	10013	<~>	<~>
10073	10013	<split-s>	<split-s>
10073	10013	<split-h>	<split-h>
10073	10013	<name2>	<name2>
10073	10074	<>	<name>
10073	10016	<aphaerese>	<aphaerese>
10073	10073	<>	<aphaerese>
10073	10013	<elision3>	<elision3>
10073	10073	<>	<elision3>
10073	10013	<elision2>	<elision2>
10073	10073	<>	<elision2>
10073	10013	<elision1>	<elision1>
10073	10073	<>	<elision1>
10073	10022	.	υ
10073	10022	.	u
10073	10022	.	α
10073	10022	.	a
10073	8816	<3s>	<>
10074	10015	.	.
10074	10015	 	 
10074	10015	<~>	<~>
10074	10015	<split-s>	<split-s>
10074	10015	<split-h>	<split-h>
10074	10015	<name2>	<name2>
10074	10018	<aphaerese>	<aphaerese>
10074	10075	<>	<aphaerese>
10074	10015	<elision3>	<elision3>
10074	10075	<>	<elision3>
10074	10015	<elision2>	<elision2>
10074	10075	<>	<elision2>
10074	10015	<elision1>	<elision1>
10074	10075	<>	<elision1>
10074	10024	.	υ
10074	10024	.	u
10074	10024	.	α
10074	10024	.	a
10074	8817	<3s>	<>
10075	10013	.	.
10075	10013	 	 
10075	10013	<~>	<~>
10075	10013	<split-s>	<split-s>
10075	10013	<split-h>	<split-h>
10075	10013	<name2>	<name2>
10075	10016	<aphaerese>	<aphaerese>
10075	10073	<>	<aphaerese>
10075	10013	<elision3>	<elision3>
10075	10073	<>	<elision3>
10075	10013	<elision2>	<elision2>
10075	10073	<>	<elision2>
10075	10013	<elision1>	<elision1>
10075	10073	<>	<elision1>
10075	10022	.	υ
10075	10022	.	u
10075	10022	.	α
10075	10022	.	a
10075	8815	<3s>	<>
10076	10013	.	.
10076	10013	 	 
10076	10013	<~>	<~>
10076	10013	<split-s>	<split-s>
10076	10013	<split-h>	<split-h>
10076	10013	<name2>	<name2>
10076	9011	<name2>	<name>
10076	10074	<>	<name>
10076	10016	<aphaerese>	<aphaerese>
10076	10073	<>	<aphaerese>
10076	10013	<elision3>	<elision3>
10076	10073	<>	<elision3>
10076	10013	<elision2>	<elision2>
10076	10073	<>	<elision2>
10076	10013	<elision1>	<elision1>
10076	10073	<>	<elision1>
10076	10022	.	υ
10076	10022	.	u
10076	10022	.	α
10076	10022	.	a
10076	8825	<3s>	<>
10077	10078	<>	<name>
10077	10077	<>	<aphaerese>
10077	10077	<>	<elision3>
10077	10077	<>	<elision2>
10077	10077	<>	<elision1>
10077	10013	<A2kl>	<>
10078	10079	<>	<aphaerese>
10078	10079	<>	<elision3>
10078	10079	<>	<elision2>
10078	10079	<>	<elision1>
10078	10014	<A2kl>	<>
10079	10077	<>	<aphaerese>
10079	10077	<>	<elision3>
10079	10077	<>	<elision2>
10079	10077	<>	<elision1>
10079	10015	<A2kl>	<>
10080	9011	<name>	<name>
10080	10081	<>	<name>
10080	10083	<>	<aphaerese>
10080	10083	<>	<elision3>
10080	10083	<>	<elision2>
10080	10083	<>	<elision1>
10080	8821	<3s>	<>
10080	10055	<A2kl>	<>
10080	10087	<L2kl>	<>
10081	10082	<>	<aphaerese>
10081	10082	<>	<elision3>
10081	10082	<>	<elision2>
10081	10082	<>	<elision1>
10081	10056	<A2kl>	<>
10081	10085	<L2kl>	<>
10082	10083	<>	<aphaerese>
10082	10083	<>	<elision3>
10082	10083	<>	<elision2>
10082	10083	<>	<elision1>
10082	10057	<A2kl>	<>
10082	10086	<L2kl>	<>
10083	10081	<>	<name>
10083	10083	<>	<aphaerese>
10083	10083	<>	<elision3>
10083	10083	<>	<elision2>
10083	10083	<>	<elision1>
10083	10055	<A2kl>	<>
10083	10084	<L2kl>	<>
10084	10013	.	.
10084	10013	 	 
10084	10013	<~>	<~>
10084	10013	<split-s>	<split-s>
10084	10013	<split-h>	<split-h>
10084	10013	<name2>	<name2>
10084	10085	<>	<name>
10084	10016	<aphaerese>	<aphaerese>
10084	10084	<>	<aphaerese>
10084	10013	<elision3>	<elision3>
10084	10084	<>	<elision3>
10084	10013	<elision2>	<elision2>
10084	10084	<>	<elision2>
10084	10013	<elision1>	<elision1>
10084	10084	<>	<elision1>
10084	10022	.	υ
10084	10022	.	u
10084	10067	.	κ
10084	10022	.	α
10084	10022	.	a
10084	10067	.	λ
10084	8838	<3s>	<>
10085	10015	.	.
10085	10015	 	 
10085	10015	<~>	<~>
10085	10015	<split-s>	<split-s>
10085	10015	<split-h>	<split-h>
10085	10015	<name2>	<name2>
10085	10018	<aphaerese>	<aphaerese>
10085	10086	<>	<aphaerese>
10085	10015	<elision3>	<elision3>
10085	10086	<>	<elision3>
10085	10015	<elision2>	<elision2>
10085	10086	<>	<elision2>
10085	10015	<elision1>	<elision1>
10085	10086	<>	<elision1>
10085	10024	.	υ
10085	10024	.	u
10085	10069	.	κ
10085	10024	.	α
10085	10024	.	a
10085	10069	.	λ
10085	8839	<3s>	<>
10086	10013	.	.
10086	10013	 	 
10086	10013	<~>	<~>
10086	10013	<split-s>	<split-s>
10086	10013	<split-h>	<split-h>
10086	10013	<name2>	<name2>
10086	10016	<aphaerese>	<aphaerese>
10086	10084	<>	<aphaerese>
10086	10013	<elision3>	<elision3>
10086	10084	<>	<elision3>
10086	10013	<elision2>	<elision2>
10086	10084	<>	<elision2>
10086	10013	<elision1>	<elision1>
10086	10084	<>	<elision1>
10086	10022	.	υ
10086	10022	.	u
10086	10067	.	κ
10086	10022	.	α
10086	10022	.	a
10086	10067	.	λ
10086	8837	<3s>	<>
10087	10013	.	.
10087	10013	 	 
10087	10013	<~>	<~>
10087	10013	<split-s>	<split-s>
10087	10013	<split-h>	<split-h>
10087	10013	<name2>	<name2>
10087	9011	<name2>	<name>
10087	10085	<>	<name>
10087	10016	<aphaerese>	<aphaerese>
10087	10084	<>	<aphaerese>
10087	10013	<elision3>	<elision3>
10087	10084	<>	<elision3>
10087	10013	<elision2>	<elision2>
10087	10084	<>	<elision2>
10087	10013	<elision1>	<elision1>
10087	10084	<>	<elision1>
10087	10022	.	υ
10087	10022	.	u
10087	10067	.	κ
10087	10022	.	α
10087	10022	.	a
10087	10067	.	λ
10087	8844	<3s>	<>
10088	10013	.	.
10088	10013	 	 
10088	10013	<~>	<~>
10088	10013	<split-s>	<split-s>
10088	10013	<split-h>	<split-h>
10088	10013	<name2>	<name2>
10088	10025	<>	<name>
10088	10016	<aphaerese>	<aphaerese>
10088	10012	<>	<aphaerese>
10088	10012	<>	<elision3>
10088	10012	<>	<elision2>
10088	10012	<>	<elision1>
10088	10022	.	υ
10088	10022	.	u
10088	10019	.	κ
10088	10022	.	α
10088	10022	.	a
10088	8850	<3s>	<>
10089	10013	.	.
10089	10013	 	 
10089	10013	<~>	<~>
10089	10013	<split-s>	<split-s>
10089	10013	<split-h>	<split-h>
10089	10013	<name2>	<name2>
10089	10040	<>	<name>
10089	10016	<aphaerese>	<aphaerese>
10089	10039	<>	<aphaerese>
10089	10042	<elision3>	<elision3>
10089	10039	<>	<elision3>
10089	10042	<elision2>	<elision2>
10089	10039	<>	<elision2>
10089	10042	<elision1>	<elision1>
10089	10039	<>	<elision1>
10089	10022	.	υ
10089	10022	.	u
10089	10022	.	κ
10089	10022	.	α
10089	10022	.	a
10089	10022	.	λ
10089	8853	<3s>	<>
10090	10013	.	.
10090	10013	 	 
10090	10013	<~>	<~>
10090	10013	<split-s>	<split-s>
10090	10013	<split-h>	<split-h>
10090	10013	<name2>	<name2>
10090	10046	<>	<name>
10090	10016	<aphaerese>	<aphaerese>
10090	10045	<>	<aphaerese>
10090	10013	<elision3>	<elision3>
10090	10045	<>	<elision3>
10090	10013	<elision2>	<elision2>
10090	10045	<>	<elision2>
10090	10013	<elision1>	<elision1>
10090	10045	<>	<elision1>
10090	10022	.	υ
10090	10022	.	u
10090	10022	.	κ
10090	10022	.	α
10090	10022	.	a
10090	10022	.	λ
10090	8856	<3s>	<>
10091	10049	<>	<name>
10091	10048	<>	<aphaerese>
10091	10048	<>	<elision3>
10091	10048	<>	<elision2>
10091	10048	<>	<elision1>
10091	10092	<U2kl>	<>
10092	10013	.	.
10092	10013	 	 
10092	10013	<~>	<~>
10092	10013	<split-s>	<split-s>
10092	10013	<split-h>	<split-h>
10092	10013	<name2>	<name2>
10092	10014	<>	<name>
10092	10016	<aphaerese>	<aphaerese>
10092	10013	<>	<aphaerese>
10092	10013	<elision3>	<elision3>
10092	10013	<>	<elision3>
10092	10013	<elision2>	<elision2>
10092	10013	<>	<elision2>
10092	10013	<elision1>	<elision1>
10092	10013	<>	<elision1>
10092	10022	.	υ
10092	10022	.	u
10092	10019	.	κ
10092	10022	.	α
10092	10022	.	a
10092	8860	<3s>	<>
10093	9011	<name>	<name>
10093	10052	<>	<name>
10093	10054	<>	<aphaerese>
10093	10054	<>	<elision3>
10093	10054	<>	<elision2>
10093	10054	<>	<elision1>
10093	8821	<3s>	<>
10093	10055	<A2kl>	<>
10093	10064	<L2kl>	<>
10093	10094	<K2kl>	<>
10094	10013	.	.
10094	10013	 	 
10094	10013	<~>	<~>
10094	10013	<split-s>	<split-s>
10094	10013	<split-h>	<split-h>
10094	10013	<name2>	<name2>
10094	9011	<name2>	<name>
10094	10074	<>	<name>
10094	10016	<aphaerese>	<aphaerese>
10094	10073	<>	<aphaerese>
10094	10013	<elision3>	<elision3>
10094	10073	<>	<elision3>
10094	10013	<elision2>	<elision2>
10094	10073	<>	<elision2>
10094	10013	<elision1>	<elision1>
10094	10073	<>	<elision1>
10094	10022	.	υ
10094	10022	.	u
10094	10022	.	α
10094	10022	.	a
10094	8864	<3s>	<>
10095	10078	<>	<name>
10095	10077	<>	<aphaerese>
10095	10077	<>	<elision3>
10095	10077	<>	<elision2>
10095	10077	<>	<elision1>
10095	10092	<A2kl>	<>
10096	9011	<name>	<name>
10096	10081	<>	<name>
10096	10083	<>	<aphaerese>
10096	10083	<>	<elision3>
10096	10083	<>	<elision2>
10096	10083	<>	<elision1>
10096	8821	<3s>	<>
10096	10055	<A2kl>	<>
10096	10097	<L2kl>	<>
10097	10013	.	.
10097	10013	 	 
10097	10013	<~>	<~>
10097	10013	<split-s>	<split-s>
10097	10013	<split-h>	<split-h>
10097	10013	<name2>	<name2>
10097	9011	<name2>	<name>
10097	10085	<>	<name>
10097	10016	<aphaerese>	<aphaerese>
10097	10084	<>	<aphaerese>
10097	10013	<elision3>	<elision3>
10097	10084	<>	<elision3>
10097	10013	<elision2>	<elision2>
10097	10084	<>	<elision2>
10097	10013	<elision1>	<elision1>
10097	10084	<>	<elision1>
10097	10022	.	υ
10097	10022	.	u
10097	10067	.	κ
10097	10022	.	α
10097	10022	.	a
10097	10067	.	λ
10097	8869	<3s>	<>
10098	10004	.	.
10098	10005	 	 
10098	10004	<~>	<~>
10098	10004	<split-s>	<split-s>
10098	10004	<split-h>	<split-h>
10098	10004	<name2>	<name2>
10098	10008	<aphaerese>	<aphaerese>
10098	10008	<>	<aphaerese>
10098	10004	<elision3>	<elision3>
10098	10008	<>	<elision3>
10098	10004	<elision2>	<elision2>
10098	10008	<>	<elision2>
10098	10004	<elision1>	<elision1>
10098	10008	<>	<elision1>
10098	10004	.	υ
10098	10004	.	u
10098	10027	.	κ
10098	10039	s	κ
10098	10045	s	k
10098	10048	s	U
10098	10099	s	K
10098	10004	.	α
10098	10004	.	a
10098	10077	s	A
10098	10045	s	λ
10098	10045	s	l
10098	10106	s	L
10099	9011	<name>	<name>
10099	10100	<>	<name>
10099	10102	<>	<aphaerese>
10099	10102	<>	<elision3>
10099	10102	<>	<elision2>
10099	10102	<>	<elision1>
10099	8821	<3s>	<>
10099	10103	<L2kl>	<>
10099	10076	<K2kl>	<>
10100	10101	<>	<aphaerese>
10100	10101	<>	<elision3>
10100	10101	<>	<elision2>
10100	10101	<>	<elision1>
10100	10104	<L2kl>	<>
10100	10074	<K2kl>	<>
10101	10102	<>	<aphaerese>
10101	10102	<>	<elision3>
10101	10102	<>	<elision2>
10101	10102	<>	<elision1>
10101	10105	<L2kl>	<>
10101	10075	<K2kl>	<>
10102	10100	<>	<name>
10102	10102	<>	<aphaerese>
10102	10102	<>	<elision3>
10102	10102	<>	<elision2>
10102	10102	<>	<elision1>
10102	10103	<L2kl>	<>
10102	10073	<K2kl>	<>
10103	10104	<>	<name>
10103	10103	<>	<aphaerese>
10103	10103	<>	<elision3>
10103	10103	<>	<elision2>
10103	10103	<>	<elision1>
10103	10022	.	κ
10103	10022	.	λ
10103	8880	<3s>	<>
10104	10105	<>	<aphaerese>
10104	10105	<>	<elision3>
10104	10105	<>	<elision2>
10104	10105	<>	<elision1>
10104	10024	.	κ
10104	10024	.	λ
10104	8881	<3s>	<>
10105	10103	<>	<aphaerese>
10105	10103	<>	<elision3>
10105	10103	<>	<elision2>
10105	10103	<>	<elision1>
10105	10022	.	κ
10105	10022	.	λ
10105	8879	<3s>	<>
10106	9011	<name>	<name>
10106	10107	<>	<name>
10106	10109	<>	<aphaerese>
10106	10109	<>	<elision3>
10106	10109	<>	<elision2>
10106	10109	<>	<elision1>
10106	8821	<3s>	<>
10106	10110	<L2kl>	<>
10107	10108	<>	<aphaerese>
10107	10108	<>	<elision3>
10107	10108	<>	<elision2>
10107	10108	<>	<elision1>
10107	10046	<L2kl>	<>
10108	10109	<>	<aphaerese>
10108	10109	<>	<elision3>
10108	10109	<>	<elision2>
10108	10109	<>	<elision1>
10108	10047	<L2kl>	<>
10109	10107	<>	<name>
10109	10109	<>	<aphaerese>
10109	10109	<>	<elision3>
10109	10109	<>	<elision2>
10109	10109	<>	<elision1>
10109	10045	<L2kl>	<>
10110	10013	.	.
10110	10013	 	 
10110	10013	<~>	<~>
10110	10013	<split-s>	<split-s>
10110	10013	<split-h>	<split-h>
10110	10013	<name2>	<name2>
10110	9011	<name2>	<name>
10110	10046	<>	<name>
10110	10016	<aphaerese>	<aphaerese>
10110	10045	<>	<aphaerese>
10110	10013	<elision3>	<elision3>
10110	10045	<>	<elision3>
10110	10013	<elision2>	<elision2>
10110	10045	<>	<elision2>
10110	10013	<elision1>	<elision1>
10110	10045	<>	<elision1>
10110	10022	.	υ
10110	10022	.	u
10110	10022	.	κ
10110	10022	.	α
10110	10022	.	a
10110	10022	.	λ
10110	8890	<3s>	<>
10111	10004	.	.
10111	10005	 	 
10111	10004	<~>	<~>
10111	10004	<split-s>	<split-s>
10111	10004	<split-h>	<split-h>
10111	10004	<name2>	<name2>
10111	10008	<aphaerese>	<aphaerese>
10111	10011	<>	<aphaerese>
10111	10004	<elision3>	<elision3>
10111	10011	<>	<elision3>
10111	10004	<elision2>	<elision2>
10111	10011	<>	<elision2>
10111	10004	<elision1>	<elision1>
10111	10011	<>	<elision1>
10111	10001	.	υ
10111	10012	s	υ
10111	10001	.	u
10111	10012	s	u
10111	10027	.	κ
10111	10039	s	κ
10111	10045	s	k
10111	10048	s	U
10111	10051	s	K
10111	10001	.	α
10111	10012	s	α
10111	10001	.	a
10111	10012	s	a
10111	10077	s	A
10111	10045	s	λ
10111	10045	s	l
10111	10080	s	L
10112	10007	.	.
10112	10010	 	 
10112	10007	<~>	<~>
10112	10007	<split-s>	<split-s>
10112	10007	<split-h>	<split-h>
10112	10007	<name2>	<name2>
10112	10098	<aphaerese>	<aphaerese>
10112	10007	<>	<aphaerese>
10112	10007	<elision3>	<elision3>
10112	10007	<>	<elision3>
10112	10007	<elision2>	<elision2>
10112	10007	<>	<elision2>
10112	10007	<elision1>	<elision1>
10112	10007	<>	<elision1>
10112	10003	.	υ
10112	10026	s	υ
10112	10003	.	u
10112	10026	s	u
10112	10029	.	κ
10112	10041	s	κ
10112	10047	s	k
10112	10050	s	U
10112	10101	s	K
10112	10003	.	α
10112	10026	s	α
10112	10003	.	a
10112	10026	s	a
10112	10079	s	A
10112	10047	s	λ
10112	10047	s	l
10112	10108	s	L
10113	10004	.	.
10113	10005	 	 
10113	10004	<~>	<~>
10113	10004	<split-s>	<split-s>
10113	10004	<split-h>	<split-h>
10113	10004	<name2>	<name2>
10113	10114	<name2>	<name>
10113	10115	<>	<name>
10113	10008	<aphaerese>	<aphaerese>
10113	10117	<>	<aphaerese>
10113	10004	<elision3>	<elision3>
10113	10117	<>	<elision3>
10113	10004	<elision2>	<elision2>
10113	10117	<>	<elision2>
10113	10004	<elision1>	<elision1>
10113	10117	<>	<elision1>
10113	10001	.	υ
10113	10012	s	υ
10113	10001	.	u
10113	10012	s	u
10113	10001	.	κ
10113	10118	s	κ
10113	10045	s	k
10113	10048	s	U
10113	10099	s	K
10113	10001	.	α
10113	10012	s	α
10113	10001	.	a
10113	10012	s	a
10113	10077	s	A
10113	10001	.	λ
10113	10118	s	λ
10113	10045	s	l
10113	10106	s	L
10114	10101	s	k
10114	10108	s	l
10115	10007	.	.
10115	10010	 	 
10115	10007	<~>	<~>
10115	10007	<split-s>	<split-s>
10115	10007	<split-h>	<split-h>
10115	10007	<name2>	<name2>
10115	10098	<aphaerese>	<aphaerese>
10115	10116	<>	<aphaerese>
10115	10007	<elision3>	<elision3>
10115	10116	<>	<elision3>
10115	10007	<elision2>	<elision2>
10115	10116	<>	<elision2>
10115	10007	<elision1>	<elision1>
10115	10116	<>	<elision1>
10115	10003	.	υ
10115	10026	s	υ
10115	10003	.	u
10115	10026	s	u
10115	10003	.	κ
10115	10120	s	κ
10115	10047	s	k
10115	10050	s	U
10115	10101	s	K
10115	10003	.	α
10115	10026	s	α
10115	10003	.	a
10115	10026	s	a
10115	10079	s	A
10115	10003	.	λ
10115	10120	s	λ
10115	10047	s	l
10115	10108	s	L
10116	10004	.	.
10116	10005	 	 
10116	10004	<~>	<~>
10116	10004	<split-s>	<split-s>
10116	10004	<split-h>	<split-h>
10116	10004	<name2>	<name2>
10116	10008	<aphaerese>	<aphaerese>
10116	10117	<>	<aphaerese>
10116	10004	<elision3>	<elision3>
10116	10117	<>	<elision3>
10116	10004	<elision2>	<elision2>
10116	10117	<>	<elision2>
10116	10004	<elision1>	<elision1>
10116	10117	<>	<elision1>
10116	10001	.	υ
10116	10012	s	υ
10116	10001	.	u
10116	10012	s	u
10116	10001	.	κ
10116	10118	s	κ
10116	10045	s	k
10116	10048	s	U
10116	10099	s	K
10116	10001	.	α
10116	10012	s	α
10116	10001	.	a
10116	10012	s	a
10116	10077	s	A
10116	10001	.	λ
10116	10118	s	λ
10116	10045	s	l
10116	10106	s	L
10117	10004	.	.
10117	10005	 	 
10117	10004	<~>	<~>
10117	10004	<split-s>	<split-s>
10117	10004	<split-h>	<split-h>
10117	10004	<name2>	<name2>
10117	10115	<>	<name>
10117	10008	<aphaerese>	<aphaerese>
10117	10117	<>	<aphaerese>
10117	10004	<elision3>	<elision3>
10117	10117	<>	<elision3>
10117	10004	<elision2>	<elision2>
10117	10117	<>	<elision2>
10117	10004	<elision1>	<elision1>
10117	10117	<>	<elision1>
10117	10001	.	υ
10117	10012	s	υ
10117	10001	.	u
10117	10012	s	u
10117	10001	.	κ
10117	10118	s	κ
10117	10045	s	k
10117	10048	s	U
10117	10099	s	K
10117	10001	.	α
10117	10012	s	α
10117	10001	.	a
10117	10012	s	a
10117	10077	s	A
10117	10001	.	λ
10117	10118	s	λ
10117	10045	s	l
10117	10106	s	L
10118	10013	.	.
10118	10013	 	 
10118	10013	<~>	<~>
10118	10013	<split-s>	<split-s>
10118	10013	<split-h>	<split-h>
10118	10013	<name2>	<name2>
10118	10119	<>	<name>
10118	10016	<aphaerese>	<aphaerese>
10118	10118	<>	<aphaerese>
10118	10118	<>	<elision3>
10118	10118	<>	<elision2>
10118	10118	<>	<elision1>
10118	10022	.	υ
10118	10022	.	u
10118	10022	.	κ
10118	10022	.	α
10118	10022	.	a
10118	10022	.	λ
10118	8915	<3s>	<>
10119	10015	.	.
10119	10015	 	 
10119	10015	<~>	<~>
10119	10015	<split-s>	<split-s>
10119	10015	<split-h>	<split-h>
10119	10015	<name2>	<name2>
10119	10018	<aphaerese>	<aphaerese>
10119	10120	<>	<aphaerese>
10119	10120	<>	<elision3>
10119	10120	<>	<elision2>
10119	10120	<>	<elision1>
10119	10024	.	υ
10119	10024	.	u
10119	10024	.	κ
10119	10024	.	α
10119	10024	.	a
10119	10024	.	λ
10119	8916	<3s>	<>
10120	10013	.	.
10120	10013	 	 
10120	10013	<~>	<~>
10120	10013	<split-s>	<split-s>
10120	10013	<split-h>	<split-h>
10120	10013	<name2>	<name2>
10120	10016	<aphaerese>	<aphaerese>
10120	10118	<>	<aphaerese>
10120	10118	<>	<elision3>
10120	10118	<>	<elision2>
10120	10118	<>	<elision1>
10120	10022	.	υ
10120	10022	.	u
10120	10022	.	κ
10120	10022	.	α
10120	10022	.	a
10120	10022	.	λ
10120	8914	<3s>	<>
10121	10122	<>	<aphaerese>
10121	10122	<>	<elision3>
10121	10122	<>	<elision2>
10121	10122	<>	<elision1>
10121	9190	s	κ
10121	9315	s	k
10121	9333	s	K
10121	9190	s	λ
10121	9346	s	l
10121	9349	s	L
10121	8523	<1s>	<>
10121	10125	<~>	<>
10122	10123	<>	<name>
10122	10122	<>	<aphaerese>
10122	10122	<>	<elision3>
10122	10122	<>	<elision2>
10122	10122	<>	<elision1>
10122	9190	s	κ
10122	9315	s	k
10122	9333	s	K
10122	9190	s	λ
10122	9346	s	l
10122	9349	s	L
10122	8524	<1s>	<>
10122	10126	<~>	<>
10123	10121	<>	<aphaerese>
10123	10121	<>	<elision3>
10123	10121	<>	<elision2>
10123	10121	<>	<elision1>
10123	9311	s	κ
10123	9317	s	k
10123	9336	s	K
10123	9311	s	λ
10123	9348	s	l
10123	9351	s	L
10123	8525	<1s>	<>
10123	10124	<~>	<>
10124	10125	<>	<aphaerese>
10124	10125	<>	<elision3>
10124	10125	<>	<elision2>
10124	10125	<>	<elision1>
10124	10000	h	k
10124	10000	h	K
10124	10116	h	l
10124	10116	h	L
10125	10126	<>	<aphaerese>
10125	10126	<>	<elision3>
10125	10126	<>	<elision2>
10125	10126	<>	<elision1>
10125	9998	h	k
10125	9998	h	K
10125	10117	h	l
10125	10127	h	L
10126	10124	<>	<name>
10126	10126	<>	<aphaerese>
10126	10126	<>	<elision3>
10126	10126	<>	<elision2>
10126	10126	<>	<elision1>
10126	9998	h	k
10126	9998	h	K
10126	10117	h	l
10126	10127	h	L
10127	10004	.	.
10127	10005	 	 
10127	10004	<~>	<~>
10127	10004	<split-s>	<split-s>
10127	10004	<split-h>	<split-h>
10127	10004	<name2>	<name2>
10127	10114	<name2>	<name>
10127	10114	<name>	<name>
10127	10115	<>	<name>
10127	10008	<aphaerese>	<aphaerese>
10127	10117	<>	<aphaerese>
10127	10004	<elision3>	<elision3>
10127	10117	<>	<elision3>
10127	10004	<elision2>	<elision2>
10127	10117	<>	<elision2>
10127	10004	<elision1>	<elision1>
10127	10117	<>	<elision1>
10127	10001	.	υ
10127	10012	s	υ
10127	10001	.	u
10127	10012	s	u
10127	10001	.	κ
10127	10118	s	κ
10127	10045	s	k
10127	10048	s	U
10127	10099	s	K
10127	10001	.	α
10127	10012	s	α
10127	10001	.	a
10127	10012	s	a
10127	10077	s	A
10127	10001	.	λ
10127	10118	s	λ
10127	10045	s	l
10127	10106	s	L
10128	10129	<>	<aphaerese>
10128	81	<elision3>	<elision3>
10128	10129	<>	<elision3>
10128	81	<elision2>	<elision2>
10128	10129	<>	<elision2>
10128	81	<elision1>	<elision1>
10128	10129	<>	<elision1>
10128	9809	<K>	<>
10129	10130	<>	<name>
10129	10129	<>	<aphaerese>
10129	81	<elision3>	<elision3>
10129	10129	<>	<elision3>
10129	81	<elision2>	<elision2>
10129	10129	<>	<elision2>
10129	81	<elision1>	<elision1>
10129	10129	<>	<elision1>
10129	9807	<K>	<>
10130	10128	<>	<aphaerese>
10130	83	<elision3>	<elision3>
10130	10128	<>	<elision3>
10130	83	<elision2>	<elision2>
10130	10128	<>	<elision2>
10130	83	<elision1>	<elision1>
10130	10128	<>	<elision1>
10130	9808	<K>	<>
10131	71	.	.
10131	72	 	 
10131	71	<~>	<~>
10131	71	<split-s>	<split-s>
10131	71	<split-h>	<split-h>
10131	71	<name2>	<name2>
10131	75	<aphaerese>	<aphaerese>
10131	10132	<>	<aphaerese>
10131	71	<elision3>	<elision3>
10131	10132	<>	<elision3>
10131	71	<elision2>	<elision2>
10131	10132	<>	<elision2>
10131	71	<elision1>	<elision1>
10131	10132	<>	<elision1>
10131	71	.	υ
10131	71	.	u
10131	78	.	κ
10131	9377	H	κ
10131	9705	H	k
10131	9718	H	U
10131	9721	H	K
10131	71	.	α
10131	71	.	a
10131	9548	H	A
10131	9732	H	λ
10131	10135	H	l
10131	10140	H	L
10131	9806	<K>	<>
10132	71	.	.
10132	72	 	 
10132	71	<~>	<~>
10132	71	<split-s>	<split-s>
10132	71	<split-h>	<split-h>
10132	71	<name2>	<name2>
10132	10133	<>	<name>
10132	75	<aphaerese>	<aphaerese>
10132	10132	<>	<aphaerese>
10132	71	<elision3>	<elision3>
10132	10132	<>	<elision3>
10132	71	<elision2>	<elision2>
10132	10132	<>	<elision2>
10132	71	<elision1>	<elision1>
10132	10132	<>	<elision1>
10132	71	.	υ
10132	71	.	u
10132	78	.	κ
10132	9377	H	κ
10132	9705	H	k
10132	9718	H	U
10132	9721	H	K
10132	71	.	α
10132	71	.	a
10132	9548	H	A
10132	9732	H	λ
10132	10135	H	l
10132	10140	H	L
10132	9804	<K>	<>
10133	70	.	.
10133	74	 	 
10133	70	<~>	<~>
10133	70	<split-s>	<split-s>
10133	70	<split-h>	<split-h>
10133	70	<name2>	<name2>
10133	77	<aphaerese>	<aphaerese>
10133	10131	<>	<aphaerese>
10133	70	<elision3>	<elision3>
10133	10131	<>	<elision3>
10133	70	<elision2>	<elision2>
10133	10131	<>	<elision2>
10133	70	<elision1>	<elision1>
10133	10131	<>	<elision1>
10133	70	.	υ
10133	70	.	u
10133	80	.	κ
10133	9742	H	κ
10133	9746	H	k
10133	9720	H	U
10133	9750	H	K
10133	70	.	α
10133	70	.	a
10133	9551	H	A
10133	9734	H	λ
10133	10134	H	l
10133	10137	H	L
10133	9805	<K>	<>
10134	10135	<>	<aphaerese>
10134	10135	<>	<elision3>
10134	10135	<>	<elision2>
10134	10135	<>	<elision1>
10134	9996	<~>	<>
10134	9735	<l2L>	<>
10135	10136	<>	<name>
10135	10135	<>	<aphaerese>
10135	10135	<>	<elision3>
10135	10135	<>	<elision2>
10135	10135	<>	<elision1>
10135	9997	<~>	<>
10135	9736	<l2L>	<>
10136	10134	<>	<aphaerese>
10136	10134	<>	<elision3>
10136	10134	<>	<elision2>
10136	10134	<>	<elision1>
10136	9995	<~>	<>
10136	9737	<l2L>	<>
10137	9548	.	.
10137	9549	 	 
10137	9548	<~>	<~>
10137	9548	<split-s>	<split-s>
10137	9548	<split-h>	<split-h>
10137	9548	<name2>	<name2>
10137	9552	<aphaerese>	<aphaerese>
10137	10138	<>	<aphaerese>
10137	9548	<elision3>	<elision3>
10137	10138	<>	<elision3>
10137	9548	<elision2>	<elision2>
10137	10138	<>	<elision2>
10137	9548	<elision1>	<elision1>
10137	10138	<>	<elision1>
10137	9556	.	υ
10137	9559	s	υ
10137	9556	.	u
10137	9559	s	u
10137	9556	.	κ
10137	9190	s	κ
10137	9315	s	k
10137	9605	s	U
10137	9333	s	K
10137	9556	.	α
10137	9630	s	α
10137	9556	.	a
10137	9630	s	a
10137	9633	s	A
10137	9556	.	λ
10137	9190	s	λ
10137	9346	s	l
10137	9349	s	L
10137	8700	<1s>	<>
10137	10125	<~>	<>
10138	9548	.	.
10138	9549	 	 
10138	9548	<~>	<~>
10138	9548	<split-s>	<split-s>
10138	9548	<split-h>	<split-h>
10138	9548	<name2>	<name2>
10138	10139	<>	<name>
10138	9552	<aphaerese>	<aphaerese>
10138	10138	<>	<aphaerese>
10138	9548	<elision3>	<elision3>
10138	10138	<>	<elision3>
10138	9548	<elision2>	<elision2>
10138	10138	<>	<elision2>
10138	9548	<elision1>	<elision1>
10138	10138	<>	<elision1>
10138	9556	.	υ
10138	9559	s	υ
10138	9556	.	u
10138	9559	s	u
10138	9556	.	κ
10138	9190	s	κ
10138	9315	s	k
10138	9605	s	U
10138	9333	s	K
10138	9556	.	α
10138	9630	s	α
10138	9556	.	a
10138	9630	s	a
10138	9633	s	A
10138	9556	.	λ
10138	9190	s	λ
10138	9346	s	l
10138	9349	s	L
10138	8701	<1s>	<>
10138	10126	<~>	<>
10139	9551	.	.
10139	9554	 	 
10139	9551	<~>	<~>
10139	9551	<split-s>	<split-s>
10139	9551	<split-h>	<split-h>
10139	9551	<name2>	<name2>
10139	9660	<aphaerese>	<aphaerese>
10139	10137	<>	<aphaerese>
10139	9551	<elision3>	<elision3>
10139	10137	<>	<elision3>
10139	9551	<elision2>	<elision2>
10139	10137	<>	<elision2>
10139	9551	<elision1>	<elision1>
10139	10137	<>	<elision1>
10139	9558	.	υ
10139	9561	s	υ
10139	9558	.	u
10139	9561	s	u
10139	9558	.	κ
10139	9311	s	κ
10139	9317	s	k
10139	9607	s	U
10139	9336	s	K
10139	9558	.	α
10139	9632	s	α
10139	9558	.	a
10139	9632	s	a
10139	9635	s	A
10139	9558	.	λ
10139	9311	s	λ
10139	9348	s	l
10139	9351	s	L
10139	8702	<1s>	<>
10139	10124	<~>	<>
10140	9548	.	.
10140	9549	 	 
10140	9548	<~>	<~>
10140	9548	<split-s>	<split-s>
10140	9548	<split-h>	<split-h>
10140	9548	<name2>	<name2>
10140	9728	<name2>	<name>
10140	10139	<>	<name>
10140	9552	<aphaerese>	<aphaerese>
10140	10138	<>	<aphaerese>
10140	9548	<elision3>	<elision3>
10140	10138	<>	<elision3>
10140	9548	<elision2>	<elision2>
10140	10138	<>	<elision2>
10140	9548	<elision1>	<elision1>
10140	10138	<>	<elision1>
10140	9556	.	υ
10140	9559	s	υ
10140	9556	.	u
10140	9559	s	u
10140	9556	.	κ
10140	9190	s	κ
10140	9315	s	k
10140	9605	s	U
10140	9333	s	K
10140	9556	.	α
10140	9630	s	α
10140	9556	.	a
10140	9630	s	a
10140	9633	s	A
10140	9556	.	λ
10140	9190	s	λ
10140	9346	s	l
10140	9349	s	L
10140	8890	<1s>	<>
10140	10126	<~>	<>
10140	9727	<l2L>	<>
10141	10142	<>	<name>
10141	10141	<>	<aphaerese>
10141	9977	<elision3>	<elision3>
10141	10141	<>	<elision3>
10141	9977	<elision2>	<elision2>
10141	10141	<>	<elision2>
10141	9977	<elision1>	<elision1>
10141	10141	<>	<elision1>
10141	68	<4s>	<>
10142	10143	<>	<aphaerese>
10142	9979	<elision3>	<elision3>
10142	10143	<>	<elision3>
10142	9979	<elision2>	<elision2>
10142	10143	<>	<elision2>
10142	9979	<elision1>	<elision1>
10142	10143	<>	<elision1>
10142	69	<4s>	<>
10143	10141	<>	<aphaerese>
10143	9977	<elision3>	<elision3>
10143	10141	<>	<elision3>
10143	9977	<elision2>	<elision2>
10143	10141	<>	<elision2>
10143	9977	<elision1>	<elision1>
10143	10141	<>	<elision1>
10143	67	<4s>	<>
10144	71	.	.
10144	72	 	 
10144	71	<~>	<~>
10144	71	<split-s>	<split-s>
10144	71	<split-h>	<split-h>
10144	71	<name2>	<name2>
10144	75	<aphaerese>	<aphaerese>
10144	10145	<>	<aphaerese>
10144	71	<elision3>	<elision3>
10144	10145	<>	<elision3>
10144	71	<elision2>	<elision2>
10144	10145	<>	<elision2>
10144	71	<elision1>	<elision1>
10144	10145	<>	<elision1>
10144	9751	.	υ
10144	9795	H	υ
10144	9751	.	u
10144	9797	H	u
10144	78	.	κ
10144	9377	H	κ
10144	9705	H	k
10144	9718	H	U
10144	9721	H	K
10144	9751	.	α
10144	9781	H	α
10144	9751	.	a
10144	9786	H	a
10144	9548	H	A
10144	9732	H	λ
10144	10135	H	l
10144	10140	H	L
10144	9803	<K>	<>
10145	71	.	.
10145	72	 	 
10145	71	<~>	<~>
10145	71	<split-s>	<split-s>
10145	71	<split-h>	<split-h>
10145	71	<name2>	<name2>
10145	10146	<>	<name>
10145	75	<aphaerese>	<aphaerese>
10145	10145	<>	<aphaerese>
10145	71	<elision3>	<elision3>
10145	10145	<>	<elision3>
10145	71	<elision2>	<elision2>
10145	10145	<>	<elision2>
10145	71	<elision1>	<elision1>
10145	10145	<>	<elision1>
10145	9751	.	υ
10145	9795	H	υ
10145	9751	.	u
10145	9797	H	u
10145	78	.	κ
10145	9377	H	κ
10145	9705	H	k
10145	9718	H	U
10145	9721	H	K
10145	9751	.	α
10145	9781	H	α
10145	9751	.	a
10145	9786	H	a
10145	9548	H	A
10145	9732	H	λ
10145	10135	H	l
10145	10140	H	L
10145	9801	<K>	<>
10146	70	.	.
10146	74	 	 
10146	70	<~>	<~>
10146	70	<split-s>	<split-s>
10146	70	<split-h>	<split-h>
10146	70	<name2>	<name2>
10146	77	<aphaerese>	<aphaerese>
10146	10144	<>	<aphaerese>
10146	70	<elision3>	<elision3>
10146	10144	<>	<elision3>
10146	70	<elision2>	<elision2>
10146	10144	<>	<elision2>
10146	70	<elision1>	<elision1>
10146	10144	<>	<elision1>
10146	9753	.	υ
10146	9790	H	υ
10146	9753	.	u
10146	9794	H	u
10146	80	.	κ
10146	9742	H	κ
10146	9746	H	k
10146	9720	H	U
10146	9750	H	K
10146	9753	.	α
10146	9780	H	α
10146	9753	.	a
10146	9785	H	a
10146	9551	H	A
10146	9734	H	λ
10146	10134	H	l
10146	10137	H	L
10146	9802	<K>	<>
10147	9979	.	.
10147	9979	 	 
10147	9979	<~>	<~>
10147	9979	<split-s>	<split-s>
10147	9979	<split-h>	<split-h>
10147	9979	<name2>	<name2>
10147	9982	<aphaerese>	<aphaerese>
10147	10148	<>	<aphaerese>
10147	10148	<>	<elision3>
10147	10148	<>	<elision2>
10147	10148	<>	<elision1>
10147	10143	.	υ
10147	10143	.	u
10147	9985	.	κ
10147	10143	.	α
10147	10143	.	a
10147	10151	<4s>	<>
10148	9977	.	.
10148	9977	 	 
10148	9977	<~>	<~>
10148	9977	<split-s>	<split-s>
10148	9977	<split-h>	<split-h>
10148	9977	<name2>	<name2>
10148	9980	<aphaerese>	<aphaerese>
10148	9976	<>	<aphaerese>
10148	9976	<>	<elision3>
10148	9976	<>	<elision2>
10148	9976	<>	<elision1>
10148	10141	.	υ
10148	10141	.	u
10148	9983	.	κ
10148	10141	.	α
10148	10141	.	a
10148	10149	<4s>	<>
10149	71	.	.
10149	72	 	 
10149	71	<~>	<~>
10149	71	<split-s>	<split-s>
10149	71	<split-h>	<split-h>
10149	71	<name2>	<name2>
10149	75	<aphaerese>	<aphaerese>
10149	10150	<>	<aphaerese>
10149	10150	<>	<elision3>
10149	10150	<>	<elision2>
10149	10150	<>	<elision1>
10149	9751	.	υ
10149	9795	H	υ
10149	9751	.	u
10149	9797	H	u
10149	78	.	κ
10149	9377	H	κ
10149	9705	H	k
10149	9718	H	U
10149	9721	H	K
10149	9751	.	α
10149	9781	H	α
10149	9751	.	a
10149	9786	H	a
10149	9548	H	A
10149	9732	H	λ
10149	10135	H	l
10149	10140	H	L
10149	10153	<K>	<>
10150	71	.	.
10150	72	 	 
10150	71	<~>	<~>
10150	71	<split-s>	<split-s>
10150	71	<split-h>	<split-h>
10150	71	<name2>	<name2>
10150	10151	<>	<name>
10150	75	<aphaerese>	<aphaerese>
10150	10150	<>	<aphaerese>
10150	10150	<>	<elision3>
10150	10150	<>	<elision2>
10150	10150	<>	<elision1>
10150	9751	.	υ
10150	9795	H	υ
10150	9751	.	u
10150	9797	H	u
10150	78	.	κ
10150	9377	H	κ
10150	9705	H	k
10150	9718	H	U
10150	9721	H	K
10150	9751	.	α
10150	9781	H	α
10150	9751	.	a
10150	9786	H	a
10150	9548	H	A
10150	9732	H	λ
10150	10135	H	l
10150	10140	H	L
10150	10154	<K>	<>
10151	70	.	.
10151	74	 	 
10151	70	<~>	<~>
10151	70	<split-s>	<split-s>
10151	70	<split-h>	<split-h>
10151	70	<name2>	<name2>
10151	77	<aphaerese>	<aphaerese>
10151	10149	<>	<aphaerese>
10151	10149	<>	<elision3>
10151	10149	<>	<elision2>
10151	10149	<>	<elision1>
10151	9753	.	υ
10151	9790	H	υ
10151	9753	.	u
10151	9794	H	u
10151	80	.	κ
10151	9742	H	κ
10151	9746	H	k
10151	9720	H	U
10151	9750	H	K
10151	9753	.	α
10151	9780	H	α
10151	9753	.	a
10151	9785	H	a
10151	9551	H	A
10151	9734	H	λ
10151	10134	H	l
10151	10137	H	L
10151	10152	<K>	<>
10152	9803	.	.
10152	9803	<~>	<~>
10152	9803	<split-s>	<split-s>
10152	9803	<split-h>	<split-h>
10152	9803	<name2>	<name2>
10152	9806	<aphaerese>	<aphaerese>
10152	10153	<>	<aphaerese>
10152	10153	<>	<elision3>
10152	10153	<>	<elision2>
10152	10153	<>	<elision1>
10152	9799	.	υ
10152	9945	H	υ
10152	9799	.	u
10152	9954	H	u
10152	9809	.	κ
10152	9860	H	κ
10152	9914	H	k
10152	9923	H	U
10152	9927	H	K
10152	9799	.	α
10152	9957	H	α
10152	9799	.	a
10152	9960	H	a
10152	9894	H	A
10152	9935	H	λ
10152	9941	H	l
10152	9936	H	L
10153	9801	.	.
10153	9801	<~>	<~>
10153	9801	<split-s>	<split-s>
10153	9801	<split-h>	<split-h>
10153	9801	<name2>	<name2>
10153	9804	<aphaerese>	<aphaerese>
10153	10154	<>	<aphaerese>
10153	10154	<>	<elision3>
10153	10154	<>	<elision2>
10153	10154	<>	<elision1>
10153	9800	.	υ
10153	9943	H	υ
10153	9800	.	u
10153	9952	H	u
10153	9807	.	κ
10153	9858	H	κ
10153	9912	H	k
10153	9921	H	U
10153	9924	H	K
10153	9800	.	α
10153	9955	H	α
10153	9800	.	a
10153	9958	H	a
10153	9892	H	A
10153	9933	H	λ
10153	9939	H	l
10153	9942	H	L
10154	9801	.	.
10154	9801	<~>	<~>
10154	9801	<split-s>	<split-s>
10154	9801	<split-h>	<split-h>
10154	9801	<name2>	<name2>
10154	10152	<>	<name>
10154	9804	<aphaerese>	<aphaerese>
10154	10154	<>	<aphaerese>
10154	10154	<>	<elision3>
10154	10154	<>	<elision2>
10154	10154	<>	<elision1>
10154	9800	.	υ
10154	9943	H	υ
10154	9800	.	u
10154	9952	H	u
10154	9807	.	κ
10154	9858	H	κ
10154	9912	H	k
10154	9921	H	U
10154	9924	H	K
10154	9800	.	α
10154	9955	H	α
10154	9800	.	a
10154	9958	H	a
10154	9892	H	A
10154	9933	H	λ
10154	9939	H	l
10154	9942	H	L
10155	10156	<>	<name>
10155	10155	<>	<aphaerese>
10155	10158	<elision3>	<elision3>
10155	10155	<>	<elision3>
10155	10158	<elision2>	<elision2>
10155	10155	<>	<elision2>
10155	10158	<elision1>	<elision1>
10155	10155	<>	<elision1>
10155	10224	<split-h>	<>
10156	10157	<>	<aphaerese>
10156	10160	<elision3>	<elision3>
10156	10157	<>	<elision3>
10156	10160	<elision2>	<elision2>
10156	10157	<>	<elision2>
10156	10160	<elision1>	<elision1>
10156	10157	<>	<elision1>
10156	10225	<split-h>	<>
10157	10155	<>	<aphaerese>
10157	10158	<elision3>	<elision3>
10157	10155	<>	<elision3>
10157	10158	<elision2>	<elision2>
10157	10155	<>	<elision2>
10157	10158	<elision1>	<elision1>
10157	10155	<>	<elision1>
10157	10223	<split-h>	<>
10158	10159	<>	<name>
10158	10158	<>	<aphaerese>
10158	10158	<>	<elision3>
10158	10158	<>	<elision2>
10158	10158	<>	<elision1>
10158	10161	s	κ
10158	10161	s	k
10158	10214	s	K
10158	10161	s	λ
10158	10161	s	l
10158	10217	s	L
10158	10221	<split-h>	<>
10159	10160	<>	<aphaerese>
10159	10160	<>	<elision3>
10159	10160	<>	<elision2>
10159	10160	<>	<elision1>
10159	10163	s	κ
10159	10163	s	k
10159	10216	s	K
10159	10163	s	λ
10159	10163	s	l
10159	10219	s	L
10159	10222	<split-h>	<>
10160	10158	<>	<aphaerese>
10160	10158	<>	<elision3>
10160	10158	<>	<elision2>
10160	10158	<>	<elision1>
10160	10161	s	κ
10160	10161	s	k
10160	10214	s	K
10160	10161	s	λ
10160	10161	s	l
10160	10217	s	L
10160	10220	<split-h>	<>
10161	10162	<>	<name>
10161	10161	<>	<aphaerese>
10161	10161	<>	<elision3>
10161	10161	<>	<elision2>
10161	10161	<>	<elision1>
10161	10165	<4s>	<>
10162	10163	<>	<aphaerese>
10162	10163	<>	<elision3>
10162	10163	<>	<elision2>
10162	10163	<>	<elision1>
10162	10166	<4s>	<>
10163	10161	<>	<aphaerese>
10163	10161	<>	<elision3>
10163	10161	<>	<elision2>
10163	10161	<>	<elision1>
10163	10164	<4s>	<>
10164	10165	<>	<aphaerese>
10164	10165	<>	<elision3>
10164	10165	<>	<elision2>
10164	10165	<>	<elision1>
10164	10210	H	κ
10164	9705	H	k
10164	9721	H	K
10164	10187	H	λ
10164	10135	H	l
10164	10140	H	L
10164	10193	<K>	<>
10165	10166	<>	<name>
10165	10165	<>	<aphaerese>
10165	10165	<>	<elision3>
10165	10165	<>	<elision2>
10165	10165	<>	<elision1>
10165	10210	H	κ
10165	9705	H	k
10165	9721	H	K
10165	10187	H	λ
10165	10135	H	l
10165	10140	H	L
10165	10194	<K>	<>
10166	10164	<>	<aphaerese>
10166	10164	<>	<elision3>
10166	10164	<>	<elision2>
10166	10164	<>	<elision1>
10166	10167	H	κ
10166	9746	H	k
10166	9750	H	K
10166	10186	H	λ
10166	10134	H	l
10166	10137	H	L
10166	10192	<K>	<>
10167	10168	<>	<aphaerese>
10167	10168	<>	<elision3>
10167	10168	<>	<elision2>
10167	10168	<>	<elision1>
10167	10171	<kappa2K>	<>
10167	10183	<kappa2L>	<>
10167	9701	<lambda2L>	<>
10168	10169	<>	<name>
10168	10168	<>	<aphaerese>
10168	10168	<>	<elision3>
10168	10168	<>	<elision2>
10168	10168	<>	<elision1>
10168	10172	<kappa2K>	<>
10168	10175	<kappa2L>	<>
10168	9699	<lambda2L>	<>
10169	10170	<>	<aphaerese>
10169	10170	<>	<elision3>
10169	10170	<>	<elision2>
10169	10170	<>	<elision1>
10169	10173	<kappa2K>	<>
10169	10176	<kappa2L>	<>
10169	9700	<lambda2L>	<>
10170	10168	<>	<aphaerese>
10170	10168	<>	<elision3>
10170	10168	<>	<elision2>
10170	10168	<>	<elision1>
10170	10171	<kappa2K>	<>
10170	10174	<kappa2L>	<>
10170	9701	<lambda2L>	<>
10171	9382	.	.
10171	9383	 	 
10171	9382	<~>	<~>
10171	9382	<split-s>	<split-s>
10171	9382	<split-h>	<split-h>
10171	9382	<name2>	<name2>
10171	9386	<aphaerese>	<aphaerese>
10171	10172	<>	<aphaerese>
10171	10172	<>	<elision3>
10171	10172	<>	<elision2>
10171	10172	<>	<elision1>
10171	9390	.	υ
10171	9393	s	υ
10171	9390	.	u
10171	9393	s	u
10171	91	s	κ
10171	9131	s	k
10171	9456	s	U
10171	9164	s	K
10171	9390	.	α
10171	9484	s	α
10171	9390	.	a
10171	9484	s	a
10171	9487	s	A
10171	91	s	λ
10171	9179	s	l
10171	9182	s	L
10172	9382	.	.
10172	9383	 	 
10172	9382	<~>	<~>
10172	9382	<split-s>	<split-s>
10172	9382	<split-h>	<split-h>
10172	9382	<name2>	<name2>
10172	10173	<>	<name>
10172	9386	<aphaerese>	<aphaerese>
10172	10172	<>	<aphaerese>
10172	10172	<>	<elision3>
10172	10172	<>	<elision2>
10172	10172	<>	<elision1>
10172	9390	.	υ
10172	9393	s	υ
10172	9390	.	u
10172	9393	s	u
10172	91	s	κ
10172	9131	s	k
10172	9456	s	U
10172	9164	s	K
10172	9390	.	α
10172	9484	s	α
10172	9390	.	a
10172	9484	s	a
10172	9487	s	A
10172	91	s	λ
10172	9179	s	l
10172	9182	s	L
10173	9385	.	.
10173	9388	 	 
10173	9385	<~>	<~>
10173	9385	<split-s>	<split-s>
10173	9385	<split-h>	<split-h>
10173	9385	<name2>	<name2>
10173	9514	<aphaerese>	<aphaerese>
10173	10171	<>	<aphaerese>
10173	10171	<>	<elision3>
10173	10171	<>	<elision2>
10173	10171	<>	<elision1>
10173	9392	.	υ
10173	9395	s	υ
10173	9392	.	u
10173	9395	s	u
10173	9124	s	κ
10173	9133	s	k
10173	9458	s	U
10173	9167	s	K
10173	9392	.	α
10173	9486	s	α
10173	9392	.	a
10173	9486	s	a
10173	9489	s	A
10173	9124	s	λ
10173	9181	s	l
10173	9184	s	L
10174	9548	.	.
10174	9549	 	 
10174	9548	<~>	<~>
10174	9548	<split-s>	<split-s>
10174	9548	<split-h>	<split-h>
10174	9548	<name2>	<name2>
10174	9552	<aphaerese>	<aphaerese>
10174	10175	<>	<aphaerese>
10174	10175	<>	<elision3>
10174	10175	<>	<elision2>
10174	10175	<>	<elision1>
10174	9556	.	υ
10174	9559	s	υ
10174	9556	.	u
10174	9559	s	u
10174	9190	s	κ
10174	9315	s	k
10174	9605	s	U
10174	9333	s	K
10174	9556	.	α
10174	9630	s	α
10174	9556	.	a
10174	9630	s	a
10174	9633	s	A
10174	9190	s	λ
10174	9346	s	l
10174	9349	s	L
10174	10178	<1s>	<>
10175	9548	.	.
10175	9549	 	 
10175	9548	<~>	<~>
10175	9548	<split-s>	<split-s>
10175	9548	<split-h>	<split-h>
10175	9548	<name2>	<name2>
10175	10176	<>	<name>
10175	9552	<aphaerese>	<aphaerese>
10175	10175	<>	<aphaerese>
10175	10175	<>	<elision3>
10175	10175	<>	<elision2>
10175	10175	<>	<elision1>
10175	9556	.	υ
10175	9559	s	υ
10175	9556	.	u
10175	9559	s	u
10175	9190	s	κ
10175	9315	s	k
10175	9605	s	U
10175	9333	s	K
10175	9556	.	α
10175	9630	s	α
10175	9556	.	a
10175	9630	s	a
10175	9633	s	A
10175	9190	s	λ
10175	9346	s	l
10175	9349	s	L
10175	10179	<1s>	<>
10176	9551	.	.
10176	9554	 	 
10176	9551	<~>	<~>
10176	9551	<split-s>	<split-s>
10176	9551	<split-h>	<split-h>
10176	9551	<name2>	<name2>
10176	9660	<aphaerese>	<aphaerese>
10176	10174	<>	<aphaerese>
10176	10174	<>	<elision3>
10176	10174	<>	<elision2>
10176	10174	<>	<elision1>
10176	9558	.	υ
10176	9561	s	υ
10176	9558	.	u
10176	9561	s	u
10176	9311	s	κ
10176	9317	s	k
10176	9607	s	U
10176	9336	s	K
10176	9558	.	α
10176	9632	s	α
10176	9558	.	a
10176	9632	s	a
10176	9635	s	A
10176	9311	s	λ
10176	9348	s	l
10176	9351	s	L
10176	10177	<1s>	<>
10177	106	.	.
10177	110	 	 
10177	106	<~>	<~>
10177	106	<split-s>	<split-s>
10177	106	<split-h>	<split-h>
10177	106	<name2>	<name2>
10177	113	<aphaerese>	<aphaerese>
10177	10178	<>	<aphaerese>
10177	10178	<>	<elision3>
10177	10178	<>	<elision2>
10177	10178	<>	<elision1>
10177	8112	.	υ
10177	8149	H	υ
10177	8112	.	u
10177	8153	H	u
10177	8526	H	κ
10177	8105	H	k
10177	8079	H	U
10177	8109	H	K
10177	8112	.	α
10177	8139	H	α
10177	8112	.	a
10177	8144	H	a
10177	7910	H	A
10177	8545	H	λ
10177	8493	H	l
10177	8496	H	L
10177	10181	<K>	<>
10178	107	.	.
10178	108	 	 
10178	107	<~>	<~>
10178	107	<split-s>	<split-s>
10178	107	<split-h>	<split-h>
10178	107	<name2>	<name2>
10178	111	<aphaerese>	<aphaerese>
10178	10179	<>	<aphaerese>
10178	10179	<>	<elision3>
10178	10179	<>	<elision2>
10178	10179	<>	<elision1>
10178	8110	.	υ
10178	8154	H	υ
10178	8110	.	u
10178	8156	H	u
10178	8569	H	κ
10178	8064	H	k
10178	8077	H	U
10178	8080	H	K
10178	8110	.	α
10178	8140	H	α
10178	8110	.	a
10178	8145	H	a
10178	7907	H	A
10178	8546	H	λ
10178	8494	H	l
10178	8499	H	L
10178	10182	<K>	<>
10179	107	.	.
10179	108	 	 
10179	107	<~>	<~>
10179	107	<split-s>	<split-s>
10179	107	<split-h>	<split-h>
10179	107	<name2>	<name2>
10179	10177	<>	<name>
10179	111	<aphaerese>	<aphaerese>
10179	10179	<>	<aphaerese>
10179	10179	<>	<elision3>
10179	10179	<>	<elision2>
10179	10179	<>	<elision1>
10179	8110	.	υ
10179	8154	H	υ
10179	8110	.	u
10179	8156	H	u
10179	8569	H	κ
10179	8064	H	k
10179	8077	H	U
10179	8080	H	K
10179	8110	.	α
10179	8140	H	α
10179	8110	.	a
10179	8145	H	a
10179	7907	H	A
10179	8546	H	λ
10179	8494	H	l
10179	8499	H	L
10179	10180	<K>	<>
10180	8160	.	.
10180	8160	<~>	<~>
10180	8160	<split-s>	<split-s>
10180	8160	<split-h>	<split-h>
10180	8160	<name2>	<name2>
10180	10181	<>	<name>
10180	8163	<aphaerese>	<aphaerese>
10180	10180	<>	<aphaerese>
10180	10180	<>	<elision3>
10180	10180	<>	<elision2>
10180	10180	<>	<elision1>
10180	8159	.	υ
10180	8302	H	υ
10180	8159	.	u
10180	8311	H	u
10180	8554	H	κ
10180	8271	H	k
10180	8280	H	U
10180	8283	H	K
10180	8159	.	α
10180	8314	H	α
10180	8159	.	a
10180	8317	H	a
10180	8251	H	A
10180	8563	H	λ
10180	8298	H	l
10180	8301	H	L
10181	8162	.	.
10181	8162	<~>	<~>
10181	8162	<split-s>	<split-s>
10181	8162	<split-h>	<split-h>
10181	8162	<name2>	<name2>
10181	8165	<aphaerese>	<aphaerese>
10181	10182	<>	<aphaerese>
10181	10182	<>	<elision3>
10181	10182	<>	<elision2>
10181	10182	<>	<elision1>
10181	8158	.	υ
10181	8304	H	υ
10181	8158	.	u
10181	8313	H	u
10181	8556	H	κ
10181	8273	H	k
10181	8282	H	U
10181	8286	H	K
10181	8158	.	α
10181	8316	H	α
10181	8158	.	a
10181	8319	H	a
10181	8253	H	A
10181	8565	H	λ
10181	8300	H	l
10181	8295	H	L
10182	8160	.	.
10182	8160	<~>	<~>
10182	8160	<split-s>	<split-s>
10182	8160	<split-h>	<split-h>
10182	8160	<name2>	<name2>
10182	8163	<aphaerese>	<aphaerese>
10182	10180	<>	<aphaerese>
10182	10180	<>	<elision3>
10182	10180	<>	<elision2>
10182	10180	<>	<elision1>
10182	8159	.	υ
10182	8302	H	υ
10182	8159	.	u
10182	8311	H	u
10182	8554	H	κ
10182	8271	H	k
10182	8280	H	U
10182	8283	H	K
10182	8159	.	α
10182	8314	H	α
10182	8159	.	a
10182	8317	H	a
10182	8251	H	A
10182	8563	H	λ
10182	8298	H	l
10182	8301	H	L
10183	9548	.	.
10183	9549	 	 
10183	9548	<~>	<~>
10183	9548	<split-s>	<split-s>
10183	9548	<split-h>	<split-h>
10183	9548	<name2>	<name2>
10183	9552	<aphaerese>	<aphaerese>
10183	10175	<>	<aphaerese>
10183	10175	<>	<elision3>
10183	10175	<>	<elision2>
10183	10175	<>	<elision1>
10183	9556	.	υ
10183	9559	s	υ
10183	9556	.	u
10183	9559	s	u
10183	9190	s	κ
10183	9315	s	k
10183	9605	s	U
10183	9333	s	K
10183	9556	.	α
10183	9630	s	α
10183	9556	.	a
10183	9630	s	a
10183	9633	s	A
10183	9190	s	λ
10183	9346	s	l
10183	9349	s	L
10183	10184	<1s>	<>
10184	107	.	.
10184	108	 	 
10184	107	<~>	<~>
10184	107	<split-s>	<split-s>
10184	107	<split-h>	<split-h>
10184	107	<name2>	<name2>
10184	111	<aphaerese>	<aphaerese>
10184	10179	<>	<aphaerese>
10184	10179	<>	<elision3>
10184	10179	<>	<elision2>
10184	10179	<>	<elision1>
10184	8110	.	υ
10184	8110	.	u
10184	8110	.	α
10184	8110	.	a
10184	10185	<K>	<>
10185	8160	.	.
10185	8160	<~>	<~>
10185	8160	<split-s>	<split-s>
10185	8160	<split-h>	<split-h>
10185	8160	<name2>	<name2>
10185	8163	<aphaerese>	<aphaerese>
10185	10180	<>	<aphaerese>
10185	10180	<>	<elision3>
10185	10180	<>	<elision2>
10185	10180	<>	<elision1>
10185	8159	.	υ
10185	8159	.	u
10185	8159	.	α
10185	8159	.	a
10186	10187	<>	<aphaerese>
10186	10187	<>	<elision3>
10186	10187	<>	<elision2>
10186	10187	<>	<elision1>
10186	10190	<lambda2L>	<>
10187	10188	<>	<name>
10187	10187	<>	<aphaerese>
10187	10187	<>	<elision3>
10187	10187	<>	<elision2>
10187	10187	<>	<elision1>
10187	10191	<lambda2L>	<>
10188	10186	<>	<aphaerese>
10188	10186	<>	<elision3>
10188	10186	<>	<elision2>
10188	10186	<>	<elision1>
10188	10189	<lambda2L>	<>
10189	9551	.	.
10189	9554	 	 
10189	9551	<~>	<~>
10189	9551	<split-s>	<split-s>
10189	9551	<split-h>	<split-h>
10189	9551	<name2>	<name2>
10189	9660	<aphaerese>	<aphaerese>
10189	10190	<>	<aphaerese>
10189	10190	<>	<elision3>
10189	10190	<>	<elision2>
10189	10190	<>	<elision1>
10189	9558	.	υ
10189	9561	s	υ
10189	9558	.	u
10189	9561	s	u
10189	9558	.	κ
10189	9311	s	κ
10189	9317	s	k
10189	9607	s	U
10189	9336	s	K
10189	9558	.	α
10189	9632	s	α
10189	9558	.	a
10189	9632	s	a
10189	9635	s	A
10189	9558	.	λ
10189	9311	s	λ
10189	9348	s	l
10189	9351	s	L
10189	8916	<1s>	<>
10190	9548	.	.
10190	9549	 	 
10190	9548	<~>	<~>
10190	9548	<split-s>	<split-s>
10190	9548	<split-h>	<split-h>
10190	9548	<name2>	<name2>
10190	9552	<aphaerese>	<aphaerese>
10190	10191	<>	<aphaerese>
10190	10191	<>	<elision3>
10190	10191	<>	<elision2>
10190	10191	<>	<elision1>
10190	9556	.	υ
10190	9559	s	υ
10190	9556	.	u
10190	9559	s	u
10190	9556	.	κ
10190	9190	s	κ
10190	9315	s	k
10190	9605	s	U
10190	9333	s	K
10190	9556	.	α
10190	9630	s	α
10190	9556	.	a
10190	9630	s	a
10190	9633	s	A
10190	9556	.	λ
10190	9190	s	λ
10190	9346	s	l
10190	9349	s	L
10190	8914	<1s>	<>
10191	9548	.	.
10191	9549	 	 
10191	9548	<~>	<~>
10191	9548	<split-s>	<split-s>
10191	9548	<split-h>	<split-h>
10191	9548	<name2>	<name2>
10191	10189	<>	<name>
10191	9552	<aphaerese>	<aphaerese>
10191	10191	<>	<aphaerese>
10191	10191	<>	<elision3>
10191	10191	<>	<elision2>
10191	10191	<>	<elision1>
10191	9556	.	υ
10191	9559	s	υ
10191	9556	.	u
10191	9559	s	u
10191	9556	.	κ
10191	9190	s	κ
10191	9315	s	k
10191	9605	s	U
10191	9333	s	K
10191	9556	.	α
10191	9630	s	α
10191	9556	.	a
10191	9630	s	a
10191	9633	s	A
10191	9556	.	λ
10191	9190	s	λ
10191	9346	s	l
10191	9349	s	L
10191	8915	<1s>	<>
10192	10193	<>	<aphaerese>
10192	10193	<>	<elision3>
10192	10193	<>	<elision2>
10192	10193	<>	<elision1>
10192	10197	H	κ
10192	9914	H	k
10192	9927	H	K
10192	10206	H	λ
10192	9941	H	l
10192	9936	H	L
10193	10194	<>	<aphaerese>
10193	10194	<>	<elision3>
10193	10194	<>	<elision2>
10193	10194	<>	<elision1>
10193	10195	H	κ
10193	9912	H	k
10193	9924	H	K
10193	10204	H	λ
10193	9939	H	l
10193	9942	H	L
10194	10192	<>	<name>
10194	10194	<>	<aphaerese>
10194	10194	<>	<elision3>
10194	10194	<>	<elision2>
10194	10194	<>	<elision1>
10194	10195	H	κ
10194	9912	H	k
10194	9924	H	K
10194	10204	H	λ
10194	9939	H	l
10194	9942	H	L
10195	10196	<>	<name>
10195	10195	<>	<aphaerese>
10195	10195	<>	<elision3>
10195	10195	<>	<elision2>
10195	10195	<>	<elision1>
10195	10199	<kappa2K>	<>
10195	10202	<kappa2L>	<>
10195	9910	<lambda2L>	<>
10196	10197	<>	<aphaerese>
10196	10197	<>	<elision3>
10196	10197	<>	<elision2>
10196	10197	<>	<elision1>
10196	10200	<kappa2K>	<>
10196	10203	<kappa2L>	<>
10196	9911	<lambda2L>	<>
10197	10195	<>	<aphaerese>
10197	10195	<>	<elision3>
10197	10195	<>	<elision2>
10197	10195	<>	<elision1>
10197	10198	<kappa2K>	<>
10197	10201	<kappa2L>	<>
10197	9909	<lambda2L>	<>
10198	9862	.	.
10198	9862	<~>	<~>
10198	9862	<split-s>	<split-s>
10198	9862	<split-h>	<split-h>
10198	9862	<name2>	<name2>
10198	9865	<aphaerese>	<aphaerese>
10198	10199	<>	<aphaerese>
10198	10199	<>	<elision3>
10198	10199	<>	<elision2>
10198	10199	<>	<elision1>
10198	9880	.	υ
10198	9833	s	υ
10198	9880	.	u
10198	9833	s	u
10198	9820	s	κ
10198	9820	s	k
10198	9874	s	U
10198	9829	s	K
10198	9880	.	α
10198	9833	s	α
10198	9880	.	a
10198	9833	s	a
10198	9877	s	A
10198	9820	s	λ
10198	9820	s	l
10198	9835	s	L
10198	9826	<1m>	<>
10199	9862	.	.
10199	9862	<~>	<~>
10199	9862	<split-s>	<split-s>
10199	9862	<split-h>	<split-h>
10199	9862	<name2>	<name2>
10199	10200	<>	<name>
10199	9865	<aphaerese>	<aphaerese>
10199	10199	<>	<aphaerese>
10199	10199	<>	<elision3>
10199	10199	<>	<elision2>
10199	10199	<>	<elision1>
10199	9880	.	υ
10199	9833	s	υ
10199	9880	.	u
10199	9833	s	u
10199	9820	s	κ
10199	9820	s	k
10199	9874	s	U
10199	9829	s	K
10199	9880	.	α
10199	9833	s	α
10199	9880	.	a
10199	9833	s	a
10199	9877	s	A
10199	9820	s	λ
10199	9820	s	l
10199	9835	s	L
10199	9827	<1m>	<>
10200	9864	.	.
10200	9864	<~>	<~>
10200	9864	<split-s>	<split-s>
10200	9864	<split-h>	<split-h>
10200	9864	<name2>	<name2>
10200	9867	<aphaerese>	<aphaerese>
10200	10198	<>	<aphaerese>
10200	10198	<>	<elision3>
10200	10198	<>	<elision2>
10200	10198	<>	<elision1>
10200	9882	.	υ
10200	9832	s	υ
10200	9882	.	u
10200	9832	s	u
10200	9819	s	κ
10200	9819	s	k
10200	9876	s	U
10200	9828	s	K
10200	9882	.	α
10200	9832	s	α
10200	9882	.	a
10200	9832	s	a
10200	9879	s	A
10200	9819	s	λ
10200	9819	s	l
10200	9834	s	L
10200	9825	<1m>	<>
10201	9892	.	.
10201	9892	<~>	<~>
10201	9892	<split-s>	<split-s>
10201	9892	<split-h>	<split-h>
10201	9892	<name2>	<name2>
10201	9895	<aphaerese>	<aphaerese>
10201	10202	<>	<aphaerese>
10201	10202	<>	<elision3>
10201	10202	<>	<elision2>
10201	10202	<>	<elision1>
10201	9898	.	υ
10201	9833	s	υ
10201	9898	.	u
10201	9833	s	u
10201	9841	s	κ
10201	9844	H	κ
10201	9841	s	k
10201	9844	H	k
10201	9874	s	U
10201	9829	s	K
10201	9844	H	K
10201	9898	.	α
10201	9833	s	α
10201	9898	.	a
10201	9833	s	a
10201	9877	s	A
10201	9841	s	λ
10201	9844	H	λ
10201	9841	s	l
10201	9844	H	l
10201	9835	s	L
10201	9844	H	L
10201	9826	<1m>	<>
10202	9892	.	.
10202	9892	<~>	<~>
10202	9892	<split-s>	<split-s>
10202	9892	<split-h>	<split-h>
10202	9892	<name2>	<name2>
10202	10203	<>	<name>
10202	9895	<aphaerese>	<aphaerese>
10202	10202	<>	<aphaerese>
10202	10202	<>	<elision3>
10202	10202	<>	<elision2>
10202	10202	<>	<elision1>
10202	9898	.	υ
10202	9833	s	υ
10202	9898	.	u
10202	9833	s	u
10202	9841	s	κ
10202	9844	H	κ
10202	9841	s	k
10202	9844	H	k
10202	9874	s	U
10202	9829	s	K
10202	9844	H	K
10202	9898	.	α
10202	9833	s	α
10202	9898	.	a
10202	9833	s	a
10202	9877	s	A
10202	9841	s	λ
10202	9844	H	λ
10202	9841	s	l
10202	9844	H	l
10202	9835	s	L
10202	9844	H	L
10202	9827	<1m>	<>
10203	9894	.	.
10203	9894	<~>	<~>
10203	9894	<split-s>	<split-s>
10203	9894	<split-h>	<split-h>
10203	9894	<name2>	<name2>
10203	9897	<aphaerese>	<aphaerese>
10203	10201	<>	<aphaerese>
10203	10201	<>	<elision3>
10203	10201	<>	<elision2>
10203	10201	<>	<elision1>
10203	9900	.	υ
10203	9832	s	υ
10203	9900	.	u
10203	9832	s	u
10203	9840	s	κ
10203	9843	H	κ
10203	9840	s	k
10203	9843	H	k
10203	9876	s	U
10203	9828	s	K
10203	9843	H	K
10203	9900	.	α
10203	9832	s	α
10203	9900	.	a
10203	9832	s	a
10203	9879	s	A
10203	9840	s	λ
10203	9843	H	λ
10203	9840	s	l
10203	9843	H	l
10203	9834	s	L
10203	9843	H	L
10203	9825	<1m>	<>
10204	10205	<>	<name>
10204	10204	<>	<aphaerese>
10204	10204	<>	<elision3>
10204	10204	<>	<elision2>
10204	10204	<>	<elision1>
10204	10208	<lambda2L>	<>
10205	10206	<>	<aphaerese>
10205	10206	<>	<elision3>
10205	10206	<>	<elision2>
10205	10206	<>	<elision1>
10205	10209	<lambda2L>	<>
10206	10204	<>	<aphaerese>
10206	10204	<>	<elision3>
10206	10204	<>	<elision2>
10206	10204	<>	<elision1>
10206	10207	<lambda2L>	<>
10207	9892	.	.
10207	9892	<~>	<~>
10207	9892	<split-s>	<split-s>
10207	9892	<split-h>	<split-h>
10207	9892	<name2>	<name2>
10207	9895	<aphaerese>	<aphaerese>
10207	10208	<>	<aphaerese>
10207	10208	<>	<elision3>
10207	10208	<>	<elision2>
10207	10208	<>	<elision1>
10207	9898	.	υ
10207	9833	s	υ
10207	9898	.	u
10207	9833	s	u
10207	9898	.	κ
10207	9841	s	κ
10207	9844	H	κ
10207	9841	s	k
10207	9844	H	k
10207	9874	s	U
10207	9829	s	K
10207	9844	H	K
10207	9898	.	α
10207	9833	s	α
10207	9898	.	a
10207	9833	s	a
10207	9877	s	A
10207	9898	.	λ
10207	9841	s	λ
10207	9844	H	λ
10207	9841	s	l
10207	9844	H	l
10207	9835	s	L
10207	9844	H	L
10207	9826	<1m>	<>
10208	9892	.	.
10208	9892	<~>	<~>
10208	9892	<split-s>	<split-s>
10208	9892	<split-h>	<split-h>
10208	9892	<name2>	<name2>
10208	10209	<>	<name>
10208	9895	<aphaerese>	<aphaerese>
10208	10208	<>	<aphaerese>
10208	10208	<>	<elision3>
10208	10208	<>	<elision2>
10208	10208	<>	<elision1>
10208	9898	.	υ
10208	9833	s	υ
10208	9898	.	u
10208	9833	s	u
10208	9898	.	κ
10208	9841	s	κ
10208	9844	H	κ
10208	9841	s	k
10208	9844	H	k
10208	9874	s	U
10208	9829	s	K
10208	9844	H	K
10208	9898	.	α
10208	9833	s	α
10208	9898	.	a
10208	9833	s	a
10208	9877	s	A
10208	9898	.	λ
10208	9841	s	λ
10208	9844	H	λ
10208	9841	s	l
10208	9844	H	l
10208	9835	s	L
10208	9844	H	L
10208	9827	<1m>	<>
10209	9894	.	.
10209	9894	<~>	<~>
10209	9894	<split-s>	<split-s>
10209	9894	<split-h>	<split-h>
10209	9894	<name2>	<name2>
10209	9897	<aphaerese>	<aphaerese>
10209	10207	<>	<aphaerese>
10209	10207	<>	<elision3>
10209	10207	<>	<elision2>
10209	10207	<>	<elision1>
10209	9900	.	υ
10209	9832	s	υ
10209	9900	.	u
10209	9832	s	u
10209	9900	.	κ
10209	9840	s	κ
10209	9843	H	κ
10209	9840	s	k
10209	9843	H	k
10209	9876	s	U
10209	9828	s	K
10209	9843	H	K
10209	9900	.	α
10209	9832	s	α
10209	9900	.	a
10209	9832	s	a
10209	9879	s	A
10209	9900	.	λ
10209	9840	s	λ
10209	9843	H	λ
10209	9840	s	l
10209	9843	H	l
10209	9834	s	L
10209	9843	H	L
10209	9825	<1m>	<>
10210	10169	<>	<name>
10210	10168	<>	<aphaerese>
10210	10168	<>	<elision3>
10210	10168	<>	<elision2>
10210	10168	<>	<elision1>
10210	10172	<kappa2K>	<>
10210	10211	<kappa2L>	<>
10210	9699	<lambda2L>	<>
10211	9548	.	.
10211	9549	 	 
10211	9548	<~>	<~>
10211	9548	<split-s>	<split-s>
10211	9548	<split-h>	<split-h>
10211	9548	<name2>	<name2>
10211	10176	<>	<name>
10211	9552	<aphaerese>	<aphaerese>
10211	10175	<>	<aphaerese>
10211	10175	<>	<elision3>
10211	10175	<>	<elision2>
10211	10175	<>	<elision1>
10211	9556	.	υ
10211	9559	s	υ
10211	9556	.	u
10211	9559	s	u
10211	9190	s	κ
10211	9315	s	k
10211	9605	s	U
10211	9333	s	K
10211	9556	.	α
10211	9630	s	α
10211	9556	.	a
10211	9630	s	a
10211	9633	s	A
10211	9190	s	λ
10211	9346	s	l
10211	9349	s	L
10211	10212	<1s>	<>
10212	107	.	.
10212	108	 	 
10212	107	<~>	<~>
10212	107	<split-s>	<split-s>
10212	107	<split-h>	<split-h>
10212	107	<name2>	<name2>
10212	10177	<>	<name>
10212	111	<aphaerese>	<aphaerese>
10212	10179	<>	<aphaerese>
10212	10179	<>	<elision3>
10212	10179	<>	<elision2>
10212	10179	<>	<elision1>
10212	8110	.	υ
10212	8110	.	u
10212	8110	.	α
10212	8110	.	a
10212	10213	<K>	<>
10213	8160	.	.
10213	8160	<~>	<~>
10213	8160	<split-s>	<split-s>
10213	8160	<split-h>	<split-h>
10213	8160	<name2>	<name2>
10213	10181	<>	<name>
10213	8163	<aphaerese>	<aphaerese>
10213	10180	<>	<aphaerese>
10213	10180	<>	<elision3>
10213	10180	<>	<elision2>
10213	10180	<>	<elision1>
10213	8159	.	υ
10213	8159	.	u
10213	8159	.	α
10213	8159	.	a
10214	10215	<>	<name>
10214	10214	<>	<aphaerese>
10214	10214	<>	<elision3>
10214	10214	<>	<elision2>
10214	10214	<>	<elision1>
10214	10161	<K2kl>	<>
10215	10216	<>	<aphaerese>
10215	10216	<>	<elision3>
10215	10216	<>	<elision2>
10215	10216	<>	<elision1>
10215	10162	<K2kl>	<>
10216	10214	<>	<aphaerese>
10216	10214	<>	<elision3>
10216	10214	<>	<elision2>
10216	10214	<>	<elision1>
10216	10163	<K2kl>	<>
10217	10218	<>	<name>
10217	10217	<>	<aphaerese>
10217	10217	<>	<elision3>
10217	10217	<>	<elision2>
10217	10217	<>	<elision1>
10217	10161	<L2kl>	<>
10218	10219	<>	<aphaerese>
10218	10219	<>	<elision3>
10218	10219	<>	<elision2>
10218	10219	<>	<elision1>
10218	10162	<L2kl>	<>
10219	10217	<>	<aphaerese>
10219	10217	<>	<elision3>
10219	10217	<>	<elision2>
10219	10217	<>	<elision1>
10219	10163	<L2kl>	<>
10220	10221	<>	<aphaerese>
10220	10221	<>	<elision3>
10220	10221	<>	<elision2>
10220	10221	<>	<elision1>
10220	9989	<3s>	<>
10221	10222	<>	<name>
10221	10221	<>	<aphaerese>
10221	10221	<>	<elision3>
10221	10221	<>	<elision2>
10221	10221	<>	<elision1>
10221	9990	<3s>	<>
10222	10220	<>	<aphaerese>
10222	10220	<>	<elision3>
10222	10220	<>	<elision2>
10222	10220	<>	<elision1>
10222	9991	<3s>	<>
10223	10224	<>	<aphaerese>
10223	10224	<>	<elision3>
10223	10224	<>	<elision2>
10223	10224	<>	<elision1>
10223	10128	<3s>	<>
10224	10225	<>	<name>
10224	10224	<>	<aphaerese>
10224	10224	<>	<elision3>
10224	10224	<>	<elision2>
10224	10224	<>	<elision1>
10224	10129	<3s>	<>
10225	10223	<>	<aphaerese>
10225	10223	<>	<elision3>
10225	10223	<>	<elision2>
10225	10223	<>	<elision1>
10225	10130	<3s>	<>
10226	9977	.	.
10226	9977	 	 
10226	9977	<~>	<~>
10226	9977	<split-s>	<split-s>
10226	9977	<split-h>	<split-h>
10226	9977	<name2>	<name2>
10226	10227	<>	<name>
10226	9980	<aphaerese>	<aphaerese>
10226	10226	<>	<aphaerese>
10226	10229	<elision3>	<elision3>
10226	10226	<>	<elision3>
10226	10229	<elision2>	<elision2>
10226	10226	<>	<elision2>
10226	10229	<elision1>	<elision1>
10226	10226	<>	<elision1>
10226	10141	.	υ
10226	10141	.	u
10226	10141	.	κ
10226	10141	.	α
10226	10141	.	a
10226	10141	.	λ
10226	10330	<4s>	<>
10227	9979	.	.
10227	9979	 	 
10227	9979	<~>	<~>
10227	9979	<split-s>	<split-s>
10227	9979	<split-h>	<split-h>
10227	9979	<name2>	<name2>
10227	9982	<aphaerese>	<aphaerese>
10227	10228	<>	<aphaerese>
10227	10231	<elision3>	<elision3>
10227	10228	<>	<elision3>
10227	10231	<elision2>	<elision2>
10227	10228	<>	<elision2>
10227	10231	<elision1>	<elision1>
10227	10228	<>	<elision1>
10227	10143	.	υ
10227	10143	.	u
10227	10143	.	κ
10227	10143	.	α
10227	10143	.	a
10227	10143	.	λ
10227	10331	<4s>	<>
10228	9977	.	.
10228	9977	 	 
10228	9977	<~>	<~>
10228	9977	<split-s>	<split-s>
10228	9977	<split-h>	<split-h>
10228	9977	<name2>	<name2>
10228	9980	<aphaerese>	<aphaerese>
10228	10226	<>	<aphaerese>
10228	10229	<elision3>	<elision3>
10228	10226	<>	<elision3>
10228	10229	<elision2>	<elision2>
10228	10226	<>	<elision2>
10228	10229	<elision1>	<elision1>
10228	10226	<>	<elision1>
10228	10141	.	υ
10228	10141	.	u
10228	10141	.	κ
10228	10141	.	α
10228	10141	.	a
10228	10141	.	λ
10228	10329	<4s>	<>
10229	9977	.	.
10229	9977	 	 
10229	9977	<~>	<~>
10229	9977	<split-s>	<split-s>
10229	9977	<split-h>	<split-h>
10229	9977	<name2>	<name2>
10229	10230	<>	<name>
10229	9980	<aphaerese>	<aphaerese>
10229	10229	<>	<aphaerese>
10229	9977	<elision3>	<elision3>
10229	10229	<>	<elision3>
10229	9977	<elision2>	<elision2>
10229	10229	<>	<elision2>
10229	9977	<elision1>	<elision1>
10229	10229	<>	<elision1>
10229	10141	.	υ
10229	10141	.	u
10229	9983	.	κ
10229	10141	.	α
10229	10141	.	a
10229	10233	<4s>	<>
10230	9979	.	.
10230	9979	 	 
10230	9979	<~>	<~>
10230	9979	<split-s>	<split-s>
10230	9979	<split-h>	<split-h>
10230	9979	<name2>	<name2>
10230	9982	<aphaerese>	<aphaerese>
10230	10231	<>	<aphaerese>
10230	9979	<elision3>	<elision3>
10230	10231	<>	<elision3>
10230	9979	<elision2>	<elision2>
10230	10231	<>	<elision2>
10230	9979	<elision1>	<elision1>
10230	10231	<>	<elision1>
10230	10143	.	υ
10230	10143	.	u
10230	9985	.	κ
10230	10143	.	α
10230	10143	.	a
10230	10234	<4s>	<>
10231	9977	.	.
10231	9977	 	 
10231	9977	<~>	<~>
10231	9977	<split-s>	<split-s>
10231	9977	<split-h>	<split-h>
10231	9977	<name2>	<name2>
10231	9980	<aphaerese>	<aphaerese>
10231	10229	<>	<aphaerese>
10231	9977	<elision3>	<elision3>
10231	10229	<>	<elision3>
10231	9977	<elision2>	<elision2>
10231	10229	<>	<elision2>
10231	9977	<elision1>	<elision1>
10231	10229	<>	<elision1>
10231	10141	.	υ
10231	10141	.	u
10231	9983	.	κ
10231	10141	.	α
10231	10141	.	a
10231	10232	<4s>	<>
10232	71	.	.
10232	72	 	 
10232	71	<~>	<~>
10232	71	<split-s>	<split-s>
10232	71	<split-h>	<split-h>
10232	71	<name2>	<name2>
10232	75	<aphaerese>	<aphaerese>
10232	10233	<>	<aphaerese>
10232	71	<elision3>	<elision3>
10232	10233	<>	<elision3>
10232	71	<elision2>	<elision2>
10232	10233	<>	<elision2>
10232	71	<elision1>	<elision1>
10232	10233	<>	<elision1>
10232	9751	.	υ
10232	9795	H	υ
10232	9751	.	u
10232	9797	H	u
10232	78	.	κ
10232	10316	H	κ
10232	10320	H	k
10232	9718	H	U
10232	10324	H	K
10232	9751	.	α
10232	9781	H	α
10232	9751	.	a
10232	9786	H	a
10232	9548	H	A
10232	10272	H	λ
10232	10278	H	l
10232	10328	H	L
10232	10281	<K>	<>
10233	71	.	.
10233	72	 	 
10233	71	<~>	<~>
10233	71	<split-s>	<split-s>
10233	71	<split-h>	<split-h>
10233	71	<name2>	<name2>
10233	10234	<>	<name>
10233	75	<aphaerese>	<aphaerese>
10233	10233	<>	<aphaerese>
10233	71	<elision3>	<elision3>
10233	10233	<>	<elision3>
10233	71	<elision2>	<elision2>
10233	10233	<>	<elision2>
10233	71	<elision1>	<elision1>
10233	10233	<>	<elision1>
10233	9751	.	υ
10233	9795	H	υ
10233	9751	.	u
10233	9797	H	u
10233	78	.	κ
10233	10316	H	κ
10233	10320	H	k
10233	9718	H	U
10233	10324	H	K
10233	9751	.	α
10233	9781	H	α
10233	9751	.	a
10233	9786	H	a
10233	9548	H	A
10233	10272	H	λ
10233	10278	H	l
10233	10328	H	L
10233	10282	<K>	<>
10234	70	.	.
10234	74	 	 
10234	70	<~>	<~>
10234	70	<split-s>	<split-s>
10234	70	<split-h>	<split-h>
10234	70	<name2>	<name2>
10234	77	<aphaerese>	<aphaerese>
10234	10232	<>	<aphaerese>
10234	70	<elision3>	<elision3>
10234	10232	<>	<elision3>
10234	70	<elision2>	<elision2>
10234	10232	<>	<elision2>
10234	70	<elision1>	<elision1>
10234	10232	<>	<elision1>
10234	9753	.	υ
10234	9790	H	υ
10234	9753	.	u
10234	9794	H	u
10234	80	.	κ
10234	10235	H	κ
10234	10254	H	k
10234	9720	H	U
10234	10267	H	K
10234	9753	.	α
10234	9780	H	α
10234	9753	.	a
10234	9785	H	a
10234	9551	H	A
10234	10271	H	λ
10234	10277	H	l
10234	10275	H	L
10234	10280	<K>	<>
10235	10236	<>	<aphaerese>
10235	10236	<>	<elision3>
10235	10236	<>	<elision2>
10235	10236	<>	<elision1>
10235	10239	<kappa2K>	<>
10235	10251	<kappa2L>	<>
10235	9701	<lambda2L>	<>
10236	10237	<>	<name>
10236	10236	<>	<aphaerese>
10236	10236	<>	<elision3>
10236	10236	<>	<elision2>
10236	10236	<>	<elision1>
10236	10240	<kappa2K>	<>
10236	10243	<kappa2L>	<>
10236	9699	<lambda2L>	<>
10237	10238	<>	<aphaerese>
10237	10238	<>	<elision3>
10237	10238	<>	<elision2>
10237	10238	<>	<elision1>
10237	10241	<kappa2K>	<>
10237	10244	<kappa2L>	<>
10237	9700	<lambda2L>	<>
10238	10236	<>	<aphaerese>
10238	10236	<>	<elision3>
10238	10236	<>	<elision2>
10238	10236	<>	<elision1>
10238	10239	<kappa2K>	<>
10238	10242	<kappa2L>	<>
10238	9701	<lambda2L>	<>
10239	9382	.	.
10239	9383	 	 
10239	9382	<~>	<~>
10239	9382	<split-s>	<split-s>
10239	9382	<split-h>	<split-h>
10239	9382	<name2>	<name2>
10239	9386	<aphaerese>	<aphaerese>
10239	10240	<>	<aphaerese>
10239	9519	<elision3>	<elision3>
10239	10240	<>	<elision3>
10239	9519	<elision2>	<elision2>
10239	10240	<>	<elision2>
10239	9519	<elision1>	<elision1>
10239	10240	<>	<elision1>
10239	9390	.	υ
10239	9393	s	υ
10239	9390	.	u
10239	9393	s	u
10239	9456	s	U
10239	9390	.	α
10239	9484	s	α
10239	9390	.	a
10239	9484	s	a
10239	9487	s	A
10240	9382	.	.
10240	9383	 	 
10240	9382	<~>	<~>
10240	9382	<split-s>	<split-s>
10240	9382	<split-h>	<split-h>
10240	9382	<name2>	<name2>
10240	10241	<>	<name>
10240	9386	<aphaerese>	<aphaerese>
10240	10240	<>	<aphaerese>
10240	9519	<elision3>	<elision3>
10240	10240	<>	<elision3>
10240	9519	<elision2>	<elision2>
10240	10240	<>	<elision2>
10240	9519	<elision1>	<elision1>
10240	10240	<>	<elision1>
10240	9390	.	υ
10240	9393	s	υ
10240	9390	.	u
10240	9393	s	u
10240	9456	s	U
10240	9390	.	α
10240	9484	s	α
10240	9390	.	a
10240	9484	s	a
10240	9487	s	A
10241	9385	.	.
10241	9388	 	 
10241	9385	<~>	<~>
10241	9385	<split-s>	<split-s>
10241	9385	<split-h>	<split-h>
10241	9385	<name2>	<name2>
10241	9514	<aphaerese>	<aphaerese>
10241	10239	<>	<aphaerese>
10241	9521	<elision3>	<elision3>
10241	10239	<>	<elision3>
10241	9521	<elision2>	<elision2>
10241	10239	<>	<elision2>
10241	9521	<elision1>	<elision1>
10241	10239	<>	<elision1>
10241	9392	.	υ
10241	9395	s	υ
10241	9392	.	u
10241	9395	s	u
10241	9458	s	U
10241	9392	.	α
10241	9486	s	α
10241	9392	.	a
10241	9486	s	a
10241	9489	s	A
10242	9548	.	.
10242	9549	 	 
10242	9548	<~>	<~>
10242	9548	<split-s>	<split-s>
10242	9548	<split-h>	<split-h>
10242	9548	<name2>	<name2>
10242	9552	<aphaerese>	<aphaerese>
10242	10243	<>	<aphaerese>
10242	9665	<elision3>	<elision3>
10242	10243	<>	<elision3>
10242	9665	<elision2>	<elision2>
10242	10243	<>	<elision2>
10242	9665	<elision1>	<elision1>
10242	10243	<>	<elision1>
10242	9556	.	υ
10242	9559	s	υ
10242	9556	.	u
10242	9559	s	u
10242	9605	s	U
10242	9556	.	α
10242	9630	s	α
10242	9556	.	a
10242	9630	s	a
10242	9633	s	A
10242	10246	<1s>	<>
10243	9548	.	.
10243	9549	 	 
10243	9548	<~>	<~>
10243	9548	<split-s>	<split-s>
10243	9548	<split-h>	<split-h>
10243	9548	<name2>	<name2>
10243	10244	<>	<name>
10243	9552	<aphaerese>	<aphaerese>
10243	10243	<>	<aphaerese>
10243	9665	<elision3>	<elision3>
10243	10243	<>	<elision3>
10243	9665	<elision2>	<elision2>
10243	10243	<>	<elision2>
10243	9665	<elision1>	<elision1>
10243	10243	<>	<elision1>
10243	9556	.	υ
10243	9559	s	υ
10243	9556	.	u
10243	9559	s	u
10243	9605	s	U
10243	9556	.	α
10243	9630	s	α
10243	9556	.	a
10243	9630	s	a
10243	9633	s	A
10243	10247	<1s>	<>
10244	9551	.	.
10244	9554	 	 
10244	9551	<~>	<~>
10244	9551	<split-s>	<split-s>
10244	9551	<split-h>	<split-h>
10244	9551	<name2>	<name2>
10244	9660	<aphaerese>	<aphaerese>
10244	10242	<>	<aphaerese>
10244	9667	<elision3>	<elision3>
10244	10242	<>	<elision3>
10244	9667	<elision2>	<elision2>
10244	10242	<>	<elision2>
10244	9667	<elision1>	<elision1>
10244	10242	<>	<elision1>
10244	9558	.	υ
10244	9561	s	υ
10244	9558	.	u
10244	9561	s	u
10244	9607	s	U
10244	9558	.	α
10244	9632	s	α
10244	9558	.	a
10244	9632	s	a
10244	9635	s	A
10244	10245	<1s>	<>
10245	106	.	.
10245	110	 	 
10245	106	<~>	<~>
10245	106	<split-s>	<split-s>
10245	106	<split-h>	<split-h>
10245	106	<name2>	<name2>
10245	113	<aphaerese>	<aphaerese>
10245	10246	<>	<aphaerese>
10245	8691	<elision3>	<elision3>
10245	10246	<>	<elision3>
10245	8691	<elision2>	<elision2>
10245	10246	<>	<elision2>
10245	8691	<elision1>	<elision1>
10245	10246	<>	<elision1>
10245	8112	.	υ
10245	8149	H	υ
10245	8112	.	u
10245	8153	H	u
10245	8079	H	U
10245	8112	.	α
10245	8139	H	α
10245	8112	.	a
10245	8144	H	a
10245	7910	H	A
10245	10249	<K>	<>
10246	107	.	.
10246	108	 	 
10246	107	<~>	<~>
10246	107	<split-s>	<split-s>
10246	107	<split-h>	<split-h>
10246	107	<name2>	<name2>
10246	111	<aphaerese>	<aphaerese>
10246	10247	<>	<aphaerese>
10246	8692	<elision3>	<elision3>
10246	10247	<>	<elision3>
10246	8692	<elision2>	<elision2>
10246	10247	<>	<elision2>
10246	8692	<elision1>	<elision1>
10246	10247	<>	<elision1>
10246	8110	.	υ
10246	8154	H	υ
10246	8110	.	u
10246	8156	H	u
10246	8077	H	U
10246	8110	.	α
10246	8140	H	α
10246	8110	.	a
10246	8145	H	a
10246	7907	H	A
10246	10250	<K>	<>
10247	107	.	.
10247	108	 	 
10247	107	<~>	<~>
10247	107	<split-s>	<split-s>
10247	107	<split-h>	<split-h>
10247	107	<name2>	<name2>
10247	10245	<>	<name>
10247	111	<aphaerese>	<aphaerese>
10247	10247	<>	<aphaerese>
10247	8692	<elision3>	<elision3>
10247	10247	<>	<elision3>
10247	8692	<elision2>	<elision2>
10247	10247	<>	<elision2>
10247	8692	<elision1>	<elision1>
10247	10247	<>	<elision1>
10247	8110	.	υ
10247	8154	H	υ
10247	8110	.	u
10247	8156	H	u
10247	8077	H	U
10247	8110	.	α
10247	8140	H	α
10247	8110	.	a
10247	8145	H	a
10247	7907	H	A
10247	10248	<K>	<>
10248	8160	.	.
10248	8160	<~>	<~>
10248	8160	<split-s>	<split-s>
10248	8160	<split-h>	<split-h>
10248	8160	<name2>	<name2>
10248	10249	<>	<name>
10248	8163	<aphaerese>	<aphaerese>
10248	10248	<>	<aphaerese>
10248	8641	<elision3>	<elision3>
10248	10248	<>	<elision3>
10248	8641	<elision2>	<elision2>
10248	10248	<>	<elision2>
10248	8641	<elision1>	<elision1>
10248	10248	<>	<elision1>
10248	8159	.	υ
10248	8302	H	υ
10248	8159	.	u
10248	8311	H	u
10248	8280	H	U
10248	8159	.	α
10248	8314	H	α
10248	8159	.	a
10248	8317	H	a
10248	8251	H	A
10249	8162	.	.
10249	8162	<~>	<~>
10249	8162	<split-s>	<split-s>
10249	8162	<split-h>	<split-h>
10249	8162	<name2>	<name2>
10249	8165	<aphaerese>	<aphaerese>
10249	10250	<>	<aphaerese>
10249	8640	<elision3>	<elision3>
10249	10250	<>	<elision3>
10249	8640	<elision2>	<elision2>
10249	10250	<>	<elision2>
10249	8640	<elision1>	<elision1>
10249	10250	<>	<elision1>
10249	8158	.	υ
10249	8304	H	υ
10249	8158	.	u
10249	8313	H	u
10249	8282	H	U
10249	8158	.	α
10249	8316	H	α
10249	8158	.	a
10249	8319	H	a
10249	8253	H	A
10250	8160	.	.
10250	8160	<~>	<~>
10250	8160	<split-s>	<split-s>
10250	8160	<split-h>	<split-h>
10250	8160	<name2>	<name2>
10250	8163	<aphaerese>	<aphaerese>
10250	10248	<>	<aphaerese>
10250	8641	<elision3>	<elision3>
10250	10248	<>	<elision3>
10250	8641	<elision2>	<elision2>
10250	10248	<>	<elision2>
10250	8641	<elision1>	<elision1>
10250	10248	<>	<elision1>
10250	8159	.	υ
10250	8302	H	υ
10250	8159	.	u
10250	8311	H	u
10250	8280	H	U
10250	8159	.	α
10250	8314	H	α
10250	8159	.	a
10250	8317	H	a
10250	8251	H	A
10251	9548	.	.
10251	9549	 	 
10251	9548	<~>	<~>
10251	9548	<split-s>	<split-s>
10251	9548	<split-h>	<split-h>
10251	9548	<name2>	<name2>
10251	9552	<aphaerese>	<aphaerese>
10251	10243	<>	<aphaerese>
10251	9665	<elision3>	<elision3>
10251	10243	<>	<elision3>
10251	9665	<elision2>	<elision2>
10251	10243	<>	<elision2>
10251	9665	<elision1>	<elision1>
10251	10243	<>	<elision1>
10251	9556	.	υ
10251	9559	s	υ
10251	9556	.	u
10251	9559	s	u
10251	9605	s	U
10251	9556	.	α
10251	9630	s	α
10251	9556	.	a
10251	9630	s	a
10251	9633	s	A
10251	10252	<1s>	<>
10252	107	.	.
10252	108	 	 
10252	107	<~>	<~>
10252	107	<split-s>	<split-s>
10252	107	<split-h>	<split-h>
10252	107	<name2>	<name2>
10252	111	<aphaerese>	<aphaerese>
10252	10247	<>	<aphaerese>
10252	8692	<elision3>	<elision3>
10252	10247	<>	<elision3>
10252	8692	<elision2>	<elision2>
10252	10247	<>	<elision2>
10252	8692	<elision1>	<elision1>
10252	10247	<>	<elision1>
10252	8110	.	υ
10252	8110	.	u
10252	8110	.	α
10252	8110	.	a
10252	10253	<K>	<>
10253	8160	.	.
10253	8160	<~>	<~>
10253	8160	<split-s>	<split-s>
10253	8160	<split-h>	<split-h>
10253	8160	<name2>	<name2>
10253	8163	<aphaerese>	<aphaerese>
10253	10248	<>	<aphaerese>
10253	8641	<elision3>	<elision3>
10253	10248	<>	<elision3>
10253	8641	<elision2>	<elision2>
10253	10248	<>	<elision2>
10253	8641	<elision1>	<elision1>
10253	10248	<>	<elision1>
10253	8159	.	υ
10253	8159	.	u
10253	8159	.	α
10253	8159	.	a
10254	10255	<>	<aphaerese>
10254	10255	<>	<elision3>
10254	10255	<>	<elision2>
10254	10255	<>	<elision1>
10254	10258	<k2K>	<>
10254	10264	<k2L>	<>
10254	9701	<l2L>	<>
10255	10256	<>	<name>
10255	10255	<>	<aphaerese>
10255	10255	<>	<elision3>
10255	10255	<>	<elision2>
10255	10255	<>	<elision1>
10255	10259	<k2K>	<>
10255	10262	<k2L>	<>
10255	9699	<l2L>	<>
10256	10257	<>	<aphaerese>
10256	10257	<>	<elision3>
10256	10257	<>	<elision2>
10256	10257	<>	<elision1>
10256	10260	<k2K>	<>
10256	10263	<k2L>	<>
10256	9700	<l2L>	<>
10257	10255	<>	<aphaerese>
10257	10255	<>	<elision3>
10257	10255	<>	<elision2>
10257	10255	<>	<elision1>
10257	10258	<k2K>	<>
10257	10261	<k2L>	<>
10257	9701	<l2L>	<>
10258	9382	.	.
10258	9383	 	 
10258	9382	<~>	<~>
10258	9382	<split-s>	<split-s>
10258	9382	<split-h>	<split-h>
10258	9382	<name2>	<name2>
10258	9386	<aphaerese>	<aphaerese>
10258	10259	<>	<aphaerese>
10258	9382	<elision3>	<elision3>
10258	10259	<>	<elision3>
10258	9382	<elision2>	<elision2>
10258	10259	<>	<elision2>
10258	9382	<elision1>	<elision1>
10258	10259	<>	<elision1>
10258	9390	.	υ
10258	9393	s	υ
10258	9390	.	u
10258	9393	s	u
10258	9456	s	U
10258	9390	.	α
10258	9484	s	α
10258	9390	.	a
10258	9484	s	a
10258	9487	s	A
10259	9382	.	.
10259	9383	 	 
10259	9382	<~>	<~>
10259	9382	<split-s>	<split-s>
10259	9382	<split-h>	<split-h>
10259	9382	<name2>	<name2>
10259	10260	<>	<name>
10259	9386	<aphaerese>	<aphaerese>
10259	10259	<>	<aphaerese>
10259	9382	<elision3>	<elision3>
10259	10259	<>	<elision3>
10259	9382	<elision2>	<elision2>
10259	10259	<>	<elision2>
10259	9382	<elision1>	<elision1>
10259	10259	<>	<elision1>
10259	9390	.	υ
10259	9393	s	υ
10259	9390	.	u
10259	9393	s	u
10259	9456	s	U
10259	9390	.	α
10259	9484	s	α
10259	9390	.	a
10259	9484	s	a
10259	9487	s	A
10260	9385	.	.
10260	9388	 	 
10260	9385	<~>	<~>
10260	9385	<split-s>	<split-s>
10260	9385	<split-h>	<split-h>
10260	9385	<name2>	<name2>
10260	9514	<aphaerese>	<aphaerese>
10260	10258	<>	<aphaerese>
10260	9385	<elision3>	<elision3>
10260	10258	<>	<elision3>
10260	9385	<elision2>	<elision2>
10260	10258	<>	<elision2>
10260	9385	<elision1>	<elision1>
10260	10258	<>	<elision1>
10260	9392	.	υ
10260	9395	s	υ
10260	9392	.	u
10260	9395	s	u
10260	9458	s	U
10260	9392	.	α
10260	9486	s	α
10260	9392	.	a
10260	9486	s	a
10260	9489	s	A
10261	9548	.	.
10261	9549	 	 
10261	9548	<~>	<~>
10261	9548	<split-s>	<split-s>
10261	9548	<split-h>	<split-h>
10261	9548	<name2>	<name2>
10261	9552	<aphaerese>	<aphaerese>
10261	10262	<>	<aphaerese>
10261	9548	<elision3>	<elision3>
10261	10262	<>	<elision3>
10261	9548	<elision2>	<elision2>
10261	10262	<>	<elision2>
10261	9548	<elision1>	<elision1>
10261	10262	<>	<elision1>
10261	9556	.	υ
10261	9559	s	υ
10261	9556	.	u
10261	9559	s	u
10261	9605	s	U
10261	9556	.	α
10261	9630	s	α
10261	9556	.	a
10261	9630	s	a
10261	9633	s	A
10261	8963	<1s>	<>
10262	9548	.	.
10262	9549	 	 
10262	9548	<~>	<~>
10262	9548	<split-s>	<split-s>
10262	9548	<split-h>	<split-h>
10262	9548	<name2>	<name2>
10262	10263	<>	<name>
10262	9552	<aphaerese>	<aphaerese>
10262	10262	<>	<aphaerese>
10262	9548	<elision3>	<elision3>
10262	10262	<>	<elision3>
10262	9548	<elision2>	<elision2>
10262	10262	<>	<elision2>
10262	9548	<elision1>	<elision1>
10262	10262	<>	<elision1>
10262	9556	.	υ
10262	9559	s	υ
10262	9556	.	u
10262	9559	s	u
10262	9605	s	U
10262	9556	.	α
10262	9630	s	α
10262	9556	.	a
10262	9630	s	a
10262	9633	s	A
10262	8964	<1s>	<>
10263	9551	.	.
10263	9554	 	 
10263	9551	<~>	<~>
10263	9551	<split-s>	<split-s>
10263	9551	<split-h>	<split-h>
10263	9551	<name2>	<name2>
10263	9660	<aphaerese>	<aphaerese>
10263	10261	<>	<aphaerese>
10263	9551	<elision3>	<elision3>
10263	10261	<>	<elision3>
10263	9551	<elision2>	<elision2>
10263	10261	<>	<elision2>
10263	9551	<elision1>	<elision1>
10263	10261	<>	<elision1>
10263	9558	.	υ
10263	9561	s	υ
10263	9558	.	u
10263	9561	s	u
10263	9607	s	U
10263	9558	.	α
10263	9632	s	α
10263	9558	.	a
10263	9632	s	a
10263	9635	s	A
10263	8965	<1s>	<>
10264	9548	.	.
10264	9549	 	 
10264	9548	<~>	<~>
10264	9548	<split-s>	<split-s>
10264	9548	<split-h>	<split-h>
10264	9548	<name2>	<name2>
10264	9552	<aphaerese>	<aphaerese>
10264	10262	<>	<aphaerese>
10264	9548	<elision3>	<elision3>
10264	10262	<>	<elision3>
10264	9548	<elision2>	<elision2>
10264	10262	<>	<elision2>
10264	9548	<elision1>	<elision1>
10264	10262	<>	<elision1>
10264	9556	.	υ
10264	9559	s	υ
10264	9556	.	u
10264	9559	s	u
10264	9605	s	U
10264	9556	.	α
10264	9630	s	α
10264	9556	.	a
10264	9630	s	a
10264	9633	s	A
10264	10265	<1s>	<>
10265	107	.	.
10265	108	 	 
10265	107	<~>	<~>
10265	107	<split-s>	<split-s>
10265	107	<split-h>	<split-h>
10265	107	<name2>	<name2>
10265	111	<aphaerese>	<aphaerese>
10265	8964	<>	<aphaerese>
10265	107	<elision3>	<elision3>
10265	8964	<>	<elision3>
10265	107	<elision2>	<elision2>
10265	8964	<>	<elision2>
10265	107	<elision1>	<elision1>
10265	8964	<>	<elision1>
10265	8110	.	υ
10265	8110	.	u
10265	8110	.	α
10265	8110	.	a
10265	10266	<K>	<>
10266	8160	.	.
10266	8160	<~>	<~>
10266	8160	<split-s>	<split-s>
10266	8160	<split-h>	<split-h>
10266	8160	<name2>	<name2>
10266	8163	<aphaerese>	<aphaerese>
10266	8968	<>	<aphaerese>
10266	8160	<elision3>	<elision3>
10266	8968	<>	<elision3>
10266	8160	<elision2>	<elision2>
10266	8968	<>	<elision2>
10266	8160	<elision1>	<elision1>
10266	8968	<>	<elision1>
10266	8159	.	υ
10266	8159	.	u
10266	8159	.	α
10266	8159	.	a
10267	9382	.	.
10267	9383	 	 
10267	9382	<~>	<~>
10267	9382	<split-s>	<split-s>
10267	9382	<split-h>	<split-h>
10267	9382	<name2>	<name2>
10267	9386	<aphaerese>	<aphaerese>
10267	10268	<>	<aphaerese>
10267	9382	<elision3>	<elision3>
10267	10268	<>	<elision3>
10267	9382	<elision2>	<elision2>
10267	10268	<>	<elision2>
10267	9382	<elision1>	<elision1>
10267	10268	<>	<elision1>
10267	9390	.	υ
10267	9393	s	υ
10267	9390	.	u
10267	9393	s	u
10267	9556	.	κ
10267	9456	s	U
10267	9390	.	α
10267	9484	s	α
10267	9390	.	a
10267	9484	s	a
10267	9487	s	A
10267	9556	.	λ
10267	8879	<1s>	<>
10267	10264	<K2L>	<>
10268	9382	.	.
10268	9383	 	 
10268	9382	<~>	<~>
10268	9382	<split-s>	<split-s>
10268	9382	<split-h>	<split-h>
10268	9382	<name2>	<name2>
10268	10269	<>	<name>
10268	9386	<aphaerese>	<aphaerese>
10268	10268	<>	<aphaerese>
10268	9382	<elision3>	<elision3>
10268	10268	<>	<elision3>
10268	9382	<elision2>	<elision2>
10268	10268	<>	<elision2>
10268	9382	<elision1>	<elision1>
10268	10268	<>	<elision1>
10268	9390	.	υ
10268	9393	s	υ
10268	9390	.	u
10268	9393	s	u
10268	9556	.	κ
10268	9456	s	U
10268	9390	.	α
10268	9484	s	α
10268	9390	.	a
10268	9484	s	a
10268	9487	s	A
10268	9556	.	λ
10268	8880	<1s>	<>
10268	10262	<K2L>	<>
10269	9385	.	.
10269	9388	 	 
10269	9385	<~>	<~>
10269	9385	<split-s>	<split-s>
10269	9385	<split-h>	<split-h>
10269	9385	<name2>	<name2>
10269	9514	<aphaerese>	<aphaerese>
10269	10270	<>	<aphaerese>
10269	9385	<elision3>	<elision3>
10269	10270	<>	<elision3>
10269	9385	<elision2>	<elision2>
10269	10270	<>	<elision2>
10269	9385	<elision1>	<elision1>
10269	10270	<>	<elision1>
10269	9392	.	υ
10269	9395	s	υ
10269	9392	.	u
10269	9395	s	u
10269	9558	.	κ
10269	9458	s	U
10269	9392	.	α
10269	9486	s	α
10269	9392	.	a
10269	9486	s	a
10269	9489	s	A
10269	9558	.	λ
10269	8881	<1s>	<>
10269	10263	<K2L>	<>
10270	9382	.	.
10270	9383	 	 
10270	9382	<~>	<~>
10270	9382	<split-s>	<split-s>
10270	9382	<split-h>	<split-h>
10270	9382	<name2>	<name2>
10270	9386	<aphaerese>	<aphaerese>
10270	10268	<>	<aphaerese>
10270	9382	<elision3>	<elision3>
10270	10268	<>	<elision3>
10270	9382	<elision2>	<elision2>
10270	10268	<>	<elision2>
10270	9382	<elision1>	<elision1>
10270	10268	<>	<elision1>
10270	9390	.	υ
10270	9393	s	υ
10270	9390	.	u
10270	9393	s	u
10270	9556	.	κ
10270	9456	s	U
10270	9390	.	α
10270	9484	s	α
10270	9390	.	a
10270	9484	s	a
10270	9487	s	A
10270	9556	.	λ
10270	8879	<1s>	<>
10270	10261	<K2L>	<>
10271	10272	<>	<aphaerese>
10271	10272	<>	<elision3>
10271	10272	<>	<elision2>
10271	10272	<>	<elision1>
10271	10275	<lambda2L>	<>
10272	10273	<>	<name>
10272	10272	<>	<aphaerese>
10272	10272	<>	<elision3>
10272	10272	<>	<elision2>
10272	10272	<>	<elision1>
10272	10276	<lambda2L>	<>
10273	10271	<>	<aphaerese>
10273	10271	<>	<elision3>
10273	10271	<>	<elision2>
10273	10271	<>	<elision1>
10273	10274	<lambda2L>	<>
10274	9551	.	.
10274	9554	 	 
10274	9551	<~>	<~>
10274	9551	<split-s>	<split-s>
10274	9551	<split-h>	<split-h>
10274	9551	<name2>	<name2>
10274	9660	<aphaerese>	<aphaerese>
10274	10275	<>	<aphaerese>
10274	9551	<elision3>	<elision3>
10274	10275	<>	<elision3>
10274	9551	<elision2>	<elision2>
10274	10275	<>	<elision2>
10274	9551	<elision1>	<elision1>
10274	10275	<>	<elision1>
10274	9558	.	υ
10274	9561	s	υ
10274	9558	.	u
10274	9561	s	u
10274	9558	.	κ
10274	9607	s	U
10274	9558	.	α
10274	9632	s	α
10274	9558	.	a
10274	9632	s	a
10274	9635	s	A
10274	9558	.	λ
10274	8952	<1s>	<>
10275	9548	.	.
10275	9549	 	 
10275	9548	<~>	<~>
10275	9548	<split-s>	<split-s>
10275	9548	<split-h>	<split-h>
10275	9548	<name2>	<name2>
10275	9552	<aphaerese>	<aphaerese>
10275	10276	<>	<aphaerese>
10275	9548	<elision3>	<elision3>
10275	10276	<>	<elision3>
10275	9548	<elision2>	<elision2>
10275	10276	<>	<elision2>
10275	9548	<elision1>	<elision1>
10275	10276	<>	<elision1>
10275	9556	.	υ
10275	9559	s	υ
10275	9556	.	u
10275	9559	s	u
10275	9556	.	κ
10275	9605	s	U
10275	9556	.	α
10275	9630	s	α
10275	9556	.	a
10275	9630	s	a
10275	9633	s	A
10275	9556	.	λ
10275	8950	<1s>	<>
10276	9548	.	.
10276	9549	 	 
10276	9548	<~>	<~>
10276	9548	<split-s>	<split-s>
10276	9548	<split-h>	<split-h>
10276	9548	<name2>	<name2>
10276	10274	<>	<name>
10276	9552	<aphaerese>	<aphaerese>
10276	10276	<>	<aphaerese>
10276	9548	<elision3>	<elision3>
10276	10276	<>	<elision3>
10276	9548	<elision2>	<elision2>
10276	10276	<>	<elision2>
10276	9548	<elision1>	<elision1>
10276	10276	<>	<elision1>
10276	9556	.	υ
10276	9559	s	υ
10276	9556	.	u
10276	9559	s	u
10276	9556	.	κ
10276	9605	s	U
10276	9556	.	α
10276	9630	s	α
10276	9556	.	a
10276	9630	s	a
10276	9633	s	A
10276	9556	.	λ
10276	8951	<1s>	<>
10277	10278	<>	<aphaerese>
10277	10278	<>	<elision3>
10277	10278	<>	<elision2>
10277	10278	<>	<elision1>
10277	10275	<l2L>	<>
10278	10279	<>	<name>
10278	10278	<>	<aphaerese>
10278	10278	<>	<elision3>
10278	10278	<>	<elision2>
10278	10278	<>	<elision1>
10278	10276	<l2L>	<>
10279	10277	<>	<aphaerese>
10279	10277	<>	<elision3>
10279	10277	<>	<elision2>
10279	10277	<>	<elision1>
10279	10274	<l2L>	<>
10280	9803	.	.
10280	9803	<~>	<~>
10280	9803	<split-s>	<split-s>
10280	9803	<split-h>	<split-h>
10280	9803	<name2>	<name2>
10280	9806	<aphaerese>	<aphaerese>
10280	10281	<>	<aphaerese>
10280	9803	<elision3>	<elision3>
10280	10281	<>	<elision3>
10280	9803	<elision2>	<elision2>
10280	10281	<>	<elision2>
10280	9803	<elision1>	<elision1>
10280	10281	<>	<elision1>
10280	9799	.	υ
10280	9945	H	υ
10280	9799	.	u
10280	9954	H	u
10280	9809	.	κ
10280	10285	H	κ
10280	10294	H	k
10280	9923	H	U
10280	10303	H	K
10280	9799	.	α
10280	9957	H	α
10280	9799	.	a
10280	9960	H	a
10280	9894	H	A
10280	10308	H	λ
10280	10314	H	l
10280	10309	H	L
10281	9801	.	.
10281	9801	<~>	<~>
10281	9801	<split-s>	<split-s>
10281	9801	<split-h>	<split-h>
10281	9801	<name2>	<name2>
10281	9804	<aphaerese>	<aphaerese>
10281	10282	<>	<aphaerese>
10281	9801	<elision3>	<elision3>
10281	10282	<>	<elision3>
10281	9801	<elision2>	<elision2>
10281	10282	<>	<elision2>
10281	9801	<elision1>	<elision1>
10281	10282	<>	<elision1>
10281	9800	.	υ
10281	9943	H	υ
10281	9800	.	u
10281	9952	H	u
10281	9807	.	κ
10281	10283	H	κ
10281	10292	H	k
10281	9921	H	U
10281	10301	H	K
10281	9800	.	α
10281	9955	H	α
10281	9800	.	a
10281	9958	H	a
10281	9892	H	A
10281	10306	H	λ
10281	10312	H	l
10281	10315	H	L
10282	9801	.	.
10282	9801	<~>	<~>
10282	9801	<split-s>	<split-s>
10282	9801	<split-h>	<split-h>
10282	9801	<name2>	<name2>
10282	10280	<>	<name>
10282	9804	<aphaerese>	<aphaerese>
10282	10282	<>	<aphaerese>
10282	9801	<elision3>	<elision3>
10282	10282	<>	<elision3>
10282	9801	<elision2>	<elision2>
10282	10282	<>	<elision2>
10282	9801	<elision1>	<elision1>
10282	10282	<>	<elision1>
10282	9800	.	υ
10282	9943	H	υ
10282	9800	.	u
10282	9952	H	u
10282	9807	.	κ
10282	10283	H	κ
10282	10292	H	k
10282	9921	H	U
10282	10301	H	K
10282	9800	.	α
10282	9955	H	α
10282	9800	.	a
10282	9958	H	a
10282	9892	H	A
10282	10306	H	λ
10282	10312	H	l
10282	10315	H	L
10283	10284	<>	<name>
10283	10283	<>	<aphaerese>
10283	10283	<>	<elision3>
10283	10283	<>	<elision2>
10283	10283	<>	<elision1>
10283	10287	<kappa2K>	<>
10283	10290	<kappa2L>	<>
10283	9910	<lambda2L>	<>
10284	10285	<>	<aphaerese>
10284	10285	<>	<elision3>
10284	10285	<>	<elision2>
10284	10285	<>	<elision1>
10284	10288	<kappa2K>	<>
10284	10291	<kappa2L>	<>
10284	9911	<lambda2L>	<>
10285	10283	<>	<aphaerese>
10285	10283	<>	<elision3>
10285	10283	<>	<elision2>
10285	10283	<>	<elision1>
10285	10286	<kappa2K>	<>
10285	10289	<kappa2L>	<>
10285	9909	<lambda2L>	<>
10286	9862	.	.
10286	9862	<~>	<~>
10286	9862	<split-s>	<split-s>
10286	9862	<split-h>	<split-h>
10286	9862	<name2>	<name2>
10286	9865	<aphaerese>	<aphaerese>
10286	10287	<>	<aphaerese>
10286	9886	<elision3>	<elision3>
10286	10287	<>	<elision3>
10286	9886	<elision2>	<elision2>
10286	10287	<>	<elision2>
10286	9886	<elision1>	<elision1>
10286	10287	<>	<elision1>
10286	9880	.	υ
10286	9833	s	υ
10286	9880	.	u
10286	9833	s	u
10286	9874	s	U
10286	9880	.	α
10286	9833	s	α
10286	9880	.	a
10286	9833	s	a
10286	9877	s	A
10286	9826	<1m>	<>
10287	9862	.	.
10287	9862	<~>	<~>
10287	9862	<split-s>	<split-s>
10287	9862	<split-h>	<split-h>
10287	9862	<name2>	<name2>
10287	10288	<>	<name>
10287	9865	<aphaerese>	<aphaerese>
10287	10287	<>	<aphaerese>
10287	9886	<elision3>	<elision3>
10287	10287	<>	<elision3>
10287	9886	<elision2>	<elision2>
10287	10287	<>	<elision2>
10287	9886	<elision1>	<elision1>
10287	10287	<>	<elision1>
10287	9880	.	υ
10287	9833	s	υ
10287	9880	.	u
10287	9833	s	u
10287	9874	s	U
10287	9880	.	α
10287	9833	s	α
10287	9880	.	a
10287	9833	s	a
10287	9877	s	A
10287	9827	<1m>	<>
10288	9864	.	.
10288	9864	<~>	<~>
10288	9864	<split-s>	<split-s>
10288	9864	<split-h>	<split-h>
10288	9864	<name2>	<name2>
10288	9867	<aphaerese>	<aphaerese>
10288	10286	<>	<aphaerese>
10288	9885	<elision3>	<elision3>
10288	10286	<>	<elision3>
10288	9885	<elision2>	<elision2>
10288	10286	<>	<elision2>
10288	9885	<elision1>	<elision1>
10288	10286	<>	<elision1>
10288	9882	.	υ
10288	9832	s	υ
10288	9882	.	u
10288	9832	s	u
10288	9876	s	U
10288	9882	.	α
10288	9832	s	α
10288	9882	.	a
10288	9832	s	a
10288	9879	s	A
10288	9825	<1m>	<>
10289	9892	.	.
10289	9892	<~>	<~>
10289	9892	<split-s>	<split-s>
10289	9892	<split-h>	<split-h>
10289	9892	<name2>	<name2>
10289	9895	<aphaerese>	<aphaerese>
10289	10290	<>	<aphaerese>
10289	9904	<elision3>	<elision3>
10289	10290	<>	<elision3>
10289	9904	<elision2>	<elision2>
10289	10290	<>	<elision2>
10289	9904	<elision1>	<elision1>
10289	10290	<>	<elision1>
10289	9898	.	υ
10289	9833	s	υ
10289	9898	.	u
10289	9833	s	u
10289	9874	s	U
10289	9898	.	α
10289	9833	s	α
10289	9898	.	a
10289	9833	s	a
10289	9877	s	A
10289	9826	<1m>	<>
10290	9892	.	.
10290	9892	<~>	<~>
10290	9892	<split-s>	<split-s>
10290	9892	<split-h>	<split-h>
10290	9892	<name2>	<name2>
10290	10291	<>	<name>
10290	9895	<aphaerese>	<aphaerese>
10290	10290	<>	<aphaerese>
10290	9904	<elision3>	<elision3>
10290	10290	<>	<elision3>
10290	9904	<elision2>	<elision2>
10290	10290	<>	<elision2>
10290	9904	<elision1>	<elision1>
10290	10290	<>	<elision1>
10290	9898	.	υ
10290	9833	s	υ
10290	9898	.	u
10290	9833	s	u
10290	9874	s	U
10290	9898	.	α
10290	9833	s	α
10290	9898	.	a
10290	9833	s	a
10290	9877	s	A
10290	9827	<1m>	<>
10291	9894	.	.
10291	9894	<~>	<~>
10291	9894	<split-s>	<split-s>
10291	9894	<split-h>	<split-h>
10291	9894	<name2>	<name2>
10291	9897	<aphaerese>	<aphaerese>
10291	10289	<>	<aphaerese>
10291	9903	<elision3>	<elision3>
10291	10289	<>	<elision3>
10291	9903	<elision2>	<elision2>
10291	10289	<>	<elision2>
10291	9903	<elision1>	<elision1>
10291	10289	<>	<elision1>
10291	9900	.	υ
10291	9832	s	υ
10291	9900	.	u
10291	9832	s	u
10291	9876	s	U
10291	9900	.	α
10291	9832	s	α
10291	9900	.	a
10291	9832	s	a
10291	9879	s	A
10291	9825	<1m>	<>
10292	10293	<>	<name>
10292	10292	<>	<aphaerese>
10292	10292	<>	<elision3>
10292	10292	<>	<elision2>
10292	10292	<>	<elision1>
10292	10296	<k2K>	<>
10292	10299	<k2L>	<>
10292	9910	<l2L>	<>
10293	10294	<>	<aphaerese>
10293	10294	<>	<elision3>
10293	10294	<>	<elision2>
10293	10294	<>	<elision1>
10293	10297	<k2K>	<>
10293	10300	<k2L>	<>
10293	9911	<l2L>	<>
10294	10292	<>	<aphaerese>
10294	10292	<>	<elision3>
10294	10292	<>	<elision2>
10294	10292	<>	<elision1>
10294	10295	<k2K>	<>
10294	10298	<k2L>	<>
10294	9909	<l2L>	<>
10295	9862	.	.
10295	9862	<~>	<~>
10295	9862	<split-s>	<split-s>
10295	9862	<split-h>	<split-h>
10295	9862	<name2>	<name2>
10295	9865	<aphaerese>	<aphaerese>
10295	10296	<>	<aphaerese>
10295	9862	<elision3>	<elision3>
10295	10296	<>	<elision3>
10295	9862	<elision2>	<elision2>
10295	10296	<>	<elision2>
10295	9862	<elision1>	<elision1>
10295	10296	<>	<elision1>
10295	9880	.	υ
10295	9833	s	υ
10295	9880	.	u
10295	9833	s	u
10295	9874	s	U
10295	9880	.	α
10295	9833	s	α
10295	9880	.	a
10295	9833	s	a
10295	9877	s	A
10295	9826	<1m>	<>
10296	9862	.	.
10296	9862	<~>	<~>
10296	9862	<split-s>	<split-s>
10296	9862	<split-h>	<split-h>
10296	9862	<name2>	<name2>
10296	10297	<>	<name>
10296	9865	<aphaerese>	<aphaerese>
10296	10296	<>	<aphaerese>
10296	9862	<elision3>	<elision3>
10296	10296	<>	<elision3>
10296	9862	<elision2>	<elision2>
10296	10296	<>	<elision2>
10296	9862	<elision1>	<elision1>
10296	10296	<>	<elision1>
10296	9880	.	υ
10296	9833	s	υ
10296	9880	.	u
10296	9833	s	u
10296	9874	s	U
10296	9880	.	α
10296	9833	s	α
10296	9880	.	a
10296	9833	s	a
10296	9877	s	A
10296	9827	<1m>	<>
10297	9864	.	.
10297	9864	<~>	<~>
10297	9864	<split-s>	<split-s>
10297	9864	<split-h>	<split-h>
10297	9864	<name2>	<name2>
10297	9867	<aphaerese>	<aphaerese>
10297	10295	<>	<aphaerese>
10297	9864	<elision3>	<elision3>
10297	10295	<>	<elision3>
10297	9864	<elision2>	<elision2>
10297	10295	<>	<elision2>
10297	9864	<elision1>	<elision1>
10297	10295	<>	<elision1>
10297	9882	.	υ
10297	9832	s	υ
10297	9882	.	u
10297	9832	s	u
10297	9876	s	U
10297	9882	.	α
10297	9832	s	α
10297	9882	.	a
10297	9832	s	a
10297	9879	s	A
10297	9825	<1m>	<>
10298	9892	.	.
10298	9892	<~>	<~>
10298	9892	<split-s>	<split-s>
10298	9892	<split-h>	<split-h>
10298	9892	<name2>	<name2>
10298	9895	<aphaerese>	<aphaerese>
10298	10299	<>	<aphaerese>
10298	9892	<elision3>	<elision3>
10298	10299	<>	<elision3>
10298	9892	<elision2>	<elision2>
10298	10299	<>	<elision2>
10298	9892	<elision1>	<elision1>
10298	10299	<>	<elision1>
10298	9898	.	υ
10298	9833	s	υ
10298	9898	.	u
10298	9833	s	u
10298	9874	s	U
10298	9898	.	α
10298	9833	s	α
10298	9898	.	a
10298	9833	s	a
10298	9877	s	A
10298	9826	<1m>	<>
10299	9892	.	.
10299	9892	<~>	<~>
10299	9892	<split-s>	<split-s>
10299	9892	<split-h>	<split-h>
10299	9892	<name2>	<name2>
10299	10300	<>	<name>
10299	9895	<aphaerese>	<aphaerese>
10299	10299	<>	<aphaerese>
10299	9892	<elision3>	<elision3>
10299	10299	<>	<elision3>
10299	9892	<elision2>	<elision2>
10299	10299	<>	<elision2>
10299	9892	<elision1>	<elision1>
10299	10299	<>	<elision1>
10299	9898	.	υ
10299	9833	s	υ
10299	9898	.	u
10299	9833	s	u
10299	9874	s	U
10299	9898	.	α
10299	9833	s	α
10299	9898	.	a
10299	9833	s	a
10299	9877	s	A
10299	9827	<1m>	<>
10300	9894	.	.
10300	9894	<~>	<~>
10300	9894	<split-s>	<split-s>
10300	9894	<split-h>	<split-h>
10300	9894	<name2>	<name2>
10300	9897	<aphaerese>	<aphaerese>
10300	10298	<>	<aphaerese>
10300	9894	<elision3>	<elision3>
10300	10298	<>	<elision3>
10300	9894	<elision2>	<elision2>
10300	10298	<>	<elision2>
10300	9894	<elision1>	<elision1>
10300	10298	<>	<elision1>
10300	9900	.	υ
10300	9832	s	υ
10300	9900	.	u
10300	9832	s	u
10300	9876	s	U
10300	9900	.	α
10300	9832	s	α
10300	9900	.	a
10300	9832	s	a
10300	9879	s	A
10300	9825	<1m>	<>
10301	9862	.	.
10301	9862	<~>	<~>
10301	9862	<split-s>	<split-s>
10301	9862	<split-h>	<split-h>
10301	9862	<name2>	<name2>
10301	9925	<name2>	<name>
10301	10302	<>	<name>
10301	9865	<aphaerese>	<aphaerese>
10301	10304	<>	<aphaerese>
10301	9862	<elision3>	<elision3>
10301	10304	<>	<elision3>
10301	9862	<elision2>	<elision2>
10301	10304	<>	<elision2>
10301	9862	<elision1>	<elision1>
10301	10304	<>	<elision1>
10301	9880	.	υ
10301	9833	s	υ
10301	9880	.	u
10301	9833	s	u
10301	9898	.	κ
10301	9874	s	U
10301	9880	.	α
10301	9833	s	α
10301	9880	.	a
10301	9833	s	a
10301	9877	s	A
10301	9898	.	λ
10301	9827	<1m>	<>
10301	9929	<k2K>	<>
10301	9930	<k2L>	<>
10301	10305	<K2L>	<>
10302	9864	.	.
10302	9864	<~>	<~>
10302	9864	<split-s>	<split-s>
10302	9864	<split-h>	<split-h>
10302	9864	<name2>	<name2>
10302	9867	<aphaerese>	<aphaerese>
10302	10303	<>	<aphaerese>
10302	9864	<elision3>	<elision3>
10302	10303	<>	<elision3>
10302	9864	<elision2>	<elision2>
10302	10303	<>	<elision2>
10302	9864	<elision1>	<elision1>
10302	10303	<>	<elision1>
10302	9882	.	υ
10302	9832	s	υ
10302	9882	.	u
10302	9832	s	u
10302	9900	.	κ
10302	9876	s	U
10302	9882	.	α
10302	9832	s	α
10302	9882	.	a
10302	9832	s	a
10302	9879	s	A
10302	9900	.	λ
10302	9825	<1m>	<>
10302	10300	<K2L>	<>
10303	9862	.	.
10303	9862	<~>	<~>
10303	9862	<split-s>	<split-s>
10303	9862	<split-h>	<split-h>
10303	9862	<name2>	<name2>
10303	9865	<aphaerese>	<aphaerese>
10303	10304	<>	<aphaerese>
10303	9862	<elision3>	<elision3>
10303	10304	<>	<elision3>
10303	9862	<elision2>	<elision2>
10303	10304	<>	<elision2>
10303	9862	<elision1>	<elision1>
10303	10304	<>	<elision1>
10303	9880	.	υ
10303	9833	s	υ
10303	9880	.	u
10303	9833	s	u
10303	9898	.	κ
10303	9874	s	U
10303	9880	.	α
10303	9833	s	α
10303	9880	.	a
10303	9833	s	a
10303	9877	s	A
10303	9898	.	λ
10303	9826	<1m>	<>
10303	10298	<K2L>	<>
10304	9862	.	.
10304	9862	<~>	<~>
10304	9862	<split-s>	<split-s>
10304	9862	<split-h>	<split-h>
10304	9862	<name2>	<name2>
10304	10302	<>	<name>
10304	9865	<aphaerese>	<aphaerese>
10304	10304	<>	<aphaerese>
10304	9862	<elision3>	<elision3>
10304	10304	<>	<elision3>
10304	9862	<elision2>	<elision2>
10304	10304	<>	<elision2>
10304	9862	<elision1>	<elision1>
10304	10304	<>	<elision1>
10304	9880	.	υ
10304	9833	s	υ
10304	9880	.	u
10304	9833	s	u
10304	9898	.	κ
10304	9874	s	U
10304	9880	.	α
10304	9833	s	α
10304	9880	.	a
10304	9833	s	a
10304	9877	s	A
10304	9898	.	λ
10304	9827	<1m>	<>
10304	10299	<K2L>	<>
10305	9892	.	.
10305	9892	<~>	<~>
10305	9892	<split-s>	<split-s>
10305	9892	<split-h>	<split-h>
10305	9892	<name2>	<name2>
10305	9931	<name2>	<name>
10305	10300	<>	<name>
10305	9895	<aphaerese>	<aphaerese>
10305	10299	<>	<aphaerese>
10305	9892	<elision3>	<elision3>
10305	10299	<>	<elision3>
10305	9892	<elision2>	<elision2>
10305	10299	<>	<elision2>
10305	9892	<elision1>	<elision1>
10305	10299	<>	<elision1>
10305	9898	.	υ
10305	9833	s	υ
10305	9898	.	u
10305	9833	s	u
10305	9874	s	U
10305	9898	.	α
10305	9833	s	α
10305	9898	.	a
10305	9833	s	a
10305	9877	s	A
10305	9827	<1m>	<>
10306	10307	<>	<name>
10306	10306	<>	<aphaerese>
10306	10306	<>	<elision3>
10306	10306	<>	<elision2>
10306	10306	<>	<elision1>
10306	10310	<lambda2L>	<>
10307	10308	<>	<aphaerese>
10307	10308	<>	<elision3>
10307	10308	<>	<elision2>
10307	10308	<>	<elision1>
10307	10311	<lambda2L>	<>
10308	10306	<>	<aphaerese>
10308	10306	<>	<elision3>
10308	10306	<>	<elision2>
10308	10306	<>	<elision1>
10308	10309	<lambda2L>	<>
10309	9892	.	.
10309	9892	<~>	<~>
10309	9892	<split-s>	<split-s>
10309	9892	<split-h>	<split-h>
10309	9892	<name2>	<name2>
10309	9895	<aphaerese>	<aphaerese>
10309	10310	<>	<aphaerese>
10309	9892	<elision3>	<elision3>
10309	10310	<>	<elision3>
10309	9892	<elision2>	<elision2>
10309	10310	<>	<elision2>
10309	9892	<elision1>	<elision1>
10309	10310	<>	<elision1>
10309	9898	.	υ
10309	9833	s	υ
10309	9898	.	u
10309	9833	s	u
10309	9898	.	κ
10309	9874	s	U
10309	9898	.	α
10309	9833	s	α
10309	9898	.	a
10309	9833	s	a
10309	9877	s	A
10309	9898	.	λ
10309	9826	<1m>	<>
10310	9892	.	.
10310	9892	<~>	<~>
10310	9892	<split-s>	<split-s>
10310	9892	<split-h>	<split-h>
10310	9892	<name2>	<name2>
10310	10311	<>	<name>
10310	9895	<aphaerese>	<aphaerese>
10310	10310	<>	<aphaerese>
10310	9892	<elision3>	<elision3>
10310	10310	<>	<elision3>
10310	9892	<elision2>	<elision2>
10310	10310	<>	<elision2>
10310	9892	<elision1>	<elision1>
10310	10310	<>	<elision1>
10310	9898	.	υ
10310	9833	s	υ
10310	9898	.	u
10310	9833	s	u
10310	9898	.	κ
10310	9874	s	U
10310	9898	.	α
10310	9833	s	α
10310	9898	.	a
10310	9833	s	a
10310	9877	s	A
10310	9898	.	λ
10310	9827	<1m>	<>
10311	9894	.	.
10311	9894	<~>	<~>
10311	9894	<split-s>	<split-s>
10311	9894	<split-h>	<split-h>
10311	9894	<name2>	<name2>
10311	9897	<aphaerese>	<aphaerese>
10311	10309	<>	<aphaerese>
10311	9894	<elision3>	<elision3>
10311	10309	<>	<elision3>
10311	9894	<elision2>	<elision2>
10311	10309	<>	<elision2>
10311	9894	<elision1>	<elision1>
10311	10309	<>	<elision1>
10311	9900	.	υ
10311	9832	s	υ
10311	9900	.	u
10311	9832	s	u
10311	9900	.	κ
10311	9876	s	U
10311	9900	.	α
10311	9832	s	α
10311	9900	.	a
10311	9832	s	a
10311	9879	s	A
10311	9900	.	λ
10311	9825	<1m>	<>
10312	10313	<>	<name>
10312	10312	<>	<aphaerese>
10312	10312	<>	<elision3>
10312	10312	<>	<elision2>
10312	10312	<>	<elision1>
10312	10310	<l2L>	<>
10313	10314	<>	<aphaerese>
10313	10314	<>	<elision3>
10313	10314	<>	<elision2>
10313	10314	<>	<elision1>
10313	10311	<l2L>	<>
10314	10312	<>	<aphaerese>
10314	10312	<>	<elision3>
10314	10312	<>	<elision2>
10314	10312	<>	<elision1>
10314	10309	<l2L>	<>
10315	9892	.	.
10315	9892	<~>	<~>
10315	9892	<split-s>	<split-s>
10315	9892	<split-h>	<split-h>
10315	9892	<name2>	<name2>
10315	9931	<name2>	<name>
10315	10311	<>	<name>
10315	9895	<aphaerese>	<aphaerese>
10315	10310	<>	<aphaerese>
10315	9892	<elision3>	<elision3>
10315	10310	<>	<elision3>
10315	9892	<elision2>	<elision2>
10315	10310	<>	<elision2>
10315	9892	<elision1>	<elision1>
10315	10310	<>	<elision1>
10315	9898	.	υ
10315	9833	s	υ
10315	9898	.	u
10315	9833	s	u
10315	9898	.	κ
10315	9874	s	U
10315	9898	.	α
10315	9833	s	α
10315	9898	.	a
10315	9833	s	a
10315	9877	s	A
10315	9898	.	λ
10315	9827	<1m>	<>
10315	9930	<l2L>	<>
10316	10237	<>	<name>
10316	10236	<>	<aphaerese>
10316	10236	<>	<elision3>
10316	10236	<>	<elision2>
10316	10236	<>	<elision1>
10316	10240	<kappa2K>	<>
10316	10317	<kappa2L>	<>
10316	9699	<lambda2L>	<>
10317	9548	.	.
10317	9549	 	 
10317	9548	<~>	<~>
10317	9548	<split-s>	<split-s>
10317	9548	<split-h>	<split-h>
10317	9548	<name2>	<name2>
10317	10244	<>	<name>
10317	9552	<aphaerese>	<aphaerese>
10317	10243	<>	<aphaerese>
10317	9665	<elision3>	<elision3>
10317	10243	<>	<elision3>
10317	9665	<elision2>	<elision2>
10317	10243	<>	<elision2>
10317	9665	<elision1>	<elision1>
10317	10243	<>	<elision1>
10317	9556	.	υ
10317	9559	s	υ
10317	9556	.	u
10317	9559	s	u
10317	9605	s	U
10317	9556	.	α
10317	9630	s	α
10317	9556	.	a
10317	9630	s	a
10317	9633	s	A
10317	10318	<1s>	<>
10318	107	.	.
10318	108	 	 
10318	107	<~>	<~>
10318	107	<split-s>	<split-s>
10318	107	<split-h>	<split-h>
10318	107	<name2>	<name2>
10318	10245	<>	<name>
10318	111	<aphaerese>	<aphaerese>
10318	10247	<>	<aphaerese>
10318	8692	<elision3>	<elision3>
10318	10247	<>	<elision3>
10318	8692	<elision2>	<elision2>
10318	10247	<>	<elision2>
10318	8692	<elision1>	<elision1>
10318	10247	<>	<elision1>
10318	8110	.	υ
10318	8110	.	u
10318	8110	.	α
10318	8110	.	a
10318	10319	<K>	<>
10319	8160	.	.
10319	8160	<~>	<~>
10319	8160	<split-s>	<split-s>
10319	8160	<split-h>	<split-h>
10319	8160	<name2>	<name2>
10319	10249	<>	<name>
10319	8163	<aphaerese>	<aphaerese>
10319	10248	<>	<aphaerese>
10319	8641	<elision3>	<elision3>
10319	10248	<>	<elision3>
10319	8641	<elision2>	<elision2>
10319	10248	<>	<elision2>
10319	8641	<elision1>	<elision1>
10319	10248	<>	<elision1>
10319	8159	.	υ
10319	8159	.	u
10319	8159	.	α
10319	8159	.	a
10320	10256	<>	<name>
10320	10255	<>	<aphaerese>
10320	10255	<>	<elision3>
10320	10255	<>	<elision2>
10320	10255	<>	<elision1>
10320	10259	<k2K>	<>
10320	10321	<k2L>	<>
10320	9699	<l2L>	<>
10321	9548	.	.
10321	9549	 	 
10321	9548	<~>	<~>
10321	9548	<split-s>	<split-s>
10321	9548	<split-h>	<split-h>
10321	9548	<name2>	<name2>
10321	10263	<>	<name>
10321	9552	<aphaerese>	<aphaerese>
10321	10262	<>	<aphaerese>
10321	9548	<elision3>	<elision3>
10321	10262	<>	<elision3>
10321	9548	<elision2>	<elision2>
10321	10262	<>	<elision2>
10321	9548	<elision1>	<elision1>
10321	10262	<>	<elision1>
10321	9556	.	υ
10321	9559	s	υ
10321	9556	.	u
10321	9559	s	u
10321	9605	s	U
10321	9556	.	α
10321	9630	s	α
10321	9556	.	a
10321	9630	s	a
10321	9633	s	A
10321	10322	<1s>	<>
10322	107	.	.
10322	108	 	 
10322	107	<~>	<~>
10322	107	<split-s>	<split-s>
10322	107	<split-h>	<split-h>
10322	107	<name2>	<name2>
10322	8965	<>	<name>
10322	111	<aphaerese>	<aphaerese>
10322	8964	<>	<aphaerese>
10322	107	<elision3>	<elision3>
10322	8964	<>	<elision3>
10322	107	<elision2>	<elision2>
10322	8964	<>	<elision2>
10322	107	<elision1>	<elision1>
10322	8964	<>	<elision1>
10322	8110	.	υ
10322	8110	.	u
10322	8110	.	α
10322	8110	.	a
10322	10323	<K>	<>
10323	8160	.	.
10323	8160	<~>	<~>
10323	8160	<split-s>	<split-s>
10323	8160	<split-h>	<split-h>
10323	8160	<name2>	<name2>
10323	8966	<>	<name>
10323	8163	<aphaerese>	<aphaerese>
10323	8968	<>	<aphaerese>
10323	8160	<elision3>	<elision3>
10323	8968	<>	<elision3>
10323	8160	<elision2>	<elision2>
10323	8968	<>	<elision2>
10323	8160	<elision1>	<elision1>
10323	8968	<>	<elision1>
10323	8159	.	υ
10323	8159	.	u
10323	8159	.	α
10323	8159	.	a
10324	9382	.	.
10324	9383	 	 
10324	9382	<~>	<~>
10324	9382	<split-s>	<split-s>
10324	9382	<split-h>	<split-h>
10324	9382	<name2>	<name2>
10324	9722	<name2>	<name>
10324	10269	<>	<name>
10324	9386	<aphaerese>	<aphaerese>
10324	10268	<>	<aphaerese>
10324	9382	<elision3>	<elision3>
10324	10268	<>	<elision3>
10324	9382	<elision2>	<elision2>
10324	10268	<>	<elision2>
10324	9382	<elision1>	<elision1>
10324	10268	<>	<elision1>
10324	9390	.	υ
10324	9393	s	υ
10324	9390	.	u
10324	9393	s	u
10324	9556	.	κ
10324	9456	s	U
10324	9390	.	α
10324	9484	s	α
10324	9390	.	a
10324	9484	s	a
10324	9487	s	A
10324	9556	.	λ
10324	8880	<1s>	<>
10324	9726	<k2K>	<>
10324	9727	<k2L>	<>
10324	10325	<K2L>	<>
10325	9548	.	.
10325	9549	 	 
10325	9548	<~>	<~>
10325	9548	<split-s>	<split-s>
10325	9548	<split-h>	<split-h>
10325	9548	<name2>	<name2>
10325	9728	<name2>	<name>
10325	10263	<>	<name>
10325	9552	<aphaerese>	<aphaerese>
10325	10262	<>	<aphaerese>
10325	9548	<elision3>	<elision3>
10325	10262	<>	<elision3>
10325	9548	<elision2>	<elision2>
10325	10262	<>	<elision2>
10325	9548	<elision1>	<elision1>
10325	10262	<>	<elision1>
10325	9556	.	υ
10325	9559	s	υ
10325	9556	.	u
10325	9559	s	u
10325	9605	s	U
10325	9556	.	α
10325	9630	s	α
10325	9556	.	a
10325	9630	s	a
10325	9633	s	A
10325	10326	<1s>	<>
10326	107	.	.
10326	108	 	 
10326	107	<~>	<~>
10326	107	<split-s>	<split-s>
10326	107	<split-h>	<split-h>
10326	107	<name2>	<name2>
10326	8822	<name2>	<name>
10326	8965	<>	<name>
10326	111	<aphaerese>	<aphaerese>
10326	8964	<>	<aphaerese>
10326	107	<elision3>	<elision3>
10326	8964	<>	<elision3>
10326	107	<elision2>	<elision2>
10326	8964	<>	<elision2>
10326	107	<elision1>	<elision1>
10326	8964	<>	<elision1>
10326	8110	.	υ
10326	8110	.	u
10326	8110	.	α
10326	8110	.	a
10326	10327	<K>	<>
10327	8160	.	.
10327	8160	<~>	<~>
10327	8160	<split-s>	<split-s>
10327	8160	<split-h>	<split-h>
10327	8160	<name2>	<name2>
10327	8712	<name2>	<name>
10327	8966	<>	<name>
10327	8163	<aphaerese>	<aphaerese>
10327	8968	<>	<aphaerese>
10327	8160	<elision3>	<elision3>
10327	8968	<>	<elision3>
10327	8160	<elision2>	<elision2>
10327	8968	<>	<elision2>
10327	8160	<elision1>	<elision1>
10327	8968	<>	<elision1>
10327	8159	.	υ
10327	8159	.	u
10327	8159	.	α
10327	8159	.	a
10328	9548	.	.
10328	9549	 	 
10328	9548	<~>	<~>
10328	9548	<split-s>	<split-s>
10328	9548	<split-h>	<split-h>
10328	9548	<name2>	<name2>
10328	9728	<name2>	<name>
10328	10274	<>	<name>
10328	9552	<aphaerese>	<aphaerese>
10328	10276	<>	<aphaerese>
10328	9548	<elision3>	<elision3>
10328	10276	<>	<elision3>
10328	9548	<elision2>	<elision2>
10328	10276	<>	<elision2>
10328	9548	<elision1>	<elision1>
10328	10276	<>	<elision1>
10328	9556	.	υ
10328	9559	s	υ
10328	9556	.	u
10328	9559	s	u
10328	9556	.	κ
10328	9605	s	U
10328	9556	.	α
10328	9630	s	α
10328	9556	.	a
10328	9630	s	a
10328	9633	s	A
10328	9556	.	λ
10328	8977	<1s>	<>
10328	9727	<l2L>	<>
10329	71	.	.
10329	72	 	 
10329	71	<~>	<~>
10329	71	<split-s>	<split-s>
10329	71	<split-h>	<split-h>
10329	71	<name2>	<name2>
10329	75	<aphaerese>	<aphaerese>
10329	10330	<>	<aphaerese>
10329	10333	<elision3>	<elision3>
10329	10330	<>	<elision3>
10329	10333	<elision2>	<elision2>
10329	10330	<>	<elision2>
10329	10333	<elision1>	<elision1>
10329	10330	<>	<elision1>
10329	9751	.	υ
10329	9795	H	υ
10329	9751	.	u
10329	9797	H	u
10329	9751	.	κ
10329	10210	H	κ
10329	9705	H	k
10329	9718	H	U
10329	9721	H	K
10329	9751	.	α
10329	9781	H	α
10329	9751	.	a
10329	9786	H	a
10329	9548	H	A
10329	9751	.	λ
10329	10187	H	λ
10329	10135	H	l
10329	10140	H	L
10329	10336	<K>	<>
10330	71	.	.
10330	72	 	 
10330	71	<~>	<~>
10330	71	<split-s>	<split-s>
10330	71	<split-h>	<split-h>
10330	71	<name2>	<name2>
10330	10331	<>	<name>
10330	75	<aphaerese>	<aphaerese>
10330	10330	<>	<aphaerese>
10330	10333	<elision3>	<elision3>
10330	10330	<>	<elision3>
10330	10333	<elision2>	<elision2>
10330	10330	<>	<elision2>
10330	10333	<elision1>	<elision1>
10330	10330	<>	<elision1>
10330	9751	.	υ
10330	9795	H	υ
10330	9751	.	u
10330	9797	H	u
10330	9751	.	κ
10330	10210	H	κ
10330	9705	H	k
10330	9718	H	U
10330	9721	H	K
10330	9751	.	α
10330	9781	H	α
10330	9751	.	a
10330	9786	H	a
10330	9548	H	A
10330	9751	.	λ
10330	10187	H	λ
10330	10135	H	l
10330	10140	H	L
10330	10337	<K>	<>
10331	70	.	.
10331	74	 	 
10331	70	<~>	<~>
10331	70	<split-s>	<split-s>
10331	70	<split-h>	<split-h>
10331	70	<name2>	<name2>
10331	77	<aphaerese>	<aphaerese>
10331	10329	<>	<aphaerese>
10331	10332	<elision3>	<elision3>
10331	10329	<>	<elision3>
10331	10332	<elision2>	<elision2>
10331	10329	<>	<elision2>
10331	10332	<elision1>	<elision1>
10331	10329	<>	<elision1>
10331	9753	.	υ
10331	9790	H	υ
10331	9753	.	u
10331	9794	H	u
10331	9753	.	κ
10331	10167	H	κ
10331	9746	H	k
10331	9720	H	U
10331	9750	H	K
10331	9753	.	α
10331	9780	H	α
10331	9753	.	a
10331	9785	H	a
10331	9551	H	A
10331	9753	.	λ
10331	10186	H	λ
10331	10134	H	l
10331	10137	H	L
10331	10335	<K>	<>
10332	71	.	.
10332	72	 	 
10332	71	<~>	<~>
10332	71	<split-s>	<split-s>
10332	71	<split-h>	<split-h>
10332	71	<name2>	<name2>
10332	75	<aphaerese>	<aphaerese>
10332	10333	<>	<aphaerese>
10332	71	<elision3>	<elision3>
10332	10333	<>	<elision3>
10332	71	<elision2>	<elision2>
10332	10333	<>	<elision2>
10332	71	<elision1>	<elision1>
10332	10333	<>	<elision1>
10332	9751	.	υ
10332	9795	H	υ
10332	9751	.	u
10332	9797	H	u
10332	78	.	κ
10332	10316	H	κ
10332	10320	H	k
10332	9718	H	U
10332	10324	H	K
10332	9751	.	α
10332	9781	H	α
10332	9751	.	a
10332	9786	H	a
10332	9548	H	A
10332	10272	H	λ
10332	10278	H	l
10332	10328	H	L
10333	71	.	.
10333	72	 	 
10333	71	<~>	<~>
10333	71	<split-s>	<split-s>
10333	71	<split-h>	<split-h>
10333	71	<name2>	<name2>
10333	10334	<>	<name>
10333	75	<aphaerese>	<aphaerese>
10333	10333	<>	<aphaerese>
10333	71	<elision3>	<elision3>
10333	10333	<>	<elision3>
10333	71	<elision2>	<elision2>
10333	10333	<>	<elision2>
10333	71	<elision1>	<elision1>
10333	10333	<>	<elision1>
10333	9751	.	υ
10333	9795	H	υ
10333	9751	.	u
10333	9797	H	u
10333	78	.	κ
10333	10316	H	κ
10333	10320	H	k
10333	9718	H	U
10333	10324	H	K
10333	9751	.	α
10333	9781	H	α
10333	9751	.	a
10333	9786	H	a
10333	9548	H	A
10333	10272	H	λ
10333	10278	H	l
10333	10328	H	L
10334	70	.	.
10334	74	 	 
10334	70	<~>	<~>
10334	70	<split-s>	<split-s>
10334	70	<split-h>	<split-h>
10334	70	<name2>	<name2>
10334	77	<aphaerese>	<aphaerese>
10334	10332	<>	<aphaerese>
10334	70	<elision3>	<elision3>
10334	10332	<>	<elision3>
10334	70	<elision2>	<elision2>
10334	10332	<>	<elision2>
10334	70	<elision1>	<elision1>
10334	10332	<>	<elision1>
10334	9753	.	υ
10334	9790	H	υ
10334	9753	.	u
10334	9794	H	u
10334	80	.	κ
10334	10235	H	κ
10334	10254	H	k
10334	9720	H	U
10334	10267	H	K
10334	9753	.	α
10334	9780	H	α
10334	9753	.	a
10334	9785	H	a
10334	9551	H	A
10334	10271	H	λ
10334	10277	H	l
10334	10275	H	L
10335	9803	.	.
10335	9803	<~>	<~>
10335	9803	<split-s>	<split-s>
10335	9803	<split-h>	<split-h>
10335	9803	<name2>	<name2>
10335	9806	<aphaerese>	<aphaerese>
10335	10336	<>	<aphaerese>
10335	10281	<elision3>	<elision3>
10335	10336	<>	<elision3>
10335	10281	<elision2>	<elision2>
10335	10336	<>	<elision2>
10335	10281	<elision1>	<elision1>
10335	10336	<>	<elision1>
10335	9799	.	υ
10335	9945	H	υ
10335	9799	.	u
10335	9954	H	u
10335	9799	.	κ
10335	10197	H	κ
10335	9914	H	k
10335	9923	H	U
10335	9927	H	K
10335	9799	.	α
10335	9957	H	α
10335	9799	.	a
10335	9960	H	a
10335	9894	H	A
10335	9799	.	λ
10335	10206	H	λ
10335	9941	H	l
10335	9936	H	L
10336	9801	.	.
10336	9801	<~>	<~>
10336	9801	<split-s>	<split-s>
10336	9801	<split-h>	<split-h>
10336	9801	<name2>	<name2>
10336	9804	<aphaerese>	<aphaerese>
10336	10337	<>	<aphaerese>
10336	10282	<elision3>	<elision3>
10336	10337	<>	<elision3>
10336	10282	<elision2>	<elision2>
10336	10337	<>	<elision2>
10336	10282	<elision1>	<elision1>
10336	10337	<>	<elision1>
10336	9800	.	υ
10336	9943	H	υ
10336	9800	.	u
10336	9952	H	u
10336	9800	.	κ
10336	10195	H	κ
10336	9912	H	k
10336	9921	H	U
10336	9924	H	K
10336	9800	.	α
10336	9955	H	α
10336	9800	.	a
10336	9958	H	a
10336	9892	H	A
10336	9800	.	λ
10336	10204	H	λ
10336	9939	H	l
10336	9942	H	L
10337	9801	.	.
10337	9801	<~>	<~>
10337	9801	<split-s>	<split-s>
10337	9801	<split-h>	<split-h>
10337	9801	<name2>	<name2>
10337	10335	<>	<name>
10337	9804	<aphaerese>	<aphaerese>
10337	10337	<>	<aphaerese>
10337	10282	<elision3>	<elision3>
10337	10337	<>	<elision3>
10337	10282	<elision2>	<elision2>
10337	10337	<>	<elision2>
10337	10282	<elision1>	<elision1>
10337	10337	<>	<elision1>
10337	9800	.	υ
10337	9943	H	υ
10337	9800	.	u
10337	9952	H	u
10337	9800	.	κ
10337	10195	H	κ
10337	9912	H	k
10337	9921	H	U
10337	9924	H	K
10337	9800	.	α
10337	9955	H	α
10337	9800	.	a
10337	9958	H	a
10337	9892	H	A
10337	9800	.	λ
10337	10204	H	λ
10337	9939	H	l
10337	9942	H	L
10338	9977	.	.
10338	9977	 	 
10338	9977	<~>	<~>
10338	9977	<split-s>	<split-s>
10338	9977	<split-h>	<split-h>
10338	9977	<name2>	<name2>
10338	10339	<>	<name>
10338	9980	<aphaerese>	<aphaerese>
10338	10338	<>	<aphaerese>
10338	9977	<elision3>	<elision3>
10338	10338	<>	<elision3>
10338	9977	<elision2>	<elision2>
10338	10338	<>	<elision2>
10338	9977	<elision1>	<elision1>
10338	10338	<>	<elision1>
10338	10141	.	υ
10338	10141	.	u
10338	10141	.	κ
10338	10141	.	α
10338	10141	.	a
10338	10141	.	λ
10338	10342	<4s>	<>
10339	9979	.	.
10339	9979	 	 
10339	9979	<~>	<~>
10339	9979	<split-s>	<split-s>
10339	9979	<split-h>	<split-h>
10339	9979	<name2>	<name2>
10339	9982	<aphaerese>	<aphaerese>
10339	10340	<>	<aphaerese>
10339	9979	<elision3>	<elision3>
10339	10340	<>	<elision3>
10339	9979	<elision2>	<elision2>
10339	10340	<>	<elision2>
10339	9979	<elision1>	<elision1>
10339	10340	<>	<elision1>
10339	10143	.	υ
10339	10143	.	u
10339	10143	.	κ
10339	10143	.	α
10339	10143	.	a
10339	10143	.	λ
10339	10343	<4s>	<>
10340	9977	.	.
10340	9977	 	 
10340	9977	<~>	<~>
10340	9977	<split-s>	<split-s>
10340	9977	<split-h>	<split-h>
10340	9977	<name2>	<name2>
10340	9980	<aphaerese>	<aphaerese>
10340	10338	<>	<aphaerese>
10340	9977	<elision3>	<elision3>
10340	10338	<>	<elision3>
10340	9977	<elision2>	<elision2>
10340	10338	<>	<elision2>
10340	9977	<elision1>	<elision1>
10340	10338	<>	<elision1>
10340	10141	.	υ
10340	10141	.	u
10340	10141	.	κ
10340	10141	.	α
10340	10141	.	a
10340	10141	.	λ
10340	10341	<4s>	<>
10341	71	.	.
10341	72	 	 
10341	71	<~>	<~>
10341	71	<split-s>	<split-s>
10341	71	<split-h>	<split-h>
10341	71	<name2>	<name2>
10341	75	<aphaerese>	<aphaerese>
10341	10342	<>	<aphaerese>
10341	71	<elision3>	<elision3>
10341	10342	<>	<elision3>
10341	71	<elision2>	<elision2>
10341	10342	<>	<elision2>
10341	71	<elision1>	<elision1>
10341	10342	<>	<elision1>
10341	9751	.	υ
10341	9795	H	υ
10341	9751	.	u
10341	9797	H	u
10341	9751	.	κ
10341	10210	H	κ
10341	9705	H	k
10341	9718	H	U
10341	9721	H	K
10341	9751	.	α
10341	9781	H	α
10341	9751	.	a
10341	9786	H	a
10341	9548	H	A
10341	9751	.	λ
10341	10187	H	λ
10341	10135	H	l
10341	10140	H	L
10341	10345	<K>	<>
10342	71	.	.
10342	72	 	 
10342	71	<~>	<~>
10342	71	<split-s>	<split-s>
10342	71	<split-h>	<split-h>
10342	71	<name2>	<name2>
10342	10343	<>	<name>
10342	75	<aphaerese>	<aphaerese>
10342	10342	<>	<aphaerese>
10342	71	<elision3>	<elision3>
10342	10342	<>	<elision3>
10342	71	<elision2>	<elision2>
10342	10342	<>	<elision2>
10342	71	<elision1>	<elision1>
10342	10342	<>	<elision1>
10342	9751	.	υ
10342	9795	H	υ
10342	9751	.	u
10342	9797	H	u
10342	9751	.	κ
10342	10210	H	κ
10342	9705	H	k
10342	9718	H	U
10342	9721	H	K
10342	9751	.	α
10342	9781	H	α
10342	9751	.	a
10342	9786	H	a
10342	9548	H	A
10342	9751	.	λ
10342	10187	H	λ
10342	10135	H	l
10342	10140	H	L
10342	10346	<K>	<>
10343	70	.	.
10343	74	 	 
10343	70	<~>	<~>
10343	70	<split-s>	<split-s>
10343	70	<split-h>	<split-h>
10343	70	<name2>	<name2>
10343	77	<aphaerese>	<aphaerese>
10343	10341	<>	<aphaerese>
10343	70	<elision3>	<elision3>
10343	10341	<>	<elision3>
10343	70	<elision2>	<elision2>
10343	10341	<>	<elision2>
10343	70	<elision1>	<elision1>
10343	10341	<>	<elision1>
10343	9753	.	υ
10343	9790	H	υ
10343	9753	.	u
10343	9794	H	u
10343	9753	.	κ
10343	10167	H	κ
10343	9746	H	k
10343	9720	H	U
10343	9750	H	K
10343	9753	.	α
10343	9780	H	α
10343	9753	.	a
10343	9785	H	a
10343	9551	H	A
10343	9753	.	λ
10343	10186	H	λ
10343	10134	H	l
10343	10137	H	L
10343	10344	<K>	<>
10344	9803	.	.
10344	9803	<~>	<~>
10344	9803	<split-s>	<split-s>
10344	9803	<split-h>	<split-h>
10344	9803	<name2>	<name2>
10344	9806	<aphaerese>	<aphaerese>
10344	10345	<>	<aphaerese>
10344	9803	<elision3>	<elision3>
10344	10345	<>	<elision3>
10344	9803	<elision2>	<elision2>
10344	10345	<>	<elision2>
10344	9803	<elision1>	<elision1>
10344	10345	<>	<elision1>
10344	9799	.	υ
10344	9945	H	υ
10344	9799	.	u
10344	9954	H	u
10344	9799	.	κ
10344	10197	H	κ
10344	9914	H	k
10344	9923	H	U
10344	9927	H	K
10344	9799	.	α
10344	9957	H	α
10344	9799	.	a
10344	9960	H	a
10344	9894	H	A
10344	9799	.	λ
10344	10206	H	λ
10344	9941	H	l
10344	9936	H	L
10345	9801	.	.
10345	9801	<~>	<~>
10345	9801	<split-s>	<split-s>
10345	9801	<split-h>	<split-h>
10345	9801	<name2>	<name2>
10345	9804	<aphaerese>	<aphaerese>
10345	10346	<>	<aphaerese>
10345	9801	<elision3>	<elision3>
10345	10346	<>	<elision3>
10345	9801	<elision2>	<elision2>
10345	10346	<>	<elision2>
10345	9801	<elision1>	<elision1>
10345	10346	<>	<elision1>
10345	9800	.	υ
10345	9943	H	υ
10345	9800	.	u
10345	9952	H	u
10345	9800	.	κ
10345	10195	H	κ
10345	9912	H	k
10345	9921	H	U
10345	9924	H	K
10345	9800	.	α
10345	9955	H	α
10345	9800	.	a
10345	9958	H	a
10345	9892	H	A
10345	9800	.	λ
10345	10204	H	λ
10345	9939	H	l
10345	9942	H	L
10346	9801	.	.
10346	9801	<~>	<~>
10346	9801	<split-s>	<split-s>
10346	9801	<split-h>	<split-h>
10346	9801	<name2>	<name2>
10346	10344	<>	<name>
10346	9804	<aphaerese>	<aphaerese>
10346	10346	<>	<aphaerese>
10346	9801	<elision3>	<elision3>
10346	10346	<>	<elision3>
10346	9801	<elision2>	<elision2>
10346	10346	<>	<elision2>
10346	9801	<elision1>	<elision1>
10346	10346	<>	<elision1>
10346	9800	.	υ
10346	9943	H	υ
10346	9800	.	u
10346	9952	H	u
10346	9800	.	κ
10346	10195	H	κ
10346	9912	H	k
10346	9921	H	U
10346	9924	H	K
10346	9800	.	α
10346	9955	H	α
10346	9800	.	a
10346	9958	H	a
10346	9892	H	A
10346	9800	.	λ
10346	10204	H	λ
10346	9939	H	l
10346	9942	H	L
10347	10348	<>	<name>
10347	10347	<>	<aphaerese>
10347	10347	<>	<elision3>
10347	10347	<>	<elision2>
10347	10347	<>	<elision1>
10347	9977	<U2kl>	<>
10348	10349	<>	<aphaerese>
10348	10349	<>	<elision3>
10348	10349	<>	<elision2>
10348	10349	<>	<elision1>
10348	9978	<U2kl>	<>
10349	10347	<>	<aphaerese>
10349	10347	<>	<elision3>
10349	10347	<>	<elision2>
10349	10347	<>	<elision1>
10349	9979	<U2kl>	<>
10350	10351	<name>	<name>
10350	10354	<>	<name>
10350	10356	<>	<aphaerese>
10350	10356	<>	<elision3>
10350	10356	<>	<elision2>
10350	10356	<>	<elision1>
10350	10462	<4s>	<>
10350	10357	<A2kl>	<>
10350	10420	<L2kl>	<>
10350	10465	<K2kl>	<>
10351	10352	<4s>	<>
10352	9750	H	k
10352	10137	H	l
10352	10353	<K>	<>
10353	9927	H	k
10353	9936	H	l
10354	10355	<>	<aphaerese>
10354	10355	<>	<elision3>
10354	10355	<>	<elision2>
10354	10355	<>	<elision1>
10354	10358	<A2kl>	<>
10354	10421	<L2kl>	<>
10354	10454	<K2kl>	<>
10355	10356	<>	<aphaerese>
10355	10356	<>	<elision3>
10355	10356	<>	<elision2>
10355	10356	<>	<elision1>
10355	10359	<A2kl>	<>
10355	10422	<L2kl>	<>
10355	10455	<K2kl>	<>
10356	10354	<>	<name>
10356	10356	<>	<aphaerese>
10356	10356	<>	<elision3>
10356	10356	<>	<elision2>
10356	10356	<>	<elision1>
10356	10357	<A2kl>	<>
10356	10420	<L2kl>	<>
10356	10453	<K2kl>	<>
10357	10358	<>	<name>
10357	10357	<>	<aphaerese>
10357	10357	<>	<elision3>
10357	10357	<>	<elision2>
10357	10357	<>	<elision1>
10357	10360	.	κ
10357	10360	.	λ
10357	10412	<4s>	<>
10358	10359	<>	<aphaerese>
10358	10359	<>	<elision3>
10358	10359	<>	<elision2>
10358	10359	<>	<elision1>
10358	10362	.	κ
10358	10362	.	λ
10358	10413	<4s>	<>
10359	10357	<>	<aphaerese>
10359	10357	<>	<elision3>
10359	10357	<>	<elision2>
10359	10357	<>	<elision1>
10359	10360	.	κ
10359	10360	.	λ
10359	10411	<4s>	<>
10360	10361	<>	<name>
10360	10360	<>	<aphaerese>
10360	10363	<elision3>	<elision3>
10360	10360	<>	<elision3>
10360	10363	<elision2>	<elision2>
10360	10360	<>	<elision2>
10360	10363	<elision1>	<elision1>
10360	10360	<>	<elision1>
10360	10403	<4s>	<>
10361	10362	<>	<aphaerese>
10361	10365	<elision3>	<elision3>
10361	10362	<>	<elision3>
10361	10365	<elision2>	<elision2>
10361	10362	<>	<elision2>
10361	10365	<elision1>	<elision1>
10361	10362	<>	<elision1>
10361	10404	<4s>	<>
10362	10360	<>	<aphaerese>
10362	10363	<elision3>	<elision3>
10362	10360	<>	<elision3>
10362	10363	<elision2>	<elision2>
10362	10360	<>	<elision2>
10362	10363	<elision1>	<elision1>
10362	10360	<>	<elision1>
10362	10402	<4s>	<>
10363	9977	.	.
10363	9977	 	 
10363	9977	<~>	<~>
10363	9977	<split-s>	<split-s>
10363	9977	<split-h>	<split-h>
10363	9977	<name2>	<name2>
10363	10364	<>	<name>
10363	9980	<aphaerese>	<aphaerese>
10363	10363	<>	<aphaerese>
10363	9977	<elision3>	<elision3>
10363	10363	<>	<elision3>
10363	9977	<elision2>	<elision2>
10363	10363	<>	<elision2>
10363	9977	<elision1>	<elision1>
10363	10363	<>	<elision1>
10363	10141	.	υ
10363	10141	.	u
10363	10141	.	α
10363	10141	.	a
10363	10367	<4s>	<>
10364	9979	.	.
10364	9979	 	 
10364	9979	<~>	<~>
10364	9979	<split-s>	<split-s>
10364	9979	<split-h>	<split-h>
10364	9979	<name2>	<name2>
10364	9982	<aphaerese>	<aphaerese>
10364	10365	<>	<aphaerese>
10364	9979	<elision3>	<elision3>
10364	10365	<>	<elision3>
10364	9979	<elision2>	<elision2>
10364	10365	<>	<elision2>
10364	9979	<elision1>	<elision1>
10364	10365	<>	<elision1>
10364	10143	.	υ
10364	10143	.	u
10364	10143	.	α
10364	10143	.	a
10364	10368	<4s>	<>
10365	9977	.	.
10365	9977	 	 
10365	9977	<~>	<~>
10365	9977	<split-s>	<split-s>
10365	9977	<split-h>	<split-h>
10365	9977	<name2>	<name2>
10365	9980	<aphaerese>	<aphaerese>
10365	10363	<>	<aphaerese>
10365	9977	<elision3>	<elision3>
10365	10363	<>	<elision3>
10365	9977	<elision2>	<elision2>
10365	10363	<>	<elision2>
10365	9977	<elision1>	<elision1>
10365	10363	<>	<elision1>
10365	10141	.	υ
10365	10141	.	u
10365	10141	.	α
10365	10141	.	a
10365	10366	<4s>	<>
10366	71	.	.
10366	72	 	 
10366	71	<~>	<~>
10366	71	<split-s>	<split-s>
10366	71	<split-h>	<split-h>
10366	71	<name2>	<name2>
10366	75	<aphaerese>	<aphaerese>
10366	10367	<>	<aphaerese>
10366	71	<elision3>	<elision3>
10366	10367	<>	<elision3>
10366	71	<elision2>	<elision2>
10366	10367	<>	<elision2>
10366	71	<elision1>	<elision1>
10366	10367	<>	<elision1>
10366	9751	.	υ
10366	9795	H	υ
10366	9751	.	u
10366	9797	H	u
10366	10370	H	κ
10366	10382	H	k
10366	9718	H	U
10366	10374	H	K
10366	9751	.	α
10366	9781	H	α
10366	9751	.	a
10366	9786	H	a
10366	9548	H	A
10366	10370	H	λ
10366	10382	H	l
10366	10374	H	L
10366	10385	<K>	<>
10367	71	.	.
10367	72	 	 
10367	71	<~>	<~>
10367	71	<split-s>	<split-s>
10367	71	<split-h>	<split-h>
10367	71	<name2>	<name2>
10367	10368	<>	<name>
10367	75	<aphaerese>	<aphaerese>
10367	10367	<>	<aphaerese>
10367	71	<elision3>	<elision3>
10367	10367	<>	<elision3>
10367	71	<elision2>	<elision2>
10367	10367	<>	<elision2>
10367	71	<elision1>	<elision1>
10367	10367	<>	<elision1>
10367	9751	.	υ
10367	9795	H	υ
10367	9751	.	u
10367	9797	H	u
10367	10370	H	κ
10367	10382	H	k
10367	9718	H	U
10367	10374	H	K
10367	9751	.	α
10367	9781	H	α
10367	9751	.	a
10367	9786	H	a
10367	9548	H	A
10367	10370	H	λ
10367	10382	H	l
10367	10374	H	L
10367	10386	<K>	<>
10368	70	.	.
10368	74	 	 
10368	70	<~>	<~>
10368	70	<split-s>	<split-s>
10368	70	<split-h>	<split-h>
10368	70	<name2>	<name2>
10368	77	<aphaerese>	<aphaerese>
10368	10366	<>	<aphaerese>
10368	70	<elision3>	<elision3>
10368	10366	<>	<elision3>
10368	70	<elision2>	<elision2>
10368	10366	<>	<elision2>
10368	70	<elision1>	<elision1>
10368	10366	<>	<elision1>
10368	9753	.	υ
10368	9790	H	υ
10368	9753	.	u
10368	9794	H	u
10368	10369	H	κ
10368	10381	H	k
10368	9720	H	U
10368	10373	H	K
10368	9753	.	α
10368	9780	H	α
10368	9753	.	a
10368	9785	H	a
10368	9551	H	A
10368	10369	H	λ
10368	10381	H	l
10368	10373	H	L
10368	10384	<K>	<>
10369	10370	<>	<aphaerese>
10369	10370	<>	<elision3>
10369	10370	<>	<elision2>
10369	10370	<>	<elision1>
10369	10373	<lambda2L>	<>
10370	10371	<>	<name>
10370	10370	<>	<aphaerese>
10370	10370	<>	<elision3>
10370	10370	<>	<elision2>
10370	10370	<>	<elision1>
10370	10374	<lambda2L>	<>
10371	10369	<>	<aphaerese>
10371	10369	<>	<elision3>
10371	10369	<>	<elision2>
10371	10369	<>	<elision1>
10371	10372	<lambda2L>	<>
10372	10373	<>	<aphaerese>
10372	10373	<>	<elision3>
10372	10373	<>	<elision2>
10372	10373	<>	<elision1>
10372	10377	.	κ
10372	10377	.	λ
10372	8805	<1s>	<>
10373	10374	<>	<aphaerese>
10373	10374	<>	<elision3>
10373	10374	<>	<elision2>
10373	10374	<>	<elision1>
10373	10375	.	κ
10373	10375	.	λ
10373	8803	<1s>	<>
10374	10372	<>	<name>
10374	10374	<>	<aphaerese>
10374	10374	<>	<elision3>
10374	10374	<>	<elision2>
10374	10374	<>	<elision1>
10374	10375	.	κ
10374	10375	.	λ
10374	8804	<1s>	<>
10375	10376	<>	<name>
10375	10375	<>	<aphaerese>
10375	10378	<elision3>	<elision3>
10375	10375	<>	<elision3>
10375	10378	<elision2>	<elision2>
10375	10375	<>	<elision2>
10375	10378	<elision1>	<elision1>
10375	10375	<>	<elision1>
10375	8795	<1s>	<>
10376	10377	<>	<aphaerese>
10376	10380	<elision3>	<elision3>
10376	10377	<>	<elision3>
10376	10380	<elision2>	<elision2>
10376	10377	<>	<elision2>
10376	10380	<elision1>	<elision1>
10376	10377	<>	<elision1>
10376	8796	<1s>	<>
10377	10375	<>	<aphaerese>
10377	10378	<elision3>	<elision3>
10377	10375	<>	<elision3>
10377	10378	<elision2>	<elision2>
10377	10375	<>	<elision2>
10377	10378	<elision1>	<elision1>
10377	10375	<>	<elision1>
10377	8794	<1s>	<>
10378	10379	<>	<name>
10378	10378	<>	<aphaerese>
10378	10378	<>	<elision3>
10378	10378	<>	<elision2>
10378	10378	<>	<elision1>
10378	9562	.	κ
10378	9580	s	κ
10378	9315	s	k
10378	9333	s	K
10378	9636	s	λ
10378	9346	s	l
10378	9349	s	L
10378	8789	<1s>	<>
10379	10380	<>	<aphaerese>
10379	10380	<>	<elision3>
10379	10380	<>	<elision2>
10379	10380	<>	<elision1>
10379	9564	.	κ
10379	9582	s	κ
10379	9317	s	k
10379	9336	s	K
10379	9638	s	λ
10379	9348	s	l
10379	9351	s	L
10379	8790	<1s>	<>
10380	10378	<>	<aphaerese>
10380	10378	<>	<elision3>
10380	10378	<>	<elision2>
10380	10378	<>	<elision1>
10380	9562	.	κ
10380	9580	s	κ
10380	9315	s	k
10380	9333	s	K
10380	9636	s	λ
10380	9346	s	l
10380	9349	s	L
10380	8788	<1s>	<>
10381	10382	<>	<aphaerese>
10381	10382	<>	<elision3>
10381	10382	<>	<elision2>
10381	10382	<>	<elision1>
10381	10373	<l2L>	<>
10382	10383	<>	<name>
10382	10382	<>	<aphaerese>
10382	10382	<>	<elision3>
10382	10382	<>	<elision2>
10382	10382	<>	<elision1>
10382	10374	<l2L>	<>
10383	10381	<>	<aphaerese>
10383	10381	<>	<elision3>
10383	10381	<>	<elision2>
10383	10381	<>	<elision1>
10383	10372	<l2L>	<>
10384	9803	.	.
10384	9803	<~>	<~>
10384	9803	<split-s>	<split-s>
10384	9803	<split-h>	<split-h>
10384	9803	<name2>	<name2>
10384	9806	<aphaerese>	<aphaerese>
10384	10385	<>	<aphaerese>
10384	9803	<elision3>	<elision3>
10384	10385	<>	<elision3>
10384	9803	<elision2>	<elision2>
10384	10385	<>	<elision2>
10384	9803	<elision1>	<elision1>
10384	10385	<>	<elision1>
10384	9799	.	υ
10384	9945	H	υ
10384	9799	.	u
10384	9954	H	u
10384	10389	H	κ
10384	10401	H	k
10384	9923	H	U
10384	10390	H	K
10384	9799	.	α
10384	9957	H	α
10384	9799	.	a
10384	9960	H	a
10384	9894	H	A
10384	10389	H	λ
10384	10401	H	l
10384	10390	H	L
10385	9801	.	.
10385	9801	<~>	<~>
10385	9801	<split-s>	<split-s>
10385	9801	<split-h>	<split-h>
10385	9801	<name2>	<name2>
10385	9804	<aphaerese>	<aphaerese>
10385	10386	<>	<aphaerese>
10385	9801	<elision3>	<elision3>
10385	10386	<>	<elision3>
10385	9801	<elision2>	<elision2>
10385	10386	<>	<elision2>
10385	9801	<elision1>	<elision1>
10385	10386	<>	<elision1>
10385	9800	.	υ
10385	9943	H	υ
10385	9800	.	u
10385	9952	H	u
10385	10387	H	κ
10385	10399	H	k
10385	9921	H	U
10385	10391	H	K
10385	9800	.	α
10385	9955	H	α
10385	9800	.	a
10385	9958	H	a
10385	9892	H	A
10385	10387	H	λ
10385	10399	H	l
10385	10391	H	L
10386	9801	.	.
10386	9801	<~>	<~>
10386	9801	<split-s>	<split-s>
10386	9801	<split-h>	<split-h>
10386	9801	<name2>	<name2>
10386	10384	<>	<name>
10386	9804	<aphaerese>	<aphaerese>
10386	10386	<>	<aphaerese>
10386	9801	<elision3>	<elision3>
10386	10386	<>	<elision3>
10386	9801	<elision2>	<elision2>
10386	10386	<>	<elision2>
10386	9801	<elision1>	<elision1>
10386	10386	<>	<elision1>
10386	9800	.	υ
10386	9943	H	υ
10386	9800	.	u
10386	9952	H	u
10386	10387	H	κ
10386	10399	H	k
10386	9921	H	U
10386	10391	H	K
10386	9800	.	α
10386	9955	H	α
10386	9800	.	a
10386	9958	H	a
10386	9892	H	A
10386	10387	H	λ
10386	10399	H	l
10386	10391	H	L
10387	10388	<>	<name>
10387	10387	<>	<aphaerese>
10387	10387	<>	<elision3>
10387	10387	<>	<elision2>
10387	10387	<>	<elision1>
10387	10391	<lambda2L>	<>
10388	10389	<>	<aphaerese>
10388	10389	<>	<elision3>
10388	10389	<>	<elision2>
10388	10389	<>	<elision1>
10388	10392	<lambda2L>	<>
10389	10387	<>	<aphaerese>
10389	10387	<>	<elision3>
10389	10387	<>	<elision2>
10389	10387	<>	<elision1>
10389	10390	<lambda2L>	<>
10390	10391	<>	<aphaerese>
10390	10391	<>	<elision3>
10390	10391	<>	<elision2>
10390	10391	<>	<elision1>
10390	10394	.	κ
10390	10394	.	λ
10391	10392	<>	<name>
10391	10391	<>	<aphaerese>
10391	10391	<>	<elision3>
10391	10391	<>	<elision2>
10391	10391	<>	<elision1>
10391	10394	.	κ
10391	10394	.	λ
10392	10390	<>	<aphaerese>
10392	10390	<>	<elision3>
10392	10390	<>	<elision2>
10392	10390	<>	<elision1>
10392	10393	.	κ
10392	10393	.	λ
10393	10394	<>	<aphaerese>
10393	10397	<elision3>	<elision3>
10393	10394	<>	<elision3>
10393	10397	<elision2>	<elision2>
10393	10394	<>	<elision2>
10393	10397	<elision1>	<elision1>
10393	10394	<>	<elision1>
10394	10395	<>	<name>
10394	10394	<>	<aphaerese>
10394	10397	<elision3>	<elision3>
10394	10394	<>	<elision3>
10394	10397	<elision2>	<elision2>
10394	10394	<>	<elision2>
10394	10397	<elision1>	<elision1>
10394	10394	<>	<elision1>
10395	10393	<>	<aphaerese>
10395	10396	<elision3>	<elision3>
10395	10393	<>	<elision3>
10395	10396	<elision2>	<elision2>
10395	10393	<>	<elision2>
10395	10396	<elision1>	<elision1>
10395	10393	<>	<elision1>
10396	10397	<>	<aphaerese>
10396	10397	<>	<elision3>
10396	10397	<>	<elision2>
10396	10397	<>	<elision1>
10396	9868	.	κ
10396	9841	s	κ
10396	9844	H	κ
10396	9841	s	k
10396	9844	H	k
10396	9829	s	K
10396	9844	H	K
10396	9841	s	λ
10396	9844	H	λ
10396	9841	s	l
10396	9844	H	l
10396	9835	s	L
10396	9844	H	L
10397	10398	<>	<name>
10397	10397	<>	<aphaerese>
10397	10397	<>	<elision3>
10397	10397	<>	<elision2>
10397	10397	<>	<elision1>
10397	9868	.	κ
10397	9841	s	κ
10397	9844	H	κ
10397	9841	s	k
10397	9844	H	k
10397	9829	s	K
10397	9844	H	K
10397	9841	s	λ
10397	9844	H	λ
10397	9841	s	l
10397	9844	H	l
10397	9835	s	L
10397	9844	H	L
10398	10396	<>	<aphaerese>
10398	10396	<>	<elision3>
10398	10396	<>	<elision2>
10398	10396	<>	<elision1>
10398	9870	.	κ
10398	9840	s	κ
10398	9843	H	κ
10398	9840	s	k
10398	9843	H	k
10398	9828	s	K
10398	9843	H	K
10398	9840	s	λ
10398	9843	H	λ
10398	9840	s	l
10398	9843	H	l
10398	9834	s	L
10398	9843	H	L
10399	10400	<>	<name>
10399	10399	<>	<aphaerese>
10399	10399	<>	<elision3>
10399	10399	<>	<elision2>
10399	10399	<>	<elision1>
10399	10391	<l2L>	<>
10400	10401	<>	<aphaerese>
10400	10401	<>	<elision3>
10400	10401	<>	<elision2>
10400	10401	<>	<elision1>
10400	10392	<l2L>	<>
10401	10399	<>	<aphaerese>
10401	10399	<>	<elision3>
10401	10399	<>	<elision2>
10401	10399	<>	<elision1>
10401	10390	<l2L>	<>
10402	10403	<>	<aphaerese>
10402	10406	<elision3>	<elision3>
10402	10403	<>	<elision3>
10402	10406	<elision2>	<elision2>
10402	10403	<>	<elision2>
10402	10406	<elision1>	<elision1>
10402	10403	<>	<elision1>
10402	10409	<K>	<>
10403	10404	<>	<name>
10403	10403	<>	<aphaerese>
10403	10406	<elision3>	<elision3>
10403	10403	<>	<elision3>
10403	10406	<elision2>	<elision2>
10403	10403	<>	<elision2>
10403	10406	<elision1>	<elision1>
10403	10403	<>	<elision1>
10403	10410	<K>	<>
10404	10402	<>	<aphaerese>
10404	10405	<elision3>	<elision3>
10404	10402	<>	<elision3>
10404	10405	<elision2>	<elision2>
10404	10402	<>	<elision2>
10404	10405	<elision1>	<elision1>
10404	10402	<>	<elision1>
10404	10408	<K>	<>
10405	71	.	.
10405	72	 	 
10405	71	<~>	<~>
10405	71	<split-s>	<split-s>
10405	71	<split-h>	<split-h>
10405	71	<name2>	<name2>
10405	75	<aphaerese>	<aphaerese>
10405	10406	<>	<aphaerese>
10405	71	<elision3>	<elision3>
10405	10406	<>	<elision3>
10405	71	<elision2>	<elision2>
10405	10406	<>	<elision2>
10405	71	<elision1>	<elision1>
10405	10406	<>	<elision1>
10405	9751	.	υ
10405	9795	H	υ
10405	9751	.	u
10405	9797	H	u
10405	10370	H	κ
10405	10382	H	k
10405	9718	H	U
10405	10374	H	K
10405	9751	.	α
10405	9781	H	α
10405	9751	.	a
10405	9786	H	a
10405	9548	H	A
10405	10370	H	λ
10405	10382	H	l
10405	10374	H	L
10406	71	.	.
10406	72	 	 
10406	71	<~>	<~>
10406	71	<split-s>	<split-s>
10406	71	<split-h>	<split-h>
10406	71	<name2>	<name2>
10406	10407	<>	<name>
10406	75	<aphaerese>	<aphaerese>
10406	10406	<>	<aphaerese>
10406	71	<elision3>	<elision3>
10406	10406	<>	<elision3>
10406	71	<elision2>	<elision2>
10406	10406	<>	<elision2>
10406	71	<elision1>	<elision1>
10406	10406	<>	<elision1>
10406	9751	.	υ
10406	9795	H	υ
10406	9751	.	u
10406	9797	H	u
10406	10370	H	κ
10406	10382	H	k
10406	9718	H	U
10406	10374	H	K
10406	9751	.	α
10406	9781	H	α
10406	9751	.	a
10406	9786	H	a
10406	9548	H	A
10406	10370	H	λ
10406	10382	H	l
10406	10374	H	L
10407	70	.	.
10407	74	 	 
10407	70	<~>	<~>
10407	70	<split-s>	<split-s>
10407	70	<split-h>	<split-h>
10407	70	<name2>	<name2>
10407	77	<aphaerese>	<aphaerese>
10407	10405	<>	<aphaerese>
10407	70	<elision3>	<elision3>
10407	10405	<>	<elision3>
10407	70	<elision2>	<elision2>
10407	10405	<>	<elision2>
10407	70	<elision1>	<elision1>
10407	10405	<>	<elision1>
10407	9753	.	υ
10407	9790	H	υ
10407	9753	.	u
10407	9794	H	u
10407	10369	H	κ
10407	10381	H	k
10407	9720	H	U
10407	10373	H	K
10407	9753	.	α
10407	9780	H	α
10407	9753	.	a
10407	9785	H	a
10407	9551	H	A
10407	10369	H	λ
10407	10381	H	l
10407	10373	H	L
10408	10409	<>	<aphaerese>
10408	10385	<elision3>	<elision3>
10408	10409	<>	<elision3>
10408	10385	<elision2>	<elision2>
10408	10409	<>	<elision2>
10408	10385	<elision1>	<elision1>
10408	10409	<>	<elision1>
10409	10410	<>	<aphaerese>
10409	10386	<elision3>	<elision3>
10409	10410	<>	<elision3>
10409	10386	<elision2>	<elision2>
10409	10410	<>	<elision2>
10409	10386	<elision1>	<elision1>
10409	10410	<>	<elision1>
10410	10408	<>	<name>
10410	10410	<>	<aphaerese>
10410	10386	<elision3>	<elision3>
10410	10410	<>	<elision3>
10410	10386	<elision2>	<elision2>
10410	10410	<>	<elision2>
10410	10386	<elision1>	<elision1>
10410	10410	<>	<elision1>
10411	10412	<>	<aphaerese>
10411	10412	<>	<elision3>
10411	10412	<>	<elision2>
10411	10412	<>	<elision1>
10411	10415	.	κ
10411	10415	.	λ
10411	10418	<K>	<>
10412	10413	<>	<name>
10412	10412	<>	<aphaerese>
10412	10412	<>	<elision3>
10412	10412	<>	<elision2>
10412	10412	<>	<elision1>
10412	10415	.	κ
10412	10415	.	λ
10412	10419	<K>	<>
10413	10411	<>	<aphaerese>
10413	10411	<>	<elision3>
10413	10411	<>	<elision2>
10413	10411	<>	<elision1>
10413	10414	.	κ
10413	10414	.	λ
10413	10417	<K>	<>
10414	10415	<>	<aphaerese>
10414	10406	<elision3>	<elision3>
10414	10415	<>	<elision3>
10414	10406	<elision2>	<elision2>
10414	10415	<>	<elision2>
10414	10406	<elision1>	<elision1>
10414	10415	<>	<elision1>
10415	10416	<>	<name>
10415	10415	<>	<aphaerese>
10415	10406	<elision3>	<elision3>
10415	10415	<>	<elision3>
10415	10406	<elision2>	<elision2>
10415	10415	<>	<elision2>
10415	10406	<elision1>	<elision1>
10415	10415	<>	<elision1>
10416	10414	<>	<aphaerese>
10416	10405	<elision3>	<elision3>
10416	10414	<>	<elision3>
10416	10405	<elision2>	<elision2>
10416	10414	<>	<elision2>
10416	10405	<elision1>	<elision1>
10416	10414	<>	<elision1>
10417	10418	<>	<aphaerese>
10417	10418	<>	<elision3>
10417	10418	<>	<elision2>
10417	10418	<>	<elision1>
10417	10409	.	κ
10417	10409	.	λ
10418	10419	<>	<aphaerese>
10418	10419	<>	<elision3>
10418	10419	<>	<elision2>
10418	10419	<>	<elision1>
10418	10410	.	κ
10418	10410	.	λ
10419	10417	<>	<name>
10419	10419	<>	<aphaerese>
10419	10419	<>	<elision3>
10419	10419	<>	<elision2>
10419	10419	<>	<elision1>
10419	10410	.	κ
10419	10410	.	λ
10420	10421	<>	<name>
10420	10420	<>	<aphaerese>
10420	10420	<>	<elision3>
10420	10420	<>	<elision2>
10420	10420	<>	<elision1>
10420	10423	.	κ
10420	10423	.	λ
10420	10445	<4s>	<>
10421	10422	<>	<aphaerese>
10421	10422	<>	<elision3>
10421	10422	<>	<elision2>
10421	10422	<>	<elision1>
10421	10425	.	κ
10421	10425	.	λ
10421	10446	<4s>	<>
10422	10420	<>	<aphaerese>
10422	10420	<>	<elision3>
10422	10420	<>	<elision2>
10422	10420	<>	<elision1>
10422	10423	.	κ
10422	10423	.	λ
10422	10444	<4s>	<>
10423	10424	<>	<name>
10423	10423	<>	<aphaerese>
10423	10426	<elision3>	<elision3>
10423	10423	<>	<elision3>
10423	10426	<elision2>	<elision2>
10423	10423	<>	<elision2>
10423	10426	<elision1>	<elision1>
10423	10423	<>	<elision1>
10423	10436	<4s>	<>
10424	10425	<>	<aphaerese>
10424	10428	<elision3>	<elision3>
10424	10425	<>	<elision3>
10424	10428	<elision2>	<elision2>
10424	10425	<>	<elision2>
10424	10428	<elision1>	<elision1>
10424	10425	<>	<elision1>
10424	10437	<4s>	<>
10425	10423	<>	<aphaerese>
10425	10426	<elision3>	<elision3>
10425	10423	<>	<elision3>
10425	10426	<elision2>	<elision2>
10425	10423	<>	<elision2>
10425	10426	<elision1>	<elision1>
10425	10423	<>	<elision1>
10425	10435	<4s>	<>
10426	10427	<>	<name>
10426	10426	<>	<aphaerese>
10426	10426	<>	<elision3>
10426	10426	<>	<elision2>
10426	10426	<>	<elision1>
10426	9983	.	κ
10426	10430	<4s>	<>
10427	10428	<>	<aphaerese>
10427	10428	<>	<elision3>
10427	10428	<>	<elision2>
10427	10428	<>	<elision1>
10427	9985	.	κ
10427	10431	<4s>	<>
10428	10426	<>	<aphaerese>
10428	10426	<>	<elision3>
10428	10426	<>	<elision2>
10428	10426	<>	<elision1>
10428	9983	.	κ
10428	10429	<4s>	<>
10429	10430	<>	<aphaerese>
10429	10430	<>	<elision3>
10429	10430	<>	<elision2>
10429	10430	<>	<elision1>
10429	78	.	κ
10429	9377	H	κ
10429	9705	H	k
10429	9721	H	K
10429	9732	H	λ
10429	10135	H	l
10429	10140	H	L
10429	10433	<K>	<>
10430	10431	<>	<name>
10430	10430	<>	<aphaerese>
10430	10430	<>	<elision3>
10430	10430	<>	<elision2>
10430	10430	<>	<elision1>
10430	78	.	κ
10430	9377	H	κ
10430	9705	H	k
10430	9721	H	K
10430	9732	H	λ
10430	10135	H	l
10430	10140	H	L
10430	10434	<K>	<>
10431	10429	<>	<aphaerese>
10431	10429	<>	<elision3>
10431	10429	<>	<elision2>
10431	10429	<>	<elision1>
10431	80	.	κ
10431	9742	H	κ
10431	9746	H	k
10431	9750	H	K
10431	9734	H	λ
10431	10134	H	l
10431	10137	H	L
10431	10432	<K>	<>
10432	10433	<>	<aphaerese>
10432	10433	<>	<elision3>
10432	10433	<>	<elision2>
10432	10433	<>	<elision1>
10432	9809	.	κ
10432	9860	H	κ
10432	9914	H	k
10432	9927	H	K
10432	9935	H	λ
10432	9941	H	l
10432	9936	H	L
10433	10434	<>	<aphaerese>
10433	10434	<>	<elision3>
10433	10434	<>	<elision2>
10433	10434	<>	<elision1>
10433	9807	.	κ
10433	9858	H	κ
10433	9912	H	k
10433	9924	H	K
10433	9933	H	λ
10433	9939	H	l
10433	9942	H	L
10434	10432	<>	<name>
10434	10434	<>	<aphaerese>
10434	10434	<>	<elision3>
10434	10434	<>	<elision2>
10434	10434	<>	<elision1>
10434	9807	.	κ
10434	9858	H	κ
10434	9912	H	k
10434	9924	H	K
10434	9933	H	λ
10434	9939	H	l
10434	9942	H	L
10435	10436	<>	<aphaerese>
10435	10439	<elision3>	<elision3>
10435	10436	<>	<elision3>
10435	10439	<elision2>	<elision2>
10435	10436	<>	<elision2>
10435	10439	<elision1>	<elision1>
10435	10436	<>	<elision1>
10435	10442	<K>	<>
10436	10437	<>	<name>
10436	10436	<>	<aphaerese>
10436	10439	<elision3>	<elision3>
10436	10436	<>	<elision3>
10436	10439	<elision2>	<elision2>
10436	10436	<>	<elision2>
10436	10439	<elision1>	<elision1>
10436	10436	<>	<elision1>
10436	10443	<K>	<>
10437	10435	<>	<aphaerese>
10437	10438	<elision3>	<elision3>
10437	10435	<>	<elision3>
10437	10438	<elision2>	<elision2>
10437	10435	<>	<elision2>
10437	10438	<elision1>	<elision1>
10437	10435	<>	<elision1>
10437	10441	<K>	<>
10438	10439	<>	<aphaerese>
10438	10439	<>	<elision3>
10438	10439	<>	<elision2>
10438	10439	<>	<elision1>
10438	78	.	κ
10438	9377	H	κ
10438	9705	H	k
10438	9721	H	K
10438	9732	H	λ
10438	9738	H	l
10438	9741	H	L
10439	10440	<>	<name>
10439	10439	<>	<aphaerese>
10439	10439	<>	<elision3>
10439	10439	<>	<elision2>
10439	10439	<>	<elision1>
10439	78	.	κ
10439	9377	H	κ
10439	9705	H	k
10439	9721	H	K
10439	9732	H	λ
10439	9738	H	l
10439	9741	H	L
10440	10438	<>	<aphaerese>
10440	10438	<>	<elision3>
10440	10438	<>	<elision2>
10440	10438	<>	<elision1>
10440	80	.	κ
10440	9742	H	κ
10440	9746	H	k
10440	9750	H	K
10440	9734	H	λ
10440	9740	H	l
10440	9735	H	L
10441	10442	<>	<aphaerese>
10441	10433	<elision3>	<elision3>
10441	10442	<>	<elision3>
10441	10433	<elision2>	<elision2>
10441	10442	<>	<elision2>
10441	10433	<elision1>	<elision1>
10441	10442	<>	<elision1>
10442	10443	<>	<aphaerese>
10442	10434	<elision3>	<elision3>
10442	10443	<>	<elision3>
10442	10434	<elision2>	<elision2>
10442	10443	<>	<elision2>
10442	10434	<elision1>	<elision1>
10442	10443	<>	<elision1>
10443	10441	<>	<name>
10443	10443	<>	<aphaerese>
10443	10434	<elision3>	<elision3>
10443	10443	<>	<elision3>
10443	10434	<elision2>	<elision2>
10443	10443	<>	<elision2>
10443	10434	<elision1>	<elision1>
10443	10443	<>	<elision1>
10444	10445	<>	<aphaerese>
10444	10445	<>	<elision3>
10444	10445	<>	<elision2>
10444	10445	<>	<elision1>
10444	10448	.	κ
10444	10448	.	λ
10444	10451	<K>	<>
10445	10446	<>	<name>
10445	10445	<>	<aphaerese>
10445	10445	<>	<elision3>
10445	10445	<>	<elision2>
10445	10445	<>	<elision1>
10445	10448	.	κ
10445	10448	.	λ
10445	10452	<K>	<>
10446	10444	<>	<aphaerese>
10446	10444	<>	<elision3>
10446	10444	<>	<elision2>
10446	10444	<>	<elision1>
10446	10447	.	κ
10446	10447	.	λ
10446	10450	<K>	<>
10447	10448	<>	<aphaerese>
10447	10439	<elision3>	<elision3>
10447	10448	<>	<elision3>
10447	10439	<elision2>	<elision2>
10447	10448	<>	<elision2>
10447	10439	<elision1>	<elision1>
10447	10448	<>	<elision1>
10448	10449	<>	<name>
10448	10448	<>	<aphaerese>
10448	10439	<elision3>	<elision3>
10448	10448	<>	<elision3>
10448	10439	<elision2>	<elision2>
10448	10448	<>	<elision2>
10448	10439	<elision1>	<elision1>
10448	10448	<>	<elision1>
10449	10447	<>	<aphaerese>
10449	10438	<elision3>	<elision3>
10449	10447	<>	<elision3>
10449	10438	<elision2>	<elision2>
10449	10447	<>	<elision2>
10449	10438	<elision1>	<elision1>
10449	10447	<>	<elision1>
10450	10451	<>	<aphaerese>
10450	10451	<>	<elision3>
10450	10451	<>	<elision2>
10450	10451	<>	<elision1>
10450	10442	.	κ
10450	10442	.	λ
10451	10452	<>	<aphaerese>
10451	10452	<>	<elision3>
10451	10452	<>	<elision2>
10451	10452	<>	<elision1>
10451	10443	.	κ
10451	10443	.	λ
10452	10450	<>	<name>
10452	10452	<>	<aphaerese>
10452	10452	<>	<elision3>
10452	10452	<>	<elision2>
10452	10452	<>	<elision1>
10452	10443	.	κ
10452	10443	.	λ
10453	9977	.	.
10453	9977	 	 
10453	9977	<~>	<~>
10453	9977	<split-s>	<split-s>
10453	9977	<split-h>	<split-h>
10453	9977	<name2>	<name2>
10453	10454	<>	<name>
10453	9980	<aphaerese>	<aphaerese>
10453	10453	<>	<aphaerese>
10453	9977	<elision3>	<elision3>
10453	10453	<>	<elision3>
10453	9977	<elision2>	<elision2>
10453	10453	<>	<elision2>
10453	9977	<elision1>	<elision1>
10453	10453	<>	<elision1>
10453	10141	.	υ
10453	10141	.	u
10453	10141	.	α
10453	10141	.	a
10453	10457	<4s>	<>
10454	9979	.	.
10454	9979	 	 
10454	9979	<~>	<~>
10454	9979	<split-s>	<split-s>
10454	9979	<split-h>	<split-h>
10454	9979	<name2>	<name2>
10454	9982	<aphaerese>	<aphaerese>
10454	10455	<>	<aphaerese>
10454	9979	<elision3>	<elision3>
10454	10455	<>	<elision3>
10454	9979	<elision2>	<elision2>
10454	10455	<>	<elision2>
10454	9979	<elision1>	<elision1>
10454	10455	<>	<elision1>
10454	10143	.	υ
10454	10143	.	u
10454	10143	.	α
10454	10143	.	a
10454	10458	<4s>	<>
10455	9977	.	.
10455	9977	 	 
10455	9977	<~>	<~>
10455	9977	<split-s>	<split-s>
10455	9977	<split-h>	<split-h>
10455	9977	<name2>	<name2>
10455	9980	<aphaerese>	<aphaerese>
10455	10453	<>	<aphaerese>
10455	9977	<elision3>	<elision3>
10455	10453	<>	<elision3>
10455	9977	<elision2>	<elision2>
10455	10453	<>	<elision2>
10455	9977	<elision1>	<elision1>
10455	10453	<>	<elision1>
10455	10141	.	υ
10455	10141	.	u
10455	10141	.	α
10455	10141	.	a
10455	10456	<4s>	<>
10456	71	.	.
10456	72	 	 
10456	71	<~>	<~>
10456	71	<split-s>	<split-s>
10456	71	<split-h>	<split-h>
10456	71	<name2>	<name2>
10456	75	<aphaerese>	<aphaerese>
10456	10457	<>	<aphaerese>
10456	71	<elision3>	<elision3>
10456	10457	<>	<elision3>
10456	71	<elision2>	<elision2>
10456	10457	<>	<elision2>
10456	71	<elision1>	<elision1>
10456	10457	<>	<elision1>
10456	9751	.	υ
10456	9795	H	υ
10456	9751	.	u
10456	9797	H	u
10456	10210	H	κ
10456	9705	H	k
10456	9718	H	U
10456	9721	H	K
10456	9751	.	α
10456	9781	H	α
10456	9751	.	a
10456	9786	H	a
10456	9548	H	A
10456	10187	H	λ
10456	10135	H	l
10456	10140	H	L
10456	10460	<K>	<>
10457	71	.	.
10457	72	 	 
10457	71	<~>	<~>
10457	71	<split-s>	<split-s>
10457	71	<split-h>	<split-h>
10457	71	<name2>	<name2>
10457	10458	<>	<name>
10457	75	<aphaerese>	<aphaerese>
10457	10457	<>	<aphaerese>
10457	71	<elision3>	<elision3>
10457	10457	<>	<elision3>
10457	71	<elision2>	<elision2>
10457	10457	<>	<elision2>
10457	71	<elision1>	<elision1>
10457	10457	<>	<elision1>
10457	9751	.	υ
10457	9795	H	υ
10457	9751	.	u
10457	9797	H	u
10457	10210	H	κ
10457	9705	H	k
10457	9718	H	U
10457	9721	H	K
10457	9751	.	α
10457	9781	H	α
10457	9751	.	a
10457	9786	H	a
10457	9548	H	A
10457	10187	H	λ
10457	10135	H	l
10457	10140	H	L
10457	10461	<K>	<>
10458	70	.	.
10458	74	 	 
10458	70	<~>	<~>
10458	70	<split-s>	<split-s>
10458	70	<split-h>	<split-h>
10458	70	<name2>	<name2>
10458	77	<aphaerese>	<aphaerese>
10458	10456	<>	<aphaerese>
10458	70	<elision3>	<elision3>
10458	10456	<>	<elision3>
10458	70	<elision2>	<elision2>
10458	10456	<>	<elision2>
10458	70	<elision1>	<elision1>
10458	10456	<>	<elision1>
10458	9753	.	υ
10458	9790	H	υ
10458	9753	.	u
10458	9794	H	u
10458	10167	H	κ
10458	9746	H	k
10458	9720	H	U
10458	9750	H	K
10458	9753	.	α
10458	9780	H	α
10458	9753	.	a
10458	9785	H	a
10458	9551	H	A
10458	10186	H	λ
10458	10134	H	l
10458	10137	H	L
10458	10459	<K>	<>
10459	9803	.	.
10459	9803	<~>	<~>
10459	9803	<split-s>	<split-s>
10459	9803	<split-h>	<split-h>
10459	9803	<name2>	<name2>
10459	9806	<aphaerese>	<aphaerese>
10459	10460	<>	<aphaerese>
10459	9803	<elision3>	<elision3>
10459	10460	<>	<elision3>
10459	9803	<elision2>	<elision2>
10459	10460	<>	<elision2>
10459	9803	<elision1>	<elision1>
10459	10460	<>	<elision1>
10459	9799	.	υ
10459	9945	H	υ
10459	9799	.	u
10459	9954	H	u
10459	10197	H	κ
10459	9914	H	k
10459	9923	H	U
10459	9927	H	K
10459	9799	.	α
10459	9957	H	α
10459	9799	.	a
10459	9960	H	a
10459	9894	H	A
10459	10206	H	λ
10459	9941	H	l
10459	9936	H	L
10460	9801	.	.
10460	9801	<~>	<~>
10460	9801	<split-s>	<split-s>
10460	9801	<split-h>	<split-h>
10460	9801	<name2>	<name2>
10460	9804	<aphaerese>	<aphaerese>
10460	10461	<>	<aphaerese>
10460	9801	<elision3>	<elision3>
10460	10461	<>	<elision3>
10460	9801	<elision2>	<elision2>
10460	10461	<>	<elision2>
10460	9801	<elision1>	<elision1>
10460	10461	<>	<elision1>
10460	9800	.	υ
10460	9943	H	υ
10460	9800	.	u
10460	9952	H	u
10460	10195	H	κ
10460	9912	H	k
10460	9921	H	U
10460	9924	H	K
10460	9800	.	α
10460	9955	H	α
10460	9800	.	a
10460	9958	H	a
10460	9892	H	A
10460	10204	H	λ
10460	9939	H	l
10460	9942	H	L
10461	9801	.	.
10461	9801	<~>	<~>
10461	9801	<split-s>	<split-s>
10461	9801	<split-h>	<split-h>
10461	9801	<name2>	<name2>
10461	10459	<>	<name>
10461	9804	<aphaerese>	<aphaerese>
10461	10461	<>	<aphaerese>
10461	9801	<elision3>	<elision3>
10461	10461	<>	<elision3>
10461	9801	<elision2>	<elision2>
10461	10461	<>	<elision2>
10461	9801	<elision1>	<elision1>
10461	10461	<>	<elision1>
10461	9800	.	υ
10461	9943	H	υ
10461	9800	.	u
10461	9952	H	u
10461	10195	H	κ
10461	9912	H	k
10461	9921	H	U
10461	9924	H	K
10461	9800	.	α
10461	9955	H	α
10461	9800	.	a
10461	9958	H	a
10461	9892	H	A
10461	10204	H	λ
10461	9939	H	l
10461	9942	H	L
10462	10463	<name>	<name>
10462	10464	<K>	<>
10463	9750	H	k
10463	9735	H	l
10464	10353	<name>	<name>
10465	9977	.	.
10465	9977	 	 
10465	9977	<~>	<~>
10465	9977	<split-s>	<split-s>
10465	9977	<split-h>	<split-h>
10465	9977	<name2>	<name2>
10465	10351	<name2>	<name>
10465	10454	<>	<name>
10465	9980	<aphaerese>	<aphaerese>
10465	10453	<>	<aphaerese>
10465	9977	<elision3>	<elision3>
10465	10453	<>	<elision3>
10465	9977	<elision2>	<elision2>
10465	10453	<>	<elision2>
10465	9977	<elision1>	<elision1>
10465	10453	<>	<elision1>
10465	10141	.	υ
10465	10141	.	u
10465	10141	.	α
10465	10141	.	a
10465	10466	<4s>	<>
10466	71	.	.
10466	72	 	 
10466	71	<~>	<~>
10466	71	<split-s>	<split-s>
10466	71	<split-h>	<split-h>
10466	71	<name2>	<name2>
10466	10463	<name2>	<name>
10466	10458	<>	<name>
10466	75	<aphaerese>	<aphaerese>
10466	10457	<>	<aphaerese>
10466	71	<elision3>	<elision3>
10466	10457	<>	<elision3>
10466	71	<elision2>	<elision2>
10466	10457	<>	<elision2>
10466	71	<elision1>	<elision1>
10466	10457	<>	<elision1>
10466	9751	.	υ
10466	9795	H	υ
10466	9751	.	u
10466	9797	H	u
10466	10210	H	κ
10466	9705	H	k
10466	9718	H	U
10466	9721	H	K
10466	9751	.	α
10466	9781	H	α
10466	9751	.	a
10466	9786	H	a
10466	9548	H	A
10466	10187	H	λ
10466	10135	H	l
10466	10140	H	L
10466	10467	<K>	<>
10467	9801	.	.
10467	9801	<~>	<~>
10467	9801	<split-s>	<split-s>
10467	9801	<split-h>	<split-h>
10467	9801	<name2>	<name2>
10467	10353	<name2>	<name>
10467	10459	<>	<name>
10467	9804	<aphaerese>	<aphaerese>
10467	10461	<>	<aphaerese>
10467	9801	<elision3>	<elision3>
10467	10461	<>	<elision3>
10467	9801	<elision2>	<elision2>
10467	10461	<>	<elision2>
10467	9801	<elision1>	<elision1>
10467	10461	<>	<elision1>
10467	9800	.	υ
10467	9943	H	υ
10467	9800	.	u
10467	9952	H	u
10467	10195	H	κ
10467	9912	H	k
10467	9921	H	U
10467	9924	H	K
10467	9800	.	α
10467	9955	H	α
10467	9800	.	a
10467	9958	H	a
10467	9892	H	A
10467	10204	H	λ
10467	9939	H	l
10467	9942	H	L
10468	10469	<>	<name>
10468	10468	<>	<aphaerese>
10468	10468	<>	<elision3>
10468	10468	<>	<elision2>
10468	10468	<>	<elision1>
10468	9977	<A2kl>	<>
10469	10470	<>	<aphaerese>
10469	10470	<>	<elision3>
10469	10470	<>	<elision2>
10469	10470	<>	<elision1>
10469	9978	<A2kl>	<>
10470	10468	<>	<aphaerese>
10470	10468	<>	<elision3>
10470	10468	<>	<elision2>
10470	10468	<>	<elision1>
10470	9979	<A2kl>	<>
10471	10351	<name>	<name>
10471	10472	<>	<name>
10471	10474	<>	<aphaerese>
10471	10474	<>	<elision3>
10471	10474	<>	<elision2>
10471	10474	<>	<elision1>
10471	10462	<4s>	<>
10471	10357	<A2kl>	<>
10471	10484	<L2kl>	<>
10472	10473	<>	<aphaerese>
10472	10473	<>	<elision3>
10472	10473	<>	<elision2>
10472	10473	<>	<elision1>
10472	10358	<A2kl>	<>
10472	10476	<L2kl>	<>
10473	10474	<>	<aphaerese>
10473	10474	<>	<elision3>
10473	10474	<>	<elision2>
10473	10474	<>	<elision1>
10473	10359	<A2kl>	<>
10473	10477	<L2kl>	<>
10474	10472	<>	<name>
10474	10474	<>	<aphaerese>
10474	10474	<>	<elision3>
10474	10474	<>	<elision2>
10474	10474	<>	<elision1>
10474	10357	<A2kl>	<>
10474	10475	<L2kl>	<>
10475	9977	.	.
10475	9977	 	 
10475	9977	<~>	<~>
10475	9977	<split-s>	<split-s>
10475	9977	<split-h>	<split-h>
10475	9977	<name2>	<name2>
10475	10476	<>	<name>
10475	9980	<aphaerese>	<aphaerese>
10475	10475	<>	<aphaerese>
10475	9977	<elision3>	<elision3>
10475	10475	<>	<elision3>
10475	9977	<elision2>	<elision2>
10475	10475	<>	<elision2>
10475	9977	<elision1>	<elision1>
10475	10475	<>	<elision1>
10475	10141	.	υ
10475	10141	.	u
10475	10423	.	κ
10475	10141	.	α
10475	10141	.	a
10475	10423	.	λ
10475	10479	<4s>	<>
10476	9979	.	.
10476	9979	 	 
10476	9979	<~>	<~>
10476	9979	<split-s>	<split-s>
10476	9979	<split-h>	<split-h>
10476	9979	<name2>	<name2>
10476	9982	<aphaerese>	<aphaerese>
10476	10477	<>	<aphaerese>
10476	9979	<elision3>	<elision3>
10476	10477	<>	<elision3>
10476	9979	<elision2>	<elision2>
10476	10477	<>	<elision2>
10476	9979	<elision1>	<elision1>
10476	10477	<>	<elision1>
10476	10143	.	υ
10476	10143	.	u
10476	10425	.	κ
10476	10143	.	α
10476	10143	.	a
10476	10425	.	λ
10476	10480	<4s>	<>
10477	9977	.	.
10477	9977	 	 
10477	9977	<~>	<~>
10477	9977	<split-s>	<split-s>
10477	9977	<split-h>	<split-h>
10477	9977	<name2>	<name2>
10477	9980	<aphaerese>	<aphaerese>
10477	10475	<>	<aphaerese>
10477	9977	<elision3>	<elision3>
10477	10475	<>	<elision3>
10477	9977	<elision2>	<elision2>
10477	10475	<>	<elision2>
10477	9977	<elision1>	<elision1>
10477	10475	<>	<elision1>
10477	10141	.	υ
10477	10141	.	u
10477	10423	.	κ
10477	10141	.	α
10477	10141	.	a
10477	10423	.	λ
10477	10478	<4s>	<>
10478	71	.	.
10478	72	 	 
10478	71	<~>	<~>
10478	71	<split-s>	<split-s>
10478	71	<split-h>	<split-h>
10478	71	<name2>	<name2>
10478	75	<aphaerese>	<aphaerese>
10478	10479	<>	<aphaerese>
10478	71	<elision3>	<elision3>
10478	10479	<>	<elision3>
10478	71	<elision2>	<elision2>
10478	10479	<>	<elision2>
10478	71	<elision1>	<elision1>
10478	10479	<>	<elision1>
10478	9751	.	υ
10478	9795	H	υ
10478	9751	.	u
10478	9797	H	u
10478	10448	.	κ
10478	10210	H	κ
10478	9705	H	k
10478	9718	H	U
10478	9721	H	K
10478	9751	.	α
10478	9781	H	α
10478	9751	.	a
10478	9786	H	a
10478	9548	H	A
10478	10448	.	λ
10478	10187	H	λ
10478	10135	H	l
10478	10140	H	L
10478	10482	<K>	<>
10479	71	.	.
10479	72	 	 
10479	71	<~>	<~>
10479	71	<split-s>	<split-s>
10479	71	<split-h>	<split-h>
10479	71	<name2>	<name2>
10479	10480	<>	<name>
10479	75	<aphaerese>	<aphaerese>
10479	10479	<>	<aphaerese>
10479	71	<elision3>	<elision3>
10479	10479	<>	<elision3>
10479	71	<elision2>	<elision2>
10479	10479	<>	<elision2>
10479	71	<elision1>	<elision1>
10479	10479	<>	<elision1>
10479	9751	.	υ
10479	9795	H	υ
10479	9751	.	u
10479	9797	H	u
10479	10448	.	κ
10479	10210	H	κ
10479	9705	H	k
10479	9718	H	U
10479	9721	H	K
10479	9751	.	α
10479	9781	H	α
10479	9751	.	a
10479	9786	H	a
10479	9548	H	A
10479	10448	.	λ
10479	10187	H	λ
10479	10135	H	l
10479	10140	H	L
10479	10483	<K>	<>
10480	70	.	.
10480	74	 	 
10480	70	<~>	<~>
10480	70	<split-s>	<split-s>
10480	70	<split-h>	<split-h>
10480	70	<name2>	<name2>
10480	77	<aphaerese>	<aphaerese>
10480	10478	<>	<aphaerese>
10480	70	<elision3>	<elision3>
10480	10478	<>	<elision3>
10480	70	<elision2>	<elision2>
10480	10478	<>	<elision2>
10480	70	<elision1>	<elision1>
10480	10478	<>	<elision1>
10480	9753	.	υ
10480	9790	H	υ
10480	9753	.	u
10480	9794	H	u
10480	10447	.	κ
10480	10167	H	κ
10480	9746	H	k
10480	9720	H	U
10480	9750	H	K
10480	9753	.	α
10480	9780	H	α
10480	9753	.	a
10480	9785	H	a
10480	9551	H	A
10480	10447	.	λ
10480	10186	H	λ
10480	10134	H	l
10480	10137	H	L
10480	10481	<K>	<>
10481	9803	.	.
10481	9803	<~>	<~>
10481	9803	<split-s>	<split-s>
10481	9803	<split-h>	<split-h>
10481	9803	<name2>	<name2>
10481	9806	<aphaerese>	<aphaerese>
10481	10482	<>	<aphaerese>
10481	9803	<elision3>	<elision3>
10481	10482	<>	<elision3>
10481	9803	<elision2>	<elision2>
10481	10482	<>	<elision2>
10481	9803	<elision1>	<elision1>
10481	10482	<>	<elision1>
10481	9799	.	υ
10481	9945	H	υ
10481	9799	.	u
10481	9954	H	u
10481	10442	.	κ
10481	10197	H	κ
10481	9914	H	k
10481	9923	H	U
10481	9927	H	K
10481	9799	.	α
10481	9957	H	α
10481	9799	.	a
10481	9960	H	a
10481	9894	H	A
10481	10442	.	λ
10481	10206	H	λ
10481	9941	H	l
10481	9936	H	L
10482	9801	.	.
10482	9801	<~>	<~>
10482	9801	<split-s>	<split-s>
10482	9801	<split-h>	<split-h>
10482	9801	<name2>	<name2>
10482	9804	<aphaerese>	<aphaerese>
10482	10483	<>	<aphaerese>
10482	9801	<elision3>	<elision3>
10482	10483	<>	<elision3>
10482	9801	<elision2>	<elision2>
10482	10483	<>	<elision2>
10482	9801	<elision1>	<elision1>
10482	10483	<>	<elision1>
10482	9800	.	υ
10482	9943	H	υ
10482	9800	.	u
10482	9952	H	u
10482	10443	.	κ
10482	10195	H	κ
10482	9912	H	k
10482	9921	H	U
10482	9924	H	K
10482	9800	.	α
10482	9955	H	α
10482	9800	.	a
10482	9958	H	a
10482	9892	H	A
10482	10443	.	λ
10482	10204	H	λ
10482	9939	H	l
10482	9942	H	L
10483	9801	.	.
10483	9801	<~>	<~>
10483	9801	<split-s>	<split-s>
10483	9801	<split-h>	<split-h>
10483	9801	<name2>	<name2>
10483	10481	<>	<name>
10483	9804	<aphaerese>	<aphaerese>
10483	10483	<>	<aphaerese>
10483	9801	<elision3>	<elision3>
10483	10483	<>	<elision3>
10483	9801	<elision2>	<elision2>
10483	10483	<>	<elision2>
10483	9801	<elision1>	<elision1>
10483	10483	<>	<elision1>
10483	9800	.	υ
10483	9943	H	υ
10483	9800	.	u
10483	9952	H	u
10483	10443	.	κ
10483	10195	H	κ
10483	9912	H	k
10483	9921	H	U
10483	9924	H	K
10483	9800	.	α
10483	9955	H	α
10483	9800	.	a
10483	9958	H	a
10483	9892	H	A
10483	10443	.	λ
10483	10204	H	λ
10483	9939	H	l
10483	9942	H	L
10484	9977	.	.
10484	9977	 	 
10484	9977	<~>	<~>
10484	9977	<split-s>	<split-s>
10484	9977	<split-h>	<split-h>
10484	9977	<name2>	<name2>
10484	10351	<name2>	<name>
10484	10476	<>	<name>
10484	9980	<aphaerese>	<aphaerese>
10484	10475	<>	<aphaerese>
10484	9977	<elision3>	<elision3>
10484	10475	<>	<elision3>
10484	9977	<elision2>	<elision2>
10484	10475	<>	<elision2>
10484	9977	<elision1>	<elision1>
10484	10475	<>	<elision1>
10484	10141	.	υ
10484	10141	.	u
10484	10423	.	κ
10484	10141	.	α
10484	10141	.	a
10484	10423	.	λ
10484	10485	<4s>	<>
10485	71	.	.
10485	72	 	 
10485	71	<~>	<~>
10485	71	<split-s>	<split-s>
10485	71	<split-h>	<split-h>
10485	71	<name2>	<name2>
10485	10463	<name2>	<name>
10485	10480	<>	<name>
10485	75	<aphaerese>	<aphaerese>
10485	10479	<>	<aphaerese>
10485	71	<elision3>	<elision3>
10485	10479	<>	<elision3>
10485	71	<elision2>	<elision2>
10485	10479	<>	<elision2>
10485	71	<elision1>	<elision1>
10485	10479	<>	<elision1>
10485	9751	.	υ
10485	9795	H	υ
10485	9751	.	u
10485	9797	H	u
10485	10448	.	κ
10485	10210	H	κ
10485	9705	H	k
10485	9718	H	U
10485	9721	H	K
10485	9751	.	α
10485	9781	H	α
10485	9751	.	a
10485	9786	H	a
10485	9548	H	A
10485	10448	.	λ
10485	10187	H	λ
10485	10135	H	l
10485	10140	H	L
10485	10486	<K>	<>
10486	9801	.	.
10486	9801	<~>	<~>
10486	9801	<split-s>	<split-s>
10486	9801	<split-h>	<split-h>
10486	9801	<name2>	<name2>
10486	10353	<name2>	<name>
10486	10481	<>	<name>
10486	9804	<aphaerese>	<aphaerese>
10486	10483	<>	<aphaerese>
10486	9801	<elision3>	<elision3>
10486	10483	<>	<elision3>
10486	9801	<elision2>	<elision2>
10486	10483	<>	<elision2>
10486	9801	<elision1>	<elision1>
10486	10483	<>	<elision1>
10486	9800	.	υ
10486	9943	H	υ
10486	9800	.	u
10486	9952	H	u
10486	10443	.	κ
10486	10195	H	κ
10486	9912	H	k
10486	9921	H	U
10486	9924	H	K
10486	9800	.	α
10486	9955	H	α
10486	9800	.	a
10486	9958	H	a
10486	9892	H	A
10486	10443	.	λ
10486	10204	H	λ
10486	9939	H	l
10486	9942	H	L
10487	10488	<>	<name>
10487	10487	<>	<aphaerese>
10487	10487	<>	<elision3>
10487	10487	<>	<elision2>
10487	10487	<>	<elision1>
10487	10145	<3s>	<>
10488	10489	<>	<aphaerese>
10488	10489	<>	<elision3>
10488	10489	<>	<elision2>
10488	10489	<>	<elision1>
10488	10146	<3s>	<>
10489	10487	<>	<aphaerese>
10489	10487	<>	<elision3>
10489	10487	<>	<elision2>
10489	10487	<>	<elision1>
10489	10144	<3s>	<>
10490	9977	.	.
10490	9977	 	 
10490	9977	<~>	<~>
10490	9977	<split-s>	<split-s>
10490	9977	<split-h>	<split-h>
10490	9977	<name2>	<name2>
10490	10147	<>	<name>
10490	9980	<aphaerese>	<aphaerese>
10490	9976	<>	<aphaerese>
10490	9976	<>	<elision3>
10490	9976	<>	<elision2>
10490	9976	<>	<elision1>
10490	10141	.	υ
10490	10141	.	u
10490	9983	.	κ
10490	10141	.	α
10490	10141	.	a
10490	10491	<4s>	<>
10491	71	.	.
10491	72	 	 
10491	71	<~>	<~>
10491	71	<split-s>	<split-s>
10491	71	<split-h>	<split-h>
10491	71	<name2>	<name2>
10491	10151	<>	<name>
10491	75	<aphaerese>	<aphaerese>
10491	10150	<>	<aphaerese>
10491	10150	<>	<elision3>
10491	10150	<>	<elision2>
10491	10150	<>	<elision1>
10491	9751	.	υ
10491	9751	.	u
10491	78	.	κ
10491	9718	H	U
10491	9721	H	K
10491	9751	.	α
10491	9751	.	a
10491	9548	H	A
10491	10140	H	L
10491	10492	<K>	<>
10492	9801	.	.
10492	9801	<~>	<~>
10492	9801	<split-s>	<split-s>
10492	9801	<split-h>	<split-h>
10492	9801	<name2>	<name2>
10492	10152	<>	<name>
10492	9804	<aphaerese>	<aphaerese>
10492	10154	<>	<aphaerese>
10492	10154	<>	<elision3>
10492	10154	<>	<elision2>
10492	10154	<>	<elision1>
10492	9800	.	υ
10492	9800	.	u
10492	9807	.	κ
10492	9921	H	U
10492	9924	H	K
10492	9800	.	α
10492	9800	.	a
10492	9892	H	A
10492	9942	H	L
10493	9977	.	.
10493	9977	 	 
10493	9977	<~>	<~>
10493	9977	<split-s>	<split-s>
10493	9977	<split-h>	<split-h>
10493	9977	<name2>	<name2>
10493	10227	<>	<name>
10493	9980	<aphaerese>	<aphaerese>
10493	10226	<>	<aphaerese>
10493	10229	<elision3>	<elision3>
10493	10226	<>	<elision3>
10493	10229	<elision2>	<elision2>
10493	10226	<>	<elision2>
10493	10229	<elision1>	<elision1>
10493	10226	<>	<elision1>
10493	10141	.	υ
10493	10141	.	u
10493	10141	.	κ
10493	10141	.	α
10493	10141	.	a
10493	10141	.	λ
10493	10494	<4s>	<>
10494	71	.	.
10494	72	 	 
10494	71	<~>	<~>
10494	71	<split-s>	<split-s>
10494	71	<split-h>	<split-h>
10494	71	<name2>	<name2>
10494	10331	<>	<name>
10494	75	<aphaerese>	<aphaerese>
10494	10330	<>	<aphaerese>
10494	10333	<elision3>	<elision3>
10494	10330	<>	<elision3>
10494	10333	<elision2>	<elision2>
10494	10330	<>	<elision2>
10494	10333	<elision1>	<elision1>
10494	10330	<>	<elision1>
10494	9751	.	υ
10494	9751	.	u
10494	9751	.	κ
10494	9718	H	U
10494	9721	H	K
10494	9751	.	α
10494	9751	.	a
10494	9548	H	A
10494	9751	.	λ
10494	10140	H	L
10494	10495	<K>	<>
10495	9801	.	.
10495	9801	<~>	<~>
10495	9801	<split-s>	<split-s>
10495	9801	<split-h>	<split-h>
10495	9801	<name2>	<name2>
10495	10335	<>	<name>
10495	9804	<aphaerese>	<aphaerese>
10495	10337	<>	<aphaerese>
10495	10282	<elision3>	<elision3>
10495	10337	<>	<elision3>
10495	10282	<elision2>	<elision2>
10495	10337	<>	<elision2>
10495	10282	<elision1>	<elision1>
10495	10337	<>	<elision1>
10495	9800	.	υ
10495	9800	.	u
10495	9800	.	κ
10495	9921	H	U
10495	9924	H	K
10495	9800	.	α
10495	9800	.	a
10495	9892	H	A
10495	9800	.	λ
10495	9942	H	L
10496	9977	.	.
10496	9977	 	 
10496	9977	<~>	<~>
10496	9977	<split-s>	<split-s>
10496	9977	<split-h>	<split-h>
10496	9977	<name2>	<name2>
10496	10339	<>	<name>
10496	9980	<aphaerese>	<aphaerese>
10496	10338	<>	<aphaerese>
10496	9977	<elision3>	<elision3>
10496	10338	<>	<elision3>
10496	9977	<elision2>	<elision2>
10496	10338	<>	<elision2>
10496	9977	<elision1>	<elision1>
10496	10338	<>	<elision1>
10496	10141	.	υ
10496	10141	.	u
10496	10141	.	κ
10496	10141	.	α
10496	10141	.	a
10496	10141	.	λ
10496	10497	<4s>	<>
10497	71	.	.
10497	72	 	 
10497	71	<~>	<~>
10497	71	<split-s>	<split-s>
10497	71	<split-h>	<split-h>
10497	71	<name2>	<name2>
10497	10343	<>	<name>
10497	75	<aphaerese>	<aphaerese>
10497	10342	<>	<aphaerese>
10497	71	<elision3>	<elision3>
10497	10342	<>	<elision3>
10497	71	<elision2>	<elision2>
10497	10342	<>	<elision2>
10497	71	<elision1>	<elision1>
10497	10342	<>	<elision1>
10497	9751	.	υ
10497	9751	.	u
10497	9751	.	κ
10497	9718	H	U
10497	9721	H	K
10497	9751	.	α
10497	9751	.	a
10497	9548	H	A
10497	9751	.	λ
10497	10140	H	L
10497	10498	<K>	<>
10498	9801	.	.
10498	9801	<~>	<~>
10498	9801	<split-s>	<split-s>
10498	9801	<split-h>	<split-h>
10498	9801	<name2>	<name2>
10498	10344	<>	<name>
10498	9804	<aphaerese>	<aphaerese>
10498	10346	<>	<aphaerese>
10498	9801	<elision3>	<elision3>
10498	10346	<>	<elision3>
10498	9801	<elision2>	<elision2>
10498	10346	<>	<elision2>
10498	9801	<elision1>	<elision1>
10498	10346	<>	<elision1>
10498	9800	.	υ
10498	9800	.	u
10498	9800	.	κ
10498	9921	H	U
10498	9924	H	K
10498	9800	.	α
10498	9800	.	a
10498	9892	H	A
10498	9800	.	λ
10498	9942	H	L
10499	10348	<>	<name>
10499	10347	<>	<aphaerese>
10499	10347	<>	<elision3>
10499	10347	<>	<elision2>
10499	10347	<>	<elision1>
10499	10500	<U2kl>	<>
10500	9977	.	.
10500	9977	 	 
10500	9977	<~>	<~>
10500	9977	<split-s>	<split-s>
10500	9977	<split-h>	<split-h>
10500	9977	<name2>	<name2>
10500	9978	<>	<name>
10500	9980	<aphaerese>	<aphaerese>
10500	9977	<>	<aphaerese>
10500	9977	<elision3>	<elision3>
10500	9977	<>	<elision3>
10500	9977	<elision2>	<elision2>
10500	9977	<>	<elision2>
10500	9977	<elision1>	<elision1>
10500	9977	<>	<elision1>
10500	10141	.	υ
10500	10141	.	u
10500	9983	.	κ
10500	10141	.	α
10500	10141	.	a
10500	10501	<4s>	<>
10501	71	.	.
10501	72	 	 
10501	71	<~>	<~>
10501	71	<split-s>	<split-s>
10501	71	<split-h>	<split-h>
10501	71	<name2>	<name2>
10501	10146	<>	<name>
10501	75	<aphaerese>	<aphaerese>
10501	10145	<>	<aphaerese>
10501	71	<elision3>	<elision3>
10501	10145	<>	<elision3>
10501	71	<elision2>	<elision2>
10501	10145	<>	<elision2>
10501	71	<elision1>	<elision1>
10501	10145	<>	<elision1>
10501	9751	.	υ
10501	9751	.	u
10501	78	.	κ
10501	9718	H	U
10501	9721	H	K
10501	9751	.	α
10501	9751	.	a
10501	9548	H	A
10501	10140	H	L
10501	10502	<K>	<>
10502	9801	.	.
10502	9801	<~>	<~>
10502	9801	<split-s>	<split-s>
10502	9801	<split-h>	<split-h>
10502	9801	<name2>	<name2>
10502	9802	<>	<name>
10502	9804	<aphaerese>	<aphaerese>
10502	9801	<>	<aphaerese>
10502	9801	<elision3>	<elision3>
10502	9801	<>	<elision3>
10502	9801	<elision2>	<elision2>
10502	9801	<>	<elision2>
10502	9801	<elision1>	<elision1>
10502	9801	<>	<elision1>
10502	9800	.	υ
10502	9800	.	u
10502	9807	.	κ
10502	9921	H	U
10502	9924	H	K
10502	9800	.	α
10502	9800	.	a
10502	9892	H	A
10502	9942	H	L
10503	10351	<name>	<name>
10503	10354	<>	<name>
10503	10356	<>	<aphaerese>
10503	10356	<>	<elision3>
10503	10356	<>	<elision2>
10503	10356	<>	<elision1>
10503	10462	<4s>	<>
10503	10357	<A2kl>	<>
10503	10420	<L2kl>	<>
10503	10504	<K2kl>	<>
10504	9977	.	.
10504	9977	 	 
10504	9977	<~>	<~>
10504	9977	<split-s>	<split-s>
10504	9977	<split-h>	<split-h>
10504	9977	<name2>	<name2>
10504	10351	<name2>	<name>
10504	10454	<>	<name>
10504	9980	<aphaerese>	<aphaerese>
10504	10453	<>	<aphaerese>
10504	9977	<elision3>	<elision3>
10504	10453	<>	<elision3>
10504	9977	<elision2>	<elision2>
10504	10453	<>	<elision2>
10504	9977	<elision1>	<elision1>
10504	10453	<>	<elision1>
10504	10141	.	υ
10504	10141	.	u
10504	10141	.	α
10504	10141	.	a
10504	10505	<4s>	<>
10505	71	.	.
10505	72	 	 
10505	71	<~>	<~>
10505	71	<split-s>	<split-s>
10505	71	<split-h>	<split-h>
10505	71	<name2>	<name2>
10505	10463	<name2>	<name>
10505	10458	<>	<name>
10505	75	<aphaerese>	<aphaerese>
10505	10457	<>	<aphaerese>
10505	71	<elision3>	<elision3>
10505	10457	<>	<elision3>
10505	71	<elision2>	<elision2>
10505	10457	<>	<elision2>
10505	71	<elision1>	<elision1>
10505	10457	<>	<elision1>
10505	9751	.	υ
10505	9751	.	u
10505	9718	H	U
10505	9721	H	K
10505	9751	.	α
10505	9751	.	a
10505	9548	H	A
10505	10140	H	L
10505	10506	<K>	<>
10506	9801	.	.
10506	9801	<~>	<~>
10506	9801	<split-s>	<split-s>
10506	9801	<split-h>	<split-h>
10506	9801	<name2>	<name2>
10506	10353	<name2>	<name>
10506	10459	<>	<name>
10506	9804	<aphaerese>	<aphaerese>
10506	10461	<>	<aphaerese>
10506	9801	<elision3>	<elision3>
10506	10461	<>	<elision3>
10506	9801	<elision2>	<elision2>
10506	10461	<>	<elision2>
10506	9801	<elision1>	<elision1>
10506	10461	<>	<elision1>
10506	9800	.	υ
10506	9800	.	u
10506	9921	H	U
10506	9924	H	K
10506	9800	.	α
10506	9800	.	a
10506	9892	H	A
10506	9942	H	L
10507	10469	<>	<name>
10507	10468	<>	<aphaerese>
10507	10468	<>	<elision3>
10507	10468	<>	<elision2>
10507	10468	<>	<elision1>
10507	10500	<A2kl>	<>
10508	10351	<name>	<name>
10508	10472	<>	<name>
10508	10474	<>	<aphaerese>
10508	10474	<>	<elision3>
10508	10474	<>	<elision2>
10508	10474	<>	<elision1>
10508	10462	<4s>	<>
10508	10357	<A2kl>	<>
10508	10509	<L2kl>	<>
10509	9977	.	.
10509	9977	 	 
10509	9977	<~>	<~>
10509	9977	<split-s>	<split-s>
10509	9977	<split-h>	<split-h>
10509	9977	<name2>	<name2>
10509	10351	<name2>	<name>
10509	10476	<>	<name>
10509	9980	<aphaerese>	<aphaerese>
10509	10475	<>	<aphaerese>
10509	9977	<elision3>	<elision3>
10509	10475	<>	<elision3>
10509	9977	<elision2>	<elision2>
10509	10475	<>	<elision2>
10509	9977	<elision1>	<elision1>
10509	10475	<>	<elision1>
10509	10141	.	υ
10509	10141	.	u
10509	10423	.	κ
10509	10141	.	α
10509	10141	.	a
10509	10423	.	λ
10509	10510	<4s>	<>
10510	71	.	.
10510	72	 	 
10510	71	<~>	<~>
10510	71	<split-s>	<split-s>
10510	71	<split-h>	<split-h>
10510	71	<name2>	<name2>
10510	10463	<name2>	<name>
10510	10480	<>	<name>
10510	75	<aphaerese>	<aphaerese>
10510	10479	<>	<aphaerese>
10510	71	<elision3>	<elision3>
10510	10479	<>	<elision3>
10510	71	<elision2>	<elision2>
10510	10479	<>	<elision2>
10510	71	<elision1>	<elision1>
10510	10479	<>	<elision1>
10510	9751	.	υ
10510	9751	.	u
10510	10448	.	κ
10510	9718	H	U
10510	9721	H	K
10510	9751	.	α
10510	9751	.	a
10510	9548	H	A
10510	10448	.	λ
10510	10140	H	L
10510	10511	<K>	<>
10511	9801	.	.
10511	9801	<~>	<~>
10511	9801	<split-s>	<split-s>
10511	9801	<split-h>	<split-h>
10511	9801	<name2>	<name2>
10511	10353	<name2>	<name>
10511	10481	<>	<name>
10511	9804	<aphaerese>	<aphaerese>
10511	10483	<>	<aphaerese>
10511	9801	<elision3>	<elision3>
10511	10483	<>	<elision3>
10511	9801	<elision2>	<elision2>
10511	10483	<>	<elision2>
10511	9801	<elision1>	<elision1>
10511	10483	<>	<elision1>
10511	9800	.	υ
10511	9800	.	u
10511	10443	.	κ
10511	9921	H	U
10511	9924	H	K
10511	9800	.	α
10511	9800	.	a
10511	9892	H	A
10511	10443	.	λ
10511	9942	H	L
10512	9962	.	.
10512	9963	 	 
10512	9962	<~>	<~>
10512	9962	<split-s>	<split-s>
10512	9962	<split-h>	<split-h>
10512	9962	<name2>	<name2>
10512	9966	<aphaerese>	<aphaerese>
10512	9966	<>	<aphaerese>
10512	9962	<elision3>	<elision3>
10512	9966	<>	<elision3>
10512	9962	<elision2>	<elision2>
10512	9966	<>	<elision2>
10512	9962	<elision1>	<elision1>
10512	9966	<>	<elision1>
10512	9962	.	υ
10512	9962	.	u
10512	10155	.	κ
10512	10226	s	κ
10512	10338	s	k
10512	10347	s	U
10512	10513	s	K
10512	9962	.	α
10512	9962	.	a
10512	10468	s	A
10512	10338	s	λ
10512	10338	s	l
10512	10526	s	L
10512	10533	<split-h>	<>
10513	10351	<name>	<name>
10513	10514	<>	<name>
10513	10516	<>	<aphaerese>
10513	10516	<>	<elision3>
10513	10516	<>	<elision2>
10513	10516	<>	<elision1>
10513	10462	<4s>	<>
10513	10517	<L2kl>	<>
10513	10465	<K2kl>	<>
10514	10515	<>	<aphaerese>
10514	10515	<>	<elision3>
10514	10515	<>	<elision2>
10514	10515	<>	<elision1>
10514	10518	<L2kl>	<>
10514	10454	<K2kl>	<>
10515	10516	<>	<aphaerese>
10515	10516	<>	<elision3>
10515	10516	<>	<elision2>
10515	10516	<>	<elision1>
10515	10519	<L2kl>	<>
10515	10455	<K2kl>	<>
10516	10514	<>	<name>
10516	10516	<>	<aphaerese>
10516	10516	<>	<elision3>
10516	10516	<>	<elision2>
10516	10516	<>	<elision1>
10516	10517	<L2kl>	<>
10516	10453	<K2kl>	<>
10517	10518	<>	<name>
10517	10517	<>	<aphaerese>
10517	10517	<>	<elision3>
10517	10517	<>	<elision2>
10517	10517	<>	<elision1>
10517	10141	.	κ
10517	10141	.	λ
10517	10521	<4s>	<>
10518	10519	<>	<aphaerese>
10518	10519	<>	<elision3>
10518	10519	<>	<elision2>
10518	10519	<>	<elision1>
10518	10143	.	κ
10518	10143	.	λ
10518	10522	<4s>	<>
10519	10517	<>	<aphaerese>
10519	10517	<>	<elision3>
10519	10517	<>	<elision2>
10519	10517	<>	<elision1>
10519	10141	.	κ
10519	10141	.	λ
10519	10520	<4s>	<>
10520	10521	<>	<aphaerese>
10520	10521	<>	<elision3>
10520	10521	<>	<elision2>
10520	10521	<>	<elision1>
10520	9751	.	κ
10520	9751	.	λ
10520	10524	<K>	<>
10521	10522	<>	<name>
10521	10521	<>	<aphaerese>
10521	10521	<>	<elision3>
10521	10521	<>	<elision2>
10521	10521	<>	<elision1>
10521	9751	.	κ
10521	9751	.	λ
10521	10525	<K>	<>
10522	10520	<>	<aphaerese>
10522	10520	<>	<elision3>
10522	10520	<>	<elision2>
10522	10520	<>	<elision1>
10522	9753	.	κ
10522	9753	.	λ
10522	10523	<K>	<>
10523	10524	<>	<aphaerese>
10523	10524	<>	<elision3>
10523	10524	<>	<elision2>
10523	10524	<>	<elision1>
10523	9799	.	κ
10523	9799	.	λ
10524	10525	<>	<aphaerese>
10524	10525	<>	<elision3>
10524	10525	<>	<elision2>
10524	10525	<>	<elision1>
10524	9800	.	κ
10524	9800	.	λ
10525	10523	<>	<name>
10525	10525	<>	<aphaerese>
10525	10525	<>	<elision3>
10525	10525	<>	<elision2>
10525	10525	<>	<elision1>
10525	9800	.	κ
10525	9800	.	λ
10526	10351	<name>	<name>
10526	10527	<>	<name>
10526	10529	<>	<aphaerese>
10526	10529	<>	<elision3>
10526	10529	<>	<elision2>
10526	10529	<>	<elision1>
10526	10462	<4s>	<>
10526	10530	<L2kl>	<>
10527	10528	<>	<aphaerese>
10527	10528	<>	<elision3>
10527	10528	<>	<elision2>
10527	10528	<>	<elision1>
10527	10339	<L2kl>	<>
10528	10529	<>	<aphaerese>
10528	10529	<>	<elision3>
10528	10529	<>	<elision2>
10528	10529	<>	<elision1>
10528	10340	<L2kl>	<>
10529	10527	<>	<name>
10529	10529	<>	<aphaerese>
10529	10529	<>	<elision3>
10529	10529	<>	<elision2>
10529	10529	<>	<elision1>
10529	10338	<L2kl>	<>
10530	9977	.	.
10530	9977	 	 
10530	9977	<~>	<~>
10530	9977	<split-s>	<split-s>
10530	9977	<split-h>	<split-h>
10530	9977	<name2>	<name2>
10530	10351	<name2>	<name>
10530	10339	<>	<name>
10530	9980	<aphaerese>	<aphaerese>
10530	10338	<>	<aphaerese>
10530	9977	<elision3>	<elision3>
10530	10338	<>	<elision3>
10530	9977	<elision2>	<elision2>
10530	10338	<>	<elision2>
10530	9977	<elision1>	<elision1>
10530	10338	<>	<elision1>
10530	10141	.	υ
10530	10141	.	u
10530	10141	.	κ
10530	10141	.	α
10530	10141	.	a
10530	10141	.	λ
10530	10531	<4s>	<>
10531	71	.	.
10531	72	 	 
10531	71	<~>	<~>
10531	71	<split-s>	<split-s>
10531	71	<split-h>	<split-h>
10531	71	<name2>	<name2>
10531	10463	<name2>	<name>
10531	10343	<>	<name>
10531	75	<aphaerese>	<aphaerese>
10531	10342	<>	<aphaerese>
10531	71	<elision3>	<elision3>
10531	10342	<>	<elision3>
10531	71	<elision2>	<elision2>
10531	10342	<>	<elision2>
10531	71	<elision1>	<elision1>
10531	10342	<>	<elision1>
10531	9751	.	υ
10531	9795	H	υ
10531	9751	.	u
10531	9797	H	u
10531	9751	.	κ
10531	10210	H	κ
10531	9705	H	k
10531	9718	H	U
10531	9721	H	K
10531	9751	.	α
10531	9781	H	α
10531	9751	.	a
10531	9786	H	a
10531	9548	H	A
10531	9751	.	λ
10531	10187	H	λ
10531	10135	H	l
10531	10140	H	L
10531	10532	<K>	<>
10532	9801	.	.
10532	9801	<~>	<~>
10532	9801	<split-s>	<split-s>
10532	9801	<split-h>	<split-h>
10532	9801	<name2>	<name2>
10532	10353	<name2>	<name>
10532	10344	<>	<name>
10532	9804	<aphaerese>	<aphaerese>
10532	10346	<>	<aphaerese>
10532	9801	<elision3>	<elision3>
10532	10346	<>	<elision3>
10532	9801	<elision2>	<elision2>
10532	10346	<>	<elision2>
10532	9801	<elision1>	<elision1>
10532	10346	<>	<elision1>
10532	9800	.	υ
10532	9943	H	υ
10532	9800	.	u
10532	9952	H	u
10532	9800	.	κ
10532	10195	H	κ
10532	9912	H	k
10532	9921	H	U
10532	9924	H	K
10532	9800	.	α
10532	9955	H	α
10532	9800	.	a
10532	9958	H	a
10532	9892	H	A
10532	9800	.	λ
10532	10204	H	λ
10532	9939	H	l
10532	9942	H	L
10533	10534	<>	<aphaerese>
10533	10534	<>	<elision3>
10533	10534	<>	<elision2>
10533	10534	<>	<elision1>
10533	10131	<3s>	<>
10534	10535	<>	<name>
10534	10534	<>	<aphaerese>
10534	10534	<>	<elision3>
10534	10534	<>	<elision2>
10534	10534	<>	<elision1>
10534	10132	<3s>	<>
10535	10533	<>	<aphaerese>
10535	10533	<>	<elision3>
10535	10533	<>	<elision2>
10535	10533	<>	<elision1>
10535	10133	<3s>	<>
10536	9962	.	.
10536	9963	 	 
10536	9962	<~>	<~>
10536	9962	<split-s>	<split-s>
10536	9962	<split-h>	<split-h>
10536	9962	<name2>	<name2>
10536	9966	<aphaerese>	<aphaerese>
10536	9969	<>	<aphaerese>
10536	9962	<elision3>	<elision3>
10536	9969	<>	<elision3>
10536	9962	<elision2>	<elision2>
10536	9969	<>	<elision2>
10536	9962	<elision1>	<elision1>
10536	9969	<>	<elision1>
10536	9970	.	υ
10536	9976	s	υ
10536	9970	.	u
10536	9976	s	u
10536	10155	.	κ
10536	10226	s	κ
10536	10338	s	k
10536	10347	s	U
10536	10350	s	K
10536	9970	.	α
10536	9976	s	α
10536	9970	.	a
10536	9976	s	a
10536	10468	s	A
10536	10338	s	λ
10536	10338	s	l
10536	10471	s	L
10536	10489	<split-h>	<>
10537	9965	.	.
10537	9968	 	 
10537	9965	<~>	<~>
10537	9965	<split-s>	<split-s>
10537	9965	<split-h>	<split-h>
10537	9965	<name2>	<name2>
10537	10512	<aphaerese>	<aphaerese>
10537	9965	<>	<aphaerese>
10537	9965	<elision3>	<elision3>
10537	9965	<>	<elision3>
10537	9965	<elision2>	<elision2>
10537	9965	<>	<elision2>
10537	9965	<elision1>	<elision1>
10537	9965	<>	<elision1>
10537	9972	.	υ
10537	10148	s	υ
10537	9972	.	u
10537	10148	s	u
10537	10157	.	κ
10537	10228	s	κ
10537	10340	s	k
10537	10349	s	U
10537	10515	s	K
10537	9972	.	α
10537	10148	s	α
10537	9972	.	a
10537	10148	s	a
10537	10470	s	A
10537	10340	s	λ
10537	10340	s	l
10537	10528	s	L
10537	10488	<split-h>	<>
10538	9965	.	.
10538	9968	 	 
10538	9965	<~>	<~>
10538	9965	<split-s>	<split-s>
10538	9965	<split-h>	<split-h>
10538	9965	<name2>	<name2>
10538	10512	<aphaerese>	<aphaerese>
10538	10539	<>	<aphaerese>
10538	10539	<>	<elision3>
10538	10539	<>	<elision2>
10538	10539	<>	<elision1>
10538	9972	.	υ
10538	10148	s	υ
10538	9972	.	u
10538	10148	s	u
10538	10157	.	κ
10538	10228	s	κ
10538	10340	s	k
10538	10349	s	U
10538	10515	s	K
10538	9972	.	α
10538	10148	s	α
10538	9972	.	a
10538	10148	s	a
10538	10470	s	A
10538	10340	s	λ
10538	10340	s	l
10538	10528	s	L
10538	10542	<split-h>	<>
10539	9962	.	.
10539	9963	 	 
10539	9962	<~>	<~>
10539	9962	<split-s>	<split-s>
10539	9962	<split-h>	<split-h>
10539	9962	<name2>	<name2>
10539	9966	<aphaerese>	<aphaerese>
10539	9961	<>	<aphaerese>
10539	9961	<>	<elision3>
10539	9961	<>	<elision2>
10539	9961	<>	<elision1>
10539	9970	.	υ
10539	9976	s	υ
10539	9970	.	u
10539	9976	s	u
10539	10155	.	κ
10539	10226	s	κ
10539	10338	s	k
10539	10347	s	U
10539	10513	s	K
10539	9970	.	α
10539	9976	s	α
10539	9970	.	a
10539	9976	s	a
10539	10468	s	A
10539	10338	s	λ
10539	10338	s	l
10539	10526	s	L
10539	10540	<split-h>	<>
10540	10541	<>	<aphaerese>
10540	10541	<>	<elision3>
10540	10541	<>	<elision2>
10540	10541	<>	<elision1>
10540	10149	<3s>	<>
10541	10542	<>	<name>
10541	10541	<>	<aphaerese>
10541	10541	<>	<elision3>
10541	10541	<>	<elision2>
10541	10541	<>	<elision1>
10541	10150	<3s>	<>
10542	10540	<>	<aphaerese>
10542	10540	<>	<elision3>
10542	10540	<>	<elision2>
10542	10540	<>	<elision1>
10542	10151	<3s>	<>
10543	10544	<>	<name>
10543	10543	<>	<aphaerese>
10543	10546	<elision3>	<elision3>
10543	10543	<>	<elision3>
10543	10546	<elision2>	<elision2>
10543	10543	<>	<elision2>
10543	10546	<elision1>	<elision1>
10543	10543	<>	<elision1>
10543	10129	<2s>	<>
10544	10545	<>	<aphaerese>
10544	10548	<elision3>	<elision3>
10544	10545	<>	<elision3>
10544	10548	<elision2>	<elision2>
10544	10545	<>	<elision2>
10544	10548	<elision1>	<elision1>
10544	10545	<>	<elision1>
10544	10130	<2s>	<>
10545	10543	<>	<aphaerese>
10545	10546	<elision3>	<elision3>
10545	10543	<>	<elision3>
10545	10546	<elision2>	<elision2>
10545	10543	<>	<elision2>
10545	10546	<elision1>	<elision1>
10545	10543	<>	<elision1>
10545	10128	<2s>	<>
10546	10547	<>	<name>
10546	10546	<>	<aphaerese>
10546	10546	<>	<elision3>
10546	10546	<>	<elision2>
10546	10546	<>	<elision1>
10546	10549	s	κ
10546	10549	s	k
10546	10564	s	K
10546	10549	s	λ
10546	10568	s	l
10546	10570	s	L
10546	9990	<2s>	<>
10547	10548	<>	<aphaerese>
10547	10548	<>	<elision3>
10547	10548	<>	<elision2>
10547	10548	<>	<elision1>
10547	10551	s	κ
10547	10551	s	k
10547	10566	s	K
10547	10551	s	λ
10547	10567	s	l
10547	10572	s	L
10547	9991	<2s>	<>
10548	10546	<>	<aphaerese>
10548	10546	<>	<elision3>
10548	10546	<>	<elision2>
10548	10546	<>	<elision1>
10548	10549	s	κ
10548	10549	s	k
10548	10564	s	K
10548	10549	s	λ
10548	10568	s	l
10548	10570	s	L
10548	9989	<2s>	<>
10549	10550	<>	<name>
10549	10549	<>	<aphaerese>
10549	10549	<>	<elision3>
10549	10549	<>	<elision2>
10549	10549	<>	<elision1>
10549	10552	s	κ
10549	10338	s	k
10549	10513	s	K
10549	10552	s	λ
10549	10338	s	l
10549	10526	s	L
10549	10562	<split-h>	<>
10550	10551	<>	<aphaerese>
10550	10551	<>	<elision3>
10550	10551	<>	<elision2>
10550	10551	<>	<elision1>
10550	10554	s	κ
10550	10340	s	k
10550	10515	s	K
10550	10554	s	λ
10550	10340	s	l
10550	10528	s	L
10550	10563	<split-h>	<>
10551	10549	<>	<aphaerese>
10551	10549	<>	<elision3>
10551	10549	<>	<elision2>
10551	10549	<>	<elision1>
10551	10552	s	κ
10551	10338	s	k
10551	10513	s	K
10551	10552	s	λ
10551	10338	s	l
10551	10526	s	L
10551	10561	<split-h>	<>
10552	9977	.	.
10552	9977	 	 
10552	9977	<~>	<~>
10552	9977	<split-s>	<split-s>
10552	9977	<split-h>	<split-h>
10552	9977	<name2>	<name2>
10552	10553	<>	<name>
10552	9980	<aphaerese>	<aphaerese>
10552	10552	<>	<aphaerese>
10552	10552	<>	<elision3>
10552	10552	<>	<elision2>
10552	10552	<>	<elision1>
10552	10141	.	υ
10552	10141	.	u
10552	10141	.	κ
10552	10141	.	α
10552	10141	.	a
10552	10141	.	λ
10552	10556	<4s>	<>
10553	9979	.	.
10553	9979	 	 
10553	9979	<~>	<~>
10553	9979	<split-s>	<split-s>
10553	9979	<split-h>	<split-h>
10553	9979	<name2>	<name2>
10553	9982	<aphaerese>	<aphaerese>
10553	10554	<>	<aphaerese>
10553	10554	<>	<elision3>
10553	10554	<>	<elision2>
10553	10554	<>	<elision1>
10553	10143	.	υ
10553	10143	.	u
10553	10143	.	κ
10553	10143	.	α
10553	10143	.	a
10553	10143	.	λ
10553	10557	<4s>	<>
10554	9977	.	.
10554	9977	 	 
10554	9977	<~>	<~>
10554	9977	<split-s>	<split-s>
10554	9977	<split-h>	<split-h>
10554	9977	<name2>	<name2>
10554	9980	<aphaerese>	<aphaerese>
10554	10552	<>	<aphaerese>
10554	10552	<>	<elision3>
10554	10552	<>	<elision2>
10554	10552	<>	<elision1>
10554	10141	.	υ
10554	10141	.	u
10554	10141	.	κ
10554	10141	.	α
10554	10141	.	a
10554	10141	.	λ
10554	10555	<4s>	<>
10555	71	.	.
10555	72	 	 
10555	71	<~>	<~>
10555	71	<split-s>	<split-s>
10555	71	<split-h>	<split-h>
10555	71	<name2>	<name2>
10555	75	<aphaerese>	<aphaerese>
10555	10556	<>	<aphaerese>
10555	10556	<>	<elision3>
10555	10556	<>	<elision2>
10555	10556	<>	<elision1>
10555	9751	.	υ
10555	9795	H	υ
10555	9751	.	u
10555	9797	H	u
10555	9751	.	κ
10555	10210	H	κ
10555	9705	H	k
10555	9718	H	U
10555	9721	H	K
10555	9751	.	α
10555	9781	H	α
10555	9751	.	a
10555	9786	H	a
10555	9548	H	A
10555	9751	.	λ
10555	10187	H	λ
10555	10135	H	l
10555	10140	H	L
10555	10559	<K>	<>
10556	71	.	.
10556	72	 	 
10556	71	<~>	<~>
10556	71	<split-s>	<split-s>
10556	71	<split-h>	<split-h>
10556	71	<name2>	<name2>
10556	10557	<>	<name>
10556	75	<aphaerese>	<aphaerese>
10556	10556	<>	<aphaerese>
10556	10556	<>	<elision3>
10556	10556	<>	<elision2>
10556	10556	<>	<elision1>
10556	9751	.	υ
10556	9795	H	υ
10556	9751	.	u
10556	9797	H	u
10556	9751	.	κ
10556	10210	H	κ
10556	9705	H	k
10556	9718	H	U
10556	9721	H	K
10556	9751	.	α
10556	9781	H	α
10556	9751	.	a
10556	9786	H	a
10556	9548	H	A
10556	9751	.	λ
10556	10187	H	λ
10556	10135	H	l
10556	10140	H	L
10556	10560	<K>	<>
10557	70	.	.
10557	74	 	 
10557	70	<~>	<~>
10557	70	<split-s>	<split-s>
10557	70	<split-h>	<split-h>
10557	70	<name2>	<name2>
10557	77	<aphaerese>	<aphaerese>
10557	10555	<>	<aphaerese>
10557	10555	<>	<elision3>
10557	10555	<>	<elision2>
10557	10555	<>	<elision1>
10557	9753	.	υ
10557	9790	H	υ
10557	9753	.	u
10557	9794	H	u
10557	9753	.	κ
10557	10167	H	κ
10557	9746	H	k
10557	9720	H	U
10557	9750	H	K
10557	9753	.	α
10557	9780	H	α
10557	9753	.	a
10557	9785	H	a
10557	9551	H	A
10557	9753	.	λ
10557	10186	H	λ
10557	10134	H	l
10557	10137	H	L
10557	10558	<K>	<>
10558	9803	.	.
10558	9803	<~>	<~>
10558	9803	<split-s>	<split-s>
10558	9803	<split-h>	<split-h>
10558	9803	<name2>	<name2>
10558	9806	<aphaerese>	<aphaerese>
10558	10559	<>	<aphaerese>
10558	10559	<>	<elision3>
10558	10559	<>	<elision2>
10558	10559	<>	<elision1>
10558	9799	.	υ
10558	9945	H	υ
10558	9799	.	u
10558	9954	H	u
10558	9799	.	κ
10558	10197	H	κ
10558	9914	H	k
10558	9923	H	U
10558	9927	H	K
10558	9799	.	α
10558	9957	H	α
10558	9799	.	a
10558	9960	H	a
10558	9894	H	A
10558	9799	.	λ
10558	10206	H	λ
10558	9941	H	l
10558	9936	H	L
10559	9801	.	.
10559	9801	<~>	<~>
10559	9801	<split-s>	<split-s>
10559	9801	<split-h>	<split-h>
10559	9801	<name2>	<name2>
10559	9804	<aphaerese>	<aphaerese>
10559	10560	<>	<aphaerese>
10559	10560	<>	<elision3>
10559	10560	<>	<elision2>
10559	10560	<>	<elision1>
10559	9800	.	υ
10559	9943	H	υ
10559	9800	.	u
10559	9952	H	u
10559	9800	.	κ
10559	10195	H	κ
10559	9912	H	k
10559	9921	H	U
10559	9924	H	K
10559	9800	.	α
10559	9955	H	α
10559	9800	.	a
10559	9958	H	a
10559	9892	H	A
10559	9800	.	λ
10559	10204	H	λ
10559	9939	H	l
10559	9942	H	L
10560	9801	.	.
10560	9801	<~>	<~>
10560	9801	<split-s>	<split-s>
10560	9801	<split-h>	<split-h>
10560	9801	<name2>	<name2>
10560	10558	<>	<name>
10560	9804	<aphaerese>	<aphaerese>
10560	10560	<>	<aphaerese>
10560	10560	<>	<elision3>
10560	10560	<>	<elision2>
10560	10560	<>	<elision1>
10560	9800	.	υ
10560	9943	H	υ
10560	9800	.	u
10560	9952	H	u
10560	9800	.	κ
10560	10195	H	κ
10560	9912	H	k
10560	9921	H	U
10560	9924	H	K
10560	9800	.	α
10560	9955	H	α
10560	9800	.	a
10560	9958	H	a
10560	9892	H	A
10560	9800	.	λ
10560	10204	H	λ
10560	9939	H	l
10560	9942	H	L
10561	10562	<>	<aphaerese>
10561	10562	<>	<elision3>
10561	10562	<>	<elision2>
10561	10562	<>	<elision1>
10561	10164	<3s>	<>
10562	10563	<>	<name>
10562	10562	<>	<aphaerese>
10562	10562	<>	<elision3>
10562	10562	<>	<elision2>
10562	10562	<>	<elision1>
10562	10165	<3s>	<>
10563	10561	<>	<aphaerese>
10563	10561	<>	<elision3>
10563	10561	<>	<elision2>
10563	10561	<>	<elision1>
10563	10166	<3s>	<>
10564	10565	<>	<name>
10564	10564	<>	<aphaerese>
10564	10564	<>	<elision3>
10564	10564	<>	<elision2>
10564	10564	<>	<elision1>
10564	10568	<K2kl>	<>
10565	10566	<>	<aphaerese>
10565	10566	<>	<elision3>
10565	10566	<>	<elision2>
10565	10566	<>	<elision1>
10565	10569	<K2kl>	<>
10566	10564	<>	<aphaerese>
10566	10564	<>	<elision3>
10566	10564	<>	<elision2>
10566	10564	<>	<elision1>
10566	10567	<K2kl>	<>
10567	10568	<>	<aphaerese>
10567	10568	<>	<elision3>
10567	10568	<>	<elision2>
10567	10568	<>	<elision1>
10567	10561	<split-h>	<>
10568	10569	<>	<name>
10568	10568	<>	<aphaerese>
10568	10568	<>	<elision3>
10568	10568	<>	<elision2>
10568	10568	<>	<elision1>
10568	10562	<split-h>	<>
10569	10567	<>	<aphaerese>
10569	10567	<>	<elision3>
10569	10567	<>	<elision2>
10569	10567	<>	<elision1>
10569	10563	<split-h>	<>
10570	10571	<>	<name>
10570	10570	<>	<aphaerese>
10570	10570	<>	<elision3>
10570	10570	<>	<elision2>
10570	10570	<>	<elision1>
10570	10568	<L2kl>	<>
10571	10572	<>	<aphaerese>
10571	10572	<>	<elision3>
10571	10572	<>	<elision2>
10571	10572	<>	<elision1>
10571	10569	<L2kl>	<>
10572	10570	<>	<aphaerese>
10572	10570	<>	<elision3>
10572	10570	<>	<elision2>
10572	10570	<>	<elision1>
10572	10567	<L2kl>	<>
10573	9962	.	.
10573	9963	 	 
10573	9962	<~>	<~>
10573	9962	<split-s>	<split-s>
10573	9962	<split-h>	<split-h>
10573	9962	<name2>	<name2>
10573	10574	<>	<name>
10573	9966	<aphaerese>	<aphaerese>
10573	10573	<>	<aphaerese>
10573	10576	<elision3>	<elision3>
10573	10573	<>	<elision3>
10573	10576	<elision2>	<elision2>
10573	10573	<>	<elision2>
10573	10576	<elision1>	<elision1>
10573	10573	<>	<elision1>
10573	9970	.	υ
10573	9976	s	υ
10573	9970	.	u
10573	9976	s	u
10573	9970	.	κ
10573	10552	s	κ
10573	10338	s	k
10573	10347	s	U
10573	10513	s	K
10573	9970	.	α
10573	9976	s	α
10573	9970	.	a
10573	9976	s	a
10573	10468	s	A
10573	9970	.	λ
10573	10552	s	λ
10573	10338	s	l
10573	10526	s	L
10573	10624	<split-h>	<>
10574	9965	.	.
10574	9968	 	 
10574	9965	<~>	<~>
10574	9965	<split-s>	<split-s>
10574	9965	<split-h>	<split-h>
10574	9965	<name2>	<name2>
10574	10512	<aphaerese>	<aphaerese>
10574	10575	<>	<aphaerese>
10574	10578	<elision3>	<elision3>
10574	10575	<>	<elision3>
10574	10578	<elision2>	<elision2>
10574	10575	<>	<elision2>
10574	10578	<elision1>	<elision1>
10574	10575	<>	<elision1>
10574	9972	.	υ
10574	10148	s	υ
10574	9972	.	u
10574	10148	s	u
10574	9972	.	κ
10574	10554	s	κ
10574	10340	s	k
10574	10349	s	U
10574	10515	s	K
10574	9972	.	α
10574	10148	s	α
10574	9972	.	a
10574	10148	s	a
10574	10470	s	A
10574	9972	.	λ
10574	10554	s	λ
10574	10340	s	l
10574	10528	s	L
10574	10625	<split-h>	<>
10575	9962	.	.
10575	9963	 	 
10575	9962	<~>	<~>
10575	9962	<split-s>	<split-s>
10575	9962	<split-h>	<split-h>
10575	9962	<name2>	<name2>
10575	9966	<aphaerese>	<aphaerese>
10575	10573	<>	<aphaerese>
10575	10576	<elision3>	<elision3>
10575	10573	<>	<elision3>
10575	10576	<elision2>	<elision2>
10575	10573	<>	<elision2>
10575	10576	<elision1>	<elision1>
10575	10573	<>	<elision1>
10575	9970	.	υ
10575	9976	s	υ
10575	9970	.	u
10575	9976	s	u
10575	9970	.	κ
10575	10552	s	κ
10575	10338	s	k
10575	10347	s	U
10575	10513	s	K
10575	9970	.	α
10575	9976	s	α
10575	9970	.	a
10575	9976	s	a
10575	10468	s	A
10575	9970	.	λ
10575	10552	s	λ
10575	10338	s	l
10575	10526	s	L
10575	10623	<split-h>	<>
10576	9962	.	.
10576	9963	 	 
10576	9962	<~>	<~>
10576	9962	<split-s>	<split-s>
10576	9962	<split-h>	<split-h>
10576	9962	<name2>	<name2>
10576	10577	<>	<name>
10576	9966	<aphaerese>	<aphaerese>
10576	10576	<>	<aphaerese>
10576	9962	<elision3>	<elision3>
10576	10576	<>	<elision3>
10576	9962	<elision2>	<elision2>
10576	10576	<>	<elision2>
10576	9962	<elision1>	<elision1>
10576	10576	<>	<elision1>
10576	9970	.	υ
10576	9976	s	υ
10576	9970	.	u
10576	9976	s	u
10576	10155	.	κ
10576	10579	s	κ
10576	10588	s	k
10576	10347	s	U
10576	10597	s	K
10576	9970	.	α
10576	9976	s	α
10576	9970	.	a
10576	9976	s	a
10576	10468	s	A
10576	10588	s	λ
10576	10588	s	l
10576	10613	s	L
10576	10621	<split-h>	<>
10577	9965	.	.
10577	9968	 	 
10577	9965	<~>	<~>
10577	9965	<split-s>	<split-s>
10577	9965	<split-h>	<split-h>
10577	9965	<name2>	<name2>
10577	10512	<aphaerese>	<aphaerese>
10577	10578	<>	<aphaerese>
10577	9965	<elision3>	<elision3>
10577	10578	<>	<elision3>
10577	9965	<elision2>	<elision2>
10577	10578	<>	<elision2>
10577	9965	<elision1>	<elision1>
10577	10578	<>	<elision1>
10577	9972	.	υ
10577	10148	s	υ
10577	9972	.	u
10577	10148	s	u
10577	10157	.	κ
10577	10581	s	κ
10577	10590	s	k
10577	10349	s	U
10577	10599	s	K
10577	9972	.	α
10577	10148	s	α
10577	9972	.	a
10577	10148	s	a
10577	10470	s	A
10577	10590	s	λ
10577	10590	s	l
10577	10615	s	L
10577	10622	<split-h>	<>
10578	9962	.	.
10578	9963	 	 
10578	9962	<~>	<~>
10578	9962	<split-s>	<split-s>
10578	9962	<split-h>	<split-h>
10578	9962	<name2>	<name2>
10578	9966	<aphaerese>	<aphaerese>
10578	10576	<>	<aphaerese>
10578	9962	<elision3>	<elision3>
10578	10576	<>	<elision3>
10578	9962	<elision2>	<elision2>
10578	10576	<>	<elision2>
10578	9962	<elision1>	<elision1>
10578	10576	<>	<elision1>
10578	9970	.	υ
10578	9976	s	υ
10578	9970	.	u
10578	9976	s	u
10578	10155	.	κ
10578	10579	s	κ
10578	10588	s	k
10578	10347	s	U
10578	10597	s	K
10578	9970	.	α
10578	9976	s	α
10578	9970	.	a
10578	9976	s	a
10578	10468	s	A
10578	10588	s	λ
10578	10588	s	l
10578	10613	s	L
10578	10620	<split-h>	<>
10579	9977	.	.
10579	9977	 	 
10579	9977	<~>	<~>
10579	9977	<split-s>	<split-s>
10579	9977	<split-h>	<split-h>
10579	9977	<name2>	<name2>
10579	10580	<>	<name>
10579	9980	<aphaerese>	<aphaerese>
10579	10579	<>	<aphaerese>
10579	10229	<elision3>	<elision3>
10579	10579	<>	<elision3>
10579	10229	<elision2>	<elision2>
10579	10579	<>	<elision2>
10579	10229	<elision1>	<elision1>
10579	10579	<>	<elision1>
10579	10141	.	υ
10579	10141	.	u
10579	10141	.	κ
10579	10141	.	α
10579	10141	.	a
10579	10141	.	λ
10579	10583	<4s>	<>
10580	9979	.	.
10580	9979	 	 
10580	9979	<~>	<~>
10580	9979	<split-s>	<split-s>
10580	9979	<split-h>	<split-h>
10580	9979	<name2>	<name2>
10580	9982	<aphaerese>	<aphaerese>
10580	10581	<>	<aphaerese>
10580	10231	<elision3>	<elision3>
10580	10581	<>	<elision3>
10580	10231	<elision2>	<elision2>
10580	10581	<>	<elision2>
10580	10231	<elision1>	<elision1>
10580	10581	<>	<elision1>
10580	10143	.	υ
10580	10143	.	u
10580	10143	.	κ
10580	10143	.	α
10580	10143	.	a
10580	10143	.	λ
10580	10584	<4s>	<>
10581	9977	.	.
10581	9977	 	 
10581	9977	<~>	<~>
10581	9977	<split-s>	<split-s>
10581	9977	<split-h>	<split-h>
10581	9977	<name2>	<name2>
10581	9980	<aphaerese>	<aphaerese>
10581	10579	<>	<aphaerese>
10581	10229	<elision3>	<elision3>
10581	10579	<>	<elision3>
10581	10229	<elision2>	<elision2>
10581	10579	<>	<elision2>
10581	10229	<elision1>	<elision1>
10581	10579	<>	<elision1>
10581	10141	.	υ
10581	10141	.	u
10581	10141	.	κ
10581	10141	.	α
10581	10141	.	a
10581	10141	.	λ
10581	10582	<4s>	<>
10582	71	.	.
10582	72	 	 
10582	71	<~>	<~>
10582	71	<split-s>	<split-s>
10582	71	<split-h>	<split-h>
10582	71	<name2>	<name2>
10582	75	<aphaerese>	<aphaerese>
10582	10583	<>	<aphaerese>
10582	10333	<elision3>	<elision3>
10582	10583	<>	<elision3>
10582	10333	<elision2>	<elision2>
10582	10583	<>	<elision2>
10582	10333	<elision1>	<elision1>
10582	10583	<>	<elision1>
10582	9751	.	υ
10582	9795	H	υ
10582	9751	.	u
10582	9797	H	u
10582	9751	.	κ
10582	9718	H	U
10582	9751	.	α
10582	9781	H	α
10582	9751	.	a
10582	9786	H	a
10582	9548	H	A
10582	9751	.	λ
10582	10586	<K>	<>
10583	71	.	.
10583	72	 	 
10583	71	<~>	<~>
10583	71	<split-s>	<split-s>
10583	71	<split-h>	<split-h>
10583	71	<name2>	<name2>
10583	10584	<>	<name>
10583	75	<aphaerese>	<aphaerese>
10583	10583	<>	<aphaerese>
10583	10333	<elision3>	<elision3>
10583	10583	<>	<elision3>
10583	10333	<elision2>	<elision2>
10583	10583	<>	<elision2>
10583	10333	<elision1>	<elision1>
10583	10583	<>	<elision1>
10583	9751	.	υ
10583	9795	H	υ
10583	9751	.	u
10583	9797	H	u
10583	9751	.	κ
10583	9718	H	U
10583	9751	.	α
10583	9781	H	α
10583	9751	.	a
10583	9786	H	a
10583	9548	H	A
10583	9751	.	λ
10583	10587	<K>	<>
10584	70	.	.
10584	74	 	 
10584	70	<~>	<~>
10584	70	<split-s>	<split-s>
10584	70	<split-h>	<split-h>
10584	70	<name2>	<name2>
10584	77	<aphaerese>	<aphaerese>
10584	10582	<>	<aphaerese>
10584	10332	<elision3>	<elision3>
10584	10582	<>	<elision3>
10584	10332	<elision2>	<elision2>
10584	10582	<>	<elision2>
10584	10332	<elision1>	<elision1>
10584	10582	<>	<elision1>
10584	9753	.	υ
10584	9790	H	υ
10584	9753	.	u
10584	9794	H	u
10584	9753	.	κ
10584	9720	H	U
10584	9753	.	α
10584	9780	H	α
10584	9753	.	a
10584	9785	H	a
10584	9551	H	A
10584	9753	.	λ
10584	10585	<K>	<>
10585	9803	.	.
10585	9803	<~>	<~>
10585	9803	<split-s>	<split-s>
10585	9803	<split-h>	<split-h>
10585	9803	<name2>	<name2>
10585	9806	<aphaerese>	<aphaerese>
10585	10586	<>	<aphaerese>
10585	10281	<elision3>	<elision3>
10585	10586	<>	<elision3>
10585	10281	<elision2>	<elision2>
10585	10586	<>	<elision2>
10585	10281	<elision1>	<elision1>
10585	10586	<>	<elision1>
10585	9799	.	υ
10585	9945	H	υ
10585	9799	.	u
10585	9954	H	u
10585	9799	.	κ
10585	9923	H	U
10585	9799	.	α
10585	9957	H	α
10585	9799	.	a
10585	9960	H	a
10585	9894	H	A
10585	9799	.	λ
10586	9801	.	.
10586	9801	<~>	<~>
10586	9801	<split-s>	<split-s>
10586	9801	<split-h>	<split-h>
10586	9801	<name2>	<name2>
10586	9804	<aphaerese>	<aphaerese>
10586	10587	<>	<aphaerese>
10586	10282	<elision3>	<elision3>
10586	10587	<>	<elision3>
10586	10282	<elision2>	<elision2>
10586	10587	<>	<elision2>
10586	10282	<elision1>	<elision1>
10586	10587	<>	<elision1>
10586	9800	.	υ
10586	9943	H	υ
10586	9800	.	u
10586	9952	H	u
10586	9800	.	κ
10586	9921	H	U
10586	9800	.	α
10586	9955	H	α
10586	9800	.	a
10586	9958	H	a
10586	9892	H	A
10586	9800	.	λ
10587	9801	.	.
10587	9801	<~>	<~>
10587	9801	<split-s>	<split-s>
10587	9801	<split-h>	<split-h>
10587	9801	<name2>	<name2>
10587	10585	<>	<name>
10587	9804	<aphaerese>	<aphaerese>
10587	10587	<>	<aphaerese>
10587	10282	<elision3>	<elision3>
10587	10587	<>	<elision3>
10587	10282	<elision2>	<elision2>
10587	10587	<>	<elision2>
10587	10282	<elision1>	<elision1>
10587	10587	<>	<elision1>
10587	9800	.	υ
10587	9943	H	υ
10587	9800	.	u
10587	9952	H	u
10587	9800	.	κ
10587	9921	H	U
10587	9800	.	α
10587	9955	H	α
10587	9800	.	a
10587	9958	H	a
10587	9892	H	A
10587	9800	.	λ
10588	9977	.	.
10588	9977	 	 
10588	9977	<~>	<~>
10588	9977	<split-s>	<split-s>
10588	9977	<split-h>	<split-h>
10588	9977	<name2>	<name2>
10588	10589	<>	<name>
10588	9980	<aphaerese>	<aphaerese>
10588	10588	<>	<aphaerese>
10588	9977	<elision3>	<elision3>
10588	10588	<>	<elision3>
10588	9977	<elision2>	<elision2>
10588	10588	<>	<elision2>
10588	9977	<elision1>	<elision1>
10588	10588	<>	<elision1>
10588	10141	.	υ
10588	10141	.	u
10588	10141	.	κ
10588	10141	.	α
10588	10141	.	a
10588	10141	.	λ
10588	10592	<4s>	<>
10589	9979	.	.
10589	9979	 	 
10589	9979	<~>	<~>
10589	9979	<split-s>	<split-s>
10589	9979	<split-h>	<split-h>
10589	9979	<name2>	<name2>
10589	9982	<aphaerese>	<aphaerese>
10589	10590	<>	<aphaerese>
10589	9979	<elision3>	<elision3>
10589	10590	<>	<elision3>
10589	9979	<elision2>	<elision2>
10589	10590	<>	<elision2>
10589	9979	<elision1>	<elision1>
10589	10590	<>	<elision1>
10589	10143	.	υ
10589	10143	.	u
10589	10143	.	κ
10589	10143	.	α
10589	10143	.	a
10589	10143	.	λ
10589	10593	<4s>	<>
10590	9977	.	.
10590	9977	 	 
10590	9977	<~>	<~>
10590	9977	<split-s>	<split-s>
10590	9977	<split-h>	<split-h>
10590	9977	<name2>	<name2>
10590	9980	<aphaerese>	<aphaerese>
10590	10588	<>	<aphaerese>
10590	9977	<elision3>	<elision3>
10590	10588	<>	<elision3>
10590	9977	<elision2>	<elision2>
10590	10588	<>	<elision2>
10590	9977	<elision1>	<elision1>
10590	10588	<>	<elision1>
10590	10141	.	υ
10590	10141	.	u
10590	10141	.	κ
10590	10141	.	α
10590	10141	.	a
10590	10141	.	λ
10590	10591	<4s>	<>
10591	71	.	.
10591	72	 	 
10591	71	<~>	<~>
10591	71	<split-s>	<split-s>
10591	71	<split-h>	<split-h>
10591	71	<name2>	<name2>
10591	75	<aphaerese>	<aphaerese>
10591	10592	<>	<aphaerese>
10591	71	<elision3>	<elision3>
10591	10592	<>	<elision3>
10591	71	<elision2>	<elision2>
10591	10592	<>	<elision2>
10591	71	<elision1>	<elision1>
10591	10592	<>	<elision1>
10591	9751	.	υ
10591	9795	H	υ
10591	9751	.	u
10591	9797	H	u
10591	9751	.	κ
10591	9718	H	U
10591	9751	.	α
10591	9781	H	α
10591	9751	.	a
10591	9786	H	a
10591	9548	H	A
10591	9751	.	λ
10591	10595	<K>	<>
10592	71	.	.
10592	72	 	 
10592	71	<~>	<~>
10592	71	<split-s>	<split-s>
10592	71	<split-h>	<split-h>
10592	71	<name2>	<name2>
10592	10593	<>	<name>
10592	75	<aphaerese>	<aphaerese>
10592	10592	<>	<aphaerese>
10592	71	<elision3>	<elision3>
10592	10592	<>	<elision3>
10592	71	<elision2>	<elision2>
10592	10592	<>	<elision2>
10592	71	<elision1>	<elision1>
10592	10592	<>	<elision1>
10592	9751	.	υ
10592	9795	H	υ
10592	9751	.	u
10592	9797	H	u
10592	9751	.	κ
10592	9718	H	U
10592	9751	.	α
10592	9781	H	α
10592	9751	.	a
10592	9786	H	a
10592	9548	H	A
10592	9751	.	λ
10592	10596	<K>	<>
10593	70	.	.
10593	74	 	 
10593	70	<~>	<~>
10593	70	<split-s>	<split-s>
10593	70	<split-h>	<split-h>
10593	70	<name2>	<name2>
10593	77	<aphaerese>	<aphaerese>
10593	10591	<>	<aphaerese>
10593	70	<elision3>	<elision3>
10593	10591	<>	<elision3>
10593	70	<elision2>	<elision2>
10593	10591	<>	<elision2>
10593	70	<elision1>	<elision1>
10593	10591	<>	<elision1>
10593	9753	.	υ
10593	9790	H	υ
10593	9753	.	u
10593	9794	H	u
10593	9753	.	κ
10593	9720	H	U
10593	9753	.	α
10593	9780	H	α
10593	9753	.	a
10593	9785	H	a
10593	9551	H	A
10593	9753	.	λ
10593	10594	<K>	<>
10594	9803	.	.
10594	9803	<~>	<~>
10594	9803	<split-s>	<split-s>
10594	9803	<split-h>	<split-h>
10594	9803	<name2>	<name2>
10594	9806	<aphaerese>	<aphaerese>
10594	10595	<>	<aphaerese>
10594	9803	<elision3>	<elision3>
10594	10595	<>	<elision3>
10594	9803	<elision2>	<elision2>
10594	10595	<>	<elision2>
10594	9803	<elision1>	<elision1>
10594	10595	<>	<elision1>
10594	9799	.	υ
10594	9945	H	υ
10594	9799	.	u
10594	9954	H	u
10594	9799	.	κ
10594	9923	H	U
10594	9799	.	α
10594	9957	H	α
10594	9799	.	a
10594	9960	H	a
10594	9894	H	A
10594	9799	.	λ
10595	9801	.	.
10595	9801	<~>	<~>
10595	9801	<split-s>	<split-s>
10595	9801	<split-h>	<split-h>
10595	9801	<name2>	<name2>
10595	9804	<aphaerese>	<aphaerese>
10595	10596	<>	<aphaerese>
10595	9801	<elision3>	<elision3>
10595	10596	<>	<elision3>
10595	9801	<elision2>	<elision2>
10595	10596	<>	<elision2>
10595	9801	<elision1>	<elision1>
10595	10596	<>	<elision1>
10595	9800	.	υ
10595	9943	H	υ
10595	9800	.	u
10595	9952	H	u
10595	9800	.	κ
10595	9921	H	U
10595	9800	.	α
10595	9955	H	α
10595	9800	.	a
10595	9958	H	a
10595	9892	H	A
10595	9800	.	λ
10596	9801	.	.
10596	9801	<~>	<~>
10596	9801	<split-s>	<split-s>
10596	9801	<split-h>	<split-h>
10596	9801	<name2>	<name2>
10596	10594	<>	<name>
10596	9804	<aphaerese>	<aphaerese>
10596	10596	<>	<aphaerese>
10596	9801	<elision3>	<elision3>
10596	10596	<>	<elision3>
10596	9801	<elision2>	<elision2>
10596	10596	<>	<elision2>
10596	9801	<elision1>	<elision1>
10596	10596	<>	<elision1>
10596	9800	.	υ
10596	9943	H	υ
10596	9800	.	u
10596	9952	H	u
10596	9800	.	κ
10596	9921	H	U
10596	9800	.	α
10596	9955	H	α
10596	9800	.	a
10596	9958	H	a
10596	9892	H	A
10596	9800	.	λ
10597	10351	<name>	<name>
10597	10598	<>	<name>
10597	10600	<>	<aphaerese>
10597	10600	<>	<elision3>
10597	10600	<>	<elision2>
10597	10600	<>	<elision1>
10597	10462	<4s>	<>
10597	10517	<L2kl>	<>
10597	10610	<K2kl>	<>
10598	10599	<>	<aphaerese>
10598	10599	<>	<elision3>
10598	10599	<>	<elision2>
10598	10599	<>	<elision1>
10598	10518	<L2kl>	<>
10598	10602	<K2kl>	<>
10599	10600	<>	<aphaerese>
10599	10600	<>	<elision3>
10599	10600	<>	<elision2>
10599	10600	<>	<elision1>
10599	10519	<L2kl>	<>
10599	10603	<K2kl>	<>
10600	10598	<>	<name>
10600	10600	<>	<aphaerese>
10600	10600	<>	<elision3>
10600	10600	<>	<elision2>
10600	10600	<>	<elision1>
10600	10517	<L2kl>	<>
10600	10601	<K2kl>	<>
10601	9977	.	.
10601	9977	 	 
10601	9977	<~>	<~>
10601	9977	<split-s>	<split-s>
10601	9977	<split-h>	<split-h>
10601	9977	<name2>	<name2>
10601	10602	<>	<name>
10601	9980	<aphaerese>	<aphaerese>
10601	10601	<>	<aphaerese>
10601	9977	<elision3>	<elision3>
10601	10601	<>	<elision3>
10601	9977	<elision2>	<elision2>
10601	10601	<>	<elision2>
10601	9977	<elision1>	<elision1>
10601	10601	<>	<elision1>
10601	10141	.	υ
10601	10141	.	u
10601	10141	.	α
10601	10141	.	a
10601	10605	<4s>	<>
10602	9979	.	.
10602	9979	 	 
10602	9979	<~>	<~>
10602	9979	<split-s>	<split-s>
10602	9979	<split-h>	<split-h>
10602	9979	<name2>	<name2>
10602	9982	<aphaerese>	<aphaerese>
10602	10603	<>	<aphaerese>
10602	9979	<elision3>	<elision3>
10602	10603	<>	<elision3>
10602	9979	<elision2>	<elision2>
10602	10603	<>	<elision2>
10602	9979	<elision1>	<elision1>
10602	10603	<>	<elision1>
10602	10143	.	υ
10602	10143	.	u
10602	10143	.	α
10602	10143	.	a
10602	10606	<4s>	<>
10603	9977	.	.
10603	9977	 	 
10603	9977	<~>	<~>
10603	9977	<split-s>	<split-s>
10603	9977	<split-h>	<split-h>
10603	9977	<name2>	<name2>
10603	9980	<aphaerese>	<aphaerese>
10603	10601	<>	<aphaerese>
10603	9977	<elision3>	<elision3>
10603	10601	<>	<elision3>
10603	9977	<elision2>	<elision2>
10603	10601	<>	<elision2>
10603	9977	<elision1>	<elision1>
10603	10601	<>	<elision1>
10603	10141	.	υ
10603	10141	.	u
10603	10141	.	α
10603	10141	.	a
10603	10604	<4s>	<>
10604	71	.	.
10604	72	 	 
10604	71	<~>	<~>
10604	71	<split-s>	<split-s>
10604	71	<split-h>	<split-h>
10604	71	<name2>	<name2>
10604	75	<aphaerese>	<aphaerese>
10604	10605	<>	<aphaerese>
10604	71	<elision3>	<elision3>
10604	10605	<>	<elision3>
10604	71	<elision2>	<elision2>
10604	10605	<>	<elision2>
10604	71	<elision1>	<elision1>
10604	10605	<>	<elision1>
10604	9751	.	υ
10604	9795	H	υ
10604	9751	.	u
10604	9797	H	u
10604	9718	H	U
10604	9751	.	α
10604	9781	H	α
10604	9751	.	a
10604	9786	H	a
10604	9548	H	A
10604	10608	<K>	<>
10605	71	.	.
10605	72	 	 
10605	71	<~>	<~>
10605	71	<split-s>	<split-s>
10605	71	<split-h>	<split-h>
10605	71	<name2>	<name2>
10605	10606	<>	<name>
10605	75	<aphaerese>	<aphaerese>
10605	10605	<>	<aphaerese>
10605	71	<elision3>	<elision3>
10605	10605	<>	<elision3>
10605	71	<elision2>	<elision2>
10605	10605	<>	<elision2>
10605	71	<elision1>	<elision1>
10605	10605	<>	<elision1>
10605	9751	.	υ
10605	9795	H	υ
10605	9751	.	u
10605	9797	H	u
10605	9718	H	U
10605	9751	.	α
10605	9781	H	α
10605	9751	.	a
10605	9786	H	a
10605	9548	H	A
10605	10609	<K>	<>
10606	70	.	.
10606	74	 	 
10606	70	<~>	<~>
10606	70	<split-s>	<split-s>
10606	70	<split-h>	<split-h>
10606	70	<name2>	<name2>
10606	77	<aphaerese>	<aphaerese>
10606	10604	<>	<aphaerese>
10606	70	<elision3>	<elision3>
10606	10604	<>	<elision3>
10606	70	<elision2>	<elision2>
10606	10604	<>	<elision2>
10606	70	<elision1>	<elision1>
10606	10604	<>	<elision1>
10606	9753	.	υ
10606	9790	H	υ
10606	9753	.	u
10606	9794	H	u
10606	9720	H	U
10606	9753	.	α
10606	9780	H	α
10606	9753	.	a
10606	9785	H	a
10606	9551	H	A
10606	10607	<K>	<>
10607	9803	.	.
10607	9803	<~>	<~>
10607	9803	<split-s>	<split-s>
10607	9803	<split-h>	<split-h>
10607	9803	<name2>	<name2>
10607	9806	<aphaerese>	<aphaerese>
10607	10608	<>	<aphaerese>
10607	9803	<elision3>	<elision3>
10607	10608	<>	<elision3>
10607	9803	<elision2>	<elision2>
10607	10608	<>	<elision2>
10607	9803	<elision1>	<elision1>
10607	10608	<>	<elision1>
10607	9799	.	υ
10607	9945	H	υ
10607	9799	.	u
10607	9954	H	u
10607	9923	H	U
10607	9799	.	α
10607	9957	H	α
10607	9799	.	a
10607	9960	H	a
10607	9894	H	A
10608	9801	.	.
10608	9801	<~>	<~>
10608	9801	<split-s>	<split-s>
10608	9801	<split-h>	<split-h>
10608	9801	<name2>	<name2>
10608	9804	<aphaerese>	<aphaerese>
10608	10609	<>	<aphaerese>
10608	9801	<elision3>	<elision3>
10608	10609	<>	<elision3>
10608	9801	<elision2>	<elision2>
10608	10609	<>	<elision2>
10608	9801	<elision1>	<elision1>
10608	10609	<>	<elision1>
10608	9800	.	υ
10608	9943	H	υ
10608	9800	.	u
10608	9952	H	u
10608	9921	H	U
10608	9800	.	α
10608	9955	H	α
10608	9800	.	a
10608	9958	H	a
10608	9892	H	A
10609	9801	.	.
10609	9801	<~>	<~>
10609	9801	<split-s>	<split-s>
10609	9801	<split-h>	<split-h>
10609	9801	<name2>	<name2>
10609	10607	<>	<name>
10609	9804	<aphaerese>	<aphaerese>
10609	10609	<>	<aphaerese>
10609	9801	<elision3>	<elision3>
10609	10609	<>	<elision3>
10609	9801	<elision2>	<elision2>
10609	10609	<>	<elision2>
10609	9801	<elision1>	<elision1>
10609	10609	<>	<elision1>
10609	9800	.	υ
10609	9943	H	υ
10609	9800	.	u
10609	9952	H	u
10609	9921	H	U
10609	9800	.	α
10609	9955	H	α
10609	9800	.	a
10609	9958	H	a
10609	9892	H	A
10610	9977	.	.
10610	9977	 	 
10610	9977	<~>	<~>
10610	9977	<split-s>	<split-s>
10610	9977	<split-h>	<split-h>
10610	9977	<name2>	<name2>
10610	10351	<name2>	<name>
10610	10602	<>	<name>
10610	9980	<aphaerese>	<aphaerese>
10610	10601	<>	<aphaerese>
10610	9977	<elision3>	<elision3>
10610	10601	<>	<elision3>
10610	9977	<elision2>	<elision2>
10610	10601	<>	<elision2>
10610	9977	<elision1>	<elision1>
10610	10601	<>	<elision1>
10610	10141	.	υ
10610	10141	.	u
10610	10141	.	α
10610	10141	.	a
10610	10611	<4s>	<>
10611	71	.	.
10611	72	 	 
10611	71	<~>	<~>
10611	71	<split-s>	<split-s>
10611	71	<split-h>	<split-h>
10611	71	<name2>	<name2>
10611	10463	<name2>	<name>
10611	10606	<>	<name>
10611	75	<aphaerese>	<aphaerese>
10611	10605	<>	<aphaerese>
10611	71	<elision3>	<elision3>
10611	10605	<>	<elision3>
10611	71	<elision2>	<elision2>
10611	10605	<>	<elision2>
10611	71	<elision1>	<elision1>
10611	10605	<>	<elision1>
10611	9751	.	υ
10611	9795	H	υ
10611	9751	.	u
10611	9797	H	u
10611	9718	H	U
10611	9751	.	α
10611	9781	H	α
10611	9751	.	a
10611	9786	H	a
10611	9548	H	A
10611	10612	<K>	<>
10612	9801	.	.
10612	9801	<~>	<~>
10612	9801	<split-s>	<split-s>
10612	9801	<split-h>	<split-h>
10612	9801	<name2>	<name2>
10612	10353	<name2>	<name>
10612	10607	<>	<name>
10612	9804	<aphaerese>	<aphaerese>
10612	10609	<>	<aphaerese>
10612	9801	<elision3>	<elision3>
10612	10609	<>	<elision3>
10612	9801	<elision2>	<elision2>
10612	10609	<>	<elision2>
10612	9801	<elision1>	<elision1>
10612	10609	<>	<elision1>
10612	9800	.	υ
10612	9943	H	υ
10612	9800	.	u
10612	9952	H	u
10612	9921	H	U
10612	9800	.	α
10612	9955	H	α
10612	9800	.	a
10612	9958	H	a
10612	9892	H	A
10613	10351	<name>	<name>
10613	10614	<>	<name>
10613	10616	<>	<aphaerese>
10613	10616	<>	<elision3>
10613	10616	<>	<elision2>
10613	10616	<>	<elision1>
10613	10462	<4s>	<>
10613	10617	<L2kl>	<>
10614	10615	<>	<aphaerese>
10614	10615	<>	<elision3>
10614	10615	<>	<elision2>
10614	10615	<>	<elision1>
10614	10589	<L2kl>	<>
10615	10616	<>	<aphaerese>
10615	10616	<>	<elision3>
10615	10616	<>	<elision2>
10615	10616	<>	<elision1>
10615	10590	<L2kl>	<>
10616	10614	<>	<name>
10616	10616	<>	<aphaerese>
10616	10616	<>	<elision3>
10616	10616	<>	<elision2>
10616	10616	<>	<elision1>
10616	10588	<L2kl>	<>
10617	9977	.	.
10617	9977	 	 
10617	9977	<~>	<~>
10617	9977	<split-s>	<split-s>
10617	9977	<split-h>	<split-h>
10617	9977	<name2>	<name2>
10617	10351	<name2>	<name>
10617	10589	<>	<name>
10617	9980	<aphaerese>	<aphaerese>
10617	10588	<>	<aphaerese>
10617	9977	<elision3>	<elision3>
10617	10588	<>	<elision3>
10617	9977	<elision2>	<elision2>
10617	10588	<>	<elision2>
10617	9977	<elision1>	<elision1>
10617	10588	<>	<elision1>
10617	10141	.	υ
10617	10141	.	u
10617	10141	.	κ
10617	10141	.	α
10617	10141	.	a
10617	10141	.	λ
10617	10618	<4s>	<>
10618	71	.	.
10618	72	 	 
10618	71	<~>	<~>
10618	71	<split-s>	<split-s>
10618	71	<split-h>	<split-h>
10618	71	<name2>	<name2>
10618	10463	<name2>	<name>
10618	10593	<>	<name>
10618	75	<aphaerese>	<aphaerese>
10618	10592	<>	<aphaerese>
10618	71	<elision3>	<elision3>
10618	10592	<>	<elision3>
10618	71	<elision2>	<elision2>
10618	10592	<>	<elision2>
10618	71	<elision1>	<elision1>
10618	10592	<>	<elision1>
10618	9751	.	υ
10618	9795	H	υ
10618	9751	.	u
10618	9797	H	u
10618	9751	.	κ
10618	9718	H	U
10618	9751	.	α
10618	9781	H	α
10618	9751	.	a
10618	9786	H	a
10618	9548	H	A
10618	9751	.	λ
10618	10619	<K>	<>
10619	9801	.	.
10619	9801	<~>	<~>
10619	9801	<split-s>	<split-s>
10619	9801	<split-h>	<split-h>
10619	9801	<name2>	<name2>
10619	10353	<name2>	<name>
10619	10594	<>	<name>
10619	9804	<aphaerese>	<aphaerese>
10619	10596	<>	<aphaerese>
10619	9801	<elision3>	<elision3>
10619	10596	<>	<elision3>
10619	9801	<elision2>	<elision2>
10619	10596	<>	<elision2>
10619	9801	<elision1>	<elision1>
10619	10596	<>	<elision1>
10619	9800	.	υ
10619	9943	H	υ
10619	9800	.	u
10619	9952	H	u
10619	9800	.	κ
10619	9921	H	U
10619	9800	.	α
10619	9955	H	α
10619	9800	.	a
10619	9958	H	a
10619	9892	H	A
10619	9800	.	λ
10620	10621	<>	<aphaerese>
10620	10621	<>	<elision3>
10620	10621	<>	<elision2>
10620	10621	<>	<elision1>
10620	10232	<3s>	<>
10621	10622	<>	<name>
10621	10621	<>	<aphaerese>
10621	10621	<>	<elision3>
10621	10621	<>	<elision2>
10621	10621	<>	<elision1>
10621	10233	<3s>	<>
10622	10620	<>	<aphaerese>
10622	10620	<>	<elision3>
10622	10620	<>	<elision2>
10622	10620	<>	<elision1>
10622	10234	<3s>	<>
10623	10624	<>	<aphaerese>
10623	10624	<>	<elision3>
10623	10624	<>	<elision2>
10623	10624	<>	<elision1>
10623	10329	<3s>	<>
10624	10625	<>	<name>
10624	10624	<>	<aphaerese>
10624	10624	<>	<elision3>
10624	10624	<>	<elision2>
10624	10624	<>	<elision1>
10624	10330	<3s>	<>
10625	10623	<>	<aphaerese>
10625	10623	<>	<elision3>
10625	10623	<>	<elision2>
10625	10623	<>	<elision1>
10625	10331	<3s>	<>
10626	9962	.	.
10626	9963	 	 
10626	9962	<~>	<~>
10626	9962	<split-s>	<split-s>
10626	9962	<split-h>	<split-h>
10626	9962	<name2>	<name2>
10626	10627	<>	<name>
10626	9966	<aphaerese>	<aphaerese>
10626	10626	<>	<aphaerese>
10626	9962	<elision3>	<elision3>
10626	10626	<>	<elision3>
10626	9962	<elision2>	<elision2>
10626	10626	<>	<elision2>
10626	9962	<elision1>	<elision1>
10626	10626	<>	<elision1>
10626	9970	.	υ
10626	9976	s	υ
10626	9970	.	u
10626	9976	s	u
10626	10629	.	κ
10626	10552	s	κ
10626	10338	s	k
10626	10347	s	U
10626	10513	s	K
10626	9970	.	α
10626	9976	s	α
10626	9970	.	a
10626	9976	s	a
10626	10468	s	A
10626	10629	.	λ
10626	10552	s	λ
10626	10338	s	l
10626	10526	s	L
10626	10645	<split-h>	<>
10627	9965	.	.
10627	9968	 	 
10627	9965	<~>	<~>
10627	9965	<split-s>	<split-s>
10627	9965	<split-h>	<split-h>
10627	9965	<name2>	<name2>
10627	10512	<aphaerese>	<aphaerese>
10627	10628	<>	<aphaerese>
10627	9965	<elision3>	<elision3>
10627	10628	<>	<elision3>
10627	9965	<elision2>	<elision2>
10627	10628	<>	<elision2>
10627	9965	<elision1>	<elision1>
10627	10628	<>	<elision1>
10627	9972	.	υ
10627	10148	s	υ
10627	9972	.	u
10627	10148	s	u
10627	10631	.	κ
10627	10554	s	κ
10627	10340	s	k
10627	10349	s	U
10627	10515	s	K
10627	9972	.	α
10627	10148	s	α
10627	9972	.	a
10627	10148	s	a
10627	10470	s	A
10627	10631	.	λ
10627	10554	s	λ
10627	10340	s	l
10627	10528	s	L
10627	10646	<split-h>	<>
10628	9962	.	.
10628	9963	 	 
10628	9962	<~>	<~>
10628	9962	<split-s>	<split-s>
10628	9962	<split-h>	<split-h>
10628	9962	<name2>	<name2>
10628	9966	<aphaerese>	<aphaerese>
10628	10626	<>	<aphaerese>
10628	9962	<elision3>	<elision3>
10628	10626	<>	<elision3>
10628	9962	<elision2>	<elision2>
10628	10626	<>	<elision2>
10628	9962	<elision1>	<elision1>
10628	10626	<>	<elision1>
10628	9970	.	υ
10628	9976	s	υ
10628	9970	.	u
10628	9976	s	u
10628	10629	.	κ
10628	10552	s	κ
10628	10338	s	k
10628	10347	s	U
10628	10513	s	K
10628	9970	.	α
10628	9976	s	α
10628	9970	.	a
10628	9976	s	a
10628	10468	s	A
10628	10629	.	λ
10628	10552	s	λ
10628	10338	s	l
10628	10526	s	L
10628	10644	<split-h>	<>
10629	10630	<>	<name>
10629	10629	<>	<aphaerese>
10629	10632	<elision3>	<elision3>
10629	10629	<>	<elision3>
10629	10632	<elision2>	<elision2>
10629	10629	<>	<elision2>
10629	10632	<elision1>	<elision1>
10629	10629	<>	<elision1>
10629	9974	<split-h>	<>
10630	10631	<>	<aphaerese>
10630	10634	<elision3>	<elision3>
10630	10631	<>	<elision3>
10630	10634	<elision2>	<elision2>
10630	10631	<>	<elision2>
10630	10634	<elision1>	<elision1>
10630	10631	<>	<elision1>
10630	9975	<split-h>	<>
10631	10629	<>	<aphaerese>
10631	10632	<elision3>	<elision3>
10631	10629	<>	<elision3>
10631	10632	<elision2>	<elision2>
10631	10629	<>	<elision2>
10631	10632	<elision1>	<elision1>
10631	10629	<>	<elision1>
10631	9973	<split-h>	<>
10632	10632	.	.
10632	10632	 	 
10632	10632	<~>	<~>
10632	10632	<split-s>	<split-s>
10632	10632	<split-h>	<split-h>
10632	10632	<name2>	<name2>
10632	10633	<>	<name>
10632	10635	<aphaerese>	<aphaerese>
10632	10632	<>	<aphaerese>
10632	10632	<elision3>	<elision3>
10632	10632	<>	<elision3>
10632	10632	<elision2>	<elision2>
10632	10632	<>	<elision2>
10632	10632	<elision1>	<elision1>
10632	10632	<>	<elision1>
10632	10629	.	υ
10632	10629	.	u
10632	10638	.	κ
10632	10629	.	α
10632	10629	.	a
10632	10487	<split-h>	<>
10633	10634	.	.
10633	10634	 	 
10633	10634	<~>	<~>
10633	10634	<split-s>	<split-s>
10633	10634	<split-h>	<split-h>
10633	10634	<name2>	<name2>
10633	10637	<aphaerese>	<aphaerese>
10633	10634	<>	<aphaerese>
10633	10634	<elision3>	<elision3>
10633	10634	<>	<elision3>
10633	10634	<elision2>	<elision2>
10633	10634	<>	<elision2>
10633	10634	<elision1>	<elision1>
10633	10634	<>	<elision1>
10633	10631	.	υ
10633	10631	.	u
10633	10640	.	κ
10633	10631	.	α
10633	10631	.	a
10633	10488	<split-h>	<>
10634	10632	.	.
10634	10632	 	 
10634	10632	<~>	<~>
10634	10632	<split-s>	<split-s>
10634	10632	<split-h>	<split-h>
10634	10632	<name2>	<name2>
10634	10635	<aphaerese>	<aphaerese>
10634	10632	<>	<aphaerese>
10634	10632	<elision3>	<elision3>
10634	10632	<>	<elision3>
10634	10632	<elision2>	<elision2>
10634	10632	<>	<elision2>
10634	10632	<elision1>	<elision1>
10634	10632	<>	<elision1>
10634	10629	.	υ
10634	10629	.	u
10634	10638	.	κ
10634	10629	.	α
10634	10629	.	a
10634	10489	<split-h>	<>
10635	10632	.	.
10635	10632	 	 
10635	10632	<~>	<~>
10635	10632	<split-s>	<split-s>
10635	10632	<split-h>	<split-h>
10635	10632	<name2>	<name2>
10635	10636	<>	<name>
10635	10635	<aphaerese>	<aphaerese>
10635	10635	<>	<aphaerese>
10635	10632	<elision3>	<elision3>
10635	10635	<>	<elision3>
10635	10632	<elision2>	<elision2>
10635	10635	<>	<elision2>
10635	10632	<elision1>	<elision1>
10635	10635	<>	<elision1>
10635	10632	.	υ
10635	10632	.	u
10635	10638	.	κ
10635	10632	.	α
10635	10632	.	a
10635	10534	<split-h>	<>
10636	10634	.	.
10636	10634	 	 
10636	10634	<~>	<~>
10636	10634	<split-s>	<split-s>
10636	10634	<split-h>	<split-h>
10636	10634	<name2>	<name2>
10636	10637	<aphaerese>	<aphaerese>
10636	10637	<>	<aphaerese>
10636	10634	<elision3>	<elision3>
10636	10637	<>	<elision3>
10636	10634	<elision2>	<elision2>
10636	10637	<>	<elision2>
10636	10634	<elision1>	<elision1>
10636	10637	<>	<elision1>
10636	10634	.	υ
10636	10634	.	u
10636	10640	.	κ
10636	10634	.	α
10636	10634	.	a
10636	10535	<split-h>	<>
10637	10632	.	.
10637	10632	 	 
10637	10632	<~>	<~>
10637	10632	<split-s>	<split-s>
10637	10632	<split-h>	<split-h>
10637	10632	<name2>	<name2>
10637	10635	<aphaerese>	<aphaerese>
10637	10635	<>	<aphaerese>
10637	10632	<elision3>	<elision3>
10637	10635	<>	<elision3>
10637	10632	<elision2>	<elision2>
10637	10635	<>	<elision2>
10637	10632	<elision1>	<elision1>
10637	10635	<>	<elision1>
10637	10632	.	υ
10637	10632	.	u
10637	10638	.	κ
10637	10632	.	α
10637	10632	.	a
10637	10533	<split-h>	<>
10638	10639	<>	<name>
10638	10638	<>	<aphaerese>
10638	10641	<elision3>	<elision3>
10638	10638	<>	<elision3>
10638	10641	<elision2>	<elision2>
10638	10638	<>	<elision2>
10638	10641	<elision1>	<elision1>
10638	10638	<>	<elision1>
10638	10224	<split-h>	<>
10639	10640	<>	<aphaerese>
10639	10643	<elision3>	<elision3>
10639	10640	<>	<elision3>
10639	10643	<elision2>	<elision2>
10639	10640	<>	<elision2>
10639	10643	<elision1>	<elision1>
10639	10640	<>	<elision1>
10639	10225	<split-h>	<>
10640	10638	<>	<aphaerese>
10640	10641	<elision3>	<elision3>
10640	10638	<>	<elision3>
10640	10641	<elision2>	<elision2>
10640	10638	<>	<elision2>
10640	10641	<elision1>	<elision1>
10640	10638	<>	<elision1>
10640	10223	<split-h>	<>
10641	10642	<>	<name>
10641	10641	<>	<aphaerese>
10641	10641	<>	<elision3>
10641	10641	<>	<elision2>
10641	10641	<>	<elision1>
10641	10221	<split-h>	<>
10642	10643	<>	<aphaerese>
10642	10643	<>	<elision3>
10642	10643	<>	<elision2>
10642	10643	<>	<elision1>
10642	10222	<split-h>	<>
10643	10641	<>	<aphaerese>
10643	10641	<>	<elision3>
10643	10641	<>	<elision2>
10643	10641	<>	<elision1>
10643	10220	<split-h>	<>
10644	10645	<>	<aphaerese>
10644	10645	<>	<elision3>
10644	10645	<>	<elision2>
10644	10645	<>	<elision1>
10644	10341	<3s>	<>
10645	10646	<>	<name>
10645	10645	<>	<aphaerese>
10645	10645	<>	<elision3>
10645	10645	<>	<elision2>
10645	10645	<>	<elision1>
10645	10342	<3s>	<>
10646	10644	<>	<aphaerese>
10646	10644	<>	<elision3>
10646	10644	<>	<elision2>
10646	10644	<>	<elision1>
10646	10343	<3s>	<>
10647	10648	<>	<name>
10647	10647	<>	<aphaerese>
10647	10647	<>	<elision3>
10647	10647	<>	<elision2>
10647	10647	<>	<elision1>
10647	10632	<U2kl>	<>
10648	10649	<>	<aphaerese>
10648	10649	<>	<elision3>
10648	10649	<>	<elision2>
10648	10649	<>	<elision1>
10648	10633	<U2kl>	<>
10649	10647	<>	<aphaerese>
10649	10647	<>	<elision3>
10649	10647	<>	<elision2>
10649	10647	<>	<elision1>
10649	10634	<U2kl>	<>
10650	10651	<name>	<name>
10650	10653	<>	<name>
10650	10655	<>	<aphaerese>
10650	10655	<>	<elision3>
10650	10655	<>	<elision2>
10650	10655	<>	<elision1>
10650	10698	<split-h>	<>
10650	10656	<A2kl>	<>
10650	10674	<L2kl>	<>
10650	10699	<K2kl>	<>
10651	10515	s	k
10651	10528	s	l
10651	10652	<split-h>	<>
10652	10352	<3s>	<>
10653	10654	<>	<aphaerese>
10653	10654	<>	<elision3>
10653	10654	<>	<elision2>
10653	10654	<>	<elision1>
10653	10657	<A2kl>	<>
10653	10675	<L2kl>	<>
10653	10693	<K2kl>	<>
10654	10655	<>	<aphaerese>
10654	10655	<>	<elision3>
10654	10655	<>	<elision2>
10654	10655	<>	<elision1>
10654	10658	<A2kl>	<>
10654	10676	<L2kl>	<>
10654	10694	<K2kl>	<>
10655	10653	<>	<name>
10655	10655	<>	<aphaerese>
10655	10655	<>	<elision3>
10655	10655	<>	<elision2>
10655	10655	<>	<elision1>
10655	10656	<A2kl>	<>
10655	10674	<L2kl>	<>
10655	10692	<K2kl>	<>
10656	10657	<>	<name>
10656	10656	<>	<aphaerese>
10656	10656	<>	<elision3>
10656	10656	<>	<elision2>
10656	10656	<>	<elision1>
10656	10659	.	κ
10656	10659	.	λ
10656	10672	<split-h>	<>
10657	10658	<>	<aphaerese>
10657	10658	<>	<elision3>
10657	10658	<>	<elision2>
10657	10658	<>	<elision1>
10657	10661	.	κ
10657	10661	.	λ
10657	10673	<split-h>	<>
10658	10656	<>	<aphaerese>
10658	10656	<>	<elision3>
10658	10656	<>	<elision2>
10658	10656	<>	<elision1>
10658	10659	.	κ
10658	10659	.	λ
10658	10671	<split-h>	<>
10659	10660	<>	<name>
10659	10659	<>	<aphaerese>
10659	10662	<elision3>	<elision3>
10659	10659	<>	<elision3>
10659	10662	<elision2>	<elision2>
10659	10659	<>	<elision2>
10659	10662	<elision1>	<elision1>
10659	10659	<>	<elision1>
10659	10669	<split-h>	<>
10660	10661	<>	<aphaerese>
10660	10664	<elision3>	<elision3>
10660	10661	<>	<elision3>
10660	10664	<elision2>	<elision2>
10660	10661	<>	<elision2>
10660	10664	<elision1>	<elision1>
10660	10661	<>	<elision1>
10660	10670	<split-h>	<>
10661	10659	<>	<aphaerese>
10661	10662	<elision3>	<elision3>
10661	10659	<>	<elision3>
10661	10662	<elision2>	<elision2>
10661	10659	<>	<elision2>
10661	10662	<elision1>	<elision1>
10661	10659	<>	<elision1>
10661	10668	<split-h>	<>
10662	10632	.	.
10662	10632	 	 
10662	10632	<~>	<~>
10662	10632	<split-s>	<split-s>
10662	10632	<split-h>	<split-h>
10662	10632	<name2>	<name2>
10662	10663	<>	<name>
10662	10635	<aphaerese>	<aphaerese>
10662	10662	<>	<aphaerese>
10662	10632	<elision3>	<elision3>
10662	10662	<>	<elision3>
10662	10632	<elision2>	<elision2>
10662	10662	<>	<elision2>
10662	10632	<elision1>	<elision1>
10662	10662	<>	<elision1>
10662	10629	.	υ
10662	10629	.	u
10662	10629	.	α
10662	10629	.	a
10662	10666	<split-h>	<>
10663	10634	.	.
10663	10634	 	 
10663	10634	<~>	<~>
10663	10634	<split-s>	<split-s>
10663	10634	<split-h>	<split-h>
10663	10634	<name2>	<name2>
10663	10637	<aphaerese>	<aphaerese>
10663	10664	<>	<aphaerese>
10663	10634	<elision3>	<elision3>
10663	10664	<>	<elision3>
10663	10634	<elision2>	<elision2>
10663	10664	<>	<elision2>
10663	10634	<elision1>	<elision1>
10663	10664	<>	<elision1>
10663	10631	.	υ
10663	10631	.	u
10663	10631	.	α
10663	10631	.	a
10663	10667	<split-h>	<>
10664	10632	.	.
10664	10632	 	 
10664	10632	<~>	<~>
10664	10632	<split-s>	<split-s>
10664	10632	<split-h>	<split-h>
10664	10632	<name2>	<name2>
10664	10635	<aphaerese>	<aphaerese>
10664	10662	<>	<aphaerese>
10664	10632	<elision3>	<elision3>
10664	10662	<>	<elision3>
10664	10632	<elision2>	<elision2>
10664	10662	<>	<elision2>
10664	10632	<elision1>	<elision1>
10664	10662	<>	<elision1>
10664	10629	.	υ
10664	10629	.	u
10664	10629	.	α
10664	10629	.	a
10664	10665	<split-h>	<>
10665	10666	<>	<aphaerese>
10665	10666	<>	<elision3>
10665	10666	<>	<elision2>
10665	10666	<>	<elision1>
10665	10366	<3s>	<>
10666	10667	<>	<name>
10666	10666	<>	<aphaerese>
10666	10666	<>	<elision3>
10666	10666	<>	<elision2>
10666	10666	<>	<elision1>
10666	10367	<3s>	<>
10667	10665	<>	<aphaerese>
10667	10665	<>	<elision3>
10667	10665	<>	<elision2>
10667	10665	<>	<elision1>
10667	10368	<3s>	<>
10668	10669	<>	<aphaerese>
10668	10669	<>	<elision3>
10668	10669	<>	<elision2>
10668	10669	<>	<elision1>
10668	10402	<3s>	<>
10669	10670	<>	<name>
10669	10669	<>	<aphaerese>
10669	10669	<>	<elision3>
10669	10669	<>	<elision2>
10669	10669	<>	<elision1>
10669	10403	<3s>	<>
10670	10668	<>	<aphaerese>
10670	10668	<>	<elision3>
10670	10668	<>	<elision2>
10670	10668	<>	<elision1>
10670	10404	<3s>	<>
10671	10672	<>	<aphaerese>
10671	10672	<>	<elision3>
10671	10672	<>	<elision2>
10671	10672	<>	<elision1>
10671	10411	<3s>	<>
10672	10673	<>	<name>
10672	10672	<>	<aphaerese>
10672	10672	<>	<elision3>
10672	10672	<>	<elision2>
10672	10672	<>	<elision1>
10672	10412	<3s>	<>
10673	10671	<>	<aphaerese>
10673	10671	<>	<elision3>
10673	10671	<>	<elision2>
10673	10671	<>	<elision1>
10673	10413	<3s>	<>
10674	10675	<>	<name>
10674	10674	<>	<aphaerese>
10674	10674	<>	<elision3>
10674	10674	<>	<elision2>
10674	10674	<>	<elision1>
10674	10677	.	κ
10674	10677	.	λ
10674	10690	<split-h>	<>
10675	10676	<>	<aphaerese>
10675	10676	<>	<elision3>
10675	10676	<>	<elision2>
10675	10676	<>	<elision1>
10675	10679	.	κ
10675	10679	.	λ
10675	10691	<split-h>	<>
10676	10674	<>	<aphaerese>
10676	10674	<>	<elision3>
10676	10674	<>	<elision2>
10676	10674	<>	<elision1>
10676	10677	.	κ
10676	10677	.	λ
10676	10689	<split-h>	<>
10677	10678	<>	<name>
10677	10677	<>	<aphaerese>
10677	10680	<elision3>	<elision3>
10677	10677	<>	<elision3>
10677	10680	<elision2>	<elision2>
10677	10677	<>	<elision2>
10677	10680	<elision1>	<elision1>
10677	10677	<>	<elision1>
10677	10687	<split-h>	<>
10678	10679	<>	<aphaerese>
10678	10682	<elision3>	<elision3>
10678	10679	<>	<elision3>
10678	10682	<elision2>	<elision2>
10678	10679	<>	<elision2>
10678	10682	<elision1>	<elision1>
10678	10679	<>	<elision1>
10678	10688	<split-h>	<>
10679	10677	<>	<aphaerese>
10679	10680	<elision3>	<elision3>
10679	10677	<>	<elision3>
10679	10680	<elision2>	<elision2>
10679	10677	<>	<elision2>
10679	10680	<elision1>	<elision1>
10679	10677	<>	<elision1>
10679	10686	<split-h>	<>
10680	10681	<>	<name>
10680	10680	<>	<aphaerese>
10680	10680	<>	<elision3>
10680	10680	<>	<elision2>
10680	10680	<>	<elision1>
10680	10638	.	κ
10680	10684	<split-h>	<>
10681	10682	<>	<aphaerese>
10681	10682	<>	<elision3>
10681	10682	<>	<elision2>
10681	10682	<>	<elision1>
10681	10640	.	κ
10681	10685	<split-h>	<>
10682	10680	<>	<aphaerese>
10682	10680	<>	<elision3>
10682	10680	<>	<elision2>
10682	10680	<>	<elision1>
10682	10638	.	κ
10682	10683	<split-h>	<>
10683	10684	<>	<aphaerese>
10683	10684	<>	<elision3>
10683	10684	<>	<elision2>
10683	10684	<>	<elision1>
10683	10429	<3s>	<>
10684	10685	<>	<name>
10684	10684	<>	<aphaerese>
10684	10684	<>	<elision3>
10684	10684	<>	<elision2>
10684	10684	<>	<elision1>
10684	10430	<3s>	<>
10685	10683	<>	<aphaerese>
10685	10683	<>	<elision3>
10685	10683	<>	<elision2>
10685	10683	<>	<elision1>
10685	10431	<3s>	<>
10686	10687	<>	<aphaerese>
10686	10687	<>	<elision3>
10686	10687	<>	<elision2>
10686	10687	<>	<elision1>
10686	10435	<3s>	<>
10687	10688	<>	<name>
10687	10687	<>	<aphaerese>
10687	10687	<>	<elision3>
10687	10687	<>	<elision2>
10687	10687	<>	<elision1>
10687	10436	<3s>	<>
10688	10686	<>	<aphaerese>
10688	10686	<>	<elision3>
10688	10686	<>	<elision2>
10688	10686	<>	<elision1>
10688	10437	<3s>	<>
10689	10690	<>	<aphaerese>
10689	10690	<>	<elision3>
10689	10690	<>	<elision2>
10689	10690	<>	<elision1>
10689	10444	<3s>	<>
10690	10691	<>	<name>
10690	10690	<>	<aphaerese>
10690	10690	<>	<elision3>
10690	10690	<>	<elision2>
10690	10690	<>	<elision1>
10690	10445	<3s>	<>
10691	10689	<>	<aphaerese>
10691	10689	<>	<elision3>
10691	10689	<>	<elision2>
10691	10689	<>	<elision1>
10691	10446	<3s>	<>
10692	10632	.	.
10692	10632	 	 
10692	10632	<~>	<~>
10692	10632	<split-s>	<split-s>
10692	10632	<split-h>	<split-h>
10692	10632	<name2>	<name2>
10692	10693	<>	<name>
10692	10635	<aphaerese>	<aphaerese>
10692	10692	<>	<aphaerese>
10692	10632	<elision3>	<elision3>
10692	10692	<>	<elision3>
10692	10632	<elision2>	<elision2>
10692	10692	<>	<elision2>
10692	10632	<elision1>	<elision1>
10692	10692	<>	<elision1>
10692	10629	.	υ
10692	10629	.	u
10692	10629	.	α
10692	10629	.	a
10692	10696	<split-h>	<>
10693	10634	.	.
10693	10634	 	 
10693	10634	<~>	<~>
10693	10634	<split-s>	<split-s>
10693	10634	<split-h>	<split-h>
10693	10634	<name2>	<name2>
10693	10637	<aphaerese>	<aphaerese>
10693	10694	<>	<aphaerese>
10693	10634	<elision3>	<elision3>
10693	10694	<>	<elision3>
10693	10634	<elision2>	<elision2>
10693	10694	<>	<elision2>
10693	10634	<elision1>	<elision1>
10693	10694	<>	<elision1>
10693	10631	.	υ
10693	10631	.	u
10693	10631	.	α
10693	10631	.	a
10693	10697	<split-h>	<>
10694	10632	.	.
10694	10632	 	 
10694	10632	<~>	<~>
10694	10632	<split-s>	<split-s>
10694	10632	<split-h>	<split-h>
10694	10632	<name2>	<name2>
10694	10635	<aphaerese>	<aphaerese>
10694	10692	<>	<aphaerese>
10694	10632	<elision3>	<elision3>
10694	10692	<>	<elision3>
10694	10632	<elision2>	<elision2>
10694	10692	<>	<elision2>
10694	10632	<elision1>	<elision1>
10694	10692	<>	<elision1>
10694	10629	.	υ
10694	10629	.	u
10694	10629	.	α
10694	10629	.	a
10694	10695	<split-h>	<>
10695	10696	<>	<aphaerese>
10695	10696	<>	<elision3>
10695	10696	<>	<elision2>
10695	10696	<>	<elision1>
10695	10456	<3s>	<>
10696	10697	<>	<name>
10696	10696	<>	<aphaerese>
10696	10696	<>	<elision3>
10696	10696	<>	<elision2>
10696	10696	<>	<elision1>
10696	10457	<3s>	<>
10697	10695	<>	<aphaerese>
10697	10695	<>	<elision3>
10697	10695	<>	<elision2>
10697	10695	<>	<elision1>
10697	10458	<3s>	<>
10698	10462	<3s>	<>
10699	10632	.	.
10699	10632	 	 
10699	10632	<~>	<~>
10699	10632	<split-s>	<split-s>
10699	10632	<split-h>	<split-h>
10699	10632	<name2>	<name2>
10699	10700	<name2>	<name>
10699	10693	<>	<name>
10699	10635	<aphaerese>	<aphaerese>
10699	10692	<>	<aphaerese>
10699	10632	<elision3>	<elision3>
10699	10692	<>	<elision3>
10699	10632	<elision2>	<elision2>
10699	10692	<>	<elision2>
10699	10632	<elision1>	<elision1>
10699	10692	<>	<elision1>
10699	10629	.	υ
10699	10629	.	u
10699	10629	.	α
10699	10629	.	a
10699	10701	<split-h>	<>
10700	10652	<split-h>	<>
10701	10697	<>	<name>
10701	10696	<>	<aphaerese>
10701	10696	<>	<elision3>
10701	10696	<>	<elision2>
10701	10696	<>	<elision1>
10701	10466	<3s>	<>
10702	10632	.	.
10702	10632	 	 
10702	10632	<~>	<~>
10702	10632	<split-s>	<split-s>
10702	10632	<split-h>	<split-h>
10702	10632	<name2>	<name2>
10702	10703	<>	<name>
10702	10635	<aphaerese>	<aphaerese>
10702	10702	<>	<aphaerese>
10702	10702	<>	<elision3>
10702	10702	<>	<elision2>
10702	10702	<>	<elision1>
10702	10629	.	υ
10702	10629	.	u
10702	10638	.	κ
10702	10629	.	α
10702	10629	.	a
10702	10541	<split-h>	<>
10703	10634	.	.
10703	10634	 	 
10703	10634	<~>	<~>
10703	10634	<split-s>	<split-s>
10703	10634	<split-h>	<split-h>
10703	10634	<name2>	<name2>
10703	10637	<aphaerese>	<aphaerese>
10703	10704	<>	<aphaerese>
10703	10704	<>	<elision3>
10703	10704	<>	<elision2>
10703	10704	<>	<elision1>
10703	10631	.	υ
10703	10631	.	u
10703	10640	.	κ
10703	10631	.	α
10703	10631	.	a
10703	10542	<split-h>	<>
10704	10632	.	.
10704	10632	 	 
10704	10632	<~>	<~>
10704	10632	<split-s>	<split-s>
10704	10632	<split-h>	<split-h>
10704	10632	<name2>	<name2>
10704	10635	<aphaerese>	<aphaerese>
10704	10702	<>	<aphaerese>
10704	10702	<>	<elision3>
10704	10702	<>	<elision2>
10704	10702	<>	<elision1>
10704	10629	.	υ
10704	10629	.	u
10704	10638	.	κ
10704	10629	.	α
10704	10629	.	a
10704	10540	<split-h>	<>
10705	10706	<>	<name>
10705	10705	<>	<aphaerese>
10705	10705	<>	<elision3>
10705	10705	<>	<elision2>
10705	10705	<>	<elision1>
10705	10632	<A2kl>	<>
10706	10707	<>	<aphaerese>
10706	10707	<>	<elision3>
10706	10707	<>	<elision2>
10706	10707	<>	<elision1>
10706	10633	<A2kl>	<>
10707	10705	<>	<aphaerese>
10707	10705	<>	<elision3>
10707	10705	<>	<elision2>
10707	10705	<>	<elision1>
10707	10634	<A2kl>	<>
10708	9962	.	.
10708	9963	 	 
10708	9962	<~>	<~>
10708	9962	<split-s>	<split-s>
10708	9962	<split-h>	<split-h>
10708	9962	<name2>	<name2>
10708	10709	<>	<name>
10708	9966	<aphaerese>	<aphaerese>
10708	10708	<>	<aphaerese>
10708	9962	<elision3>	<elision3>
10708	10708	<>	<elision3>
10708	9962	<elision2>	<elision2>
10708	10708	<>	<elision2>
10708	9962	<elision1>	<elision1>
10708	10708	<>	<elision1>
10708	9970	.	υ
10708	9976	s	υ
10708	9970	.	u
10708	9976	s	u
10708	9970	.	κ
10708	10552	s	κ
10708	10338	s	k
10708	10347	s	U
10708	10513	s	K
10708	9970	.	α
10708	9976	s	α
10708	9970	.	a
10708	9976	s	a
10708	10468	s	A
10708	9970	.	λ
10708	10552	s	λ
10708	10338	s	l
10708	10526	s	L
10708	10645	<split-h>	<>
10709	9965	.	.
10709	9968	 	 
10709	9965	<~>	<~>
10709	9965	<split-s>	<split-s>
10709	9965	<split-h>	<split-h>
10709	9965	<name2>	<name2>
10709	10512	<aphaerese>	<aphaerese>
10709	10710	<>	<aphaerese>
10709	9965	<elision3>	<elision3>
10709	10710	<>	<elision3>
10709	9965	<elision2>	<elision2>
10709	10710	<>	<elision2>
10709	9965	<elision1>	<elision1>
10709	10710	<>	<elision1>
10709	9972	.	υ
10709	10148	s	υ
10709	9972	.	u
10709	10148	s	u
10709	9972	.	κ
10709	10554	s	κ
10709	10340	s	k
10709	10349	s	U
10709	10515	s	K
10709	9972	.	α
10709	10148	s	α
10709	9972	.	a
10709	10148	s	a
10709	10470	s	A
10709	9972	.	λ
10709	10554	s	λ
10709	10340	s	l
10709	10528	s	L
10709	10646	<split-h>	<>
10710	9962	.	.
10710	9963	 	 
10710	9962	<~>	<~>
10710	9962	<split-s>	<split-s>
10710	9962	<split-h>	<split-h>
10710	9962	<name2>	<name2>
10710	9966	<aphaerese>	<aphaerese>
10710	10708	<>	<aphaerese>
10710	9962	<elision3>	<elision3>
10710	10708	<>	<elision3>
10710	9962	<elision2>	<elision2>
10710	10708	<>	<elision2>
10710	9962	<elision1>	<elision1>
10710	10708	<>	<elision1>
10710	9970	.	υ
10710	9976	s	υ
10710	9970	.	u
10710	9976	s	u
10710	9970	.	κ
10710	10552	s	κ
10710	10338	s	k
10710	10347	s	U
10710	10513	s	K
10710	9970	.	α
10710	9976	s	α
10710	9970	.	a
10710	9976	s	a
10710	10468	s	A
10710	9970	.	λ
10710	10552	s	λ
10710	10338	s	l
10710	10526	s	L
10710	10644	<split-h>	<>
10711	10632	.	.
10711	10632	 	 
10711	10632	<~>	<~>
10711	10632	<split-s>	<split-s>
10711	10632	<split-h>	<split-h>
10711	10632	<name2>	<name2>
10711	10712	<>	<name>
10711	10635	<aphaerese>	<aphaerese>
10711	10711	<>	<aphaerese>
10711	10632	<elision3>	<elision3>
10711	10711	<>	<elision3>
10711	10632	<elision2>	<elision2>
10711	10711	<>	<elision2>
10711	10632	<elision1>	<elision1>
10711	10711	<>	<elision1>
10711	10629	.	υ
10711	10629	.	u
10711	10629	.	κ
10711	10629	.	α
10711	10629	.	a
10711	10629	.	λ
10711	10645	<split-h>	<>
10712	10634	.	.
10712	10634	 	 
10712	10634	<~>	<~>
10712	10634	<split-s>	<split-s>
10712	10634	<split-h>	<split-h>
10712	10634	<name2>	<name2>
10712	10637	<aphaerese>	<aphaerese>
10712	10713	<>	<aphaerese>
10712	10634	<elision3>	<elision3>
10712	10713	<>	<elision3>
10712	10634	<elision2>	<elision2>
10712	10713	<>	<elision2>
10712	10634	<elision1>	<elision1>
10712	10713	<>	<elision1>
10712	10631	.	υ
10712	10631	.	u
10712	10631	.	κ
10712	10631	.	α
10712	10631	.	a
10712	10631	.	λ
10712	10646	<split-h>	<>
10713	10632	.	.
10713	10632	 	 
10713	10632	<~>	<~>
10713	10632	<split-s>	<split-s>
10713	10632	<split-h>	<split-h>
10713	10632	<name2>	<name2>
10713	10635	<aphaerese>	<aphaerese>
10713	10711	<>	<aphaerese>
10713	10632	<elision3>	<elision3>
10713	10711	<>	<elision3>
10713	10632	<elision2>	<elision2>
10713	10711	<>	<elision2>
10713	10632	<elision1>	<elision1>
10713	10711	<>	<elision1>
10713	10629	.	υ
10713	10629	.	u
10713	10629	.	κ
10713	10629	.	α
10713	10629	.	a
10713	10629	.	λ
10713	10644	<split-h>	<>
10714	10700	<name>	<name>
10714	10715	<>	<name>
10714	10717	<>	<aphaerese>
10714	10717	<>	<elision3>
10714	10717	<>	<elision2>
10714	10717	<>	<elision1>
10714	10698	<split-h>	<>
10714	10656	<A2kl>	<>
10714	10724	<L2kl>	<>
10715	10716	<>	<aphaerese>
10715	10716	<>	<elision3>
10715	10716	<>	<elision2>
10715	10716	<>	<elision1>
10715	10657	<A2kl>	<>
10715	10719	<L2kl>	<>
10716	10717	<>	<aphaerese>
10716	10717	<>	<elision3>
10716	10717	<>	<elision2>
10716	10717	<>	<elision1>
10716	10658	<A2kl>	<>
10716	10720	<L2kl>	<>
10717	10715	<>	<name>
10717	10717	<>	<aphaerese>
10717	10717	<>	<elision3>
10717	10717	<>	<elision2>
10717	10717	<>	<elision1>
10717	10656	<A2kl>	<>
10717	10718	<L2kl>	<>
10718	10632	.	.
10718	10632	 	 
10718	10632	<~>	<~>
10718	10632	<split-s>	<split-s>
10718	10632	<split-h>	<split-h>
10718	10632	<name2>	<name2>
10718	10719	<>	<name>
10718	10635	<aphaerese>	<aphaerese>
10718	10718	<>	<aphaerese>
10718	10632	<elision3>	<elision3>
10718	10718	<>	<elision3>
10718	10632	<elision2>	<elision2>
10718	10718	<>	<elision2>
10718	10632	<elision1>	<elision1>
10718	10718	<>	<elision1>
10718	10629	.	υ
10718	10629	.	u
10718	10677	.	κ
10718	10629	.	α
10718	10629	.	a
10718	10677	.	λ
10718	10722	<split-h>	<>
10719	10634	.	.
10719	10634	 	 
10719	10634	<~>	<~>
10719	10634	<split-s>	<split-s>
10719	10634	<split-h>	<split-h>
10719	10634	<name2>	<name2>
10719	10637	<aphaerese>	<aphaerese>
10719	10720	<>	<aphaerese>
10719	10634	<elision3>	<elision3>
10719	10720	<>	<elision3>
10719	10634	<elision2>	<elision2>
10719	10720	<>	<elision2>
10719	10634	<elision1>	<elision1>
10719	10720	<>	<elision1>
10719	10631	.	υ
10719	10631	.	u
10719	10679	.	κ
10719	10631	.	α
10719	10631	.	a
10719	10679	.	λ
10719	10723	<split-h>	<>
10720	10632	.	.
10720	10632	 	 
10720	10632	<~>	<~>
10720	10632	<split-s>	<split-s>
10720	10632	<split-h>	<split-h>
10720	10632	<name2>	<name2>
10720	10635	<aphaerese>	<aphaerese>
10720	10718	<>	<aphaerese>
10720	10632	<elision3>	<elision3>
10720	10718	<>	<elision3>
10720	10632	<elision2>	<elision2>
10720	10718	<>	<elision2>
10720	10632	<elision1>	<elision1>
10720	10718	<>	<elision1>
10720	10629	.	υ
10720	10629	.	u
10720	10677	.	κ
10720	10629	.	α
10720	10629	.	a
10720	10677	.	λ
10720	10721	<split-h>	<>
10721	10722	<>	<aphaerese>
10721	10722	<>	<elision3>
10721	10722	<>	<elision2>
10721	10722	<>	<elision1>
10721	10478	<3s>	<>
10722	10723	<>	<name>
10722	10722	<>	<aphaerese>
10722	10722	<>	<elision3>
10722	10722	<>	<elision2>
10722	10722	<>	<elision1>
10722	10479	<3s>	<>
10723	10721	<>	<aphaerese>
10723	10721	<>	<elision3>
10723	10721	<>	<elision2>
10723	10721	<>	<elision1>
10723	10480	<3s>	<>
10724	10632	.	.
10724	10632	 	 
10724	10632	<~>	<~>
10724	10632	<split-s>	<split-s>
10724	10632	<split-h>	<split-h>
10724	10632	<name2>	<name2>
10724	10700	<name2>	<name>
10724	10719	<>	<name>
10724	10635	<aphaerese>	<aphaerese>
10724	10718	<>	<aphaerese>
10724	10632	<elision3>	<elision3>
10724	10718	<>	<elision3>
10724	10632	<elision2>	<elision2>
10724	10718	<>	<elision2>
10724	10632	<elision1>	<elision1>
10724	10718	<>	<elision1>
10724	10629	.	υ
10724	10629	.	u
10724	10677	.	κ
10724	10629	.	α
10724	10629	.	a
10724	10677	.	λ
10724	10725	<split-h>	<>
10725	10723	<>	<name>
10725	10722	<>	<aphaerese>
10725	10722	<>	<elision3>
10725	10722	<>	<elision2>
10725	10722	<>	<elision1>
10725	10485	<3s>	<>
10726	9962	.	.
10726	9963	 	 
10726	9962	<~>	<~>
10726	9962	<split-s>	<split-s>
10726	9962	<split-h>	<split-h>
10726	9962	<name2>	<name2>
10726	10538	<>	<name>
10726	9966	<aphaerese>	<aphaerese>
10726	9961	<>	<aphaerese>
10726	9961	<>	<elision3>
10726	9961	<>	<elision2>
10726	9961	<>	<elision1>
10726	9970	.	υ
10726	9976	s	υ
10726	9970	.	u
10726	9976	s	u
10726	10155	.	κ
10726	10226	s	κ
10726	10338	s	k
10726	10347	s	U
10726	10513	s	K
10726	9970	.	α
10726	9976	s	α
10726	9970	.	a
10726	9976	s	a
10726	10468	s	A
10726	10338	s	λ
10726	10338	s	l
10726	10526	s	L
10726	10727	<split-h>	<>
10727	10542	<>	<name>
10727	10541	<>	<aphaerese>
10727	10541	<>	<elision3>
10727	10541	<>	<elision2>
10727	10541	<>	<elision1>
10727	10491	<3s>	<>
10728	9962	.	.
10728	9963	 	 
10728	9962	<~>	<~>
10728	9962	<split-s>	<split-s>
10728	9962	<split-h>	<split-h>
10728	9962	<name2>	<name2>
10728	10574	<>	<name>
10728	9966	<aphaerese>	<aphaerese>
10728	10573	<>	<aphaerese>
10728	10576	<elision3>	<elision3>
10728	10573	<>	<elision3>
10728	10576	<elision2>	<elision2>
10728	10573	<>	<elision2>
10728	10576	<elision1>	<elision1>
10728	10573	<>	<elision1>
10728	9970	.	υ
10728	9976	s	υ
10728	9970	.	u
10728	9976	s	u
10728	9970	.	κ
10728	10552	s	κ
10728	10338	s	k
10728	10347	s	U
10728	10513	s	K
10728	9970	.	α
10728	9976	s	α
10728	9970	.	a
10728	9976	s	a
10728	10468	s	A
10728	9970	.	λ
10728	10552	s	λ
10728	10338	s	l
10728	10526	s	L
10728	10729	<split-h>	<>
10729	10625	<>	<name>
10729	10624	<>	<aphaerese>
10729	10624	<>	<elision3>
10729	10624	<>	<elision2>
10729	10624	<>	<elision1>
10729	10494	<3s>	<>
10730	9962	.	.
10730	9963	 	 
10730	9962	<~>	<~>
10730	9962	<split-s>	<split-s>
10730	9962	<split-h>	<split-h>
10730	9962	<name2>	<name2>
10730	10627	<>	<name>
10730	9966	<aphaerese>	<aphaerese>
10730	10626	<>	<aphaerese>
10730	9962	<elision3>	<elision3>
10730	10626	<>	<elision3>
10730	9962	<elision2>	<elision2>
10730	10626	<>	<elision2>
10730	9962	<elision1>	<elision1>
10730	10626	<>	<elision1>
10730	9970	.	υ
10730	9976	s	υ
10730	9970	.	u
10730	9976	s	u
10730	10629	.	κ
10730	10552	s	κ
10730	10338	s	k
10730	10347	s	U
10730	10513	s	K
10730	9970	.	α
10730	9976	s	α
10730	9970	.	a
10730	9976	s	a
10730	10468	s	A
10730	10629	.	λ
10730	10552	s	λ
10730	10338	s	l
10730	10526	s	L
10730	10731	<split-h>	<>
10731	10646	<>	<name>
10731	10645	<>	<aphaerese>
10731	10645	<>	<elision3>
10731	10645	<>	<elision2>
10731	10645	<>	<elision1>
10731	10497	<3s>	<>
10732	10648	<>	<name>
10732	10647	<>	<aphaerese>
10732	10647	<>	<elision3>
10732	10647	<>	<elision2>
10732	10647	<>	<elision1>
10732	10733	<U2kl>	<>
10733	10632	.	.
10733	10632	 	 
10733	10632	<~>	<~>
10733	10632	<split-s>	<split-s>
10733	10632	<split-h>	<split-h>
10733	10632	<name2>	<name2>
10733	10633	<>	<name>
10733	10635	<aphaerese>	<aphaerese>
10733	10632	<>	<aphaerese>
10733	10632	<elision3>	<elision3>
10733	10632	<>	<elision3>
10733	10632	<elision2>	<elision2>
10733	10632	<>	<elision2>
10733	10632	<elision1>	<elision1>
10733	10632	<>	<elision1>
10733	10629	.	υ
10733	10629	.	u
10733	10638	.	κ
10733	10629	.	α
10733	10629	.	a
10733	10734	<split-h>	<>
10734	10488	<>	<name>
10734	10487	<>	<aphaerese>
10734	10487	<>	<elision3>
10734	10487	<>	<elision2>
10734	10487	<>	<elision1>
10734	10501	<3s>	<>
10735	10651	<name>	<name>
10735	10653	<>	<name>
10735	10655	<>	<aphaerese>
10735	10655	<>	<elision3>
10735	10655	<>	<elision2>
10735	10655	<>	<elision1>
10735	10698	<split-h>	<>
10735	10656	<A2kl>	<>
10735	10674	<L2kl>	<>
10735	10736	<K2kl>	<>
10736	10632	.	.
10736	10632	 	 
10736	10632	<~>	<~>
10736	10632	<split-s>	<split-s>
10736	10632	<split-h>	<split-h>
10736	10632	<name2>	<name2>
10736	10700	<name2>	<name>
10736	10693	<>	<name>
10736	10635	<aphaerese>	<aphaerese>
10736	10692	<>	<aphaerese>
10736	10632	<elision3>	<elision3>
10736	10692	<>	<elision3>
10736	10632	<elision2>	<elision2>
10736	10692	<>	<elision2>
10736	10632	<elision1>	<elision1>
10736	10692	<>	<elision1>
10736	10629	.	υ
10736	10629	.	u
10736	10629	.	α
10736	10629	.	a
10736	10737	<split-h>	<>
10737	10697	<>	<name>
10737	10696	<>	<aphaerese>
10737	10696	<>	<elision3>
10737	10696	<>	<elision2>
10737	10696	<>	<elision1>
10737	10505	<3s>	<>
10738	10632	.	.
10738	10632	 	 
10738	10632	<~>	<~>
10738	10632	<split-s>	<split-s>
10738	10632	<split-h>	<split-h>
10738	10632	<name2>	<name2>
10738	10703	<>	<name>
10738	10635	<aphaerese>	<aphaerese>
10738	10702	<>	<aphaerese>
10738	10702	<>	<elision3>
10738	10702	<>	<elision2>
10738	10702	<>	<elision1>
10738	10629	.	υ
10738	10629	.	u
10738	10638	.	κ
10738	10629	.	α
10738	10629	.	a
10738	10727	<split-h>	<>
10739	10706	<>	<name>
10739	10705	<>	<aphaerese>
10739	10705	<>	<elision3>
10739	10705	<>	<elision2>
10739	10705	<>	<elision1>
10739	10733	<A2kl>	<>
10740	9962	.	.
10740	9963	 	 
10740	9962	<~>	<~>
10740	9962	<split-s>	<split-s>
10740	9962	<split-h>	<split-h>
10740	9962	<name2>	<name2>
10740	10709	<>	<name>
10740	9966	<aphaerese>	<aphaerese>
10740	10708	<>	<aphaerese>
10740	9962	<elision3>	<elision3>
10740	10708	<>	<elision3>
10740	9962	<elision2>	<elision2>
10740	10708	<>	<elision2>
10740	9962	<elision1>	<elision1>
10740	10708	<>	<elision1>
10740	9970	.	υ
10740	9976	s	υ
10740	9970	.	u
10740	9976	s	u
10740	9970	.	κ
10740	10552	s	κ
10740	10338	s	k
10740	10347	s	U
10740	10513	s	K
10740	9970	.	α
10740	9976	s	α
10740	9970	.	a
10740	9976	s	a
10740	10468	s	A
10740	9970	.	λ
10740	10552	s	λ
10740	10338	s	l
10740	10526	s	L
10740	10731	<split-h>	<>
10741	10632	.	.
10741	10632	 	 
10741	10632	<~>	<~>
10741	10632	<split-s>	<split-s>
10741	10632	<split-h>	<split-h>
10741	10632	<name2>	<name2>
10741	10712	<>	<name>
10741	10635	<aphaerese>	<aphaerese>
10741	10711	<>	<aphaerese>
10741	10632	<elision3>	<elision3>
10741	10711	<>	<elision3>
10741	10632	<elision2>	<elision2>
10741	10711	<>	<elision2>
10741	10632	<elision1>	<elision1>
10741	10711	<>	<elision1>
10741	10629	.	υ
10741	10629	.	u
10741	10629	.	κ
10741	10629	.	α
10741	10629	.	a
10741	10629	.	λ
10741	10731	<split-h>	<>
10742	10700	<name>	<name>
10742	10715	<>	<name>
10742	10717	<>	<aphaerese>
10742	10717	<>	<elision3>
10742	10717	<>	<elision2>
10742	10717	<>	<elision1>
10742	10698	<split-h>	<>
10742	10656	<A2kl>	<>
10742	10743	<L2kl>	<>
10743	10632	.	.
10743	10632	 	 
10743	10632	<~>	<~>
10743	10632	<split-s>	<split-s>
10743	10632	<split-h>	<split-h>
10743	10632	<name2>	<name2>
10743	10700	<name2>	<name>
10743	10719	<>	<name>
10743	10635	<aphaerese>	<aphaerese>
10743	10718	<>	<aphaerese>
10743	10632	<elision3>	<elision3>
10743	10718	<>	<elision3>
10743	10632	<elision2>	<elision2>
10743	10718	<>	<elision2>
10743	10632	<elision1>	<elision1>
10743	10718	<>	<elision1>
10743	10629	.	υ
10743	10629	.	u
10743	10677	.	κ
10743	10629	.	α
10743	10629	.	a
10743	10677	.	λ
10743	10744	<split-h>	<>
10744	10723	<>	<name>
10744	10722	<>	<aphaerese>
10744	10722	<>	<elision3>
10744	10722	<>	<elision2>
10744	10722	<>	<elision1>
10744	10510	<3s>	<>
10745	56	.	.
10745	57	 	 
10745	56	<~>	<~>
10745	56	<split-s>	<split-s>
10745	56	<split-h>	<split-h>
10745	56	<name2>	<name2>
10745	60	<aphaerese>	<aphaerese>
10745	60	<>	<aphaerese>
10745	56	<elision3>	<elision3>
10745	60	<>	<elision3>
10745	56	<elision2>	<elision2>
10745	60	<>	<elision2>
10745	56	<elision1>	<elision1>
10745	60	<>	<elision1>
10745	56	.	υ
10745	56	.	u
10745	10543	.	κ
10745	10573	s	κ
10745	10626	s	k
10745	10647	s	U
10745	10746	s	K
10745	56	.	α
10745	56	.	a
10745	10705	s	A
10745	10708	s	λ
10745	10711	s	l
10745	10756	s	L
10745	10131	<2s>	<>
10746	10651	<name>	<name>
10746	10747	<>	<name>
10746	10749	<>	<aphaerese>
10746	10749	<>	<elision3>
10746	10749	<>	<elision2>
10746	10749	<>	<elision1>
10746	10698	<split-h>	<>
10746	10750	<L2kl>	<>
10746	10699	<K2kl>	<>
10747	10748	<>	<aphaerese>
10747	10748	<>	<elision3>
10747	10748	<>	<elision2>
10747	10748	<>	<elision1>
10747	10751	<L2kl>	<>
10747	10693	<K2kl>	<>
10748	10749	<>	<aphaerese>
10748	10749	<>	<elision3>
10748	10749	<>	<elision2>
10748	10749	<>	<elision1>
10748	10752	<L2kl>	<>
10748	10694	<K2kl>	<>
10749	10747	<>	<name>
10749	10749	<>	<aphaerese>
10749	10749	<>	<elision3>
10749	10749	<>	<elision2>
10749	10749	<>	<elision1>
10749	10750	<L2kl>	<>
10749	10692	<K2kl>	<>
10750	10751	<>	<name>
10750	10750	<>	<aphaerese>
10750	10750	<>	<elision3>
10750	10750	<>	<elision2>
10750	10750	<>	<elision1>
10750	10629	.	κ
10750	10629	.	λ
10750	10754	<split-h>	<>
10751	10752	<>	<aphaerese>
10751	10752	<>	<elision3>
10751	10752	<>	<elision2>
10751	10752	<>	<elision1>
10751	10631	.	κ
10751	10631	.	λ
10751	10755	<split-h>	<>
10752	10750	<>	<aphaerese>
10752	10750	<>	<elision3>
10752	10750	<>	<elision2>
10752	10750	<>	<elision1>
10752	10629	.	κ
10752	10629	.	λ
10752	10753	<split-h>	<>
10753	10754	<>	<aphaerese>
10753	10754	<>	<elision3>
10753	10754	<>	<elision2>
10753	10754	<>	<elision1>
10753	10520	<3s>	<>
10754	10755	<>	<name>
10754	10754	<>	<aphaerese>
10754	10754	<>	<elision3>
10754	10754	<>	<elision2>
10754	10754	<>	<elision1>
10754	10521	<3s>	<>
10755	10753	<>	<aphaerese>
10755	10753	<>	<elision3>
10755	10753	<>	<elision2>
10755	10753	<>	<elision1>
10755	10522	<3s>	<>
10756	10700	<name>	<name>
10756	10757	<>	<name>
10756	10759	<>	<aphaerese>
10756	10759	<>	<elision3>
10756	10759	<>	<elision2>
10756	10759	<>	<elision1>
10756	10698	<split-h>	<>
10756	10760	<L2kl>	<>
10757	10758	<>	<aphaerese>
10757	10758	<>	<elision3>
10757	10758	<>	<elision2>
10757	10758	<>	<elision1>
10757	10712	<L2kl>	<>
10758	10759	<>	<aphaerese>
10758	10759	<>	<elision3>
10758	10759	<>	<elision2>
10758	10759	<>	<elision1>
10758	10713	<L2kl>	<>
10759	10757	<>	<name>
10759	10759	<>	<aphaerese>
10759	10759	<>	<elision3>
10759	10759	<>	<elision2>
10759	10759	<>	<elision1>
10759	10711	<L2kl>	<>
10760	10632	.	.
10760	10632	 	 
10760	10632	<~>	<~>
10760	10632	<split-s>	<split-s>
10760	10632	<split-h>	<split-h>
10760	10632	<name2>	<name2>
10760	10700	<name2>	<name>
10760	10712	<>	<name>
10760	10635	<aphaerese>	<aphaerese>
10760	10711	<>	<aphaerese>
10760	10632	<elision3>	<elision3>
10760	10711	<>	<elision3>
10760	10632	<elision2>	<elision2>
10760	10711	<>	<elision2>
10760	10632	<elision1>	<elision1>
10760	10711	<>	<elision1>
10760	10629	.	υ
10760	10629	.	u
10760	10629	.	κ
10760	10629	.	α
10760	10629	.	a
10760	10629	.	λ
10760	10761	<split-h>	<>
10761	10646	<>	<name>
10761	10645	<>	<aphaerese>
10761	10645	<>	<elision3>
10761	10645	<>	<elision2>
10761	10645	<>	<elision1>
10761	10531	<3s>	<>
10762	56	.	.
10762	57	 	 
10762	56	<~>	<~>
10762	56	<split-s>	<split-s>
10762	56	<split-h>	<split-h>
10762	56	<name2>	<name2>
10762	60	<aphaerese>	<aphaerese>
10762	63	<>	<aphaerese>
10762	56	<elision3>	<elision3>
10762	63	<>	<elision3>
10762	56	<elision2>	<elision2>
10762	63	<>	<elision2>
10762	56	<elision1>	<elision1>
10762	63	<>	<elision1>
10762	64	.	υ
10762	9961	s	υ
10762	64	.	u
10762	9961	s	u
10762	10543	.	κ
10762	10573	s	κ
10762	10626	s	k
10762	10647	s	U
10762	10650	s	K
10762	64	.	α
10762	10702	s	α
10762	64	.	a
10762	10702	s	a
10762	10705	s	A
10762	10708	s	λ
10762	10711	s	l
10762	10714	s	L
10762	10144	<2s>	<>
10763	59	.	.
10763	62	 	 
10763	59	<~>	<~>
10763	59	<split-s>	<split-s>
10763	59	<split-h>	<split-h>
10763	59	<name2>	<name2>
10763	10745	<aphaerese>	<aphaerese>
10763	59	<>	<aphaerese>
10763	59	<elision3>	<elision3>
10763	59	<>	<elision3>
10763	59	<elision2>	<elision2>
10763	59	<>	<elision2>
10763	59	<elision1>	<elision1>
10763	59	<>	<elision1>
10763	66	.	υ
10763	10539	s	υ
10763	66	.	u
10763	10539	s	u
10763	10545	.	κ
10763	10575	s	κ
10763	10628	s	k
10763	10649	s	U
10763	10748	s	K
10763	66	.	α
10763	10704	s	α
10763	66	.	a
10763	10704	s	a
10763	10707	s	A
10763	10710	s	λ
10763	10713	s	l
10763	10758	s	L
10763	10146	<2s>	<>
10764	59	.	.
10764	62	 	 
10764	59	<~>	<~>
10764	59	<split-s>	<split-s>
10764	59	<split-h>	<split-h>
10764	59	<name2>	<name2>
10764	10745	<aphaerese>	<aphaerese>
10764	10765	<>	<aphaerese>
10764	10765	<>	<elision3>
10764	10765	<>	<elision2>
10764	10765	<>	<elision1>
10764	66	.	υ
10764	10539	s	υ
10764	66	.	u
10764	10539	s	u
10764	66	.	κ
10764	10768	s	κ
10764	10628	s	k
10764	10649	s	U
10764	10748	s	K
10764	66	.	α
10764	10704	s	α
10764	66	.	a
10764	10704	s	a
10764	10707	s	A
10764	66	.	λ
10764	10768	s	λ
10764	10713	s	l
10764	10758	s	L
10764	10557	<2s>	<>
10765	56	.	.
10765	57	 	 
10765	56	<~>	<~>
10765	56	<split-s>	<split-s>
10765	56	<split-h>	<split-h>
10765	56	<name2>	<name2>
10765	60	<aphaerese>	<aphaerese>
10765	55	<>	<aphaerese>
10765	55	<>	<elision3>
10765	55	<>	<elision2>
10765	55	<>	<elision1>
10765	64	.	υ
10765	9961	s	υ
10765	64	.	u
10765	9961	s	u
10765	64	.	κ
10765	10766	s	κ
10765	10626	s	k
10765	10647	s	U
10765	10746	s	K
10765	64	.	α
10765	10702	s	α
10765	64	.	a
10765	10702	s	a
10765	10705	s	A
10765	64	.	λ
10765	10766	s	λ
10765	10711	s	l
10765	10756	s	L
10765	10555	<2s>	<>
10766	9962	.	.
10766	9963	 	 
10766	9962	<~>	<~>
10766	9962	<split-s>	<split-s>
10766	9962	<split-h>	<split-h>
10766	9962	<name2>	<name2>
10766	10767	<>	<name>
10766	9966	<aphaerese>	<aphaerese>
10766	10766	<>	<aphaerese>
10766	10766	<>	<elision3>
10766	10766	<>	<elision2>
10766	10766	<>	<elision1>
10766	9970	.	υ
10766	9976	s	υ
10766	9970	.	u
10766	9976	s	u
10766	9970	.	κ
10766	10552	s	κ
10766	10338	s	k
10766	10347	s	U
10766	10513	s	K
10766	9970	.	α
10766	9976	s	α
10766	9970	.	a
10766	9976	s	a
10766	10468	s	A
10766	9970	.	λ
10766	10552	s	λ
10766	10338	s	l
10766	10526	s	L
10766	10770	<split-h>	<>
10767	9965	.	.
10767	9968	 	 
10767	9965	<~>	<~>
10767	9965	<split-s>	<split-s>
10767	9965	<split-h>	<split-h>
10767	9965	<name2>	<name2>
10767	10512	<aphaerese>	<aphaerese>
10767	10768	<>	<aphaerese>
10767	10768	<>	<elision3>
10767	10768	<>	<elision2>
10767	10768	<>	<elision1>
10767	9972	.	υ
10767	10148	s	υ
10767	9972	.	u
10767	10148	s	u
10767	9972	.	κ
10767	10554	s	κ
10767	10340	s	k
10767	10349	s	U
10767	10515	s	K
10767	9972	.	α
10767	10148	s	α
10767	9972	.	a
10767	10148	s	a
10767	10470	s	A
10767	9972	.	λ
10767	10554	s	λ
10767	10340	s	l
10767	10528	s	L
10767	10771	<split-h>	<>
10768	9962	.	.
10768	9963	 	 
10768	9962	<~>	<~>
10768	9962	<split-s>	<split-s>
10768	9962	<split-h>	<split-h>
10768	9962	<name2>	<name2>
10768	9966	<aphaerese>	<aphaerese>
10768	10766	<>	<aphaerese>
10768	10766	<>	<elision3>
10768	10766	<>	<elision2>
10768	10766	<>	<elision1>
10768	9970	.	υ
10768	9976	s	υ
10768	9970	.	u
10768	9976	s	u
10768	9970	.	κ
10768	10552	s	κ
10768	10338	s	k
10768	10347	s	U
10768	10513	s	K
10768	9970	.	α
10768	9976	s	α
10768	9970	.	a
10768	9976	s	a
10768	10468	s	A
10768	9970	.	λ
10768	10552	s	λ
10768	10338	s	l
10768	10526	s	L
10768	10769	<split-h>	<>
10769	10770	<>	<aphaerese>
10769	10770	<>	<elision3>
10769	10770	<>	<elision2>
10769	10770	<>	<elision1>
10769	10555	<3s>	<>
10770	10771	<>	<name>
10770	10770	<>	<aphaerese>
10770	10770	<>	<elision3>
10770	10770	<>	<elision2>
10770	10770	<>	<elision1>
10770	10556	<3s>	<>
10771	10769	<>	<aphaerese>
10771	10769	<>	<elision3>
10771	10769	<>	<elision2>
10771	10769	<>	<elision1>
10771	10557	<3s>	<>
10772	56	.	.
10772	57	 	 
10772	56	<~>	<~>
10772	56	<split-s>	<split-s>
10772	56	<split-h>	<split-h>
10772	56	<name2>	<name2>
10772	10773	<>	<name>
10772	60	<aphaerese>	<aphaerese>
10772	10772	<>	<aphaerese>
10772	56	<elision3>	<elision3>
10772	10772	<>	<elision3>
10772	56	<elision2>	<elision2>
10772	10772	<>	<elision2>
10772	56	<elision1>	<elision1>
10772	10772	<>	<elision1>
10772	64	.	υ
10772	9961	s	υ
10772	64	.	u
10772	9961	s	u
10772	10775	.	κ
10772	10766	s	κ
10772	10626	s	k
10772	10647	s	U
10772	10746	s	K
10772	64	.	α
10772	10702	s	α
10772	64	.	a
10772	10702	s	a
10772	10705	s	A
10772	10775	.	λ
10772	10766	s	λ
10772	10711	s	l
10772	10756	s	L
10772	10342	<2s>	<>
10773	59	.	.
10773	62	 	 
10773	59	<~>	<~>
10773	59	<split-s>	<split-s>
10773	59	<split-h>	<split-h>
10773	59	<name2>	<name2>
10773	10745	<aphaerese>	<aphaerese>
10773	10774	<>	<aphaerese>
10773	59	<elision3>	<elision3>
10773	10774	<>	<elision3>
10773	59	<elision2>	<elision2>
10773	10774	<>	<elision2>
10773	59	<elision1>	<elision1>
10773	10774	<>	<elision1>
10773	66	.	υ
10773	10539	s	υ
10773	66	.	u
10773	10539	s	u
10773	10777	.	κ
10773	10768	s	κ
10773	10628	s	k
10773	10649	s	U
10773	10748	s	K
10773	66	.	α
10773	10704	s	α
10773	66	.	a
10773	10704	s	a
10773	10707	s	A
10773	10777	.	λ
10773	10768	s	λ
10773	10713	s	l
10773	10758	s	L
10773	10343	<2s>	<>
10774	56	.	.
10774	57	 	 
10774	56	<~>	<~>
10774	56	<split-s>	<split-s>
10774	56	<split-h>	<split-h>
10774	56	<name2>	<name2>
10774	60	<aphaerese>	<aphaerese>
10774	10772	<>	<aphaerese>
10774	56	<elision3>	<elision3>
10774	10772	<>	<elision3>
10774	56	<elision2>	<elision2>
10774	10772	<>	<elision2>
10774	56	<elision1>	<elision1>
10774	10772	<>	<elision1>
10774	64	.	υ
10774	9961	s	υ
10774	64	.	u
10774	9961	s	u
10774	10775	.	κ
10774	10766	s	κ
10774	10626	s	k
10774	10647	s	U
10774	10746	s	K
10774	64	.	α
10774	10702	s	α
10774	64	.	a
10774	10702	s	a
10774	10705	s	A
10774	10775	.	λ
10774	10766	s	λ
10774	10711	s	l
10774	10756	s	L
10774	10341	<2s>	<>
10775	10776	<>	<name>
10775	10775	<>	<aphaerese>
10775	10778	<elision3>	<elision3>
10775	10775	<>	<elision3>
10775	10778	<elision2>	<elision2>
10775	10775	<>	<elision2>
10775	10778	<elision1>	<elision1>
10775	10775	<>	<elision1>
10775	68	<2s>	<>
10776	10777	<>	<aphaerese>
10776	10781	<elision3>	<elision3>
10776	10777	<>	<elision3>
10776	10781	<elision2>	<elision2>
10776	10777	<>	<elision2>
10776	10781	<elision1>	<elision1>
10776	10777	<>	<elision1>
10776	69	<2s>	<>
10777	10775	<>	<aphaerese>
10777	10778	<elision3>	<elision3>
10777	10775	<>	<elision3>
10777	10778	<elision2>	<elision2>
10777	10775	<>	<elision2>
10777	10778	<elision1>	<elision1>
10777	10775	<>	<elision1>
10777	67	<2s>	<>
10778	10778	.	.
10778	10779	 	 
10778	10778	<~>	<~>
10778	10778	<split-s>	<split-s>
10778	10778	<split-h>	<split-h>
10778	10778	<name2>	<name2>
10778	10804	<>	<name>
10778	10782	<aphaerese>	<aphaerese>
10778	10778	<>	<aphaerese>
10778	10778	<elision3>	<elision3>
10778	10778	<>	<elision3>
10778	10778	<elision2>	<elision2>
10778	10778	<>	<elision2>
10778	10778	<elision1>	<elision1>
10778	10778	<>	<elision1>
10778	10775	.	υ
10778	10702	s	υ
10778	10775	.	u
10778	10702	s	u
10778	10786	.	κ
10778	10792	s	κ
10778	10711	s	k
10778	10647	s	U
10778	10802	s	K
10778	10775	.	α
10778	10702	s	α
10778	10775	.	a
10778	10702	s	a
10778	10705	s	A
10778	10711	s	λ
10778	10711	s	l
10778	10756	s	L
10778	10145	<2s>	<>
10779	10778	.	.
10779	10779	 	 
10779	10778	<~>	<~>
10779	10778	<split-s>	<split-s>
10779	10778	<split-h>	<split-h>
10779	10778	<name2>	<name2>
10779	10780	<>	<name>
10779	10782	<aphaerese>	<aphaerese>
10779	10785	<>	<aphaerese>
10779	10778	<elision3>	<elision3>
10779	10785	<>	<elision3>
10779	10778	<elision2>	<elision2>
10779	10785	<>	<elision2>
10779	10778	<elision1>	<elision1>
10779	10785	<>	<elision1>
10779	10775	.	υ
10779	10738	s	υ
10779	10775	.	u
10779	10738	s	u
10779	10786	.	κ
10779	10799	s	κ
10779	10741	s	k
10779	10732	s	U
10779	10800	s	K
10779	10775	.	α
10779	10738	s	α
10779	10775	.	a
10779	10738	s	a
10779	10739	s	A
10779	10741	s	λ
10779	10741	s	l
10779	10742	s	L
10779	10145	<2s>	<>
10780	10781	.	.
10780	10784	 	 
10780	10781	<~>	<~>
10780	10781	<split-s>	<split-s>
10780	10781	<split-h>	<split-h>
10780	10781	<name2>	<name2>
10780	10801	<aphaerese>	<aphaerese>
10780	10803	<>	<aphaerese>
10780	10781	<elision3>	<elision3>
10780	10803	<>	<elision3>
10780	10781	<elision2>	<elision2>
10780	10803	<>	<elision2>
10780	10781	<elision1>	<elision1>
10780	10803	<>	<elision1>
10780	10777	.	υ
10780	10704	s	υ
10780	10777	.	u
10780	10704	s	u
10780	10788	.	κ
10780	10794	s	κ
10780	10713	s	k
10780	10649	s	U
10780	10654	s	K
10780	10777	.	α
10780	10704	s	α
10780	10777	.	a
10780	10704	s	a
10780	10707	s	A
10780	10713	s	λ
10780	10713	s	l
10780	10716	s	L
10780	10146	<2s>	<>
10781	10778	.	.
10781	10779	 	 
10781	10778	<~>	<~>
10781	10778	<split-s>	<split-s>
10781	10778	<split-h>	<split-h>
10781	10778	<name2>	<name2>
10781	10782	<aphaerese>	<aphaerese>
10781	10778	<>	<aphaerese>
10781	10778	<elision3>	<elision3>
10781	10778	<>	<elision3>
10781	10778	<elision2>	<elision2>
10781	10778	<>	<elision2>
10781	10778	<elision1>	<elision1>
10781	10778	<>	<elision1>
10781	10775	.	υ
10781	10702	s	υ
10781	10775	.	u
10781	10702	s	u
10781	10786	.	κ
10781	10792	s	κ
10781	10711	s	k
10781	10647	s	U
10781	10802	s	K
10781	10775	.	α
10781	10702	s	α
10781	10775	.	a
10781	10702	s	a
10781	10705	s	A
10781	10711	s	λ
10781	10711	s	l
10781	10756	s	L
10781	10144	<2s>	<>
10782	10778	.	.
10782	10779	 	 
10782	10778	<~>	<~>
10782	10778	<split-s>	<split-s>
10782	10778	<split-h>	<split-h>
10782	10778	<name2>	<name2>
10782	10783	<>	<name>
10782	10782	<aphaerese>	<aphaerese>
10782	10782	<>	<aphaerese>
10782	10778	<elision3>	<elision3>
10782	10782	<>	<elision3>
10782	10778	<elision2>	<elision2>
10782	10782	<>	<elision2>
10782	10778	<elision1>	<elision1>
10782	10782	<>	<elision1>
10782	10778	.	υ
10782	10778	.	u
10782	10786	.	κ
10782	10792	s	κ
10782	10711	s	k
10782	10647	s	U
10782	10802	s	K
10782	10778	.	α
10782	10778	.	a
10782	10705	s	A
10782	10711	s	λ
10782	10711	s	l
10782	10756	s	L
10782	10132	<2s>	<>
10783	10781	.	.
10783	10784	 	 
10783	10781	<~>	<~>
10783	10781	<split-s>	<split-s>
10783	10781	<split-h>	<split-h>
10783	10781	<name2>	<name2>
10783	10801	<aphaerese>	<aphaerese>
10783	10801	<>	<aphaerese>
10783	10781	<elision3>	<elision3>
10783	10801	<>	<elision3>
10783	10781	<elision2>	<elision2>
10783	10801	<>	<elision2>
10783	10781	<elision1>	<elision1>
10783	10801	<>	<elision1>
10783	10781	.	υ
10783	10781	.	u
10783	10788	.	κ
10783	10794	s	κ
10783	10713	s	k
10783	10649	s	U
10783	10748	s	K
10783	10781	.	α
10783	10781	.	a
10783	10707	s	A
10783	10713	s	λ
10783	10713	s	l
10783	10758	s	L
10783	10133	<2s>	<>
10784	10778	.	.
10784	10779	 	 
10784	10778	<~>	<~>
10784	10778	<split-s>	<split-s>
10784	10778	<split-h>	<split-h>
10784	10778	<name2>	<name2>
10784	10782	<aphaerese>	<aphaerese>
10784	10785	<>	<aphaerese>
10784	10778	<elision3>	<elision3>
10784	10785	<>	<elision3>
10784	10778	<elision2>	<elision2>
10784	10785	<>	<elision2>
10784	10778	<elision1>	<elision1>
10784	10785	<>	<elision1>
10784	10775	.	υ
10784	10738	s	υ
10784	10775	.	u
10784	10738	s	u
10784	10786	.	κ
10784	10799	s	κ
10784	10741	s	k
10784	10732	s	U
10784	10800	s	K
10784	10775	.	α
10784	10738	s	α
10784	10775	.	a
10784	10738	s	a
10784	10739	s	A
10784	10741	s	λ
10784	10741	s	l
10784	10742	s	L
10784	10144	<2s>	<>
10785	10778	.	.
10785	10779	 	 
10785	10778	<~>	<~>
10785	10778	<split-s>	<split-s>
10785	10778	<split-h>	<split-h>
10785	10778	<name2>	<name2>
10785	10780	<>	<name>
10785	10782	<aphaerese>	<aphaerese>
10785	10785	<>	<aphaerese>
10785	10778	<elision3>	<elision3>
10785	10785	<>	<elision3>
10785	10778	<elision2>	<elision2>
10785	10785	<>	<elision2>
10785	10778	<elision1>	<elision1>
10785	10785	<>	<elision1>
10785	10775	.	υ
10785	10702	s	υ
10785	10775	.	u
10785	10702	s	u
10785	10786	.	κ
10785	10792	s	κ
10785	10711	s	k
10785	10647	s	U
10785	10798	s	K
10785	10775	.	α
10785	10702	s	α
10785	10775	.	a
10785	10702	s	a
10785	10705	s	A
10785	10711	s	λ
10785	10711	s	l
10785	10714	s	L
10785	10145	<2s>	<>
10786	10787	<>	<name>
10786	10786	<>	<aphaerese>
10786	10789	<elision3>	<elision3>
10786	10786	<>	<elision3>
10786	10789	<elision2>	<elision2>
10786	10786	<>	<elision2>
10786	10789	<elision1>	<elision1>
10786	10786	<>	<elision1>
10786	10129	<2s>	<>
10787	10788	<>	<aphaerese>
10787	10791	<elision3>	<elision3>
10787	10788	<>	<elision3>
10787	10791	<elision2>	<elision2>
10787	10788	<>	<elision2>
10787	10791	<elision1>	<elision1>
10787	10788	<>	<elision1>
10787	10130	<2s>	<>
10788	10786	<>	<aphaerese>
10788	10789	<elision3>	<elision3>
10788	10786	<>	<elision3>
10788	10789	<elision2>	<elision2>
10788	10786	<>	<elision2>
10788	10789	<elision1>	<elision1>
10788	10786	<>	<elision1>
10788	10128	<2s>	<>
10789	10790	<>	<name>
10789	10789	<>	<aphaerese>
10789	10789	<>	<elision3>
10789	10789	<>	<elision2>
10789	10789	<>	<elision1>
10789	10568	s	κ
10789	10568	s	k
10789	10564	s	K
10789	10568	s	λ
10789	10568	s	l
10789	10570	s	L
10789	9990	<2s>	<>
10790	10791	<>	<aphaerese>
10790	10791	<>	<elision3>
10790	10791	<>	<elision2>
10790	10791	<>	<elision1>
10790	10567	s	κ
10790	10567	s	k
10790	10566	s	K
10790	10567	s	λ
10790	10567	s	l
10790	10572	s	L
10790	9991	<2s>	<>
10791	10789	<>	<aphaerese>
10791	10789	<>	<elision3>
10791	10789	<>	<elision2>
10791	10789	<>	<elision1>
10791	10568	s	κ
10791	10568	s	k
10791	10564	s	K
10791	10568	s	λ
10791	10568	s	l
10791	10570	s	L
10791	9989	<2s>	<>
10792	10632	.	.
10792	10632	 	 
10792	10632	<~>	<~>
10792	10632	<split-s>	<split-s>
10792	10632	<split-h>	<split-h>
10792	10632	<name2>	<name2>
10792	10793	<>	<name>
10792	10635	<aphaerese>	<aphaerese>
10792	10792	<>	<aphaerese>
10792	10795	<elision3>	<elision3>
10792	10792	<>	<elision3>
10792	10795	<elision2>	<elision2>
10792	10792	<>	<elision2>
10792	10795	<elision1>	<elision1>
10792	10792	<>	<elision1>
10792	10629	.	υ
10792	10629	.	u
10792	10629	.	κ
10792	10629	.	α
10792	10629	.	a
10792	10629	.	λ
10792	10624	<split-h>	<>
10793	10634	.	.
10793	10634	 	 
10793	10634	<~>	<~>
10793	10634	<split-s>	<split-s>
10793	10634	<split-h>	<split-h>
10793	10634	<name2>	<name2>
10793	10637	<aphaerese>	<aphaerese>
10793	10794	<>	<aphaerese>
10793	10797	<elision3>	<elision3>
10793	10794	<>	<elision3>
10793	10797	<elision2>	<elision2>
10793	10794	<>	<elision2>
10793	10797	<elision1>	<elision1>
10793	10794	<>	<elision1>
10793	10631	.	υ
10793	10631	.	u
10793	10631	.	κ
10793	10631	.	α
10793	10631	.	a
10793	10631	.	λ
10793	10625	<split-h>	<>
10794	10632	.	.
10794	10632	 	 
10794	10632	<~>	<~>
10794	10632	<split-s>	<split-s>
10794	10632	<split-h>	<split-h>
10794	10632	<name2>	<name2>
10794	10635	<aphaerese>	<aphaerese>
10794	10792	<>	<aphaerese>
10794	10795	<elision3>	<elision3>
10794	10792	<>	<elision3>
10794	10795	<elision2>	<elision2>
10794	10792	<>	<elision2>
10794	10795	<elision1>	<elision1>
10794	10792	<>	<elision1>
10794	10629	.	υ
10794	10629	.	u
10794	10629	.	κ
10794	10629	.	α
10794	10629	.	a
10794	10629	.	λ
10794	10623	<split-h>	<>
10795	10632	.	.
10795	10632	 	 
10795	10632	<~>	<~>
10795	10632	<split-s>	<split-s>
10795	10632	<split-h>	<split-h>
10795	10632	<name2>	<name2>
10795	10796	<>	<name>
10795	10635	<aphaerese>	<aphaerese>
10795	10795	<>	<aphaerese>
10795	10632	<elision3>	<elision3>
10795	10795	<>	<elision3>
10795	10632	<elision2>	<elision2>
10795	10795	<>	<elision2>
10795	10632	<elision1>	<elision1>
10795	10795	<>	<elision1>
10795	10629	.	υ
10795	10629	.	u
10795	10638	.	κ
10795	10629	.	α
10795	10629	.	a
10795	10621	<split-h>	<>
10796	10634	.	.
10796	10634	 	 
10796	10634	<~>	<~>
10796	10634	<split-s>	<split-s>
10796	10634	<split-h>	<split-h>
10796	10634	<name2>	<name2>
10796	10637	<aphaerese>	<aphaerese>
10796	10797	<>	<aphaerese>
10796	10634	<elision3>	<elision3>
10796	10797	<>	<elision3>
10796	10634	<elision2>	<elision2>
10796	10797	<>	<elision2>
10796	10634	<elision1>	<elision1>
10796	10797	<>	<elision1>
10796	10631	.	υ
10796	10631	.	u
10796	10640	.	κ
10796	10631	.	α
10796	10631	.	a
10796	10622	<split-h>	<>
10797	10632	.	.
10797	10632	 	 
10797	10632	<~>	<~>
10797	10632	<split-s>	<split-s>
10797	10632	<split-h>	<split-h>
10797	10632	<name2>	<name2>
10797	10635	<aphaerese>	<aphaerese>
10797	10795	<>	<aphaerese>
10797	10632	<elision3>	<elision3>
10797	10795	<>	<elision3>
10797	10632	<elision2>	<elision2>
10797	10795	<>	<elision2>
10797	10632	<elision1>	<elision1>
10797	10795	<>	<elision1>
10797	10629	.	υ
10797	10629	.	u
10797	10638	.	κ
10797	10629	.	α
10797	10629	.	a
10797	10620	<split-h>	<>
10798	10700	<name>	<name>
10798	10653	<>	<name>
10798	10655	<>	<aphaerese>
10798	10655	<>	<elision3>
10798	10655	<>	<elision2>
10798	10655	<>	<elision1>
10798	10698	<split-h>	<>
10798	10656	<A2kl>	<>
10798	10674	<L2kl>	<>
10798	10699	<K2kl>	<>
10799	10632	.	.
10799	10632	 	 
10799	10632	<~>	<~>
10799	10632	<split-s>	<split-s>
10799	10632	<split-h>	<split-h>
10799	10632	<name2>	<name2>
10799	10793	<>	<name>
10799	10635	<aphaerese>	<aphaerese>
10799	10792	<>	<aphaerese>
10799	10795	<elision3>	<elision3>
10799	10792	<>	<elision3>
10799	10795	<elision2>	<elision2>
10799	10792	<>	<elision2>
10799	10795	<elision1>	<elision1>
10799	10792	<>	<elision1>
10799	10629	.	υ
10799	10629	.	u
10799	10629	.	κ
10799	10629	.	α
10799	10629	.	a
10799	10629	.	λ
10799	10729	<split-h>	<>
10800	10700	<name>	<name>
10800	10653	<>	<name>
10800	10655	<>	<aphaerese>
10800	10655	<>	<elision3>
10800	10655	<>	<elision2>
10800	10655	<>	<elision1>
10800	10698	<split-h>	<>
10800	10656	<A2kl>	<>
10800	10674	<L2kl>	<>
10800	10736	<K2kl>	<>
10801	10778	.	.
10801	10779	 	 
10801	10778	<~>	<~>
10801	10778	<split-s>	<split-s>
10801	10778	<split-h>	<split-h>
10801	10778	<name2>	<name2>
10801	10782	<aphaerese>	<aphaerese>
10801	10782	<>	<aphaerese>
10801	10778	<elision3>	<elision3>
10801	10782	<>	<elision3>
10801	10778	<elision2>	<elision2>
10801	10782	<>	<elision2>
10801	10778	<elision1>	<elision1>
10801	10782	<>	<elision1>
10801	10778	.	υ
10801	10778	.	u
10801	10786	.	κ
10801	10792	s	κ
10801	10711	s	k
10801	10647	s	U
10801	10802	s	K
10801	10778	.	α
10801	10778	.	a
10801	10705	s	A
10801	10711	s	λ
10801	10711	s	l
10801	10756	s	L
10801	10131	<2s>	<>
10802	10700	<name>	<name>
10802	10747	<>	<name>
10802	10749	<>	<aphaerese>
10802	10749	<>	<elision3>
10802	10749	<>	<elision2>
10802	10749	<>	<elision1>
10802	10698	<split-h>	<>
10802	10750	<L2kl>	<>
10802	10699	<K2kl>	<>
10803	10778	.	.
10803	10779	 	 
10803	10778	<~>	<~>
10803	10778	<split-s>	<split-s>
10803	10778	<split-h>	<split-h>
10803	10778	<name2>	<name2>
10803	10782	<aphaerese>	<aphaerese>
10803	10785	<>	<aphaerese>
10803	10778	<elision3>	<elision3>
10803	10785	<>	<elision3>
10803	10778	<elision2>	<elision2>
10803	10785	<>	<elision2>
10803	10778	<elision1>	<elision1>
10803	10785	<>	<elision1>
10803	10775	.	υ
10803	10702	s	υ
10803	10775	.	u
10803	10702	s	u
10803	10786	.	κ
10803	10792	s	κ
10803	10711	s	k
10803	10647	s	U
10803	10798	s	K
10803	10775	.	α
10803	10702	s	α
10803	10775	.	a
10803	10702	s	a
10803	10705	s	A
10803	10711	s	λ
10803	10711	s	l
10803	10714	s	L
10803	10144	<2s>	<>
10804	10781	.	.
10804	10784	 	 
10804	10781	<~>	<~>
10804	10781	<split-s>	<split-s>
10804	10781	<split-h>	<split-h>
10804	10781	<name2>	<name2>
10804	10801	<aphaerese>	<aphaerese>
10804	10781	<>	<aphaerese>
10804	10781	<elision3>	<elision3>
10804	10781	<>	<elision3>
10804	10781	<elision2>	<elision2>
10804	10781	<>	<elision2>
10804	10781	<elision1>	<elision1>
10804	10781	<>	<elision1>
10804	10777	.	υ
10804	10704	s	υ
10804	10777	.	u
10804	10704	s	u
10804	10788	.	κ
10804	10794	s	κ
10804	10713	s	k
10804	10649	s	U
10804	10748	s	K
10804	10777	.	α
10804	10704	s	α
10804	10777	.	a
10804	10704	s	a
10804	10707	s	A
10804	10713	s	λ
10804	10713	s	l
10804	10758	s	L
10804	10146	<2s>	<>
10805	10806	<name>	<name>
10805	10807	<>	<name>
10805	10809	<>	<aphaerese>
10805	10809	<>	<elision3>
10805	10809	<>	<elision2>
10805	10809	<>	<elision1>
10805	10462	<2s>	<>
10805	10810	<L2kl>	<>
10805	10819	<K2kl>	<>
10806	10748	s	k
10806	10758	s	l
10806	10352	<2s>	<>
10807	10808	<>	<aphaerese>
10807	10808	<>	<elision3>
10807	10808	<>	<elision2>
10807	10808	<>	<elision1>
10807	10811	<L2kl>	<>
10807	10814	<K2kl>	<>
10808	10809	<>	<aphaerese>
10808	10809	<>	<elision3>
10808	10809	<>	<elision2>
10808	10809	<>	<elision1>
10808	10812	<L2kl>	<>
10808	10815	<K2kl>	<>
10809	10807	<>	<name>
10809	10809	<>	<aphaerese>
10809	10809	<>	<elision3>
10809	10809	<>	<elision2>
10809	10809	<>	<elision1>
10809	10810	<L2kl>	<>
10809	10813	<K2kl>	<>
10810	10811	<>	<name>
10810	10810	<>	<aphaerese>
10810	10810	<>	<elision3>
10810	10810	<>	<elision2>
10810	10810	<>	<elision1>
10810	10775	.	κ
10810	10775	.	λ
10810	10521	<2s>	<>
10811	10812	<>	<aphaerese>
10811	10812	<>	<elision3>
10811	10812	<>	<elision2>
10811	10812	<>	<elision1>
10811	10777	.	κ
10811	10777	.	λ
10811	10522	<2s>	<>
10812	10810	<>	<aphaerese>
10812	10810	<>	<elision3>
10812	10810	<>	<elision2>
10812	10810	<>	<elision1>
10812	10775	.	κ
10812	10775	.	λ
10812	10520	<2s>	<>
10813	10778	.	.
10813	10779	 	 
10813	10778	<~>	<~>
10813	10778	<split-s>	<split-s>
10813	10778	<split-h>	<split-h>
10813	10778	<name2>	<name2>
10813	10814	<>	<name>
10813	10782	<aphaerese>	<aphaerese>
10813	10813	<>	<aphaerese>
10813	10778	<elision3>	<elision3>
10813	10813	<>	<elision3>
10813	10778	<elision2>	<elision2>
10813	10813	<>	<elision2>
10813	10778	<elision1>	<elision1>
10813	10813	<>	<elision1>
10813	10775	.	υ
10813	10702	s	υ
10813	10775	.	u
10813	10702	s	u
10813	10816	s	κ
10813	10711	s	k
10813	10647	s	U
10813	10802	s	K
10813	10775	.	α
10813	10702	s	α
10813	10775	.	a
10813	10702	s	a
10813	10705	s	A
10813	10816	s	λ
10813	10711	s	l
10813	10756	s	L
10813	10457	<2s>	<>
10814	10781	.	.
10814	10784	 	 
10814	10781	<~>	<~>
10814	10781	<split-s>	<split-s>
10814	10781	<split-h>	<split-h>
10814	10781	<name2>	<name2>
10814	10801	<aphaerese>	<aphaerese>
10814	10815	<>	<aphaerese>
10814	10781	<elision3>	<elision3>
10814	10815	<>	<elision3>
10814	10781	<elision2>	<elision2>
10814	10815	<>	<elision2>
10814	10781	<elision1>	<elision1>
10814	10815	<>	<elision1>
10814	10777	.	υ
10814	10704	s	υ
10814	10777	.	u
10814	10704	s	u
10814	10818	s	κ
10814	10713	s	k
10814	10649	s	U
10814	10748	s	K
10814	10777	.	α
10814	10704	s	α
10814	10777	.	a
10814	10704	s	a
10814	10707	s	A
10814	10818	s	λ
10814	10713	s	l
10814	10758	s	L
10814	10458	<2s>	<>
10815	10778	.	.
10815	10779	 	 
10815	10778	<~>	<~>
10815	10778	<split-s>	<split-s>
10815	10778	<split-h>	<split-h>
10815	10778	<name2>	<name2>
10815	10782	<aphaerese>	<aphaerese>
10815	10813	<>	<aphaerese>
10815	10778	<elision3>	<elision3>
10815	10813	<>	<elision3>
10815	10778	<elision2>	<elision2>
10815	10813	<>	<elision2>
10815	10778	<elision1>	<elision1>
10815	10813	<>	<elision1>
10815	10775	.	υ
10815	10702	s	υ
10815	10775	.	u
10815	10702	s	u
10815	10816	s	κ
10815	10711	s	k
10815	10647	s	U
10815	10802	s	K
10815	10775	.	α
10815	10702	s	α
10815	10775	.	a
10815	10702	s	a
10815	10705	s	A
10815	10816	s	λ
10815	10711	s	l
10815	10756	s	L
10815	10456	<2s>	<>
10816	10632	.	.
10816	10632	 	 
10816	10632	<~>	<~>
10816	10632	<split-s>	<split-s>
10816	10632	<split-h>	<split-h>
10816	10632	<name2>	<name2>
10816	10817	<>	<name>
10816	10635	<aphaerese>	<aphaerese>
10816	10816	<>	<aphaerese>
10816	10816	<>	<elision3>
10816	10816	<>	<elision2>
10816	10816	<>	<elision1>
10816	10629	.	υ
10816	10629	.	u
10816	10629	.	κ
10816	10629	.	α
10816	10629	.	a
10816	10629	.	λ
10816	10770	<split-h>	<>
10817	10634	.	.
10817	10634	 	 
10817	10634	<~>	<~>
10817	10634	<split-s>	<split-s>
10817	10634	<split-h>	<split-h>
10817	10634	<name2>	<name2>
10817	10637	<aphaerese>	<aphaerese>
10817	10818	<>	<aphaerese>
10817	10818	<>	<elision3>
10817	10818	<>	<elision2>
10817	10818	<>	<elision1>
10817	10631	.	υ
10817	10631	.	u
10817	10631	.	κ
10817	10631	.	α
10817	10631	.	a
10817	10631	.	λ
10817	10771	<split-h>	<>
10818	10632	.	.
10818	10632	 	 
10818	10632	<~>	<~>
10818	10632	<split-s>	<split-s>
10818	10632	<split-h>	<split-h>
10818	10632	<name2>	<name2>
10818	10635	<aphaerese>	<aphaerese>
10818	10816	<>	<aphaerese>
10818	10816	<>	<elision3>
10818	10816	<>	<elision2>
10818	10816	<>	<elision1>
10818	10629	.	υ
10818	10629	.	u
10818	10629	.	κ
10818	10629	.	α
10818	10629	.	a
10818	10629	.	λ
10818	10769	<split-h>	<>
10819	10778	.	.
10819	10779	 	 
10819	10778	<~>	<~>
10819	10778	<split-s>	<split-s>
10819	10778	<split-h>	<split-h>
10819	10778	<name2>	<name2>
10819	10806	<name2>	<name>
10819	10814	<>	<name>
10819	10782	<aphaerese>	<aphaerese>
10819	10813	<>	<aphaerese>
10819	10778	<elision3>	<elision3>
10819	10813	<>	<elision3>
10819	10778	<elision2>	<elision2>
10819	10813	<>	<elision2>
10819	10778	<elision1>	<elision1>
10819	10813	<>	<elision1>
10819	10775	.	υ
10819	10702	s	υ
10819	10775	.	u
10819	10702	s	u
10819	10816	s	κ
10819	10711	s	k
10819	10647	s	U
10819	10802	s	K
10819	10775	.	α
10819	10702	s	α
10819	10775	.	a
10819	10702	s	a
10819	10705	s	A
10819	10816	s	λ
10819	10711	s	l
10819	10756	s	L
10819	10466	<2s>	<>
10820	10778	.	.
10820	10779	 	 
10820	10778	<~>	<~>
10820	10778	<split-s>	<split-s>
10820	10778	<split-h>	<split-h>
10820	10778	<name2>	<name2>
10820	10821	<>	<name>
10820	10782	<aphaerese>	<aphaerese>
10820	10820	<>	<aphaerese>
10820	10778	<elision3>	<elision3>
10820	10820	<>	<elision3>
10820	10778	<elision2>	<elision2>
10820	10820	<>	<elision2>
10820	10778	<elision1>	<elision1>
10820	10820	<>	<elision1>
10820	10775	.	υ
10820	10702	s	υ
10820	10775	.	u
10820	10702	s	u
10820	10775	.	κ
10820	10816	s	κ
10820	10711	s	k
10820	10647	s	U
10820	10802	s	K
10820	10775	.	α
10820	10702	s	α
10820	10775	.	a
10820	10702	s	a
10820	10705	s	A
10820	10775	.	λ
10820	10816	s	λ
10820	10711	s	l
10820	10756	s	L
10820	10342	<2s>	<>
10821	10781	.	.
10821	10784	 	 
10821	10781	<~>	<~>
10821	10781	<split-s>	<split-s>
10821	10781	<split-h>	<split-h>
10821	10781	<name2>	<name2>
10821	10801	<aphaerese>	<aphaerese>
10821	10822	<>	<aphaerese>
10821	10781	<elision3>	<elision3>
10821	10822	<>	<elision3>
10821	10781	<elision2>	<elision2>
10821	10822	<>	<elision2>
10821	10781	<elision1>	<elision1>
10821	10822	<>	<elision1>
10821	10777	.	υ
10821	10704	s	υ
10821	10777	.	u
10821	10704	s	u
10821	10777	.	κ
10821	10818	s	κ
10821	10713	s	k
10821	10649	s	U
10821	10748	s	K
10821	10777	.	α
10821	10704	s	α
10821	10777	.	a
10821	10704	s	a
10821	10707	s	A
10821	10777	.	λ
10821	10818	s	λ
10821	10713	s	l
10821	10758	s	L
10821	10343	<2s>	<>
10822	10778	.	.
10822	10779	 	 
10822	10778	<~>	<~>
10822	10778	<split-s>	<split-s>
10822	10778	<split-h>	<split-h>
10822	10778	<name2>	<name2>
10822	10782	<aphaerese>	<aphaerese>
10822	10820	<>	<aphaerese>
10822	10778	<elision3>	<elision3>
10822	10820	<>	<elision3>
10822	10778	<elision2>	<elision2>
10822	10820	<>	<elision2>
10822	10778	<elision1>	<elision1>
10822	10820	<>	<elision1>
10822	10775	.	υ
10822	10702	s	υ
10822	10775	.	u
10822	10702	s	u
10822	10775	.	κ
10822	10816	s	κ
10822	10711	s	k
10822	10647	s	U
10822	10802	s	K
10822	10775	.	α
10822	10702	s	α
10822	10775	.	a
10822	10702	s	a
10822	10705	s	A
10822	10775	.	λ
10822	10816	s	λ
10822	10711	s	l
10822	10756	s	L
10822	10341	<2s>	<>
10823	10806	<name>	<name>
10823	10824	<>	<name>
10823	10826	<>	<aphaerese>
10823	10826	<>	<elision3>
10823	10826	<>	<elision2>
10823	10826	<>	<elision1>
10823	10462	<2s>	<>
10823	10827	<L2kl>	<>
10824	10825	<>	<aphaerese>
10824	10825	<>	<elision3>
10824	10825	<>	<elision2>
10824	10825	<>	<elision1>
10824	10821	<L2kl>	<>
10825	10826	<>	<aphaerese>
10825	10826	<>	<elision3>
10825	10826	<>	<elision2>
10825	10826	<>	<elision1>
10825	10822	<L2kl>	<>
10826	10824	<>	<name>
10826	10826	<>	<aphaerese>
10826	10826	<>	<elision3>
10826	10826	<>	<elision2>
10826	10826	<>	<elision1>
10826	10820	<L2kl>	<>
10827	10778	.	.
10827	10779	 	 
10827	10778	<~>	<~>
10827	10778	<split-s>	<split-s>
10827	10778	<split-h>	<split-h>
10827	10778	<name2>	<name2>
10827	10806	<name2>	<name>
10827	10821	<>	<name>
10827	10782	<aphaerese>	<aphaerese>
10827	10820	<>	<aphaerese>
10827	10778	<elision3>	<elision3>
10827	10820	<>	<elision3>
10827	10778	<elision2>	<elision2>
10827	10820	<>	<elision2>
10827	10778	<elision1>	<elision1>
10827	10820	<>	<elision1>
10827	10775	.	υ
10827	10702	s	υ
10827	10775	.	u
10827	10702	s	u
10827	10775	.	κ
10827	10816	s	κ
10827	10711	s	k
10827	10647	s	U
10827	10802	s	K
10827	10775	.	α
10827	10702	s	α
10827	10775	.	a
10827	10702	s	a
10827	10705	s	A
10827	10775	.	λ
10827	10816	s	λ
10827	10711	s	l
10827	10756	s	L
10827	10531	<2s>	<>
10828	10829	<>	<name>
10828	10828	<>	<aphaerese>
10828	10828	<>	<elision3>
10828	10828	<>	<elision2>
10828	10828	<>	<elision1>
10828	10831	s	κ
10828	10956	s	k
10828	10974	s	K
10828	10831	s	λ
10828	10987	s	l
10828	10990	s	L
10828	10165	<1s>	<>
10829	10830	<>	<aphaerese>
10829	10830	<>	<elision3>
10829	10830	<>	<elision2>
10829	10830	<>	<elision1>
10829	10952	s	κ
10829	10958	s	k
10829	10977	s	K
10829	10952	s	λ
10829	10989	s	l
10829	10992	s	L
10829	10166	<1s>	<>
10830	10828	<>	<aphaerese>
10830	10828	<>	<elision3>
10830	10828	<>	<elision2>
10830	10828	<>	<elision1>
10830	10831	s	κ
10830	10956	s	k
10830	10974	s	K
10830	10831	s	λ
10830	10987	s	l
10830	10990	s	L
10830	10164	<1s>	<>
10831	10832	.	.
10831	10833	 	 
10831	10832	<~>	<~>
10831	10832	<split-s>	<split-s>
10831	10832	<split-h>	<split-h>
10831	10832	<name2>	<name2>
10831	10951	<>	<name>
10831	10836	<aphaerese>	<aphaerese>
10831	10831	<>	<aphaerese>
10831	10831	<>	<elision3>
10831	10831	<>	<elision2>
10831	10831	<>	<elision1>
10831	10840	.	υ
10831	10843	s	υ
10831	10840	.	u
10831	10843	s	u
10831	10840	.	κ
10831	10953	s	κ
10831	10882	s	k
10831	10885	s	U
10831	10937	s	K
10831	10840	.	α
10831	10843	s	α
10831	10840	.	a
10831	10843	s	a
10831	10915	s	A
10831	10840	.	λ
10831	10953	s	λ
10831	10882	s	l
10831	10944	s	L
10831	10556	<2s>	<>
10832	10832	.	.
10832	10833	 	 
10832	10832	<~>	<~>
10832	10832	<split-s>	<split-s>
10832	10832	<split-h>	<split-h>
10832	10832	<name2>	<name2>
10832	10950	<>	<name>
10832	10836	<aphaerese>	<aphaerese>
10832	10832	<>	<aphaerese>
10832	10832	<elision3>	<elision3>
10832	10832	<>	<elision3>
10832	10832	<elision2>	<elision2>
10832	10832	<>	<elision2>
10832	10832	<elision1>	<elision1>
10832	10832	<>	<elision1>
10832	10840	.	υ
10832	10843	s	υ
10832	10840	.	u
10832	10843	s	u
10832	10861	.	κ
10832	10876	s	κ
10832	10882	s	k
10832	10885	s	U
10832	10937	s	K
10832	10840	.	α
10832	10843	s	α
10832	10840	.	a
10832	10843	s	a
10832	10915	s	A
10832	10882	s	λ
10832	10882	s	l
10832	10944	s	L
10832	10145	<2s>	<>
10833	10832	.	.
10833	10833	 	 
10833	10832	<~>	<~>
10833	10832	<split-s>	<split-s>
10833	10832	<split-h>	<split-h>
10833	10832	<name2>	<name2>
10833	10834	<>	<name>
10833	10836	<aphaerese>	<aphaerese>
10833	10839	<>	<aphaerese>
10833	10832	<elision3>	<elision3>
10833	10839	<>	<elision3>
10833	10832	<elision2>	<elision2>
10833	10839	<>	<elision2>
10833	10832	<elision1>	<elision1>
10833	10839	<>	<elision1>
10833	10840	.	υ
10833	10926	s	υ
10833	10840	.	u
10833	10926	s	u
10833	10861	.	κ
10833	10927	s	κ
10833	10928	s	k
10833	10929	s	U
10833	10931	s	K
10833	10840	.	α
10833	10926	s	α
10833	10840	.	a
10833	10926	s	a
10833	10933	s	A
10833	10928	s	λ
10833	10928	s	l
10833	10934	s	L
10833	10145	<2s>	<>
10834	10835	.	.
10834	10838	 	 
10834	10835	<~>	<~>
10834	10835	<split-s>	<split-s>
10834	10835	<split-h>	<split-h>
10834	10835	<name2>	<name2>
10834	10936	<aphaerese>	<aphaerese>
10834	10949	<>	<aphaerese>
10834	10835	<elision3>	<elision3>
10834	10949	<>	<elision3>
10834	10835	<elision2>	<elision2>
10834	10949	<>	<elision2>
10834	10835	<elision1>	<elision1>
10834	10949	<>	<elision1>
10834	10842	.	υ
10834	10860	s	υ
10834	10842	.	u
10834	10860	s	u
10834	10863	.	κ
10834	10878	s	κ
10834	10884	s	k
10834	10887	s	U
10834	10891	s	K
10834	10842	.	α
10834	10860	s	α
10834	10842	.	a
10834	10860	s	a
10834	10917	s	A
10834	10884	s	λ
10834	10884	s	l
10834	10920	s	L
10834	10146	<2s>	<>
10835	10832	.	.
10835	10833	 	 
10835	10832	<~>	<~>
10835	10832	<split-s>	<split-s>
10835	10832	<split-h>	<split-h>
10835	10832	<name2>	<name2>
10835	10836	<aphaerese>	<aphaerese>
10835	10832	<>	<aphaerese>
10835	10832	<elision3>	<elision3>
10835	10832	<>	<elision3>
10835	10832	<elision2>	<elision2>
10835	10832	<>	<elision2>
10835	10832	<elision1>	<elision1>
10835	10832	<>	<elision1>
10835	10840	.	υ
10835	10843	s	υ
10835	10840	.	u
10835	10843	s	u
10835	10861	.	κ
10835	10876	s	κ
10835	10882	s	k
10835	10885	s	U
10835	10937	s	K
10835	10840	.	α
10835	10843	s	α
10835	10840	.	a
10835	10843	s	a
10835	10915	s	A
10835	10882	s	λ
10835	10882	s	l
10835	10944	s	L
10835	10144	<2s>	<>
10836	10832	.	.
10836	10833	 	 
10836	10832	<~>	<~>
10836	10832	<split-s>	<split-s>
10836	10832	<split-h>	<split-h>
10836	10832	<name2>	<name2>
10836	10837	<>	<name>
10836	10836	<aphaerese>	<aphaerese>
10836	10836	<>	<aphaerese>
10836	10832	<elision3>	<elision3>
10836	10836	<>	<elision3>
10836	10832	<elision2>	<elision2>
10836	10836	<>	<elision2>
10836	10832	<elision1>	<elision1>
10836	10836	<>	<elision1>
10836	10832	.	υ
10836	10832	.	u
10836	10861	.	κ
10836	10876	s	κ
10836	10882	s	k
10836	10885	s	U
10836	10937	s	K
10836	10832	.	α
10836	10832	.	a
10836	10915	s	A
10836	10882	s	λ
10836	10882	s	l
10836	10944	s	L
10836	10132	<2s>	<>
10837	10835	.	.
10837	10838	 	 
10837	10835	<~>	<~>
10837	10835	<split-s>	<split-s>
10837	10835	<split-h>	<split-h>
10837	10835	<name2>	<name2>
10837	10936	<aphaerese>	<aphaerese>
10837	10936	<>	<aphaerese>
10837	10835	<elision3>	<elision3>
10837	10936	<>	<elision3>
10837	10835	<elision2>	<elision2>
10837	10936	<>	<elision2>
10837	10835	<elision1>	<elision1>
10837	10936	<>	<elision1>
10837	10835	.	υ
10837	10835	.	u
10837	10863	.	κ
10837	10878	s	κ
10837	10884	s	k
10837	10887	s	U
10837	10939	s	K
10837	10835	.	α
10837	10835	.	a
10837	10917	s	A
10837	10884	s	λ
10837	10884	s	l
10837	10946	s	L
10837	10133	<2s>	<>
10838	10832	.	.
10838	10833	 	 
10838	10832	<~>	<~>
10838	10832	<split-s>	<split-s>
10838	10832	<split-h>	<split-h>
10838	10832	<name2>	<name2>
10838	10836	<aphaerese>	<aphaerese>
10838	10839	<>	<aphaerese>
10838	10832	<elision3>	<elision3>
10838	10839	<>	<elision3>
10838	10832	<elision2>	<elision2>
10838	10839	<>	<elision2>
10838	10832	<elision1>	<elision1>
10838	10839	<>	<elision1>
10838	10840	.	υ
10838	10926	s	υ
10838	10840	.	u
10838	10926	s	u
10838	10861	.	κ
10838	10927	s	κ
10838	10928	s	k
10838	10929	s	U
10838	10931	s	K
10838	10840	.	α
10838	10926	s	α
10838	10840	.	a
10838	10926	s	a
10838	10933	s	A
10838	10928	s	λ
10838	10928	s	l
10838	10934	s	L
10838	10144	<2s>	<>
10839	10832	.	.
10839	10833	 	 
10839	10832	<~>	<~>
10839	10832	<split-s>	<split-s>
10839	10832	<split-h>	<split-h>
10839	10832	<name2>	<name2>
10839	10834	<>	<name>
10839	10836	<aphaerese>	<aphaerese>
10839	10839	<>	<aphaerese>
10839	10832	<elision3>	<elision3>
10839	10839	<>	<elision3>
10839	10832	<elision2>	<elision2>
10839	10839	<>	<elision2>
10839	10832	<elision1>	<elision1>
10839	10839	<>	<elision1>
10839	10840	.	υ
10839	10843	s	υ
10839	10840	.	u
10839	10843	s	u
10839	10861	.	κ
10839	10876	s	κ
10839	10882	s	k
10839	10885	s	U
10839	10888	s	K
10839	10840	.	α
10839	10843	s	α
10839	10840	.	a
10839	10843	s	a
10839	10915	s	A
10839	10882	s	λ
10839	10882	s	l
10839	10918	s	L
10839	10145	<2s>	<>
10840	10841	<>	<name>
10840	10840	<>	<aphaerese>
10840	10832	<elision3>	<elision3>
10840	10840	<>	<elision3>
10840	10832	<elision2>	<elision2>
10840	10840	<>	<elision2>
10840	10832	<elision1>	<elision1>
10840	10840	<>	<elision1>
10840	68	<2s>	<>
10841	10842	<>	<aphaerese>
10841	10835	<elision3>	<elision3>
10841	10842	<>	<elision3>
10841	10835	<elision2>	<elision2>
10841	10842	<>	<elision2>
10841	10835	<elision1>	<elision1>
10841	10842	<>	<elision1>
10841	69	<2s>	<>
10842	10840	<>	<aphaerese>
10842	10832	<elision3>	<elision3>
10842	10840	<>	<elision3>
10842	10832	<elision2>	<elision2>
10842	10840	<>	<elision2>
10842	10832	<elision1>	<elision1>
10842	10840	<>	<elision1>
10842	67	<2s>	<>
10843	10844	.	.
10843	10844	 	 
10843	10844	<~>	<~>
10843	10844	<split-s>	<split-s>
10843	10844	<split-h>	<split-h>
10843	10844	<name2>	<name2>
10843	10859	<>	<name>
10843	10847	<aphaerese>	<aphaerese>
10843	10843	<>	<aphaerese>
10843	10843	<>	<elision3>
10843	10843	<>	<elision2>
10843	10843	<>	<elision1>
10843	10856	.	υ
10843	10856	.	u
10843	10850	.	κ
10843	10856	.	α
10843	10856	.	a
10843	10541	<split-s>	<>
10844	10844	.	.
10844	10844	 	 
10844	10844	<~>	<~>
10844	10844	<split-s>	<split-s>
10844	10844	<split-h>	<split-h>
10844	10844	<name2>	<name2>
10844	10845	<>	<name>
10844	10847	<aphaerese>	<aphaerese>
10844	10844	<>	<aphaerese>
10844	10844	<elision3>	<elision3>
10844	10844	<>	<elision3>
10844	10844	<elision2>	<elision2>
10844	10844	<>	<elision2>
10844	10844	<elision1>	<elision1>
10844	10844	<>	<elision1>
10844	10856	.	υ
10844	10856	.	u
10844	10850	.	κ
10844	10856	.	α
10844	10856	.	a
10844	10487	<split-s>	<>
10845	10846	.	.
10845	10846	 	 
10845	10846	<~>	<~>
10845	10846	<split-s>	<split-s>
10845	10846	<split-h>	<split-h>
10845	10846	<name2>	<name2>
10845	10849	<aphaerese>	<aphaerese>
10845	10846	<>	<aphaerese>
10845	10846	<elision3>	<elision3>
10845	10846	<>	<elision3>
10845	10846	<elision2>	<elision2>
10845	10846	<>	<elision2>
10845	10846	<elision1>	<elision1>
10845	10846	<>	<elision1>
10845	10858	.	υ
10845	10858	.	u
10845	10852	.	κ
10845	10858	.	α
10845	10858	.	a
10845	10488	<split-s>	<>
10846	10844	.	.
10846	10844	 	 
10846	10844	<~>	<~>
10846	10844	<split-s>	<split-s>
10846	10844	<split-h>	<split-h>
10846	10844	<name2>	<name2>
10846	10847	<aphaerese>	<aphaerese>
10846	10844	<>	<aphaerese>
10846	10844	<elision3>	<elision3>
10846	10844	<>	<elision3>
10846	10844	<elision2>	<elision2>
10846	10844	<>	<elision2>
10846	10844	<elision1>	<elision1>
10846	10844	<>	<elision1>
10846	10856	.	υ
10846	10856	.	u
10846	10850	.	κ
10846	10856	.	α
10846	10856	.	a
10846	10489	<split-s>	<>
10847	10844	.	.
10847	10844	 	 
10847	10844	<~>	<~>
10847	10844	<split-s>	<split-s>
10847	10844	<split-h>	<split-h>
10847	10844	<name2>	<name2>
10847	10848	<>	<name>
10847	10847	<aphaerese>	<aphaerese>
10847	10847	<>	<aphaerese>
10847	10844	<elision3>	<elision3>
10847	10847	<>	<elision3>
10847	10844	<elision2>	<elision2>
10847	10847	<>	<elision2>
10847	10844	<elision1>	<elision1>
10847	10847	<>	<elision1>
10847	10844	.	υ
10847	10844	.	u
10847	10850	.	κ
10847	10844	.	α
10847	10844	.	a
10847	10534	<split-s>	<>
10848	10846	.	.
10848	10846	 	 
10848	10846	<~>	<~>
10848	10846	<split-s>	<split-s>
10848	10846	<split-h>	<split-h>
10848	10846	<name2>	<name2>
10848	10849	<aphaerese>	<aphaerese>
10848	10849	<>	<aphaerese>
10848	10846	<elision3>	<elision3>
10848	10849	<>	<elision3>
10848	10846	<elision2>	<elision2>
10848	10849	<>	<elision2>
10848	10846	<elision1>	<elision1>
10848	10849	<>	<elision1>
10848	10846	.	υ
10848	10846	.	u
10848	10852	.	κ
10848	10846	.	α
10848	10846	.	a
10848	10535	<split-s>	<>
10849	10844	.	.
10849	10844	 	 
10849	10844	<~>	<~>
10849	10844	<split-s>	<split-s>
10849	10844	<split-h>	<split-h>
10849	10844	<name2>	<name2>
10849	10847	<aphaerese>	<aphaerese>
10849	10847	<>	<aphaerese>
10849	10844	<elision3>	<elision3>
10849	10847	<>	<elision3>
10849	10844	<elision2>	<elision2>
10849	10847	<>	<elision2>
10849	10844	<elision1>	<elision1>
10849	10847	<>	<elision1>
10849	10844	.	υ
10849	10844	.	u
10849	10850	.	κ
10849	10844	.	α
10849	10844	.	a
10849	10533	<split-s>	<>
10850	10851	<>	<name>
10850	10850	<>	<aphaerese>
10850	10853	<elision3>	<elision3>
10850	10850	<>	<elision3>
10850	10853	<elision2>	<elision2>
10850	10850	<>	<elision2>
10850	10853	<elision1>	<elision1>
10850	10850	<>	<elision1>
10850	10224	<split-s>	<>
10851	10852	<>	<aphaerese>
10851	10855	<elision3>	<elision3>
10851	10852	<>	<elision3>
10851	10855	<elision2>	<elision2>
10851	10852	<>	<elision2>
10851	10855	<elision1>	<elision1>
10851	10852	<>	<elision1>
10851	10225	<split-s>	<>
10852	10850	<>	<aphaerese>
10852	10853	<elision3>	<elision3>
10852	10850	<>	<elision3>
10852	10853	<elision2>	<elision2>
10852	10850	<>	<elision2>
10852	10853	<elision1>	<elision1>
10852	10850	<>	<elision1>
10852	10223	<split-s>	<>
10853	10854	<>	<name>
10853	10853	<>	<aphaerese>
10853	10853	<>	<elision3>
10853	10853	<>	<elision2>
10853	10853	<>	<elision1>
10853	10221	<split-s>	<>
10854	10855	<>	<aphaerese>
10854	10855	<>	<elision3>
10854	10855	<>	<elision2>
10854	10855	<>	<elision1>
10854	10222	<split-s>	<>
10855	10853	<>	<aphaerese>
10855	10853	<>	<elision3>
10855	10853	<>	<elision2>
10855	10853	<>	<elision1>
10855	10220	<split-s>	<>
10856	10857	<>	<name>
10856	10856	<>	<aphaerese>
10856	10844	<elision3>	<elision3>
10856	10856	<>	<elision3>
10856	10844	<elision2>	<elision2>
10856	10856	<>	<elision2>
10856	10844	<elision1>	<elision1>
10856	10856	<>	<elision1>
10856	9974	<split-s>	<>
10857	10858	<>	<aphaerese>
10857	10846	<elision3>	<elision3>
10857	10858	<>	<elision3>
10857	10846	<elision2>	<elision2>
10857	10858	<>	<elision2>
10857	10846	<elision1>	<elision1>
10857	10858	<>	<elision1>
10857	9975	<split-s>	<>
10858	10856	<>	<aphaerese>
10858	10844	<elision3>	<elision3>
10858	10856	<>	<elision3>
10858	10844	<elision2>	<elision2>
10858	10856	<>	<elision2>
10858	10844	<elision1>	<elision1>
10858	10856	<>	<elision1>
10858	9973	<split-s>	<>
10859	10846	.	.
10859	10846	 	 
10859	10846	<~>	<~>
10859	10846	<split-s>	<split-s>
10859	10846	<split-h>	<split-h>
10859	10846	<name2>	<name2>
10859	10849	<aphaerese>	<aphaerese>
10859	10860	<>	<aphaerese>
10859	10860	<>	<elision3>
10859	10860	<>	<elision2>
10859	10860	<>	<elision1>
10859	10858	.	υ
10859	10858	.	u
10859	10852	.	κ
10859	10858	.	α
10859	10858	.	a
10859	10542	<split-s>	<>
10860	10844	.	.
10860	10844	 	 
10860	10844	<~>	<~>
10860	10844	<split-s>	<split-s>
10860	10844	<split-h>	<split-h>
10860	10844	<name2>	<name2>
10860	10847	<aphaerese>	<aphaerese>
10860	10843	<>	<aphaerese>
10860	10843	<>	<elision3>
10860	10843	<>	<elision2>
10860	10843	<>	<elision1>
10860	10856	.	υ
10860	10856	.	u
10860	10850	.	κ
10860	10856	.	α
10860	10856	.	a
10860	10540	<split-s>	<>
10861	10862	<>	<name>
10861	10861	<>	<aphaerese>
10861	10864	<elision3>	<elision3>
10861	10861	<>	<elision3>
10861	10864	<elision2>	<elision2>
10861	10861	<>	<elision2>
10861	10864	<elision1>	<elision1>
10861	10861	<>	<elision1>
10861	10129	<2s>	<>
10862	10863	<>	<aphaerese>
10862	10866	<elision3>	<elision3>
10862	10863	<>	<elision3>
10862	10866	<elision2>	<elision2>
10862	10863	<>	<elision2>
10862	10866	<elision1>	<elision1>
10862	10863	<>	<elision1>
10862	10130	<2s>	<>
10863	10861	<>	<aphaerese>
10863	10864	<elision3>	<elision3>
10863	10861	<>	<elision3>
10863	10864	<elision2>	<elision2>
10863	10861	<>	<elision2>
10863	10864	<elision1>	<elision1>
10863	10861	<>	<elision1>
10863	10128	<2s>	<>
10864	10865	<>	<name>
10864	10864	<>	<aphaerese>
10864	10864	<>	<elision3>
10864	10864	<>	<elision2>
10864	10864	<>	<elision1>
10864	10867	s	κ
10864	10867	s	k
10864	10870	s	K
10864	10867	s	λ
10864	10867	s	l
10864	10873	s	L
10864	9990	<2s>	<>
10865	10866	<>	<aphaerese>
10865	10866	<>	<elision3>
10865	10866	<>	<elision2>
10865	10866	<>	<elision1>
10865	10869	s	κ
10865	10869	s	k
10865	10872	s	K
10865	10869	s	λ
10865	10869	s	l
10865	10875	s	L
10865	9991	<2s>	<>
10866	10864	<>	<aphaerese>
10866	10864	<>	<elision3>
10866	10864	<>	<elision2>
10866	10864	<>	<elision1>
10866	10867	s	κ
10866	10867	s	k
10866	10870	s	K
10866	10867	s	λ
10866	10867	s	l
10866	10873	s	L
10866	9989	<2s>	<>
10867	10868	<>	<name>
10867	10867	<>	<aphaerese>
10867	10867	<>	<elision3>
10867	10867	<>	<elision2>
10867	10867	<>	<elision1>
10867	10562	<split-s>	<>
10868	10869	<>	<aphaerese>
10868	10869	<>	<elision3>
10868	10869	<>	<elision2>
10868	10869	<>	<elision1>
10868	10563	<split-s>	<>
10869	10867	<>	<aphaerese>
10869	10867	<>	<elision3>
10869	10867	<>	<elision2>
10869	10867	<>	<elision1>
10869	10561	<split-s>	<>
10870	10871	<>	<name>
10870	10870	<>	<aphaerese>
10870	10870	<>	<elision3>
10870	10870	<>	<elision2>
10870	10870	<>	<elision1>
10870	10867	<K2kl>	<>
10871	10872	<>	<aphaerese>
10871	10872	<>	<elision3>
10871	10872	<>	<elision2>
10871	10872	<>	<elision1>
10871	10868	<K2kl>	<>
10872	10870	<>	<aphaerese>
10872	10870	<>	<elision3>
10872	10870	<>	<elision2>
10872	10870	<>	<elision1>
10872	10869	<K2kl>	<>
10873	10874	<>	<name>
10873	10873	<>	<aphaerese>
10873	10873	<>	<elision3>
10873	10873	<>	<elision2>
10873	10873	<>	<elision1>
10873	10867	<L2kl>	<>
10874	10875	<>	<aphaerese>
10874	10875	<>	<elision3>
10874	10875	<>	<elision2>
10874	10875	<>	<elision1>
10874	10868	<L2kl>	<>
10875	10873	<>	<aphaerese>
10875	10873	<>	<elision3>
10875	10873	<>	<elision2>
10875	10873	<>	<elision1>
10875	10869	<L2kl>	<>
10876	10844	.	.
10876	10844	 	 
10876	10844	<~>	<~>
10876	10844	<split-s>	<split-s>
10876	10844	<split-h>	<split-h>
10876	10844	<name2>	<name2>
10876	10877	<>	<name>
10876	10847	<aphaerese>	<aphaerese>
10876	10876	<>	<aphaerese>
10876	10879	<elision3>	<elision3>
10876	10876	<>	<elision3>
10876	10879	<elision2>	<elision2>
10876	10876	<>	<elision2>
10876	10879	<elision1>	<elision1>
10876	10876	<>	<elision1>
10876	10856	.	υ
10876	10856	.	u
10876	10856	.	κ
10876	10856	.	α
10876	10856	.	a
10876	10856	.	λ
10876	10624	<split-s>	<>
10877	10846	.	.
10877	10846	 	 
10877	10846	<~>	<~>
10877	10846	<split-s>	<split-s>
10877	10846	<split-h>	<split-h>
10877	10846	<name2>	<name2>
10877	10849	<aphaerese>	<aphaerese>
10877	10878	<>	<aphaerese>
10877	10881	<elision3>	<elision3>
10877	10878	<>	<elision3>
10877	10881	<elision2>	<elision2>
10877	10878	<>	<elision2>
10877	10881	<elision1>	<elision1>
10877	10878	<>	<elision1>
10877	10858	.	υ
10877	10858	.	u
10877	10858	.	κ
10877	10858	.	α
10877	10858	.	a
10877	10858	.	λ
10877	10625	<split-s>	<>
10878	10844	.	.
10878	10844	 	 
10878	10844	<~>	<~>
10878	10844	<split-s>	<split-s>
10878	10844	<split-h>	<split-h>
10878	10844	<name2>	<name2>
10878	10847	<aphaerese>	<aphaerese>
10878	10876	<>	<aphaerese>
10878	10879	<elision3>	<elision3>
10878	10876	<>	<elision3>
10878	10879	<elision2>	<elision2>
10878	10876	<>	<elision2>
10878	10879	<elision1>	<elision1>
10878	10876	<>	<elision1>
10878	10856	.	υ
10878	10856	.	u
10878	10856	.	κ
10878	10856	.	α
10878	10856	.	a
10878	10856	.	λ
10878	10623	<split-s>	<>
10879	10844	.	.
10879	10844	 	 
10879	10844	<~>	<~>
10879	10844	<split-s>	<split-s>
10879	10844	<split-h>	<split-h>
10879	10844	<name2>	<name2>
10879	10880	<>	<name>
10879	10847	<aphaerese>	<aphaerese>
10879	10879	<>	<aphaerese>
10879	10844	<elision3>	<elision3>
10879	10879	<>	<elision3>
10879	10844	<elision2>	<elision2>
10879	10879	<>	<elision2>
10879	10844	<elision1>	<elision1>
10879	10879	<>	<elision1>
10879	10856	.	υ
10879	10856	.	u
10879	10850	.	κ
10879	10856	.	α
10879	10856	.	a
10879	10621	<split-s>	<>
10880	10846	.	.
10880	10846	 	 
10880	10846	<~>	<~>
10880	10846	<split-s>	<split-s>
10880	10846	<split-h>	<split-h>
10880	10846	<name2>	<name2>
10880	10849	<aphaerese>	<aphaerese>
10880	10881	<>	<aphaerese>
10880	10846	<elision3>	<elision3>
10880	10881	<>	<elision3>
10880	10846	<elision2>	<elision2>
10880	10881	<>	<elision2>
10880	10846	<elision1>	<elision1>
10880	10881	<>	<elision1>
10880	10858	.	υ
10880	10858	.	u
10880	10852	.	κ
10880	10858	.	α
10880	10858	.	a
10880	10622	<split-s>	<>
10881	10844	.	.
10881	10844	 	 
10881	10844	<~>	<~>
10881	10844	<split-s>	<split-s>
10881	10844	<split-h>	<split-h>
10881	10844	<name2>	<name2>
10881	10847	<aphaerese>	<aphaerese>
10881	10879	<>	<aphaerese>
10881	10844	<elision3>	<elision3>
10881	10879	<>	<elision3>
10881	10844	<elision2>	<elision2>
10881	10879	<>	<elision2>
10881	10844	<elision1>	<elision1>
10881	10879	<>	<elision1>
10881	10856	.	υ
10881	10856	.	u
10881	10850	.	κ
10881	10856	.	α
10881	10856	.	a
10881	10620	<split-s>	<>
10882	10844	.	.
10882	10844	 	 
10882	10844	<~>	<~>
10882	10844	<split-s>	<split-s>
10882	10844	<split-h>	<split-h>
10882	10844	<name2>	<name2>
10882	10883	<>	<name>
10882	10847	<aphaerese>	<aphaerese>
10882	10882	<>	<aphaerese>
10882	10844	<elision3>	<elision3>
10882	10882	<>	<elision3>
10882	10844	<elision2>	<elision2>
10882	10882	<>	<elision2>
10882	10844	<elision1>	<elision1>
10882	10882	<>	<elision1>
10882	10856	.	υ
10882	10856	.	u
10882	10856	.	κ
10882	10856	.	α
10882	10856	.	a
10882	10856	.	λ
10882	10645	<split-s>	<>
10883	10846	.	.
10883	10846	 	 
10883	10846	<~>	<~>
10883	10846	<split-s>	<split-s>
10883	10846	<split-h>	<split-h>
10883	10846	<name2>	<name2>
10883	10849	<aphaerese>	<aphaerese>
10883	10884	<>	<aphaerese>
10883	10846	<elision3>	<elision3>
10883	10884	<>	<elision3>
10883	10846	<elision2>	<elision2>
10883	10884	<>	<elision2>
10883	10846	<elision1>	<elision1>
10883	10884	<>	<elision1>
10883	10858	.	υ
10883	10858	.	u
10883	10858	.	κ
10883	10858	.	α
10883	10858	.	a
10883	10858	.	λ
10883	10646	<split-s>	<>
10884	10844	.	.
10884	10844	 	 
10884	10844	<~>	<~>
10884	10844	<split-s>	<split-s>
10884	10844	<split-h>	<split-h>
10884	10844	<name2>	<name2>
10884	10847	<aphaerese>	<aphaerese>
10884	10882	<>	<aphaerese>
10884	10844	<elision3>	<elision3>
10884	10882	<>	<elision3>
10884	10844	<elision2>	<elision2>
10884	10882	<>	<elision2>
10884	10844	<elision1>	<elision1>
10884	10882	<>	<elision1>
10884	10856	.	υ
10884	10856	.	u
10884	10856	.	κ
10884	10856	.	α
10884	10856	.	a
10884	10856	.	λ
10884	10644	<split-s>	<>
10885	10886	<>	<name>
10885	10885	<>	<aphaerese>
10885	10885	<>	<elision3>
10885	10885	<>	<elision2>
10885	10885	<>	<elision1>
10885	10844	<U2kl>	<>
10886	10887	<>	<aphaerese>
10886	10887	<>	<elision3>
10886	10887	<>	<elision2>
10886	10887	<>	<elision1>
10886	10845	<U2kl>	<>
10887	10885	<>	<aphaerese>
10887	10885	<>	<elision3>
10887	10885	<>	<elision2>
10887	10885	<>	<elision1>
10887	10846	<U2kl>	<>
10888	10889	<name>	<name>
10888	10890	<>	<name>
10888	10892	<>	<aphaerese>
10888	10892	<>	<elision3>
10888	10892	<>	<elision2>
10888	10892	<>	<elision1>
10888	10698	<split-s>	<>
10888	10893	<A2kl>	<>
10888	10902	<L2kl>	<>
10888	10914	<K2kl>	<>
10889	10652	<split-s>	<>
10890	10891	<>	<aphaerese>
10890	10891	<>	<elision3>
10890	10891	<>	<elision2>
10890	10891	<>	<elision1>
10890	10894	<A2kl>	<>
10890	10903	<L2kl>	<>
10890	10912	<K2kl>	<>
10891	10892	<>	<aphaerese>
10891	10892	<>	<elision3>
10891	10892	<>	<elision2>
10891	10892	<>	<elision1>
10891	10895	<A2kl>	<>
10891	10904	<L2kl>	<>
10891	10913	<K2kl>	<>
10892	10890	<>	<name>
10892	10892	<>	<aphaerese>
10892	10892	<>	<elision3>
10892	10892	<>	<elision2>
10892	10892	<>	<elision1>
10892	10893	<A2kl>	<>
10892	10902	<L2kl>	<>
10892	10911	<K2kl>	<>
10893	10894	<>	<name>
10893	10893	<>	<aphaerese>
10893	10893	<>	<elision3>
10893	10893	<>	<elision2>
10893	10893	<>	<elision1>
10893	10896	.	κ
10893	10896	.	λ
10893	10672	<split-s>	<>
10894	10895	<>	<aphaerese>
10894	10895	<>	<elision3>
10894	10895	<>	<elision2>
10894	10895	<>	<elision1>
10894	10898	.	κ
10894	10898	.	λ
10894	10673	<split-s>	<>
10895	10893	<>	<aphaerese>
10895	10893	<>	<elision3>
10895	10893	<>	<elision2>
10895	10893	<>	<elision1>
10895	10896	.	κ
10895	10896	.	λ
10895	10671	<split-s>	<>
10896	10897	<>	<name>
10896	10896	<>	<aphaerese>
10896	10899	<elision3>	<elision3>
10896	10896	<>	<elision3>
10896	10899	<elision2>	<elision2>
10896	10896	<>	<elision2>
10896	10899	<elision1>	<elision1>
10896	10896	<>	<elision1>
10896	10669	<split-s>	<>
10897	10898	<>	<aphaerese>
10897	10901	<elision3>	<elision3>
10897	10898	<>	<elision3>
10897	10901	<elision2>	<elision2>
10897	10898	<>	<elision2>
10897	10901	<elision1>	<elision1>
10897	10898	<>	<elision1>
10897	10670	<split-s>	<>
10898	10896	<>	<aphaerese>
10898	10899	<elision3>	<elision3>
10898	10896	<>	<elision3>
10898	10899	<elision2>	<elision2>
10898	10896	<>	<elision2>
10898	10899	<elision1>	<elision1>
10898	10896	<>	<elision1>
10898	10668	<split-s>	<>
10899	10844	.	.
10899	10844	 	 
10899	10844	<~>	<~>
10899	10844	<split-s>	<split-s>
10899	10844	<split-h>	<split-h>
10899	10844	<name2>	<name2>
10899	10900	<>	<name>
10899	10847	<aphaerese>	<aphaerese>
10899	10899	<>	<aphaerese>
10899	10844	<elision3>	<elision3>
10899	10899	<>	<elision3>
10899	10844	<elision2>	<elision2>
10899	10899	<>	<elision2>
10899	10844	<elision1>	<elision1>
10899	10899	<>	<elision1>
10899	10856	.	υ
10899	10856	.	u
10899	10856	.	α
10899	10856	.	a
10899	10666	<split-s>	<>
10900	10846	.	.
10900	10846	 	 
10900	10846	<~>	<~>
10900	10846	<split-s>	<split-s>
10900	10846	<split-h>	<split-h>
10900	10846	<name2>	<name2>
10900	10849	<aphaerese>	<aphaerese>
10900	10901	<>	<aphaerese>
10900	10846	<elision3>	<elision3>
10900	10901	<>	<elision3>
10900	10846	<elision2>	<elision2>
10900	10901	<>	<elision2>
10900	10846	<elision1>	<elision1>
10900	10901	<>	<elision1>
10900	10858	.	υ
10900	10858	.	u
10900	10858	.	α
10900	10858	.	a
10900	10667	<split-s>	<>
10901	10844	.	.
10901	10844	 	 
10901	10844	<~>	<~>
10901	10844	<split-s>	<split-s>
10901	10844	<split-h>	<split-h>
10901	10844	<name2>	<name2>
10901	10847	<aphaerese>	<aphaerese>
10901	10899	<>	<aphaerese>
10901	10844	<elision3>	<elision3>
10901	10899	<>	<elision3>
10901	10844	<elision2>	<elision2>
10901	10899	<>	<elision2>
10901	10844	<elision1>	<elision1>
10901	10899	<>	<elision1>
10901	10856	.	υ
10901	10856	.	u
10901	10856	.	α
10901	10856	.	a
10901	10665	<split-s>	<>
10902	10903	<>	<name>
10902	10902	<>	<aphaerese>
10902	10902	<>	<elision3>
10902	10902	<>	<elision2>
10902	10902	<>	<elision1>
10902	10905	.	κ
10902	10905	.	λ
10902	10690	<split-s>	<>
10903	10904	<>	<aphaerese>
10903	10904	<>	<elision3>
10903	10904	<>	<elision2>
10903	10904	<>	<elision1>
10903	10907	.	κ
10903	10907	.	λ
10903	10691	<split-s>	<>
10904	10902	<>	<aphaerese>
10904	10902	<>	<elision3>
10904	10902	<>	<elision2>
10904	10902	<>	<elision1>
10904	10905	.	κ
10904	10905	.	λ
10904	10689	<split-s>	<>
10905	10906	<>	<name>
10905	10905	<>	<aphaerese>
10905	10908	<elision3>	<elision3>
10905	10905	<>	<elision3>
10905	10908	<elision2>	<elision2>
10905	10905	<>	<elision2>
10905	10908	<elision1>	<elision1>
10905	10905	<>	<elision1>
10905	10687	<split-s>	<>
10906	10907	<>	<aphaerese>
10906	10910	<elision3>	<elision3>
10906	10907	<>	<elision3>
10906	10910	<elision2>	<elision2>
10906	10907	<>	<elision2>
10906	10910	<elision1>	<elision1>
10906	10907	<>	<elision1>
10906	10688	<split-s>	<>
10907	10905	<>	<aphaerese>
10907	10908	<elision3>	<elision3>
10907	10905	<>	<elision3>
10907	10908	<elision2>	<elision2>
10907	10905	<>	<elision2>
10907	10908	<elision1>	<elision1>
10907	10905	<>	<elision1>
10907	10686	<split-s>	<>
10908	10909	<>	<name>
10908	10908	<>	<aphaerese>
10908	10908	<>	<elision3>
10908	10908	<>	<elision2>
10908	10908	<>	<elision1>
10908	10850	.	κ
10908	10684	<split-s>	<>
10909	10910	<>	<aphaerese>
10909	10910	<>	<elision3>
10909	10910	<>	<elision2>
10909	10910	<>	<elision1>
10909	10852	.	κ
10909	10685	<split-s>	<>
10910	10908	<>	<aphaerese>
10910	10908	<>	<elision3>
10910	10908	<>	<elision2>
10910	10908	<>	<elision1>
10910	10850	.	κ
10910	10683	<split-s>	<>
10911	10844	.	.
10911	10844	 	 
10911	10844	<~>	<~>
10911	10844	<split-s>	<split-s>
10911	10844	<split-h>	<split-h>
10911	10844	<name2>	<name2>
10911	10912	<>	<name>
10911	10847	<aphaerese>	<aphaerese>
10911	10911	<>	<aphaerese>
10911	10844	<elision3>	<elision3>
10911	10911	<>	<elision3>
10911	10844	<elision2>	<elision2>
10911	10911	<>	<elision2>
10911	10844	<elision1>	<elision1>
10911	10911	<>	<elision1>
10911	10856	.	υ
10911	10856	.	u
10911	10856	.	α
10911	10856	.	a
10911	10696	<split-s>	<>
10912	10846	.	.
10912	10846	 	 
10912	10846	<~>	<~>
10912	10846	<split-s>	<split-s>
10912	10846	<split-h>	<split-h>
10912	10846	<name2>	<name2>
10912	10849	<aphaerese>	<aphaerese>
10912	10913	<>	<aphaerese>
10912	10846	<elision3>	<elision3>
10912	10913	<>	<elision3>
10912	10846	<elision2>	<elision2>
10912	10913	<>	<elision2>
10912	10846	<elision1>	<elision1>
10912	10913	<>	<elision1>
10912	10858	.	υ
10912	10858	.	u
10912	10858	.	α
10912	10858	.	a
10912	10697	<split-s>	<>
10913	10844	.	.
10913	10844	 	 
10913	10844	<~>	<~>
10913	10844	<split-s>	<split-s>
10913	10844	<split-h>	<split-h>
10913	10844	<name2>	<name2>
10913	10847	<aphaerese>	<aphaerese>
10913	10911	<>	<aphaerese>
10913	10844	<elision3>	<elision3>
10913	10911	<>	<elision3>
10913	10844	<elision2>	<elision2>
10913	10911	<>	<elision2>
10913	10844	<elision1>	<elision1>
10913	10911	<>	<elision1>
10913	10856	.	υ
10913	10856	.	u
10913	10856	.	α
10913	10856	.	a
10913	10695	<split-s>	<>
10914	10844	.	.
10914	10844	 	 
10914	10844	<~>	<~>
10914	10844	<split-s>	<split-s>
10914	10844	<split-h>	<split-h>
10914	10844	<name2>	<name2>
10914	10889	<name2>	<name>
10914	10912	<>	<name>
10914	10847	<aphaerese>	<aphaerese>
10914	10911	<>	<aphaerese>
10914	10844	<elision3>	<elision3>
10914	10911	<>	<elision3>
10914	10844	<elision2>	<elision2>
10914	10911	<>	<elision2>
10914	10844	<elision1>	<elision1>
10914	10911	<>	<elision1>
10914	10856	.	υ
10914	10856	.	u
10914	10856	.	α
10914	10856	.	a
10914	10701	<split-s>	<>
10915	10916	<>	<name>
10915	10915	<>	<aphaerese>
10915	10915	<>	<elision3>
10915	10915	<>	<elision2>
10915	10915	<>	<elision1>
10915	10844	<A2kl>	<>
10916	10917	<>	<aphaerese>
10916	10917	<>	<elision3>
10916	10917	<>	<elision2>
10916	10917	<>	<elision1>
10916	10845	<A2kl>	<>
10917	10915	<>	<aphaerese>
10917	10915	<>	<elision3>
10917	10915	<>	<elision2>
10917	10915	<>	<elision1>
10917	10846	<A2kl>	<>
10918	10889	<name>	<name>
10918	10919	<>	<name>
10918	10921	<>	<aphaerese>
10918	10921	<>	<elision3>
10918	10921	<>	<elision2>
10918	10921	<>	<elision1>
10918	10698	<split-s>	<>
10918	10893	<A2kl>	<>
10918	10925	<L2kl>	<>
10919	10920	<>	<aphaerese>
10919	10920	<>	<elision3>
10919	10920	<>	<elision2>
10919	10920	<>	<elision1>
10919	10894	<A2kl>	<>
10919	10923	<L2kl>	<>
10920	10921	<>	<aphaerese>
10920	10921	<>	<elision3>
10920	10921	<>	<elision2>
10920	10921	<>	<elision1>
10920	10895	<A2kl>	<>
10920	10924	<L2kl>	<>
10921	10919	<>	<name>
10921	10921	<>	<aphaerese>
10921	10921	<>	<elision3>
10921	10921	<>	<elision2>
10921	10921	<>	<elision1>
10921	10893	<A2kl>	<>
10921	10922	<L2kl>	<>
10922	10844	.	.
10922	10844	 	 
10922	10844	<~>	<~>
10922	10844	<split-s>	<split-s>
10922	10844	<split-h>	<split-h>
10922	10844	<name2>	<name2>
10922	10923	<>	<name>
10922	10847	<aphaerese>	<aphaerese>
10922	10922	<>	<aphaerese>
10922	10844	<elision3>	<elision3>
10922	10922	<>	<elision3>
10922	10844	<elision2>	<elision2>
10922	10922	<>	<elision2>
10922	10844	<elision1>	<elision1>
10922	10922	<>	<elision1>
10922	10856	.	υ
10922	10856	.	u
10922	10905	.	κ
10922	10856	.	α
10922	10856	.	a
10922	10905	.	λ
10922	10722	<split-s>	<>
10923	10846	.	.
10923	10846	 	 
10923	10846	<~>	<~>
10923	10846	<split-s>	<split-s>
10923	10846	<split-h>	<split-h>
10923	10846	<name2>	<name2>
10923	10849	<aphaerese>	<aphaerese>
10923	10924	<>	<aphaerese>
10923	10846	<elision3>	<elision3>
10923	10924	<>	<elision3>
10923	10846	<elision2>	<elision2>
10923	10924	<>	<elision2>
10923	10846	<elision1>	<elision1>
10923	10924	<>	<elision1>
10923	10858	.	υ
10923	10858	.	u
10923	10907	.	κ
10923	10858	.	α
10923	10858	.	a
10923	10907	.	λ
10923	10723	<split-s>	<>
10924	10844	.	.
10924	10844	 	 
10924	10844	<~>	<~>
10924	10844	<split-s>	<split-s>
10924	10844	<split-h>	<split-h>
10924	10844	<name2>	<name2>
10924	10847	<aphaerese>	<aphaerese>
10924	10922	<>	<aphaerese>
10924	10844	<elision3>	<elision3>
10924	10922	<>	<elision3>
10924	10844	<elision2>	<elision2>
10924	10922	<>	<elision2>
10924	10844	<elision1>	<elision1>
10924	10922	<>	<elision1>
10924	10856	.	υ
10924	10856	.	u
10924	10905	.	κ
10924	10856	.	α
10924	10856	.	a
10924	10905	.	λ
10924	10721	<split-s>	<>
10925	10844	.	.
10925	10844	 	 
10925	10844	<~>	<~>
10925	10844	<split-s>	<split-s>
10925	10844	<split-h>	<split-h>
10925	10844	<name2>	<name2>
10925	10889	<name2>	<name>
10925	10923	<>	<name>
10925	10847	<aphaerese>	<aphaerese>
10925	10922	<>	<aphaerese>
10925	10844	<elision3>	<elision3>
10925	10922	<>	<elision3>
10925	10844	<elision2>	<elision2>
10925	10922	<>	<elision2>
10925	10844	<elision1>	<elision1>
10925	10922	<>	<elision1>
10925	10856	.	υ
10925	10856	.	u
10925	10905	.	κ
10925	10856	.	α
10925	10856	.	a
10925	10905	.	λ
10925	10725	<split-s>	<>
10926	10844	.	.
10926	10844	 	 
10926	10844	<~>	<~>
10926	10844	<split-s>	<split-s>
10926	10844	<split-h>	<split-h>
10926	10844	<name2>	<name2>
10926	10859	<>	<name>
10926	10847	<aphaerese>	<aphaerese>
10926	10843	<>	<aphaerese>
10926	10843	<>	<elision3>
10926	10843	<>	<elision2>
10926	10843	<>	<elision1>
10926	10856	.	υ
10926	10856	.	u
10926	10850	.	κ
10926	10856	.	α
10926	10856	.	a
10926	10727	<split-s>	<>
10927	10844	.	.
10927	10844	 	 
10927	10844	<~>	<~>
10927	10844	<split-s>	<split-s>
10927	10844	<split-h>	<split-h>
10927	10844	<name2>	<name2>
10927	10877	<>	<name>
10927	10847	<aphaerese>	<aphaerese>
10927	10876	<>	<aphaerese>
10927	10879	<elision3>	<elision3>
10927	10876	<>	<elision3>
10927	10879	<elision2>	<elision2>
10927	10876	<>	<elision2>
10927	10879	<elision1>	<elision1>
10927	10876	<>	<elision1>
10927	10856	.	υ
10927	10856	.	u
10927	10856	.	κ
10927	10856	.	α
10927	10856	.	a
10927	10856	.	λ
10927	10729	<split-s>	<>
10928	10844	.	.
10928	10844	 	 
10928	10844	<~>	<~>
10928	10844	<split-s>	<split-s>
10928	10844	<split-h>	<split-h>
10928	10844	<name2>	<name2>
10928	10883	<>	<name>
10928	10847	<aphaerese>	<aphaerese>
10928	10882	<>	<aphaerese>
10928	10844	<elision3>	<elision3>
10928	10882	<>	<elision3>
10928	10844	<elision2>	<elision2>
10928	10882	<>	<elision2>
10928	10844	<elision1>	<elision1>
10928	10882	<>	<elision1>
10928	10856	.	υ
10928	10856	.	u
10928	10856	.	κ
10928	10856	.	α
10928	10856	.	a
10928	10856	.	λ
10928	10731	<split-s>	<>
10929	10886	<>	<name>
10929	10885	<>	<aphaerese>
10929	10885	<>	<elision3>
10929	10885	<>	<elision2>
10929	10885	<>	<elision1>
10929	10930	<U2kl>	<>
10930	10844	.	.
10930	10844	 	 
10930	10844	<~>	<~>
10930	10844	<split-s>	<split-s>
10930	10844	<split-h>	<split-h>
10930	10844	<name2>	<name2>
10930	10845	<>	<name>
10930	10847	<aphaerese>	<aphaerese>
10930	10844	<>	<aphaerese>
10930	10844	<elision3>	<elision3>
10930	10844	<>	<elision3>
10930	10844	<elision2>	<elision2>
10930	10844	<>	<elision2>
10930	10844	<elision1>	<elision1>
10930	10844	<>	<elision1>
10930	10856	.	υ
10930	10856	.	u
10930	10850	.	κ
10930	10856	.	α
10930	10856	.	a
10930	10734	<split-s>	<>
10931	10889	<name>	<name>
10931	10890	<>	<name>
10931	10892	<>	<aphaerese>
10931	10892	<>	<elision3>
10931	10892	<>	<elision2>
10931	10892	<>	<elision1>
10931	10698	<split-s>	<>
10931	10893	<A2kl>	<>
10931	10902	<L2kl>	<>
10931	10932	<K2kl>	<>
10932	10844	.	.
10932	10844	 	 
10932	10844	<~>	<~>
10932	10844	<split-s>	<split-s>
10932	10844	<split-h>	<split-h>
10932	10844	<name2>	<name2>
10932	10889	<name2>	<name>
10932	10912	<>	<name>
10932	10847	<aphaerese>	<aphaerese>
10932	10911	<>	<aphaerese>
10932	10844	<elision3>	<elision3>
10932	10911	<>	<elision3>
10932	10844	<elision2>	<elision2>
10932	10911	<>	<elision2>
10932	10844	<elision1>	<elision1>
10932	10911	<>	<elision1>
10932	10856	.	υ
10932	10856	.	u
10932	10856	.	α
10932	10856	.	a
10932	10737	<split-s>	<>
10933	10916	<>	<name>
10933	10915	<>	<aphaerese>
10933	10915	<>	<elision3>
10933	10915	<>	<elision2>
10933	10915	<>	<elision1>
10933	10930	<A2kl>	<>
10934	10889	<name>	<name>
10934	10919	<>	<name>
10934	10921	<>	<aphaerese>
10934	10921	<>	<elision3>
10934	10921	<>	<elision2>
10934	10921	<>	<elision1>
10934	10698	<split-s>	<>
10934	10893	<A2kl>	<>
10934	10935	<L2kl>	<>
10935	10844	.	.
10935	10844	 	 
10935	10844	<~>	<~>
10935	10844	<split-s>	<split-s>
10935	10844	<split-h>	<split-h>
10935	10844	<name2>	<name2>
10935	10889	<name2>	<name>
10935	10923	<>	<name>
10935	10847	<aphaerese>	<aphaerese>
10935	10922	<>	<aphaerese>
10935	10844	<elision3>	<elision3>
10935	10922	<>	<elision3>
10935	10844	<elision2>	<elision2>
10935	10922	<>	<elision2>
10935	10844	<elision1>	<elision1>
10935	10922	<>	<elision1>
10935	10856	.	υ
10935	10856	.	u
10935	10905	.	κ
10935	10856	.	α
10935	10856	.	a
10935	10905	.	λ
10935	10744	<split-s>	<>
10936	10832	.	.
10936	10833	 	 
10936	10832	<~>	<~>
10936	10832	<split-s>	<split-s>
10936	10832	<split-h>	<split-h>
10936	10832	<name2>	<name2>
10936	10836	<aphaerese>	<aphaerese>
10936	10836	<>	<aphaerese>
10936	10832	<elision3>	<elision3>
10936	10836	<>	<elision3>
10936	10832	<elision2>	<elision2>
10936	10836	<>	<elision2>
10936	10832	<elision1>	<elision1>
10936	10836	<>	<elision1>
10936	10832	.	υ
10936	10832	.	u
10936	10861	.	κ
10936	10876	s	κ
10936	10882	s	k
10936	10885	s	U
10936	10937	s	K
10936	10832	.	α
10936	10832	.	a
10936	10915	s	A
10936	10882	s	λ
10936	10882	s	l
10936	10944	s	L
10936	10131	<2s>	<>
10937	10889	<name>	<name>
10937	10938	<>	<name>
10937	10940	<>	<aphaerese>
10937	10940	<>	<elision3>
10937	10940	<>	<elision2>
10937	10940	<>	<elision1>
10937	10698	<split-s>	<>
10937	10941	<L2kl>	<>
10937	10914	<K2kl>	<>
10938	10939	<>	<aphaerese>
10938	10939	<>	<elision3>
10938	10939	<>	<elision2>
10938	10939	<>	<elision1>
10938	10942	<L2kl>	<>
10938	10912	<K2kl>	<>
10939	10940	<>	<aphaerese>
10939	10940	<>	<elision3>
10939	10940	<>	<elision2>
10939	10940	<>	<elision1>
10939	10943	<L2kl>	<>
10939	10913	<K2kl>	<>
10940	10938	<>	<name>
10940	10940	<>	<aphaerese>
10940	10940	<>	<elision3>
10940	10940	<>	<elision2>
10940	10940	<>	<elision1>
10940	10941	<L2kl>	<>
10940	10911	<K2kl>	<>
10941	10942	<>	<name>
10941	10941	<>	<aphaerese>
10941	10941	<>	<elision3>
10941	10941	<>	<elision2>
10941	10941	<>	<elision1>
10941	10856	.	κ
10941	10856	.	λ
10941	10754	<split-s>	<>
10942	10943	<>	<aphaerese>
10942	10943	<>	<elision3>
10942	10943	<>	<elision2>
10942	10943	<>	<elision1>
10942	10858	.	κ
10942	10858	.	λ
10942	10755	<split-s>	<>
10943	10941	<>	<aphaerese>
10943	10941	<>	<elision3>
10943	10941	<>	<elision2>
10943	10941	<>	<elision1>
10943	10856	.	κ
10943	10856	.	λ
10943	10753	<split-s>	<>
10944	10889	<name>	<name>
10944	10945	<>	<name>
10944	10947	<>	<aphaerese>
10944	10947	<>	<elision3>
10944	10947	<>	<elision2>
10944	10947	<>	<elision1>
10944	10698	<split-s>	<>
10944	10948	<L2kl>	<>
10945	10946	<>	<aphaerese>
10945	10946	<>	<elision3>
10945	10946	<>	<elision2>
10945	10946	<>	<elision1>
10945	10883	<L2kl>	<>
10946	10947	<>	<aphaerese>
10946	10947	<>	<elision3>
10946	10947	<>	<elision2>
10946	10947	<>	<elision1>
10946	10884	<L2kl>	<>
10947	10945	<>	<name>
10947	10947	<>	<aphaerese>
10947	10947	<>	<elision3>
10947	10947	<>	<elision2>
10947	10947	<>	<elision1>
10947	10882	<L2kl>	<>
10948	10844	.	.
10948	10844	 	 
10948	10844	<~>	<~>
10948	10844	<split-s>	<split-s>
10948	10844	<split-h>	<split-h>
10948	10844	<name2>	<name2>
10948	10889	<name2>	<name>
10948	10883	<>	<name>
10948	10847	<aphaerese>	<aphaerese>
10948	10882	<>	<aphaerese>
10948	10844	<elision3>	<elision3>
10948	10882	<>	<elision3>
10948	10844	<elision2>	<elision2>
10948	10882	<>	<elision2>
10948	10844	<elision1>	<elision1>
10948	10882	<>	<elision1>
10948	10856	.	υ
10948	10856	.	u
10948	10856	.	κ
10948	10856	.	α
10948	10856	.	a
10948	10856	.	λ
10948	10761	<split-s>	<>
10949	10832	.	.
10949	10833	 	 
10949	10832	<~>	<~>
10949	10832	<split-s>	<split-s>
10949	10832	<split-h>	<split-h>
10949	10832	<name2>	<name2>
10949	10836	<aphaerese>	<aphaerese>
10949	10839	<>	<aphaerese>
10949	10832	<elision3>	<elision3>
10949	10839	<>	<elision3>
10949	10832	<elision2>	<elision2>
10949	10839	<>	<elision2>
10949	10832	<elision1>	<elision1>
10949	10839	<>	<elision1>
10949	10840	.	υ
10949	10843	s	υ
10949	10840	.	u
10949	10843	s	u
10949	10861	.	κ
10949	10876	s	κ
10949	10882	s	k
10949	10885	s	U
10949	10888	s	K
10949	10840	.	α
10949	10843	s	α
10949	10840	.	a
10949	10843	s	a
10949	10915	s	A
10949	10882	s	λ
10949	10882	s	l
10949	10918	s	L
10949	10144	<2s>	<>
10950	10835	.	.
10950	10838	 	 
10950	10835	<~>	<~>
10950	10835	<split-s>	<split-s>
10950	10835	<split-h>	<split-h>
10950	10835	<name2>	<name2>
10950	10936	<aphaerese>	<aphaerese>
10950	10835	<>	<aphaerese>
10950	10835	<elision3>	<elision3>
10950	10835	<>	<elision3>
10950	10835	<elision2>	<elision2>
10950	10835	<>	<elision2>
10950	10835	<elision1>	<elision1>
10950	10835	<>	<elision1>
10950	10842	.	υ
10950	10860	s	υ
10950	10842	.	u
10950	10860	s	u
10950	10863	.	κ
10950	10878	s	κ
10950	10884	s	k
10950	10887	s	U
10950	10939	s	K
10950	10842	.	α
10950	10860	s	α
10950	10842	.	a
10950	10860	s	a
10950	10917	s	A
10950	10884	s	λ
10950	10884	s	l
10950	10946	s	L
10950	10146	<2s>	<>
10951	10835	.	.
10951	10838	 	 
10951	10835	<~>	<~>
10951	10835	<split-s>	<split-s>
10951	10835	<split-h>	<split-h>
10951	10835	<name2>	<name2>
10951	10936	<aphaerese>	<aphaerese>
10951	10952	<>	<aphaerese>
10951	10952	<>	<elision3>
10951	10952	<>	<elision2>
10951	10952	<>	<elision1>
10951	10842	.	υ
10951	10860	s	υ
10951	10842	.	u
10951	10860	s	u
10951	10842	.	κ
10951	10955	s	κ
10951	10884	s	k
10951	10887	s	U
10951	10939	s	K
10951	10842	.	α
10951	10860	s	α
10951	10842	.	a
10951	10860	s	a
10951	10917	s	A
10951	10842	.	λ
10951	10955	s	λ
10951	10884	s	l
10951	10946	s	L
10951	10557	<2s>	<>
10952	10832	.	.
10952	10833	 	 
10952	10832	<~>	<~>
10952	10832	<split-s>	<split-s>
10952	10832	<split-h>	<split-h>
10952	10832	<name2>	<name2>
10952	10836	<aphaerese>	<aphaerese>
10952	10831	<>	<aphaerese>
10952	10831	<>	<elision3>
10952	10831	<>	<elision2>
10952	10831	<>	<elision1>
10952	10840	.	υ
10952	10843	s	υ
10952	10840	.	u
10952	10843	s	u
10952	10840	.	κ
10952	10953	s	κ
10952	10882	s	k
10952	10885	s	U
10952	10937	s	K
10952	10840	.	α
10952	10843	s	α
10952	10840	.	a
10952	10843	s	a
10952	10915	s	A
10952	10840	.	λ
10952	10953	s	λ
10952	10882	s	l
10952	10944	s	L
10952	10555	<2s>	<>
10953	10844	.	.
10953	10844	 	 
10953	10844	<~>	<~>
10953	10844	<split-s>	<split-s>
10953	10844	<split-h>	<split-h>
10953	10844	<name2>	<name2>
10953	10954	<>	<name>
10953	10847	<aphaerese>	<aphaerese>
10953	10953	<>	<aphaerese>
10953	10953	<>	<elision3>
10953	10953	<>	<elision2>
10953	10953	<>	<elision1>
10953	10856	.	υ
10953	10856	.	u
10953	10856	.	κ
10953	10856	.	α
10953	10856	.	a
10953	10856	.	λ
10953	10770	<split-s>	<>
10954	10846	.	.
10954	10846	 	 
10954	10846	<~>	<~>
10954	10846	<split-s>	<split-s>
10954	10846	<split-h>	<split-h>
10954	10846	<name2>	<name2>
10954	10849	<aphaerese>	<aphaerese>
10954	10955	<>	<aphaerese>
10954	10955	<>	<elision3>
10954	10955	<>	<elision2>
10954	10955	<>	<elision1>
10954	10858	.	υ
10954	10858	.	u
10954	10858	.	κ
10954	10858	.	α
10954	10858	.	a
10954	10858	.	λ
10954	10771	<split-s>	<>
10955	10844	.	.
10955	10844	 	 
10955	10844	<~>	<~>
10955	10844	<split-s>	<split-s>
10955	10844	<split-h>	<split-h>
10955	10844	<name2>	<name2>
10955	10847	<aphaerese>	<aphaerese>
10955	10953	<>	<aphaerese>
10955	10953	<>	<elision3>
10955	10953	<>	<elision2>
10955	10953	<>	<elision1>
10955	10856	.	υ
10955	10856	.	u
10955	10856	.	κ
10955	10856	.	α
10955	10856	.	a
10955	10856	.	λ
10955	10769	<split-s>	<>
10956	10832	.	.
10956	10833	 	 
10956	10832	<~>	<~>
10956	10832	<split-s>	<split-s>
10956	10832	<split-h>	<split-h>
10956	10832	<name2>	<name2>
10956	10957	<>	<name>
10956	10836	<aphaerese>	<aphaerese>
10956	10956	<>	<aphaerese>
10956	10832	<elision3>	<elision3>
10956	10956	<>	<elision3>
10956	10832	<elision2>	<elision2>
10956	10956	<>	<elision2>
10956	10832	<elision1>	<elision1>
10956	10956	<>	<elision1>
10956	10840	.	υ
10956	10843	s	υ
10956	10840	.	u
10956	10843	s	u
10956	10959	.	κ
10956	10953	s	κ
10956	10882	s	k
10956	10885	s	U
10956	10937	s	K
10956	10840	.	α
10956	10843	s	α
10956	10840	.	a
10956	10843	s	a
10956	10915	s	A
10956	10959	.	λ
10956	10953	s	λ
10956	10882	s	l
10956	10944	s	L
10956	10342	<2s>	<>
10957	10835	.	.
10957	10838	 	 
10957	10835	<~>	<~>
10957	10835	<split-s>	<split-s>
10957	10835	<split-h>	<split-h>
10957	10835	<name2>	<name2>
10957	10936	<aphaerese>	<aphaerese>
10957	10958	<>	<aphaerese>
10957	10835	<elision3>	<elision3>
10957	10958	<>	<elision3>
10957	10835	<elision2>	<elision2>
10957	10958	<>	<elision2>
10957	10835	<elision1>	<elision1>
10957	10958	<>	<elision1>
10957	10842	.	υ
10957	10860	s	υ
10957	10842	.	u
10957	10860	s	u
10957	10961	.	κ
10957	10955	s	κ
10957	10884	s	k
10957	10887	s	U
10957	10939	s	K
10957	10842	.	α
10957	10860	s	α
10957	10842	.	a
10957	10860	s	a
10957	10917	s	A
10957	10961	.	λ
10957	10955	s	λ
10957	10884	s	l
10957	10946	s	L
10957	10343	<2s>	<>
10958	10832	.	.
10958	10833	 	 
10958	10832	<~>	<~>
10958	10832	<split-s>	<split-s>
10958	10832	<split-h>	<split-h>
10958	10832	<name2>	<name2>
10958	10836	<aphaerese>	<aphaerese>
10958	10956	<>	<aphaerese>
10958	10832	<elision3>	<elision3>
10958	10956	<>	<elision3>
10958	10832	<elision2>	<elision2>
10958	10956	<>	<elision2>
10958	10832	<elision1>	<elision1>
10958	10956	<>	<elision1>
10958	10840	.	υ
10958	10843	s	υ
10958	10840	.	u
10958	10843	s	u
10958	10959	.	κ
10958	10953	s	κ
10958	10882	s	k
10958	10885	s	U
10958	10937	s	K
10958	10840	.	α
10958	10843	s	α
10958	10840	.	a
10958	10843	s	a
10958	10915	s	A
10958	10959	.	λ
10958	10953	s	λ
10958	10882	s	l
10958	10944	s	L
10958	10341	<2s>	<>
10959	10960	<>	<name>
10959	10959	<>	<aphaerese>
10959	10962	<elision3>	<elision3>
10959	10959	<>	<elision3>
10959	10962	<elision2>	<elision2>
10959	10959	<>	<elision2>
10959	10962	<elision1>	<elision1>
10959	10959	<>	<elision1>
10959	68	<2s>	<>
10960	10961	<>	<aphaerese>
10960	10964	<elision3>	<elision3>
10960	10961	<>	<elision3>
10960	10964	<elision2>	<elision2>
10960	10961	<>	<elision2>
10960	10964	<elision1>	<elision1>
10960	10961	<>	<elision1>
10960	69	<2s>	<>
10961	10959	<>	<aphaerese>
10961	10962	<elision3>	<elision3>
10961	10959	<>	<elision3>
10961	10962	<elision2>	<elision2>
10961	10959	<>	<elision2>
10961	10962	<elision1>	<elision1>
10961	10959	<>	<elision1>
10961	67	<2s>	<>
10962	10962	.	.
10962	10962	 	 
10962	10962	<~>	<~>
10962	10962	<split-s>	<split-s>
10962	10962	<split-h>	<split-h>
10962	10962	<name2>	<name2>
10962	10963	<>	<name>
10962	10965	<aphaerese>	<aphaerese>
10962	10962	<>	<aphaerese>
10962	10962	<elision3>	<elision3>
10962	10962	<>	<elision3>
10962	10962	<elision2>	<elision2>
10962	10962	<>	<elision2>
10962	10962	<elision1>	<elision1>
10962	10962	<>	<elision1>
10962	10959	.	υ
10962	10959	.	u
10962	10968	.	κ
10962	10959	.	α
10962	10959	.	a
10962	10145	<2s>	<>
10963	10964	.	.
10963	10964	 	 
10963	10964	<~>	<~>
10963	10964	<split-s>	<split-s>
10963	10964	<split-h>	<split-h>
10963	10964	<name2>	<name2>
10963	10967	<aphaerese>	<aphaerese>
10963	10964	<>	<aphaerese>
10963	10964	<elision3>	<elision3>
10963	10964	<>	<elision3>
10963	10964	<elision2>	<elision2>
10963	10964	<>	<elision2>
10963	10964	<elision1>	<elision1>
10963	10964	<>	<elision1>
10963	10961	.	υ
10963	10961	.	u
10963	10970	.	κ
10963	10961	.	α
10963	10961	.	a
10963	10146	<2s>	<>
10964	10962	.	.
10964	10962	 	 
10964	10962	<~>	<~>
10964	10962	<split-s>	<split-s>
10964	10962	<split-h>	<split-h>
10964	10962	<name2>	<name2>
10964	10965	<aphaerese>	<aphaerese>
10964	10962	<>	<aphaerese>
10964	10962	<elision3>	<elision3>
10964	10962	<>	<elision3>
10964	10962	<elision2>	<elision2>
10964	10962	<>	<elision2>
10964	10962	<elision1>	<elision1>
10964	10962	<>	<elision1>
10964	10959	.	υ
10964	10959	.	u
10964	10968	.	κ
10964	10959	.	α
10964	10959	.	a
10964	10144	<2s>	<>
10965	10962	.	.
10965	10962	 	 
10965	10962	<~>	<~>
10965	10962	<split-s>	<split-s>
10965	10962	<split-h>	<split-h>
10965	10962	<name2>	<name2>
10965	10966	<>	<name>
10965	10965	<aphaerese>	<aphaerese>
10965	10965	<>	<aphaerese>
10965	10962	<elision3>	<elision3>
10965	10965	<>	<elision3>
10965	10962	<elision2>	<elision2>
10965	10965	<>	<elision2>
10965	10962	<elision1>	<elision1>
10965	10965	<>	<elision1>
10965	10962	.	υ
10965	10962	.	u
10965	10968	.	κ
10965	10962	.	α
10965	10962	.	a
10965	10132	<2s>	<>
10966	10964	.	.
10966	10964	 	 
10966	10964	<~>	<~>
10966	10964	<split-s>	<split-s>
10966	10964	<split-h>	<split-h>
10966	10964	<name2>	<name2>
10966	10967	<aphaerese>	<aphaerese>
10966	10967	<>	<aphaerese>
10966	10964	<elision3>	<elision3>
10966	10967	<>	<elision3>
10966	10964	<elision2>	<elision2>
10966	10967	<>	<elision2>
10966	10964	<elision1>	<elision1>
10966	10967	<>	<elision1>
10966	10964	.	υ
10966	10964	.	u
10966	10970	.	κ
10966	10964	.	α
10966	10964	.	a
10966	10133	<2s>	<>
10967	10962	.	.
10967	10962	 	 
10967	10962	<~>	<~>
10967	10962	<split-s>	<split-s>
10967	10962	<split-h>	<split-h>
10967	10962	<name2>	<name2>
10967	10965	<aphaerese>	<aphaerese>
10967	10965	<>	<aphaerese>
10967	10962	<elision3>	<elision3>
10967	10965	<>	<elision3>
10967	10962	<elision2>	<elision2>
10967	10965	<>	<elision2>
10967	10962	<elision1>	<elision1>
10967	10965	<>	<elision1>
10967	10962	.	υ
10967	10962	.	u
10967	10968	.	κ
10967	10962	.	α
10967	10962	.	a
10967	10131	<2s>	<>
10968	10969	<>	<name>
10968	10968	<>	<aphaerese>
10968	10971	<elision3>	<elision3>
10968	10968	<>	<elision3>
10968	10971	<elision2>	<elision2>
10968	10968	<>	<elision2>
10968	10971	<elision1>	<elision1>
10968	10968	<>	<elision1>
10968	10129	<2s>	<>
10969	10970	<>	<aphaerese>
10969	10973	<elision3>	<elision3>
10969	10970	<>	<elision3>
10969	10973	<elision2>	<elision2>
10969	10970	<>	<elision2>
10969	10973	<elision1>	<elision1>
10969	10970	<>	<elision1>
10969	10130	<2s>	<>
10970	10968	<>	<aphaerese>
10970	10971	<elision3>	<elision3>
10970	10968	<>	<elision3>
10970	10971	<elision2>	<elision2>
10970	10968	<>	<elision2>
10970	10971	<elision1>	<elision1>
10970	10968	<>	<elision1>
10970	10128	<2s>	<>
10971	10972	<>	<name>
10971	10971	<>	<aphaerese>
10971	10971	<>	<elision3>
10971	10971	<>	<elision2>
10971	10971	<>	<elision1>
10971	9990	<2s>	<>
10972	10973	<>	<aphaerese>
10972	10973	<>	<elision3>
10972	10973	<>	<elision2>
10972	10973	<>	<elision1>
10972	9991	<2s>	<>
10973	10971	<>	<aphaerese>
10973	10971	<>	<elision3>
10973	10971	<>	<elision2>
10973	10971	<>	<elision1>
10973	9989	<2s>	<>
10974	10975	<name>	<name>
10974	10976	<>	<name>
10974	10978	<>	<aphaerese>
10974	10978	<>	<elision3>
10974	10978	<>	<elision2>
10974	10978	<>	<elision1>
10974	10462	<2s>	<>
10974	10979	<L2kl>	<>
10974	10985	<K2kl>	<>
10975	10939	s	k
10975	10946	s	l
10975	10352	<2s>	<>
10976	10977	<>	<aphaerese>
10976	10977	<>	<elision3>
10976	10977	<>	<elision2>
10976	10977	<>	<elision1>
10976	10980	<L2kl>	<>
10976	10983	<K2kl>	<>
10977	10978	<>	<aphaerese>
10977	10978	<>	<elision3>
10977	10978	<>	<elision2>
10977	10978	<>	<elision1>
10977	10981	<L2kl>	<>
10977	10984	<K2kl>	<>
10978	10976	<>	<name>
10978	10978	<>	<aphaerese>
10978	10978	<>	<elision3>
10978	10978	<>	<elision2>
10978	10978	<>	<elision1>
10978	10979	<L2kl>	<>
10978	10982	<K2kl>	<>
10979	10980	<>	<name>
10979	10979	<>	<aphaerese>
10979	10979	<>	<elision3>
10979	10979	<>	<elision2>
10979	10979	<>	<elision1>
10979	10959	.	κ
10979	10959	.	λ
10979	10521	<2s>	<>
10980	10981	<>	<aphaerese>
10980	10981	<>	<elision3>
10980	10981	<>	<elision2>
10980	10981	<>	<elision1>
10980	10961	.	κ
10980	10961	.	λ
10980	10522	<2s>	<>
10981	10979	<>	<aphaerese>
10981	10979	<>	<elision3>
10981	10979	<>	<elision2>
10981	10979	<>	<elision1>
10981	10959	.	κ
10981	10959	.	λ
10981	10520	<2s>	<>
10982	10962	.	.
10982	10962	 	 
10982	10962	<~>	<~>
10982	10962	<split-s>	<split-s>
10982	10962	<split-h>	<split-h>
10982	10962	<name2>	<name2>
10982	10983	<>	<name>
10982	10965	<aphaerese>	<aphaerese>
10982	10982	<>	<aphaerese>
10982	10962	<elision3>	<elision3>
10982	10982	<>	<elision3>
10982	10962	<elision2>	<elision2>
10982	10982	<>	<elision2>
10982	10962	<elision1>	<elision1>
10982	10982	<>	<elision1>
10982	10959	.	υ
10982	10959	.	u
10982	10959	.	α
10982	10959	.	a
10982	10457	<2s>	<>
10983	10964	.	.
10983	10964	 	 
10983	10964	<~>	<~>
10983	10964	<split-s>	<split-s>
10983	10964	<split-h>	<split-h>
10983	10964	<name2>	<name2>
10983	10967	<aphaerese>	<aphaerese>
10983	10984	<>	<aphaerese>
10983	10964	<elision3>	<elision3>
10983	10984	<>	<elision3>
10983	10964	<elision2>	<elision2>
10983	10984	<>	<elision2>
10983	10964	<elision1>	<elision1>
10983	10984	<>	<elision1>
10983	10961	.	υ
10983	10961	.	u
10983	10961	.	α
10983	10961	.	a
10983	10458	<2s>	<>
10984	10962	.	.
10984	10962	 	 
10984	10962	<~>	<~>
10984	10962	<split-s>	<split-s>
10984	10962	<split-h>	<split-h>
10984	10962	<name2>	<name2>
10984	10965	<aphaerese>	<aphaerese>
10984	10982	<>	<aphaerese>
10984	10962	<elision3>	<elision3>
10984	10982	<>	<elision3>
10984	10962	<elision2>	<elision2>
10984	10982	<>	<elision2>
10984	10962	<elision1>	<elision1>
10984	10982	<>	<elision1>
10984	10959	.	υ
10984	10959	.	u
10984	10959	.	α
10984	10959	.	a
10984	10456	<2s>	<>
10985	10962	.	.
10985	10962	 	 
10985	10962	<~>	<~>
10985	10962	<split-s>	<split-s>
10985	10962	<split-h>	<split-h>
10985	10962	<name2>	<name2>
10985	10986	<name2>	<name>
10985	10983	<>	<name>
10985	10965	<aphaerese>	<aphaerese>
10985	10982	<>	<aphaerese>
10985	10962	<elision3>	<elision3>
10985	10982	<>	<elision3>
10985	10962	<elision2>	<elision2>
10985	10982	<>	<elision2>
10985	10962	<elision1>	<elision1>
10985	10982	<>	<elision1>
10985	10959	.	υ
10985	10959	.	u
10985	10959	.	α
10985	10959	.	a
10985	10466	<2s>	<>
10986	10352	<2s>	<>
10987	10962	.	.
10987	10962	 	 
10987	10962	<~>	<~>
10987	10962	<split-s>	<split-s>
10987	10962	<split-h>	<split-h>
10987	10962	<name2>	<name2>
10987	10988	<>	<name>
10987	10965	<aphaerese>	<aphaerese>
10987	10987	<>	<aphaerese>
10987	10962	<elision3>	<elision3>
10987	10987	<>	<elision3>
10987	10962	<elision2>	<elision2>
10987	10987	<>	<elision2>
10987	10962	<elision1>	<elision1>
10987	10987	<>	<elision1>
10987	10959	.	υ
10987	10959	.	u
10987	10959	.	κ
10987	10959	.	α
10987	10959	.	a
10987	10959	.	λ
10987	10342	<2s>	<>
10988	10964	.	.
10988	10964	 	 
10988	10964	<~>	<~>
10988	10964	<split-s>	<split-s>
10988	10964	<split-h>	<split-h>
10988	10964	<name2>	<name2>
10988	10967	<aphaerese>	<aphaerese>
10988	10989	<>	<aphaerese>
10988	10964	<elision3>	<elision3>
10988	10989	<>	<elision3>
10988	10964	<elision2>	<elision2>
10988	10989	<>	<elision2>
10988	10964	<elision1>	<elision1>
10988	10989	<>	<elision1>
10988	10961	.	υ
10988	10961	.	u
10988	10961	.	κ
10988	10961	.	α
10988	10961	.	a
10988	10961	.	λ
10988	10343	<2s>	<>
10989	10962	.	.
10989	10962	 	 
10989	10962	<~>	<~>
10989	10962	<split-s>	<split-s>
10989	10962	<split-h>	<split-h>
10989	10962	<name2>	<name2>
10989	10965	<aphaerese>	<aphaerese>
10989	10987	<>	<aphaerese>
10989	10962	<elision3>	<elision3>
10989	10987	<>	<elision3>
10989	10962	<elision2>	<elision2>
10989	10987	<>	<elision2>
10989	10962	<elision1>	<elision1>
10989	10987	<>	<elision1>
10989	10959	.	υ
10989	10959	.	u
10989	10959	.	κ
10989	10959	.	α
10989	10959	.	a
10989	10959	.	λ
10989	10341	<2s>	<>
10990	10986	<name>	<name>
10990	10991	<>	<name>
10990	10993	<>	<aphaerese>
10990	10993	<>	<elision3>
10990	10993	<>	<elision2>
10990	10993	<>	<elision1>
10990	10462	<2s>	<>
10990	10994	<L2kl>	<>
10991	10992	<>	<aphaerese>
10991	10992	<>	<elision3>
10991	10992	<>	<elision2>
10991	10992	<>	<elision1>
10991	10988	<L2kl>	<>
10992	10993	<>	<aphaerese>
10992	10993	<>	<elision3>
10992	10993	<>	<elision2>
10992	10993	<>	<elision1>
10992	10989	<L2kl>	<>
10993	10991	<>	<name>
10993	10993	<>	<aphaerese>
10993	10993	<>	<elision3>
10993	10993	<>	<elision2>
10993	10993	<>	<elision1>
10993	10987	<L2kl>	<>
10994	10962	.	.
10994	10962	 	 
10994	10962	<~>	<~>
10994	10962	<split-s>	<split-s>
10994	10962	<split-h>	<split-h>
10994	10962	<name2>	<name2>
10994	10986	<name2>	<name>
10994	10988	<>	<name>
10994	10965	<aphaerese>	<aphaerese>
10994	10987	<>	<aphaerese>
10994	10962	<elision3>	<elision3>
10994	10987	<>	<elision3>
10994	10962	<elision2>	<elision2>
10994	10987	<>	<elision2>
10994	10962	<elision1>	<elision1>
10994	10987	<>	<elision1>
10994	10959	.	υ
10994	10959	.	u
10994	10959	.	κ
10994	10959	.	α
10994	10959	.	a
10994	10959	.	λ
10994	10531	<2s>	<>
10995	10829	<>	<name>
10995	10828	<>	<aphaerese>
10995	10828	<>	<elision3>
10995	10828	<>	<elision2>
10995	10828	<>	<elision1>
10995	10831	s	κ
10995	10956	s	k
10995	10974	s	K
10995	10831	s	λ
10995	10987	s	l
10995	10990	s	L
10995	10996	<1s>	<>
10996	10166	<>	<name>
10996	10165	<>	<aphaerese>
10996	10165	<>	<elision3>
10996	10165	<>	<elision2>
10996	10165	<>	<elision1>
10996	10997	<K>	<>
10997	10192	<>	<name>
10997	10194	<>	<aphaerese>
10997	10194	<>	<elision3>
10997	10194	<>	<elision2>
10997	10194	<>	<elision1>
10998	10999	<>	<name>
10998	11001	<>	<aphaerese>
10998	11001	<>	<elision3>
10998	11001	<>	<elision2>
10998	11001	<>	<elision1>
10998	52	<k2K>	<>
10998	10995	<k2L>	<>
10999	11000	<>	<aphaerese>
10999	11000	<>	<elision3>
10999	11000	<>	<elision2>
10999	11000	<>	<elision1>
10999	53	<k2K>	<>
10999	10829	<k2L>	<>
11000	11001	<>	<aphaerese>
11000	11001	<>	<elision3>
11000	11001	<>	<elision2>
11000	11001	<>	<elision1>
11000	54	<k2K>	<>
11000	10830	<k2L>	<>
11001	10999	<>	<name>
11001	11001	<>	<aphaerese>
11001	11001	<>	<elision3>
11001	11001	<>	<elision2>
11001	11001	<>	<elision1>
11001	52	<k2K>	<>
11001	10828	<k2L>	<>
11002	11003	<>	<name>
11002	11005	<>	<aphaerese>
11002	11005	<>	<elision3>
11002	11005	<>	<elision2>
11002	11005	<>	<elision1>
11002	55	s	κ
11002	10772	s	k
11002	10805	s	K
11002	55	s	λ
11002	10820	s	l
11002	10823	s	L
11002	10995	<K2L>	<>
11003	11004	<>	<aphaerese>
11003	11004	<>	<elision3>
11003	11004	<>	<elision2>
11003	11004	<>	<elision1>
11003	10765	s	κ
11003	10774	s	k
11003	10808	s	K
11003	10765	s	λ
11003	10822	s	l
11003	10825	s	L
11003	10829	<K2L>	<>
11004	11005	<>	<aphaerese>
11004	11005	<>	<elision3>
11004	11005	<>	<elision2>
11004	11005	<>	<elision1>
11004	55	s	κ
11004	10772	s	k
11004	10805	s	K
11004	55	s	λ
11004	10820	s	l
11004	10823	s	L
11004	10830	<K2L>	<>
11005	11003	<>	<name>
11005	11005	<>	<aphaerese>
11005	11005	<>	<elision3>
11005	11005	<>	<elision2>
11005	11005	<>	<elision1>
11005	55	s	κ
11005	10772	s	k
11005	10805	s	K
11005	55	s	λ
11005	10820	s	l
11005	10823	s	L
11005	10828	<K2L>	<>
11006	11007	<>	<name>
11006	11006	<>	<aphaerese>
11006	11006	<>	<elision3>
11006	11006	<>	<elision2>
11006	11006	<>	<elision1>
11006	10828	<lambda2L>	<>
11007	11008	<>	<aphaerese>
11007	11008	<>	<elision3>
11007	11008	<>	<elision2>
11007	11008	<>	<elision1>
11007	10829	<lambda2L>	<>
11008	11006	<>	<aphaerese>
11008	11006	<>	<elision3>
11008	11006	<>	<elision2>
11008	11006	<>	<elision1>
11008	10830	<lambda2L>	<>
11009	11010	<>	<name>
11009	11009	<>	<aphaerese>
11009	11009	<>	<elision3>
11009	11009	<>	<elision2>
11009	11009	<>	<elision1>
11009	10828	<l2L>	<>
11010	11011	<>	<aphaerese>
11010	11011	<>	<elision3>
11010	11011	<>	<elision2>
11010	11011	<>	<elision1>
11010	10829	<l2L>	<>
11011	11009	<>	<aphaerese>
11011	11009	<>	<elision3>
11011	11009	<>	<elision2>
11011	11009	<>	<elision1>
11011	10830	<l2L>	<>
11012	51	<>	<aphaerese>
11012	51	<>	<elision3>
11012	51	<>	<elision2>
11012	51	<>	<elision1>
11012	54	<kappa2K>	<>
11012	11013	<kappa2L>	<>
11013	10828	<>	<aphaerese>
11013	10828	<>	<elision3>
11013	10828	<>	<elision2>
11013	10828	<>	<elision1>
11013	10831	s	κ
11013	10956	s	k
11013	10974	s	K
11013	10831	s	λ
11013	10987	s	l
11013	10990	s	L
11013	11014	<1s>	<>
11014	10165	<>	<aphaerese>
11014	10165	<>	<elision3>
11014	10165	<>	<elision2>
11014	10165	<>	<elision1>
11014	11015	<K>	<>
11015	10194	<>	<aphaerese>
11015	10194	<>	<elision3>
11015	10194	<>	<elision2>
11015	10194	<>	<elision1>
11016	11001	<>	<aphaerese>
11016	11001	<>	<elision3>
11016	11001	<>	<elision2>
11016	11001	<>	<elision1>
11016	54	<k2K>	<>
11016	11013	<k2L>	<>
11017	11005	<>	<aphaerese>
11017	11005	<>	<elision3>
11017	11005	<>	<elision2>
11017	11005	<>	<elision1>
11017	55	s	κ
11017	10772	s	k
11017	10805	s	K
11017	55	s	λ
11017	10820	s	l
11017	10823	s	L
11017	11013	<K2L>	<>
11018	11019	<>	<name>
11018	11021	<>	<aphaerese>
11018	11021	<>	<elision3>
11018	11021	<>	<elision2>
11018	11021	<>	<elision1>
11018	11022	<kappa2K>	<>
11018	11343	<kappa2L>	<>
11018	11340	<lambda2L>	<>
11019	11020	<>	<aphaerese>
11019	11020	<>	<elision3>
11019	11020	<>	<elision2>
11019	11020	<>	<elision1>
11019	11158	<kappa2K>	<>
11019	11304	<kappa2L>	<>
11019	11341	<lambda2L>	<>
11020	11021	<>	<aphaerese>
11020	11021	<>	<elision3>
11020	11021	<>	<elision2>
11020	11021	<>	<elision1>
11020	11159	<kappa2K>	<>
11020	11305	<kappa2L>	<>
11020	11342	<lambda2L>	<>
11021	11019	<>	<name>
11021	11021	<>	<aphaerese>
11021	11021	<>	<elision3>
11021	11021	<>	<elision2>
11021	11021	<>	<elision1>
11021	11022	<kappa2K>	<>
11021	11188	<kappa2L>	<>
11021	11340	<lambda2L>	<>
11022	11023	.	.
11022	11024	 	 
11022	11023	<~>	<~>
11022	11023	<split-s>	<split-s>
11022	11023	<split-h>	<split-h>
11022	11023	<name2>	<name2>
11022	11158	<>	<name>
11022	11027	<aphaerese>	<aphaerese>
11022	11022	<>	<aphaerese>
11022	11160	<elision3>	<elision3>
11022	11022	<>	<elision3>
11022	11160	<elision2>	<elision2>
11022	11022	<>	<elision2>
11022	11160	<elision1>	<elision1>
11022	11022	<>	<elision1>
11022	11031	.	υ
11022	11034	s	υ
11022	11031	.	u
11022	11034	s	u
11022	55	s	κ
11022	10772	s	k
11022	11097	s	U
11022	10805	s	K
11022	11031	.	α
11022	11125	s	α
11022	11031	.	a
11022	11125	s	a
11022	11128	s	A
11022	55	s	λ
11022	10820	s	l
11022	10823	s	L
11023	11023	.	.
11023	11024	 	 
11023	11023	<~>	<~>
11023	11023	<split-s>	<split-s>
11023	11023	<split-h>	<split-h>
11023	11023	<name2>	<name2>
11023	11157	<>	<name>
11023	11027	<aphaerese>	<aphaerese>
11023	11023	<>	<aphaerese>
11023	11023	<elision3>	<elision3>
11023	11023	<>	<elision3>
11023	11023	<elision2>	<elision2>
11023	11023	<>	<elision2>
11023	11023	<elision1>	<elision1>
11023	11023	<>	<elision1>
11023	11031	.	υ
11023	11034	s	υ
11023	11031	.	u
11023	11034	s	u
11023	11037	.	κ
11023	11055	s	κ
11023	10772	s	k
11023	11097	s	U
11023	10805	s	K
11023	11031	.	α
11023	11125	s	α
11023	11031	.	a
11023	11125	s	a
11023	11128	s	A
11023	11131	s	λ
11023	10820	s	l
11023	10823	s	L
11024	11023	.	.
11024	11024	 	 
11024	11023	<~>	<~>
11024	11023	<split-s>	<split-s>
11024	11023	<split-h>	<split-h>
11024	11023	<name2>	<name2>
11024	11025	<>	<name>
11024	11027	<aphaerese>	<aphaerese>
11024	11030	<>	<aphaerese>
11024	11023	<elision3>	<elision3>
11024	11030	<>	<elision3>
11024	11023	<elision2>	<elision2>
11024	11030	<>	<elision2>
11024	11023	<elision1>	<elision1>
11024	11030	<>	<elision1>
11024	11031	.	υ
11024	11142	s	υ
11024	11031	.	u
11024	11142	s	u
11024	11037	.	κ
11024	11143	s	κ
11024	11144	s	k
11024	11145	s	U
11024	11147	s	K
11024	11031	.	α
11024	11149	s	α
11024	11031	.	a
11024	11149	s	a
11024	11150	s	A
11024	11151	s	λ
11024	11152	s	l
11024	11153	s	L
11025	11026	.	.
11025	11029	 	 
11025	11026	<~>	<~>
11025	11026	<split-s>	<split-s>
11025	11026	<split-h>	<split-h>
11025	11026	<name2>	<name2>
11025	11155	<aphaerese>	<aphaerese>
11025	11156	<>	<aphaerese>
11025	11026	<elision3>	<elision3>
11025	11156	<>	<elision3>
11025	11026	<elision2>	<elision2>
11025	11156	<>	<elision2>
11025	11026	<elision1>	<elision1>
11025	11156	<>	<elision1>
11025	11033	.	υ
11025	11036	s	υ
11025	11033	.	u
11025	11036	s	u
11025	11039	.	κ
11025	11057	s	κ
11025	10774	s	k
11025	11099	s	U
11025	11102	s	K
11025	11033	.	α
11025	11127	s	α
11025	11033	.	a
11025	11127	s	a
11025	11130	s	A
11025	11133	s	λ
11025	10822	s	l
11025	11136	s	L
11026	11023	.	.
11026	11024	 	 
11026	11023	<~>	<~>
11026	11023	<split-s>	<split-s>
11026	11023	<split-h>	<split-h>
11026	11023	<name2>	<name2>
11026	11027	<aphaerese>	<aphaerese>
11026	11023	<>	<aphaerese>
11026	11023	<elision3>	<elision3>
11026	11023	<>	<elision3>
11026	11023	<elision2>	<elision2>
11026	11023	<>	<elision2>
11026	11023	<elision1>	<elision1>
11026	11023	<>	<elision1>
11026	11031	.	υ
11026	11034	s	υ
11026	11031	.	u
11026	11034	s	u
11026	11037	.	κ
11026	11055	s	κ
11026	10772	s	k
11026	11097	s	U
11026	10805	s	K
11026	11031	.	α
11026	11125	s	α
11026	11031	.	a
11026	11125	s	a
11026	11128	s	A
11026	11131	s	λ
11026	10820	s	l
11026	10823	s	L
11027	11023	.	.
11027	11024	 	 
11027	11023	<~>	<~>
11027	11023	<split-s>	<split-s>
11027	11023	<split-h>	<split-h>
11027	11023	<name2>	<name2>
11027	11028	<>	<name>
11027	11027	<aphaerese>	<aphaerese>
11027	11027	<>	<aphaerese>
11027	11023	<elision3>	<elision3>
11027	11027	<>	<elision3>
11027	11023	<elision2>	<elision2>
11027	11027	<>	<elision2>
11027	11023	<elision1>	<elision1>
11027	11027	<>	<elision1>
11027	11023	.	υ
11027	11023	.	u
11027	11037	.	κ
11027	11055	s	κ
11027	10772	s	k
11027	11097	s	U
11027	10805	s	K
11027	11023	.	α
11027	11023	.	a
11027	11128	s	A
11027	11131	s	λ
11027	10820	s	l
11027	10823	s	L
11028	11026	.	.
11028	11029	 	 
11028	11026	<~>	<~>
11028	11026	<split-s>	<split-s>
11028	11026	<split-h>	<split-h>
11028	11026	<name2>	<name2>
11028	11155	<aphaerese>	<aphaerese>
11028	11155	<>	<aphaerese>
11028	11026	<elision3>	<elision3>
11028	11155	<>	<elision3>
11028	11026	<elision2>	<elision2>
11028	11155	<>	<elision2>
11028	11026	<elision1>	<elision1>
11028	11155	<>	<elision1>
11028	11026	.	υ
11028	11026	.	u
11028	11039	.	κ
11028	11057	s	κ
11028	10774	s	k
11028	11099	s	U
11028	10808	s	K
11028	11026	.	α
11028	11026	.	a
11028	11130	s	A
11028	11133	s	λ
11028	10822	s	l
11028	10825	s	L
11029	11023	.	.
11029	11024	 	 
11029	11023	<~>	<~>
11029	11023	<split-s>	<split-s>
11029	11023	<split-h>	<split-h>
11029	11023	<name2>	<name2>
11029	11027	<aphaerese>	<aphaerese>
11029	11030	<>	<aphaerese>
11029	11023	<elision3>	<elision3>
11029	11030	<>	<elision3>
11029	11023	<elision2>	<elision2>
11029	11030	<>	<elision2>
11029	11023	<elision1>	<elision1>
11029	11030	<>	<elision1>
11029	11031	.	υ
11029	11142	s	υ
11029	11031	.	u
11029	11142	s	u
11029	11037	.	κ
11029	11143	s	κ
11029	11144	s	k
11029	11145	s	U
11029	11147	s	K
11029	11031	.	α
11029	11149	s	α
11029	11031	.	a
11029	11149	s	a
11029	11150	s	A
11029	11151	s	λ
11029	11152	s	l
11029	11153	s	L
11030	11023	.	.
11030	11024	 	 
11030	11023	<~>	<~>
11030	11023	<split-s>	<split-s>
11030	11023	<split-h>	<split-h>
11030	11023	<name2>	<name2>
11030	11025	<>	<name>
11030	11027	<aphaerese>	<aphaerese>
11030	11030	<>	<aphaerese>
11030	11023	<elision3>	<elision3>
11030	11030	<>	<elision3>
11030	11023	<elision2>	<elision2>
11030	11030	<>	<elision2>
11030	11023	<elision1>	<elision1>
11030	11030	<>	<elision1>
11030	11031	.	υ
11030	11034	s	υ
11030	11031	.	u
11030	11034	s	u
11030	11037	.	κ
11030	11055	s	κ
11030	10772	s	k
11030	11097	s	U
11030	11100	s	K
11030	11031	.	α
11030	11125	s	α
11030	11031	.	a
11030	11125	s	a
11030	11128	s	A
11030	11131	s	λ
11030	10820	s	l
11030	11134	s	L
11031	11032	<>	<name>
11031	11031	<>	<aphaerese>
11031	11023	<elision3>	<elision3>
11031	11031	<>	<elision3>
11031	11023	<elision2>	<elision2>
11031	11031	<>	<elision2>
11031	11023	<elision1>	<elision1>
11031	11031	<>	<elision1>
11032	11033	<>	<aphaerese>
11032	11026	<elision3>	<elision3>
11032	11033	<>	<elision3>
11032	11026	<elision2>	<elision2>
11032	11033	<>	<elision2>
11032	11026	<elision1>	<elision1>
11032	11033	<>	<elision1>
11033	11031	<>	<aphaerese>
11033	11023	<elision3>	<elision3>
11033	11031	<>	<elision3>
11033	11023	<elision2>	<elision2>
11033	11031	<>	<elision2>
11033	11023	<elision1>	<elision1>
11033	11031	<>	<elision1>
11034	56	.	.
11034	57	 	 
11034	56	<~>	<~>
11034	56	<split-s>	<split-s>
11034	56	<split-h>	<split-h>
11034	56	<name2>	<name2>
11034	11035	<>	<name>
11034	60	<aphaerese>	<aphaerese>
11034	11034	<>	<aphaerese>
11034	11034	<>	<elision3>
11034	11034	<>	<elision2>
11034	11034	<>	<elision1>
11034	64	.	υ
11034	9961	s	υ
11034	64	.	u
11034	9961	s	u
11034	10543	.	κ
11034	10573	s	κ
11034	10626	s	k
11034	10647	s	U
11034	10746	s	K
11034	64	.	α
11034	10702	s	α
11034	64	.	a
11034	10702	s	a
11034	10705	s	A
11034	10708	s	λ
11034	10711	s	l
11034	10756	s	L
11034	10150	<2s>	<>
11035	59	.	.
11035	62	 	 
11035	59	<~>	<~>
11035	59	<split-s>	<split-s>
11035	59	<split-h>	<split-h>
11035	59	<name2>	<name2>
11035	10745	<aphaerese>	<aphaerese>
11035	11036	<>	<aphaerese>
11035	11036	<>	<elision3>
11035	11036	<>	<elision2>
11035	11036	<>	<elision1>
11035	66	.	υ
11035	10539	s	υ
11035	66	.	u
11035	10539	s	u
11035	10545	.	κ
11035	10575	s	κ
11035	10628	s	k
11035	10649	s	U
11035	10748	s	K
11035	66	.	α
11035	10704	s	α
11035	66	.	a
11035	10704	s	a
11035	10707	s	A
11035	10710	s	λ
11035	10713	s	l
11035	10758	s	L
11035	10151	<2s>	<>
11036	56	.	.
11036	57	 	 
11036	56	<~>	<~>
11036	56	<split-s>	<split-s>
11036	56	<split-h>	<split-h>
11036	56	<name2>	<name2>
11036	60	<aphaerese>	<aphaerese>
11036	11034	<>	<aphaerese>
11036	11034	<>	<elision3>
11036	11034	<>	<elision2>
11036	11034	<>	<elision1>
11036	64	.	υ
11036	9961	s	υ
11036	64	.	u
11036	9961	s	u
11036	10543	.	κ
11036	10573	s	κ
11036	10626	s	k
11036	10647	s	U
11036	10746	s	K
11036	64	.	α
11036	10702	s	α
11036	64	.	a
11036	10702	s	a
11036	10705	s	A
11036	10708	s	λ
11036	10711	s	l
11036	10756	s	L
11036	10149	<2s>	<>
11037	11038	<>	<name>
11037	11037	<>	<aphaerese>
11037	11040	<elision3>	<elision3>
11037	11037	<>	<elision3>
11037	11040	<elision2>	<elision2>
11037	11037	<>	<elision2>
11037	11040	<elision1>	<elision1>
11037	11037	<>	<elision1>
11038	11039	<>	<aphaerese>
11038	11042	<elision3>	<elision3>
11038	11039	<>	<elision3>
11038	11042	<elision2>	<elision2>
11038	11039	<>	<elision2>
11038	11042	<elision1>	<elision1>
11038	11039	<>	<elision1>
11039	11037	<>	<aphaerese>
11039	11040	<elision3>	<elision3>
11039	11037	<>	<elision3>
11039	11040	<elision2>	<elision2>
11039	11037	<>	<elision2>
11039	11040	<elision1>	<elision1>
11039	11037	<>	<elision1>
11040	11041	<>	<name>
11040	11040	<>	<aphaerese>
11040	11040	<>	<elision3>
11040	11040	<>	<elision2>
11040	11040	<>	<elision1>
11040	11043	s	κ
11040	11043	s	k
11040	11046	s	K
11040	11043	s	λ
11040	11050	s	l
11040	11052	s	L
11041	11042	<>	<aphaerese>
11041	11042	<>	<elision3>
11041	11042	<>	<elision2>
11041	11042	<>	<elision1>
11041	11045	s	κ
11041	11045	s	k
11041	11048	s	K
11041	11045	s	λ
11041	11049	s	l
11041	11054	s	L
11042	11040	<>	<aphaerese>
11042	11040	<>	<elision3>
11042	11040	<>	<elision2>
11042	11040	<>	<elision1>
11042	11043	s	κ
11042	11043	s	k
11042	11046	s	K
11042	11043	s	λ
11042	11050	s	l
11042	11052	s	L
11043	11044	<>	<name>
11043	11043	<>	<aphaerese>
11043	11043	<>	<elision3>
11043	11043	<>	<elision2>
11043	11043	<>	<elision1>
11043	10766	s	κ
11043	10626	s	k
11043	10746	s	K
11043	10766	s	λ
11043	10711	s	l
11043	10756	s	L
11043	10165	<2s>	<>
11044	11045	<>	<aphaerese>
11044	11045	<>	<elision3>
11044	11045	<>	<elision2>
11044	11045	<>	<elision1>
11044	10768	s	κ
11044	10628	s	k
11044	10748	s	K
11044	10768	s	λ
11044	10713	s	l
11044	10758	s	L
11044	10166	<2s>	<>
11045	11043	<>	<aphaerese>
11045	11043	<>	<elision3>
11045	11043	<>	<elision2>
11045	11043	<>	<elision1>
11045	10766	s	κ
11045	10626	s	k
11045	10746	s	K
11045	10766	s	λ
11045	10711	s	l
11045	10756	s	L
11045	10164	<2s>	<>
11046	11047	<>	<name>
11046	11046	<>	<aphaerese>
11046	11046	<>	<elision3>
11046	11046	<>	<elision2>
11046	11046	<>	<elision1>
11046	11050	<K2kl>	<>
11047	11048	<>	<aphaerese>
11047	11048	<>	<elision3>
11047	11048	<>	<elision2>
11047	11048	<>	<elision1>
11047	11051	<K2kl>	<>
11048	11046	<>	<aphaerese>
11048	11046	<>	<elision3>
11048	11046	<>	<elision2>
11048	11046	<>	<elision1>
11048	11049	<K2kl>	<>
11049	11050	<>	<aphaerese>
11049	11050	<>	<elision3>
11049	11050	<>	<elision2>
11049	11050	<>	<elision1>
11049	10816	s	κ
11049	10711	s	k
11049	10802	s	K
11049	10816	s	λ
11049	10711	s	l
11049	10756	s	L
11049	10164	<2s>	<>
11050	11051	<>	<name>
11050	11050	<>	<aphaerese>
11050	11050	<>	<elision3>
11050	11050	<>	<elision2>
11050	11050	<>	<elision1>
11050	10816	s	κ
11050	10711	s	k
11050	10802	s	K
11050	10816	s	λ
11050	10711	s	l
11050	10756	s	L
11050	10165	<2s>	<>
11051	11049	<>	<aphaerese>
11051	11049	<>	<elision3>
11051	11049	<>	<elision2>
11051	11049	<>	<elision1>
11051	10818	s	κ
11051	10713	s	k
11051	10748	s	K
11051	10818	s	λ
11051	10713	s	l
11051	10758	s	L
11051	10166	<2s>	<>
11052	11053	<>	<name>
11052	11052	<>	<aphaerese>
11052	11052	<>	<elision3>
11052	11052	<>	<elision2>
11052	11052	<>	<elision1>
11052	11050	<L2kl>	<>
11053	11054	<>	<aphaerese>
11053	11054	<>	<elision3>
11053	11054	<>	<elision2>
11053	11054	<>	<elision1>
11053	11051	<L2kl>	<>
11054	11052	<>	<aphaerese>
11054	11052	<>	<elision3>
11054	11052	<>	<elision2>
11054	11052	<>	<elision1>
11054	11049	<L2kl>	<>
11055	56	.	.
11055	57	 	 
11055	56	<~>	<~>
11055	56	<split-s>	<split-s>
11055	56	<split-h>	<split-h>
11055	56	<name2>	<name2>
11055	11056	<>	<name>
11055	60	<aphaerese>	<aphaerese>
11055	11055	<>	<aphaerese>
11055	11058	<elision3>	<elision3>
11055	11055	<>	<elision3>
11055	11058	<elision2>	<elision2>
11055	11055	<>	<elision2>
11055	11058	<elision1>	<elision1>
11055	11055	<>	<elision1>
11055	64	.	υ
11055	9961	s	υ
11055	64	.	u
11055	9961	s	u
11055	64	.	κ
11055	10766	s	κ
11055	10626	s	k
11055	10647	s	U
11055	10746	s	K
11055	64	.	α
11055	10702	s	α
11055	64	.	a
11055	10702	s	a
11055	10705	s	A
11055	64	.	λ
11055	10766	s	λ
11055	10711	s	l
11055	10756	s	L
11055	10330	<2s>	<>
11056	59	.	.
11056	62	 	 
11056	59	<~>	<~>
11056	59	<split-s>	<split-s>
11056	59	<split-h>	<split-h>
11056	59	<name2>	<name2>
11056	10745	<aphaerese>	<aphaerese>
11056	11057	<>	<aphaerese>
11056	11060	<elision3>	<elision3>
11056	11057	<>	<elision3>
11056	11060	<elision2>	<elision2>
11056	11057	<>	<elision2>
11056	11060	<elision1>	<elision1>
11056	11057	<>	<elision1>
11056	66	.	υ
11056	10539	s	υ
11056	66	.	u
11056	10539	s	u
11056	66	.	κ
11056	10768	s	κ
11056	10628	s	k
11056	10649	s	U
11056	10748	s	K
11056	66	.	α
11056	10704	s	α
11056	66	.	a
11056	10704	s	a
11056	10707	s	A
11056	66	.	λ
11056	10768	s	λ
11056	10713	s	l
11056	10758	s	L
11056	10331	<2s>	<>
11057	56	.	.
11057	57	 	 
11057	56	<~>	<~>
11057	56	<split-s>	<split-s>
11057	56	<split-h>	<split-h>
11057	56	<name2>	<name2>
11057	60	<aphaerese>	<aphaerese>
11057	11055	<>	<aphaerese>
11057	11058	<elision3>	<elision3>
11057	11055	<>	<elision3>
11057	11058	<elision2>	<elision2>
11057	11055	<>	<elision2>
11057	11058	<elision1>	<elision1>
11057	11055	<>	<elision1>
11057	64	.	υ
11057	9961	s	υ
11057	64	.	u
11057	9961	s	u
11057	64	.	κ
11057	10766	s	κ
11057	10626	s	k
11057	10647	s	U
11057	10746	s	K
11057	64	.	α
11057	10702	s	α
11057	64	.	a
11057	10702	s	a
11057	10705	s	A
11057	64	.	λ
11057	10766	s	λ
11057	10711	s	l
11057	10756	s	L
11057	10329	<2s>	<>
11058	56	.	.
11058	57	 	 
11058	56	<~>	<~>
11058	56	<split-s>	<split-s>
11058	56	<split-h>	<split-h>
11058	56	<name2>	<name2>
11058	11059	<>	<name>
11058	60	<aphaerese>	<aphaerese>
11058	11058	<>	<aphaerese>
11058	56	<elision3>	<elision3>
11058	11058	<>	<elision3>
11058	56	<elision2>	<elision2>
11058	11058	<>	<elision2>
11058	56	<elision1>	<elision1>
11058	11058	<>	<elision1>
11058	64	.	υ
11058	9961	s	υ
11058	64	.	u
11058	9961	s	u
11058	10543	.	κ
11058	11061	s	κ
11058	11067	s	k
11058	10647	s	U
11058	11073	s	K
11058	64	.	α
11058	10702	s	α
11058	64	.	a
11058	10702	s	a
11058	10705	s	A
11058	11085	s	λ
11058	11088	s	l
11058	11091	s	L
11058	10233	<2s>	<>
11059	59	.	.
11059	62	 	 
11059	59	<~>	<~>
11059	59	<split-s>	<split-s>
11059	59	<split-h>	<split-h>
11059	59	<name2>	<name2>
11059	10745	<aphaerese>	<aphaerese>
11059	11060	<>	<aphaerese>
11059	59	<elision3>	<elision3>
11059	11060	<>	<elision3>
11059	59	<elision2>	<elision2>
11059	11060	<>	<elision2>
11059	59	<elision1>	<elision1>
11059	11060	<>	<elision1>
11059	66	.	υ
11059	10539	s	υ
11059	66	.	u
11059	10539	s	u
11059	10545	.	κ
11059	11063	s	κ
11059	11069	s	k
11059	10649	s	U
11059	11075	s	K
11059	66	.	α
11059	10704	s	α
11059	66	.	a
11059	10704	s	a
11059	10707	s	A
11059	11087	s	λ
11059	11090	s	l
11059	11093	s	L
11059	10234	<2s>	<>
11060	56	.	.
11060	57	 	 
11060	56	<~>	<~>
11060	56	<split-s>	<split-s>
11060	56	<split-h>	<split-h>
11060	56	<name2>	<name2>
11060	60	<aphaerese>	<aphaerese>
11060	11058	<>	<aphaerese>
11060	56	<elision3>	<elision3>
11060	11058	<>	<elision3>
11060	56	<elision2>	<elision2>
11060	11058	<>	<elision2>
11060	56	<elision1>	<elision1>
11060	11058	<>	<elision1>
11060	64	.	υ
11060	9961	s	υ
11060	64	.	u
11060	9961	s	u
11060	10543	.	κ
11060	11061	s	κ
11060	11067	s	k
11060	10647	s	U
11060	11073	s	K
11060	64	.	α
11060	10702	s	α
11060	64	.	a
11060	10702	s	a
11060	10705	s	A
11060	11085	s	λ
11060	11088	s	l
11060	11091	s	L
11060	10232	<2s>	<>
11061	9962	.	.
11061	9963	 	 
11061	9962	<~>	<~>
11061	9962	<split-s>	<split-s>
11061	9962	<split-h>	<split-h>
11061	9962	<name2>	<name2>
11061	11062	<>	<name>
11061	9966	<aphaerese>	<aphaerese>
11061	11061	<>	<aphaerese>
11061	10576	<elision3>	<elision3>
11061	11061	<>	<elision3>
11061	10576	<elision2>	<elision2>
11061	11061	<>	<elision2>
11061	10576	<elision1>	<elision1>
11061	11061	<>	<elision1>
11061	9970	.	υ
11061	9976	s	υ
11061	9970	.	u
11061	9976	s	u
11061	9970	.	κ
11061	10347	s	U
11061	9970	.	α
11061	9976	s	α
11061	9970	.	a
11061	9976	s	a
11061	10468	s	A
11061	9970	.	λ
11061	11065	<split-h>	<>
11062	9965	.	.
11062	9968	 	 
11062	9965	<~>	<~>
11062	9965	<split-s>	<split-s>
11062	9965	<split-h>	<split-h>
11062	9965	<name2>	<name2>
11062	10512	<aphaerese>	<aphaerese>
11062	11063	<>	<aphaerese>
11062	10578	<elision3>	<elision3>
11062	11063	<>	<elision3>
11062	10578	<elision2>	<elision2>
11062	11063	<>	<elision2>
11062	10578	<elision1>	<elision1>
11062	11063	<>	<elision1>
11062	9972	.	υ
11062	10148	s	υ
11062	9972	.	u
11062	10148	s	u
11062	9972	.	κ
11062	10349	s	U
11062	9972	.	α
11062	10148	s	α
11062	9972	.	a
11062	10148	s	a
11062	10470	s	A
11062	9972	.	λ
11062	11066	<split-h>	<>
11063	9962	.	.
11063	9963	 	 
11063	9962	<~>	<~>
11063	9962	<split-s>	<split-s>
11063	9962	<split-h>	<split-h>
11063	9962	<name2>	<name2>
11063	9966	<aphaerese>	<aphaerese>
11063	11061	<>	<aphaerese>
11063	10576	<elision3>	<elision3>
11063	11061	<>	<elision3>
11063	10576	<elision2>	<elision2>
11063	11061	<>	<elision2>
11063	10576	<elision1>	<elision1>
11063	11061	<>	<elision1>
11063	9970	.	υ
11063	9976	s	υ
11063	9970	.	u
11063	9976	s	u
11063	9970	.	κ
11063	10347	s	U
11063	9970	.	α
11063	9976	s	α
11063	9970	.	a
11063	9976	s	a
11063	10468	s	A
11063	9970	.	λ
11063	11064	<split-h>	<>
11064	11065	<>	<aphaerese>
11064	11065	<>	<elision3>
11064	11065	<>	<elision2>
11064	11065	<>	<elision1>
11064	10582	<3s>	<>
11065	11066	<>	<name>
11065	11065	<>	<aphaerese>
11065	11065	<>	<elision3>
11065	11065	<>	<elision2>
11065	11065	<>	<elision1>
11065	10583	<3s>	<>
11066	11064	<>	<aphaerese>
11066	11064	<>	<elision3>
11066	11064	<>	<elision2>
11066	11064	<>	<elision1>
11066	10584	<3s>	<>
11067	9962	.	.
11067	9963	 	 
11067	9962	<~>	<~>
11067	9962	<split-s>	<split-s>
11067	9962	<split-h>	<split-h>
11067	9962	<name2>	<name2>
11067	11068	<>	<name>
11067	9966	<aphaerese>	<aphaerese>
11067	11067	<>	<aphaerese>
11067	9962	<elision3>	<elision3>
11067	11067	<>	<elision3>
11067	9962	<elision2>	<elision2>
11067	11067	<>	<elision2>
11067	9962	<elision1>	<elision1>
11067	11067	<>	<elision1>
11067	9970	.	υ
11067	9976	s	υ
11067	9970	.	u
11067	9976	s	u
11067	10629	.	κ
11067	10347	s	U
11067	9970	.	α
11067	9976	s	α
11067	9970	.	a
11067	9976	s	a
11067	10468	s	A
11067	10629	.	λ
11067	11071	<split-h>	<>
11068	9965	.	.
11068	9968	 	 
11068	9965	<~>	<~>
11068	9965	<split-s>	<split-s>
11068	9965	<split-h>	<split-h>
11068	9965	<name2>	<name2>
11068	10512	<aphaerese>	<aphaerese>
11068	11069	<>	<aphaerese>
11068	9965	<elision3>	<elision3>
11068	11069	<>	<elision3>
11068	9965	<elision2>	<elision2>
11068	11069	<>	<elision2>
11068	9965	<elision1>	<elision1>
11068	11069	<>	<elision1>
11068	9972	.	υ
11068	10148	s	υ
11068	9972	.	u
11068	10148	s	u
11068	10631	.	κ
11068	10349	s	U
11068	9972	.	α
11068	10148	s	α
11068	9972	.	a
11068	10148	s	a
11068	10470	s	A
11068	10631	.	λ
11068	11072	<split-h>	<>
11069	9962	.	.
11069	9963	 	 
11069	9962	<~>	<~>
11069	9962	<split-s>	<split-s>
11069	9962	<split-h>	<split-h>
11069	9962	<name2>	<name2>
11069	9966	<aphaerese>	<aphaerese>
11069	11067	<>	<aphaerese>
11069	9962	<elision3>	<elision3>
11069	11067	<>	<elision3>
11069	9962	<elision2>	<elision2>
11069	11067	<>	<elision2>
11069	9962	<elision1>	<elision1>
11069	11067	<>	<elision1>
11069	9970	.	υ
11069	9976	s	υ
11069	9970	.	u
11069	9976	s	u
11069	10629	.	κ
11069	10347	s	U
11069	9970	.	α
11069	9976	s	α
11069	9970	.	a
11069	9976	s	a
11069	10468	s	A
11069	10629	.	λ
11069	11070	<split-h>	<>
11070	11071	<>	<aphaerese>
11070	11071	<>	<elision3>
11070	11071	<>	<elision2>
11070	11071	<>	<elision1>
11070	10591	<3s>	<>
11071	11072	<>	<name>
11071	11071	<>	<aphaerese>
11071	11071	<>	<elision3>
11071	11071	<>	<elision2>
11071	11071	<>	<elision1>
11071	10592	<3s>	<>
11072	11070	<>	<aphaerese>
11072	11070	<>	<elision3>
11072	11070	<>	<elision2>
11072	11070	<>	<elision1>
11072	10593	<3s>	<>
11073	10651	<name>	<name>
11073	11074	<>	<name>
11073	11076	<>	<aphaerese>
11073	11076	<>	<elision3>
11073	11076	<>	<elision2>
11073	11076	<>	<elision1>
11073	10698	<split-h>	<>
11073	10750	<L2kl>	<>
11073	11083	<K2kl>	<>
11074	11075	<>	<aphaerese>
11074	11075	<>	<elision3>
11074	11075	<>	<elision2>
11074	11075	<>	<elision1>
11074	10751	<L2kl>	<>
11074	11078	<K2kl>	<>
11075	11076	<>	<aphaerese>
11075	11076	<>	<elision3>
11075	11076	<>	<elision2>
11075	11076	<>	<elision1>
11075	10752	<L2kl>	<>
11075	11079	<K2kl>	<>
11076	11074	<>	<name>
11076	11076	<>	<aphaerese>
11076	11076	<>	<elision3>
11076	11076	<>	<elision2>
11076	11076	<>	<elision1>
11076	10750	<L2kl>	<>
11076	11077	<K2kl>	<>
11077	10632	.	.
11077	10632	 	 
11077	10632	<~>	<~>
11077	10632	<split-s>	<split-s>
11077	10632	<split-h>	<split-h>
11077	10632	<name2>	<name2>
11077	11078	<>	<name>
11077	10635	<aphaerese>	<aphaerese>
11077	11077	<>	<aphaerese>
11077	10632	<elision3>	<elision3>
11077	11077	<>	<elision3>
11077	10632	<elision2>	<elision2>
11077	11077	<>	<elision2>
11077	10632	<elision1>	<elision1>
11077	11077	<>	<elision1>
11077	10629	.	υ
11077	10629	.	u
11077	10629	.	α
11077	10629	.	a
11077	11081	<split-h>	<>
11078	10634	.	.
11078	10634	 	 
11078	10634	<~>	<~>
11078	10634	<split-s>	<split-s>
11078	10634	<split-h>	<split-h>
11078	10634	<name2>	<name2>
11078	10637	<aphaerese>	<aphaerese>
11078	11079	<>	<aphaerese>
11078	10634	<elision3>	<elision3>
11078	11079	<>	<elision3>
11078	10634	<elision2>	<elision2>
11078	11079	<>	<elision2>
11078	10634	<elision1>	<elision1>
11078	11079	<>	<elision1>
11078	10631	.	υ
11078	10631	.	u
11078	10631	.	α
11078	10631	.	a
11078	11082	<split-h>	<>
11079	10632	.	.
11079	10632	 	 
11079	10632	<~>	<~>
11079	10632	<split-s>	<split-s>
11079	10632	<split-h>	<split-h>
11079	10632	<name2>	<name2>
11079	10635	<aphaerese>	<aphaerese>
11079	11077	<>	<aphaerese>
11079	10632	<elision3>	<elision3>
11079	11077	<>	<elision3>
11079	10632	<elision2>	<elision2>
11079	11077	<>	<elision2>
11079	10632	<elision1>	<elision1>
11079	11077	<>	<elision1>
11079	10629	.	υ
11079	10629	.	u
11079	10629	.	α
11079	10629	.	a
11079	11080	<split-h>	<>
11080	11081	<>	<aphaerese>
11080	11081	<>	<elision3>
11080	11081	<>	<elision2>
11080	11081	<>	<elision1>
11080	10604	<3s>	<>
11081	11082	<>	<name>
11081	11081	<>	<aphaerese>
11081	11081	<>	<elision3>
11081	11081	<>	<elision2>
11081	11081	<>	<elision1>
11081	10605	<3s>	<>
11082	11080	<>	<aphaerese>
11082	11080	<>	<elision3>
11082	11080	<>	<elision2>
11082	11080	<>	<elision1>
11082	10606	<3s>	<>
11083	10632	.	.
11083	10632	 	 
11083	10632	<~>	<~>
11083	10632	<split-s>	<split-s>
11083	10632	<split-h>	<split-h>
11083	10632	<name2>	<name2>
11083	10700	<name2>	<name>
11083	11078	<>	<name>
11083	10635	<aphaerese>	<aphaerese>
11083	11077	<>	<aphaerese>
11083	10632	<elision3>	<elision3>
11083	11077	<>	<elision3>
11083	10632	<elision2>	<elision2>
11083	11077	<>	<elision2>
11083	10632	<elision1>	<elision1>
11083	11077	<>	<elision1>
11083	10629	.	υ
11083	10629	.	u
11083	10629	.	α
11083	10629	.	a
11083	11084	<split-h>	<>
11084	11082	<>	<name>
11084	11081	<>	<aphaerese>
11084	11081	<>	<elision3>
11084	11081	<>	<elision2>
11084	11081	<>	<elision1>
11084	10611	<3s>	<>
11085	9962	.	.
11085	9963	 	 
11085	9962	<~>	<~>
11085	9962	<split-s>	<split-s>
11085	9962	<split-h>	<split-h>
11085	9962	<name2>	<name2>
11085	11086	<>	<name>
11085	9966	<aphaerese>	<aphaerese>
11085	11085	<>	<aphaerese>
11085	9962	<elision3>	<elision3>
11085	11085	<>	<elision3>
11085	9962	<elision2>	<elision2>
11085	11085	<>	<elision2>
11085	9962	<elision1>	<elision1>
11085	11085	<>	<elision1>
11085	9970	.	υ
11085	9976	s	υ
11085	9970	.	u
11085	9976	s	u
11085	9970	.	κ
11085	10347	s	U
11085	9970	.	α
11085	9976	s	α
11085	9970	.	a
11085	9976	s	a
11085	10468	s	A
11085	9970	.	λ
11085	11071	<split-h>	<>
11086	9965	.	.
11086	9968	 	 
11086	9965	<~>	<~>
11086	9965	<split-s>	<split-s>
11086	9965	<split-h>	<split-h>
11086	9965	<name2>	<name2>
11086	10512	<aphaerese>	<aphaerese>
11086	11087	<>	<aphaerese>
11086	9965	<elision3>	<elision3>
11086	11087	<>	<elision3>
11086	9965	<elision2>	<elision2>
11086	11087	<>	<elision2>
11086	9965	<elision1>	<elision1>
11086	11087	<>	<elision1>
11086	9972	.	υ
11086	10148	s	υ
11086	9972	.	u
11086	10148	s	u
11086	9972	.	κ
11086	10349	s	U
11086	9972	.	α
11086	10148	s	α
11086	9972	.	a
11086	10148	s	a
11086	10470	s	A
11086	9972	.	λ
11086	11072	<split-h>	<>
11087	9962	.	.
11087	9963	 	 
11087	9962	<~>	<~>
11087	9962	<split-s>	<split-s>
11087	9962	<split-h>	<split-h>
11087	9962	<name2>	<name2>
11087	9966	<aphaerese>	<aphaerese>
11087	11085	<>	<aphaerese>
11087	9962	<elision3>	<elision3>
11087	11085	<>	<elision3>
11087	9962	<elision2>	<elision2>
11087	11085	<>	<elision2>
11087	9962	<elision1>	<elision1>
11087	11085	<>	<elision1>
11087	9970	.	υ
11087	9976	s	υ
11087	9970	.	u
11087	9976	s	u
11087	9970	.	κ
11087	10347	s	U
11087	9970	.	α
11087	9976	s	α
11087	9970	.	a
11087	9976	s	a
11087	10468	s	A
11087	9970	.	λ
11087	11070	<split-h>	<>
11088	10632	.	.
11088	10632	 	 
11088	10632	<~>	<~>
11088	10632	<split-s>	<split-s>
11088	10632	<split-h>	<split-h>
11088	10632	<name2>	<name2>
11088	11089	<>	<name>
11088	10635	<aphaerese>	<aphaerese>
11088	11088	<>	<aphaerese>
11088	10632	<elision3>	<elision3>
11088	11088	<>	<elision3>
11088	10632	<elision2>	<elision2>
11088	11088	<>	<elision2>
11088	10632	<elision1>	<elision1>
11088	11088	<>	<elision1>
11088	10629	.	υ
11088	10629	.	u
11088	10629	.	κ
11088	10629	.	α
11088	10629	.	a
11088	10629	.	λ
11088	11071	<split-h>	<>
11089	10634	.	.
11089	10634	 	 
11089	10634	<~>	<~>
11089	10634	<split-s>	<split-s>
11089	10634	<split-h>	<split-h>
11089	10634	<name2>	<name2>
11089	10637	<aphaerese>	<aphaerese>
11089	11090	<>	<aphaerese>
11089	10634	<elision3>	<elision3>
11089	11090	<>	<elision3>
11089	10634	<elision2>	<elision2>
11089	11090	<>	<elision2>
11089	10634	<elision1>	<elision1>
11089	11090	<>	<elision1>
11089	10631	.	υ
11089	10631	.	u
11089	10631	.	κ
11089	10631	.	α
11089	10631	.	a
11089	10631	.	λ
11089	11072	<split-h>	<>
11090	10632	.	.
11090	10632	 	 
11090	10632	<~>	<~>
11090	10632	<split-s>	<split-s>
11090	10632	<split-h>	<split-h>
11090	10632	<name2>	<name2>
11090	10635	<aphaerese>	<aphaerese>
11090	11088	<>	<aphaerese>
11090	10632	<elision3>	<elision3>
11090	11088	<>	<elision3>
11090	10632	<elision2>	<elision2>
11090	11088	<>	<elision2>
11090	10632	<elision1>	<elision1>
11090	11088	<>	<elision1>
11090	10629	.	υ
11090	10629	.	u
11090	10629	.	κ
11090	10629	.	α
11090	10629	.	a
11090	10629	.	λ
11090	11070	<split-h>	<>
11091	10700	<name>	<name>
11091	11092	<>	<name>
11091	11094	<>	<aphaerese>
11091	11094	<>	<elision3>
11091	11094	<>	<elision2>
11091	11094	<>	<elision1>
11091	10698	<split-h>	<>
11091	11095	<L2kl>	<>
11092	11093	<>	<aphaerese>
11092	11093	<>	<elision3>
11092	11093	<>	<elision2>
11092	11093	<>	<elision1>
11092	11089	<L2kl>	<>
11093	11094	<>	<aphaerese>
11093	11094	<>	<elision3>
11093	11094	<>	<elision2>
11093	11094	<>	<elision1>
11093	11090	<L2kl>	<>
11094	11092	<>	<name>
11094	11094	<>	<aphaerese>
11094	11094	<>	<elision3>
11094	11094	<>	<elision2>
11094	11094	<>	<elision1>
11094	11088	<L2kl>	<>
11095	10632	.	.
11095	10632	 	 
11095	10632	<~>	<~>
11095	10632	<split-s>	<split-s>
11095	10632	<split-h>	<split-h>
11095	10632	<name2>	<name2>
11095	10700	<name2>	<name>
11095	11089	<>	<name>
11095	10635	<aphaerese>	<aphaerese>
11095	11088	<>	<aphaerese>
11095	10632	<elision3>	<elision3>
11095	11088	<>	<elision3>
11095	10632	<elision2>	<elision2>
11095	11088	<>	<elision2>
11095	10632	<elision1>	<elision1>
11095	11088	<>	<elision1>
11095	10629	.	υ
11095	10629	.	u
11095	10629	.	κ
11095	10629	.	α
11095	10629	.	a
11095	10629	.	λ
11095	11096	<split-h>	<>
11096	11072	<>	<name>
11096	11071	<>	<aphaerese>
11096	11071	<>	<elision3>
11096	11071	<>	<elision2>
11096	11071	<>	<elision1>
11096	10618	<3s>	<>
11097	11098	<>	<name>
11097	11097	<>	<aphaerese>
11097	11097	<>	<elision3>
11097	11097	<>	<elision2>
11097	11097	<>	<elision1>
11097	10778	<U2kl>	<>
11098	11099	<>	<aphaerese>
11098	11099	<>	<elision3>
11098	11099	<>	<elision2>
11098	11099	<>	<elision1>
11098	10804	<U2kl>	<>
11099	11097	<>	<aphaerese>
11099	11097	<>	<elision3>
11099	11097	<>	<elision2>
11099	11097	<>	<elision1>
11099	10781	<U2kl>	<>
11100	10806	<name>	<name>
11100	11101	<>	<name>
11100	11103	<>	<aphaerese>
11100	11103	<>	<elision3>
11100	11103	<>	<elision2>
11100	11103	<>	<elision1>
11100	10462	<2s>	<>
11100	11104	<A2kl>	<>
11100	11116	<L2kl>	<>
11100	10819	<K2kl>	<>
11101	11102	<>	<aphaerese>
11101	11102	<>	<elision3>
11101	11102	<>	<elision2>
11101	11102	<>	<elision1>
11101	11105	<A2kl>	<>
11101	11117	<L2kl>	<>
11101	10814	<K2kl>	<>
11102	11103	<>	<aphaerese>
11102	11103	<>	<elision3>
11102	11103	<>	<elision2>
11102	11103	<>	<elision1>
11102	11106	<A2kl>	<>
11102	11118	<L2kl>	<>
11102	10815	<K2kl>	<>
11103	11101	<>	<name>
11103	11103	<>	<aphaerese>
11103	11103	<>	<elision3>
11103	11103	<>	<elision2>
11103	11103	<>	<elision1>
11103	11104	<A2kl>	<>
11103	11116	<L2kl>	<>
11103	10813	<K2kl>	<>
11104	11105	<>	<name>
11104	11104	<>	<aphaerese>
11104	11104	<>	<elision3>
11104	11104	<>	<elision2>
11104	11104	<>	<elision1>
11104	11107	.	κ
11104	11107	.	λ
11104	10412	<2s>	<>
11105	11106	<>	<aphaerese>
11105	11106	<>	<elision3>
11105	11106	<>	<elision2>
11105	11106	<>	<elision1>
11105	11109	.	κ
11105	11109	.	λ
11105	10413	<2s>	<>
11106	11104	<>	<aphaerese>
11106	11104	<>	<elision3>
11106	11104	<>	<elision2>
11106	11104	<>	<elision1>
11106	11107	.	κ
11106	11107	.	λ
11106	10411	<2s>	<>
11107	11108	<>	<name>
11107	11107	<>	<aphaerese>
11107	11110	<elision3>	<elision3>
11107	11107	<>	<elision3>
11107	11110	<elision2>	<elision2>
11107	11107	<>	<elision2>
11107	11110	<elision1>	<elision1>
11107	11107	<>	<elision1>
11107	10403	<2s>	<>
11108	11109	<>	<aphaerese>
11108	11112	<elision3>	<elision3>
11108	11109	<>	<elision3>
11108	11112	<elision2>	<elision2>
11108	11109	<>	<elision2>
11108	11112	<elision1>	<elision1>
11108	11109	<>	<elision1>
11108	10404	<2s>	<>
11109	11107	<>	<aphaerese>
11109	11110	<elision3>	<elision3>
11109	11107	<>	<elision3>
11109	11110	<elision2>	<elision2>
11109	11107	<>	<elision2>
11109	11110	<elision1>	<elision1>
11109	11107	<>	<elision1>
11109	10402	<2s>	<>
11110	10778	.	.
11110	10779	 	 
11110	10778	<~>	<~>
11110	10778	<split-s>	<split-s>
11110	10778	<split-h>	<split-h>
11110	10778	<name2>	<name2>
11110	11111	<>	<name>
11110	10782	<aphaerese>	<aphaerese>
11110	11110	<>	<aphaerese>
11110	10778	<elision3>	<elision3>
11110	11110	<>	<elision3>
11110	10778	<elision2>	<elision2>
11110	11110	<>	<elision2>
11110	10778	<elision1>	<elision1>
11110	11110	<>	<elision1>
11110	10775	.	υ
11110	10702	s	υ
11110	10775	.	u
11110	10702	s	u
11110	10674	s	κ
11110	10674	s	k
11110	10647	s	U
11110	11113	s	K
11110	10775	.	α
11110	10702	s	α
11110	10775	.	a
11110	10702	s	a
11110	10705	s	A
11110	10674	s	λ
11110	10674	s	l
11110	11113	s	L
11110	10367	<2s>	<>
11111	10781	.	.
11111	10784	 	 
11111	10781	<~>	<~>
11111	10781	<split-s>	<split-s>
11111	10781	<split-h>	<split-h>
11111	10781	<name2>	<name2>
11111	10801	<aphaerese>	<aphaerese>
11111	11112	<>	<aphaerese>
11111	10781	<elision3>	<elision3>
11111	11112	<>	<elision3>
11111	10781	<elision2>	<elision2>
11111	11112	<>	<elision2>
11111	10781	<elision1>	<elision1>
11111	11112	<>	<elision1>
11111	10777	.	υ
11111	10704	s	υ
11111	10777	.	u
11111	10704	s	u
11111	10676	s	κ
11111	10676	s	k
11111	10649	s	U
11111	11115	s	K
11111	10777	.	α
11111	10704	s	α
11111	10777	.	a
11111	10704	s	a
11111	10707	s	A
11111	10676	s	λ
11111	10676	s	l
11111	11115	s	L
11111	10368	<2s>	<>
11112	10778	.	.
11112	10779	 	 
11112	10778	<~>	<~>
11112	10778	<split-s>	<split-s>
11112	10778	<split-h>	<split-h>
11112	10778	<name2>	<name2>
11112	10782	<aphaerese>	<aphaerese>
11112	11110	<>	<aphaerese>
11112	10778	<elision3>	<elision3>
11112	11110	<>	<elision3>
11112	10778	<elision2>	<elision2>
11112	11110	<>	<elision2>
11112	10778	<elision1>	<elision1>
11112	11110	<>	<elision1>
11112	10775	.	υ
11112	10702	s	υ
11112	10775	.	u
11112	10702	s	u
11112	10674	s	κ
11112	10674	s	k
11112	10647	s	U
11112	11113	s	K
11112	10775	.	α
11112	10702	s	α
11112	10775	.	a
11112	10702	s	a
11112	10705	s	A
11112	10674	s	λ
11112	10674	s	l
11112	11113	s	L
11112	10366	<2s>	<>
11113	11114	<>	<name>
11113	11113	<>	<aphaerese>
11113	11113	<>	<elision3>
11113	11113	<>	<elision2>
11113	11113	<>	<elision1>
11113	10674	<L2kl>	<>
11114	11115	<>	<aphaerese>
11114	11115	<>	<elision3>
11114	11115	<>	<elision2>
11114	11115	<>	<elision1>
11114	10675	<L2kl>	<>
11115	11113	<>	<aphaerese>
11115	11113	<>	<elision3>
11115	11113	<>	<elision2>
11115	11113	<>	<elision1>
11115	10676	<L2kl>	<>
11116	11117	<>	<name>
11116	11116	<>	<aphaerese>
11116	11116	<>	<elision3>
11116	11116	<>	<elision2>
11116	11116	<>	<elision1>
11116	11119	.	κ
11116	11119	.	λ
11116	10445	<2s>	<>
11117	11118	<>	<aphaerese>
11117	11118	<>	<elision3>
11117	11118	<>	<elision2>
11117	11118	<>	<elision1>
11117	11121	.	κ
11117	11121	.	λ
11117	10446	<2s>	<>
11118	11116	<>	<aphaerese>
11118	11116	<>	<elision3>
11118	11116	<>	<elision2>
11118	11116	<>	<elision1>
11118	11119	.	κ
11118	11119	.	λ
11118	10444	<2s>	<>
11119	11120	<>	<name>
11119	11119	<>	<aphaerese>
11119	11122	<elision3>	<elision3>
11119	11119	<>	<elision3>
11119	11122	<elision2>	<elision2>
11119	11119	<>	<elision2>
11119	11122	<elision1>	<elision1>
11119	11119	<>	<elision1>
11119	10436	<2s>	<>
11120	11121	<>	<aphaerese>
11120	11124	<elision3>	<elision3>
11120	11121	<>	<elision3>
11120	11124	<elision2>	<elision2>
11120	11121	<>	<elision2>
11120	11124	<elision1>	<elision1>
11120	11121	<>	<elision1>
11120	10437	<2s>	<>
11121	11119	<>	<aphaerese>
11121	11122	<elision3>	<elision3>
11121	11119	<>	<elision3>
11121	11122	<elision2>	<elision2>
11121	11119	<>	<elision2>
11121	11122	<elision1>	<elision1>
11121	11119	<>	<elision1>
11121	10435	<2s>	<>
11122	11123	<>	<name>
11122	11122	<>	<aphaerese>
11122	11122	<>	<elision3>
11122	11122	<>	<elision2>
11122	11122	<>	<elision1>
11122	10786	.	κ
11122	10792	s	κ
11122	10711	s	k
11122	10802	s	K
11122	10711	s	λ
11122	10711	s	l
11122	10756	s	L
11122	10430	<2s>	<>
11123	11124	<>	<aphaerese>
11123	11124	<>	<elision3>
11123	11124	<>	<elision2>
11123	11124	<>	<elision1>
11123	10788	.	κ
11123	10794	s	κ
11123	10713	s	k
11123	10748	s	K
11123	10713	s	λ
11123	10713	s	l
11123	10758	s	L
11123	10431	<2s>	<>
11124	11122	<>	<aphaerese>
11124	11122	<>	<elision3>
11124	11122	<>	<elision2>
11124	11122	<>	<elision1>
11124	10786	.	κ
11124	10792	s	κ
11124	10711	s	k
11124	10802	s	K
11124	10711	s	λ
11124	10711	s	l
11124	10756	s	L
11124	10429	<2s>	<>
11125	10778	.	.
11125	10779	 	 
11125	10778	<~>	<~>
11125	10778	<split-s>	<split-s>
11125	10778	<split-h>	<split-h>
11125	10778	<name2>	<name2>
11125	11126	<>	<name>
11125	10782	<aphaerese>	<aphaerese>
11125	11125	<>	<aphaerese>
11125	11125	<>	<elision3>
11125	11125	<>	<elision2>
11125	11125	<>	<elision1>
11125	10775	.	υ
11125	10702	s	υ
11125	10775	.	u
11125	10702	s	u
11125	10786	.	κ
11125	10792	s	κ
11125	10711	s	k
11125	10647	s	U
11125	10802	s	K
11125	10775	.	α
11125	10702	s	α
11125	10775	.	a
11125	10702	s	a
11125	10705	s	A
11125	10711	s	λ
11125	10711	s	l
11125	10756	s	L
11125	10150	<2s>	<>
11126	10781	.	.
11126	10784	 	 
11126	10781	<~>	<~>
11126	10781	<split-s>	<split-s>
11126	10781	<split-h>	<split-h>
11126	10781	<name2>	<name2>
11126	10801	<aphaerese>	<aphaerese>
11126	11127	<>	<aphaerese>
11126	11127	<>	<elision3>
11126	11127	<>	<elision2>
11126	11127	<>	<elision1>
11126	10777	.	υ
11126	10704	s	υ
11126	10777	.	u
11126	10704	s	u
11126	10788	.	κ
11126	10794	s	κ
11126	10713	s	k
11126	10649	s	U
11126	10748	s	K
11126	10777	.	α
11126	10704	s	α
11126	10777	.	a
11126	10704	s	a
11126	10707	s	A
11126	10713	s	λ
11126	10713	s	l
11126	10758	s	L
11126	10151	<2s>	<>
11127	10778	.	.
11127	10779	 	 
11127	10778	<~>	<~>
11127	10778	<split-s>	<split-s>
11127	10778	<split-h>	<split-h>
11127	10778	<name2>	<name2>
11127	10782	<aphaerese>	<aphaerese>
11127	11125	<>	<aphaerese>
11127	11125	<>	<elision3>
11127	11125	<>	<elision2>
11127	11125	<>	<elision1>
11127	10775	.	υ
11127	10702	s	υ
11127	10775	.	u
11127	10702	s	u
11127	10786	.	κ
11127	10792	s	κ
11127	10711	s	k
11127	10647	s	U
11127	10802	s	K
11127	10775	.	α
11127	10702	s	α
11127	10775	.	a
11127	10702	s	a
11127	10705	s	A
11127	10711	s	λ
11127	10711	s	l
11127	10756	s	L
11127	10149	<2s>	<>
11128	11129	<>	<name>
11128	11128	<>	<aphaerese>
11128	11128	<>	<elision3>
11128	11128	<>	<elision2>
11128	11128	<>	<elision1>
11128	10778	<A2kl>	<>
11129	11130	<>	<aphaerese>
11129	11130	<>	<elision3>
11129	11130	<>	<elision2>
11129	11130	<>	<elision1>
11129	10804	<A2kl>	<>
11130	11128	<>	<aphaerese>
11130	11128	<>	<elision3>
11130	11128	<>	<elision2>
11130	11128	<>	<elision1>
11130	10781	<A2kl>	<>
11131	56	.	.
11131	57	 	 
11131	56	<~>	<~>
11131	56	<split-s>	<split-s>
11131	56	<split-h>	<split-h>
11131	56	<name2>	<name2>
11131	11132	<>	<name>
11131	60	<aphaerese>	<aphaerese>
11131	11131	<>	<aphaerese>
11131	56	<elision3>	<elision3>
11131	11131	<>	<elision3>
11131	56	<elision2>	<elision2>
11131	11131	<>	<elision2>
11131	56	<elision1>	<elision1>
11131	11131	<>	<elision1>
11131	64	.	υ
11131	9961	s	υ
11131	64	.	u
11131	9961	s	u
11131	64	.	κ
11131	10766	s	κ
11131	10626	s	k
11131	10647	s	U
11131	10746	s	K
11131	64	.	α
11131	10702	s	α
11131	64	.	a
11131	10702	s	a
11131	10705	s	A
11131	64	.	λ
11131	10766	s	λ
11131	10711	s	l
11131	10756	s	L
11131	10342	<2s>	<>
11132	59	.	.
11132	62	 	 
11132	59	<~>	<~>
11132	59	<split-s>	<split-s>
11132	59	<split-h>	<split-h>
11132	59	<name2>	<name2>
11132	10745	<aphaerese>	<aphaerese>
11132	11133	<>	<aphaerese>
11132	59	<elision3>	<elision3>
11132	11133	<>	<elision3>
11132	59	<elision2>	<elision2>
11132	11133	<>	<elision2>
11132	59	<elision1>	<elision1>
11132	11133	<>	<elision1>
11132	66	.	υ
11132	10539	s	υ
11132	66	.	u
11132	10539	s	u
11132	66	.	κ
11132	10768	s	κ
11132	10628	s	k
11132	10649	s	U
11132	10748	s	K
11132	66	.	α
11132	10704	s	α
11132	66	.	a
11132	10704	s	a
11132	10707	s	A
11132	66	.	λ
11132	10768	s	λ
11132	10713	s	l
11132	10758	s	L
11132	10343	<2s>	<>
11133	56	.	.
11133	57	 	 
11133	56	<~>	<~>
11133	56	<split-s>	<split-s>
11133	56	<split-h>	<split-h>
11133	56	<name2>	<name2>
11133	60	<aphaerese>	<aphaerese>
11133	11131	<>	<aphaerese>
11133	56	<elision3>	<elision3>
11133	11131	<>	<elision3>
11133	56	<elision2>	<elision2>
11133	11131	<>	<elision2>
11133	56	<elision1>	<elision1>
11133	11131	<>	<elision1>
11133	64	.	υ
11133	9961	s	υ
11133	64	.	u
11133	9961	s	u
11133	64	.	κ
11133	10766	s	κ
11133	10626	s	k
11133	10647	s	U
11133	10746	s	K
11133	64	.	α
11133	10702	s	α
11133	64	.	a
11133	10702	s	a
11133	10705	s	A
11133	64	.	λ
11133	10766	s	λ
11133	10711	s	l
11133	10756	s	L
11133	10341	<2s>	<>
11134	10806	<name>	<name>
11134	11135	<>	<name>
11134	11137	<>	<aphaerese>
11134	11137	<>	<elision3>
11134	11137	<>	<elision2>
11134	11137	<>	<elision1>
11134	10462	<2s>	<>
11134	11104	<A2kl>	<>
11134	11141	<L2kl>	<>
11135	11136	<>	<aphaerese>
11135	11136	<>	<elision3>
11135	11136	<>	<elision2>
11135	11136	<>	<elision1>
11135	11105	<A2kl>	<>
11135	11139	<L2kl>	<>
11136	11137	<>	<aphaerese>
11136	11137	<>	<elision3>
11136	11137	<>	<elision2>
11136	11137	<>	<elision1>
11136	11106	<A2kl>	<>
11136	11140	<L2kl>	<>
11137	11135	<>	<name>
11137	11137	<>	<aphaerese>
11137	11137	<>	<elision3>
11137	11137	<>	<elision2>
11137	11137	<>	<elision1>
11137	11104	<A2kl>	<>
11137	11138	<L2kl>	<>
11138	10778	.	.
11138	10779	 	 
11138	10778	<~>	<~>
11138	10778	<split-s>	<split-s>
11138	10778	<split-h>	<split-h>
11138	10778	<name2>	<name2>
11138	11139	<>	<name>
11138	10782	<aphaerese>	<aphaerese>
11138	11138	<>	<aphaerese>
11138	10778	<elision3>	<elision3>
11138	11138	<>	<elision3>
11138	10778	<elision2>	<elision2>
11138	11138	<>	<elision2>
11138	10778	<elision1>	<elision1>
11138	11138	<>	<elision1>
11138	10775	.	υ
11138	10702	s	υ
11138	10775	.	u
11138	10702	s	u
11138	11119	.	κ
11138	10816	s	κ
11138	10711	s	k
11138	10647	s	U
11138	10802	s	K
11138	10775	.	α
11138	10702	s	α
11138	10775	.	a
11138	10702	s	a
11138	10705	s	A
11138	11119	.	λ
11138	10816	s	λ
11138	10711	s	l
11138	10756	s	L
11138	10479	<2s>	<>
11139	10781	.	.
11139	10784	 	 
11139	10781	<~>	<~>
11139	10781	<split-s>	<split-s>
11139	10781	<split-h>	<split-h>
11139	10781	<name2>	<name2>
11139	10801	<aphaerese>	<aphaerese>
11139	11140	<>	<aphaerese>
11139	10781	<elision3>	<elision3>
11139	11140	<>	<elision3>
11139	10781	<elision2>	<elision2>
11139	11140	<>	<elision2>
11139	10781	<elision1>	<elision1>
11139	11140	<>	<elision1>
11139	10777	.	υ
11139	10704	s	υ
11139	10777	.	u
11139	10704	s	u
11139	11121	.	κ
11139	10818	s	κ
11139	10713	s	k
11139	10649	s	U
11139	10748	s	K
11139	10777	.	α
11139	10704	s	α
11139	10777	.	a
11139	10704	s	a
11139	10707	s	A
11139	11121	.	λ
11139	10818	s	λ
11139	10713	s	l
11139	10758	s	L
11139	10480	<2s>	<>
11140	10778	.	.
11140	10779	 	 
11140	10778	<~>	<~>
11140	10778	<split-s>	<split-s>
11140	10778	<split-h>	<split-h>
11140	10778	<name2>	<name2>
11140	10782	<aphaerese>	<aphaerese>
11140	11138	<>	<aphaerese>
11140	10778	<elision3>	<elision3>
11140	11138	<>	<elision3>
11140	10778	<elision2>	<elision2>
11140	11138	<>	<elision2>
11140	10778	<elision1>	<elision1>
11140	11138	<>	<elision1>
11140	10775	.	υ
11140	10702	s	υ
11140	10775	.	u
11140	10702	s	u
11140	11119	.	κ
11140	10816	s	κ
11140	10711	s	k
11140	10647	s	U
11140	10802	s	K
11140	10775	.	α
11140	10702	s	α
11140	10775	.	a
11140	10702	s	a
11140	10705	s	A
11140	11119	.	λ
11140	10816	s	λ
11140	10711	s	l
11140	10756	s	L
11140	10478	<2s>	<>
11141	10778	.	.
11141	10779	 	 
11141	10778	<~>	<~>
11141	10778	<split-s>	<split-s>
11141	10778	<split-h>	<split-h>
11141	10778	<name2>	<name2>
11141	10806	<name2>	<name>
11141	11139	<>	<name>
11141	10782	<aphaerese>	<aphaerese>
11141	11138	<>	<aphaerese>
11141	10778	<elision3>	<elision3>
11141	11138	<>	<elision3>
11141	10778	<elision2>	<elision2>
11141	11138	<>	<elision2>
11141	10778	<elision1>	<elision1>
11141	11138	<>	<elision1>
11141	10775	.	υ
11141	10702	s	υ
11141	10775	.	u
11141	10702	s	u
11141	11119	.	κ
11141	10816	s	κ
11141	10711	s	k
11141	10647	s	U
11141	10802	s	K
11141	10775	.	α
11141	10702	s	α
11141	10775	.	a
11141	10702	s	a
11141	10705	s	A
11141	11119	.	λ
11141	10816	s	λ
11141	10711	s	l
11141	10756	s	L
11141	10485	<2s>	<>
11142	56	.	.
11142	57	 	 
11142	56	<~>	<~>
11142	56	<split-s>	<split-s>
11142	56	<split-h>	<split-h>
11142	56	<name2>	<name2>
11142	11035	<>	<name>
11142	60	<aphaerese>	<aphaerese>
11142	11034	<>	<aphaerese>
11142	11034	<>	<elision3>
11142	11034	<>	<elision2>
11142	11034	<>	<elision1>
11142	64	.	υ
11142	9961	s	υ
11142	64	.	u
11142	9961	s	u
11142	10543	.	κ
11142	10573	s	κ
11142	10626	s	k
11142	10647	s	U
11142	10746	s	K
11142	64	.	α
11142	10702	s	α
11142	64	.	a
11142	10702	s	a
11142	10705	s	A
11142	10708	s	λ
11142	10711	s	l
11142	10756	s	L
11142	10491	<2s>	<>
11143	56	.	.
11143	57	 	 
11143	56	<~>	<~>
11143	56	<split-s>	<split-s>
11143	56	<split-h>	<split-h>
11143	56	<name2>	<name2>
11143	11056	<>	<name>
11143	60	<aphaerese>	<aphaerese>
11143	11055	<>	<aphaerese>
11143	11058	<elision3>	<elision3>
11143	11055	<>	<elision3>
11143	11058	<elision2>	<elision2>
11143	11055	<>	<elision2>
11143	11058	<elision1>	<elision1>
11143	11055	<>	<elision1>
11143	64	.	υ
11143	9961	s	υ
11143	64	.	u
11143	9961	s	u
11143	64	.	κ
11143	10766	s	κ
11143	10626	s	k
11143	10647	s	U
11143	10746	s	K
11143	64	.	α
11143	10702	s	α
11143	64	.	a
11143	10702	s	a
11143	10705	s	A
11143	64	.	λ
11143	10766	s	λ
11143	10711	s	l
11143	10756	s	L
11143	10494	<2s>	<>
11144	56	.	.
11144	57	 	 
11144	56	<~>	<~>
11144	56	<split-s>	<split-s>
11144	56	<split-h>	<split-h>
11144	56	<name2>	<name2>
11144	10773	<>	<name>
11144	60	<aphaerese>	<aphaerese>
11144	10772	<>	<aphaerese>
11144	56	<elision3>	<elision3>
11144	10772	<>	<elision3>
11144	56	<elision2>	<elision2>
11144	10772	<>	<elision2>
11144	56	<elision1>	<elision1>
11144	10772	<>	<elision1>
11144	64	.	υ
11144	9961	s	υ
11144	64	.	u
11144	9961	s	u
11144	10775	.	κ
11144	10766	s	κ
11144	10626	s	k
11144	10647	s	U
11144	10746	s	K
11144	64	.	α
11144	10702	s	α
11144	64	.	a
11144	10702	s	a
11144	10705	s	A
11144	10775	.	λ
11144	10766	s	λ
11144	10711	s	l
11144	10756	s	L
11144	10497	<2s>	<>
11145	11098	<>	<name>
11145	11097	<>	<aphaerese>
11145	11097	<>	<elision3>
11145	11097	<>	<elision2>
11145	11097	<>	<elision1>
11145	11146	<U2kl>	<>
11146	10778	.	.
11146	10779	 	 
11146	10778	<~>	<~>
11146	10778	<split-s>	<split-s>
11146	10778	<split-h>	<split-h>
11146	10778	<name2>	<name2>
11146	10804	<>	<name>
11146	10782	<aphaerese>	<aphaerese>
11146	10778	<>	<aphaerese>
11146	10778	<elision3>	<elision3>
11146	10778	<>	<elision3>
11146	10778	<elision2>	<elision2>
11146	10778	<>	<elision2>
11146	10778	<elision1>	<elision1>
11146	10778	<>	<elision1>
11146	10775	.	υ
11146	10702	s	υ
11146	10775	.	u
11146	10702	s	u
11146	10786	.	κ
11146	10792	s	κ
11146	10711	s	k
11146	10647	s	U
11146	10802	s	K
11146	10775	.	α
11146	10702	s	α
11146	10775	.	a
11146	10702	s	a
11146	10705	s	A
11146	10711	s	λ
11146	10711	s	l
11146	10756	s	L
11146	10501	<2s>	<>
11147	10806	<name>	<name>
11147	11101	<>	<name>
11147	11103	<>	<aphaerese>
11147	11103	<>	<elision3>
11147	11103	<>	<elision2>
11147	11103	<>	<elision1>
11147	10462	<2s>	<>
11147	11104	<A2kl>	<>
11147	11116	<L2kl>	<>
11147	11148	<K2kl>	<>
11148	10778	.	.
11148	10779	 	 
11148	10778	<~>	<~>
11148	10778	<split-s>	<split-s>
11148	10778	<split-h>	<split-h>
11148	10778	<name2>	<name2>
11148	10806	<name2>	<name>
11148	10814	<>	<name>
11148	10782	<aphaerese>	<aphaerese>
11148	10813	<>	<aphaerese>
11148	10778	<elision3>	<elision3>
11148	10813	<>	<elision3>
11148	10778	<elision2>	<elision2>
11148	10813	<>	<elision2>
11148	10778	<elision1>	<elision1>
11148	10813	<>	<elision1>
11148	10775	.	υ
11148	10702	s	υ
11148	10775	.	u
11148	10702	s	u
11148	10816	s	κ
11148	10711	s	k
11148	10647	s	U
11148	10802	s	K
11148	10775	.	α
11148	10702	s	α
11148	10775	.	a
11148	10702	s	a
11148	10705	s	A
11148	10816	s	λ
11148	10711	s	l
11148	10756	s	L
11148	10505	<2s>	<>
11149	10778	.	.
11149	10779	 	 
11149	10778	<~>	<~>
11149	10778	<split-s>	<split-s>
11149	10778	<split-h>	<split-h>
11149	10778	<name2>	<name2>
11149	11126	<>	<name>
11149	10782	<aphaerese>	<aphaerese>
11149	11125	<>	<aphaerese>
11149	11125	<>	<elision3>
11149	11125	<>	<elision2>
11149	11125	<>	<elision1>
11149	10775	.	υ
11149	10702	s	υ
11149	10775	.	u
11149	10702	s	u
11149	10786	.	κ
11149	10792	s	κ
11149	10711	s	k
11149	10647	s	U
11149	10802	s	K
11149	10775	.	α
11149	10702	s	α
11149	10775	.	a
11149	10702	s	a
11149	10705	s	A
11149	10711	s	λ
11149	10711	s	l
11149	10756	s	L
11149	10491	<2s>	<>
11150	11129	<>	<name>
11150	11128	<>	<aphaerese>
11150	11128	<>	<elision3>
11150	11128	<>	<elision2>
11150	11128	<>	<elision1>
11150	11146	<A2kl>	<>
11151	56	.	.
11151	57	 	 
11151	56	<~>	<~>
11151	56	<split-s>	<split-s>
11151	56	<split-h>	<split-h>
11151	56	<name2>	<name2>
11151	11132	<>	<name>
11151	60	<aphaerese>	<aphaerese>
11151	11131	<>	<aphaerese>
11151	56	<elision3>	<elision3>
11151	11131	<>	<elision3>
11151	56	<elision2>	<elision2>
11151	11131	<>	<elision2>
11151	56	<elision1>	<elision1>
11151	11131	<>	<elision1>
11151	64	.	υ
11151	9961	s	υ
11151	64	.	u
11151	9961	s	u
11151	64	.	κ
11151	10766	s	κ
11151	10626	s	k
11151	10647	s	U
11151	10746	s	K
11151	64	.	α
11151	10702	s	α
11151	64	.	a
11151	10702	s	a
11151	10705	s	A
11151	64	.	λ
11151	10766	s	λ
11151	10711	s	l
11151	10756	s	L
11151	10497	<2s>	<>
11152	10778	.	.
11152	10779	 	 
11152	10778	<~>	<~>
11152	10778	<split-s>	<split-s>
11152	10778	<split-h>	<split-h>
11152	10778	<name2>	<name2>
11152	10821	<>	<name>
11152	10782	<aphaerese>	<aphaerese>
11152	10820	<>	<aphaerese>
11152	10778	<elision3>	<elision3>
11152	10820	<>	<elision3>
11152	10778	<elision2>	<elision2>
11152	10820	<>	<elision2>
11152	10778	<elision1>	<elision1>
11152	10820	<>	<elision1>
11152	10775	.	υ
11152	10702	s	υ
11152	10775	.	u
11152	10702	s	u
11152	10775	.	κ
11152	10816	s	κ
11152	10711	s	k
11152	10647	s	U
11152	10802	s	K
11152	10775	.	α
11152	10702	s	α
11152	10775	.	a
11152	10702	s	a
11152	10705	s	A
11152	10775	.	λ
11152	10816	s	λ
11152	10711	s	l
11152	10756	s	L
11152	10497	<2s>	<>
11153	10806	<name>	<name>
11153	11135	<>	<name>
11153	11137	<>	<aphaerese>
11153	11137	<>	<elision3>
11153	11137	<>	<elision2>
11153	11137	<>	<elision1>
11153	10462	<2s>	<>
11153	11104	<A2kl>	<>
11153	11154	<L2kl>	<>
11154	10778	.	.
11154	10779	 	 
11154	10778	<~>	<~>
11154	10778	<split-s>	<split-s>
11154	10778	<split-h>	<split-h>
11154	10778	<name2>	<name2>
11154	10806	<name2>	<name>
11154	11139	<>	<name>
11154	10782	<aphaerese>	<aphaerese>
11154	11138	<>	<aphaerese>
11154	10778	<elision3>	<elision3>
11154	11138	<>	<elision3>
11154	10778	<elision2>	<elision2>
11154	11138	<>	<elision2>
11154	10778	<elision1>	<elision1>
11154	11138	<>	<elision1>
11154	10775	.	υ
11154	10702	s	υ
11154	10775	.	u
11154	10702	s	u
11154	11119	.	κ
11154	10816	s	κ
11154	10711	s	k
11154	10647	s	U
11154	10802	s	K
11154	10775	.	α
11154	10702	s	α
11154	10775	.	a
11154	10702	s	a
11154	10705	s	A
11154	11119	.	λ
11154	10816	s	λ
11154	10711	s	l
11154	10756	s	L
11154	10510	<2s>	<>
11155	11023	.	.
11155	11024	 	 
11155	11023	<~>	<~>
11155	11023	<split-s>	<split-s>
11155	11023	<split-h>	<split-h>
11155	11023	<name2>	<name2>
11155	11027	<aphaerese>	<aphaerese>
11155	11027	<>	<aphaerese>
11155	11023	<elision3>	<elision3>
11155	11027	<>	<elision3>
11155	11023	<elision2>	<elision2>
11155	11027	<>	<elision2>
11155	11023	<elision1>	<elision1>
11155	11027	<>	<elision1>
11155	11023	.	υ
11155	11023	.	u
11155	11037	.	κ
11155	11055	s	κ
11155	10772	s	k
11155	11097	s	U
11155	10805	s	K
11155	11023	.	α
11155	11023	.	a
11155	11128	s	A
11155	11131	s	λ
11155	10820	s	l
11155	10823	s	L
11156	11023	.	.
11156	11024	 	 
11156	11023	<~>	<~>
11156	11023	<split-s>	<split-s>
11156	11023	<split-h>	<split-h>
11156	11023	<name2>	<name2>
11156	11027	<aphaerese>	<aphaerese>
11156	11030	<>	<aphaerese>
11156	11023	<elision3>	<elision3>
11156	11030	<>	<elision3>
11156	11023	<elision2>	<elision2>
11156	11030	<>	<elision2>
11156	11023	<elision1>	<elision1>
11156	11030	<>	<elision1>
11156	11031	.	υ
11156	11034	s	υ
11156	11031	.	u
11156	11034	s	u
11156	11037	.	κ
11156	11055	s	κ
11156	10772	s	k
11156	11097	s	U
11156	11100	s	K
11156	11031	.	α
11156	11125	s	α
11156	11031	.	a
11156	11125	s	a
11156	11128	s	A
11156	11131	s	λ
11156	10820	s	l
11156	11134	s	L
11157	11026	.	.
11157	11029	 	 
11157	11026	<~>	<~>
11157	11026	<split-s>	<split-s>
11157	11026	<split-h>	<split-h>
11157	11026	<name2>	<name2>
11157	11155	<aphaerese>	<aphaerese>
11157	11026	<>	<aphaerese>
11157	11026	<elision3>	<elision3>
11157	11026	<>	<elision3>
11157	11026	<elision2>	<elision2>
11157	11026	<>	<elision2>
11157	11026	<elision1>	<elision1>
11157	11026	<>	<elision1>
11157	11033	.	υ
11157	11036	s	υ
11157	11033	.	u
11157	11036	s	u
11157	11039	.	κ
11157	11057	s	κ
11157	10774	s	k
11157	11099	s	U
11157	10808	s	K
11157	11033	.	α
11157	11127	s	α
11157	11033	.	a
11157	11127	s	a
11157	11130	s	A
11157	11133	s	λ
11157	10822	s	l
11157	10825	s	L
11158	11026	.	.
11158	11029	 	 
11158	11026	<~>	<~>
11158	11026	<split-s>	<split-s>
11158	11026	<split-h>	<split-h>
11158	11026	<name2>	<name2>
11158	11155	<aphaerese>	<aphaerese>
11158	11159	<>	<aphaerese>
11158	11162	<elision3>	<elision3>
11158	11159	<>	<elision3>
11158	11162	<elision2>	<elision2>
11158	11159	<>	<elision2>
11158	11162	<elision1>	<elision1>
11158	11159	<>	<elision1>
11158	11033	.	υ
11158	11036	s	υ
11158	11033	.	u
11158	11036	s	u
11158	10765	s	κ
11158	10774	s	k
11158	11099	s	U
11158	10808	s	K
11158	11033	.	α
11158	11127	s	α
11158	11033	.	a
11158	11127	s	a
11158	11130	s	A
11158	10765	s	λ
11158	10822	s	l
11158	10825	s	L
11159	11023	.	.
11159	11024	 	 
11159	11023	<~>	<~>
11159	11023	<split-s>	<split-s>
11159	11023	<split-h>	<split-h>
11159	11023	<name2>	<name2>
11159	11027	<aphaerese>	<aphaerese>
11159	11022	<>	<aphaerese>
11159	11160	<elision3>	<elision3>
11159	11022	<>	<elision3>
11159	11160	<elision2>	<elision2>
11159	11022	<>	<elision2>
11159	11160	<elision1>	<elision1>
11159	11022	<>	<elision1>
11159	11031	.	υ
11159	11034	s	υ
11159	11031	.	u
11159	11034	s	u
11159	55	s	κ
11159	10772	s	k
11159	11097	s	U
11159	10805	s	K
11159	11031	.	α
11159	11125	s	α
11159	11031	.	a
11159	11125	s	a
11159	11128	s	A
11159	55	s	λ
11159	10820	s	l
11159	10823	s	L
11160	11023	.	.
11160	11024	 	 
11160	11023	<~>	<~>
11160	11023	<split-s>	<split-s>
11160	11023	<split-h>	<split-h>
11160	11023	<name2>	<name2>
11160	11161	<>	<name>
11160	11027	<aphaerese>	<aphaerese>
11160	11160	<>	<aphaerese>
11160	11023	<elision3>	<elision3>
11160	11160	<>	<elision3>
11160	11023	<elision2>	<elision2>
11160	11160	<>	<elision2>
11160	11023	<elision1>	<elision1>
11160	11160	<>	<elision1>
11160	11031	.	υ
11160	11034	s	υ
11160	11031	.	u
11160	11034	s	u
11160	11037	.	κ
11160	11163	s	κ
11160	11166	s	k
11160	11097	s	U
11160	11169	s	K
11160	11031	.	α
11160	11125	s	α
11160	11031	.	a
11160	11125	s	a
11160	11128	s	A
11160	11177	s	λ
11160	11180	s	l
11160	11183	s	L
11161	11026	.	.
11161	11029	 	 
11161	11026	<~>	<~>
11161	11026	<split-s>	<split-s>
11161	11026	<split-h>	<split-h>
11161	11026	<name2>	<name2>
11161	11155	<aphaerese>	<aphaerese>
11161	11162	<>	<aphaerese>
11161	11026	<elision3>	<elision3>
11161	11162	<>	<elision3>
11161	11026	<elision2>	<elision2>
11161	11162	<>	<elision2>
11161	11026	<elision1>	<elision1>
11161	11162	<>	<elision1>
11161	11033	.	υ
11161	11036	s	υ
11161	11033	.	u
11161	11036	s	u
11161	11039	.	κ
11161	11165	s	κ
11161	11168	s	k
11161	11099	s	U
11161	11171	s	K
11161	11033	.	α
11161	11127	s	α
11161	11033	.	a
11161	11127	s	a
11161	11130	s	A
11161	11179	s	λ
11161	11182	s	l
11161	11185	s	L
11162	11023	.	.
11162	11024	 	 
11162	11023	<~>	<~>
11162	11023	<split-s>	<split-s>
11162	11023	<split-h>	<split-h>
11162	11023	<name2>	<name2>
11162	11027	<aphaerese>	<aphaerese>
11162	11160	<>	<aphaerese>
11162	11023	<elision3>	<elision3>
11162	11160	<>	<elision3>
11162	11023	<elision2>	<elision2>
11162	11160	<>	<elision2>
11162	11023	<elision1>	<elision1>
11162	11160	<>	<elision1>
11162	11031	.	υ
11162	11034	s	υ
11162	11031	.	u
11162	11034	s	u
11162	11037	.	κ
11162	11163	s	κ
11162	11166	s	k
11162	11097	s	U
11162	11169	s	K
11162	11031	.	α
11162	11125	s	α
11162	11031	.	a
11162	11125	s	a
11162	11128	s	A
11162	11177	s	λ
11162	11180	s	l
11162	11183	s	L
11163	56	.	.
11163	57	 	 
11163	56	<~>	<~>
11163	56	<split-s>	<split-s>
11163	56	<split-h>	<split-h>
11163	56	<name2>	<name2>
11163	11164	<>	<name>
11163	60	<aphaerese>	<aphaerese>
11163	11163	<>	<aphaerese>
11163	11058	<elision3>	<elision3>
11163	11163	<>	<elision3>
11163	11058	<elision2>	<elision2>
11163	11163	<>	<elision2>
11163	11058	<elision1>	<elision1>
11163	11163	<>	<elision1>
11163	64	.	υ
11163	9961	s	υ
11163	64	.	u
11163	9961	s	u
11163	64	.	κ
11163	10647	s	U
11163	64	.	α
11163	10702	s	α
11163	64	.	a
11163	10702	s	a
11163	10705	s	A
11163	64	.	λ
11163	10583	<2s>	<>
11164	59	.	.
11164	62	 	 
11164	59	<~>	<~>
11164	59	<split-s>	<split-s>
11164	59	<split-h>	<split-h>
11164	59	<name2>	<name2>
11164	10745	<aphaerese>	<aphaerese>
11164	11165	<>	<aphaerese>
11164	11060	<elision3>	<elision3>
11164	11165	<>	<elision3>
11164	11060	<elision2>	<elision2>
11164	11165	<>	<elision2>
11164	11060	<elision1>	<elision1>
11164	11165	<>	<elision1>
11164	66	.	υ
11164	10539	s	υ
11164	66	.	u
11164	10539	s	u
11164	66	.	κ
11164	10649	s	U
11164	66	.	α
11164	10704	s	α
11164	66	.	a
11164	10704	s	a
11164	10707	s	A
11164	66	.	λ
11164	10584	<2s>	<>
11165	56	.	.
11165	57	 	 
11165	56	<~>	<~>
11165	56	<split-s>	<split-s>
11165	56	<split-h>	<split-h>
11165	56	<name2>	<name2>
11165	60	<aphaerese>	<aphaerese>
11165	11163	<>	<aphaerese>
11165	11058	<elision3>	<elision3>
11165	11163	<>	<elision3>
11165	11058	<elision2>	<elision2>
11165	11163	<>	<elision2>
11165	11058	<elision1>	<elision1>
11165	11163	<>	<elision1>
11165	64	.	υ
11165	9961	s	υ
11165	64	.	u
11165	9961	s	u
11165	64	.	κ
11165	10647	s	U
11165	64	.	α
11165	10702	s	α
11165	64	.	a
11165	10702	s	a
11165	10705	s	A
11165	64	.	λ
11165	10582	<2s>	<>
11166	56	.	.
11166	57	 	 
11166	56	<~>	<~>
11166	56	<split-s>	<split-s>
11166	56	<split-h>	<split-h>
11166	56	<name2>	<name2>
11166	11167	<>	<name>
11166	60	<aphaerese>	<aphaerese>
11166	11166	<>	<aphaerese>
11166	56	<elision3>	<elision3>
11166	11166	<>	<elision3>
11166	56	<elision2>	<elision2>
11166	11166	<>	<elision2>
11166	56	<elision1>	<elision1>
11166	11166	<>	<elision1>
11166	64	.	υ
11166	9961	s	υ
11166	64	.	u
11166	9961	s	u
11166	10775	.	κ
11166	10647	s	U
11166	64	.	α
11166	10702	s	α
11166	64	.	a
11166	10702	s	a
11166	10705	s	A
11166	10775	.	λ
11166	10592	<2s>	<>
11167	59	.	.
11167	62	 	 
11167	59	<~>	<~>
11167	59	<split-s>	<split-s>
11167	59	<split-h>	<split-h>
11167	59	<name2>	<name2>
11167	10745	<aphaerese>	<aphaerese>
11167	11168	<>	<aphaerese>
11167	59	<elision3>	<elision3>
11167	11168	<>	<elision3>
11167	59	<elision2>	<elision2>
11167	11168	<>	<elision2>
11167	59	<elision1>	<elision1>
11167	11168	<>	<elision1>
11167	66	.	υ
11167	10539	s	υ
11167	66	.	u
11167	10539	s	u
11167	10777	.	κ
11167	10649	s	U
11167	66	.	α
11167	10704	s	α
11167	66	.	a
11167	10704	s	a
11167	10707	s	A
11167	10777	.	λ
11167	10593	<2s>	<>
11168	56	.	.
11168	57	 	 
11168	56	<~>	<~>
11168	56	<split-s>	<split-s>
11168	56	<split-h>	<split-h>
11168	56	<name2>	<name2>
11168	60	<aphaerese>	<aphaerese>
11168	11166	<>	<aphaerese>
11168	56	<elision3>	<elision3>
11168	11166	<>	<elision3>
11168	56	<elision2>	<elision2>
11168	11166	<>	<elision2>
11168	56	<elision1>	<elision1>
11168	11166	<>	<elision1>
11168	64	.	υ
11168	9961	s	υ
11168	64	.	u
11168	9961	s	u
11168	10775	.	κ
11168	10647	s	U
11168	64	.	α
11168	10702	s	α
11168	64	.	a
11168	10702	s	a
11168	10705	s	A
11168	10775	.	λ
11168	10591	<2s>	<>
11169	10806	<name>	<name>
11169	11170	<>	<name>
11169	11172	<>	<aphaerese>
11169	11172	<>	<elision3>
11169	11172	<>	<elision2>
11169	11172	<>	<elision1>
11169	10462	<2s>	<>
11169	10810	<L2kl>	<>
11169	11176	<K2kl>	<>
11170	11171	<>	<aphaerese>
11170	11171	<>	<elision3>
11170	11171	<>	<elision2>
11170	11171	<>	<elision1>
11170	10811	<L2kl>	<>
11170	11174	<K2kl>	<>
11171	11172	<>	<aphaerese>
11171	11172	<>	<elision3>
11171	11172	<>	<elision2>
11171	11172	<>	<elision1>
11171	10812	<L2kl>	<>
11171	11175	<K2kl>	<>
11172	11170	<>	<name>
11172	11172	<>	<aphaerese>
11172	11172	<>	<elision3>
11172	11172	<>	<elision2>
11172	11172	<>	<elision1>
11172	10810	<L2kl>	<>
11172	11173	<K2kl>	<>
11173	10778	.	.
11173	10779	 	 
11173	10778	<~>	<~>
11173	10778	<split-s>	<split-s>
11173	10778	<split-h>	<split-h>
11173	10778	<name2>	<name2>
11173	11174	<>	<name>
11173	10782	<aphaerese>	<aphaerese>
11173	11173	<>	<aphaerese>
11173	10778	<elision3>	<elision3>
11173	11173	<>	<elision3>
11173	10778	<elision2>	<elision2>
11173	11173	<>	<elision2>
11173	10778	<elision1>	<elision1>
11173	11173	<>	<elision1>
11173	10775	.	υ
11173	10702	s	υ
11173	10775	.	u
11173	10702	s	u
11173	10647	s	U
11173	10775	.	α
11173	10702	s	α
11173	10775	.	a
11173	10702	s	a
11173	10705	s	A
11173	10605	<2s>	<>
11174	10781	.	.
11174	10784	 	 
11174	10781	<~>	<~>
11174	10781	<split-s>	<split-s>
11174	10781	<split-h>	<split-h>
11174	10781	<name2>	<name2>
11174	10801	<aphaerese>	<aphaerese>
11174	11175	<>	<aphaerese>
11174	10781	<elision3>	<elision3>
11174	11175	<>	<elision3>
11174	10781	<elision2>	<elision2>
11174	11175	<>	<elision2>
11174	10781	<elision1>	<elision1>
11174	11175	<>	<elision1>
11174	10777	.	υ
11174	10704	s	υ
11174	10777	.	u
11174	10704	s	u
11174	10649	s	U
11174	10777	.	α
11174	10704	s	α
11174	10777	.	a
11174	10704	s	a
11174	10707	s	A
11174	10606	<2s>	<>
11175	10778	.	.
11175	10779	 	 
11175	10778	<~>	<~>
11175	10778	<split-s>	<split-s>
11175	10778	<split-h>	<split-h>
11175	10778	<name2>	<name2>
11175	10782	<aphaerese>	<aphaerese>
11175	11173	<>	<aphaerese>
11175	10778	<elision3>	<elision3>
11175	11173	<>	<elision3>
11175	10778	<elision2>	<elision2>
11175	11173	<>	<elision2>
11175	10778	<elision1>	<elision1>
11175	11173	<>	<elision1>
11175	10775	.	υ
11175	10702	s	υ
11175	10775	.	u
11175	10702	s	u
11175	10647	s	U
11175	10775	.	α
11175	10702	s	α
11175	10775	.	a
11175	10702	s	a
11175	10705	s	A
11175	10604	<2s>	<>
11176	10778	.	.
11176	10779	 	 
11176	10778	<~>	<~>
11176	10778	<split-s>	<split-s>
11176	10778	<split-h>	<split-h>
11176	10778	<name2>	<name2>
11176	10806	<name2>	<name>
11176	11174	<>	<name>
11176	10782	<aphaerese>	<aphaerese>
11176	11173	<>	<aphaerese>
11176	10778	<elision3>	<elision3>
11176	11173	<>	<elision3>
11176	10778	<elision2>	<elision2>
11176	11173	<>	<elision2>
11176	10778	<elision1>	<elision1>
11176	11173	<>	<elision1>
11176	10775	.	υ
11176	10702	s	υ
11176	10775	.	u
11176	10702	s	u
11176	10647	s	U
11176	10775	.	α
11176	10702	s	α
11176	10775	.	a
11176	10702	s	a
11176	10705	s	A
11176	10611	<2s>	<>
11177	56	.	.
11177	57	 	 
11177	56	<~>	<~>
11177	56	<split-s>	<split-s>
11177	56	<split-h>	<split-h>
11177	56	<name2>	<name2>
11177	11178	<>	<name>
11177	60	<aphaerese>	<aphaerese>
11177	11177	<>	<aphaerese>
11177	56	<elision3>	<elision3>
11177	11177	<>	<elision3>
11177	56	<elision2>	<elision2>
11177	11177	<>	<elision2>
11177	56	<elision1>	<elision1>
11177	11177	<>	<elision1>
11177	64	.	υ
11177	9961	s	υ
11177	64	.	u
11177	9961	s	u
11177	64	.	κ
11177	10647	s	U
11177	64	.	α
11177	10702	s	α
11177	64	.	a
11177	10702	s	a
11177	10705	s	A
11177	64	.	λ
11177	10592	<2s>	<>
11178	59	.	.
11178	62	 	 
11178	59	<~>	<~>
11178	59	<split-s>	<split-s>
11178	59	<split-h>	<split-h>
11178	59	<name2>	<name2>
11178	10745	<aphaerese>	<aphaerese>
11178	11179	<>	<aphaerese>
11178	59	<elision3>	<elision3>
11178	11179	<>	<elision3>
11178	59	<elision2>	<elision2>
11178	11179	<>	<elision2>
11178	59	<elision1>	<elision1>
11178	11179	<>	<elision1>
11178	66	.	υ
11178	10539	s	υ
11178	66	.	u
11178	10539	s	u
11178	66	.	κ
11178	10649	s	U
11178	66	.	α
11178	10704	s	α
11178	66	.	a
11178	10704	s	a
11178	10707	s	A
11178	66	.	λ
11178	10593	<2s>	<>
11179	56	.	.
11179	57	 	 
11179	56	<~>	<~>
11179	56	<split-s>	<split-s>
11179	56	<split-h>	<split-h>
11179	56	<name2>	<name2>
11179	60	<aphaerese>	<aphaerese>
11179	11177	<>	<aphaerese>
11179	56	<elision3>	<elision3>
11179	11177	<>	<elision3>
11179	56	<elision2>	<elision2>
11179	11177	<>	<elision2>
11179	56	<elision1>	<elision1>
11179	11177	<>	<elision1>
11179	64	.	υ
11179	9961	s	υ
11179	64	.	u
11179	9961	s	u
11179	64	.	κ
11179	10647	s	U
11179	64	.	α
11179	10702	s	α
11179	64	.	a
11179	10702	s	a
11179	10705	s	A
11179	64	.	λ
11179	10591	<2s>	<>
11180	10778	.	.
11180	10779	 	 
11180	10778	<~>	<~>
11180	10778	<split-s>	<split-s>
11180	10778	<split-h>	<split-h>
11180	10778	<name2>	<name2>
11180	11181	<>	<name>
11180	10782	<aphaerese>	<aphaerese>
11180	11180	<>	<aphaerese>
11180	10778	<elision3>	<elision3>
11180	11180	<>	<elision3>
11180	10778	<elision2>	<elision2>
11180	11180	<>	<elision2>
11180	10778	<elision1>	<elision1>
11180	11180	<>	<elision1>
11180	10775	.	υ
11180	10702	s	υ
11180	10775	.	u
11180	10702	s	u
11180	10775	.	κ
11180	10647	s	U
11180	10775	.	α
11180	10702	s	α
11180	10775	.	a
11180	10702	s	a
11180	10705	s	A
11180	10775	.	λ
11180	10592	<2s>	<>
11181	10781	.	.
11181	10784	 	 
11181	10781	<~>	<~>
11181	10781	<split-s>	<split-s>
11181	10781	<split-h>	<split-h>
11181	10781	<name2>	<name2>
11181	10801	<aphaerese>	<aphaerese>
11181	11182	<>	<aphaerese>
11181	10781	<elision3>	<elision3>
11181	11182	<>	<elision3>
11181	10781	<elision2>	<elision2>
11181	11182	<>	<elision2>
11181	10781	<elision1>	<elision1>
11181	11182	<>	<elision1>
11181	10777	.	υ
11181	10704	s	υ
11181	10777	.	u
11181	10704	s	u
11181	10777	.	κ
11181	10649	s	U
11181	10777	.	α
11181	10704	s	α
11181	10777	.	a
11181	10704	s	a
11181	10707	s	A
11181	10777	.	λ
11181	10593	<2s>	<>
11182	10778	.	.
11182	10779	 	 
11182	10778	<~>	<~>
11182	10778	<split-s>	<split-s>
11182	10778	<split-h>	<split-h>
11182	10778	<name2>	<name2>
11182	10782	<aphaerese>	<aphaerese>
11182	11180	<>	<aphaerese>
11182	10778	<elision3>	<elision3>
11182	11180	<>	<elision3>
11182	10778	<elision2>	<elision2>
11182	11180	<>	<elision2>
11182	10778	<elision1>	<elision1>
11182	11180	<>	<elision1>
11182	10775	.	υ
11182	10702	s	υ
11182	10775	.	u
11182	10702	s	u
11182	10775	.	κ
11182	10647	s	U
11182	10775	.	α
11182	10702	s	α
11182	10775	.	a
11182	10702	s	a
11182	10705	s	A
11182	10775	.	λ
11182	10591	<2s>	<>
11183	10806	<name>	<name>
11183	11184	<>	<name>
11183	11186	<>	<aphaerese>
11183	11186	<>	<elision3>
11183	11186	<>	<elision2>
11183	11186	<>	<elision1>
11183	10462	<2s>	<>
11183	11187	<L2kl>	<>
11184	11185	<>	<aphaerese>
11184	11185	<>	<elision3>
11184	11185	<>	<elision2>
11184	11185	<>	<elision1>
11184	11181	<L2kl>	<>
11185	11186	<>	<aphaerese>
11185	11186	<>	<elision3>
11185	11186	<>	<elision2>
11185	11186	<>	<elision1>
11185	11182	<L2kl>	<>
11186	11184	<>	<name>
11186	11186	<>	<aphaerese>
11186	11186	<>	<elision3>
11186	11186	<>	<elision2>
11186	11186	<>	<elision1>
11186	11180	<L2kl>	<>
11187	10778	.	.
11187	10779	 	 
11187	10778	<~>	<~>
11187	10778	<split-s>	<split-s>
11187	10778	<split-h>	<split-h>
11187	10778	<name2>	<name2>
11187	10806	<name2>	<name>
11187	11181	<>	<name>
11187	10782	<aphaerese>	<aphaerese>
11187	11180	<>	<aphaerese>
11187	10778	<elision3>	<elision3>
11187	11180	<>	<elision3>
11187	10778	<elision2>	<elision2>
11187	11180	<>	<elision2>
11187	10778	<elision1>	<elision1>
11187	11180	<>	<elision1>
11187	10775	.	υ
11187	10702	s	υ
11187	10775	.	u
11187	10702	s	u
11187	10775	.	κ
11187	10647	s	U
11187	10775	.	α
11187	10702	s	α
11187	10775	.	a
11187	10702	s	a
11187	10705	s	A
11187	10775	.	λ
11187	10618	<2s>	<>
11188	11189	.	.
11188	11190	 	 
11188	11189	<~>	<~>
11188	11189	<split-s>	<split-s>
11188	11189	<split-h>	<split-h>
11188	11189	<name2>	<name2>
11188	11304	<>	<name>
11188	11193	<aphaerese>	<aphaerese>
11188	11188	<>	<aphaerese>
11188	11306	<elision3>	<elision3>
11188	11188	<>	<elision3>
11188	11306	<elision2>	<elision2>
11188	11188	<>	<elision2>
11188	11306	<elision1>	<elision1>
11188	11188	<>	<elision1>
11188	11197	.	υ
11188	11200	s	υ
11188	11197	.	u
11188	11200	s	u
11188	10831	s	κ
11188	10956	s	k
11188	11246	s	U
11188	10974	s	K
11188	11197	.	α
11188	11271	s	α
11188	11197	.	a
11188	11271	s	a
11188	11274	s	A
11188	10831	s	λ
11188	10987	s	l
11188	10990	s	L
11188	11335	<1s>	<>
11189	11189	.	.
11189	11190	 	 
11189	11189	<~>	<~>
11189	11189	<split-s>	<split-s>
11189	11189	<split-h>	<split-h>
11189	11189	<name2>	<name2>
11189	11303	<>	<name>
11189	11193	<aphaerese>	<aphaerese>
11189	11189	<>	<aphaerese>
11189	11189	<elision3>	<elision3>
11189	11189	<>	<elision3>
11189	11189	<elision2>	<elision2>
11189	11189	<>	<elision2>
11189	11189	<elision1>	<elision1>
11189	11189	<>	<elision1>
11189	11197	.	υ
11189	11200	s	υ
11189	11197	.	u
11189	11200	s	u
11189	11203	.	κ
11189	11221	s	κ
11189	10956	s	k
11189	11246	s	U
11189	10974	s	K
11189	11197	.	α
11189	11271	s	α
11189	11197	.	a
11189	11271	s	a
11189	11274	s	A
11189	11277	s	λ
11189	10987	s	l
11189	10990	s	L
11189	10145	<1s>	<>
11190	11189	.	.
11190	11190	 	 
11190	11189	<~>	<~>
11190	11189	<split-s>	<split-s>
11190	11189	<split-h>	<split-h>
11190	11189	<name2>	<name2>
11190	11191	<>	<name>
11190	11193	<aphaerese>	<aphaerese>
11190	11196	<>	<aphaerese>
11190	11189	<elision3>	<elision3>
11190	11196	<>	<elision3>
11190	11189	<elision2>	<elision2>
11190	11196	<>	<elision2>
11190	11189	<elision1>	<elision1>
11190	11196	<>	<elision1>
11190	11197	.	υ
11190	11288	s	υ
11190	11197	.	u
11190	11288	s	u
11190	11203	.	κ
11190	11289	s	κ
11190	11290	s	k
11190	11291	s	U
11190	11293	s	K
11190	11197	.	α
11190	11295	s	α
11190	11197	.	a
11190	11295	s	a
11190	11296	s	A
11190	11297	s	λ
11190	11298	s	l
11190	11299	s	L
11190	10145	<1s>	<>
11191	11192	.	.
11191	11195	 	 
11191	11192	<~>	<~>
11191	11192	<split-s>	<split-s>
11191	11192	<split-h>	<split-h>
11191	11192	<name2>	<name2>
11191	11301	<aphaerese>	<aphaerese>
11191	11302	<>	<aphaerese>
11191	11192	<elision3>	<elision3>
11191	11302	<>	<elision3>
11191	11192	<elision2>	<elision2>
11191	11302	<>	<elision2>
11191	11192	<elision1>	<elision1>
11191	11302	<>	<elision1>
11191	11199	.	υ
11191	11202	s	υ
11191	11199	.	u
11191	11202	s	u
11191	11205	.	κ
11191	11223	s	κ
11191	10958	s	k
11191	11248	s	U
11191	11251	s	K
11191	11199	.	α
11191	11273	s	α
11191	11199	.	a
11191	11273	s	a
11191	11276	s	A
11191	11279	s	λ
11191	10989	s	l
11191	11282	s	L
11191	10146	<1s>	<>
11192	11189	.	.
11192	11190	 	 
11192	11189	<~>	<~>
11192	11189	<split-s>	<split-s>
11192	11189	<split-h>	<split-h>
11192	11189	<name2>	<name2>
11192	11193	<aphaerese>	<aphaerese>
11192	11189	<>	<aphaerese>
11192	11189	<elision3>	<elision3>
11192	11189	<>	<elision3>
11192	11189	<elision2>	<elision2>
11192	11189	<>	<elision2>
11192	11189	<elision1>	<elision1>
11192	11189	<>	<elision1>
11192	11197	.	υ
11192	11200	s	υ
11192	11197	.	u
11192	11200	s	u
11192	11203	.	κ
11192	11221	s	κ
11192	10956	s	k
11192	11246	s	U
11192	10974	s	K
11192	11197	.	α
11192	11271	s	α
11192	11197	.	a
11192	11271	s	a
11192	11274	s	A
11192	11277	s	λ
11192	10987	s	l
11192	10990	s	L
11192	10144	<1s>	<>
11193	11189	.	.
11193	11190	 	 
11193	11189	<~>	<~>
11193	11189	<split-s>	<split-s>
11193	11189	<split-h>	<split-h>
11193	11189	<name2>	<name2>
11193	11194	<>	<name>
11193	11193	<aphaerese>	<aphaerese>
11193	11193	<>	<aphaerese>
11193	11189	<elision3>	<elision3>
11193	11193	<>	<elision3>
11193	11189	<elision2>	<elision2>
11193	11193	<>	<elision2>
11193	11189	<elision1>	<elision1>
11193	11193	<>	<elision1>
11193	11189	.	υ
11193	11189	.	u
11193	11203	.	κ
11193	11221	s	κ
11193	10956	s	k
11193	11246	s	U
11193	10974	s	K
11193	11189	.	α
11193	11189	.	a
11193	11274	s	A
11193	11277	s	λ
11193	10987	s	l
11193	10990	s	L
11193	10132	<1s>	<>
11194	11192	.	.
11194	11195	 	 
11194	11192	<~>	<~>
11194	11192	<split-s>	<split-s>
11194	11192	<split-h>	<split-h>
11194	11192	<name2>	<name2>
11194	11301	<aphaerese>	<aphaerese>
11194	11301	<>	<aphaerese>
11194	11192	<elision3>	<elision3>
11194	11301	<>	<elision3>
11194	11192	<elision2>	<elision2>
11194	11301	<>	<elision2>
11194	11192	<elision1>	<elision1>
11194	11301	<>	<elision1>
11194	11192	.	υ
11194	11192	.	u
11194	11205	.	κ
11194	11223	s	κ
11194	10958	s	k
11194	11248	s	U
11194	10977	s	K
11194	11192	.	α
11194	11192	.	a
11194	11276	s	A
11194	11279	s	λ
11194	10989	s	l
11194	10992	s	L
11194	10133	<1s>	<>
11195	11189	.	.
11195	11190	 	 
11195	11189	<~>	<~>
11195	11189	<split-s>	<split-s>
11195	11189	<split-h>	<split-h>
11195	11189	<name2>	<name2>
11195	11193	<aphaerese>	<aphaerese>
11195	11196	<>	<aphaerese>
11195	11189	<elision3>	<elision3>
11195	11196	<>	<elision3>
11195	11189	<elision2>	<elision2>
11195	11196	<>	<elision2>
11195	11189	<elision1>	<elision1>
11195	11196	<>	<elision1>
11195	11197	.	υ
11195	11288	s	υ
11195	11197	.	u
11195	11288	s	u
11195	11203	.	κ
11195	11289	s	κ
11195	11290	s	k
11195	11291	s	U
11195	11293	s	K
11195	11197	.	α
11195	11295	s	α
11195	11197	.	a
11195	11295	s	a
11195	11296	s	A
11195	11297	s	λ
11195	11298	s	l
11195	11299	s	L
11195	10144	<1s>	<>
11196	11189	.	.
11196	11190	 	 
11196	11189	<~>	<~>
11196	11189	<split-s>	<split-s>
11196	11189	<split-h>	<split-h>
11196	11189	<name2>	<name2>
11196	11191	<>	<name>
11196	11193	<aphaerese>	<aphaerese>
11196	11196	<>	<aphaerese>
11196	11189	<elision3>	<elision3>
11196	11196	<>	<elision3>
11196	11189	<elision2>	<elision2>
11196	11196	<>	<elision2>
11196	11189	<elision1>	<elision1>
11196	11196	<>	<elision1>
11196	11197	.	υ
11196	11200	s	υ
11196	11197	.	u
11196	11200	s	u
11196	11203	.	κ
11196	11221	s	κ
11196	10956	s	k
11196	11246	s	U
11196	11249	s	K
11196	11197	.	α
11196	11271	s	α
11196	11197	.	a
11196	11271	s	a
11196	11274	s	A
11196	11277	s	λ
11196	10987	s	l
11196	11280	s	L
11196	10145	<1s>	<>
11197	11198	<>	<name>
11197	11197	<>	<aphaerese>
11197	11189	<elision3>	<elision3>
11197	11197	<>	<elision3>
11197	11189	<elision2>	<elision2>
11197	11197	<>	<elision2>
11197	11189	<elision1>	<elision1>
11197	11197	<>	<elision1>
11197	68	<1s>	<>
11198	11199	<>	<aphaerese>
11198	11192	<elision3>	<elision3>
11198	11199	<>	<elision3>
11198	11192	<elision2>	<elision2>
11198	11199	<>	<elision2>
11198	11192	<elision1>	<elision1>
11198	11199	<>	<elision1>
11198	69	<1s>	<>
11199	11197	<>	<aphaerese>
11199	11189	<elision3>	<elision3>
11199	11197	<>	<elision3>
11199	11189	<elision2>	<elision2>
11199	11197	<>	<elision2>
11199	11189	<elision1>	<elision1>
11199	11197	<>	<elision1>
11199	67	<1s>	<>
11200	10832	.	.
11200	10833	 	 
11200	10832	<~>	<~>
11200	10832	<split-s>	<split-s>
11200	10832	<split-h>	<split-h>
11200	10832	<name2>	<name2>
11200	11201	<>	<name>
11200	10836	<aphaerese>	<aphaerese>
11200	11200	<>	<aphaerese>
11200	11200	<>	<elision3>
11200	11200	<>	<elision2>
11200	11200	<>	<elision1>
11200	10840	.	υ
11200	10843	s	υ
11200	10840	.	u
11200	10843	s	u
11200	10861	.	κ
11200	10876	s	κ
11200	10882	s	k
11200	10885	s	U
11200	10937	s	K
11200	10840	.	α
11200	10843	s	α
11200	10840	.	a
11200	10843	s	a
11200	10915	s	A
11200	10882	s	λ
11200	10882	s	l
11200	10944	s	L
11200	10150	<2s>	<>
11201	10835	.	.
11201	10838	 	 
11201	10835	<~>	<~>
11201	10835	<split-s>	<split-s>
11201	10835	<split-h>	<split-h>
11201	10835	<name2>	<name2>
11201	10936	<aphaerese>	<aphaerese>
11201	11202	<>	<aphaerese>
11201	11202	<>	<elision3>
11201	11202	<>	<elision2>
11201	11202	<>	<elision1>
11201	10842	.	υ
11201	10860	s	υ
11201	10842	.	u
11201	10860	s	u
11201	10863	.	κ
11201	10878	s	κ
11201	10884	s	k
11201	10887	s	U
11201	10939	s	K
11201	10842	.	α
11201	10860	s	α
11201	10842	.	a
11201	10860	s	a
11201	10917	s	A
11201	10884	s	λ
11201	10884	s	l
11201	10946	s	L
11201	10151	<2s>	<>
11202	10832	.	.
11202	10833	 	 
11202	10832	<~>	<~>
11202	10832	<split-s>	<split-s>
11202	10832	<split-h>	<split-h>
11202	10832	<name2>	<name2>
11202	10836	<aphaerese>	<aphaerese>
11202	11200	<>	<aphaerese>
11202	11200	<>	<elision3>
11202	11200	<>	<elision2>
11202	11200	<>	<elision1>
11202	10840	.	υ
11202	10843	s	υ
11202	10840	.	u
11202	10843	s	u
11202	10861	.	κ
11202	10876	s	κ
11202	10882	s	k
11202	10885	s	U
11202	10937	s	K
11202	10840	.	α
11202	10843	s	α
11202	10840	.	a
11202	10843	s	a
11202	10915	s	A
11202	10882	s	λ
11202	10882	s	l
11202	10944	s	L
11202	10149	<2s>	<>
11203	11204	<>	<name>
11203	11203	<>	<aphaerese>
11203	11206	<elision3>	<elision3>
11203	11203	<>	<elision3>
11203	11206	<elision2>	<elision2>
11203	11203	<>	<elision2>
11203	11206	<elision1>	<elision1>
11203	11203	<>	<elision1>
11203	10129	<1s>	<>
11204	11205	<>	<aphaerese>
11204	11208	<elision3>	<elision3>
11204	11205	<>	<elision3>
11204	11208	<elision2>	<elision2>
11204	11205	<>	<elision2>
11204	11208	<elision1>	<elision1>
11204	11205	<>	<elision1>
11204	10130	<1s>	<>
11205	11203	<>	<aphaerese>
11205	11206	<elision3>	<elision3>
11205	11203	<>	<elision3>
11205	11206	<elision2>	<elision2>
11205	11203	<>	<elision2>
11205	11206	<elision1>	<elision1>
11205	11203	<>	<elision1>
11205	10128	<1s>	<>
11206	11207	<>	<name>
11206	11206	<>	<aphaerese>
11206	11206	<>	<elision3>
11206	11206	<>	<elision2>
11206	11206	<>	<elision1>
11206	11209	s	κ
11206	11209	s	k
11206	11212	s	K
11206	11209	s	λ
11206	11216	s	l
11206	11218	s	L
11206	9990	<1s>	<>
11207	11208	<>	<aphaerese>
11207	11208	<>	<elision3>
11207	11208	<>	<elision2>
11207	11208	<>	<elision1>
11207	11211	s	κ
11207	11211	s	k
11207	11214	s	K
11207	11211	s	λ
11207	11215	s	l
11207	11220	s	L
11207	9991	<1s>	<>
11208	11206	<>	<aphaerese>
11208	11206	<>	<elision3>
11208	11206	<>	<elision2>
11208	11206	<>	<elision1>
11208	11209	s	κ
11208	11209	s	k
11208	11212	s	K
11208	11209	s	λ
11208	11216	s	l
11208	11218	s	L
11208	9989	<1s>	<>
11209	11210	<>	<name>
11209	11209	<>	<aphaerese>
11209	11209	<>	<elision3>
11209	11209	<>	<elision2>
11209	11209	<>	<elision1>
11209	10953	s	κ
11209	10882	s	k
11209	10937	s	K
11209	10953	s	λ
11209	10882	s	l
11209	10944	s	L
11209	10165	<2s>	<>
11210	11211	<>	<aphaerese>
11210	11211	<>	<elision3>
11210	11211	<>	<elision2>
11210	11211	<>	<elision1>
11210	10955	s	κ
11210	10884	s	k
11210	10939	s	K
11210	10955	s	λ
11210	10884	s	l
11210	10946	s	L
11210	10166	<2s>	<>
11211	11209	<>	<aphaerese>
11211	11209	<>	<elision3>
11211	11209	<>	<elision2>
11211	11209	<>	<elision1>
11211	10953	s	κ
11211	10882	s	k
11211	10937	s	K
11211	10953	s	λ
11211	10882	s	l
11211	10944	s	L
11211	10164	<2s>	<>
11212	11213	<>	<name>
11212	11212	<>	<aphaerese>
11212	11212	<>	<elision3>
11212	11212	<>	<elision2>
11212	11212	<>	<elision1>
11212	11216	<K2kl>	<>
11213	11214	<>	<aphaerese>
11213	11214	<>	<elision3>
11213	11214	<>	<elision2>
11213	11214	<>	<elision1>
11213	11217	<K2kl>	<>
11214	11212	<>	<aphaerese>
11214	11212	<>	<elision3>
11214	11212	<>	<elision2>
11214	11212	<>	<elision1>
11214	11215	<K2kl>	<>
11215	11216	<>	<aphaerese>
11215	11216	<>	<elision3>
11215	11216	<>	<elision2>
11215	11216	<>	<elision1>
11215	10164	<2s>	<>
11216	11217	<>	<name>
11216	11216	<>	<aphaerese>
11216	11216	<>	<elision3>
11216	11216	<>	<elision2>
11216	11216	<>	<elision1>
11216	10165	<2s>	<>
11217	11215	<>	<aphaerese>
11217	11215	<>	<elision3>
11217	11215	<>	<elision2>
11217	11215	<>	<elision1>
11217	10166	<2s>	<>
11218	11219	<>	<name>
11218	11218	<>	<aphaerese>
11218	11218	<>	<elision3>
11218	11218	<>	<elision2>
11218	11218	<>	<elision1>
11218	11216	<L2kl>	<>
11219	11220	<>	<aphaerese>
11219	11220	<>	<elision3>
11219	11220	<>	<elision2>
11219	11220	<>	<elision1>
11219	11217	<L2kl>	<>
11220	11218	<>	<aphaerese>
11220	11218	<>	<elision3>
11220	11218	<>	<elision2>
11220	11218	<>	<elision1>
11220	11215	<L2kl>	<>
11221	10832	.	.
11221	10833	 	 
11221	10832	<~>	<~>
11221	10832	<split-s>	<split-s>
11221	10832	<split-h>	<split-h>
11221	10832	<name2>	<name2>
11221	11222	<>	<name>
11221	10836	<aphaerese>	<aphaerese>
11221	11221	<>	<aphaerese>
11221	11224	<elision3>	<elision3>
11221	11221	<>	<elision3>
11221	11224	<elision2>	<elision2>
11221	11221	<>	<elision2>
11221	11224	<elision1>	<elision1>
11221	11221	<>	<elision1>
11221	10840	.	υ
11221	10843	s	υ
11221	10840	.	u
11221	10843	s	u
11221	10840	.	κ
11221	10953	s	κ
11221	10882	s	k
11221	10885	s	U
11221	10937	s	K
11221	10840	.	α
11221	10843	s	α
11221	10840	.	a
11221	10843	s	a
11221	10915	s	A
11221	10840	.	λ
11221	10953	s	λ
11221	10882	s	l
11221	10944	s	L
11221	10330	<2s>	<>
11222	10835	.	.
11222	10838	 	 
11222	10835	<~>	<~>
11222	10835	<split-s>	<split-s>
11222	10835	<split-h>	<split-h>
11222	10835	<name2>	<name2>
11222	10936	<aphaerese>	<aphaerese>
11222	11223	<>	<aphaerese>
11222	11226	<elision3>	<elision3>
11222	11223	<>	<elision3>
11222	11226	<elision2>	<elision2>
11222	11223	<>	<elision2>
11222	11226	<elision1>	<elision1>
11222	11223	<>	<elision1>
11222	10842	.	υ
11222	10860	s	υ
11222	10842	.	u
11222	10860	s	u
11222	10842	.	κ
11222	10955	s	κ
11222	10884	s	k
11222	10887	s	U
11222	10939	s	K
11222	10842	.	α
11222	10860	s	α
11222	10842	.	a
11222	10860	s	a
11222	10917	s	A
11222	10842	.	λ
11222	10955	s	λ
11222	10884	s	l
11222	10946	s	L
11222	10331	<2s>	<>
11223	10832	.	.
11223	10833	 	 
11223	10832	<~>	<~>
11223	10832	<split-s>	<split-s>
11223	10832	<split-h>	<split-h>
11223	10832	<name2>	<name2>
11223	10836	<aphaerese>	<aphaerese>
11223	11221	<>	<aphaerese>
11223	11224	<elision3>	<elision3>
11223	11221	<>	<elision3>
11223	11224	<elision2>	<elision2>
11223	11221	<>	<elision2>
11223	11224	<elision1>	<elision1>
11223	11221	<>	<elision1>
11223	10840	.	υ
11223	10843	s	υ
11223	10840	.	u
11223	10843	s	u
11223	10840	.	κ
11223	10953	s	κ
11223	10882	s	k
11223	10885	s	U
11223	10937	s	K
11223	10840	.	α
11223	10843	s	α
11223	10840	.	a
11223	10843	s	a
11223	10915	s	A
11223	10840	.	λ
11223	10953	s	λ
11223	10882	s	l
11223	10944	s	L
11223	10329	<2s>	<>
11224	10832	.	.
11224	10833	 	 
11224	10832	<~>	<~>
11224	10832	<split-s>	<split-s>
11224	10832	<split-h>	<split-h>
11224	10832	<name2>	<name2>
11224	11225	<>	<name>
11224	10836	<aphaerese>	<aphaerese>
11224	11224	<>	<aphaerese>
11224	10832	<elision3>	<elision3>
11224	11224	<>	<elision3>
11224	10832	<elision2>	<elision2>
11224	11224	<>	<elision2>
11224	10832	<elision1>	<elision1>
11224	11224	<>	<elision1>
11224	10840	.	υ
11224	10843	s	υ
11224	10840	.	u
11224	10843	s	u
11224	10861	.	κ
11224	11227	s	κ
11224	11230	s	k
11224	10885	s	U
11224	11233	s	K
11224	10840	.	α
11224	10843	s	α
11224	10840	.	a
11224	10843	s	a
11224	10915	s	A
11224	11230	s	λ
11224	11230	s	l
11224	11241	s	L
11224	10233	<2s>	<>
11225	10835	.	.
11225	10838	 	 
11225	10835	<~>	<~>
11225	10835	<split-s>	<split-s>
11225	10835	<split-h>	<split-h>
11225	10835	<name2>	<name2>
11225	10936	<aphaerese>	<aphaerese>
11225	11226	<>	<aphaerese>
11225	10835	<elision3>	<elision3>
11225	11226	<>	<elision3>
11225	10835	<elision2>	<elision2>
11225	11226	<>	<elision2>
11225	10835	<elision1>	<elision1>
11225	11226	<>	<elision1>
11225	10842	.	υ
11225	10860	s	υ
11225	10842	.	u
11225	10860	s	u
11225	10863	.	κ
11225	11229	s	κ
11225	11232	s	k
11225	10887	s	U
11225	11235	s	K
11225	10842	.	α
11225	10860	s	α
11225	10842	.	a
11225	10860	s	a
11225	10917	s	A
11225	11232	s	λ
11225	11232	s	l
11225	11243	s	L
11225	10234	<2s>	<>
11226	10832	.	.
11226	10833	 	 
11226	10832	<~>	<~>
11226	10832	<split-s>	<split-s>
11226	10832	<split-h>	<split-h>
11226	10832	<name2>	<name2>
11226	10836	<aphaerese>	<aphaerese>
11226	11224	<>	<aphaerese>
11226	10832	<elision3>	<elision3>
11226	11224	<>	<elision3>
11226	10832	<elision2>	<elision2>
11226	11224	<>	<elision2>
11226	10832	<elision1>	<elision1>
11226	11224	<>	<elision1>
11226	10840	.	υ
11226	10843	s	υ
11226	10840	.	u
11226	10843	s	u
11226	10861	.	κ
11226	11227	s	κ
11226	11230	s	k
11226	10885	s	U
11226	11233	s	K
11226	10840	.	α
11226	10843	s	α
11226	10840	.	a
11226	10843	s	a
11226	10915	s	A
11226	11230	s	λ
11226	11230	s	l
11226	11241	s	L
11226	10232	<2s>	<>
11227	10844	.	.
11227	10844	 	 
11227	10844	<~>	<~>
11227	10844	<split-s>	<split-s>
11227	10844	<split-h>	<split-h>
11227	10844	<name2>	<name2>
11227	11228	<>	<name>
11227	10847	<aphaerese>	<aphaerese>
11227	11227	<>	<aphaerese>
11227	10879	<elision3>	<elision3>
11227	11227	<>	<elision3>
11227	10879	<elision2>	<elision2>
11227	11227	<>	<elision2>
11227	10879	<elision1>	<elision1>
11227	11227	<>	<elision1>
11227	10856	.	υ
11227	10856	.	u
11227	10856	.	κ
11227	10856	.	α
11227	10856	.	a
11227	10856	.	λ
11227	11065	<split-s>	<>
11228	10846	.	.
11228	10846	 	 
11228	10846	<~>	<~>
11228	10846	<split-s>	<split-s>
11228	10846	<split-h>	<split-h>
11228	10846	<name2>	<name2>
11228	10849	<aphaerese>	<aphaerese>
11228	11229	<>	<aphaerese>
11228	10881	<elision3>	<elision3>
11228	11229	<>	<elision3>
11228	10881	<elision2>	<elision2>
11228	11229	<>	<elision2>
11228	10881	<elision1>	<elision1>
11228	11229	<>	<elision1>
11228	10858	.	υ
11228	10858	.	u
11228	10858	.	κ
11228	10858	.	α
11228	10858	.	a
11228	10858	.	λ
11228	11066	<split-s>	<>
11229	10844	.	.
11229	10844	 	 
11229	10844	<~>	<~>
11229	10844	<split-s>	<split-s>
11229	10844	<split-h>	<split-h>
11229	10844	<name2>	<name2>
11229	10847	<aphaerese>	<aphaerese>
11229	11227	<>	<aphaerese>
11229	10879	<elision3>	<elision3>
11229	11227	<>	<elision3>
11229	10879	<elision2>	<elision2>
11229	11227	<>	<elision2>
11229	10879	<elision1>	<elision1>
11229	11227	<>	<elision1>
11229	10856	.	υ
11229	10856	.	u
11229	10856	.	κ
11229	10856	.	α
11229	10856	.	a
11229	10856	.	λ
11229	11064	<split-s>	<>
11230	10844	.	.
11230	10844	 	 
11230	10844	<~>	<~>
11230	10844	<split-s>	<split-s>
11230	10844	<split-h>	<split-h>
11230	10844	<name2>	<name2>
11230	11231	<>	<name>
11230	10847	<aphaerese>	<aphaerese>
11230	11230	<>	<aphaerese>
11230	10844	<elision3>	<elision3>
11230	11230	<>	<elision3>
11230	10844	<elision2>	<elision2>
11230	11230	<>	<elision2>
11230	10844	<elision1>	<elision1>
11230	11230	<>	<elision1>
11230	10856	.	υ
11230	10856	.	u
11230	10856	.	κ
11230	10856	.	α
11230	10856	.	a
11230	10856	.	λ
11230	11071	<split-s>	<>
11231	10846	.	.
11231	10846	 	 
11231	10846	<~>	<~>
11231	10846	<split-s>	<split-s>
11231	10846	<split-h>	<split-h>
11231	10846	<name2>	<name2>
11231	10849	<aphaerese>	<aphaerese>
11231	11232	<>	<aphaerese>
11231	10846	<elision3>	<elision3>
11231	11232	<>	<elision3>
11231	10846	<elision2>	<elision2>
11231	11232	<>	<elision2>
11231	10846	<elision1>	<elision1>
11231	11232	<>	<elision1>
11231	10858	.	υ
11231	10858	.	u
11231	10858	.	κ
11231	10858	.	α
11231	10858	.	a
11231	10858	.	λ
11231	11072	<split-s>	<>
11232	10844	.	.
11232	10844	 	 
11232	10844	<~>	<~>
11232	10844	<split-s>	<split-s>
11232	10844	<split-h>	<split-h>
11232	10844	<name2>	<name2>
11232	10847	<aphaerese>	<aphaerese>
11232	11230	<>	<aphaerese>
11232	10844	<elision3>	<elision3>
11232	11230	<>	<elision3>
11232	10844	<elision2>	<elision2>
11232	11230	<>	<elision2>
11232	10844	<elision1>	<elision1>
11232	11230	<>	<elision1>
11232	10856	.	υ
11232	10856	.	u
11232	10856	.	κ
11232	10856	.	α
11232	10856	.	a
11232	10856	.	λ
11232	11070	<split-s>	<>
11233	10889	<name>	<name>
11233	11234	<>	<name>
11233	11236	<>	<aphaerese>
11233	11236	<>	<elision3>
11233	11236	<>	<elision2>
11233	11236	<>	<elision1>
11233	10698	<split-s>	<>
11233	10941	<L2kl>	<>
11233	11240	<K2kl>	<>
11234	11235	<>	<aphaerese>
11234	11235	<>	<elision3>
11234	11235	<>	<elision2>
11234	11235	<>	<elision1>
11234	10942	<L2kl>	<>
11234	11238	<K2kl>	<>
11235	11236	<>	<aphaerese>
11235	11236	<>	<elision3>
11235	11236	<>	<elision2>
11235	11236	<>	<elision1>
11235	10943	<L2kl>	<>
11235	11239	<K2kl>	<>
11236	11234	<>	<name>
11236	11236	<>	<aphaerese>
11236	11236	<>	<elision3>
11236	11236	<>	<elision2>
11236	11236	<>	<elision1>
11236	10941	<L2kl>	<>
11236	11237	<K2kl>	<>
11237	10844	.	.
11237	10844	 	 
11237	10844	<~>	<~>
11237	10844	<split-s>	<split-s>
11237	10844	<split-h>	<split-h>
11237	10844	<name2>	<name2>
11237	11238	<>	<name>
11237	10847	<aphaerese>	<aphaerese>
11237	11237	<>	<aphaerese>
11237	10844	<elision3>	<elision3>
11237	11237	<>	<elision3>
11237	10844	<elision2>	<elision2>
11237	11237	<>	<elision2>
11237	10844	<elision1>	<elision1>
11237	11237	<>	<elision1>
11237	10856	.	υ
11237	10856	.	u
11237	10856	.	α
11237	10856	.	a
11237	11081	<split-s>	<>
11238	10846	.	.
11238	10846	 	 
11238	10846	<~>	<~>
11238	10846	<split-s>	<split-s>
11238	10846	<split-h>	<split-h>
11238	10846	<name2>	<name2>
11238	10849	<aphaerese>	<aphaerese>
11238	11239	<>	<aphaerese>
11238	10846	<elision3>	<elision3>
11238	11239	<>	<elision3>
11238	10846	<elision2>	<elision2>
11238	11239	<>	<elision2>
11238	10846	<elision1>	<elision1>
11238	11239	<>	<elision1>
11238	10858	.	υ
11238	10858	.	u
11238	10858	.	α
11238	10858	.	a
11238	11082	<split-s>	<>
11239	10844	.	.
11239	10844	 	 
11239	10844	<~>	<~>
11239	10844	<split-s>	<split-s>
11239	10844	<split-h>	<split-h>
11239	10844	<name2>	<name2>
11239	10847	<aphaerese>	<aphaerese>
11239	11237	<>	<aphaerese>
11239	10844	<elision3>	<elision3>
11239	11237	<>	<elision3>
11239	10844	<elision2>	<elision2>
11239	11237	<>	<elision2>
11239	10844	<elision1>	<elision1>
11239	11237	<>	<elision1>
11239	10856	.	υ
11239	10856	.	u
11239	10856	.	α
11239	10856	.	a
11239	11080	<split-s>	<>
11240	10844	.	.
11240	10844	 	 
11240	10844	<~>	<~>
11240	10844	<split-s>	<split-s>
11240	10844	<split-h>	<split-h>
11240	10844	<name2>	<name2>
11240	10889	<name2>	<name>
11240	11238	<>	<name>
11240	10847	<aphaerese>	<aphaerese>
11240	11237	<>	<aphaerese>
11240	10844	<elision3>	<elision3>
11240	11237	<>	<elision3>
11240	10844	<elision2>	<elision2>
11240	11237	<>	<elision2>
11240	10844	<elision1>	<elision1>
11240	11237	<>	<elision1>
11240	10856	.	υ
11240	10856	.	u
11240	10856	.	α
11240	10856	.	a
11240	11084	<split-s>	<>
11241	10889	<name>	<name>
11241	11242	<>	<name>
11241	11244	<>	<aphaerese>
11241	11244	<>	<elision3>
11241	11244	<>	<elision2>
11241	11244	<>	<elision1>
11241	10698	<split-s>	<>
11241	11245	<L2kl>	<>
11242	11243	<>	<aphaerese>
11242	11243	<>	<elision3>
11242	11243	<>	<elision2>
11242	11243	<>	<elision1>
11242	11231	<L2kl>	<>
11243	11244	<>	<aphaerese>
11243	11244	<>	<elision3>
11243	11244	<>	<elision2>
11243	11244	<>	<elision1>
11243	11232	<L2kl>	<>
11244	11242	<>	<name>
11244	11244	<>	<aphaerese>
11244	11244	<>	<elision3>
11244	11244	<>	<elision2>
11244	11244	<>	<elision1>
11244	11230	<L2kl>	<>
11245	10844	.	.
11245	10844	 	 
11245	10844	<~>	<~>
11245	10844	<split-s>	<split-s>
11245	10844	<split-h>	<split-h>
11245	10844	<name2>	<name2>
11245	10889	<name2>	<name>
11245	11231	<>	<name>
11245	10847	<aphaerese>	<aphaerese>
11245	11230	<>	<aphaerese>
11245	10844	<elision3>	<elision3>
11245	11230	<>	<elision3>
11245	10844	<elision2>	<elision2>
11245	11230	<>	<elision2>
11245	10844	<elision1>	<elision1>
11245	11230	<>	<elision1>
11245	10856	.	υ
11245	10856	.	u
11245	10856	.	κ
11245	10856	.	α
11245	10856	.	a
11245	10856	.	λ
11245	11096	<split-s>	<>
11246	11247	<>	<name>
11246	11246	<>	<aphaerese>
11246	11246	<>	<elision3>
11246	11246	<>	<elision2>
11246	11246	<>	<elision1>
11246	10962	<U2kl>	<>
11247	11248	<>	<aphaerese>
11247	11248	<>	<elision3>
11247	11248	<>	<elision2>
11247	11248	<>	<elision1>
11247	10963	<U2kl>	<>
11248	11246	<>	<aphaerese>
11248	11246	<>	<elision3>
11248	11246	<>	<elision2>
11248	11246	<>	<elision1>
11248	10964	<U2kl>	<>
11249	10975	<name>	<name>
11249	11250	<>	<name>
11249	11252	<>	<aphaerese>
11249	11252	<>	<elision3>
11249	11252	<>	<elision2>
11249	11252	<>	<elision1>
11249	10462	<2s>	<>
11249	11253	<A2kl>	<>
11249	11262	<L2kl>	<>
11249	10985	<K2kl>	<>
11250	11251	<>	<aphaerese>
11250	11251	<>	<elision3>
11250	11251	<>	<elision2>
11250	11251	<>	<elision1>
11250	11254	<A2kl>	<>
11250	11263	<L2kl>	<>
11250	10983	<K2kl>	<>
11251	11252	<>	<aphaerese>
11251	11252	<>	<elision3>
11251	11252	<>	<elision2>
11251	11252	<>	<elision1>
11251	11255	<A2kl>	<>
11251	11264	<L2kl>	<>
11251	10984	<K2kl>	<>
11252	11250	<>	<name>
11252	11252	<>	<aphaerese>
11252	11252	<>	<elision3>
11252	11252	<>	<elision2>
11252	11252	<>	<elision1>
11252	11253	<A2kl>	<>
11252	11262	<L2kl>	<>
11252	10982	<K2kl>	<>
11253	11254	<>	<name>
11253	11253	<>	<aphaerese>
11253	11253	<>	<elision3>
11253	11253	<>	<elision2>
11253	11253	<>	<elision1>
11253	11256	.	κ
11253	11256	.	λ
11253	10412	<2s>	<>
11254	11255	<>	<aphaerese>
11254	11255	<>	<elision3>
11254	11255	<>	<elision2>
11254	11255	<>	<elision1>
11254	11258	.	κ
11254	11258	.	λ
11254	10413	<2s>	<>
11255	11253	<>	<aphaerese>
11255	11253	<>	<elision3>
11255	11253	<>	<elision2>
11255	11253	<>	<elision1>
11255	11256	.	κ
11255	11256	.	λ
11255	10411	<2s>	<>
11256	11257	<>	<name>
11256	11256	<>	<aphaerese>
11256	11259	<elision3>	<elision3>
11256	11256	<>	<elision3>
11256	11259	<elision2>	<elision2>
11256	11256	<>	<elision2>
11256	11259	<elision1>	<elision1>
11256	11256	<>	<elision1>
11256	10403	<2s>	<>
11257	11258	<>	<aphaerese>
11257	11261	<elision3>	<elision3>
11257	11258	<>	<elision3>
11257	11261	<elision2>	<elision2>
11257	11258	<>	<elision2>
11257	11261	<elision1>	<elision1>
11257	11258	<>	<elision1>
11257	10404	<2s>	<>
11258	11256	<>	<aphaerese>
11258	11259	<elision3>	<elision3>
11258	11256	<>	<elision3>
11258	11259	<elision2>	<elision2>
11258	11256	<>	<elision2>
11258	11259	<elision1>	<elision1>
11258	11256	<>	<elision1>
11258	10402	<2s>	<>
11259	10962	.	.
11259	10962	 	 
11259	10962	<~>	<~>
11259	10962	<split-s>	<split-s>
11259	10962	<split-h>	<split-h>
11259	10962	<name2>	<name2>
11259	11260	<>	<name>
11259	10965	<aphaerese>	<aphaerese>
11259	11259	<>	<aphaerese>
11259	10962	<elision3>	<elision3>
11259	11259	<>	<elision3>
11259	10962	<elision2>	<elision2>
11259	11259	<>	<elision2>
11259	10962	<elision1>	<elision1>
11259	11259	<>	<elision1>
11259	10959	.	υ
11259	10959	.	u
11259	10959	.	α
11259	10959	.	a
11259	10367	<2s>	<>
11260	10964	.	.
11260	10964	 	 
11260	10964	<~>	<~>
11260	10964	<split-s>	<split-s>
11260	10964	<split-h>	<split-h>
11260	10964	<name2>	<name2>
11260	10967	<aphaerese>	<aphaerese>
11260	11261	<>	<aphaerese>
11260	10964	<elision3>	<elision3>
11260	11261	<>	<elision3>
11260	10964	<elision2>	<elision2>
11260	11261	<>	<elision2>
11260	10964	<elision1>	<elision1>
11260	11261	<>	<elision1>
11260	10961	.	υ
11260	10961	.	u
11260	10961	.	α
11260	10961	.	a
11260	10368	<2s>	<>
11261	10962	.	.
11261	10962	 	 
11261	10962	<~>	<~>
11261	10962	<split-s>	<split-s>
11261	10962	<split-h>	<split-h>
11261	10962	<name2>	<name2>
11261	10965	<aphaerese>	<aphaerese>
11261	11259	<>	<aphaerese>
11261	10962	<elision3>	<elision3>
11261	11259	<>	<elision3>
11261	10962	<elision2>	<elision2>
11261	11259	<>	<elision2>
11261	10962	<elision1>	<elision1>
11261	11259	<>	<elision1>
11261	10959	.	υ
11261	10959	.	u
11261	10959	.	α
11261	10959	.	a
11261	10366	<2s>	<>
11262	11263	<>	<name>
11262	11262	<>	<aphaerese>
11262	11262	<>	<elision3>
11262	11262	<>	<elision2>
11262	11262	<>	<elision1>
11262	11265	.	κ
11262	11265	.	λ
11262	10445	<2s>	<>
11263	11264	<>	<aphaerese>
11263	11264	<>	<elision3>
11263	11264	<>	<elision2>
11263	11264	<>	<elision1>
11263	11267	.	κ
11263	11267	.	λ
11263	10446	<2s>	<>
11264	11262	<>	<aphaerese>
11264	11262	<>	<elision3>
11264	11262	<>	<elision2>
11264	11262	<>	<elision1>
11264	11265	.	κ
11264	11265	.	λ
11264	10444	<2s>	<>
11265	11266	<>	<name>
11265	11265	<>	<aphaerese>
11265	11268	<elision3>	<elision3>
11265	11265	<>	<elision3>
11265	11268	<elision2>	<elision2>
11265	11265	<>	<elision2>
11265	11268	<elision1>	<elision1>
11265	11265	<>	<elision1>
11265	10436	<2s>	<>
11266	11267	<>	<aphaerese>
11266	11270	<elision3>	<elision3>
11266	11267	<>	<elision3>
11266	11270	<elision2>	<elision2>
11266	11267	<>	<elision2>
11266	11270	<elision1>	<elision1>
11266	11267	<>	<elision1>
11266	10437	<2s>	<>
11267	11265	<>	<aphaerese>
11267	11268	<elision3>	<elision3>
11267	11265	<>	<elision3>
11267	11268	<elision2>	<elision2>
11267	11265	<>	<elision2>
11267	11268	<elision1>	<elision1>
11267	11265	<>	<elision1>
11267	10435	<2s>	<>
11268	11269	<>	<name>
11268	11268	<>	<aphaerese>
11268	11268	<>	<elision3>
11268	11268	<>	<elision2>
11268	11268	<>	<elision1>
11268	10968	.	κ
11268	10430	<2s>	<>
11269	11270	<>	<aphaerese>
11269	11270	<>	<elision3>
11269	11270	<>	<elision2>
11269	11270	<>	<elision1>
11269	10970	.	κ
11269	10431	<2s>	<>
11270	11268	<>	<aphaerese>
11270	11268	<>	<elision3>
11270	11268	<>	<elision2>
11270	11268	<>	<elision1>
11270	10968	.	κ
11270	10429	<2s>	<>
11271	10962	.	.
11271	10962	 	 
11271	10962	<~>	<~>
11271	10962	<split-s>	<split-s>
11271	10962	<split-h>	<split-h>
11271	10962	<name2>	<name2>
11271	11272	<>	<name>
11271	10965	<aphaerese>	<aphaerese>
11271	11271	<>	<aphaerese>
11271	11271	<>	<elision3>
11271	11271	<>	<elision2>
11271	11271	<>	<elision1>
11271	10959	.	υ
11271	10959	.	u
11271	10968	.	κ
11271	10959	.	α
11271	10959	.	a
11271	10150	<2s>	<>
11272	10964	.	.
11272	10964	 	 
11272	10964	<~>	<~>
11272	10964	<split-s>	<split-s>
11272	10964	<split-h>	<split-h>
11272	10964	<name2>	<name2>
11272	10967	<aphaerese>	<aphaerese>
11272	11273	<>	<aphaerese>
11272	11273	<>	<elision3>
11272	11273	<>	<elision2>
11272	11273	<>	<elision1>
11272	10961	.	υ
11272	10961	.	u
11272	10970	.	κ
11272	10961	.	α
11272	10961	.	a
11272	10151	<2s>	<>
11273	10962	.	.
11273	10962	 	 
11273	10962	<~>	<~>
11273	10962	<split-s>	<split-s>
11273	10962	<split-h>	<split-h>
11273	10962	<name2>	<name2>
11273	10965	<aphaerese>	<aphaerese>
11273	11271	<>	<aphaerese>
11273	11271	<>	<elision3>
11273	11271	<>	<elision2>
11273	11271	<>	<elision1>
11273	10959	.	υ
11273	10959	.	u
11273	10968	.	κ
11273	10959	.	α
11273	10959	.	a
11273	10149	<2s>	<>
11274	11275	<>	<name>
11274	11274	<>	<aphaerese>
11274	11274	<>	<elision3>
11274	11274	<>	<elision2>
11274	11274	<>	<elision1>
11274	10962	<A2kl>	<>
11275	11276	<>	<aphaerese>
11275	11276	<>	<elision3>
11275	11276	<>	<elision2>
11275	11276	<>	<elision1>
11275	10963	<A2kl>	<>
11276	11274	<>	<aphaerese>
11276	11274	<>	<elision3>
11276	11274	<>	<elision2>
11276	11274	<>	<elision1>
11276	10964	<A2kl>	<>
11277	10832	.	.
11277	10833	 	 
11277	10832	<~>	<~>
11277	10832	<split-s>	<split-s>
11277	10832	<split-h>	<split-h>
11277	10832	<name2>	<name2>
11277	11278	<>	<name>
11277	10836	<aphaerese>	<aphaerese>
11277	11277	<>	<aphaerese>
11277	10832	<elision3>	<elision3>
11277	11277	<>	<elision3>
11277	10832	<elision2>	<elision2>
11277	11277	<>	<elision2>
11277	10832	<elision1>	<elision1>
11277	11277	<>	<elision1>
11277	10840	.	υ
11277	10843	s	υ
11277	10840	.	u
11277	10843	s	u
11277	10840	.	κ
11277	10953	s	κ
11277	10882	s	k
11277	10885	s	U
11277	10937	s	K
11277	10840	.	α
11277	10843	s	α
11277	10840	.	a
11277	10843	s	a
11277	10915	s	A
11277	10840	.	λ
11277	10953	s	λ
11277	10882	s	l
11277	10944	s	L
11277	10342	<2s>	<>
11278	10835	.	.
11278	10838	 	 
11278	10835	<~>	<~>
11278	10835	<split-s>	<split-s>
11278	10835	<split-h>	<split-h>
11278	10835	<name2>	<name2>
11278	10936	<aphaerese>	<aphaerese>
11278	11279	<>	<aphaerese>
11278	10835	<elision3>	<elision3>
11278	11279	<>	<elision3>
11278	10835	<elision2>	<elision2>
11278	11279	<>	<elision2>
11278	10835	<elision1>	<elision1>
11278	11279	<>	<elision1>
11278	10842	.	υ
11278	10860	s	υ
11278	10842	.	u
11278	10860	s	u
11278	10842	.	κ
11278	10955	s	κ
11278	10884	s	k
11278	10887	s	U
11278	10939	s	K
11278	10842	.	α
11278	10860	s	α
11278	10842	.	a
11278	10860	s	a
11278	10917	s	A
11278	10842	.	λ
11278	10955	s	λ
11278	10884	s	l
11278	10946	s	L
11278	10343	<2s>	<>
11279	10832	.	.
11279	10833	 	 
11279	10832	<~>	<~>
11279	10832	<split-s>	<split-s>
11279	10832	<split-h>	<split-h>
11279	10832	<name2>	<name2>
11279	10836	<aphaerese>	<aphaerese>
11279	11277	<>	<aphaerese>
11279	10832	<elision3>	<elision3>
11279	11277	<>	<elision3>
11279	10832	<elision2>	<elision2>
11279	11277	<>	<elision2>
11279	10832	<elision1>	<elision1>
11279	11277	<>	<elision1>
11279	10840	.	υ
11279	10843	s	υ
11279	10840	.	u
11279	10843	s	u
11279	10840	.	κ
11279	10953	s	κ
11279	10882	s	k
11279	10885	s	U
11279	10937	s	K
11279	10840	.	α
11279	10843	s	α
11279	10840	.	a
11279	10843	s	a
11279	10915	s	A
11279	10840	.	λ
11279	10953	s	λ
11279	10882	s	l
11279	10944	s	L
11279	10341	<2s>	<>
11280	10986	<name>	<name>
11280	11281	<>	<name>
11280	11283	<>	<aphaerese>
11280	11283	<>	<elision3>
11280	11283	<>	<elision2>
11280	11283	<>	<elision1>
11280	10462	<2s>	<>
11280	11253	<A2kl>	<>
11280	11287	<L2kl>	<>
11281	11282	<>	<aphaerese>
11281	11282	<>	<elision3>
11281	11282	<>	<elision2>
11281	11282	<>	<elision1>
11281	11254	<A2kl>	<>
11281	11285	<L2kl>	<>
11282	11283	<>	<aphaerese>
11282	11283	<>	<elision3>
11282	11283	<>	<elision2>
11282	11283	<>	<elision1>
11282	11255	<A2kl>	<>
11282	11286	<L2kl>	<>
11283	11281	<>	<name>
11283	11283	<>	<aphaerese>
11283	11283	<>	<elision3>
11283	11283	<>	<elision2>
11283	11283	<>	<elision1>
11283	11253	<A2kl>	<>
11283	11284	<L2kl>	<>
11284	10962	.	.
11284	10962	 	 
11284	10962	<~>	<~>
11284	10962	<split-s>	<split-s>
11284	10962	<split-h>	<split-h>
11284	10962	<name2>	<name2>
11284	11285	<>	<name>
11284	10965	<aphaerese>	<aphaerese>
11284	11284	<>	<aphaerese>
11284	10962	<elision3>	<elision3>
11284	11284	<>	<elision3>
11284	10962	<elision2>	<elision2>
11284	11284	<>	<elision2>
11284	10962	<elision1>	<elision1>
11284	11284	<>	<elision1>
11284	10959	.	υ
11284	10959	.	u
11284	11265	.	κ
11284	10959	.	α
11284	10959	.	a
11284	11265	.	λ
11284	10479	<2s>	<>
11285	10964	.	.
11285	10964	 	 
11285	10964	<~>	<~>
11285	10964	<split-s>	<split-s>
11285	10964	<split-h>	<split-h>
11285	10964	<name2>	<name2>
11285	10967	<aphaerese>	<aphaerese>
11285	11286	<>	<aphaerese>
11285	10964	<elision3>	<elision3>
11285	11286	<>	<elision3>
11285	10964	<elision2>	<elision2>
11285	11286	<>	<elision2>
11285	10964	<elision1>	<elision1>
11285	11286	<>	<elision1>
11285	10961	.	υ
11285	10961	.	u
11285	11267	.	κ
11285	10961	.	α
11285	10961	.	a
11285	11267	.	λ
11285	10480	<2s>	<>
11286	10962	.	.
11286	10962	 	 
11286	10962	<~>	<~>
11286	10962	<split-s>	<split-s>
11286	10962	<split-h>	<split-h>
11286	10962	<name2>	<name2>
11286	10965	<aphaerese>	<aphaerese>
11286	11284	<>	<aphaerese>
11286	10962	<elision3>	<elision3>
11286	11284	<>	<elision3>
11286	10962	<elision2>	<elision2>
11286	11284	<>	<elision2>
11286	10962	<elision1>	<elision1>
11286	11284	<>	<elision1>
11286	10959	.	υ
11286	10959	.	u
11286	11265	.	κ
11286	10959	.	α
11286	10959	.	a
11286	11265	.	λ
11286	10478	<2s>	<>
11287	10962	.	.
11287	10962	 	 
11287	10962	<~>	<~>
11287	10962	<split-s>	<split-s>
11287	10962	<split-h>	<split-h>
11287	10962	<name2>	<name2>
11287	10986	<name2>	<name>
11287	11285	<>	<name>
11287	10965	<aphaerese>	<aphaerese>
11287	11284	<>	<aphaerese>
11287	10962	<elision3>	<elision3>
11287	11284	<>	<elision3>
11287	10962	<elision2>	<elision2>
11287	11284	<>	<elision2>
11287	10962	<elision1>	<elision1>
11287	11284	<>	<elision1>
11287	10959	.	υ
11287	10959	.	u
11287	11265	.	κ
11287	10959	.	α
11287	10959	.	a
11287	11265	.	λ
11287	10485	<2s>	<>
11288	10832	.	.
11288	10833	 	 
11288	10832	<~>	<~>
11288	10832	<split-s>	<split-s>
11288	10832	<split-h>	<split-h>
11288	10832	<name2>	<name2>
11288	11201	<>	<name>
11288	10836	<aphaerese>	<aphaerese>
11288	11200	<>	<aphaerese>
11288	11200	<>	<elision3>
11288	11200	<>	<elision2>
11288	11200	<>	<elision1>
11288	10840	.	υ
11288	10843	s	υ
11288	10840	.	u
11288	10843	s	u
11288	10861	.	κ
11288	10876	s	κ
11288	10882	s	k
11288	10885	s	U
11288	10937	s	K
11288	10840	.	α
11288	10843	s	α
11288	10840	.	a
11288	10843	s	a
11288	10915	s	A
11288	10882	s	λ
11288	10882	s	l
11288	10944	s	L
11288	10491	<2s>	<>
11289	10832	.	.
11289	10833	 	 
11289	10832	<~>	<~>
11289	10832	<split-s>	<split-s>
11289	10832	<split-h>	<split-h>
11289	10832	<name2>	<name2>
11289	11222	<>	<name>
11289	10836	<aphaerese>	<aphaerese>
11289	11221	<>	<aphaerese>
11289	11224	<elision3>	<elision3>
11289	11221	<>	<elision3>
11289	11224	<elision2>	<elision2>
11289	11221	<>	<elision2>
11289	11224	<elision1>	<elision1>
11289	11221	<>	<elision1>
11289	10840	.	υ
11289	10843	s	υ
11289	10840	.	u
11289	10843	s	u
11289	10840	.	κ
11289	10953	s	κ
11289	10882	s	k
11289	10885	s	U
11289	10937	s	K
11289	10840	.	α
11289	10843	s	α
11289	10840	.	a
11289	10843	s	a
11289	10915	s	A
11289	10840	.	λ
11289	10953	s	λ
11289	10882	s	l
11289	10944	s	L
11289	10494	<2s>	<>
11290	10832	.	.
11290	10833	 	 
11290	10832	<~>	<~>
11290	10832	<split-s>	<split-s>
11290	10832	<split-h>	<split-h>
11290	10832	<name2>	<name2>
11290	10957	<>	<name>
11290	10836	<aphaerese>	<aphaerese>
11290	10956	<>	<aphaerese>
11290	10832	<elision3>	<elision3>
11290	10956	<>	<elision3>
11290	10832	<elision2>	<elision2>
11290	10956	<>	<elision2>
11290	10832	<elision1>	<elision1>
11290	10956	<>	<elision1>
11290	10840	.	υ
11290	10843	s	υ
11290	10840	.	u
11290	10843	s	u
11290	10959	.	κ
11290	10953	s	κ
11290	10882	s	k
11290	10885	s	U
11290	10937	s	K
11290	10840	.	α
11290	10843	s	α
11290	10840	.	a
11290	10843	s	a
11290	10915	s	A
11290	10959	.	λ
11290	10953	s	λ
11290	10882	s	l
11290	10944	s	L
11290	10497	<2s>	<>
11291	11247	<>	<name>
11291	11246	<>	<aphaerese>
11291	11246	<>	<elision3>
11291	11246	<>	<elision2>
11291	11246	<>	<elision1>
11291	11292	<U2kl>	<>
11292	10962	.	.
11292	10962	 	 
11292	10962	<~>	<~>
11292	10962	<split-s>	<split-s>
11292	10962	<split-h>	<split-h>
11292	10962	<name2>	<name2>
11292	10963	<>	<name>
11292	10965	<aphaerese>	<aphaerese>
11292	10962	<>	<aphaerese>
11292	10962	<elision3>	<elision3>
11292	10962	<>	<elision3>
11292	10962	<elision2>	<elision2>
11292	10962	<>	<elision2>
11292	10962	<elision1>	<elision1>
11292	10962	<>	<elision1>
11292	10959	.	υ
11292	10959	.	u
11292	10968	.	κ
11292	10959	.	α
11292	10959	.	a
11292	10501	<2s>	<>
11293	10975	<name>	<name>
11293	11250	<>	<name>
11293	11252	<>	<aphaerese>
11293	11252	<>	<elision3>
11293	11252	<>	<elision2>
11293	11252	<>	<elision1>
11293	10462	<2s>	<>
11293	11253	<A2kl>	<>
11293	11262	<L2kl>	<>
11293	11294	<K2kl>	<>
11294	10962	.	.
11294	10962	 	 
11294	10962	<~>	<~>
11294	10962	<split-s>	<split-s>
11294	10962	<split-h>	<split-h>
11294	10962	<name2>	<name2>
11294	10986	<name2>	<name>
11294	10983	<>	<name>
11294	10965	<aphaerese>	<aphaerese>
11294	10982	<>	<aphaerese>
11294	10962	<elision3>	<elision3>
11294	10982	<>	<elision3>
11294	10962	<elision2>	<elision2>
11294	10982	<>	<elision2>
11294	10962	<elision1>	<elision1>
11294	10982	<>	<elision1>
11294	10959	.	υ
11294	10959	.	u
11294	10959	.	α
11294	10959	.	a
11294	10505	<2s>	<>
11295	10962	.	.
11295	10962	 	 
11295	10962	<~>	<~>
11295	10962	<split-s>	<split-s>
11295	10962	<split-h>	<split-h>
11295	10962	<name2>	<name2>
11295	11272	<>	<name>
11295	10965	<aphaerese>	<aphaerese>
11295	11271	<>	<aphaerese>
11295	11271	<>	<elision3>
11295	11271	<>	<elision2>
11295	11271	<>	<elision1>
11295	10959	.	υ
11295	10959	.	u
11295	10968	.	κ
11295	10959	.	α
11295	10959	.	a
11295	10491	<2s>	<>
11296	11275	<>	<name>
11296	11274	<>	<aphaerese>
11296	11274	<>	<elision3>
11296	11274	<>	<elision2>
11296	11274	<>	<elision1>
11296	11292	<A2kl>	<>
11297	10832	.	.
11297	10833	 	 
11297	10832	<~>	<~>
11297	10832	<split-s>	<split-s>
11297	10832	<split-h>	<split-h>
11297	10832	<name2>	<name2>
11297	11278	<>	<name>
11297	10836	<aphaerese>	<aphaerese>
11297	11277	<>	<aphaerese>
11297	10832	<elision3>	<elision3>
11297	11277	<>	<elision3>
11297	10832	<elision2>	<elision2>
11297	11277	<>	<elision2>
11297	10832	<elision1>	<elision1>
11297	11277	<>	<elision1>
11297	10840	.	υ
11297	10843	s	υ
11297	10840	.	u
11297	10843	s	u
11297	10840	.	κ
11297	10953	s	κ
11297	10882	s	k
11297	10885	s	U
11297	10937	s	K
11297	10840	.	α
11297	10843	s	α
11297	10840	.	a
11297	10843	s	a
11297	10915	s	A
11297	10840	.	λ
11297	10953	s	λ
11297	10882	s	l
11297	10944	s	L
11297	10497	<2s>	<>
11298	10962	.	.
11298	10962	 	 
11298	10962	<~>	<~>
11298	10962	<split-s>	<split-s>
11298	10962	<split-h>	<split-h>
11298	10962	<name2>	<name2>
11298	10988	<>	<name>
11298	10965	<aphaerese>	<aphaerese>
11298	10987	<>	<aphaerese>
11298	10962	<elision3>	<elision3>
11298	10987	<>	<elision3>
11298	10962	<elision2>	<elision2>
11298	10987	<>	<elision2>
11298	10962	<elision1>	<elision1>
11298	10987	<>	<elision1>
11298	10959	.	υ
11298	10959	.	u
11298	10959	.	κ
11298	10959	.	α
11298	10959	.	a
11298	10959	.	λ
11298	10497	<2s>	<>
11299	10986	<name>	<name>
11299	11281	<>	<name>
11299	11283	<>	<aphaerese>
11299	11283	<>	<elision3>
11299	11283	<>	<elision2>
11299	11283	<>	<elision1>
11299	10462	<2s>	<>
11299	11253	<A2kl>	<>
11299	11300	<L2kl>	<>
11300	10962	.	.
11300	10962	 	 
11300	10962	<~>	<~>
11300	10962	<split-s>	<split-s>
11300	10962	<split-h>	<split-h>
11300	10962	<name2>	<name2>
11300	10986	<name2>	<name>
11300	11285	<>	<name>
11300	10965	<aphaerese>	<aphaerese>
11300	11284	<>	<aphaerese>
11300	10962	<elision3>	<elision3>
11300	11284	<>	<elision3>
11300	10962	<elision2>	<elision2>
11300	11284	<>	<elision2>
11300	10962	<elision1>	<elision1>
11300	11284	<>	<elision1>
11300	10959	.	υ
11300	10959	.	u
11300	11265	.	κ
11300	10959	.	α
11300	10959	.	a
11300	11265	.	λ
11300	10510	<2s>	<>
11301	11189	.	.
11301	11190	 	 
11301	11189	<~>	<~>
11301	11189	<split-s>	<split-s>
11301	11189	<split-h>	<split-h>
11301	11189	<name2>	<name2>
11301	11193	<aphaerese>	<aphaerese>
11301	11193	<>	<aphaerese>
11301	11189	<elision3>	<elision3>
11301	11193	<>	<elision3>
11301	11189	<elision2>	<elision2>
11301	11193	<>	<elision2>
11301	11189	<elision1>	<elision1>
11301	11193	<>	<elision1>
11301	11189	.	υ
11301	11189	.	u
11301	11203	.	κ
11301	11221	s	κ
11301	10956	s	k
11301	11246	s	U
11301	10974	s	K
11301	11189	.	α
11301	11189	.	a
11301	11274	s	A
11301	11277	s	λ
11301	10987	s	l
11301	10990	s	L
11301	10131	<1s>	<>
11302	11189	.	.
11302	11190	 	 
11302	11189	<~>	<~>
11302	11189	<split-s>	<split-s>
11302	11189	<split-h>	<split-h>
11302	11189	<name2>	<name2>
11302	11193	<aphaerese>	<aphaerese>
11302	11196	<>	<aphaerese>
11302	11189	<elision3>	<elision3>
11302	11196	<>	<elision3>
11302	11189	<elision2>	<elision2>
11302	11196	<>	<elision2>
11302	11189	<elision1>	<elision1>
11302	11196	<>	<elision1>
11302	11197	.	υ
11302	11200	s	υ
11302	11197	.	u
11302	11200	s	u
11302	11203	.	κ
11302	11221	s	κ
11302	10956	s	k
11302	11246	s	U
11302	11249	s	K
11302	11197	.	α
11302	11271	s	α
11302	11197	.	a
11302	11271	s	a
11302	11274	s	A
11302	11277	s	λ
11302	10987	s	l
11302	11280	s	L
11302	10144	<1s>	<>
11303	11192	.	.
11303	11195	 	 
11303	11192	<~>	<~>
11303	11192	<split-s>	<split-s>
11303	11192	<split-h>	<split-h>
11303	11192	<name2>	<name2>
11303	11301	<aphaerese>	<aphaerese>
11303	11192	<>	<aphaerese>
11303	11192	<elision3>	<elision3>
11303	11192	<>	<elision3>
11303	11192	<elision2>	<elision2>
11303	11192	<>	<elision2>
11303	11192	<elision1>	<elision1>
11303	11192	<>	<elision1>
11303	11199	.	υ
11303	11202	s	υ
11303	11199	.	u
11303	11202	s	u
11303	11205	.	κ
11303	11223	s	κ
11303	10958	s	k
11303	11248	s	U
11303	10977	s	K
11303	11199	.	α
11303	11273	s	α
11303	11199	.	a
11303	11273	s	a
11303	11276	s	A
11303	11279	s	λ
11303	10989	s	l
11303	10992	s	L
11303	10146	<1s>	<>
11304	11192	.	.
11304	11195	 	 
11304	11192	<~>	<~>
11304	11192	<split-s>	<split-s>
11304	11192	<split-h>	<split-h>
11304	11192	<name2>	<name2>
11304	11301	<aphaerese>	<aphaerese>
11304	11305	<>	<aphaerese>
11304	11308	<elision3>	<elision3>
11304	11305	<>	<elision3>
11304	11308	<elision2>	<elision2>
11304	11305	<>	<elision2>
11304	11308	<elision1>	<elision1>
11304	11305	<>	<elision1>
11304	11199	.	υ
11304	11202	s	υ
11304	11199	.	u
11304	11202	s	u
11304	10952	s	κ
11304	10958	s	k
11304	11248	s	U
11304	10977	s	K
11304	11199	.	α
11304	11273	s	α
11304	11199	.	a
11304	11273	s	a
11304	11276	s	A
11304	10952	s	λ
11304	10989	s	l
11304	10992	s	L
11304	11336	<1s>	<>
11305	11189	.	.
11305	11190	 	 
11305	11189	<~>	<~>
11305	11189	<split-s>	<split-s>
11305	11189	<split-h>	<split-h>
11305	11189	<name2>	<name2>
11305	11193	<aphaerese>	<aphaerese>
11305	11188	<>	<aphaerese>
11305	11306	<elision3>	<elision3>
11305	11188	<>	<elision3>
11305	11306	<elision2>	<elision2>
11305	11188	<>	<elision2>
11305	11306	<elision1>	<elision1>
11305	11188	<>	<elision1>
11305	11197	.	υ
11305	11200	s	υ
11305	11197	.	u
11305	11200	s	u
11305	10831	s	κ
11305	10956	s	k
11305	11246	s	U
11305	10974	s	K
11305	11197	.	α
11305	11271	s	α
11305	11197	.	a
11305	11271	s	a
11305	11274	s	A
11305	10831	s	λ
11305	10987	s	l
11305	10990	s	L
11305	11334	<1s>	<>
11306	11189	.	.
11306	11190	 	 
11306	11189	<~>	<~>
11306	11189	<split-s>	<split-s>
11306	11189	<split-h>	<split-h>
11306	11189	<name2>	<name2>
11306	11307	<>	<name>
11306	11193	<aphaerese>	<aphaerese>
11306	11306	<>	<aphaerese>
11306	11189	<elision3>	<elision3>
11306	11306	<>	<elision3>
11306	11189	<elision2>	<elision2>
11306	11306	<>	<elision2>
11306	11189	<elision1>	<elision1>
11306	11306	<>	<elision1>
11306	11197	.	υ
11306	11200	s	υ
11306	11197	.	u
11306	11200	s	u
11306	11203	.	κ
11306	11309	s	κ
11306	11312	s	k
11306	11246	s	U
11306	11315	s	K
11306	11197	.	α
11306	11271	s	α
11306	11197	.	a
11306	11271	s	a
11306	11274	s	A
11306	11323	s	λ
11306	11326	s	l
11306	11329	s	L
11306	10233	<1s>	<>
11307	11192	.	.
11307	11195	 	 
11307	11192	<~>	<~>
11307	11192	<split-s>	<split-s>
11307	11192	<split-h>	<split-h>
11307	11192	<name2>	<name2>
11307	11301	<aphaerese>	<aphaerese>
11307	11308	<>	<aphaerese>
11307	11192	<elision3>	<elision3>
11307	11308	<>	<elision3>
11307	11192	<elision2>	<elision2>
11307	11308	<>	<elision2>
11307	11192	<elision1>	<elision1>
11307	11308	<>	<elision1>
11307	11199	.	υ
11307	11202	s	υ
11307	11199	.	u
11307	11202	s	u
11307	11205	.	κ
11307	11311	s	κ
11307	11314	s	k
11307	11248	s	U
11307	11317	s	K
11307	11199	.	α
11307	11273	s	α
11307	11199	.	a
11307	11273	s	a
11307	11276	s	A
11307	11325	s	λ
11307	11328	s	l
11307	11331	s	L
11307	10234	<1s>	<>
11308	11189	.	.
11308	11190	 	 
11308	11189	<~>	<~>
11308	11189	<split-s>	<split-s>
11308	11189	<split-h>	<split-h>
11308	11189	<name2>	<name2>
11308	11193	<aphaerese>	<aphaerese>
11308	11306	<>	<aphaerese>
11308	11189	<elision3>	<elision3>
11308	11306	<>	<elision3>
11308	11189	<elision2>	<elision2>
11308	11306	<>	<elision2>
11308	11189	<elision1>	<elision1>
11308	11306	<>	<elision1>
11308	11197	.	υ
11308	11200	s	υ
11308	11197	.	u
11308	11200	s	u
11308	11203	.	κ
11308	11309	s	κ
11308	11312	s	k
11308	11246	s	U
11308	11315	s	K
11308	11197	.	α
11308	11271	s	α
11308	11197	.	a
11308	11271	s	a
11308	11274	s	A
11308	11323	s	λ
11308	11326	s	l
11308	11329	s	L
11308	10232	<1s>	<>
11309	10832	.	.
11309	10833	 	 
11309	10832	<~>	<~>
11309	10832	<split-s>	<split-s>
11309	10832	<split-h>	<split-h>
11309	10832	<name2>	<name2>
11309	11310	<>	<name>
11309	10836	<aphaerese>	<aphaerese>
11309	11309	<>	<aphaerese>
11309	11224	<elision3>	<elision3>
11309	11309	<>	<elision3>
11309	11224	<elision2>	<elision2>
11309	11309	<>	<elision2>
11309	11224	<elision1>	<elision1>
11309	11309	<>	<elision1>
11309	10840	.	υ
11309	10843	s	υ
11309	10840	.	u
11309	10843	s	u
11309	10840	.	κ
11309	10885	s	U
11309	10840	.	α
11309	10843	s	α
11309	10840	.	a
11309	10843	s	a
11309	10915	s	A
11309	10840	.	λ
11309	10583	<2s>	<>
11310	10835	.	.
11310	10838	 	 
11310	10835	<~>	<~>
11310	10835	<split-s>	<split-s>
11310	10835	<split-h>	<split-h>
11310	10835	<name2>	<name2>
11310	10936	<aphaerese>	<aphaerese>
11310	11311	<>	<aphaerese>
11310	11226	<elision3>	<elision3>
11310	11311	<>	<elision3>
11310	11226	<elision2>	<elision2>
11310	11311	<>	<elision2>
11310	11226	<elision1>	<elision1>
11310	11311	<>	<elision1>
11310	10842	.	υ
11310	10860	s	υ
11310	10842	.	u
11310	10860	s	u
11310	10842	.	κ
11310	10887	s	U
11310	10842	.	α
11310	10860	s	α
11310	10842	.	a
11310	10860	s	a
11310	10917	s	A
11310	10842	.	λ
11310	10584	<2s>	<>
11311	10832	.	.
11311	10833	 	 
11311	10832	<~>	<~>
11311	10832	<split-s>	<split-s>
11311	10832	<split-h>	<split-h>
11311	10832	<name2>	<name2>
11311	10836	<aphaerese>	<aphaerese>
11311	11309	<>	<aphaerese>
11311	11224	<elision3>	<elision3>
11311	11309	<>	<elision3>
11311	11224	<elision2>	<elision2>
11311	11309	<>	<elision2>
11311	11224	<elision1>	<elision1>
11311	11309	<>	<elision1>
11311	10840	.	υ
11311	10843	s	υ
11311	10840	.	u
11311	10843	s	u
11311	10840	.	κ
11311	10885	s	U
11311	10840	.	α
11311	10843	s	α
11311	10840	.	a
11311	10843	s	a
11311	10915	s	A
11311	10840	.	λ
11311	10582	<2s>	<>
11312	10832	.	.
11312	10833	 	 
11312	10832	<~>	<~>
11312	10832	<split-s>	<split-s>
11312	10832	<split-h>	<split-h>
11312	10832	<name2>	<name2>
11312	11313	<>	<name>
11312	10836	<aphaerese>	<aphaerese>
11312	11312	<>	<aphaerese>
11312	10832	<elision3>	<elision3>
11312	11312	<>	<elision3>
11312	10832	<elision2>	<elision2>
11312	11312	<>	<elision2>
11312	10832	<elision1>	<elision1>
11312	11312	<>	<elision1>
11312	10840	.	υ
11312	10843	s	υ
11312	10840	.	u
11312	10843	s	u
11312	10959	.	κ
11312	10885	s	U
11312	10840	.	α
11312	10843	s	α
11312	10840	.	a
11312	10843	s	a
11312	10915	s	A
11312	10959	.	λ
11312	10592	<2s>	<>
11313	10835	.	.
11313	10838	 	 
11313	10835	<~>	<~>
11313	10835	<split-s>	<split-s>
11313	10835	<split-h>	<split-h>
11313	10835	<name2>	<name2>
11313	10936	<aphaerese>	<aphaerese>
11313	11314	<>	<aphaerese>
11313	10835	<elision3>	<elision3>
11313	11314	<>	<elision3>
11313	10835	<elision2>	<elision2>
11313	11314	<>	<elision2>
11313	10835	<elision1>	<elision1>
11313	11314	<>	<elision1>
11313	10842	.	υ
11313	10860	s	υ
11313	10842	.	u
11313	10860	s	u
11313	10961	.	κ
11313	10887	s	U
11313	10842	.	α
11313	10860	s	α
11313	10842	.	a
11313	10860	s	a
11313	10917	s	A
11313	10961	.	λ
11313	10593	<2s>	<>
11314	10832	.	.
11314	10833	 	 
11314	10832	<~>	<~>
11314	10832	<split-s>	<split-s>
11314	10832	<split-h>	<split-h>
11314	10832	<name2>	<name2>
11314	10836	<aphaerese>	<aphaerese>
11314	11312	<>	<aphaerese>
11314	10832	<elision3>	<elision3>
11314	11312	<>	<elision3>
11314	10832	<elision2>	<elision2>
11314	11312	<>	<elision2>
11314	10832	<elision1>	<elision1>
11314	11312	<>	<elision1>
11314	10840	.	υ
11314	10843	s	υ
11314	10840	.	u
11314	10843	s	u
11314	10959	.	κ
11314	10885	s	U
11314	10840	.	α
11314	10843	s	α
11314	10840	.	a
11314	10843	s	a
11314	10915	s	A
11314	10959	.	λ
11314	10591	<2s>	<>
11315	10975	<name>	<name>
11315	11316	<>	<name>
11315	11318	<>	<aphaerese>
11315	11318	<>	<elision3>
11315	11318	<>	<elision2>
11315	11318	<>	<elision1>
11315	10462	<2s>	<>
11315	10979	<L2kl>	<>
11315	11322	<K2kl>	<>
11316	11317	<>	<aphaerese>
11316	11317	<>	<elision3>
11316	11317	<>	<elision2>
11316	11317	<>	<elision1>
11316	10980	<L2kl>	<>
11316	11320	<K2kl>	<>
11317	11318	<>	<aphaerese>
11317	11318	<>	<elision3>
11317	11318	<>	<elision2>
11317	11318	<>	<elision1>
11317	10981	<L2kl>	<>
11317	11321	<K2kl>	<>
11318	11316	<>	<name>
11318	11318	<>	<aphaerese>
11318	11318	<>	<elision3>
11318	11318	<>	<elision2>
11318	11318	<>	<elision1>
11318	10979	<L2kl>	<>
11318	11319	<K2kl>	<>
11319	10962	.	.
11319	10962	 	 
11319	10962	<~>	<~>
11319	10962	<split-s>	<split-s>
11319	10962	<split-h>	<split-h>
11319	10962	<name2>	<name2>
11319	11320	<>	<name>
11319	10965	<aphaerese>	<aphaerese>
11319	11319	<>	<aphaerese>
11319	10962	<elision3>	<elision3>
11319	11319	<>	<elision3>
11319	10962	<elision2>	<elision2>
11319	11319	<>	<elision2>
11319	10962	<elision1>	<elision1>
11319	11319	<>	<elision1>
11319	10959	.	υ
11319	10959	.	u
11319	10959	.	α
11319	10959	.	a
11319	10605	<2s>	<>
11320	10964	.	.
11320	10964	 	 
11320	10964	<~>	<~>
11320	10964	<split-s>	<split-s>
11320	10964	<split-h>	<split-h>
11320	10964	<name2>	<name2>
11320	10967	<aphaerese>	<aphaerese>
11320	11321	<>	<aphaerese>
11320	10964	<elision3>	<elision3>
11320	11321	<>	<elision3>
11320	10964	<elision2>	<elision2>
11320	11321	<>	<elision2>
11320	10964	<elision1>	<elision1>
11320	11321	<>	<elision1>
11320	10961	.	υ
11320	10961	.	u
11320	10961	.	α
11320	10961	.	a
11320	10606	<2s>	<>
11321	10962	.	.
11321	10962	 	 
11321	10962	<~>	<~>
11321	10962	<split-s>	<split-s>
11321	10962	<split-h>	<split-h>
11321	10962	<name2>	<name2>
11321	10965	<aphaerese>	<aphaerese>
11321	11319	<>	<aphaerese>
11321	10962	<elision3>	<elision3>
11321	11319	<>	<elision3>
11321	10962	<elision2>	<elision2>
11321	11319	<>	<elision2>
11321	10962	<elision1>	<elision1>
11321	11319	<>	<elision1>
11321	10959	.	υ
11321	10959	.	u
11321	10959	.	α
11321	10959	.	a
11321	10604	<2s>	<>
11322	10962	.	.
11322	10962	 	 
11322	10962	<~>	<~>
11322	10962	<split-s>	<split-s>
11322	10962	<split-h>	<split-h>
11322	10962	<name2>	<name2>
11322	10986	<name2>	<name>
11322	11320	<>	<name>
11322	10965	<aphaerese>	<aphaerese>
11322	11319	<>	<aphaerese>
11322	10962	<elision3>	<elision3>
11322	11319	<>	<elision3>
11322	10962	<elision2>	<elision2>
11322	11319	<>	<elision2>
11322	10962	<elision1>	<elision1>
11322	11319	<>	<elision1>
11322	10959	.	υ
11322	10959	.	u
11322	10959	.	α
11322	10959	.	a
11322	10611	<2s>	<>
11323	10832	.	.
11323	10833	 	 
11323	10832	<~>	<~>
11323	10832	<split-s>	<split-s>
11323	10832	<split-h>	<split-h>
11323	10832	<name2>	<name2>
11323	11324	<>	<name>
11323	10836	<aphaerese>	<aphaerese>
11323	11323	<>	<aphaerese>
11323	10832	<elision3>	<elision3>
11323	11323	<>	<elision3>
11323	10832	<elision2>	<elision2>
11323	11323	<>	<elision2>
11323	10832	<elision1>	<elision1>
11323	11323	<>	<elision1>
11323	10840	.	υ
11323	10843	s	υ
11323	10840	.	u
11323	10843	s	u
11323	10840	.	κ
11323	10885	s	U
11323	10840	.	α
11323	10843	s	α
11323	10840	.	a
11323	10843	s	a
11323	10915	s	A
11323	10840	.	λ
11323	10592	<2s>	<>
11324	10835	.	.
11324	10838	 	 
11324	10835	<~>	<~>
11324	10835	<split-s>	<split-s>
11324	10835	<split-h>	<split-h>
11324	10835	<name2>	<name2>
11324	10936	<aphaerese>	<aphaerese>
11324	11325	<>	<aphaerese>
11324	10835	<elision3>	<elision3>
11324	11325	<>	<elision3>
11324	10835	<elision2>	<elision2>
11324	11325	<>	<elision2>
11324	10835	<elision1>	<elision1>
11324	11325	<>	<elision1>
11324	10842	.	υ
11324	10860	s	υ
11324	10842	.	u
11324	10860	s	u
11324	10842	.	κ
11324	10887	s	U
11324	10842	.	α
11324	10860	s	α
11324	10842	.	a
11324	10860	s	a
11324	10917	s	A
11324	10842	.	λ
11324	10593	<2s>	<>
11325	10832	.	.
11325	10833	 	 
11325	10832	<~>	<~>
11325	10832	<split-s>	<split-s>
11325	10832	<split-h>	<split-h>
11325	10832	<name2>	<name2>
11325	10836	<aphaerese>	<aphaerese>
11325	11323	<>	<aphaerese>
11325	10832	<elision3>	<elision3>
11325	11323	<>	<elision3>
11325	10832	<elision2>	<elision2>
11325	11323	<>	<elision2>
11325	10832	<elision1>	<elision1>
11325	11323	<>	<elision1>
11325	10840	.	υ
11325	10843	s	υ
11325	10840	.	u
11325	10843	s	u
11325	10840	.	κ
11325	10885	s	U
11325	10840	.	α
11325	10843	s	α
11325	10840	.	a
11325	10843	s	a
11325	10915	s	A
11325	10840	.	λ
11325	10591	<2s>	<>
11326	10962	.	.
11326	10962	 	 
11326	10962	<~>	<~>
11326	10962	<split-s>	<split-s>
11326	10962	<split-h>	<split-h>
11326	10962	<name2>	<name2>
11326	11327	<>	<name>
11326	10965	<aphaerese>	<aphaerese>
11326	11326	<>	<aphaerese>
11326	10962	<elision3>	<elision3>
11326	11326	<>	<elision3>
11326	10962	<elision2>	<elision2>
11326	11326	<>	<elision2>
11326	10962	<elision1>	<elision1>
11326	11326	<>	<elision1>
11326	10959	.	υ
11326	10959	.	u
11326	10959	.	κ
11326	10959	.	α
11326	10959	.	a
11326	10959	.	λ
11326	10592	<2s>	<>
11327	10964	.	.
11327	10964	 	 
11327	10964	<~>	<~>
11327	10964	<split-s>	<split-s>
11327	10964	<split-h>	<split-h>
11327	10964	<name2>	<name2>
11327	10967	<aphaerese>	<aphaerese>
11327	11328	<>	<aphaerese>
11327	10964	<elision3>	<elision3>
11327	11328	<>	<elision3>
11327	10964	<elision2>	<elision2>
11327	11328	<>	<elision2>
11327	10964	<elision1>	<elision1>
11327	11328	<>	<elision1>
11327	10961	.	υ
11327	10961	.	u
11327	10961	.	κ
11327	10961	.	α
11327	10961	.	a
11327	10961	.	λ
11327	10593	<2s>	<>
11328	10962	.	.
11328	10962	 	 
11328	10962	<~>	<~>
11328	10962	<split-s>	<split-s>
11328	10962	<split-h>	<split-h>
11328	10962	<name2>	<name2>
11328	10965	<aphaerese>	<aphaerese>
11328	11326	<>	<aphaerese>
11328	10962	<elision3>	<elision3>
11328	11326	<>	<elision3>
11328	10962	<elision2>	<elision2>
11328	11326	<>	<elision2>
11328	10962	<elision1>	<elision1>
11328	11326	<>	<elision1>
11328	10959	.	υ
11328	10959	.	u
11328	10959	.	κ
11328	10959	.	α
11328	10959	.	a
11328	10959	.	λ
11328	10591	<2s>	<>
11329	10986	<name>	<name>
11329	11330	<>	<name>
11329	11332	<>	<aphaerese>
11329	11332	<>	<elision3>
11329	11332	<>	<elision2>
11329	11332	<>	<elision1>
11329	10462	<2s>	<>
11329	11333	<L2kl>	<>
11330	11331	<>	<aphaerese>
11330	11331	<>	<elision3>
11330	11331	<>	<elision2>
11330	11331	<>	<elision1>
11330	11327	<L2kl>	<>
11331	11332	<>	<aphaerese>
11331	11332	<>	<elision3>
11331	11332	<>	<elision2>
11331	11332	<>	<elision1>
11331	11328	<L2kl>	<>
11332	11330	<>	<name>
11332	11332	<>	<aphaerese>
11332	11332	<>	<elision3>
11332	11332	<>	<elision2>
11332	11332	<>	<elision1>
11332	11326	<L2kl>	<>
11333	10962	.	.
11333	10962	 	 
11333	10962	<~>	<~>
11333	10962	<split-s>	<split-s>
11333	10962	<split-h>	<split-h>
11333	10962	<name2>	<name2>
11333	10986	<name2>	<name>
11333	11327	<>	<name>
11333	10965	<aphaerese>	<aphaerese>
11333	11326	<>	<aphaerese>
11333	10962	<elision3>	<elision3>
11333	11326	<>	<elision3>
11333	10962	<elision2>	<elision2>
11333	11326	<>	<elision2>
11333	10962	<elision1>	<elision1>
11333	11326	<>	<elision1>
11333	10959	.	υ
11333	10959	.	u
11333	10959	.	κ
11333	10959	.	α
11333	10959	.	a
11333	10959	.	λ
11333	10618	<2s>	<>
11334	71	.	.
11334	72	 	 
11334	71	<~>	<~>
11334	71	<split-s>	<split-s>
11334	71	<split-h>	<split-h>
11334	71	<name2>	<name2>
11334	75	<aphaerese>	<aphaerese>
11334	11335	<>	<aphaerese>
11334	10333	<elision3>	<elision3>
11334	11335	<>	<elision3>
11334	10333	<elision2>	<elision2>
11334	11335	<>	<elision2>
11334	10333	<elision1>	<elision1>
11334	11335	<>	<elision1>
11334	9751	.	υ
11334	9795	H	υ
11334	9751	.	u
11334	9797	H	u
11334	10210	H	κ
11334	9705	H	k
11334	9718	H	U
11334	9721	H	K
11334	9751	.	α
11334	9781	H	α
11334	9751	.	a
11334	9786	H	a
11334	9548	H	A
11334	10187	H	λ
11334	10135	H	l
11334	10140	H	L
11334	11338	<K>	<>
11335	71	.	.
11335	72	 	 
11335	71	<~>	<~>
11335	71	<split-s>	<split-s>
11335	71	<split-h>	<split-h>
11335	71	<name2>	<name2>
11335	11336	<>	<name>
11335	75	<aphaerese>	<aphaerese>
11335	11335	<>	<aphaerese>
11335	10333	<elision3>	<elision3>
11335	11335	<>	<elision3>
11335	10333	<elision2>	<elision2>
11335	11335	<>	<elision2>
11335	10333	<elision1>	<elision1>
11335	11335	<>	<elision1>
11335	9751	.	υ
11335	9795	H	υ
11335	9751	.	u
11335	9797	H	u
11335	10210	H	κ
11335	9705	H	k
11335	9718	H	U
11335	9721	H	K
11335	9751	.	α
11335	9781	H	α
11335	9751	.	a
11335	9786	H	a
11335	9548	H	A
11335	10187	H	λ
11335	10135	H	l
11335	10140	H	L
11335	11339	<K>	<>
11336	70	.	.
11336	74	 	 
11336	70	<~>	<~>
11336	70	<split-s>	<split-s>
11336	70	<split-h>	<split-h>
11336	70	<name2>	<name2>
11336	77	<aphaerese>	<aphaerese>
11336	11334	<>	<aphaerese>
11336	10332	<elision3>	<elision3>
11336	11334	<>	<elision3>
11336	10332	<elision2>	<elision2>
11336	11334	<>	<elision2>
11336	10332	<elision1>	<elision1>
11336	11334	<>	<elision1>
11336	9753	.	υ
11336	9790	H	υ
11336	9753	.	u
11336	9794	H	u
11336	10167	H	κ
11336	9746	H	k
11336	9720	H	U
11336	9750	H	K
11336	9753	.	α
11336	9780	H	α
11336	9753	.	a
11336	9785	H	a
11336	9551	H	A
11336	10186	H	λ
11336	10134	H	l
11336	10137	H	L
11336	11337	<K>	<>
11337	9803	.	.
11337	9803	<~>	<~>
11337	9803	<split-s>	<split-s>
11337	9803	<split-h>	<split-h>
11337	9803	<name2>	<name2>
11337	9806	<aphaerese>	<aphaerese>
11337	11338	<>	<aphaerese>
11337	10281	<elision3>	<elision3>
11337	11338	<>	<elision3>
11337	10281	<elision2>	<elision2>
11337	11338	<>	<elision2>
11337	10281	<elision1>	<elision1>
11337	11338	<>	<elision1>
11337	9799	.	υ
11337	9945	H	υ
11337	9799	.	u
11337	9954	H	u
11337	10197	H	κ
11337	9914	H	k
11337	9923	H	U
11337	9927	H	K
11337	9799	.	α
11337	9957	H	α
11337	9799	.	a
11337	9960	H	a
11337	9894	H	A
11337	10206	H	λ
11337	9941	H	l
11337	9936	H	L
11338	9801	.	.
11338	9801	<~>	<~>
11338	9801	<split-s>	<split-s>
11338	9801	<split-h>	<split-h>
11338	9801	<name2>	<name2>
11338	9804	<aphaerese>	<aphaerese>
11338	11339	<>	<aphaerese>
11338	10282	<elision3>	<elision3>
11338	11339	<>	<elision3>
11338	10282	<elision2>	<elision2>
11338	11339	<>	<elision2>
11338	10282	<elision1>	<elision1>
11338	11339	<>	<elision1>
11338	9800	.	υ
11338	9943	H	υ
11338	9800	.	u
11338	9952	H	u
11338	10195	H	κ
11338	9912	H	k
11338	9921	H	U
11338	9924	H	K
11338	9800	.	α
11338	9955	H	α
11338	9800	.	a
11338	9958	H	a
11338	9892	H	A
11338	10204	H	λ
11338	9939	H	l
11338	9942	H	L
11339	9801	.	.
11339	9801	<~>	<~>
11339	9801	<split-s>	<split-s>
11339	9801	<split-h>	<split-h>
11339	9801	<name2>	<name2>
11339	11337	<>	<name>
11339	9804	<aphaerese>	<aphaerese>
11339	11339	<>	<aphaerese>
11339	10282	<elision3>	<elision3>
11339	11339	<>	<elision3>
11339	10282	<elision2>	<elision2>
11339	11339	<>	<elision2>
11339	10282	<elision1>	<elision1>
11339	11339	<>	<elision1>
11339	9800	.	υ
11339	9943	H	υ
11339	9800	.	u
11339	9952	H	u
11339	10195	H	κ
11339	9912	H	k
11339	9921	H	U
11339	9924	H	K
11339	9800	.	α
11339	9955	H	α
11339	9800	.	a
11339	9958	H	a
11339	9892	H	A
11339	10204	H	λ
11339	9939	H	l
11339	9942	H	L
11340	11341	<>	<name>
11340	11340	<>	<aphaerese>
11340	11340	<>	<elision3>
11340	11340	<>	<elision2>
11340	11340	<>	<elision1>
11340	11197	.	κ
11340	11197	.	λ
11340	10521	<1s>	<>
11341	11342	<>	<aphaerese>
11341	11342	<>	<elision3>
11341	11342	<>	<elision2>
11341	11342	<>	<elision1>
11341	11199	.	κ
11341	11199	.	λ
11341	10522	<1s>	<>
11342	11340	<>	<aphaerese>
11342	11340	<>	<elision3>
11342	11340	<>	<elision2>
11342	11340	<>	<elision1>
11342	11197	.	κ
11342	11197	.	λ
11342	10520	<1s>	<>
11343	11189	.	.
11343	11190	 	 
11343	11189	<~>	<~>
11343	11189	<split-s>	<split-s>
11343	11189	<split-h>	<split-h>
11343	11189	<name2>	<name2>
11343	11304	<>	<name>
11343	11193	<aphaerese>	<aphaerese>
11343	11188	<>	<aphaerese>
11343	11306	<elision3>	<elision3>
11343	11188	<>	<elision3>
11343	11306	<elision2>	<elision2>
11343	11188	<>	<elision2>
11343	11306	<elision1>	<elision1>
11343	11188	<>	<elision1>
11343	11197	.	υ
11343	11200	s	υ
11343	11197	.	u
11343	11200	s	u
11343	10831	s	κ
11343	10956	s	k
11343	11246	s	U
11343	10974	s	K
11343	11197	.	α
11343	11271	s	α
11343	11197	.	a
11343	11271	s	a
11343	11274	s	A
11343	10831	s	λ
11343	10987	s	l
11343	10990	s	L
11343	11344	<1s>	<>
11344	71	.	.
11344	72	 	 
11344	71	<~>	<~>
11344	71	<split-s>	<split-s>
11344	71	<split-h>	<split-h>
11344	71	<name2>	<name2>
11344	11336	<>	<name>
11344	75	<aphaerese>	<aphaerese>
11344	11335	<>	<aphaerese>
11344	10333	<elision3>	<elision3>
11344	11335	<>	<elision3>
11344	10333	<elision2>	<elision2>
11344	11335	<>	<elision2>
11344	10333	<elision1>	<elision1>
11344	11335	<>	<elision1>
11344	9751	.	υ
11344	9751	.	u
11344	9751	.	α
11344	9751	.	a
11344	11345	<K>	<>
11345	9801	.	.
11345	9801	<~>	<~>
11345	9801	<split-s>	<split-s>
11345	9801	<split-h>	<split-h>
11345	9801	<name2>	<name2>
11345	11337	<>	<name>
11345	9804	<aphaerese>	<aphaerese>
11345	11339	<>	<aphaerese>
11345	10282	<elision3>	<elision3>
11345	11339	<>	<elision3>
11345	10282	<elision2>	<elision2>
11345	11339	<>	<elision2>
11345	10282	<elision1>	<elision1>
11345	11339	<>	<elision1>
11345	9800	.	υ
11345	9800	.	u
11345	9800	.	α
11345	9800	.	a
11346	11347	<>	<name>
11346	11349	<>	<aphaerese>
11346	11349	<>	<elision3>
11346	11349	<>	<elision2>
11346	11349	<>	<elision1>
11346	11350	<k2K>	<>
11346	11356	<k2L>	<>
11346	11340	<l2L>	<>
11347	11348	<>	<aphaerese>
11347	11348	<>	<elision3>
11347	11348	<>	<elision2>
11347	11348	<>	<elision1>
11347	11351	<k2K>	<>
11347	11354	<k2L>	<>
11347	11341	<l2L>	<>
11348	11349	<>	<aphaerese>
11348	11349	<>	<elision3>
11348	11349	<>	<elision2>
11348	11349	<>	<elision1>
11348	11352	<k2K>	<>
11348	11355	<k2L>	<>
11348	11342	<l2L>	<>
11349	11347	<>	<name>
11349	11349	<>	<aphaerese>
11349	11349	<>	<elision3>
11349	11349	<>	<elision2>
11349	11349	<>	<elision1>
11349	11350	<k2K>	<>
11349	11353	<k2L>	<>
11349	11340	<l2L>	<>
11350	11023	.	.
11350	11024	 	 
11350	11023	<~>	<~>
11350	11023	<split-s>	<split-s>
11350	11023	<split-h>	<split-h>
11350	11023	<name2>	<name2>
11350	11351	<>	<name>
11350	11027	<aphaerese>	<aphaerese>
11350	11350	<>	<aphaerese>
11350	11023	<elision3>	<elision3>
11350	11350	<>	<elision3>
11350	11023	<elision2>	<elision2>
11350	11350	<>	<elision2>
11350	11023	<elision1>	<elision1>
11350	11350	<>	<elision1>
11350	11031	.	υ
11350	11034	s	υ
11350	11031	.	u
11350	11034	s	u
11350	55	s	κ
11350	10772	s	k
11350	11097	s	U
11350	10805	s	K
11350	11031	.	α
11350	11125	s	α
11350	11031	.	a
11350	11125	s	a
11350	11128	s	A
11350	55	s	λ
11350	10820	s	l
11350	10823	s	L
11351	11026	.	.
11351	11029	 	 
11351	11026	<~>	<~>
11351	11026	<split-s>	<split-s>
11351	11026	<split-h>	<split-h>
11351	11026	<name2>	<name2>
11351	11155	<aphaerese>	<aphaerese>
11351	11352	<>	<aphaerese>
11351	11026	<elision3>	<elision3>
11351	11352	<>	<elision3>
11351	11026	<elision2>	<elision2>
11351	11352	<>	<elision2>
11351	11026	<elision1>	<elision1>
11351	11352	<>	<elision1>
11351	11033	.	υ
11351	11036	s	υ
11351	11033	.	u
11351	11036	s	u
11351	10765	s	κ
11351	10774	s	k
11351	11099	s	U
11351	10808	s	K
11351	11033	.	α
11351	11127	s	α
11351	11033	.	a
11351	11127	s	a
11351	11130	s	A
11351	10765	s	λ
11351	10822	s	l
11351	10825	s	L
11352	11023	.	.
11352	11024	 	 
11352	11023	<~>	<~>
11352	11023	<split-s>	<split-s>
11352	11023	<split-h>	<split-h>
11352	11023	<name2>	<name2>
11352	11027	<aphaerese>	<aphaerese>
11352	11350	<>	<aphaerese>
11352	11023	<elision3>	<elision3>
11352	11350	<>	<elision3>
11352	11023	<elision2>	<elision2>
11352	11350	<>	<elision2>
11352	11023	<elision1>	<elision1>
11352	11350	<>	<elision1>
11352	11031	.	υ
11352	11034	s	υ
11352	11031	.	u
11352	11034	s	u
11352	55	s	κ
11352	10772	s	k
11352	11097	s	U
11352	10805	s	K
11352	11031	.	α
11352	11125	s	α
11352	11031	.	a
11352	11125	s	a
11352	11128	s	A
11352	55	s	λ
11352	10820	s	l
11352	10823	s	L
11353	11189	.	.
11353	11190	 	 
11353	11189	<~>	<~>
11353	11189	<split-s>	<split-s>
11353	11189	<split-h>	<split-h>
11353	11189	<name2>	<name2>
11353	11354	<>	<name>
11353	11193	<aphaerese>	<aphaerese>
11353	11353	<>	<aphaerese>
11353	11189	<elision3>	<elision3>
11353	11353	<>	<elision3>
11353	11189	<elision2>	<elision2>
11353	11353	<>	<elision2>
11353	11189	<elision1>	<elision1>
11353	11353	<>	<elision1>
11353	11197	.	υ
11353	11200	s	υ
11353	11197	.	u
11353	11200	s	u
11353	10831	s	κ
11353	10956	s	k
11353	11246	s	U
11353	10974	s	K
11353	11197	.	α
11353	11271	s	α
11353	11197	.	a
11353	11271	s	a
11353	11274	s	A
11353	10831	s	λ
11353	10987	s	l
11353	10990	s	L
11353	10457	<1s>	<>
11354	11192	.	.
11354	11195	 	 
11354	11192	<~>	<~>
11354	11192	<split-s>	<split-s>
11354	11192	<split-h>	<split-h>
11354	11192	<name2>	<name2>
11354	11301	<aphaerese>	<aphaerese>
11354	11355	<>	<aphaerese>
11354	11192	<elision3>	<elision3>
11354	11355	<>	<elision3>
11354	11192	<elision2>	<elision2>
11354	11355	<>	<elision2>
11354	11192	<elision1>	<elision1>
11354	11355	<>	<elision1>
11354	11199	.	υ
11354	11202	s	υ
11354	11199	.	u
11354	11202	s	u
11354	10952	s	κ
11354	10958	s	k
11354	11248	s	U
11354	10977	s	K
11354	11199	.	α
11354	11273	s	α
11354	11199	.	a
11354	11273	s	a
11354	11276	s	A
11354	10952	s	λ
11354	10989	s	l
11354	10992	s	L
11354	10458	<1s>	<>
11355	11189	.	.
11355	11190	 	 
11355	11189	<~>	<~>
11355	11189	<split-s>	<split-s>
11355	11189	<split-h>	<split-h>
11355	11189	<name2>	<name2>
11355	11193	<aphaerese>	<aphaerese>
11355	11353	<>	<aphaerese>
11355	11189	<elision3>	<elision3>
11355	11353	<>	<elision3>
11355	11189	<elision2>	<elision2>
11355	11353	<>	<elision2>
11355	11189	<elision1>	<elision1>
11355	11353	<>	<elision1>
11355	11197	.	υ
11355	11200	s	υ
11355	11197	.	u
11355	11200	s	u
11355	10831	s	κ
11355	10956	s	k
11355	11246	s	U
11355	10974	s	K
11355	11197	.	α
11355	11271	s	α
11355	11197	.	a
11355	11271	s	a
11355	11274	s	A
11355	10831	s	λ
11355	10987	s	l
11355	10990	s	L
11355	10456	<1s>	<>
11356	11189	.	.
11356	11190	 	 
11356	11189	<~>	<~>
11356	11189	<split-s>	<split-s>
11356	11189	<split-h>	<split-h>
11356	11189	<name2>	<name2>
11356	11354	<>	<name>
11356	11193	<aphaerese>	<aphaerese>
11356	11353	<>	<aphaerese>
11356	11189	<elision3>	<elision3>
11356	11353	<>	<elision3>
11356	11189	<elision2>	<elision2>
11356	11353	<>	<elision2>
11356	11189	<elision1>	<elision1>
11356	11353	<>	<elision1>
11356	11197	.	υ
11356	11200	s	υ
11356	11197	.	u
11356	11200	s	u
11356	10831	s	κ
11356	10956	s	k
11356	11246	s	U
11356	10974	s	K
11356	11197	.	α
11356	11271	s	α
11356	11197	.	a
11356	11271	s	a
11356	11274	s	A
11356	10831	s	λ
11356	10987	s	l
11356	10990	s	L
11356	11357	<1s>	<>
11357	71	.	.
11357	72	 	 
11357	71	<~>	<~>
11357	71	<split-s>	<split-s>
11357	71	<split-h>	<split-h>
11357	71	<name2>	<name2>
11357	10458	<>	<name>
11357	75	<aphaerese>	<aphaerese>
11357	10457	<>	<aphaerese>
11357	71	<elision3>	<elision3>
11357	10457	<>	<elision3>
11357	71	<elision2>	<elision2>
11357	10457	<>	<elision2>
11357	71	<elision1>	<elision1>
11357	10457	<>	<elision1>
11357	9751	.	υ
11357	9751	.	u
11357	9751	.	α
11357	9751	.	a
11357	11358	<K>	<>
11358	9801	.	.
11358	9801	<~>	<~>
11358	9801	<split-s>	<split-s>
11358	9801	<split-h>	<split-h>
11358	9801	<name2>	<name2>
11358	10459	<>	<name>
11358	9804	<aphaerese>	<aphaerese>
11358	10461	<>	<aphaerese>
11358	9801	<elision3>	<elision3>
11358	10461	<>	<elision3>
11358	9801	<elision2>	<elision2>
11358	10461	<>	<elision2>
11358	9801	<elision1>	<elision1>
11358	10461	<>	<elision1>
11358	9800	.	υ
11358	9800	.	u
11358	9800	.	α
11358	9800	.	a
11359	11023	.	.
11359	11024	 	 
11359	11023	<~>	<~>
11359	11023	<split-s>	<split-s>
11359	11023	<split-h>	<split-h>
11359	11023	<name2>	<name2>
11359	11360	<>	<name>
11359	11027	<aphaerese>	<aphaerese>
11359	11359	<>	<aphaerese>
11359	11023	<elision3>	<elision3>
11359	11359	<>	<elision3>
11359	11023	<elision2>	<elision2>
11359	11359	<>	<elision2>
11359	11023	<elision1>	<elision1>
11359	11359	<>	<elision1>
11359	11031	.	υ
11359	11034	s	υ
11359	11031	.	u
11359	11034	s	u
11359	11037	.	κ
11359	11055	s	κ
11359	10772	s	k
11359	11097	s	U
11359	10805	s	K
11359	11031	.	α
11359	11125	s	α
11359	11031	.	a
11359	11125	s	a
11359	11128	s	A
11359	11131	s	λ
11359	10820	s	l
11359	10823	s	L
11359	11189	<U2L>	<>
11360	11026	.	.
11360	11029	 	 
11360	11026	<~>	<~>
11360	11026	<split-s>	<split-s>
11360	11026	<split-h>	<split-h>
11360	11026	<name2>	<name2>
11360	11155	<aphaerese>	<aphaerese>
11360	11361	<>	<aphaerese>
11360	11026	<elision3>	<elision3>
11360	11361	<>	<elision3>
11360	11026	<elision2>	<elision2>
11360	11361	<>	<elision2>
11360	11026	<elision1>	<elision1>
11360	11361	<>	<elision1>
11360	11033	.	υ
11360	11036	s	υ
11360	11033	.	u
11360	11036	s	u
11360	11039	.	κ
11360	11057	s	κ
11360	10774	s	k
11360	11099	s	U
11360	10808	s	K
11360	11033	.	α
11360	11127	s	α
11360	11033	.	a
11360	11127	s	a
11360	11130	s	A
11360	11133	s	λ
11360	10822	s	l
11360	10825	s	L
11360	11303	<U2L>	<>
11361	11023	.	.
11361	11024	 	 
11361	11023	<~>	<~>
11361	11023	<split-s>	<split-s>
11361	11023	<split-h>	<split-h>
11361	11023	<name2>	<name2>
11361	11027	<aphaerese>	<aphaerese>
11361	11359	<>	<aphaerese>
11361	11023	<elision3>	<elision3>
11361	11359	<>	<elision3>
11361	11023	<elision2>	<elision2>
11361	11359	<>	<elision2>
11361	11023	<elision1>	<elision1>
11361	11359	<>	<elision1>
11361	11031	.	υ
11361	11034	s	υ
11361	11031	.	u
11361	11034	s	u
11361	11037	.	κ
11361	11055	s	κ
11361	10772	s	k
11361	11097	s	U
11361	10805	s	K
11361	11031	.	α
11361	11125	s	α
11361	11031	.	a
11361	11125	s	a
11361	11128	s	A
11361	11131	s	λ
11361	10820	s	l
11361	10823	s	L
11361	11192	<U2L>	<>
11362	11023	.	.
11362	11024	 	 
11362	11023	<~>	<~>
11362	11023	<split-s>	<split-s>
11362	11023	<split-h>	<split-h>
11362	11023	<name2>	<name2>
11362	11363	<name2>	<name>
11362	11364	<>	<name>
11362	11027	<aphaerese>	<aphaerese>
11362	11366	<>	<aphaerese>
11362	11023	<elision3>	<elision3>
11362	11366	<>	<elision3>
11362	11023	<elision2>	<elision2>
11362	11366	<>	<elision2>
11362	11023	<elision1>	<elision1>
11362	11366	<>	<elision1>
11362	11031	.	υ
11362	11034	s	υ
11362	11031	.	u
11362	11034	s	u
11362	11197	.	κ
11362	55	s	κ
11362	10772	s	k
11362	11097	s	U
11362	10805	s	K
11362	11031	.	α
11362	11125	s	α
11362	11031	.	a
11362	11125	s	a
11362	11128	s	A
11362	11197	.	λ
11362	55	s	λ
11362	10820	s	l
11362	10823	s	L
11362	10521	<1s>	<>
11362	11367	<k2K>	<>
11362	11368	<k2L>	<>
11362	11370	<K2L>	<>
11363	10808	s	k
11363	10825	s	l
11364	11026	.	.
11364	11029	 	 
11364	11026	<~>	<~>
11364	11026	<split-s>	<split-s>
11364	11026	<split-h>	<split-h>
11364	11026	<name2>	<name2>
11364	11155	<aphaerese>	<aphaerese>
11364	11365	<>	<aphaerese>
11364	11026	<elision3>	<elision3>
11364	11365	<>	<elision3>
11364	11026	<elision2>	<elision2>
11364	11365	<>	<elision2>
11364	11026	<elision1>	<elision1>
11364	11365	<>	<elision1>
11364	11033	.	υ
11364	11036	s	υ
11364	11033	.	u
11364	11036	s	u
11364	11199	.	κ
11364	10765	s	κ
11364	10774	s	k
11364	11099	s	U
11364	10808	s	K
11364	11033	.	α
11364	11127	s	α
11364	11033	.	a
11364	11127	s	a
11364	11130	s	A
11364	11199	.	λ
11364	10765	s	λ
11364	10822	s	l
11364	10825	s	L
11364	10522	<1s>	<>
11364	11354	<K2L>	<>
11365	11023	.	.
11365	11024	 	 
11365	11023	<~>	<~>
11365	11023	<split-s>	<split-s>
11365	11023	<split-h>	<split-h>
11365	11023	<name2>	<name2>
11365	11027	<aphaerese>	<aphaerese>
11365	11366	<>	<aphaerese>
11365	11023	<elision3>	<elision3>
11365	11366	<>	<elision3>
11365	11023	<elision2>	<elision2>
11365	11366	<>	<elision2>
11365	11023	<elision1>	<elision1>
11365	11366	<>	<elision1>
11365	11031	.	υ
11365	11034	s	υ
11365	11031	.	u
11365	11034	s	u
11365	11197	.	κ
11365	55	s	κ
11365	10772	s	k
11365	11097	s	U
11365	10805	s	K
11365	11031	.	α
11365	11125	s	α
11365	11031	.	a
11365	11125	s	a
11365	11128	s	A
11365	11197	.	λ
11365	55	s	λ
11365	10820	s	l
11365	10823	s	L
11365	10520	<1s>	<>
11365	11355	<K2L>	<>
11366	11023	.	.
11366	11024	 	 
11366	11023	<~>	<~>
11366	11023	<split-s>	<split-s>
11366	11023	<split-h>	<split-h>
11366	11023	<name2>	<name2>
11366	11364	<>	<name>
11366	11027	<aphaerese>	<aphaerese>
11366	11366	<>	<aphaerese>
11366	11023	<elision3>	<elision3>
11366	11366	<>	<elision3>
11366	11023	<elision2>	<elision2>
11366	11366	<>	<elision2>
11366	11023	<elision1>	<elision1>
11366	11366	<>	<elision1>
11366	11031	.	υ
11366	11034	s	υ
11366	11031	.	u
11366	11034	s	u
11366	11197	.	κ
11366	55	s	κ
11366	10772	s	k
11366	11097	s	U
11366	10805	s	K
11366	11031	.	α
11366	11125	s	α
11366	11031	.	a
11366	11125	s	a
11366	11128	s	A
11366	11197	.	λ
11366	55	s	λ
11366	10820	s	l
11366	10823	s	L
11366	10521	<1s>	<>
11366	11353	<K2L>	<>
11367	11363	<name>	<name>
11368	11369	<name>	<name>
11368	10462	<1s>	<>
11369	10977	s	k
11369	10992	s	l
11369	10352	<1s>	<>
11370	11189	.	.
11370	11190	 	 
11370	11189	<~>	<~>
11370	11189	<split-s>	<split-s>
11370	11189	<split-h>	<split-h>
11370	11189	<name2>	<name2>
11370	11369	<name2>	<name>
11370	11354	<>	<name>
11370	11193	<aphaerese>	<aphaerese>
11370	11353	<>	<aphaerese>
11370	11189	<elision3>	<elision3>
11370	11353	<>	<elision3>
11370	11189	<elision2>	<elision2>
11370	11353	<>	<elision2>
11370	11189	<elision1>	<elision1>
11370	11353	<>	<elision1>
11370	11197	.	υ
11370	11200	s	υ
11370	11197	.	u
11370	11200	s	u
11370	10831	s	κ
11370	10956	s	k
11370	11246	s	U
11370	10974	s	K
11370	11197	.	α
11370	11271	s	α
11370	11197	.	a
11370	11271	s	a
11370	11274	s	A
11370	10831	s	λ
11370	10987	s	l
11370	10990	s	L
11370	11371	<1s>	<>
11371	71	.	.
11371	72	 	 
11371	71	<~>	<~>
11371	71	<split-s>	<split-s>
11371	71	<split-h>	<split-h>
11371	71	<name2>	<name2>
11371	10463	<name2>	<name>
11371	10458	<>	<name>
11371	75	<aphaerese>	<aphaerese>
11371	10457	<>	<aphaerese>
11371	71	<elision3>	<elision3>
11371	10457	<>	<elision3>
11371	71	<elision2>	<elision2>
11371	10457	<>	<elision2>
11371	71	<elision1>	<elision1>
11371	10457	<>	<elision1>
11371	9751	.	υ
11371	9751	.	u
11371	9751	.	α
11371	9751	.	a
11371	11372	<K>	<>
11372	9801	.	.
11372	9801	<~>	<~>
11372	9801	<split-s>	<split-s>
11372	9801	<split-h>	<split-h>
11372	9801	<name2>	<name2>
11372	10353	<name2>	<name>
11372	10459	<>	<name>
11372	9804	<aphaerese>	<aphaerese>
11372	10461	<>	<aphaerese>
11372	9801	<elision3>	<elision3>
11372	10461	<>	<elision3>
11372	9801	<elision2>	<elision2>
11372	10461	<>	<elision2>
11372	9801	<elision1>	<elision1>
11372	10461	<>	<elision1>
11372	9800	.	υ
11372	9800	.	u
11372	9800	.	α
11372	9800	.	a
11373	11374	<>	<name>
11373	11373	<>	<aphaerese>
11373	11373	<>	<elision3>
11373	11373	<>	<elision2>
11373	11373	<>	<elision1>
11373	11377	<lambda2L>	<>
11374	11375	<>	<aphaerese>
11374	11375	<>	<elision3>
11374	11375	<>	<elision2>
11374	11375	<>	<elision1>
11374	11378	<lambda2L>	<>
11375	11373	<>	<aphaerese>
11375	11373	<>	<elision3>
11375	11373	<>	<elision2>
11375	11373	<>	<elision1>
11375	11376	<lambda2L>	<>
11376	11189	.	.
11376	11190	 	 
11376	11189	<~>	<~>
11376	11189	<split-s>	<split-s>
11376	11189	<split-h>	<split-h>
11376	11189	<name2>	<name2>
11376	11193	<aphaerese>	<aphaerese>
11376	11377	<>	<aphaerese>
11376	11189	<elision3>	<elision3>
11376	11377	<>	<elision3>
11376	11189	<elision2>	<elision2>
11376	11377	<>	<elision2>
11376	11189	<elision1>	<elision1>
11376	11377	<>	<elision1>
11376	11197	.	υ
11376	11200	s	υ
11376	11197	.	u
11376	11200	s	u
11376	11197	.	κ
11376	10831	s	κ
11376	10956	s	k
11376	11246	s	U
11376	10974	s	K
11376	11197	.	α
11376	11271	s	α
11376	11197	.	a
11376	11271	s	a
11376	11274	s	A
11376	11197	.	λ
11376	10831	s	λ
11376	10987	s	l
11376	10990	s	L
11376	10341	<1s>	<>
11377	11189	.	.
11377	11190	 	 
11377	11189	<~>	<~>
11377	11189	<split-s>	<split-s>
11377	11189	<split-h>	<split-h>
11377	11189	<name2>	<name2>
11377	11378	<>	<name>
11377	11193	<aphaerese>	<aphaerese>
11377	11377	<>	<aphaerese>
11377	11189	<elision3>	<elision3>
11377	11377	<>	<elision3>
11377	11189	<elision2>	<elision2>
11377	11377	<>	<elision2>
11377	11189	<elision1>	<elision1>
11377	11377	<>	<elision1>
11377	11197	.	υ
11377	11200	s	υ
11377	11197	.	u
11377	11200	s	u
11377	11197	.	κ
11377	10831	s	κ
11377	10956	s	k
11377	11246	s	U
11377	10974	s	K
11377	11197	.	α
11377	11271	s	α
11377	11197	.	a
11377	11271	s	a
11377	11274	s	A
11377	11197	.	λ
11377	10831	s	λ
11377	10987	s	l
11377	10990	s	L
11377	10342	<1s>	<>
11378	11192	.	.
11378	11195	 	 
11378	11192	<~>	<~>
11378	11192	<split-s>	<split-s>
11378	11192	<split-h>	<split-h>
11378	11192	<name2>	<name2>
11378	11301	<aphaerese>	<aphaerese>
11378	11376	<>	<aphaerese>
11378	11192	<elision3>	<elision3>
11378	11376	<>	<elision3>
11378	11192	<elision2>	<elision2>
11378	11376	<>	<elision2>
11378	11192	<elision1>	<elision1>
11378	11376	<>	<elision1>
11378	11199	.	υ
11378	11202	s	υ
11378	11199	.	u
11378	11202	s	u
11378	11199	.	κ
11378	10952	s	κ
11378	10958	s	k
11378	11248	s	U
11378	10977	s	K
11378	11199	.	α
11378	11273	s	α
11378	11199	.	a
11378	11273	s	a
11378	11276	s	A
11378	11199	.	λ
11378	10952	s	λ
11378	10989	s	l
11378	10992	s	L
11378	10343	<1s>	<>
11379	11380	<>	<name>
11379	11379	<>	<aphaerese>
11379	11379	<>	<elision3>
11379	11379	<>	<elision2>
11379	11379	<>	<elision1>
11379	11377	<l2L>	<>
11380	11381	<>	<aphaerese>
11380	11381	<>	<elision3>
11380	11381	<>	<elision2>
11380	11381	<>	<elision1>
11380	11378	<l2L>	<>
11381	11379	<>	<aphaerese>
11381	11379	<>	<elision3>
11381	11379	<>	<elision2>
11381	11379	<>	<elision1>
11381	11376	<l2L>	<>
11382	11189	.	.
11382	11190	 	 
11382	11189	<~>	<~>
11382	11189	<split-s>	<split-s>
11382	11189	<split-h>	<split-h>
11382	11189	<name2>	<name2>
11382	11369	<name2>	<name>
11382	11378	<>	<name>
11382	11193	<aphaerese>	<aphaerese>
11382	11377	<>	<aphaerese>
11382	11189	<elision3>	<elision3>
11382	11377	<>	<elision3>
11382	11189	<elision2>	<elision2>
11382	11377	<>	<elision2>
11382	11189	<elision1>	<elision1>
11382	11377	<>	<elision1>
11382	11197	.	υ
11382	11200	s	υ
11382	11197	.	u
11382	11200	s	u
11382	11197	.	κ
11382	10831	s	κ
11382	10956	s	k
11382	11246	s	U
11382	10974	s	K
11382	11197	.	α
11382	11271	s	α
11382	11197	.	a
11382	11271	s	a
11382	11274	s	A
11382	11197	.	λ
11382	10831	s	λ
11382	10987	s	l
11382	10990	s	L
11382	10531	<1s>	<>
11382	11368	<l2L>	<>
11383	11021	<>	<aphaerese>
11383	11021	<>	<elision3>
11383	11021	<>	<elision2>
11383	11021	<>	<elision1>
11383	11159	<kappa2K>	<>
11383	11384	<kappa2L>	<>
11383	11342	<lambda2L>	<>
11384	11189	.	.
11384	11190	 	 
11384	11189	<~>	<~>
11384	11189	<split-s>	<split-s>
11384	11189	<split-h>	<split-h>
11384	11189	<name2>	<name2>
11384	11193	<aphaerese>	<aphaerese>
11384	11188	<>	<aphaerese>
11384	11306	<elision3>	<elision3>
11384	11188	<>	<elision3>
11384	11306	<elision2>	<elision2>
11384	11188	<>	<elision2>
11384	11306	<elision1>	<elision1>
11384	11188	<>	<elision1>
11384	11197	.	υ
11384	11200	s	υ
11384	11197	.	u
11384	11200	s	u
11384	10831	s	κ
11384	10956	s	k
11384	11246	s	U
11384	10974	s	K
11384	11197	.	α
11384	11271	s	α
11384	11197	.	a
11384	11271	s	a
11384	11274	s	A
11384	10831	s	λ
11384	10987	s	l
11384	10990	s	L
11384	11385	<1s>	<>
11385	71	.	.
11385	72	 	 
11385	71	<~>	<~>
11385	71	<split-s>	<split-s>
11385	71	<split-h>	<split-h>
11385	71	<name2>	<name2>
11385	75	<aphaerese>	<aphaerese>
11385	11335	<>	<aphaerese>
11385	10333	<elision3>	<elision3>
11385	11335	<>	<elision3>
11385	10333	<elision2>	<elision2>
11385	11335	<>	<elision2>
11385	10333	<elision1>	<elision1>
11385	11335	<>	<elision1>
11385	9751	.	υ
11385	9751	.	u
11385	9751	.	α
11385	9751	.	a
11385	11386	<K>	<>
11386	9801	.	.
11386	9801	<~>	<~>
11386	9801	<split-s>	<split-s>
11386	9801	<split-h>	<split-h>
11386	9801	<name2>	<name2>
11386	9804	<aphaerese>	<aphaerese>
11386	11339	<>	<aphaerese>
11386	10282	<elision3>	<elision3>
11386	11339	<>	<elision3>
11386	10282	<elision2>	<elision2>
11386	11339	<>	<elision2>
11386	10282	<elision1>	<elision1>
11386	11339	<>	<elision1>
11386	9800	.	υ
11386	9800	.	u
11386	9800	.	α
11386	9800	.	a
11387	11349	<>	<aphaerese>
11387	11349	<>	<elision3>
11387	11349	<>	<elision2>
11387	11349	<>	<elision1>
11387	11352	<k2K>	<>
11387	11388	<k2L>	<>
11387	11342	<l2L>	<>
11388	11189	.	.
11388	11190	 	 
11388	11189	<~>	<~>
11388	11189	<split-s>	<split-s>
11388	11189	<split-h>	<split-h>
11388	11189	<name2>	<name2>
11388	11193	<aphaerese>	<aphaerese>
11388	11353	<>	<aphaerese>
11388	11189	<elision3>	<elision3>
11388	11353	<>	<elision3>
11388	11189	<elision2>	<elision2>
11388	11353	<>	<elision2>
11388	11189	<elision1>	<elision1>
11388	11353	<>	<elision1>
11388	11197	.	υ
11388	11200	s	υ
11388	11197	.	u
11388	11200	s	u
11388	10831	s	κ
11388	10956	s	k
11388	11246	s	U
11388	10974	s	K
11388	11197	.	α
11388	11271	s	α
11388	11197	.	a
11388	11271	s	a
11388	11274	s	A
11388	10831	s	λ
11388	10987	s	l
11388	10990	s	L
11388	11389	<1s>	<>
11389	71	.	.
11389	72	 	 
11389	71	<~>	<~>
11389	71	<split-s>	<split-s>
11389	71	<split-h>	<split-h>
11389	71	<name2>	<name2>
11389	75	<aphaerese>	<aphaerese>
11389	10457	<>	<aphaerese>
11389	71	<elision3>	<elision3>
11389	10457	<>	<elision3>
11389	71	<elision2>	<elision2>
11389	10457	<>	<elision2>
11389	71	<elision1>	<elision1>
11389	10457	<>	<elision1>
11389	9751	.	υ
11389	9751	.	u
11389	9751	.	α
11389	9751	.	a
11389	11390	<K>	<>
11390	9801	.	.
11390	9801	<~>	<~>
11390	9801	<split-s>	<split-s>
11390	9801	<split-h>	<split-h>
11390	9801	<name2>	<name2>
11390	9804	<aphaerese>	<aphaerese>
11390	10461	<>	<aphaerese>
11390	9801	<elision3>	<elision3>
11390	10461	<>	<elision3>
11390	9801	<elision2>	<elision2>
11390	10461	<>	<elision2>
11390	9801	<elision1>	<elision1>
11390	10461	<>	<elision1>
11390	9800	.	υ
11390	9800	.	u
11390	9800	.	α
11390	9800	.	a
11391	11023	.	.
11391	11024	 	 
11391	11023	<~>	<~>
11391	11023	<split-s>	<split-s>
11391	11023	<split-h>	<split-h>
11391	11023	<name2>	<name2>
11391	11027	<aphaerese>	<aphaerese>
11391	11366	<>	<aphaerese>
11391	11023	<elision3>	<elision3>
11391	11366	<>	<elision3>
11391	11023	<elision2>	<elision2>
11391	11366	<>	<elision2>
11391	11023	<elision1>	<elision1>
11391	11366	<>	<elision1>
11391	11031	.	υ
11391	11034	s	υ
11391	11031	.	u
11391	11034	s	u
11391	11197	.	κ
11391	55	s	κ
11391	10772	s	k
11391	11097	s	U
11391	10805	s	K
11391	11031	.	α
11391	11125	s	α
11391	11031	.	a
11391	11125	s	a
11391	11128	s	A
11391	11197	.	λ
11391	55	s	λ
11391	10820	s	l
11391	10823	s	L
11391	10520	<1s>	<>
11391	11388	<K2L>	<>
11392	11393	<>	<name>
11392	11392	<>	<aphaerese>
11392	35	<elision3>	<elision3>
11392	11392	<>	<elision3>
11392	35	<elision2>	<elision2>
11392	11392	<>	<elision2>
11392	35	<elision1>	<elision1>
11392	11392	<>	<elision1>
11393	11394	<>	<aphaerese>
11393	34	<elision3>	<elision3>
11393	11394	<>	<elision3>
11393	34	<elision2>	<elision2>
11393	11394	<>	<elision2>
11393	34	<elision1>	<elision1>
11393	11394	<>	<elision1>
11394	11392	<>	<aphaerese>
11394	35	<elision3>	<elision3>
11394	11392	<>	<elision3>
11394	35	<elision2>	<elision2>
11394	11392	<>	<elision2>
11394	35	<elision1>	<elision1>
11394	11392	<>	<elision1>
11395	11396	<>	<name>
11395	11398	<>	<aphaerese>
11395	11398	<>	<elision3>
11395	11398	<>	<elision2>
11395	11398	<>	<elision1>
11395	11405	<ypsilon2K>	<>
11395	11406	<ypsilon2L>	<>
11396	11397	<>	<aphaerese>
11396	11397	<>	<elision3>
11396	11397	<>	<elision2>
11396	11397	<>	<elision1>
11396	11400	<ypsilon2K>	<>
11396	11403	<ypsilon2L>	<>
11397	11398	<>	<aphaerese>
11397	11398	<>	<elision3>
11397	11398	<>	<elision2>
11397	11398	<>	<elision1>
11397	11401	<ypsilon2K>	<>
11397	11404	<ypsilon2L>	<>
11398	11396	<>	<name>
11398	11398	<>	<aphaerese>
11398	11398	<>	<elision3>
11398	11398	<>	<elision2>
11398	11398	<>	<elision1>
11398	11399	<ypsilon2K>	<>
11398	11402	<ypsilon2L>	<>
11399	11023	.	.
11399	11024	 	 
11399	11023	<~>	<~>
11399	11023	<split-s>	<split-s>
11399	11023	<split-h>	<split-h>
11399	11023	<name2>	<name2>
11399	11400	<>	<name>
11399	11027	<aphaerese>	<aphaerese>
11399	11399	<>	<aphaerese>
11399	11399	<>	<elision3>
11399	11399	<>	<elision2>
11399	11399	<>	<elision1>
11399	11031	.	υ
11399	11034	s	υ
11399	11031	.	u
11399	11034	s	u
11399	11037	.	κ
11399	11055	s	κ
11399	10772	s	k
11399	11097	s	U
11399	10805	s	K
11399	11031	.	α
11399	11125	s	α
11399	11031	.	a
11399	11125	s	a
11399	11128	s	A
11399	11131	s	λ
11399	10820	s	l
11399	10823	s	L
11400	11026	.	.
11400	11029	 	 
11400	11026	<~>	<~>
11400	11026	<split-s>	<split-s>
11400	11026	<split-h>	<split-h>
11400	11026	<name2>	<name2>
11400	11155	<aphaerese>	<aphaerese>
11400	11401	<>	<aphaerese>
11400	11401	<>	<elision3>
11400	11401	<>	<elision2>
11400	11401	<>	<elision1>
11400	11033	.	υ
11400	11036	s	υ
11400	11033	.	u
11400	11036	s	u
11400	11039	.	κ
11400	11057	s	κ
11400	10774	s	k
11400	11099	s	U
11400	10808	s	K
11400	11033	.	α
11400	11127	s	α
11400	11033	.	a
11400	11127	s	a
11400	11130	s	A
11400	11133	s	λ
11400	10822	s	l
11400	10825	s	L
11401	11023	.	.
11401	11024	 	 
11401	11023	<~>	<~>
11401	11023	<split-s>	<split-s>
11401	11023	<split-h>	<split-h>
11401	11023	<name2>	<name2>
11401	11027	<aphaerese>	<aphaerese>
11401	11399	<>	<aphaerese>
11401	11399	<>	<elision3>
11401	11399	<>	<elision2>
11401	11399	<>	<elision1>
11401	11031	.	υ
11401	11034	s	υ
11401	11031	.	u
11401	11034	s	u
11401	11037	.	κ
11401	11055	s	κ
11401	10772	s	k
11401	11097	s	U
11401	10805	s	K
11401	11031	.	α
11401	11125	s	α
11401	11031	.	a
11401	11125	s	a
11401	11128	s	A
11401	11131	s	λ
11401	10820	s	l
11401	10823	s	L
11402	11189	.	.
11402	11190	 	 
11402	11189	<~>	<~>
11402	11189	<split-s>	<split-s>
11402	11189	<split-h>	<split-h>
11402	11189	<name2>	<name2>
11402	11403	<>	<name>
11402	11193	<aphaerese>	<aphaerese>
11402	11402	<>	<aphaerese>
11402	11402	<>	<elision3>
11402	11402	<>	<elision2>
11402	11402	<>	<elision1>
11402	11197	.	υ
11402	11200	s	υ
11402	11197	.	u
11402	11200	s	u
11402	11203	.	κ
11402	11221	s	κ
11402	10956	s	k
11402	11246	s	U
11402	10974	s	K
11402	11197	.	α
11402	11271	s	α
11402	11197	.	a
11402	11271	s	a
11402	11274	s	A
11402	11277	s	λ
11402	10987	s	l
11402	10990	s	L
11402	10150	<1s>	<>
11403	11192	.	.
11403	11195	 	 
11403	11192	<~>	<~>
11403	11192	<split-s>	<split-s>
11403	11192	<split-h>	<split-h>
11403	11192	<name2>	<name2>
11403	11301	<aphaerese>	<aphaerese>
11403	11404	<>	<aphaerese>
11403	11404	<>	<elision3>
11403	11404	<>	<elision2>
11403	11404	<>	<elision1>
11403	11199	.	υ
11403	11202	s	υ
11403	11199	.	u
11403	11202	s	u
11403	11205	.	κ
11403	11223	s	κ
11403	10958	s	k
11403	11248	s	U
11403	10977	s	K
11403	11199	.	α
11403	11273	s	α
11403	11199	.	a
11403	11273	s	a
11403	11276	s	A
11403	11279	s	λ
11403	10989	s	l
11403	10992	s	L
11403	10151	<1s>	<>
11404	11189	.	.
11404	11190	 	 
11404	11189	<~>	<~>
11404	11189	<split-s>	<split-s>
11404	11189	<split-h>	<split-h>
11404	11189	<name2>	<name2>
11404	11193	<aphaerese>	<aphaerese>
11404	11402	<>	<aphaerese>
11404	11402	<>	<elision3>
11404	11402	<>	<elision2>
11404	11402	<>	<elision1>
11404	11197	.	υ
11404	11200	s	υ
11404	11197	.	u
11404	11200	s	u
11404	11203	.	κ
11404	11221	s	κ
11404	10956	s	k
11404	11246	s	U
11404	10974	s	K
11404	11197	.	α
11404	11271	s	α
11404	11197	.	a
11404	11271	s	a
11404	11274	s	A
11404	11277	s	λ
11404	10987	s	l
11404	10990	s	L
11404	10149	<1s>	<>
11405	11023	.	.
11405	11024	 	 
11405	11023	<~>	<~>
11405	11023	<split-s>	<split-s>
11405	11023	<split-h>	<split-h>
11405	11023	<name2>	<name2>
11405	11400	<>	<name>
11405	11027	<aphaerese>	<aphaerese>
11405	11399	<>	<aphaerese>
11405	11399	<>	<elision3>
11405	11399	<>	<elision2>
11405	11399	<>	<elision1>
11405	11031	.	υ
11405	11034	s	υ
11405	11031	.	u
11405	11034	s	u
11405	11037	.	κ
11405	11055	s	κ
11405	10772	s	k
11405	11031	.	α
11405	11125	s	α
11405	11031	.	a
11405	11125	s	a
11405	11131	s	λ
11405	10820	s	l
11406	11189	.	.
11406	11190	 	 
11406	11189	<~>	<~>
11406	11189	<split-s>	<split-s>
11406	11189	<split-h>	<split-h>
11406	11189	<name2>	<name2>
11406	11403	<>	<name>
11406	11193	<aphaerese>	<aphaerese>
11406	11402	<>	<aphaerese>
11406	11402	<>	<elision3>
11406	11402	<>	<elision2>
11406	11402	<>	<elision1>
11406	11197	.	υ
11406	11200	s	υ
11406	11197	.	u
11406	11200	s	u
11406	11203	.	κ
11406	11221	s	κ
11406	10956	s	k
11406	11197	.	α
11406	11271	s	α
11406	11197	.	a
11406	11271	s	a
11406	11277	s	λ
11406	10987	s	l
11406	11407	<1s>	<>
11407	71	.	.
11407	72	 	 
11407	71	<~>	<~>
11407	71	<split-s>	<split-s>
11407	71	<split-h>	<split-h>
11407	71	<name2>	<name2>
11407	10151	<>	<name>
11407	75	<aphaerese>	<aphaerese>
11407	10150	<>	<aphaerese>
11407	10150	<>	<elision3>
11407	10150	<>	<elision2>
11407	10150	<>	<elision1>
11407	9751	.	υ
11407	9751	.	u
11407	78	.	κ
11407	9751	.	α
11407	9751	.	a
11407	11408	<K>	<>
11408	9801	.	.
11408	9801	<~>	<~>
11408	9801	<split-s>	<split-s>
11408	9801	<split-h>	<split-h>
11408	9801	<name2>	<name2>
11408	10152	<>	<name>
11408	9804	<aphaerese>	<aphaerese>
11408	10154	<>	<aphaerese>
11408	10154	<>	<elision3>
11408	10154	<>	<elision2>
11408	10154	<>	<elision1>
11408	9800	.	υ
11408	9800	.	u
11408	9807	.	κ
11408	9800	.	α
11408	9800	.	a
11409	11410	<>	<name>
11409	11412	<>	<aphaerese>
11409	11412	<>	<elision3>
11409	11412	<>	<elision2>
11409	11412	<>	<elision1>
11409	11405	<u2K>	<>
11409	11406	<u2L>	<>
11410	11411	<>	<aphaerese>
11410	11411	<>	<elision3>
11410	11411	<>	<elision2>
11410	11411	<>	<elision1>
11410	11400	<u2K>	<>
11410	11403	<u2L>	<>
11411	11412	<>	<aphaerese>
11411	11412	<>	<elision3>
11411	11412	<>	<elision2>
11411	11412	<>	<elision1>
11411	11401	<u2K>	<>
11411	11404	<u2L>	<>
11412	11410	<>	<name>
11412	11412	<>	<aphaerese>
11412	11412	<>	<elision3>
11412	11412	<>	<elision2>
11412	11412	<>	<elision1>
11412	11399	<u2K>	<>
11412	11402	<u2L>	<>
11413	11019	<>	<name>
11413	11021	<>	<aphaerese>
11413	11021	<>	<elision3>
11413	11021	<>	<elision2>
11413	11021	<>	<elision1>
11413	11414	<kappa2K>	<>
11413	11415	<kappa2L>	<>
11413	11340	<lambda2L>	<>
11414	11023	.	.
11414	11024	 	 
11414	11023	<~>	<~>
11414	11023	<split-s>	<split-s>
11414	11023	<split-h>	<split-h>
11414	11023	<name2>	<name2>
11414	11158	<>	<name>
11414	11027	<aphaerese>	<aphaerese>
11414	11022	<>	<aphaerese>
11414	11160	<elision3>	<elision3>
11414	11022	<>	<elision3>
11414	11160	<elision2>	<elision2>
11414	11022	<>	<elision2>
11414	11160	<elision1>	<elision1>
11414	11022	<>	<elision1>
11414	11031	.	υ
11414	11034	s	υ
11414	11031	.	u
11414	11034	s	u
11414	55	s	κ
11414	10772	s	k
11414	11031	.	α
11414	11125	s	α
11414	11031	.	a
11414	11125	s	a
11414	55	s	λ
11414	10820	s	l
11415	11189	.	.
11415	11190	 	 
11415	11189	<~>	<~>
11415	11189	<split-s>	<split-s>
11415	11189	<split-h>	<split-h>
11415	11189	<name2>	<name2>
11415	11304	<>	<name>
11415	11193	<aphaerese>	<aphaerese>
11415	11188	<>	<aphaerese>
11415	11306	<elision3>	<elision3>
11415	11188	<>	<elision3>
11415	11306	<elision2>	<elision2>
11415	11188	<>	<elision2>
11415	11306	<elision1>	<elision1>
11415	11188	<>	<elision1>
11415	11197	.	υ
11415	11200	s	υ
11415	11197	.	u
11415	11200	s	u
11415	10831	s	κ
11415	10956	s	k
11415	11197	.	α
11415	11271	s	α
11415	11197	.	a
11415	11271	s	a
11415	10831	s	λ
11415	10987	s	l
11415	11344	<1s>	<>
11416	11347	<>	<name>
11416	11349	<>	<aphaerese>
11416	11349	<>	<elision3>
11416	11349	<>	<elision2>
11416	11349	<>	<elision1>
11416	11417	<k2K>	<>
11416	11418	<k2L>	<>
11416	11340	<l2L>	<>
11417	11023	.	.
11417	11024	 	 
11417	11023	<~>	<~>
11417	11023	<split-s>	<split-s>
11417	11023	<split-h>	<split-h>
11417	11023	<name2>	<name2>
11417	11351	<>	<name>
11417	11027	<aphaerese>	<aphaerese>
11417	11350	<>	<aphaerese>
11417	11023	<elision3>	<elision3>
11417	11350	<>	<elision3>
11417	11023	<elision2>	<elision2>
11417	11350	<>	<elision2>
11417	11023	<elision1>	<elision1>
11417	11350	<>	<elision1>
11417	11031	.	υ
11417	11034	s	υ
11417	11031	.	u
11417	11034	s	u
11417	55	s	κ
11417	10772	s	k
11417	11031	.	α
11417	11125	s	α
11417	11031	.	a
11417	11125	s	a
11417	55	s	λ
11417	10820	s	l
11418	11189	.	.
11418	11190	 	 
11418	11189	<~>	<~>
11418	11189	<split-s>	<split-s>
11418	11189	<split-h>	<split-h>
11418	11189	<name2>	<name2>
11418	11354	<>	<name>
11418	11193	<aphaerese>	<aphaerese>
11418	11353	<>	<aphaerese>
11418	11189	<elision3>	<elision3>
11418	11353	<>	<elision3>
11418	11189	<elision2>	<elision2>
11418	11353	<>	<elision2>
11418	11189	<elision1>	<elision1>
11418	11353	<>	<elision1>
11418	11197	.	υ
11418	11200	s	υ
11418	11197	.	u
11418	11200	s	u
11418	10831	s	κ
11418	10956	s	k
11418	11197	.	α
11418	11271	s	α
11418	11197	.	a
11418	11271	s	a
11418	10831	s	λ
11418	10987	s	l
11418	11357	<1s>	<>
11419	11420	<>	<name>
11419	11422	<>	<aphaerese>
11419	11422	<>	<elision3>
11419	11422	<>	<elision2>
11419	11422	<>	<elision1>
11419	11423	<alpha2L>	<>
11420	11421	<>	<aphaerese>
11420	11421	<>	<elision3>
11420	11421	<>	<elision2>
11420	11421	<>	<elision1>
11420	11403	<alpha2L>	<>
11421	11422	<>	<aphaerese>
11421	11422	<>	<elision3>
11421	11422	<>	<elision2>
11421	11422	<>	<elision1>
11421	11404	<alpha2L>	<>
11422	11420	<>	<name>
11422	11422	<>	<aphaerese>
11422	11422	<>	<elision3>
11422	11422	<>	<elision2>
11422	11422	<>	<elision1>
11422	11402	<alpha2L>	<>
11423	11189	.	.
11423	11190	 	 
11423	11189	<~>	<~>
11423	11189	<split-s>	<split-s>
11423	11189	<split-h>	<split-h>
11423	11189	<name2>	<name2>
11423	11403	<>	<name>
11423	11193	<aphaerese>	<aphaerese>
11423	11402	<>	<aphaerese>
11423	11402	<>	<elision3>
11423	11402	<>	<elision2>
11423	11402	<>	<elision1>
11423	11197	.	υ
11423	11200	s	υ
11423	11197	.	u
11423	11200	s	u
11423	11203	.	κ
11423	11221	s	κ
11423	10956	s	k
11423	11197	.	α
11423	11271	s	α
11423	11197	.	a
11423	11271	s	a
11423	11277	s	λ
11423	10987	s	l
11423	10150	<1s>	<>
11424	11425	<>	<name>
11424	11427	<>	<aphaerese>
11424	11427	<>	<elision3>
11424	11427	<>	<elision2>
11424	11427	<>	<elision1>
11424	11423	<a2L>	<>
11425	11426	<>	<aphaerese>
11425	11426	<>	<elision3>
11425	11426	<>	<elision2>
11425	11426	<>	<elision1>
11425	11403	<a2L>	<>
11426	11427	<>	<aphaerese>
11426	11427	<>	<elision3>
11426	11427	<>	<elision2>
11426	11427	<>	<elision1>
11426	11404	<a2L>	<>
11427	11425	<>	<name>
11427	11427	<>	<aphaerese>
11427	11427	<>	<elision3>
11427	11427	<>	<elision2>
11427	11427	<>	<elision1>
11427	11402	<a2L>	<>
11428	11374	<>	<name>
11428	11373	<>	<aphaerese>
11428	11373	<>	<elision3>
11428	11373	<>	<elision2>
11428	11373	<>	<elision1>
11428	11429	<lambda2L>	<>
11429	11189	.	.
11429	11190	 	 
11429	11189	<~>	<~>
11429	11189	<split-s>	<split-s>
11429	11189	<split-h>	<split-h>
11429	11189	<name2>	<name2>
11429	11378	<>	<name>
11429	11193	<aphaerese>	<aphaerese>
11429	11377	<>	<aphaerese>
11429	11189	<elision3>	<elision3>
11429	11377	<>	<elision3>
11429	11189	<elision2>	<elision2>
11429	11377	<>	<elision2>
11429	11189	<elision1>	<elision1>
11429	11377	<>	<elision1>
11429	11197	.	υ
11429	11200	s	υ
11429	11197	.	u
11429	11200	s	u
11429	11197	.	κ
11429	10831	s	κ
11429	10956	s	k
11429	11197	.	α
11429	11271	s	α
11429	11197	.	a
11429	11271	s	a
11429	11197	.	λ
11429	10831	s	λ
11429	10987	s	l
11429	10342	<1s>	<>
11430	11380	<>	<name>
11430	11379	<>	<aphaerese>
11430	11379	<>	<elision3>
11430	11379	<>	<elision2>
11430	11379	<>	<elision1>
11430	11429	<l2L>	<>
11431	11398	<>	<aphaerese>
11431	11398	<>	<elision3>
11431	11398	<>	<elision2>
11431	11398	<>	<elision1>
11431	11401	<ypsilon2K>	<>
11431	11432	<ypsilon2L>	<>
11432	11189	.	.
11432	11190	 	 
11432	11189	<~>	<~>
11432	11189	<split-s>	<split-s>
11432	11189	<split-h>	<split-h>
11432	11189	<name2>	<name2>
11432	11193	<aphaerese>	<aphaerese>
11432	11402	<>	<aphaerese>
11432	11402	<>	<elision3>
11432	11402	<>	<elision2>
11432	11402	<>	<elision1>
11432	11197	.	υ
11432	11200	s	υ
11432	11197	.	u
11432	11200	s	u
11432	11203	.	κ
11432	11221	s	κ
11432	10956	s	k
11432	11246	s	U
11432	10974	s	K
11432	11197	.	α
11432	11271	s	α
11432	11197	.	a
11432	11271	s	a
11432	11274	s	A
11432	11277	s	λ
11432	10987	s	l
11432	10990	s	L
11432	11433	<1s>	<>
11433	71	.	.
11433	72	 	 
11433	71	<~>	<~>
11433	71	<split-s>	<split-s>
11433	71	<split-h>	<split-h>
11433	71	<name2>	<name2>
11433	75	<aphaerese>	<aphaerese>
11433	10150	<>	<aphaerese>
11433	10150	<>	<elision3>
11433	10150	<>	<elision2>
11433	10150	<>	<elision1>
11433	9751	.	υ
11433	9751	.	u
11433	78	.	κ
11433	9751	.	α
11433	9751	.	a
11433	11434	<K>	<>
11434	9801	.	.
11434	9801	<~>	<~>
11434	9801	<split-s>	<split-s>
11434	9801	<split-h>	<split-h>
11434	9801	<name2>	<name2>
11434	9804	<aphaerese>	<aphaerese>
11434	10154	<>	<aphaerese>
11434	10154	<>	<elision3>
11434	10154	<>	<elision2>
11434	10154	<>	<elision1>
11434	9800	.	υ
11434	9800	.	u
11434	9807	.	κ
11434	9800	.	α
11434	9800	.	a
11435	11412	<>	<aphaerese>
11435	11412	<>	<elision3>
11435	11412	<>	<elision2>
11435	11412	<>	<elision1>
11435	11401	<u2K>	<>
11435	11432	<u2L>	<>
11436	11396	<>	<name>
11436	11398	<>	<aphaerese>
11436	11398	<>	<elision3>
11436	11398	<>	<elision2>
11436	11398	<>	<elision1>
11436	11399	<ypsilon2K>	<>
11436	11437	<ypsilon2L>	<>
11437	11189	.	.
11437	11190	 	 
11437	11189	<~>	<~>
11437	11189	<split-s>	<split-s>
11437	11189	<split-h>	<split-h>
11437	11189	<name2>	<name2>
11437	11403	<>	<name>
11437	11193	<aphaerese>	<aphaerese>
11437	11402	<>	<aphaerese>
11437	11402	<>	<elision3>
11437	11402	<>	<elision2>
11437	11402	<>	<elision1>
11437	11197	.	υ
11437	11200	s	υ
11437	11197	.	u
11437	11200	s	u
11437	11203	.	κ
11437	11221	s	κ
11437	10956	s	k
11437	11246	s	U
11437	10974	s	K
11437	11197	.	α
11437	11271	s	α
11437	11197	.	a
11437	11271	s	a
11437	11274	s	A
11437	11277	s	λ
11437	10987	s	l
11437	10990	s	L
11437	11407	<1s>	<>
11438	11410	<>	<name>
11438	11412	<>	<aphaerese>
11438	11412	<>	<elision3>
11438	11412	<>	<elision2>
11438	11412	<>	<elision1>
11438	11399	<u2K>	<>
11438	11437	<u2L>	<>
11439	11440	<>	<aphaerese>
11439	11444	<elision3>	<elision3>
11439	11440	<>	<elision3>
11439	11444	<elision2>	<elision2>
11439	11440	<>	<elision2>
11439	11444	<elision1>	<elision1>
11439	11440	<>	<elision1>
11440	11441	<>	<aphaerese>
11440	11442	<elision3>	<elision3>
11440	11441	<>	<elision3>
11440	11442	<elision2>	<elision2>
11440	11441	<>	<elision2>
11440	11442	<elision1>	<elision1>
11440	11441	<>	<elision1>
11441	11439	<>	<name>
11441	11441	<>	<aphaerese>
11441	11442	<elision3>	<elision3>
11441	11441	<>	<elision3>
11441	11442	<elision2>	<elision2>
11441	11441	<>	<elision2>
11441	11442	<elision1>	<elision1>
11441	11441	<>	<elision1>
11442	11442	.	.
11442	11442	<~>	<~>
11442	11442	<split-s>	<split-s>
11442	11442	<split-h>	<split-h>
11442	11442	<name2>	<name2>
11442	11443	<>	<name>
11442	11445	<aphaerese>	<aphaerese>
11442	11442	<>	<aphaerese>
11442	11442	<elision3>	<elision3>
11442	11442	<>	<elision3>
11442	11442	<elision2>	<elision2>
11442	11442	<>	<elision2>
11442	11442	<elision1>	<elision1>
11442	11442	<>	<elision1>
11442	11441	.	υ
11442	11566	H	υ
11442	11441	.	u
11442	11575	H	u
11442	11448	.	κ
11442	11490	H	κ
11442	11535	H	k
11442	11544	H	U
11442	11547	H	K
11442	11441	.	α
11442	11578	H	α
11442	11441	.	a
11442	11581	H	a
11442	11518	H	A
11442	11556	H	λ
11442	11562	H	l
11442	11565	H	L
11443	11444	.	.
11443	11444	<~>	<~>
11443	11444	<split-s>	<split-s>
11443	11444	<split-h>	<split-h>
11443	11444	<name2>	<name2>
11443	11447	<aphaerese>	<aphaerese>
11443	11444	<>	<aphaerese>
11443	11444	<elision3>	<elision3>
11443	11444	<>	<elision3>
11443	11444	<elision2>	<elision2>
11443	11444	<>	<elision2>
11443	11444	<elision1>	<elision1>
11443	11444	<>	<elision1>
11443	11440	.	υ
11443	11568	H	υ
11443	11440	.	u
11443	11577	H	u
11443	11450	.	κ
11443	11492	H	κ
11443	11537	H	k
11443	11546	H	U
11443	11550	H	K
11443	11440	.	α
11443	11580	H	α
11443	11440	.	a
11443	11583	H	a
11443	11520	H	A
11443	11558	H	λ
11443	11564	H	l
11443	11559	H	L
11444	11442	.	.
11444	11442	<~>	<~>
11444	11442	<split-s>	<split-s>
11444	11442	<split-h>	<split-h>
11444	11442	<name2>	<name2>
11444	11445	<aphaerese>	<aphaerese>
11444	11442	<>	<aphaerese>
11444	11442	<elision3>	<elision3>
11444	11442	<>	<elision3>
11444	11442	<elision2>	<elision2>
11444	11442	<>	<elision2>
11444	11442	<elision1>	<elision1>
11444	11442	<>	<elision1>
11444	11441	.	υ
11444	11566	H	υ
11444	11441	.	u
11444	11575	H	u
11444	11448	.	κ
11444	11490	H	κ
11444	11535	H	k
11444	11544	H	U
11444	11547	H	K
11444	11441	.	α
11444	11578	H	α
11444	11441	.	a
11444	11581	H	a
11444	11518	H	A
11444	11556	H	λ
11444	11562	H	l
11444	11565	H	L
11445	11442	.	.
11445	11442	<~>	<~>
11445	11442	<split-s>	<split-s>
11445	11442	<split-h>	<split-h>
11445	11442	<name2>	<name2>
11445	11446	<>	<name>
11445	11445	<aphaerese>	<aphaerese>
11445	11445	<>	<aphaerese>
11445	11442	<elision3>	<elision3>
11445	11445	<>	<elision3>
11445	11442	<elision2>	<elision2>
11445	11445	<>	<elision2>
11445	11442	<elision1>	<elision1>
11445	11445	<>	<elision1>
11445	11442	.	υ
11445	11442	.	u
11445	11448	.	κ
11445	11490	H	κ
11445	11535	H	k
11445	11544	H	U
11445	11547	H	K
11445	11442	.	α
11445	11442	.	a
11445	11518	H	A
11445	11556	H	λ
11445	11562	H	l
11445	11565	H	L
11446	11444	.	.
11446	11444	<~>	<~>
11446	11444	<split-s>	<split-s>
11446	11444	<split-h>	<split-h>
11446	11444	<name2>	<name2>
11446	11447	<aphaerese>	<aphaerese>
11446	11447	<>	<aphaerese>
11446	11444	<elision3>	<elision3>
11446	11447	<>	<elision3>
11446	11444	<elision2>	<elision2>
11446	11447	<>	<elision2>
11446	11444	<elision1>	<elision1>
11446	11447	<>	<elision1>
11446	11444	.	υ
11446	11444	.	u
11446	11450	.	κ
11446	11492	H	κ
11446	11537	H	k
11446	11546	H	U
11446	11550	H	K
11446	11444	.	α
11446	11444	.	a
11446	11520	H	A
11446	11558	H	λ
11446	11564	H	l
11446	11559	H	L
11447	11442	.	.
11447	11442	<~>	<~>
11447	11442	<split-s>	<split-s>
11447	11442	<split-h>	<split-h>
11447	11442	<name2>	<name2>
11447	11445	<aphaerese>	<aphaerese>
11447	11445	<>	<aphaerese>
11447	11442	<elision3>	<elision3>
11447	11445	<>	<elision3>
11447	11442	<elision2>	<elision2>
11447	11445	<>	<elision2>
11447	11442	<elision1>	<elision1>
11447	11445	<>	<elision1>
11447	11442	.	υ
11447	11442	.	u
11447	11448	.	κ
11447	11490	H	κ
11447	11535	H	k
11447	11544	H	U
11447	11547	H	K
11447	11442	.	α
11447	11442	.	a
11447	11518	H	A
11447	11556	H	λ
11447	11562	H	l
11447	11565	H	L
11448	11449	<>	<name>
11448	11448	<>	<aphaerese>
11448	11451	<elision3>	<elision3>
11448	11448	<>	<elision3>
11448	11451	<elision2>	<elision2>
11448	11448	<>	<elision2>
11448	11451	<elision1>	<elision1>
11448	11448	<>	<elision1>
11449	11450	<>	<aphaerese>
11449	11453	<elision3>	<elision3>
11449	11450	<>	<elision3>
11449	11453	<elision2>	<elision2>
11449	11450	<>	<elision2>
11449	11453	<elision1>	<elision1>
11449	11450	<>	<elision1>
11450	11448	<>	<aphaerese>
11450	11451	<elision3>	<elision3>
11450	11448	<>	<elision3>
11450	11451	<elision2>	<elision2>
11450	11448	<>	<elision2>
11450	11451	<elision1>	<elision1>
11450	11448	<>	<elision1>
11451	11452	<>	<name>
11451	11451	<>	<aphaerese>
11451	11451	<>	<elision3>
11451	11451	<>	<elision2>
11451	11451	<>	<elision1>
11451	11454	H	κ
11451	11478	H	k
11451	11481	H	K
11451	11484	H	λ
11451	11487	H	l
11451	11473	H	L
11452	11453	<>	<aphaerese>
11452	11453	<>	<elision3>
11452	11453	<>	<elision2>
11452	11453	<>	<elision1>
11452	11456	H	κ
11452	11480	H	k
11452	11483	H	K
11452	11486	H	λ
11452	11489	H	l
11452	11472	H	L
11453	11451	<>	<aphaerese>
11453	11451	<>	<elision3>
11453	11451	<>	<elision2>
11453	11451	<>	<elision1>
11453	11454	H	κ
11453	11478	H	k
11453	11481	H	K
11453	11484	H	λ
11453	11487	H	l
11453	11473	H	L
11454	11455	<>	<name>
11454	11454	<>	<aphaerese>
11454	11454	<>	<elision3>
11454	11454	<>	<elision2>
11454	11454	<>	<elision1>
11454	11458	<kappa2K>	<>
11454	11473	<kappa2L>	<>
11455	11456	<>	<aphaerese>
11455	11456	<>	<elision3>
11455	11456	<>	<elision2>
11455	11456	<>	<elision1>
11455	11459	<kappa2K>	<>
11455	11474	<kappa2L>	<>
11456	11454	<>	<aphaerese>
11456	11454	<>	<elision3>
11456	11454	<>	<elision2>
11456	11454	<>	<elision1>
11456	11457	<kappa2K>	<>
11456	11472	<kappa2L>	<>
11457	11458	<>	<aphaerese>
11457	11458	<>	<elision3>
11457	11458	<>	<elision2>
11457	11458	<>	<elision1>
11457	11461	s	κ
11457	11461	s	k
11457	11467	s	K
11457	11461	s	λ
11457	11461	s	l
11457	11470	s	L
11458	11459	<>	<name>
11458	11458	<>	<aphaerese>
11458	11458	<>	<elision3>
11458	11458	<>	<elision2>
11458	11458	<>	<elision1>
11458	11461	s	κ
11458	11461	s	k
11458	11467	s	K
11458	11461	s	λ
11458	11461	s	l
11458	11470	s	L
11459	11457	<>	<aphaerese>
11459	11457	<>	<elision3>
11459	11457	<>	<elision2>
11459	11457	<>	<elision1>
11459	11460	s	κ
11459	11460	s	k
11459	11466	s	K
11459	11460	s	λ
11459	11460	s	l
11459	11469	s	L
11460	11461	<>	<aphaerese>
11460	11461	<>	<elision3>
11460	11461	<>	<elision2>
11460	11461	<>	<elision1>
11460	11464	H	κ
11460	11464	H	k
11460	11464	H	K
11460	11464	H	λ
11460	11464	H	l
11460	11464	H	L
11461	11462	<>	<name>
11461	11461	<>	<aphaerese>
11461	11461	<>	<elision3>
11461	11461	<>	<elision2>
11461	11461	<>	<elision1>
11461	11464	H	κ
11461	11464	H	k
11461	11464	H	K
11461	11464	H	λ
11461	11464	H	l
11461	11464	H	L
11462	11460	<>	<aphaerese>
11462	11460	<>	<elision3>
11462	11460	<>	<elision2>
11462	11460	<>	<elision1>
11462	11463	H	κ
11462	11463	H	k
11462	11463	H	K
11462	11463	H	λ
11462	11463	H	l
11462	11463	H	L
11463	11464	<>	<aphaerese>
11463	11464	<>	<elision3>
11463	11464	<>	<elision2>
11463	11464	<>	<elision1>
11463	9826	<3k>	<>
11464	11465	<>	<name>
11464	11464	<>	<aphaerese>
11464	11464	<>	<elision3>
11464	11464	<>	<elision2>
11464	11464	<>	<elision1>
11464	9827	<3k>	<>
11465	11463	<>	<aphaerese>
11465	11463	<>	<elision3>
11465	11463	<>	<elision2>
11465	11463	<>	<elision1>
11465	9825	<3k>	<>
11466	11467	<>	<aphaerese>
11466	11467	<>	<elision3>
11466	11467	<>	<elision2>
11466	11467	<>	<elision1>
11466	11460	<K2kl>	<>
11467	11468	<>	<name>
11467	11467	<>	<aphaerese>
11467	11467	<>	<elision3>
11467	11467	<>	<elision2>
11467	11467	<>	<elision1>
11467	11461	<K2kl>	<>
11468	11466	<>	<aphaerese>
11468	11466	<>	<elision3>
11468	11466	<>	<elision2>
11468	11466	<>	<elision1>
11468	11462	<K2kl>	<>
11469	11470	<>	<aphaerese>
11469	11470	<>	<elision3>
11469	11470	<>	<elision2>
11469	11470	<>	<elision1>
11469	11460	<L2kl>	<>
11470	11471	<>	<name>
11470	11470	<>	<aphaerese>
11470	11470	<>	<elision3>
11470	11470	<>	<elision2>
11470	11470	<>	<elision1>
11470	11461	<L2kl>	<>
11471	11469	<>	<aphaerese>
11471	11469	<>	<elision3>
11471	11469	<>	<elision2>
11471	11469	<>	<elision1>
11471	11462	<L2kl>	<>
11472	11473	<>	<aphaerese>
11472	11473	<>	<elision3>
11472	11473	<>	<elision2>
11472	11473	<>	<elision1>
11472	11461	s	κ
11472	11476	H	κ
11472	11461	s	k
11472	11476	H	k
11472	11467	s	K
11472	11476	H	K
11472	11461	s	λ
11472	11476	H	λ
11472	11461	s	l
11472	11476	H	l
11472	11470	s	L
11472	11476	H	L
11473	11474	<>	<name>
11473	11473	<>	<aphaerese>
11473	11473	<>	<elision3>
11473	11473	<>	<elision2>
11473	11473	<>	<elision1>
11473	11461	s	κ
11473	11476	H	κ
11473	11461	s	k
11473	11476	H	k
11473	11467	s	K
11473	11476	H	K
11473	11461	s	λ
11473	11476	H	λ
11473	11461	s	l
11473	11476	H	l
11473	11470	s	L
11473	11476	H	L
11474	11472	<>	<aphaerese>
11474	11472	<>	<elision3>
11474	11472	<>	<elision2>
11474	11472	<>	<elision1>
11474	11460	s	κ
11474	11475	H	κ
11474	11460	s	k
11474	11475	H	k
11474	11466	s	K
11474	11475	H	K
11474	11460	s	λ
11474	11475	H	λ
11474	11460	s	l
11474	11475	H	l
11474	11469	s	L
11474	11475	H	L
11475	11476	<>	<aphaerese>
11475	11476	<>	<elision3>
11475	11476	<>	<elision2>
11475	11476	<>	<elision1>
11475	9826	<2k>	<>
11476	11477	<>	<name>
11476	11476	<>	<aphaerese>
11476	11476	<>	<elision3>
11476	11476	<>	<elision2>
11476	11476	<>	<elision1>
11476	9827	<2k>	<>
11477	11475	<>	<aphaerese>
11477	11475	<>	<elision3>
11477	11475	<>	<elision2>
11477	11475	<>	<elision1>
11477	9825	<2k>	<>
11478	11479	<>	<name>
11478	11478	<>	<aphaerese>
11478	11478	<>	<elision3>
11478	11478	<>	<elision2>
11478	11478	<>	<elision1>
11478	11458	<k2K>	<>
11478	11473	<k2L>	<>
11479	11480	<>	<aphaerese>
11479	11480	<>	<elision3>
11479	11480	<>	<elision2>
11479	11480	<>	<elision1>
11479	11459	<k2K>	<>
11479	11474	<k2L>	<>
11480	11478	<>	<aphaerese>
11480	11478	<>	<elision3>
11480	11478	<>	<elision2>
11480	11478	<>	<elision1>
11480	11457	<k2K>	<>
11480	11472	<k2L>	<>
11481	11482	<>	<name>
11481	11481	<>	<aphaerese>
11481	11481	<>	<elision3>
11481	11481	<>	<elision2>
11481	11481	<>	<elision1>
11481	11461	s	κ
11481	11461	s	k
11481	11467	s	K
11481	11461	s	λ
11481	11461	s	l
11481	11470	s	L
11481	11473	<K2L>	<>
11482	11483	<>	<aphaerese>
11482	11483	<>	<elision3>
11482	11483	<>	<elision2>
11482	11483	<>	<elision1>
11482	11460	s	κ
11482	11460	s	k
11482	11466	s	K
11482	11460	s	λ
11482	11460	s	l
11482	11469	s	L
11482	11474	<K2L>	<>
11483	11481	<>	<aphaerese>
11483	11481	<>	<elision3>
11483	11481	<>	<elision2>
11483	11481	<>	<elision1>
11483	11461	s	κ
11483	11461	s	k
11483	11467	s	K
11483	11461	s	λ
11483	11461	s	l
11483	11470	s	L
11483	11472	<K2L>	<>
11484	11485	<>	<name>
11484	11484	<>	<aphaerese>
11484	11484	<>	<elision3>
11484	11484	<>	<elision2>
11484	11484	<>	<elision1>
11484	11473	<lambda2L>	<>
11485	11486	<>	<aphaerese>
11485	11486	<>	<elision3>
11485	11486	<>	<elision2>
11485	11486	<>	<elision1>
11485	11474	<lambda2L>	<>
11486	11484	<>	<aphaerese>
11486	11484	<>	<elision3>
11486	11484	<>	<elision2>
11486	11484	<>	<elision1>
11486	11472	<lambda2L>	<>
11487	11488	<>	<name>
11487	11487	<>	<aphaerese>
11487	11487	<>	<elision3>
11487	11487	<>	<elision2>
11487	11487	<>	<elision1>
11487	11473	<l2L>	<>
11488	11489	<>	<aphaerese>
11488	11489	<>	<elision3>
11488	11489	<>	<elision2>
11488	11489	<>	<elision1>
11488	11474	<l2L>	<>
11489	11487	<>	<aphaerese>
11489	11487	<>	<elision3>
11489	11487	<>	<elision2>
11489	11487	<>	<elision1>
11489	11472	<l2L>	<>
11490	11491	<>	<name>
11490	11490	<>	<aphaerese>
11490	11490	<>	<elision3>
11490	11490	<>	<elision2>
11490	11490	<>	<elision1>
11490	11512	<kappa2K>	<>
11490	11527	<kappa2L>	<>
11490	11533	<lambda2L>	<>
11491	11492	<>	<aphaerese>
11491	11492	<>	<elision3>
11491	11492	<>	<elision2>
11491	11492	<>	<elision1>
11491	11513	<kappa2K>	<>
11491	11528	<kappa2L>	<>
11491	11534	<lambda2L>	<>
11492	11490	<>	<aphaerese>
11492	11490	<>	<elision3>
11492	11490	<>	<elision2>
11492	11490	<>	<elision1>
11492	11493	<kappa2K>	<>
11492	11517	<kappa2L>	<>
11492	11532	<lambda2L>	<>
11493	11494	.	.
11493	11494	<~>	<~>
11493	11494	<split-s>	<split-s>
11493	11494	<split-h>	<split-h>
11493	11494	<name2>	<name2>
11493	11497	<aphaerese>	<aphaerese>
11493	11512	<>	<aphaerese>
11493	11515	<elision3>	<elision3>
11493	11512	<>	<elision3>
11493	11515	<elision2>	<elision2>
11493	11512	<>	<elision2>
11493	11515	<elision1>	<elision1>
11493	11512	<>	<elision1>
11493	11509	.	υ
11493	11461	s	υ
11493	11509	.	u
11493	11461	s	u
11493	11461	s	κ
11493	11461	s	k
11493	11503	s	U
11493	11467	s	K
11493	11509	.	α
11493	11461	s	α
11493	11509	.	a
11493	11461	s	a
11493	11506	s	A
11493	11461	s	λ
11493	11461	s	l
11493	11470	s	L
11494	11494	.	.
11494	11494	<~>	<~>
11494	11494	<split-s>	<split-s>
11494	11494	<split-h>	<split-h>
11494	11494	<name2>	<name2>
11494	11495	<>	<name>
11494	11497	<aphaerese>	<aphaerese>
11494	11494	<>	<aphaerese>
11494	11494	<elision3>	<elision3>
11494	11494	<>	<elision3>
11494	11494	<elision2>	<elision2>
11494	11494	<>	<elision2>
11494	11494	<elision1>	<elision1>
11494	11494	<>	<elision1>
11494	11509	.	υ
11494	11461	s	υ
11494	11509	.	u
11494	11461	s	u
11494	11500	.	κ
11494	11461	s	κ
11494	11461	s	k
11494	11503	s	U
11494	11467	s	K
11494	11509	.	α
11494	11461	s	α
11494	11509	.	a
11494	11461	s	a
11494	11506	s	A
11494	11461	s	λ
11494	11461	s	l
11494	11470	s	L
11495	11496	.	.
11495	11496	<~>	<~>
11495	11496	<split-s>	<split-s>
11495	11496	<split-h>	<split-h>
11495	11496	<name2>	<name2>
11495	11499	<aphaerese>	<aphaerese>
11495	11496	<>	<aphaerese>
11495	11496	<elision3>	<elision3>
11495	11496	<>	<elision3>
11495	11496	<elision2>	<elision2>
11495	11496	<>	<elision2>
11495	11496	<elision1>	<elision1>
11495	11496	<>	<elision1>
11495	11511	.	υ
11495	11460	s	υ
11495	11511	.	u
11495	11460	s	u
11495	11502	.	κ
11495	11460	s	κ
11495	11460	s	k
11495	11505	s	U
11495	11466	s	K
11495	11511	.	α
11495	11460	s	α
11495	11511	.	a
11495	11460	s	a
11495	11508	s	A
11495	11460	s	λ
11495	11460	s	l
11495	11469	s	L
11496	11494	.	.
11496	11494	<~>	<~>
11496	11494	<split-s>	<split-s>
11496	11494	<split-h>	<split-h>
11496	11494	<name2>	<name2>
11496	11497	<aphaerese>	<aphaerese>
11496	11494	<>	<aphaerese>
11496	11494	<elision3>	<elision3>
11496	11494	<>	<elision3>
11496	11494	<elision2>	<elision2>
11496	11494	<>	<elision2>
11496	11494	<elision1>	<elision1>
11496	11494	<>	<elision1>
11496	11509	.	υ
11496	11461	s	υ
11496	11509	.	u
11496	11461	s	u
11496	11500	.	κ
11496	11461	s	κ
11496	11461	s	k
11496	11503	s	U
11496	11467	s	K
11496	11509	.	α
11496	11461	s	α
11496	11509	.	a
11496	11461	s	a
11496	11506	s	A
11496	11461	s	λ
11496	11461	s	l
11496	11470	s	L
11497	11494	.	.
11497	11494	<~>	<~>
11497	11494	<split-s>	<split-s>
11497	11494	<split-h>	<split-h>
11497	11494	<name2>	<name2>
11497	11498	<>	<name>
11497	11497	<aphaerese>	<aphaerese>
11497	11497	<>	<aphaerese>
11497	11494	<elision3>	<elision3>
11497	11497	<>	<elision3>
11497	11494	<elision2>	<elision2>
11497	11497	<>	<elision2>
11497	11494	<elision1>	<elision1>
11497	11497	<>	<elision1>
11497	11494	.	υ
11497	11494	.	u
11497	11500	.	κ
11497	11461	s	κ
11497	11461	s	k
11497	11503	s	U
11497	11467	s	K
11497	11494	.	α
11497	11494	.	a
11497	11506	s	A
11497	11461	s	λ
11497	11461	s	l
11497	11470	s	L
11498	11496	.	.
11498	11496	<~>	<~>
11498	11496	<split-s>	<split-s>
11498	11496	<split-h>	<split-h>
11498	11496	<name2>	<name2>
11498	11499	<aphaerese>	<aphaerese>
11498	11499	<>	<aphaerese>
11498	11496	<elision3>	<elision3>
11498	11499	<>	<elision3>
11498	11496	<elision2>	<elision2>
11498	11499	<>	<elision2>
11498	11496	<elision1>	<elision1>
11498	11499	<>	<elision1>
11498	11496	.	υ
11498	11496	.	u
11498	11502	.	κ
11498	11460	s	κ
11498	11460	s	k
11498	11505	s	U
11498	11466	s	K
11498	11496	.	α
11498	11496	.	a
11498	11508	s	A
11498	11460	s	λ
11498	11460	s	l
11498	11469	s	L
11499	11494	.	.
11499	11494	<~>	<~>
11499	11494	<split-s>	<split-s>
11499	11494	<split-h>	<split-h>
11499	11494	<name2>	<name2>
11499	11497	<aphaerese>	<aphaerese>
11499	11497	<>	<aphaerese>
11499	11494	<elision3>	<elision3>
11499	11497	<>	<elision3>
11499	11494	<elision2>	<elision2>
11499	11497	<>	<elision2>
11499	11494	<elision1>	<elision1>
11499	11497	<>	<elision1>
11499	11494	.	υ
11499	11494	.	u
11499	11500	.	κ
11499	11461	s	κ
11499	11461	s	k
11499	11503	s	U
11499	11467	s	K
11499	11494	.	α
11499	11494	.	a
11499	11506	s	A
11499	11461	s	λ
11499	11461	s	l
11499	11470	s	L
11500	11501	<>	<name>
11500	11500	<>	<aphaerese>
11500	11458	<elision3>	<elision3>
11500	11500	<>	<elision3>
11500	11458	<elision2>	<elision2>
11500	11500	<>	<elision2>
11500	11458	<elision1>	<elision1>
11500	11500	<>	<elision1>
11501	11502	<>	<aphaerese>
11501	11457	<elision3>	<elision3>
11501	11502	<>	<elision3>
11501	11457	<elision2>	<elision2>
11501	11502	<>	<elision2>
11501	11457	<elision1>	<elision1>
11501	11502	<>	<elision1>
11502	11500	<>	<aphaerese>
11502	11458	<elision3>	<elision3>
11502	11500	<>	<elision3>
11502	11458	<elision2>	<elision2>
11502	11500	<>	<elision2>
11502	11458	<elision1>	<elision1>
11502	11500	<>	<elision1>
11503	11504	<>	<name>
11503	11503	<>	<aphaerese>
11503	11503	<>	<elision3>
11503	11503	<>	<elision2>
11503	11503	<>	<elision1>
11503	11461	<U2kl>	<>
11504	11505	<>	<aphaerese>
11504	11505	<>	<elision3>
11504	11505	<>	<elision2>
11504	11505	<>	<elision1>
11504	11462	<U2kl>	<>
11505	11503	<>	<aphaerese>
11505	11503	<>	<elision3>
11505	11503	<>	<elision2>
11505	11503	<>	<elision1>
11505	11460	<U2kl>	<>
11506	11507	<>	<name>
11506	11506	<>	<aphaerese>
11506	11506	<>	<elision3>
11506	11506	<>	<elision2>
11506	11506	<>	<elision1>
11506	11461	<A2kl>	<>
11507	11508	<>	<aphaerese>
11507	11508	<>	<elision3>
11507	11508	<>	<elision2>
11507	11508	<>	<elision1>
11507	11462	<A2kl>	<>
11508	11506	<>	<aphaerese>
11508	11506	<>	<elision3>
11508	11506	<>	<elision2>
11508	11506	<>	<elision1>
11508	11460	<A2kl>	<>
11509	11510	<>	<name>
11509	11509	<>	<aphaerese>
11509	11494	<elision3>	<elision3>
11509	11509	<>	<elision3>
11509	11494	<elision2>	<elision2>
11509	11509	<>	<elision2>
11509	11494	<elision1>	<elision1>
11509	11509	<>	<elision1>
11510	11511	<>	<aphaerese>
11510	11496	<elision3>	<elision3>
11510	11511	<>	<elision3>
11510	11496	<elision2>	<elision2>
11510	11511	<>	<elision2>
11510	11496	<elision1>	<elision1>
11510	11511	<>	<elision1>
11511	11509	<>	<aphaerese>
11511	11494	<elision3>	<elision3>
11511	11509	<>	<elision3>
11511	11494	<elision2>	<elision2>
11511	11509	<>	<elision2>
11511	11494	<elision1>	<elision1>
11511	11509	<>	<elision1>
11512	11494	.	.
11512	11494	<~>	<~>
11512	11494	<split-s>	<split-s>
11512	11494	<split-h>	<split-h>
11512	11494	<name2>	<name2>
11512	11513	<>	<name>
11512	11497	<aphaerese>	<aphaerese>
11512	11512	<>	<aphaerese>
11512	11515	<elision3>	<elision3>
11512	11512	<>	<elision3>
11512	11515	<elision2>	<elision2>
11512	11512	<>	<elision2>
11512	11515	<elision1>	<elision1>
11512	11512	<>	<elision1>
11512	11509	.	υ
11512	11461	s	υ
11512	11509	.	u
11512	11461	s	u
11512	11461	s	κ
11512	11461	s	k
11512	11503	s	U
11512	11467	s	K
11512	11509	.	α
11512	11461	s	α
11512	11509	.	a
11512	11461	s	a
11512	11506	s	A
11512	11461	s	λ
11512	11461	s	l
11512	11470	s	L
11513	11496	.	.
11513	11496	<~>	<~>
11513	11496	<split-s>	<split-s>
11513	11496	<split-h>	<split-h>
11513	11496	<name2>	<name2>
11513	11499	<aphaerese>	<aphaerese>
11513	11493	<>	<aphaerese>
11513	11514	<elision3>	<elision3>
11513	11493	<>	<elision3>
11513	11514	<elision2>	<elision2>
11513	11493	<>	<elision2>
11513	11514	<elision1>	<elision1>
11513	11493	<>	<elision1>
11513	11511	.	υ
11513	11460	s	υ
11513	11511	.	u
11513	11460	s	u
11513	11460	s	κ
11513	11460	s	k
11513	11505	s	U
11513	11466	s	K
11513	11511	.	α
11513	11460	s	α
11513	11511	.	a
11513	11460	s	a
11513	11508	s	A
11513	11460	s	λ
11513	11460	s	l
11513	11469	s	L
11514	11494	.	.
11514	11494	<~>	<~>
11514	11494	<split-s>	<split-s>
11514	11494	<split-h>	<split-h>
11514	11494	<name2>	<name2>
11514	11497	<aphaerese>	<aphaerese>
11514	11515	<>	<aphaerese>
11514	11494	<elision3>	<elision3>
11514	11515	<>	<elision3>
11514	11494	<elision2>	<elision2>
11514	11515	<>	<elision2>
11514	11494	<elision1>	<elision1>
11514	11515	<>	<elision1>
11514	11509	.	υ
11514	11461	s	υ
11514	11509	.	u
11514	11461	s	u
11514	11500	.	κ
11514	11503	s	U
11514	11509	.	α
11514	11461	s	α
11514	11509	.	a
11514	11461	s	a
11514	11506	s	A
11515	11494	.	.
11515	11494	<~>	<~>
11515	11494	<split-s>	<split-s>
11515	11494	<split-h>	<split-h>
11515	11494	<name2>	<name2>
11515	11516	<>	<name>
11515	11497	<aphaerese>	<aphaerese>
11515	11515	<>	<aphaerese>
11515	11494	<elision3>	<elision3>
11515	11515	<>	<elision3>
11515	11494	<elision2>	<elision2>
11515	11515	<>	<elision2>
11515	11494	<elision1>	<elision1>
11515	11515	<>	<elision1>
11515	11509	.	υ
11515	11461	s	υ
11515	11509	.	u
11515	11461	s	u
11515	11500	.	κ
11515	11503	s	U
11515	11509	.	α
11515	11461	s	α
11515	11509	.	a
11515	11461	s	a
11515	11506	s	A
11516	11496	.	.
11516	11496	<~>	<~>
11516	11496	<split-s>	<split-s>
11516	11496	<split-h>	<split-h>
11516	11496	<name2>	<name2>
11516	11499	<aphaerese>	<aphaerese>
11516	11514	<>	<aphaerese>
11516	11496	<elision3>	<elision3>
11516	11514	<>	<elision3>
11516	11496	<elision2>	<elision2>
11516	11514	<>	<elision2>
11516	11496	<elision1>	<elision1>
11516	11514	<>	<elision1>
11516	11511	.	υ
11516	11460	s	υ
11516	11511	.	u
11516	11460	s	u
11516	11502	.	κ
11516	11505	s	U
11516	11511	.	α
11516	11460	s	α
11516	11511	.	a
11516	11460	s	a
11516	11508	s	A
11517	11518	.	.
11517	11518	<~>	<~>
11517	11518	<split-s>	<split-s>
11517	11518	<split-h>	<split-h>
11517	11518	<name2>	<name2>
11517	11521	<aphaerese>	<aphaerese>
11517	11527	<>	<aphaerese>
11517	11530	<elision3>	<elision3>
11517	11527	<>	<elision3>
11517	11530	<elision2>	<elision2>
11517	11527	<>	<elision2>
11517	11530	<elision1>	<elision1>
11517	11527	<>	<elision1>
11517	11524	.	υ
11517	11461	s	υ
11517	11524	.	u
11517	11461	s	u
11517	11461	s	κ
11517	11476	H	κ
11517	11461	s	k
11517	11476	H	k
11517	11503	s	U
11517	11467	s	K
11517	11476	H	K
11517	11524	.	α
11517	11461	s	α
11517	11524	.	a
11517	11461	s	a
11517	11506	s	A
11517	11461	s	λ
11517	11476	H	λ
11517	11461	s	l
11517	11476	H	l
11517	11470	s	L
11517	11476	H	L
11518	11518	.	.
11518	11518	<~>	<~>
11518	11518	<split-s>	<split-s>
11518	11518	<split-h>	<split-h>
11518	11518	<name2>	<name2>
11518	11519	<>	<name>
11518	11521	<aphaerese>	<aphaerese>
11518	11518	<>	<aphaerese>
11518	11518	<elision3>	<elision3>
11518	11518	<>	<elision3>
11518	11518	<elision2>	<elision2>
11518	11518	<>	<elision2>
11518	11518	<elision1>	<elision1>
11518	11518	<>	<elision1>
11518	11524	.	υ
11518	11461	s	υ
11518	11524	.	u
11518	11461	s	u
11518	11500	.	κ
11518	11461	s	κ
11518	11476	H	κ
11518	11461	s	k
11518	11476	H	k
11518	11503	s	U
11518	11467	s	K
11518	11476	H	K
11518	11524	.	α
11518	11461	s	α
11518	11524	.	a
11518	11461	s	a
11518	11506	s	A
11518	11461	s	λ
11518	11476	H	λ
11518	11461	s	l
11518	11476	H	l
11518	11470	s	L
11518	11476	H	L
11519	11520	.	.
11519	11520	<~>	<~>
11519	11520	<split-s>	<split-s>
11519	11520	<split-h>	<split-h>
11519	11520	<name2>	<name2>
11519	11523	<aphaerese>	<aphaerese>
11519	11520	<>	<aphaerese>
11519	11520	<elision3>	<elision3>
11519	11520	<>	<elision3>
11519	11520	<elision2>	<elision2>
11519	11520	<>	<elision2>
11519	11520	<elision1>	<elision1>
11519	11520	<>	<elision1>
11519	11526	.	υ
11519	11460	s	υ
11519	11526	.	u
11519	11460	s	u
11519	11502	.	κ
11519	11460	s	κ
11519	11475	H	κ
11519	11460	s	k
11519	11475	H	k
11519	11505	s	U
11519	11466	s	K
11519	11475	H	K
11519	11526	.	α
11519	11460	s	α
11519	11526	.	a
11519	11460	s	a
11519	11508	s	A
11519	11460	s	λ
11519	11475	H	λ
11519	11460	s	l
11519	11475	H	l
11519	11469	s	L
11519	11475	H	L
11520	11518	.	.
11520	11518	<~>	<~>
11520	11518	<split-s>	<split-s>
11520	11518	<split-h>	<split-h>
11520	11518	<name2>	<name2>
11520	11521	<aphaerese>	<aphaerese>
11520	11518	<>	<aphaerese>
11520	11518	<elision3>	<elision3>
11520	11518	<>	<elision3>
11520	11518	<elision2>	<elision2>
11520	11518	<>	<elision2>
11520	11518	<elision1>	<elision1>
11520	11518	<>	<elision1>
11520	11524	.	υ
11520	11461	s	υ
11520	11524	.	u
11520	11461	s	u
11520	11500	.	κ
11520	11461	s	κ
11520	11476	H	κ
11520	11461	s	k
11520	11476	H	k
11520	11503	s	U
11520	11467	s	K
11520	11476	H	K
11520	11524	.	α
11520	11461	s	α
11520	11524	.	a
11520	11461	s	a
11520	11506	s	A
11520	11461	s	λ
11520	11476	H	λ
11520	11461	s	l
11520	11476	H	l
11520	11470	s	L
11520	11476	H	L
11521	11518	.	.
11521	11518	<~>	<~>
11521	11518	<split-s>	<split-s>
11521	11518	<split-h>	<split-h>
11521	11518	<name2>	<name2>
11521	11522	<>	<name>
11521	11521	<aphaerese>	<aphaerese>
11521	11521	<>	<aphaerese>
11521	11518	<elision3>	<elision3>
11521	11521	<>	<elision3>
11521	11518	<elision2>	<elision2>
11521	11521	<>	<elision2>
11521	11518	<elision1>	<elision1>
11521	11521	<>	<elision1>
11521	11518	.	υ
11521	11518	.	u
11521	11500	.	κ
11521	11461	s	κ
11521	11476	H	κ
11521	11461	s	k
11521	11476	H	k
11521	11503	s	U
11521	11467	s	K
11521	11476	H	K
11521	11518	.	α
11521	11518	.	a
11521	11506	s	A
11521	11461	s	λ
11521	11476	H	λ
11521	11461	s	l
11521	11476	H	l
11521	11470	s	L
11521	11476	H	L
11522	11520	.	.
11522	11520	<~>	<~>
11522	11520	<split-s>	<split-s>
11522	11520	<split-h>	<split-h>
11522	11520	<name2>	<name2>
11522	11523	<aphaerese>	<aphaerese>
11522	11523	<>	<aphaerese>
11522	11520	<elision3>	<elision3>
11522	11523	<>	<elision3>
11522	11520	<elision2>	<elision2>
11522	11523	<>	<elision2>
11522	11520	<elision1>	<elision1>
11522	11523	<>	<elision1>
11522	11520	.	υ
11522	11520	.	u
11522	11502	.	κ
11522	11460	s	κ
11522	11475	H	κ
11522	11460	s	k
11522	11475	H	k
11522	11505	s	U
11522	11466	s	K
11522	11475	H	K
11522	11520	.	α
11522	11520	.	a
11522	11508	s	A
11522	11460	s	λ
11522	11475	H	λ
11522	11460	s	l
11522	11475	H	l
11522	11469	s	L
11522	11475	H	L
11523	11518	.	.
11523	11518	<~>	<~>
11523	11518	<split-s>	<split-s>
11523	11518	<split-h>	<split-h>
11523	11518	<name2>	<name2>
11523	11521	<aphaerese>	<aphaerese>
11523	11521	<>	<aphaerese>
11523	11518	<elision3>	<elision3>
11523	11521	<>	<elision3>
11523	11518	<elision2>	<elision2>
11523	11521	<>	<elision2>
11523	11518	<elision1>	<elision1>
11523	11521	<>	<elision1>
11523	11518	.	υ
11523	11518	.	u
11523	11500	.	κ
11523	11461	s	κ
11523	11476	H	κ
11523	11461	s	k
11523	11476	H	k
11523	11503	s	U
11523	11467	s	K
11523	11476	H	K
11523	11518	.	α
11523	11518	.	a
11523	11506	s	A
11523	11461	s	λ
11523	11476	H	λ
11523	11461	s	l
11523	11476	H	l
11523	11470	s	L
11523	11476	H	L
11524	11525	<>	<name>
11524	11524	<>	<aphaerese>
11524	11518	<elision3>	<elision3>
11524	11524	<>	<elision3>
11524	11518	<elision2>	<elision2>
11524	11524	<>	<elision2>
11524	11518	<elision1>	<elision1>
11524	11524	<>	<elision1>
11525	11526	<>	<aphaerese>
11525	11520	<elision3>	<elision3>
11525	11526	<>	<elision3>
11525	11520	<elision2>	<elision2>
11525	11526	<>	<elision2>
11525	11520	<elision1>	<elision1>
11525	11526	<>	<elision1>
11526	11524	<>	<aphaerese>
11526	11518	<elision3>	<elision3>
11526	11524	<>	<elision3>
11526	11518	<elision2>	<elision2>
11526	11524	<>	<elision2>
11526	11518	<elision1>	<elision1>
11526	11524	<>	<elision1>
11527	11518	.	.
11527	11518	<~>	<~>
11527	11518	<split-s>	<split-s>
11527	11518	<split-h>	<split-h>
11527	11518	<name2>	<name2>
11527	11528	<>	<name>
11527	11521	<aphaerese>	<aphaerese>
11527	11527	<>	<aphaerese>
11527	11530	<elision3>	<elision3>
11527	11527	<>	<elision3>
11527	11530	<elision2>	<elision2>
11527	11527	<>	<elision2>
11527	11530	<elision1>	<elision1>
11527	11527	<>	<elision1>
11527	11524	.	υ
11527	11461	s	υ
11527	11524	.	u
11527	11461	s	u
11527	11461	s	κ
11527	11476	H	κ
11527	11461	s	k
11527	11476	H	k
11527	11503	s	U
11527	11467	s	K
11527	11476	H	K
11527	11524	.	α
11527	11461	s	α
11527	11524	.	a
11527	11461	s	a
11527	11506	s	A
11527	11461	s	λ
11527	11476	H	λ
11527	11461	s	l
11527	11476	H	l
11527	11470	s	L
11527	11476	H	L
11528	11520	.	.
11528	11520	<~>	<~>
11528	11520	<split-s>	<split-s>
11528	11520	<split-h>	<split-h>
11528	11520	<name2>	<name2>
11528	11523	<aphaerese>	<aphaerese>
11528	11517	<>	<aphaerese>
11528	11529	<elision3>	<elision3>
11528	11517	<>	<elision3>
11528	11529	<elision2>	<elision2>
11528	11517	<>	<elision2>
11528	11529	<elision1>	<elision1>
11528	11517	<>	<elision1>
11528	11526	.	υ
11528	11460	s	υ
11528	11526	.	u
11528	11460	s	u
11528	11460	s	κ
11528	11475	H	κ
11528	11460	s	k
11528	11475	H	k
11528	11505	s	U
11528	11466	s	K
11528	11475	H	K
11528	11526	.	α
11528	11460	s	α
11528	11526	.	a
11528	11460	s	a
11528	11508	s	A
11528	11460	s	λ
11528	11475	H	λ
11528	11460	s	l
11528	11475	H	l
11528	11469	s	L
11528	11475	H	L
11529	11518	.	.
11529	11518	<~>	<~>
11529	11518	<split-s>	<split-s>
11529	11518	<split-h>	<split-h>
11529	11518	<name2>	<name2>
11529	11521	<aphaerese>	<aphaerese>
11529	11530	<>	<aphaerese>
11529	11518	<elision3>	<elision3>
11529	11530	<>	<elision3>
11529	11518	<elision2>	<elision2>
11529	11530	<>	<elision2>
11529	11518	<elision1>	<elision1>
11529	11530	<>	<elision1>
11529	11524	.	υ
11529	11461	s	υ
11529	11524	.	u
11529	11461	s	u
11529	11500	.	κ
11529	11476	H	κ
11529	11476	H	k
11529	11503	s	U
11529	11476	H	K
11529	11524	.	α
11529	11461	s	α
11529	11524	.	a
11529	11461	s	a
11529	11506	s	A
11529	11476	H	λ
11529	11476	H	l
11529	11476	H	L
11530	11518	.	.
11530	11518	<~>	<~>
11530	11518	<split-s>	<split-s>
11530	11518	<split-h>	<split-h>
11530	11518	<name2>	<name2>
11530	11531	<>	<name>
11530	11521	<aphaerese>	<aphaerese>
11530	11530	<>	<aphaerese>
11530	11518	<elision3>	<elision3>
11530	11530	<>	<elision3>
11530	11518	<elision2>	<elision2>
11530	11530	<>	<elision2>
11530	11518	<elision1>	<elision1>
11530	11530	<>	<elision1>
11530	11524	.	υ
11530	11461	s	υ
11530	11524	.	u
11530	11461	s	u
11530	11500	.	κ
11530	11476	H	κ
11530	11476	H	k
11530	11503	s	U
11530	11476	H	K
11530	11524	.	α
11530	11461	s	α
11530	11524	.	a
11530	11461	s	a
11530	11506	s	A
11530	11476	H	λ
11530	11476	H	l
11530	11476	H	L
11531	11520	.	.
11531	11520	<~>	<~>
11531	11520	<split-s>	<split-s>
11531	11520	<split-h>	<split-h>
11531	11520	<name2>	<name2>
11531	11523	<aphaerese>	<aphaerese>
11531	11529	<>	<aphaerese>
11531	11520	<elision3>	<elision3>
11531	11529	<>	<elision3>
11531	11520	<elision2>	<elision2>
11531	11529	<>	<elision2>
11531	11520	<elision1>	<elision1>
11531	11529	<>	<elision1>
11531	11526	.	υ
11531	11460	s	υ
11531	11526	.	u
11531	11460	s	u
11531	11502	.	κ
11531	11475	H	κ
11531	11475	H	k
11531	11505	s	U
11531	11475	H	K
11531	11526	.	α
11531	11460	s	α
11531	11526	.	a
11531	11460	s	a
11531	11508	s	A
11531	11475	H	λ
11531	11475	H	l
11531	11475	H	L
11532	11533	<>	<aphaerese>
11532	11533	<>	<elision3>
11532	11533	<>	<elision2>
11532	11533	<>	<elision1>
11532	11524	.	κ
11532	11524	.	λ
11533	11534	<>	<name>
11533	11533	<>	<aphaerese>
11533	11533	<>	<elision3>
11533	11533	<>	<elision2>
11533	11533	<>	<elision1>
11533	11524	.	κ
11533	11524	.	λ
11534	11532	<>	<aphaerese>
11534	11532	<>	<elision3>
11534	11532	<>	<elision2>
11534	11532	<>	<elision1>
11534	11526	.	κ
11534	11526	.	λ
11535	11536	<>	<name>
11535	11535	<>	<aphaerese>
11535	11535	<>	<elision3>
11535	11535	<>	<elision2>
11535	11535	<>	<elision1>
11535	11539	<k2K>	<>
11535	11542	<k2L>	<>
11535	11533	<l2L>	<>
11536	11537	<>	<aphaerese>
11536	11537	<>	<elision3>
11536	11537	<>	<elision2>
11536	11537	<>	<elision1>
11536	11540	<k2K>	<>
11536	11543	<k2L>	<>
11536	11534	<l2L>	<>
11537	11535	<>	<aphaerese>
11537	11535	<>	<elision3>
11537	11535	<>	<elision2>
11537	11535	<>	<elision1>
11537	11538	<k2K>	<>
11537	11541	<k2L>	<>
11537	11532	<l2L>	<>
11538	11494	.	.
11538	11494	<~>	<~>
11538	11494	<split-s>	<split-s>
11538	11494	<split-h>	<split-h>
11538	11494	<name2>	<name2>
11538	11497	<aphaerese>	<aphaerese>
11538	11539	<>	<aphaerese>
11538	11494	<elision3>	<elision3>
11538	11539	<>	<elision3>
11538	11494	<elision2>	<elision2>
11538	11539	<>	<elision2>
11538	11494	<elision1>	<elision1>
11538	11539	<>	<elision1>
11538	11509	.	υ
11538	11461	s	υ
11538	11509	.	u
11538	11461	s	u
11538	11461	s	κ
11538	11461	s	k
11538	11503	s	U
11538	11467	s	K
11538	11509	.	α
11538	11461	s	α
11538	11509	.	a
11538	11461	s	a
11538	11506	s	A
11538	11461	s	λ
11538	11461	s	l
11538	11470	s	L
11539	11494	.	.
11539	11494	<~>	<~>
11539	11494	<split-s>	<split-s>
11539	11494	<split-h>	<split-h>
11539	11494	<name2>	<name2>
11539	11540	<>	<name>
11539	11497	<aphaerese>	<aphaerese>
11539	11539	<>	<aphaerese>
11539	11494	<elision3>	<elision3>
11539	11539	<>	<elision3>
11539	11494	<elision2>	<elision2>
11539	11539	<>	<elision2>
11539	11494	<elision1>	<elision1>
11539	11539	<>	<elision1>
11539	11509	.	υ
11539	11461	s	υ
11539	11509	.	u
11539	11461	s	u
11539	11461	s	κ
11539	11461	s	k
11539	11503	s	U
11539	11467	s	K
11539	11509	.	α
11539	11461	s	α
11539	11509	.	a
11539	11461	s	a
11539	11506	s	A
11539	11461	s	λ
11539	11461	s	l
11539	11470	s	L
11540	11496	.	.
11540	11496	<~>	<~>
11540	11496	<split-s>	<split-s>
11540	11496	<split-h>	<split-h>
11540	11496	<name2>	<name2>
11540	11499	<aphaerese>	<aphaerese>
11540	11538	<>	<aphaerese>
11540	11496	<elision3>	<elision3>
11540	11538	<>	<elision3>
11540	11496	<elision2>	<elision2>
11540	11538	<>	<elision2>
11540	11496	<elision1>	<elision1>
11540	11538	<>	<elision1>
11540	11511	.	υ
11540	11460	s	υ
11540	11511	.	u
11540	11460	s	u
11540	11460	s	κ
11540	11460	s	k
11540	11505	s	U
11540	11466	s	K
11540	11511	.	α
11540	11460	s	α
11540	11511	.	a
11540	11460	s	a
11540	11508	s	A
11540	11460	s	λ
11540	11460	s	l
11540	11469	s	L
11541	11518	.	.
11541	11518	<~>	<~>
11541	11518	<split-s>	<split-s>
11541	11518	<split-h>	<split-h>
11541	11518	<name2>	<name2>
11541	11521	<aphaerese>	<aphaerese>
11541	11542	<>	<aphaerese>
11541	11518	<elision3>	<elision3>
11541	11542	<>	<elision3>
11541	11518	<elision2>	<elision2>
11541	11542	<>	<elision2>
11541	11518	<elision1>	<elision1>
11541	11542	<>	<elision1>
11541	11524	.	υ
11541	11461	s	υ
11541	11524	.	u
11541	11461	s	u
11541	11461	s	κ
11541	11476	H	κ
11541	11461	s	k
11541	11476	H	k
11541	11503	s	U
11541	11467	s	K
11541	11476	H	K
11541	11524	.	α
11541	11461	s	α
11541	11524	.	a
11541	11461	s	a
11541	11506	s	A
11541	11461	s	λ
11541	11476	H	λ
11541	11461	s	l
11541	11476	H	l
11541	11470	s	L
11541	11476	H	L
11542	11518	.	.
11542	11518	<~>	<~>
11542	11518	<split-s>	<split-s>
11542	11518	<split-h>	<split-h>
11542	11518	<name2>	<name2>
11542	11543	<>	<name>
11542	11521	<aphaerese>	<aphaerese>
11542	11542	<>	<aphaerese>
11542	11518	<elision3>	<elision3>
11542	11542	<>	<elision3>
11542	11518	<elision2>	<elision2>
11542	11542	<>	<elision2>
11542	11518	<elision1>	<elision1>
11542	11542	<>	<elision1>
11542	11524	.	υ
11542	11461	s	υ
11542	11524	.	u
11542	11461	s	u
11542	11461	s	κ
11542	11476	H	κ
11542	11461	s	k
11542	11476	H	k
11542	11503	s	U
11542	11467	s	K
11542	11476	H	K
11542	11524	.	α
11542	11461	s	α
11542	11524	.	a
11542	11461	s	a
11542	11506	s	A
11542	11461	s	λ
11542	11476	H	λ
11542	11461	s	l
11542	11476	H	l
11542	11470	s	L
11542	11476	H	L
11543	11520	.	.
11543	11520	<~>	<~>
11543	11520	<split-s>	<split-s>
11543	11520	<split-h>	<split-h>
11543	11520	<name2>	<name2>
11543	11523	<aphaerese>	<aphaerese>
11543	11541	<>	<aphaerese>
11543	11520	<elision3>	<elision3>
11543	11541	<>	<elision3>
11543	11520	<elision2>	<elision2>
11543	11541	<>	<elision2>
11543	11520	<elision1>	<elision1>
11543	11541	<>	<elision1>
11543	11526	.	υ
11543	11460	s	υ
11543	11526	.	u
11543	11460	s	u
11543	11460	s	κ
11543	11475	H	κ
11543	11460	s	k
11543	11475	H	k
11543	11505	s	U
11543	11466	s	K
11543	11475	H	K
11543	11526	.	α
11543	11460	s	α
11543	11526	.	a
11543	11460	s	a
11543	11508	s	A
11543	11460	s	λ
11543	11475	H	λ
11543	11460	s	l
11543	11475	H	l
11543	11469	s	L
11543	11475	H	L
11544	11494	.	.
11544	11494	<~>	<~>
11544	11494	<split-s>	<split-s>
11544	11494	<split-h>	<split-h>
11544	11494	<name2>	<name2>
11544	11545	<>	<name>
11544	11497	<aphaerese>	<aphaerese>
11544	11544	<>	<aphaerese>
11544	11494	<elision3>	<elision3>
11544	11544	<>	<elision3>
11544	11494	<elision2>	<elision2>
11544	11544	<>	<elision2>
11544	11494	<elision1>	<elision1>
11544	11544	<>	<elision1>
11544	11509	.	υ
11544	11461	s	υ
11544	11509	.	u
11544	11461	s	u
11544	11500	.	κ
11544	11461	s	κ
11544	11461	s	k
11544	11503	s	U
11544	11467	s	K
11544	11509	.	α
11544	11461	s	α
11544	11509	.	a
11544	11461	s	a
11544	11506	s	A
11544	11461	s	λ
11544	11461	s	l
11544	11470	s	L
11544	11518	<U2L>	<>
11545	11496	.	.
11545	11496	<~>	<~>
11545	11496	<split-s>	<split-s>
11545	11496	<split-h>	<split-h>
11545	11496	<name2>	<name2>
11545	11499	<aphaerese>	<aphaerese>
11545	11546	<>	<aphaerese>
11545	11496	<elision3>	<elision3>
11545	11546	<>	<elision3>
11545	11496	<elision2>	<elision2>
11545	11546	<>	<elision2>
11545	11496	<elision1>	<elision1>
11545	11546	<>	<elision1>
11545	11511	.	υ
11545	11460	s	υ
11545	11511	.	u
11545	11460	s	u
11545	11502	.	κ
11545	11460	s	κ
11545	11460	s	k
11545	11505	s	U
11545	11466	s	K
11545	11511	.	α
11545	11460	s	α
11545	11511	.	a
11545	11460	s	a
11545	11508	s	A
11545	11460	s	λ
11545	11460	s	l
11545	11469	s	L
11545	11519	<U2L>	<>
11546	11494	.	.
11546	11494	<~>	<~>
11546	11494	<split-s>	<split-s>
11546	11494	<split-h>	<split-h>
11546	11494	<name2>	<name2>
11546	11497	<aphaerese>	<aphaerese>
11546	11544	<>	<aphaerese>
11546	11494	<elision3>	<elision3>
11546	11544	<>	<elision3>
11546	11494	<elision2>	<elision2>
11546	11544	<>	<elision2>
11546	11494	<elision1>	<elision1>
11546	11544	<>	<elision1>
11546	11509	.	υ
11546	11461	s	υ
11546	11509	.	u
11546	11461	s	u
11546	11500	.	κ
11546	11461	s	κ
11546	11461	s	k
11546	11503	s	U
11546	11467	s	K
11546	11509	.	α
11546	11461	s	α
11546	11509	.	a
11546	11461	s	a
11546	11506	s	A
11546	11461	s	λ
11546	11461	s	l
11546	11470	s	L
11546	11520	<U2L>	<>
11547	11494	.	.
11547	11494	<~>	<~>
11547	11494	<split-s>	<split-s>
11547	11494	<split-h>	<split-h>
11547	11494	<name2>	<name2>
11547	11548	<name2>	<name>
11547	11549	<>	<name>
11547	11497	<aphaerese>	<aphaerese>
11547	11551	<>	<aphaerese>
11547	11494	<elision3>	<elision3>
11547	11551	<>	<elision3>
11547	11494	<elision2>	<elision2>
11547	11551	<>	<elision2>
11547	11494	<elision1>	<elision1>
11547	11551	<>	<elision1>
11547	11509	.	υ
11547	11461	s	υ
11547	11509	.	u
11547	11461	s	u
11547	11524	.	κ
11547	11461	s	κ
11547	11461	s	k
11547	11503	s	U
11547	11467	s	K
11547	11509	.	α
11547	11461	s	α
11547	11509	.	a
11547	11461	s	a
11547	11506	s	A
11547	11524	.	λ
11547	11461	s	λ
11547	11461	s	l
11547	11470	s	L
11547	11552	<k2K>	<>
11547	11553	<k2L>	<>
11547	11555	<K2L>	<>
11548	11466	s	k
11548	11469	s	l
11549	11496	.	.
11549	11496	<~>	<~>
11549	11496	<split-s>	<split-s>
11549	11496	<split-h>	<split-h>
11549	11496	<name2>	<name2>
11549	11499	<aphaerese>	<aphaerese>
11549	11550	<>	<aphaerese>
11549	11496	<elision3>	<elision3>
11549	11550	<>	<elision3>
11549	11496	<elision2>	<elision2>
11549	11550	<>	<elision2>
11549	11496	<elision1>	<elision1>
11549	11550	<>	<elision1>
11549	11511	.	υ
11549	11460	s	υ
11549	11511	.	u
11549	11460	s	u
11549	11526	.	κ
11549	11460	s	κ
11549	11460	s	k
11549	11505	s	U
11549	11466	s	K
11549	11511	.	α
11549	11460	s	α
11549	11511	.	a
11549	11460	s	a
11549	11508	s	A
11549	11526	.	λ
11549	11460	s	λ
11549	11460	s	l
11549	11469	s	L
11549	11543	<K2L>	<>
11550	11494	.	.
11550	11494	<~>	<~>
11550	11494	<split-s>	<split-s>
11550	11494	<split-h>	<split-h>
11550	11494	<name2>	<name2>
11550	11497	<aphaerese>	<aphaerese>
11550	11551	<>	<aphaerese>
11550	11494	<elision3>	<elision3>
11550	11551	<>	<elision3>
11550	11494	<elision2>	<elision2>
11550	11551	<>	<elision2>
11550	11494	<elision1>	<elision1>
11550	11551	<>	<elision1>
11550	11509	.	υ
11550	11461	s	υ
11550	11509	.	u
11550	11461	s	u
11550	11524	.	κ
11550	11461	s	κ
11550	11461	s	k
11550	11503	s	U
11550	11467	s	K
11550	11509	.	α
11550	11461	s	α
11550	11509	.	a
11550	11461	s	a
11550	11506	s	A
11550	11524	.	λ
11550	11461	s	λ
11550	11461	s	l
11550	11470	s	L
11550	11541	<K2L>	<>
11551	11494	.	.
11551	11494	<~>	<~>
11551	11494	<split-s>	<split-s>
11551	11494	<split-h>	<split-h>
11551	11494	<name2>	<name2>
11551	11549	<>	<name>
11551	11497	<aphaerese>	<aphaerese>
11551	11551	<>	<aphaerese>
11551	11494	<elision3>	<elision3>
11551	11551	<>	<elision3>
11551	11494	<elision2>	<elision2>
11551	11551	<>	<elision2>
11551	11494	<elision1>	<elision1>
11551	11551	<>	<elision1>
11551	11509	.	υ
11551	11461	s	υ
11551	11509	.	u
11551	11461	s	u
11551	11524	.	κ
11551	11461	s	κ
11551	11461	s	k
11551	11503	s	U
11551	11467	s	K
11551	11509	.	α
11551	11461	s	α
11551	11509	.	a
11551	11461	s	a
11551	11506	s	A
11551	11524	.	λ
11551	11461	s	λ
11551	11461	s	l
11551	11470	s	L
11551	11542	<K2L>	<>
11552	11548	<name>	<name>
11553	11554	<name>	<name>
11554	11466	s	k
11554	11475	H	k
11554	11469	s	l
11554	11475	H	l
11555	11518	.	.
11555	11518	<~>	<~>
11555	11518	<split-s>	<split-s>
11555	11518	<split-h>	<split-h>
11555	11518	<name2>	<name2>
11555	11554	<name2>	<name>
11555	11543	<>	<name>
11555	11521	<aphaerese>	<aphaerese>
11555	11542	<>	<aphaerese>
11555	11518	<elision3>	<elision3>
11555	11542	<>	<elision3>
11555	11518	<elision2>	<elision2>
11555	11542	<>	<elision2>
11555	11518	<elision1>	<elision1>
11555	11542	<>	<elision1>
11555	11524	.	υ
11555	11461	s	υ
11555	11524	.	u
11555	11461	s	u
11555	11461	s	κ
11555	11476	H	κ
11555	11461	s	k
11555	11476	H	k
11555	11503	s	U
11555	11467	s	K
11555	11476	H	K
11555	11524	.	α
11555	11461	s	α
11555	11524	.	a
11555	11461	s	a
11555	11506	s	A
11555	11461	s	λ
11555	11476	H	λ
11555	11461	s	l
11555	11476	H	l
11555	11470	s	L
11555	11476	H	L
11556	11557	<>	<name>
11556	11556	<>	<aphaerese>
11556	11556	<>	<elision3>
11556	11556	<>	<elision2>
11556	11556	<>	<elision1>
11556	11560	<lambda2L>	<>
11557	11558	<>	<aphaerese>
11557	11558	<>	<elision3>
11557	11558	<>	<elision2>
11557	11558	<>	<elision1>
11557	11561	<lambda2L>	<>
11558	11556	<>	<aphaerese>
11558	11556	<>	<elision3>
11558	11556	<>	<elision2>
11558	11556	<>	<elision1>
11558	11559	<lambda2L>	<>
11559	11518	.	.
11559	11518	<~>	<~>
11559	11518	<split-s>	<split-s>
11559	11518	<split-h>	<split-h>
11559	11518	<name2>	<name2>
11559	11521	<aphaerese>	<aphaerese>
11559	11560	<>	<aphaerese>
11559	11518	<elision3>	<elision3>
11559	11560	<>	<elision3>
11559	11518	<elision2>	<elision2>
11559	11560	<>	<elision2>
11559	11518	<elision1>	<elision1>
11559	11560	<>	<elision1>
11559	11524	.	υ
11559	11461	s	υ
11559	11524	.	u
11559	11461	s	u
11559	11524	.	κ
11559	11461	s	κ
11559	11476	H	κ
11559	11461	s	k
11559	11476	H	k
11559	11503	s	U
11559	11467	s	K
11559	11476	H	K
11559	11524	.	α
11559	11461	s	α
11559	11524	.	a
11559	11461	s	a
11559	11506	s	A
11559	11524	.	λ
11559	11461	s	λ
11559	11476	H	λ
11559	11461	s	l
11559	11476	H	l
11559	11470	s	L
11559	11476	H	L
11560	11518	.	.
11560	11518	<~>	<~>
11560	11518	<split-s>	<split-s>
11560	11518	<split-h>	<split-h>
11560	11518	<name2>	<name2>
11560	11561	<>	<name>
11560	11521	<aphaerese>	<aphaerese>
11560	11560	<>	<aphaerese>
11560	11518	<elision3>	<elision3>
11560	11560	<>	<elision3>
11560	11518	<elision2>	<elision2>
11560	11560	<>	<elision2>
11560	11518	<elision1>	<elision1>
11560	11560	<>	<elision1>
11560	11524	.	υ
11560	11461	s	υ
11560	11524	.	u
11560	11461	s	u
11560	11524	.	κ
11560	11461	s	κ
11560	11476	H	κ
11560	11461	s	k
11560	11476	H	k
11560	11503	s	U
11560	11467	s	K
11560	11476	H	K
11560	11524	.	α
11560	11461	s	α
11560	11524	.	a
11560	11461	s	a
11560	11506	s	A
11560	11524	.	λ
11560	11461	s	λ
11560	11476	H	λ
11560	11461	s	l
11560	11476	H	l
11560	11470	s	L
11560	11476	H	L
11561	11520	.	.
11561	11520	<~>	<~>
11561	11520	<split-s>	<split-s>
11561	11520	<split-h>	<split-h>
11561	11520	<name2>	<name2>
11561	11523	<aphaerese>	<aphaerese>
11561	11559	<>	<aphaerese>
11561	11520	<elision3>	<elision3>
11561	11559	<>	<elision3>
11561	11520	<elision2>	<elision2>
11561	11559	<>	<elision2>
11561	11520	<elision1>	<elision1>
11561	11559	<>	<elision1>
11561	11526	.	υ
11561	11460	s	υ
11561	11526	.	u
11561	11460	s	u
11561	11526	.	κ
11561	11460	s	κ
11561	11475	H	κ
11561	11460	s	k
11561	11475	H	k
11561	11505	s	U
11561	11466	s	K
11561	11475	H	K
11561	11526	.	α
11561	11460	s	α
11561	11526	.	a
11561	11460	s	a
11561	11508	s	A
11561	11526	.	λ
11561	11460	s	λ
11561	11475	H	λ
11561	11460	s	l
11561	11475	H	l
11561	11469	s	L
11561	11475	H	L
11562	11563	<>	<name>
11562	11562	<>	<aphaerese>
11562	11562	<>	<elision3>
11562	11562	<>	<elision2>
11562	11562	<>	<elision1>
11562	11560	<l2L>	<>
11563	11564	<>	<aphaerese>
11563	11564	<>	<elision3>
11563	11564	<>	<elision2>
11563	11564	<>	<elision1>
11563	11561	<l2L>	<>
11564	11562	<>	<aphaerese>
11564	11562	<>	<elision3>
11564	11562	<>	<elision2>
11564	11562	<>	<elision1>
11564	11559	<l2L>	<>
11565	11518	.	.
11565	11518	<~>	<~>
11565	11518	<split-s>	<split-s>
11565	11518	<split-h>	<split-h>
11565	11518	<name2>	<name2>
11565	11554	<name2>	<name>
11565	11561	<>	<name>
11565	11521	<aphaerese>	<aphaerese>
11565	11560	<>	<aphaerese>
11565	11518	<elision3>	<elision3>
11565	11560	<>	<elision3>
11565	11518	<elision2>	<elision2>
11565	11560	<>	<elision2>
11565	11518	<elision1>	<elision1>
11565	11560	<>	<elision1>
11565	11524	.	υ
11565	11461	s	υ
11565	11524	.	u
11565	11461	s	u
11565	11524	.	κ
11565	11461	s	κ
11565	11476	H	κ
11565	11461	s	k
11565	11476	H	k
11565	11503	s	U
11565	11467	s	K
11565	11476	H	K
11565	11524	.	α
11565	11461	s	α
11565	11524	.	a
11565	11461	s	a
11565	11506	s	A
11565	11524	.	λ
11565	11461	s	λ
11565	11476	H	λ
11565	11461	s	l
11565	11476	H	l
11565	11470	s	L
11565	11476	H	L
11565	11553	<l2L>	<>
11566	11567	<>	<name>
11566	11566	<>	<aphaerese>
11566	11566	<>	<elision3>
11566	11566	<>	<elision2>
11566	11566	<>	<elision1>
11566	11570	<ypsilon2K>	<>
11566	11573	<ypsilon2L>	<>
11567	11568	<>	<aphaerese>
11567	11568	<>	<elision3>
11567	11568	<>	<elision2>
11567	11568	<>	<elision1>
11567	11571	<ypsilon2K>	<>
11567	11574	<ypsilon2L>	<>
11568	11566	<>	<aphaerese>
11568	11566	<>	<elision3>
11568	11566	<>	<elision2>
11568	11566	<>	<elision1>
11568	11569	<ypsilon2K>	<>
11568	11572	<ypsilon2L>	<>
11569	11494	.	.
11569	11494	<~>	<~>
11569	11494	<split-s>	<split-s>
11569	11494	<split-h>	<split-h>
11569	11494	<name2>	<name2>
11569	11497	<aphaerese>	<aphaerese>
11569	11570	<>	<aphaerese>
11569	11570	<>	<elision3>
11569	11570	<>	<elision2>
11569	11570	<>	<elision1>
11569	11509	.	υ
11569	11461	s	υ
11569	11509	.	u
11569	11461	s	u
11569	11500	.	κ
11569	11461	s	κ
11569	11461	s	k
11569	11503	s	U
11569	11467	s	K
11569	11509	.	α
11569	11461	s	α
11569	11509	.	a
11569	11461	s	a
11569	11506	s	A
11569	11461	s	λ
11569	11461	s	l
11569	11470	s	L
11570	11494	.	.
11570	11494	<~>	<~>
11570	11494	<split-s>	<split-s>
11570	11494	<split-h>	<split-h>
11570	11494	<name2>	<name2>
11570	11571	<>	<name>
11570	11497	<aphaerese>	<aphaerese>
11570	11570	<>	<aphaerese>
11570	11570	<>	<elision3>
11570	11570	<>	<elision2>
11570	11570	<>	<elision1>
11570	11509	.	υ
11570	11461	s	υ
11570	11509	.	u
11570	11461	s	u
11570	11500	.	κ
11570	11461	s	κ
11570	11461	s	k
11570	11503	s	U
11570	11467	s	K
11570	11509	.	α
11570	11461	s	α
11570	11509	.	a
11570	11461	s	a
11570	11506	s	A
11570	11461	s	λ
11570	11461	s	l
11570	11470	s	L
11571	11496	.	.
11571	11496	<~>	<~>
11571	11496	<split-s>	<split-s>
11571	11496	<split-h>	<split-h>
11571	11496	<name2>	<name2>
11571	11499	<aphaerese>	<aphaerese>
11571	11569	<>	<aphaerese>
11571	11569	<>	<elision3>
11571	11569	<>	<elision2>
11571	11569	<>	<elision1>
11571	11511	.	υ
11571	11460	s	υ
11571	11511	.	u
11571	11460	s	u
11571	11502	.	κ
11571	11460	s	κ
11571	11460	s	k
11571	11505	s	U
11571	11466	s	K
11571	11511	.	α
11571	11460	s	α
11571	11511	.	a
11571	11460	s	a
11571	11508	s	A
11571	11460	s	λ
11571	11460	s	l
11571	11469	s	L
11572	11518	.	.
11572	11518	<~>	<~>
11572	11518	<split-s>	<split-s>
11572	11518	<split-h>	<split-h>
11572	11518	<name2>	<name2>
11572	11521	<aphaerese>	<aphaerese>
11572	11573	<>	<aphaerese>
11572	11573	<>	<elision3>
11572	11573	<>	<elision2>
11572	11573	<>	<elision1>
11572	11524	.	υ
11572	11461	s	υ
11572	11524	.	u
11572	11461	s	u
11572	11500	.	κ
11572	11461	s	κ
11572	11476	H	κ
11572	11461	s	k
11572	11476	H	k
11572	11503	s	U
11572	11467	s	K
11572	11476	H	K
11572	11524	.	α
11572	11461	s	α
11572	11524	.	a
11572	11461	s	a
11572	11506	s	A
11572	11461	s	λ
11572	11476	H	λ
11572	11461	s	l
11572	11476	H	l
11572	11470	s	L
11572	11476	H	L
11573	11518	.	.
11573	11518	<~>	<~>
11573	11518	<split-s>	<split-s>
11573	11518	<split-h>	<split-h>
11573	11518	<name2>	<name2>
11573	11574	<>	<name>
11573	11521	<aphaerese>	<aphaerese>
11573	11573	<>	<aphaerese>
11573	11573	<>	<elision3>
11573	11573	<>	<elision2>
11573	11573	<>	<elision1>
11573	11524	.	υ
11573	11461	s	υ
11573	11524	.	u
11573	11461	s	u
11573	11500	.	κ
11573	11461	s	κ
11573	11476	H	κ
11573	11461	s	k
11573	11476	H	k
11573	11503	s	U
11573	11467	s	K
11573	11476	H	K
11573	11524	.	α
11573	11461	s	α
11573	11524	.	a
11573	11461	s	a
11573	11506	s	A
11573	11461	s	λ
11573	11476	H	λ
11573	11461	s	l
11573	11476	H	l
11573	11470	s	L
11573	11476	H	L
11574	11520	.	.
11574	11520	<~>	<~>
11574	11520	<split-s>	<split-s>
11574	11520	<split-h>	<split-h>
11574	11520	<name2>	<name2>
11574	11523	<aphaerese>	<aphaerese>
11574	11572	<>	<aphaerese>
11574	11572	<>	<elision3>
11574	11572	<>	<elision2>
11574	11572	<>	<elision1>
11574	11526	.	υ
11574	11460	s	υ
11574	11526	.	u
11574	11460	s	u
11574	11502	.	κ
11574	11460	s	κ
11574	11475	H	κ
11574	11460	s	k
11574	11475	H	k
11574	11505	s	U
11574	11466	s	K
11574	11475	H	K
11574	11526	.	α
11574	11460	s	α
11574	11526	.	a
11574	11460	s	a
11574	11508	s	A
11574	11460	s	λ
11574	11475	H	λ
11574	11460	s	l
11574	11475	H	l
11574	11469	s	L
11574	11475	H	L
11575	11576	<>	<name>
11575	11575	<>	<aphaerese>
11575	11575	<>	<elision3>
11575	11575	<>	<elision2>
11575	11575	<>	<elision1>
11575	11570	<u2K>	<>
11575	11573	<u2L>	<>
11576	11577	<>	<aphaerese>
11576	11577	<>	<elision3>
11576	11577	<>	<elision2>
11576	11577	<>	<elision1>
11576	11571	<u2K>	<>
11576	11574	<u2L>	<>
11577	11575	<>	<aphaerese>
11577	11575	<>	<elision3>
11577	11575	<>	<elision2>
11577	11575	<>	<elision1>
11577	11569	<u2K>	<>
11577	11572	<u2L>	<>
11578	11579	<>	<name>
11578	11578	<>	<aphaerese>
11578	11578	<>	<elision3>
11578	11578	<>	<elision2>
11578	11578	<>	<elision1>
11578	11573	<alpha2L>	<>
11579	11580	<>	<aphaerese>
11579	11580	<>	<elision3>
11579	11580	<>	<elision2>
11579	11580	<>	<elision1>
11579	11574	<alpha2L>	<>
11580	11578	<>	<aphaerese>
11580	11578	<>	<elision3>
11580	11578	<>	<elision2>
11580	11578	<>	<elision1>
11580	11572	<alpha2L>	<>
11581	11582	<>	<name>
11581	11581	<>	<aphaerese>
11581	11581	<>	<elision3>
11581	11581	<>	<elision2>
11581	11581	<>	<elision1>
11581	11573	<a2L>	<>
11582	11583	<>	<aphaerese>
11582	11583	<>	<elision3>
11582	11583	<>	<elision2>
11582	11583	<>	<elision1>
11582	11574	<a2L>	<>
11583	11581	<>	<aphaerese>
11583	11581	<>	<elision3>
11583	11581	<>	<elision2>
11583	11581	<>	<elision1>
11583	11572	<a2L>	<>
11584	11585	.	.
11584	11586	 	 
11584	11585	<~>	<~>
11584	11585	<split-s>	<split-s>
11584	11585	<split-h>	<split-h>
11584	11585	<name2>	<name2>
11584	12146	<>	<name>
11584	11589	<aphaerese>	<aphaerese>
11584	11584	<>	<aphaerese>
11584	11584	<>	<elision3>
11584	11584	<>	<elision2>
11584	11584	<>	<elision1>
11584	11593	.	υ
11584	11596	s	υ
11584	11593	.	u
11584	11596	s	u
11584	11775	.	κ
11584	11840	s	κ
11584	11952	s	k
11584	11961	s	U
11584	12124	s	K
11584	11593	.	α
11584	11596	s	α
11584	11593	.	a
11584	11596	s	a
11584	12082	s	A
11584	11952	s	λ
11584	11952	s	l
11584	12137	s	L
11584	11770	<A3>	<>
11585	11585	.	.
11585	11586	 	 
11585	11585	<~>	<~>
11585	11585	<split-s>	<split-s>
11585	11585	<split-h>	<split-h>
11585	11585	<name2>	<name2>
11585	12145	<>	<name>
11585	11589	<aphaerese>	<aphaerese>
11585	11585	<>	<aphaerese>
11585	11585	<elision3>	<elision3>
11585	11585	<>	<elision3>
11585	11585	<elision2>	<elision2>
11585	11585	<>	<elision2>
11585	11585	<elision1>	<elision1>
11585	11585	<>	<elision1>
11585	11593	.	υ
11585	11596	s	υ
11585	11593	.	u
11585	11596	s	u
11585	11775	.	κ
11585	11840	s	κ
11585	11952	s	k
11585	11961	s	U
11585	12124	s	K
11585	11593	.	α
11585	11596	s	α
11585	11593	.	a
11585	11596	s	a
11585	12082	s	A
11585	11952	s	λ
11585	11952	s	l
11585	12137	s	L
11585	11765	<A3>	<>
11586	11585	.	.
11586	11586	 	 
11586	11585	<~>	<~>
11586	11585	<split-s>	<split-s>
11586	11585	<split-h>	<split-h>
11586	11585	<name2>	<name2>
11586	11587	<>	<name>
11586	11589	<aphaerese>	<aphaerese>
11586	11592	<>	<aphaerese>
11586	11585	<elision3>	<elision3>
11586	11592	<>	<elision3>
11586	11585	<elision2>	<elision2>
11586	11592	<>	<elision2>
11586	11585	<elision1>	<elision1>
11586	11592	<>	<elision1>
11586	11593	.	υ
11586	12101	s	υ
11586	11593	.	u
11586	12101	s	u
11586	11775	.	κ
11586	12104	s	κ
11586	12107	s	k
11586	12110	s	U
11586	12114	s	K
11586	11593	.	α
11586	12101	s	α
11586	11593	.	a
11586	12101	s	a
11586	12118	s	A
11586	12107	s	λ
11586	12107	s	l
11586	12119	s	L
11586	11765	<A3>	<>
11587	11588	.	.
11587	11591	 	 
11587	11588	<~>	<~>
11587	11588	<split-s>	<split-s>
11587	11588	<split-h>	<split-h>
11587	11588	<name2>	<name2>
11587	12123	<aphaerese>	<aphaerese>
11587	12144	<>	<aphaerese>
11587	11588	<elision3>	<elision3>
11587	12144	<>	<elision3>
11587	11588	<elision2>	<elision2>
11587	12144	<>	<elision2>
11587	11588	<elision1>	<elision1>
11587	12144	<>	<elision1>
11587	11595	.	υ
11587	11768	s	υ
11587	11595	.	u
11587	11768	s	u
11587	11777	.	κ
11587	11842	s	κ
11587	11954	s	k
11587	11963	s	U
11587	11969	s	K
11587	11595	.	α
11587	11768	s	α
11587	11595	.	a
11587	11768	s	a
11587	12084	s	A
11587	11954	s	λ
11587	11954	s	l
11587	12087	s	L
11587	11766	<A3>	<>
11588	11585	.	.
11588	11586	 	 
11588	11585	<~>	<~>
11588	11585	<split-s>	<split-s>
11588	11585	<split-h>	<split-h>
11588	11585	<name2>	<name2>
11588	11589	<aphaerese>	<aphaerese>
11588	11585	<>	<aphaerese>
11588	11585	<elision3>	<elision3>
11588	11585	<>	<elision3>
11588	11585	<elision2>	<elision2>
11588	11585	<>	<elision2>
11588	11585	<elision1>	<elision1>
11588	11585	<>	<elision1>
11588	11593	.	υ
11588	11596	s	υ
11588	11593	.	u
11588	11596	s	u
11588	11775	.	κ
11588	11840	s	κ
11588	11952	s	k
11588	11961	s	U
11588	12124	s	K
11588	11593	.	α
11588	11596	s	α
11588	11593	.	a
11588	11596	s	a
11588	12082	s	A
11588	11952	s	λ
11588	11952	s	l
11588	12137	s	L
11588	11764	<A3>	<>
11589	11585	.	.
11589	11586	 	 
11589	11585	<~>	<~>
11589	11585	<split-s>	<split-s>
11589	11585	<split-h>	<split-h>
11589	11585	<name2>	<name2>
11589	11590	<>	<name>
11589	11589	<aphaerese>	<aphaerese>
11589	11589	<>	<aphaerese>
11589	11585	<elision3>	<elision3>
11589	11589	<>	<elision3>
11589	11585	<elision2>	<elision2>
11589	11589	<>	<elision2>
11589	11585	<elision1>	<elision1>
11589	11589	<>	<elision1>
11589	11585	.	υ
11589	11585	.	u
11589	11775	.	κ
11589	11840	s	κ
11589	11952	s	k
11589	11961	s	U
11589	12124	s	K
11589	11585	.	α
11589	11585	.	a
11589	12082	s	A
11589	11952	s	λ
11589	11952	s	l
11589	12137	s	L
11589	11752	<A3>	<>
11590	11588	.	.
11590	11591	 	 
11590	11588	<~>	<~>
11590	11588	<split-s>	<split-s>
11590	11588	<split-h>	<split-h>
11590	11588	<name2>	<name2>
11590	12123	<aphaerese>	<aphaerese>
11590	12123	<>	<aphaerese>
11590	11588	<elision3>	<elision3>
11590	12123	<>	<elision3>
11590	11588	<elision2>	<elision2>
11590	12123	<>	<elision2>
11590	11588	<elision1>	<elision1>
11590	12123	<>	<elision1>
11590	11588	.	υ
11590	11588	.	u
11590	11777	.	κ
11590	11842	s	κ
11590	11954	s	k
11590	11963	s	U
11590	12126	s	K
11590	11588	.	α
11590	11588	.	a
11590	12084	s	A
11590	11954	s	λ
11590	11954	s	l
11590	12139	s	L
11590	11753	<A3>	<>
11591	11585	.	.
11591	11586	 	 
11591	11585	<~>	<~>
11591	11585	<split-s>	<split-s>
11591	11585	<split-h>	<split-h>
11591	11585	<name2>	<name2>
11591	11589	<aphaerese>	<aphaerese>
11591	11592	<>	<aphaerese>
11591	11585	<elision3>	<elision3>
11591	11592	<>	<elision3>
11591	11585	<elision2>	<elision2>
11591	11592	<>	<elision2>
11591	11585	<elision1>	<elision1>
11591	11592	<>	<elision1>
11591	11593	.	υ
11591	12101	s	υ
11591	11593	.	u
11591	12101	s	u
11591	11775	.	κ
11591	12104	s	κ
11591	12107	s	k
11591	12110	s	U
11591	12114	s	K
11591	11593	.	α
11591	12101	s	α
11591	11593	.	a
11591	12101	s	a
11591	12118	s	A
11591	12107	s	λ
11591	12107	s	l
11591	12119	s	L
11591	11764	<A3>	<>
11592	11585	.	.
11592	11586	 	 
11592	11585	<~>	<~>
11592	11585	<split-s>	<split-s>
11592	11585	<split-h>	<split-h>
11592	11585	<name2>	<name2>
11592	11587	<>	<name>
11592	11589	<aphaerese>	<aphaerese>
11592	11592	<>	<aphaerese>
11592	11585	<elision3>	<elision3>
11592	11592	<>	<elision3>
11592	11585	<elision2>	<elision2>
11592	11592	<>	<elision2>
11592	11585	<elision1>	<elision1>
11592	11592	<>	<elision1>
11592	11593	.	υ
11592	11596	s	υ
11592	11593	.	u
11592	11596	s	u
11592	11775	.	κ
11592	11840	s	κ
11592	11952	s	k
11592	11961	s	U
11592	11964	s	K
11592	11593	.	α
11592	11596	s	α
11592	11593	.	a
11592	11596	s	a
11592	12082	s	A
11592	11952	s	λ
11592	11952	s	l
11592	12085	s	L
11592	11765	<A3>	<>
11593	11594	<>	<name>
11593	11593	<>	<aphaerese>
11593	11585	<elision3>	<elision3>
11593	11593	<>	<elision3>
11593	11585	<elision2>	<elision2>
11593	11593	<>	<elision2>
11593	11585	<elision1>	<elision1>
11593	11593	<>	<elision1>
11593	32	<A3>	<>
11594	11595	<>	<aphaerese>
11594	11588	<elision3>	<elision3>
11594	11595	<>	<elision3>
11594	11588	<elision2>	<elision2>
11594	11595	<>	<elision2>
11594	11588	<elision1>	<elision1>
11594	11595	<>	<elision1>
11594	33	<A3>	<>
11595	11593	<>	<aphaerese>
11595	11585	<elision3>	<elision3>
11595	11593	<>	<elision3>
11595	11585	<elision2>	<elision2>
11595	11593	<>	<elision2>
11595	11585	<elision1>	<elision1>
11595	11593	<>	<elision1>
11595	31	<A3>	<>
11596	11597	.	.
11596	11597	 	 
11596	11597	<~>	<~>
11596	11597	<split-s>	<split-s>
11596	11597	<split-h>	<split-h>
11596	11597	<name2>	<name2>
11596	11767	<>	<name>
11596	11600	<aphaerese>	<aphaerese>
11596	11596	<>	<aphaerese>
11596	11596	<>	<elision3>
11596	11596	<>	<elision2>
11596	11596	<>	<elision1>
11596	11761	.	υ
11596	11761	.	u
11596	11603	.	κ
11596	11761	.	α
11596	11761	.	a
11596	11770	<A4>	<>
11597	11597	.	.
11597	11597	 	 
11597	11597	<~>	<~>
11597	11597	<split-s>	<split-s>
11597	11597	<split-h>	<split-h>
11597	11597	<name2>	<name2>
11597	11598	<>	<name>
11597	11600	<aphaerese>	<aphaerese>
11597	11597	<>	<aphaerese>
11597	11597	<elision3>	<elision3>
11597	11597	<>	<elision3>
11597	11597	<elision2>	<elision2>
11597	11597	<>	<elision2>
11597	11597	<elision1>	<elision1>
11597	11597	<>	<elision1>
11597	11761	.	υ
11597	11761	.	u
11597	11603	.	κ
11597	11761	.	α
11597	11761	.	a
11597	11765	<A4>	<>
11598	11599	.	.
11598	11599	 	 
11598	11599	<~>	<~>
11598	11599	<split-s>	<split-s>
11598	11599	<split-h>	<split-h>
11598	11599	<name2>	<name2>
11598	11602	<aphaerese>	<aphaerese>
11598	11599	<>	<aphaerese>
11598	11599	<elision3>	<elision3>
11598	11599	<>	<elision3>
11598	11599	<elision2>	<elision2>
11598	11599	<>	<elision2>
11598	11599	<elision1>	<elision1>
11598	11599	<>	<elision1>
11598	11763	.	υ
11598	11763	.	u
11598	11605	.	κ
11598	11763	.	α
11598	11763	.	a
11598	11766	<A4>	<>
11599	11597	.	.
11599	11597	 	 
11599	11597	<~>	<~>
11599	11597	<split-s>	<split-s>
11599	11597	<split-h>	<split-h>
11599	11597	<name2>	<name2>
11599	11600	<aphaerese>	<aphaerese>
11599	11597	<>	<aphaerese>
11599	11597	<elision3>	<elision3>
11599	11597	<>	<elision3>
11599	11597	<elision2>	<elision2>
11599	11597	<>	<elision2>
11599	11597	<elision1>	<elision1>
11599	11597	<>	<elision1>
11599	11761	.	υ
11599	11761	.	u
11599	11603	.	κ
11599	11761	.	α
11599	11761	.	a
11599	11764	<A4>	<>
11600	11597	.	.
11600	11597	 	 
11600	11597	<~>	<~>
11600	11597	<split-s>	<split-s>
11600	11597	<split-h>	<split-h>
11600	11597	<name2>	<name2>
11600	11601	<>	<name>
11600	11600	<aphaerese>	<aphaerese>
11600	11600	<>	<aphaerese>
11600	11597	<elision3>	<elision3>
11600	11600	<>	<elision3>
11600	11597	<elision2>	<elision2>
11600	11600	<>	<elision2>
11600	11597	<elision1>	<elision1>
11600	11600	<>	<elision1>
11600	11597	.	υ
11600	11597	.	u
11600	11603	.	κ
11600	11597	.	α
11600	11597	.	a
11600	11752	<A4>	<>
11601	11599	.	.
11601	11599	 	 
11601	11599	<~>	<~>
11601	11599	<split-s>	<split-s>
11601	11599	<split-h>	<split-h>
11601	11599	<name2>	<name2>
11601	11602	<aphaerese>	<aphaerese>
11601	11602	<>	<aphaerese>
11601	11599	<elision3>	<elision3>
11601	11602	<>	<elision3>
11601	11599	<elision2>	<elision2>
11601	11602	<>	<elision2>
11601	11599	<elision1>	<elision1>
11601	11602	<>	<elision1>
11601	11599	.	υ
11601	11599	.	u
11601	11605	.	κ
11601	11599	.	α
11601	11599	.	a
11601	11753	<A4>	<>
11602	11597	.	.
11602	11597	 	 
11602	11597	<~>	<~>
11602	11597	<split-s>	<split-s>
11602	11597	<split-h>	<split-h>
11602	11597	<name2>	<name2>
11602	11600	<aphaerese>	<aphaerese>
11602	11600	<>	<aphaerese>
11602	11597	<elision3>	<elision3>
11602	11600	<>	<elision3>
11602	11597	<elision2>	<elision2>
11602	11600	<>	<elision2>
11602	11597	<elision1>	<elision1>
11602	11600	<>	<elision1>
11602	11597	.	υ
11602	11597	.	u
11602	11603	.	κ
11602	11597	.	α
11602	11597	.	a
11602	11751	<A4>	<>
11603	11604	<>	<name>
11603	11603	<>	<aphaerese>
11603	11606	<elision3>	<elision3>
11603	11603	<>	<elision3>
11603	11606	<elision2>	<elision2>
11603	11603	<>	<elision2>
11603	11606	<elision1>	<elision1>
11603	11603	<>	<elision1>
11603	11749	<A4>	<>
11604	11605	<>	<aphaerese>
11604	11608	<elision3>	<elision3>
11604	11605	<>	<elision3>
11604	11608	<elision2>	<elision2>
11604	11605	<>	<elision2>
11604	11608	<elision1>	<elision1>
11604	11605	<>	<elision1>
11604	11750	<A4>	<>
11605	11603	<>	<aphaerese>
11605	11606	<elision3>	<elision3>
11605	11603	<>	<elision3>
11605	11606	<elision2>	<elision2>
11605	11603	<>	<elision2>
11605	11606	<elision1>	<elision1>
11605	11603	<>	<elision1>
11605	11748	<A4>	<>
11606	11607	<>	<name>
11606	11606	<>	<aphaerese>
11606	11606	<>	<elision3>
11606	11606	<>	<elision2>
11606	11606	<>	<elision1>
11606	11610	<A4>	<>
11607	11608	<>	<aphaerese>
11607	11608	<>	<elision3>
11607	11608	<>	<elision2>
11607	11608	<>	<elision1>
11607	11611	<A4>	<>
11608	11606	<>	<aphaerese>
11608	11606	<>	<elision3>
11608	11606	<>	<elision2>
11608	11606	<>	<elision1>
11608	11609	<A4>	<>
11609	11610	<>	<aphaerese>
11609	11610	<>	<elision3>
11609	11610	<>	<elision2>
11609	11610	<>	<elision1>
11609	48	H	κ
11609	10998	H	k
11609	11002	H	K
11609	11006	H	λ
11609	11613	H	l
11609	11742	H	L
11609	11453	<K>	<>
11610	11611	<>	<name>
11610	11610	<>	<aphaerese>
11610	11610	<>	<elision3>
11610	11610	<>	<elision2>
11610	11610	<>	<elision1>
11610	48	H	κ
11610	10998	H	k
11610	11002	H	K
11610	11006	H	λ
11610	11613	H	l
11610	11742	H	L
11610	11451	<K>	<>
11611	11609	<>	<aphaerese>
11611	11609	<>	<elision3>
11611	11609	<>	<elision2>
11611	11609	<>	<elision1>
11611	11012	H	κ
11611	11016	H	k
11611	11017	H	K
11611	11008	H	λ
11611	11612	H	l
11611	11741	H	L
11611	11452	<K>	<>
11612	11613	<>	<aphaerese>
11612	11613	<>	<elision3>
11612	11613	<>	<elision2>
11612	11613	<>	<elision1>
11612	11616	<~>	<>
11612	10830	<l2L>	<>
11613	11614	<>	<name>
11613	11613	<>	<aphaerese>
11613	11613	<>	<elision3>
11613	11613	<>	<elision2>
11613	11613	<>	<elision1>
11613	11617	<~>	<>
11613	10828	<l2L>	<>
11614	11612	<>	<aphaerese>
11614	11612	<>	<elision3>
11614	11612	<>	<elision2>
11614	11612	<>	<elision1>
11614	11615	<~>	<>
11614	10829	<l2L>	<>
11615	11616	<>	<aphaerese>
11615	11616	<>	<elision3>
11615	11616	<>	<elision2>
11615	11616	<>	<elision1>
11615	11620	h	K
11615	11736	h	L
11616	11617	<>	<aphaerese>
11616	11617	<>	<elision3>
11616	11617	<>	<elision2>
11616	11617	<>	<elision1>
11616	11618	h	K
11616	11733	h	L
11617	11615	<>	<name>
11617	11617	<>	<aphaerese>
11617	11617	<>	<elision3>
11617	11617	<>	<elision2>
11617	11617	<>	<elision1>
11617	11618	h	K
11617	11733	h	L
11618	11619	<>	<name>
11618	11618	<>	<aphaerese>
11618	11618	<>	<elision3>
11618	11618	<>	<elision2>
11618	11618	<>	<elision1>
11618	11621	.	κ
11618	11621	.	λ
11619	11620	<>	<aphaerese>
11619	11620	<>	<elision3>
11619	11620	<>	<elision2>
11619	11620	<>	<elision1>
11619	11623	.	κ
11619	11623	.	λ
11620	11618	<>	<aphaerese>
11620	11618	<>	<elision3>
11620	11618	<>	<elision2>
11620	11618	<>	<elision1>
11620	11621	.	κ
11620	11621	.	λ
11621	11622	<>	<name>
11621	11621	<>	<aphaerese>
11621	11624	<elision3>	<elision3>
11621	11621	<>	<elision3>
11621	11624	<elision2>	<elision2>
11621	11621	<>	<elision2>
11621	11624	<elision1>	<elision1>
11621	11621	<>	<elision1>
11622	11623	<>	<aphaerese>
11622	11627	<elision3>	<elision3>
11622	11623	<>	<elision3>
11622	11627	<elision2>	<elision2>
11622	11623	<>	<elision2>
11622	11627	<elision1>	<elision1>
11622	11623	<>	<elision1>
11623	11621	<>	<aphaerese>
11623	11624	<elision3>	<elision3>
11623	11621	<>	<elision3>
11623	11624	<elision2>	<elision2>
11623	11621	<>	<elision2>
11623	11624	<elision1>	<elision1>
11623	11621	<>	<elision1>
11624	11624	.	.
11624	11625	 	 
11624	11624	<~>	<~>
11624	11624	<split-s>	<split-s>
11624	11624	<split-h>	<split-h>
11624	11624	<name2>	<name2>
11624	11732	<>	<name>
11624	11628	<aphaerese>	<aphaerese>
11624	11624	<>	<aphaerese>
11624	11624	<elision3>	<elision3>
11624	11624	<>	<elision3>
11624	11624	<elision2>	<elision2>
11624	11624	<>	<elision2>
11624	11624	<elision1>	<elision1>
11624	11624	<>	<elision1>
11624	11621	.	υ
11624	11632	s	υ
11624	11621	.	u
11624	11632	s	u
11624	11647	.	κ
11624	11659	s	κ
11624	11665	s	k
11624	11668	s	U
11624	11719	s	K
11624	11621	.	α
11624	11632	s	α
11624	11621	.	a
11624	11632	s	a
11624	11697	s	A
11624	11665	s	λ
11624	11665	s	l
11624	11726	s	L
11625	11624	.	.
11625	11625	 	 
11625	11624	<~>	<~>
11625	11624	<split-s>	<split-s>
11625	11624	<split-h>	<split-h>
11625	11624	<name2>	<name2>
11625	11626	<>	<name>
11625	11628	<aphaerese>	<aphaerese>
11625	11631	<>	<aphaerese>
11625	11624	<elision3>	<elision3>
11625	11631	<>	<elision3>
11625	11624	<elision2>	<elision2>
11625	11631	<>	<elision2>
11625	11624	<elision1>	<elision1>
11625	11631	<>	<elision1>
11625	11621	.	υ
11625	11708	s	υ
11625	11621	.	u
11625	11708	s	u
11625	11647	.	κ
11625	11709	s	κ
11625	11710	s	k
11625	11711	s	U
11625	11713	s	K
11625	11621	.	α
11625	11708	s	α
11625	11621	.	a
11625	11708	s	a
11625	11715	s	A
11625	11710	s	λ
11625	11710	s	l
11625	11716	s	L
11626	11627	.	.
11626	11630	 	 
11626	11627	<~>	<~>
11626	11627	<split-s>	<split-s>
11626	11627	<split-h>	<split-h>
11626	11627	<name2>	<name2>
11626	11718	<aphaerese>	<aphaerese>
11626	11731	<>	<aphaerese>
11626	11627	<elision3>	<elision3>
11626	11731	<>	<elision3>
11626	11627	<elision2>	<elision2>
11626	11731	<>	<elision2>
11626	11627	<elision1>	<elision1>
11626	11731	<>	<elision1>
11626	11623	.	υ
11626	11646	s	υ
11626	11623	.	u
11626	11646	s	u
11626	11649	.	κ
11626	11661	s	κ
11626	11667	s	k
11626	11670	s	U
11626	11673	s	K
11626	11623	.	α
11626	11646	s	α
11626	11623	.	a
11626	11646	s	a
11626	11699	s	A
11626	11667	s	λ
11626	11667	s	l
11626	11702	s	L
11627	11624	.	.
11627	11625	 	 
11627	11624	<~>	<~>
11627	11624	<split-s>	<split-s>
11627	11624	<split-h>	<split-h>
11627	11624	<name2>	<name2>
11627	11628	<aphaerese>	<aphaerese>
11627	11624	<>	<aphaerese>
11627	11624	<elision3>	<elision3>
11627	11624	<>	<elision3>
11627	11624	<elision2>	<elision2>
11627	11624	<>	<elision2>
11627	11624	<elision1>	<elision1>
11627	11624	<>	<elision1>
11627	11621	.	υ
11627	11632	s	υ
11627	11621	.	u
11627	11632	s	u
11627	11647	.	κ
11627	11659	s	κ
11627	11665	s	k
11627	11668	s	U
11627	11719	s	K
11627	11621	.	α
11627	11632	s	α
11627	11621	.	a
11627	11632	s	a
11627	11697	s	A
11627	11665	s	λ
11627	11665	s	l
11627	11726	s	L
11628	11624	.	.
11628	11625	 	 
11628	11624	<~>	<~>
11628	11624	<split-s>	<split-s>
11628	11624	<split-h>	<split-h>
11628	11624	<name2>	<name2>
11628	11629	<>	<name>
11628	11628	<aphaerese>	<aphaerese>
11628	11628	<>	<aphaerese>
11628	11624	<elision3>	<elision3>
11628	11628	<>	<elision3>
11628	11624	<elision2>	<elision2>
11628	11628	<>	<elision2>
11628	11624	<elision1>	<elision1>
11628	11628	<>	<elision1>
11628	11624	.	υ
11628	11624	.	u
11628	11647	.	κ
11628	11659	s	κ
11628	11665	s	k
11628	11668	s	U
11628	11719	s	K
11628	11624	.	α
11628	11624	.	a
11628	11697	s	A
11628	11665	s	λ
11628	11665	s	l
11628	11726	s	L
11629	11627	.	.
11629	11630	 	 
11629	11627	<~>	<~>
11629	11627	<split-s>	<split-s>
11629	11627	<split-h>	<split-h>
11629	11627	<name2>	<name2>
11629	11718	<aphaerese>	<aphaerese>
11629	11718	<>	<aphaerese>
11629	11627	<elision3>	<elision3>
11629	11718	<>	<elision3>
11629	11627	<elision2>	<elision2>
11629	11718	<>	<elision2>
11629	11627	<elision1>	<elision1>
11629	11718	<>	<elision1>
11629	11627	.	υ
11629	11627	.	u
11629	11649	.	κ
11629	11661	s	κ
11629	11667	s	k
11629	11670	s	U
11629	11721	s	K
11629	11627	.	α
11629	11627	.	a
11629	11699	s	A
11629	11667	s	λ
11629	11667	s	l
11629	11728	s	L
11630	11624	.	.
11630	11625	 	 
11630	11624	<~>	<~>
11630	11624	<split-s>	<split-s>
11630	11624	<split-h>	<split-h>
11630	11624	<name2>	<name2>
11630	11628	<aphaerese>	<aphaerese>
11630	11631	<>	<aphaerese>
11630	11624	<elision3>	<elision3>
11630	11631	<>	<elision3>
11630	11624	<elision2>	<elision2>
11630	11631	<>	<elision2>
11630	11624	<elision1>	<elision1>
11630	11631	<>	<elision1>
11630	11621	.	υ
11630	11708	s	υ
11630	11621	.	u
11630	11708	s	u
11630	11647	.	κ
11630	11709	s	κ
11630	11710	s	k
11630	11711	s	U
11630	11713	s	K
11630	11621	.	α
11630	11708	s	α
11630	11621	.	a
11630	11708	s	a
11630	11715	s	A
11630	11710	s	λ
11630	11710	s	l
11630	11716	s	L
11631	11624	.	.
11631	11625	 	 
11631	11624	<~>	<~>
11631	11624	<split-s>	<split-s>
11631	11624	<split-h>	<split-h>
11631	11624	<name2>	<name2>
11631	11626	<>	<name>
11631	11628	<aphaerese>	<aphaerese>
11631	11631	<>	<aphaerese>
11631	11624	<elision3>	<elision3>
11631	11631	<>	<elision3>
11631	11624	<elision2>	<elision2>
11631	11631	<>	<elision2>
11631	11624	<elision1>	<elision1>
11631	11631	<>	<elision1>
11631	11621	.	υ
11631	11632	s	υ
11631	11621	.	u
11631	11632	s	u
11631	11647	.	κ
11631	11659	s	κ
11631	11665	s	k
11631	11668	s	U
11631	11671	s	K
11631	11621	.	α
11631	11632	s	α
11631	11621	.	a
11631	11632	s	a
11631	11697	s	A
11631	11665	s	λ
11631	11665	s	l
11631	11700	s	L
11632	11633	.	.
11632	11633	 	 
11632	11633	<~>	<~>
11632	11633	<split-s>	<split-s>
11632	11633	<split-h>	<split-h>
11632	11633	<name2>	<name2>
11632	11645	<>	<name>
11632	11636	<aphaerese>	<aphaerese>
11632	11632	<>	<aphaerese>
11632	11632	<>	<elision3>
11632	11632	<>	<elision2>
11632	11632	<>	<elision1>
11632	11642	.	υ
11632	11642	.	u
11632	11639	.	κ
11632	11642	.	α
11632	11642	.	a
11632	10150	<3s>	<>
11633	11633	.	.
11633	11633	 	 
11633	11633	<~>	<~>
11633	11633	<split-s>	<split-s>
11633	11633	<split-h>	<split-h>
11633	11633	<name2>	<name2>
11633	11634	<>	<name>
11633	11636	<aphaerese>	<aphaerese>
11633	11633	<>	<aphaerese>
11633	11633	<elision3>	<elision3>
11633	11633	<>	<elision3>
11633	11633	<elision2>	<elision2>
11633	11633	<>	<elision2>
11633	11633	<elision1>	<elision1>
11633	11633	<>	<elision1>
11633	11642	.	υ
11633	11642	.	u
11633	11639	.	κ
11633	11642	.	α
11633	11642	.	a
11633	10145	<3s>	<>
11634	11635	.	.
11634	11635	 	 
11634	11635	<~>	<~>
11634	11635	<split-s>	<split-s>
11634	11635	<split-h>	<split-h>
11634	11635	<name2>	<name2>
11634	11638	<aphaerese>	<aphaerese>
11634	11635	<>	<aphaerese>
11634	11635	<elision3>	<elision3>
11634	11635	<>	<elision3>
11634	11635	<elision2>	<elision2>
11634	11635	<>	<elision2>
11634	11635	<elision1>	<elision1>
11634	11635	<>	<elision1>
11634	11644	.	υ
11634	11644	.	u
11634	11641	.	κ
11634	11644	.	α
11634	11644	.	a
11634	10146	<3s>	<>
11635	11633	.	.
11635	11633	 	 
11635	11633	<~>	<~>
11635	11633	<split-s>	<split-s>
11635	11633	<split-h>	<split-h>
11635	11633	<name2>	<name2>
11635	11636	<aphaerese>	<aphaerese>
11635	11633	<>	<aphaerese>
11635	11633	<elision3>	<elision3>
11635	11633	<>	<elision3>
11635	11633	<elision2>	<elision2>
11635	11633	<>	<elision2>
11635	11633	<elision1>	<elision1>
11635	11633	<>	<elision1>
11635	11642	.	υ
11635	11642	.	u
11635	11639	.	κ
11635	11642	.	α
11635	11642	.	a
11635	10144	<3s>	<>
11636	11633	.	.
11636	11633	 	 
11636	11633	<~>	<~>
11636	11633	<split-s>	<split-s>
11636	11633	<split-h>	<split-h>
11636	11633	<name2>	<name2>
11636	11637	<>	<name>
11636	11636	<aphaerese>	<aphaerese>
11636	11636	<>	<aphaerese>
11636	11633	<elision3>	<elision3>
11636	11636	<>	<elision3>
11636	11633	<elision2>	<elision2>
11636	11636	<>	<elision2>
11636	11633	<elision1>	<elision1>
11636	11636	<>	<elision1>
11636	11633	.	υ
11636	11633	.	u
11636	11639	.	κ
11636	11633	.	α
11636	11633	.	a
11636	10132	<3s>	<>
11637	11635	.	.
11637	11635	 	 
11637	11635	<~>	<~>
11637	11635	<split-s>	<split-s>
11637	11635	<split-h>	<split-h>
11637	11635	<name2>	<name2>
11637	11638	<aphaerese>	<aphaerese>
11637	11638	<>	<aphaerese>
11637	11635	<elision3>	<elision3>
11637	11638	<>	<elision3>
11637	11635	<elision2>	<elision2>
11637	11638	<>	<elision2>
11637	11635	<elision1>	<elision1>
11637	11638	<>	<elision1>
11637	11635	.	υ
11637	11635	.	u
11637	11641	.	κ
11637	11635	.	α
11637	11635	.	a
11637	10133	<3s>	<>
11638	11633	.	.
11638	11633	 	 
11638	11633	<~>	<~>
11638	11633	<split-s>	<split-s>
11638	11633	<split-h>	<split-h>
11638	11633	<name2>	<name2>
11638	11636	<aphaerese>	<aphaerese>
11638	11636	<>	<aphaerese>
11638	11633	<elision3>	<elision3>
11638	11636	<>	<elision3>
11638	11633	<elision2>	<elision2>
11638	11636	<>	<elision2>
11638	11633	<elision1>	<elision1>
11638	11636	<>	<elision1>
11638	11633	.	υ
11638	11633	.	u
11638	11639	.	κ
11638	11633	.	α
11638	11633	.	a
11638	10131	<3s>	<>
11639	11640	<>	<name>
11639	11639	<>	<aphaerese>
11639	10221	<elision3>	<elision3>
11639	11639	<>	<elision3>
11639	10221	<elision2>	<elision2>
11639	11639	<>	<elision2>
11639	10221	<elision1>	<elision1>
11639	11639	<>	<elision1>
11639	10129	<3s>	<>
11640	11641	<>	<aphaerese>
11640	10220	<elision3>	<elision3>
11640	11641	<>	<elision3>
11640	10220	<elision2>	<elision2>
11640	11641	<>	<elision2>
11640	10220	<elision1>	<elision1>
11640	11641	<>	<elision1>
11640	10130	<3s>	<>
11641	11639	<>	<aphaerese>
11641	10221	<elision3>	<elision3>
11641	11639	<>	<elision3>
11641	10221	<elision2>	<elision2>
11641	11639	<>	<elision2>
11641	10221	<elision1>	<elision1>
11641	11639	<>	<elision1>
11641	10128	<3s>	<>
11642	11643	<>	<name>
11642	11642	<>	<aphaerese>
11642	11633	<elision3>	<elision3>
11642	11642	<>	<elision3>
11642	11633	<elision2>	<elision2>
11642	11642	<>	<elision2>
11642	11633	<elision1>	<elision1>
11642	11642	<>	<elision1>
11642	68	<3s>	<>
11643	11644	<>	<aphaerese>
11643	11635	<elision3>	<elision3>
11643	11644	<>	<elision3>
11643	11635	<elision2>	<elision2>
11643	11644	<>	<elision2>
11643	11635	<elision1>	<elision1>
11643	11644	<>	<elision1>
11643	69	<3s>	<>
11644	11642	<>	<aphaerese>
11644	11633	<elision3>	<elision3>
11644	11642	<>	<elision3>
11644	11633	<elision2>	<elision2>
11644	11642	<>	<elision2>
11644	11633	<elision1>	<elision1>
11644	11642	<>	<elision1>
11644	67	<3s>	<>
11645	11635	.	.
11645	11635	 	 
11645	11635	<~>	<~>
11645	11635	<split-s>	<split-s>
11645	11635	<split-h>	<split-h>
11645	11635	<name2>	<name2>
11645	11638	<aphaerese>	<aphaerese>
11645	11646	<>	<aphaerese>
11645	11646	<>	<elision3>
11645	11646	<>	<elision2>
11645	11646	<>	<elision1>
11645	11644	.	υ
11645	11644	.	u
11645	11641	.	κ
11645	11644	.	α
11645	11644	.	a
11645	10151	<3s>	<>
11646	11633	.	.
11646	11633	 	 
11646	11633	<~>	<~>
11646	11633	<split-s>	<split-s>
11646	11633	<split-h>	<split-h>
11646	11633	<name2>	<name2>
11646	11636	<aphaerese>	<aphaerese>
11646	11632	<>	<aphaerese>
11646	11632	<>	<elision3>
11646	11632	<>	<elision2>
11646	11632	<>	<elision1>
11646	11642	.	υ
11646	11642	.	u
11646	11639	.	κ
11646	11642	.	α
11646	11642	.	a
11646	10149	<3s>	<>
11647	11648	<>	<name>
11647	11647	<>	<aphaerese>
11647	11650	<elision3>	<elision3>
11647	11647	<>	<elision3>
11647	11650	<elision2>	<elision2>
11647	11647	<>	<elision2>
11647	11650	<elision1>	<elision1>
11647	11647	<>	<elision1>
11648	11649	<>	<aphaerese>
11648	11652	<elision3>	<elision3>
11648	11649	<>	<elision3>
11648	11652	<elision2>	<elision2>
11648	11649	<>	<elision2>
11648	11652	<elision1>	<elision1>
11648	11649	<>	<elision1>
11649	11647	<>	<aphaerese>
11649	11650	<elision3>	<elision3>
11649	11647	<>	<elision3>
11649	11650	<elision2>	<elision2>
11649	11647	<>	<elision2>
11649	11650	<elision1>	<elision1>
11649	11647	<>	<elision1>
11650	11651	<>	<name>
11650	11650	<>	<aphaerese>
11650	11650	<>	<elision3>
11650	11650	<>	<elision2>
11650	11650	<>	<elision1>
11650	10562	s	κ
11650	10562	s	k
11650	11653	s	K
11650	10562	s	λ
11650	10562	s	l
11650	11656	s	L
11651	11652	<>	<aphaerese>
11651	11652	<>	<elision3>
11651	11652	<>	<elision2>
11651	11652	<>	<elision1>
11651	10561	s	κ
11651	10561	s	k
11651	11655	s	K
11651	10561	s	λ
11651	10561	s	l
11651	11658	s	L
11652	11650	<>	<aphaerese>
11652	11650	<>	<elision3>
11652	11650	<>	<elision2>
11652	11650	<>	<elision1>
11652	10562	s	κ
11652	10562	s	k
11652	11653	s	K
11652	10562	s	λ
11652	10562	s	l
11652	11656	s	L
11653	11654	<>	<name>
11653	11653	<>	<aphaerese>
11653	11653	<>	<elision3>
11653	11653	<>	<elision2>
11653	11653	<>	<elision1>
11653	10562	<K2kl>	<>
11654	11655	<>	<aphaerese>
11654	11655	<>	<elision3>
11654	11655	<>	<elision2>
11654	11655	<>	<elision1>
11654	10563	<K2kl>	<>
11655	11653	<>	<aphaerese>
11655	11653	<>	<elision3>
11655	11653	<>	<elision2>
11655	11653	<>	<elision1>
11655	10561	<K2kl>	<>
11656	11657	<>	<name>
11656	11656	<>	<aphaerese>
11656	11656	<>	<elision3>
11656	11656	<>	<elision2>
11656	11656	<>	<elision1>
11656	10562	<L2kl>	<>
11657	11658	<>	<aphaerese>
11657	11658	<>	<elision3>
11657	11658	<>	<elision2>
11657	11658	<>	<elision1>
11657	10563	<L2kl>	<>
11658	11656	<>	<aphaerese>
11658	11656	<>	<elision3>
11658	11656	<>	<elision2>
11658	11656	<>	<elision1>
11658	10561	<L2kl>	<>
11659	11633	.	.
11659	11633	 	 
11659	11633	<~>	<~>
11659	11633	<split-s>	<split-s>
11659	11633	<split-h>	<split-h>
11659	11633	<name2>	<name2>
11659	11660	<>	<name>
11659	11636	<aphaerese>	<aphaerese>
11659	11659	<>	<aphaerese>
11659	11662	<elision3>	<elision3>
11659	11659	<>	<elision3>
11659	11662	<elision2>	<elision2>
11659	11659	<>	<elision2>
11659	11662	<elision1>	<elision1>
11659	11659	<>	<elision1>
11659	11642	.	υ
11659	11642	.	u
11659	11642	.	κ
11659	11642	.	α
11659	11642	.	a
11659	11642	.	λ
11659	10330	<3s>	<>
11660	11635	.	.
11660	11635	 	 
11660	11635	<~>	<~>
11660	11635	<split-s>	<split-s>
11660	11635	<split-h>	<split-h>
11660	11635	<name2>	<name2>
11660	11638	<aphaerese>	<aphaerese>
11660	11661	<>	<aphaerese>
11660	11664	<elision3>	<elision3>
11660	11661	<>	<elision3>
11660	11664	<elision2>	<elision2>
11660	11661	<>	<elision2>
11660	11664	<elision1>	<elision1>
11660	11661	<>	<elision1>
11660	11644	.	υ
11660	11644	.	u
11660	11644	.	κ
11660	11644	.	α
11660	11644	.	a
11660	11644	.	λ
11660	10331	<3s>	<>
11661	11633	.	.
11661	11633	 	 
11661	11633	<~>	<~>
11661	11633	<split-s>	<split-s>
11661	11633	<split-h>	<split-h>
11661	11633	<name2>	<name2>
11661	11636	<aphaerese>	<aphaerese>
11661	11659	<>	<aphaerese>
11661	11662	<elision3>	<elision3>
11661	11659	<>	<elision3>
11661	11662	<elision2>	<elision2>
11661	11659	<>	<elision2>
11661	11662	<elision1>	<elision1>
11661	11659	<>	<elision1>
11661	11642	.	υ
11661	11642	.	u
11661	11642	.	κ
11661	11642	.	α
11661	11642	.	a
11661	11642	.	λ
11661	10329	<3s>	<>
11662	11633	.	.
11662	11633	 	 
11662	11633	<~>	<~>
11662	11633	<split-s>	<split-s>
11662	11633	<split-h>	<split-h>
11662	11633	<name2>	<name2>
11662	11663	<>	<name>
11662	11636	<aphaerese>	<aphaerese>
11662	11662	<>	<aphaerese>
11662	11633	<elision3>	<elision3>
11662	11662	<>	<elision3>
11662	11633	<elision2>	<elision2>
11662	11662	<>	<elision2>
11662	11633	<elision1>	<elision1>
11662	11662	<>	<elision1>
11662	11642	.	υ
11662	11642	.	u
11662	11639	.	κ
11662	11642	.	α
11662	11642	.	a
11662	10233	<3s>	<>
11663	11635	.	.
11663	11635	 	 
11663	11635	<~>	<~>
11663	11635	<split-s>	<split-s>
11663	11635	<split-h>	<split-h>
11663	11635	<name2>	<name2>
11663	11638	<aphaerese>	<aphaerese>
11663	11664	<>	<aphaerese>
11663	11635	<elision3>	<elision3>
11663	11664	<>	<elision3>
11663	11635	<elision2>	<elision2>
11663	11664	<>	<elision2>
11663	11635	<elision1>	<elision1>
11663	11664	<>	<elision1>
11663	11644	.	υ
11663	11644	.	u
11663	11641	.	κ
11663	11644	.	α
11663	11644	.	a
11663	10234	<3s>	<>
11664	11633	.	.
11664	11633	 	 
11664	11633	<~>	<~>
11664	11633	<split-s>	<split-s>
11664	11633	<split-h>	<split-h>
11664	11633	<name2>	<name2>
11664	11636	<aphaerese>	<aphaerese>
11664	11662	<>	<aphaerese>
11664	11633	<elision3>	<elision3>
11664	11662	<>	<elision3>
11664	11633	<elision2>	<elision2>
11664	11662	<>	<elision2>
11664	11633	<elision1>	<elision1>
11664	11662	<>	<elision1>
11664	11642	.	υ
11664	11642	.	u
11664	11639	.	κ
11664	11642	.	α
11664	11642	.	a
11664	10232	<3s>	<>
11665	11633	.	.
11665	11633	 	 
11665	11633	<~>	<~>
11665	11633	<split-s>	<split-s>
11665	11633	<split-h>	<split-h>
11665	11633	<name2>	<name2>
11665	11666	<>	<name>
11665	11636	<aphaerese>	<aphaerese>
11665	11665	<>	<aphaerese>
11665	11633	<elision3>	<elision3>
11665	11665	<>	<elision3>
11665	11633	<elision2>	<elision2>
11665	11665	<>	<elision2>
11665	11633	<elision1>	<elision1>
11665	11665	<>	<elision1>
11665	11642	.	υ
11665	11642	.	u
11665	11642	.	κ
11665	11642	.	α
11665	11642	.	a
11665	11642	.	λ
11665	10342	<3s>	<>
11666	11635	.	.
11666	11635	 	 
11666	11635	<~>	<~>
11666	11635	<split-s>	<split-s>
11666	11635	<split-h>	<split-h>
11666	11635	<name2>	<name2>
11666	11638	<aphaerese>	<aphaerese>
11666	11667	<>	<aphaerese>
11666	11635	<elision3>	<elision3>
11666	11667	<>	<elision3>
11666	11635	<elision2>	<elision2>
11666	11667	<>	<elision2>
11666	11635	<elision1>	<elision1>
11666	11667	<>	<elision1>
11666	11644	.	υ
11666	11644	.	u
11666	11644	.	κ
11666	11644	.	α
11666	11644	.	a
11666	11644	.	λ
11666	10343	<3s>	<>
11667	11633	.	.
11667	11633	 	 
11667	11633	<~>	<~>
11667	11633	<split-s>	<split-s>
11667	11633	<split-h>	<split-h>
11667	11633	<name2>	<name2>
11667	11636	<aphaerese>	<aphaerese>
11667	11665	<>	<aphaerese>
11667	11633	<elision3>	<elision3>
11667	11665	<>	<elision3>
11667	11633	<elision2>	<elision2>
11667	11665	<>	<elision2>
11667	11633	<elision1>	<elision1>
11667	11665	<>	<elision1>
11667	11642	.	υ
11667	11642	.	u
11667	11642	.	κ
11667	11642	.	α
11667	11642	.	a
11667	11642	.	λ
11667	10341	<3s>	<>
11668	11669	<>	<name>
11668	11668	<>	<aphaerese>
11668	11668	<>	<elision3>
11668	11668	<>	<elision2>
11668	11668	<>	<elision1>
11668	11633	<U2kl>	<>
11669	11670	<>	<aphaerese>
11669	11670	<>	<elision3>
11669	11670	<>	<elision2>
11669	11670	<>	<elision1>
11669	11634	<U2kl>	<>
11670	11668	<>	<aphaerese>
11670	11668	<>	<elision3>
11670	11668	<>	<elision2>
11670	11668	<>	<elision1>
11670	11635	<U2kl>	<>
11671	10652	<name>	<name>
11671	11672	<>	<name>
11671	11674	<>	<aphaerese>
11671	11674	<>	<elision3>
11671	11674	<>	<elision2>
11671	11674	<>	<elision1>
11671	10462	<3s>	<>
11671	11675	<A2kl>	<>
11671	11684	<L2kl>	<>
11671	11696	<K2kl>	<>
11672	11673	<>	<aphaerese>
11672	11673	<>	<elision3>
11672	11673	<>	<elision2>
11672	11673	<>	<elision1>
11672	11676	<A2kl>	<>
11672	11685	<L2kl>	<>
11672	11694	<K2kl>	<>
11673	11674	<>	<aphaerese>
11673	11674	<>	<elision3>
11673	11674	<>	<elision2>
11673	11674	<>	<elision1>
11673	11677	<A2kl>	<>
11673	11686	<L2kl>	<>
11673	11695	<K2kl>	<>
11674	11672	<>	<name>
11674	11674	<>	<aphaerese>
11674	11674	<>	<elision3>
11674	11674	<>	<elision2>
11674	11674	<>	<elision1>
11674	11675	<A2kl>	<>
11674	11684	<L2kl>	<>
11674	11693	<K2kl>	<>
11675	11676	<>	<name>
11675	11675	<>	<aphaerese>
11675	11675	<>	<elision3>
11675	11675	<>	<elision2>
11675	11675	<>	<elision1>
11675	11678	.	κ
11675	11678	.	λ
11675	10412	<3s>	<>
11676	11677	<>	<aphaerese>
11676	11677	<>	<elision3>
11676	11677	<>	<elision2>
11676	11677	<>	<elision1>
11676	11680	.	κ
11676	11680	.	λ
11676	10413	<3s>	<>
11677	11675	<>	<aphaerese>
11677	11675	<>	<elision3>
11677	11675	<>	<elision2>
11677	11675	<>	<elision1>
11677	11678	.	κ
11677	11678	.	λ
11677	10411	<3s>	<>
11678	11679	<>	<name>
11678	11678	<>	<aphaerese>
11678	11681	<elision3>	<elision3>
11678	11678	<>	<elision3>
11678	11681	<elision2>	<elision2>
11678	11678	<>	<elision2>
11678	11681	<elision1>	<elision1>
11678	11678	<>	<elision1>
11678	10403	<3s>	<>
11679	11680	<>	<aphaerese>
11679	11683	<elision3>	<elision3>
11679	11680	<>	<elision3>
11679	11683	<elision2>	<elision2>
11679	11680	<>	<elision2>
11679	11683	<elision1>	<elision1>
11679	11680	<>	<elision1>
11679	10404	<3s>	<>
11680	11678	<>	<aphaerese>
11680	11681	<elision3>	<elision3>
11680	11678	<>	<elision3>
11680	11681	<elision2>	<elision2>
11680	11678	<>	<elision2>
11680	11681	<elision1>	<elision1>
11680	11678	<>	<elision1>
11680	10402	<3s>	<>
11681	11633	.	.
11681	11633	 	 
11681	11633	<~>	<~>
11681	11633	<split-s>	<split-s>
11681	11633	<split-h>	<split-h>
11681	11633	<name2>	<name2>
11681	11682	<>	<name>
11681	11636	<aphaerese>	<aphaerese>
11681	11681	<>	<aphaerese>
11681	11633	<elision3>	<elision3>
11681	11681	<>	<elision3>
11681	11633	<elision2>	<elision2>
11681	11681	<>	<elision2>
11681	11633	<elision1>	<elision1>
11681	11681	<>	<elision1>
11681	11642	.	υ
11681	11642	.	u
11681	11642	.	α
11681	11642	.	a
11681	10367	<3s>	<>
11682	11635	.	.
11682	11635	 	 
11682	11635	<~>	<~>
11682	11635	<split-s>	<split-s>
11682	11635	<split-h>	<split-h>
11682	11635	<name2>	<name2>
11682	11638	<aphaerese>	<aphaerese>
11682	11683	<>	<aphaerese>
11682	11635	<elision3>	<elision3>
11682	11683	<>	<elision3>
11682	11635	<elision2>	<elision2>
11682	11683	<>	<elision2>
11682	11635	<elision1>	<elision1>
11682	11683	<>	<elision1>
11682	11644	.	υ
11682	11644	.	u
11682	11644	.	α
11682	11644	.	a
11682	10368	<3s>	<>
11683	11633	.	.
11683	11633	 	 
11683	11633	<~>	<~>
11683	11633	<split-s>	<split-s>
11683	11633	<split-h>	<split-h>
11683	11633	<name2>	<name2>
11683	11636	<aphaerese>	<aphaerese>
11683	11681	<>	<aphaerese>
11683	11633	<elision3>	<elision3>
11683	11681	<>	<elision3>
11683	11633	<elision2>	<elision2>
11683	11681	<>	<elision2>
11683	11633	<elision1>	<elision1>
11683	11681	<>	<elision1>
11683	11642	.	υ
11683	11642	.	u
11683	11642	.	α
11683	11642	.	a
11683	10366	<3s>	<>
11684	11685	<>	<name>
11684	11684	<>	<aphaerese>
11684	11684	<>	<elision3>
11684	11684	<>	<elision2>
11684	11684	<>	<elision1>
11684	11687	.	κ
11684	11687	.	λ
11684	10445	<3s>	<>
11685	11686	<>	<aphaerese>
11685	11686	<>	<elision3>
11685	11686	<>	<elision2>
11685	11686	<>	<elision1>
11685	11689	.	κ
11685	11689	.	λ
11685	10446	<3s>	<>
11686	11684	<>	<aphaerese>
11686	11684	<>	<elision3>
11686	11684	<>	<elision2>
11686	11684	<>	<elision1>
11686	11687	.	κ
11686	11687	.	λ
11686	10444	<3s>	<>
11687	11688	<>	<name>
11687	11687	<>	<aphaerese>
11687	11690	<elision3>	<elision3>
11687	11687	<>	<elision3>
11687	11690	<elision2>	<elision2>
11687	11687	<>	<elision2>
11687	11690	<elision1>	<elision1>
11687	11687	<>	<elision1>
11687	10436	<3s>	<>
11688	11689	<>	<aphaerese>
11688	11692	<elision3>	<elision3>
11688	11689	<>	<elision3>
11688	11692	<elision2>	<elision2>
11688	11689	<>	<elision2>
11688	11692	<elision1>	<elision1>
11688	11689	<>	<elision1>
11688	10437	<3s>	<>
11689	11687	<>	<aphaerese>
11689	11690	<elision3>	<elision3>
11689	11687	<>	<elision3>
11689	11690	<elision2>	<elision2>
11689	11687	<>	<elision2>
11689	11690	<elision1>	<elision1>
11689	11687	<>	<elision1>
11689	10435	<3s>	<>
11690	11691	<>	<name>
11690	11690	<>	<aphaerese>
11690	11690	<>	<elision3>
11690	11690	<>	<elision2>
11690	11690	<>	<elision1>
11690	11639	.	κ
11690	10430	<3s>	<>
11691	11692	<>	<aphaerese>
11691	11692	<>	<elision3>
11691	11692	<>	<elision2>
11691	11692	<>	<elision1>
11691	11641	.	κ
11691	10431	<3s>	<>
11692	11690	<>	<aphaerese>
11692	11690	<>	<elision3>
11692	11690	<>	<elision2>
11692	11690	<>	<elision1>
11692	11639	.	κ
11692	10429	<3s>	<>
11693	11633	.	.
11693	11633	 	 
11693	11633	<~>	<~>
11693	11633	<split-s>	<split-s>
11693	11633	<split-h>	<split-h>
11693	11633	<name2>	<name2>
11693	11694	<>	<name>
11693	11636	<aphaerese>	<aphaerese>
11693	11693	<>	<aphaerese>
11693	11633	<elision3>	<elision3>
11693	11693	<>	<elision3>
11693	11633	<elision2>	<elision2>
11693	11693	<>	<elision2>
11693	11633	<elision1>	<elision1>
11693	11693	<>	<elision1>
11693	11642	.	υ
11693	11642	.	u
11693	11642	.	α
11693	11642	.	a
11693	10457	<3s>	<>
11694	11635	.	.
11694	11635	 	 
11694	11635	<~>	<~>
11694	11635	<split-s>	<split-s>
11694	11635	<split-h>	<split-h>
11694	11635	<name2>	<name2>
11694	11638	<aphaerese>	<aphaerese>
11694	11695	<>	<aphaerese>
11694	11635	<elision3>	<elision3>
11694	11695	<>	<elision3>
11694	11635	<elision2>	<elision2>
11694	11695	<>	<elision2>
11694	11635	<elision1>	<elision1>
11694	11695	<>	<elision1>
11694	11644	.	υ
11694	11644	.	u
11694	11644	.	α
11694	11644	.	a
11694	10458	<3s>	<>
11695	11633	.	.
11695	11633	 	 
11695	11633	<~>	<~>
11695	11633	<split-s>	<split-s>
11695	11633	<split-h>	<split-h>
11695	11633	<name2>	<name2>
11695	11636	<aphaerese>	<aphaerese>
11695	11693	<>	<aphaerese>
11695	11633	<elision3>	<elision3>
11695	11693	<>	<elision3>
11695	11633	<elision2>	<elision2>
11695	11693	<>	<elision2>
11695	11633	<elision1>	<elision1>
11695	11693	<>	<elision1>
11695	11642	.	υ
11695	11642	.	u
11695	11642	.	α
11695	11642	.	a
11695	10456	<3s>	<>
11696	11633	.	.
11696	11633	 	 
11696	11633	<~>	<~>
11696	11633	<split-s>	<split-s>
11696	11633	<split-h>	<split-h>
11696	11633	<name2>	<name2>
11696	10652	<name2>	<name>
11696	11694	<>	<name>
11696	11636	<aphaerese>	<aphaerese>
11696	11693	<>	<aphaerese>
11696	11633	<elision3>	<elision3>
11696	11693	<>	<elision3>
11696	11633	<elision2>	<elision2>
11696	11693	<>	<elision2>
11696	11633	<elision1>	<elision1>
11696	11693	<>	<elision1>
11696	11642	.	υ
11696	11642	.	u
11696	11642	.	α
11696	11642	.	a
11696	10466	<3s>	<>
11697	11698	<>	<name>
11697	11697	<>	<aphaerese>
11697	11697	<>	<elision3>
11697	11697	<>	<elision2>
11697	11697	<>	<elision1>
11697	11633	<A2kl>	<>
11698	11699	<>	<aphaerese>
11698	11699	<>	<elision3>
11698	11699	<>	<elision2>
11698	11699	<>	<elision1>
11698	11634	<A2kl>	<>
11699	11697	<>	<aphaerese>
11699	11697	<>	<elision3>
11699	11697	<>	<elision2>
11699	11697	<>	<elision1>
11699	11635	<A2kl>	<>
11700	10652	<name>	<name>
11700	11701	<>	<name>
11700	11703	<>	<aphaerese>
11700	11703	<>	<elision3>
11700	11703	<>	<elision2>
11700	11703	<>	<elision1>
11700	10462	<3s>	<>
11700	11675	<A2kl>	<>
11700	11707	<L2kl>	<>
11701	11702	<>	<aphaerese>
11701	11702	<>	<elision3>
11701	11702	<>	<elision2>
11701	11702	<>	<elision1>
11701	11676	<A2kl>	<>
11701	11705	<L2kl>	<>
11702	11703	<>	<aphaerese>
11702	11703	<>	<elision3>
11702	11703	<>	<elision2>
11702	11703	<>	<elision1>
11702	11677	<A2kl>	<>
11702	11706	<L2kl>	<>
11703	11701	<>	<name>
11703	11703	<>	<aphaerese>
11703	11703	<>	<elision3>
11703	11703	<>	<elision2>
11703	11703	<>	<elision1>
11703	11675	<A2kl>	<>
11703	11704	<L2kl>	<>
11704	11633	.	.
11704	11633	 	 
11704	11633	<~>	<~>
11704	11633	<split-s>	<split-s>
11704	11633	<split-h>	<split-h>
11704	11633	<name2>	<name2>
11704	11705	<>	<name>
11704	11636	<aphaerese>	<aphaerese>
11704	11704	<>	<aphaerese>
11704	11633	<elision3>	<elision3>
11704	11704	<>	<elision3>
11704	11633	<elision2>	<elision2>
11704	11704	<>	<elision2>
11704	11633	<elision1>	<elision1>
11704	11704	<>	<elision1>
11704	11642	.	υ
11704	11642	.	u
11704	11687	.	κ
11704	11642	.	α
11704	11642	.	a
11704	11687	.	λ
11704	10479	<3s>	<>
11705	11635	.	.
11705	11635	 	 
11705	11635	<~>	<~>
11705	11635	<split-s>	<split-s>
11705	11635	<split-h>	<split-h>
11705	11635	<name2>	<name2>
11705	11638	<aphaerese>	<aphaerese>
11705	11706	<>	<aphaerese>
11705	11635	<elision3>	<elision3>
11705	11706	<>	<elision3>
11705	11635	<elision2>	<elision2>
11705	11706	<>	<elision2>
11705	11635	<elision1>	<elision1>
11705	11706	<>	<elision1>
11705	11644	.	υ
11705	11644	.	u
11705	11689	.	κ
11705	11644	.	α
11705	11644	.	a
11705	11689	.	λ
11705	10480	<3s>	<>
11706	11633	.	.
11706	11633	 	 
11706	11633	<~>	<~>
11706	11633	<split-s>	<split-s>
11706	11633	<split-h>	<split-h>
11706	11633	<name2>	<name2>
11706	11636	<aphaerese>	<aphaerese>
11706	11704	<>	<aphaerese>
11706	11633	<elision3>	<elision3>
11706	11704	<>	<elision3>
11706	11633	<elision2>	<elision2>
11706	11704	<>	<elision2>
11706	11633	<elision1>	<elision1>
11706	11704	<>	<elision1>
11706	11642	.	υ
11706	11642	.	u
11706	11687	.	κ
11706	11642	.	α
11706	11642	.	a
11706	11687	.	λ
11706	10478	<3s>	<>
11707	11633	.	.
11707	11633	 	 
11707	11633	<~>	<~>
11707	11633	<split-s>	<split-s>
11707	11633	<split-h>	<split-h>
11707	11633	<name2>	<name2>
11707	10652	<name2>	<name>
11707	11705	<>	<name>
11707	11636	<aphaerese>	<aphaerese>
11707	11704	<>	<aphaerese>
11707	11633	<elision3>	<elision3>
11707	11704	<>	<elision3>
11707	11633	<elision2>	<elision2>
11707	11704	<>	<elision2>
11707	11633	<elision1>	<elision1>
11707	11704	<>	<elision1>
11707	11642	.	υ
11707	11642	.	u
11707	11687	.	κ
11707	11642	.	α
11707	11642	.	a
11707	11687	.	λ
11707	10485	<3s>	<>
11708	11633	.	.
11708	11633	 	 
11708	11633	<~>	<~>
11708	11633	<split-s>	<split-s>
11708	11633	<split-h>	<split-h>
11708	11633	<name2>	<name2>
11708	11645	<>	<name>
11708	11636	<aphaerese>	<aphaerese>
11708	11632	<>	<aphaerese>
11708	11632	<>	<elision3>
11708	11632	<>	<elision2>
11708	11632	<>	<elision1>
11708	11642	.	υ
11708	11642	.	u
11708	11639	.	κ
11708	11642	.	α
11708	11642	.	a
11708	10491	<3s>	<>
11709	11633	.	.
11709	11633	 	 
11709	11633	<~>	<~>
11709	11633	<split-s>	<split-s>
11709	11633	<split-h>	<split-h>
11709	11633	<name2>	<name2>
11709	11660	<>	<name>
11709	11636	<aphaerese>	<aphaerese>
11709	11659	<>	<aphaerese>
11709	11662	<elision3>	<elision3>
11709	11659	<>	<elision3>
11709	11662	<elision2>	<elision2>
11709	11659	<>	<elision2>
11709	11662	<elision1>	<elision1>
11709	11659	<>	<elision1>
11709	11642	.	υ
11709	11642	.	u
11709	11642	.	κ
11709	11642	.	α
11709	11642	.	a
11709	11642	.	λ
11709	10494	<3s>	<>
11710	11633	.	.
11710	11633	 	 
11710	11633	<~>	<~>
11710	11633	<split-s>	<split-s>
11710	11633	<split-h>	<split-h>
11710	11633	<name2>	<name2>
11710	11666	<>	<name>
11710	11636	<aphaerese>	<aphaerese>
11710	11665	<>	<aphaerese>
11710	11633	<elision3>	<elision3>
11710	11665	<>	<elision3>
11710	11633	<elision2>	<elision2>
11710	11665	<>	<elision2>
11710	11633	<elision1>	<elision1>
11710	11665	<>	<elision1>
11710	11642	.	υ
11710	11642	.	u
11710	11642	.	κ
11710	11642	.	α
11710	11642	.	a
11710	11642	.	λ
11710	10497	<3s>	<>
11711	11669	<>	<name>
11711	11668	<>	<aphaerese>
11711	11668	<>	<elision3>
11711	11668	<>	<elision2>
11711	11668	<>	<elision1>
11711	11712	<U2kl>	<>
11712	11633	.	.
11712	11633	 	 
11712	11633	<~>	<~>
11712	11633	<split-s>	<split-s>
11712	11633	<split-h>	<split-h>
11712	11633	<name2>	<name2>
11712	11634	<>	<name>
11712	11636	<aphaerese>	<aphaerese>
11712	11633	<>	<aphaerese>
11712	11633	<elision3>	<elision3>
11712	11633	<>	<elision3>
11712	11633	<elision2>	<elision2>
11712	11633	<>	<elision2>
11712	11633	<elision1>	<elision1>
11712	11633	<>	<elision1>
11712	11642	.	υ
11712	11642	.	u
11712	11639	.	κ
11712	11642	.	α
11712	11642	.	a
11712	10501	<3s>	<>
11713	10652	<name>	<name>
11713	11672	<>	<name>
11713	11674	<>	<aphaerese>
11713	11674	<>	<elision3>
11713	11674	<>	<elision2>
11713	11674	<>	<elision1>
11713	10462	<3s>	<>
11713	11675	<A2kl>	<>
11713	11684	<L2kl>	<>
11713	11714	<K2kl>	<>
11714	11633	.	.
11714	11633	 	 
11714	11633	<~>	<~>
11714	11633	<split-s>	<split-s>
11714	11633	<split-h>	<split-h>
11714	11633	<name2>	<name2>
11714	10652	<name2>	<name>
11714	11694	<>	<name>
11714	11636	<aphaerese>	<aphaerese>
11714	11693	<>	<aphaerese>
11714	11633	<elision3>	<elision3>
11714	11693	<>	<elision3>
11714	11633	<elision2>	<elision2>
11714	11693	<>	<elision2>
11714	11633	<elision1>	<elision1>
11714	11693	<>	<elision1>
11714	11642	.	υ
11714	11642	.	u
11714	11642	.	α
11714	11642	.	a
11714	10505	<3s>	<>
11715	11698	<>	<name>
11715	11697	<>	<aphaerese>
11715	11697	<>	<elision3>
11715	11697	<>	<elision2>
11715	11697	<>	<elision1>
11715	11712	<A2kl>	<>
11716	10652	<name>	<name>
11716	11701	<>	<name>
11716	11703	<>	<aphaerese>
11716	11703	<>	<elision3>
11716	11703	<>	<elision2>
11716	11703	<>	<elision1>
11716	10462	<3s>	<>
11716	11675	<A2kl>	<>
11716	11717	<L2kl>	<>
11717	11633	.	.
11717	11633	 	 
11717	11633	<~>	<~>
11717	11633	<split-s>	<split-s>
11717	11633	<split-h>	<split-h>
11717	11633	<name2>	<name2>
11717	10652	<name2>	<name>
11717	11705	<>	<name>
11717	11636	<aphaerese>	<aphaerese>
11717	11704	<>	<aphaerese>
11717	11633	<elision3>	<elision3>
11717	11704	<>	<elision3>
11717	11633	<elision2>	<elision2>
11717	11704	<>	<elision2>
11717	11633	<elision1>	<elision1>
11717	11704	<>	<elision1>
11717	11642	.	υ
11717	11642	.	u
11717	11687	.	κ
11717	11642	.	α
11717	11642	.	a
11717	11687	.	λ
11717	10510	<3s>	<>
11718	11624	.	.
11718	11625	 	 
11718	11624	<~>	<~>
11718	11624	<split-s>	<split-s>
11718	11624	<split-h>	<split-h>
11718	11624	<name2>	<name2>
11718	11628	<aphaerese>	<aphaerese>
11718	11628	<>	<aphaerese>
11718	11624	<elision3>	<elision3>
11718	11628	<>	<elision3>
11718	11624	<elision2>	<elision2>
11718	11628	<>	<elision2>
11718	11624	<elision1>	<elision1>
11718	11628	<>	<elision1>
11718	11624	.	υ
11718	11624	.	u
11718	11647	.	κ
11718	11659	s	κ
11718	11665	s	k
11718	11668	s	U
11718	11719	s	K
11718	11624	.	α
11718	11624	.	a
11718	11697	s	A
11718	11665	s	λ
11718	11665	s	l
11718	11726	s	L
11719	10652	<name>	<name>
11719	11720	<>	<name>
11719	11722	<>	<aphaerese>
11719	11722	<>	<elision3>
11719	11722	<>	<elision2>
11719	11722	<>	<elision1>
11719	10462	<3s>	<>
11719	11723	<L2kl>	<>
11719	11696	<K2kl>	<>
11720	11721	<>	<aphaerese>
11720	11721	<>	<elision3>
11720	11721	<>	<elision2>
11720	11721	<>	<elision1>
11720	11724	<L2kl>	<>
11720	11694	<K2kl>	<>
11721	11722	<>	<aphaerese>
11721	11722	<>	<elision3>
11721	11722	<>	<elision2>
11721	11722	<>	<elision1>
11721	11725	<L2kl>	<>
11721	11695	<K2kl>	<>
11722	11720	<>	<name>
11722	11722	<>	<aphaerese>
11722	11722	<>	<elision3>
11722	11722	<>	<elision2>
11722	11722	<>	<elision1>
11722	11723	<L2kl>	<>
11722	11693	<K2kl>	<>
11723	11724	<>	<name>
11723	11723	<>	<aphaerese>
11723	11723	<>	<elision3>
11723	11723	<>	<elision2>
11723	11723	<>	<elision1>
11723	11642	.	κ
11723	11642	.	λ
11723	10521	<3s>	<>
11724	11725	<>	<aphaerese>
11724	11725	<>	<elision3>
11724	11725	<>	<elision2>
11724	11725	<>	<elision1>
11724	11644	.	κ
11724	11644	.	λ
11724	10522	<3s>	<>
11725	11723	<>	<aphaerese>
11725	11723	<>	<elision3>
11725	11723	<>	<elision2>
11725	11723	<>	<elision1>
11725	11642	.	κ
11725	11642	.	λ
11725	10520	<3s>	<>
11726	10652	<name>	<name>
11726	11727	<>	<name>
11726	11729	<>	<aphaerese>
11726	11729	<>	<elision3>
11726	11729	<>	<elision2>
11726	11729	<>	<elision1>
11726	10462	<3s>	<>
11726	11730	<L2kl>	<>
11727	11728	<>	<aphaerese>
11727	11728	<>	<elision3>
11727	11728	<>	<elision2>
11727	11728	<>	<elision1>
11727	11666	<L2kl>	<>
11728	11729	<>	<aphaerese>
11728	11729	<>	<elision3>
11728	11729	<>	<elision2>
11728	11729	<>	<elision1>
11728	11667	<L2kl>	<>
11729	11727	<>	<name>
11729	11729	<>	<aphaerese>
11729	11729	<>	<elision3>
11729	11729	<>	<elision2>
11729	11729	<>	<elision1>
11729	11665	<L2kl>	<>
11730	11633	.	.
11730	11633	 	 
11730	11633	<~>	<~>
11730	11633	<split-s>	<split-s>
11730	11633	<split-h>	<split-h>
11730	11633	<name2>	<name2>
11730	10652	<name2>	<name>
11730	11666	<>	<name>
11730	11636	<aphaerese>	<aphaerese>
11730	11665	<>	<aphaerese>
11730	11633	<elision3>	<elision3>
11730	11665	<>	<elision3>
11730	11633	<elision2>	<elision2>
11730	11665	<>	<elision2>
11730	11633	<elision1>	<elision1>
11730	11665	<>	<elision1>
11730	11642	.	υ
11730	11642	.	u
11730	11642	.	κ
11730	11642	.	α
11730	11642	.	a
11730	11642	.	λ
11730	10531	<3s>	<>
11731	11624	.	.
11731	11625	 	 
11731	11624	<~>	<~>
11731	11624	<split-s>	<split-s>
11731	11624	<split-h>	<split-h>
11731	11624	<name2>	<name2>
11731	11628	<aphaerese>	<aphaerese>
11731	11631	<>	<aphaerese>
11731	11624	<elision3>	<elision3>
11731	11631	<>	<elision3>
11731	11624	<elision2>	<elision2>
11731	11631	<>	<elision2>
11731	11624	<elision1>	<elision1>
11731	11631	<>	<elision1>
11731	11621	.	υ
11731	11632	s	υ
11731	11621	.	u
11731	11632	s	u
11731	11647	.	κ
11731	11659	s	κ
11731	11665	s	k
11731	11668	s	U
11731	11671	s	K
11731	11621	.	α
11731	11632	s	α
11731	11621	.	a
11731	11632	s	a
11731	11697	s	A
11731	11665	s	λ
11731	11665	s	l
11731	11700	s	L
11732	11627	.	.
11732	11630	 	 
11732	11627	<~>	<~>
11732	11627	<split-s>	<split-s>
11732	11627	<split-h>	<split-h>
11732	11627	<name2>	<name2>
11732	11718	<aphaerese>	<aphaerese>
11732	11627	<>	<aphaerese>
11732	11627	<elision3>	<elision3>
11732	11627	<>	<elision3>
11732	11627	<elision2>	<elision2>
11732	11627	<>	<elision2>
11732	11627	<elision1>	<elision1>
11732	11627	<>	<elision1>
11732	11623	.	υ
11732	11646	s	υ
11732	11623	.	u
11732	11646	s	u
11732	11649	.	κ
11732	11661	s	κ
11732	11667	s	k
11732	11670	s	U
11732	11721	s	K
11732	11623	.	α
11732	11646	s	α
11732	11623	.	a
11732	11646	s	a
11732	11699	s	A
11732	11667	s	λ
11732	11667	s	l
11732	11728	s	L
11733	11624	.	.
11733	11625	 	 
11733	11624	<~>	<~>
11733	11624	<split-s>	<split-s>
11733	11624	<split-h>	<split-h>
11733	11624	<name2>	<name2>
11733	11734	<name2>	<name>
11733	11735	<>	<name>
11733	11628	<aphaerese>	<aphaerese>
11733	11737	<>	<aphaerese>
11733	11624	<elision3>	<elision3>
11733	11737	<>	<elision3>
11733	11624	<elision2>	<elision2>
11733	11737	<>	<elision2>
11733	11624	<elision1>	<elision1>
11733	11737	<>	<elision1>
11733	11621	.	υ
11733	11632	s	υ
11733	11621	.	u
11733	11632	s	u
11733	11621	.	κ
11733	11738	s	κ
11733	11665	s	k
11733	11668	s	U
11733	11719	s	K
11733	11621	.	α
11733	11632	s	α
11733	11621	.	a
11733	11632	s	a
11733	11697	s	A
11733	11621	.	λ
11733	11738	s	λ
11733	11665	s	l
11733	11726	s	L
11734	11721	s	k
11734	11728	s	l
11735	11627	.	.
11735	11630	 	 
11735	11627	<~>	<~>
11735	11627	<split-s>	<split-s>
11735	11627	<split-h>	<split-h>
11735	11627	<name2>	<name2>
11735	11718	<aphaerese>	<aphaerese>
11735	11736	<>	<aphaerese>
11735	11627	<elision3>	<elision3>
11735	11736	<>	<elision3>
11735	11627	<elision2>	<elision2>
11735	11736	<>	<elision2>
11735	11627	<elision1>	<elision1>
11735	11736	<>	<elision1>
11735	11623	.	υ
11735	11646	s	υ
11735	11623	.	u
11735	11646	s	u
11735	11623	.	κ
11735	11740	s	κ
11735	11667	s	k
11735	11670	s	U
11735	11721	s	K
11735	11623	.	α
11735	11646	s	α
11735	11623	.	a
11735	11646	s	a
11735	11699	s	A
11735	11623	.	λ
11735	11740	s	λ
11735	11667	s	l
11735	11728	s	L
11736	11624	.	.
11736	11625	 	 
11736	11624	<~>	<~>
11736	11624	<split-s>	<split-s>
11736	11624	<split-h>	<split-h>
11736	11624	<name2>	<name2>
11736	11628	<aphaerese>	<aphaerese>
11736	11737	<>	<aphaerese>
11736	11624	<elision3>	<elision3>
11736	11737	<>	<elision3>
11736	11624	<elision2>	<elision2>
11736	11737	<>	<elision2>
11736	11624	<elision1>	<elision1>
11736	11737	<>	<elision1>
11736	11621	.	υ
11736	11632	s	υ
11736	11621	.	u
11736	11632	s	u
11736	11621	.	κ
11736	11738	s	κ
11736	11665	s	k
11736	11668	s	U
11736	11719	s	K
11736	11621	.	α
11736	11632	s	α
11736	11621	.	a
11736	11632	s	a
11736	11697	s	A
11736	11621	.	λ
11736	11738	s	λ
11736	11665	s	l
11736	11726	s	L
11737	11624	.	.
11737	11625	 	 
11737	11624	<~>	<~>
11737	11624	<split-s>	<split-s>
11737	11624	<split-h>	<split-h>
11737	11624	<name2>	<name2>
11737	11735	<>	<name>
11737	11628	<aphaerese>	<aphaerese>
11737	11737	<>	<aphaerese>
11737	11624	<elision3>	<elision3>
11737	11737	<>	<elision3>
11737	11624	<elision2>	<elision2>
11737	11737	<>	<elision2>
11737	11624	<elision1>	<elision1>
11737	11737	<>	<elision1>
11737	11621	.	υ
11737	11632	s	υ
11737	11621	.	u
11737	11632	s	u
11737	11621	.	κ
11737	11738	s	κ
11737	11665	s	k
11737	11668	s	U
11737	11719	s	K
11737	11621	.	α
11737	11632	s	α
11737	11621	.	a
11737	11632	s	a
11737	11697	s	A
11737	11621	.	λ
11737	11738	s	λ
11737	11665	s	l
11737	11726	s	L
11738	11633	.	.
11738	11633	 	 
11738	11633	<~>	<~>
11738	11633	<split-s>	<split-s>
11738	11633	<split-h>	<split-h>
11738	11633	<name2>	<name2>
11738	11739	<>	<name>
11738	11636	<aphaerese>	<aphaerese>
11738	11738	<>	<aphaerese>
11738	11738	<>	<elision3>
11738	11738	<>	<elision2>
11738	11738	<>	<elision1>
11738	11642	.	υ
11738	11642	.	u
11738	11642	.	κ
11738	11642	.	α
11738	11642	.	a
11738	11642	.	λ
11738	10556	<3s>	<>
11739	11635	.	.
11739	11635	 	 
11739	11635	<~>	<~>
11739	11635	<split-s>	<split-s>
11739	11635	<split-h>	<split-h>
11739	11635	<name2>	<name2>
11739	11638	<aphaerese>	<aphaerese>
11739	11740	<>	<aphaerese>
11739	11740	<>	<elision3>
11739	11740	<>	<elision2>
11739	11740	<>	<elision1>
11739	11644	.	υ
11739	11644	.	u
11739	11644	.	κ
11739	11644	.	α
11739	11644	.	a
11739	11644	.	λ
11739	10557	<3s>	<>
11740	11633	.	.
11740	11633	 	 
11740	11633	<~>	<~>
11740	11633	<split-s>	<split-s>
11740	11633	<split-h>	<split-h>
11740	11633	<name2>	<name2>
11740	11636	<aphaerese>	<aphaerese>
11740	11738	<>	<aphaerese>
11740	11738	<>	<elision3>
11740	11738	<>	<elision2>
11740	11738	<>	<elision1>
11740	11642	.	υ
11740	11642	.	u
11740	11642	.	κ
11740	11642	.	α
11740	11642	.	a
11740	11642	.	λ
11740	10555	<3s>	<>
11741	11742	<>	<aphaerese>
11741	11742	<>	<elision3>
11741	11742	<>	<elision2>
11741	11742	<>	<elision1>
11741	10831	s	κ
11741	10956	s	k
11741	10974	s	K
11741	10831	s	λ
11741	10987	s	l
11741	10990	s	L
11741	10164	<1s>	<>
11741	11745	<~>	<>
11742	11743	<>	<name>
11742	11742	<>	<aphaerese>
11742	11742	<>	<elision3>
11742	11742	<>	<elision2>
11742	11742	<>	<elision1>
11742	10831	s	κ
11742	10956	s	k
11742	10974	s	K
11742	10831	s	λ
11742	10987	s	l
11742	10990	s	L
11742	10165	<1s>	<>
11742	11746	<~>	<>
11743	11741	<>	<aphaerese>
11743	11741	<>	<elision3>
11743	11741	<>	<elision2>
11743	11741	<>	<elision1>
11743	10952	s	κ
11743	10958	s	k
11743	10977	s	K
11743	10952	s	λ
11743	10989	s	l
11743	10992	s	L
11743	10166	<1s>	<>
11743	11744	<~>	<>
11744	11745	<>	<aphaerese>
11744	11745	<>	<elision3>
11744	11745	<>	<elision2>
11744	11745	<>	<elision1>
11744	11620	h	k
11744	11620	h	K
11744	11736	h	l
11744	11736	h	L
11745	11746	<>	<aphaerese>
11745	11746	<>	<elision3>
11745	11746	<>	<elision2>
11745	11746	<>	<elision1>
11745	11618	h	k
11745	11618	h	K
11745	11737	h	l
11745	11747	h	L
11746	11744	<>	<name>
11746	11746	<>	<aphaerese>
11746	11746	<>	<elision3>
11746	11746	<>	<elision2>
11746	11746	<>	<elision1>
11746	11618	h	k
11746	11618	h	K
11746	11737	h	l
11746	11747	h	L
11747	11624	.	.
11747	11625	 	 
11747	11624	<~>	<~>
11747	11624	<split-s>	<split-s>
11747	11624	<split-h>	<split-h>
11747	11624	<name2>	<name2>
11747	11734	<name2>	<name>
11747	11734	<name>	<name>
11747	11735	<>	<name>
11747	11628	<aphaerese>	<aphaerese>
11747	11737	<>	<aphaerese>
11747	11624	<elision3>	<elision3>
11747	11737	<>	<elision3>
11747	11624	<elision2>	<elision2>
11747	11737	<>	<elision2>
11747	11624	<elision1>	<elision1>
11747	11737	<>	<elision1>
11747	11621	.	υ
11747	11632	s	υ
11747	11621	.	u
11747	11632	s	u
11747	11621	.	κ
11747	11738	s	κ
11747	11665	s	k
11747	11668	s	U
11747	11719	s	K
11747	11621	.	α
11747	11632	s	α
11747	11621	.	a
11747	11632	s	a
11747	11697	s	A
11747	11621	.	λ
11747	11738	s	λ
11747	11665	s	l
11747	11726	s	L
11748	11749	<>	<aphaerese>
11748	45	<elision3>	<elision3>
11748	11749	<>	<elision3>
11748	45	<elision2>	<elision2>
11748	11749	<>	<elision2>
11748	45	<elision1>	<elision1>
11748	11749	<>	<elision1>
11748	11450	<K>	<>
11749	11750	<>	<name>
11749	11749	<>	<aphaerese>
11749	45	<elision3>	<elision3>
11749	11749	<>	<elision3>
11749	45	<elision2>	<elision2>
11749	11749	<>	<elision2>
11749	45	<elision1>	<elision1>
11749	11749	<>	<elision1>
11749	11448	<K>	<>
11750	11748	<>	<aphaerese>
11750	47	<elision3>	<elision3>
11750	11748	<>	<elision3>
11750	47	<elision2>	<elision2>
11750	11748	<>	<elision2>
11750	47	<elision1>	<elision1>
11750	11748	<>	<elision1>
11750	11449	<K>	<>
11751	35	.	.
11751	36	 	 
11751	35	<~>	<~>
11751	35	<split-s>	<split-s>
11751	35	<split-h>	<split-h>
11751	35	<name2>	<name2>
11751	39	<aphaerese>	<aphaerese>
11751	11752	<>	<aphaerese>
11751	35	<elision3>	<elision3>
11751	11752	<>	<elision3>
11751	35	<elision2>	<elision2>
11751	11752	<>	<elision2>
11751	35	<elision1>	<elision1>
11751	11752	<>	<elision1>
11751	35	.	υ
11751	35	.	u
11751	42	.	κ
11751	11018	H	κ
11751	11346	H	k
11751	11359	H	U
11751	11362	H	K
11751	35	.	α
11751	35	.	a
11751	11189	H	A
11751	11373	H	λ
11751	11755	H	l
11751	11760	H	L
11751	11447	<K>	<>
11752	35	.	.
11752	36	 	 
11752	35	<~>	<~>
11752	35	<split-s>	<split-s>
11752	35	<split-h>	<split-h>
11752	35	<name2>	<name2>
11752	11753	<>	<name>
11752	39	<aphaerese>	<aphaerese>
11752	11752	<>	<aphaerese>
11752	35	<elision3>	<elision3>
11752	11752	<>	<elision3>
11752	35	<elision2>	<elision2>
11752	11752	<>	<elision2>
11752	35	<elision1>	<elision1>
11752	11752	<>	<elision1>
11752	35	.	υ
11752	35	.	u
11752	42	.	κ
11752	11018	H	κ
11752	11346	H	k
11752	11359	H	U
11752	11362	H	K
11752	35	.	α
11752	35	.	a
11752	11189	H	A
11752	11373	H	λ
11752	11755	H	l
11752	11760	H	L
11752	11445	<K>	<>
11753	34	.	.
11753	38	 	 
11753	34	<~>	<~>
11753	34	<split-s>	<split-s>
11753	34	<split-h>	<split-h>
11753	34	<name2>	<name2>
11753	41	<aphaerese>	<aphaerese>
11753	11751	<>	<aphaerese>
11753	34	<elision3>	<elision3>
11753	11751	<>	<elision3>
11753	34	<elision2>	<elision2>
11753	11751	<>	<elision2>
11753	34	<elision1>	<elision1>
11753	11751	<>	<elision1>
11753	34	.	υ
11753	34	.	u
11753	44	.	κ
11753	11383	H	κ
11753	11387	H	k
11753	11361	H	U
11753	11391	H	K
11753	34	.	α
11753	34	.	a
11753	11192	H	A
11753	11375	H	λ
11753	11754	H	l
11753	11757	H	L
11753	11446	<K>	<>
11754	11755	<>	<aphaerese>
11754	11755	<>	<elision3>
11754	11755	<>	<elision2>
11754	11755	<>	<elision1>
11754	11616	<~>	<>
11754	11376	<l2L>	<>
11755	11756	<>	<name>
11755	11755	<>	<aphaerese>
11755	11755	<>	<elision3>
11755	11755	<>	<elision2>
11755	11755	<>	<elision1>
11755	11617	<~>	<>
11755	11377	<l2L>	<>
11756	11754	<>	<aphaerese>
11756	11754	<>	<elision3>
11756	11754	<>	<elision2>
11756	11754	<>	<elision1>
11756	11615	<~>	<>
11756	11378	<l2L>	<>
11757	11189	.	.
11757	11190	 	 
11757	11189	<~>	<~>
11757	11189	<split-s>	<split-s>
11757	11189	<split-h>	<split-h>
11757	11189	<name2>	<name2>
11757	11193	<aphaerese>	<aphaerese>
11757	11758	<>	<aphaerese>
11757	11189	<elision3>	<elision3>
11757	11758	<>	<elision3>
11757	11189	<elision2>	<elision2>
11757	11758	<>	<elision2>
11757	11189	<elision1>	<elision1>
11757	11758	<>	<elision1>
11757	11197	.	υ
11757	11200	s	υ
11757	11197	.	u
11757	11200	s	u
11757	11197	.	κ
11757	10831	s	κ
11757	10956	s	k
11757	11246	s	U
11757	10974	s	K
11757	11197	.	α
11757	11271	s	α
11757	11197	.	a
11757	11271	s	a
11757	11274	s	A
11757	11197	.	λ
11757	10831	s	λ
11757	10987	s	l
11757	10990	s	L
11757	10341	<1s>	<>
11757	11745	<~>	<>
11758	11189	.	.
11758	11190	 	 
11758	11189	<~>	<~>
11758	11189	<split-s>	<split-s>
11758	11189	<split-h>	<split-h>
11758	11189	<name2>	<name2>
11758	11759	<>	<name>
11758	11193	<aphaerese>	<aphaerese>
11758	11758	<>	<aphaerese>
11758	11189	<elision3>	<elision3>
11758	11758	<>	<elision3>
11758	11189	<elision2>	<elision2>
11758	11758	<>	<elision2>
11758	11189	<elision1>	<elision1>
11758	11758	<>	<elision1>
11758	11197	.	υ
11758	11200	s	υ
11758	11197	.	u
11758	11200	s	u
11758	11197	.	κ
11758	10831	s	κ
11758	10956	s	k
11758	11246	s	U
11758	10974	s	K
11758	11197	.	α
11758	11271	s	α
11758	11197	.	a
11758	11271	s	a
11758	11274	s	A
11758	11197	.	λ
11758	10831	s	λ
11758	10987	s	l
11758	10990	s	L
11758	10342	<1s>	<>
11758	11746	<~>	<>
11759	11192	.	.
11759	11195	 	 
11759	11192	<~>	<~>
11759	11192	<split-s>	<split-s>
11759	11192	<split-h>	<split-h>
11759	11192	<name2>	<name2>
11759	11301	<aphaerese>	<aphaerese>
11759	11757	<>	<aphaerese>
11759	11192	<elision3>	<elision3>
11759	11757	<>	<elision3>
11759	11192	<elision2>	<elision2>
11759	11757	<>	<elision2>
11759	11192	<elision1>	<elision1>
11759	11757	<>	<elision1>
11759	11199	.	υ
11759	11202	s	υ
11759	11199	.	u
11759	11202	s	u
11759	11199	.	κ
11759	10952	s	κ
11759	10958	s	k
11759	11248	s	U
11759	10977	s	K
11759	11199	.	α
11759	11273	s	α
11759	11199	.	a
11759	11273	s	a
11759	11276	s	A
11759	11199	.	λ
11759	10952	s	λ
11759	10989	s	l
11759	10992	s	L
11759	10343	<1s>	<>
11759	11744	<~>	<>
11760	11189	.	.
11760	11190	 	 
11760	11189	<~>	<~>
11760	11189	<split-s>	<split-s>
11760	11189	<split-h>	<split-h>
11760	11189	<name2>	<name2>
11760	11369	<name2>	<name>
11760	11759	<>	<name>
11760	11193	<aphaerese>	<aphaerese>
11760	11758	<>	<aphaerese>
11760	11189	<elision3>	<elision3>
11760	11758	<>	<elision3>
11760	11189	<elision2>	<elision2>
11760	11758	<>	<elision2>
11760	11189	<elision1>	<elision1>
11760	11758	<>	<elision1>
11760	11197	.	υ
11760	11200	s	υ
11760	11197	.	u
11760	11200	s	u
11760	11197	.	κ
11760	10831	s	κ
11760	10956	s	k
11760	11246	s	U
11760	10974	s	K
11760	11197	.	α
11760	11271	s	α
11760	11197	.	a
11760	11271	s	a
11760	11274	s	A
11760	11197	.	λ
11760	10831	s	λ
11760	10987	s	l
11760	10990	s	L
11760	10531	<1s>	<>
11760	11746	<~>	<>
11760	11368	<l2L>	<>
11761	11762	<>	<name>
11761	11761	<>	<aphaerese>
11761	11597	<elision3>	<elision3>
11761	11761	<>	<elision3>
11761	11597	<elision2>	<elision2>
11761	11761	<>	<elision2>
11761	11597	<elision1>	<elision1>
11761	11761	<>	<elision1>
11761	32	<A4>	<>
11762	11763	<>	<aphaerese>
11762	11599	<elision3>	<elision3>
11762	11763	<>	<elision3>
11762	11599	<elision2>	<elision2>
11762	11763	<>	<elision2>
11762	11599	<elision1>	<elision1>
11762	11763	<>	<elision1>
11762	33	<A4>	<>
11763	11761	<>	<aphaerese>
11763	11597	<elision3>	<elision3>
11763	11761	<>	<elision3>
11763	11597	<elision2>	<elision2>
11763	11761	<>	<elision2>
11763	11597	<elision1>	<elision1>
11763	11761	<>	<elision1>
11763	31	<A4>	<>
11764	35	.	.
11764	36	 	 
11764	35	<~>	<~>
11764	35	<split-s>	<split-s>
11764	35	<split-h>	<split-h>
11764	35	<name2>	<name2>
11764	39	<aphaerese>	<aphaerese>
11764	11765	<>	<aphaerese>
11764	35	<elision3>	<elision3>
11764	11765	<>	<elision3>
11764	35	<elision2>	<elision2>
11764	11765	<>	<elision2>
11764	35	<elision1>	<elision1>
11764	11765	<>	<elision1>
11764	11392	.	υ
11764	11436	H	υ
11764	11392	.	u
11764	11438	H	u
11764	42	.	κ
11764	11018	H	κ
11764	11346	H	k
11764	11359	H	U
11764	11362	H	K
11764	11392	.	α
11764	11422	H	α
11764	11392	.	a
11764	11427	H	a
11764	11189	H	A
11764	11373	H	λ
11764	11755	H	l
11764	11760	H	L
11764	11444	<K>	<>
11765	35	.	.
11765	36	 	 
11765	35	<~>	<~>
11765	35	<split-s>	<split-s>
11765	35	<split-h>	<split-h>
11765	35	<name2>	<name2>
11765	11766	<>	<name>
11765	39	<aphaerese>	<aphaerese>
11765	11765	<>	<aphaerese>
11765	35	<elision3>	<elision3>
11765	11765	<>	<elision3>
11765	35	<elision2>	<elision2>
11765	11765	<>	<elision2>
11765	35	<elision1>	<elision1>
11765	11765	<>	<elision1>
11765	11392	.	υ
11765	11436	H	υ
11765	11392	.	u
11765	11438	H	u
11765	42	.	κ
11765	11018	H	κ
11765	11346	H	k
11765	11359	H	U
11765	11362	H	K
11765	11392	.	α
11765	11422	H	α
11765	11392	.	a
11765	11427	H	a
11765	11189	H	A
11765	11373	H	λ
11765	11755	H	l
11765	11760	H	L
11765	11442	<K>	<>
11766	34	.	.
11766	38	 	 
11766	34	<~>	<~>
11766	34	<split-s>	<split-s>
11766	34	<split-h>	<split-h>
11766	34	<name2>	<name2>
11766	41	<aphaerese>	<aphaerese>
11766	11764	<>	<aphaerese>
11766	34	<elision3>	<elision3>
11766	11764	<>	<elision3>
11766	34	<elision2>	<elision2>
11766	11764	<>	<elision2>
11766	34	<elision1>	<elision1>
11766	11764	<>	<elision1>
11766	11394	.	υ
11766	11431	H	υ
11766	11394	.	u
11766	11435	H	u
11766	44	.	κ
11766	11383	H	κ
11766	11387	H	k
11766	11361	H	U
11766	11391	H	K
11766	11394	.	α
11766	11421	H	α
11766	11394	.	a
11766	11426	H	a
11766	11192	H	A
11766	11375	H	λ
11766	11754	H	l
11766	11757	H	L
11766	11443	<K>	<>
11767	11599	.	.
11767	11599	 	 
11767	11599	<~>	<~>
11767	11599	<split-s>	<split-s>
11767	11599	<split-h>	<split-h>
11767	11599	<name2>	<name2>
11767	11602	<aphaerese>	<aphaerese>
11767	11768	<>	<aphaerese>
11767	11768	<>	<elision3>
11767	11768	<>	<elision2>
11767	11768	<>	<elision1>
11767	11763	.	υ
11767	11763	.	u
11767	11605	.	κ
11767	11763	.	α
11767	11763	.	a
11767	11771	<A4>	<>
11768	11597	.	.
11768	11597	 	 
11768	11597	<~>	<~>
11768	11597	<split-s>	<split-s>
11768	11597	<split-h>	<split-h>
11768	11597	<name2>	<name2>
11768	11600	<aphaerese>	<aphaerese>
11768	11596	<>	<aphaerese>
11768	11596	<>	<elision3>
11768	11596	<>	<elision2>
11768	11596	<>	<elision1>
11768	11761	.	υ
11768	11761	.	u
11768	11603	.	κ
11768	11761	.	α
11768	11761	.	a
11768	11769	<A4>	<>
11769	35	.	.
11769	36	 	 
11769	35	<~>	<~>
11769	35	<split-s>	<split-s>
11769	35	<split-h>	<split-h>
11769	35	<name2>	<name2>
11769	39	<aphaerese>	<aphaerese>
11769	11770	<>	<aphaerese>
11769	11770	<>	<elision3>
11769	11770	<>	<elision2>
11769	11770	<>	<elision1>
11769	11392	.	υ
11769	11436	H	υ
11769	11392	.	u
11769	11438	H	u
11769	42	.	κ
11769	11018	H	κ
11769	11346	H	k
11769	11359	H	U
11769	11362	H	K
11769	11392	.	α
11769	11422	H	α
11769	11392	.	a
11769	11427	H	a
11769	11189	H	A
11769	11373	H	λ
11769	11755	H	l
11769	11760	H	L
11769	11773	<K>	<>
11770	35	.	.
11770	36	 	 
11770	35	<~>	<~>
11770	35	<split-s>	<split-s>
11770	35	<split-h>	<split-h>
11770	35	<name2>	<name2>
11770	11771	<>	<name>
11770	39	<aphaerese>	<aphaerese>
11770	11770	<>	<aphaerese>
11770	11770	<>	<elision3>
11770	11770	<>	<elision2>
11770	11770	<>	<elision1>
11770	11392	.	υ
11770	11436	H	υ
11770	11392	.	u
11770	11438	H	u
11770	42	.	κ
11770	11018	H	κ
11770	11346	H	k
11770	11359	H	U
11770	11362	H	K
11770	11392	.	α
11770	11422	H	α
11770	11392	.	a
11770	11427	H	a
11770	11189	H	A
11770	11373	H	λ
11770	11755	H	l
11770	11760	H	L
11770	11774	<K>	<>
11771	34	.	.
11771	38	 	 
11771	34	<~>	<~>
11771	34	<split-s>	<split-s>
11771	34	<split-h>	<split-h>
11771	34	<name2>	<name2>
11771	41	<aphaerese>	<aphaerese>
11771	11769	<>	<aphaerese>
11771	11769	<>	<elision3>
11771	11769	<>	<elision2>
11771	11769	<>	<elision1>
11771	11394	.	υ
11771	11431	H	υ
11771	11394	.	u
11771	11435	H	u
11771	44	.	κ
11771	11383	H	κ
11771	11387	H	k
11771	11361	H	U
11771	11391	H	K
11771	11394	.	α
11771	11421	H	α
11771	11394	.	a
11771	11426	H	a
11771	11192	H	A
11771	11375	H	λ
11771	11754	H	l
11771	11757	H	L
11771	11772	<K>	<>
11772	11444	.	.
11772	11444	<~>	<~>
11772	11444	<split-s>	<split-s>
11772	11444	<split-h>	<split-h>
11772	11444	<name2>	<name2>
11772	11447	<aphaerese>	<aphaerese>
11772	11773	<>	<aphaerese>
11772	11773	<>	<elision3>
11772	11773	<>	<elision2>
11772	11773	<>	<elision1>
11772	11440	.	υ
11772	11568	H	υ
11772	11440	.	u
11772	11577	H	u
11772	11450	.	κ
11772	11492	H	κ
11772	11537	H	k
11772	11546	H	U
11772	11550	H	K
11772	11440	.	α
11772	11580	H	α
11772	11440	.	a
11772	11583	H	a
11772	11520	H	A
11772	11558	H	λ
11772	11564	H	l
11772	11559	H	L
11773	11442	.	.
11773	11442	<~>	<~>
11773	11442	<split-s>	<split-s>
11773	11442	<split-h>	<split-h>
11773	11442	<name2>	<name2>
11773	11445	<aphaerese>	<aphaerese>
11773	11774	<>	<aphaerese>
11773	11774	<>	<elision3>
11773	11774	<>	<elision2>
11773	11774	<>	<elision1>
11773	11441	.	υ
11773	11566	H	υ
11773	11441	.	u
11773	11575	H	u
11773	11448	.	κ
11773	11490	H	κ
11773	11535	H	k
11773	11544	H	U
11773	11547	H	K
11773	11441	.	α
11773	11578	H	α
11773	11441	.	a
11773	11581	H	a
11773	11518	H	A
11773	11556	H	λ
11773	11562	H	l
11773	11565	H	L
11774	11442	.	.
11774	11442	<~>	<~>
11774	11442	<split-s>	<split-s>
11774	11442	<split-h>	<split-h>
11774	11442	<name2>	<name2>
11774	11772	<>	<name>
11774	11445	<aphaerese>	<aphaerese>
11774	11774	<>	<aphaerese>
11774	11774	<>	<elision3>
11774	11774	<>	<elision2>
11774	11774	<>	<elision1>
11774	11441	.	υ
11774	11566	H	υ
11774	11441	.	u
11774	11575	H	u
11774	11448	.	κ
11774	11490	H	κ
11774	11535	H	k
11774	11544	H	U
11774	11547	H	K
11774	11441	.	α
11774	11578	H	α
11774	11441	.	a
11774	11581	H	a
11774	11518	H	A
11774	11556	H	λ
11774	11562	H	l
11774	11565	H	L
11775	11776	<>	<name>
11775	11775	<>	<aphaerese>
11775	11778	<elision3>	<elision3>
11775	11775	<>	<elision3>
11775	11778	<elision2>	<elision2>
11775	11775	<>	<elision2>
11775	11778	<elision1>	<elision1>
11775	11775	<>	<elision1>
11775	11749	<A3>	<>
11776	11777	<>	<aphaerese>
11776	11780	<elision3>	<elision3>
11776	11777	<>	<elision3>
11776	11780	<elision2>	<elision2>
11776	11777	<>	<elision2>
11776	11780	<elision1>	<elision1>
11776	11777	<>	<elision1>
11776	11750	<A3>	<>
11777	11775	<>	<aphaerese>
11777	11778	<elision3>	<elision3>
11777	11775	<>	<elision3>
11777	11778	<elision2>	<elision2>
11777	11775	<>	<elision2>
11777	11778	<elision1>	<elision1>
11777	11775	<>	<elision1>
11777	11748	<A3>	<>
11778	11779	<>	<name>
11778	11778	<>	<aphaerese>
11778	11778	<>	<elision3>
11778	11778	<>	<elision2>
11778	11778	<>	<elision1>
11778	11781	s	κ
11778	11781	s	k
11778	11834	s	K
11778	11781	s	λ
11778	11781	s	l
11778	11837	s	L
11778	11610	<A3>	<>
11779	11780	<>	<aphaerese>
11779	11780	<>	<elision3>
11779	11780	<>	<elision2>
11779	11780	<>	<elision1>
11779	11783	s	κ
11779	11783	s	k
11779	11836	s	K
11779	11783	s	λ
11779	11783	s	l
11779	11839	s	L
11779	11611	<A3>	<>
11780	11778	<>	<aphaerese>
11780	11778	<>	<elision3>
11780	11778	<>	<elision2>
11780	11778	<>	<elision1>
11780	11781	s	κ
11780	11781	s	k
11780	11834	s	K
11780	11781	s	λ
11780	11781	s	l
11780	11837	s	L
11780	11609	<A3>	<>
11781	11782	<>	<name>
11781	11781	<>	<aphaerese>
11781	11781	<>	<elision3>
11781	11781	<>	<elision2>
11781	11781	<>	<elision1>
11781	11785	<A4>	<>
11782	11783	<>	<aphaerese>
11782	11783	<>	<elision3>
11782	11783	<>	<elision2>
11782	11783	<>	<elision1>
11782	11786	<A4>	<>
11783	11781	<>	<aphaerese>
11783	11781	<>	<elision3>
11783	11781	<>	<elision2>
11783	11781	<>	<elision1>
11783	11784	<A4>	<>
11784	11785	<>	<aphaerese>
11784	11785	<>	<elision3>
11784	11785	<>	<elision2>
11784	11785	<>	<elision1>
11784	11830	H	κ
11784	11346	H	k
11784	11362	H	K
11784	11807	H	λ
11784	11755	H	l
11784	11760	H	L
11784	11813	<K>	<>
11785	11786	<>	<name>
11785	11785	<>	<aphaerese>
11785	11785	<>	<elision3>
11785	11785	<>	<elision2>
11785	11785	<>	<elision1>
11785	11830	H	κ
11785	11346	H	k
11785	11362	H	K
11785	11807	H	λ
11785	11755	H	l
11785	11760	H	L
11785	11814	<K>	<>
11786	11784	<>	<aphaerese>
11786	11784	<>	<elision3>
11786	11784	<>	<elision2>
11786	11784	<>	<elision1>
11786	11787	H	κ
11786	11387	H	k
11786	11391	H	K
11786	11806	H	λ
11786	11754	H	l
11786	11757	H	L
11786	11812	<K>	<>
11787	11788	<>	<aphaerese>
11787	11788	<>	<elision3>
11787	11788	<>	<elision2>
11787	11788	<>	<elision1>
11787	11791	<kappa2K>	<>
11787	11803	<kappa2L>	<>
11787	11342	<lambda2L>	<>
11788	11789	<>	<name>
11788	11788	<>	<aphaerese>
11788	11788	<>	<elision3>
11788	11788	<>	<elision2>
11788	11788	<>	<elision1>
11788	11792	<kappa2K>	<>
11788	11795	<kappa2L>	<>
11788	11340	<lambda2L>	<>
11789	11790	<>	<aphaerese>
11789	11790	<>	<elision3>
11789	11790	<>	<elision2>
11789	11790	<>	<elision1>
11789	11793	<kappa2K>	<>
11789	11796	<kappa2L>	<>
11789	11341	<lambda2L>	<>
11790	11788	<>	<aphaerese>
11790	11788	<>	<elision3>
11790	11788	<>	<elision2>
11790	11788	<>	<elision1>
11790	11791	<kappa2K>	<>
11790	11794	<kappa2L>	<>
11790	11342	<lambda2L>	<>
11791	11023	.	.
11791	11024	 	 
11791	11023	<~>	<~>
11791	11023	<split-s>	<split-s>
11791	11023	<split-h>	<split-h>
11791	11023	<name2>	<name2>
11791	11027	<aphaerese>	<aphaerese>
11791	11792	<>	<aphaerese>
11791	11792	<>	<elision3>
11791	11792	<>	<elision2>
11791	11792	<>	<elision1>
11791	11031	.	υ
11791	11034	s	υ
11791	11031	.	u
11791	11034	s	u
11791	55	s	κ
11791	10772	s	k
11791	11097	s	U
11791	10805	s	K
11791	11031	.	α
11791	11125	s	α
11791	11031	.	a
11791	11125	s	a
11791	11128	s	A
11791	55	s	λ
11791	10820	s	l
11791	10823	s	L
11792	11023	.	.
11792	11024	 	 
11792	11023	<~>	<~>
11792	11023	<split-s>	<split-s>
11792	11023	<split-h>	<split-h>
11792	11023	<name2>	<name2>
11792	11793	<>	<name>
11792	11027	<aphaerese>	<aphaerese>
11792	11792	<>	<aphaerese>
11792	11792	<>	<elision3>
11792	11792	<>	<elision2>
11792	11792	<>	<elision1>
11792	11031	.	υ
11792	11034	s	υ
11792	11031	.	u
11792	11034	s	u
11792	55	s	κ
11792	10772	s	k
11792	11097	s	U
11792	10805	s	K
11792	11031	.	α
11792	11125	s	α
11792	11031	.	a
11792	11125	s	a
11792	11128	s	A
11792	55	s	λ
11792	10820	s	l
11792	10823	s	L
11793	11026	.	.
11793	11029	 	 
11793	11026	<~>	<~>
11793	11026	<split-s>	<split-s>
11793	11026	<split-h>	<split-h>
11793	11026	<name2>	<name2>
11793	11155	<aphaerese>	<aphaerese>
11793	11791	<>	<aphaerese>
11793	11791	<>	<elision3>
11793	11791	<>	<elision2>
11793	11791	<>	<elision1>
11793	11033	.	υ
11793	11036	s	υ
11793	11033	.	u
11793	11036	s	u
11793	10765	s	κ
11793	10774	s	k
11793	11099	s	U
11793	10808	s	K
11793	11033	.	α
11793	11127	s	α
11793	11033	.	a
11793	11127	s	a
11793	11130	s	A
11793	10765	s	λ
11793	10822	s	l
11793	10825	s	L
11794	11189	.	.
11794	11190	 	 
11794	11189	<~>	<~>
11794	11189	<split-s>	<split-s>
11794	11189	<split-h>	<split-h>
11794	11189	<name2>	<name2>
11794	11193	<aphaerese>	<aphaerese>
11794	11795	<>	<aphaerese>
11794	11795	<>	<elision3>
11794	11795	<>	<elision2>
11794	11795	<>	<elision1>
11794	11197	.	υ
11794	11200	s	υ
11794	11197	.	u
11794	11200	s	u
11794	10831	s	κ
11794	10956	s	k
11794	11246	s	U
11794	10974	s	K
11794	11197	.	α
11794	11271	s	α
11794	11197	.	a
11794	11271	s	a
11794	11274	s	A
11794	10831	s	λ
11794	10987	s	l
11794	10990	s	L
11794	11798	<1s>	<>
11795	11189	.	.
11795	11190	 	 
11795	11189	<~>	<~>
11795	11189	<split-s>	<split-s>
11795	11189	<split-h>	<split-h>
11795	11189	<name2>	<name2>
11795	11796	<>	<name>
11795	11193	<aphaerese>	<aphaerese>
11795	11795	<>	<aphaerese>
11795	11795	<>	<elision3>
11795	11795	<>	<elision2>
11795	11795	<>	<elision1>
11795	11197	.	υ
11795	11200	s	υ
11795	11197	.	u
11795	11200	s	u
11795	10831	s	κ
11795	10956	s	k
11795	11246	s	U
11795	10974	s	K
11795	11197	.	α
11795	11271	s	α
11795	11197	.	a
11795	11271	s	a
11795	11274	s	A
11795	10831	s	λ
11795	10987	s	l
11795	10990	s	L
11795	11799	<1s>	<>
11796	11192	.	.
11796	11195	 	 
11796	11192	<~>	<~>
11796	11192	<split-s>	<split-s>
11796	11192	<split-h>	<split-h>
11796	11192	<name2>	<name2>
11796	11301	<aphaerese>	<aphaerese>
11796	11794	<>	<aphaerese>
11796	11794	<>	<elision3>
11796	11794	<>	<elision2>
11796	11794	<>	<elision1>
11796	11199	.	υ
11796	11202	s	υ
11796	11199	.	u
11796	11202	s	u
11796	10952	s	κ
11796	10958	s	k
11796	11248	s	U
11796	10977	s	K
11796	11199	.	α
11796	11273	s	α
11796	11199	.	a
11796	11273	s	a
11796	11276	s	A
11796	10952	s	λ
11796	10989	s	l
11796	10992	s	L
11796	11797	<1s>	<>
11797	70	.	.
11797	74	 	 
11797	70	<~>	<~>
11797	70	<split-s>	<split-s>
11797	70	<split-h>	<split-h>
11797	70	<name2>	<name2>
11797	77	<aphaerese>	<aphaerese>
11797	11798	<>	<aphaerese>
11797	11798	<>	<elision3>
11797	11798	<>	<elision2>
11797	11798	<>	<elision1>
11797	9753	.	υ
11797	9790	H	υ
11797	9753	.	u
11797	9794	H	u
11797	10167	H	κ
11797	9746	H	k
11797	9720	H	U
11797	9750	H	K
11797	9753	.	α
11797	9780	H	α
11797	9753	.	a
11797	9785	H	a
11797	9551	H	A
11797	10186	H	λ
11797	10134	H	l
11797	10137	H	L
11797	11801	<K>	<>
11798	71	.	.
11798	72	 	 
11798	71	<~>	<~>
11798	71	<split-s>	<split-s>
11798	71	<split-h>	<split-h>
11798	71	<name2>	<name2>
11798	75	<aphaerese>	<aphaerese>
11798	11799	<>	<aphaerese>
11798	11799	<>	<elision3>
11798	11799	<>	<elision2>
11798	11799	<>	<elision1>
11798	9751	.	υ
11798	9795	H	υ
11798	9751	.	u
11798	9797	H	u
11798	10210	H	κ
11798	9705	H	k
11798	9718	H	U
11798	9721	H	K
11798	9751	.	α
11798	9781	H	α
11798	9751	.	a
11798	9786	H	a
11798	9548	H	A
11798	10187	H	λ
11798	10135	H	l
11798	10140	H	L
11798	11802	<K>	<>
11799	71	.	.
11799	72	 	 
11799	71	<~>	<~>
11799	71	<split-s>	<split-s>
11799	71	<split-h>	<split-h>
11799	71	<name2>	<name2>
11799	11797	<>	<name>
11799	75	<aphaerese>	<aphaerese>
11799	11799	<>	<aphaerese>
11799	11799	<>	<elision3>
11799	11799	<>	<elision2>
11799	11799	<>	<elision1>
11799	9751	.	υ
11799	9795	H	υ
11799	9751	.	u
11799	9797	H	u
11799	10210	H	κ
11799	9705	H	k
11799	9718	H	U
11799	9721	H	K
11799	9751	.	α
11799	9781	H	α
11799	9751	.	a
11799	9786	H	a
11799	9548	H	A
11799	10187	H	λ
11799	10135	H	l
11799	10140	H	L
11799	11800	<K>	<>
11800	9801	.	.
11800	9801	<~>	<~>
11800	9801	<split-s>	<split-s>
11800	9801	<split-h>	<split-h>
11800	9801	<name2>	<name2>
11800	11801	<>	<name>
11800	9804	<aphaerese>	<aphaerese>
11800	11800	<>	<aphaerese>
11800	11800	<>	<elision3>
11800	11800	<>	<elision2>
11800	11800	<>	<elision1>
11800	9800	.	υ
11800	9943	H	υ
11800	9800	.	u
11800	9952	H	u
11800	10195	H	κ
11800	9912	H	k
11800	9921	H	U
11800	9924	H	K
11800	9800	.	α
11800	9955	H	α
11800	9800	.	a
11800	9958	H	a
11800	9892	H	A
11800	10204	H	λ
11800	9939	H	l
11800	9942	H	L
11801	9803	.	.
11801	9803	<~>	<~>
11801	9803	<split-s>	<split-s>
11801	9803	<split-h>	<split-h>
11801	9803	<name2>	<name2>
11801	9806	<aphaerese>	<aphaerese>
11801	11802	<>	<aphaerese>
11801	11802	<>	<elision3>
11801	11802	<>	<elision2>
11801	11802	<>	<elision1>
11801	9799	.	υ
11801	9945	H	υ
11801	9799	.	u
11801	9954	H	u
11801	10197	H	κ
11801	9914	H	k
11801	9923	H	U
11801	9927	H	K
11801	9799	.	α
11801	9957	H	α
11801	9799	.	a
11801	9960	H	a
11801	9894	H	A
11801	10206	H	λ
11801	9941	H	l
11801	9936	H	L
11802	9801	.	.
11802	9801	<~>	<~>
11802	9801	<split-s>	<split-s>
11802	9801	<split-h>	<split-h>
11802	9801	<name2>	<name2>
11802	9804	<aphaerese>	<aphaerese>
11802	11800	<>	<aphaerese>
11802	11800	<>	<elision3>
11802	11800	<>	<elision2>
11802	11800	<>	<elision1>
11802	9800	.	υ
11802	9943	H	υ
11802	9800	.	u
11802	9952	H	u
11802	10195	H	κ
11802	9912	H	k
11802	9921	H	U
11802	9924	H	K
11802	9800	.	α
11802	9955	H	α
11802	9800	.	a
11802	9958	H	a
11802	9892	H	A
11802	10204	H	λ
11802	9939	H	l
11802	9942	H	L
11803	11189	.	.
11803	11190	 	 
11803	11189	<~>	<~>
11803	11189	<split-s>	<split-s>
11803	11189	<split-h>	<split-h>
11803	11189	<name2>	<name2>
11803	11193	<aphaerese>	<aphaerese>
11803	11795	<>	<aphaerese>
11803	11795	<>	<elision3>
11803	11795	<>	<elision2>
11803	11795	<>	<elision1>
11803	11197	.	υ
11803	11200	s	υ
11803	11197	.	u
11803	11200	s	u
11803	10831	s	κ
11803	10956	s	k
11803	11246	s	U
11803	10974	s	K
11803	11197	.	α
11803	11271	s	α
11803	11197	.	a
11803	11271	s	a
11803	11274	s	A
11803	10831	s	λ
11803	10987	s	l
11803	10990	s	L
11803	11804	<1s>	<>
11804	71	.	.
11804	72	 	 
11804	71	<~>	<~>
11804	71	<split-s>	<split-s>
11804	71	<split-h>	<split-h>
11804	71	<name2>	<name2>
11804	75	<aphaerese>	<aphaerese>
11804	11799	<>	<aphaerese>
11804	11799	<>	<elision3>
11804	11799	<>	<elision2>
11804	11799	<>	<elision1>
11804	9751	.	υ
11804	9751	.	u
11804	9751	.	α
11804	9751	.	a
11804	11805	<K>	<>
11805	9801	.	.
11805	9801	<~>	<~>
11805	9801	<split-s>	<split-s>
11805	9801	<split-h>	<split-h>
11805	9801	<name2>	<name2>
11805	9804	<aphaerese>	<aphaerese>
11805	11800	<>	<aphaerese>
11805	11800	<>	<elision3>
11805	11800	<>	<elision2>
11805	11800	<>	<elision1>
11805	9800	.	υ
11805	9800	.	u
11805	9800	.	α
11805	9800	.	a
11806	11807	<>	<aphaerese>
11806	11807	<>	<elision3>
11806	11807	<>	<elision2>
11806	11807	<>	<elision1>
11806	11810	<lambda2L>	<>
11807	11808	<>	<name>
11807	11807	<>	<aphaerese>
11807	11807	<>	<elision3>
11807	11807	<>	<elision2>
11807	11807	<>	<elision1>
11807	11811	<lambda2L>	<>
11808	11806	<>	<aphaerese>
11808	11806	<>	<elision3>
11808	11806	<>	<elision2>
11808	11806	<>	<elision1>
11808	11809	<lambda2L>	<>
11809	11192	.	.
11809	11195	 	 
11809	11192	<~>	<~>
11809	11192	<split-s>	<split-s>
11809	11192	<split-h>	<split-h>
11809	11192	<name2>	<name2>
11809	11301	<aphaerese>	<aphaerese>
11809	11810	<>	<aphaerese>
11809	11810	<>	<elision3>
11809	11810	<>	<elision2>
11809	11810	<>	<elision1>
11809	11199	.	υ
11809	11202	s	υ
11809	11199	.	u
11809	11202	s	u
11809	11199	.	κ
11809	10952	s	κ
11809	10958	s	k
11809	11248	s	U
11809	10977	s	K
11809	11199	.	α
11809	11273	s	α
11809	11199	.	a
11809	11273	s	a
11809	11276	s	A
11809	11199	.	λ
11809	10952	s	λ
11809	10989	s	l
11809	10992	s	L
11809	10557	<1s>	<>
11810	11189	.	.
11810	11190	 	 
11810	11189	<~>	<~>
11810	11189	<split-s>	<split-s>
11810	11189	<split-h>	<split-h>
11810	11189	<name2>	<name2>
11810	11193	<aphaerese>	<aphaerese>
11810	11811	<>	<aphaerese>
11810	11811	<>	<elision3>
11810	11811	<>	<elision2>
11810	11811	<>	<elision1>
11810	11197	.	υ
11810	11200	s	υ
11810	11197	.	u
11810	11200	s	u
11810	11197	.	κ
11810	10831	s	κ
11810	10956	s	k
11810	11246	s	U
11810	10974	s	K
11810	11197	.	α
11810	11271	s	α
11810	11197	.	a
11810	11271	s	a
11810	11274	s	A
11810	11197	.	λ
11810	10831	s	λ
11810	10987	s	l
11810	10990	s	L
11810	10555	<1s>	<>
11811	11189	.	.
11811	11190	 	 
11811	11189	<~>	<~>
11811	11189	<split-s>	<split-s>
11811	11189	<split-h>	<split-h>
11811	11189	<name2>	<name2>
11811	11809	<>	<name>
11811	11193	<aphaerese>	<aphaerese>
11811	11811	<>	<aphaerese>
11811	11811	<>	<elision3>
11811	11811	<>	<elision2>
11811	11811	<>	<elision1>
11811	11197	.	υ
11811	11200	s	υ
11811	11197	.	u
11811	11200	s	u
11811	11197	.	κ
11811	10831	s	κ
11811	10956	s	k
11811	11246	s	U
11811	10974	s	K
11811	11197	.	α
11811	11271	s	α
11811	11197	.	a
11811	11271	s	a
11811	11274	s	A
11811	11197	.	λ
11811	10831	s	λ
11811	10987	s	l
11811	10990	s	L
11811	10556	<1s>	<>
11812	11813	<>	<aphaerese>
11812	11813	<>	<elision3>
11812	11813	<>	<elision2>
11812	11813	<>	<elision1>
11812	11817	H	κ
11812	11537	H	k
11812	11550	H	K
11812	11826	H	λ
11812	11564	H	l
11812	11559	H	L
11813	11814	<>	<aphaerese>
11813	11814	<>	<elision3>
11813	11814	<>	<elision2>
11813	11814	<>	<elision1>
11813	11815	H	κ
11813	11535	H	k
11813	11547	H	K
11813	11824	H	λ
11813	11562	H	l
11813	11565	H	L
11814	11812	<>	<name>
11814	11814	<>	<aphaerese>
11814	11814	<>	<elision3>
11814	11814	<>	<elision2>
11814	11814	<>	<elision1>
11814	11815	H	κ
11814	11535	H	k
11814	11547	H	K
11814	11824	H	λ
11814	11562	H	l
11814	11565	H	L
11815	11816	<>	<name>
11815	11815	<>	<aphaerese>
11815	11815	<>	<elision3>
11815	11815	<>	<elision2>
11815	11815	<>	<elision1>
11815	11819	<kappa2K>	<>
11815	11822	<kappa2L>	<>
11815	11533	<lambda2L>	<>
11816	11817	<>	<aphaerese>
11816	11817	<>	<elision3>
11816	11817	<>	<elision2>
11816	11817	<>	<elision1>
11816	11820	<kappa2K>	<>
11816	11823	<kappa2L>	<>
11816	11534	<lambda2L>	<>
11817	11815	<>	<aphaerese>
11817	11815	<>	<elision3>
11817	11815	<>	<elision2>
11817	11815	<>	<elision1>
11817	11818	<kappa2K>	<>
11817	11821	<kappa2L>	<>
11817	11532	<lambda2L>	<>
11818	11494	.	.
11818	11494	<~>	<~>
11818	11494	<split-s>	<split-s>
11818	11494	<split-h>	<split-h>
11818	11494	<name2>	<name2>
11818	11497	<aphaerese>	<aphaerese>
11818	11819	<>	<aphaerese>
11818	11819	<>	<elision3>
11818	11819	<>	<elision2>
11818	11819	<>	<elision1>
11818	11509	.	υ
11818	11461	s	υ
11818	11509	.	u
11818	11461	s	u
11818	11461	s	κ
11818	11461	s	k
11818	11503	s	U
11818	11467	s	K
11818	11509	.	α
11818	11461	s	α
11818	11509	.	a
11818	11461	s	a
11818	11506	s	A
11818	11461	s	λ
11818	11461	s	l
11818	11470	s	L
11819	11494	.	.
11819	11494	<~>	<~>
11819	11494	<split-s>	<split-s>
11819	11494	<split-h>	<split-h>
11819	11494	<name2>	<name2>
11819	11820	<>	<name>
11819	11497	<aphaerese>	<aphaerese>
11819	11819	<>	<aphaerese>
11819	11819	<>	<elision3>
11819	11819	<>	<elision2>
11819	11819	<>	<elision1>
11819	11509	.	υ
11819	11461	s	υ
11819	11509	.	u
11819	11461	s	u
11819	11461	s	κ
11819	11461	s	k
11819	11503	s	U
11819	11467	s	K
11819	11509	.	α
11819	11461	s	α
11819	11509	.	a
11819	11461	s	a
11819	11506	s	A
11819	11461	s	λ
11819	11461	s	l
11819	11470	s	L
11820	11496	.	.
11820	11496	<~>	<~>
11820	11496	<split-s>	<split-s>
11820	11496	<split-h>	<split-h>
11820	11496	<name2>	<name2>
11820	11499	<aphaerese>	<aphaerese>
11820	11818	<>	<aphaerese>
11820	11818	<>	<elision3>
11820	11818	<>	<elision2>
11820	11818	<>	<elision1>
11820	11511	.	υ
11820	11460	s	υ
11820	11511	.	u
11820	11460	s	u
11820	11460	s	κ
11820	11460	s	k
11820	11505	s	U
11820	11466	s	K
11820	11511	.	α
11820	11460	s	α
11820	11511	.	a
11820	11460	s	a
11820	11508	s	A
11820	11460	s	λ
11820	11460	s	l
11820	11469	s	L
11821	11518	.	.
11821	11518	<~>	<~>
11821	11518	<split-s>	<split-s>
11821	11518	<split-h>	<split-h>
11821	11518	<name2>	<name2>
11821	11521	<aphaerese>	<aphaerese>
11821	11822	<>	<aphaerese>
11821	11822	<>	<elision3>
11821	11822	<>	<elision2>
11821	11822	<>	<elision1>
11821	11524	.	υ
11821	11461	s	υ
11821	11524	.	u
11821	11461	s	u
11821	11461	s	κ
11821	11476	H	κ
11821	11461	s	k
11821	11476	H	k
11821	11503	s	U
11821	11467	s	K
11821	11476	H	K
11821	11524	.	α
11821	11461	s	α
11821	11524	.	a
11821	11461	s	a
11821	11506	s	A
11821	11461	s	λ
11821	11476	H	λ
11821	11461	s	l
11821	11476	H	l
11821	11470	s	L
11821	11476	H	L
11822	11518	.	.
11822	11518	<~>	<~>
11822	11518	<split-s>	<split-s>
11822	11518	<split-h>	<split-h>
11822	11518	<name2>	<name2>
11822	11823	<>	<name>
11822	11521	<aphaerese>	<aphaerese>
11822	11822	<>	<aphaerese>
11822	11822	<>	<elision3>
11822	11822	<>	<elision2>
11822	11822	<>	<elision1>
11822	11524	.	υ
11822	11461	s	υ
11822	11524	.	u
11822	11461	s	u
11822	11461	s	κ
11822	11476	H	κ
11822	11461	s	k
11822	11476	H	k
11822	11503	s	U
11822	11467	s	K
11822	11476	H	K
11822	11524	.	α
11822	11461	s	α
11822	11524	.	a
11822	11461	s	a
11822	11506	s	A
11822	11461	s	λ
11822	11476	H	λ
11822	11461	s	l
11822	11476	H	l
11822	11470	s	L
11822	11476	H	L
11823	11520	.	.
11823	11520	<~>	<~>
11823	11520	<split-s>	<split-s>
11823	11520	<split-h>	<split-h>
11823	11520	<name2>	<name2>
11823	11523	<aphaerese>	<aphaerese>
11823	11821	<>	<aphaerese>
11823	11821	<>	<elision3>
11823	11821	<>	<elision2>
11823	11821	<>	<elision1>
11823	11526	.	υ
11823	11460	s	υ
11823	11526	.	u
11823	11460	s	u
11823	11460	s	κ
11823	11475	H	κ
11823	11460	s	k
11823	11475	H	k
11823	11505	s	U
11823	11466	s	K
11823	11475	H	K
11823	11526	.	α
11823	11460	s	α
11823	11526	.	a
11823	11460	s	a
11823	11508	s	A
11823	11460	s	λ
11823	11475	H	λ
11823	11460	s	l
11823	11475	H	l
11823	11469	s	L
11823	11475	H	L
11824	11825	<>	<name>
11824	11824	<>	<aphaerese>
11824	11824	<>	<elision3>
11824	11824	<>	<elision2>
11824	11824	<>	<elision1>
11824	11828	<lambda2L>	<>
11825	11826	<>	<aphaerese>
11825	11826	<>	<elision3>
11825	11826	<>	<elision2>
11825	11826	<>	<elision1>
11825	11829	<lambda2L>	<>
11826	11824	<>	<aphaerese>
11826	11824	<>	<elision3>
11826	11824	<>	<elision2>
11826	11824	<>	<elision1>
11826	11827	<lambda2L>	<>
11827	11518	.	.
11827	11518	<~>	<~>
11827	11518	<split-s>	<split-s>
11827	11518	<split-h>	<split-h>
11827	11518	<name2>	<name2>
11827	11521	<aphaerese>	<aphaerese>
11827	11828	<>	<aphaerese>
11827	11828	<>	<elision3>
11827	11828	<>	<elision2>
11827	11828	<>	<elision1>
11827	11524	.	υ
11827	11461	s	υ
11827	11524	.	u
11827	11461	s	u
11827	11524	.	κ
11827	11461	s	κ
11827	11476	H	κ
11827	11461	s	k
11827	11476	H	k
11827	11503	s	U
11827	11467	s	K
11827	11476	H	K
11827	11524	.	α
11827	11461	s	α
11827	11524	.	a
11827	11461	s	a
11827	11506	s	A
11827	11524	.	λ
11827	11461	s	λ
11827	11476	H	λ
11827	11461	s	l
11827	11476	H	l
11827	11470	s	L
11827	11476	H	L
11828	11518	.	.
11828	11518	<~>	<~>
11828	11518	<split-s>	<split-s>
11828	11518	<split-h>	<split-h>
11828	11518	<name2>	<name2>
11828	11829	<>	<name>
11828	11521	<aphaerese>	<aphaerese>
11828	11828	<>	<aphaerese>
11828	11828	<>	<elision3>
11828	11828	<>	<elision2>
11828	11828	<>	<elision1>
11828	11524	.	υ
11828	11461	s	υ
11828	11524	.	u
11828	11461	s	u
11828	11524	.	κ
11828	11461	s	κ
11828	11476	H	κ
11828	11461	s	k
11828	11476	H	k
11828	11503	s	U
11828	11467	s	K
11828	11476	H	K
11828	11524	.	α
11828	11461	s	α
11828	11524	.	a
11828	11461	s	a
11828	11506	s	A
11828	11524	.	λ
11828	11461	s	λ
11828	11476	H	λ
11828	11461	s	l
11828	11476	H	l
11828	11470	s	L
11828	11476	H	L
11829	11520	.	.
11829	11520	<~>	<~>
11829	11520	<split-s>	<split-s>
11829	11520	<split-h>	<split-h>
11829	11520	<name2>	<name2>
11829	11523	<aphaerese>	<aphaerese>
11829	11827	<>	<aphaerese>
11829	11827	<>	<elision3>
11829	11827	<>	<elision2>
11829	11827	<>	<elision1>
11829	11526	.	υ
11829	11460	s	υ
11829	11526	.	u
11829	11460	s	u
11829	11526	.	κ
11829	11460	s	κ
11829	11475	H	κ
11829	11460	s	k
11829	11475	H	k
11829	11505	s	U
11829	11466	s	K
11829	11475	H	K
11829	11526	.	α
11829	11460	s	α
11829	11526	.	a
11829	11460	s	a
11829	11508	s	A
11829	11526	.	λ
11829	11460	s	λ
11829	11475	H	λ
11829	11460	s	l
11829	11475	H	l
11829	11469	s	L
11829	11475	H	L
11830	11789	<>	<name>
11830	11788	<>	<aphaerese>
11830	11788	<>	<elision3>
11830	11788	<>	<elision2>
11830	11788	<>	<elision1>
11830	11792	<kappa2K>	<>
11830	11831	<kappa2L>	<>
11830	11340	<lambda2L>	<>
11831	11189	.	.
11831	11190	 	 
11831	11189	<~>	<~>
11831	11189	<split-s>	<split-s>
11831	11189	<split-h>	<split-h>
11831	11189	<name2>	<name2>
11831	11796	<>	<name>
11831	11193	<aphaerese>	<aphaerese>
11831	11795	<>	<aphaerese>
11831	11795	<>	<elision3>
11831	11795	<>	<elision2>
11831	11795	<>	<elision1>
11831	11197	.	υ
11831	11200	s	υ
11831	11197	.	u
11831	11200	s	u
11831	10831	s	κ
11831	10956	s	k
11831	11246	s	U
11831	10974	s	K
11831	11197	.	α
11831	11271	s	α
11831	11197	.	a
11831	11271	s	a
11831	11274	s	A
11831	10831	s	λ
11831	10987	s	l
11831	10990	s	L
11831	11832	<1s>	<>
11832	71	.	.
11832	72	 	 
11832	71	<~>	<~>
11832	71	<split-s>	<split-s>
11832	71	<split-h>	<split-h>
11832	71	<name2>	<name2>
11832	11797	<>	<name>
11832	75	<aphaerese>	<aphaerese>
11832	11799	<>	<aphaerese>
11832	11799	<>	<elision3>
11832	11799	<>	<elision2>
11832	11799	<>	<elision1>
11832	9751	.	υ
11832	9751	.	u
11832	9751	.	α
11832	9751	.	a
11832	11833	<K>	<>
11833	9801	.	.
11833	9801	<~>	<~>
11833	9801	<split-s>	<split-s>
11833	9801	<split-h>	<split-h>
11833	9801	<name2>	<name2>
11833	11801	<>	<name>
11833	9804	<aphaerese>	<aphaerese>
11833	11800	<>	<aphaerese>
11833	11800	<>	<elision3>
11833	11800	<>	<elision2>
11833	11800	<>	<elision1>
11833	9800	.	υ
11833	9800	.	u
11833	9800	.	α
11833	9800	.	a
11834	11835	<>	<name>
11834	11834	<>	<aphaerese>
11834	11834	<>	<elision3>
11834	11834	<>	<elision2>
11834	11834	<>	<elision1>
11834	11781	<K2kl>	<>
11835	11836	<>	<aphaerese>
11835	11836	<>	<elision3>
11835	11836	<>	<elision2>
11835	11836	<>	<elision1>
11835	11782	<K2kl>	<>
11836	11834	<>	<aphaerese>
11836	11834	<>	<elision3>
11836	11834	<>	<elision2>
11836	11834	<>	<elision1>
11836	11783	<K2kl>	<>
11837	11838	<>	<name>
11837	11837	<>	<aphaerese>
11837	11837	<>	<elision3>
11837	11837	<>	<elision2>
11837	11837	<>	<elision1>
11837	11781	<L2kl>	<>
11838	11839	<>	<aphaerese>
11838	11839	<>	<elision3>
11838	11839	<>	<elision2>
11838	11839	<>	<elision1>
11838	11782	<L2kl>	<>
11839	11837	<>	<aphaerese>
11839	11837	<>	<elision3>
11839	11837	<>	<elision2>
11839	11837	<>	<elision1>
11839	11783	<L2kl>	<>
11840	11597	.	.
11840	11597	 	 
11840	11597	<~>	<~>
11840	11597	<split-s>	<split-s>
11840	11597	<split-h>	<split-h>
11840	11597	<name2>	<name2>
11840	11841	<>	<name>
11840	11600	<aphaerese>	<aphaerese>
11840	11840	<>	<aphaerese>
11840	11843	<elision3>	<elision3>
11840	11840	<>	<elision3>
11840	11843	<elision2>	<elision2>
11840	11840	<>	<elision2>
11840	11843	<elision1>	<elision1>
11840	11840	<>	<elision1>
11840	11761	.	υ
11840	11761	.	u
11840	11761	.	κ
11840	11761	.	α
11840	11761	.	a
11840	11761	.	λ
11840	11944	<A4>	<>
11841	11599	.	.
11841	11599	 	 
11841	11599	<~>	<~>
11841	11599	<split-s>	<split-s>
11841	11599	<split-h>	<split-h>
11841	11599	<name2>	<name2>
11841	11602	<aphaerese>	<aphaerese>
11841	11842	<>	<aphaerese>
11841	11845	<elision3>	<elision3>
11841	11842	<>	<elision3>
11841	11845	<elision2>	<elision2>
11841	11842	<>	<elision2>
11841	11845	<elision1>	<elision1>
11841	11842	<>	<elision1>
11841	11763	.	υ
11841	11763	.	u
11841	11763	.	κ
11841	11763	.	α
11841	11763	.	a
11841	11763	.	λ
11841	11945	<A4>	<>
11842	11597	.	.
11842	11597	 	 
11842	11597	<~>	<~>
11842	11597	<split-s>	<split-s>
11842	11597	<split-h>	<split-h>
11842	11597	<name2>	<name2>
11842	11600	<aphaerese>	<aphaerese>
11842	11840	<>	<aphaerese>
11842	11843	<elision3>	<elision3>
11842	11840	<>	<elision3>
11842	11843	<elision2>	<elision2>
11842	11840	<>	<elision2>
11842	11843	<elision1>	<elision1>
11842	11840	<>	<elision1>
11842	11761	.	υ
11842	11761	.	u
11842	11761	.	κ
11842	11761	.	α
11842	11761	.	a
11842	11761	.	λ
11842	11943	<A4>	<>
11843	11597	.	.
11843	11597	 	 
11843	11597	<~>	<~>
11843	11597	<split-s>	<split-s>
11843	11597	<split-h>	<split-h>
11843	11597	<name2>	<name2>
11843	11844	<>	<name>
11843	11600	<aphaerese>	<aphaerese>
11843	11843	<>	<aphaerese>
11843	11597	<elision3>	<elision3>
11843	11843	<>	<elision3>
11843	11597	<elision2>	<elision2>
11843	11843	<>	<elision2>
11843	11597	<elision1>	<elision1>
11843	11843	<>	<elision1>
11843	11761	.	υ
11843	11761	.	u
11843	11603	.	κ
11843	11761	.	α
11843	11761	.	a
11843	11847	<A4>	<>
11844	11599	.	.
11844	11599	 	 
11844	11599	<~>	<~>
11844	11599	<split-s>	<split-s>
11844	11599	<split-h>	<split-h>
11844	11599	<name2>	<name2>
11844	11602	<aphaerese>	<aphaerese>
11844	11845	<>	<aphaerese>
11844	11599	<elision3>	<elision3>
11844	11845	<>	<elision3>
11844	11599	<elision2>	<elision2>
11844	11845	<>	<elision2>
11844	11599	<elision1>	<elision1>
11844	11845	<>	<elision1>
11844	11763	.	υ
11844	11763	.	u
11844	11605	.	κ
11844	11763	.	α
11844	11763	.	a
11844	11848	<A4>	<>
11845	11597	.	.
11845	11597	 	 
11845	11597	<~>	<~>
11845	11597	<split-s>	<split-s>
11845	11597	<split-h>	<split-h>
11845	11597	<name2>	<name2>
11845	11600	<aphaerese>	<aphaerese>
11845	11843	<>	<aphaerese>
11845	11597	<elision3>	<elision3>
11845	11843	<>	<elision3>
11845	11597	<elision2>	<elision2>
11845	11843	<>	<elision2>
11845	11597	<elision1>	<elision1>
11845	11843	<>	<elision1>
11845	11761	.	υ
11845	11761	.	u
11845	11603	.	κ
11845	11761	.	α
11845	11761	.	a
11845	11846	<A4>	<>
11846	35	.	.
11846	36	 	 
11846	35	<~>	<~>
11846	35	<split-s>	<split-s>
11846	35	<split-h>	<split-h>
11846	35	<name2>	<name2>
11846	39	<aphaerese>	<aphaerese>
11846	11847	<>	<aphaerese>
11846	35	<elision3>	<elision3>
11846	11847	<>	<elision3>
11846	35	<elision2>	<elision2>
11846	11847	<>	<elision2>
11846	35	<elision1>	<elision1>
11846	11847	<>	<elision1>
11846	11392	.	υ
11846	11436	H	υ
11846	11392	.	u
11846	11438	H	u
11846	42	.	κ
11846	11930	H	κ
11846	11934	H	k
11846	11359	H	U
11846	11938	H	K
11846	11392	.	α
11846	11422	H	α
11846	11392	.	a
11846	11427	H	a
11846	11189	H	A
11846	11886	H	λ
11846	11892	H	l
11846	11942	H	L
11846	11895	<K>	<>
11847	35	.	.
11847	36	 	 
11847	35	<~>	<~>
11847	35	<split-s>	<split-s>
11847	35	<split-h>	<split-h>
11847	35	<name2>	<name2>
11847	11848	<>	<name>
11847	39	<aphaerese>	<aphaerese>
11847	11847	<>	<aphaerese>
11847	35	<elision3>	<elision3>
11847	11847	<>	<elision3>
11847	35	<elision2>	<elision2>
11847	11847	<>	<elision2>
11847	35	<elision1>	<elision1>
11847	11847	<>	<elision1>
11847	11392	.	υ
11847	11436	H	υ
11847	11392	.	u
11847	11438	H	u
11847	42	.	κ
11847	11930	H	κ
11847	11934	H	k
11847	11359	H	U
11847	11938	H	K
11847	11392	.	α
11847	11422	H	α
11847	11392	.	a
11847	11427	H	a
11847	11189	H	A
11847	11886	H	λ
11847	11892	H	l
11847	11942	H	L
11847	11896	<K>	<>
11848	34	.	.
11848	38	 	 
11848	34	<~>	<~>
11848	34	<split-s>	<split-s>
11848	34	<split-h>	<split-h>
11848	34	<name2>	<name2>
11848	41	<aphaerese>	<aphaerese>
11848	11846	<>	<aphaerese>
11848	34	<elision3>	<elision3>
11848	11846	<>	<elision3>
11848	34	<elision2>	<elision2>
11848	11846	<>	<elision2>
11848	34	<elision1>	<elision1>
11848	11846	<>	<elision1>
11848	11394	.	υ
11848	11431	H	υ
11848	11394	.	u
11848	11435	H	u
11848	44	.	κ
11848	11849	H	κ
11848	11868	H	k
11848	11361	H	U
11848	11881	H	K
11848	11394	.	α
11848	11421	H	α
11848	11394	.	a
11848	11426	H	a
11848	11192	H	A
11848	11885	H	λ
11848	11891	H	l
11848	11889	H	L
11848	11894	<K>	<>
11849	11850	<>	<aphaerese>
11849	11850	<>	<elision3>
11849	11850	<>	<elision2>
11849	11850	<>	<elision1>
11849	11853	<kappa2K>	<>
11849	11865	<kappa2L>	<>
11849	11342	<lambda2L>	<>
11850	11851	<>	<name>
11850	11850	<>	<aphaerese>
11850	11850	<>	<elision3>
11850	11850	<>	<elision2>
11850	11850	<>	<elision1>
11850	11854	<kappa2K>	<>
11850	11857	<kappa2L>	<>
11850	11340	<lambda2L>	<>
11851	11852	<>	<aphaerese>
11851	11852	<>	<elision3>
11851	11852	<>	<elision2>
11851	11852	<>	<elision1>
11851	11855	<kappa2K>	<>
11851	11858	<kappa2L>	<>
11851	11341	<lambda2L>	<>
11852	11850	<>	<aphaerese>
11852	11850	<>	<elision3>
11852	11850	<>	<elision2>
11852	11850	<>	<elision1>
11852	11853	<kappa2K>	<>
11852	11856	<kappa2L>	<>
11852	11342	<lambda2L>	<>
11853	11023	.	.
11853	11024	 	 
11853	11023	<~>	<~>
11853	11023	<split-s>	<split-s>
11853	11023	<split-h>	<split-h>
11853	11023	<name2>	<name2>
11853	11027	<aphaerese>	<aphaerese>
11853	11854	<>	<aphaerese>
11853	11160	<elision3>	<elision3>
11853	11854	<>	<elision3>
11853	11160	<elision2>	<elision2>
11853	11854	<>	<elision2>
11853	11160	<elision1>	<elision1>
11853	11854	<>	<elision1>
11853	11031	.	υ
11853	11034	s	υ
11853	11031	.	u
11853	11034	s	u
11853	11097	s	U
11853	11031	.	α
11853	11125	s	α
11853	11031	.	a
11853	11125	s	a
11853	11128	s	A
11854	11023	.	.
11854	11024	 	 
11854	11023	<~>	<~>
11854	11023	<split-s>	<split-s>
11854	11023	<split-h>	<split-h>
11854	11023	<name2>	<name2>
11854	11855	<>	<name>
11854	11027	<aphaerese>	<aphaerese>
11854	11854	<>	<aphaerese>
11854	11160	<elision3>	<elision3>
11854	11854	<>	<elision3>
11854	11160	<elision2>	<elision2>
11854	11854	<>	<elision2>
11854	11160	<elision1>	<elision1>
11854	11854	<>	<elision1>
11854	11031	.	υ
11854	11034	s	υ
11854	11031	.	u
11854	11034	s	u
11854	11097	s	U
11854	11031	.	α
11854	11125	s	α
11854	11031	.	a
11854	11125	s	a
11854	11128	s	A
11855	11026	.	.
11855	11029	 	 
11855	11026	<~>	<~>
11855	11026	<split-s>	<split-s>
11855	11026	<split-h>	<split-h>
11855	11026	<name2>	<name2>
11855	11155	<aphaerese>	<aphaerese>
11855	11853	<>	<aphaerese>
11855	11162	<elision3>	<elision3>
11855	11853	<>	<elision3>
11855	11162	<elision2>	<elision2>
11855	11853	<>	<elision2>
11855	11162	<elision1>	<elision1>
11855	11853	<>	<elision1>
11855	11033	.	υ
11855	11036	s	υ
11855	11033	.	u
11855	11036	s	u
11855	11099	s	U
11855	11033	.	α
11855	11127	s	α
11855	11033	.	a
11855	11127	s	a
11855	11130	s	A
11856	11189	.	.
11856	11190	 	 
11856	11189	<~>	<~>
11856	11189	<split-s>	<split-s>
11856	11189	<split-h>	<split-h>
11856	11189	<name2>	<name2>
11856	11193	<aphaerese>	<aphaerese>
11856	11857	<>	<aphaerese>
11856	11306	<elision3>	<elision3>
11856	11857	<>	<elision3>
11856	11306	<elision2>	<elision2>
11856	11857	<>	<elision2>
11856	11306	<elision1>	<elision1>
11856	11857	<>	<elision1>
11856	11197	.	υ
11856	11200	s	υ
11856	11197	.	u
11856	11200	s	u
11856	11246	s	U
11856	11197	.	α
11856	11271	s	α
11856	11197	.	a
11856	11271	s	a
11856	11274	s	A
11856	11860	<1s>	<>
11857	11189	.	.
11857	11190	 	 
11857	11189	<~>	<~>
11857	11189	<split-s>	<split-s>
11857	11189	<split-h>	<split-h>
11857	11189	<name2>	<name2>
11857	11858	<>	<name>
11857	11193	<aphaerese>	<aphaerese>
11857	11857	<>	<aphaerese>
11857	11306	<elision3>	<elision3>
11857	11857	<>	<elision3>
11857	11306	<elision2>	<elision2>
11857	11857	<>	<elision2>
11857	11306	<elision1>	<elision1>
11857	11857	<>	<elision1>
11857	11197	.	υ
11857	11200	s	υ
11857	11197	.	u
11857	11200	s	u
11857	11246	s	U
11857	11197	.	α
11857	11271	s	α
11857	11197	.	a
11857	11271	s	a
11857	11274	s	A
11857	11861	<1s>	<>
11858	11192	.	.
11858	11195	 	 
11858	11192	<~>	<~>
11858	11192	<split-s>	<split-s>
11858	11192	<split-h>	<split-h>
11858	11192	<name2>	<name2>
11858	11301	<aphaerese>	<aphaerese>
11858	11856	<>	<aphaerese>
11858	11308	<elision3>	<elision3>
11858	11856	<>	<elision3>
11858	11308	<elision2>	<elision2>
11858	11856	<>	<elision2>
11858	11308	<elision1>	<elision1>
11858	11856	<>	<elision1>
11858	11199	.	υ
11858	11202	s	υ
11858	11199	.	u
11858	11202	s	u
11858	11248	s	U
11858	11199	.	α
11858	11273	s	α
11858	11199	.	a
11858	11273	s	a
11858	11276	s	A
11858	11859	<1s>	<>
11859	70	.	.
11859	74	 	 
11859	70	<~>	<~>
11859	70	<split-s>	<split-s>
11859	70	<split-h>	<split-h>
11859	70	<name2>	<name2>
11859	77	<aphaerese>	<aphaerese>
11859	11860	<>	<aphaerese>
11859	10332	<elision3>	<elision3>
11859	11860	<>	<elision3>
11859	10332	<elision2>	<elision2>
11859	11860	<>	<elision2>
11859	10332	<elision1>	<elision1>
11859	11860	<>	<elision1>
11859	9753	.	υ
11859	9790	H	υ
11859	9753	.	u
11859	9794	H	u
11859	9720	H	U
11859	9753	.	α
11859	9780	H	α
11859	9753	.	a
11859	9785	H	a
11859	9551	H	A
11859	11863	<K>	<>
11860	71	.	.
11860	72	 	 
11860	71	<~>	<~>
11860	71	<split-s>	<split-s>
11860	71	<split-h>	<split-h>
11860	71	<name2>	<name2>
11860	75	<aphaerese>	<aphaerese>
11860	11861	<>	<aphaerese>
11860	10333	<elision3>	<elision3>
11860	11861	<>	<elision3>
11860	10333	<elision2>	<elision2>
11860	11861	<>	<elision2>
11860	10333	<elision1>	<elision1>
11860	11861	<>	<elision1>
11860	9751	.	υ
11860	9795	H	υ
11860	9751	.	u
11860	9797	H	u
11860	9718	H	U
11860	9751	.	α
11860	9781	H	α
11860	9751	.	a
11860	9786	H	a
11860	9548	H	A
11860	11864	<K>	<>
11861	71	.	.
11861	72	 	 
11861	71	<~>	<~>
11861	71	<split-s>	<split-s>
11861	71	<split-h>	<split-h>
11861	71	<name2>	<name2>
11861	11859	<>	<name>
11861	75	<aphaerese>	<aphaerese>
11861	11861	<>	<aphaerese>
11861	10333	<elision3>	<elision3>
11861	11861	<>	<elision3>
11861	10333	<elision2>	<elision2>
11861	11861	<>	<elision2>
11861	10333	<elision1>	<elision1>
11861	11861	<>	<elision1>
11861	9751	.	υ
11861	9795	H	υ
11861	9751	.	u
11861	9797	H	u
11861	9718	H	U
11861	9751	.	α
11861	9781	H	α
11861	9751	.	a
11861	9786	H	a
11861	9548	H	A
11861	11862	<K>	<>
11862	9801	.	.
11862	9801	<~>	<~>
11862	9801	<split-s>	<split-s>
11862	9801	<split-h>	<split-h>
11862	9801	<name2>	<name2>
11862	11863	<>	<name>
11862	9804	<aphaerese>	<aphaerese>
11862	11862	<>	<aphaerese>
11862	10282	<elision3>	<elision3>
11862	11862	<>	<elision3>
11862	10282	<elision2>	<elision2>
11862	11862	<>	<elision2>
11862	10282	<elision1>	<elision1>
11862	11862	<>	<elision1>
11862	9800	.	υ
11862	9943	H	υ
11862	9800	.	u
11862	9952	H	u
11862	9921	H	U
11862	9800	.	α
11862	9955	H	α
11862	9800	.	a
11862	9958	H	a
11862	9892	H	A
11863	9803	.	.
11863	9803	<~>	<~>
11863	9803	<split-s>	<split-s>
11863	9803	<split-h>	<split-h>
11863	9803	<name2>	<name2>
11863	9806	<aphaerese>	<aphaerese>
11863	11864	<>	<aphaerese>
11863	10281	<elision3>	<elision3>
11863	11864	<>	<elision3>
11863	10281	<elision2>	<elision2>
11863	11864	<>	<elision2>
11863	10281	<elision1>	<elision1>
11863	11864	<>	<elision1>
11863	9799	.	υ
11863	9945	H	υ
11863	9799	.	u
11863	9954	H	u
11863	9923	H	U
11863	9799	.	α
11863	9957	H	α
11863	9799	.	a
11863	9960	H	a
11863	9894	H	A
11864	9801	.	.
11864	9801	<~>	<~>
11864	9801	<split-s>	<split-s>
11864	9801	<split-h>	<split-h>
11864	9801	<name2>	<name2>
11864	9804	<aphaerese>	<aphaerese>
11864	11862	<>	<aphaerese>
11864	10282	<elision3>	<elision3>
11864	11862	<>	<elision3>
11864	10282	<elision2>	<elision2>
11864	11862	<>	<elision2>
11864	10282	<elision1>	<elision1>
11864	11862	<>	<elision1>
11864	9800	.	υ
11864	9943	H	υ
11864	9800	.	u
11864	9952	H	u
11864	9921	H	U
11864	9800	.	α
11864	9955	H	α
11864	9800	.	a
11864	9958	H	a
11864	9892	H	A
11865	11189	.	.
11865	11190	 	 
11865	11189	<~>	<~>
11865	11189	<split-s>	<split-s>
11865	11189	<split-h>	<split-h>
11865	11189	<name2>	<name2>
11865	11193	<aphaerese>	<aphaerese>
11865	11857	<>	<aphaerese>
11865	11306	<elision3>	<elision3>
11865	11857	<>	<elision3>
11865	11306	<elision2>	<elision2>
11865	11857	<>	<elision2>
11865	11306	<elision1>	<elision1>
11865	11857	<>	<elision1>
11865	11197	.	υ
11865	11200	s	υ
11865	11197	.	u
11865	11200	s	u
11865	11246	s	U
11865	11197	.	α
11865	11271	s	α
11865	11197	.	a
11865	11271	s	a
11865	11274	s	A
11865	11866	<1s>	<>
11866	71	.	.
11866	72	 	 
11866	71	<~>	<~>
11866	71	<split-s>	<split-s>
11866	71	<split-h>	<split-h>
11866	71	<name2>	<name2>
11866	75	<aphaerese>	<aphaerese>
11866	11861	<>	<aphaerese>
11866	10333	<elision3>	<elision3>
11866	11861	<>	<elision3>
11866	10333	<elision2>	<elision2>
11866	11861	<>	<elision2>
11866	10333	<elision1>	<elision1>
11866	11861	<>	<elision1>
11866	9751	.	υ
11866	9751	.	u
11866	9751	.	α
11866	9751	.	a
11866	11867	<K>	<>
11867	9801	.	.
11867	9801	<~>	<~>
11867	9801	<split-s>	<split-s>
11867	9801	<split-h>	<split-h>
11867	9801	<name2>	<name2>
11867	9804	<aphaerese>	<aphaerese>
11867	11862	<>	<aphaerese>
11867	10282	<elision3>	<elision3>
11867	11862	<>	<elision3>
11867	10282	<elision2>	<elision2>
11867	11862	<>	<elision2>
11867	10282	<elision1>	<elision1>
11867	11862	<>	<elision1>
11867	9800	.	υ
11867	9800	.	u
11867	9800	.	α
11867	9800	.	a
11868	11869	<>	<aphaerese>
11868	11869	<>	<elision3>
11868	11869	<>	<elision2>
11868	11869	<>	<elision1>
11868	11872	<k2K>	<>
11868	11878	<k2L>	<>
11868	11342	<l2L>	<>
11869	11870	<>	<name>
11869	11869	<>	<aphaerese>
11869	11869	<>	<elision3>
11869	11869	<>	<elision2>
11869	11869	<>	<elision1>
11869	11873	<k2K>	<>
11869	11876	<k2L>	<>
11869	11340	<l2L>	<>
11870	11871	<>	<aphaerese>
11870	11871	<>	<elision3>
11870	11871	<>	<elision2>
11870	11871	<>	<elision1>
11870	11874	<k2K>	<>
11870	11877	<k2L>	<>
11870	11341	<l2L>	<>
11871	11869	<>	<aphaerese>
11871	11869	<>	<elision3>
11871	11869	<>	<elision2>
11871	11869	<>	<elision1>
11871	11872	<k2K>	<>
11871	11875	<k2L>	<>
11871	11342	<l2L>	<>
11872	11023	.	.
11872	11024	 	 
11872	11023	<~>	<~>
11872	11023	<split-s>	<split-s>
11872	11023	<split-h>	<split-h>
11872	11023	<name2>	<name2>
11872	11027	<aphaerese>	<aphaerese>
11872	11873	<>	<aphaerese>
11872	11023	<elision3>	<elision3>
11872	11873	<>	<elision3>
11872	11023	<elision2>	<elision2>
11872	11873	<>	<elision2>
11872	11023	<elision1>	<elision1>
11872	11873	<>	<elision1>
11872	11031	.	υ
11872	11034	s	υ
11872	11031	.	u
11872	11034	s	u
11872	11097	s	U
11872	11031	.	α
11872	11125	s	α
11872	11031	.	a
11872	11125	s	a
11872	11128	s	A
11873	11023	.	.
11873	11024	 	 
11873	11023	<~>	<~>
11873	11023	<split-s>	<split-s>
11873	11023	<split-h>	<split-h>
11873	11023	<name2>	<name2>
11873	11874	<>	<name>
11873	11027	<aphaerese>	<aphaerese>
11873	11873	<>	<aphaerese>
11873	11023	<elision3>	<elision3>
11873	11873	<>	<elision3>
11873	11023	<elision2>	<elision2>
11873	11873	<>	<elision2>
11873	11023	<elision1>	<elision1>
11873	11873	<>	<elision1>
11873	11031	.	υ
11873	11034	s	υ
11873	11031	.	u
11873	11034	s	u
11873	11097	s	U
11873	11031	.	α
11873	11125	s	α
11873	11031	.	a
11873	11125	s	a
11873	11128	s	A
11874	11026	.	.
11874	11029	 	 
11874	11026	<~>	<~>
11874	11026	<split-s>	<split-s>
11874	11026	<split-h>	<split-h>
11874	11026	<name2>	<name2>
11874	11155	<aphaerese>	<aphaerese>
11874	11872	<>	<aphaerese>
11874	11026	<elision3>	<elision3>
11874	11872	<>	<elision3>
11874	11026	<elision2>	<elision2>
11874	11872	<>	<elision2>
11874	11026	<elision1>	<elision1>
11874	11872	<>	<elision1>
11874	11033	.	υ
11874	11036	s	υ
11874	11033	.	u
11874	11036	s	u
11874	11099	s	U
11874	11033	.	α
11874	11127	s	α
11874	11033	.	a
11874	11127	s	a
11874	11130	s	A
11875	11189	.	.
11875	11190	 	 
11875	11189	<~>	<~>
11875	11189	<split-s>	<split-s>
11875	11189	<split-h>	<split-h>
11875	11189	<name2>	<name2>
11875	11193	<aphaerese>	<aphaerese>
11875	11876	<>	<aphaerese>
11875	11189	<elision3>	<elision3>
11875	11876	<>	<elision3>
11875	11189	<elision2>	<elision2>
11875	11876	<>	<elision2>
11875	11189	<elision1>	<elision1>
11875	11876	<>	<elision1>
11875	11197	.	υ
11875	11200	s	υ
11875	11197	.	u
11875	11200	s	u
11875	11246	s	U
11875	11197	.	α
11875	11271	s	α
11875	11197	.	a
11875	11271	s	a
11875	11274	s	A
11875	10604	<1s>	<>
11876	11189	.	.
11876	11190	 	 
11876	11189	<~>	<~>
11876	11189	<split-s>	<split-s>
11876	11189	<split-h>	<split-h>
11876	11189	<name2>	<name2>
11876	11877	<>	<name>
11876	11193	<aphaerese>	<aphaerese>
11876	11876	<>	<aphaerese>
11876	11189	<elision3>	<elision3>
11876	11876	<>	<elision3>
11876	11189	<elision2>	<elision2>
11876	11876	<>	<elision2>
11876	11189	<elision1>	<elision1>
11876	11876	<>	<elision1>
11876	11197	.	υ
11876	11200	s	υ
11876	11197	.	u
11876	11200	s	u
11876	11246	s	U
11876	11197	.	α
11876	11271	s	α
11876	11197	.	a
11876	11271	s	a
11876	11274	s	A
11876	10605	<1s>	<>
11877	11192	.	.
11877	11195	 	 
11877	11192	<~>	<~>
11877	11192	<split-s>	<split-s>
11877	11192	<split-h>	<split-h>
11877	11192	<name2>	<name2>
11877	11301	<aphaerese>	<aphaerese>
11877	11875	<>	<aphaerese>
11877	11192	<elision3>	<elision3>
11877	11875	<>	<elision3>
11877	11192	<elision2>	<elision2>
11877	11875	<>	<elision2>
11877	11192	<elision1>	<elision1>
11877	11875	<>	<elision1>
11877	11199	.	υ
11877	11202	s	υ
11877	11199	.	u
11877	11202	s	u
11877	11248	s	U
11877	11199	.	α
11877	11273	s	α
11877	11199	.	a
11877	11273	s	a
11877	11276	s	A
11877	10606	<1s>	<>
11878	11189	.	.
11878	11190	 	 
11878	11189	<~>	<~>
11878	11189	<split-s>	<split-s>
11878	11189	<split-h>	<split-h>
11878	11189	<name2>	<name2>
11878	11193	<aphaerese>	<aphaerese>
11878	11876	<>	<aphaerese>
11878	11189	<elision3>	<elision3>
11878	11876	<>	<elision3>
11878	11189	<elision2>	<elision2>
11878	11876	<>	<elision2>
11878	11189	<elision1>	<elision1>
11878	11876	<>	<elision1>
11878	11197	.	υ
11878	11200	s	υ
11878	11197	.	u
11878	11200	s	u
11878	11246	s	U
11878	11197	.	α
11878	11271	s	α
11878	11197	.	a
11878	11271	s	a
11878	11274	s	A
11878	11879	<1s>	<>
11879	71	.	.
11879	72	 	 
11879	71	<~>	<~>
11879	71	<split-s>	<split-s>
11879	71	<split-h>	<split-h>
11879	71	<name2>	<name2>
11879	75	<aphaerese>	<aphaerese>
11879	10605	<>	<aphaerese>
11879	71	<elision3>	<elision3>
11879	10605	<>	<elision3>
11879	71	<elision2>	<elision2>
11879	10605	<>	<elision2>
11879	71	<elision1>	<elision1>
11879	10605	<>	<elision1>
11879	9751	.	υ
11879	9751	.	u
11879	9751	.	α
11879	9751	.	a
11879	11880	<K>	<>
11880	9801	.	.
11880	9801	<~>	<~>
11880	9801	<split-s>	<split-s>
11880	9801	<split-h>	<split-h>
11880	9801	<name2>	<name2>
11880	9804	<aphaerese>	<aphaerese>
11880	10609	<>	<aphaerese>
11880	9801	<elision3>	<elision3>
11880	10609	<>	<elision3>
11880	9801	<elision2>	<elision2>
11880	10609	<>	<elision2>
11880	9801	<elision1>	<elision1>
11880	10609	<>	<elision1>
11880	9800	.	υ
11880	9800	.	u
11880	9800	.	α
11880	9800	.	a
11881	11023	.	.
11881	11024	 	 
11881	11023	<~>	<~>
11881	11023	<split-s>	<split-s>
11881	11023	<split-h>	<split-h>
11881	11023	<name2>	<name2>
11881	11027	<aphaerese>	<aphaerese>
11881	11882	<>	<aphaerese>
11881	11023	<elision3>	<elision3>
11881	11882	<>	<elision3>
11881	11023	<elision2>	<elision2>
11881	11882	<>	<elision2>
11881	11023	<elision1>	<elision1>
11881	11882	<>	<elision1>
11881	11031	.	υ
11881	11034	s	υ
11881	11031	.	u
11881	11034	s	u
11881	11197	.	κ
11881	11097	s	U
11881	11031	.	α
11881	11125	s	α
11881	11031	.	a
11881	11125	s	a
11881	11128	s	A
11881	11197	.	λ
11881	10520	<1s>	<>
11881	11878	<K2L>	<>
11882	11023	.	.
11882	11024	 	 
11882	11023	<~>	<~>
11882	11023	<split-s>	<split-s>
11882	11023	<split-h>	<split-h>
11882	11023	<name2>	<name2>
11882	11883	<>	<name>
11882	11027	<aphaerese>	<aphaerese>
11882	11882	<>	<aphaerese>
11882	11023	<elision3>	<elision3>
11882	11882	<>	<elision3>
11882	11023	<elision2>	<elision2>
11882	11882	<>	<elision2>
11882	11023	<elision1>	<elision1>
11882	11882	<>	<elision1>
11882	11031	.	υ
11882	11034	s	υ
11882	11031	.	u
11882	11034	s	u
11882	11197	.	κ
11882	11097	s	U
11882	11031	.	α
11882	11125	s	α
11882	11031	.	a
11882	11125	s	a
11882	11128	s	A
11882	11197	.	λ
11882	10521	<1s>	<>
11882	11876	<K2L>	<>
11883	11026	.	.
11883	11029	 	 
11883	11026	<~>	<~>
11883	11026	<split-s>	<split-s>
11883	11026	<split-h>	<split-h>
11883	11026	<name2>	<name2>
11883	11155	<aphaerese>	<aphaerese>
11883	11884	<>	<aphaerese>
11883	11026	<elision3>	<elision3>
11883	11884	<>	<elision3>
11883	11026	<elision2>	<elision2>
11883	11884	<>	<elision2>
11883	11026	<elision1>	<elision1>
11883	11884	<>	<elision1>
11883	11033	.	υ
11883	11036	s	υ
11883	11033	.	u
11883	11036	s	u
11883	11199	.	κ
11883	11099	s	U
11883	11033	.	α
11883	11127	s	α
11883	11033	.	a
11883	11127	s	a
11883	11130	s	A
11883	11199	.	λ
11883	10522	<1s>	<>
11883	11877	<K2L>	<>
11884	11023	.	.
11884	11024	 	 
11884	11023	<~>	<~>
11884	11023	<split-s>	<split-s>
11884	11023	<split-h>	<split-h>
11884	11023	<name2>	<name2>
11884	11027	<aphaerese>	<aphaerese>
11884	11882	<>	<aphaerese>
11884	11023	<elision3>	<elision3>
11884	11882	<>	<elision3>
11884	11023	<elision2>	<elision2>
11884	11882	<>	<elision2>
11884	11023	<elision1>	<elision1>
11884	11882	<>	<elision1>
11884	11031	.	υ
11884	11034	s	υ
11884	11031	.	u
11884	11034	s	u
11884	11197	.	κ
11884	11097	s	U
11884	11031	.	α
11884	11125	s	α
11884	11031	.	a
11884	11125	s	a
11884	11128	s	A
11884	11197	.	λ
11884	10520	<1s>	<>
11884	11875	<K2L>	<>
11885	11886	<>	<aphaerese>
11885	11886	<>	<elision3>
11885	11886	<>	<elision2>
11885	11886	<>	<elision1>
11885	11889	<lambda2L>	<>
11886	11887	<>	<name>
11886	11886	<>	<aphaerese>
11886	11886	<>	<elision3>
11886	11886	<>	<elision2>
11886	11886	<>	<elision1>
11886	11890	<lambda2L>	<>
11887	11885	<>	<aphaerese>
11887	11885	<>	<elision3>
11887	11885	<>	<elision2>
11887	11885	<>	<elision1>
11887	11888	<lambda2L>	<>
11888	11192	.	.
11888	11195	 	 
11888	11192	<~>	<~>
11888	11192	<split-s>	<split-s>
11888	11192	<split-h>	<split-h>
11888	11192	<name2>	<name2>
11888	11301	<aphaerese>	<aphaerese>
11888	11889	<>	<aphaerese>
11888	11192	<elision3>	<elision3>
11888	11889	<>	<elision3>
11888	11192	<elision2>	<elision2>
11888	11889	<>	<elision2>
11888	11192	<elision1>	<elision1>
11888	11889	<>	<elision1>
11888	11199	.	υ
11888	11202	s	υ
11888	11199	.	u
11888	11202	s	u
11888	11199	.	κ
11888	11248	s	U
11888	11199	.	α
11888	11273	s	α
11888	11199	.	a
11888	11273	s	a
11888	11276	s	A
11888	11199	.	λ
11888	10593	<1s>	<>
11889	11189	.	.
11889	11190	 	 
11889	11189	<~>	<~>
11889	11189	<split-s>	<split-s>
11889	11189	<split-h>	<split-h>
11889	11189	<name2>	<name2>
11889	11193	<aphaerese>	<aphaerese>
11889	11890	<>	<aphaerese>
11889	11189	<elision3>	<elision3>
11889	11890	<>	<elision3>
11889	11189	<elision2>	<elision2>
11889	11890	<>	<elision2>
11889	11189	<elision1>	<elision1>
11889	11890	<>	<elision1>
11889	11197	.	υ
11889	11200	s	υ
11889	11197	.	u
11889	11200	s	u
11889	11197	.	κ
11889	11246	s	U
11889	11197	.	α
11889	11271	s	α
11889	11197	.	a
11889	11271	s	a
11889	11274	s	A
11889	11197	.	λ
11889	10591	<1s>	<>
11890	11189	.	.
11890	11190	 	 
11890	11189	<~>	<~>
11890	11189	<split-s>	<split-s>
11890	11189	<split-h>	<split-h>
11890	11189	<name2>	<name2>
11890	11888	<>	<name>
11890	11193	<aphaerese>	<aphaerese>
11890	11890	<>	<aphaerese>
11890	11189	<elision3>	<elision3>
11890	11890	<>	<elision3>
11890	11189	<elision2>	<elision2>
11890	11890	<>	<elision2>
11890	11189	<elision1>	<elision1>
11890	11890	<>	<elision1>
11890	11197	.	υ
11890	11200	s	υ
11890	11197	.	u
11890	11200	s	u
11890	11197	.	κ
11890	11246	s	U
11890	11197	.	α
11890	11271	s	α
11890	11197	.	a
11890	11271	s	a
11890	11274	s	A
11890	11197	.	λ
11890	10592	<1s>	<>
11891	11892	<>	<aphaerese>
11891	11892	<>	<elision3>
11891	11892	<>	<elision2>
11891	11892	<>	<elision1>
11891	11889	<l2L>	<>
11892	11893	<>	<name>
11892	11892	<>	<aphaerese>
11892	11892	<>	<elision3>
11892	11892	<>	<elision2>
11892	11892	<>	<elision1>
11892	11890	<l2L>	<>
11893	11891	<>	<aphaerese>
11893	11891	<>	<elision3>
11893	11891	<>	<elision2>
11893	11891	<>	<elision1>
11893	11888	<l2L>	<>
11894	11444	.	.
11894	11444	<~>	<~>
11894	11444	<split-s>	<split-s>
11894	11444	<split-h>	<split-h>
11894	11444	<name2>	<name2>
11894	11447	<aphaerese>	<aphaerese>
11894	11895	<>	<aphaerese>
11894	11444	<elision3>	<elision3>
11894	11895	<>	<elision3>
11894	11444	<elision2>	<elision2>
11894	11895	<>	<elision2>
11894	11444	<elision1>	<elision1>
11894	11895	<>	<elision1>
11894	11440	.	υ
11894	11568	H	υ
11894	11440	.	u
11894	11577	H	u
11894	11450	.	κ
11894	11899	H	κ
11894	11908	H	k
11894	11546	H	U
11894	11917	H	K
11894	11440	.	α
11894	11580	H	α
11894	11440	.	a
11894	11583	H	a
11894	11520	H	A
11894	11922	H	λ
11894	11928	H	l
11894	11923	H	L
11895	11442	.	.
11895	11442	<~>	<~>
11895	11442	<split-s>	<split-s>
11895	11442	<split-h>	<split-h>
11895	11442	<name2>	<name2>
11895	11445	<aphaerese>	<aphaerese>
11895	11896	<>	<aphaerese>
11895	11442	<elision3>	<elision3>
11895	11896	<>	<elision3>
11895	11442	<elision2>	<elision2>
11895	11896	<>	<elision2>
11895	11442	<elision1>	<elision1>
11895	11896	<>	<elision1>
11895	11441	.	υ
11895	11566	H	υ
11895	11441	.	u
11895	11575	H	u
11895	11448	.	κ
11895	11897	H	κ
11895	11906	H	k
11895	11544	H	U
11895	11915	H	K
11895	11441	.	α
11895	11578	H	α
11895	11441	.	a
11895	11581	H	a
11895	11518	H	A
11895	11920	H	λ
11895	11926	H	l
11895	11929	H	L
11896	11442	.	.
11896	11442	<~>	<~>
11896	11442	<split-s>	<split-s>
11896	11442	<split-h>	<split-h>
11896	11442	<name2>	<name2>
11896	11894	<>	<name>
11896	11445	<aphaerese>	<aphaerese>
11896	11896	<>	<aphaerese>
11896	11442	<elision3>	<elision3>
11896	11896	<>	<elision3>
11896	11442	<elision2>	<elision2>
11896	11896	<>	<elision2>
11896	11442	<elision1>	<elision1>
11896	11896	<>	<elision1>
11896	11441	.	υ
11896	11566	H	υ
11896	11441	.	u
11896	11575	H	u
11896	11448	.	κ
11896	11897	H	κ
11896	11906	H	k
11896	11544	H	U
11896	11915	H	K
11896	11441	.	α
11896	11578	H	α
11896	11441	.	a
11896	11581	H	a
11896	11518	H	A
11896	11920	H	λ
11896	11926	H	l
11896	11929	H	L
11897	11898	<>	<name>
11897	11897	<>	<aphaerese>
11897	11897	<>	<elision3>
11897	11897	<>	<elision2>
11897	11897	<>	<elision1>
11897	11901	<kappa2K>	<>
11897	11904	<kappa2L>	<>
11897	11533	<lambda2L>	<>
11898	11899	<>	<aphaerese>
11898	11899	<>	<elision3>
11898	11899	<>	<elision2>
11898	11899	<>	<elision1>
11898	11902	<kappa2K>	<>
11898	11905	<kappa2L>	<>
11898	11534	<lambda2L>	<>
11899	11897	<>	<aphaerese>
11899	11897	<>	<elision3>
11899	11897	<>	<elision2>
11899	11897	<>	<elision1>
11899	11900	<kappa2K>	<>
11899	11903	<kappa2L>	<>
11899	11532	<lambda2L>	<>
11900	11494	.	.
11900	11494	<~>	<~>
11900	11494	<split-s>	<split-s>
11900	11494	<split-h>	<split-h>
11900	11494	<name2>	<name2>
11900	11497	<aphaerese>	<aphaerese>
11900	11901	<>	<aphaerese>
11900	11515	<elision3>	<elision3>
11900	11901	<>	<elision3>
11900	11515	<elision2>	<elision2>
11900	11901	<>	<elision2>
11900	11515	<elision1>	<elision1>
11900	11901	<>	<elision1>
11900	11509	.	υ
11900	11461	s	υ
11900	11509	.	u
11900	11461	s	u
11900	11503	s	U
11900	11509	.	α
11900	11461	s	α
11900	11509	.	a
11900	11461	s	a
11900	11506	s	A
11901	11494	.	.
11901	11494	<~>	<~>
11901	11494	<split-s>	<split-s>
11901	11494	<split-h>	<split-h>
11901	11494	<name2>	<name2>
11901	11902	<>	<name>
11901	11497	<aphaerese>	<aphaerese>
11901	11901	<>	<aphaerese>
11901	11515	<elision3>	<elision3>
11901	11901	<>	<elision3>
11901	11515	<elision2>	<elision2>
11901	11901	<>	<elision2>
11901	11515	<elision1>	<elision1>
11901	11901	<>	<elision1>
11901	11509	.	υ
11901	11461	s	υ
11901	11509	.	u
11901	11461	s	u
11901	11503	s	U
11901	11509	.	α
11901	11461	s	α
11901	11509	.	a
11901	11461	s	a
11901	11506	s	A
11902	11496	.	.
11902	11496	<~>	<~>
11902	11496	<split-s>	<split-s>
11902	11496	<split-h>	<split-h>
11902	11496	<name2>	<name2>
11902	11499	<aphaerese>	<aphaerese>
11902	11900	<>	<aphaerese>
11902	11514	<elision3>	<elision3>
11902	11900	<>	<elision3>
11902	11514	<elision2>	<elision2>
11902	11900	<>	<elision2>
11902	11514	<elision1>	<elision1>
11902	11900	<>	<elision1>
11902	11511	.	υ
11902	11460	s	υ
11902	11511	.	u
11902	11460	s	u
11902	11505	s	U
11902	11511	.	α
11902	11460	s	α
11902	11511	.	a
11902	11460	s	a
11902	11508	s	A
11903	11518	.	.
11903	11518	<~>	<~>
11903	11518	<split-s>	<split-s>
11903	11518	<split-h>	<split-h>
11903	11518	<name2>	<name2>
11903	11521	<aphaerese>	<aphaerese>
11903	11904	<>	<aphaerese>
11903	11530	<elision3>	<elision3>
11903	11904	<>	<elision3>
11903	11530	<elision2>	<elision2>
11903	11904	<>	<elision2>
11903	11530	<elision1>	<elision1>
11903	11904	<>	<elision1>
11903	11524	.	υ
11903	11461	s	υ
11903	11524	.	u
11903	11461	s	u
11903	11503	s	U
11903	11524	.	α
11903	11461	s	α
11903	11524	.	a
11903	11461	s	a
11903	11506	s	A
11904	11518	.	.
11904	11518	<~>	<~>
11904	11518	<split-s>	<split-s>
11904	11518	<split-h>	<split-h>
11904	11518	<name2>	<name2>
11904	11905	<>	<name>
11904	11521	<aphaerese>	<aphaerese>
11904	11904	<>	<aphaerese>
11904	11530	<elision3>	<elision3>
11904	11904	<>	<elision3>
11904	11530	<elision2>	<elision2>
11904	11904	<>	<elision2>
11904	11530	<elision1>	<elision1>
11904	11904	<>	<elision1>
11904	11524	.	υ
11904	11461	s	υ
11904	11524	.	u
11904	11461	s	u
11904	11503	s	U
11904	11524	.	α
11904	11461	s	α
11904	11524	.	a
11904	11461	s	a
11904	11506	s	A
11905	11520	.	.
11905	11520	<~>	<~>
11905	11520	<split-s>	<split-s>
11905	11520	<split-h>	<split-h>
11905	11520	<name2>	<name2>
11905	11523	<aphaerese>	<aphaerese>
11905	11903	<>	<aphaerese>
11905	11529	<elision3>	<elision3>
11905	11903	<>	<elision3>
11905	11529	<elision2>	<elision2>
11905	11903	<>	<elision2>
11905	11529	<elision1>	<elision1>
11905	11903	<>	<elision1>
11905	11526	.	υ
11905	11460	s	υ
11905	11526	.	u
11905	11460	s	u
11905	11505	s	U
11905	11526	.	α
11905	11460	s	α
11905	11526	.	a
11905	11460	s	a
11905	11508	s	A
11906	11907	<>	<name>
11906	11906	<>	<aphaerese>
11906	11906	<>	<elision3>
11906	11906	<>	<elision2>
11906	11906	<>	<elision1>
11906	11910	<k2K>	<>
11906	11913	<k2L>	<>
11906	11533	<l2L>	<>
11907	11908	<>	<aphaerese>
11907	11908	<>	<elision3>
11907	11908	<>	<elision2>
11907	11908	<>	<elision1>
11907	11911	<k2K>	<>
11907	11914	<k2L>	<>
11907	11534	<l2L>	<>
11908	11906	<>	<aphaerese>
11908	11906	<>	<elision3>
11908	11906	<>	<elision2>
11908	11906	<>	<elision1>
11908	11909	<k2K>	<>
11908	11912	<k2L>	<>
11908	11532	<l2L>	<>
11909	11494	.	.
11909	11494	<~>	<~>
11909	11494	<split-s>	<split-s>
11909	11494	<split-h>	<split-h>
11909	11494	<name2>	<name2>
11909	11497	<aphaerese>	<aphaerese>
11909	11910	<>	<aphaerese>
11909	11494	<elision3>	<elision3>
11909	11910	<>	<elision3>
11909	11494	<elision2>	<elision2>
11909	11910	<>	<elision2>
11909	11494	<elision1>	<elision1>
11909	11910	<>	<elision1>
11909	11509	.	υ
11909	11461	s	υ
11909	11509	.	u
11909	11461	s	u
11909	11503	s	U
11909	11509	.	α
11909	11461	s	α
11909	11509	.	a
11909	11461	s	a
11909	11506	s	A
11910	11494	.	.
11910	11494	<~>	<~>
11910	11494	<split-s>	<split-s>
11910	11494	<split-h>	<split-h>
11910	11494	<name2>	<name2>
11910	11911	<>	<name>
11910	11497	<aphaerese>	<aphaerese>
11910	11910	<>	<aphaerese>
11910	11494	<elision3>	<elision3>
11910	11910	<>	<elision3>
11910	11494	<elision2>	<elision2>
11910	11910	<>	<elision2>
11910	11494	<elision1>	<elision1>
11910	11910	<>	<elision1>
11910	11509	.	υ
11910	11461	s	υ
11910	11509	.	u
11910	11461	s	u
11910	11503	s	U
11910	11509	.	α
11910	11461	s	α
11910	11509	.	a
11910	11461	s	a
11910	11506	s	A
11911	11496	.	.
11911	11496	<~>	<~>
11911	11496	<split-s>	<split-s>
11911	11496	<split-h>	<split-h>
11911	11496	<name2>	<name2>
11911	11499	<aphaerese>	<aphaerese>
11911	11909	<>	<aphaerese>
11911	11496	<elision3>	<elision3>
11911	11909	<>	<elision3>
11911	11496	<elision2>	<elision2>
11911	11909	<>	<elision2>
11911	11496	<elision1>	<elision1>
11911	11909	<>	<elision1>
11911	11511	.	υ
11911	11460	s	υ
11911	11511	.	u
11911	11460	s	u
11911	11505	s	U
11911	11511	.	α
11911	11460	s	α
11911	11511	.	a
11911	11460	s	a
11911	11508	s	A
11912	11518	.	.
11912	11518	<~>	<~>
11912	11518	<split-s>	<split-s>
11912	11518	<split-h>	<split-h>
11912	11518	<name2>	<name2>
11912	11521	<aphaerese>	<aphaerese>
11912	11913	<>	<aphaerese>
11912	11518	<elision3>	<elision3>
11912	11913	<>	<elision3>
11912	11518	<elision2>	<elision2>
11912	11913	<>	<elision2>
11912	11518	<elision1>	<elision1>
11912	11913	<>	<elision1>
11912	11524	.	υ
11912	11461	s	υ
11912	11524	.	u
11912	11461	s	u
11912	11503	s	U
11912	11524	.	α
11912	11461	s	α
11912	11524	.	a
11912	11461	s	a
11912	11506	s	A
11913	11518	.	.
11913	11518	<~>	<~>
11913	11518	<split-s>	<split-s>
11913	11518	<split-h>	<split-h>
11913	11518	<name2>	<name2>
11913	11914	<>	<name>
11913	11521	<aphaerese>	<aphaerese>
11913	11913	<>	<aphaerese>
11913	11518	<elision3>	<elision3>
11913	11913	<>	<elision3>
11913	11518	<elision2>	<elision2>
11913	11913	<>	<elision2>
11913	11518	<elision1>	<elision1>
11913	11913	<>	<elision1>
11913	11524	.	υ
11913	11461	s	υ
11913	11524	.	u
11913	11461	s	u
11913	11503	s	U
11913	11524	.	α
11913	11461	s	α
11913	11524	.	a
11913	11461	s	a
11913	11506	s	A
11914	11520	.	.
11914	11520	<~>	<~>
11914	11520	<split-s>	<split-s>
11914	11520	<split-h>	<split-h>
11914	11520	<name2>	<name2>
11914	11523	<aphaerese>	<aphaerese>
11914	11912	<>	<aphaerese>
11914	11520	<elision3>	<elision3>
11914	11912	<>	<elision3>
11914	11520	<elision2>	<elision2>
11914	11912	<>	<elision2>
11914	11520	<elision1>	<elision1>
11914	11912	<>	<elision1>
11914	11526	.	υ
11914	11460	s	υ
11914	11526	.	u
11914	11460	s	u
11914	11505	s	U
11914	11526	.	α
11914	11460	s	α
11914	11526	.	a
11914	11460	s	a
11914	11508	s	A
11915	11494	.	.
11915	11494	<~>	<~>
11915	11494	<split-s>	<split-s>
11915	11494	<split-h>	<split-h>
11915	11494	<name2>	<name2>
11915	11548	<name2>	<name>
11915	11916	<>	<name>
11915	11497	<aphaerese>	<aphaerese>
11915	11918	<>	<aphaerese>
11915	11494	<elision3>	<elision3>
11915	11918	<>	<elision3>
11915	11494	<elision2>	<elision2>
11915	11918	<>	<elision2>
11915	11494	<elision1>	<elision1>
11915	11918	<>	<elision1>
11915	11509	.	υ
11915	11461	s	υ
11915	11509	.	u
11915	11461	s	u
11915	11524	.	κ
11915	11503	s	U
11915	11509	.	α
11915	11461	s	α
11915	11509	.	a
11915	11461	s	a
11915	11506	s	A
11915	11524	.	λ
11915	11552	<k2K>	<>
11915	11553	<k2L>	<>
11915	11919	<K2L>	<>
11916	11496	.	.
11916	11496	<~>	<~>
11916	11496	<split-s>	<split-s>
11916	11496	<split-h>	<split-h>
11916	11496	<name2>	<name2>
11916	11499	<aphaerese>	<aphaerese>
11916	11917	<>	<aphaerese>
11916	11496	<elision3>	<elision3>
11916	11917	<>	<elision3>
11916	11496	<elision2>	<elision2>
11916	11917	<>	<elision2>
11916	11496	<elision1>	<elision1>
11916	11917	<>	<elision1>
11916	11511	.	υ
11916	11460	s	υ
11916	11511	.	u
11916	11460	s	u
11916	11526	.	κ
11916	11505	s	U
11916	11511	.	α
11916	11460	s	α
11916	11511	.	a
11916	11460	s	a
11916	11508	s	A
11916	11526	.	λ
11916	11914	<K2L>	<>
11917	11494	.	.
11917	11494	<~>	<~>
11917	11494	<split-s>	<split-s>
11917	11494	<split-h>	<split-h>
11917	11494	<name2>	<name2>
11917	11497	<aphaerese>	<aphaerese>
11917	11918	<>	<aphaerese>
11917	11494	<elision3>	<elision3>
11917	11918	<>	<elision3>
11917	11494	<elision2>	<elision2>
11917	11918	<>	<elision2>
11917	11494	<elision1>	<elision1>
11917	11918	<>	<elision1>
11917	11509	.	υ
11917	11461	s	υ
11917	11509	.	u
11917	11461	s	u
11917	11524	.	κ
11917	11503	s	U
11917	11509	.	α
11917	11461	s	α
11917	11509	.	a
11917	11461	s	a
11917	11506	s	A
11917	11524	.	λ
11917	11912	<K2L>	<>
11918	11494	.	.
11918	11494	<~>	<~>
11918	11494	<split-s>	<split-s>
11918	11494	<split-h>	<split-h>
11918	11494	<name2>	<name2>
11918	11916	<>	<name>
11918	11497	<aphaerese>	<aphaerese>
11918	11918	<>	<aphaerese>
11918	11494	<elision3>	<elision3>
11918	11918	<>	<elision3>
11918	11494	<elision2>	<elision2>
11918	11918	<>	<elision2>
11918	11494	<elision1>	<elision1>
11918	11918	<>	<elision1>
11918	11509	.	υ
11918	11461	s	υ
11918	11509	.	u
11918	11461	s	u
11918	11524	.	κ
11918	11503	s	U
11918	11509	.	α
11918	11461	s	α
11918	11509	.	a
11918	11461	s	a
11918	11506	s	A
11918	11524	.	λ
11918	11913	<K2L>	<>
11919	11518	.	.
11919	11518	<~>	<~>
11919	11518	<split-s>	<split-s>
11919	11518	<split-h>	<split-h>
11919	11518	<name2>	<name2>
11919	11554	<name2>	<name>
11919	11914	<>	<name>
11919	11521	<aphaerese>	<aphaerese>
11919	11913	<>	<aphaerese>
11919	11518	<elision3>	<elision3>
11919	11913	<>	<elision3>
11919	11518	<elision2>	<elision2>
11919	11913	<>	<elision2>
11919	11518	<elision1>	<elision1>
11919	11913	<>	<elision1>
11919	11524	.	υ
11919	11461	s	υ
11919	11524	.	u
11919	11461	s	u
11919	11503	s	U
11919	11524	.	α
11919	11461	s	α
11919	11524	.	a
11919	11461	s	a
11919	11506	s	A
11920	11921	<>	<name>
11920	11920	<>	<aphaerese>
11920	11920	<>	<elision3>
11920	11920	<>	<elision2>
11920	11920	<>	<elision1>
11920	11924	<lambda2L>	<>
11921	11922	<>	<aphaerese>
11921	11922	<>	<elision3>
11921	11922	<>	<elision2>
11921	11922	<>	<elision1>
11921	11925	<lambda2L>	<>
11922	11920	<>	<aphaerese>
11922	11920	<>	<elision3>
11922	11920	<>	<elision2>
11922	11920	<>	<elision1>
11922	11923	<lambda2L>	<>
11923	11518	.	.
11923	11518	<~>	<~>
11923	11518	<split-s>	<split-s>
11923	11518	<split-h>	<split-h>
11923	11518	<name2>	<name2>
11923	11521	<aphaerese>	<aphaerese>
11923	11924	<>	<aphaerese>
11923	11518	<elision3>	<elision3>
11923	11924	<>	<elision3>
11923	11518	<elision2>	<elision2>
11923	11924	<>	<elision2>
11923	11518	<elision1>	<elision1>
11923	11924	<>	<elision1>
11923	11524	.	υ
11923	11461	s	υ
11923	11524	.	u
11923	11461	s	u
11923	11524	.	κ
11923	11503	s	U
11923	11524	.	α
11923	11461	s	α
11923	11524	.	a
11923	11461	s	a
11923	11506	s	A
11923	11524	.	λ
11924	11518	.	.
11924	11518	<~>	<~>
11924	11518	<split-s>	<split-s>
11924	11518	<split-h>	<split-h>
11924	11518	<name2>	<name2>
11924	11925	<>	<name>
11924	11521	<aphaerese>	<aphaerese>
11924	11924	<>	<aphaerese>
11924	11518	<elision3>	<elision3>
11924	11924	<>	<elision3>
11924	11518	<elision2>	<elision2>
11924	11924	<>	<elision2>
11924	11518	<elision1>	<elision1>
11924	11924	<>	<elision1>
11924	11524	.	υ
11924	11461	s	υ
11924	11524	.	u
11924	11461	s	u
11924	11524	.	κ
11924	11503	s	U
11924	11524	.	α
11924	11461	s	α
11924	11524	.	a
11924	11461	s	a
11924	11506	s	A
11924	11524	.	λ
11925	11520	.	.
11925	11520	<~>	<~>
11925	11520	<split-s>	<split-s>
11925	11520	<split-h>	<split-h>
11925	11520	<name2>	<name2>
11925	11523	<aphaerese>	<aphaerese>
11925	11923	<>	<aphaerese>
11925	11520	<elision3>	<elision3>
11925	11923	<>	<elision3>
11925	11520	<elision2>	<elision2>
11925	11923	<>	<elision2>
11925	11520	<elision1>	<elision1>
11925	11923	<>	<elision1>
11925	11526	.	υ
11925	11460	s	υ
11925	11526	.	u
11925	11460	s	u
11925	11526	.	κ
11925	11505	s	U
11925	11526	.	α
11925	11460	s	α
11925	11526	.	a
11925	11460	s	a
11925	11508	s	A
11925	11526	.	λ
11926	11927	<>	<name>
11926	11926	<>	<aphaerese>
11926	11926	<>	<elision3>
11926	11926	<>	<elision2>
11926	11926	<>	<elision1>
11926	11924	<l2L>	<>
11927	11928	<>	<aphaerese>
11927	11928	<>	<elision3>
11927	11928	<>	<elision2>
11927	11928	<>	<elision1>
11927	11925	<l2L>	<>
11928	11926	<>	<aphaerese>
11928	11926	<>	<elision3>
11928	11926	<>	<elision2>
11928	11926	<>	<elision1>
11928	11923	<l2L>	<>
11929	11518	.	.
11929	11518	<~>	<~>
11929	11518	<split-s>	<split-s>
11929	11518	<split-h>	<split-h>
11929	11518	<name2>	<name2>
11929	11554	<name2>	<name>
11929	11925	<>	<name>
11929	11521	<aphaerese>	<aphaerese>
11929	11924	<>	<aphaerese>
11929	11518	<elision3>	<elision3>
11929	11924	<>	<elision3>
11929	11518	<elision2>	<elision2>
11929	11924	<>	<elision2>
11929	11518	<elision1>	<elision1>
11929	11924	<>	<elision1>
11929	11524	.	υ
11929	11461	s	υ
11929	11524	.	u
11929	11461	s	u
11929	11524	.	κ
11929	11503	s	U
11929	11524	.	α
11929	11461	s	α
11929	11524	.	a
11929	11461	s	a
11929	11506	s	A
11929	11524	.	λ
11929	11553	<l2L>	<>
11930	11851	<>	<name>
11930	11850	<>	<aphaerese>
11930	11850	<>	<elision3>
11930	11850	<>	<elision2>
11930	11850	<>	<elision1>
11930	11854	<kappa2K>	<>
11930	11931	<kappa2L>	<>
11930	11340	<lambda2L>	<>
11931	11189	.	.
11931	11190	 	 
11931	11189	<~>	<~>
11931	11189	<split-s>	<split-s>
11931	11189	<split-h>	<split-h>
11931	11189	<name2>	<name2>
11931	11858	<>	<name>
11931	11193	<aphaerese>	<aphaerese>
11931	11857	<>	<aphaerese>
11931	11306	<elision3>	<elision3>
11931	11857	<>	<elision3>
11931	11306	<elision2>	<elision2>
11931	11857	<>	<elision2>
11931	11306	<elision1>	<elision1>
11931	11857	<>	<elision1>
11931	11197	.	υ
11931	11200	s	υ
11931	11197	.	u
11931	11200	s	u
11931	11246	s	U
11931	11197	.	α
11931	11271	s	α
11931	11197	.	a
11931	11271	s	a
11931	11274	s	A
11931	11932	<1s>	<>
11932	71	.	.
11932	72	 	 
11932	71	<~>	<~>
11932	71	<split-s>	<split-s>
11932	71	<split-h>	<split-h>
11932	71	<name2>	<name2>
11932	11859	<>	<name>
11932	75	<aphaerese>	<aphaerese>
11932	11861	<>	<aphaerese>
11932	10333	<elision3>	<elision3>
11932	11861	<>	<elision3>
11932	10333	<elision2>	<elision2>
11932	11861	<>	<elision2>
11932	10333	<elision1>	<elision1>
11932	11861	<>	<elision1>
11932	9751	.	υ
11932	9751	.	u
11932	9751	.	α
11932	9751	.	a
11932	11933	<K>	<>
11933	9801	.	.
11933	9801	<~>	<~>
11933	9801	<split-s>	<split-s>
11933	9801	<split-h>	<split-h>
11933	9801	<name2>	<name2>
11933	11863	<>	<name>
11933	9804	<aphaerese>	<aphaerese>
11933	11862	<>	<aphaerese>
11933	10282	<elision3>	<elision3>
11933	11862	<>	<elision3>
11933	10282	<elision2>	<elision2>
11933	11862	<>	<elision2>
11933	10282	<elision1>	<elision1>
11933	11862	<>	<elision1>
11933	9800	.	υ
11933	9800	.	u
11933	9800	.	α
11933	9800	.	a
11934	11870	<>	<name>
11934	11869	<>	<aphaerese>
11934	11869	<>	<elision3>
11934	11869	<>	<elision2>
11934	11869	<>	<elision1>
11934	11873	<k2K>	<>
11934	11935	<k2L>	<>
11934	11340	<l2L>	<>
11935	11189	.	.
11935	11190	 	 
11935	11189	<~>	<~>
11935	11189	<split-s>	<split-s>
11935	11189	<split-h>	<split-h>
11935	11189	<name2>	<name2>
11935	11877	<>	<name>
11935	11193	<aphaerese>	<aphaerese>
11935	11876	<>	<aphaerese>
11935	11189	<elision3>	<elision3>
11935	11876	<>	<elision3>
11935	11189	<elision2>	<elision2>
11935	11876	<>	<elision2>
11935	11189	<elision1>	<elision1>
11935	11876	<>	<elision1>
11935	11197	.	υ
11935	11200	s	υ
11935	11197	.	u
11935	11200	s	u
11935	11246	s	U
11935	11197	.	α
11935	11271	s	α
11935	11197	.	a
11935	11271	s	a
11935	11274	s	A
11935	11936	<1s>	<>
11936	71	.	.
11936	72	 	 
11936	71	<~>	<~>
11936	71	<split-s>	<split-s>
11936	71	<split-h>	<split-h>
11936	71	<name2>	<name2>
11936	10606	<>	<name>
11936	75	<aphaerese>	<aphaerese>
11936	10605	<>	<aphaerese>
11936	71	<elision3>	<elision3>
11936	10605	<>	<elision3>
11936	71	<elision2>	<elision2>
11936	10605	<>	<elision2>
11936	71	<elision1>	<elision1>
11936	10605	<>	<elision1>
11936	9751	.	υ
11936	9751	.	u
11936	9751	.	α
11936	9751	.	a
11936	11937	<K>	<>
11937	9801	.	.
11937	9801	<~>	<~>
11937	9801	<split-s>	<split-s>
11937	9801	<split-h>	<split-h>
11937	9801	<name2>	<name2>
11937	10607	<>	<name>
11937	9804	<aphaerese>	<aphaerese>
11937	10609	<>	<aphaerese>
11937	9801	<elision3>	<elision3>
11937	10609	<>	<elision3>
11937	9801	<elision2>	<elision2>
11937	10609	<>	<elision2>
11937	9801	<elision1>	<elision1>
11937	10609	<>	<elision1>
11937	9800	.	υ
11937	9800	.	u
11937	9800	.	α
11937	9800	.	a
11938	11023	.	.
11938	11024	 	 
11938	11023	<~>	<~>
11938	11023	<split-s>	<split-s>
11938	11023	<split-h>	<split-h>
11938	11023	<name2>	<name2>
11938	11363	<name2>	<name>
11938	11883	<>	<name>
11938	11027	<aphaerese>	<aphaerese>
11938	11882	<>	<aphaerese>
11938	11023	<elision3>	<elision3>
11938	11882	<>	<elision3>
11938	11023	<elision2>	<elision2>
11938	11882	<>	<elision2>
11938	11023	<elision1>	<elision1>
11938	11882	<>	<elision1>
11938	11031	.	υ
11938	11034	s	υ
11938	11031	.	u
11938	11034	s	u
11938	11197	.	κ
11938	11097	s	U
11938	11031	.	α
11938	11125	s	α
11938	11031	.	a
11938	11125	s	a
11938	11128	s	A
11938	11197	.	λ
11938	10521	<1s>	<>
11938	11367	<k2K>	<>
11938	11368	<k2L>	<>
11938	11939	<K2L>	<>
11939	11189	.	.
11939	11190	 	 
11939	11189	<~>	<~>
11939	11189	<split-s>	<split-s>
11939	11189	<split-h>	<split-h>
11939	11189	<name2>	<name2>
11939	11369	<name2>	<name>
11939	11877	<>	<name>
11939	11193	<aphaerese>	<aphaerese>
11939	11876	<>	<aphaerese>
11939	11189	<elision3>	<elision3>
11939	11876	<>	<elision3>
11939	11189	<elision2>	<elision2>
11939	11876	<>	<elision2>
11939	11189	<elision1>	<elision1>
11939	11876	<>	<elision1>
11939	11197	.	υ
11939	11200	s	υ
11939	11197	.	u
11939	11200	s	u
11939	11246	s	U
11939	11197	.	α
11939	11271	s	α
11939	11197	.	a
11939	11271	s	a
11939	11274	s	A
11939	11940	<1s>	<>
11940	71	.	.
11940	72	 	 
11940	71	<~>	<~>
11940	71	<split-s>	<split-s>
11940	71	<split-h>	<split-h>
11940	71	<name2>	<name2>
11940	10463	<name2>	<name>
11940	10606	<>	<name>
11940	75	<aphaerese>	<aphaerese>
11940	10605	<>	<aphaerese>
11940	71	<elision3>	<elision3>
11940	10605	<>	<elision3>
11940	71	<elision2>	<elision2>
11940	10605	<>	<elision2>
11940	71	<elision1>	<elision1>
11940	10605	<>	<elision1>
11940	9751	.	υ
11940	9751	.	u
11940	9751	.	α
11940	9751	.	a
11940	11941	<K>	<>
11941	9801	.	.
11941	9801	<~>	<~>
11941	9801	<split-s>	<split-s>
11941	9801	<split-h>	<split-h>
11941	9801	<name2>	<name2>
11941	10353	<name2>	<name>
11941	10607	<>	<name>
11941	9804	<aphaerese>	<aphaerese>
11941	10609	<>	<aphaerese>
11941	9801	<elision3>	<elision3>
11941	10609	<>	<elision3>
11941	9801	<elision2>	<elision2>
11941	10609	<>	<elision2>
11941	9801	<elision1>	<elision1>
11941	10609	<>	<elision1>
11941	9800	.	υ
11941	9800	.	u
11941	9800	.	α
11941	9800	.	a
11942	11189	.	.
11942	11190	 	 
11942	11189	<~>	<~>
11942	11189	<split-s>	<split-s>
11942	11189	<split-h>	<split-h>
11942	11189	<name2>	<name2>
11942	11369	<name2>	<name>
11942	11888	<>	<name>
11942	11193	<aphaerese>	<aphaerese>
11942	11890	<>	<aphaerese>
11942	11189	<elision3>	<elision3>
11942	11890	<>	<elision3>
11942	11189	<elision2>	<elision2>
11942	11890	<>	<elision2>
11942	11189	<elision1>	<elision1>
11942	11890	<>	<elision1>
11942	11197	.	υ
11942	11200	s	υ
11942	11197	.	u
11942	11200	s	u
11942	11197	.	κ
11942	11246	s	U
11942	11197	.	α
11942	11271	s	α
11942	11197	.	a
11942	11271	s	a
11942	11274	s	A
11942	11197	.	λ
11942	10618	<1s>	<>
11942	11368	<l2L>	<>
11943	35	.	.
11943	36	 	 
11943	35	<~>	<~>
11943	35	<split-s>	<split-s>
11943	35	<split-h>	<split-h>
11943	35	<name2>	<name2>
11943	39	<aphaerese>	<aphaerese>
11943	11944	<>	<aphaerese>
11943	11947	<elision3>	<elision3>
11943	11944	<>	<elision3>
11943	11947	<elision2>	<elision2>
11943	11944	<>	<elision2>
11943	11947	<elision1>	<elision1>
11943	11944	<>	<elision1>
11943	11392	.	υ
11943	11436	H	υ
11943	11392	.	u
11943	11438	H	u
11943	11392	.	κ
11943	11830	H	κ
11943	11346	H	k
11943	11359	H	U
11943	11362	H	K
11943	11392	.	α
11943	11422	H	α
11943	11392	.	a
11943	11427	H	a
11943	11189	H	A
11943	11392	.	λ
11943	11807	H	λ
11943	11755	H	l
11943	11760	H	L
11943	11950	<K>	<>
11944	35	.	.
11944	36	 	 
11944	35	<~>	<~>
11944	35	<split-s>	<split-s>
11944	35	<split-h>	<split-h>
11944	35	<name2>	<name2>
11944	11945	<>	<name>
11944	39	<aphaerese>	<aphaerese>
11944	11944	<>	<aphaerese>
11944	11947	<elision3>	<elision3>
11944	11944	<>	<elision3>
11944	11947	<elision2>	<elision2>
11944	11944	<>	<elision2>
11944	11947	<elision1>	<elision1>
11944	11944	<>	<elision1>
11944	11392	.	υ
11944	11436	H	υ
11944	11392	.	u
11944	11438	H	u
11944	11392	.	κ
11944	11830	H	κ
11944	11346	H	k
11944	11359	H	U
11944	11362	H	K
11944	11392	.	α
11944	11422	H	α
11944	11392	.	a
11944	11427	H	a
11944	11189	H	A
11944	11392	.	λ
11944	11807	H	λ
11944	11755	H	l
11944	11760	H	L
11944	11951	<K>	<>
11945	34	.	.
11945	38	 	 
11945	34	<~>	<~>
11945	34	<split-s>	<split-s>
11945	34	<split-h>	<split-h>
11945	34	<name2>	<name2>
11945	41	<aphaerese>	<aphaerese>
11945	11943	<>	<aphaerese>
11945	11946	<elision3>	<elision3>
11945	11943	<>	<elision3>
11945	11946	<elision2>	<elision2>
11945	11943	<>	<elision2>
11945	11946	<elision1>	<elision1>
11945	11943	<>	<elision1>
11945	11394	.	υ
11945	11431	H	υ
11945	11394	.	u
11945	11435	H	u
11945	11394	.	κ
11945	11787	H	κ
11945	11387	H	k
11945	11361	H	U
11945	11391	H	K
11945	11394	.	α
11945	11421	H	α
11945	11394	.	a
11945	11426	H	a
11945	11192	H	A
11945	11394	.	λ
11945	11806	H	λ
11945	11754	H	l
11945	11757	H	L
11945	11949	<K>	<>
11946	35	.	.
11946	36	 	 
11946	35	<~>	<~>
11946	35	<split-s>	<split-s>
11946	35	<split-h>	<split-h>
11946	35	<name2>	<name2>
11946	39	<aphaerese>	<aphaerese>
11946	11947	<>	<aphaerese>
11946	35	<elision3>	<elision3>
11946	11947	<>	<elision3>
11946	35	<elision2>	<elision2>
11946	11947	<>	<elision2>
11946	35	<elision1>	<elision1>
11946	11947	<>	<elision1>
11946	11392	.	υ
11946	11436	H	υ
11946	11392	.	u
11946	11438	H	u
11946	42	.	κ
11946	11930	H	κ
11946	11934	H	k
11946	11359	H	U
11946	11938	H	K
11946	11392	.	α
11946	11422	H	α
11946	11392	.	a
11946	11427	H	a
11946	11189	H	A
11946	11886	H	λ
11946	11892	H	l
11946	11942	H	L
11947	35	.	.
11947	36	 	 
11947	35	<~>	<~>
11947	35	<split-s>	<split-s>
11947	35	<split-h>	<split-h>
11947	35	<name2>	<name2>
11947	11948	<>	<name>
11947	39	<aphaerese>	<aphaerese>
11947	11947	<>	<aphaerese>
11947	35	<elision3>	<elision3>
11947	11947	<>	<elision3>
11947	35	<elision2>	<elision2>
11947	11947	<>	<elision2>
11947	35	<elision1>	<elision1>
11947	11947	<>	<elision1>
11947	11392	.	υ
11947	11436	H	υ
11947	11392	.	u
11947	11438	H	u
11947	42	.	κ
11947	11930	H	κ
11947	11934	H	k
11947	11359	H	U
11947	11938	H	K
11947	11392	.	α
11947	11422	H	α
11947	11392	.	a
11947	11427	H	a
11947	11189	H	A
11947	11886	H	λ
11947	11892	H	l
11947	11942	H	L
11948	34	.	.
11948	38	 	 
11948	34	<~>	<~>
11948	34	<split-s>	<split-s>
11948	34	<split-h>	<split-h>
11948	34	<name2>	<name2>
11948	41	<aphaerese>	<aphaerese>
11948	11946	<>	<aphaerese>
11948	34	<elision3>	<elision3>
11948	11946	<>	<elision3>
11948	34	<elision2>	<elision2>
11948	11946	<>	<elision2>
11948	34	<elision1>	<elision1>
11948	11946	<>	<elision1>
11948	11394	.	υ
11948	11431	H	υ
11948	11394	.	u
11948	11435	H	u
11948	44	.	κ
11948	11849	H	κ
11948	11868	H	k
11948	11361	H	U
11948	11881	H	K
11948	11394	.	α
11948	11421	H	α
11948	11394	.	a
11948	11426	H	a
11948	11192	H	A
11948	11885	H	λ
11948	11891	H	l
11948	11889	H	L
11949	11444	.	.
11949	11444	<~>	<~>
11949	11444	<split-s>	<split-s>
11949	11444	<split-h>	<split-h>
11949	11444	<name2>	<name2>
11949	11447	<aphaerese>	<aphaerese>
11949	11950	<>	<aphaerese>
11949	11895	<elision3>	<elision3>
11949	11950	<>	<elision3>
11949	11895	<elision2>	<elision2>
11949	11950	<>	<elision2>
11949	11895	<elision1>	<elision1>
11949	11950	<>	<elision1>
11949	11440	.	υ
11949	11568	H	υ
11949	11440	.	u
11949	11577	H	u
11949	11440	.	κ
11949	11817	H	κ
11949	11537	H	k
11949	11546	H	U
11949	11550	H	K
11949	11440	.	α
11949	11580	H	α
11949	11440	.	a
11949	11583	H	a
11949	11520	H	A
11949	11440	.	λ
11949	11826	H	λ
11949	11564	H	l
11949	11559	H	L
11950	11442	.	.
11950	11442	<~>	<~>
11950	11442	<split-s>	<split-s>
11950	11442	<split-h>	<split-h>
11950	11442	<name2>	<name2>
11950	11445	<aphaerese>	<aphaerese>
11950	11951	<>	<aphaerese>
11950	11896	<elision3>	<elision3>
11950	11951	<>	<elision3>
11950	11896	<elision2>	<elision2>
11950	11951	<>	<elision2>
11950	11896	<elision1>	<elision1>
11950	11951	<>	<elision1>
11950	11441	.	υ
11950	11566	H	υ
11950	11441	.	u
11950	11575	H	u
11950	11441	.	κ
11950	11815	H	κ
11950	11535	H	k
11950	11544	H	U
11950	11547	H	K
11950	11441	.	α
11950	11578	H	α
11950	11441	.	a
11950	11581	H	a
11950	11518	H	A
11950	11441	.	λ
11950	11824	H	λ
11950	11562	H	l
11950	11565	H	L
11951	11442	.	.
11951	11442	<~>	<~>
11951	11442	<split-s>	<split-s>
11951	11442	<split-h>	<split-h>
11951	11442	<name2>	<name2>
11951	11949	<>	<name>
11951	11445	<aphaerese>	<aphaerese>
11951	11951	<>	<aphaerese>
11951	11896	<elision3>	<elision3>
11951	11951	<>	<elision3>
11951	11896	<elision2>	<elision2>
11951	11951	<>	<elision2>
11951	11896	<elision1>	<elision1>
11951	11951	<>	<elision1>
11951	11441	.	υ
11951	11566	H	υ
11951	11441	.	u
11951	11575	H	u
11951	11441	.	κ
11951	11815	H	κ
11951	11535	H	k
11951	11544	H	U
11951	11547	H	K
11951	11441	.	α
11951	11578	H	α
11951	11441	.	a
11951	11581	H	a
11951	11518	H	A
11951	11441	.	λ
11951	11824	H	λ
11951	11562	H	l
11951	11565	H	L
11952	11597	.	.
11952	11597	 	 
11952	11597	<~>	<~>
11952	11597	<split-s>	<split-s>
11952	11597	<split-h>	<split-h>
11952	11597	<name2>	<name2>
11952	11953	<>	<name>
11952	11600	<aphaerese>	<aphaerese>
11952	11952	<>	<aphaerese>
11952	11597	<elision3>	<elision3>
11952	11952	<>	<elision3>
11952	11597	<elision2>	<elision2>
11952	11952	<>	<elision2>
11952	11597	<elision1>	<elision1>
11952	11952	<>	<elision1>
11952	11761	.	υ
11952	11761	.	u
11952	11761	.	κ
11952	11761	.	α
11952	11761	.	a
11952	11761	.	λ
11952	11956	<A4>	<>
11953	11599	.	.
11953	11599	 	 
11953	11599	<~>	<~>
11953	11599	<split-s>	<split-s>
11953	11599	<split-h>	<split-h>
11953	11599	<name2>	<name2>
11953	11602	<aphaerese>	<aphaerese>
11953	11954	<>	<aphaerese>
11953	11599	<elision3>	<elision3>
11953	11954	<>	<elision3>
11953	11599	<elision2>	<elision2>
11953	11954	<>	<elision2>
11953	11599	<elision1>	<elision1>
11953	11954	<>	<elision1>
11953	11763	.	υ
11953	11763	.	u
11953	11763	.	κ
11953	11763	.	α
11953	11763	.	a
11953	11763	.	λ
11953	11957	<A4>	<>
11954	11597	.	.
11954	11597	 	 
11954	11597	<~>	<~>
11954	11597	<split-s>	<split-s>
11954	11597	<split-h>	<split-h>
11954	11597	<name2>	<name2>
11954	11600	<aphaerese>	<aphaerese>
11954	11952	<>	<aphaerese>
11954	11597	<elision3>	<elision3>
11954	11952	<>	<elision3>
11954	11597	<elision2>	<elision2>
11954	11952	<>	<elision2>
11954	11597	<elision1>	<elision1>
11954	11952	<>	<elision1>
11954	11761	.	υ
11954	11761	.	u
11954	11761	.	κ
11954	11761	.	α
11954	11761	.	a
11954	11761	.	λ
11954	11955	<A4>	<>
11955	35	.	.
11955	36	 	 
11955	35	<~>	<~>
11955	35	<split-s>	<split-s>
11955	35	<split-h>	<split-h>
11955	35	<name2>	<name2>
11955	39	<aphaerese>	<aphaerese>
11955	11956	<>	<aphaerese>
11955	35	<elision3>	<elision3>
11955	11956	<>	<elision3>
11955	35	<elision2>	<elision2>
11955	11956	<>	<elision2>
11955	35	<elision1>	<elision1>
11955	11956	<>	<elision1>
11955	11392	.	υ
11955	11436	H	υ
11955	11392	.	u
11955	11438	H	u
11955	11392	.	κ
11955	11830	H	κ
11955	11346	H	k
11955	11359	H	U
11955	11362	H	K
11955	11392	.	α
11955	11422	H	α
11955	11392	.	a
11955	11427	H	a
11955	11189	H	A
11955	11392	.	λ
11955	11807	H	λ
11955	11755	H	l
11955	11760	H	L
11955	11959	<K>	<>
11956	35	.	.
11956	36	 	 
11956	35	<~>	<~>
11956	35	<split-s>	<split-s>
11956	35	<split-h>	<split-h>
11956	35	<name2>	<name2>
11956	11957	<>	<name>
11956	39	<aphaerese>	<aphaerese>
11956	11956	<>	<aphaerese>
11956	35	<elision3>	<elision3>
11956	11956	<>	<elision3>
11956	35	<elision2>	<elision2>
11956	11956	<>	<elision2>
11956	35	<elision1>	<elision1>
11956	11956	<>	<elision1>
11956	11392	.	υ
11956	11436	H	υ
11956	11392	.	u
11956	11438	H	u
11956	11392	.	κ
11956	11830	H	κ
11956	11346	H	k
11956	11359	H	U
11956	11362	H	K
11956	11392	.	α
11956	11422	H	α
11956	11392	.	a
11956	11427	H	a
11956	11189	H	A
11956	11392	.	λ
11956	11807	H	λ
11956	11755	H	l
11956	11760	H	L
11956	11960	<K>	<>
11957	34	.	.
11957	38	 	 
11957	34	<~>	<~>
11957	34	<split-s>	<split-s>
11957	34	<split-h>	<split-h>
11957	34	<name2>	<name2>
11957	41	<aphaerese>	<aphaerese>
11957	11955	<>	<aphaerese>
11957	34	<elision3>	<elision3>
11957	11955	<>	<elision3>
11957	34	<elision2>	<elision2>
11957	11955	<>	<elision2>
11957	34	<elision1>	<elision1>
11957	11955	<>	<elision1>
11957	11394	.	υ
11957	11431	H	υ
11957	11394	.	u
11957	11435	H	u
11957	11394	.	κ
11957	11787	H	κ
11957	11387	H	k
11957	11361	H	U
11957	11391	H	K
11957	11394	.	α
11957	11421	H	α
11957	11394	.	a
11957	11426	H	a
11957	11192	H	A
11957	11394	.	λ
11957	11806	H	λ
11957	11754	H	l
11957	11757	H	L
11957	11958	<K>	<>
11958	11444	.	.
11958	11444	<~>	<~>
11958	11444	<split-s>	<split-s>
11958	11444	<split-h>	<split-h>
11958	11444	<name2>	<name2>
11958	11447	<aphaerese>	<aphaerese>
11958	11959	<>	<aphaerese>
11958	11444	<elision3>	<elision3>
11958	11959	<>	<elision3>
11958	11444	<elision2>	<elision2>
11958	11959	<>	<elision2>
11958	11444	<elision1>	<elision1>
11958	11959	<>	<elision1>
11958	11440	.	υ
11958	11568	H	υ
11958	11440	.	u
11958	11577	H	u
11958	11440	.	κ
11958	11817	H	κ
11958	11537	H	k
11958	11546	H	U
11958	11550	H	K
11958	11440	.	α
11958	11580	H	α
11958	11440	.	a
11958	11583	H	a
11958	11520	H	A
11958	11440	.	λ
11958	11826	H	λ
11958	11564	H	l
11958	11559	H	L
11959	11442	.	.
11959	11442	<~>	<~>
11959	11442	<split-s>	<split-s>
11959	11442	<split-h>	<split-h>
11959	11442	<name2>	<name2>
11959	11445	<aphaerese>	<aphaerese>
11959	11960	<>	<aphaerese>
11959	11442	<elision3>	<elision3>
11959	11960	<>	<elision3>
11959	11442	<elision2>	<elision2>
11959	11960	<>	<elision2>
11959	11442	<elision1>	<elision1>
11959	11960	<>	<elision1>
11959	11441	.	υ
11959	11566	H	υ
11959	11441	.	u
11959	11575	H	u
11959	11441	.	κ
11959	11815	H	κ
11959	11535	H	k
11959	11544	H	U
11959	11547	H	K
11959	11441	.	α
11959	11578	H	α
11959	11441	.	a
11959	11581	H	a
11959	11518	H	A
11959	11441	.	λ
11959	11824	H	λ
11959	11562	H	l
11959	11565	H	L
11960	11442	.	.
11960	11442	<~>	<~>
11960	11442	<split-s>	<split-s>
11960	11442	<split-h>	<split-h>
11960	11442	<name2>	<name2>
11960	11958	<>	<name>
11960	11445	<aphaerese>	<aphaerese>
11960	11960	<>	<aphaerese>
11960	11442	<elision3>	<elision3>
11960	11960	<>	<elision3>
11960	11442	<elision2>	<elision2>
11960	11960	<>	<elision2>
11960	11442	<elision1>	<elision1>
11960	11960	<>	<elision1>
11960	11441	.	υ
11960	11566	H	υ
11960	11441	.	u
11960	11575	H	u
11960	11441	.	κ
11960	11815	H	κ
11960	11535	H	k
11960	11544	H	U
11960	11547	H	K
11960	11441	.	α
11960	11578	H	α
11960	11441	.	a
11960	11581	H	a
11960	11518	H	A
11960	11441	.	λ
11960	11824	H	λ
11960	11562	H	l
11960	11565	H	L
11961	11962	<>	<name>
11961	11961	<>	<aphaerese>
11961	11961	<>	<elision3>
11961	11961	<>	<elision2>
11961	11961	<>	<elision1>
11961	11597	<U2kl>	<>
11962	11963	<>	<aphaerese>
11962	11963	<>	<elision3>
11962	11963	<>	<elision2>
11962	11963	<>	<elision1>
11962	11598	<U2kl>	<>
11963	11961	<>	<aphaerese>
11963	11961	<>	<elision3>
11963	11961	<>	<elision2>
11963	11961	<>	<elision1>
11963	11599	<U2kl>	<>
11964	11965	<name>	<name>
11964	11968	<>	<name>
11964	11970	<>	<aphaerese>
11964	11970	<>	<elision3>
11964	11970	<>	<elision2>
11964	11970	<>	<elision1>
11964	12076	<A4>	<>
11964	11971	<A2kl>	<>
11964	12034	<L2kl>	<>
11964	12079	<K2kl>	<>
11965	11966	<A4>	<>
11966	11391	H	k
11966	11757	H	l
11966	11967	<K>	<>
11967	11550	H	k
11967	11559	H	l
11968	11969	<>	<aphaerese>
11968	11969	<>	<elision3>
11968	11969	<>	<elision2>
11968	11969	<>	<elision1>
11968	11972	<A2kl>	<>
11968	12035	<L2kl>	<>
11968	12068	<K2kl>	<>
11969	11970	<>	<aphaerese>
11969	11970	<>	<elision3>
11969	11970	<>	<elision2>
11969	11970	<>	<elision1>
11969	11973	<A2kl>	<>
11969	12036	<L2kl>	<>
11969	12069	<K2kl>	<>
11970	11968	<>	<name>
11970	11970	<>	<aphaerese>
11970	11970	<>	<elision3>
11970	11970	<>	<elision2>
11970	11970	<>	<elision1>
11970	11971	<A2kl>	<>
11970	12034	<L2kl>	<>
11970	12067	<K2kl>	<>
11971	11972	<>	<name>
11971	11971	<>	<aphaerese>
11971	11971	<>	<elision3>
11971	11971	<>	<elision2>
11971	11971	<>	<elision1>
11971	11974	.	κ
11971	11974	.	λ
11971	12026	<A4>	<>
11972	11973	<>	<aphaerese>
11972	11973	<>	<elision3>
11972	11973	<>	<elision2>
11972	11973	<>	<elision1>
11972	11976	.	κ
11972	11976	.	λ
11972	12027	<A4>	<>
11973	11971	<>	<aphaerese>
11973	11971	<>	<elision3>
11973	11971	<>	<elision2>
11973	11971	<>	<elision1>
11973	11974	.	κ
11973	11974	.	λ
11973	12025	<A4>	<>
11974	11975	<>	<name>
11974	11974	<>	<aphaerese>
11974	11977	<elision3>	<elision3>
11974	11974	<>	<elision3>
11974	11977	<elision2>	<elision2>
11974	11974	<>	<elision2>
11974	11977	<elision1>	<elision1>
11974	11974	<>	<elision1>
11974	12017	<A4>	<>
11975	11976	<>	<aphaerese>
11975	11979	<elision3>	<elision3>
11975	11976	<>	<elision3>
11975	11979	<elision2>	<elision2>
11975	11976	<>	<elision2>
11975	11979	<elision1>	<elision1>
11975	11976	<>	<elision1>
11975	12018	<A4>	<>
11976	11974	<>	<aphaerese>
11976	11977	<elision3>	<elision3>
11976	11974	<>	<elision3>
11976	11977	<elision2>	<elision2>
11976	11974	<>	<elision2>
11976	11977	<elision1>	<elision1>
11976	11974	<>	<elision1>
11976	12016	<A4>	<>
11977	11597	.	.
11977	11597	 	 
11977	11597	<~>	<~>
11977	11597	<split-s>	<split-s>
11977	11597	<split-h>	<split-h>
11977	11597	<name2>	<name2>
11977	11978	<>	<name>
11977	11600	<aphaerese>	<aphaerese>
11977	11977	<>	<aphaerese>
11977	11597	<elision3>	<elision3>
11977	11977	<>	<elision3>
11977	11597	<elision2>	<elision2>
11977	11977	<>	<elision2>
11977	11597	<elision1>	<elision1>
11977	11977	<>	<elision1>
11977	11761	.	υ
11977	11761	.	u
11977	11761	.	α
11977	11761	.	a
11977	11981	<A4>	<>
11978	11599	.	.
11978	11599	 	 
11978	11599	<~>	<~>
11978	11599	<split-s>	<split-s>
11978	11599	<split-h>	<split-h>
11978	11599	<name2>	<name2>
11978	11602	<aphaerese>	<aphaerese>
11978	11979	<>	<aphaerese>
11978	11599	<elision3>	<elision3>
11978	11979	<>	<elision3>
11978	11599	<elision2>	<elision2>
11978	11979	<>	<elision2>
11978	11599	<elision1>	<elision1>
11978	11979	<>	<elision1>
11978	11763	.	υ
11978	11763	.	u
11978	11763	.	α
11978	11763	.	a
11978	11982	<A4>	<>
11979	11597	.	.
11979	11597	 	 
11979	11597	<~>	<~>
11979	11597	<split-s>	<split-s>
11979	11597	<split-h>	<split-h>
11979	11597	<name2>	<name2>
11979	11600	<aphaerese>	<aphaerese>
11979	11977	<>	<aphaerese>
11979	11597	<elision3>	<elision3>
11979	11977	<>	<elision3>
11979	11597	<elision2>	<elision2>
11979	11977	<>	<elision2>
11979	11597	<elision1>	<elision1>
11979	11977	<>	<elision1>
11979	11761	.	υ
11979	11761	.	u
11979	11761	.	α
11979	11761	.	a
11979	11980	<A4>	<>
11980	35	.	.
11980	36	 	 
11980	35	<~>	<~>
11980	35	<split-s>	<split-s>
11980	35	<split-h>	<split-h>
11980	35	<name2>	<name2>
11980	39	<aphaerese>	<aphaerese>
11980	11981	<>	<aphaerese>
11980	35	<elision3>	<elision3>
11980	11981	<>	<elision3>
11980	35	<elision2>	<elision2>
11980	11981	<>	<elision2>
11980	35	<elision1>	<elision1>
11980	11981	<>	<elision1>
11980	11392	.	υ
11980	11436	H	υ
11980	11392	.	u
11980	11438	H	u
11980	11984	H	κ
11980	11996	H	k
11980	11359	H	U
11980	11988	H	K
11980	11392	.	α
11980	11422	H	α
11980	11392	.	a
11980	11427	H	a
11980	11189	H	A
11980	11984	H	λ
11980	11996	H	l
11980	11988	H	L
11980	11999	<K>	<>
11981	35	.	.
11981	36	 	 
11981	35	<~>	<~>
11981	35	<split-s>	<split-s>
11981	35	<split-h>	<split-h>
11981	35	<name2>	<name2>
11981	11982	<>	<name>
11981	39	<aphaerese>	<aphaerese>
11981	11981	<>	<aphaerese>
11981	35	<elision3>	<elision3>
11981	11981	<>	<elision3>
11981	35	<elision2>	<elision2>
11981	11981	<>	<elision2>
11981	35	<elision1>	<elision1>
11981	11981	<>	<elision1>
11981	11392	.	υ
11981	11436	H	υ
11981	11392	.	u
11981	11438	H	u
11981	11984	H	κ
11981	11996	H	k
11981	11359	H	U
11981	11988	H	K
11981	11392	.	α
11981	11422	H	α
11981	11392	.	a
11981	11427	H	a
11981	11189	H	A
11981	11984	H	λ
11981	11996	H	l
11981	11988	H	L
11981	12000	<K>	<>
11982	34	.	.
11982	38	 	 
11982	34	<~>	<~>
11982	34	<split-s>	<split-s>
11982	34	<split-h>	<split-h>
11982	34	<name2>	<name2>
11982	41	<aphaerese>	<aphaerese>
11982	11980	<>	<aphaerese>
11982	34	<elision3>	<elision3>
11982	11980	<>	<elision3>
11982	34	<elision2>	<elision2>
11982	11980	<>	<elision2>
11982	34	<elision1>	<elision1>
11982	11980	<>	<elision1>
11982	11394	.	υ
11982	11431	H	υ
11982	11394	.	u
11982	11435	H	u
11982	11983	H	κ
11982	11995	H	k
11982	11361	H	U
11982	11987	H	K
11982	11394	.	α
11982	11421	H	α
11982	11394	.	a
11982	11426	H	a
11982	11192	H	A
11982	11983	H	λ
11982	11995	H	l
11982	11987	H	L
11982	11998	<K>	<>
11983	11984	<>	<aphaerese>
11983	11984	<>	<elision3>
11983	11984	<>	<elision2>
11983	11984	<>	<elision1>
11983	11987	<lambda2L>	<>
11984	11985	<>	<name>
11984	11984	<>	<aphaerese>
11984	11984	<>	<elision3>
11984	11984	<>	<elision2>
11984	11984	<>	<elision1>
11984	11988	<lambda2L>	<>
11985	11983	<>	<aphaerese>
11985	11983	<>	<elision3>
11985	11983	<>	<elision2>
11985	11983	<>	<elision1>
11985	11986	<lambda2L>	<>
11986	11987	<>	<aphaerese>
11986	11987	<>	<elision3>
11986	11987	<>	<elision2>
11986	11987	<>	<elision1>
11986	11991	.	κ
11986	11991	.	λ
11986	10446	<1s>	<>
11987	11988	<>	<aphaerese>
11987	11988	<>	<elision3>
11987	11988	<>	<elision2>
11987	11988	<>	<elision1>
11987	11989	.	κ
11987	11989	.	λ
11987	10444	<1s>	<>
11988	11986	<>	<name>
11988	11988	<>	<aphaerese>
11988	11988	<>	<elision3>
11988	11988	<>	<elision2>
11988	11988	<>	<elision1>
11988	11989	.	κ
11988	11989	.	λ
11988	10445	<1s>	<>
11989	11990	<>	<name>
11989	11989	<>	<aphaerese>
11989	11992	<elision3>	<elision3>
11989	11989	<>	<elision3>
11989	11992	<elision2>	<elision2>
11989	11989	<>	<elision2>
11989	11992	<elision1>	<elision1>
11989	11989	<>	<elision1>
11989	10436	<1s>	<>
11990	11991	<>	<aphaerese>
11990	11994	<elision3>	<elision3>
11990	11991	<>	<elision3>
11990	11994	<elision2>	<elision2>
11990	11991	<>	<elision2>
11990	11994	<elision1>	<elision1>
11990	11991	<>	<elision1>
11990	10437	<1s>	<>
11991	11989	<>	<aphaerese>
11991	11992	<elision3>	<elision3>
11991	11989	<>	<elision3>
11991	11992	<elision2>	<elision2>
11991	11989	<>	<elision2>
11991	11992	<elision1>	<elision1>
11991	11989	<>	<elision1>
11991	10435	<1s>	<>
11992	11993	<>	<name>
11992	11992	<>	<aphaerese>
11992	11992	<>	<elision3>
11992	11992	<>	<elision2>
11992	11992	<>	<elision1>
11992	11203	.	κ
11992	11221	s	κ
11992	10956	s	k
11992	10974	s	K
11992	11277	s	λ
11992	10987	s	l
11992	10990	s	L
11992	10430	<1s>	<>
11993	11994	<>	<aphaerese>
11993	11994	<>	<elision3>
11993	11994	<>	<elision2>
11993	11994	<>	<elision1>
11993	11205	.	κ
11993	11223	s	κ
11993	10958	s	k
11993	10977	s	K
11993	11279	s	λ
11993	10989	s	l
11993	10992	s	L
11993	10431	<1s>	<>
11994	11992	<>	<aphaerese>
11994	11992	<>	<elision3>
11994	11992	<>	<elision2>
11994	11992	<>	<elision1>
11994	11203	.	κ
11994	11221	s	κ
11994	10956	s	k
11994	10974	s	K
11994	11277	s	λ
11994	10987	s	l
11994	10990	s	L
11994	10429	<1s>	<>
11995	11996	<>	<aphaerese>
11995	11996	<>	<elision3>
11995	11996	<>	<elision2>
11995	11996	<>	<elision1>
11995	11987	<l2L>	<>
11996	11997	<>	<name>
11996	11996	<>	<aphaerese>
11996	11996	<>	<elision3>
11996	11996	<>	<elision2>
11996	11996	<>	<elision1>
11996	11988	<l2L>	<>
11997	11995	<>	<aphaerese>
11997	11995	<>	<elision3>
11997	11995	<>	<elision2>
11997	11995	<>	<elision1>
11997	11986	<l2L>	<>
11998	11444	.	.
11998	11444	<~>	<~>
11998	11444	<split-s>	<split-s>
11998	11444	<split-h>	<split-h>
11998	11444	<name2>	<name2>
11998	11447	<aphaerese>	<aphaerese>
11998	11999	<>	<aphaerese>
11998	11444	<elision3>	<elision3>
11998	11999	<>	<elision3>
11998	11444	<elision2>	<elision2>
11998	11999	<>	<elision2>
11998	11444	<elision1>	<elision1>
11998	11999	<>	<elision1>
11998	11440	.	υ
11998	11568	H	υ
11998	11440	.	u
11998	11577	H	u
11998	12003	H	κ
11998	12015	H	k
11998	11546	H	U
11998	12004	H	K
11998	11440	.	α
11998	11580	H	α
11998	11440	.	a
11998	11583	H	a
11998	11520	H	A
11998	12003	H	λ
11998	12015	H	l
11998	12004	H	L
11999	11442	.	.
11999	11442	<~>	<~>
11999	11442	<split-s>	<split-s>
11999	11442	<split-h>	<split-h>
11999	11442	<name2>	<name2>
11999	11445	<aphaerese>	<aphaerese>
11999	12000	<>	<aphaerese>
11999	11442	<elision3>	<elision3>
11999	12000	<>	<elision3>
11999	11442	<elision2>	<elision2>
11999	12000	<>	<elision2>
11999	11442	<elision1>	<elision1>
11999	12000	<>	<elision1>
11999	11441	.	υ
11999	11566	H	υ
11999	11441	.	u
11999	11575	H	u
11999	12001	H	κ
11999	12013	H	k
11999	11544	H	U
11999	12005	H	K
11999	11441	.	α
11999	11578	H	α
11999	11441	.	a
11999	11581	H	a
11999	11518	H	A
11999	12001	H	λ
11999	12013	H	l
11999	12005	H	L
12000	11442	.	.
12000	11442	<~>	<~>
12000	11442	<split-s>	<split-s>
12000	11442	<split-h>	<split-h>
12000	11442	<name2>	<name2>
12000	11998	<>	<name>
12000	11445	<aphaerese>	<aphaerese>
12000	12000	<>	<aphaerese>
12000	11442	<elision3>	<elision3>
12000	12000	<>	<elision3>
12000	11442	<elision2>	<elision2>
12000	12000	<>	<elision2>
12000	11442	<elision1>	<elision1>
12000	12000	<>	<elision1>
12000	11441	.	υ
12000	11566	H	υ
12000	11441	.	u
12000	11575	H	u
12000	12001	H	κ
12000	12013	H	k
12000	11544	H	U
12000	12005	H	K
12000	11441	.	α
12000	11578	H	α
12000	11441	.	a
12000	11581	H	a
12000	11518	H	A
12000	12001	H	λ
12000	12013	H	l
12000	12005	H	L
12001	12002	<>	<name>
12001	12001	<>	<aphaerese>
12001	12001	<>	<elision3>
12001	12001	<>	<elision2>
12001	12001	<>	<elision1>
12001	12005	<lambda2L>	<>
12002	12003	<>	<aphaerese>
12002	12003	<>	<elision3>
12002	12003	<>	<elision2>
12002	12003	<>	<elision1>
12002	12006	<lambda2L>	<>
12003	12001	<>	<aphaerese>
12003	12001	<>	<elision3>
12003	12001	<>	<elision2>
12003	12001	<>	<elision1>
12003	12004	<lambda2L>	<>
12004	12005	<>	<aphaerese>
12004	12005	<>	<elision3>
12004	12005	<>	<elision2>
12004	12005	<>	<elision1>
12004	12008	.	κ
12004	12008	.	λ
12005	12006	<>	<name>
12005	12005	<>	<aphaerese>
12005	12005	<>	<elision3>
12005	12005	<>	<elision2>
12005	12005	<>	<elision1>
12005	12008	.	κ
12005	12008	.	λ
12006	12004	<>	<aphaerese>
12006	12004	<>	<elision3>
12006	12004	<>	<elision2>
12006	12004	<>	<elision1>
12006	12007	.	κ
12006	12007	.	λ
12007	12008	<>	<aphaerese>
12007	12011	<elision3>	<elision3>
12007	12008	<>	<elision3>
12007	12011	<elision2>	<elision2>
12007	12008	<>	<elision2>
12007	12011	<elision1>	<elision1>
12007	12008	<>	<elision1>
12008	12009	<>	<name>
12008	12008	<>	<aphaerese>
12008	12011	<elision3>	<elision3>
12008	12008	<>	<elision3>
12008	12011	<elision2>	<elision2>
12008	12008	<>	<elision2>
12008	12011	<elision1>	<elision1>
12008	12008	<>	<elision1>
12009	12007	<>	<aphaerese>
12009	12010	<elision3>	<elision3>
12009	12007	<>	<elision3>
12009	12010	<elision2>	<elision2>
12009	12007	<>	<elision2>
12009	12010	<elision1>	<elision1>
12009	12007	<>	<elision1>
12010	12011	<>	<aphaerese>
12010	12011	<>	<elision3>
12010	12011	<>	<elision2>
12010	12011	<>	<elision1>
12010	11500	.	κ
12010	11461	s	κ
12010	11476	H	κ
12010	11461	s	k
12010	11476	H	k
12010	11467	s	K
12010	11476	H	K
12010	11461	s	λ
12010	11476	H	λ
12010	11461	s	l
12010	11476	H	l
12010	11470	s	L
12010	11476	H	L
12011	12012	<>	<name>
12011	12011	<>	<aphaerese>
12011	12011	<>	<elision3>
12011	12011	<>	<elision2>
12011	12011	<>	<elision1>
12011	11500	.	κ
12011	11461	s	κ
12011	11476	H	κ
12011	11461	s	k
12011	11476	H	k
12011	11467	s	K
12011	11476	H	K
12011	11461	s	λ
12011	11476	H	λ
12011	11461	s	l
12011	11476	H	l
12011	11470	s	L
12011	11476	H	L
12012	12010	<>	<aphaerese>
12012	12010	<>	<elision3>
12012	12010	<>	<elision2>
12012	12010	<>	<elision1>
12012	11502	.	κ
12012	11460	s	κ
12012	11475	H	κ
12012	11460	s	k
12012	11475	H	k
12012	11466	s	K
12012	11475	H	K
12012	11460	s	λ
12012	11475	H	λ
12012	11460	s	l
12012	11475	H	l
12012	11469	s	L
12012	11475	H	L
12013	12014	<>	<name>
12013	12013	<>	<aphaerese>
12013	12013	<>	<elision3>
12013	12013	<>	<elision2>
12013	12013	<>	<elision1>
12013	12005	<l2L>	<>
12014	12015	<>	<aphaerese>
12014	12015	<>	<elision3>
12014	12015	<>	<elision2>
12014	12015	<>	<elision1>
12014	12006	<l2L>	<>
12015	12013	<>	<aphaerese>
12015	12013	<>	<elision3>
12015	12013	<>	<elision2>
12015	12013	<>	<elision1>
12015	12004	<l2L>	<>
12016	12017	<>	<aphaerese>
12016	12020	<elision3>	<elision3>
12016	12017	<>	<elision3>
12016	12020	<elision2>	<elision2>
12016	12017	<>	<elision2>
12016	12020	<elision1>	<elision1>
12016	12017	<>	<elision1>
12016	12023	<K>	<>
12017	12018	<>	<name>
12017	12017	<>	<aphaerese>
12017	12020	<elision3>	<elision3>
12017	12017	<>	<elision3>
12017	12020	<elision2>	<elision2>
12017	12017	<>	<elision2>
12017	12020	<elision1>	<elision1>
12017	12017	<>	<elision1>
12017	12024	<K>	<>
12018	12016	<>	<aphaerese>
12018	12019	<elision3>	<elision3>
12018	12016	<>	<elision3>
12018	12019	<elision2>	<elision2>
12018	12016	<>	<elision2>
12018	12019	<elision1>	<elision1>
12018	12016	<>	<elision1>
12018	12022	<K>	<>
12019	35	.	.
12019	36	 	 
12019	35	<~>	<~>
12019	35	<split-s>	<split-s>
12019	35	<split-h>	<split-h>
12019	35	<name2>	<name2>
12019	39	<aphaerese>	<aphaerese>
12019	12020	<>	<aphaerese>
12019	35	<elision3>	<elision3>
12019	12020	<>	<elision3>
12019	35	<elision2>	<elision2>
12019	12020	<>	<elision2>
12019	35	<elision1>	<elision1>
12019	12020	<>	<elision1>
12019	11392	.	υ
12019	11436	H	υ
12019	11392	.	u
12019	11438	H	u
12019	11984	H	κ
12019	11996	H	k
12019	11359	H	U
12019	11988	H	K
12019	11392	.	α
12019	11422	H	α
12019	11392	.	a
12019	11427	H	a
12019	11189	H	A
12019	11984	H	λ
12019	11996	H	l
12019	11988	H	L
12020	35	.	.
12020	36	 	 
12020	35	<~>	<~>
12020	35	<split-s>	<split-s>
12020	35	<split-h>	<split-h>
12020	35	<name2>	<name2>
12020	12021	<>	<name>
12020	39	<aphaerese>	<aphaerese>
12020	12020	<>	<aphaerese>
12020	35	<elision3>	<elision3>
12020	12020	<>	<elision3>
12020	35	<elision2>	<elision2>
12020	12020	<>	<elision2>
12020	35	<elision1>	<elision1>
12020	12020	<>	<elision1>
12020	11392	.	υ
12020	11436	H	υ
12020	11392	.	u
12020	11438	H	u
12020	11984	H	κ
12020	11996	H	k
12020	11359	H	U
12020	11988	H	K
12020	11392	.	α
12020	11422	H	α
12020	11392	.	a
12020	11427	H	a
12020	11189	H	A
12020	11984	H	λ
12020	11996	H	l
12020	11988	H	L
12021	34	.	.
12021	38	 	 
12021	34	<~>	<~>
12021	34	<split-s>	<split-s>
12021	34	<split-h>	<split-h>
12021	34	<name2>	<name2>
12021	41	<aphaerese>	<aphaerese>
12021	12019	<>	<aphaerese>
12021	34	<elision3>	<elision3>
12021	12019	<>	<elision3>
12021	34	<elision2>	<elision2>
12021	12019	<>	<elision2>
12021	34	<elision1>	<elision1>
12021	12019	<>	<elision1>
12021	11394	.	υ
12021	11431	H	υ
12021	11394	.	u
12021	11435	H	u
12021	11983	H	κ
12021	11995	H	k
12021	11361	H	U
12021	11987	H	K
12021	11394	.	α
12021	11421	H	α
12021	11394	.	a
12021	11426	H	a
12021	11192	H	A
12021	11983	H	λ
12021	11995	H	l
12021	11987	H	L
12022	12023	<>	<aphaerese>
12022	11999	<elision3>	<elision3>
12022	12023	<>	<elision3>
12022	11999	<elision2>	<elision2>
12022	12023	<>	<elision2>
12022	11999	<elision1>	<elision1>
12022	12023	<>	<elision1>
12023	12024	<>	<aphaerese>
12023	12000	<elision3>	<elision3>
12023	12024	<>	<elision3>
12023	12000	<elision2>	<elision2>
12023	12024	<>	<elision2>
12023	12000	<elision1>	<elision1>
12023	12024	<>	<elision1>
12024	12022	<>	<name>
12024	12024	<>	<aphaerese>
12024	12000	<elision3>	<elision3>
12024	12024	<>	<elision3>
12024	12000	<elision2>	<elision2>
12024	12024	<>	<elision2>
12024	12000	<elision1>	<elision1>
12024	12024	<>	<elision1>
12025	12026	<>	<aphaerese>
12025	12026	<>	<elision3>
12025	12026	<>	<elision2>
12025	12026	<>	<elision1>
12025	12029	.	κ
12025	12029	.	λ
12025	12032	<K>	<>
12026	12027	<>	<name>
12026	12026	<>	<aphaerese>
12026	12026	<>	<elision3>
12026	12026	<>	<elision2>
12026	12026	<>	<elision1>
12026	12029	.	κ
12026	12029	.	λ
12026	12033	<K>	<>
12027	12025	<>	<aphaerese>
12027	12025	<>	<elision3>
12027	12025	<>	<elision2>
12027	12025	<>	<elision1>
12027	12028	.	κ
12027	12028	.	λ
12027	12031	<K>	<>
12028	12029	<>	<aphaerese>
12028	12020	<elision3>	<elision3>
12028	12029	<>	<elision3>
12028	12020	<elision2>	<elision2>
12028	12029	<>	<elision2>
12028	12020	<elision1>	<elision1>
12028	12029	<>	<elision1>
12029	12030	<>	<name>
12029	12029	<>	<aphaerese>
12029	12020	<elision3>	<elision3>
12029	12029	<>	<elision3>
12029	12020	<elision2>	<elision2>
12029	12029	<>	<elision2>
12029	12020	<elision1>	<elision1>
12029	12029	<>	<elision1>
12030	12028	<>	<aphaerese>
12030	12019	<elision3>	<elision3>
12030	12028	<>	<elision3>
12030	12019	<elision2>	<elision2>
12030	12028	<>	<elision2>
12030	12019	<elision1>	<elision1>
12030	12028	<>	<elision1>
12031	12032	<>	<aphaerese>
12031	12032	<>	<elision3>
12031	12032	<>	<elision2>
12031	12032	<>	<elision1>
12031	12023	.	κ
12031	12023	.	λ
12032	12033	<>	<aphaerese>
12032	12033	<>	<elision3>
12032	12033	<>	<elision2>
12032	12033	<>	<elision1>
12032	12024	.	κ
12032	12024	.	λ
12033	12031	<>	<name>
12033	12033	<>	<aphaerese>
12033	12033	<>	<elision3>
12033	12033	<>	<elision2>
12033	12033	<>	<elision1>
12033	12024	.	κ
12033	12024	.	λ
12034	12035	<>	<name>
12034	12034	<>	<aphaerese>
12034	12034	<>	<elision3>
12034	12034	<>	<elision2>
12034	12034	<>	<elision1>
12034	12037	.	κ
12034	12037	.	λ
12034	12059	<A4>	<>
12035	12036	<>	<aphaerese>
12035	12036	<>	<elision3>
12035	12036	<>	<elision2>
12035	12036	<>	<elision1>
12035	12039	.	κ
12035	12039	.	λ
12035	12060	<A4>	<>
12036	12034	<>	<aphaerese>
12036	12034	<>	<elision3>
12036	12034	<>	<elision2>
12036	12034	<>	<elision1>
12036	12037	.	κ
12036	12037	.	λ
12036	12058	<A4>	<>
12037	12038	<>	<name>
12037	12037	<>	<aphaerese>
12037	12040	<elision3>	<elision3>
12037	12037	<>	<elision3>
12037	12040	<elision2>	<elision2>
12037	12037	<>	<elision2>
12037	12040	<elision1>	<elision1>
12037	12037	<>	<elision1>
12037	12050	<A4>	<>
12038	12039	<>	<aphaerese>
12038	12042	<elision3>	<elision3>
12038	12039	<>	<elision3>
12038	12042	<elision2>	<elision2>
12038	12039	<>	<elision2>
12038	12042	<elision1>	<elision1>
12038	12039	<>	<elision1>
12038	12051	<A4>	<>
12039	12037	<>	<aphaerese>
12039	12040	<elision3>	<elision3>
12039	12037	<>	<elision3>
12039	12040	<elision2>	<elision2>
12039	12037	<>	<elision2>
12039	12040	<elision1>	<elision1>
12039	12037	<>	<elision1>
12039	12049	<A4>	<>
12040	12041	<>	<name>
12040	12040	<>	<aphaerese>
12040	12040	<>	<elision3>
12040	12040	<>	<elision2>
12040	12040	<>	<elision1>
12040	11603	.	κ
12040	12044	<A4>	<>
12041	12042	<>	<aphaerese>
12041	12042	<>	<elision3>
12041	12042	<>	<elision2>
12041	12042	<>	<elision1>
12041	11605	.	κ
12041	12045	<A4>	<>
12042	12040	<>	<aphaerese>
12042	12040	<>	<elision3>
12042	12040	<>	<elision2>
12042	12040	<>	<elision1>
12042	11603	.	κ
12042	12043	<A4>	<>
12043	12044	<>	<aphaerese>
12043	12044	<>	<elision3>
12043	12044	<>	<elision2>
12043	12044	<>	<elision1>
12043	42	.	κ
12043	11018	H	κ
12043	11346	H	k
12043	11362	H	K
12043	11373	H	λ
12043	11755	H	l
12043	11760	H	L
12043	12047	<K>	<>
12044	12045	<>	<name>
12044	12044	<>	<aphaerese>
12044	12044	<>	<elision3>
12044	12044	<>	<elision2>
12044	12044	<>	<elision1>
12044	42	.	κ
12044	11018	H	κ
12044	11346	H	k
12044	11362	H	K
12044	11373	H	λ
12044	11755	H	l
12044	11760	H	L
12044	12048	<K>	<>
12045	12043	<>	<aphaerese>
12045	12043	<>	<elision3>
12045	12043	<>	<elision2>
12045	12043	<>	<elision1>
12045	44	.	κ
12045	11383	H	κ
12045	11387	H	k
12045	11391	H	K
12045	11375	H	λ
12045	11754	H	l
12045	11757	H	L
12045	12046	<K>	<>
12046	12047	<>	<aphaerese>
12046	12047	<>	<elision3>
12046	12047	<>	<elision2>
12046	12047	<>	<elision1>
12046	11450	.	κ
12046	11492	H	κ
12046	11537	H	k
12046	11550	H	K
12046	11558	H	λ
12046	11564	H	l
12046	11559	H	L
12047	12048	<>	<aphaerese>
12047	12048	<>	<elision3>
12047	12048	<>	<elision2>
12047	12048	<>	<elision1>
12047	11448	.	κ
12047	11490	H	κ
12047	11535	H	k
12047	11547	H	K
12047	11556	H	λ
12047	11562	H	l
12047	11565	H	L
12048	12046	<>	<name>
12048	12048	<>	<aphaerese>
12048	12048	<>	<elision3>
12048	12048	<>	<elision2>
12048	12048	<>	<elision1>
12048	11448	.	κ
12048	11490	H	κ
12048	11535	H	k
12048	11547	H	K
12048	11556	H	λ
12048	11562	H	l
12048	11565	H	L
12049	12050	<>	<aphaerese>
12049	12053	<elision3>	<elision3>
12049	12050	<>	<elision3>
12049	12053	<elision2>	<elision2>
12049	12050	<>	<elision2>
12049	12053	<elision1>	<elision1>
12049	12050	<>	<elision1>
12049	12056	<K>	<>
12050	12051	<>	<name>
12050	12050	<>	<aphaerese>
12050	12053	<elision3>	<elision3>
12050	12050	<>	<elision3>
12050	12053	<elision2>	<elision2>
12050	12050	<>	<elision2>
12050	12053	<elision1>	<elision1>
12050	12050	<>	<elision1>
12050	12057	<K>	<>
12051	12049	<>	<aphaerese>
12051	12052	<elision3>	<elision3>
12051	12049	<>	<elision3>
12051	12052	<elision2>	<elision2>
12051	12049	<>	<elision2>
12051	12052	<elision1>	<elision1>
12051	12049	<>	<elision1>
12051	12055	<K>	<>
12052	12053	<>	<aphaerese>
12052	12053	<>	<elision3>
12052	12053	<>	<elision2>
12052	12053	<>	<elision1>
12052	42	.	κ
12052	11018	H	κ
12052	11346	H	k
12052	11362	H	K
12052	11373	H	λ
12052	11379	H	l
12052	11382	H	L
12053	12054	<>	<name>
12053	12053	<>	<aphaerese>
12053	12053	<>	<elision3>
12053	12053	<>	<elision2>
12053	12053	<>	<elision1>
12053	42	.	κ
12053	11018	H	κ
12053	11346	H	k
12053	11362	H	K
12053	11373	H	λ
12053	11379	H	l
12053	11382	H	L
12054	12052	<>	<aphaerese>
12054	12052	<>	<elision3>
12054	12052	<>	<elision2>
12054	12052	<>	<elision1>
12054	44	.	κ
12054	11383	H	κ
12054	11387	H	k
12054	11391	H	K
12054	11375	H	λ
12054	11381	H	l
12054	11376	H	L
12055	12056	<>	<aphaerese>
12055	12047	<elision3>	<elision3>
12055	12056	<>	<elision3>
12055	12047	<elision2>	<elision2>
12055	12056	<>	<elision2>
12055	12047	<elision1>	<elision1>
12055	12056	<>	<elision1>
12056	12057	<>	<aphaerese>
12056	12048	<elision3>	<elision3>
12056	12057	<>	<elision3>
12056	12048	<elision2>	<elision2>
12056	12057	<>	<elision2>
12056	12048	<elision1>	<elision1>
12056	12057	<>	<elision1>
12057	12055	<>	<name>
12057	12057	<>	<aphaerese>
12057	12048	<elision3>	<elision3>
12057	12057	<>	<elision3>
12057	12048	<elision2>	<elision2>
12057	12057	<>	<elision2>
12057	12048	<elision1>	<elision1>
12057	12057	<>	<elision1>
12058	12059	<>	<aphaerese>
12058	12059	<>	<elision3>
12058	12059	<>	<elision2>
12058	12059	<>	<elision1>
12058	12062	.	κ
12058	12062	.	λ
12058	12065	<K>	<>
12059	12060	<>	<name>
12059	12059	<>	<aphaerese>
12059	12059	<>	<elision3>
12059	12059	<>	<elision2>
12059	12059	<>	<elision1>
12059	12062	.	κ
12059	12062	.	λ
12059	12066	<K>	<>
12060	12058	<>	<aphaerese>
12060	12058	<>	<elision3>
12060	12058	<>	<elision2>
12060	12058	<>	<elision1>
12060	12061	.	κ
12060	12061	.	λ
12060	12064	<K>	<>
12061	12062	<>	<aphaerese>
12061	12053	<elision3>	<elision3>
12061	12062	<>	<elision3>
12061	12053	<elision2>	<elision2>
12061	12062	<>	<elision2>
12061	12053	<elision1>	<elision1>
12061	12062	<>	<elision1>
12062	12063	<>	<name>
12062	12062	<>	<aphaerese>
12062	12053	<elision3>	<elision3>
12062	12062	<>	<elision3>
12062	12053	<elision2>	<elision2>
12062	12062	<>	<elision2>
12062	12053	<elision1>	<elision1>
12062	12062	<>	<elision1>
12063	12061	<>	<aphaerese>
12063	12052	<elision3>	<elision3>
12063	12061	<>	<elision3>
12063	12052	<elision2>	<elision2>
12063	12061	<>	<elision2>
12063	12052	<elision1>	<elision1>
12063	12061	<>	<elision1>
12064	12065	<>	<aphaerese>
12064	12065	<>	<elision3>
12064	12065	<>	<elision2>
12064	12065	<>	<elision1>
12064	12056	.	κ
12064	12056	.	λ
12065	12066	<>	<aphaerese>
12065	12066	<>	<elision3>
12065	12066	<>	<elision2>
12065	12066	<>	<elision1>
12065	12057	.	κ
12065	12057	.	λ
12066	12064	<>	<name>
12066	12066	<>	<aphaerese>
12066	12066	<>	<elision3>
12066	12066	<>	<elision2>
12066	12066	<>	<elision1>
12066	12057	.	κ
12066	12057	.	λ
12067	11597	.	.
12067	11597	 	 
12067	11597	<~>	<~>
12067	11597	<split-s>	<split-s>
12067	11597	<split-h>	<split-h>
12067	11597	<name2>	<name2>
12067	12068	<>	<name>
12067	11600	<aphaerese>	<aphaerese>
12067	12067	<>	<aphaerese>
12067	11597	<elision3>	<elision3>
12067	12067	<>	<elision3>
12067	11597	<elision2>	<elision2>
12067	12067	<>	<elision2>
12067	11597	<elision1>	<elision1>
12067	12067	<>	<elision1>
12067	11761	.	υ
12067	11761	.	u
12067	11761	.	α
12067	11761	.	a
12067	12071	<A4>	<>
12068	11599	.	.
12068	11599	 	 
12068	11599	<~>	<~>
12068	11599	<split-s>	<split-s>
12068	11599	<split-h>	<split-h>
12068	11599	<name2>	<name2>
12068	11602	<aphaerese>	<aphaerese>
12068	12069	<>	<aphaerese>
12068	11599	<elision3>	<elision3>
12068	12069	<>	<elision3>
12068	11599	<elision2>	<elision2>
12068	12069	<>	<elision2>
12068	11599	<elision1>	<elision1>
12068	12069	<>	<elision1>
12068	11763	.	υ
12068	11763	.	u
12068	11763	.	α
12068	11763	.	a
12068	12072	<A4>	<>
12069	11597	.	.
12069	11597	 	 
12069	11597	<~>	<~>
12069	11597	<split-s>	<split-s>
12069	11597	<split-h>	<split-h>
12069	11597	<name2>	<name2>
12069	11600	<aphaerese>	<aphaerese>
12069	12067	<>	<aphaerese>
12069	11597	<elision3>	<elision3>
12069	12067	<>	<elision3>
12069	11597	<elision2>	<elision2>
12069	12067	<>	<elision2>
12069	11597	<elision1>	<elision1>
12069	12067	<>	<elision1>
12069	11761	.	υ
12069	11761	.	u
12069	11761	.	α
12069	11761	.	a
12069	12070	<A4>	<>
12070	35	.	.
12070	36	 	 
12070	35	<~>	<~>
12070	35	<split-s>	<split-s>
12070	35	<split-h>	<split-h>
12070	35	<name2>	<name2>
12070	39	<aphaerese>	<aphaerese>
12070	12071	<>	<aphaerese>
12070	35	<elision3>	<elision3>
12070	12071	<>	<elision3>
12070	35	<elision2>	<elision2>
12070	12071	<>	<elision2>
12070	35	<elision1>	<elision1>
12070	12071	<>	<elision1>
12070	11392	.	υ
12070	11436	H	υ
12070	11392	.	u
12070	11438	H	u
12070	11830	H	κ
12070	11346	H	k
12070	11359	H	U
12070	11362	H	K
12070	11392	.	α
12070	11422	H	α
12070	11392	.	a
12070	11427	H	a
12070	11189	H	A
12070	11807	H	λ
12070	11755	H	l
12070	11760	H	L
12070	12074	<K>	<>
12071	35	.	.
12071	36	 	 
12071	35	<~>	<~>
12071	35	<split-s>	<split-s>
12071	35	<split-h>	<split-h>
12071	35	<name2>	<name2>
12071	12072	<>	<name>
12071	39	<aphaerese>	<aphaerese>
12071	12071	<>	<aphaerese>
12071	35	<elision3>	<elision3>
12071	12071	<>	<elision3>
12071	35	<elision2>	<elision2>
12071	12071	<>	<elision2>
12071	35	<elision1>	<elision1>
12071	12071	<>	<elision1>
12071	11392	.	υ
12071	11436	H	υ
12071	11392	.	u
12071	11438	H	u
12071	11830	H	κ
12071	11346	H	k
12071	11359	H	U
12071	11362	H	K
12071	11392	.	α
12071	11422	H	α
12071	11392	.	a
12071	11427	H	a
12071	11189	H	A
12071	11807	H	λ
12071	11755	H	l
12071	11760	H	L
12071	12075	<K>	<>
12072	34	.	.
12072	38	 	 
12072	34	<~>	<~>
12072	34	<split-s>	<split-s>
12072	34	<split-h>	<split-h>
12072	34	<name2>	<name2>
12072	41	<aphaerese>	<aphaerese>
12072	12070	<>	<aphaerese>
12072	34	<elision3>	<elision3>
12072	12070	<>	<elision3>
12072	34	<elision2>	<elision2>
12072	12070	<>	<elision2>
12072	34	<elision1>	<elision1>
12072	12070	<>	<elision1>
12072	11394	.	υ
12072	11431	H	υ
12072	11394	.	u
12072	11435	H	u
12072	11787	H	κ
12072	11387	H	k
12072	11361	H	U
12072	11391	H	K
12072	11394	.	α
12072	11421	H	α
12072	11394	.	a
12072	11426	H	a
12072	11192	H	A
12072	11806	H	λ
12072	11754	H	l
12072	11757	H	L
12072	12073	<K>	<>
12073	11444	.	.
12073	11444	<~>	<~>
12073	11444	<split-s>	<split-s>
12073	11444	<split-h>	<split-h>
12073	11444	<name2>	<name2>
12073	11447	<aphaerese>	<aphaerese>
12073	12074	<>	<aphaerese>
12073	11444	<elision3>	<elision3>
12073	12074	<>	<elision3>
12073	11444	<elision2>	<elision2>
12073	12074	<>	<elision2>
12073	11444	<elision1>	<elision1>
12073	12074	<>	<elision1>
12073	11440	.	υ
12073	11568	H	υ
12073	11440	.	u
12073	11577	H	u
12073	11817	H	κ
12073	11537	H	k
12073	11546	H	U
12073	11550	H	K
12073	11440	.	α
12073	11580	H	α
12073	11440	.	a
12073	11583	H	a
12073	11520	H	A
12073	11826	H	λ
12073	11564	H	l
12073	11559	H	L
12074	11442	.	.
12074	11442	<~>	<~>
12074	11442	<split-s>	<split-s>
12074	11442	<split-h>	<split-h>
12074	11442	<name2>	<name2>
12074	11445	<aphaerese>	<aphaerese>
12074	12075	<>	<aphaerese>
12074	11442	<elision3>	<elision3>
12074	12075	<>	<elision3>
12074	11442	<elision2>	<elision2>
12074	12075	<>	<elision2>
12074	11442	<elision1>	<elision1>
12074	12075	<>	<elision1>
12074	11441	.	υ
12074	11566	H	υ
12074	11441	.	u
12074	11575	H	u
12074	11815	H	κ
12074	11535	H	k
12074	11544	H	U
12074	11547	H	K
12074	11441	.	α
12074	11578	H	α
12074	11441	.	a
12074	11581	H	a
12074	11518	H	A
12074	11824	H	λ
12074	11562	H	l
12074	11565	H	L
12075	11442	.	.
12075	11442	<~>	<~>
12075	11442	<split-s>	<split-s>
12075	11442	<split-h>	<split-h>
12075	11442	<name2>	<name2>
12075	12073	<>	<name>
12075	11445	<aphaerese>	<aphaerese>
12075	12075	<>	<aphaerese>
12075	11442	<elision3>	<elision3>
12075	12075	<>	<elision3>
12075	11442	<elision2>	<elision2>
12075	12075	<>	<elision2>
12075	11442	<elision1>	<elision1>
12075	12075	<>	<elision1>
12075	11441	.	υ
12075	11566	H	υ
12075	11441	.	u
12075	11575	H	u
12075	11815	H	κ
12075	11535	H	k
12075	11544	H	U
12075	11547	H	K
12075	11441	.	α
12075	11578	H	α
12075	11441	.	a
12075	11581	H	a
12075	11518	H	A
12075	11824	H	λ
12075	11562	H	l
12075	11565	H	L
12076	12077	<name>	<name>
12076	12078	<K>	<>
12077	11391	H	k
12077	11376	H	l
12078	11967	<name>	<name>
12079	11597	.	.
12079	11597	 	 
12079	11597	<~>	<~>
12079	11597	<split-s>	<split-s>
12079	11597	<split-h>	<split-h>
12079	11597	<name2>	<name2>
12079	11965	<name2>	<name>
12079	12068	<>	<name>
12079	11600	<aphaerese>	<aphaerese>
12079	12067	<>	<aphaerese>
12079	11597	<elision3>	<elision3>
12079	12067	<>	<elision3>
12079	11597	<elision2>	<elision2>
12079	12067	<>	<elision2>
12079	11597	<elision1>	<elision1>
12079	12067	<>	<elision1>
12079	11761	.	υ
12079	11761	.	u
12079	11761	.	α
12079	11761	.	a
12079	12080	<A4>	<>
12080	35	.	.
12080	36	 	 
12080	35	<~>	<~>
12080	35	<split-s>	<split-s>
12080	35	<split-h>	<split-h>
12080	35	<name2>	<name2>
12080	12077	<name2>	<name>
12080	12072	<>	<name>
12080	39	<aphaerese>	<aphaerese>
12080	12071	<>	<aphaerese>
12080	35	<elision3>	<elision3>
12080	12071	<>	<elision3>
12080	35	<elision2>	<elision2>
12080	12071	<>	<elision2>
12080	35	<elision1>	<elision1>
12080	12071	<>	<elision1>
12080	11392	.	υ
12080	11436	H	υ
12080	11392	.	u
12080	11438	H	u
12080	11830	H	κ
12080	11346	H	k
12080	11359	H	U
12080	11362	H	K
12080	11392	.	α
12080	11422	H	α
12080	11392	.	a
12080	11427	H	a
12080	11189	H	A
12080	11807	H	λ
12080	11755	H	l
12080	11760	H	L
12080	12081	<K>	<>
12081	11442	.	.
12081	11442	<~>	<~>
12081	11442	<split-s>	<split-s>
12081	11442	<split-h>	<split-h>
12081	11442	<name2>	<name2>
12081	11967	<name2>	<name>
12081	12073	<>	<name>
12081	11445	<aphaerese>	<aphaerese>
12081	12075	<>	<aphaerese>
12081	11442	<elision3>	<elision3>
12081	12075	<>	<elision3>
12081	11442	<elision2>	<elision2>
12081	12075	<>	<elision2>
12081	11442	<elision1>	<elision1>
12081	12075	<>	<elision1>
12081	11441	.	υ
12081	11566	H	υ
12081	11441	.	u
12081	11575	H	u
12081	11815	H	κ
12081	11535	H	k
12081	11544	H	U
12081	11547	H	K
12081	11441	.	α
12081	11578	H	α
12081	11441	.	a
12081	11581	H	a
12081	11518	H	A
12081	11824	H	λ
12081	11562	H	l
12081	11565	H	L
12082	12083	<>	<name>
12082	12082	<>	<aphaerese>
12082	12082	<>	<elision3>
12082	12082	<>	<elision2>
12082	12082	<>	<elision1>
12082	11597	<A2kl>	<>
12083	12084	<>	<aphaerese>
12083	12084	<>	<elision3>
12083	12084	<>	<elision2>
12083	12084	<>	<elision1>
12083	11598	<A2kl>	<>
12084	12082	<>	<aphaerese>
12084	12082	<>	<elision3>
12084	12082	<>	<elision2>
12084	12082	<>	<elision1>
12084	11599	<A2kl>	<>
12085	11965	<name>	<name>
12085	12086	<>	<name>
12085	12088	<>	<aphaerese>
12085	12088	<>	<elision3>
12085	12088	<>	<elision2>
12085	12088	<>	<elision1>
12085	12076	<A4>	<>
12085	11971	<A2kl>	<>
12085	12098	<L2kl>	<>
12086	12087	<>	<aphaerese>
12086	12087	<>	<elision3>
12086	12087	<>	<elision2>
12086	12087	<>	<elision1>
12086	11972	<A2kl>	<>
12086	12090	<L2kl>	<>
12087	12088	<>	<aphaerese>
12087	12088	<>	<elision3>
12087	12088	<>	<elision2>
12087	12088	<>	<elision1>
12087	11973	<A2kl>	<>
12087	12091	<L2kl>	<>
12088	12086	<>	<name>
12088	12088	<>	<aphaerese>
12088	12088	<>	<elision3>
12088	12088	<>	<elision2>
12088	12088	<>	<elision1>
12088	11971	<A2kl>	<>
12088	12089	<L2kl>	<>
12089	11597	.	.
12089	11597	 	 
12089	11597	<~>	<~>
12089	11597	<split-s>	<split-s>
12089	11597	<split-h>	<split-h>
12089	11597	<name2>	<name2>
12089	12090	<>	<name>
12089	11600	<aphaerese>	<aphaerese>
12089	12089	<>	<aphaerese>
12089	11597	<elision3>	<elision3>
12089	12089	<>	<elision3>
12089	11597	<elision2>	<elision2>
12089	12089	<>	<elision2>
12089	11597	<elision1>	<elision1>
12089	12089	<>	<elision1>
12089	11761	.	υ
12089	11761	.	u
12089	12037	.	κ
12089	11761	.	α
12089	11761	.	a
12089	12037	.	λ
12089	12093	<A4>	<>
12090	11599	.	.
12090	11599	 	 
12090	11599	<~>	<~>
12090	11599	<split-s>	<split-s>
12090	11599	<split-h>	<split-h>
12090	11599	<name2>	<name2>
12090	11602	<aphaerese>	<aphaerese>
12090	12091	<>	<aphaerese>
12090	11599	<elision3>	<elision3>
12090	12091	<>	<elision3>
12090	11599	<elision2>	<elision2>
12090	12091	<>	<elision2>
12090	11599	<elision1>	<elision1>
12090	12091	<>	<elision1>
12090	11763	.	υ
12090	11763	.	u
12090	12039	.	κ
12090	11763	.	α
12090	11763	.	a
12090	12039	.	λ
12090	12094	<A4>	<>
12091	11597	.	.
12091	11597	 	 
12091	11597	<~>	<~>
12091	11597	<split-s>	<split-s>
12091	11597	<split-h>	<split-h>
12091	11597	<name2>	<name2>
12091	11600	<aphaerese>	<aphaerese>
12091	12089	<>	<aphaerese>
12091	11597	<elision3>	<elision3>
12091	12089	<>	<elision3>
12091	11597	<elision2>	<elision2>
12091	12089	<>	<elision2>
12091	11597	<elision1>	<elision1>
12091	12089	<>	<elision1>
12091	11761	.	υ
12091	11761	.	u
12091	12037	.	κ
12091	11761	.	α
12091	11761	.	a
12091	12037	.	λ
12091	12092	<A4>	<>
12092	35	.	.
12092	36	 	 
12092	35	<~>	<~>
12092	35	<split-s>	<split-s>
12092	35	<split-h>	<split-h>
12092	35	<name2>	<name2>
12092	39	<aphaerese>	<aphaerese>
12092	12093	<>	<aphaerese>
12092	35	<elision3>	<elision3>
12092	12093	<>	<elision3>
12092	35	<elision2>	<elision2>
12092	12093	<>	<elision2>
12092	35	<elision1>	<elision1>
12092	12093	<>	<elision1>
12092	11392	.	υ
12092	11436	H	υ
12092	11392	.	u
12092	11438	H	u
12092	12062	.	κ
12092	11830	H	κ
12092	11346	H	k
12092	11359	H	U
12092	11362	H	K
12092	11392	.	α
12092	11422	H	α
12092	11392	.	a
12092	11427	H	a
12092	11189	H	A
12092	12062	.	λ
12092	11807	H	λ
12092	11755	H	l
12092	11760	H	L
12092	12096	<K>	<>
12093	35	.	.
12093	36	 	 
12093	35	<~>	<~>
12093	35	<split-s>	<split-s>
12093	35	<split-h>	<split-h>
12093	35	<name2>	<name2>
12093	12094	<>	<name>
12093	39	<aphaerese>	<aphaerese>
12093	12093	<>	<aphaerese>
12093	35	<elision3>	<elision3>
12093	12093	<>	<elision3>
12093	35	<elision2>	<elision2>
12093	12093	<>	<elision2>
12093	35	<elision1>	<elision1>
12093	12093	<>	<elision1>
12093	11392	.	υ
12093	11436	H	υ
12093	11392	.	u
12093	11438	H	u
12093	12062	.	κ
12093	11830	H	κ
12093	11346	H	k
12093	11359	H	U
12093	11362	H	K
12093	11392	.	α
12093	11422	H	α
12093	11392	.	a
12093	11427	H	a
12093	11189	H	A
12093	12062	.	λ
12093	11807	H	λ
12093	11755	H	l
12093	11760	H	L
12093	12097	<K>	<>
12094	34	.	.
12094	38	 	 
12094	34	<~>	<~>
12094	34	<split-s>	<split-s>
12094	34	<split-h>	<split-h>
12094	34	<name2>	<name2>
12094	41	<aphaerese>	<aphaerese>
12094	12092	<>	<aphaerese>
12094	34	<elision3>	<elision3>
12094	12092	<>	<elision3>
12094	34	<elision2>	<elision2>
12094	12092	<>	<elision2>
12094	34	<elision1>	<elision1>
12094	12092	<>	<elision1>
12094	11394	.	υ
12094	11431	H	υ
12094	11394	.	u
12094	11435	H	u
12094	12061	.	κ
12094	11787	H	κ
12094	11387	H	k
12094	11361	H	U
12094	11391	H	K
12094	11394	.	α
12094	11421	H	α
12094	11394	.	a
12094	11426	H	a
12094	11192	H	A
12094	12061	.	λ
12094	11806	H	λ
12094	11754	H	l
12094	11757	H	L
12094	12095	<K>	<>
12095	11444	.	.
12095	11444	<~>	<~>
12095	11444	<split-s>	<split-s>
12095	11444	<split-h>	<split-h>
12095	11444	<name2>	<name2>
12095	11447	<aphaerese>	<aphaerese>
12095	12096	<>	<aphaerese>
12095	11444	<elision3>	<elision3>
12095	12096	<>	<elision3>
12095	11444	<elision2>	<elision2>
12095	12096	<>	<elision2>
12095	11444	<elision1>	<elision1>
12095	12096	<>	<elision1>
12095	11440	.	υ
12095	11568	H	υ
12095	11440	.	u
12095	11577	H	u
12095	12056	.	κ
12095	11817	H	κ
12095	11537	H	k
12095	11546	H	U
12095	11550	H	K
12095	11440	.	α
12095	11580	H	α
12095	11440	.	a
12095	11583	H	a
12095	11520	H	A
12095	12056	.	λ
12095	11826	H	λ
12095	11564	H	l
12095	11559	H	L
12096	11442	.	.
12096	11442	<~>	<~>
12096	11442	<split-s>	<split-s>
12096	11442	<split-h>	<split-h>
12096	11442	<name2>	<name2>
12096	11445	<aphaerese>	<aphaerese>
12096	12097	<>	<aphaerese>
12096	11442	<elision3>	<elision3>
12096	12097	<>	<elision3>
12096	11442	<elision2>	<elision2>
12096	12097	<>	<elision2>
12096	11442	<elision1>	<elision1>
12096	12097	<>	<elision1>
12096	11441	.	υ
12096	11566	H	υ
12096	11441	.	u
12096	11575	H	u
12096	12057	.	κ
12096	11815	H	κ
12096	11535	H	k
12096	11544	H	U
12096	11547	H	K
12096	11441	.	α
12096	11578	H	α
12096	11441	.	a
12096	11581	H	a
12096	11518	H	A
12096	12057	.	λ
12096	11824	H	λ
12096	11562	H	l
12096	11565	H	L
12097	11442	.	.
12097	11442	<~>	<~>
12097	11442	<split-s>	<split-s>
12097	11442	<split-h>	<split-h>
12097	11442	<name2>	<name2>
12097	12095	<>	<name>
12097	11445	<aphaerese>	<aphaerese>
12097	12097	<>	<aphaerese>
12097	11442	<elision3>	<elision3>
12097	12097	<>	<elision3>
12097	11442	<elision2>	<elision2>
12097	12097	<>	<elision2>
12097	11442	<elision1>	<elision1>
12097	12097	<>	<elision1>
12097	11441	.	υ
12097	11566	H	υ
12097	11441	.	u
12097	11575	H	u
12097	12057	.	κ
12097	11815	H	κ
12097	11535	H	k
12097	11544	H	U
12097	11547	H	K
12097	11441	.	α
12097	11578	H	α
12097	11441	.	a
12097	11581	H	a
12097	11518	H	A
12097	12057	.	λ
12097	11824	H	λ
12097	11562	H	l
12097	11565	H	L
12098	11597	.	.
12098	11597	 	 
12098	11597	<~>	<~>
12098	11597	<split-s>	<split-s>
12098	11597	<split-h>	<split-h>
12098	11597	<name2>	<name2>
12098	11965	<name2>	<name>
12098	12090	<>	<name>
12098	11600	<aphaerese>	<aphaerese>
12098	12089	<>	<aphaerese>
12098	11597	<elision3>	<elision3>
12098	12089	<>	<elision3>
12098	11597	<elision2>	<elision2>
12098	12089	<>	<elision2>
12098	11597	<elision1>	<elision1>
12098	12089	<>	<elision1>
12098	11761	.	υ
12098	11761	.	u
12098	12037	.	κ
12098	11761	.	α
12098	11761	.	a
12098	12037	.	λ
12098	12099	<A4>	<>
12099	35	.	.
12099	36	 	 
12099	35	<~>	<~>
12099	35	<split-s>	<split-s>
12099	35	<split-h>	<split-h>
12099	35	<name2>	<name2>
12099	12077	<name2>	<name>
12099	12094	<>	<name>
12099	39	<aphaerese>	<aphaerese>
12099	12093	<>	<aphaerese>
12099	35	<elision3>	<elision3>
12099	12093	<>	<elision3>
12099	35	<elision2>	<elision2>
12099	12093	<>	<elision2>
12099	35	<elision1>	<elision1>
12099	12093	<>	<elision1>
12099	11392	.	υ
12099	11436	H	υ
12099	11392	.	u
12099	11438	H	u
12099	12062	.	κ
12099	11830	H	κ
12099	11346	H	k
12099	11359	H	U
12099	11362	H	K
12099	11392	.	α
12099	11422	H	α
12099	11392	.	a
12099	11427	H	a
12099	11189	H	A
12099	12062	.	λ
12099	11807	H	λ
12099	11755	H	l
12099	11760	H	L
12099	12100	<K>	<>
12100	11442	.	.
12100	11442	<~>	<~>
12100	11442	<split-s>	<split-s>
12100	11442	<split-h>	<split-h>
12100	11442	<name2>	<name2>
12100	11967	<name2>	<name>
12100	12095	<>	<name>
12100	11445	<aphaerese>	<aphaerese>
12100	12097	<>	<aphaerese>
12100	11442	<elision3>	<elision3>
12100	12097	<>	<elision3>
12100	11442	<elision2>	<elision2>
12100	12097	<>	<elision2>
12100	11442	<elision1>	<elision1>
12100	12097	<>	<elision1>
12100	11441	.	υ
12100	11566	H	υ
12100	11441	.	u
12100	11575	H	u
12100	12057	.	κ
12100	11815	H	κ
12100	11535	H	k
12100	11544	H	U
12100	11547	H	K
12100	11441	.	α
12100	11578	H	α
12100	11441	.	a
12100	11581	H	a
12100	11518	H	A
12100	12057	.	λ
12100	11824	H	λ
12100	11562	H	l
12100	11565	H	L
12101	11597	.	.
12101	11597	 	 
12101	11597	<~>	<~>
12101	11597	<split-s>	<split-s>
12101	11597	<split-h>	<split-h>
12101	11597	<name2>	<name2>
12101	11767	<>	<name>
12101	11600	<aphaerese>	<aphaerese>
12101	11596	<>	<aphaerese>
12101	11596	<>	<elision3>
12101	11596	<>	<elision2>
12101	11596	<>	<elision1>
12101	11761	.	υ
12101	11761	.	u
12101	11603	.	κ
12101	11761	.	α
12101	11761	.	a
12101	12102	<A4>	<>
12102	35	.	.
12102	36	 	 
12102	35	<~>	<~>
12102	35	<split-s>	<split-s>
12102	35	<split-h>	<split-h>
12102	35	<name2>	<name2>
12102	11771	<>	<name>
12102	39	<aphaerese>	<aphaerese>
12102	11770	<>	<aphaerese>
12102	11770	<>	<elision3>
12102	11770	<>	<elision2>
12102	11770	<>	<elision1>
12102	11392	.	υ
12102	11392	.	u
12102	42	.	κ
12102	11359	H	U
12102	11362	H	K
12102	11392	.	α
12102	11392	.	a
12102	11189	H	A
12102	11760	H	L
12102	12103	<K>	<>
12103	11442	.	.
12103	11442	<~>	<~>
12103	11442	<split-s>	<split-s>
12103	11442	<split-h>	<split-h>
12103	11442	<name2>	<name2>
12103	11772	<>	<name>
12103	11445	<aphaerese>	<aphaerese>
12103	11774	<>	<aphaerese>
12103	11774	<>	<elision3>
12103	11774	<>	<elision2>
12103	11774	<>	<elision1>
12103	11441	.	υ
12103	11441	.	u
12103	11448	.	κ
12103	11544	H	U
12103	11547	H	K
12103	11441	.	α
12103	11441	.	a
12103	11518	H	A
12103	11565	H	L
12104	11597	.	.
12104	11597	 	 
12104	11597	<~>	<~>
12104	11597	<split-s>	<split-s>
12104	11597	<split-h>	<split-h>
12104	11597	<name2>	<name2>
12104	11841	<>	<name>
12104	11600	<aphaerese>	<aphaerese>
12104	11840	<>	<aphaerese>
12104	11843	<elision3>	<elision3>
12104	11840	<>	<elision3>
12104	11843	<elision2>	<elision2>
12104	11840	<>	<elision2>
12104	11843	<elision1>	<elision1>
12104	11840	<>	<elision1>
12104	11761	.	υ
12104	11761	.	u
12104	11761	.	κ
12104	11761	.	α
12104	11761	.	a
12104	11761	.	λ
12104	12105	<A4>	<>
12105	35	.	.
12105	36	 	 
12105	35	<~>	<~>
12105	35	<split-s>	<split-s>
12105	35	<split-h>	<split-h>
12105	35	<name2>	<name2>
12105	11945	<>	<name>
12105	39	<aphaerese>	<aphaerese>
12105	11944	<>	<aphaerese>
12105	11947	<elision3>	<elision3>
12105	11944	<>	<elision3>
12105	11947	<elision2>	<elision2>
12105	11944	<>	<elision2>
12105	11947	<elision1>	<elision1>
12105	11944	<>	<elision1>
12105	11392	.	υ
12105	11392	.	u
12105	11392	.	κ
12105	11359	H	U
12105	11362	H	K
12105	11392	.	α
12105	11392	.	a
12105	11189	H	A
12105	11392	.	λ
12105	11760	H	L
12105	12106	<K>	<>
12106	11442	.	.
12106	11442	<~>	<~>
12106	11442	<split-s>	<split-s>
12106	11442	<split-h>	<split-h>
12106	11442	<name2>	<name2>
12106	11949	<>	<name>
12106	11445	<aphaerese>	<aphaerese>
12106	11951	<>	<aphaerese>
12106	11896	<elision3>	<elision3>
12106	11951	<>	<elision3>
12106	11896	<elision2>	<elision2>
12106	11951	<>	<elision2>
12106	11896	<elision1>	<elision1>
12106	11951	<>	<elision1>
12106	11441	.	υ
12106	11441	.	u
12106	11441	.	κ
12106	11544	H	U
12106	11547	H	K
12106	11441	.	α
12106	11441	.	a
12106	11518	H	A
12106	11441	.	λ
12106	11565	H	L
12107	11597	.	.
12107	11597	 	 
12107	11597	<~>	<~>
12107	11597	<split-s>	<split-s>
12107	11597	<split-h>	<split-h>
12107	11597	<name2>	<name2>
12107	11953	<>	<name>
12107	11600	<aphaerese>	<aphaerese>
12107	11952	<>	<aphaerese>
12107	11597	<elision3>	<elision3>
12107	11952	<>	<elision3>
12107	11597	<elision2>	<elision2>
12107	11952	<>	<elision2>
12107	11597	<elision1>	<elision1>
12107	11952	<>	<elision1>
12107	11761	.	υ
12107	11761	.	u
12107	11761	.	κ
12107	11761	.	α
12107	11761	.	a
12107	11761	.	λ
12107	12108	<A4>	<>
12108	35	.	.
12108	36	 	 
12108	35	<~>	<~>
12108	35	<split-s>	<split-s>
12108	35	<split-h>	<split-h>
12108	35	<name2>	<name2>
12108	11957	<>	<name>
12108	39	<aphaerese>	<aphaerese>
12108	11956	<>	<aphaerese>
12108	35	<elision3>	<elision3>
12108	11956	<>	<elision3>
12108	35	<elision2>	<elision2>
12108	11956	<>	<elision2>
12108	35	<elision1>	<elision1>
12108	11956	<>	<elision1>
12108	11392	.	υ
12108	11392	.	u
12108	11392	.	κ
12108	11359	H	U
12108	11362	H	K
12108	11392	.	α
12108	11392	.	a
12108	11189	H	A
12108	11392	.	λ
12108	11760	H	L
12108	12109	<K>	<>
12109	11442	.	.
12109	11442	<~>	<~>
12109	11442	<split-s>	<split-s>
12109	11442	<split-h>	<split-h>
12109	11442	<name2>	<name2>
12109	11958	<>	<name>
12109	11445	<aphaerese>	<aphaerese>
12109	11960	<>	<aphaerese>
12109	11442	<elision3>	<elision3>
12109	11960	<>	<elision3>
12109	11442	<elision2>	<elision2>
12109	11960	<>	<elision2>
12109	11442	<elision1>	<elision1>
12109	11960	<>	<elision1>
12109	11441	.	υ
12109	11441	.	u
12109	11441	.	κ
12109	11544	H	U
12109	11547	H	K
12109	11441	.	α
12109	11441	.	a
12109	11518	H	A
12109	11441	.	λ
12109	11565	H	L
12110	11962	<>	<name>
12110	11961	<>	<aphaerese>
12110	11961	<>	<elision3>
12110	11961	<>	<elision2>
12110	11961	<>	<elision1>
12110	12111	<U2kl>	<>
12111	11597	.	.
12111	11597	 	 
12111	11597	<~>	<~>
12111	11597	<split-s>	<split-s>
12111	11597	<split-h>	<split-h>
12111	11597	<name2>	<name2>
12111	11598	<>	<name>
12111	11600	<aphaerese>	<aphaerese>
12111	11597	<>	<aphaerese>
12111	11597	<elision3>	<elision3>
12111	11597	<>	<elision3>
12111	11597	<elision2>	<elision2>
12111	11597	<>	<elision2>
12111	11597	<elision1>	<elision1>
12111	11597	<>	<elision1>
12111	11761	.	υ
12111	11761	.	u
12111	11603	.	κ
12111	11761	.	α
12111	11761	.	a
12111	12112	<A4>	<>
12112	35	.	.
12112	36	 	 
12112	35	<~>	<~>
12112	35	<split-s>	<split-s>
12112	35	<split-h>	<split-h>
12112	35	<name2>	<name2>
12112	11766	<>	<name>
12112	39	<aphaerese>	<aphaerese>
12112	11765	<>	<aphaerese>
12112	35	<elision3>	<elision3>
12112	11765	<>	<elision3>
12112	35	<elision2>	<elision2>
12112	11765	<>	<elision2>
12112	35	<elision1>	<elision1>
12112	11765	<>	<elision1>
12112	11392	.	υ
12112	11392	.	u
12112	42	.	κ
12112	11359	H	U
12112	11362	H	K
12112	11392	.	α
12112	11392	.	a
12112	11189	H	A
12112	11760	H	L
12112	12113	<K>	<>
12113	11442	.	.
12113	11442	<~>	<~>
12113	11442	<split-s>	<split-s>
12113	11442	<split-h>	<split-h>
12113	11442	<name2>	<name2>
12113	11443	<>	<name>
12113	11445	<aphaerese>	<aphaerese>
12113	11442	<>	<aphaerese>
12113	11442	<elision3>	<elision3>
12113	11442	<>	<elision3>
12113	11442	<elision2>	<elision2>
12113	11442	<>	<elision2>
12113	11442	<elision1>	<elision1>
12113	11442	<>	<elision1>
12113	11441	.	υ
12113	11441	.	u
12113	11448	.	κ
12113	11544	H	U
12113	11547	H	K
12113	11441	.	α
12113	11441	.	a
12113	11518	H	A
12113	11565	H	L
12114	11965	<name>	<name>
12114	11968	<>	<name>
12114	11970	<>	<aphaerese>
12114	11970	<>	<elision3>
12114	11970	<>	<elision2>
12114	11970	<>	<elision1>
12114	12076	<A4>	<>
12114	11971	<A2kl>	<>
12114	12034	<L2kl>	<>
12114	12115	<K2kl>	<>
12115	11597	.	.
12115	11597	 	 
12115	11597	<~>	<~>
12115	11597	<split-s>	<split-s>
12115	11597	<split-h>	<split-h>
12115	11597	<name2>	<name2>
12115	11965	<name2>	<name>
12115	12068	<>	<name>
12115	11600	<aphaerese>	<aphaerese>
12115	12067	<>	<aphaerese>
12115	11597	<elision3>	<elision3>
12115	12067	<>	<elision3>
12115	11597	<elision2>	<elision2>
12115	12067	<>	<elision2>
12115	11597	<elision1>	<elision1>
12115	12067	<>	<elision1>
12115	11761	.	υ
12115	11761	.	u
12115	11761	.	α
12115	11761	.	a
12115	12116	<A4>	<>
12116	35	.	.
12116	36	 	 
12116	35	<~>	<~>
12116	35	<split-s>	<split-s>
12116	35	<split-h>	<split-h>
12116	35	<name2>	<name2>
12116	12077	<name2>	<name>
12116	12072	<>	<name>
12116	39	<aphaerese>	<aphaerese>
12116	12071	<>	<aphaerese>
12116	35	<elision3>	<elision3>
12116	12071	<>	<elision3>
12116	35	<elision2>	<elision2>
12116	12071	<>	<elision2>
12116	35	<elision1>	<elision1>
12116	12071	<>	<elision1>
12116	11392	.	υ
12116	11392	.	u
12116	11359	H	U
12116	11362	H	K
12116	11392	.	α
12116	11392	.	a
12116	11189	H	A
12116	11760	H	L
12116	12117	<K>	<>
12117	11442	.	.
12117	11442	<~>	<~>
12117	11442	<split-s>	<split-s>
12117	11442	<split-h>	<split-h>
12117	11442	<name2>	<name2>
12117	11967	<name2>	<name>
12117	12073	<>	<name>
12117	11445	<aphaerese>	<aphaerese>
12117	12075	<>	<aphaerese>
12117	11442	<elision3>	<elision3>
12117	12075	<>	<elision3>
12117	11442	<elision2>	<elision2>
12117	12075	<>	<elision2>
12117	11442	<elision1>	<elision1>
12117	12075	<>	<elision1>
12117	11441	.	υ
12117	11441	.	u
12117	11544	H	U
12117	11547	H	K
12117	11441	.	α
12117	11441	.	a
12117	11518	H	A
12117	11565	H	L
12118	12083	<>	<name>
12118	12082	<>	<aphaerese>
12118	12082	<>	<elision3>
12118	12082	<>	<elision2>
12118	12082	<>	<elision1>
12118	12111	<A2kl>	<>
12119	11965	<name>	<name>
12119	12086	<>	<name>
12119	12088	<>	<aphaerese>
12119	12088	<>	<elision3>
12119	12088	<>	<elision2>
12119	12088	<>	<elision1>
12119	12076	<A4>	<>
12119	11971	<A2kl>	<>
12119	12120	<L2kl>	<>
12120	11597	.	.
12120	11597	 	 
12120	11597	<~>	<~>
12120	11597	<split-s>	<split-s>
12120	11597	<split-h>	<split-h>
12120	11597	<name2>	<name2>
12120	11965	<name2>	<name>
12120	12090	<>	<name>
12120	11600	<aphaerese>	<aphaerese>
12120	12089	<>	<aphaerese>
12120	11597	<elision3>	<elision3>
12120	12089	<>	<elision3>
12120	11597	<elision2>	<elision2>
12120	12089	<>	<elision2>
12120	11597	<elision1>	<elision1>
12120	12089	<>	<elision1>
12120	11761	.	υ
12120	11761	.	u
12120	12037	.	κ
12120	11761	.	α
12120	11761	.	a
12120	12037	.	λ
12120	12121	<A4>	<>
12121	35	.	.
12121	36	 	 
12121	35	<~>	<~>
12121	35	<split-s>	<split-s>
12121	35	<split-h>	<split-h>
12121	35	<name2>	<name2>
12121	12077	<name2>	<name>
12121	12094	<>	<name>
12121	39	<aphaerese>	<aphaerese>
12121	12093	<>	<aphaerese>
12121	35	<elision3>	<elision3>
12121	12093	<>	<elision3>
12121	35	<elision2>	<elision2>
12121	12093	<>	<elision2>
12121	35	<elision1>	<elision1>
12121	12093	<>	<elision1>
12121	11392	.	υ
12121	11392	.	u
12121	12062	.	κ
12121	11359	H	U
12121	11362	H	K
12121	11392	.	α
12121	11392	.	a
12121	11189	H	A
12121	12062	.	λ
12121	11760	H	L
12121	12122	<K>	<>
12122	11442	.	.
12122	11442	<~>	<~>
12122	11442	<split-s>	<split-s>
12122	11442	<split-h>	<split-h>
12122	11442	<name2>	<name2>
12122	11967	<name2>	<name>
12122	12095	<>	<name>
12122	11445	<aphaerese>	<aphaerese>
12122	12097	<>	<aphaerese>
12122	11442	<elision3>	<elision3>
12122	12097	<>	<elision3>
12122	11442	<elision2>	<elision2>
12122	12097	<>	<elision2>
12122	11442	<elision1>	<elision1>
12122	12097	<>	<elision1>
12122	11441	.	υ
12122	11441	.	u
12122	12057	.	κ
12122	11544	H	U
12122	11547	H	K
12122	11441	.	α
12122	11441	.	a
12122	11518	H	A
12122	12057	.	λ
12122	11565	H	L
12123	11585	.	.
12123	11586	 	 
12123	11585	<~>	<~>
12123	11585	<split-s>	<split-s>
12123	11585	<split-h>	<split-h>
12123	11585	<name2>	<name2>
12123	11589	<aphaerese>	<aphaerese>
12123	11589	<>	<aphaerese>
12123	11585	<elision3>	<elision3>
12123	11589	<>	<elision3>
12123	11585	<elision2>	<elision2>
12123	11589	<>	<elision2>
12123	11585	<elision1>	<elision1>
12123	11589	<>	<elision1>
12123	11585	.	υ
12123	11585	.	u
12123	11775	.	κ
12123	11840	s	κ
12123	11952	s	k
12123	11961	s	U
12123	12124	s	K
12123	11585	.	α
12123	11585	.	a
12123	12082	s	A
12123	11952	s	λ
12123	11952	s	l
12123	12137	s	L
12123	11751	<A3>	<>
12124	11965	<name>	<name>
12124	12125	<>	<name>
12124	12127	<>	<aphaerese>
12124	12127	<>	<elision3>
12124	12127	<>	<elision2>
12124	12127	<>	<elision1>
12124	12076	<A4>	<>
12124	12128	<L2kl>	<>
12124	12079	<K2kl>	<>
12125	12126	<>	<aphaerese>
12125	12126	<>	<elision3>
12125	12126	<>	<elision2>
12125	12126	<>	<elision1>
12125	12129	<L2kl>	<>
12125	12068	<K2kl>	<>
12126	12127	<>	<aphaerese>
12126	12127	<>	<elision3>
12126	12127	<>	<elision2>
12126	12127	<>	<elision1>
12126	12130	<L2kl>	<>
12126	12069	<K2kl>	<>
12127	12125	<>	<name>
12127	12127	<>	<aphaerese>
12127	12127	<>	<elision3>
12127	12127	<>	<elision2>
12127	12127	<>	<elision1>
12127	12128	<L2kl>	<>
12127	12067	<K2kl>	<>
12128	12129	<>	<name>
12128	12128	<>	<aphaerese>
12128	12128	<>	<elision3>
12128	12128	<>	<elision2>
12128	12128	<>	<elision1>
12128	11761	.	κ
12128	11761	.	λ
12128	12132	<A4>	<>
12129	12130	<>	<aphaerese>
12129	12130	<>	<elision3>
12129	12130	<>	<elision2>
12129	12130	<>	<elision1>
12129	11763	.	κ
12129	11763	.	λ
12129	12133	<A4>	<>
12130	12128	<>	<aphaerese>
12130	12128	<>	<elision3>
12130	12128	<>	<elision2>
12130	12128	<>	<elision1>
12130	11761	.	κ
12130	11761	.	λ
12130	12131	<A4>	<>
12131	12132	<>	<aphaerese>
12131	12132	<>	<elision3>
12131	12132	<>	<elision2>
12131	12132	<>	<elision1>
12131	11392	.	κ
12131	11392	.	λ
12131	12135	<K>	<>
12132	12133	<>	<name>
12132	12132	<>	<aphaerese>
12132	12132	<>	<elision3>
12132	12132	<>	<elision2>
12132	12132	<>	<elision1>
12132	11392	.	κ
12132	11392	.	λ
12132	12136	<K>	<>
12133	12131	<>	<aphaerese>
12133	12131	<>	<elision3>
12133	12131	<>	<elision2>
12133	12131	<>	<elision1>
12133	11394	.	κ
12133	11394	.	λ
12133	12134	<K>	<>
12134	12135	<>	<aphaerese>
12134	12135	<>	<elision3>
12134	12135	<>	<elision2>
12134	12135	<>	<elision1>
12134	11440	.	κ
12134	11440	.	λ
12135	12136	<>	<aphaerese>
12135	12136	<>	<elision3>
12135	12136	<>	<elision2>
12135	12136	<>	<elision1>
12135	11441	.	κ
12135	11441	.	λ
12136	12134	<>	<name>
12136	12136	<>	<aphaerese>
12136	12136	<>	<elision3>
12136	12136	<>	<elision2>
12136	12136	<>	<elision1>
12136	11441	.	κ
12136	11441	.	λ
12137	11965	<name>	<name>
12137	12138	<>	<name>
12137	12140	<>	<aphaerese>
12137	12140	<>	<elision3>
12137	12140	<>	<elision2>
12137	12140	<>	<elision1>
12137	12076	<A4>	<>
12137	12141	<L2kl>	<>
12138	12139	<>	<aphaerese>
12138	12139	<>	<elision3>
12138	12139	<>	<elision2>
12138	12139	<>	<elision1>
12138	11953	<L2kl>	<>
12139	12140	<>	<aphaerese>
12139	12140	<>	<elision3>
12139	12140	<>	<elision2>
12139	12140	<>	<elision1>
12139	11954	<L2kl>	<>
12140	12138	<>	<name>
12140	12140	<>	<aphaerese>
12140	12140	<>	<elision3>
12140	12140	<>	<elision2>
12140	12140	<>	<elision1>
12140	11952	<L2kl>	<>
12141	11597	.	.
12141	11597	 	 
12141	11597	<~>	<~>
12141	11597	<split-s>	<split-s>
12141	11597	<split-h>	<split-h>
12141	11597	<name2>	<name2>
12141	11965	<name2>	<name>
12141	11953	<>	<name>
12141	11600	<aphaerese>	<aphaerese>
12141	11952	<>	<aphaerese>
12141	11597	<elision3>	<elision3>
12141	11952	<>	<elision3>
12141	11597	<elision2>	<elision2>
12141	11952	<>	<elision2>
12141	11597	<elision1>	<elision1>
12141	11952	<>	<elision1>
12141	11761	.	υ
12141	11761	.	u
12141	11761	.	κ
12141	11761	.	α
12141	11761	.	a
12141	11761	.	λ
12141	12142	<A4>	<>
12142	35	.	.
12142	36	 	 
12142	35	<~>	<~>
12142	35	<split-s>	<split-s>
12142	35	<split-h>	<split-h>
12142	35	<name2>	<name2>
12142	12077	<name2>	<name>
12142	11957	<>	<name>
12142	39	<aphaerese>	<aphaerese>
12142	11956	<>	<aphaerese>
12142	35	<elision3>	<elision3>
12142	11956	<>	<elision3>
12142	35	<elision2>	<elision2>
12142	11956	<>	<elision2>
12142	35	<elision1>	<elision1>
12142	11956	<>	<elision1>
12142	11392	.	υ
12142	11436	H	υ
12142	11392	.	u
12142	11438	H	u
12142	11392	.	κ
12142	11830	H	κ
12142	11346	H	k
12142	11359	H	U
12142	11362	H	K
12142	11392	.	α
12142	11422	H	α
12142	11392	.	a
12142	11427	H	a
12142	11189	H	A
12142	11392	.	λ
12142	11807	H	λ
12142	11755	H	l
12142	11760	H	L
12142	12143	<K>	<>
12143	11442	.	.
12143	11442	<~>	<~>
12143	11442	<split-s>	<split-s>
12143	11442	<split-h>	<split-h>
12143	11442	<name2>	<name2>
12143	11967	<name2>	<name>
12143	11958	<>	<name>
12143	11445	<aphaerese>	<aphaerese>
12143	11960	<>	<aphaerese>
12143	11442	<elision3>	<elision3>
12143	11960	<>	<elision3>
12143	11442	<elision2>	<elision2>
12143	11960	<>	<elision2>
12143	11442	<elision1>	<elision1>
12143	11960	<>	<elision1>
12143	11441	.	υ
12143	11566	H	υ
12143	11441	.	u
12143	11575	H	u
12143	11441	.	κ
12143	11815	H	κ
12143	11535	H	k
12143	11544	H	U
12143	11547	H	K
12143	11441	.	α
12143	11578	H	α
12143	11441	.	a
12143	11581	H	a
12143	11518	H	A
12143	11441	.	λ
12143	11824	H	λ
12143	11562	H	l
12143	11565	H	L
12144	11585	.	.
12144	11586	 	 
12144	11585	<~>	<~>
12144	11585	<split-s>	<split-s>
12144	11585	<split-h>	<split-h>
12144	11585	<name2>	<name2>
12144	11589	<aphaerese>	<aphaerese>
12144	11592	<>	<aphaerese>
12144	11585	<elision3>	<elision3>
12144	11592	<>	<elision3>
12144	11585	<elision2>	<elision2>
12144	11592	<>	<elision2>
12144	11585	<elision1>	<elision1>
12144	11592	<>	<elision1>
12144	11593	.	υ
12144	11596	s	υ
12144	11593	.	u
12144	11596	s	u
12144	11775	.	κ
12144	11840	s	κ
12144	11952	s	k
12144	11961	s	U
12144	11964	s	K
12144	11593	.	α
12144	11596	s	α
12144	11593	.	a
12144	11596	s	a
12144	12082	s	A
12144	11952	s	λ
12144	11952	s	l
12144	12085	s	L
12144	11764	<A3>	<>
12145	11588	.	.
12145	11591	 	 
12145	11588	<~>	<~>
12145	11588	<split-s>	<split-s>
12145	11588	<split-h>	<split-h>
12145	11588	<name2>	<name2>
12145	12123	<aphaerese>	<aphaerese>
12145	11588	<>	<aphaerese>
12145	11588	<elision3>	<elision3>
12145	11588	<>	<elision3>
12145	11588	<elision2>	<elision2>
12145	11588	<>	<elision2>
12145	11588	<elision1>	<elision1>
12145	11588	<>	<elision1>
12145	11595	.	υ
12145	11768	s	υ
12145	11595	.	u
12145	11768	s	u
12145	11777	.	κ
12145	11842	s	κ
12145	11954	s	k
12145	11963	s	U
12145	12126	s	K
12145	11595	.	α
12145	11768	s	α
12145	11595	.	a
12145	11768	s	a
12145	12084	s	A
12145	11954	s	λ
12145	11954	s	l
12145	12139	s	L
12145	11766	<A3>	<>
12146	11588	.	.
12146	11591	 	 
12146	11588	<~>	<~>
12146	11588	<split-s>	<split-s>
12146	11588	<split-h>	<split-h>
12146	11588	<name2>	<name2>
12146	12123	<aphaerese>	<aphaerese>
12146	12147	<>	<aphaerese>
12146	12147	<>	<elision3>
12146	12147	<>	<elision2>
12146	12147	<>	<elision1>
12146	11595	.	υ
12146	11768	s	υ
12146	11595	.	u
12146	11768	s	u
12146	11777	.	κ
12146	11842	s	κ
12146	11954	s	k
12146	11963	s	U
12146	12126	s	K
12146	11595	.	α
12146	11768	s	α
12146	11595	.	a
12146	11768	s	a
12146	12084	s	A
12146	11954	s	λ
12146	11954	s	l
12146	12139	s	L
12146	11771	<A3>	<>
12147	11585	.	.
12147	11586	 	 
12147	11585	<~>	<~>
12147	11585	<split-s>	<split-s>
12147	11585	<split-h>	<split-h>
12147	11585	<name2>	<name2>
12147	11589	<aphaerese>	<aphaerese>
12147	11584	<>	<aphaerese>
12147	11584	<>	<elision3>
12147	11584	<>	<elision2>
12147	11584	<>	<elision1>
12147	11593	.	υ
12147	11596	s	υ
12147	11593	.	u
12147	11596	s	u
12147	11775	.	κ
12147	11840	s	κ
12147	11952	s	k
12147	11961	s	U
12147	12124	s	K
12147	11593	.	α
12147	11596	s	α
12147	11593	.	a
12147	11596	s	a
12147	12082	s	A
12147	11952	s	λ
12147	11952	s	l
12147	12137	s	L
12147	11769	<A3>	<>
12148	12149	<>	<name>
12148	12148	<>	<aphaerese>
12148	12151	<elision3>	<elision3>
12148	12148	<>	<elision3>
12148	12151	<elision2>	<elision2>
12148	12148	<>	<elision2>
12148	12151	<elision1>	<elision1>
12148	12148	<>	<elision1>
12148	11749	<A2>	<>
12149	12150	<>	<aphaerese>
12149	12153	<elision3>	<elision3>
12149	12150	<>	<elision3>
12149	12153	<elision2>	<elision2>
12149	12150	<>	<elision2>
12149	12153	<elision1>	<elision1>
12149	12150	<>	<elision1>
12149	11750	<A2>	<>
12150	12148	<>	<aphaerese>
12150	12151	<elision3>	<elision3>
12150	12148	<>	<elision3>
12150	12151	<elision2>	<elision2>
12150	12148	<>	<elision2>
12150	12151	<elision1>	<elision1>
12150	12148	<>	<elision1>
12150	11748	<A2>	<>
12151	12152	<>	<name>
12151	12151	<>	<aphaerese>
12151	12151	<>	<elision3>
12151	12151	<>	<elision2>
12151	12151	<>	<elision1>
12151	12154	s	κ
12151	12154	s	k
12151	12166	s	K
12151	12154	s	λ
12151	12154	s	l
12151	12169	s	L
12151	11610	<A2>	<>
12152	12153	<>	<aphaerese>
12152	12153	<>	<elision3>
12152	12153	<>	<elision2>
12152	12153	<>	<elision1>
12152	12156	s	κ
12152	12156	s	k
12152	12168	s	K
12152	12156	s	λ
12152	12156	s	l
12152	12171	s	L
12152	11611	<A2>	<>
12153	12151	<>	<aphaerese>
12153	12151	<>	<elision3>
12153	12151	<>	<elision2>
12153	12151	<>	<elision1>
12153	12154	s	κ
12153	12154	s	k
12153	12166	s	K
12153	12154	s	λ
12153	12154	s	l
12153	12169	s	L
12153	11609	<A2>	<>
12154	12155	<>	<name>
12154	12154	<>	<aphaerese>
12154	12154	<>	<elision3>
12154	12154	<>	<elision2>
12154	12154	<>	<elision1>
12154	12157	s	κ
12154	11952	s	k
12154	12124	s	K
12154	12157	s	λ
12154	11952	s	l
12154	12137	s	L
12154	11785	<A3>	<>
12155	12156	<>	<aphaerese>
12155	12156	<>	<elision3>
12155	12156	<>	<elision2>
12155	12156	<>	<elision1>
12155	12159	s	κ
12155	11954	s	k
12155	12126	s	K
12155	12159	s	λ
12155	11954	s	l
12155	12139	s	L
12155	11786	<A3>	<>
12156	12154	<>	<aphaerese>
12156	12154	<>	<elision3>
12156	12154	<>	<elision2>
12156	12154	<>	<elision1>
12156	12157	s	κ
12156	11952	s	k
12156	12124	s	K
12156	12157	s	λ
12156	11952	s	l
12156	12137	s	L
12156	11784	<A3>	<>
12157	11597	.	.
12157	11597	 	 
12157	11597	<~>	<~>
12157	11597	<split-s>	<split-s>
12157	11597	<split-h>	<split-h>
12157	11597	<name2>	<name2>
12157	12158	<>	<name>
12157	11600	<aphaerese>	<aphaerese>
12157	12157	<>	<aphaerese>
12157	12157	<>	<elision3>
12157	12157	<>	<elision2>
12157	12157	<>	<elision1>
12157	11761	.	υ
12157	11761	.	u
12157	11761	.	κ
12157	11761	.	α
12157	11761	.	a
12157	11761	.	λ
12157	12161	<A4>	<>
12158	11599	.	.
12158	11599	 	 
12158	11599	<~>	<~>
12158	11599	<split-s>	<split-s>
12158	11599	<split-h>	<split-h>
12158	11599	<name2>	<name2>
12158	11602	<aphaerese>	<aphaerese>
12158	12159	<>	<aphaerese>
12158	12159	<>	<elision3>
12158	12159	<>	<elision2>
12158	12159	<>	<elision1>
12158	11763	.	υ
12158	11763	.	u
12158	11763	.	κ
12158	11763	.	α
12158	11763	.	a
12158	11763	.	λ
12158	12162	<A4>	<>
12159	11597	.	.
12159	11597	 	 
12159	11597	<~>	<~>
12159	11597	<split-s>	<split-s>
12159	11597	<split-h>	<split-h>
12159	11597	<name2>	<name2>
12159	11600	<aphaerese>	<aphaerese>
12159	12157	<>	<aphaerese>
12159	12157	<>	<elision3>
12159	12157	<>	<elision2>
12159	12157	<>	<elision1>
12159	11761	.	υ
12159	11761	.	u
12159	11761	.	κ
12159	11761	.	α
12159	11761	.	a
12159	11761	.	λ
12159	12160	<A4>	<>
12160	35	.	.
12160	36	 	 
12160	35	<~>	<~>
12160	35	<split-s>	<split-s>
12160	35	<split-h>	<split-h>
12160	35	<name2>	<name2>
12160	39	<aphaerese>	<aphaerese>
12160	12161	<>	<aphaerese>
12160	12161	<>	<elision3>
12160	12161	<>	<elision2>
12160	12161	<>	<elision1>
12160	11392	.	υ
12160	11436	H	υ
12160	11392	.	u
12160	11438	H	u
12160	11392	.	κ
12160	11830	H	κ
12160	11346	H	k
12160	11359	H	U
12160	11362	H	K
12160	11392	.	α
12160	11422	H	α
12160	11392	.	a
12160	11427	H	a
12160	11189	H	A
12160	11392	.	λ
12160	11807	H	λ
12160	11755	H	l
12160	11760	H	L
12160	12164	<K>	<>
12161	35	.	.
12161	36	 	 
12161	35	<~>	<~>
12161	35	<split-s>	<split-s>
12161	35	<split-h>	<split-h>
12161	35	<name2>	<name2>
12161	12162	<>	<name>
12161	39	<aphaerese>	<aphaerese>
12161	12161	<>	<aphaerese>
12161	12161	<>	<elision3>
12161	12161	<>	<elision2>
12161	12161	<>	<elision1>
12161	11392	.	υ
12161	11436	H	υ
12161	11392	.	u
12161	11438	H	u
12161	11392	.	κ
12161	11830	H	κ
12161	11346	H	k
12161	11359	H	U
12161	11362	H	K
12161	11392	.	α
12161	11422	H	α
12161	11392	.	a
12161	11427	H	a
12161	11189	H	A
12161	11392	.	λ
12161	11807	H	λ
12161	11755	H	l
12161	11760	H	L
12161	12165	<K>	<>
12162	34	.	.
12162	38	 	 
12162	34	<~>	<~>
12162	34	<split-s>	<split-s>
12162	34	<split-h>	<split-h>
12162	34	<name2>	<name2>
12162	41	<aphaerese>	<aphaerese>
12162	12160	<>	<aphaerese>
12162	12160	<>	<elision3>
12162	12160	<>	<elision2>
12162	12160	<>	<elision1>
12162	11394	.	υ
12162	11431	H	υ
12162	11394	.	u
12162	11435	H	u
12162	11394	.	κ
12162	11787	H	κ
12162	11387	H	k
12162	11361	H	U
12162	11391	H	K
12162	11394	.	α
12162	11421	H	α
12162	11394	.	a
12162	11426	H	a
12162	11192	H	A
12162	11394	.	λ
12162	11806	H	λ
12162	11754	H	l
12162	11757	H	L
12162	12163	<K>	<>
12163	11444	.	.
12163	11444	<~>	<~>
12163	11444	<split-s>	<split-s>
12163	11444	<split-h>	<split-h>
12163	11444	<name2>	<name2>
12163	11447	<aphaerese>	<aphaerese>
12163	12164	<>	<aphaerese>
12163	12164	<>	<elision3>
12163	12164	<>	<elision2>
12163	12164	<>	<elision1>
12163	11440	.	υ
12163	11568	H	υ
12163	11440	.	u
12163	11577	H	u
12163	11440	.	κ
12163	11817	H	κ
12163	11537	H	k
12163	11546	H	U
12163	11550	H	K
12163	11440	.	α
12163	11580	H	α
12163	11440	.	a
12163	11583	H	a
12163	11520	H	A
12163	11440	.	λ
12163	11826	H	λ
12163	11564	H	l
12163	11559	H	L
12164	11442	.	.
12164	11442	<~>	<~>
12164	11442	<split-s>	<split-s>
12164	11442	<split-h>	<split-h>
12164	11442	<name2>	<name2>
12164	11445	<aphaerese>	<aphaerese>
12164	12165	<>	<aphaerese>
12164	12165	<>	<elision3>
12164	12165	<>	<elision2>
12164	12165	<>	<elision1>
12164	11441	.	υ
12164	11566	H	υ
12164	11441	.	u
12164	11575	H	u
12164	11441	.	κ
12164	11815	H	κ
12164	11535	H	k
12164	11544	H	U
12164	11547	H	K
12164	11441	.	α
12164	11578	H	α
12164	11441	.	a
12164	11581	H	a
12164	11518	H	A
12164	11441	.	λ
12164	11824	H	λ
12164	11562	H	l
12164	11565	H	L
12165	11442	.	.
12165	11442	<~>	<~>
12165	11442	<split-s>	<split-s>
12165	11442	<split-h>	<split-h>
12165	11442	<name2>	<name2>
12165	12163	<>	<name>
12165	11445	<aphaerese>	<aphaerese>
12165	12165	<>	<aphaerese>
12165	12165	<>	<elision3>
12165	12165	<>	<elision2>
12165	12165	<>	<elision1>
12165	11441	.	υ
12165	11566	H	υ
12165	11441	.	u
12165	11575	H	u
12165	11441	.	κ
12165	11815	H	κ
12165	11535	H	k
12165	11544	H	U
12165	11547	H	K
12165	11441	.	α
12165	11578	H	α
12165	11441	.	a
12165	11581	H	a
12165	11518	H	A
12165	11441	.	λ
12165	11824	H	λ
12165	11562	H	l
12165	11565	H	L
12166	12167	<>	<name>
12166	12166	<>	<aphaerese>
12166	12166	<>	<elision3>
12166	12166	<>	<elision2>
12166	12166	<>	<elision1>
12166	12154	<K2kl>	<>
12167	12168	<>	<aphaerese>
12167	12168	<>	<elision3>
12167	12168	<>	<elision2>
12167	12168	<>	<elision1>
12167	12155	<K2kl>	<>
12168	12166	<>	<aphaerese>
12168	12166	<>	<elision3>
12168	12166	<>	<elision2>
12168	12166	<>	<elision1>
12168	12156	<K2kl>	<>
12169	12170	<>	<name>
12169	12169	<>	<aphaerese>
12169	12169	<>	<elision3>
12169	12169	<>	<elision2>
12169	12169	<>	<elision1>
12169	12154	<L2kl>	<>
12170	12171	<>	<aphaerese>
12170	12171	<>	<elision3>
12170	12171	<>	<elision2>
12170	12171	<>	<elision1>
12170	12155	<L2kl>	<>
12171	12169	<>	<aphaerese>
12171	12169	<>	<elision3>
12171	12169	<>	<elision2>
12171	12169	<>	<elision1>
12171	12156	<L2kl>	<>
12172	11585	.	.
12172	11586	 	 
12172	11585	<~>	<~>
12172	11585	<split-s>	<split-s>
12172	11585	<split-h>	<split-h>
12172	11585	<name2>	<name2>
12172	12173	<>	<name>
12172	11589	<aphaerese>	<aphaerese>
12172	12172	<>	<aphaerese>
12172	12175	<elision3>	<elision3>
12172	12172	<>	<elision3>
12172	12175	<elision2>	<elision2>
12172	12172	<>	<elision2>
12172	12175	<elision1>	<elision1>
12172	12172	<>	<elision1>
12172	11593	.	υ
12172	11596	s	υ
12172	11593	.	u
12172	11596	s	u
12172	11593	.	κ
12172	12157	s	κ
12172	11952	s	k
12172	11961	s	U
12172	12124	s	K
12172	11593	.	α
12172	11596	s	α
12172	11593	.	a
12172	11596	s	a
12172	12082	s	A
12172	11593	.	λ
12172	12157	s	λ
12172	11952	s	l
12172	12137	s	L
12172	11944	<A3>	<>
12173	11588	.	.
12173	11591	 	 
12173	11588	<~>	<~>
12173	11588	<split-s>	<split-s>
12173	11588	<split-h>	<split-h>
12173	11588	<name2>	<name2>
12173	12123	<aphaerese>	<aphaerese>
12173	12174	<>	<aphaerese>
12173	12177	<elision3>	<elision3>
12173	12174	<>	<elision3>
12173	12177	<elision2>	<elision2>
12173	12174	<>	<elision2>
12173	12177	<elision1>	<elision1>
12173	12174	<>	<elision1>
12173	11595	.	υ
12173	11768	s	υ
12173	11595	.	u
12173	11768	s	u
12173	11595	.	κ
12173	12159	s	κ
12173	11954	s	k
12173	11963	s	U
12173	12126	s	K
12173	11595	.	α
12173	11768	s	α
12173	11595	.	a
12173	11768	s	a
12173	12084	s	A
12173	11595	.	λ
12173	12159	s	λ
12173	11954	s	l
12173	12139	s	L
12173	11945	<A3>	<>
12174	11585	.	.
12174	11586	 	 
12174	11585	<~>	<~>
12174	11585	<split-s>	<split-s>
12174	11585	<split-h>	<split-h>
12174	11585	<name2>	<name2>
12174	11589	<aphaerese>	<aphaerese>
12174	12172	<>	<aphaerese>
12174	12175	<elision3>	<elision3>
12174	12172	<>	<elision3>
12174	12175	<elision2>	<elision2>
12174	12172	<>	<elision2>
12174	12175	<elision1>	<elision1>
12174	12172	<>	<elision1>
12174	11593	.	υ
12174	11596	s	υ
12174	11593	.	u
12174	11596	s	u
12174	11593	.	κ
12174	12157	s	κ
12174	11952	s	k
12174	11961	s	U
12174	12124	s	K
12174	11593	.	α
12174	11596	s	α
12174	11593	.	a
12174	11596	s	a
12174	12082	s	A
12174	11593	.	λ
12174	12157	s	λ
12174	11952	s	l
12174	12137	s	L
12174	11943	<A3>	<>
12175	11585	.	.
12175	11586	 	 
12175	11585	<~>	<~>
12175	11585	<split-s>	<split-s>
12175	11585	<split-h>	<split-h>
12175	11585	<name2>	<name2>
12175	12176	<>	<name>
12175	11589	<aphaerese>	<aphaerese>
12175	12175	<>	<aphaerese>
12175	11585	<elision3>	<elision3>
12175	12175	<>	<elision3>
12175	11585	<elision2>	<elision2>
12175	12175	<>	<elision2>
12175	11585	<elision1>	<elision1>
12175	12175	<>	<elision1>
12175	11593	.	υ
12175	11596	s	υ
12175	11593	.	u
12175	11596	s	u
12175	11775	.	κ
12175	12178	s	κ
12175	12187	s	k
12175	11961	s	U
12175	12196	s	K
12175	11593	.	α
12175	11596	s	α
12175	11593	.	a
12175	11596	s	a
12175	12082	s	A
12175	12187	s	λ
12175	12187	s	l
12175	12212	s	L
12175	11847	<A3>	<>
12176	11588	.	.
12176	11591	 	 
12176	11588	<~>	<~>
12176	11588	<split-s>	<split-s>
12176	11588	<split-h>	<split-h>
12176	11588	<name2>	<name2>
12176	12123	<aphaerese>	<aphaerese>
12176	12177	<>	<aphaerese>
12176	11588	<elision3>	<elision3>
12176	12177	<>	<elision3>
12176	11588	<elision2>	<elision2>
12176	12177	<>	<elision2>
12176	11588	<elision1>	<elision1>
12176	12177	<>	<elision1>
12176	11595	.	υ
12176	11768	s	υ
12176	11595	.	u
12176	11768	s	u
12176	11777	.	κ
12176	12180	s	κ
12176	12189	s	k
12176	11963	s	U
12176	12198	s	K
12176	11595	.	α
12176	11768	s	α
12176	11595	.	a
12176	11768	s	a
12176	12084	s	A
12176	12189	s	λ
12176	12189	s	l
12176	12214	s	L
12176	11848	<A3>	<>
12177	11585	.	.
12177	11586	 	 
12177	11585	<~>	<~>
12177	11585	<split-s>	<split-s>
12177	11585	<split-h>	<split-h>
12177	11585	<name2>	<name2>
12177	11589	<aphaerese>	<aphaerese>
12177	12175	<>	<aphaerese>
12177	11585	<elision3>	<elision3>
12177	12175	<>	<elision3>
12177	11585	<elision2>	<elision2>
12177	12175	<>	<elision2>
12177	11585	<elision1>	<elision1>
12177	12175	<>	<elision1>
12177	11593	.	υ
12177	11596	s	υ
12177	11593	.	u
12177	11596	s	u
12177	11775	.	κ
12177	12178	s	κ
12177	12187	s	k
12177	11961	s	U
12177	12196	s	K
12177	11593	.	α
12177	11596	s	α
12177	11593	.	a
12177	11596	s	a
12177	12082	s	A
12177	12187	s	λ
12177	12187	s	l
12177	12212	s	L
12177	11846	<A3>	<>
12178	11597	.	.
12178	11597	 	 
12178	11597	<~>	<~>
12178	11597	<split-s>	<split-s>
12178	11597	<split-h>	<split-h>
12178	11597	<name2>	<name2>
12178	12179	<>	<name>
12178	11600	<aphaerese>	<aphaerese>
12178	12178	<>	<aphaerese>
12178	11843	<elision3>	<elision3>
12178	12178	<>	<elision3>
12178	11843	<elision2>	<elision2>
12178	12178	<>	<elision2>
12178	11843	<elision1>	<elision1>
12178	12178	<>	<elision1>
12178	11761	.	υ
12178	11761	.	u
12178	11761	.	κ
12178	11761	.	α
12178	11761	.	a
12178	11761	.	λ
12178	12182	<A4>	<>
12179	11599	.	.
12179	11599	 	 
12179	11599	<~>	<~>
12179	11599	<split-s>	<split-s>
12179	11599	<split-h>	<split-h>
12179	11599	<name2>	<name2>
12179	11602	<aphaerese>	<aphaerese>
12179	12180	<>	<aphaerese>
12179	11845	<elision3>	<elision3>
12179	12180	<>	<elision3>
12179	11845	<elision2>	<elision2>
12179	12180	<>	<elision2>
12179	11845	<elision1>	<elision1>
12179	12180	<>	<elision1>
12179	11763	.	υ
12179	11763	.	u
12179	11763	.	κ
12179	11763	.	α
12179	11763	.	a
12179	11763	.	λ
12179	12183	<A4>	<>
12180	11597	.	.
12180	11597	 	 
12180	11597	<~>	<~>
12180	11597	<split-s>	<split-s>
12180	11597	<split-h>	<split-h>
12180	11597	<name2>	<name2>
12180	11600	<aphaerese>	<aphaerese>
12180	12178	<>	<aphaerese>
12180	11843	<elision3>	<elision3>
12180	12178	<>	<elision3>
12180	11843	<elision2>	<elision2>
12180	12178	<>	<elision2>
12180	11843	<elision1>	<elision1>
12180	12178	<>	<elision1>
12180	11761	.	υ
12180	11761	.	u
12180	11761	.	κ
12180	11761	.	α
12180	11761	.	a
12180	11761	.	λ
12180	12181	<A4>	<>
12181	35	.	.
12181	36	 	 
12181	35	<~>	<~>
12181	35	<split-s>	<split-s>
12181	35	<split-h>	<split-h>
12181	35	<name2>	<name2>
12181	39	<aphaerese>	<aphaerese>
12181	12182	<>	<aphaerese>
12181	11947	<elision3>	<elision3>
12181	12182	<>	<elision3>
12181	11947	<elision2>	<elision2>
12181	12182	<>	<elision2>
12181	11947	<elision1>	<elision1>
12181	12182	<>	<elision1>
12181	11392	.	υ
12181	11436	H	υ
12181	11392	.	u
12181	11438	H	u
12181	11392	.	κ
12181	11359	H	U
12181	11392	.	α
12181	11422	H	α
12181	11392	.	a
12181	11427	H	a
12181	11189	H	A
12181	11392	.	λ
12181	12185	<K>	<>
12182	35	.	.
12182	36	 	 
12182	35	<~>	<~>
12182	35	<split-s>	<split-s>
12182	35	<split-h>	<split-h>
12182	35	<name2>	<name2>
12182	12183	<>	<name>
12182	39	<aphaerese>	<aphaerese>
12182	12182	<>	<aphaerese>
12182	11947	<elision3>	<elision3>
12182	12182	<>	<elision3>
12182	11947	<elision2>	<elision2>
12182	12182	<>	<elision2>
12182	11947	<elision1>	<elision1>
12182	12182	<>	<elision1>
12182	11392	.	υ
12182	11436	H	υ
12182	11392	.	u
12182	11438	H	u
12182	11392	.	κ
12182	11359	H	U
12182	11392	.	α
12182	11422	H	α
12182	11392	.	a
12182	11427	H	a
12182	11189	H	A
12182	11392	.	λ
12182	12186	<K>	<>
12183	34	.	.
12183	38	 	 
12183	34	<~>	<~>
12183	34	<split-s>	<split-s>
12183	34	<split-h>	<split-h>
12183	34	<name2>	<name2>
12183	41	<aphaerese>	<aphaerese>
12183	12181	<>	<aphaerese>
12183	11946	<elision3>	<elision3>
12183	12181	<>	<elision3>
12183	11946	<elision2>	<elision2>
12183	12181	<>	<elision2>
12183	11946	<elision1>	<elision1>
12183	12181	<>	<elision1>
12183	11394	.	υ
12183	11431	H	υ
12183	11394	.	u
12183	11435	H	u
12183	11394	.	κ
12183	11361	H	U
12183	11394	.	α
12183	11421	H	α
12183	11394	.	a
12183	11426	H	a
12183	11192	H	A
12183	11394	.	λ
12183	12184	<K>	<>
12184	11444	.	.
12184	11444	<~>	<~>
12184	11444	<split-s>	<split-s>
12184	11444	<split-h>	<split-h>
12184	11444	<name2>	<name2>
12184	11447	<aphaerese>	<aphaerese>
12184	12185	<>	<aphaerese>
12184	11895	<elision3>	<elision3>
12184	12185	<>	<elision3>
12184	11895	<elision2>	<elision2>
12184	12185	<>	<elision2>
12184	11895	<elision1>	<elision1>
12184	12185	<>	<elision1>
12184	11440	.	υ
12184	11568	H	υ
12184	11440	.	u
12184	11577	H	u
12184	11440	.	κ
12184	11546	H	U
12184	11440	.	α
12184	11580	H	α
12184	11440	.	a
12184	11583	H	a
12184	11520	H	A
12184	11440	.	λ
12185	11442	.	.
12185	11442	<~>	<~>
12185	11442	<split-s>	<split-s>
12185	11442	<split-h>	<split-h>
12185	11442	<name2>	<name2>
12185	11445	<aphaerese>	<aphaerese>
12185	12186	<>	<aphaerese>
12185	11896	<elision3>	<elision3>
12185	12186	<>	<elision3>
12185	11896	<elision2>	<elision2>
12185	12186	<>	<elision2>
12185	11896	<elision1>	<elision1>
12185	12186	<>	<elision1>
12185	11441	.	υ
12185	11566	H	υ
12185	11441	.	u
12185	11575	H	u
12185	11441	.	κ
12185	11544	H	U
12185	11441	.	α
12185	11578	H	α
12185	11441	.	a
12185	11581	H	a
12185	11518	H	A
12185	11441	.	λ
12186	11442	.	.
12186	11442	<~>	<~>
12186	11442	<split-s>	<split-s>
12186	11442	<split-h>	<split-h>
12186	11442	<name2>	<name2>
12186	12184	<>	<name>
12186	11445	<aphaerese>	<aphaerese>
12186	12186	<>	<aphaerese>
12186	11896	<elision3>	<elision3>
12186	12186	<>	<elision3>
12186	11896	<elision2>	<elision2>
12186	12186	<>	<elision2>
12186	11896	<elision1>	<elision1>
12186	12186	<>	<elision1>
12186	11441	.	υ
12186	11566	H	υ
12186	11441	.	u
12186	11575	H	u
12186	11441	.	κ
12186	11544	H	U
12186	11441	.	α
12186	11578	H	α
12186	11441	.	a
12186	11581	H	a
12186	11518	H	A
12186	11441	.	λ
12187	11597	.	.
12187	11597	 	 
12187	11597	<~>	<~>
12187	11597	<split-s>	<split-s>
12187	11597	<split-h>	<split-h>
12187	11597	<name2>	<name2>
12187	12188	<>	<name>
12187	11600	<aphaerese>	<aphaerese>
12187	12187	<>	<aphaerese>
12187	11597	<elision3>	<elision3>
12187	12187	<>	<elision3>
12187	11597	<elision2>	<elision2>
12187	12187	<>	<elision2>
12187	11597	<elision1>	<elision1>
12187	12187	<>	<elision1>
12187	11761	.	υ
12187	11761	.	u
12187	11761	.	κ
12187	11761	.	α
12187	11761	.	a
12187	11761	.	λ
12187	12191	<A4>	<>
12188	11599	.	.
12188	11599	 	 
12188	11599	<~>	<~>
12188	11599	<split-s>	<split-s>
12188	11599	<split-h>	<split-h>
12188	11599	<name2>	<name2>
12188	11602	<aphaerese>	<aphaerese>
12188	12189	<>	<aphaerese>
12188	11599	<elision3>	<elision3>
12188	12189	<>	<elision3>
12188	11599	<elision2>	<elision2>
12188	12189	<>	<elision2>
12188	11599	<elision1>	<elision1>
12188	12189	<>	<elision1>
12188	11763	.	υ
12188	11763	.	u
12188	11763	.	κ
12188	11763	.	α
12188	11763	.	a
12188	11763	.	λ
12188	12192	<A4>	<>
12189	11597	.	.
12189	11597	 	 
12189	11597	<~>	<~>
12189	11597	<split-s>	<split-s>
12189	11597	<split-h>	<split-h>
12189	11597	<name2>	<name2>
12189	11600	<aphaerese>	<aphaerese>
12189	12187	<>	<aphaerese>
12189	11597	<elision3>	<elision3>
12189	12187	<>	<elision3>
12189	11597	<elision2>	<elision2>
12189	12187	<>	<elision2>
12189	11597	<elision1>	<elision1>
12189	12187	<>	<elision1>
12189	11761	.	υ
12189	11761	.	u
12189	11761	.	κ
12189	11761	.	α
12189	11761	.	a
12189	11761	.	λ
12189	12190	<A4>	<>
12190	35	.	.
12190	36	 	 
12190	35	<~>	<~>
12190	35	<split-s>	<split-s>
12190	35	<split-h>	<split-h>
12190	35	<name2>	<name2>
12190	39	<aphaerese>	<aphaerese>
12190	12191	<>	<aphaerese>
12190	35	<elision3>	<elision3>
12190	12191	<>	<elision3>
12190	35	<elision2>	<elision2>
12190	12191	<>	<elision2>
12190	35	<elision1>	<elision1>
12190	12191	<>	<elision1>
12190	11392	.	υ
12190	11436	H	υ
12190	11392	.	u
12190	11438	H	u
12190	11392	.	κ
12190	11359	H	U
12190	11392	.	α
12190	11422	H	α
12190	11392	.	a
12190	11427	H	a
12190	11189	H	A
12190	11392	.	λ
12190	12194	<K>	<>
12191	35	.	.
12191	36	 	 
12191	35	<~>	<~>
12191	35	<split-s>	<split-s>
12191	35	<split-h>	<split-h>
12191	35	<name2>	<name2>
12191	12192	<>	<name>
12191	39	<aphaerese>	<aphaerese>
12191	12191	<>	<aphaerese>
12191	35	<elision3>	<elision3>
12191	12191	<>	<elision3>
12191	35	<elision2>	<elision2>
12191	12191	<>	<elision2>
12191	35	<elision1>	<elision1>
12191	12191	<>	<elision1>
12191	11392	.	υ
12191	11436	H	υ
12191	11392	.	u
12191	11438	H	u
12191	11392	.	κ
12191	11359	H	U
12191	11392	.	α
12191	11422	H	α
12191	11392	.	a
12191	11427	H	a
12191	11189	H	A
12191	11392	.	λ
12191	12195	<K>	<>
12192	34	.	.
12192	38	 	 
12192	34	<~>	<~>
12192	34	<split-s>	<split-s>
12192	34	<split-h>	<split-h>
12192	34	<name2>	<name2>
12192	41	<aphaerese>	<aphaerese>
12192	12190	<>	<aphaerese>
12192	34	<elision3>	<elision3>
12192	12190	<>	<elision3>
12192	34	<elision2>	<elision2>
12192	12190	<>	<elision2>
12192	34	<elision1>	<elision1>
12192	12190	<>	<elision1>
12192	11394	.	υ
12192	11431	H	υ
12192	11394	.	u
12192	11435	H	u
12192	11394	.	κ
12192	11361	H	U
12192	11394	.	α
12192	11421	H	α
12192	11394	.	a
12192	11426	H	a
12192	11192	H	A
12192	11394	.	λ
12192	12193	<K>	<>
12193	11444	.	.
12193	11444	<~>	<~>
12193	11444	<split-s>	<split-s>
12193	11444	<split-h>	<split-h>
12193	11444	<name2>	<name2>
12193	11447	<aphaerese>	<aphaerese>
12193	12194	<>	<aphaerese>
12193	11444	<elision3>	<elision3>
12193	12194	<>	<elision3>
12193	11444	<elision2>	<elision2>
12193	12194	<>	<elision2>
12193	11444	<elision1>	<elision1>
12193	12194	<>	<elision1>
12193	11440	.	υ
12193	11568	H	υ
12193	11440	.	u
12193	11577	H	u
12193	11440	.	κ
12193	11546	H	U
12193	11440	.	α
12193	11580	H	α
12193	11440	.	a
12193	11583	H	a
12193	11520	H	A
12193	11440	.	λ
12194	11442	.	.
12194	11442	<~>	<~>
12194	11442	<split-s>	<split-s>
12194	11442	<split-h>	<split-h>
12194	11442	<name2>	<name2>
12194	11445	<aphaerese>	<aphaerese>
12194	12195	<>	<aphaerese>
12194	11442	<elision3>	<elision3>
12194	12195	<>	<elision3>
12194	11442	<elision2>	<elision2>
12194	12195	<>	<elision2>
12194	11442	<elision1>	<elision1>
12194	12195	<>	<elision1>
12194	11441	.	υ
12194	11566	H	υ
12194	11441	.	u
12194	11575	H	u
12194	11441	.	κ
12194	11544	H	U
12194	11441	.	α
12194	11578	H	α
12194	11441	.	a
12194	11581	H	a
12194	11518	H	A
12194	11441	.	λ
12195	11442	.	.
12195	11442	<~>	<~>
12195	11442	<split-s>	<split-s>
12195	11442	<split-h>	<split-h>
12195	11442	<name2>	<name2>
12195	12193	<>	<name>
12195	11445	<aphaerese>	<aphaerese>
12195	12195	<>	<aphaerese>
12195	11442	<elision3>	<elision3>
12195	12195	<>	<elision3>
12195	11442	<elision2>	<elision2>
12195	12195	<>	<elision2>
12195	11442	<elision1>	<elision1>
12195	12195	<>	<elision1>
12195	11441	.	υ
12195	11566	H	υ
12195	11441	.	u
12195	11575	H	u
12195	11441	.	κ
12195	11544	H	U
12195	11441	.	α
12195	11578	H	α
12195	11441	.	a
12195	11581	H	a
12195	11518	H	A
12195	11441	.	λ
12196	11965	<name>	<name>
12196	12197	<>	<name>
12196	12199	<>	<aphaerese>
12196	12199	<>	<elision3>
12196	12199	<>	<elision2>
12196	12199	<>	<elision1>
12196	12076	<A4>	<>
12196	12128	<L2kl>	<>
12196	12209	<K2kl>	<>
12197	12198	<>	<aphaerese>
12197	12198	<>	<elision3>
12197	12198	<>	<elision2>
12197	12198	<>	<elision1>
12197	12129	<L2kl>	<>
12197	12201	<K2kl>	<>
12198	12199	<>	<aphaerese>
12198	12199	<>	<elision3>
12198	12199	<>	<elision2>
12198	12199	<>	<elision1>
12198	12130	<L2kl>	<>
12198	12202	<K2kl>	<>
12199	12197	<>	<name>
12199	12199	<>	<aphaerese>
12199	12199	<>	<elision3>
12199	12199	<>	<elision2>
12199	12199	<>	<elision1>
12199	12128	<L2kl>	<>
12199	12200	<K2kl>	<>
12200	11597	.	.
12200	11597	 	 
12200	11597	<~>	<~>
12200	11597	<split-s>	<split-s>
12200	11597	<split-h>	<split-h>
12200	11597	<name2>	<name2>
12200	12201	<>	<name>
12200	11600	<aphaerese>	<aphaerese>
12200	12200	<>	<aphaerese>
12200	11597	<elision3>	<elision3>
12200	12200	<>	<elision3>
12200	11597	<elision2>	<elision2>
12200	12200	<>	<elision2>
12200	11597	<elision1>	<elision1>
12200	12200	<>	<elision1>
12200	11761	.	υ
12200	11761	.	u
12200	11761	.	α
12200	11761	.	a
12200	12204	<A4>	<>
12201	11599	.	.
12201	11599	 	 
12201	11599	<~>	<~>
12201	11599	<split-s>	<split-s>
12201	11599	<split-h>	<split-h>
12201	11599	<name2>	<name2>
12201	11602	<aphaerese>	<aphaerese>
12201	12202	<>	<aphaerese>
12201	11599	<elision3>	<elision3>
12201	12202	<>	<elision3>
12201	11599	<elision2>	<elision2>
12201	12202	<>	<elision2>
12201	11599	<elision1>	<elision1>
12201	12202	<>	<elision1>
12201	11763	.	υ
12201	11763	.	u
12201	11763	.	α
12201	11763	.	a
12201	12205	<A4>	<>
12202	11597	.	.
12202	11597	 	 
12202	11597	<~>	<~>
12202	11597	<split-s>	<split-s>
12202	11597	<split-h>	<split-h>
12202	11597	<name2>	<name2>
12202	11600	<aphaerese>	<aphaerese>
12202	12200	<>	<aphaerese>
12202	11597	<elision3>	<elision3>
12202	12200	<>	<elision3>
12202	11597	<elision2>	<elision2>
12202	12200	<>	<elision2>
12202	11597	<elision1>	<elision1>
12202	12200	<>	<elision1>
12202	11761	.	υ
12202	11761	.	u
12202	11761	.	α
12202	11761	.	a
12202	12203	<A4>	<>
12203	35	.	.
12203	36	 	 
12203	35	<~>	<~>
12203	35	<split-s>	<split-s>
12203	35	<split-h>	<split-h>
12203	35	<name2>	<name2>
12203	39	<aphaerese>	<aphaerese>
12203	12204	<>	<aphaerese>
12203	35	<elision3>	<elision3>
12203	12204	<>	<elision3>
12203	35	<elision2>	<elision2>
12203	12204	<>	<elision2>
12203	35	<elision1>	<elision1>
12203	12204	<>	<elision1>
12203	11392	.	υ
12203	11436	H	υ
12203	11392	.	u
12203	11438	H	u
12203	11359	H	U
12203	11392	.	α
12203	11422	H	α
12203	11392	.	a
12203	11427	H	a
12203	11189	H	A
12203	12207	<K>	<>
12204	35	.	.
12204	36	 	 
12204	35	<~>	<~>
12204	35	<split-s>	<split-s>
12204	35	<split-h>	<split-h>
12204	35	<name2>	<name2>
12204	12205	<>	<name>
12204	39	<aphaerese>	<aphaerese>
12204	12204	<>	<aphaerese>
12204	35	<elision3>	<elision3>
12204	12204	<>	<elision3>
12204	35	<elision2>	<elision2>
12204	12204	<>	<elision2>
12204	35	<elision1>	<elision1>
12204	12204	<>	<elision1>
12204	11392	.	υ
12204	11436	H	υ
12204	11392	.	u
12204	11438	H	u
12204	11359	H	U
12204	11392	.	α
12204	11422	H	α
12204	11392	.	a
12204	11427	H	a
12204	11189	H	A
12204	12208	<K>	<>
12205	34	.	.
12205	38	 	 
12205	34	<~>	<~>
12205	34	<split-s>	<split-s>
12205	34	<split-h>	<split-h>
12205	34	<name2>	<name2>
12205	41	<aphaerese>	<aphaerese>
12205	12203	<>	<aphaerese>
12205	34	<elision3>	<elision3>
12205	12203	<>	<elision3>
12205	34	<elision2>	<elision2>
12205	12203	<>	<elision2>
12205	34	<elision1>	<elision1>
12205	12203	<>	<elision1>
12205	11394	.	υ
12205	11431	H	υ
12205	11394	.	u
12205	11435	H	u
12205	11361	H	U
12205	11394	.	α
12205	11421	H	α
12205	11394	.	a
12205	11426	H	a
12205	11192	H	A
12205	12206	<K>	<>
12206	11444	.	.
12206	11444	<~>	<~>
12206	11444	<split-s>	<split-s>
12206	11444	<split-h>	<split-h>
12206	11444	<name2>	<name2>
12206	11447	<aphaerese>	<aphaerese>
12206	12207	<>	<aphaerese>
12206	11444	<elision3>	<elision3>
12206	12207	<>	<elision3>
12206	11444	<elision2>	<elision2>
12206	12207	<>	<elision2>
12206	11444	<elision1>	<elision1>
12206	12207	<>	<elision1>
12206	11440	.	υ
12206	11568	H	υ
12206	11440	.	u
12206	11577	H	u
12206	11546	H	U
12206	11440	.	α
12206	11580	H	α
12206	11440	.	a
12206	11583	H	a
12206	11520	H	A
12207	11442	.	.
12207	11442	<~>	<~>
12207	11442	<split-s>	<split-s>
12207	11442	<split-h>	<split-h>
12207	11442	<name2>	<name2>
12207	11445	<aphaerese>	<aphaerese>
12207	12208	<>	<aphaerese>
12207	11442	<elision3>	<elision3>
12207	12208	<>	<elision3>
12207	11442	<elision2>	<elision2>
12207	12208	<>	<elision2>
12207	11442	<elision1>	<elision1>
12207	12208	<>	<elision1>
12207	11441	.	υ
12207	11566	H	υ
12207	11441	.	u
12207	11575	H	u
12207	11544	H	U
12207	11441	.	α
12207	11578	H	α
12207	11441	.	a
12207	11581	H	a
12207	11518	H	A
12208	11442	.	.
12208	11442	<~>	<~>
12208	11442	<split-s>	<split-s>
12208	11442	<split-h>	<split-h>
12208	11442	<name2>	<name2>
12208	12206	<>	<name>
12208	11445	<aphaerese>	<aphaerese>
12208	12208	<>	<aphaerese>
12208	11442	<elision3>	<elision3>
12208	12208	<>	<elision3>
12208	11442	<elision2>	<elision2>
12208	12208	<>	<elision2>
12208	11442	<elision1>	<elision1>
12208	12208	<>	<elision1>
12208	11441	.	υ
12208	11566	H	υ
12208	11441	.	u
12208	11575	H	u
12208	11544	H	U
12208	11441	.	α
12208	11578	H	α
12208	11441	.	a
12208	11581	H	a
12208	11518	H	A
12209	11597	.	.
12209	11597	 	 
12209	11597	<~>	<~>
12209	11597	<split-s>	<split-s>
12209	11597	<split-h>	<split-h>
12209	11597	<name2>	<name2>
12209	11965	<name2>	<name>
12209	12201	<>	<name>
12209	11600	<aphaerese>	<aphaerese>
12209	12200	<>	<aphaerese>
12209	11597	<elision3>	<elision3>
12209	12200	<>	<elision3>
12209	11597	<elision2>	<elision2>
12209	12200	<>	<elision2>
12209	11597	<elision1>	<elision1>
12209	12200	<>	<elision1>
12209	11761	.	υ
12209	11761	.	u
12209	11761	.	α
12209	11761	.	a
12209	12210	<A4>	<>
12210	35	.	.
12210	36	 	 
12210	35	<~>	<~>
12210	35	<split-s>	<split-s>
12210	35	<split-h>	<split-h>
12210	35	<name2>	<name2>
12210	12077	<name2>	<name>
12210	12205	<>	<name>
12210	39	<aphaerese>	<aphaerese>
12210	12204	<>	<aphaerese>
12210	35	<elision3>	<elision3>
12210	12204	<>	<elision3>
12210	35	<elision2>	<elision2>
12210	12204	<>	<elision2>
12210	35	<elision1>	<elision1>
12210	12204	<>	<elision1>
12210	11392	.	υ
12210	11436	H	υ
12210	11392	.	u
12210	11438	H	u
12210	11359	H	U
12210	11392	.	α
12210	11422	H	α
12210	11392	.	a
12210	11427	H	a
12210	11189	H	A
12210	12211	<K>	<>
12211	11442	.	.
12211	11442	<~>	<~>
12211	11442	<split-s>	<split-s>
12211	11442	<split-h>	<split-h>
12211	11442	<name2>	<name2>
12211	11967	<name2>	<name>
12211	12206	<>	<name>
12211	11445	<aphaerese>	<aphaerese>
12211	12208	<>	<aphaerese>
12211	11442	<elision3>	<elision3>
12211	12208	<>	<elision3>
12211	11442	<elision2>	<elision2>
12211	12208	<>	<elision2>
12211	11442	<elision1>	<elision1>
12211	12208	<>	<elision1>
12211	11441	.	υ
12211	11566	H	υ
12211	11441	.	u
12211	11575	H	u
12211	11544	H	U
12211	11441	.	α
12211	11578	H	α
12211	11441	.	a
12211	11581	H	a
12211	11518	H	A
12212	11965	<name>	<name>
12212	12213	<>	<name>
12212	12215	<>	<aphaerese>
12212	12215	<>	<elision3>
12212	12215	<>	<elision2>
12212	12215	<>	<elision1>
12212	12076	<A4>	<>
12212	12216	<L2kl>	<>
12213	12214	<>	<aphaerese>
12213	12214	<>	<elision3>
12213	12214	<>	<elision2>
12213	12214	<>	<elision1>
12213	12188	<L2kl>	<>
12214	12215	<>	<aphaerese>
12214	12215	<>	<elision3>
12214	12215	<>	<elision2>
12214	12215	<>	<elision1>
12214	12189	<L2kl>	<>
12215	12213	<>	<name>
12215	12215	<>	<aphaerese>
12215	12215	<>	<elision3>
12215	12215	<>	<elision2>
12215	12215	<>	<elision1>
12215	12187	<L2kl>	<>
12216	11597	.	.
12216	11597	 	 
12216	11597	<~>	<~>
12216	11597	<split-s>	<split-s>
12216	11597	<split-h>	<split-h>
12216	11597	<name2>	<name2>
12216	11965	<name2>	<name>
12216	12188	<>	<name>
12216	11600	<aphaerese>	<aphaerese>
12216	12187	<>	<aphaerese>
12216	11597	<elision3>	<elision3>
12216	12187	<>	<elision3>
12216	11597	<elision2>	<elision2>
12216	12187	<>	<elision2>
12216	11597	<elision1>	<elision1>
12216	12187	<>	<elision1>
12216	11761	.	υ
12216	11761	.	u
12216	11761	.	κ
12216	11761	.	α
12216	11761	.	a
12216	11761	.	λ
12216	12217	<A4>	<>
12217	35	.	.
12217	36	 	 
12217	35	<~>	<~>
12217	35	<split-s>	<split-s>
12217	35	<split-h>	<split-h>
12217	35	<name2>	<name2>
12217	12077	<name2>	<name>
12217	12192	<>	<name>
12217	39	<aphaerese>	<aphaerese>
12217	12191	<>	<aphaerese>
12217	35	<elision3>	<elision3>
12217	12191	<>	<elision3>
12217	35	<elision2>	<elision2>
12217	12191	<>	<elision2>
12217	35	<elision1>	<elision1>
12217	12191	<>	<elision1>
12217	11392	.	υ
12217	11436	H	υ
12217	11392	.	u
12217	11438	H	u
12217	11392	.	κ
12217	11359	H	U
12217	11392	.	α
12217	11422	H	α
12217	11392	.	a
12217	11427	H	a
12217	11189	H	A
12217	11392	.	λ
12217	12218	<K>	<>
12218	11442	.	.
12218	11442	<~>	<~>
12218	11442	<split-s>	<split-s>
12218	11442	<split-h>	<split-h>
12218	11442	<name2>	<name2>
12218	11967	<name2>	<name>
12218	12193	<>	<name>
12218	11445	<aphaerese>	<aphaerese>
12218	12195	<>	<aphaerese>
12218	11442	<elision3>	<elision3>
12218	12195	<>	<elision3>
12218	11442	<elision2>	<elision2>
12218	12195	<>	<elision2>
12218	11442	<elision1>	<elision1>
12218	12195	<>	<elision1>
12218	11441	.	υ
12218	11566	H	υ
12218	11441	.	u
12218	11575	H	u
12218	11441	.	κ
12218	11544	H	U
12218	11441	.	α
12218	11578	H	α
12218	11441	.	a
12218	11581	H	a
12218	11518	H	A
12218	11441	.	λ
12219	11585	.	.
12219	11586	 	 
12219	11585	<~>	<~>
12219	11585	<split-s>	<split-s>
12219	11585	<split-h>	<split-h>
12219	11585	<name2>	<name2>
12219	12220	<>	<name>
12219	11589	<aphaerese>	<aphaerese>
12219	12219	<>	<aphaerese>
12219	11585	<elision3>	<elision3>
12219	12219	<>	<elision3>
12219	11585	<elision2>	<elision2>
12219	12219	<>	<elision2>
12219	11585	<elision1>	<elision1>
12219	12219	<>	<elision1>
12219	11593	.	υ
12219	11596	s	υ
12219	11593	.	u
12219	11596	s	u
12219	11593	.	κ
12219	12157	s	κ
12219	11952	s	k
12219	11961	s	U
12219	12124	s	K
12219	11593	.	α
12219	11596	s	α
12219	11593	.	a
12219	11596	s	a
12219	12082	s	A
12219	11593	.	λ
12219	12157	s	λ
12219	11952	s	l
12219	12137	s	L
12219	11956	<A3>	<>
12220	11588	.	.
12220	11591	 	 
12220	11588	<~>	<~>
12220	11588	<split-s>	<split-s>
12220	11588	<split-h>	<split-h>
12220	11588	<name2>	<name2>
12220	12123	<aphaerese>	<aphaerese>
12220	12221	<>	<aphaerese>
12220	11588	<elision3>	<elision3>
12220	12221	<>	<elision3>
12220	11588	<elision2>	<elision2>
12220	12221	<>	<elision2>
12220	11588	<elision1>	<elision1>
12220	12221	<>	<elision1>
12220	11595	.	υ
12220	11768	s	υ
12220	11595	.	u
12220	11768	s	u
12220	11595	.	κ
12220	12159	s	κ
12220	11954	s	k
12220	11963	s	U
12220	12126	s	K
12220	11595	.	α
12220	11768	s	α
12220	11595	.	a
12220	11768	s	a
12220	12084	s	A
12220	11595	.	λ
12220	12159	s	λ
12220	11954	s	l
12220	12139	s	L
12220	11957	<A3>	<>
12221	11585	.	.
12221	11586	 	 
12221	11585	<~>	<~>
12221	11585	<split-s>	<split-s>
12221	11585	<split-h>	<split-h>
12221	11585	<name2>	<name2>
12221	11589	<aphaerese>	<aphaerese>
12221	12219	<>	<aphaerese>
12221	11585	<elision3>	<elision3>
12221	12219	<>	<elision3>
12221	11585	<elision2>	<elision2>
12221	12219	<>	<elision2>
12221	11585	<elision1>	<elision1>
12221	12219	<>	<elision1>
12221	11593	.	υ
12221	11596	s	υ
12221	11593	.	u
12221	11596	s	u
12221	11593	.	κ
12221	12157	s	κ
12221	11952	s	k
12221	11961	s	U
12221	12124	s	K
12221	11593	.	α
12221	11596	s	α
12221	11593	.	a
12221	11596	s	a
12221	12082	s	A
12221	11593	.	λ
12221	12157	s	λ
12221	11952	s	l
12221	12137	s	L
12221	11955	<A3>	<>
12222	12223	<>	<name>
12222	12222	<>	<aphaerese>
12222	12222	<>	<elision3>
12222	12222	<>	<elision2>
12222	12222	<>	<elision1>
12222	11585	<U2kl>	<>
12223	12224	<>	<aphaerese>
12223	12224	<>	<elision3>
12223	12224	<>	<elision2>
12223	12224	<>	<elision1>
12223	12145	<U2kl>	<>
12224	12222	<>	<aphaerese>
12224	12222	<>	<elision3>
12224	12222	<>	<elision2>
12224	12222	<>	<elision1>
12224	11588	<U2kl>	<>
12225	12226	<name>	<name>
12225	12227	<>	<name>
12225	12229	<>	<aphaerese>
12225	12229	<>	<elision3>
12225	12229	<>	<elision2>
12225	12229	<>	<elision1>
12225	12076	<A3>	<>
12225	12230	<A2kl>	<>
12225	12242	<L2kl>	<>
12225	12254	<K2kl>	<>
12226	12126	s	k
12226	12139	s	l
12226	11966	<A3>	<>
12227	12228	<>	<aphaerese>
12227	12228	<>	<elision3>
12227	12228	<>	<elision2>
12227	12228	<>	<elision1>
12227	12231	<A2kl>	<>
12227	12243	<L2kl>	<>
12227	12252	<K2kl>	<>
12228	12229	<>	<aphaerese>
12228	12229	<>	<elision3>
12228	12229	<>	<elision2>
12228	12229	<>	<elision1>
12228	12232	<A2kl>	<>
12228	12244	<L2kl>	<>
12228	12253	<K2kl>	<>
12229	12227	<>	<name>
12229	12229	<>	<aphaerese>
12229	12229	<>	<elision3>
12229	12229	<>	<elision2>
12229	12229	<>	<elision1>
12229	12230	<A2kl>	<>
12229	12242	<L2kl>	<>
12229	12251	<K2kl>	<>
12230	12231	<>	<name>
12230	12230	<>	<aphaerese>
12230	12230	<>	<elision3>
12230	12230	<>	<elision2>
12230	12230	<>	<elision1>
12230	12233	.	κ
12230	12233	.	λ
12230	12026	<A3>	<>
12231	12232	<>	<aphaerese>
12231	12232	<>	<elision3>
12231	12232	<>	<elision2>
12231	12232	<>	<elision1>
12231	12235	.	κ
12231	12235	.	λ
12231	12027	<A3>	<>
12232	12230	<>	<aphaerese>
12232	12230	<>	<elision3>
12232	12230	<>	<elision2>
12232	12230	<>	<elision1>
12232	12233	.	κ
12232	12233	.	λ
12232	12025	<A3>	<>
12233	12234	<>	<name>
12233	12233	<>	<aphaerese>
12233	12236	<elision3>	<elision3>
12233	12233	<>	<elision3>
12233	12236	<elision2>	<elision2>
12233	12233	<>	<elision2>
12233	12236	<elision1>	<elision1>
12233	12233	<>	<elision1>
12233	12017	<A3>	<>
12234	12235	<>	<aphaerese>
12234	12238	<elision3>	<elision3>
12234	12235	<>	<elision3>
12234	12238	<elision2>	<elision2>
12234	12235	<>	<elision2>
12234	12238	<elision1>	<elision1>
12234	12235	<>	<elision1>
12234	12018	<A3>	<>
12235	12233	<>	<aphaerese>
12235	12236	<elision3>	<elision3>
12235	12233	<>	<elision3>
12235	12236	<elision2>	<elision2>
12235	12233	<>	<elision2>
12235	12236	<elision1>	<elision1>
12235	12233	<>	<elision1>
12235	12016	<A3>	<>
12236	11585	.	.
12236	11586	 	 
12236	11585	<~>	<~>
12236	11585	<split-s>	<split-s>
12236	11585	<split-h>	<split-h>
12236	11585	<name2>	<name2>
12236	12237	<>	<name>
12236	11589	<aphaerese>	<aphaerese>
12236	12236	<>	<aphaerese>
12236	11585	<elision3>	<elision3>
12236	12236	<>	<elision3>
12236	11585	<elision2>	<elision2>
12236	12236	<>	<elision2>
12236	11585	<elision1>	<elision1>
12236	12236	<>	<elision1>
12236	11593	.	υ
12236	11596	s	υ
12236	11593	.	u
12236	11596	s	u
12236	12034	s	κ
12236	12034	s	k
12236	11961	s	U
12236	12239	s	K
12236	11593	.	α
12236	11596	s	α
12236	11593	.	a
12236	11596	s	a
12236	12082	s	A
12236	12034	s	λ
12236	12034	s	l
12236	12239	s	L
12236	11981	<A3>	<>
12237	11588	.	.
12237	11591	 	 
12237	11588	<~>	<~>
12237	11588	<split-s>	<split-s>
12237	11588	<split-h>	<split-h>
12237	11588	<name2>	<name2>
12237	12123	<aphaerese>	<aphaerese>
12237	12238	<>	<aphaerese>
12237	11588	<elision3>	<elision3>
12237	12238	<>	<elision3>
12237	11588	<elision2>	<elision2>
12237	12238	<>	<elision2>
12237	11588	<elision1>	<elision1>
12237	12238	<>	<elision1>
12237	11595	.	υ
12237	11768	s	υ
12237	11595	.	u
12237	11768	s	u
12237	12036	s	κ
12237	12036	s	k
12237	11963	s	U
12237	12241	s	K
12237	11595	.	α
12237	11768	s	α
12237	11595	.	a
12237	11768	s	a
12237	12084	s	A
12237	12036	s	λ
12237	12036	s	l
12237	12241	s	L
12237	11982	<A3>	<>
12238	11585	.	.
12238	11586	 	 
12238	11585	<~>	<~>
12238	11585	<split-s>	<split-s>
12238	11585	<split-h>	<split-h>
12238	11585	<name2>	<name2>
12238	11589	<aphaerese>	<aphaerese>
12238	12236	<>	<aphaerese>
12238	11585	<elision3>	<elision3>
12238	12236	<>	<elision3>
12238	11585	<elision2>	<elision2>
12238	12236	<>	<elision2>
12238	11585	<elision1>	<elision1>
12238	12236	<>	<elision1>
12238	11593	.	υ
12238	11596	s	υ
12238	11593	.	u
12238	11596	s	u
12238	12034	s	κ
12238	12034	s	k
12238	11961	s	U
12238	12239	s	K
12238	11593	.	α
12238	11596	s	α
12238	11593	.	a
12238	11596	s	a
12238	12082	s	A
12238	12034	s	λ
12238	12034	s	l
12238	12239	s	L
12238	11980	<A3>	<>
12239	12240	<>	<name>
12239	12239	<>	<aphaerese>
12239	12239	<>	<elision3>
12239	12239	<>	<elision2>
12239	12239	<>	<elision1>
12239	12034	<L2kl>	<>
12240	12241	<>	<aphaerese>
12240	12241	<>	<elision3>
12240	12241	<>	<elision2>
12240	12241	<>	<elision1>
12240	12035	<L2kl>	<>
12241	12239	<>	<aphaerese>
12241	12239	<>	<elision3>
12241	12239	<>	<elision2>
12241	12239	<>	<elision1>
12241	12036	<L2kl>	<>
12242	12243	<>	<name>
12242	12242	<>	<aphaerese>
12242	12242	<>	<elision3>
12242	12242	<>	<elision2>
12242	12242	<>	<elision1>
12242	12245	.	κ
12242	12245	.	λ
12242	12059	<A3>	<>
12243	12244	<>	<aphaerese>
12243	12244	<>	<elision3>
12243	12244	<>	<elision2>
12243	12244	<>	<elision1>
12243	12247	.	κ
12243	12247	.	λ
12243	12060	<A3>	<>
12244	12242	<>	<aphaerese>
12244	12242	<>	<elision3>
12244	12242	<>	<elision2>
12244	12242	<>	<elision1>
12244	12245	.	κ
12244	12245	.	λ
12244	12058	<A3>	<>
12245	12246	<>	<name>
12245	12245	<>	<aphaerese>
12245	12248	<elision3>	<elision3>
12245	12245	<>	<elision3>
12245	12248	<elision2>	<elision2>
12245	12245	<>	<elision2>
12245	12248	<elision1>	<elision1>
12245	12245	<>	<elision1>
12245	12050	<A3>	<>
12246	12247	<>	<aphaerese>
12246	12250	<elision3>	<elision3>
12246	12247	<>	<elision3>
12246	12250	<elision2>	<elision2>
12246	12247	<>	<elision2>
12246	12250	<elision1>	<elision1>
12246	12247	<>	<elision1>
12246	12051	<A3>	<>
12247	12245	<>	<aphaerese>
12247	12248	<elision3>	<elision3>
12247	12245	<>	<elision3>
12247	12248	<elision2>	<elision2>
12247	12245	<>	<elision2>
12247	12248	<elision1>	<elision1>
12247	12245	<>	<elision1>
12247	12049	<A3>	<>
12248	12249	<>	<name>
12248	12248	<>	<aphaerese>
12248	12248	<>	<elision3>
12248	12248	<>	<elision2>
12248	12248	<>	<elision1>
12248	11775	.	κ
12248	11840	s	κ
12248	11952	s	k
12248	12124	s	K
12248	11952	s	λ
12248	11952	s	l
12248	12137	s	L
12248	12044	<A3>	<>
12249	12250	<>	<aphaerese>
12249	12250	<>	<elision3>
12249	12250	<>	<elision2>
12249	12250	<>	<elision1>
12249	11777	.	κ
12249	11842	s	κ
12249	11954	s	k
12249	12126	s	K
12249	11954	s	λ
12249	11954	s	l
12249	12139	s	L
12249	12045	<A3>	<>
12250	12248	<>	<aphaerese>
12250	12248	<>	<elision3>
12250	12248	<>	<elision2>
12250	12248	<>	<elision1>
12250	11775	.	κ
12250	11840	s	κ
12250	11952	s	k
12250	12124	s	K
12250	11952	s	λ
12250	11952	s	l
12250	12137	s	L
12250	12043	<A3>	<>
12251	11585	.	.
12251	11586	 	 
12251	11585	<~>	<~>
12251	11585	<split-s>	<split-s>
12251	11585	<split-h>	<split-h>
12251	11585	<name2>	<name2>
12251	12252	<>	<name>
12251	11589	<aphaerese>	<aphaerese>
12251	12251	<>	<aphaerese>
12251	11585	<elision3>	<elision3>
12251	12251	<>	<elision3>
12251	11585	<elision2>	<elision2>
12251	12251	<>	<elision2>
12251	11585	<elision1>	<elision1>
12251	12251	<>	<elision1>
12251	11593	.	υ
12251	11596	s	υ
12251	11593	.	u
12251	11596	s	u
12251	12157	s	κ
12251	11952	s	k
12251	11961	s	U
12251	12124	s	K
12251	11593	.	α
12251	11596	s	α
12251	11593	.	a
12251	11596	s	a
12251	12082	s	A
12251	12157	s	λ
12251	11952	s	l
12251	12137	s	L
12251	12071	<A3>	<>
12252	11588	.	.
12252	11591	 	 
12252	11588	<~>	<~>
12252	11588	<split-s>	<split-s>
12252	11588	<split-h>	<split-h>
12252	11588	<name2>	<name2>
12252	12123	<aphaerese>	<aphaerese>
12252	12253	<>	<aphaerese>
12252	11588	<elision3>	<elision3>
12252	12253	<>	<elision3>
12252	11588	<elision2>	<elision2>
12252	12253	<>	<elision2>
12252	11588	<elision1>	<elision1>
12252	12253	<>	<elision1>
12252	11595	.	υ
12252	11768	s	υ
12252	11595	.	u
12252	11768	s	u
12252	12159	s	κ
12252	11954	s	k
12252	11963	s	U
12252	12126	s	K
12252	11595	.	α
12252	11768	s	α
12252	11595	.	a
12252	11768	s	a
12252	12084	s	A
12252	12159	s	λ
12252	11954	s	l
12252	12139	s	L
12252	12072	<A3>	<>
12253	11585	.	.
12253	11586	 	 
12253	11585	<~>	<~>
12253	11585	<split-s>	<split-s>
12253	11585	<split-h>	<split-h>
12253	11585	<name2>	<name2>
12253	11589	<aphaerese>	<aphaerese>
12253	12251	<>	<aphaerese>
12253	11585	<elision3>	<elision3>
12253	12251	<>	<elision3>
12253	11585	<elision2>	<elision2>
12253	12251	<>	<elision2>
12253	11585	<elision1>	<elision1>
12253	12251	<>	<elision1>
12253	11593	.	υ
12253	11596	s	υ
12253	11593	.	u
12253	11596	s	u
12253	12157	s	κ
12253	11952	s	k
12253	11961	s	U
12253	12124	s	K
12253	11593	.	α
12253	11596	s	α
12253	11593	.	a
12253	11596	s	a
12253	12082	s	A
12253	12157	s	λ
12253	11952	s	l
12253	12137	s	L
12253	12070	<A3>	<>
12254	11585	.	.
12254	11586	 	 
12254	11585	<~>	<~>
12254	11585	<split-s>	<split-s>
12254	11585	<split-h>	<split-h>
12254	11585	<name2>	<name2>
12254	12226	<name2>	<name>
12254	12252	<>	<name>
12254	11589	<aphaerese>	<aphaerese>
12254	12251	<>	<aphaerese>
12254	11585	<elision3>	<elision3>
12254	12251	<>	<elision3>
12254	11585	<elision2>	<elision2>
12254	12251	<>	<elision2>
12254	11585	<elision1>	<elision1>
12254	12251	<>	<elision1>
12254	11593	.	υ
12254	11596	s	υ
12254	11593	.	u
12254	11596	s	u
12254	12157	s	κ
12254	11952	s	k
12254	11961	s	U
12254	12124	s	K
12254	11593	.	α
12254	11596	s	α
12254	11593	.	a
12254	11596	s	a
12254	12082	s	A
12254	12157	s	λ
12254	11952	s	l
12254	12137	s	L
12254	12080	<A3>	<>
12255	12256	<>	<name>
12255	12255	<>	<aphaerese>
12255	12255	<>	<elision3>
12255	12255	<>	<elision2>
12255	12255	<>	<elision1>
12255	11585	<A2kl>	<>
12256	12257	<>	<aphaerese>
12256	12257	<>	<elision3>
12256	12257	<>	<elision2>
12256	12257	<>	<elision1>
12256	12145	<A2kl>	<>
12257	12255	<>	<aphaerese>
12257	12255	<>	<elision3>
12257	12255	<>	<elision2>
12257	12255	<>	<elision1>
12257	11588	<A2kl>	<>
12258	12226	<name>	<name>
12258	12259	<>	<name>
12258	12261	<>	<aphaerese>
12258	12261	<>	<elision3>
12258	12261	<>	<elision2>
12258	12261	<>	<elision1>
12258	12076	<A3>	<>
12258	12230	<A2kl>	<>
12258	12265	<L2kl>	<>
12259	12260	<>	<aphaerese>
12259	12260	<>	<elision3>
12259	12260	<>	<elision2>
12259	12260	<>	<elision1>
12259	12231	<A2kl>	<>
12259	12263	<L2kl>	<>
12260	12261	<>	<aphaerese>
12260	12261	<>	<elision3>
12260	12261	<>	<elision2>
12260	12261	<>	<elision1>
12260	12232	<A2kl>	<>
12260	12264	<L2kl>	<>
12261	12259	<>	<name>
12261	12261	<>	<aphaerese>
12261	12261	<>	<elision3>
12261	12261	<>	<elision2>
12261	12261	<>	<elision1>
12261	12230	<A2kl>	<>
12261	12262	<L2kl>	<>
12262	11585	.	.
12262	11586	 	 
12262	11585	<~>	<~>
12262	11585	<split-s>	<split-s>
12262	11585	<split-h>	<split-h>
12262	11585	<name2>	<name2>
12262	12263	<>	<name>
12262	11589	<aphaerese>	<aphaerese>
12262	12262	<>	<aphaerese>
12262	11585	<elision3>	<elision3>
12262	12262	<>	<elision3>
12262	11585	<elision2>	<elision2>
12262	12262	<>	<elision2>
12262	11585	<elision1>	<elision1>
12262	12262	<>	<elision1>
12262	11593	.	υ
12262	11596	s	υ
12262	11593	.	u
12262	11596	s	u
12262	12245	.	κ
12262	12157	s	κ
12262	11952	s	k
12262	11961	s	U
12262	12124	s	K
12262	11593	.	α
12262	11596	s	α
12262	11593	.	a
12262	11596	s	a
12262	12082	s	A
12262	12245	.	λ
12262	12157	s	λ
12262	11952	s	l
12262	12137	s	L
12262	12093	<A3>	<>
12263	11588	.	.
12263	11591	 	 
12263	11588	<~>	<~>
12263	11588	<split-s>	<split-s>
12263	11588	<split-h>	<split-h>
12263	11588	<name2>	<name2>
12263	12123	<aphaerese>	<aphaerese>
12263	12264	<>	<aphaerese>
12263	11588	<elision3>	<elision3>
12263	12264	<>	<elision3>
12263	11588	<elision2>	<elision2>
12263	12264	<>	<elision2>
12263	11588	<elision1>	<elision1>
12263	12264	<>	<elision1>
12263	11595	.	υ
12263	11768	s	υ
12263	11595	.	u
12263	11768	s	u
12263	12247	.	κ
12263	12159	s	κ
12263	11954	s	k
12263	11963	s	U
12263	12126	s	K
12263	11595	.	α
12263	11768	s	α
12263	11595	.	a
12263	11768	s	a
12263	12084	s	A
12263	12247	.	λ
12263	12159	s	λ
12263	11954	s	l
12263	12139	s	L
12263	12094	<A3>	<>
12264	11585	.	.
12264	11586	 	 
12264	11585	<~>	<~>
12264	11585	<split-s>	<split-s>
12264	11585	<split-h>	<split-h>
12264	11585	<name2>	<name2>
12264	11589	<aphaerese>	<aphaerese>
12264	12262	<>	<aphaerese>
12264	11585	<elision3>	<elision3>
12264	12262	<>	<elision3>
12264	11585	<elision2>	<elision2>
12264	12262	<>	<elision2>
12264	11585	<elision1>	<elision1>
12264	12262	<>	<elision1>
12264	11593	.	υ
12264	11596	s	υ
12264	11593	.	u
12264	11596	s	u
12264	12245	.	κ
12264	12157	s	κ
12264	11952	s	k
12264	11961	s	U
12264	12124	s	K
12264	11593	.	α
12264	11596	s	α
12264	11593	.	a
12264	11596	s	a
12264	12082	s	A
12264	12245	.	λ
12264	12157	s	λ
12264	11952	s	l
12264	12137	s	L
12264	12092	<A3>	<>
12265	11585	.	.
12265	11586	 	 
12265	11585	<~>	<~>
12265	11585	<split-s>	<split-s>
12265	11585	<split-h>	<split-h>
12265	11585	<name2>	<name2>
12265	12226	<name2>	<name>
12265	12263	<>	<name>
12265	11589	<aphaerese>	<aphaerese>
12265	12262	<>	<aphaerese>
12265	11585	<elision3>	<elision3>
12265	12262	<>	<elision3>
12265	11585	<elision2>	<elision2>
12265	12262	<>	<elision2>
12265	11585	<elision1>	<elision1>
12265	12262	<>	<elision1>
12265	11593	.	υ
12265	11596	s	υ
12265	11593	.	u
12265	11596	s	u
12265	12245	.	κ
12265	12157	s	κ
12265	11952	s	k
12265	11961	s	U
12265	12124	s	K
12265	11593	.	α
12265	11596	s	α
12265	11593	.	a
12265	11596	s	a
12265	12082	s	A
12265	12245	.	λ
12265	12157	s	λ
12265	11952	s	l
12265	12137	s	L
12265	12099	<A3>	<>
12266	11585	.	.
12266	11586	 	 
12266	11585	<~>	<~>
12266	11585	<split-s>	<split-s>
12266	11585	<split-h>	<split-h>
12266	11585	<name2>	<name2>
12266	12146	<>	<name>
12266	11589	<aphaerese>	<aphaerese>
12266	11584	<>	<aphaerese>
12266	11584	<>	<elision3>
12266	11584	<>	<elision2>
12266	11584	<>	<elision1>
12266	11593	.	υ
12266	11596	s	υ
12266	11593	.	u
12266	11596	s	u
12266	11775	.	κ
12266	11840	s	κ
12266	11952	s	k
12266	11961	s	U
12266	12124	s	K
12266	11593	.	α
12266	11596	s	α
12266	11593	.	a
12266	11596	s	a
12266	12082	s	A
12266	11952	s	λ
12266	11952	s	l
12266	12137	s	L
12266	12102	<A3>	<>
12267	11585	.	.
12267	11586	 	 
12267	11585	<~>	<~>
12267	11585	<split-s>	<split-s>
12267	11585	<split-h>	<split-h>
12267	11585	<name2>	<name2>
12267	12173	<>	<name>
12267	11589	<aphaerese>	<aphaerese>
12267	12172	<>	<aphaerese>
12267	12175	<elision3>	<elision3>
12267	12172	<>	<elision3>
12267	12175	<elision2>	<elision2>
12267	12172	<>	<elision2>
12267	12175	<elision1>	<elision1>
12267	12172	<>	<elision1>
12267	11593	.	υ
12267	11596	s	υ
12267	11593	.	u
12267	11596	s	u
12267	11593	.	κ
12267	12157	s	κ
12267	11952	s	k
12267	11961	s	U
12267	12124	s	K
12267	11593	.	α
12267	11596	s	α
12267	11593	.	a
12267	11596	s	a
12267	12082	s	A
12267	11593	.	λ
12267	12157	s	λ
12267	11952	s	l
12267	12137	s	L
12267	12105	<A3>	<>
12268	11585	.	.
12268	11586	 	 
12268	11585	<~>	<~>
12268	11585	<split-s>	<split-s>
12268	11585	<split-h>	<split-h>
12268	11585	<name2>	<name2>
12268	12220	<>	<name>
12268	11589	<aphaerese>	<aphaerese>
12268	12219	<>	<aphaerese>
12268	11585	<elision3>	<elision3>
12268	12219	<>	<elision3>
12268	11585	<elision2>	<elision2>
12268	12219	<>	<elision2>
12268	11585	<elision1>	<elision1>
12268	12219	<>	<elision1>
12268	11593	.	υ
12268	11596	s	υ
12268	11593	.	u
12268	11596	s	u
12268	11593	.	κ
12268	12157	s	κ
12268	11952	s	k
12268	11961	s	U
12268	12124	s	K
12268	11593	.	α
12268	11596	s	α
12268	11593	.	a
12268	11596	s	a
12268	12082	s	A
12268	11593	.	λ
12268	12157	s	λ
12268	11952	s	l
12268	12137	s	L
12268	12108	<A3>	<>
12269	12223	<>	<name>
12269	12222	<>	<aphaerese>
12269	12222	<>	<elision3>
12269	12222	<>	<elision2>
12269	12222	<>	<elision1>
12269	12270	<U2kl>	<>
12270	11585	.	.
12270	11586	 	 
12270	11585	<~>	<~>
12270	11585	<split-s>	<split-s>
12270	11585	<split-h>	<split-h>
12270	11585	<name2>	<name2>
12270	12145	<>	<name>
12270	11589	<aphaerese>	<aphaerese>
12270	11585	<>	<aphaerese>
12270	11585	<elision3>	<elision3>
12270	11585	<>	<elision3>
12270	11585	<elision2>	<elision2>
12270	11585	<>	<elision2>
12270	11585	<elision1>	<elision1>
12270	11585	<>	<elision1>
12270	11593	.	υ
12270	11596	s	υ
12270	11593	.	u
12270	11596	s	u
12270	11775	.	κ
12270	11840	s	κ
12270	11952	s	k
12270	11961	s	U
12270	12124	s	K
12270	11593	.	α
12270	11596	s	α
12270	11593	.	a
12270	11596	s	a
12270	12082	s	A
12270	11952	s	λ
12270	11952	s	l
12270	12137	s	L
12270	12112	<A3>	<>
12271	12226	<name>	<name>
12271	12227	<>	<name>
12271	12229	<>	<aphaerese>
12271	12229	<>	<elision3>
12271	12229	<>	<elision2>
12271	12229	<>	<elision1>
12271	12076	<A3>	<>
12271	12230	<A2kl>	<>
12271	12242	<L2kl>	<>
12271	12272	<K2kl>	<>
12272	11585	.	.
12272	11586	 	 
12272	11585	<~>	<~>
12272	11585	<split-s>	<split-s>
12272	11585	<split-h>	<split-h>
12272	11585	<name2>	<name2>
12272	12226	<name2>	<name>
12272	12252	<>	<name>
12272	11589	<aphaerese>	<aphaerese>
12272	12251	<>	<aphaerese>
12272	11585	<elision3>	<elision3>
12272	12251	<>	<elision3>
12272	11585	<elision2>	<elision2>
12272	12251	<>	<elision2>
12272	11585	<elision1>	<elision1>
12272	12251	<>	<elision1>
12272	11593	.	υ
12272	11596	s	υ
12272	11593	.	u
12272	11596	s	u
12272	12157	s	κ
12272	11952	s	k
12272	11961	s	U
12272	12124	s	K
12272	11593	.	α
12272	11596	s	α
12272	11593	.	a
12272	11596	s	a
12272	12082	s	A
12272	12157	s	λ
12272	11952	s	l
12272	12137	s	L
12272	12116	<A3>	<>
12273	12256	<>	<name>
12273	12255	<>	<aphaerese>
12273	12255	<>	<elision3>
12273	12255	<>	<elision2>
12273	12255	<>	<elision1>
12273	12270	<A2kl>	<>
12274	12226	<name>	<name>
12274	12259	<>	<name>
12274	12261	<>	<aphaerese>
12274	12261	<>	<elision3>
12274	12261	<>	<elision2>
12274	12261	<>	<elision1>
12274	12076	<A3>	<>
12274	12230	<A2kl>	<>
12274	12275	<L2kl>	<>
12275	11585	.	.
12275	11586	 	 
12275	11585	<~>	<~>
12275	11585	<split-s>	<split-s>
12275	11585	<split-h>	<split-h>
12275	11585	<name2>	<name2>
12275	12226	<name2>	<name>
12275	12263	<>	<name>
12275	11589	<aphaerese>	<aphaerese>
12275	12262	<>	<aphaerese>
12275	11585	<elision3>	<elision3>
12275	12262	<>	<elision3>
12275	11585	<elision2>	<elision2>
12275	12262	<>	<elision2>
12275	11585	<elision1>	<elision1>
12275	12262	<>	<elision1>
12275	11593	.	υ
12275	11596	s	υ
12275	11593	.	u
12275	11596	s	u
12275	12245	.	κ
12275	12157	s	κ
12275	11952	s	k
12275	11961	s	U
12275	12124	s	K
12275	11593	.	α
12275	11596	s	α
12275	11593	.	a
12275	11596	s	a
12275	12082	s	A
12275	12245	.	λ
12275	12157	s	λ
12275	11952	s	l
12275	12137	s	L
12275	12121	<A3>	<>
12276	20	.	.
12276	21	 	 
12276	20	<~>	<~>
12276	20	<split-s>	<split-s>
12276	20	<split-h>	<split-h>
12276	20	<name2>	<name2>
12276	24	<aphaerese>	<aphaerese>
12276	24	<>	<aphaerese>
12276	20	<elision3>	<elision3>
12276	24	<>	<elision3>
12276	20	<elision2>	<elision2>
12276	24	<>	<elision2>
12276	20	<elision1>	<elision1>
12276	24	<>	<elision1>
12276	20	.	υ
12276	20	.	u
12276	12148	.	κ
12276	12172	s	κ
12276	12219	s	k
12276	12222	s	U
12276	12277	s	K
12276	20	.	α
12276	20	.	a
12276	12255	s	A
12276	12219	s	λ
12276	12219	s	l
12276	12284	s	L
12276	11751	<A2>	<>
12277	12226	<name>	<name>
12277	12278	<>	<name>
12277	12280	<>	<aphaerese>
12277	12280	<>	<elision3>
12277	12280	<>	<elision2>
12277	12280	<>	<elision1>
12277	12076	<A3>	<>
12277	12281	<L2kl>	<>
12277	12254	<K2kl>	<>
12278	12279	<>	<aphaerese>
12278	12279	<>	<elision3>
12278	12279	<>	<elision2>
12278	12279	<>	<elision1>
12278	12282	<L2kl>	<>
12278	12252	<K2kl>	<>
12279	12280	<>	<aphaerese>
12279	12280	<>	<elision3>
12279	12280	<>	<elision2>
12279	12280	<>	<elision1>
12279	12283	<L2kl>	<>
12279	12253	<K2kl>	<>
12280	12278	<>	<name>
12280	12280	<>	<aphaerese>
12280	12280	<>	<elision3>
12280	12280	<>	<elision2>
12280	12280	<>	<elision1>
12280	12281	<L2kl>	<>
12280	12251	<K2kl>	<>
12281	12282	<>	<name>
12281	12281	<>	<aphaerese>
12281	12281	<>	<elision3>
12281	12281	<>	<elision2>
12281	12281	<>	<elision1>
12281	11593	.	κ
12281	11593	.	λ
12281	12132	<A3>	<>
12282	12283	<>	<aphaerese>
12282	12283	<>	<elision3>
12282	12283	<>	<elision2>
12282	12283	<>	<elision1>
12282	11595	.	κ
12282	11595	.	λ
12282	12133	<A3>	<>
12283	12281	<>	<aphaerese>
12283	12281	<>	<elision3>
12283	12281	<>	<elision2>
12283	12281	<>	<elision1>
12283	11593	.	κ
12283	11593	.	λ
12283	12131	<A3>	<>
12284	12226	<name>	<name>
12284	12285	<>	<name>
12284	12287	<>	<aphaerese>
12284	12287	<>	<elision3>
12284	12287	<>	<elision2>
12284	12287	<>	<elision1>
12284	12076	<A3>	<>
12284	12288	<L2kl>	<>
12285	12286	<>	<aphaerese>
12285	12286	<>	<elision3>
12285	12286	<>	<elision2>
12285	12286	<>	<elision1>
12285	12220	<L2kl>	<>
12286	12287	<>	<aphaerese>
12286	12287	<>	<elision3>
12286	12287	<>	<elision2>
12286	12287	<>	<elision1>
12286	12221	<L2kl>	<>
12287	12285	<>	<name>
12287	12287	<>	<aphaerese>
12287	12287	<>	<elision3>
12287	12287	<>	<elision2>
12287	12287	<>	<elision1>
12287	12219	<L2kl>	<>
12288	11585	.	.
12288	11586	 	 
12288	11585	<~>	<~>
12288	11585	<split-s>	<split-s>
12288	11585	<split-h>	<split-h>
12288	11585	<name2>	<name2>
12288	12226	<name2>	<name>
12288	12220	<>	<name>
12288	11589	<aphaerese>	<aphaerese>
12288	12219	<>	<aphaerese>
12288	11585	<elision3>	<elision3>
12288	12219	<>	<elision3>
12288	11585	<elision2>	<elision2>
12288	12219	<>	<elision2>
12288	11585	<elision1>	<elision1>
12288	12219	<>	<elision1>
12288	11593	.	υ
12288	11596	s	υ
12288	11593	.	u
12288	11596	s	u
12288	11593	.	κ
12288	12157	s	κ
12288	11952	s	k
12288	11961	s	U
12288	12124	s	K
12288	11593	.	α
12288	11596	s	α
12288	11593	.	a
12288	11596	s	a
12288	12082	s	A
12288	11593	.	λ
12288	12157	s	λ
12288	11952	s	l
12288	12137	s	L
12288	12142	<A3>	<>
12289	20	.	.
12289	21	 	 
12289	20	<~>	<~>
12289	20	<split-s>	<split-s>
12289	20	<split-h>	<split-h>
12289	20	<name2>	<name2>
12289	24	<aphaerese>	<aphaerese>
12289	27	<>	<aphaerese>
12289	20	<elision3>	<elision3>
12289	27	<>	<elision3>
12289	20	<elision2>	<elision2>
12289	27	<>	<elision2>
12289	20	<elision1>	<elision1>
12289	27	<>	<elision1>
12289	28	.	υ
12289	11584	s	υ
12289	28	.	u
12289	11584	s	u
12289	12148	.	κ
12289	12172	s	κ
12289	12219	s	k
12289	12222	s	U
12289	12225	s	K
12289	28	.	α
12289	11584	s	α
12289	28	.	a
12289	11584	s	a
12289	12255	s	A
12289	12219	s	λ
12289	12219	s	l
12289	12258	s	L
12289	11764	<A2>	<>
12290	23	.	.
12290	26	 	 
12290	23	<~>	<~>
12290	23	<split-s>	<split-s>
12290	23	<split-h>	<split-h>
12290	23	<name2>	<name2>
12290	12276	<aphaerese>	<aphaerese>
12290	23	<>	<aphaerese>
12290	23	<elision3>	<elision3>
12290	23	<>	<elision3>
12290	23	<elision2>	<elision2>
12290	23	<>	<elision2>
12290	23	<elision1>	<elision1>
12290	23	<>	<elision1>
12290	30	.	υ
12290	12147	s	υ
12290	30	.	u
12290	12147	s	u
12290	12150	.	κ
12290	12174	s	κ
12290	12221	s	k
12290	12224	s	U
12290	12279	s	K
12290	30	.	α
12290	12147	s	α
12290	30	.	a
12290	12147	s	a
12290	12257	s	A
12290	12221	s	λ
12290	12221	s	l
12290	12286	s	L
12290	11766	<A2>	<>
12291	23	.	.
12291	26	 	 
12291	23	<~>	<~>
12291	23	<split-s>	<split-s>
12291	23	<split-h>	<split-h>
12291	23	<name2>	<name2>
12291	12276	<aphaerese>	<aphaerese>
12291	12292	<>	<aphaerese>
12291	12292	<>	<elision3>
12291	12292	<>	<elision2>
12291	12292	<>	<elision1>
12291	30	.	υ
12291	12147	s	υ
12291	30	.	u
12291	12147	s	u
12291	30	.	κ
12291	12295	s	κ
12291	12221	s	k
12291	12224	s	U
12291	12279	s	K
12291	30	.	α
12291	12147	s	α
12291	30	.	a
12291	12147	s	a
12291	12257	s	A
12291	30	.	λ
12291	12295	s	λ
12291	12221	s	l
12291	12286	s	L
12291	12162	<A2>	<>
12292	20	.	.
12292	21	 	 
12292	20	<~>	<~>
12292	20	<split-s>	<split-s>
12292	20	<split-h>	<split-h>
12292	20	<name2>	<name2>
12292	24	<aphaerese>	<aphaerese>
12292	19	<>	<aphaerese>
12292	19	<>	<elision3>
12292	19	<>	<elision2>
12292	19	<>	<elision1>
12292	28	.	υ
12292	11584	s	υ
12292	28	.	u
12292	11584	s	u
12292	28	.	κ
12292	12293	s	κ
12292	12219	s	k
12292	12222	s	U
12292	12277	s	K
12292	28	.	α
12292	11584	s	α
12292	28	.	a
12292	11584	s	a
12292	12255	s	A
12292	28	.	λ
12292	12293	s	λ
12292	12219	s	l
12292	12284	s	L
12292	12160	<A2>	<>
12293	11585	.	.
12293	11586	 	 
12293	11585	<~>	<~>
12293	11585	<split-s>	<split-s>
12293	11585	<split-h>	<split-h>
12293	11585	<name2>	<name2>
12293	12294	<>	<name>
12293	11589	<aphaerese>	<aphaerese>
12293	12293	<>	<aphaerese>
12293	12293	<>	<elision3>
12293	12293	<>	<elision2>
12293	12293	<>	<elision1>
12293	11593	.	υ
12293	11596	s	υ
12293	11593	.	u
12293	11596	s	u
12293	11593	.	κ
12293	12157	s	κ
12293	11952	s	k
12293	11961	s	U
12293	12124	s	K
12293	11593	.	α
12293	11596	s	α
12293	11593	.	a
12293	11596	s	a
12293	12082	s	A
12293	11593	.	λ
12293	12157	s	λ
12293	11952	s	l
12293	12137	s	L
12293	12161	<A3>	<>
12294	11588	.	.
12294	11591	 	 
12294	11588	<~>	<~>
12294	11588	<split-s>	<split-s>
12294	11588	<split-h>	<split-h>
12294	11588	<name2>	<name2>
12294	12123	<aphaerese>	<aphaerese>
12294	12295	<>	<aphaerese>
12294	12295	<>	<elision3>
12294	12295	<>	<elision2>
12294	12295	<>	<elision1>
12294	11595	.	υ
12294	11768	s	υ
12294	11595	.	u
12294	11768	s	u
12294	11595	.	κ
12294	12159	s	κ
12294	11954	s	k
12294	11963	s	U
12294	12126	s	K
12294	11595	.	α
12294	11768	s	α
12294	11595	.	a
12294	11768	s	a
12294	12084	s	A
12294	11595	.	λ
12294	12159	s	λ
12294	11954	s	l
12294	12139	s	L
12294	12162	<A3>	<>
12295	11585	.	.
12295	11586	 	 
12295	11585	<~>	<~>
12295	11585	<split-s>	<split-s>
12295	11585	<split-h>	<split-h>
12295	11585	<name2>	<name2>
12295	11589	<aphaerese>	<aphaerese>
12295	12293	<>	<aphaerese>
12295	12293	<>	<elision3>
12295	12293	<>	<elision2>
12295	12293	<>	<elision1>
12295	11593	.	υ
12295	11596	s	υ
12295	11593	.	u
12295	11596	s	u
12295	11593	.	κ
12295	12157	s	κ
12295	11952	s	k
12295	11961	s	U
12295	12124	s	K
12295	11593	.	α
12295	11596	s	α
12295	11593	.	a
12295	11596	s	a
12295	12082	s	A
12295	11593	.	λ
12295	12157	s	λ
12295	11952	s	l
12295	12137	s	L
12295	12160	<A3>	<>
12296	20	.	.
12296	21	 	 
12296	20	<~>	<~>
12296	20	<split-s>	<split-s>
12296	20	<split-h>	<split-h>
12296	20	<name2>	<name2>
12296	12297	<>	<name>
12296	24	<aphaerese>	<aphaerese>
12296	12296	<>	<aphaerese>
12296	20	<elision3>	<elision3>
12296	12296	<>	<elision3>
12296	20	<elision2>	<elision2>
12296	12296	<>	<elision2>
12296	20	<elision1>	<elision1>
12296	12296	<>	<elision1>
12296	28	.	υ
12296	11584	s	υ
12296	28	.	u
12296	11584	s	u
12296	28	.	κ
12296	12293	s	κ
12296	12219	s	k
12296	12222	s	U
12296	12277	s	K
12296	28	.	α
12296	11584	s	α
12296	28	.	a
12296	11584	s	a
12296	12255	s	A
12296	28	.	λ
12296	12293	s	λ
12296	12219	s	l
12296	12284	s	L
12296	11956	<A2>	<>
12297	23	.	.
12297	26	 	 
12297	23	<~>	<~>
12297	23	<split-s>	<split-s>
12297	23	<split-h>	<split-h>
12297	23	<name2>	<name2>
12297	12276	<aphaerese>	<aphaerese>
12297	12298	<>	<aphaerese>
12297	23	<elision3>	<elision3>
12297	12298	<>	<elision3>
12297	23	<elision2>	<elision2>
12297	12298	<>	<elision2>
12297	23	<elision1>	<elision1>
12297	12298	<>	<elision1>
12297	30	.	υ
12297	12147	s	υ
12297	30	.	u
12297	12147	s	u
12297	30	.	κ
12297	12295	s	κ
12297	12221	s	k
12297	12224	s	U
12297	12279	s	K
12297	30	.	α
12297	12147	s	α
12297	30	.	a
12297	12147	s	a
12297	12257	s	A
12297	30	.	λ
12297	12295	s	λ
12297	12221	s	l
12297	12286	s	L
12297	11957	<A2>	<>
12298	20	.	.
12298	21	 	 
12298	20	<~>	<~>
12298	20	<split-s>	<split-s>
12298	20	<split-h>	<split-h>
12298	20	<name2>	<name2>
12298	24	<aphaerese>	<aphaerese>
12298	12296	<>	<aphaerese>
12298	20	<elision3>	<elision3>
12298	12296	<>	<elision3>
12298	20	<elision2>	<elision2>
12298	12296	<>	<elision2>
12298	20	<elision1>	<elision1>
12298	12296	<>	<elision1>
12298	28	.	υ
12298	11584	s	υ
12298	28	.	u
12298	11584	s	u
12298	28	.	κ
12298	12293	s	κ
12298	12219	s	k
12298	12222	s	U
12298	12277	s	K
12298	28	.	α
12298	11584	s	α
12298	28	.	a
12298	11584	s	a
12298	12255	s	A
12298	28	.	λ
12298	12293	s	λ
12298	12219	s	l
12298	12284	s	L
12298	11955	<A2>	<>
12299	12300	<name>	<name>
12299	12301	<>	<name>
12299	12303	<>	<aphaerese>
12299	12303	<>	<elision3>
12299	12303	<>	<elision2>
12299	12303	<>	<elision1>
12299	12076	<A2>	<>
12299	12304	<L2kl>	<>
12299	12310	<K2kl>	<>
12300	12279	s	k
12300	12286	s	l
12300	11966	<A2>	<>
12301	12302	<>	<aphaerese>
12301	12302	<>	<elision3>
12301	12302	<>	<elision2>
12301	12302	<>	<elision1>
12301	12305	<L2kl>	<>
12301	12308	<K2kl>	<>
12302	12303	<>	<aphaerese>
12302	12303	<>	<elision3>
12302	12303	<>	<elision2>
12302	12303	<>	<elision1>
12302	12306	<L2kl>	<>
12302	12309	<K2kl>	<>
12303	12301	<>	<name>
12303	12303	<>	<aphaerese>
12303	12303	<>	<elision3>
12303	12303	<>	<elision2>
12303	12303	<>	<elision1>
12303	12304	<L2kl>	<>
12303	12307	<K2kl>	<>
12304	12305	<>	<name>
12304	12304	<>	<aphaerese>
12304	12304	<>	<elision3>
12304	12304	<>	<elision2>
12304	12304	<>	<elision1>
12304	28	.	κ
12304	28	.	λ
12304	12132	<A2>	<>
12305	12306	<>	<aphaerese>
12305	12306	<>	<elision3>
12305	12306	<>	<elision2>
12305	12306	<>	<elision1>
12305	30	.	κ
12305	30	.	λ
12305	12133	<A2>	<>
12306	12304	<>	<aphaerese>
12306	12304	<>	<elision3>
12306	12304	<>	<elision2>
12306	12304	<>	<elision1>
12306	28	.	κ
12306	28	.	λ
12306	12131	<A2>	<>
12307	20	.	.
12307	21	 	 
12307	20	<~>	<~>
12307	20	<split-s>	<split-s>
12307	20	<split-h>	<split-h>
12307	20	<name2>	<name2>
12307	12308	<>	<name>
12307	24	<aphaerese>	<aphaerese>
12307	12307	<>	<aphaerese>
12307	20	<elision3>	<elision3>
12307	12307	<>	<elision3>
12307	20	<elision2>	<elision2>
12307	12307	<>	<elision2>
12307	20	<elision1>	<elision1>
12307	12307	<>	<elision1>
12307	28	.	υ
12307	11584	s	υ
12307	28	.	u
12307	11584	s	u
12307	12293	s	κ
12307	12219	s	k
12307	12222	s	U
12307	12277	s	K
12307	28	.	α
12307	11584	s	α
12307	28	.	a
12307	11584	s	a
12307	12255	s	A
12307	12293	s	λ
12307	12219	s	l
12307	12284	s	L
12307	12071	<A2>	<>
12308	23	.	.
12308	26	 	 
12308	23	<~>	<~>
12308	23	<split-s>	<split-s>
12308	23	<split-h>	<split-h>
12308	23	<name2>	<name2>
12308	12276	<aphaerese>	<aphaerese>
12308	12309	<>	<aphaerese>
12308	23	<elision3>	<elision3>
12308	12309	<>	<elision3>
12308	23	<elision2>	<elision2>
12308	12309	<>	<elision2>
12308	23	<elision1>	<elision1>
12308	12309	<>	<elision1>
12308	30	.	υ
12308	12147	s	υ
12308	30	.	u
12308	12147	s	u
12308	12295	s	κ
12308	12221	s	k
12308	12224	s	U
12308	12279	s	K
12308	30	.	α
12308	12147	s	α
12308	30	.	a
12308	12147	s	a
12308	12257	s	A
12308	12295	s	λ
12308	12221	s	l
12308	12286	s	L
12308	12072	<A2>	<>
12309	20	.	.
12309	21	 	 
12309	20	<~>	<~>
12309	20	<split-s>	<split-s>
12309	20	<split-h>	<split-h>
12309	20	<name2>	<name2>
12309	24	<aphaerese>	<aphaerese>
12309	12307	<>	<aphaerese>
12309	20	<elision3>	<elision3>
12309	12307	<>	<elision3>
12309	20	<elision2>	<elision2>
12309	12307	<>	<elision2>
12309	20	<elision1>	<elision1>
12309	12307	<>	<elision1>
12309	28	.	υ
12309	11584	s	υ
12309	28	.	u
12309	11584	s	u
12309	12293	s	κ
12309	12219	s	k
12309	12222	s	U
12309	12277	s	K
12309	28	.	α
12309	11584	s	α
12309	28	.	a
12309	11584	s	a
12309	12255	s	A
12309	12293	s	λ
12309	12219	s	l
12309	12284	s	L
12309	12070	<A2>	<>
12310	20	.	.
12310	21	 	 
12310	20	<~>	<~>
12310	20	<split-s>	<split-s>
12310	20	<split-h>	<split-h>
12310	20	<name2>	<name2>
12310	12300	<name2>	<name>
12310	12308	<>	<name>
12310	24	<aphaerese>	<aphaerese>
12310	12307	<>	<aphaerese>
12310	20	<elision3>	<elision3>
12310	12307	<>	<elision3>
12310	20	<elision2>	<elision2>
12310	12307	<>	<elision2>
12310	20	<elision1>	<elision1>
12310	12307	<>	<elision1>
12310	28	.	υ
12310	11584	s	υ
12310	28	.	u
12310	11584	s	u
12310	12293	s	κ
12310	12219	s	k
12310	12222	s	U
12310	12277	s	K
12310	28	.	α
12310	11584	s	α
12310	28	.	a
12310	11584	s	a
12310	12255	s	A
12310	12293	s	λ
12310	12219	s	l
12310	12284	s	L
12310	12080	<A2>	<>
12311	12300	<name>	<name>
12311	12312	<>	<name>
12311	12314	<>	<aphaerese>
12311	12314	<>	<elision3>
12311	12314	<>	<elision2>
12311	12314	<>	<elision1>
12311	12076	<A2>	<>
12311	12315	<L2kl>	<>
12312	12313	<>	<aphaerese>
12312	12313	<>	<elision3>
12312	12313	<>	<elision2>
12312	12313	<>	<elision1>
12312	12297	<L2kl>	<>
12313	12314	<>	<aphaerese>
12313	12314	<>	<elision3>
12313	12314	<>	<elision2>
12313	12314	<>	<elision1>
12313	12298	<L2kl>	<>
12314	12312	<>	<name>
12314	12314	<>	<aphaerese>
12314	12314	<>	<elision3>
12314	12314	<>	<elision2>
12314	12314	<>	<elision1>
12314	12296	<L2kl>	<>
12315	20	.	.
12315	21	 	 
12315	20	<~>	<~>
12315	20	<split-s>	<split-s>
12315	20	<split-h>	<split-h>
12315	20	<name2>	<name2>
12315	12300	<name2>	<name>
12315	12297	<>	<name>
12315	24	<aphaerese>	<aphaerese>
12315	12296	<>	<aphaerese>
12315	20	<elision3>	<elision3>
12315	12296	<>	<elision3>
12315	20	<elision2>	<elision2>
12315	12296	<>	<elision2>
12315	20	<elision1>	<elision1>
12315	12296	<>	<elision1>
12315	28	.	υ
12315	11584	s	υ
12315	28	.	u
12315	11584	s	u
12315	28	.	κ
12315	12293	s	κ
12315	12219	s	k
12315	12222	s	U
12315	12277	s	K
12315	28	.	α
12315	11584	s	α
12315	28	.	a
12315	11584	s	a
12315	12255	s	A
12315	28	.	λ
12315	12293	s	λ
12315	12219	s	l
12315	12284	s	L
12315	12142	<A2>	<>
12316	12317	<>	<name>
12316	12316	<>	<aphaerese>
12316	12316	<>	<elision3>
12316	12316	<>	<elision2>
12316	12316	<>	<elision1>
12316	16	<K2kl>	<>
12317	12318	<>	<aphaerese>
12317	12318	<>	<elision3>
12317	12318	<>	<elision2>
12317	12318	<>	<elision1>
12317	17	<K2kl>	<>
12318	12316	<>	<aphaerese>
12318	12316	<>	<elision3>
12318	12316	<>	<elision2>
12318	12316	<>	<elision1>
12318	18	<K2kl>	<>
12319	12320	<>	<name>
12319	12319	<>	<aphaerese>
12319	12319	<>	<elision3>
12319	12319	<>	<elision2>
12319	12319	<>	<elision1>
12319	16	<L2kl>	<>
12320	12321	<>	<aphaerese>
12320	12321	<>	<elision3>
12320	12321	<>	<elision2>
12320	12321	<>	<elision1>
12320	17	<L2kl>	<>
12321	12319	<>	<aphaerese>
12321	12319	<>	<elision3>
12321	12319	<>	<elision2>
12321	12319	<>	<elision1>
12321	18	<L2kl>	<>
12322	12323	.	.
12322	12324	 	 
12322	12323	<~>	<~>
12322	12323	<split-s>	<split-s>
12322	12323	<split-h>	<split-h>
12322	12323	<name2>	<name2>
12322	12429	<>	<name>
12322	12327	<aphaerese>	<aphaerese>
12322	12322	<>	<aphaerese>
12322	12431	<elision3>	<elision3>
12322	12322	<>	<elision3>
12322	12431	<elision2>	<elision2>
12322	12322	<>	<elision2>
12322	12431	<elision1>	<elision1>
12322	12322	<>	<elision1>
12322	12331	.	υ
12322	12334	s	υ
12322	12331	.	u
12322	12334	s	u
12322	12331	.	κ
12322	19	s	κ
12322	12296	s	k
12322	12377	s	U
12322	12299	s	K
12322	12331	.	α
12322	12334	s	α
12322	12331	.	a
12322	12334	s	a
12322	12405	s	A
12322	12331	.	λ
12322	19	s	λ
12322	12296	s	l
12322	12311	s	L
12322	11944	<A1>	<>
12323	12323	.	.
12323	12324	 	 
12323	12323	<~>	<~>
12323	12323	<split-s>	<split-s>
12323	12323	<split-h>	<split-h>
12323	12323	<name2>	<name2>
12323	12428	<>	<name>
12323	12327	<aphaerese>	<aphaerese>
12323	12323	<>	<aphaerese>
12323	12323	<elision3>	<elision3>
12323	12323	<>	<elision3>
12323	12323	<elision2>	<elision2>
12323	12323	<>	<elision2>
12323	12323	<elision1>	<elision1>
12323	12323	<>	<elision1>
12323	12331	.	υ
12323	12334	s	υ
12323	12331	.	u
12323	12334	s	u
12323	12337	.	κ
12323	12352	s	κ
12323	12296	s	k
12323	12377	s	U
12323	12299	s	K
12323	12331	.	α
12323	12334	s	α
12323	12331	.	a
12323	12334	s	a
12323	12405	s	A
12323	12296	s	λ
12323	12296	s	l
12323	12311	s	L
12323	11765	<A1>	<>
12324	12323	.	.
12324	12324	 	 
12324	12323	<~>	<~>
12324	12323	<split-s>	<split-s>
12324	12323	<split-h>	<split-h>
12324	12323	<name2>	<name2>
12324	12325	<>	<name>
12324	12327	<aphaerese>	<aphaerese>
12324	12330	<>	<aphaerese>
12324	12323	<elision3>	<elision3>
12324	12330	<>	<elision3>
12324	12323	<elision2>	<elision2>
12324	12330	<>	<elision2>
12324	12323	<elision1>	<elision1>
12324	12330	<>	<elision1>
12324	12331	.	υ
12324	12416	s	υ
12324	12331	.	u
12324	12416	s	u
12324	12337	.	κ
12324	12417	s	κ
12324	12418	s	k
12324	12419	s	U
12324	12421	s	K
12324	12331	.	α
12324	12416	s	α
12324	12331	.	a
12324	12416	s	a
12324	12423	s	A
12324	12418	s	λ
12324	12418	s	l
12324	12424	s	L
12324	11765	<A1>	<>
12325	12326	.	.
12325	12329	 	 
12325	12326	<~>	<~>
12325	12326	<split-s>	<split-s>
12325	12326	<split-h>	<split-h>
12325	12326	<name2>	<name2>
12325	12426	<aphaerese>	<aphaerese>
12325	12427	<>	<aphaerese>
12325	12326	<elision3>	<elision3>
12325	12427	<>	<elision3>
12325	12326	<elision2>	<elision2>
12325	12427	<>	<elision2>
12325	12326	<elision1>	<elision1>
12325	12427	<>	<elision1>
12325	12333	.	υ
12325	12336	s	υ
12325	12333	.	u
12325	12336	s	u
12325	12339	.	κ
12325	12354	s	κ
12325	12298	s	k
12325	12379	s	U
12325	12382	s	K
12325	12333	.	α
12325	12336	s	α
12325	12333	.	a
12325	12336	s	a
12325	12407	s	A
12325	12298	s	λ
12325	12298	s	l
12325	12410	s	L
12325	11766	<A1>	<>
12326	12323	.	.
12326	12324	 	 
12326	12323	<~>	<~>
12326	12323	<split-s>	<split-s>
12326	12323	<split-h>	<split-h>
12326	12323	<name2>	<name2>
12326	12327	<aphaerese>	<aphaerese>
12326	12323	<>	<aphaerese>
12326	12323	<elision3>	<elision3>
12326	12323	<>	<elision3>
12326	12323	<elision2>	<elision2>
12326	12323	<>	<elision2>
12326	12323	<elision1>	<elision1>
12326	12323	<>	<elision1>
12326	12331	.	υ
12326	12334	s	υ
12326	12331	.	u
12326	12334	s	u
12326	12337	.	κ
12326	12352	s	κ
12326	12296	s	k
12326	12377	s	U
12326	12299	s	K
12326	12331	.	α
12326	12334	s	α
12326	12331	.	a
12326	12334	s	a
12326	12405	s	A
12326	12296	s	λ
12326	12296	s	l
12326	12311	s	L
12326	11764	<A1>	<>
12327	12323	.	.
12327	12324	 	 
12327	12323	<~>	<~>
12327	12323	<split-s>	<split-s>
12327	12323	<split-h>	<split-h>
12327	12323	<name2>	<name2>
12327	12328	<>	<name>
12327	12327	<aphaerese>	<aphaerese>
12327	12327	<>	<aphaerese>
12327	12323	<elision3>	<elision3>
12327	12327	<>	<elision3>
12327	12323	<elision2>	<elision2>
12327	12327	<>	<elision2>
12327	12323	<elision1>	<elision1>
12327	12327	<>	<elision1>
12327	12323	.	υ
12327	12323	.	u
12327	12337	.	κ
12327	12352	s	κ
12327	12296	s	k
12327	12377	s	U
12327	12299	s	K
12327	12323	.	α
12327	12323	.	a
12327	12405	s	A
12327	12296	s	λ
12327	12296	s	l
12327	12311	s	L
12327	11752	<A1>	<>
12328	12326	.	.
12328	12329	 	 
12328	12326	<~>	<~>
12328	12326	<split-s>	<split-s>
12328	12326	<split-h>	<split-h>
12328	12326	<name2>	<name2>
12328	12426	<aphaerese>	<aphaerese>
12328	12426	<>	<aphaerese>
12328	12326	<elision3>	<elision3>
12328	12426	<>	<elision3>
12328	12326	<elision2>	<elision2>
12328	12426	<>	<elision2>
12328	12326	<elision1>	<elision1>
12328	12426	<>	<elision1>
12328	12326	.	υ
12328	12326	.	u
12328	12339	.	κ
12328	12354	s	κ
12328	12298	s	k
12328	12379	s	U
12328	12302	s	K
12328	12326	.	α
12328	12326	.	a
12328	12407	s	A
12328	12298	s	λ
12328	12298	s	l
12328	12313	s	L
12328	11753	<A1>	<>
12329	12323	.	.
12329	12324	 	 
12329	12323	<~>	<~>
12329	12323	<split-s>	<split-s>
12329	12323	<split-h>	<split-h>
12329	12323	<name2>	<name2>
12329	12327	<aphaerese>	<aphaerese>
12329	12330	<>	<aphaerese>
12329	12323	<elision3>	<elision3>
12329	12330	<>	<elision3>
12329	12323	<elision2>	<elision2>
12329	12330	<>	<elision2>
12329	12323	<elision1>	<elision1>
12329	12330	<>	<elision1>
12329	12331	.	υ
12329	12416	s	υ
12329	12331	.	u
12329	12416	s	u
12329	12337	.	κ
12329	12417	s	κ
12329	12418	s	k
12329	12419	s	U
12329	12421	s	K
12329	12331	.	α
12329	12416	s	α
12329	12331	.	a
12329	12416	s	a
12329	12423	s	A
12329	12418	s	λ
12329	12418	s	l
12329	12424	s	L
12329	11764	<A1>	<>
12330	12323	.	.
12330	12324	 	 
12330	12323	<~>	<~>
12330	12323	<split-s>	<split-s>
12330	12323	<split-h>	<split-h>
12330	12323	<name2>	<name2>
12330	12325	<>	<name>
12330	12327	<aphaerese>	<aphaerese>
12330	12330	<>	<aphaerese>
12330	12323	<elision3>	<elision3>
12330	12330	<>	<elision3>
12330	12323	<elision2>	<elision2>
12330	12330	<>	<elision2>
12330	12323	<elision1>	<elision1>
12330	12330	<>	<elision1>
12330	12331	.	υ
12330	12334	s	υ
12330	12331	.	u
12330	12334	s	u
12330	12337	.	κ
12330	12352	s	κ
12330	12296	s	k
12330	12377	s	U
12330	12380	s	K
12330	12331	.	α
12330	12334	s	α
12330	12331	.	a
12330	12334	s	a
12330	12405	s	A
12330	12296	s	λ
12330	12296	s	l
12330	12408	s	L
12330	11765	<A1>	<>
12331	12332	<>	<name>
12331	12331	<>	<aphaerese>
12331	12323	<elision3>	<elision3>
12331	12331	<>	<elision3>
12331	12323	<elision2>	<elision2>
12331	12331	<>	<elision2>
12331	12323	<elision1>	<elision1>
12331	12331	<>	<elision1>
12331	32	<A1>	<>
12332	12333	<>	<aphaerese>
12332	12326	<elision3>	<elision3>
12332	12333	<>	<elision3>
12332	12326	<elision2>	<elision2>
12332	12333	<>	<elision2>
12332	12326	<elision1>	<elision1>
12332	12333	<>	<elision1>
12332	33	<A1>	<>
12333	12331	<>	<aphaerese>
12333	12323	<elision3>	<elision3>
12333	12331	<>	<elision3>
12333	12323	<elision2>	<elision2>
12333	12331	<>	<elision2>
12333	12323	<elision1>	<elision1>
12333	12331	<>	<elision1>
12333	31	<A1>	<>
12334	20	.	.
12334	21	 	 
12334	20	<~>	<~>
12334	20	<split-s>	<split-s>
12334	20	<split-h>	<split-h>
12334	20	<name2>	<name2>
12334	12335	<>	<name>
12334	24	<aphaerese>	<aphaerese>
12334	12334	<>	<aphaerese>
12334	12334	<>	<elision3>
12334	12334	<>	<elision2>
12334	12334	<>	<elision1>
12334	28	.	υ
12334	11584	s	υ
12334	28	.	u
12334	11584	s	u
12334	12148	.	κ
12334	12172	s	κ
12334	12219	s	k
12334	12222	s	U
12334	12277	s	K
12334	28	.	α
12334	11584	s	α
12334	28	.	a
12334	11584	s	a
12334	12255	s	A
12334	12219	s	λ
12334	12219	s	l
12334	12284	s	L
12334	11770	<A2>	<>
12335	23	.	.
12335	26	 	 
12335	23	<~>	<~>
12335	23	<split-s>	<split-s>
12335	23	<split-h>	<split-h>
12335	23	<name2>	<name2>
12335	12276	<aphaerese>	<aphaerese>
12335	12336	<>	<aphaerese>
12335	12336	<>	<elision3>
12335	12336	<>	<elision2>
12335	12336	<>	<elision1>
12335	30	.	υ
12335	12147	s	υ
12335	30	.	u
12335	12147	s	u
12335	12150	.	κ
12335	12174	s	κ
12335	12221	s	k
12335	12224	s	U
12335	12279	s	K
12335	30	.	α
12335	12147	s	α
12335	30	.	a
12335	12147	s	a
12335	12257	s	A
12335	12221	s	λ
12335	12221	s	l
12335	12286	s	L
12335	11771	<A2>	<>
12336	20	.	.
12336	21	 	 
12336	20	<~>	<~>
12336	20	<split-s>	<split-s>
12336	20	<split-h>	<split-h>
12336	20	<name2>	<name2>
12336	24	<aphaerese>	<aphaerese>
12336	12334	<>	<aphaerese>
12336	12334	<>	<elision3>
12336	12334	<>	<elision2>
12336	12334	<>	<elision1>
12336	28	.	υ
12336	11584	s	υ
12336	28	.	u
12336	11584	s	u
12336	12148	.	κ
12336	12172	s	κ
12336	12219	s	k
12336	12222	s	U
12336	12277	s	K
12336	28	.	α
12336	11584	s	α
12336	28	.	a
12336	11584	s	a
12336	12255	s	A
12336	12219	s	λ
12336	12219	s	l
12336	12284	s	L
12336	11769	<A2>	<>
12337	12338	<>	<name>
12337	12337	<>	<aphaerese>
12337	12340	<elision3>	<elision3>
12337	12337	<>	<elision3>
12337	12340	<elision2>	<elision2>
12337	12337	<>	<elision2>
12337	12340	<elision1>	<elision1>
12337	12337	<>	<elision1>
12337	11749	<A1>	<>
12338	12339	<>	<aphaerese>
12338	12342	<elision3>	<elision3>
12338	12339	<>	<elision3>
12338	12342	<elision2>	<elision2>
12338	12339	<>	<elision2>
12338	12342	<elision1>	<elision1>
12338	12339	<>	<elision1>
12338	11750	<A1>	<>
12339	12337	<>	<aphaerese>
12339	12340	<elision3>	<elision3>
12339	12337	<>	<elision3>
12339	12340	<elision2>	<elision2>
12339	12337	<>	<elision2>
12339	12340	<elision1>	<elision1>
12339	12337	<>	<elision1>
12339	11748	<A1>	<>
12340	12341	<>	<name>
12340	12340	<>	<aphaerese>
12340	12340	<>	<elision3>
12340	12340	<>	<elision2>
12340	12340	<>	<elision1>
12340	12343	s	κ
12340	12343	s	k
12340	12346	s	K
12340	12343	s	λ
12340	12343	s	l
12340	12349	s	L
12340	11610	<A1>	<>
12341	12342	<>	<aphaerese>
12341	12342	<>	<elision3>
12341	12342	<>	<elision2>
12341	12342	<>	<elision1>
12341	12345	s	κ
12341	12345	s	k
12341	12348	s	K
12341	12345	s	λ
12341	12345	s	l
12341	12351	s	L
12341	11611	<A1>	<>
12342	12340	<>	<aphaerese>
12342	12340	<>	<elision3>
12342	12340	<>	<elision2>
12342	12340	<>	<elision1>
12342	12343	s	κ
12342	12343	s	k
12342	12346	s	K
12342	12343	s	λ
12342	12343	s	l
12342	12349	s	L
12342	11609	<A1>	<>
12343	12344	<>	<name>
12343	12343	<>	<aphaerese>
12343	12343	<>	<elision3>
12343	12343	<>	<elision2>
12343	12343	<>	<elision1>
12343	12293	s	κ
12343	12219	s	k
12343	12277	s	K
12343	12293	s	λ
12343	12219	s	l
12343	12284	s	L
12343	11785	<A2>	<>
12344	12345	<>	<aphaerese>
12344	12345	<>	<elision3>
12344	12345	<>	<elision2>
12344	12345	<>	<elision1>
12344	12295	s	κ
12344	12221	s	k
12344	12279	s	K
12344	12295	s	λ
12344	12221	s	l
12344	12286	s	L
12344	11786	<A2>	<>
12345	12343	<>	<aphaerese>
12345	12343	<>	<elision3>
12345	12343	<>	<elision2>
12345	12343	<>	<elision1>
12345	12293	s	κ
12345	12219	s	k
12345	12277	s	K
12345	12293	s	λ
12345	12219	s	l
12345	12284	s	L
12345	11784	<A2>	<>
12346	12347	<>	<name>
12346	12346	<>	<aphaerese>
12346	12346	<>	<elision3>
12346	12346	<>	<elision2>
12346	12346	<>	<elision1>
12346	12343	<K2kl>	<>
12347	12348	<>	<aphaerese>
12347	12348	<>	<elision3>
12347	12348	<>	<elision2>
12347	12348	<>	<elision1>
12347	12344	<K2kl>	<>
12348	12346	<>	<aphaerese>
12348	12346	<>	<elision3>
12348	12346	<>	<elision2>
12348	12346	<>	<elision1>
12348	12345	<K2kl>	<>
12349	12350	<>	<name>
12349	12349	<>	<aphaerese>
12349	12349	<>	<elision3>
12349	12349	<>	<elision2>
12349	12349	<>	<elision1>
12349	12343	<L2kl>	<>
12350	12351	<>	<aphaerese>
12350	12351	<>	<elision3>
12350	12351	<>	<elision2>
12350	12351	<>	<elision1>
12350	12344	<L2kl>	<>
12351	12349	<>	<aphaerese>
12351	12349	<>	<elision3>
12351	12349	<>	<elision2>
12351	12349	<>	<elision1>
12351	12345	<L2kl>	<>
12352	20	.	.
12352	21	 	 
12352	20	<~>	<~>
12352	20	<split-s>	<split-s>
12352	20	<split-h>	<split-h>
12352	20	<name2>	<name2>
12352	12353	<>	<name>
12352	24	<aphaerese>	<aphaerese>
12352	12352	<>	<aphaerese>
12352	12355	<elision3>	<elision3>
12352	12352	<>	<elision3>
12352	12355	<elision2>	<elision2>
12352	12352	<>	<elision2>
12352	12355	<elision1>	<elision1>
12352	12352	<>	<elision1>
12352	28	.	υ
12352	11584	s	υ
12352	28	.	u
12352	11584	s	u
12352	28	.	κ
12352	12293	s	κ
12352	12219	s	k
12352	12222	s	U
12352	12277	s	K
12352	28	.	α
12352	11584	s	α
12352	28	.	a
12352	11584	s	a
12352	12255	s	A
12352	28	.	λ
12352	12293	s	λ
12352	12219	s	l
12352	12284	s	L
12352	11944	<A2>	<>
12353	23	.	.
12353	26	 	 
12353	23	<~>	<~>
12353	23	<split-s>	<split-s>
12353	23	<split-h>	<split-h>
12353	23	<name2>	<name2>
12353	12276	<aphaerese>	<aphaerese>
12353	12354	<>	<aphaerese>
12353	12357	<elision3>	<elision3>
12353	12354	<>	<elision3>
12353	12357	<elision2>	<elision2>
12353	12354	<>	<elision2>
12353	12357	<elision1>	<elision1>
12353	12354	<>	<elision1>
12353	30	.	υ
12353	12147	s	υ
12353	30	.	u
12353	12147	s	u
12353	30	.	κ
12353	12295	s	κ
12353	12221	s	k
12353	12224	s	U
12353	12279	s	K
12353	30	.	α
12353	12147	s	α
12353	30	.	a
12353	12147	s	a
12353	12257	s	A
12353	30	.	λ
12353	12295	s	λ
12353	12221	s	l
12353	12286	s	L
12353	11945	<A2>	<>
12354	20	.	.
12354	21	 	 
12354	20	<~>	<~>
12354	20	<split-s>	<split-s>
12354	20	<split-h>	<split-h>
12354	20	<name2>	<name2>
12354	24	<aphaerese>	<aphaerese>
12354	12352	<>	<aphaerese>
12354	12355	<elision3>	<elision3>
12354	12352	<>	<elision3>
12354	12355	<elision2>	<elision2>
12354	12352	<>	<elision2>
12354	12355	<elision1>	<elision1>
12354	12352	<>	<elision1>
12354	28	.	υ
12354	11584	s	υ
12354	28	.	u
12354	11584	s	u
12354	28	.	κ
12354	12293	s	κ
12354	12219	s	k
12354	12222	s	U
12354	12277	s	K
12354	28	.	α
12354	11584	s	α
12354	28	.	a
12354	11584	s	a
12354	12255	s	A
12354	28	.	λ
12354	12293	s	λ
12354	12219	s	l
12354	12284	s	L
12354	11943	<A2>	<>
12355	20	.	.
12355	21	 	 
12355	20	<~>	<~>
12355	20	<split-s>	<split-s>
12355	20	<split-h>	<split-h>
12355	20	<name2>	<name2>
12355	12356	<>	<name>
12355	24	<aphaerese>	<aphaerese>
12355	12355	<>	<aphaerese>
12355	20	<elision3>	<elision3>
12355	12355	<>	<elision3>
12355	20	<elision2>	<elision2>
12355	12355	<>	<elision2>
12355	20	<elision1>	<elision1>
12355	12355	<>	<elision1>
12355	28	.	υ
12355	11584	s	υ
12355	28	.	u
12355	11584	s	u
12355	12148	.	κ
12355	12358	s	κ
12355	12361	s	k
12355	12222	s	U
12355	12364	s	K
12355	28	.	α
12355	11584	s	α
12355	28	.	a
12355	11584	s	a
12355	12255	s	A
12355	12361	s	λ
12355	12361	s	l
12355	12372	s	L
12355	11847	<A2>	<>
12356	23	.	.
12356	26	 	 
12356	23	<~>	<~>
12356	23	<split-s>	<split-s>
12356	23	<split-h>	<split-h>
12356	23	<name2>	<name2>
12356	12276	<aphaerese>	<aphaerese>
12356	12357	<>	<aphaerese>
12356	23	<elision3>	<elision3>
12356	12357	<>	<elision3>
12356	23	<elision2>	<elision2>
12356	12357	<>	<elision2>
12356	23	<elision1>	<elision1>
12356	12357	<>	<elision1>
12356	30	.	υ
12356	12147	s	υ
12356	30	.	u
12356	12147	s	u
12356	12150	.	κ
12356	12360	s	κ
12356	12363	s	k
12356	12224	s	U
12356	12366	s	K
12356	30	.	α
12356	12147	s	α
12356	30	.	a
12356	12147	s	a
12356	12257	s	A
12356	12363	s	λ
12356	12363	s	l
12356	12374	s	L
12356	11848	<A2>	<>
12357	20	.	.
12357	21	 	 
12357	20	<~>	<~>
12357	20	<split-s>	<split-s>
12357	20	<split-h>	<split-h>
12357	20	<name2>	<name2>
12357	24	<aphaerese>	<aphaerese>
12357	12355	<>	<aphaerese>
12357	20	<elision3>	<elision3>
12357	12355	<>	<elision3>
12357	20	<elision2>	<elision2>
12357	12355	<>	<elision2>
12357	20	<elision1>	<elision1>
12357	12355	<>	<elision1>
12357	28	.	υ
12357	11584	s	υ
12357	28	.	u
12357	11584	s	u
12357	12148	.	κ
12357	12358	s	κ
12357	12361	s	k
12357	12222	s	U
12357	12364	s	K
12357	28	.	α
12357	11584	s	α
12357	28	.	a
12357	11584	s	a
12357	12255	s	A
12357	12361	s	λ
12357	12361	s	l
12357	12372	s	L
12357	11846	<A2>	<>
12358	11585	.	.
12358	11586	 	 
12358	11585	<~>	<~>
12358	11585	<split-s>	<split-s>
12358	11585	<split-h>	<split-h>
12358	11585	<name2>	<name2>
12358	12359	<>	<name>
12358	11589	<aphaerese>	<aphaerese>
12358	12358	<>	<aphaerese>
12358	12175	<elision3>	<elision3>
12358	12358	<>	<elision3>
12358	12175	<elision2>	<elision2>
12358	12358	<>	<elision2>
12358	12175	<elision1>	<elision1>
12358	12358	<>	<elision1>
12358	11593	.	υ
12358	11596	s	υ
12358	11593	.	u
12358	11596	s	u
12358	11593	.	κ
12358	11961	s	U
12358	11593	.	α
12358	11596	s	α
12358	11593	.	a
12358	11596	s	a
12358	12082	s	A
12358	11593	.	λ
12358	12182	<A3>	<>
12359	11588	.	.
12359	11591	 	 
12359	11588	<~>	<~>
12359	11588	<split-s>	<split-s>
12359	11588	<split-h>	<split-h>
12359	11588	<name2>	<name2>
12359	12123	<aphaerese>	<aphaerese>
12359	12360	<>	<aphaerese>
12359	12177	<elision3>	<elision3>
12359	12360	<>	<elision3>
12359	12177	<elision2>	<elision2>
12359	12360	<>	<elision2>
12359	12177	<elision1>	<elision1>
12359	12360	<>	<elision1>
12359	11595	.	υ
12359	11768	s	υ
12359	11595	.	u
12359	11768	s	u
12359	11595	.	κ
12359	11963	s	U
12359	11595	.	α
12359	11768	s	α
12359	11595	.	a
12359	11768	s	a
12359	12084	s	A
12359	11595	.	λ
12359	12183	<A3>	<>
12360	11585	.	.
12360	11586	 	 
12360	11585	<~>	<~>
12360	11585	<split-s>	<split-s>
12360	11585	<split-h>	<split-h>
12360	11585	<name2>	<name2>
12360	11589	<aphaerese>	<aphaerese>
12360	12358	<>	<aphaerese>
12360	12175	<elision3>	<elision3>
12360	12358	<>	<elision3>
12360	12175	<elision2>	<elision2>
12360	12358	<>	<elision2>
12360	12175	<elision1>	<elision1>
12360	12358	<>	<elision1>
12360	11593	.	υ
12360	11596	s	υ
12360	11593	.	u
12360	11596	s	u
12360	11593	.	κ
12360	11961	s	U
12360	11593	.	α
12360	11596	s	α
12360	11593	.	a
12360	11596	s	a
12360	12082	s	A
12360	11593	.	λ
12360	12181	<A3>	<>
12361	11585	.	.
12361	11586	 	 
12361	11585	<~>	<~>
12361	11585	<split-s>	<split-s>
12361	11585	<split-h>	<split-h>
12361	11585	<name2>	<name2>
12361	12362	<>	<name>
12361	11589	<aphaerese>	<aphaerese>
12361	12361	<>	<aphaerese>
12361	11585	<elision3>	<elision3>
12361	12361	<>	<elision3>
12361	11585	<elision2>	<elision2>
12361	12361	<>	<elision2>
12361	11585	<elision1>	<elision1>
12361	12361	<>	<elision1>
12361	11593	.	υ
12361	11596	s	υ
12361	11593	.	u
12361	11596	s	u
12361	11593	.	κ
12361	11961	s	U
12361	11593	.	α
12361	11596	s	α
12361	11593	.	a
12361	11596	s	a
12361	12082	s	A
12361	11593	.	λ
12361	12191	<A3>	<>
12362	11588	.	.
12362	11591	 	 
12362	11588	<~>	<~>
12362	11588	<split-s>	<split-s>
12362	11588	<split-h>	<split-h>
12362	11588	<name2>	<name2>
12362	12123	<aphaerese>	<aphaerese>
12362	12363	<>	<aphaerese>
12362	11588	<elision3>	<elision3>
12362	12363	<>	<elision3>
12362	11588	<elision2>	<elision2>
12362	12363	<>	<elision2>
12362	11588	<elision1>	<elision1>
12362	12363	<>	<elision1>
12362	11595	.	υ
12362	11768	s	υ
12362	11595	.	u
12362	11768	s	u
12362	11595	.	κ
12362	11963	s	U
12362	11595	.	α
12362	11768	s	α
12362	11595	.	a
12362	11768	s	a
12362	12084	s	A
12362	11595	.	λ
12362	12192	<A3>	<>
12363	11585	.	.
12363	11586	 	 
12363	11585	<~>	<~>
12363	11585	<split-s>	<split-s>
12363	11585	<split-h>	<split-h>
12363	11585	<name2>	<name2>
12363	11589	<aphaerese>	<aphaerese>
12363	12361	<>	<aphaerese>
12363	11585	<elision3>	<elision3>
12363	12361	<>	<elision3>
12363	11585	<elision2>	<elision2>
12363	12361	<>	<elision2>
12363	11585	<elision1>	<elision1>
12363	12361	<>	<elision1>
12363	11593	.	υ
12363	11596	s	υ
12363	11593	.	u
12363	11596	s	u
12363	11593	.	κ
12363	11961	s	U
12363	11593	.	α
12363	11596	s	α
12363	11593	.	a
12363	11596	s	a
12363	12082	s	A
12363	11593	.	λ
12363	12190	<A3>	<>
12364	12226	<name>	<name>
12364	12365	<>	<name>
12364	12367	<>	<aphaerese>
12364	12367	<>	<elision3>
12364	12367	<>	<elision2>
12364	12367	<>	<elision1>
12364	12076	<A3>	<>
12364	12281	<L2kl>	<>
12364	12371	<K2kl>	<>
12365	12366	<>	<aphaerese>
12365	12366	<>	<elision3>
12365	12366	<>	<elision2>
12365	12366	<>	<elision1>
12365	12282	<L2kl>	<>
12365	12369	<K2kl>	<>
12366	12367	<>	<aphaerese>
12366	12367	<>	<elision3>
12366	12367	<>	<elision2>
12366	12367	<>	<elision1>
12366	12283	<L2kl>	<>
12366	12370	<K2kl>	<>
12367	12365	<>	<name>
12367	12367	<>	<aphaerese>
12367	12367	<>	<elision3>
12367	12367	<>	<elision2>
12367	12367	<>	<elision1>
12367	12281	<L2kl>	<>
12367	12368	<K2kl>	<>
12368	11585	.	.
12368	11586	 	 
12368	11585	<~>	<~>
12368	11585	<split-s>	<split-s>
12368	11585	<split-h>	<split-h>
12368	11585	<name2>	<name2>
12368	12369	<>	<name>
12368	11589	<aphaerese>	<aphaerese>
12368	12368	<>	<aphaerese>
12368	11585	<elision3>	<elision3>
12368	12368	<>	<elision3>
12368	11585	<elision2>	<elision2>
12368	12368	<>	<elision2>
12368	11585	<elision1>	<elision1>
12368	12368	<>	<elision1>
12368	11593	.	υ
12368	11596	s	υ
12368	11593	.	u
12368	11596	s	u
12368	11961	s	U
12368	11593	.	α
12368	11596	s	α
12368	11593	.	a
12368	11596	s	a
12368	12082	s	A
12368	12204	<A3>	<>
12369	11588	.	.
12369	11591	 	 
12369	11588	<~>	<~>
12369	11588	<split-s>	<split-s>
12369	11588	<split-h>	<split-h>
12369	11588	<name2>	<name2>
12369	12123	<aphaerese>	<aphaerese>
12369	12370	<>	<aphaerese>
12369	11588	<elision3>	<elision3>
12369	12370	<>	<elision3>
12369	11588	<elision2>	<elision2>
12369	12370	<>	<elision2>
12369	11588	<elision1>	<elision1>
12369	12370	<>	<elision1>
12369	11595	.	υ
12369	11768	s	υ
12369	11595	.	u
12369	11768	s	u
12369	11963	s	U
12369	11595	.	α
12369	11768	s	α
12369	11595	.	a
12369	11768	s	a
12369	12084	s	A
12369	12205	<A3>	<>
12370	11585	.	.
12370	11586	 	 
12370	11585	<~>	<~>
12370	11585	<split-s>	<split-s>
12370	11585	<split-h>	<split-h>
12370	11585	<name2>	<name2>
12370	11589	<aphaerese>	<aphaerese>
12370	12368	<>	<aphaerese>
12370	11585	<elision3>	<elision3>
12370	12368	<>	<elision3>
12370	11585	<elision2>	<elision2>
12370	12368	<>	<elision2>
12370	11585	<elision1>	<elision1>
12370	12368	<>	<elision1>
12370	11593	.	υ
12370	11596	s	υ
12370	11593	.	u
12370	11596	s	u
12370	11961	s	U
12370	11593	.	α
12370	11596	s	α
12370	11593	.	a
12370	11596	s	a
12370	12082	s	A
12370	12203	<A3>	<>
12371	11585	.	.
12371	11586	 	 
12371	11585	<~>	<~>
12371	11585	<split-s>	<split-s>
12371	11585	<split-h>	<split-h>
12371	11585	<name2>	<name2>
12371	12226	<name2>	<name>
12371	12369	<>	<name>
12371	11589	<aphaerese>	<aphaerese>
12371	12368	<>	<aphaerese>
12371	11585	<elision3>	<elision3>
12371	12368	<>	<elision3>
12371	11585	<elision2>	<elision2>
12371	12368	<>	<elision2>
12371	11585	<elision1>	<elision1>
12371	12368	<>	<elision1>
12371	11593	.	υ
12371	11596	s	υ
12371	11593	.	u
12371	11596	s	u
12371	11961	s	U
12371	11593	.	α
12371	11596	s	α
12371	11593	.	a
12371	11596	s	a
12371	12082	s	A
12371	12210	<A3>	<>
12372	12226	<name>	<name>
12372	12373	<>	<name>
12372	12375	<>	<aphaerese>
12372	12375	<>	<elision3>
12372	12375	<>	<elision2>
12372	12375	<>	<elision1>
12372	12076	<A3>	<>
12372	12376	<L2kl>	<>
12373	12374	<>	<aphaerese>
12373	12374	<>	<elision3>
12373	12374	<>	<elision2>
12373	12374	<>	<elision1>
12373	12362	<L2kl>	<>
12374	12375	<>	<aphaerese>
12374	12375	<>	<elision3>
12374	12375	<>	<elision2>
12374	12375	<>	<elision1>
12374	12363	<L2kl>	<>
12375	12373	<>	<name>
12375	12375	<>	<aphaerese>
12375	12375	<>	<elision3>
12375	12375	<>	<elision2>
12375	12375	<>	<elision1>
12375	12361	<L2kl>	<>
12376	11585	.	.
12376	11586	 	 
12376	11585	<~>	<~>
12376	11585	<split-s>	<split-s>
12376	11585	<split-h>	<split-h>
12376	11585	<name2>	<name2>
12376	12226	<name2>	<name>
12376	12362	<>	<name>
12376	11589	<aphaerese>	<aphaerese>
12376	12361	<>	<aphaerese>
12376	11585	<elision3>	<elision3>
12376	12361	<>	<elision3>
12376	11585	<elision2>	<elision2>
12376	12361	<>	<elision2>
12376	11585	<elision1>	<elision1>
12376	12361	<>	<elision1>
12376	11593	.	υ
12376	11596	s	υ
12376	11593	.	u
12376	11596	s	u
12376	11593	.	κ
12376	11961	s	U
12376	11593	.	α
12376	11596	s	α
12376	11593	.	a
12376	11596	s	a
12376	12082	s	A
12376	11593	.	λ
12376	12217	<A3>	<>
12377	12378	<>	<name>
12377	12377	<>	<aphaerese>
12377	12377	<>	<elision3>
12377	12377	<>	<elision2>
12377	12377	<>	<elision1>
12377	20	<U2kl>	<>
12378	12379	<>	<aphaerese>
12378	12379	<>	<elision3>
12378	12379	<>	<elision2>
12378	12379	<>	<elision1>
12378	12290	<U2kl>	<>
12379	12377	<>	<aphaerese>
12379	12377	<>	<elision3>
12379	12377	<>	<elision2>
12379	12377	<>	<elision1>
12379	23	<U2kl>	<>
12380	12300	<name>	<name>
12380	12381	<>	<name>
12380	12383	<>	<aphaerese>
12380	12383	<>	<elision3>
12380	12383	<>	<elision2>
12380	12383	<>	<elision1>
12380	12076	<A2>	<>
12380	12384	<A2kl>	<>
12380	12396	<L2kl>	<>
12380	12310	<K2kl>	<>
12381	12382	<>	<aphaerese>
12381	12382	<>	<elision3>
12381	12382	<>	<elision2>
12381	12382	<>	<elision1>
12381	12385	<A2kl>	<>
12381	12397	<L2kl>	<>
12381	12308	<K2kl>	<>
12382	12383	<>	<aphaerese>
12382	12383	<>	<elision3>
12382	12383	<>	<elision2>
12382	12383	<>	<elision1>
12382	12386	<A2kl>	<>
12382	12398	<L2kl>	<>
12382	12309	<K2kl>	<>
12383	12381	<>	<name>
12383	12383	<>	<aphaerese>
12383	12383	<>	<elision3>
12383	12383	<>	<elision2>
12383	12383	<>	<elision1>
12383	12384	<A2kl>	<>
12383	12396	<L2kl>	<>
12383	12307	<K2kl>	<>
12384	12385	<>	<name>
12384	12384	<>	<aphaerese>
12384	12384	<>	<elision3>
12384	12384	<>	<elision2>
12384	12384	<>	<elision1>
12384	12387	.	κ
12384	12387	.	λ
12384	12026	<A2>	<>
12385	12386	<>	<aphaerese>
12385	12386	<>	<elision3>
12385	12386	<>	<elision2>
12385	12386	<>	<elision1>
12385	12389	.	κ
12385	12389	.	λ
12385	12027	<A2>	<>
12386	12384	<>	<aphaerese>
12386	12384	<>	<elision3>
12386	12384	<>	<elision2>
12386	12384	<>	<elision1>
12386	12387	.	κ
12386	12387	.	λ
12386	12025	<A2>	<>
12387	12388	<>	<name>
12387	12387	<>	<aphaerese>
12387	12390	<elision3>	<elision3>
12387	12387	<>	<elision3>
12387	12390	<elision2>	<elision2>
12387	12387	<>	<elision2>
12387	12390	<elision1>	<elision1>
12387	12387	<>	<elision1>
12387	12017	<A2>	<>
12388	12389	<>	<aphaerese>
12388	12392	<elision3>	<elision3>
12388	12389	<>	<elision3>
12388	12392	<elision2>	<elision2>
12388	12389	<>	<elision2>
12388	12392	<elision1>	<elision1>
12388	12389	<>	<elision1>
12388	12018	<A2>	<>
12389	12387	<>	<aphaerese>
12389	12390	<elision3>	<elision3>
12389	12387	<>	<elision3>
12389	12390	<elision2>	<elision2>
12389	12387	<>	<elision2>
12389	12390	<elision1>	<elision1>
12389	12387	<>	<elision1>
12389	12016	<A2>	<>
12390	20	.	.
12390	21	 	 
12390	20	<~>	<~>
12390	20	<split-s>	<split-s>
12390	20	<split-h>	<split-h>
12390	20	<name2>	<name2>
12390	12391	<>	<name>
12390	24	<aphaerese>	<aphaerese>
12390	12390	<>	<aphaerese>
12390	20	<elision3>	<elision3>
12390	12390	<>	<elision3>
12390	20	<elision2>	<elision2>
12390	12390	<>	<elision2>
12390	20	<elision1>	<elision1>
12390	12390	<>	<elision1>
12390	28	.	υ
12390	11584	s	υ
12390	28	.	u
12390	11584	s	u
12390	12242	s	κ
12390	12242	s	k
12390	12222	s	U
12390	12393	s	K
12390	28	.	α
12390	11584	s	α
12390	28	.	a
12390	11584	s	a
12390	12255	s	A
12390	12242	s	λ
12390	12242	s	l
12390	12393	s	L
12390	11981	<A2>	<>
12391	23	.	.
12391	26	 	 
12391	23	<~>	<~>
12391	23	<split-s>	<split-s>
12391	23	<split-h>	<split-h>
12391	23	<name2>	<name2>
12391	12276	<aphaerese>	<aphaerese>
12391	12392	<>	<aphaerese>
12391	23	<elision3>	<elision3>
12391	12392	<>	<elision3>
12391	23	<elision2>	<elision2>
12391	12392	<>	<elision2>
12391	23	<elision1>	<elision1>
12391	12392	<>	<elision1>
12391	30	.	υ
12391	12147	s	υ
12391	30	.	u
12391	12147	s	u
12391	12244	s	κ
12391	12244	s	k
12391	12224	s	U
12391	12395	s	K
12391	30	.	α
12391	12147	s	α
12391	30	.	a
12391	12147	s	a
12391	12257	s	A
12391	12244	s	λ
12391	12244	s	l
12391	12395	s	L
12391	11982	<A2>	<>
12392	20	.	.
12392	21	 	 
12392	20	<~>	<~>
12392	20	<split-s>	<split-s>
12392	20	<split-h>	<split-h>
12392	20	<name2>	<name2>
12392	24	<aphaerese>	<aphaerese>
12392	12390	<>	<aphaerese>
12392	20	<elision3>	<elision3>
12392	12390	<>	<elision3>
12392	20	<elision2>	<elision2>
12392	12390	<>	<elision2>
12392	20	<elision1>	<elision1>
12392	12390	<>	<elision1>
12392	28	.	υ
12392	11584	s	υ
12392	28	.	u
12392	11584	s	u
12392	12242	s	κ
12392	12242	s	k
12392	12222	s	U
12392	12393	s	K
12392	28	.	α
12392	11584	s	α
12392	28	.	a
12392	11584	s	a
12392	12255	s	A
12392	12242	s	λ
12392	12242	s	l
12392	12393	s	L
12392	11980	<A2>	<>
12393	12394	<>	<name>
12393	12393	<>	<aphaerese>
12393	12393	<>	<elision3>
12393	12393	<>	<elision2>
12393	12393	<>	<elision1>
12393	12242	<L2kl>	<>
12394	12395	<>	<aphaerese>
12394	12395	<>	<elision3>
12394	12395	<>	<elision2>
12394	12395	<>	<elision1>
12394	12243	<L2kl>	<>
12395	12393	<>	<aphaerese>
12395	12393	<>	<elision3>
12395	12393	<>	<elision2>
12395	12393	<>	<elision1>
12395	12244	<L2kl>	<>
12396	12397	<>	<name>
12396	12396	<>	<aphaerese>
12396	12396	<>	<elision3>
12396	12396	<>	<elision2>
12396	12396	<>	<elision1>
12396	12399	.	κ
12396	12399	.	λ
12396	12059	<A2>	<>
12397	12398	<>	<aphaerese>
12397	12398	<>	<elision3>
12397	12398	<>	<elision2>
12397	12398	<>	<elision1>
12397	12401	.	κ
12397	12401	.	λ
12397	12060	<A2>	<>
12398	12396	<>	<aphaerese>
12398	12396	<>	<elision3>
12398	12396	<>	<elision2>
12398	12396	<>	<elision1>
12398	12399	.	κ
12398	12399	.	λ
12398	12058	<A2>	<>
12399	12400	<>	<name>
12399	12399	<>	<aphaerese>
12399	12402	<elision3>	<elision3>
12399	12399	<>	<elision3>
12399	12402	<elision2>	<elision2>
12399	12399	<>	<elision2>
12399	12402	<elision1>	<elision1>
12399	12399	<>	<elision1>
12399	12050	<A2>	<>
12400	12401	<>	<aphaerese>
12400	12404	<elision3>	<elision3>
12400	12401	<>	<elision3>
12400	12404	<elision2>	<elision2>
12400	12401	<>	<elision2>
12400	12404	<elision1>	<elision1>
12400	12401	<>	<elision1>
12400	12051	<A2>	<>
12401	12399	<>	<aphaerese>
12401	12402	<elision3>	<elision3>
12401	12399	<>	<elision3>
12401	12402	<elision2>	<elision2>
12401	12399	<>	<elision2>
12401	12402	<elision1>	<elision1>
12401	12399	<>	<elision1>
12401	12049	<A2>	<>
12402	12403	<>	<name>
12402	12402	<>	<aphaerese>
12402	12402	<>	<elision3>
12402	12402	<>	<elision2>
12402	12402	<>	<elision1>
12402	12148	.	κ
12402	12172	s	κ
12402	12219	s	k
12402	12277	s	K
12402	12219	s	λ
12402	12219	s	l
12402	12284	s	L
12402	12044	<A2>	<>
12403	12404	<>	<aphaerese>
12403	12404	<>	<elision3>
12403	12404	<>	<elision2>
12403	12404	<>	<elision1>
12403	12150	.	κ
12403	12174	s	κ
12403	12221	s	k
12403	12279	s	K
12403	12221	s	λ
12403	12221	s	l
12403	12286	s	L
12403	12045	<A2>	<>
12404	12402	<>	<aphaerese>
12404	12402	<>	<elision3>
12404	12402	<>	<elision2>
12404	12402	<>	<elision1>
12404	12148	.	κ
12404	12172	s	κ
12404	12219	s	k
12404	12277	s	K
12404	12219	s	λ
12404	12219	s	l
12404	12284	s	L
12404	12043	<A2>	<>
12405	12406	<>	<name>
12405	12405	<>	<aphaerese>
12405	12405	<>	<elision3>
12405	12405	<>	<elision2>
12405	12405	<>	<elision1>
12405	20	<A2kl>	<>
12406	12407	<>	<aphaerese>
12406	12407	<>	<elision3>
12406	12407	<>	<elision2>
12406	12407	<>	<elision1>
12406	12290	<A2kl>	<>
12407	12405	<>	<aphaerese>
12407	12405	<>	<elision3>
12407	12405	<>	<elision2>
12407	12405	<>	<elision1>
12407	23	<A2kl>	<>
12408	12300	<name>	<name>
12408	12409	<>	<name>
12408	12411	<>	<aphaerese>
12408	12411	<>	<elision3>
12408	12411	<>	<elision2>
12408	12411	<>	<elision1>
12408	12076	<A2>	<>
12408	12384	<A2kl>	<>
12408	12415	<L2kl>	<>
12409	12410	<>	<aphaerese>
12409	12410	<>	<elision3>
12409	12410	<>	<elision2>
12409	12410	<>	<elision1>
12409	12385	<A2kl>	<>
12409	12413	<L2kl>	<>
12410	12411	<>	<aphaerese>
12410	12411	<>	<elision3>
12410	12411	<>	<elision2>
12410	12411	<>	<elision1>
12410	12386	<A2kl>	<>
12410	12414	<L2kl>	<>
12411	12409	<>	<name>
12411	12411	<>	<aphaerese>
12411	12411	<>	<elision3>
12411	12411	<>	<elision2>
12411	12411	<>	<elision1>
12411	12384	<A2kl>	<>
12411	12412	<L2kl>	<>
12412	20	.	.
12412	21	 	 
12412	20	<~>	<~>
12412	20	<split-s>	<split-s>
12412	20	<split-h>	<split-h>
12412	20	<name2>	<name2>
12412	12413	<>	<name>
12412	24	<aphaerese>	<aphaerese>
12412	12412	<>	<aphaerese>
12412	20	<elision3>	<elision3>
12412	12412	<>	<elision3>
12412	20	<elision2>	<elision2>
12412	12412	<>	<elision2>
12412	20	<elision1>	<elision1>
12412	12412	<>	<elision1>
12412	28	.	υ
12412	11584	s	υ
12412	28	.	u
12412	11584	s	u
12412	12399	.	κ
12412	12293	s	κ
12412	12219	s	k
12412	12222	s	U
12412	12277	s	K
12412	28	.	α
12412	11584	s	α
12412	28	.	a
12412	11584	s	a
12412	12255	s	A
12412	12399	.	λ
12412	12293	s	λ
12412	12219	s	l
12412	12284	s	L
12412	12093	<A2>	<>
12413	23	.	.
12413	26	 	 
12413	23	<~>	<~>
12413	23	<split-s>	<split-s>
12413	23	<split-h>	<split-h>
12413	23	<name2>	<name2>
12413	12276	<aphaerese>	<aphaerese>
12413	12414	<>	<aphaerese>
12413	23	<elision3>	<elision3>
12413	12414	<>	<elision3>
12413	23	<elision2>	<elision2>
12413	12414	<>	<elision2>
12413	23	<elision1>	<elision1>
12413	12414	<>	<elision1>
12413	30	.	υ
12413	12147	s	υ
12413	30	.	u
12413	12147	s	u
12413	12401	.	κ
12413	12295	s	κ
12413	12221	s	k
12413	12224	s	U
12413	12279	s	K
12413	30	.	α
12413	12147	s	α
12413	30	.	a
12413	12147	s	a
12413	12257	s	A
12413	12401	.	λ
12413	12295	s	λ
12413	12221	s	l
12413	12286	s	L
12413	12094	<A2>	<>
12414	20	.	.
12414	21	 	 
12414	20	<~>	<~>
12414	20	<split-s>	<split-s>
12414	20	<split-h>	<split-h>
12414	20	<name2>	<name2>
12414	24	<aphaerese>	<aphaerese>
12414	12412	<>	<aphaerese>
12414	20	<elision3>	<elision3>
12414	12412	<>	<elision3>
12414	20	<elision2>	<elision2>
12414	12412	<>	<elision2>
12414	20	<elision1>	<elision1>
12414	12412	<>	<elision1>
12414	28	.	υ
12414	11584	s	υ
12414	28	.	u
12414	11584	s	u
12414	12399	.	κ
12414	12293	s	κ
12414	12219	s	k
12414	12222	s	U
12414	12277	s	K
12414	28	.	α
12414	11584	s	α
12414	28	.	a
12414	11584	s	a
12414	12255	s	A
12414	12399	.	λ
12414	12293	s	λ
12414	12219	s	l
12414	12284	s	L
12414	12092	<A2>	<>
12415	20	.	.
12415	21	 	 
12415	20	<~>	<~>
12415	20	<split-s>	<split-s>
12415	20	<split-h>	<split-h>
12415	20	<name2>	<name2>
12415	12300	<name2>	<name>
12415	12413	<>	<name>
12415	24	<aphaerese>	<aphaerese>
12415	12412	<>	<aphaerese>
12415	20	<elision3>	<elision3>
12415	12412	<>	<elision3>
12415	20	<elision2>	<elision2>
12415	12412	<>	<elision2>
12415	20	<elision1>	<elision1>
12415	12412	<>	<elision1>
12415	28	.	υ
12415	11584	s	υ
12415	28	.	u
12415	11584	s	u
12415	12399	.	κ
12415	12293	s	κ
12415	12219	s	k
12415	12222	s	U
12415	12277	s	K
12415	28	.	α
12415	11584	s	α
12415	28	.	a
12415	11584	s	a
12415	12255	s	A
12415	12399	.	λ
12415	12293	s	λ
12415	12219	s	l
12415	12284	s	L
12415	12099	<A2>	<>
12416	20	.	.
12416	21	 	 
12416	20	<~>	<~>
12416	20	<split-s>	<split-s>
12416	20	<split-h>	<split-h>
12416	20	<name2>	<name2>
12416	12335	<>	<name>
12416	24	<aphaerese>	<aphaerese>
12416	12334	<>	<aphaerese>
12416	12334	<>	<elision3>
12416	12334	<>	<elision2>
12416	12334	<>	<elision1>
12416	28	.	υ
12416	11584	s	υ
12416	28	.	u
12416	11584	s	u
12416	12148	.	κ
12416	12172	s	κ
12416	12219	s	k
12416	12222	s	U
12416	12277	s	K
12416	28	.	α
12416	11584	s	α
12416	28	.	a
12416	11584	s	a
12416	12255	s	A
12416	12219	s	λ
12416	12219	s	l
12416	12284	s	L
12416	12102	<A2>	<>
12417	20	.	.
12417	21	 	 
12417	20	<~>	<~>
12417	20	<split-s>	<split-s>
12417	20	<split-h>	<split-h>
12417	20	<name2>	<name2>
12417	12353	<>	<name>
12417	24	<aphaerese>	<aphaerese>
12417	12352	<>	<aphaerese>
12417	12355	<elision3>	<elision3>
12417	12352	<>	<elision3>
12417	12355	<elision2>	<elision2>
12417	12352	<>	<elision2>
12417	12355	<elision1>	<elision1>
12417	12352	<>	<elision1>
12417	28	.	υ
12417	11584	s	υ
12417	28	.	u
12417	11584	s	u
12417	28	.	κ
12417	12293	s	κ
12417	12219	s	k
12417	12222	s	U
12417	12277	s	K
12417	28	.	α
12417	11584	s	α
12417	28	.	a
12417	11584	s	a
12417	12255	s	A
12417	28	.	λ
12417	12293	s	λ
12417	12219	s	l
12417	12284	s	L
12417	12105	<A2>	<>
12418	20	.	.
12418	21	 	 
12418	20	<~>	<~>
12418	20	<split-s>	<split-s>
12418	20	<split-h>	<split-h>
12418	20	<name2>	<name2>
12418	12297	<>	<name>
12418	24	<aphaerese>	<aphaerese>
12418	12296	<>	<aphaerese>
12418	20	<elision3>	<elision3>
12418	12296	<>	<elision3>
12418	20	<elision2>	<elision2>
12418	12296	<>	<elision2>
12418	20	<elision1>	<elision1>
12418	12296	<>	<elision1>
12418	28	.	υ
12418	11584	s	υ
12418	28	.	u
12418	11584	s	u
12418	28	.	κ
12418	12293	s	κ
12418	12219	s	k
12418	12222	s	U
12418	12277	s	K
12418	28	.	α
12418	11584	s	α
12418	28	.	a
12418	11584	s	a
12418	12255	s	A
12418	28	.	λ
12418	12293	s	λ
12418	12219	s	l
12418	12284	s	L
12418	12108	<A2>	<>
12419	12378	<>	<name>
12419	12377	<>	<aphaerese>
12419	12377	<>	<elision3>
12419	12377	<>	<elision2>
12419	12377	<>	<elision1>
12419	12420	<U2kl>	<>
12420	20	.	.
12420	21	 	 
12420	20	<~>	<~>
12420	20	<split-s>	<split-s>
12420	20	<split-h>	<split-h>
12420	20	<name2>	<name2>
12420	12290	<>	<name>
12420	24	<aphaerese>	<aphaerese>
12420	20	<>	<aphaerese>
12420	20	<elision3>	<elision3>
12420	20	<>	<elision3>
12420	20	<elision2>	<elision2>
12420	20	<>	<elision2>
12420	20	<elision1>	<elision1>
12420	20	<>	<elision1>
12420	28	.	υ
12420	11584	s	υ
12420	28	.	u
12420	11584	s	u
12420	12148	.	κ
12420	12172	s	κ
12420	12219	s	k
12420	12222	s	U
12420	12277	s	K
12420	28	.	α
12420	11584	s	α
12420	28	.	a
12420	11584	s	a
12420	12255	s	A
12420	12219	s	λ
12420	12219	s	l
12420	12284	s	L
12420	12112	<A2>	<>
12421	12300	<name>	<name>
12421	12381	<>	<name>
12421	12383	<>	<aphaerese>
12421	12383	<>	<elision3>
12421	12383	<>	<elision2>
12421	12383	<>	<elision1>
12421	12076	<A2>	<>
12421	12384	<A2kl>	<>
12421	12396	<L2kl>	<>
12421	12422	<K2kl>	<>
12422	20	.	.
12422	21	 	 
12422	20	<~>	<~>
12422	20	<split-s>	<split-s>
12422	20	<split-h>	<split-h>
12422	20	<name2>	<name2>
12422	12300	<name2>	<name>
12422	12308	<>	<name>
12422	24	<aphaerese>	<aphaerese>
12422	12307	<>	<aphaerese>
12422	20	<elision3>	<elision3>
12422	12307	<>	<elision3>
12422	20	<elision2>	<elision2>
12422	12307	<>	<elision2>
12422	20	<elision1>	<elision1>
12422	12307	<>	<elision1>
12422	28	.	υ
12422	11584	s	υ
12422	28	.	u
12422	11584	s	u
12422	12293	s	κ
12422	12219	s	k
12422	12222	s	U
12422	12277	s	K
12422	28	.	α
12422	11584	s	α
12422	28	.	a
12422	11584	s	a
12422	12255	s	A
12422	12293	s	λ
12422	12219	s	l
12422	12284	s	L
12422	12116	<A2>	<>
12423	12406	<>	<name>
12423	12405	<>	<aphaerese>
12423	12405	<>	<elision3>
12423	12405	<>	<elision2>
12423	12405	<>	<elision1>
12423	12420	<A2kl>	<>
12424	12300	<name>	<name>
12424	12409	<>	<name>
12424	12411	<>	<aphaerese>
12424	12411	<>	<elision3>
12424	12411	<>	<elision2>
12424	12411	<>	<elision1>
12424	12076	<A2>	<>
12424	12384	<A2kl>	<>
12424	12425	<L2kl>	<>
12425	20	.	.
12425	21	 	 
12425	20	<~>	<~>
12425	20	<split-s>	<split-s>
12425	20	<split-h>	<split-h>
12425	20	<name2>	<name2>
12425	12300	<name2>	<name>
12425	12413	<>	<name>
12425	24	<aphaerese>	<aphaerese>
12425	12412	<>	<aphaerese>
12425	20	<elision3>	<elision3>
12425	12412	<>	<elision3>
12425	20	<elision2>	<elision2>
12425	12412	<>	<elision2>
12425	20	<elision1>	<elision1>
12425	12412	<>	<elision1>
12425	28	.	υ
12425	11584	s	υ
12425	28	.	u
12425	11584	s	u
12425	12399	.	κ
12425	12293	s	κ
12425	12219	s	k
12425	12222	s	U
12425	12277	s	K
12425	28	.	α
12425	11584	s	α
12425	28	.	a
12425	11584	s	a
12425	12255	s	A
12425	12399	.	λ
12425	12293	s	λ
12425	12219	s	l
12425	12284	s	L
12425	12121	<A2>	<>
12426	12323	.	.
12426	12324	 	 
12426	12323	<~>	<~>
12426	12323	<split-s>	<split-s>
12426	12323	<split-h>	<split-h>
12426	12323	<name2>	<name2>
12426	12327	<aphaerese>	<aphaerese>
12426	12327	<>	<aphaerese>
12426	12323	<elision3>	<elision3>
12426	12327	<>	<elision3>
12426	12323	<elision2>	<elision2>
12426	12327	<>	<elision2>
12426	12323	<elision1>	<elision1>
12426	12327	<>	<elision1>
12426	12323	.	υ
12426	12323	.	u
12426	12337	.	κ
12426	12352	s	κ
12426	12296	s	k
12426	12377	s	U
12426	12299	s	K
12426	12323	.	α
12426	12323	.	a
12426	12405	s	A
12426	12296	s	λ
12426	12296	s	l
12426	12311	s	L
12426	11751	<A1>	<>
12427	12323	.	.
12427	12324	 	 
12427	12323	<~>	<~>
12427	12323	<split-s>	<split-s>
12427	12323	<split-h>	<split-h>
12427	12323	<name2>	<name2>
12427	12327	<aphaerese>	<aphaerese>
12427	12330	<>	<aphaerese>
12427	12323	<elision3>	<elision3>
12427	12330	<>	<elision3>
12427	12323	<elision2>	<elision2>
12427	12330	<>	<elision2>
12427	12323	<elision1>	<elision1>
12427	12330	<>	<elision1>
12427	12331	.	υ
12427	12334	s	υ
12427	12331	.	u
12427	12334	s	u
12427	12337	.	κ
12427	12352	s	κ
12427	12296	s	k
12427	12377	s	U
12427	12380	s	K
12427	12331	.	α
12427	12334	s	α
12427	12331	.	a
12427	12334	s	a
12427	12405	s	A
12427	12296	s	λ
12427	12296	s	l
12427	12408	s	L
12427	11764	<A1>	<>
12428	12326	.	.
12428	12329	 	 
12428	12326	<~>	<~>
12428	12326	<split-s>	<split-s>
12428	12326	<split-h>	<split-h>
12428	12326	<name2>	<name2>
12428	12426	<aphaerese>	<aphaerese>
12428	12326	<>	<aphaerese>
12428	12326	<elision3>	<elision3>
12428	12326	<>	<elision3>
12428	12326	<elision2>	<elision2>
12428	12326	<>	<elision2>
12428	12326	<elision1>	<elision1>
12428	12326	<>	<elision1>
12428	12333	.	υ
12428	12336	s	υ
12428	12333	.	u
12428	12336	s	u
12428	12339	.	κ
12428	12354	s	κ
12428	12298	s	k
12428	12379	s	U
12428	12302	s	K
12428	12333	.	α
12428	12336	s	α
12428	12333	.	a
12428	12336	s	a
12428	12407	s	A
12428	12298	s	λ
12428	12298	s	l
12428	12313	s	L
12428	11766	<A1>	<>
12429	12326	.	.
12429	12329	 	 
12429	12326	<~>	<~>
12429	12326	<split-s>	<split-s>
12429	12326	<split-h>	<split-h>
12429	12326	<name2>	<name2>
12429	12426	<aphaerese>	<aphaerese>
12429	12430	<>	<aphaerese>
12429	12433	<elision3>	<elision3>
12429	12430	<>	<elision3>
12429	12433	<elision2>	<elision2>
12429	12430	<>	<elision2>
12429	12433	<elision1>	<elision1>
12429	12430	<>	<elision1>
12429	12333	.	υ
12429	12336	s	υ
12429	12333	.	u
12429	12336	s	u
12429	12333	.	κ
12429	12292	s	κ
12429	12298	s	k
12429	12379	s	U
12429	12302	s	K
12429	12333	.	α
12429	12336	s	α
12429	12333	.	a
12429	12336	s	a
12429	12407	s	A
12429	12333	.	λ
12429	12292	s	λ
12429	12298	s	l
12429	12313	s	L
12429	11945	<A1>	<>
12430	12323	.	.
12430	12324	 	 
12430	12323	<~>	<~>
12430	12323	<split-s>	<split-s>
12430	12323	<split-h>	<split-h>
12430	12323	<name2>	<name2>
12430	12327	<aphaerese>	<aphaerese>
12430	12322	<>	<aphaerese>
12430	12431	<elision3>	<elision3>
12430	12322	<>	<elision3>
12430	12431	<elision2>	<elision2>
12430	12322	<>	<elision2>
12430	12431	<elision1>	<elision1>
12430	12322	<>	<elision1>
12430	12331	.	υ
12430	12334	s	υ
12430	12331	.	u
12430	12334	s	u
12430	12331	.	κ
12430	19	s	κ
12430	12296	s	k
12430	12377	s	U
12430	12299	s	K
12430	12331	.	α
12430	12334	s	α
12430	12331	.	a
12430	12334	s	a
12430	12405	s	A
12430	12331	.	λ
12430	19	s	λ
12430	12296	s	l
12430	12311	s	L
12430	11943	<A1>	<>
12431	12323	.	.
12431	12324	 	 
12431	12323	<~>	<~>
12431	12323	<split-s>	<split-s>
12431	12323	<split-h>	<split-h>
12431	12323	<name2>	<name2>
12431	12432	<>	<name>
12431	12327	<aphaerese>	<aphaerese>
12431	12431	<>	<aphaerese>
12431	12323	<elision3>	<elision3>
12431	12431	<>	<elision3>
12431	12323	<elision2>	<elision2>
12431	12431	<>	<elision2>
12431	12323	<elision1>	<elision1>
12431	12431	<>	<elision1>
12431	12331	.	υ
12431	12334	s	υ
12431	12331	.	u
12431	12334	s	u
12431	12337	.	κ
12431	12434	s	κ
12431	12437	s	k
12431	12377	s	U
12431	12440	s	K
12431	12331	.	α
12431	12334	s	α
12431	12331	.	a
12431	12334	s	a
12431	12405	s	A
12431	12437	s	λ
12431	12437	s	l
12431	12448	s	L
12431	11847	<A1>	<>
12432	12326	.	.
12432	12329	 	 
12432	12326	<~>	<~>
12432	12326	<split-s>	<split-s>
12432	12326	<split-h>	<split-h>
12432	12326	<name2>	<name2>
12432	12426	<aphaerese>	<aphaerese>
12432	12433	<>	<aphaerese>
12432	12326	<elision3>	<elision3>
12432	12433	<>	<elision3>
12432	12326	<elision2>	<elision2>
12432	12433	<>	<elision2>
12432	12326	<elision1>	<elision1>
12432	12433	<>	<elision1>
12432	12333	.	υ
12432	12336	s	υ
12432	12333	.	u
12432	12336	s	u
12432	12339	.	κ
12432	12436	s	κ
12432	12439	s	k
12432	12379	s	U
12432	12442	s	K
12432	12333	.	α
12432	12336	s	α
12432	12333	.	a
12432	12336	s	a
12432	12407	s	A
12432	12439	s	λ
12432	12439	s	l
12432	12450	s	L
12432	11848	<A1>	<>
12433	12323	.	.
12433	12324	 	 
12433	12323	<~>	<~>
12433	12323	<split-s>	<split-s>
12433	12323	<split-h>	<split-h>
12433	12323	<name2>	<name2>
12433	12327	<aphaerese>	<aphaerese>
12433	12431	<>	<aphaerese>
12433	12323	<elision3>	<elision3>
12433	12431	<>	<elision3>
12433	12323	<elision2>	<elision2>
12433	12431	<>	<elision2>
12433	12323	<elision1>	<elision1>
12433	12431	<>	<elision1>
12433	12331	.	υ
12433	12334	s	υ
12433	12331	.	u
12433	12334	s	u
12433	12337	.	κ
12433	12434	s	κ
12433	12437	s	k
12433	12377	s	U
12433	12440	s	K
12433	12331	.	α
12433	12334	s	α
12433	12331	.	a
12433	12334	s	a
12433	12405	s	A
12433	12437	s	λ
12433	12437	s	l
12433	12448	s	L
12433	11846	<A1>	<>
12434	20	.	.
12434	21	 	 
12434	20	<~>	<~>
12434	20	<split-s>	<split-s>
12434	20	<split-h>	<split-h>
12434	20	<name2>	<name2>
12434	12435	<>	<name>
12434	24	<aphaerese>	<aphaerese>
12434	12434	<>	<aphaerese>
12434	12355	<elision3>	<elision3>
12434	12434	<>	<elision3>
12434	12355	<elision2>	<elision2>
12434	12434	<>	<elision2>
12434	12355	<elision1>	<elision1>
12434	12434	<>	<elision1>
12434	28	.	υ
12434	11584	s	υ
12434	28	.	u
12434	11584	s	u
12434	28	.	κ
12434	12222	s	U
12434	28	.	α
12434	11584	s	α
12434	28	.	a
12434	11584	s	a
12434	12255	s	A
12434	28	.	λ
12434	12182	<A2>	<>
12435	23	.	.
12435	26	 	 
12435	23	<~>	<~>
12435	23	<split-s>	<split-s>
12435	23	<split-h>	<split-h>
12435	23	<name2>	<name2>
12435	12276	<aphaerese>	<aphaerese>
12435	12436	<>	<aphaerese>
12435	12357	<elision3>	<elision3>
12435	12436	<>	<elision3>
12435	12357	<elision2>	<elision2>
12435	12436	<>	<elision2>
12435	12357	<elision1>	<elision1>
12435	12436	<>	<elision1>
12435	30	.	υ
12435	12147	s	υ
12435	30	.	u
12435	12147	s	u
12435	30	.	κ
12435	12224	s	U
12435	30	.	α
12435	12147	s	α
12435	30	.	a
12435	12147	s	a
12435	12257	s	A
12435	30	.	λ
12435	12183	<A2>	<>
12436	20	.	.
12436	21	 	 
12436	20	<~>	<~>
12436	20	<split-s>	<split-s>
12436	20	<split-h>	<split-h>
12436	20	<name2>	<name2>
12436	24	<aphaerese>	<aphaerese>
12436	12434	<>	<aphaerese>
12436	12355	<elision3>	<elision3>
12436	12434	<>	<elision3>
12436	12355	<elision2>	<elision2>
12436	12434	<>	<elision2>
12436	12355	<elision1>	<elision1>
12436	12434	<>	<elision1>
12436	28	.	υ
12436	11584	s	υ
12436	28	.	u
12436	11584	s	u
12436	28	.	κ
12436	12222	s	U
12436	28	.	α
12436	11584	s	α
12436	28	.	a
12436	11584	s	a
12436	12255	s	A
12436	28	.	λ
12436	12181	<A2>	<>
12437	20	.	.
12437	21	 	 
12437	20	<~>	<~>
12437	20	<split-s>	<split-s>
12437	20	<split-h>	<split-h>
12437	20	<name2>	<name2>
12437	12438	<>	<name>
12437	24	<aphaerese>	<aphaerese>
12437	12437	<>	<aphaerese>
12437	20	<elision3>	<elision3>
12437	12437	<>	<elision3>
12437	20	<elision2>	<elision2>
12437	12437	<>	<elision2>
12437	20	<elision1>	<elision1>
12437	12437	<>	<elision1>
12437	28	.	υ
12437	11584	s	υ
12437	28	.	u
12437	11584	s	u
12437	28	.	κ
12437	12222	s	U
12437	28	.	α
12437	11584	s	α
12437	28	.	a
12437	11584	s	a
12437	12255	s	A
12437	28	.	λ
12437	12191	<A2>	<>
12438	23	.	.
12438	26	 	 
12438	23	<~>	<~>
12438	23	<split-s>	<split-s>
12438	23	<split-h>	<split-h>
12438	23	<name2>	<name2>
12438	12276	<aphaerese>	<aphaerese>
12438	12439	<>	<aphaerese>
12438	23	<elision3>	<elision3>
12438	12439	<>	<elision3>
12438	23	<elision2>	<elision2>
12438	12439	<>	<elision2>
12438	23	<elision1>	<elision1>
12438	12439	<>	<elision1>
12438	30	.	υ
12438	12147	s	υ
12438	30	.	u
12438	12147	s	u
12438	30	.	κ
12438	12224	s	U
12438	30	.	α
12438	12147	s	α
12438	30	.	a
12438	12147	s	a
12438	12257	s	A
12438	30	.	λ
12438	12192	<A2>	<>
12439	20	.	.
12439	21	 	 
12439	20	<~>	<~>
12439	20	<split-s>	<split-s>
12439	20	<split-h>	<split-h>
12439	20	<name2>	<name2>
12439	24	<aphaerese>	<aphaerese>
12439	12437	<>	<aphaerese>
12439	20	<elision3>	<elision3>
12439	12437	<>	<elision3>
12439	20	<elision2>	<elision2>
12439	12437	<>	<elision2>
12439	20	<elision1>	<elision1>
12439	12437	<>	<elision1>
12439	28	.	υ
12439	11584	s	υ
12439	28	.	u
12439	11584	s	u
12439	28	.	κ
12439	12222	s	U
12439	28	.	α
12439	11584	s	α
12439	28	.	a
12439	11584	s	a
12439	12255	s	A
12439	28	.	λ
12439	12190	<A2>	<>
12440	12300	<name>	<name>
12440	12441	<>	<name>
12440	12443	<>	<aphaerese>
12440	12443	<>	<elision3>
12440	12443	<>	<elision2>
12440	12443	<>	<elision1>
12440	12076	<A2>	<>
12440	12304	<L2kl>	<>
12440	12447	<K2kl>	<>
12441	12442	<>	<aphaerese>
12441	12442	<>	<elision3>
12441	12442	<>	<elision2>
12441	12442	<>	<elision1>
12441	12305	<L2kl>	<>
12441	12445	<K2kl>	<>
12442	12443	<>	<aphaerese>
12442	12443	<>	<elision3>
12442	12443	<>	<elision2>
12442	12443	<>	<elision1>
12442	12306	<L2kl>	<>
12442	12446	<K2kl>	<>
12443	12441	<>	<name>
12443	12443	<>	<aphaerese>
12443	12443	<>	<elision3>
12443	12443	<>	<elision2>
12443	12443	<>	<elision1>
12443	12304	<L2kl>	<>
12443	12444	<K2kl>	<>
12444	20	.	.
12444	21	 	 
12444	20	<~>	<~>
12444	20	<split-s>	<split-s>
12444	20	<split-h>	<split-h>
12444	20	<name2>	<name2>
12444	12445	<>	<name>
12444	24	<aphaerese>	<aphaerese>
12444	12444	<>	<aphaerese>
12444	20	<elision3>	<elision3>
12444	12444	<>	<elision3>
12444	20	<elision2>	<elision2>
12444	12444	<>	<elision2>
12444	20	<elision1>	<elision1>
12444	12444	<>	<elision1>
12444	28	.	υ
12444	11584	s	υ
12444	28	.	u
12444	11584	s	u
12444	12222	s	U
12444	28	.	α
12444	11584	s	α
12444	28	.	a
12444	11584	s	a
12444	12255	s	A
12444	12204	<A2>	<>
12445	23	.	.
12445	26	 	 
12445	23	<~>	<~>
12445	23	<split-s>	<split-s>
12445	23	<split-h>	<split-h>
12445	23	<name2>	<name2>
12445	12276	<aphaerese>	<aphaerese>
12445	12446	<>	<aphaerese>
12445	23	<elision3>	<elision3>
12445	12446	<>	<elision3>
12445	23	<elision2>	<elision2>
12445	12446	<>	<elision2>
12445	23	<elision1>	<elision1>
12445	12446	<>	<elision1>
12445	30	.	υ
12445	12147	s	υ
12445	30	.	u
12445	12147	s	u
12445	12224	s	U
12445	30	.	α
12445	12147	s	α
12445	30	.	a
12445	12147	s	a
12445	12257	s	A
12445	12205	<A2>	<>
12446	20	.	.
12446	21	 	 
12446	20	<~>	<~>
12446	20	<split-s>	<split-s>
12446	20	<split-h>	<split-h>
12446	20	<name2>	<name2>
12446	24	<aphaerese>	<aphaerese>
12446	12444	<>	<aphaerese>
12446	20	<elision3>	<elision3>
12446	12444	<>	<elision3>
12446	20	<elision2>	<elision2>
12446	12444	<>	<elision2>
12446	20	<elision1>	<elision1>
12446	12444	<>	<elision1>
12446	28	.	υ
12446	11584	s	υ
12446	28	.	u
12446	11584	s	u
12446	12222	s	U
12446	28	.	α
12446	11584	s	α
12446	28	.	a
12446	11584	s	a
12446	12255	s	A
12446	12203	<A2>	<>
12447	20	.	.
12447	21	 	 
12447	20	<~>	<~>
12447	20	<split-s>	<split-s>
12447	20	<split-h>	<split-h>
12447	20	<name2>	<name2>
12447	12300	<name2>	<name>
12447	12445	<>	<name>
12447	24	<aphaerese>	<aphaerese>
12447	12444	<>	<aphaerese>
12447	20	<elision3>	<elision3>
12447	12444	<>	<elision3>
12447	20	<elision2>	<elision2>
12447	12444	<>	<elision2>
12447	20	<elision1>	<elision1>
12447	12444	<>	<elision1>
12447	28	.	υ
12447	11584	s	υ
12447	28	.	u
12447	11584	s	u
12447	12222	s	U
12447	28	.	α
12447	11584	s	α
12447	28	.	a
12447	11584	s	a
12447	12255	s	A
12447	12210	<A2>	<>
12448	12300	<name>	<name>
12448	12449	<>	<name>
12448	12451	<>	<aphaerese>
12448	12451	<>	<elision3>
12448	12451	<>	<elision2>
12448	12451	<>	<elision1>
12448	12076	<A2>	<>
12448	12452	<L2kl>	<>
12449	12450	<>	<aphaerese>
12449	12450	<>	<elision3>
12449	12450	<>	<elision2>
12449	12450	<>	<elision1>
12449	12438	<L2kl>	<>
12450	12451	<>	<aphaerese>
12450	12451	<>	<elision3>
12450	12451	<>	<elision2>
12450	12451	<>	<elision1>
12450	12439	<L2kl>	<>
12451	12449	<>	<name>
12451	12451	<>	<aphaerese>
12451	12451	<>	<elision3>
12451	12451	<>	<elision2>
12451	12451	<>	<elision1>
12451	12437	<L2kl>	<>
12452	20	.	.
12452	21	 	 
12452	20	<~>	<~>
12452	20	<split-s>	<split-s>
12452	20	<split-h>	<split-h>
12452	20	<name2>	<name2>
12452	12300	<name2>	<name>
12452	12438	<>	<name>
12452	24	<aphaerese>	<aphaerese>
12452	12437	<>	<aphaerese>
12452	20	<elision3>	<elision3>
12452	12437	<>	<elision3>
12452	20	<elision2>	<elision2>
12452	12437	<>	<elision2>
12452	20	<elision1>	<elision1>
12452	12437	<>	<elision1>
12452	28	.	υ
12452	11584	s	υ
12452	28	.	u
12452	11584	s	u
12452	28	.	κ
12452	12222	s	U
12452	28	.	α
12452	11584	s	α
12452	28	.	a
12452	11584	s	a
12452	12255	s	A
12452	28	.	λ
12452	12217	<A2>	<>
12453	12323	.	.
12453	12324	 	 
12453	12323	<~>	<~>
12453	12323	<split-s>	<split-s>
12453	12323	<split-h>	<split-h>
12453	12323	<name2>	<name2>
12453	12454	<>	<name>
12453	12327	<aphaerese>	<aphaerese>
12453	12453	<>	<aphaerese>
12453	12323	<elision3>	<elision3>
12453	12453	<>	<elision3>
12453	12323	<elision2>	<elision2>
12453	12453	<>	<elision2>
12453	12323	<elision1>	<elision1>
12453	12453	<>	<elision1>
12453	12331	.	υ
12453	12334	s	υ
12453	12331	.	u
12453	12334	s	u
12453	12331	.	κ
12453	19	s	κ
12453	12296	s	k
12453	12377	s	U
12453	12299	s	K
12453	12331	.	α
12453	12334	s	α
12453	12331	.	a
12453	12334	s	a
12453	12405	s	A
12453	12331	.	λ
12453	19	s	λ
12453	12296	s	l
12453	12311	s	L
12453	11956	<A1>	<>
12454	12326	.	.
12454	12329	 	 
12454	12326	<~>	<~>
12454	12326	<split-s>	<split-s>
12454	12326	<split-h>	<split-h>
12454	12326	<name2>	<name2>
12454	12426	<aphaerese>	<aphaerese>
12454	12455	<>	<aphaerese>
12454	12326	<elision3>	<elision3>
12454	12455	<>	<elision3>
12454	12326	<elision2>	<elision2>
12454	12455	<>	<elision2>
12454	12326	<elision1>	<elision1>
12454	12455	<>	<elision1>
12454	12333	.	υ
12454	12336	s	υ
12454	12333	.	u
12454	12336	s	u
12454	12333	.	κ
12454	12292	s	κ
12454	12298	s	k
12454	12379	s	U
12454	12302	s	K
12454	12333	.	α
12454	12336	s	α
12454	12333	.	a
12454	12336	s	a
12454	12407	s	A
12454	12333	.	λ
12454	12292	s	λ
12454	12298	s	l
12454	12313	s	L
12454	11957	<A1>	<>
12455	12323	.	.
12455	12324	 	 
12455	12323	<~>	<~>
12455	12323	<split-s>	<split-s>
12455	12323	<split-h>	<split-h>
12455	12323	<name2>	<name2>
12455	12327	<aphaerese>	<aphaerese>
12455	12453	<>	<aphaerese>
12455	12323	<elision3>	<elision3>
12455	12453	<>	<elision3>
12455	12323	<elision2>	<elision2>
12455	12453	<>	<elision2>
12455	12323	<elision1>	<elision1>
12455	12453	<>	<elision1>
12455	12331	.	υ
12455	12334	s	υ
12455	12331	.	u
12455	12334	s	u
12455	12331	.	κ
12455	19	s	κ
12455	12296	s	k
12455	12377	s	U
12455	12299	s	K
12455	12331	.	α
12455	12334	s	α
12455	12331	.	a
12455	12334	s	a
12455	12405	s	A
12455	12331	.	λ
12455	19	s	λ
12455	12296	s	l
12455	12311	s	L
12455	11955	<A1>	<>
12456	12457	<>	<name>
12456	12456	<>	<aphaerese>
12456	12456	<>	<elision3>
12456	12456	<>	<elision2>
12456	12456	<>	<elision1>
12456	12323	<U2kl>	<>
12457	12458	<>	<aphaerese>
12457	12458	<>	<elision3>
12457	12458	<>	<elision2>
12457	12458	<>	<elision1>
12457	12428	<U2kl>	<>
12458	12456	<>	<aphaerese>
12458	12456	<>	<elision3>
12458	12456	<>	<elision2>
12458	12456	<>	<elision1>
12458	12326	<U2kl>	<>
12459	12460	<name>	<name>
12459	12461	<>	<name>
12459	12463	<>	<aphaerese>
12459	12463	<>	<elision3>
12459	12463	<>	<elision2>
12459	12463	<>	<elision1>
12459	12076	<A1>	<>
12459	12464	<L2kl>	<>
12459	12470	<K2kl>	<>
12460	12302	s	k
12460	12313	s	l
12460	11966	<A1>	<>
12461	12462	<>	<aphaerese>
12461	12462	<>	<elision3>
12461	12462	<>	<elision2>
12461	12462	<>	<elision1>
12461	12465	<L2kl>	<>
12461	12468	<K2kl>	<>
12462	12463	<>	<aphaerese>
12462	12463	<>	<elision3>
12462	12463	<>	<elision2>
12462	12463	<>	<elision1>
12462	12466	<L2kl>	<>
12462	12469	<K2kl>	<>
12463	12461	<>	<name>
12463	12463	<>	<aphaerese>
12463	12463	<>	<elision3>
12463	12463	<>	<elision2>
12463	12463	<>	<elision1>
12463	12464	<L2kl>	<>
12463	12467	<K2kl>	<>
12464	12465	<>	<name>
12464	12464	<>	<aphaerese>
12464	12464	<>	<elision3>
12464	12464	<>	<elision2>
12464	12464	<>	<elision1>
12464	12331	.	κ
12464	12331	.	λ
12464	12132	<A1>	<>
12465	12466	<>	<aphaerese>
12465	12466	<>	<elision3>
12465	12466	<>	<elision2>
12465	12466	<>	<elision1>
12465	12333	.	κ
12465	12333	.	λ
12465	12133	<A1>	<>
12466	12464	<>	<aphaerese>
12466	12464	<>	<elision3>
12466	12464	<>	<elision2>
12466	12464	<>	<elision1>
12466	12331	.	κ
12466	12331	.	λ
12466	12131	<A1>	<>
12467	12323	.	.
12467	12324	 	 
12467	12323	<~>	<~>
12467	12323	<split-s>	<split-s>
12467	12323	<split-h>	<split-h>
12467	12323	<name2>	<name2>
12467	12468	<>	<name>
12467	12327	<aphaerese>	<aphaerese>
12467	12467	<>	<aphaerese>
12467	12323	<elision3>	<elision3>
12467	12467	<>	<elision3>
12467	12323	<elision2>	<elision2>
12467	12467	<>	<elision2>
12467	12323	<elision1>	<elision1>
12467	12467	<>	<elision1>
12467	12331	.	υ
12467	12334	s	υ
12467	12331	.	u
12467	12334	s	u
12467	19	s	κ
12467	12296	s	k
12467	12377	s	U
12467	12299	s	K
12467	12331	.	α
12467	12334	s	α
12467	12331	.	a
12467	12334	s	a
12467	12405	s	A
12467	19	s	λ
12467	12296	s	l
12467	12311	s	L
12467	12071	<A1>	<>
12468	12326	.	.
12468	12329	 	 
12468	12326	<~>	<~>
12468	12326	<split-s>	<split-s>
12468	12326	<split-h>	<split-h>
12468	12326	<name2>	<name2>
12468	12426	<aphaerese>	<aphaerese>
12468	12469	<>	<aphaerese>
12468	12326	<elision3>	<elision3>
12468	12469	<>	<elision3>
12468	12326	<elision2>	<elision2>
12468	12469	<>	<elision2>
12468	12326	<elision1>	<elision1>
12468	12469	<>	<elision1>
12468	12333	.	υ
12468	12336	s	υ
12468	12333	.	u
12468	12336	s	u
12468	12292	s	κ
12468	12298	s	k
12468	12379	s	U
12468	12302	s	K
12468	12333	.	α
12468	12336	s	α
12468	12333	.	a
12468	12336	s	a
12468	12407	s	A
12468	12292	s	λ
12468	12298	s	l
12468	12313	s	L
12468	12072	<A1>	<>
12469	12323	.	.
12469	12324	 	 
12469	12323	<~>	<~>
12469	12323	<split-s>	<split-s>
12469	12323	<split-h>	<split-h>
12469	12323	<name2>	<name2>
12469	12327	<aphaerese>	<aphaerese>
12469	12467	<>	<aphaerese>
12469	12323	<elision3>	<elision3>
12469	12467	<>	<elision3>
12469	12323	<elision2>	<elision2>
12469	12467	<>	<elision2>
12469	12323	<elision1>	<elision1>
12469	12467	<>	<elision1>
12469	12331	.	υ
12469	12334	s	υ
12469	12331	.	u
12469	12334	s	u
12469	19	s	κ
12469	12296	s	k
12469	12377	s	U
12469	12299	s	K
12469	12331	.	α
12469	12334	s	α
12469	12331	.	a
12469	12334	s	a
12469	12405	s	A
12469	19	s	λ
12469	12296	s	l
12469	12311	s	L
12469	12070	<A1>	<>
12470	12323	.	.
12470	12324	 	 
12470	12323	<~>	<~>
12470	12323	<split-s>	<split-s>
12470	12323	<split-h>	<split-h>
12470	12323	<name2>	<name2>
12470	12460	<name2>	<name>
12470	12468	<>	<name>
12470	12327	<aphaerese>	<aphaerese>
12470	12467	<>	<aphaerese>
12470	12323	<elision3>	<elision3>
12470	12467	<>	<elision3>
12470	12323	<elision2>	<elision2>
12470	12467	<>	<elision2>
12470	12323	<elision1>	<elision1>
12470	12467	<>	<elision1>
12470	12331	.	υ
12470	12334	s	υ
12470	12331	.	u
12470	12334	s	u
12470	19	s	κ
12470	12296	s	k
12470	12377	s	U
12470	12299	s	K
12470	12331	.	α
12470	12334	s	α
12470	12331	.	a
12470	12334	s	a
12470	12405	s	A
12470	19	s	λ
12470	12296	s	l
12470	12311	s	L
12470	12080	<A1>	<>
12471	12472	<>	<name>
12471	12471	<>	<aphaerese>
12471	12471	<>	<elision3>
12471	12471	<>	<elision2>
12471	12471	<>	<elision1>
12471	12323	<A2kl>	<>
12472	12473	<>	<aphaerese>
12472	12473	<>	<elision3>
12472	12473	<>	<elision2>
12472	12473	<>	<elision1>
12472	12428	<A2kl>	<>
12473	12471	<>	<aphaerese>
12473	12471	<>	<elision3>
12473	12471	<>	<elision2>
12473	12471	<>	<elision1>
12473	12326	<A2kl>	<>
12474	12460	<name>	<name>
12474	12475	<>	<name>
12474	12477	<>	<aphaerese>
12474	12477	<>	<elision3>
12474	12477	<>	<elision2>
12474	12477	<>	<elision1>
12474	12076	<A1>	<>
12474	12478	<L2kl>	<>
12475	12476	<>	<aphaerese>
12475	12476	<>	<elision3>
12475	12476	<>	<elision2>
12475	12476	<>	<elision1>
12475	12454	<L2kl>	<>
12476	12477	<>	<aphaerese>
12476	12477	<>	<elision3>
12476	12477	<>	<elision2>
12476	12477	<>	<elision1>
12476	12455	<L2kl>	<>
12477	12475	<>	<name>
12477	12477	<>	<aphaerese>
12477	12477	<>	<elision3>
12477	12477	<>	<elision2>
12477	12477	<>	<elision1>
12477	12453	<L2kl>	<>
12478	12323	.	.
12478	12324	 	 
12478	12323	<~>	<~>
12478	12323	<split-s>	<split-s>
12478	12323	<split-h>	<split-h>
12478	12323	<name2>	<name2>
12478	12460	<name2>	<name>
12478	12454	<>	<name>
12478	12327	<aphaerese>	<aphaerese>
12478	12453	<>	<aphaerese>
12478	12323	<elision3>	<elision3>
12478	12453	<>	<elision3>
12478	12323	<elision2>	<elision2>
12478	12453	<>	<elision2>
12478	12323	<elision1>	<elision1>
12478	12453	<>	<elision1>
12478	12331	.	υ
12478	12334	s	υ
12478	12331	.	u
12478	12334	s	u
12478	12331	.	κ
12478	19	s	κ
12478	12296	s	k
12478	12377	s	U
12478	12299	s	K
12478	12331	.	α
12478	12334	s	α
12478	12331	.	a
12478	12334	s	a
12478	12405	s	A
12478	12331	.	λ
12478	19	s	λ
12478	12296	s	l
12478	12311	s	L
12478	12142	<A1>	<>
12479	1	.	.
12479	0	 	 
12479	1	<~>	<~>
12479	1	<split-s>	<split-s>
12479	1	<split-h>	<split-h>
12479	1	<name2>	<name2>
12479	4	<aphaerese>	<aphaerese>
12479	7	<>	<aphaerese>
12479	1	<elision3>	<elision3>
12479	7	<>	<elision3>
12479	1	<elision2>	<elision2>
12479	7	<>	<elision2>
12479	1	<elision1>	<elision1>
12479	7	<>	<elision1>
12479	12480	.	υ
12479	12483	s	υ
12479	11436	H	υ
12479	12480	.	u
12479	12483	s	u
12479	11438	H	u
12479	10	.	κ
12479	12322	s	κ
12479	11018	H	κ
12479	12453	s	k
12479	11346	H	k
12479	12456	s	U
12479	11359	H	U
12479	12486	s	K
12479	11362	H	K
12479	12480	.	α
12479	12483	s	α
12479	11422	H	α
12479	12480	.	a
12479	12483	s	a
12479	11427	H	a
12479	12471	s	A
12479	11189	H	A
12479	12453	s	λ
12479	11373	H	λ
12479	12453	s	l
12479	11755	H	l
12479	12511	s	L
12479	11760	H	L
12479	11444	<K>	<>
12480	12481	<>	<name>
12480	12480	<>	<aphaerese>
12480	1	<elision3>	<elision3>
12480	12480	<>	<elision3>
12480	1	<elision2>	<elision2>
12480	12480	<>	<elision2>
12480	1	<elision1>	<elision1>
12480	12480	<>	<elision1>
12480	11441	<K>	<>
12481	12482	<>	<aphaerese>
12481	3	<elision3>	<elision3>
12481	12482	<>	<elision3>
12481	3	<elision2>	<elision2>
12481	12482	<>	<elision2>
12481	3	<elision1>	<elision1>
12481	12482	<>	<elision1>
12481	11439	<K>	<>
12482	12480	<>	<aphaerese>
12482	1	<elision3>	<elision3>
12482	12480	<>	<elision3>
12482	1	<elision2>	<elision2>
12482	12480	<>	<elision2>
12482	1	<elision1>	<elision1>
12482	12480	<>	<elision1>
12482	11440	<K>	<>
12483	12323	.	.
12483	12324	 	 
12483	12323	<~>	<~>
12483	12323	<split-s>	<split-s>
12483	12323	<split-h>	<split-h>
12483	12323	<name2>	<name2>
12483	12484	<>	<name>
12483	12327	<aphaerese>	<aphaerese>
12483	12483	<>	<aphaerese>
12483	12483	<>	<elision3>
12483	12483	<>	<elision2>
12483	12483	<>	<elision1>
12483	12331	.	υ
12483	12334	s	υ
12483	12331	.	u
12483	12334	s	u
12483	12337	.	κ
12483	12352	s	κ
12483	12296	s	k
12483	12377	s	U
12483	12299	s	K
12483	12331	.	α
12483	12334	s	α
12483	12331	.	a
12483	12334	s	a
12483	12405	s	A
12483	12296	s	λ
12483	12296	s	l
12483	12311	s	L
12483	11770	<A1>	<>
12484	12326	.	.
12484	12329	 	 
12484	12326	<~>	<~>
12484	12326	<split-s>	<split-s>
12484	12326	<split-h>	<split-h>
12484	12326	<name2>	<name2>
12484	12426	<aphaerese>	<aphaerese>
12484	12485	<>	<aphaerese>
12484	12485	<>	<elision3>
12484	12485	<>	<elision2>
12484	12485	<>	<elision1>
12484	12333	.	υ
12484	12336	s	υ
12484	12333	.	u
12484	12336	s	u
12484	12339	.	κ
12484	12354	s	κ
12484	12298	s	k
12484	12379	s	U
12484	12302	s	K
12484	12333	.	α
12484	12336	s	α
12484	12333	.	a
12484	12336	s	a
12484	12407	s	A
12484	12298	s	λ
12484	12298	s	l
12484	12313	s	L
12484	11771	<A1>	<>
12485	12323	.	.
12485	12324	 	 
12485	12323	<~>	<~>
12485	12323	<split-s>	<split-s>
12485	12323	<split-h>	<split-h>
12485	12323	<name2>	<name2>
12485	12327	<aphaerese>	<aphaerese>
12485	12483	<>	<aphaerese>
12485	12483	<>	<elision3>
12485	12483	<>	<elision2>
12485	12483	<>	<elision1>
12485	12331	.	υ
12485	12334	s	υ
12485	12331	.	u
12485	12334	s	u
12485	12337	.	κ
12485	12352	s	κ
12485	12296	s	k
12485	12377	s	U
12485	12299	s	K
12485	12331	.	α
12485	12334	s	α
12485	12331	.	a
12485	12334	s	a
12485	12405	s	A
12485	12296	s	λ
12485	12296	s	l
12485	12311	s	L
12485	11769	<A1>	<>
12486	12460	<name>	<name>
12486	12487	<>	<name>
12486	12489	<>	<aphaerese>
12486	12489	<>	<elision3>
12486	12489	<>	<elision2>
12486	12489	<>	<elision1>
12486	12076	<A1>	<>
12486	12490	<A2kl>	<>
12486	12502	<L2kl>	<>
12486	12470	<K2kl>	<>
12487	12488	<>	<aphaerese>
12487	12488	<>	<elision3>
12487	12488	<>	<elision2>
12487	12488	<>	<elision1>
12487	12491	<A2kl>	<>
12487	12503	<L2kl>	<>
12487	12468	<K2kl>	<>
12488	12489	<>	<aphaerese>
12488	12489	<>	<elision3>
12488	12489	<>	<elision2>
12488	12489	<>	<elision1>
12488	12492	<A2kl>	<>
12488	12504	<L2kl>	<>
12488	12469	<K2kl>	<>
12489	12487	<>	<name>
12489	12489	<>	<aphaerese>
12489	12489	<>	<elision3>
12489	12489	<>	<elision2>
12489	12489	<>	<elision1>
12489	12490	<A2kl>	<>
12489	12502	<L2kl>	<>
12489	12467	<K2kl>	<>
12490	12491	<>	<name>
12490	12490	<>	<aphaerese>
12490	12490	<>	<elision3>
12490	12490	<>	<elision2>
12490	12490	<>	<elision1>
12490	12493	.	κ
12490	12493	.	λ
12490	12026	<A1>	<>
12491	12492	<>	<aphaerese>
12491	12492	<>	<elision3>
12491	12492	<>	<elision2>
12491	12492	<>	<elision1>
12491	12495	.	κ
12491	12495	.	λ
12491	12027	<A1>	<>
12492	12490	<>	<aphaerese>
12492	12490	<>	<elision3>
12492	12490	<>	<elision2>
12492	12490	<>	<elision1>
12492	12493	.	κ
12492	12493	.	λ
12492	12025	<A1>	<>
12493	12494	<>	<name>
12493	12493	<>	<aphaerese>
12493	12496	<elision3>	<elision3>
12493	12493	<>	<elision3>
12493	12496	<elision2>	<elision2>
12493	12493	<>	<elision2>
12493	12496	<elision1>	<elision1>
12493	12493	<>	<elision1>
12493	12017	<A1>	<>
12494	12495	<>	<aphaerese>
12494	12498	<elision3>	<elision3>
12494	12495	<>	<elision3>
12494	12498	<elision2>	<elision2>
12494	12495	<>	<elision2>
12494	12498	<elision1>	<elision1>
12494	12495	<>	<elision1>
12494	12018	<A1>	<>
12495	12493	<>	<aphaerese>
12495	12496	<elision3>	<elision3>
12495	12493	<>	<elision3>
12495	12496	<elision2>	<elision2>
12495	12493	<>	<elision2>
12495	12496	<elision1>	<elision1>
12495	12493	<>	<elision1>
12495	12016	<A1>	<>
12496	12323	.	.
12496	12324	 	 
12496	12323	<~>	<~>
12496	12323	<split-s>	<split-s>
12496	12323	<split-h>	<split-h>
12496	12323	<name2>	<name2>
12496	12497	<>	<name>
12496	12327	<aphaerese>	<aphaerese>
12496	12496	<>	<aphaerese>
12496	12323	<elision3>	<elision3>
12496	12496	<>	<elision3>
12496	12323	<elision2>	<elision2>
12496	12496	<>	<elision2>
12496	12323	<elision1>	<elision1>
12496	12496	<>	<elision1>
12496	12331	.	υ
12496	12334	s	υ
12496	12331	.	u
12496	12334	s	u
12496	12396	s	κ
12496	12396	s	k
12496	12377	s	U
12496	12499	s	K
12496	12331	.	α
12496	12334	s	α
12496	12331	.	a
12496	12334	s	a
12496	12405	s	A
12496	12396	s	λ
12496	12396	s	l
12496	12499	s	L
12496	11981	<A1>	<>
12497	12326	.	.
12497	12329	 	 
12497	12326	<~>	<~>
12497	12326	<split-s>	<split-s>
12497	12326	<split-h>	<split-h>
12497	12326	<name2>	<name2>
12497	12426	<aphaerese>	<aphaerese>
12497	12498	<>	<aphaerese>
12497	12326	<elision3>	<elision3>
12497	12498	<>	<elision3>
12497	12326	<elision2>	<elision2>
12497	12498	<>	<elision2>
12497	12326	<elision1>	<elision1>
12497	12498	<>	<elision1>
12497	12333	.	υ
12497	12336	s	υ
12497	12333	.	u
12497	12336	s	u
12497	12398	s	κ
12497	12398	s	k
12497	12379	s	U
12497	12501	s	K
12497	12333	.	α
12497	12336	s	α
12497	12333	.	a
12497	12336	s	a
12497	12407	s	A
12497	12398	s	λ
12497	12398	s	l
12497	12501	s	L
12497	11982	<A1>	<>
12498	12323	.	.
12498	12324	 	 
12498	12323	<~>	<~>
12498	12323	<split-s>	<split-s>
12498	12323	<split-h>	<split-h>
12498	12323	<name2>	<name2>
12498	12327	<aphaerese>	<aphaerese>
12498	12496	<>	<aphaerese>
12498	12323	<elision3>	<elision3>
12498	12496	<>	<elision3>
12498	12323	<elision2>	<elision2>
12498	12496	<>	<elision2>
12498	12323	<elision1>	<elision1>
12498	12496	<>	<elision1>
12498	12331	.	υ
12498	12334	s	υ
12498	12331	.	u
12498	12334	s	u
12498	12396	s	κ
12498	12396	s	k
12498	12377	s	U
12498	12499	s	K
12498	12331	.	α
12498	12334	s	α
12498	12331	.	a
12498	12334	s	a
12498	12405	s	A
12498	12396	s	λ
12498	12396	s	l
12498	12499	s	L
12498	11980	<A1>	<>
12499	12500	<>	<name>
12499	12499	<>	<aphaerese>
12499	12499	<>	<elision3>
12499	12499	<>	<elision2>
12499	12499	<>	<elision1>
12499	12396	<L2kl>	<>
12500	12501	<>	<aphaerese>
12500	12501	<>	<elision3>
12500	12501	<>	<elision2>
12500	12501	<>	<elision1>
12500	12397	<L2kl>	<>
12501	12499	<>	<aphaerese>
12501	12499	<>	<elision3>
12501	12499	<>	<elision2>
12501	12499	<>	<elision1>
12501	12398	<L2kl>	<>
12502	12503	<>	<name>
12502	12502	<>	<aphaerese>
12502	12502	<>	<elision3>
12502	12502	<>	<elision2>
12502	12502	<>	<elision1>
12502	12505	.	κ
12502	12505	.	λ
12502	12059	<A1>	<>
12503	12504	<>	<aphaerese>
12503	12504	<>	<elision3>
12503	12504	<>	<elision2>
12503	12504	<>	<elision1>
12503	12507	.	κ
12503	12507	.	λ
12503	12060	<A1>	<>
12504	12502	<>	<aphaerese>
12504	12502	<>	<elision3>
12504	12502	<>	<elision2>
12504	12502	<>	<elision1>
12504	12505	.	κ
12504	12505	.	λ
12504	12058	<A1>	<>
12505	12506	<>	<name>
12505	12505	<>	<aphaerese>
12505	12508	<elision3>	<elision3>
12505	12505	<>	<elision3>
12505	12508	<elision2>	<elision2>
12505	12505	<>	<elision2>
12505	12508	<elision1>	<elision1>
12505	12505	<>	<elision1>
12505	12050	<A1>	<>
12506	12507	<>	<aphaerese>
12506	12510	<elision3>	<elision3>
12506	12507	<>	<elision3>
12506	12510	<elision2>	<elision2>
12506	12507	<>	<elision2>
12506	12510	<elision1>	<elision1>
12506	12507	<>	<elision1>
12506	12051	<A1>	<>
12507	12505	<>	<aphaerese>
12507	12508	<elision3>	<elision3>
12507	12505	<>	<elision3>
12507	12508	<elision2>	<elision2>
12507	12505	<>	<elision2>
12507	12508	<elision1>	<elision1>
12507	12505	<>	<elision1>
12507	12049	<A1>	<>
12508	12509	<>	<name>
12508	12508	<>	<aphaerese>
12508	12508	<>	<elision3>
12508	12508	<>	<elision2>
12508	12508	<>	<elision1>
12508	12337	.	κ
12508	12352	s	κ
12508	12296	s	k
12508	12299	s	K
12508	12296	s	λ
12508	12296	s	l
12508	12311	s	L
12508	12044	<A1>	<>
12509	12510	<>	<aphaerese>
12509	12510	<>	<elision3>
12509	12510	<>	<elision2>
12509	12510	<>	<elision1>
12509	12339	.	κ
12509	12354	s	κ
12509	12298	s	k
12509	12302	s	K
12509	12298	s	λ
12509	12298	s	l
12509	12313	s	L
12509	12045	<A1>	<>
12510	12508	<>	<aphaerese>
12510	12508	<>	<elision3>
12510	12508	<>	<elision2>
12510	12508	<>	<elision1>
12510	12337	.	κ
12510	12352	s	κ
12510	12296	s	k
12510	12299	s	K
12510	12296	s	λ
12510	12296	s	l
12510	12311	s	L
12510	12043	<A1>	<>
12511	12460	<name>	<name>
12511	12512	<>	<name>
12511	12514	<>	<aphaerese>
12511	12514	<>	<elision3>
12511	12514	<>	<elision2>
12511	12514	<>	<elision1>
12511	12076	<A1>	<>
12511	12490	<A2kl>	<>
12511	12518	<L2kl>	<>
12512	12513	<>	<aphaerese>
12512	12513	<>	<elision3>
12512	12513	<>	<elision2>
12512	12513	<>	<elision1>
12512	12491	<A2kl>	<>
12512	12516	<L2kl>	<>
12513	12514	<>	<aphaerese>
12513	12514	<>	<elision3>
12513	12514	<>	<elision2>
12513	12514	<>	<elision1>
12513	12492	<A2kl>	<>
12513	12517	<L2kl>	<>
12514	12512	<>	<name>
12514	12514	<>	<aphaerese>
12514	12514	<>	<elision3>
12514	12514	<>	<elision2>
12514	12514	<>	<elision1>
12514	12490	<A2kl>	<>
12514	12515	<L2kl>	<>
12515	12323	.	.
12515	12324	 	 
12515	12323	<~>	<~>
12515	12323	<split-s>	<split-s>
12515	12323	<split-h>	<split-h>
12515	12323	<name2>	<name2>
12515	12516	<>	<name>
12515	12327	<aphaerese>	<aphaerese>
12515	12515	<>	<aphaerese>
12515	12323	<elision3>	<elision3>
12515	12515	<>	<elision3>
12515	12323	<elision2>	<elision2>
12515	12515	<>	<elision2>
12515	12323	<elision1>	<elision1>
12515	12515	<>	<elision1>
12515	12331	.	υ
12515	12334	s	υ
12515	12331	.	u
12515	12334	s	u
12515	12505	.	κ
12515	19	s	κ
12515	12296	s	k
12515	12377	s	U
12515	12299	s	K
12515	12331	.	α
12515	12334	s	α
12515	12331	.	a
12515	12334	s	a
12515	12405	s	A
12515	12505	.	λ
12515	19	s	λ
12515	12296	s	l
12515	12311	s	L
12515	12093	<A1>	<>
12516	12326	.	.
12516	12329	 	 
12516	12326	<~>	<~>
12516	12326	<split-s>	<split-s>
12516	12326	<split-h>	<split-h>
12516	12326	<name2>	<name2>
12516	12426	<aphaerese>	<aphaerese>
12516	12517	<>	<aphaerese>
12516	12326	<elision3>	<elision3>
12516	12517	<>	<elision3>
12516	12326	<elision2>	<elision2>
12516	12517	<>	<elision2>
12516	12326	<elision1>	<elision1>
12516	12517	<>	<elision1>
12516	12333	.	υ
12516	12336	s	υ
12516	12333	.	u
12516	12336	s	u
12516	12507	.	κ
12516	12292	s	κ
12516	12298	s	k
12516	12379	s	U
12516	12302	s	K
12516	12333	.	α
12516	12336	s	α
12516	12333	.	a
12516	12336	s	a
12516	12407	s	A
12516	12507	.	λ
12516	12292	s	λ
12516	12298	s	l
12516	12313	s	L
12516	12094	<A1>	<>
12517	12323	.	.
12517	12324	 	 
12517	12323	<~>	<~>
12517	12323	<split-s>	<split-s>
12517	12323	<split-h>	<split-h>
12517	12323	<name2>	<name2>
12517	12327	<aphaerese>	<aphaerese>
12517	12515	<>	<aphaerese>
12517	12323	<elision3>	<elision3>
12517	12515	<>	<elision3>
12517	12323	<elision2>	<elision2>
12517	12515	<>	<elision2>
12517	12323	<elision1>	<elision1>
12517	12515	<>	<elision1>
12517	12331	.	υ
12517	12334	s	υ
12517	12331	.	u
12517	12334	s	u
12517	12505	.	κ
12517	19	s	κ
12517	12296	s	k
12517	12377	s	U
12517	12299	s	K
12517	12331	.	α
12517	12334	s	α
12517	12331	.	a
12517	12334	s	a
12517	12405	s	A
12517	12505	.	λ
12517	19	s	λ
12517	12296	s	l
12517	12311	s	L
12517	12092	<A1>	<>
12518	12323	.	.
12518	12324	 	 
12518	12323	<~>	<~>
12518	12323	<split-s>	<split-s>
12518	12323	<split-h>	<split-h>
12518	12323	<name2>	<name2>
12518	12460	<name2>	<name>
12518	12516	<>	<name>
12518	12327	<aphaerese>	<aphaerese>
12518	12515	<>	<aphaerese>
12518	12323	<elision3>	<elision3>
12518	12515	<>	<elision3>
12518	12323	<elision2>	<elision2>
12518	12515	<>	<elision2>
12518	12323	<elision1>	<elision1>
12518	12515	<>	<elision1>
12518	12331	.	υ
12518	12334	s	υ
12518	12331	.	u
12518	12334	s	u
12518	12505	.	κ
12518	19	s	κ
12518	12296	s	k
12518	12377	s	U
12518	12299	s	K
12518	12331	.	α
12518	12334	s	α
12518	12331	.	a
12518	12334	s	a
12518	12405	s	A
12518	12505	.	λ
12518	19	s	λ
12518	12296	s	l
12518	12311	s	L
12518	12099	<A1>	<>
12519	12323	.	.
12519	12324	 	 
12519	12323	<~>	<~>
12519	12323	<split-s>	<split-s>
12519	12323	<split-h>	<split-h>
12519	12323	<name2>	<name2>
12519	12484	<>	<name>
12519	12327	<aphaerese>	<aphaerese>
12519	12483	<>	<aphaerese>
12519	12483	<>	<elision3>
12519	12483	<>	<elision2>
12519	12483	<>	<elision1>
12519	12331	.	υ
12519	12334	s	υ
12519	12331	.	u
12519	12334	s	u
12519	12337	.	κ
12519	12352	s	κ
12519	12296	s	k
12519	12377	s	U
12519	12299	s	K
12519	12331	.	α
12519	12334	s	α
12519	12331	.	a
12519	12334	s	a
12519	12405	s	A
12519	12296	s	λ
12519	12296	s	l
12519	12311	s	L
12519	12102	<A1>	<>
12520	12323	.	.
12520	12324	 	 
12520	12323	<~>	<~>
12520	12323	<split-s>	<split-s>
12520	12323	<split-h>	<split-h>
12520	12323	<name2>	<name2>
12520	12429	<>	<name>
12520	12327	<aphaerese>	<aphaerese>
12520	12322	<>	<aphaerese>
12520	12431	<elision3>	<elision3>
12520	12322	<>	<elision3>
12520	12431	<elision2>	<elision2>
12520	12322	<>	<elision2>
12520	12431	<elision1>	<elision1>
12520	12322	<>	<elision1>
12520	12331	.	υ
12520	12334	s	υ
12520	12331	.	u
12520	12334	s	u
12520	12331	.	κ
12520	19	s	κ
12520	12296	s	k
12520	12377	s	U
12520	12299	s	K
12520	12331	.	α
12520	12334	s	α
12520	12331	.	a
12520	12334	s	a
12520	12405	s	A
12520	12331	.	λ
12520	19	s	λ
12520	12296	s	l
12520	12311	s	L
12520	12105	<A1>	<>
12521	12323	.	.
12521	12324	 	 
12521	12323	<~>	<~>
12521	12323	<split-s>	<split-s>
12521	12323	<split-h>	<split-h>
12521	12323	<name2>	<name2>
12521	12454	<>	<name>
12521	12327	<aphaerese>	<aphaerese>
12521	12453	<>	<aphaerese>
12521	12323	<elision3>	<elision3>
12521	12453	<>	<elision3>
12521	12323	<elision2>	<elision2>
12521	12453	<>	<elision2>
12521	12323	<elision1>	<elision1>
12521	12453	<>	<elision1>
12521	12331	.	υ
12521	12334	s	υ
12521	12331	.	u
12521	12334	s	u
12521	12331	.	κ
12521	19	s	κ
12521	12296	s	k
12521	12377	s	U
12521	12299	s	K
12521	12331	.	α
12521	12334	s	α
12521	12331	.	a
12521	12334	s	a
12521	12405	s	A
12521	12331	.	λ
12521	19	s	λ
12521	12296	s	l
12521	12311	s	L
12521	12108	<A1>	<>
12522	12457	<>	<name>
12522	12456	<>	<aphaerese>
12522	12456	<>	<elision3>
12522	12456	<>	<elision2>
12522	12456	<>	<elision1>
12522	12523	<U2kl>	<>
12523	12323	.	.
12523	12324	 	 
12523	12323	<~>	<~>
12523	12323	<split-s>	<split-s>
12523	12323	<split-h>	<split-h>
12523	12323	<name2>	<name2>
12523	12428	<>	<name>
12523	12327	<aphaerese>	<aphaerese>
12523	12323	<>	<aphaerese>
12523	12323	<elision3>	<elision3>
12523	12323	<>	<elision3>
12523	12323	<elision2>	<elision2>
12523	12323	<>	<elision2>
12523	12323	<elision1>	<elision1>
12523	12323	<>	<elision1>
12523	12331	.	υ
12523	12334	s	υ
12523	12331	.	u
12523	12334	s	u
12523	12337	.	κ
12523	12352	s	κ
12523	12296	s	k
12523	12377	s	U
12523	12299	s	K
12523	12331	.	α
12523	12334	s	α
12523	12331	.	a
12523	12334	s	a
12523	12405	s	A
12523	12296	s	λ
12523	12296	s	l
12523	12311	s	L
12523	12112	<A1>	<>
12524	12460	<name>	<name>
12524	12487	<>	<name>
12524	12489	<>	<aphaerese>
12524	12489	<>	<elision3>
12524	12489	<>	<elision2>
12524	12489	<>	<elision1>
12524	12076	<A1>	<>
12524	12490	<A2kl>	<>
12524	12502	<L2kl>	<>
12524	12525	<K2kl>	<>
12525	12323	.	.
12525	12324	 	 
12525	12323	<~>	<~>
12525	12323	<split-s>	<split-s>
12525	12323	<split-h>	<split-h>
12525	12323	<name2>	<name2>
12525	12460	<name2>	<name>
12525	12468	<>	<name>
12525	12327	<aphaerese>	<aphaerese>
12525	12467	<>	<aphaerese>
12525	12323	<elision3>	<elision3>
12525	12467	<>	<elision3>
12525	12323	<elision2>	<elision2>
12525	12467	<>	<elision2>
12525	12323	<elision1>	<elision1>
12525	12467	<>	<elision1>
12525	12331	.	υ
12525	12334	s	υ
12525	12331	.	u
12525	12334	s	u
12525	19	s	κ
12525	12296	s	k
12525	12377	s	U
12525	12299	s	K
12525	12331	.	α
12525	12334	s	α
12525	12331	.	a
12525	12334	s	a
12525	12405	s	A
12525	19	s	λ
12525	12296	s	l
12525	12311	s	L
12525	12116	<A1>	<>
12526	12472	<>	<name>
12526	12471	<>	<aphaerese>
12526	12471	<>	<elision3>
12526	12471	<>	<elision2>
12526	12471	<>	<elision1>
12526	12523	<A2kl>	<>
12527	11756	<>	<name>
12527	11755	<>	<aphaerese>
12527	11755	<>	<elision3>
12527	11755	<>	<elision2>
12527	11755	<>	<elision1>
12527	11617	<~>	<>
12527	11429	<l2L>	<>
12528	12460	<name>	<name>
12528	12512	<>	<name>
12528	12514	<>	<aphaerese>
12528	12514	<>	<elision3>
12528	12514	<>	<elision2>
12528	12514	<>	<elision1>
12528	12076	<A1>	<>
12528	12490	<A2kl>	<>
12528	12529	<L2kl>	<>
12529	12323	.	.
12529	12324	 	 
12529	12323	<~>	<~>
12529	12323	<split-s>	<split-s>
12529	12323	<split-h>	<split-h>
12529	12323	<name2>	<name2>
12529	12460	<name2>	<name>
12529	12516	<>	<name>
12529	12327	<aphaerese>	<aphaerese>
12529	12515	<>	<aphaerese>
12529	12323	<elision3>	<elision3>
12529	12515	<>	<elision3>
12529	12323	<elision2>	<elision2>
12529	12515	<>	<elision2>
12529	12323	<elision1>	<elision1>
12529	12515	<>	<elision1>
12529	12331	.	υ
12529	12334	s	υ
12529	12331	.	u
12529	12334	s	u
12529	12505	.	κ
12529	19	s	κ
12529	12296	s	k
12529	12377	s	U
12529	12299	s	K
12529	12331	.	α
12529	12334	s	α
12529	12331	.	a
12529	12334	s	a
12529	12405	s	A
12529	12505	.	λ
12529	19	s	λ
12529	12296	s	l
12529	12311	s	L
12529	12121	<A1>	<>
