C3^2:Dic7 - GroupNames

G = C₃²⋊Dic₇ order 252 = 2²·3²·7

The semidirect product of C₃² and Dic₇ acting via Dic₇/C₇=C₄

metabelian, soluble, monomial, A-group

Aliases: C₃²⋊Dic₇, C₇⋊(C₃²⋊C₄), C₃⋊S₃.D₇, (C₃×C₂₁)⋊₂C₄, (C₇×C₃⋊S₃).₂C₂, SmallGroup(252,32)

Series: Derived ►Chief ►Lower central ►Upper central

Derived series

C₁ — C₃×C₂₁ — C₃²⋊Dic₇

Chief series

C₁ — C₇ — C₃×C₂₁ — C₇×C₃⋊S₃ — C₃²⋊Dic₇

Lower central

C₃×C₂₁ — C₃²⋊Dic₇

Upper central

C₁

Generators and relations for C₃²⋊Dic₇
G = < a,b,c,d | a³=b³=c¹⁴=1, d²=c⁷, ab=ba, cac^-1=a^-1, dad^-1=ab^-1, cbc^-1=b^-1, dbd^-1=a^-1b^-1, dcd^-1=c^-1 >

C₁

₉C₂

₂C₃

C₇

₆₃C₄

₆S₃

C₃²

₉C₁₄

₂C₂₁

C₃⋊S₃

₉Dic₇

₆S₃×C₇

C₃×C₂₁

₇C₃²⋊C₄

C₇×C₃⋊S₃

C₃²⋊Dic₇

Character table of C₃²⋊Dic₇

class	1	2	3A	3B	4A	4B	7A	7B	7C	14A	14B	14C	21A	21B	21C	21D	21E	21F	21G	21H	21I	21J	21K	21L
size	1	9	4	4	63	63	2	2	2	18	18	18	4	4	4	4	4	4	4	4	4	4	4	4
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	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	linear of order 2
ρ₃	1	-1	1	1	-i	i	1	1	1	-1	-1	-1	1	1	1	1	1	1	1	1	1	1	1	1	linear of order 4
ρ₄	1	-1	1	1	i	-i	1	1	1	-1	-1	-1	1	1	1	1	1	1	1	1	1	1	1	1	linear of order 4
ρ₅	2	2	2	2	0	0	ζ₇⁶+ζ₇	ζ₇⁵+ζ₇²	ζ₇⁴+ζ₇³	ζ₇⁴+ζ₇³	ζ₇⁵+ζ₇²	ζ₇⁶+ζ₇	ζ₇⁵+ζ₇²	ζ₇⁵+ζ₇²	ζ₇⁴+ζ₇³	ζ₇⁴+ζ₇³	ζ₇⁵+ζ₇²	ζ₇⁶+ζ₇	ζ₇⁴+ζ₇³	ζ₇⁵+ζ₇²	ζ₇⁶+ζ₇	ζ₇⁴+ζ₇³	ζ₇⁶+ζ₇	ζ₇⁶+ζ₇	orthogonal lifted from D₇
ρ₆	2	2	2	2	0	0	ζ₇⁴+ζ₇³	ζ₇⁶+ζ₇	ζ₇⁵+ζ₇²	ζ₇⁵+ζ₇²	ζ₇⁶+ζ₇	ζ₇⁴+ζ₇³	ζ₇⁶+ζ₇	ζ₇⁶+ζ₇	ζ₇⁵+ζ₇²	ζ₇⁵+ζ₇²	ζ₇⁶+ζ₇	ζ₇⁴+ζ₇³	ζ₇⁵+ζ₇²	ζ₇⁶+ζ₇	ζ₇⁴+ζ₇³	ζ₇⁵+ζ₇²	ζ₇⁴+ζ₇³	ζ₇⁴+ζ₇³	orthogonal lifted from D₇
ρ₇	2	2	2	2	0	0	ζ₇⁵+ζ₇²	ζ₇⁴+ζ₇³	ζ₇⁶+ζ₇	ζ₇⁶+ζ₇	ζ₇⁴+ζ₇³	ζ₇⁵+ζ₇²	ζ₇⁴+ζ₇³	ζ₇⁴+ζ₇³	ζ₇⁶+ζ₇	ζ₇⁶+ζ₇	ζ₇⁴+ζ₇³	ζ₇⁵+ζ₇²	ζ₇⁶+ζ₇	ζ₇⁴+ζ₇³	ζ₇⁵+ζ₇²	ζ₇⁶+ζ₇	ζ₇⁵+ζ₇²	ζ₇⁵+ζ₇²	orthogonal lifted from D₇
ρ₈	2	-2	2	2	0	0	ζ₇⁶+ζ₇	ζ₇⁵+ζ₇²	ζ₇⁴+ζ₇³	-ζ₇⁴-ζ₇³	-ζ₇⁵-ζ₇²	-ζ₇⁶-ζ₇	ζ₇⁵+ζ₇²	ζ₇⁵+ζ₇²	ζ₇⁴+ζ₇³	ζ₇⁴+ζ₇³	ζ₇⁵+ζ₇²	ζ₇⁶+ζ₇	ζ₇⁴+ζ₇³	ζ₇⁵+ζ₇²	ζ₇⁶+ζ₇	ζ₇⁴+ζ₇³	ζ₇⁶+ζ₇	ζ₇⁶+ζ₇	symplectic lifted from Dic₇, Schur index 2
ρ₉	2	-2	2	2	0	0	ζ₇⁵+ζ₇²	ζ₇⁴+ζ₇³	ζ₇⁶+ζ₇	-ζ₇⁶-ζ₇	-ζ₇⁴-ζ₇³	-ζ₇⁵-ζ₇²	ζ₇⁴+ζ₇³	ζ₇⁴+ζ₇³	ζ₇⁶+ζ₇	ζ₇⁶+ζ₇	ζ₇⁴+ζ₇³	ζ₇⁵+ζ₇²	ζ₇⁶+ζ₇	ζ₇⁴+ζ₇³	ζ₇⁵+ζ₇²	ζ₇⁶+ζ₇	ζ₇⁵+ζ₇²	ζ₇⁵+ζ₇²	symplectic lifted from Dic₇, Schur index 2
ρ₁₀	2	-2	2	2	0	0	ζ₇⁴+ζ₇³	ζ₇⁶+ζ₇	ζ₇⁵+ζ₇²	-ζ₇⁵-ζ₇²	-ζ₇⁶-ζ₇	-ζ₇⁴-ζ₇³	ζ₇⁶+ζ₇	ζ₇⁶+ζ₇	ζ₇⁵+ζ₇²	ζ₇⁵+ζ₇²	ζ₇⁶+ζ₇	ζ₇⁴+ζ₇³	ζ₇⁵+ζ₇²	ζ₇⁶+ζ₇	ζ₇⁴+ζ₇³	ζ₇⁵+ζ₇²	ζ₇⁴+ζ₇³	ζ₇⁴+ζ₇³	symplectic lifted from Dic₇, Schur index 2
ρ₁₁	4	0	-2	1	0	0	4	4	4	0	0	0	1	-2	-2	-2	-2	-2	1	1	1	1	-2	1	orthogonal lifted from C₃²⋊C₄
ρ₁₂	4	0	1	-2	0	0	4	4	4	0	0	0	-2	1	1	1	1	1	-2	-2	-2	-2	1	-2	orthogonal lifted from C₃²⋊C₄
ρ₁₃	4	0	-2	1	0	0	2ζ₇⁴+2ζ₇³	2ζ₇⁶+2ζ₇	2ζ₇⁵+2ζ₇²	0	0	0	2ζ₇⁶-ζ₇	-ζ₇⁶-ζ₇	-ζ₇⁵-ζ₇²	-ζ₇⁵-ζ₇²	-ζ₇⁶-ζ₇	-ζ₇⁴-ζ₇³	2ζ₇⁵-ζ₇²	-ζ₇⁶+2ζ₇	2ζ₇⁴-ζ₇³	-ζ₇⁵+2ζ₇²	-ζ₇⁴-ζ₇³	-ζ₇⁴+2ζ₇³	complex faithful
ρ₁₄	4	0	1	-2	0	0	2ζ₇⁶+2ζ₇	2ζ₇⁵+2ζ₇²	2ζ₇⁴+2ζ₇³	0	0	0	-ζ₇⁵-ζ₇²	2ζ₇⁵-ζ₇²	2ζ₇⁴-ζ₇³	-ζ₇⁴+2ζ₇³	-ζ₇⁵+2ζ₇²	-ζ₇⁶+2ζ₇	-ζ₇⁴-ζ₇³	-ζ₇⁵-ζ₇²	-ζ₇⁶-ζ₇	-ζ₇⁴-ζ₇³	2ζ₇⁶-ζ₇	-ζ₇⁶-ζ₇	complex faithful
ρ₁₅	4	0	-2	1	0	0	2ζ₇⁵+2ζ₇²	2ζ₇⁴+2ζ₇³	2ζ₇⁶+2ζ₇	0	0	0	2ζ₇⁴-ζ₇³	-ζ₇⁴-ζ₇³	-ζ₇⁶-ζ₇	-ζ₇⁶-ζ₇	-ζ₇⁴-ζ₇³	-ζ₇⁵-ζ₇²	-ζ₇⁶+2ζ₇	-ζ₇⁴+2ζ₇³	2ζ₇⁵-ζ₇²	2ζ₇⁶-ζ₇	-ζ₇⁵-ζ₇²	-ζ₇⁵+2ζ₇²	complex faithful
ρ₁₆	4	0	-2	1	0	0	2ζ₇⁶+2ζ₇	2ζ₇⁵+2ζ₇²	2ζ₇⁴+2ζ₇³	0	0	0	-ζ₇⁵+2ζ₇²	-ζ₇⁵-ζ₇²	-ζ₇⁴-ζ₇³	-ζ₇⁴-ζ₇³	-ζ₇⁵-ζ₇²	-ζ₇⁶-ζ₇	2ζ₇⁴-ζ₇³	2ζ₇⁵-ζ₇²	2ζ₇⁶-ζ₇	-ζ₇⁴+2ζ₇³	-ζ₇⁶-ζ₇	-ζ₇⁶+2ζ₇	complex faithful
ρ₁₇	4	0	1	-2	0	0	2ζ₇⁵+2ζ₇²	2ζ₇⁴+2ζ₇³	2ζ₇⁶+2ζ₇	0	0	0	-ζ₇⁴-ζ₇³	-ζ₇⁴+2ζ₇³	-ζ₇⁶+2ζ₇	2ζ₇⁶-ζ₇	2ζ₇⁴-ζ₇³	-ζ₇⁵+2ζ₇²	-ζ₇⁶-ζ₇	-ζ₇⁴-ζ₇³	-ζ₇⁵-ζ₇²	-ζ₇⁶-ζ₇	2ζ₇⁵-ζ₇²	-ζ₇⁵-ζ₇²	complex faithful
ρ₁₈	4	0	1	-2	0	0	2ζ₇⁵+2ζ₇²	2ζ₇⁴+2ζ₇³	2ζ₇⁶+2ζ₇	0	0	0	-ζ₇⁴-ζ₇³	2ζ₇⁴-ζ₇³	2ζ₇⁶-ζ₇	-ζ₇⁶+2ζ₇	-ζ₇⁴+2ζ₇³	2ζ₇⁵-ζ₇²	-ζ₇⁶-ζ₇	-ζ₇⁴-ζ₇³	-ζ₇⁵-ζ₇²	-ζ₇⁶-ζ₇	-ζ₇⁵+2ζ₇²	-ζ₇⁵-ζ₇²	complex faithful
ρ₁₉	4	0	1	-2	0	0	2ζ₇⁶+2ζ₇	2ζ₇⁵+2ζ₇²	2ζ₇⁴+2ζ₇³	0	0	0	-ζ₇⁵-ζ₇²	-ζ₇⁵+2ζ₇²	-ζ₇⁴+2ζ₇³	2ζ₇⁴-ζ₇³	2ζ₇⁵-ζ₇²	2ζ₇⁶-ζ₇	-ζ₇⁴-ζ₇³	-ζ₇⁵-ζ₇²	-ζ₇⁶-ζ₇	-ζ₇⁴-ζ₇³	-ζ₇⁶+2ζ₇	-ζ₇⁶-ζ₇	complex faithful
ρ₂₀	4	0	1	-2	0	0	2ζ₇⁴+2ζ₇³	2ζ₇⁶+2ζ₇	2ζ₇⁵+2ζ₇²	0	0	0	-ζ₇⁶-ζ₇	2ζ₇⁶-ζ₇	-ζ₇⁵+2ζ₇²	2ζ₇⁵-ζ₇²	-ζ₇⁶+2ζ₇	2ζ₇⁴-ζ₇³	-ζ₇⁵-ζ₇²	-ζ₇⁶-ζ₇	-ζ₇⁴-ζ₇³	-ζ₇⁵-ζ₇²	-ζ₇⁴+2ζ₇³	-ζ₇⁴-ζ₇³	complex faithful
ρ₂₁	4	0	-2	1	0	0	2ζ₇⁶+2ζ₇	2ζ₇⁵+2ζ₇²	2ζ₇⁴+2ζ₇³	0	0	0	2ζ₇⁵-ζ₇²	-ζ₇⁵-ζ₇²	-ζ₇⁴-ζ₇³	-ζ₇⁴-ζ₇³	-ζ₇⁵-ζ₇²	-ζ₇⁶-ζ₇	-ζ₇⁴+2ζ₇³	-ζ₇⁵+2ζ₇²	-ζ₇⁶+2ζ₇	2ζ₇⁴-ζ₇³	-ζ₇⁶-ζ₇	2ζ₇⁶-ζ₇	complex faithful
ρ₂₂	4	0	1	-2	0	0	2ζ₇⁴+2ζ₇³	2ζ₇⁶+2ζ₇	2ζ₇⁵+2ζ₇²	0	0	0	-ζ₇⁶-ζ₇	-ζ₇⁶+2ζ₇	2ζ₇⁵-ζ₇²	-ζ₇⁵+2ζ₇²	2ζ₇⁶-ζ₇	-ζ₇⁴+2ζ₇³	-ζ₇⁵-ζ₇²	-ζ₇⁶-ζ₇	-ζ₇⁴-ζ₇³	-ζ₇⁵-ζ₇²	2ζ₇⁴-ζ₇³	-ζ₇⁴-ζ₇³	complex faithful
ρ₂₃	4	0	-2	1	0	0	2ζ₇⁴+2ζ₇³	2ζ₇⁶+2ζ₇	2ζ₇⁵+2ζ₇²	0	0	0	-ζ₇⁶+2ζ₇	-ζ₇⁶-ζ₇	-ζ₇⁵-ζ₇²	-ζ₇⁵-ζ₇²	-ζ₇⁶-ζ₇	-ζ₇⁴-ζ₇³	-ζ₇⁵+2ζ₇²	2ζ₇⁶-ζ₇	-ζ₇⁴+2ζ₇³	2ζ₇⁵-ζ₇²	-ζ₇⁴-ζ₇³	2ζ₇⁴-ζ₇³	complex faithful
ρ₂₄	4	0	-2	1	0	0	2ζ₇⁵+2ζ₇²	2ζ₇⁴+2ζ₇³	2ζ₇⁶+2ζ₇	0	0	0	-ζ₇⁴+2ζ₇³	-ζ₇⁴-ζ₇³	-ζ₇⁶-ζ₇	-ζ₇⁶-ζ₇	-ζ₇⁴-ζ₇³	-ζ₇⁵-ζ₇²	2ζ₇⁶-ζ₇	2ζ₇⁴-ζ₇³	-ζ₇⁵+2ζ₇²	-ζ₇⁶+2ζ₇	-ζ₇⁵-ζ₇²	2ζ₇⁵-ζ₇²	complex faithful

Smallest permutation representation of C₃²⋊Dic₇
►On 42 points

Generators in S₄₂

(8 42 35)(9 36 29)(10 30 37)(11 38 31)(12 32 39)(13 40 33)(14 34 41)

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

(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)

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

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

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

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

Matrix representation of C₃²⋊Dic₇ ►in GL₄(𝔽₃₃₇) generated by

1	0	0	0
0	1	0	0
0	0	0	1
297	0	336	336

1	269	0	0
5	335	0	0
0	8	0	1
297	8	336	336

8	0	0	0
40	329	0	0
232	0	295	0
227	0	42	42

329	0	269	0
0	0	336	1
105	0	8	0
110	336	8	0

G:=sub<GL(4,GF(337))| [1,0,0,297,0,1,0,0,0,0,0,336,0,0,1,336],[1,5,0,297,269,335,8,8,0,0,0,336,0,0,1,336],[8,40,232,227,0,329,0,0,0,0,295,42,0,0,0,42],[329,0,105,110,0,0,0,336,269,336,8,8,0,1,0,0] >;

C₃²⋊Dic₇ in GAP, Magma, Sage, TeX

C_3^2\rtimes {\rm Dic}_7

% in TeX

G:=Group("C3^2:Dic7");

// GroupNames label

G:=SmallGroup(252,32);

// by ID

G=gap.SmallGroup(252,32);

# by ID

G:=PCGroup([5,-2,-2,-3,3,-7,10,302,67,323,248,5404]);

// Polycyclic

G:=Group<a,b,c,d|a^3=b^3=c^14=1,d^2=c^7,a*b=b*a,c*a*c^-1=a^-1,d*a*d^-1=a*b^-1,c*b*c^-1=b^-1,d*b*d^-1=a^-1*b^-1,d*c*d^-1=c^-1>;

// generators/relations

Export

Subgroup lattice of C₃²⋊Dic₇ in TeX
Character table of C₃²⋊Dic₇ in TeX

G = C32⋊Dic7 order 252 = 22·32·7

The semidirect product of C32 and Dic7 acting via Dic7/C7=C4

G = C₃²⋊Dic₇ order 252 = 2²·3²·7

The semidirect product of C₃² and Dic₇ acting via Dic₇/C₇=C₄