Galois conjugate representations are grouped into single lines.
Label |
Dimension |
Conductor |
Ramified prime count |
Artin stem field |
$G$ |
Projective image |
Container |
Ind |
$\chi(c)$ |
12.353...281.55.a.a 12.353...281.55.a.b |
$12$ |
$ 83^{6} \cdot 97^{6} \cdot 15331^{6}$ |
$3$ |
11.3.232103260410508882263696899053921.2 |
$\PSL(2,11)$ |
$\PSL(2,11)$ |
55 |
$1$ |
$0$ |
12.375...321.55.a.a 12.375...321.55.a.b |
$12$ |
$ 43^{6} \cdot 2898947^{6}$ |
$2$ |
11.3.241454288893908170924307051041281.2 |
$\PSL(2,11)$ |
$\PSL(2,11)$ |
55 |
$1$ |
$0$ |
12.402...161.55.a.a 12.402...161.55.a.b |
$12$ |
$ 126127861^{6}$ |
$1$ |
11.3.253072014643291161956948944373041.2 |
$\PSL(2,11)$ |
$\PSL(2,11)$ |
55 |
$1$ |
$0$ |
12.547...664.55.a.a 12.547...664.55.a.b |
$12$ |
$ 2^{12} \cdot 41^{10} \cdot 47^{6} \cdot 3121^{6}$ |
$4$ |
11.3.946405652456836696490269155592519936.1 |
$\PSL(2,11)$ |
$\PSL(2,11)$ |
55 |
$1$ |
$0$ |
12.924...249.55.a.a 12.924...249.55.a.b |
$12$ |
$ 23^{6} \cdot 127^{6} \cdot 156833^{6}$ |
$3$ |
11.3.44042912225770372337071144454340001.1 |
$\PSL(2,11)$ |
$\PSL(2,11)$ |
55 |
$1$ |
$0$ |
12.503...064.55.a.a 12.503...064.55.a.b |
$12$ |
$ 2^{8} \cdot 349^{6} \cdot 379^{6} \cdot 1823^{6}$ |
$4$ |
11.3.216364096903447587790305699611258944.1 |
$\PSL(2,11)$ |
$\PSL(2,11)$ |
55 |
$1$ |
$0$ |
12.842...544.55.a.a 12.842...544.55.a.b |
$12$ |
$ 2^{8} \cdot 113^{6} \cdot 2325361^{6}$ |
$3$ |
11.3.305109187539659374294488917983027264.1 |
$\PSL(2,11)$ |
$\PSL(2,11)$ |
55 |
$1$ |
$0$ |
12.951...889.55.a.a 12.951...889.55.a.b |
$12$ |
$ 991677977^{6}$ |
$1$ |
11.3.967125143794954350729376094031375841.1 |
$\PSL(2,11)$ |
$\PSL(2,11)$ |
55 |
$1$ |
$0$ |
12.152...584.55.a.a 12.152...584.55.a.b |
$12$ |
$ 2^{18} \cdot 9787^{6} \cdot 13697^{6}$ |
$3$ |
11.3.1322696256137864230312062897370894336.1 |
$\PSL(2,11)$ |
$\PSL(2,11)$ |
55 |
$1$ |
$0$ |
12.552...961.55.a.a 12.552...961.55.a.b |
$12$ |
$ 1601^{6} \cdot 830561^{6}$ |
$2$ |
11.3.3126449840227862331488598918646170241.1 |
$\PSL(2,11)$ |
$\PSL(2,11)$ |
55 |
$1$ |
$0$ |
12.253...401.55.a.a 12.253...401.55.a.b |
$12$ |
$ 11^{6} \cdot 79^{6} \cdot 1971829^{6}$ |
$3$ |
11.3.8620969409330032424291018787048237601.1 |
$\PSL(2,11)$ |
$\PSL(2,11)$ |
55 |
$1$ |
$0$ |
12.389...584.55.a.a 12.389...584.55.a.b |
$12$ |
$ 2^{24} \cdot 115072207^{6}$ |
$2$ |
11.3.11491102567744880993068475876691214336.1 |
$\PSL(2,11)$ |
$\PSL(2,11)$ |
55 |
$1$ |
$0$ |
12.504...129.55.a.a 12.504...129.55.a.b |
$12$ |
$ 109^{6} \cdot 17634433^{6}$ |
$2$ |
11.3.13650607932114878185476093591384414481.1 |
$\PSL(2,11)$ |
$\PSL(2,11)$ |
55 |
$1$ |
$0$ |
12.965...449.55.a.a 12.965...449.55.a.b |
$12$ |
$ 19^{6} \cdot 317^{6} \cdot 355591^{6}$ |
$3$ |
11.3.21040424347011179156604622305022891201.1 |
$\PSL(2,11)$ |
$\PSL(2,11)$ |
55 |
$1$ |
$0$ |