⌂ → Higher genus → C → Aut → 9 → $C_2^3:D_4$ → [0;2,2,2,4] → 11

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One refined passport of genus 9 with automorphism group $C_2^3:D_4$

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Properties

Label	9.64-73.0.2-2-2-4.11
Genus	\(9\)
Quotient genus	\(0\)
Group	\(C_2^3:D_4\)
Signature	\([ 0; 2, 2, 2, 4 ]\)
Generating Vectors	\(4\)

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Family Information

Genus:	$9$
Quotient genus:	$0$
Group name:	$C_2^3:D_4$
Group identifier:	$[64,73]$
Signature:	$[ 0; 2, 2, 2, 4 ]$

Conjugacy classes for this refined passport:

$10, 11, 14, 21$

Jacobian variety group algebra decomposition:	$E\times E^{2}\times E^{2}\times E^{2}\times E^{2}$
Corresponding character(s):	$8, 12, 16, 20, 21$

Other Data

Hyperelliptic curve(s):	no
Cyclic trigonal curve(s):	no

Generating vector(s)

Displaying 4 of 4 generating vectors for this refined passport.

9.64-73.0.2-2-2-4.11.1

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

9.64-73.0.2-2-2-4.11.2

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

9.64-73.0.2-2-2-4.11.3

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

9.64-73.0.2-2-2-4.11.4

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