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 $x^{26} - 11 x^{25} - 7 x^{24} + 468 x^{23} - 1046 x^{22} - 6960 x^{21} + 26796 x^{20} + 40357 x^{19} - 278503 x^{18} + 355 x^{17} + 1499785 x^{16} - 1077692 x^{15} - 4479644 x^{14} + 5284410 x^{13} + 7470556 x^{12} - 11963101 x^{11} - 6678940 x^{10} + 14762504 x^{9} + 2744933 x^{8} - 10366844 x^{7} - 29320 x^{6} + 4079010 x^{5} - 378384 x^{4} - 821546 x^{3} + 120702 x^{2} + 64121 x - 11789$

$\times$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 254, ·)$
$\chi_{ 265 }(1, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 254, ·)$
$\chi_{ 265 }(256, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 99, ·)$
$\chi_{ 265 }(66, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 69, ·)$
$\chi_{ 265 }(259, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 66, ·)$
$\chi_{ 265 }(261, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 44, ·)$
$\chi_{ 265 }(134, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 116, ·)$
$\chi_{ 265 }(201, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 174, ·)$
$\chi_{ 265 }(206, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 119, ·)$
$\chi_{ 265 }(16, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 89, ·)$
$\chi_{ 265 }(81, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 169, ·)$
$\chi_{ 265 }(46, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 24, ·)$
$\chi_{ 265 }(24, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 1, ·)$
$\chi_{ 265 }(89, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 81, ·)$
$\chi_{ 265 }(69, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 36, ·)$
$\chi_{ 265 }(99, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 236, ·)$
$\chi_{ 265 }(36, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 134, ·)$
$\chi_{ 265 }(169, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 261, ·)$
$\chi_{ 265 }(44, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 46, ·)$
$\chi_{ 265 }(174, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 206, ·)$
$\chi_{ 265 }(49, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 256, ·)$
$\chi_{ 265 }(116, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 49, ·)$
$\chi_{ 265 }(236, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 54, ·)$
$\chi_{ 265 }(54, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 201, ·)$
$\chi_{ 265 }(119, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 16, ·)$
$\chi_{ 265 }(121, ·)$	$\chi_{ 265 } ( 121, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 259, ·)$
$\chi_{ 265 }(254, ·)$	$\chi_{ 265 } ( 254, ·)$	$\chi_{ 265 } ( 99, ·)$	$\chi_{ 265 } ( 69, ·)$	$\chi_{ 265 } ( 66, ·)$	$\chi_{ 265 } ( 44, ·)$	$\chi_{ 265 } ( 116, ·)$	$\chi_{ 265 } ( 174, ·)$	$\chi_{ 265 } ( 119, ·)$	$\chi_{ 265 } ( 89, ·)$	$\chi_{ 265 } ( 169, ·)$	$\chi_{ 265 } ( 24, ·)$	$\chi_{ 265 } ( 1, ·)$	$\chi_{ 265 } ( 81, ·)$	$\chi_{ 265 } ( 36, ·)$	$\chi_{ 265 } ( 236, ·)$	$\chi_{ 265 } ( 134, ·)$	$\chi_{ 265 } ( 261, ·)$	$\chi_{ 265 } ( 46, ·)$	$\chi_{ 265 } ( 206, ·)$	$\chi_{ 265 } ( 256, ·)$	$\chi_{ 265 } ( 49, ·)$	$\chi_{ 265 } ( 54, ·)$	$\chi_{ 265 } ( 201, ·)$	$\chi_{ 265 } ( 16, ·)$	$\chi_{ 265 } ( 259, ·)$	$\chi_{ 265 } ( 121, ·)$

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 $\F_{q}$

$\times$	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 254, ·)\)
\(\chi_{ 265 }(1, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 254, ·)\)
\(\chi_{ 265 }(256, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 99, ·)\)
\(\chi_{ 265 }(66, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 69, ·)\)
\(\chi_{ 265 }(259, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 66, ·)\)
\(\chi_{ 265 }(261, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 44, ·)\)
\(\chi_{ 265 }(134, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 116, ·)\)
\(\chi_{ 265 }(201, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 174, ·)\)
\(\chi_{ 265 }(206, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 119, ·)\)
\(\chi_{ 265 }(16, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 89, ·)\)
\(\chi_{ 265 }(81, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 169, ·)\)
\(\chi_{ 265 }(46, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 24, ·)\)
\(\chi_{ 265 }(24, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 1, ·)\)
\(\chi_{ 265 }(89, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 81, ·)\)
\(\chi_{ 265 }(69, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 36, ·)\)
\(\chi_{ 265 }(99, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 236, ·)\)
\(\chi_{ 265 }(36, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 134, ·)\)
\(\chi_{ 265 }(169, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 261, ·)\)
\(\chi_{ 265 }(44, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 46, ·)\)
\(\chi_{ 265 }(174, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 206, ·)\)
\(\chi_{ 265 }(49, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 256, ·)\)
\(\chi_{ 265 }(116, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 49, ·)\)
\(\chi_{ 265 }(236, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 54, ·)\)
\(\chi_{ 265 }(54, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 201, ·)\)
\(\chi_{ 265 }(119, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 16, ·)\)
\(\chi_{ 265 }(121, ·)\)	\(\chi_{ 265 } ( 121, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 259, ·)\)
\(\chi_{ 265 }(254, ·)\)	\(\chi_{ 265 } ( 254, ·)\)	\(\chi_{ 265 } ( 99, ·)\)	\(\chi_{ 265 } ( 69, ·)\)	\(\chi_{ 265 } ( 66, ·)\)	\(\chi_{ 265 } ( 44, ·)\)	\(\chi_{ 265 } ( 116, ·)\)	\(\chi_{ 265 } ( 174, ·)\)	\(\chi_{ 265 } ( 119, ·)\)	\(\chi_{ 265 } ( 89, ·)\)	\(\chi_{ 265 } ( 169, ·)\)	\(\chi_{ 265 } ( 24, ·)\)	\(\chi_{ 265 } ( 1, ·)\)	\(\chi_{ 265 } ( 81, ·)\)	\(\chi_{ 265 } ( 36, ·)\)	\(\chi_{ 265 } ( 236, ·)\)	\(\chi_{ 265 } ( 134, ·)\)	\(\chi_{ 265 } ( 261, ·)\)	\(\chi_{ 265 } ( 46, ·)\)	\(\chi_{ 265 } ( 206, ·)\)	\(\chi_{ 265 } ( 256, ·)\)	\(\chi_{ 265 } ( 49, ·)\)	\(\chi_{ 265 } ( 54, ·)\)	\(\chi_{ 265 } ( 201, ·)\)	\(\chi_{ 265 } ( 16, ·)\)	\(\chi_{ 265 } ( 259, ·)\)	\(\chi_{ 265 } ( 121, ·)\)

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.