Refined passport label |
Genus |
Quotient genus |
Group |
Group order |
Dimension |
Signature |
Hyperelliptic |
Cyclic trigonal |
Generating vectors |
13.36-8.0.6-12-12.1 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,4,5,2,3,6)\cdots(31,34,35,32,33,36),\ldots$ |
13.36-8.0.6-12-12.2 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,4,5,2,3,6)\cdots(31,34,35,32,33,36),\ldots$ |
13.36-8.0.6-12-12.3 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,4,5,2,3,6)\cdots(31,34,35,32,33,36),\ldots$ |
13.36-8.0.6-12-12.4 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,4,5,2,3,6)\cdots(31,34,35,32,33,36),\ldots$ |
13.36-8.0.6-12-12.5 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,4,5,2,3,6)\cdots(31,34,35,32,33,36),\ldots$ |
13.36-8.0.6-12-12.6 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,4,5,2,3,6)\cdots(31,34,35,32,33,36),\ldots$ |
13.36-8.0.6-12-12.7 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,6,3,2,5,4)\cdots(31,36,33,32,35,34),\ldots$ |
13.36-8.0.6-12-12.8 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,6,3,2,5,4)\cdots(31,36,33,32,35,34),\ldots$ |
13.36-8.0.6-12-12.9 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,6,3,2,5,4)\cdots(31,36,33,32,35,34),\ldots$ |
13.36-8.0.6-12-12.10 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,6,3,2,5,4)\cdots(31,36,33,32,35,34),\ldots$ |
13.36-8.0.6-12-12.11 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,6,3,2,5,4)\cdots(31,36,33,32,35,34),\ldots$ |
13.36-8.0.6-12-12.12 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,6,3,2,5,4)\cdots(31,36,33,32,35,34),\ldots$ |
13.36-8.0.6-12-12.13 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,8,13,2,7,14)\cdots(23,30,35,24,29,36),\ldots$ |
13.36-8.0.6-12-12.14 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,8,13,2,7,14)\cdots(23,30,35,24,29,36),\ldots$ |
13.36-8.0.6-12-12.15 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,8,13,2,7,14)\cdots(23,30,35,24,29,36),\ldots$ |
13.36-8.0.6-12-12.16 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,8,13,2,7,14)\cdots(23,30,35,24,29,36),\ldots$ |
13.36-8.0.6-12-12.17 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,8,13,2,7,14)\cdots(23,30,35,24,29,36),\ldots$ |
13.36-8.0.6-12-12.18 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,8,13,2,7,14)\cdots(23,30,35,24,29,36),\ldots$ |
13.36-8.0.6-12-12.19 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,14,7,2,13,8)\cdots(23,36,29,24,35,30),\ldots$ |
13.36-8.0.6-12-12.20 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,14,7,2,13,8)\cdots(23,36,29,24,35,30),\ldots$ |
13.36-8.0.6-12-12.21 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,14,7,2,13,8)\cdots(23,36,29,24,35,30),\ldots$ |
13.36-8.0.6-12-12.22 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,14,7,2,13,8)\cdots(23,36,29,24,35,30),\ldots$ |
13.36-8.0.6-12-12.23 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,14,7,2,13,8)\cdots(23,36,29,24,35,30),\ldots$ |
13.36-8.0.6-12-12.24 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,14,7,2,13,8)\cdots(23,36,29,24,35,30),\ldots$ |
13.36-8.0.6-12-12.25 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,10,17,2,9,18)\cdots(23,26,33,24,25,34),\ldots$ |
13.36-8.0.6-12-12.26 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,10,17,2,9,18)\cdots(23,26,33,24,25,34),\ldots$ |
13.36-8.0.6-12-12.27 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,10,17,2,9,18)\cdots(23,26,33,24,25,34),\ldots$ |
13.36-8.0.6-12-12.28 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,10,17,2,9,18)\cdots(23,26,33,24,25,34),\ldots$ |
13.36-8.0.6-12-12.29 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,10,17,2,9,18)\cdots(23,26,33,24,25,34),\ldots$ |
13.36-8.0.6-12-12.30 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,10,17,2,9,18)\cdots(23,26,33,24,25,34),\ldots$ |
13.36-8.0.6-12-12.31 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,18,9,2,17,10)\cdots(23,34,25,24,33,26),\ldots$ |
13.36-8.0.6-12-12.32 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,18,9,2,17,10)\cdots(23,34,25,24,33,26),\ldots$ |
13.36-8.0.6-12-12.33 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,18,9,2,17,10)\cdots(23,34,25,24,33,26),\ldots$ |
13.36-8.0.6-12-12.34 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,18,9,2,17,10)\cdots(23,34,25,24,33,26),\ldots$ |
13.36-8.0.6-12-12.35 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,18,9,2,17,10)\cdots(23,34,25,24,33,26),\ldots$ |
13.36-8.0.6-12-12.36 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,18,9,2,17,10)\cdots(23,34,25,24,33,26),\ldots$ |
13.36-8.0.6-12-12.37 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,12,15,2,11,16)\cdots(23,28,31,24,27,32),\ldots$ |
13.36-8.0.6-12-12.38 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,12,15,2,11,16)\cdots(23,28,31,24,27,32),\ldots$ |
13.36-8.0.6-12-12.39 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,12,15,2,11,16)\cdots(23,28,31,24,27,32),\ldots$ |
13.36-8.0.6-12-12.40 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,12,15,2,11,16)\cdots(23,28,31,24,27,32),\ldots$ |
13.36-8.0.6-12-12.41 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,12,15,2,11,16)\cdots(23,28,31,24,27,32),\ldots$ |
13.36-8.0.6-12-12.42 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,12,15,2,11,16)\cdots(23,28,31,24,27,32),\ldots$ |
13.36-8.0.6-12-12.43 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,16,11,2,15,12)\cdots(23,32,27,24,31,28),\ldots$ |
13.36-8.0.6-12-12.44 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,16,11,2,15,12)\cdots(23,32,27,24,31,28),\ldots$ |
13.36-8.0.6-12-12.45 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,16,11,2,15,12)\cdots(23,32,27,24,31,28),\ldots$ |
13.36-8.0.6-12-12.46 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,16,11,2,15,12)\cdots(23,32,27,24,31,28),\ldots$ |
13.36-8.0.6-12-12.47 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,16,11,2,15,12)\cdots(23,32,27,24,31,28),\ldots$ |
13.36-8.0.6-12-12.48 |
$13$ |
$0$ |
$C_3\times C_{12}$ |
$36$ |
$0$ |
$[ 0; 6, 12, 12 ]$ |
|
|
$(1,16,11,2,15,12)\cdots(23,32,27,24,31,28),\ldots$ |