D19:A4 - GroupNames

G = D₁₉⋊A₄ order 456 = 2³·3·19

The semidirect product of D₁₉ and A₄ acting via A₄/C₂²=C₃

metabelian, soluble, monomial, A-group

Aliases: D₁₉⋊A₄, C₁₉⋊A₄⋊C₂, C₁₉⋊(C₂×A₄), (C₂×C₃₈)⋊₂C₆, C₂²⋊(C₁₉⋊C₆), (C₂²×D₁₉)⋊₂C₃, SmallGroup(456,46)

Series: Derived ►Chief ►Lower central ►Upper central

Derived series

C₁ — C₂×C₃₈ — D₁₉⋊A₄

Chief series

C₁ — C₁₉ — C₂×C₃₈ — C₁₉⋊A₄ — D₁₉⋊A₄

Lower central

C₂×C₃₈ — D₁₉⋊A₄

Upper central

C₁

Generators and relations for D₁₉⋊A₄
G = < a,b,c,d,e | a¹⁹=b²=c²=d²=e³=1, bab=a^-1, ac=ca, ad=da, eae^-1=a¹¹, bc=cb, bd=db, ebe^-1=a¹⁰b, ece^-1=cd=dc, ede^-1=c >

C₁

₃C₂

₁₉C₂

₅₇C₂

₇₆C₃

C₁₉

C₂²

₅₇C₂²

₇₆C₆

D₁₉

₃C₃₈

₃D₁₉

₄C₁₉⋊C₃

₁₉C₂³

₁₉A₄

C₂×C₃₈

₃D₃₈

₄C₁₉⋊C₆

₁₉C₂×A₄

C₂²×D₁₉

C₁₉⋊A₄

D₁₉⋊A₄

Character table of D₁₉⋊A₄

class	1	2A	2B	2C	3A	3B	6A	6B	19A	19B	19C	38A	38B	38C	38D	38E	38F	38G	38H	38I
size	1	3	19	57	76	76	76	76	6	6	6	6	6	6	6	6	6	6	6	6
ρ₁	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	linear of order 2
ρ₃	1	1	1	1	ζ₃	ζ₃²	ζ₃²	ζ₃	1	1	1	1	1	1	1	1	1	1	1	1	linear of order 3
ρ₄	1	1	-1	-1	ζ₃²	ζ₃	ζ₆⁵	ζ₆	1	1	1	1	1	1	1	1	1	1	1	1	linear of order 6
ρ₅	1	1	-1	-1	ζ₃	ζ₃²	ζ₆	ζ₆⁵	1	1	1	1	1	1	1	1	1	1	1	1	linear of order 6
ρ₆	1	1	1	1	ζ₃²	ζ₃	ζ₃	ζ₃²	1	1	1	1	1	1	1	1	1	1	1	1	linear of order 3
ρ₇	3	-1	3	-1	0	0	0	0	3	3	3	-1	-1	-1	-1	-1	-1	-1	-1	-1	orthogonal lifted from A₄
ρ₈	3	-1	-3	1	0	0	0	0	3	3	3	-1	-1	-1	-1	-1	-1	-1	-1	-1	orthogonal lifted from C₂×A₄
ρ₉	6	-2	0	0	0	0	0	0	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	-ζ₁₉¹⁷-ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵-ζ₁₉³-ζ₁₉²	-ζ₁₉¹⁵-ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹-ζ₁₉⁶-ζ₁₉⁴	-ζ₁₉¹⁷+ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵+ζ₁₉³-ζ₁₉²	-ζ₁₉¹⁸-ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸-ζ₁₉⁷-ζ₁₉	ζ₁₉¹⁷-ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵-ζ₁₉³+ζ₁₉²	ζ₁₉¹⁵-ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹-ζ₁₉⁶+ζ₁₉⁴	-ζ₁₉¹⁵+ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹+ζ₁₉⁶-ζ₁₉⁴	-ζ₁₉¹⁸+ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸+ζ₁₉⁷-ζ₁₉	ζ₁₉¹⁸-ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸-ζ₁₉⁷+ζ₁₉	orthogonal faithful
ρ₁₀	6	-2	0	0	0	0	0	0	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁸-ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸-ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁷-ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵-ζ₁₉³+ζ₁₉²	-ζ₁₉¹⁸+ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸+ζ₁₉⁷-ζ₁₉	-ζ₁₉¹⁵+ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹+ζ₁₉⁶-ζ₁₉⁴	-ζ₁₉¹⁸-ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸-ζ₁₉⁷-ζ₁₉	-ζ₁₉¹⁷+ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵+ζ₁₉³-ζ₁₉²	-ζ₁₉¹⁷-ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵-ζ₁₉³-ζ₁₉²	-ζ₁₉¹⁵-ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹-ζ₁₉⁶-ζ₁₉⁴	ζ₁₉¹⁵-ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹-ζ₁₉⁶+ζ₁₉⁴	orthogonal faithful
ρ₁₁	6	-2	0	0	0	0	0	0	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	-ζ₁₉¹⁵+ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹+ζ₁₉⁶-ζ₁₉⁴	-ζ₁₉¹⁸+ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸+ζ₁₉⁷-ζ₁₉	ζ₁₉¹⁵-ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹-ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁷-ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵-ζ₁₉³+ζ₁₉²	-ζ₁₉¹⁵-ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹-ζ₁₉⁶-ζ₁₉⁴	ζ₁₉¹⁸-ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸-ζ₁₉⁷+ζ₁₉	-ζ₁₉¹⁸-ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸-ζ₁₉⁷-ζ₁₉	-ζ₁₉¹⁷+ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵+ζ₁₉³-ζ₁₉²	-ζ₁₉¹⁷-ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵-ζ₁₉³-ζ₁₉²	orthogonal faithful
ρ₁₂	6	6	0	0	0	0	0	0	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	orthogonal lifted from C₁₉⋊C₆
ρ₁₃	6	-2	0	0	0	0	0	0	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	-ζ₁₉¹⁸+ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸+ζ₁₉⁷-ζ₁₉	-ζ₁₉¹⁷-ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵-ζ₁₉³-ζ₁₉²	-ζ₁₉¹⁸-ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸-ζ₁₉⁷-ζ₁₉	ζ₁₉¹⁵-ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹-ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁸-ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸-ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁷-ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵-ζ₁₉³+ζ₁₉²	-ζ₁₉¹⁷+ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵+ζ₁₉³-ζ₁₉²	-ζ₁₉¹⁵+ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹+ζ₁₉⁶-ζ₁₉⁴	-ζ₁₉¹⁵-ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹-ζ₁₉⁶-ζ₁₉⁴	orthogonal faithful
ρ₁₄	6	-2	0	0	0	0	0	0	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	-ζ₁₉¹⁸-ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸-ζ₁₉⁷-ζ₁₉	-ζ₁₉¹⁷+ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵+ζ₁₉³-ζ₁₉²	ζ₁₉¹⁸-ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸-ζ₁₉⁷+ζ₁₉	-ζ₁₉¹⁵-ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹-ζ₁₉⁶-ζ₁₉⁴	-ζ₁₉¹⁸+ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸+ζ₁₉⁷-ζ₁₉	-ζ₁₉¹⁷-ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵-ζ₁₉³-ζ₁₉²	ζ₁₉¹⁷-ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵-ζ₁₉³+ζ₁₉²	ζ₁₉¹⁵-ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹-ζ₁₉⁶+ζ₁₉⁴	-ζ₁₉¹⁵+ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹+ζ₁₉⁶-ζ₁₉⁴	orthogonal faithful
ρ₁₅	6	-2	0	0	0	0	0	0	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	-ζ₁₉¹⁷+ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵+ζ₁₉³-ζ₁₉²	-ζ₁₉¹⁵+ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹+ζ₁₉⁶-ζ₁₉⁴	ζ₁₉¹⁷-ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵-ζ₁₉³+ζ₁₉²	ζ₁₉¹⁸-ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸-ζ₁₉⁷+ζ₁₉	-ζ₁₉¹⁷-ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵-ζ₁₉³-ζ₁₉²	-ζ₁₉¹⁵-ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹-ζ₁₉⁶-ζ₁₉⁴	ζ₁₉¹⁵-ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹-ζ₁₉⁶+ζ₁₉⁴	-ζ₁₉¹⁸-ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸-ζ₁₉⁷-ζ₁₉	-ζ₁₉¹⁸+ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸+ζ₁₉⁷-ζ₁₉	orthogonal faithful
ρ₁₆	6	-2	0	0	0	0	0	0	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁵-ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹-ζ₁₉⁶+ζ₁₉⁴	-ζ₁₉¹⁸-ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸-ζ₁₉⁷-ζ₁₉	-ζ₁₉¹⁵-ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹-ζ₁₉⁶-ζ₁₉⁴	-ζ₁₉¹⁷-ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵-ζ₁₉³-ζ₁₉²	-ζ₁₉¹⁵+ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹+ζ₁₉⁶-ζ₁₉⁴	-ζ₁₉¹⁸+ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸+ζ₁₉⁷-ζ₁₉	ζ₁₉¹⁸-ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸-ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁷-ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵-ζ₁₉³+ζ₁₉²	-ζ₁₉¹⁷+ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵+ζ₁₉³-ζ₁₉²	orthogonal faithful
ρ₁₇	6	6	0	0	0	0	0	0	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	orthogonal lifted from C₁₉⋊C₆
ρ₁₈	6	-2	0	0	0	0	0	0	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	-ζ₁₉¹⁵-ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹-ζ₁₉⁶-ζ₁₉⁴	ζ₁₉¹⁸-ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸-ζ₁₉⁷+ζ₁₉	-ζ₁₉¹⁵+ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹+ζ₁₉⁶-ζ₁₉⁴	-ζ₁₉¹⁷+ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵+ζ₁₉³-ζ₁₉²	ζ₁₉¹⁵-ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹-ζ₁₉⁶+ζ₁₉⁴	-ζ₁₉¹⁸-ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸-ζ₁₉⁷-ζ₁₉	-ζ₁₉¹⁸+ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸+ζ₁₉⁷-ζ₁₉	-ζ₁₉¹⁷-ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵-ζ₁₉³-ζ₁₉²	ζ₁₉¹⁷-ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵-ζ₁₉³+ζ₁₉²	orthogonal faithful
ρ₁₉	6	-2	0	0	0	0	0	0	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁷-ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵-ζ₁₉³+ζ₁₉²	ζ₁₉¹⁵-ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹-ζ₁₉⁶+ζ₁₉⁴	-ζ₁₉¹⁷-ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵-ζ₁₉³-ζ₁₉²	-ζ₁₉¹⁸+ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸+ζ₁₉⁷-ζ₁₉	-ζ₁₉¹⁷+ζ₁₉¹⁶-ζ₁₉¹⁴-ζ₁₉⁵+ζ₁₉³-ζ₁₉²	-ζ₁₉¹⁵+ζ₁₉¹³-ζ₁₉¹⁰-ζ₁₉⁹+ζ₁₉⁶-ζ₁₉⁴	-ζ₁₉¹⁵-ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹-ζ₁₉⁶-ζ₁₉⁴	ζ₁₉¹⁸-ζ₁₉¹²-ζ₁₉¹¹-ζ₁₉⁸-ζ₁₉⁷+ζ₁₉	-ζ₁₉¹⁸-ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸-ζ₁₉⁷-ζ₁₉	orthogonal faithful
ρ₂₀	6	6	0	0	0	0	0	0	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁸+ζ₁₉¹²+ζ₁₉¹¹+ζ₁₉⁸+ζ₁₉⁷+ζ₁₉	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁷+ζ₁₉¹⁶+ζ₁₉¹⁴+ζ₁₉⁵+ζ₁₉³+ζ₁₉²	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	ζ₁₉¹⁵+ζ₁₉¹³+ζ₁₉¹⁰+ζ₁₉⁹+ζ₁₉⁶+ζ₁₉⁴	orthogonal lifted from C₁₉⋊C₆

Smallest permutation representation of D₁₉⋊A₄
►On 76 points

Generators in S₇₆

(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 45 46 47 48 49 50 51 52 53 54 55 56 57)(58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76)

(1 19)(2 18)(3 17)(4 16)(5 15)(6 14)(7 13)(8 12)(9 11)(20 36)(21 35)(22 34)(23 33)(24 32)(25 31)(26 30)(27 29)(37 38)(39 41)(42 57)(43 56)(44 55)(45 54)(46 53)(47 52)(48 51)(49 50)(58 66)(59 65)(60 64)(61 63)(67 76)(68 75)(69 74)(70 73)(71 72)

(1 50)(2 51)(3 52)(4 53)(5 54)(6 55)(7 56)(8 57)(9 39)(10 40)(11 41)(12 42)(13 43)(14 44)(15 45)(16 46)(17 47)(18 48)(19 49)(20 73)(21 74)(22 75)(23 76)(24 58)(25 59)(26 60)(27 61)(28 62)(29 63)(30 64)(31 65)(32 66)(33 67)(34 68)(35 69)(36 70)(37 71)(38 72)

(1 38)(2 20)(3 21)(4 22)(5 23)(6 24)(7 25)(8 26)(9 27)(10 28)(11 29)(12 30)(13 31)(14 32)(15 33)(16 34)(17 35)(18 36)(19 37)(39 61)(40 62)(41 63)(42 64)(43 65)(44 66)(45 67)(46 68)(47 69)(48 70)(49 71)(50 72)(51 73)(52 74)(53 75)(54 76)(55 58)(56 59)(57 60)

(2 8 12)(3 15 4)(5 10 7)(6 17 18)(9 19 13)(11 14 16)(20 60 42)(21 67 53)(22 74 45)(23 62 56)(24 69 48)(25 76 40)(26 64 51)(27 71 43)(28 59 54)(29 66 46)(30 73 57)(31 61 49)(32 68 41)(33 75 52)(34 63 44)(35 70 55)(36 58 47)(37 65 39)(38 72 50)

G:=sub<Sym(76)| (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)(39,40,41,42,43,44,45,46,47,48,49,50,51,52,53,54,55,56,57)(58,59,60,61,62,63,64,65,66,67,68,69,70,71,72,73,74,75,76), (1,19)(2,18)(3,17)(4,16)(5,15)(6,14)(7,13)(8,12)(9,11)(20,36)(21,35)(22,34)(23,33)(24,32)(25,31)(26,30)(27,29)(37,38)(39,41)(42,57)(43,56)(44,55)(45,54)(46,53)(47,52)(48,51)(49,50)(58,66)(59,65)(60,64)(61,63)(67,76)(68,75)(69,74)(70,73)(71,72), (1,50)(2,51)(3,52)(4,53)(5,54)(6,55)(7,56)(8,57)(9,39)(10,40)(11,41)(12,42)(13,43)(14,44)(15,45)(16,46)(17,47)(18,48)(19,49)(20,73)(21,74)(22,75)(23,76)(24,58)(25,59)(26,60)(27,61)(28,62)(29,63)(30,64)(31,65)(32,66)(33,67)(34,68)(35,69)(36,70)(37,71)(38,72), (1,38)(2,20)(3,21)(4,22)(5,23)(6,24)(7,25)(8,26)(9,27)(10,28)(11,29)(12,30)(13,31)(14,32)(15,33)(16,34)(17,35)(18,36)(19,37)(39,61)(40,62)(41,63)(42,64)(43,65)(44,66)(45,67)(46,68)(47,69)(48,70)(49,71)(50,72)(51,73)(52,74)(53,75)(54,76)(55,58)(56,59)(57,60), (2,8,12)(3,15,4)(5,10,7)(6,17,18)(9,19,13)(11,14,16)(20,60,42)(21,67,53)(22,74,45)(23,62,56)(24,69,48)(25,76,40)(26,64,51)(27,71,43)(28,59,54)(29,66,46)(30,73,57)(31,61,49)(32,68,41)(33,75,52)(34,63,44)(35,70,55)(36,58,47)(37,65,39)(38,72,50)>;

G:=Group( (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)(39,40,41,42,43,44,45,46,47,48,49,50,51,52,53,54,55,56,57)(58,59,60,61,62,63,64,65,66,67,68,69,70,71,72,73,74,75,76), (1,19)(2,18)(3,17)(4,16)(5,15)(6,14)(7,13)(8,12)(9,11)(20,36)(21,35)(22,34)(23,33)(24,32)(25,31)(26,30)(27,29)(37,38)(39,41)(42,57)(43,56)(44,55)(45,54)(46,53)(47,52)(48,51)(49,50)(58,66)(59,65)(60,64)(61,63)(67,76)(68,75)(69,74)(70,73)(71,72), (1,50)(2,51)(3,52)(4,53)(5,54)(6,55)(7,56)(8,57)(9,39)(10,40)(11,41)(12,42)(13,43)(14,44)(15,45)(16,46)(17,47)(18,48)(19,49)(20,73)(21,74)(22,75)(23,76)(24,58)(25,59)(26,60)(27,61)(28,62)(29,63)(30,64)(31,65)(32,66)(33,67)(34,68)(35,69)(36,70)(37,71)(38,72), (1,38)(2,20)(3,21)(4,22)(5,23)(6,24)(7,25)(8,26)(9,27)(10,28)(11,29)(12,30)(13,31)(14,32)(15,33)(16,34)(17,35)(18,36)(19,37)(39,61)(40,62)(41,63)(42,64)(43,65)(44,66)(45,67)(46,68)(47,69)(48,70)(49,71)(50,72)(51,73)(52,74)(53,75)(54,76)(55,58)(56,59)(57,60), (2,8,12)(3,15,4)(5,10,7)(6,17,18)(9,19,13)(11,14,16)(20,60,42)(21,67,53)(22,74,45)(23,62,56)(24,69,48)(25,76,40)(26,64,51)(27,71,43)(28,59,54)(29,66,46)(30,73,57)(31,61,49)(32,68,41)(33,75,52)(34,63,44)(35,70,55)(36,58,47)(37,65,39)(38,72,50) );

G=PermutationGroup([[(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),(39,40,41,42,43,44,45,46,47,48,49,50,51,52,53,54,55,56,57),(58,59,60,61,62,63,64,65,66,67,68,69,70,71,72,73,74,75,76)], [(1,19),(2,18),(3,17),(4,16),(5,15),(6,14),(7,13),(8,12),(9,11),(20,36),(21,35),(22,34),(23,33),(24,32),(25,31),(26,30),(27,29),(37,38),(39,41),(42,57),(43,56),(44,55),(45,54),(46,53),(47,52),(48,51),(49,50),(58,66),(59,65),(60,64),(61,63),(67,76),(68,75),(69,74),(70,73),(71,72)], [(1,50),(2,51),(3,52),(4,53),(5,54),(6,55),(7,56),(8,57),(9,39),(10,40),(11,41),(12,42),(13,43),(14,44),(15,45),(16,46),(17,47),(18,48),(19,49),(20,73),(21,74),(22,75),(23,76),(24,58),(25,59),(26,60),(27,61),(28,62),(29,63),(30,64),(31,65),(32,66),(33,67),(34,68),(35,69),(36,70),(37,71),(38,72)], [(1,38),(2,20),(3,21),(4,22),(5,23),(6,24),(7,25),(8,26),(9,27),(10,28),(11,29),(12,30),(13,31),(14,32),(15,33),(16,34),(17,35),(18,36),(19,37),(39,61),(40,62),(41,63),(42,64),(43,65),(44,66),(45,67),(46,68),(47,69),(48,70),(49,71),(50,72),(51,73),(52,74),(53,75),(54,76),(55,58),(56,59),(57,60)], [(2,8,12),(3,15,4),(5,10,7),(6,17,18),(9,19,13),(11,14,16),(20,60,42),(21,67,53),(22,74,45),(23,62,56),(24,69,48),(25,76,40),(26,64,51),(27,71,43),(28,59,54),(29,66,46),(30,73,57),(31,61,49),(32,68,41),(33,75,52),(34,63,44),(35,70,55),(36,58,47),(37,65,39),(38,72,50)]])

Matrix representation of D₁₉⋊A₄ ►in GL₆(𝔽₂₂₉)

101	1	0	0	0	0
106	0	1	0	0	0
83	0	0	1	0	0
106	0	0	0	1	0
101	0	0	0	0	1
228	0	0	0	0	0

19	210	122	102	1	227
123	209	146	4	126	101
27	99	125	77	224	107
125	99	27	2	24	210
146	209	123	204	104	228
122	210	19	107	127	228

112	143	18	0	211	86
92	96	157	18	215	227
55	48	20	157	94	30
30	94	157	20	48	55
227	215	18	157	96	92
86	211	0	18	143	112

52	128	6	0	223	101
77	177	209	6	148	98
45	20	228	209	184	205
205	184	209	228	20	45
98	148	6	209	177	77
101	223	0	6	128	52

0	1	228	0	122	101
0	126	228	0	146	106
1	224	210	0	125	83
0	24	107	0	27	106
0	104	101	1	123	101
0	127	227	0	19	228

G:=sub<GL(6,GF(229))| [101,106,83,106,101,228,1,0,0,0,0,0,0,1,0,0,0,0,0,0,1,0,0,0,0,0,0,1,0,0,0,0,0,0,1,0],[19,123,27,125,146,122,210,209,99,99,209,210,122,146,125,27,123,19,102,4,77,2,204,107,1,126,224,24,104,127,227,101,107,210,228,228],[112,92,55,30,227,86,143,96,48,94,215,211,18,157,20,157,18,0,0,18,157,20,157,18,211,215,94,48,96,143,86,227,30,55,92,112],[52,77,45,205,98,101,128,177,20,184,148,223,6,209,228,209,6,0,0,6,209,228,209,6,223,148,184,20,177,128,101,98,205,45,77,52],[0,0,1,0,0,0,1,126,224,24,104,127,228,228,210,107,101,227,0,0,0,0,1,0,122,146,125,27,123,19,101,106,83,106,101,228] >;

D₁₉⋊A₄ in GAP, Magma, Sage, TeX

D_{19}\rtimes A_4

% in TeX

G:=Group("D19:A4");

// GroupNames label

G:=SmallGroup(456,46);

// by ID

G=gap.SmallGroup(456,46);

# by ID

G:=PCGroup([5,-2,-3,-2,2,-19,97,188,10804,2109]);

// Polycyclic

G:=Group<a,b,c,d,e|a^19=b^2=c^2=d^2=e^3=1,b*a*b=a^-1,a*c=c*a,a*d=d*a,e*a*e^-1=a^11,b*c=c*b,b*d=d*b,e*b*e^-1=a^10*b,e*c*e^-1=c*d=d*c,e*d*e^-1=c>;

// generators/relations

Export

Subgroup lattice of D₁₉⋊A₄ in TeX
Character table of D₁₉⋊A₄ in TeX

19	210	122	102	1	227
123	209	146	4	126	101
27	99	125	77	224	107
125	99	27	2	24	210
146	209	123	204	104	228
122	210	19	107	127	228

112	143	18	0	211	86
92	96	157	18	215	227
55	48	20	157	94	30
30	94	157	20	48	55
227	215	18	157	96	92
86	211	0	18	143	112

52	128	6	0	223	101
77	177	209	6	148	98
45	20	228	209	184	205
205	184	209	228	20	45
98	148	6	209	177	77
101	223	0	6	128	52

0	1	228	0	122	101
0	126	228	0	146	106
1	224	210	0	125	83
0	24	107	0	27	106
0	104	101	1	123	101
0	127	227	0	19	228

19	210	122	102	1	227
123	209	146	4	126	101
27	99	125	77	224	107
125	99	27	2	24	210
146	209	123	204	104	228
122	210	19	107	127	228

112	143	18	0	211	86
92	96	157	18	215	227
55	48	20	157	94	30
30	94	157	20	48	55
227	215	18	157	96	92
86	211	0	18	143	112

52	128	6	0	223	101
77	177	209	6	148	98
45	20	228	209	184	205
205	184	209	228	20	45
98	148	6	209	177	77
101	223	0	6	128	52

0	1	228	0	122	101
0	126	228	0	146	106
1	224	210	0	125	83
0	24	107	0	27	106
0	104	101	1	123	101
0	127	227	0	19	228

G = D19⋊A4 order 456 = 23·3·19

The semidirect product of D19 and A4 acting via A4/C22=C3

G = D₁₉⋊A₄ order 456 = 2³·3·19

The semidirect product of D₁₉ and A₄ acting via A₄/C₂²=C₃

19	210	122	102	1	227
123	209	146	4	126	101
27	99	125	77	224	107
125	99	27	2	24	210
146	209	123	204	104	228
122	210	19	107	127	228

112	143	18	0	211	86
92	96	157	18	215	227
55	48	20	157	94	30
30	94	157	20	48	55
227	215	18	157	96	92
86	211	0	18	143	112

52	128	6	0	223	101
77	177	209	6	148	98
45	20	228	209	184	205
205	184	209	228	20	45
98	148	6	209	177	77
101	223	0	6	128	52

0	1	228	0	122	101
0	126	228	0	146	106
1	224	210	0	125	83
0	24	107	0	27	106
0	104	101	1	123	101
0	127	227	0	19	228