A4xD11 - GroupNames

G = A₄×D₁₁ order 264 = 2³·3·11

Direct product of A₄ and D₁₁

direct product, metabelian, soluble, monomial, A-group

Aliases: A₄×D₁₁, C₁₁⋊(C₂×A₄), (C₂×C₂₂)⋊C₆, (C₂²×D₁₁)⋊C₃, C₂²⋊(C₃×D₁₁), (C₁₁×A₄)⋊₂C₂, SmallGroup(264,33)

Series: Derived ►Chief ►Lower central ►Upper central

Derived series

C₁ — C₂×C₂₂ — A₄×D₁₁

Chief series

C₁ — C₁₁ — C₂×C₂₂ — C₁₁×A₄ — A₄×D₁₁

Lower central

C₂×C₂₂ — A₄×D₁₁

Upper central

C₁

Generators and relations for A₄×D₁₁
G = < a,b,c,d,e | a²=b²=c³=d¹¹=e²=1, cac^-1=ab=ba, ad=da, ae=ea, cbc^-1=a, bd=db, be=eb, cd=dc, ce=ec, ede=d^-1 >

C₁

₃C₂

₁₁C₂

₃₃C₂

₄C₃

C₁₁

C₂²

₃₃C₂²

₄₄C₆

D₁₁

₃C₂₂

₃D₁₁

₄C₃₃

₁₁C₂³

A₄

C₂×C₂₂

₃D₂₂

₄C₃×D₁₁

₁₁C₂×A₄

C₂²×D₁₁

C₁₁×A₄

A₄×D₁₁

Character table of A₄×D₁₁

class	1	2A	2B	2C	3A	3B	6A	6B	11A	11B	11C	11D	11E	22A	22B	22C	22D	22E	33A	33B	33C	33D	33E	33F	33G	33H	33I	33J
size	1	3	11	33	4	4	44	44	2	2	2	2	2	6	6	6	6	6	8	8	8	8	8	8	8	8	8	8
ρ₁	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	trivial
ρ₂	1	1	-1	-1	1	1	-1	-1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	1	linear of order 2
ρ₃	1	1	1	1	ζ₃	ζ₃²	ζ₃²	ζ₃	1	1	1	1	1	1	1	1	1	1	ζ₃	ζ₃²	ζ₃²	ζ₃²	ζ₃²	ζ₃²	ζ₃	ζ₃	ζ₃	ζ₃	linear of order 3
ρ₄	1	1	-1	-1	ζ₃²	ζ₃	ζ₆⁵	ζ₆	1	1	1	1	1	1	1	1	1	1	ζ₃²	ζ₃	ζ₃	ζ₃	ζ₃	ζ₃	ζ₃²	ζ₃²	ζ₃²	ζ₃²	linear of order 6
ρ₅	1	1	1	1	ζ₃²	ζ₃	ζ₃	ζ₃²	1	1	1	1	1	1	1	1	1	1	ζ₃²	ζ₃	ζ₃	ζ₃	ζ₃	ζ₃	ζ₃²	ζ₃²	ζ₃²	ζ₃²	linear of order 3
ρ₆	1	1	-1	-1	ζ₃	ζ₃²	ζ₆	ζ₆⁵	1	1	1	1	1	1	1	1	1	1	ζ₃	ζ₃²	ζ₃²	ζ₃²	ζ₃²	ζ₃²	ζ₃	ζ₃	ζ₃	ζ₃	linear of order 6
ρ₇	2	2	0	0	2	2	0	0	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁹+ζ₁₁²	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁹+ζ₁₁²	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁹+ζ₁₁²	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁹+ζ₁₁²	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁷+ζ₁₁⁴	orthogonal lifted from D₁₁
ρ₈	2	2	0	0	2	2	0	0	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁¹⁰+ζ₁₁	ζ₁₁¹⁰+ζ₁₁	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁶+ζ₁₁⁵	orthogonal lifted from D₁₁
ρ₉	2	2	0	0	2	2	0	0	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁸+ζ₁₁³	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁸+ζ₁₁³	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁸+ζ₁₁³	ζ₁₁¹⁰+ζ₁₁	orthogonal lifted from D₁₁
ρ₁₀	2	2	0	0	2	2	0	0	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁸+ζ₁₁³	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁹+ζ₁₁²	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁸+ζ₁₁³	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁸+ζ₁₁³	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁹+ζ₁₁²	orthogonal lifted from D₁₁
ρ₁₁	2	2	0	0	2	2	0	0	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁸+ζ₁₁³	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁸+ζ₁₁³	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁸+ζ₁₁³	orthogonal lifted from D₁₁
ρ₁₂	2	2	0	0	-1-√-3	-1+√-3	0	0	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁸+ζ₁₁³	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁹+ζ₁₁²	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁷+ζ₁₁⁴	ζ₃²ζ₁₁⁷+ζ₃²ζ₁₁⁴	ζ₃ζ₁₁⁷+ζ₃ζ₁₁⁴	ζ₃ζ₁₁⁸+ζ₃ζ₁₁³	ζ₃ζ₁₁¹⁰+ζ₃ζ₁₁	ζ₃ζ₁₁⁶+ζ₃ζ₁₁⁵	ζ₃ζ₁₁⁹+ζ₃ζ₁₁²	ζ₃²ζ₁₁⁸+ζ₃²ζ₁₁³	ζ₃²ζ₁₁¹⁰+ζ₃²ζ₁₁	ζ₃²ζ₁₁⁶+ζ₃²ζ₁₁⁵	ζ₃²ζ₁₁⁹+ζ₃²ζ₁₁²	complex lifted from C₃×D₁₁
ρ₁₃	2	2	0	0	-1+√-3	-1-√-3	0	0	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁¹⁰+ζ₁₁	ζ₃ζ₁₁¹⁰+ζ₃ζ₁₁	ζ₃²ζ₁₁¹⁰+ζ₃²ζ₁₁	ζ₃²ζ₁₁⁹+ζ₃²ζ₁₁²	ζ₃²ζ₁₁⁸+ζ₃²ζ₁₁³	ζ₃²ζ₁₁⁷+ζ₃²ζ₁₁⁴	ζ₃²ζ₁₁⁶+ζ₃²ζ₁₁⁵	ζ₃ζ₁₁⁹+ζ₃ζ₁₁²	ζ₃ζ₁₁⁸+ζ₃ζ₁₁³	ζ₃ζ₁₁⁷+ζ₃ζ₁₁⁴	ζ₃ζ₁₁⁶+ζ₃ζ₁₁⁵	complex lifted from C₃×D₁₁
ρ₁₄	2	2	0	0	-1+√-3	-1-√-3	0	0	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁸+ζ₁₁³	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁹+ζ₁₁²	ζ₃ζ₁₁⁹+ζ₃ζ₁₁²	ζ₃²ζ₁₁⁹+ζ₃²ζ₁₁²	ζ₃²ζ₁₁⁷+ζ₃²ζ₁₁⁴	ζ₃²ζ₁₁⁶+ζ₃²ζ₁₁⁵	ζ₃²ζ₁₁⁸+ζ₃²ζ₁₁³	ζ₃²ζ₁₁¹⁰+ζ₃²ζ₁₁	ζ₃ζ₁₁⁷+ζ₃ζ₁₁⁴	ζ₃ζ₁₁⁶+ζ₃ζ₁₁⁵	ζ₃ζ₁₁⁸+ζ₃ζ₁₁³	ζ₃ζ₁₁¹⁰+ζ₃ζ₁₁	complex lifted from C₃×D₁₁
ρ₁₅	2	2	0	0	-1+√-3	-1-√-3	0	0	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁸+ζ₁₁³	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁹+ζ₁₁²	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁷+ζ₁₁⁴	ζ₃ζ₁₁⁷+ζ₃ζ₁₁⁴	ζ₃²ζ₁₁⁷+ζ₃²ζ₁₁⁴	ζ₃²ζ₁₁⁸+ζ₃²ζ₁₁³	ζ₃²ζ₁₁¹⁰+ζ₃²ζ₁₁	ζ₃²ζ₁₁⁶+ζ₃²ζ₁₁⁵	ζ₃²ζ₁₁⁹+ζ₃²ζ₁₁²	ζ₃ζ₁₁⁸+ζ₃ζ₁₁³	ζ₃ζ₁₁¹⁰+ζ₃ζ₁₁	ζ₃ζ₁₁⁶+ζ₃ζ₁₁⁵	ζ₃ζ₁₁⁹+ζ₃ζ₁₁²	complex lifted from C₃×D₁₁
ρ₁₆	2	2	0	0	-1+√-3	-1-√-3	0	0	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁹+ζ₁₁²	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁹+ζ₁₁²	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁸+ζ₁₁³	ζ₃ζ₁₁⁸+ζ₃ζ₁₁³	ζ₃²ζ₁₁⁸+ζ₃²ζ₁₁³	ζ₃²ζ₁₁⁶+ζ₃²ζ₁₁⁵	ζ₃²ζ₁₁⁹+ζ₃²ζ₁₁²	ζ₃²ζ₁₁¹⁰+ζ₃²ζ₁₁	ζ₃²ζ₁₁⁷+ζ₃²ζ₁₁⁴	ζ₃ζ₁₁⁶+ζ₃ζ₁₁⁵	ζ₃ζ₁₁⁹+ζ₃ζ₁₁²	ζ₃ζ₁₁¹⁰+ζ₃ζ₁₁	ζ₃ζ₁₁⁷+ζ₃ζ₁₁⁴	complex lifted from C₃×D₁₁
ρ₁₇	2	2	0	0	-1-√-3	-1+√-3	0	0	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁸+ζ₁₁³	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁶+ζ₁₁⁵	ζ₃²ζ₁₁⁶+ζ₃²ζ₁₁⁵	ζ₃ζ₁₁⁶+ζ₃ζ₁₁⁵	ζ₃ζ₁₁¹⁰+ζ₃ζ₁₁	ζ₃ζ₁₁⁷+ζ₃ζ₁₁⁴	ζ₃ζ₁₁⁹+ζ₃ζ₁₁²	ζ₃ζ₁₁⁸+ζ₃ζ₁₁³	ζ₃²ζ₁₁¹⁰+ζ₃²ζ₁₁	ζ₃²ζ₁₁⁷+ζ₃²ζ₁₁⁴	ζ₃²ζ₁₁⁹+ζ₃²ζ₁₁²	ζ₃²ζ₁₁⁸+ζ₃²ζ₁₁³	complex lifted from C₃×D₁₁
ρ₁₈	2	2	0	0	-1-√-3	-1+√-3	0	0	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁸+ζ₁₁³	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁹+ζ₁₁²	ζ₃²ζ₁₁⁹+ζ₃²ζ₁₁²	ζ₃ζ₁₁⁹+ζ₃ζ₁₁²	ζ₃ζ₁₁⁷+ζ₃ζ₁₁⁴	ζ₃ζ₁₁⁶+ζ₃ζ₁₁⁵	ζ₃ζ₁₁⁸+ζ₃ζ₁₁³	ζ₃ζ₁₁¹⁰+ζ₃ζ₁₁	ζ₃²ζ₁₁⁷+ζ₃²ζ₁₁⁴	ζ₃²ζ₁₁⁶+ζ₃²ζ₁₁⁵	ζ₃²ζ₁₁⁸+ζ₃²ζ₁₁³	ζ₃²ζ₁₁¹⁰+ζ₃²ζ₁₁	complex lifted from C₃×D₁₁
ρ₁₉	2	2	0	0	-1-√-3	-1+√-3	0	0	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁¹⁰+ζ₁₁	ζ₃²ζ₁₁¹⁰+ζ₃²ζ₁₁	ζ₃ζ₁₁¹⁰+ζ₃ζ₁₁	ζ₃ζ₁₁⁹+ζ₃ζ₁₁²	ζ₃ζ₁₁⁸+ζ₃ζ₁₁³	ζ₃ζ₁₁⁷+ζ₃ζ₁₁⁴	ζ₃ζ₁₁⁶+ζ₃ζ₁₁⁵	ζ₃²ζ₁₁⁹+ζ₃²ζ₁₁²	ζ₃²ζ₁₁⁸+ζ₃²ζ₁₁³	ζ₃²ζ₁₁⁷+ζ₃²ζ₁₁⁴	ζ₃²ζ₁₁⁶+ζ₃²ζ₁₁⁵	complex lifted from C₃×D₁₁
ρ₂₀	2	2	0	0	-1+√-3	-1-√-3	0	0	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁸+ζ₁₁³	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁹+ζ₁₁²	ζ₁₁⁶+ζ₁₁⁵	ζ₃ζ₁₁⁶+ζ₃ζ₁₁⁵	ζ₃²ζ₁₁⁶+ζ₃²ζ₁₁⁵	ζ₃²ζ₁₁¹⁰+ζ₃²ζ₁₁	ζ₃²ζ₁₁⁷+ζ₃²ζ₁₁⁴	ζ₃²ζ₁₁⁹+ζ₃²ζ₁₁²	ζ₃²ζ₁₁⁸+ζ₃²ζ₁₁³	ζ₃ζ₁₁¹⁰+ζ₃ζ₁₁	ζ₃ζ₁₁⁷+ζ₃ζ₁₁⁴	ζ₃ζ₁₁⁹+ζ₃ζ₁₁²	ζ₃ζ₁₁⁸+ζ₃ζ₁₁³	complex lifted from C₃×D₁₁
ρ₂₁	2	2	0	0	-1-√-3	-1+√-3	0	0	ζ₁₁⁸+ζ₁₁³	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁹+ζ₁₁²	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁶+ζ₁₁⁵	ζ₁₁⁷+ζ₁₁⁴	ζ₁₁⁹+ζ₁₁²	ζ₁₁¹⁰+ζ₁₁	ζ₁₁⁸+ζ₁₁³	ζ₃²ζ₁₁⁸+ζ₃²ζ₁₁³	ζ₃ζ₁₁⁸+ζ₃ζ₁₁³	ζ₃ζ₁₁⁶+ζ₃ζ₁₁⁵	ζ₃ζ₁₁⁹+ζ₃ζ₁₁²	ζ₃ζ₁₁¹⁰+ζ₃ζ₁₁	ζ₃ζ₁₁⁷+ζ₃ζ₁₁⁴	ζ₃²ζ₁₁⁶+ζ₃²ζ₁₁⁵	ζ₃²ζ₁₁⁹+ζ₃²ζ₁₁²	ζ₃²ζ₁₁¹⁰+ζ₃²ζ₁₁	ζ₃²ζ₁₁⁷+ζ₃²ζ₁₁⁴	complex lifted from C₃×D₁₁
ρ₂₂	3	-1	-3	1	0	0	0	0	3	3	3	3	3	-1	-1	-1	-1	-1	0	0	0	0	0	0	0	0	0	0	orthogonal lifted from C₂×A₄
ρ₂₃	3	-1	3	-1	0	0	0	0	3	3	3	3	3	-1	-1	-1	-1	-1	0	0	0	0	0	0	0	0	0	0	orthogonal lifted from A₄
ρ₂₄	6	-2	0	0	0	0	0	0	3ζ₁₁⁸+3ζ₁₁³	3ζ₁₁⁶+3ζ₁₁⁵	3ζ₁₁⁹+3ζ₁₁²	3ζ₁₁¹⁰+3ζ₁₁	3ζ₁₁⁷+3ζ₁₁⁴	-ζ₁₁⁶-ζ₁₁⁵	-ζ₁₁⁷-ζ₁₁⁴	-ζ₁₁⁹-ζ₁₁²	-ζ₁₁¹⁰-ζ₁₁	-ζ₁₁⁸-ζ₁₁³	0	0	0	0	0	0	0	0	0	0	orthogonal faithful
ρ₂₅	6	-2	0	0	0	0	0	0	3ζ₁₁⁶+3ζ₁₁⁵	3ζ₁₁¹⁰+3ζ₁₁	3ζ₁₁⁷+3ζ₁₁⁴	3ζ₁₁⁹+3ζ₁₁²	3ζ₁₁⁸+3ζ₁₁³	-ζ₁₁¹⁰-ζ₁₁	-ζ₁₁⁸-ζ₁₁³	-ζ₁₁⁷-ζ₁₁⁴	-ζ₁₁⁹-ζ₁₁²	-ζ₁₁⁶-ζ₁₁⁵	0	0	0	0	0	0	0	0	0	0	orthogonal faithful
ρ₂₆	6	-2	0	0	0	0	0	0	3ζ₁₁¹⁰+3ζ₁₁	3ζ₁₁⁹+3ζ₁₁²	3ζ₁₁⁸+3ζ₁₁³	3ζ₁₁⁷+3ζ₁₁⁴	3ζ₁₁⁶+3ζ₁₁⁵	-ζ₁₁⁹-ζ₁₁²	-ζ₁₁⁶-ζ₁₁⁵	-ζ₁₁⁸-ζ₁₁³	-ζ₁₁⁷-ζ₁₁⁴	-ζ₁₁¹⁰-ζ₁₁	0	0	0	0	0	0	0	0	0	0	orthogonal faithful
ρ₂₇	6	-2	0	0	0	0	0	0	3ζ₁₁⁹+3ζ₁₁²	3ζ₁₁⁷+3ζ₁₁⁴	3ζ₁₁⁶+3ζ₁₁⁵	3ζ₁₁⁸+3ζ₁₁³	3ζ₁₁¹⁰+3ζ₁₁	-ζ₁₁⁷-ζ₁₁⁴	-ζ₁₁¹⁰-ζ₁₁	-ζ₁₁⁶-ζ₁₁⁵	-ζ₁₁⁸-ζ₁₁³	-ζ₁₁⁹-ζ₁₁²	0	0	0	0	0	0	0	0	0	0	orthogonal faithful
ρ₂₈	6	-2	0	0	0	0	0	0	3ζ₁₁⁷+3ζ₁₁⁴	3ζ₁₁⁸+3ζ₁₁³	3ζ₁₁¹⁰+3ζ₁₁	3ζ₁₁⁶+3ζ₁₁⁵	3ζ₁₁⁹+3ζ₁₁²	-ζ₁₁⁸-ζ₁₁³	-ζ₁₁⁹-ζ₁₁²	-ζ₁₁¹⁰-ζ₁₁	-ζ₁₁⁶-ζ₁₁⁵	-ζ₁₁⁷-ζ₁₁⁴	0	0	0	0	0	0	0	0	0	0	orthogonal faithful

Smallest permutation representation of A₄×D₁₁
►On 44 points

Generators in S₄₄

(1 21)(2 22)(3 12)(4 13)(5 14)(6 15)(7 16)(8 17)(9 18)(10 19)(11 20)(23 34)(24 35)(25 36)(26 37)(27 38)(28 39)(29 40)(30 41)(31 42)(32 43)(33 44)

(1 32)(2 33)(3 23)(4 24)(5 25)(6 26)(7 27)(8 28)(9 29)(10 30)(11 31)(12 34)(13 35)(14 36)(15 37)(16 38)(17 39)(18 40)(19 41)(20 42)(21 43)(22 44)

(12 23 34)(13 24 35)(14 25 36)(15 26 37)(16 27 38)(17 28 39)(18 29 40)(19 30 41)(20 31 42)(21 32 43)(22 33 44)

(1 2 3 4 5 6 7 8 9 10 11)(12 13 14 15 16 17 18 19 20 21 22)(23 24 25 26 27 28 29 30 31 32 33)(34 35 36 37 38 39 40 41 42 43 44)

(1 11)(2 10)(3 9)(4 8)(5 7)(12 18)(13 17)(14 16)(19 22)(20 21)(23 29)(24 28)(25 27)(30 33)(31 32)(34 40)(35 39)(36 38)(41 44)(42 43)

G:=sub<Sym(44)| (1,21)(2,22)(3,12)(4,13)(5,14)(6,15)(7,16)(8,17)(9,18)(10,19)(11,20)(23,34)(24,35)(25,36)(26,37)(27,38)(28,39)(29,40)(30,41)(31,42)(32,43)(33,44), (1,32)(2,33)(3,23)(4,24)(5,25)(6,26)(7,27)(8,28)(9,29)(10,30)(11,31)(12,34)(13,35)(14,36)(15,37)(16,38)(17,39)(18,40)(19,41)(20,42)(21,43)(22,44), (12,23,34)(13,24,35)(14,25,36)(15,26,37)(16,27,38)(17,28,39)(18,29,40)(19,30,41)(20,31,42)(21,32,43)(22,33,44), (1,2,3,4,5,6,7,8,9,10,11)(12,13,14,15,16,17,18,19,20,21,22)(23,24,25,26,27,28,29,30,31,32,33)(34,35,36,37,38,39,40,41,42,43,44), (1,11)(2,10)(3,9)(4,8)(5,7)(12,18)(13,17)(14,16)(19,22)(20,21)(23,29)(24,28)(25,27)(30,33)(31,32)(34,40)(35,39)(36,38)(41,44)(42,43)>;

G:=Group( (1,21)(2,22)(3,12)(4,13)(5,14)(6,15)(7,16)(8,17)(9,18)(10,19)(11,20)(23,34)(24,35)(25,36)(26,37)(27,38)(28,39)(29,40)(30,41)(31,42)(32,43)(33,44), (1,32)(2,33)(3,23)(4,24)(5,25)(6,26)(7,27)(8,28)(9,29)(10,30)(11,31)(12,34)(13,35)(14,36)(15,37)(16,38)(17,39)(18,40)(19,41)(20,42)(21,43)(22,44), (12,23,34)(13,24,35)(14,25,36)(15,26,37)(16,27,38)(17,28,39)(18,29,40)(19,30,41)(20,31,42)(21,32,43)(22,33,44), (1,2,3,4,5,6,7,8,9,10,11)(12,13,14,15,16,17,18,19,20,21,22)(23,24,25,26,27,28,29,30,31,32,33)(34,35,36,37,38,39,40,41,42,43,44), (1,11)(2,10)(3,9)(4,8)(5,7)(12,18)(13,17)(14,16)(19,22)(20,21)(23,29)(24,28)(25,27)(30,33)(31,32)(34,40)(35,39)(36,38)(41,44)(42,43) );

G=PermutationGroup([[(1,21),(2,22),(3,12),(4,13),(5,14),(6,15),(7,16),(8,17),(9,18),(10,19),(11,20),(23,34),(24,35),(25,36),(26,37),(27,38),(28,39),(29,40),(30,41),(31,42),(32,43),(33,44)], [(1,32),(2,33),(3,23),(4,24),(5,25),(6,26),(7,27),(8,28),(9,29),(10,30),(11,31),(12,34),(13,35),(14,36),(15,37),(16,38),(17,39),(18,40),(19,41),(20,42),(21,43),(22,44)], [(12,23,34),(13,24,35),(14,25,36),(15,26,37),(16,27,38),(17,28,39),(18,29,40),(19,30,41),(20,31,42),(21,32,43),(22,33,44)], [(1,2,3,4,5,6,7,8,9,10,11),(12,13,14,15,16,17,18,19,20,21,22),(23,24,25,26,27,28,29,30,31,32,33),(34,35,36,37,38,39,40,41,42,43,44)], [(1,11),(2,10),(3,9),(4,8),(5,7),(12,18),(13,17),(14,16),(19,22),(20,21),(23,29),(24,28),(25,27),(30,33),(31,32),(34,40),(35,39),(36,38),(41,44),(42,43)]])

Matrix representation of A₄×D₁₁ ►in GL₅(𝔽₆₇)

1	0	0	0	0
0	1	0	0	0
0	0	66	0	0
0	0	65	66	52
0	0	36	0	1

1	0	0	0	0
0	1	0	0	0
0	0	66	65	52
0	0	0	66	0
0	0	0	36	1

37	0	0	0	0
0	37	0	0	0
0	0	66	66	52
0	0	1	0	0
0	0	0	0	1

24	1	0	0	0
62	11	0	0	0
0	0	1	0	0
0	0	0	1	0
0	0	0	0	1

29	49	0	0	0
2	38	0	0	0
0	0	66	0	0
0	0	0	66	0
0	0	0	0	66

G:=sub<GL(5,GF(67))| [1,0,0,0,0,0,1,0,0,0,0,0,66,65,36,0,0,0,66,0,0,0,0,52,1],[1,0,0,0,0,0,1,0,0,0,0,0,66,0,0,0,0,65,66,36,0,0,52,0,1],[37,0,0,0,0,0,37,0,0,0,0,0,66,1,0,0,0,66,0,0,0,0,52,0,1],[24,62,0,0,0,1,11,0,0,0,0,0,1,0,0,0,0,0,1,0,0,0,0,0,1],[29,2,0,0,0,49,38,0,0,0,0,0,66,0,0,0,0,0,66,0,0,0,0,0,66] >;

A₄×D₁₁ in GAP, Magma, Sage, TeX

A_4\times D_{11}

% in TeX

G:=Group("A4xD11");

// GroupNames label

G:=SmallGroup(264,33);

// by ID

G=gap.SmallGroup(264,33);

# by ID

G:=PCGroup([5,-2,-3,-2,2,-11,142,68,6004]);

// Polycyclic

G:=Group<a,b,c,d,e|a^2=b^2=c^3=d^11=e^2=1,c*a*c^-1=a*b=b*a,a*d=d*a,a*e=e*a,c*b*c^-1=a,b*d=d*b,b*e=e*b,c*d=d*c,c*e=e*c,e*d*e=d^-1>;

// generators/relations

Export

Subgroup lattice of A₄×D₁₁ in TeX
Character table of A₄×D₁₁ in TeX

G = A4×D11 order 264 = 23·3·11

Direct product of A4 and D11

G = A₄×D₁₁ order 264 = 2³·3·11

Direct product of A₄ and D₁₁