Dirichlet character search results

Results (1-50 of )

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Orbit label	Conrey labels	Modulus	Conductor	Order	Parity	Real	Primitive	Minimal
7.d	\(\chi_{7}(3, \cdot)\)$,$ \(\chi_{7}(5, \cdot)\)	$7$	$7$	$6$	odd		✓	✓
9.d	\(\chi_{9}(2, \cdot)\)$,$ \(\chi_{9}(5, \cdot)\)	$9$	$9$	$6$	odd		✓	✓
13.e	\(\chi_{13}(4, \cdot)\)$,$ \(\chi_{13}(10, \cdot)\)	$13$	$13$	$6$	even		✓	✓
14.d	\(\chi_{14}(3, \cdot)\)$,$ \(\chi_{14}(5, \cdot)\)	$14$	$7$	$6$	odd			✓
18.d	\(\chi_{18}(5, \cdot)\)$,$ \(\chi_{18}(11, \cdot)\)	$18$	$9$	$6$	odd			✓
19.d	\(\chi_{19}(8, \cdot)\)$,$ \(\chi_{19}(12, \cdot)\)	$19$	$19$	$6$	odd		✓	✓
21.f	\(\chi_{21}(10, \cdot)\)$,$ \(\chi_{21}(19, \cdot)\)	$21$	$7$	$6$	odd			✓
21.g	\(\chi_{21}(5, \cdot)\)$,$ \(\chi_{21}(17, \cdot)\)	$21$	$21$	$6$	even		✓	✓
21.h	\(\chi_{21}(2, \cdot)\)$,$ \(\chi_{21}(11, \cdot)\)	$21$	$21$	$6$	odd		✓	✓
26.e	\(\chi_{26}(17, \cdot)\)$,$ \(\chi_{26}(23, \cdot)\)	$26$	$13$	$6$	even			✓
27.d	\(\chi_{27}(8, \cdot)\)$,$ \(\chi_{27}(17, \cdot)\)	$27$	$9$	$6$	odd
28.f	\(\chi_{28}(3, \cdot)\)$,$ \(\chi_{28}(19, \cdot)\)	$28$	$28$	$6$	even		✓	✓
28.g	\(\chi_{28}(11, \cdot)\)$,$ \(\chi_{28}(23, \cdot)\)	$28$	$28$	$6$	odd		✓	✓
28.h	\(\chi_{28}(5, \cdot)\)$,$ \(\chi_{28}(17, \cdot)\)	$28$	$7$	$6$	odd			✓
31.e	\(\chi_{31}(6, \cdot)\)$,$ \(\chi_{31}(26, \cdot)\)	$31$	$31$	$6$	odd		✓	✓
35.h	\(\chi_{35}(26, \cdot)\)$,$ \(\chi_{35}(31, \cdot)\)	$35$	$7$	$6$	odd			✓
35.i	\(\chi_{35}(19, \cdot)\)$,$ \(\chi_{35}(24, \cdot)\)	$35$	$35$	$6$	odd		✓	✓
35.j	\(\chi_{35}(4, \cdot)\)$,$ \(\chi_{35}(9, \cdot)\)	$35$	$35$	$6$	even		✓	✓
36.f	\(\chi_{36}(7, \cdot)\)$,$ \(\chi_{36}(31, \cdot)\)	$36$	$36$	$6$	odd		✓	✓
36.g	\(\chi_{36}(5, \cdot)\)$,$ \(\chi_{36}(29, \cdot)\)	$36$	$9$	$6$	odd			✓
36.h	\(\chi_{36}(11, \cdot)\)$,$ \(\chi_{36}(23, \cdot)\)	$36$	$36$	$6$	even		✓	✓
37.e	\(\chi_{37}(11, \cdot)\)$,$ \(\chi_{37}(27, \cdot)\)	$37$	$37$	$6$	even		✓	✓
38.d	\(\chi_{38}(27, \cdot)\)$,$ \(\chi_{38}(31, \cdot)\)	$38$	$19$	$6$	odd			✓
39.h	\(\chi_{39}(17, \cdot)\)$,$ \(\chi_{39}(23, \cdot)\)	$39$	$39$	$6$	odd		✓	✓
39.i	\(\chi_{39}(29, \cdot)\)$,$ \(\chi_{39}(35, \cdot)\)	$39$	$39$	$6$	odd		✓	✓
39.j	\(\chi_{39}(4, \cdot)\)$,$ \(\chi_{39}(10, \cdot)\)	$39$	$13$	$6$	even			✓
42.f	\(\chi_{42}(5, \cdot)\)$,$ \(\chi_{42}(17, \cdot)\)	$42$	$21$	$6$	even			✓
42.g	\(\chi_{42}(19, \cdot)\)$,$ \(\chi_{42}(31, \cdot)\)	$42$	$7$	$6$	odd			✓
42.h	\(\chi_{42}(11, \cdot)\)$,$ \(\chi_{42}(23, \cdot)\)	$42$	$21$	$6$	odd			✓
43.d	\(\chi_{43}(7, \cdot)\)$,$ \(\chi_{43}(37, \cdot)\)	$43$	$43$	$6$	odd		✓	✓
45.h	\(\chi_{45}(14, \cdot)\)$,$ \(\chi_{45}(29, \cdot)\)	$45$	$45$	$6$	odd		✓	✓
45.i	\(\chi_{45}(11, \cdot)\)$,$ \(\chi_{45}(41, \cdot)\)	$45$	$9$	$6$	odd			✓
45.j	\(\chi_{45}(4, \cdot)\)$,$ \(\chi_{45}(34, \cdot)\)	$45$	$45$	$6$	even		✓	✓
49.d	\(\chi_{49}(19, \cdot)\)$,$ \(\chi_{49}(31, \cdot)\)	$49$	$7$	$6$	odd
52.h	\(\chi_{52}(17, \cdot)\)$,$ \(\chi_{52}(49, \cdot)\)	$52$	$13$	$6$	even			✓
52.i	\(\chi_{52}(23, \cdot)\)$,$ \(\chi_{52}(43, \cdot)\)	$52$	$52$	$6$	odd		✓	✓
52.j	\(\chi_{52}(3, \cdot)\)$,$ \(\chi_{52}(35, \cdot)\)	$52$	$52$	$6$	odd		✓	✓
54.d	\(\chi_{54}(17, \cdot)\)$,$ \(\chi_{54}(35, \cdot)\)	$54$	$9$	$6$	odd
56.j	\(\chi_{56}(5, \cdot)\)$,$ \(\chi_{56}(45, \cdot)\)	$56$	$56$	$6$	odd		✓	✓
56.k	\(\chi_{56}(11, \cdot)\)$,$ \(\chi_{56}(51, \cdot)\)	$56$	$56$	$6$	odd		✓	✓
56.l	\(\chi_{56}(31, \cdot)\)$,$ \(\chi_{56}(47, \cdot)\)	$56$	$28$	$6$	even
56.m	\(\chi_{56}(3, \cdot)\)$,$ \(\chi_{56}(19, \cdot)\)	$56$	$56$	$6$	even		✓	✓
56.n	\(\chi_{56}(23, \cdot)\)$,$ \(\chi_{56}(39, \cdot)\)	$56$	$28$	$6$	odd
56.o	\(\chi_{56}(17, \cdot)\)$,$ \(\chi_{56}(33, \cdot)\)	$56$	$7$	$6$	odd			✓
56.p	\(\chi_{56}(37, \cdot)\)$,$ \(\chi_{56}(53, \cdot)\)	$56$	$56$	$6$	even		✓	✓
57.f	\(\chi_{57}(8, \cdot)\)$,$ \(\chi_{57}(50, \cdot)\)	$57$	$57$	$6$	even		✓	✓
57.g	\(\chi_{57}(31, \cdot)\)$,$ \(\chi_{57}(46, \cdot)\)	$57$	$19$	$6$	odd			✓
57.h	\(\chi_{57}(11, \cdot)\)$,$ \(\chi_{57}(26, \cdot)\)	$57$	$57$	$6$	odd		✓	✓
61.f	\(\chi_{61}(14, \cdot)\)$,$ \(\chi_{61}(48, \cdot)\)	$61$	$61$	$6$	even		✓	✓
62.e	\(\chi_{62}(37, \cdot)\)$,$ \(\chi_{62}(57, \cdot)\)	$62$	$31$	$6$	odd			✓

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