C39:C4 - GroupNames

class	1	2	3	4A	4B	6	13A	13B	13C	39A	39B	39C	39D	39E	39F
size	1	13	2	39	39	26	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	trivial
ρ₂	1	1	1	-1	-1	1	1	1	1	1	1	1	1	1	1	linear of order 2
ρ₃	1	-1	1	i	-i	-1	1	1	1	1	1	1	1	1	1	linear of order 4
ρ₄	1	-1	1	-i	i	-1	1	1	1	1	1	1	1	1	1	linear of order 4
ρ₅	2	2	-1	0	0	-1	2	2	2	-1	-1	-1	-1	-1	-1	orthogonal lifted from S₃
ρ₆	2	-2	-1	0	0	1	2	2	2	-1	-1	-1	-1	-1	-1	symplectic lifted from Dic₃, Schur index 2
ρ₇	4	0	4	0	0	0	ζ₁₃¹¹+ζ₁₃¹⁰+ζ₁₃³+ζ₁₃²	ζ₁₃¹²+ζ₁₃⁸+ζ₁₃⁵+ζ₁₃	ζ₁₃⁹+ζ₁₃⁷+ζ₁₃⁶+ζ₁₃⁴	ζ₁₃⁹+ζ₁₃⁷+ζ₁₃⁶+ζ₁₃⁴	ζ₁₃¹²+ζ₁₃⁸+ζ₁₃⁵+ζ₁₃	ζ₁₃¹¹+ζ₁₃¹⁰+ζ₁₃³+ζ₁₃²	ζ₁₃¹¹+ζ₁₃¹⁰+ζ₁₃³+ζ₁₃²	ζ₁₃⁹+ζ₁₃⁷+ζ₁₃⁶+ζ₁₃⁴	ζ₁₃¹²+ζ₁₃⁸+ζ₁₃⁵+ζ₁₃	orthogonal lifted from C₁₃⋊C₄
ρ₈	4	0	4	0	0	0	ζ₁₃⁹+ζ₁₃⁷+ζ₁₃⁶+ζ₁₃⁴	ζ₁₃¹¹+ζ₁₃¹⁰+ζ₁₃³+ζ₁₃²	ζ₁₃¹²+ζ₁₃⁸+ζ₁₃⁵+ζ₁₃	ζ₁₃¹²+ζ₁₃⁸+ζ₁₃⁵+ζ₁₃	ζ₁₃¹¹+ζ₁₃¹⁰+ζ₁₃³+ζ₁₃²	ζ₁₃⁹+ζ₁₃⁷+ζ₁₃⁶+ζ₁₃⁴	ζ₁₃⁹+ζ₁₃⁷+ζ₁₃⁶+ζ₁₃⁴	ζ₁₃¹²+ζ₁₃⁸+ζ₁₃⁵+ζ₁₃	ζ₁₃¹¹+ζ₁₃¹⁰+ζ₁₃³+ζ₁₃²	orthogonal lifted from C₁₃⋊C₄
ρ₉	4	0	4	0	0	0	ζ₁₃¹²+ζ₁₃⁸+ζ₁₃⁵+ζ₁₃	ζ₁₃⁹+ζ₁₃⁷+ζ₁₃⁶+ζ₁₃⁴	ζ₁₃¹¹+ζ₁₃¹⁰+ζ₁₃³+ζ₁₃²	ζ₁₃¹¹+ζ₁₃¹⁰+ζ₁₃³+ζ₁₃²	ζ₁₃⁹+ζ₁₃⁷+ζ₁₃⁶+ζ₁₃⁴	ζ₁₃¹²+ζ₁₃⁸+ζ₁₃⁵+ζ₁₃	ζ₁₃¹²+ζ₁₃⁸+ζ₁₃⁵+ζ₁₃	ζ₁₃¹¹+ζ₁₃¹⁰+ζ₁₃³+ζ₁₃²	ζ₁₃⁹+ζ₁₃⁷+ζ₁₃⁶+ζ₁₃⁴	orthogonal lifted from C₁₃⋊C₄
ρ₁₀	4	0	-2	0	0	0	ζ₁₃⁹+ζ₁₃⁷+ζ₁₃⁶+ζ₁₃⁴	ζ₁₃¹¹+ζ₁₃¹⁰+ζ₁₃³+ζ₁₃²	ζ₁₃¹²+ζ₁₃⁸+ζ₁₃⁵+ζ₁₃	-ζ₃ζ₁₃¹²+ζ₃ζ₁₃⁸+ζ₃ζ₁₃⁵-ζ₃ζ₁₃-ζ₁₃¹²-ζ₁₃	-ζ₃ζ₁₃¹¹+ζ₃ζ₁₃¹⁰+ζ₃ζ₁₃³-ζ₃ζ₁₃²-ζ₁₃¹¹-ζ₁₃²	ζ₃²ζ₁₃⁹-ζ₃²ζ₁₃⁷-ζ₃²ζ₁₃⁶+ζ₃²ζ₁₃⁴-ζ₁₃⁷-ζ₁₃⁶	-ζ₃²ζ₁₃⁹+ζ₃²ζ₁₃⁷+ζ₃²ζ₁₃⁶-ζ₃²ζ₁₃⁴-ζ₁₃⁹-ζ₁₃⁴	ζ₃ζ₁₃¹²-ζ₃ζ₁₃⁸-ζ₃ζ₁₃⁵+ζ₃ζ₁₃-ζ₁₃⁸-ζ₁₃⁵	-ζ₃²ζ₁₃¹¹+ζ₃²ζ₁₃¹⁰+ζ₃²ζ₁₃³-ζ₃²ζ₁₃²-ζ₁₃¹¹-ζ₁₃²	complex faithful
ρ₁₁	4	0	-2	0	0	0	ζ₁₃⁹+ζ₁₃⁷+ζ₁₃⁶+ζ₁₃⁴	ζ₁₃¹¹+ζ₁₃¹⁰+ζ₁₃³+ζ₁₃²	ζ₁₃¹²+ζ₁₃⁸+ζ₁₃⁵+ζ₁₃	ζ₃ζ₁₃¹²-ζ₃ζ₁₃⁸-ζ₃ζ₁₃⁵+ζ₃ζ₁₃-ζ₁₃⁸-ζ₁₃⁵	-ζ₃²ζ₁₃¹¹+ζ₃²ζ₁₃¹⁰+ζ₃²ζ₁₃³-ζ₃²ζ₁₃²-ζ₁₃¹¹-ζ₁₃²	-ζ₃²ζ₁₃⁹+ζ₃²ζ₁₃⁷+ζ₃²ζ₁₃⁶-ζ₃²ζ₁₃⁴-ζ₁₃⁹-ζ₁₃⁴	ζ₃²ζ₁₃⁹-ζ₃²ζ₁₃⁷-ζ₃²ζ₁₃⁶+ζ₃²ζ₁₃⁴-ζ₁₃⁷-ζ₁₃⁶	-ζ₃ζ₁₃¹²+ζ₃ζ₁₃⁸+ζ₃ζ₁₃⁵-ζ₃ζ₁₃-ζ₁₃¹²-ζ₁₃	-ζ₃ζ₁₃¹¹+ζ₃ζ₁₃¹⁰+ζ₃ζ₁₃³-ζ₃ζ₁₃²-ζ₁₃¹¹-ζ₁₃²	complex faithful
ρ₁₂	4	0	-2	0	0	0	ζ₁₃¹²+ζ₁₃⁸+ζ₁₃⁵+ζ₁₃	ζ₁₃⁹+ζ₁₃⁷+ζ₁₃⁶+ζ₁₃⁴	ζ₁₃¹¹+ζ₁₃¹⁰+ζ₁₃³+ζ₁₃²	-ζ₃ζ₁₃¹¹+ζ₃ζ₁₃¹⁰+ζ₃ζ₁₃³-ζ₃ζ₁₃²-ζ₁₃¹¹-ζ₁₃²	ζ₃²ζ₁₃⁹-ζ₃²ζ₁₃⁷-ζ₃²ζ₁₃⁶+ζ₃²ζ₁₃⁴-ζ₁₃⁷-ζ₁₃⁶	ζ₃ζ₁₃¹²-ζ₃ζ₁₃⁸-ζ₃ζ₁₃⁵+ζ₃ζ₁₃-ζ₁₃⁸-ζ₁₃⁵	-ζ₃ζ₁₃¹²+ζ₃ζ₁₃⁸+ζ₃ζ₁₃⁵-ζ₃ζ₁₃-ζ₁₃¹²-ζ₁₃	-ζ₃²ζ₁₃¹¹+ζ₃²ζ₁₃¹⁰+ζ₃²ζ₁₃³-ζ₃²ζ₁₃²-ζ₁₃¹¹-ζ₁₃²	-ζ₃²ζ₁₃⁹+ζ₃²ζ₁₃⁷+ζ₃²ζ₁₃⁶-ζ₃²ζ₁₃⁴-ζ₁₃⁹-ζ₁₃⁴	complex faithful
ρ₁₃	4	0	-2	0	0	0	ζ₁₃¹¹+ζ₁₃¹⁰+ζ₁₃³+ζ₁₃²	ζ₁₃¹²+ζ₁₃⁸+ζ₁₃⁵+ζ₁₃	ζ₁₃⁹+ζ₁₃⁷+ζ₁₃⁶+ζ₁₃⁴	-ζ₃²ζ₁₃⁹+ζ₃²ζ₁₃⁷+ζ₃²ζ₁₃⁶-ζ₃²ζ₁₃⁴-ζ₁₃⁹-ζ₁₃⁴	-ζ₃ζ₁₃¹²+ζ₃ζ₁₃⁸+ζ₃ζ₁₃⁵-ζ₃ζ₁₃-ζ₁₃¹²-ζ₁₃	-ζ₃ζ₁₃¹¹+ζ₃ζ₁₃¹⁰+ζ₃ζ₁₃³-ζ₃ζ₁₃²-ζ₁₃¹¹-ζ₁₃²	-ζ₃²ζ₁₃¹¹+ζ₃²ζ₁₃¹⁰+ζ₃²ζ₁₃³-ζ₃²ζ₁₃²-ζ₁₃¹¹-ζ₁₃²	ζ₃²ζ₁₃⁹-ζ₃²ζ₁₃⁷-ζ₃²ζ₁₃⁶+ζ₃²ζ₁₃⁴-ζ₁₃⁷-ζ₁₃⁶	ζ₃ζ₁₃¹²-ζ₃ζ₁₃⁸-ζ₃ζ₁₃⁵+ζ₃ζ₁₃-ζ₁₃⁸-ζ₁₃⁵	complex faithful
ρ₁₄	4	0	-2	0	0	0	ζ₁₃¹¹+ζ₁₃¹⁰+ζ₁₃³+ζ₁₃²	ζ₁₃¹²+ζ₁₃⁸+ζ₁₃⁵+ζ₁₃	ζ₁₃⁹+ζ₁₃⁷+ζ₁₃⁶+ζ₁₃⁴	ζ₃²ζ₁₃⁹-ζ₃²ζ₁₃⁷-ζ₃²ζ₁₃⁶+ζ₃²ζ₁₃⁴-ζ₁₃⁷-ζ₁₃⁶	ζ₃ζ₁₃¹²-ζ₃ζ₁₃⁸-ζ₃ζ₁₃⁵+ζ₃ζ₁₃-ζ₁₃⁸-ζ₁₃⁵	-ζ₃²ζ₁₃¹¹+ζ₃²ζ₁₃¹⁰+ζ₃²ζ₁₃³-ζ₃²ζ₁₃²-ζ₁₃¹¹-ζ₁₃²	-ζ₃ζ₁₃¹¹+ζ₃ζ₁₃¹⁰+ζ₃ζ₁₃³-ζ₃ζ₁₃²-ζ₁₃¹¹-ζ₁₃²	-ζ₃²ζ₁₃⁹+ζ₃²ζ₁₃⁷+ζ₃²ζ₁₃⁶-ζ₃²ζ₁₃⁴-ζ₁₃⁹-ζ₁₃⁴	-ζ₃ζ₁₃¹²+ζ₃ζ₁₃⁸+ζ₃ζ₁₃⁵-ζ₃ζ₁₃-ζ₁₃¹²-ζ₁₃	complex faithful
ρ₁₅	4	0	-2	0	0	0	ζ₁₃¹²+ζ₁₃⁸+ζ₁₃⁵+ζ₁₃	ζ₁₃⁹+ζ₁₃⁷+ζ₁₃⁶+ζ₁₃⁴	ζ₁₃¹¹+ζ₁₃¹⁰+ζ₁₃³+ζ₁₃²	-ζ₃²ζ₁₃¹¹+ζ₃²ζ₁₃¹⁰+ζ₃²ζ₁₃³-ζ₃²ζ₁₃²-ζ₁₃¹¹-ζ₁₃²	-ζ₃²ζ₁₃⁹+ζ₃²ζ₁₃⁷+ζ₃²ζ₁₃⁶-ζ₃²ζ₁₃⁴-ζ₁₃⁹-ζ₁₃⁴	-ζ₃ζ₁₃¹²+ζ₃ζ₁₃⁸+ζ₃ζ₁₃⁵-ζ₃ζ₁₃-ζ₁₃¹²-ζ₁₃	ζ₃ζ₁₃¹²-ζ₃ζ₁₃⁸-ζ₃ζ₁₃⁵+ζ₃ζ₁₃-ζ₁₃⁸-ζ₁₃⁵	-ζ₃ζ₁₃¹¹+ζ₃ζ₁₃¹⁰+ζ₃ζ₁₃³-ζ₃ζ₁₃²-ζ₁₃¹¹-ζ₁₃²	ζ₃²ζ₁₃⁹-ζ₃²ζ₁₃⁷-ζ₃²ζ₁₃⁶+ζ₃²ζ₁₃⁴-ζ₁₃⁷-ζ₁₃⁶	complex faithful

Smallest permutation representation of C₃₉⋊C₄
►On 39 points

Generators in S₃₉

(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)

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

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

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

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

C₃₉⋊C₄ is a maximal subgroup of S₃×C₁₃⋊C₄ C₁₃⋊Dic₉ C₃⋊F₁₃ C₃₉⋊Dic₃
C₃₉⋊C₄ is a maximal quotient of C₃₉⋊C₈ C₁₃⋊Dic₉ C₃₉⋊Dic₃

Matrix representation of C₃₉⋊C₄ ►in GL₄(𝔽₅) generated by

2	0	2	4
2	2	0	4
3	0	2	0
0	4	3	3

1	2	1	0
0	4	3	1
0	1	0	0
0	1	4	0

G:=sub<GL(4,GF(5))| [2,2,3,0,0,2,0,4,2,0,2,3,4,4,0,3],[1,0,0,0,2,4,1,1,1,3,0,4,0,1,0,0] >;

C₃₉⋊C₄ in GAP, Magma, Sage, TeX

C_{39}\rtimes C_4

% in TeX

G:=Group("C39:C4");

// GroupNames label

G:=SmallGroup(156,10);

// by ID

G=gap.SmallGroup(156,10);

# by ID

G:=PCGroup([4,-2,-2,-3,-13,8,98,963,1159]);

// Polycyclic

G:=Group<a,b|a^39=b^4=1,b*a*b^-1=a^8>;

// generators/relations

Export

Subgroup lattice of C₃₉⋊C₄ in TeX
Character table of C₃₉⋊C₄ in TeX

G = C39⋊C4 order 156 = 22·3·13

1st semidirect product of C39 and C4 acting faithfully

G = C₃₉⋊C₄ order 156 = 2²·3·13

1^st semidirect product of C₃₉ and C₄ acting faithfully