Family Information
Genus: | $8$ |
Quotient genus: | $0$ |
Group name: | $D_{12}$ |
Group identifier: | $[24,6]$ |
Signature: | $[ 0; 2, 2, 3, 12 ]$ |
Conjugacy classes for this refined passport: | $3, 4, 5, 9$ |
Jacobian variety group algebra decomposition: | $E^{2}\times E^{2}\times A_{2}^{2}$ |
Corresponding character(s): | $5, 6, 8$ |
Other Data
Hyperelliptic curve(s): | no |
Cyclic trigonal curve(s): | yes |
Trigonal automorphism: | (1,2,3) (4,5,6) (7,8,9) (10,11,12) (13,14,15) (16,17,18) (19,20,21) (22,23,24) |
Generating vector(s)
Displaying 2 of 2 generating vectors for this refined passport.
8.24-6.0.2-2-3-12.2.1
(1,13) (2,15) (3,14) (4,16) (5,18) (6,17) (7,22) (8,24) (9,23) (10,19) (11,21) (12,20) | |
(1,19) (2,21) (3,20) (4,22) (5,24) (6,23) (7,13) (8,15) (9,14) (10,16) (11,18) (12,17) | |
(1,3,2) (4,6,5) (7,9,8) (10,12,11) (13,15,14) (16,18,17) (19,21,20) (22,24,23) | |
(1,11,6,7,2,12,4,8,3,10,5,9) (13,23,18,19,14,24,16,20,15,22,17,21) |
8.24-6.0.2-2-3-12.2.2
(1,13) (2,15) (3,14) (4,16) (5,18) (6,17) (7,22) (8,24) (9,23) (10,19) (11,21) (12,20) | |
(1,20) (2,19) (3,21) (4,23) (5,22) (6,24) (7,14) (8,13) (9,15) (10,17) (11,16) (12,18) | |
(1,2,3) (4,5,6) (7,8,9) (10,11,12) (13,14,15) (16,17,18) (19,20,21) (22,23,24) | |
(1,11,6,7,2,12,4,8,3,10,5,9) (13,23,18,19,14,24,16,20,15,22,17,21) |