Overview of the GAP Character Table Library (version 1.3.8)

Character Table info for He.2

Name:

He.2

Group order:

8060774400 = 2¹¹ ⋅ 3³ ⋅ 5² ⋅ 7³ ⋅ 17

Number of classes:

45

InfoText value:

origin: ATLAS of finite groups, tests: 1.o.r., pow[2,3,5,7,17], constructions: Aut(He)

Duplicates:

He.2

Maximal subgroups:

	Order	Index	Structure	Name
1	4030387200	2	He	He
2	3916800	2058	S4(4).4	S4(4).4
3	967680	8330	22.L3(4).D12	2^2.L3(4).D12
4	43008	187425	21+6+.L3(2).2	2^(1+6)_+.L3(2).2
5	32928	244800	72:2.L2(7).2	7^2:2.L2(7).2
6	30240	266560	3.S7 × 2	3.s7x2
7	28800	279888	(S5 × S5):2	s5wrs2
8	18432	437325	24+4.(S3 × S3).2	2^(4+4).(S3xS3).2
9	12348	652800	71+2:(S3 × 6)	7^(1+2):(S3x6)
10	8064	999600	S4 × L3(2).2	S4xL3(2).2
11	7056	1142400	7:6 × L3(2)	7:6xL3(2)
12	2400	3358656	52:4S4	Fi22N5

Stored Sylow p normalizers:

p	Order	Index	Structure	Name
5	2400	3358656	52:4S4	Fi22N5
7	12348	652800	71+2:(S3 × 6)	7^(1+2):(S3x6)
17	272	29635200	17:16	17:16

Available Brauer tables:

p
2	dec. matrix (PDF)
3	dec. matrix (PDF)
5	dec. matrix (PDF)
7	dec. matrix (PDF)
17	dec. matrix (PDF)

Atlas representations:

21 available

Group constructions in GAP:

AtlasGroup( "He.2" ), AutomorphismGroup( AtlasGroup( "He" ) ), PrimitiveGroup( 2058, 2 )

Stored class fusions from this table:

F₃₊

Stored class fusions to this table:

2².L₃(4).D₁₂, 2¹⁺⁶₊.L₃(2).2, 2⁴⁺⁴.(S₃ × S₃).2, 3.S₇ × 2, 5:4 × S₅, 7:6 × L₃(2), 7²:2.L₂(7).2, 7¹⁺²:(S₃ × 6), 17:16, (7:3 × He):2, 5²:4S₄, He, NDG(He.2, 3²), S₄(4).4, S₄ × L₃(2).2, (S₅ × S₅):2

File created automatically by GAP on 13-Mar-2024.