GAP Package AtlasRep

AtlasRep Info for L2(23)

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Representations for G = L2(23): (all refer to std. generators 1)
1 G ≤ Sym(24) 2-trans., on cosets of 23:11 (1st max.)
2 G ≤ GL(11a,2) character 11a
3 G ≤ GL(11b,2) character 11b
4 G ≤ GL(22,2) character 22a
5 G ≤ GL(22a,3) character 22a
6 G ≤ GL(23,11) character 23a
7 G ≤ GL(3,23) character 3a
8 G ≤ GL(5,23) character 5a
9 G ≤ GL(7,23) character 7a
10 G ≤ GL(9,23) character 9a
11 G ≤ GL(11,23) character 11a
12 G ≤ GL(13,23) character 13a
13 G ≤ GL(15,23) character 15a
14 G ≤ GL(17,23) character 17a
15 G ≤ GL(19,23) character 19a
16 G ≤ GL(21,23) character 21a
17 G ≤ GL(23,23) character 23a
18 G ≤ GL(24a,32) character 24a
19 G ≤ GL(24b,32) character 24b
20 G ≤ GL(24c,32) character 24c
21 G ≤ GL(24d,32) character 24d
22 G ≤ GL(24e,32) character 24e
23 G ≤ GL(22a,ℤ) character 22a
24 G ≤ GL(22b,ℤ) character 22b
25 G ≤ GL(22c,ℤ) character 22c
26 G ≤ GL(23,ℤ) character 23a
27 G ≤ GL(24a,Field([E(11)])) character 24a
28 G ≤ GL(24b,Field([E(11)])) character 24b
29 G ≤ GL(24c,Field([E(11)])) character 24c
30 G ≤ GL(24d,Field([E(11)])) character 24d
31 G ≤ GL(24e,Field([E(11)])) character 24e
Programs for G = L2(23): (all refer to std. generators 1)

File created automatically by GAP on 22-Apr-2022.