Galois conjugate representations are grouped into single lines.
Label |
Dimension |
Conductor |
Ramified prime count |
Artin stem field |
$G$ |
Projective image |
Container |
Ind |
$\chi(c)$ |
10.147...000.110.a.a |
$10$ |
$ 2^{6} \cdot 5^{10} \cdot 11^{9}$ |
$3$ |
12.2.713279176527500000000.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.456...000.110.a.a |
$10$ |
$ 2^{10} \cdot 5^{6} \cdot 11^{11}$ |
$3$ |
12.2.114124668244400000000.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.690...144.110.a.a |
$10$ |
$ 2^{12} \cdot 3^{10} \cdot 11^{11}$ |
$3$ |
12.2.276027291040300056576.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.682...416.110.a.a |
$10$ |
$ 2^{10} \cdot 7^{10} \cdot 11^{9}$ |
$3$ |
12.2.82527728843210964110336.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.475...259.110.a.a |
$10$ |
$ 11^{9} \cdot 17^{10}$ |
$2$ |
12.2.575186587678690213004339.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.740...211.110.a.a |
$10$ |
$ 11^{21}$ |
$1$ |
12.2.7400249944258160101211.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.114...000.110.a.a |
$10$ |
$ 2^{12} \cdot 5^{10} \cdot 11^{11}$ |
$3$ |
12.2.45649867297760000000000.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.164...875.110.a.a |
$10$ |
$ 3^{10} \cdot 5^{10} \cdot 11^{11}$ |
$3$ |
12.2.164525086307704482421875.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.473...504.110.a.a |
$10$ |
$ 2^{6} \cdot 11^{21}$ |
$2$ |
12.2.1894463985730088985910016.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.139...000.110.a.a |
$10$ |
$ 2^{10} \cdot 3^{10} \cdot 5^{10} \cdot 11^{9}$ |
$4$ |
12.2.168473688379089390000000000.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.174...411.110.a.a |
$10$ |
$ 11^{11} \cdot 19^{10}$ |
$2$ |
12.2.1749264756639935321186411.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.251...296.110.a.a |
$10$ |
$ 2^{6} \cdot 11^{11} \cdot 13^{10}$ |
$3$ |
12.2.10069154974041885785533184.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.475...811.110.a.a |
$10$ |
$ 3^{10} \cdot 7^{10} \cdot 11^{11}$ |
$3$ |
12.2.4758964707483168183350811.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.402...736.110.a.a |
$10$ |
$ 2^{10} \cdot 11^{11} \cdot 13^{10}$ |
$3$ |
12.2.40276619896167543142132736.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.402...736.110.b.a |
$10$ |
$ 2^{10} \cdot 11^{11} \cdot 13^{10}$ |
$3$ |
12.2.40276619896167543142132736.2 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.436...339.110.a.a |
$10$ |
$ 3^{10} \cdot 11^{21}$ |
$2$ |
12.2.436977358958500095816408339.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.588...136.110.a.a |
$10$ |
$ 2^{10} \cdot 11^{11} \cdot 17^{10}$ |
$3$ |
12.2.588991065782978778116443136.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.787...875.110.a.a |
$10$ |
$ 5^{10} \cdot 7^{10} \cdot 11^{11}$ |
$3$ |
12.2.787045753891095772841796875.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.137...739.110.a.a |
$10$ |
$ 11^{11} \cdot 37^{10}$ |
$2$ |
12.2.1371945240568483487545135739.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.137...739.110.b.a |
$10$ |
$ 11^{11} \cdot 37^{10}$ |
$2$ |
12.2.1371945240568483487545135739.2 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.179...864.110.a.a |
$10$ |
$ 2^{10} \cdot 11^{11} \cdot 19^{10}$ |
$3$ |
12.2.1791247110799293768894884864.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.179...864.110.b.a |
$10$ |
$ 2^{10} \cdot 11^{11} \cdot 19^{10}$ |
$3$ |
12.2.1791247110799293768894884864.2 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.232...211.110.a.a |
$10$ |
$ 3^{10} \cdot 11^{11} \cdot 13^{10}$ |
$3$ |
12.2.2322552859617966069335738211.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.487...464.110.a.a |
$10$ |
$ 2^{10} \cdot 3^{10} \cdot 7^{10} \cdot 11^{11}$ |
$4$ |
12.2.4873179860462764219751230464.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.616...139.110.a.a |
$10$ |
$ 11^{11} \cdot 43^{10}$ |
$2$ |
12.2.6166008123183207960302506139.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.121...936.110.a.a |
$10$ |
$ 2^{10} \cdot 11^{11} \cdot 23^{10}$ |
$3$ |
12.2.12103134332878357847418407936.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
10.339...611.110.a.a |
$10$ |
$ 3^{10} \cdot 11^{11} \cdot 17^{10}$ |
$3$ |
12.2.33964192815838978387693213611.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$0$ |
12.713...000.110.a.a 12.713...000.110.a.b |
$12$ |
$ 2^{8} \cdot 5^{10} \cdot 11^{11}$ |
$3$ |
12.2.713279176527500000000.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.138...000.110.a.a 12.138...000.110.a.b |
$12$ |
$ 2^{10} \cdot 5^{8} \cdot 11^{13}$ |
$3$ |
12.2.114124668244400000000.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.333...696.110.a.a 12.333...696.110.a.b |
$12$ |
$ 2^{14} \cdot 3^{10} \cdot 11^{13}$ |
$3$ |
12.2.276027291040300056576.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.825...336.110.a.a 12.825...336.110.a.b |
$12$ |
$ 2^{10} \cdot 7^{10} \cdot 11^{11}$ |
$3$ |
12.2.82527728843210964110336.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.575...339.110.a.a 12.575...339.110.a.b |
$12$ |
$ 11^{11} \cdot 17^{10}$ |
$2$ |
12.2.575186587678690213004339.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.895...531.110.a.a 12.895...531.110.a.b |
$12$ |
$ 11^{23}$ |
$1$ |
12.2.7400249944258160101211.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.552...000.110.a.a 12.552...000.110.a.b |
$12$ |
$ 2^{14} \cdot 5^{10} \cdot 11^{13}$ |
$3$ |
12.2.45649867297760000000000.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.199...875.110.a.a 12.199...875.110.a.b |
$12$ |
$ 3^{10} \cdot 5^{10} \cdot 11^{13}$ |
$3$ |
12.2.164525086307704482421875.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.168...000.110.a.a 12.168...000.110.a.b |
$12$ |
$ 2^{10} \cdot 3^{10} \cdot 5^{10} \cdot 11^{11}$ |
$4$ |
12.2.168473688379089390000000000.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.211...731.110.a.a 12.211...731.110.a.b |
$12$ |
$ 11^{13} \cdot 19^{10}$ |
$2$ |
12.2.1749264756639935321186411.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.229...936.110.a.a 12.229...936.110.a.b |
$12$ |
$ 2^{8} \cdot 11^{23}$ |
$2$ |
12.2.1894463985730088985910016.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.575...131.110.a.a 12.575...131.110.a.b |
$12$ |
$ 3^{10} \cdot 7^{10} \cdot 11^{13}$ |
$3$ |
12.2.4758964707483168183350811.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.121...264.110.a.a 12.121...264.110.a.b |
$12$ |
$ 2^{8} \cdot 11^{13} \cdot 13^{10}$ |
$3$ |
12.2.10069154974041885785533184.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.487...056.110.a.a 12.487...056.110.a.b |
$12$ |
$ 2^{10} \cdot 11^{13} \cdot 13^{10}$ |
$3$ |
12.2.40276619896167543142132736.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.487...056.110.b.a 12.487...056.110.b.b |
$12$ |
$ 2^{10} \cdot 11^{13} \cdot 13^{10}$ |
$3$ |
12.2.40276619896167543142132736.2 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.528...019.110.a.a 12.528...019.110.a.b |
$12$ |
$ 3^{10} \cdot 11^{23}$ |
$2$ |
12.2.436977358958500095816408339.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.712...456.110.a.a 12.712...456.110.a.b |
$12$ |
$ 2^{10} \cdot 11^{13} \cdot 17^{10}$ |
$3$ |
12.2.588991065782978778116443136.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.952...875.110.a.a 12.952...875.110.a.b |
$12$ |
$ 5^{10} \cdot 7^{10} \cdot 11^{13}$ |
$3$ |
12.2.787045753891095772841796875.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.166...419.110.a.a 12.166...419.110.a.b |
$12$ |
$ 11^{13} \cdot 37^{10}$ |
$2$ |
12.2.1371945240568483487545135739.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.166...419.110.b.a 12.166...419.110.b.b |
$12$ |
$ 11^{13} \cdot 37^{10}$ |
$2$ |
12.2.1371945240568483487545135739.2 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.216...544.110.a.a 12.216...544.110.a.b |
$12$ |
$ 2^{10} \cdot 11^{13} \cdot 19^{10}$ |
$3$ |
12.2.1791247110799293768894884864.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.216...544.110.b.a 12.216...544.110.b.b |
$12$ |
$ 2^{10} \cdot 11^{13} \cdot 19^{10}$ |
$3$ |
12.2.1791247110799293768894884864.2 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |
12.281...531.110.a.a 12.281...531.110.a.b |
$12$ |
$ 3^{10} \cdot 11^{13} \cdot 13^{10}$ |
$3$ |
12.2.2322552859617966069335738211.1 |
$\PGL(2,11)$ |
$\PGL(2,11)$ |
110 |
$1$ |
$-2$ |