Family Information
| Genus: | $14$ |
| Quotient genus: | $0$ |
| Group name: | $C_{26}:C_6$ |
| Group identifier: | $[156,8]$ |
| Signature: | $[ 0; 2, 6, 6 ]$ |
| Conjugacy classes for this refined passport: | $4, 8, 9$ |
| Jacobian variety group algebra decomposition: | $E\times E\times A_{2}^{6}$ |
| Corresponding character(s): | $5, 6, 14$ |
Other Data
| Hyperelliptic curve(s): | no |
| Cyclic trigonal curve(s): | no |
Generating vector(s)
Displaying 2 of 2 generating vectors for this refined passport.
14.156-8.0.2-6-6.4.1
| (1,118) (2,130) (3,129) (4,128) (5,127) (6,126) (7,125) (8,124) (9,123) (10,122) (11,121) (12,120) (13,119) (14,131) (15,143) (16,142) (17,141) (18,140) (19,139) (20,138) (21,137) (22,136) (23,135) (24,134) (25,133) (26,132) (27,144) (28,156) (29,155) (30,154) (31,153) (32,152) (33,151) (34,150) (35,149) (36,148) (37,147) (38,146) (39,145) (40,79) (41,91) (42,90) (43,89) (44,88) (45,87) (46,86) (47,85) (48,84) (49,83) (50,82) (51,81) (52,80) (53,92) (54,104) (55,103) (56,102) (57,101) (58,100) (59,99) (60,98) (61,97) (62,96) (63,95) (64,94) (65,93) (66,105) (67,117) (68,116) (69,115) (70,114) (71,113) (72,112) (73,111) (74,110) (75,109) (76,108) (77,107) (78,106) | |
| (1,71,25,40,32,64) (2,67,15,41,28,54) (3,76,18,42,37,57) (4,72,21,43,33,60) (5,68,24,44,29,63) (6,77,14,45,38,53) (7,73,17,46,34,56) (8,69,20,47,30,59) (9,78,23,48,39,62) (10,74,26,49,35,65) (11,70,16,50,31,55) (12,66,19,51,27,58) (13,75,22,52,36,61) (79,149,103,118,110,142) (80,145,93,119,106,132) (81,154,96,120,115,135) (82,150,99,121,111,138) (83,146,102,122,107,141) (84,155,92,123,116,131) (85,151,95,124,112,134) (86,147,98,125,108,137) (87,156,101,126,117,140) (88,152,104,127,113,143) (89,148,94,128,109,133) (90,144,97,129,105,136) (91,153,100,130,114,139) | |
| (1,94,36,80,26,110) (2,104,32,79,16,114) (3,101,28,91,19,105) (4,98,37,90,22,109) (5,95,33,89,25,113) (6,92,29,88,15,117) (7,102,38,87,18,108) (8,99,34,86,21,112) (9,96,30,85,24,116) (10,93,39,84,14,107) (11,103,35,83,17,111) (12,100,31,82,20,115) (13,97,27,81,23,106) (40,133,75,119,65,149) (41,143,71,118,55,153) (42,140,67,130,58,144) (43,137,76,129,61,148) (44,134,72,128,64,152) (45,131,68,127,54,156) (46,141,77,126,57,147) (47,138,73,125,60,151) (48,135,69,124,63,155) (49,132,78,123,53,146) (50,142,74,122,56,150) (51,139,70,121,59,154) (52,136,66,120,62,145) |
14.156-8.0.2-6-6.4.2
| (1,118) (2,130) (3,129) (4,128) (5,127) (6,126) (7,125) (8,124) (9,123) (10,122) (11,121) (12,120) (13,119) (14,131) (15,143) (16,142) (17,141) (18,140) (19,139) (20,138) (21,137) (22,136) (23,135) (24,134) (25,133) (26,132) (27,144) (28,156) (29,155) (30,154) (31,153) (32,152) (33,151) (34,150) (35,149) (36,148) (37,147) (38,146) (39,145) (40,79) (41,91) (42,90) (43,89) (44,88) (45,87) (46,86) (47,85) (48,84) (49,83) (50,82) (51,81) (52,80) (53,92) (54,104) (55,103) (56,102) (57,101) (58,100) (59,99) (60,98) (61,97) (62,96) (63,95) (64,94) (65,93) (66,105) (67,117) (68,116) (69,115) (70,114) (71,113) (72,112) (73,111) (74,110) (75,109) (76,108) (77,107) (78,106) | |
| (1,76,23,40,37,62) (2,72,26,41,33,65) (3,68,16,42,29,55) (4,77,19,43,38,58) (5,73,22,44,34,61) (6,69,25,45,30,64) (7,78,15,46,39,54) (8,74,18,47,35,57) (9,70,21,48,31,60) (10,66,24,49,27,63) (11,75,14,50,36,53) (12,71,17,51,32,56) (13,67,20,52,28,59) (79,154,101,118,115,140) (80,150,104,119,111,143) (81,146,94,120,107,133) (82,155,97,121,116,136) (83,151,100,122,112,139) (84,147,103,123,108,142) (85,156,93,124,117,132) (86,152,96,125,113,135) (87,148,99,126,109,138) (88,144,102,127,105,141) (89,153,92,128,114,131) (90,149,95,129,110,134) (91,145,98,130,106,137) | |
| (1,96,32,81,25,115) (2,93,28,80,15,106) (3,103,37,79,18,110) (4,100,33,91,21,114) (5,97,29,90,24,105) (6,94,38,89,14,109) (7,104,34,88,17,113) (8,101,30,87,20,117) (9,98,39,86,23,108) (10,95,35,85,26,112) (11,92,31,84,16,116) (12,102,27,83,19,107) (13,99,36,82,22,111) (40,135,71,120,64,154) (41,132,67,119,54,145) (42,142,76,118,57,149) (43,139,72,130,60,153) (44,136,68,129,63,144) (45,133,77,128,53,148) (46,143,73,127,56,152) (47,140,69,126,59,156) (48,137,78,125,62,147) (49,134,74,124,65,151) (50,131,70,123,55,155) (51,141,66,122,58,146) (52,138,75,121,61,150) |