Family Information
Genus: | $4$ |
Quotient genus: | $0$ |
Group name: | $A_4$ |
Group identifier: | $[12,3]$ |
Signature: | $[ 0; 2, 3, 3, 3 ]$ |
Conjugacy classes for this refined passport: | $2, 4, 4, 4$ |
Jacobian variety group algebra decomposition: | $E\times E^{3}$ |
Corresponding character(s): | $2, 4$ |
Other Data
Hyperelliptic curve(s): | no |
Cyclic trigonal curve(s): | no |
Generating vector(s)
Displaying 4 of 4 generating vectors for this refined passport.
4.12-3.0.2-3-3-3.2.1
(1,2) (3,4) (5,6) (7,8) (9,10) (11,12) | |
(1,9,5) (2,11,8) (3,12,6) (4,10,7) | |
(1,9,5) (2,11,8) (3,12,6) (4,10,7) | |
(1,10,8) (2,12,5) (3,11,7) (4,9,6) |
4.12-3.0.2-3-3-3.2.2
(1,2) (3,4) (5,6) (7,8) (9,10) (11,12) | |
(1,9,5) (2,11,8) (3,12,6) (4,10,7) | |
(1,12,7) (2,10,6) (3,9,8) (4,11,5) | |
(1,9,5) (2,11,8) (3,12,6) (4,10,7) |
4.12-3.0.2-3-3-3.2.3
(1,2) (3,4) (5,6) (7,8) (9,10) (11,12) | |
(1,9,5) (2,11,8) (3,12,6) (4,10,7) | |
(1,10,8) (2,12,5) (3,11,7) (4,9,6) | |
(1,12,7) (2,10,6) (3,9,8) (4,11,5) |
4.12-3.0.2-3-3-3.2.4
(1,2) (3,4) (5,6) (7,8) (9,10) (11,12) | |
(1,9,5) (2,11,8) (3,12,6) (4,10,7) | |
(1,11,6) (2,9,7) (3,10,5) (4,12,8) | |
(1,11,6) (2,9,7) (3,10,5) (4,12,8) |
Displaying the unique representative of this refined passport up to braid equivalence.
4.12-3.0.2-3-3-3.2.1
(1,2) (3,4) (5,6) (7,8) (9,10) (11,12) | |
(1,9,5) (2,11,8) (3,12,6) (4,10,7) | |
(1,9,5) (2,11,8) (3,12,6) (4,10,7) | |
(1,10,8) (2,12,5) (3,11,7) (4,9,6) |