LMFDB - Group of Dirichlet characters

Group table for the character group for $\textrm{Gal}(K/\mathbb{Q})$

$K$ is the global number field defined by $ x^{24} + 2 x^{22} - 8 x^{18} - 16 x^{16} + 64 x^{12} - 256 x^{8} - 512 x^{6} + 2048 x^{2} + 4096 $

$\times$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 59, ·)$
$\chi_{ 168 }(1, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 59, ·)$
$\chi_{ 168 }(131, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 1, ·)$
$\chi_{ 168 }(65, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 139, ·)$
$\chi_{ 168 }(137, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 19, ·)$
$\chi_{ 168 }(139, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 137, ·)$
$\chi_{ 168 }(11, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 145, ·)$
$\chi_{ 168 }(145, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 155, ·)$
$\chi_{ 168 }(19, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 113, ·)$
$\chi_{ 168 }(115, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 65, ·)$
$\chi_{ 168 }(89, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 43, ·)$
$\chi_{ 168 }(25, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 131, ·)$
$\chi_{ 168 }(155, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 73, ·)$
$\chi_{ 168 }(107, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 97, ·)$
$\chi_{ 168 }(97, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 11, ·)$
$\chi_{ 168 }(67, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 89, ·)$
$\chi_{ 168 }(163, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 41, ·)$
$\chi_{ 168 }(17, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 163, ·)$
$\chi_{ 168 }(41, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 67, ·)$
$\chi_{ 168 }(43, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 17, ·)$
$\chi_{ 168 }(113, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 115, ·)$
$\chi_{ 168 }(83, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 25, ·)$
$\chi_{ 168 }(73, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 107, ·)$
$\chi_{ 168 }(121, ·)$	$\chi_{ 168 } ( 121, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 83, ·)$
$\chi_{ 168 }(59, ·)$	$\chi_{ 168 } ( 59, ·)$	$\chi_{ 168 } ( 1, ·)$	$\chi_{ 168 } ( 139, ·)$	$\chi_{ 168 } ( 19, ·)$	$\chi_{ 168 } ( 137, ·)$	$\chi_{ 168 } ( 145, ·)$	$\chi_{ 168 } ( 155, ·)$	$\chi_{ 168 } ( 113, ·)$	$\chi_{ 168 } ( 65, ·)$	$\chi_{ 168 } ( 43, ·)$	$\chi_{ 168 } ( 131, ·)$	$\chi_{ 168 } ( 73, ·)$	$\chi_{ 168 } ( 97, ·)$	$\chi_{ 168 } ( 11, ·)$	$\chi_{ 168 } ( 89, ·)$	$\chi_{ 168 } ( 41, ·)$	$\chi_{ 168 } ( 163, ·)$	$\chi_{ 168 } ( 67, ·)$	$\chi_{ 168 } ( 17, ·)$	$\chi_{ 168 } ( 115, ·)$	$\chi_{ 168 } ( 25, ·)$	$\chi_{ 168 } ( 107, ·)$	$\chi_{ 168 } ( 83, ·)$	$\chi_{ 168 } ( 121, ·)$

Overview	Random
Universe	Knowledge

Classical	Maass
Hilbert	Bianchi

Elliptic curves over $\Q$
Elliptic curves over $\Q(\alpha)$
Genus 2 curves over $\Q$
Higher genus families
Abelian varieties over $\F_{q}$

$\times$	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 59, ·)\)
\(\chi_{ 168 }(1, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 59, ·)\)
\(\chi_{ 168 }(131, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 1, ·)\)
\(\chi_{ 168 }(65, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 139, ·)\)
\(\chi_{ 168 }(137, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 19, ·)\)
\(\chi_{ 168 }(139, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 137, ·)\)
\(\chi_{ 168 }(11, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 145, ·)\)
\(\chi_{ 168 }(145, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 155, ·)\)
\(\chi_{ 168 }(19, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 113, ·)\)
\(\chi_{ 168 }(115, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 65, ·)\)
\(\chi_{ 168 }(89, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 43, ·)\)
\(\chi_{ 168 }(25, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 131, ·)\)
\(\chi_{ 168 }(155, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 73, ·)\)
\(\chi_{ 168 }(107, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 97, ·)\)
\(\chi_{ 168 }(97, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 11, ·)\)
\(\chi_{ 168 }(67, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 89, ·)\)
\(\chi_{ 168 }(163, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 41, ·)\)
\(\chi_{ 168 }(17, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 163, ·)\)
\(\chi_{ 168 }(41, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 67, ·)\)
\(\chi_{ 168 }(43, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 17, ·)\)
\(\chi_{ 168 }(113, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 115, ·)\)
\(\chi_{ 168 }(83, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 25, ·)\)
\(\chi_{ 168 }(73, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 107, ·)\)
\(\chi_{ 168 }(121, ·)\)	\(\chi_{ 168 } ( 121, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 83, ·)\)
\(\chi_{ 168 }(59, ·)\)	\(\chi_{ 168 } ( 59, ·)\)	\(\chi_{ 168 } ( 1, ·)\)	\(\chi_{ 168 } ( 139, ·)\)	\(\chi_{ 168 } ( 19, ·)\)	\(\chi_{ 168 } ( 137, ·)\)	\(\chi_{ 168 } ( 145, ·)\)	\(\chi_{ 168 } ( 155, ·)\)	\(\chi_{ 168 } ( 113, ·)\)	\(\chi_{ 168 } ( 65, ·)\)	\(\chi_{ 168 } ( 43, ·)\)	\(\chi_{ 168 } ( 131, ·)\)	\(\chi_{ 168 } ( 73, ·)\)	\(\chi_{ 168 } ( 97, ·)\)	\(\chi_{ 168 } ( 11, ·)\)	\(\chi_{ 168 } ( 89, ·)\)	\(\chi_{ 168 } ( 41, ·)\)	\(\chi_{ 168 } ( 163, ·)\)	\(\chi_{ 168 } ( 67, ·)\)	\(\chi_{ 168 } ( 17, ·)\)	\(\chi_{ 168 } ( 115, ·)\)	\(\chi_{ 168 } ( 25, ·)\)	\(\chi_{ 168 } ( 107, ·)\)	\(\chi_{ 168 } ( 83, ·)\)	\(\chi_{ 168 } ( 121, ·)\)

Introduction

L-functions

Modular forms

Varieties

Fields

Representations

Groups

Database

Group table for the character group for $\textrm{Gal}(K/\mathbb{Q})$

This project is supported by grants from the US National Science Foundation, the UK Engineering and Physical Sciences Research Council, and the Simons Foundation.