Character Table Info for a Group

Overview of the GAP Character Table Library (version 1.3.8)

Character Table info for M

Name:

M

Group order:

808017424794512875886459904961710757005754368000000000 = 2⁴⁶ ⋅ 3²⁰ ⋅ 5⁹ ⋅ 7⁶ ⋅ 11² ⋅ 13³ ⋅ 17 ⋅ 19 ⋅ 23 ⋅ 29 ⋅ 31 ⋅ 41 ⋅ 47 ⋅ 59 ⋅ 71

Number of classes:

194

InfoText value:

origin: ATLAS of finite groups, tests: 1.o.r.

Some maximal subgroups:

	Order	Index	Structure	Name
1	8309562962452852382355161088000000	97239461142009186000	2.B	`2.B`
2	139511839126336328171520000	5791748068511982636944259375	2¹⁺²⁴.Co₁	`2^1+24.Co1`
3	7531234255143970327756800	107288845018015770869760000000	3.F₃₊.2	`3.F3+.2`
4	1836779512410596494540800	439909863614532427326210000000	2².²E₆(2).3.2	`2^2.2E6(2).3.2`
5	1577011055923770163200	512372707698741056749515292734375	2¹⁰⁺¹⁶.O₁₀⁺(2)	`2^(10+16).O10+(2)`
6	50472333605150392320	16009115629875684006343550944921875	2^2+11+22.(M₂₄ × S₃)	`2^(2+11+22).(M24xS3)`
7	2859230155080499200	282599644298926271851701207040000000	3¹⁺¹².2.Suz.2	`3^(1+12).2.Suz.2`
9	544475663327232000	1484028541986258159045049319424000000	S₃ × Th	`S3xTh`
10	199495389743677440	4050306254358548053604918389065234375	2^[39].(L₃(2) × 3.S₆)	`2^[39].(L3(2)x3.S6)`
11	133214132225341440	6065553341050124859256025907200000000	3⁸.O₈⁻(3).2₃	`3^8.O8-(3).2_3`
12	5460618240000000	147971784380684498443615773616452403200	(D₁₀ × HN).2	`(D10xHN).2`
13	2139341679820800	377694424605514962329798663208960000000	(3²:2 × O₈⁺(3)).S₄	`(3^2:2xO8+(3)).S4`
14	49093924366080	16458603283969466072643078298009600000000	3²⁺⁵⁺¹⁰.(M₁₁ × 2S₄)	`3^(2+5+10).(M11x2S4)`
15	11604018486528	69632552355255433384259177414656000000000	3^3+2+6+6:(L₃(3) × SD₁₆)	`3^(3+2+6+6):(L3(3)xSD16)`
16	378000000000	2137612234906118719276348954925160732819456	5¹⁺⁶:2.J₂.4	`5^(1+6):2.J2.4`
17	169276262400	4773365227577903302562875496013496320000000	(7:3 × He):2	`(7:3xHe):2`
18	28740096000	28114639032330054704286996987125956608000000	(A₅ × A₁₂):2	`(A5xA12):2`
19	11625000000	69506875251140892549372895050469742538129408	5³⁺³.(2 × L₃(5))	`5^(3+3).(2xL3(5))`
20	2239488000	360804534248235702038349794668116443136000000	(A₆ × A₆ × A₆).(2 × S₄)	`(A6xA6xA6).(2xS4)`
21	1985679360	406922407046882370719943377445244108800000000	(A₅ × U₃(8):3):2	`(A5xU3(8):3):2`
22	1125000000	718237710928455889676853248854854006227337216	5²⁺²⁺⁴:(S₃ × GL₂(5))	`5^(2+2+4):(S3xGL2(5))`
23	658022400	1227948204794415624584299721349471928320000000	(L₃(2) × S₄(4):2).2	`(L3(2)xS4(4):2).2`
24	508243680	1589822867634109834649512818264086937600000000	7¹⁺⁴:(3 × 2.S₇)	`7^(1+4):(3x2.S7)`
25	302400000	2672015293632648399095436193656450916024320000	(5²:[2⁴] × U₃(5)).S₃	`(5^2:[2^4]xU3(5)).S3`
26	125452800	6440808214679248895891202946141582786560000000	(L₂(11) × M₁₂):2	`(L2(11)xM12):2`
27	72576000	11133397056802701662897650806901878816768000000	(A₇ × (A₅ × A₅):2²):2	`(A7x(A5xA5):2^2):2`
28	58500000	13812263671701074801477947093362577042833408000	5⁴:(3 × 2.L₂(25)).2	`5^4:(3x2.L2(25)).2`
29	33882912	23847343014511647519742692273961304064000000000	7²⁺¹⁺²:GL₂(7)	`7^(2+1+2):GL2(7)`
30	11404800	70848890361471737854803232407557410652160000000	M₁₁ × A₆.2²	`M11xA6.2^2`
31	10368000	77933779397618911640283555648313151717376000000	(S₅ × S₅ × S₅):S₃	`(S5xS5xS5):S3`
32	1742400	463738191456905920504166612122193960632320000000	(L₂(11) × L₂(11)):4	`(L2(11)xL2(11)):4`
33	1476384	547294894007597532814267768386619441152000000000	13²:2.L₂(13).4	`13^2:2.L2(13).4`
34	1185408	681636554498124591605978620830727274496000000000	(7²:(3 × 2A₄) × L₂(7)).2	`(7^2:(3x2A4)xL2(7)).2`
35	876096	922293247309099546038858646725599428608000000000	(13:6 × L₃(3)).2	`(13:6xL3(3)).2`
36	632736	1277021419351060909899958126235445362688000000000	13¹⁺²:(3 × 4S₄)	`13^(1+2):(3x4S4)`
37	249600	3237249298054939406596393850006853994414080000000	U₃(4).4	`U3(4).4`
38	178920	4516082186421377575935948496320762111590400000000	L₂(71)	`L2(71)`
39	102660	7870810683757187569515487092944776514764800000000	L₂(59)	`L2(59)`
40	72600	11129716594965742092099998690932655055175680000000	11²:(5 × 2.A₅)	`11^2:(5x2.A5)`
41	34440	23461597700189107894496512919910300726067200000000	L₂(41)	`L2(41)`
42	24360	33169845024405290471529552748838701026508800000000	L₂(29).2	`L2(29).2`
43	16464	49077831923864970595630460699812363763712000000000	7²:2L₂(7)	`7^2:2psl(2,7)`
44	6840	118131202455338139749482442245864145761075200000000	L₂(19).2	`L2(19).2`
45	2184	369971348349135932182445011429354742218752000000000	L₂(13).2	`L2(13).2`
46	1640	492693551703971265784426771318116315247411200000000	41:40	`41:40`

Stored Sylow p normalizers:

p	Order	Index	Structure	Name
5	187500000	4309426265570735338061119493129124037364023296	MN5	`MN5`
7	4235364	190778744116093180157941538191690432512000000000	[7⁶]:(6 × 6)	`[7^6]:(6x6)`
11	72600	11129716594965742092099998690932655055175680000000	11²:(5 × 2.A₅)	`11^2:(5x2.A5)`
13	632736	1277021419351060909899958126235445362688000000000	13¹⁺²:(3 × 4S₄)	`13^(1+2):(3x4S4)`
47	2162	373736089174150266367465265939736705368064000000000	2 × 47:23	`2x47:23`

Available Brauer tables:

p
17	dec. matrix (PDF)
19	dec. matrix (PDF)
23	dec. matrix (PDF)
31	dec. matrix (PDF)

Stored class fusions to this table:

2.(2 × F₄(2)).2, 2.B, 2¹⁺²⁴.Co₁, 2².²E₆(2).3.2, 2^2+11+22.(M₂₄ × S₃), 2¹⁰⁺¹⁶.O₁₀⁺(2), 2^[39].(L₃(2) × 3.S₆), 2 × 47:23, 3.F₃₊.2, 3⁸.O₈⁻(3).2₃, 3¹⁺¹².2.Suz.2, 3²⁺⁵⁺¹⁰.(M₁₁ × 2S₄), 3^3+2+6+6:(L₃(3) × SD₁₆), 5⁴:(3 × 2.L₂(25)).2, 5¹⁺⁶:2.J₂.4, 5²⁺²⁺⁴:(S₃ × GL₂(5)), 5³⁺³.(2 × L₃(5)), 7¹⁺⁴.2A₇, 7²:2L₂(7), 7¹⁺⁴:(3 × 2.S₇), 7²⁺¹⁺²:GL₂(7), 11²:(5 × 2.A₅), 13²:2.L₂(13).4, 13¹⁺²:(3 × 4S₄), 41:40, (3²:2 × O₈⁺(3)).S₄, (3¹⁺²:2² × G₂(3)):2, (5²:[2⁴] × U₃(5)).S₃, (7:3 × He):2, (7²:(3 × 2A₄) × L₂(7)).2, (11:5 × M₁₂):2, (13:6 × L₃(3)).2, (A₅ × A₁₂):2, (A₅ × U₃(8):3):2, (A₆ × A₆ × A₆).(2 × S₄), (A₇ × (A₅ × A₅):2²):2, (D₁₀ × HN).2, (L₂(11) × L₂(11)):4, (L₂(11) × M₁₂):2, (L₃(2) × S₄(4):2).2, (QD₁₆ × ²F₄(2)').2, (S₃ × 2.Fi₂₂).2, (S₅ × S₅ × S₅):S₃, L₂(13).2, L₂(19).2, L₂(29).2, L₂(41), L₂(59), L₂(71), M₁₁ × A₆.2², MN5, S₃ × Th, U₃(4).4

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