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Transitive Groups of Degree 6

name size 0 2 4 6

6T1 C(6) = 6 = 3[x]2 6 -16807 -- -- 300125

6T2 D₆(6) = [3]2 6 -12167 -- -- 810448

6T3 D(6) = S(3)[x]2 12 -14283 66125 -- 2738000

6T4 A₄(6) = [2²]3 12 -- 153664 -- 25969216

6T5 F₁8(6) = [3²]2 = 3wr2 18 -9747 -- -- 722000

6T6 2A₄(6) = [2³]3 = 2wr3 24 -400967 31213 -103243 434581

6T7 S₄(6d )= [2²]S(3) 24 -- 33856 -- 3356224

6T8 S₄(6c) = 1/2[2³]S(3) 24 -85184 810448 -- 33076161

6T9 F₁8(6) : 2 = [1/2.S(3)²]2 36 -309123 242000 -- 27848000

6T10 F₃6(6) = 1/2[S(3)²]2 36 -- 525625 -- 55130625

6T11 2S₄(6) = [2³]S(3) = 2wrS(3) 48 -10051 28037 -309123 1387029

6T12 L(6) = PSL(2, 5) = A₅(6) 60 -- 287296 -- 30991489

6T13 F₃6(6) : 2 = [S(3)²]2 = S(3)wr2 72 -11691 30125 -104875 485125

6T14 L(6) : 2 = PGL(2, 5) = S₅(6) 120 -1778112 2299968 -- 767431973

6T15 A6 360 -- 287296 -- 170067681

6T16 S6 720 -14731 29077 -92779 592661

Subsections

Next: Transitive Group 6T1 Up: A Database for Number Previous: Transitive Group 5T5

Jürgen Klüners and Gunter Malle

	name	size	0	2	4	6
6T1	C(6) = 6 = 3[x]2	6	-16807	--	--	300125
6T2	D₆(6) = [3]2	6	-12167	--	--	810448
6T3	D(6) = S(3)[x]2	12	-14283	66125	--	2738000
6T4	A₄(6) = [2²]3	12	--	153664	--	25969216
6T5	F₁8(6) = [3²]2 = 3wr2	18	-9747	--	--	722000
6T6	2A₄(6) = [2³]3 = 2wr3	24	-400967	31213	-103243	434581
6T7	S₄(6d )= [2²]S(3)	24	--	33856	--	3356224
6T8	S₄(6c) = 1/2[2³]S(3)	24	-85184	810448	--	33076161
6T9	F₁8(6) : 2 = [1/2.S(3)²]2	36	-309123	242000	--	27848000
6T10	F₃6(6) = 1/2[S(3)²]2	36	--	525625	--	55130625
6T11	2S₄(6) = [2³]S(3) = 2wrS(3)	48	-10051	28037	-309123	1387029
6T12	L(6) = PSL(2, 5) = A₅(6)	60	--	287296	--	30991489
6T13	F₃6(6) : 2 = [S(3)²]2 = S(3)wr2	72	-11691	30125	-104875	485125
6T14	L(6) : 2 = PGL(2, 5) = S₅(6)	120	-1778112	2299968	--	767431973
6T15	A6	360	--	287296	--	170067681
6T16	S6	720	-14731	29077	-92779	592661