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Fischer group Fi22

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Sporadic simple group For general background and history of the Fischer sporadic groups, see Fischer group.
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Algebraic structureGroup theory
Group theory
Basic notions
Group homomorphisms
Finite groups
Classification of finite simple groups
Modular groups
  • PSL(2, Z {\displaystyle \mathbb {Z} } )
  • SL(2, Z {\displaystyle \mathbb {Z} } )
Topological and Lie groups Infinite dimensional Lie group
  • O(∞)
  • SU(∞)
  • Sp(∞)
Algebraic groups

In the area of modern algebra known as group theory, the Fischer group Fi22 is a sporadic simple group of order

   64,561,751,654,400
= 2 ···· 11 · 13
≈ 6×10.

History

Fi22 is one of the 26 sporadic groups and is the smallest of the three Fischer groups. It was introduced by Bernd Fischer (1971, 1976) while investigating 3-transposition groups.

The outer automorphism group has order 2, and the Schur multiplier has order 6.

Representations

The Fischer group Fi22 has a rank 3 action on a graph of 3510 vertices corresponding to its 3-transpositions, with point stabilizer the double cover of the group PSU6(2). It also has two rank 3 actions on 14080 points, exchanged by an outer automorphism.

Fi22 has an irreducible real representation of dimension 78. Reducing an integral form of this mod 3 gives a representation of Fi22 over the field with 3 elements, whose quotient by the 1-dimensional space of fixed vectors is a 77-dimensional irreducible representation.

The perfect triple cover of Fi22 has an irreducible representation of dimension 27 over the field with 4 elements. This arises from the fact that Fi22 is a subgroup of E6(2). All the ordinary and modular character tables of Fi22 have been computed. Hiss & White (1994) found the 5-modular character table, and Noeske (2007) found the 2- and 3-modular character tables.

The automorphism group of Fi22 centralizes an element of order 3 in the baby monster group.

Generalized Monstrous Moonshine

Conway and Norton suggested in their 1979 paper that monstrous moonshine is not limited to the monster, but that similar phenomena may be found for other groups. Larissa Queen and others subsequently found that one can construct the expansions of many Hauptmoduln from simple combinations of dimensions of sporadic groups. For Fi22, the McKay-Thompson series is T 6 A ( τ ) {\displaystyle T_{6A}(\tau )} where one can set a(0) = 10 (OEISA007254),

j 6 A ( τ ) = T 6 A ( τ ) + 10 = ( ( η ( τ ) η ( 3 τ ) η ( 2 τ ) η ( 6 τ ) ) 3 + 2 3 ( η ( 2 τ ) η ( 6 τ ) η ( τ ) η ( 3 τ ) ) 3 ) 2 = ( ( η ( τ ) η ( 2 τ ) η ( 3 τ ) η ( 6 τ ) ) 2 + 3 2 ( η ( 3 τ ) η ( 6 τ ) η ( τ ) η ( 2 τ ) ) 2 ) 2 4 = 1 q + 10 + 79 q + 352 q 2 + 1431 q 3 + 4160 q 4 + 13015 q 5 + {\displaystyle {\begin{aligned}j_{6A}(\tau )&=T_{6A}(\tau )+10\\&=\left(\left({\tfrac {\eta (\tau )\,\eta (3\tau )}{\eta (2\tau )\,\eta (6\tau )}}\right)^{3}+2^{3}\left({\tfrac {\eta (2\tau )\,\eta (6\tau )}{\eta (\tau )\,\eta (3\tau )}}\right)^{3}\right)^{2}\\&=\left(\left({\tfrac {\eta (\tau )\,\eta (2\tau )}{\eta (3\tau )\,\eta (6\tau )}}\right)^{2}+3^{2}\left({\tfrac {\eta (3\tau )\,\eta (6\tau )}{\eta (\tau )\,\eta (2\tau )}}\right)^{2}\right)^{2}-4\\&={\frac {1}{q}}+10+79q+352q^{2}+1431q^{3}+4160q^{4}+13015q^{5}+\dots \end{aligned}}}

and η(τ) is the Dedekind eta function.

Maximal subgroups of Fi22
No. Structure Order Index Comments
1 2U6(2) 18,393,661,440
= 2·3·5·7·11
3,510
= 2·3·5·13
centralizer of an involution of class 2A
2,3 O7(3) 4,585,351,680
= 2·3·5·7·13
14,080
= 2·5·11
two classes, fused by an outer automorphism
4 O
8(2):S3
1,045,094,400
= 2·3·5·7
61,776
= 2·3·11·13
centralizer of an outer automorphism of order 2 (class 2D)
5 2:M22 454,164,480
= 2·3·5·7·11
142,155
= 3·5·13
6 2:S6(2) 92,897,280
= 2·3·5·7
694,980
= 2·3·5·11·13
7 (2 × 2):(U4(2):2) 53,084,160
= 2·3·5
1,216,215
= 3·5·7·11·13
centralizer of an involution of class 2B
8 U4(3):2 × S3 39,191,040
= 2·3·5·7
1,647,360
= 2·3·5·11·13
normalizer of a subgroup of order 3 (class 3A)
9 F4(2)' 17,971,200
= 2·3·5·13
3,592,512
= 2·3·7·11
the Tits group
10 2:(S3 × A6) 17,694,720
= 2·3·5
3,648,645
= 3·5·7·11·13
11 3:2:3:2 5,038,848
= 2·3
12,812,800
= 2·5·7·11·13
normalizer of a subgroup of order 3 (class 3B)
12,13 S10 3,628,800
= 2·3·5·7
17,791,488
= 2·3·11·13
two classes, fused by an outer automorphism
14 M12 95,040
= 2·3·5·11
679,311,360
= 2·3·5·7·13

References

External links

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