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

$K$ is the global number field defined by \( x^{7} - 903x^{5} - 15953x^{4} - 97223x^{3} - 177590x^{2} + 46956x + 94471 \) Copy content Toggle raw display

$\times$ \(\chi_{ 2107 } ( 1, ·)\) \(\chi_{ 2107 } ( 64, ·)\) \(\chi_{ 2107 } ( 1282, ·)\) \(\chi_{ 2107 } ( 1989, ·)\) \(\chi_{ 2107 } ( 428, ·)\) \(\chi_{ 2107 } ( 876, ·)\) \(\chi_{ 2107 } ( 1982, ·)\)
\(\chi_{ 2107 }(1, ·)\) \(\chi_{ 2107 } ( 1, ·)\) \(\chi_{ 2107 } ( 64, ·)\) \(\chi_{ 2107 } ( 1282, ·)\) \(\chi_{ 2107 } ( 1989, ·)\) \(\chi_{ 2107 } ( 428, ·)\) \(\chi_{ 2107 } ( 876, ·)\) \(\chi_{ 2107 } ( 1982, ·)\)
\(\chi_{ 2107 }(64, ·)\) \(\chi_{ 2107 } ( 64, ·)\) \(\chi_{ 2107 } ( 1989, ·)\) \(\chi_{ 2107 } ( 1982, ·)\) \(\chi_{ 2107 } ( 876, ·)\) \(\chi_{ 2107 } ( 1, ·)\) \(\chi_{ 2107 } ( 1282, ·)\) \(\chi_{ 2107 } ( 428, ·)\)
\(\chi_{ 2107 }(1282, ·)\) \(\chi_{ 2107 } ( 1282, ·)\) \(\chi_{ 2107 } ( 1982, ·)\) \(\chi_{ 2107 } ( 64, ·)\) \(\chi_{ 2107 } ( 428, ·)\) \(\chi_{ 2107 } ( 876, ·)\) \(\chi_{ 2107 } ( 1, ·)\) \(\chi_{ 2107 } ( 1989, ·)\)
\(\chi_{ 2107 }(1989, ·)\) \(\chi_{ 2107 } ( 1989, ·)\) \(\chi_{ 2107 } ( 876, ·)\) \(\chi_{ 2107 } ( 428, ·)\) \(\chi_{ 2107 } ( 1282, ·)\) \(\chi_{ 2107 } ( 64, ·)\) \(\chi_{ 2107 } ( 1982, ·)\) \(\chi_{ 2107 } ( 1, ·)\)
\(\chi_{ 2107 }(428, ·)\) \(\chi_{ 2107 } ( 428, ·)\) \(\chi_{ 2107 } ( 1, ·)\) \(\chi_{ 2107 } ( 876, ·)\) \(\chi_{ 2107 } ( 64, ·)\) \(\chi_{ 2107 } ( 1982, ·)\) \(\chi_{ 2107 } ( 1989, ·)\) \(\chi_{ 2107 } ( 1282, ·)\)
\(\chi_{ 2107 }(876, ·)\) \(\chi_{ 2107 } ( 876, ·)\) \(\chi_{ 2107 } ( 1282, ·)\) \(\chi_{ 2107 } ( 1, ·)\) \(\chi_{ 2107 } ( 1982, ·)\) \(\chi_{ 2107 } ( 1989, ·)\) \(\chi_{ 2107 } ( 428, ·)\) \(\chi_{ 2107 } ( 64, ·)\)
\(\chi_{ 2107 }(1982, ·)\) \(\chi_{ 2107 } ( 1982, ·)\) \(\chi_{ 2107 } ( 428, ·)\) \(\chi_{ 2107 } ( 1989, ·)\) \(\chi_{ 2107 } ( 1, ·)\) \(\chi_{ 2107 } ( 1282, ·)\) \(\chi_{ 2107 } ( 64, ·)\) \(\chi_{ 2107 } ( 876, ·)\)