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G = C633C3order 189 = 33·7

3rd semidirect product of C63 and C3 acting faithfully

metacyclic, supersoluble, monomial, 3-hyperelementary

Aliases: C633C3, C21.3C32, C723- 1+2, C7⋊C92C3, C92(C7⋊C3), C3.4(C3×C7⋊C3), (C3×C7⋊C3).2C3, SmallGroup(189,5)

Series: Derived Chief Lower central Upper central

Derived series
C1C21 — C633C3
Chief series
C1C7C21C3×C7⋊C3 — C633C3
Lower central
C7C21 — C633C3
Upper central
C1C3C9

Generators and relations for C633C3
 G = < a,b | a63=b3=1, bab-1=a4 >

C1
C3
21C3
C7
C9
7C32
7C9
7C9
C21
3C7⋊C3
73- 1+2
C63
C3×C7⋊C3
C7⋊C9
C7⋊C9
C633C3

Character table of C633C3

 class 13A3B3C3D7A7B9A9B9C9D9E9F21A21B21C21D63A63B63C63D63E63F63G63H63I63J63K63L
 size 11121213333212121213333333333333333
ρ111111111111111111111111111111    trivial
ρ2111ζ32ζ311ζ3ζ32ζ3ζ32111111ζ3ζ32ζ32ζ32ζ32ζ32ζ3ζ3ζ32ζ3ζ3ζ3    linear of order 3
ρ31111111ζ3ζ32ζ32ζ3ζ3ζ321111ζ3ζ32ζ32ζ32ζ32ζ32ζ3ζ3ζ32ζ3ζ3ζ3    linear of order 3
ρ4111ζ3ζ3211ζ3ζ3211ζ32ζ31111ζ3ζ32ζ32ζ32ζ32ζ32ζ3ζ3ζ32ζ3ζ3ζ3    linear of order 3
ρ51111111ζ32ζ3ζ3ζ32ζ32ζ31111ζ32ζ3ζ3ζ3ζ3ζ3ζ32ζ32ζ3ζ32ζ32ζ32    linear of order 3
ρ6111ζ32ζ31111ζ32ζ3ζ32ζ31111111111111111    linear of order 3
ρ7111ζ3ζ321111ζ3ζ32ζ3ζ321111111111111111    linear of order 3
ρ8111ζ3ζ3211ζ32ζ3ζ32ζ3111111ζ32ζ3ζ3ζ3ζ3ζ3ζ32ζ32ζ3ζ32ζ32ζ32    linear of order 3
ρ9111ζ32ζ311ζ32ζ311ζ3ζ321111ζ32ζ3ζ3ζ3ζ3ζ3ζ32ζ32ζ3ζ32ζ32ζ32    linear of order 3
ρ103-3+3-3/2-3-3-3/20033000000-3-3-3/2-3-3-3/2-3+3-3/2-3+3-3/2000000000000    complex lifted from 3- 1+2
ρ113-3-3-3/2-3+3-3/20033000000-3+3-3/2-3+3-3/2-3-3-3/2-3-3-3/2000000000000    complex lifted from 3- 1+2
ρ1233300-1--7/2-1+-7/2330000-1+-7/2-1--7/2-1--7/2-1+-7/2-1--7/2-1--7/2-1+-7/2-1--7/2-1+-7/2-1+-7/2-1+-7/2-1+-7/2-1--7/2-1--7/2-1--7/2-1+-7/2    complex lifted from C7⋊C3
ρ1333300-1+-7/2-1--7/2330000-1--7/2-1+-7/2-1+-7/2-1--7/2-1+-7/2-1+-7/2-1--7/2-1+-7/2-1--7/2-1--7/2-1--7/2-1--7/2-1+-7/2-1+-7/2-1+-7/2-1--7/2    complex lifted from C7⋊C3
ρ1433300-1+-7/2-1--7/2-3+3-3/2-3-3-3/20000-1--7/2-1+-7/2-1+-7/2-1--7/2ζ3ζ743ζ723ζ7ζ32ζ7432ζ7232ζ7ζ32ζ7632ζ7532ζ73ζ32ζ7432ζ7232ζ7ζ32ζ7632ζ7532ζ73ζ32ζ7632ζ7532ζ73ζ3ζ763ζ753ζ73ζ3ζ763ζ753ζ73ζ32ζ7432ζ7232ζ7ζ3ζ743ζ723ζ7ζ3ζ743ζ723ζ7ζ3ζ763ζ753ζ73    complex lifted from C3×C7⋊C3
ρ1533300-1--7/2-1+-7/2-3-3-3/2-3+3-3/20000-1+-7/2-1--7/2-1--7/2-1+-7/2ζ32ζ7632ζ7532ζ73ζ3ζ763ζ753ζ73ζ3ζ743ζ723ζ7ζ3ζ763ζ753ζ73ζ3ζ743ζ723ζ7ζ3ζ743ζ723ζ7ζ32ζ7432ζ7232ζ7ζ32ζ7432ζ7232ζ7ζ3ζ763ζ753ζ73ζ32ζ7632ζ7532ζ73ζ32ζ7632ζ7532ζ73ζ32ζ7432ζ7232ζ7    complex lifted from C3×C7⋊C3
ρ1633300-1--7/2-1+-7/2-3+3-3/2-3-3-3/20000-1+-7/2-1--7/2-1--7/2-1+-7/2ζ3ζ763ζ753ζ73ζ32ζ7632ζ7532ζ73ζ32ζ7432ζ7232ζ7ζ32ζ7632ζ7532ζ73ζ32ζ7432ζ7232ζ7ζ32ζ7432ζ7232ζ7ζ3ζ743ζ723ζ7ζ3ζ743ζ723ζ7ζ32ζ7632ζ7532ζ73ζ3ζ763ζ753ζ73ζ3ζ763ζ753ζ73ζ3ζ743ζ723ζ7    complex lifted from C3×C7⋊C3
ρ1733300-1+-7/2-1--7/2-3-3-3/2-3+3-3/20000-1--7/2-1+-7/2-1+-7/2-1--7/2ζ32ζ7432ζ7232ζ7ζ3ζ743ζ723ζ7ζ3ζ763ζ753ζ73ζ3ζ743ζ723ζ7ζ3ζ763ζ753ζ73ζ3ζ763ζ753ζ73ζ32ζ7632ζ7532ζ73ζ32ζ7632ζ7532ζ73ζ3ζ743ζ723ζ7ζ32ζ7432ζ7232ζ7ζ32ζ7432ζ7232ζ7ζ32ζ7632ζ7532ζ73    complex lifted from C3×C7⋊C3
ρ183-3+3-3/2-3-3-3/200-1--7/2-1+-7/2000000ζ96ζ7496ζ7296ζ7ζ96ζ7696ζ7596ζ73ζ93ζ7693ζ7593ζ73ζ93ζ7493ζ7293ζ7ζ97ζ7697ζ7394ζ7594ζ7395ζ7695ζ7392ζ7692ζ75ζ98ζ7298ζ792ζ7492ζ798ζ7698ζ7592ζ7692ζ73ζ95ζ7495ζ792ζ7292ζ7ζ98ζ7498ζ7292ζ7292ζ797ζ7497ζ729ζ749ζ794ζ7494ζ79ζ749ζ7298ζ7698ζ7395ζ7695ζ7594ζ7594ζ739ζ769ζ7597ζ7597ζ7394ζ7694ζ7597ζ7497ζ794ζ7494ζ72    complex faithful
ρ193-3+3-3/2-3-3-3/200-1--7/2-1+-7/2000000ζ96ζ7496ζ7296ζ7ζ96ζ7696ζ7596ζ73ζ93ζ7693ζ7593ζ73ζ93ζ7493ζ7293ζ797ζ7597ζ7394ζ7694ζ7598ζ7698ζ7395ζ7695ζ75ζ95ζ7495ζ792ζ7292ζ795ζ7695ζ7392ζ7692ζ75ζ98ζ7498ζ7292ζ7292ζ7ζ98ζ7298ζ792ζ7492ζ797ζ7497ζ794ζ7494ζ7297ζ7497ζ729ζ749ζ798ζ7698ζ7592ζ7692ζ73ζ97ζ7697ζ7394ζ7594ζ7394ζ7594ζ739ζ769ζ7594ζ7494ζ79ζ749ζ72    complex faithful
ρ203-3+3-3/2-3-3-3/200-1+-7/2-1--7/2000000ζ96ζ7696ζ7596ζ73ζ96ζ7496ζ7296ζ7ζ93ζ7493ζ7293ζ7ζ93ζ7693ζ7593ζ7397ζ7497ζ729ζ749ζ7ζ98ζ7298ζ792ζ7492ζ798ζ7698ζ7395ζ7695ζ75ζ98ζ7498ζ7292ζ7292ζ798ζ7698ζ7592ζ7692ζ7395ζ7695ζ7392ζ7692ζ7597ζ7597ζ7394ζ7694ζ75ζ97ζ7697ζ7394ζ7594ζ73ζ95ζ7495ζ792ζ7292ζ794ζ7494ζ79ζ749ζ7297ζ7497ζ794ζ7494ζ7294ζ7594ζ739ζ769ζ75    complex faithful
ρ213-3-3-3/2-3+3-3/200-1--7/2-1+-7/2000000ζ93ζ7493ζ7293ζ7ζ93ζ7693ζ7593ζ73ζ96ζ7696ζ7596ζ73ζ96ζ7496ζ7296ζ798ζ7698ζ7592ζ7692ζ73ζ97ζ7697ζ7394ζ7594ζ7397ζ7497ζ729ζ749ζ794ζ7594ζ739ζ769ζ7597ζ7497ζ794ζ7494ζ7294ζ7494ζ79ζ749ζ72ζ98ζ7498ζ7292ζ7292ζ7ζ95ζ7495ζ792ζ7292ζ797ζ7597ζ7394ζ7694ζ7598ζ7698ζ7395ζ7695ζ7595ζ7695ζ7392ζ7692ζ75ζ98ζ7298ζ792ζ7492ζ7    complex faithful
ρ223-3-3-3/2-3+3-3/200-1+-7/2-1--7/2000000ζ93ζ7693ζ7593ζ73ζ93ζ7493ζ7293ζ7ζ96ζ7496ζ7296ζ7ζ96ζ7696ζ7596ζ73ζ98ζ7498ζ7292ζ7292ζ797ζ7497ζ729ζ749ζ797ζ7597ζ7394ζ7694ζ7594ζ7494ζ79ζ749ζ7294ζ7594ζ739ζ769ζ75ζ97ζ7697ζ7394ζ7594ζ7395ζ7695ζ7392ζ7692ζ7598ζ7698ζ7592ζ7692ζ7397ζ7497ζ794ζ7494ζ72ζ95ζ7495ζ792ζ7292ζ7ζ98ζ7298ζ792ζ7492ζ798ζ7698ζ7395ζ7695ζ75    complex faithful
ρ233-3+3-3/2-3-3-3/200-1+-7/2-1--7/2000000ζ96ζ7696ζ7596ζ73ζ96ζ7496ζ7296ζ7ζ93ζ7493ζ7293ζ7ζ93ζ7693ζ7593ζ7397ζ7497ζ794ζ7494ζ72ζ95ζ7495ζ792ζ7292ζ798ζ7698ζ7592ζ7692ζ73ζ98ζ7298ζ792ζ7492ζ795ζ7695ζ7392ζ7692ζ7598ζ7698ζ7395ζ7695ζ7594ζ7594ζ739ζ769ζ7597ζ7597ζ7394ζ7694ζ75ζ98ζ7498ζ7292ζ7292ζ797ζ7497ζ729ζ749ζ794ζ7494ζ79ζ749ζ72ζ97ζ7697ζ7394ζ7594ζ73    complex faithful
ρ243-3-3-3/2-3+3-3/200-1--7/2-1+-7/2000000ζ93ζ7493ζ7293ζ7ζ93ζ7693ζ7593ζ73ζ96ζ7696ζ7596ζ73ζ96ζ7496ζ7296ζ798ζ7698ζ7395ζ7695ζ7594ζ7594ζ739ζ769ζ7594ζ7494ζ79ζ749ζ7297ζ7597ζ7394ζ7694ζ7597ζ7497ζ729ζ749ζ797ζ7497ζ794ζ7494ζ72ζ95ζ7495ζ792ζ7292ζ7ζ98ζ7298ζ792ζ7492ζ7ζ97ζ7697ζ7394ζ7594ζ7395ζ7695ζ7392ζ7692ζ7598ζ7698ζ7592ζ7692ζ73ζ98ζ7498ζ7292ζ7292ζ7    complex faithful
ρ253-3+3-3/2-3-3-3/200-1--7/2-1+-7/2000000ζ96ζ7496ζ7296ζ7ζ96ζ7696ζ7596ζ73ζ93ζ7693ζ7593ζ73ζ93ζ7493ζ7293ζ794ζ7594ζ739ζ769ζ7598ζ7698ζ7592ζ7692ζ73ζ98ζ7498ζ7292ζ7292ζ798ζ7698ζ7395ζ7695ζ75ζ98ζ7298ζ792ζ7492ζ7ζ95ζ7495ζ792ζ7292ζ794ζ7494ζ79ζ749ζ7297ζ7497ζ794ζ7494ζ7295ζ7695ζ7392ζ7692ζ7597ζ7597ζ7394ζ7694ζ75ζ97ζ7697ζ7394ζ7594ζ7397ζ7497ζ729ζ749ζ7    complex faithful
ρ263-3-3-3/2-3+3-3/200-1+-7/2-1--7/2000000ζ93ζ7693ζ7593ζ73ζ93ζ7493ζ7293ζ7ζ96ζ7496ζ7296ζ7ζ96ζ7696ζ7596ζ73ζ95ζ7495ζ792ζ7292ζ794ζ7494ζ79ζ749ζ72ζ97ζ7697ζ7394ζ7594ζ7397ζ7497ζ794ζ7494ζ7297ζ7597ζ7394ζ7694ζ7594ζ7594ζ739ζ769ζ7598ζ7698ζ7592ζ7692ζ7398ζ7698ζ7395ζ7695ζ7597ζ7497ζ729ζ749ζ7ζ98ζ7298ζ792ζ7492ζ7ζ98ζ7498ζ7292ζ7292ζ795ζ7695ζ7392ζ7692ζ75    complex faithful
ρ273-3+3-3/2-3-3-3/200-1+-7/2-1--7/2000000ζ96ζ7696ζ7596ζ73ζ96ζ7496ζ7296ζ7ζ93ζ7493ζ7293ζ7ζ93ζ7693ζ7593ζ7394ζ7494ζ79ζ749ζ72ζ98ζ7498ζ7292ζ7292ζ795ζ7695ζ7392ζ7692ζ75ζ95ζ7495ζ792ζ7292ζ798ζ7698ζ7395ζ7695ζ7598ζ7698ζ7592ζ7692ζ73ζ97ζ7697ζ7394ζ7594ζ7394ζ7594ζ739ζ769ζ75ζ98ζ7298ζ792ζ7492ζ797ζ7497ζ794ζ7494ζ7297ζ7497ζ729ζ749ζ797ζ7597ζ7394ζ7694ζ75    complex faithful
ρ283-3-3-3/2-3+3-3/200-1--7/2-1+-7/2000000ζ93ζ7493ζ7293ζ7ζ93ζ7693ζ7593ζ73ζ96ζ7696ζ7596ζ73ζ96ζ7496ζ7296ζ795ζ7695ζ7392ζ7692ζ7597ζ7597ζ7394ζ7694ζ7597ζ7497ζ794ζ7494ζ72ζ97ζ7697ζ7394ζ7594ζ7394ζ7494ζ79ζ749ζ7297ζ7497ζ729ζ749ζ7ζ98ζ7298ζ792ζ7492ζ7ζ98ζ7498ζ7292ζ7292ζ794ζ7594ζ739ζ769ζ7598ζ7698ζ7592ζ7692ζ7398ζ7698ζ7395ζ7695ζ75ζ95ζ7495ζ792ζ7292ζ7    complex faithful
ρ293-3-3-3/2-3+3-3/200-1+-7/2-1--7/2000000ζ93ζ7693ζ7593ζ73ζ93ζ7493ζ7293ζ7ζ96ζ7496ζ7296ζ7ζ96ζ7696ζ7596ζ73ζ98ζ7298ζ792ζ7492ζ797ζ7497ζ794ζ7494ζ7294ζ7594ζ739ζ769ζ7597ζ7497ζ729ζ749ζ7ζ97ζ7697ζ7394ζ7594ζ7397ζ7597ζ7394ζ7694ζ7598ζ7698ζ7395ζ7695ζ7595ζ7695ζ7392ζ7692ζ7594ζ7494ζ79ζ749ζ72ζ98ζ7498ζ7292ζ7292ζ7ζ95ζ7495ζ792ζ7292ζ798ζ7698ζ7592ζ7692ζ73    complex faithful

Smallest permutation representation of C633C3
On 63 points
Generators in S63
(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)

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

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

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), (2,17,5)(3,33,9)(4,49,13)(6,18,21)(7,34,25)(8,50,29)(10,19,37)(11,35,41)(12,51,45)(14,20,53)(15,36,57)(16,52,61)(23,38,26)(24,54,30)(27,39,42)(28,55,46)(31,40,58)(32,56,62)(44,59,47)(48,60,63) );

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)], [(2,17,5),(3,33,9),(4,49,13),(6,18,21),(7,34,25),(8,50,29),(10,19,37),(11,35,41),(12,51,45),(14,20,53),(15,36,57),(16,52,61),(23,38,26),(24,54,30),(27,39,42),(28,55,46),(31,40,58),(32,56,62),(44,59,47),(48,60,63)]])

C633C3 is a maximal subgroup of   C93F7  C63⋊C6  C9⋊F7

Matrix representation of C633C3 in GL3(𝔽127) generated by

1196750
5012624
249419
,
10700
682020
01070
G:=sub<GL(3,GF(127))| [119,50,24,67,126,94,50,24,19],[107,68,0,0,20,107,0,20,0] >;

C633C3 in GAP, Magma, Sage, TeX 

C_{63}\rtimes_3C_3
% in TeX

G:=Group("C63:3C3");
// GroupNames label

G:=SmallGroup(189,5);
// by ID

G=gap.SmallGroup(189,5);
# by ID

G:=PCGroup([4,-3,-3,-3,-7,97,53,867]);
// Polycyclic

G:=Group<a,b|a^63=b^3=1,b*a*b^-1=a^4>;
// generators/relations

Export

Subgroup lattice of C633C3 in TeX
Character table of C633C3 in TeX

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