LMFDB - Dirichlet character search results

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Results (1-50 of 240 matches)

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Orbit label	Conrey labels	Modulus	Conductor	Order	Parity	Real	Minimal
6930.a	$\chi_{6930}(1, \cdot)$	$6930$	$1$	$1$	even	✓	✓
6930.b	$\chi_{6930}(1891, \cdot)$	$6930$	$11$	$2$	odd	✓	✓
6930.c	$\chi_{6930}(3961, \cdot)$	$6930$	$7$	$2$	odd	✓	✓
6930.d	$\chi_{6930}(3079, \cdot)$	$6930$	$385$	$2$	even	✓	✓
6930.e	$\chi_{6930}(4159, \cdot)$	$6930$	$5$	$2$	even	✓	✓
6930.f	$\chi_{6930}(881, \cdot)$	$6930$	$21$	$2$	even	✓	✓
6930.g	$\chi_{6930}(5741, \cdot)$	$6930$	$33$	$2$	even	✓	✓
6930.h	$\chi_{6930}(1079, \cdot)$	$6930$	$15$	$2$	odd	✓	✓
6930.i	$\chi_{6930}(6929, \cdot)$	$6930$	$1155$	$2$	odd	✓	✓
6930.j	$\chi_{6930}(5039, \cdot)$	$6930$	$105$	$2$	even	✓	✓
6930.k	$\chi_{6930}(2969, \cdot)$	$6930$	$165$	$2$	even	✓	✓
6930.l	$\chi_{6930}(3851, \cdot)$	$6930$	$3$	$2$	odd	✓	✓
6930.m	$\chi_{6930}(2771, \cdot)$	$6930$	$231$	$2$	odd	✓	✓
6930.n	$\chi_{6930}(6049, \cdot)$	$6930$	$55$	$2$	odd	✓	✓
6930.o	$\chi_{6930}(1189, \cdot)$	$6930$	$35$	$2$	odd	✓	✓
6930.p	$\chi_{6930}(5851, \cdot)$	$6930$	$77$	$2$	even	✓	✓
6930.q	$\chi_{6930}(2641, \cdot)$$,$ $\chi_{6930}(3301, \cdot)$	$6930$	$63$	$3$	even		✓
6930.r	$\chi_{6930}(331, \cdot)$$,$ $\chi_{6930}(5611, \cdot)$	$6930$	$63$	$3$	even		✓
6930.s	$\chi_{6930}(2311, \cdot)$$,$ $\chi_{6930}(4621, \cdot)$	$6930$	$9$	$3$	even		✓
6930.t	$\chi_{6930}(991, \cdot)$$,$ $\chi_{6930}(4951, \cdot)$	$6930$	$7$	$3$	even		✓
6930.u	$\chi_{6930}(4157, \cdot)$$,$ $\chi_{6930}(5543, \cdot)$	$6930$	$1155$	$4$	even		✓
6930.v	$\chi_{6930}(1387, \cdot)$$,$ $\chi_{6930}(2773, \cdot)$	$6930$	$5$	$4$	odd		✓
6930.w	$\chi_{6930}(307, \cdot)$$,$ $\chi_{6930}(1693, \cdot)$	$6930$	$385$	$4$	odd		✓
6930.x	$\chi_{6930}(5237, \cdot)$$,$ $\chi_{6930}(6623, \cdot)$	$6930$	$15$	$4$	even		✓
6930.y	$\chi_{6930}(5347, \cdot)$$,$ $\chi_{6930}(6733, \cdot)$	$6930$	$35$	$4$	even		✓
6930.z	$\chi_{6930}(197, \cdot)$$,$ $\chi_{6930}(1583, \cdot)$	$6930$	$165$	$4$	odd		✓
6930.ba	$\chi_{6930}(2267, \cdot)$$,$ $\chi_{6930}(3653, \cdot)$	$6930$	$105$	$4$	odd		✓
6930.bb	$\chi_{6930}(3277, \cdot)$$,$ $\chi_{6930}(4663, \cdot)$	$6930$	$55$	$4$	even		✓
6930.bc	$\chi_{6930}(631, \cdot)$$, \cdots ,$$\chi_{6930}(6301, \cdot)$	$6930$	$11$	$5$	even		✓
6930.bd	$\chi_{6930}(2069, \cdot)$$,$ $\chi_{6930}(6029, \cdot)$	$6930$	$105$	$6$	odd		✓
6930.be	$\chi_{6930}(1979, \cdot)$$,$ $\chi_{6930}(5939, \cdot)$	$6930$	$1155$	$6$	odd		✓
6930.bf	$\chi_{6930}(2861, \cdot)$$,$ $\chi_{6930}(6821, \cdot)$	$6930$	$21$	$6$	even		✓
6930.bg	$\chi_{6930}(3761, \cdot)$$,$ $\chi_{6930}(6731, \cdot)$	$6930$	$231$	$6$	even		✓
6930.bh	$\chi_{6930}(2089, \cdot)$$,$ $\chi_{6930}(5059, \cdot)$	$6930$	$385$	$6$	even		✓
6930.bi	$\chi_{6930}(2179, \cdot)$$,$ $\chi_{6930}(5149, \cdot)$	$6930$	$35$	$6$	even		✓
6930.bj	$\chi_{6930}(2881, \cdot)$$,$ $\chi_{6930}(6841, \cdot)$	$6930$	$77$	$6$	odd		✓
6930.bk	$\chi_{6930}(2971, \cdot)$$,$ $\chi_{6930}(5941, \cdot)$	$6930$	$7$	$6$	odd		✓
6930.bl	$\chi_{6930}(659, \cdot)$$,$ $\chi_{6930}(5279, \cdot)$	$6930$	$495$	$6$	even		✓
6930.bm	$\chi_{6930}(419, \cdot)$$,$ $\chi_{6930}(2729, \cdot)$	$6930$	$315$	$6$	even		✓
6930.bn	$\chi_{6930}(461, \cdot)$$,$ $\chi_{6930}(5081, \cdot)$	$6930$	$693$	$6$	odd		✓
6930.bo	$\chi_{6930}(1541, \cdot)$$,$ $\chi_{6930}(6161, \cdot)$	$6930$	$9$	$6$	odd		✓
6930.bp	$\chi_{6930}(241, \cdot)$$,$ $\chi_{6930}(5521, \cdot)$	$6930$	$693$	$6$	even		✓
6930.bq	$\chi_{6930}(2551, \cdot)$$,$ $\chi_{6930}(3211, \cdot)$	$6930$	$693$	$6$	even		✓
6930.br	$\chi_{6930}(4819, \cdot)$$,$ $\chi_{6930}(5479, \cdot)$	$6930$	$315$	$6$	odd		✓
6930.bs	$\chi_{6930}(4729, \cdot)$$,$ $\chi_{6930}(6379, \cdot)$	$6930$	$3465$	$6$	odd		✓
6930.bt	$\chi_{6930}(859, \cdot)$$,$ $\chi_{6930}(2509, \cdot)$	$6930$	$315$	$6$	odd		✓
6930.bu	$\chi_{6930}(1759, \cdot)$$,$ $\chi_{6930}(2419, \cdot)$	$6930$	$3465$	$6$	odd		✓
6930.bv	$\chi_{6930}(2441, \cdot)$$,$ $\chi_{6930}(4091, \cdot)$	$6930$	$693$	$6$	odd		✓
6930.bw	$\chi_{6930}(221, \cdot)$$,$ $\chi_{6930}(6491, \cdot)$	$6930$	$63$	$6$	odd		✓
6930.bx	$\chi_{6930}(131, \cdot)$$,$ $\chi_{6930}(6401, \cdot)$	$6930$	$693$	$6$	odd		✓

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Classical	Maass
Hilbert	Bianchi

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

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Results (1-50 of 240 matches)

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

Orbit label	Conrey labels	Modulus	Conductor	Order	Parity	Real	Minimal
6930.a	\(\chi_{6930}(1, \cdot)\)	$6930$	$1$	$1$	even	✓	✓
6930.b	\(\chi_{6930}(1891, \cdot)\)	$6930$	$11$	$2$	odd	✓	✓
6930.c	\(\chi_{6930}(3961, \cdot)\)	$6930$	$7$	$2$	odd	✓	✓
6930.d	\(\chi_{6930}(3079, \cdot)\)	$6930$	$385$	$2$	even	✓	✓
6930.e	\(\chi_{6930}(4159, \cdot)\)	$6930$	$5$	$2$	even	✓	✓
6930.f	\(\chi_{6930}(881, \cdot)\)	$6930$	$21$	$2$	even	✓	✓
6930.g	\(\chi_{6930}(5741, \cdot)\)	$6930$	$33$	$2$	even	✓	✓
6930.h	\(\chi_{6930}(1079, \cdot)\)	$6930$	$15$	$2$	odd	✓	✓
6930.i	\(\chi_{6930}(6929, \cdot)\)	$6930$	$1155$	$2$	odd	✓	✓
6930.j	\(\chi_{6930}(5039, \cdot)\)	$6930$	$105$	$2$	even	✓	✓
6930.k	\(\chi_{6930}(2969, \cdot)\)	$6930$	$165$	$2$	even	✓	✓
6930.l	\(\chi_{6930}(3851, \cdot)\)	$6930$	$3$	$2$	odd	✓	✓
6930.m	\(\chi_{6930}(2771, \cdot)\)	$6930$	$231$	$2$	odd	✓	✓
6930.n	\(\chi_{6930}(6049, \cdot)\)	$6930$	$55$	$2$	odd	✓	✓
6930.o	\(\chi_{6930}(1189, \cdot)\)	$6930$	$35$	$2$	odd	✓	✓
6930.p	\(\chi_{6930}(5851, \cdot)\)	$6930$	$77$	$2$	even	✓	✓
6930.q	\(\chi_{6930}(2641, \cdot)\)$,$ \(\chi_{6930}(3301, \cdot)\)	$6930$	$63$	$3$	even		✓
6930.r	\(\chi_{6930}(331, \cdot)\)$,$ \(\chi_{6930}(5611, \cdot)\)	$6930$	$63$	$3$	even		✓
6930.s	\(\chi_{6930}(2311, \cdot)\)$,$ \(\chi_{6930}(4621, \cdot)\)	$6930$	$9$	$3$	even		✓
6930.t	\(\chi_{6930}(991, \cdot)\)$,$ \(\chi_{6930}(4951, \cdot)\)	$6930$	$7$	$3$	even		✓
6930.u	\(\chi_{6930}(4157, \cdot)\)$,$ \(\chi_{6930}(5543, \cdot)\)	$6930$	$1155$	$4$	even		✓
6930.v	\(\chi_{6930}(1387, \cdot)\)$,$ \(\chi_{6930}(2773, \cdot)\)	$6930$	$5$	$4$	odd		✓
6930.w	\(\chi_{6930}(307, \cdot)\)$,$ \(\chi_{6930}(1693, \cdot)\)	$6930$	$385$	$4$	odd		✓
6930.x	\(\chi_{6930}(5237, \cdot)\)$,$ \(\chi_{6930}(6623, \cdot)\)	$6930$	$15$	$4$	even		✓
6930.y	\(\chi_{6930}(5347, \cdot)\)$,$ \(\chi_{6930}(6733, \cdot)\)	$6930$	$35$	$4$	even		✓
6930.z	\(\chi_{6930}(197, \cdot)\)$,$ \(\chi_{6930}(1583, \cdot)\)	$6930$	$165$	$4$	odd		✓
6930.ba	\(\chi_{6930}(2267, \cdot)\)$,$ \(\chi_{6930}(3653, \cdot)\)	$6930$	$105$	$4$	odd		✓
6930.bb	\(\chi_{6930}(3277, \cdot)\)$,$ \(\chi_{6930}(4663, \cdot)\)	$6930$	$55$	$4$	even		✓
6930.bc	\(\chi_{6930}(631, \cdot)\)$, \cdots ,$\(\chi_{6930}(6301, \cdot)\)	$6930$	$11$	$5$	even		✓
6930.bd	\(\chi_{6930}(2069, \cdot)\)$,$ \(\chi_{6930}(6029, \cdot)\)	$6930$	$105$	$6$	odd		✓
6930.be	\(\chi_{6930}(1979, \cdot)\)$,$ \(\chi_{6930}(5939, \cdot)\)	$6930$	$1155$	$6$	odd		✓
6930.bf	\(\chi_{6930}(2861, \cdot)\)$,$ \(\chi_{6930}(6821, \cdot)\)	$6930$	$21$	$6$	even		✓
6930.bg	\(\chi_{6930}(3761, \cdot)\)$,$ \(\chi_{6930}(6731, \cdot)\)	$6930$	$231$	$6$	even		✓
6930.bh	\(\chi_{6930}(2089, \cdot)\)$,$ \(\chi_{6930}(5059, \cdot)\)	$6930$	$385$	$6$	even		✓
6930.bi	\(\chi_{6930}(2179, \cdot)\)$,$ \(\chi_{6930}(5149, \cdot)\)	$6930$	$35$	$6$	even		✓
6930.bj	\(\chi_{6930}(2881, \cdot)\)$,$ \(\chi_{6930}(6841, \cdot)\)	$6930$	$77$	$6$	odd		✓
6930.bk	\(\chi_{6930}(2971, \cdot)\)$,$ \(\chi_{6930}(5941, \cdot)\)	$6930$	$7$	$6$	odd		✓
6930.bl	\(\chi_{6930}(659, \cdot)\)$,$ \(\chi_{6930}(5279, \cdot)\)	$6930$	$495$	$6$	even		✓
6930.bm	\(\chi_{6930}(419, \cdot)\)$,$ \(\chi_{6930}(2729, \cdot)\)	$6930$	$315$	$6$	even		✓
6930.bn	\(\chi_{6930}(461, \cdot)\)$,$ \(\chi_{6930}(5081, \cdot)\)	$6930$	$693$	$6$	odd		✓
6930.bo	\(\chi_{6930}(1541, \cdot)\)$,$ \(\chi_{6930}(6161, \cdot)\)	$6930$	$9$	$6$	odd		✓
6930.bp	\(\chi_{6930}(241, \cdot)\)$,$ \(\chi_{6930}(5521, \cdot)\)	$6930$	$693$	$6$	even		✓
6930.bq	\(\chi_{6930}(2551, \cdot)\)$,$ \(\chi_{6930}(3211, \cdot)\)	$6930$	$693$	$6$	even		✓
6930.br	\(\chi_{6930}(4819, \cdot)\)$,$ \(\chi_{6930}(5479, \cdot)\)	$6930$	$315$	$6$	odd		✓
6930.bs	\(\chi_{6930}(4729, \cdot)\)$,$ \(\chi_{6930}(6379, \cdot)\)	$6930$	$3465$	$6$	odd		✓
6930.bt	\(\chi_{6930}(859, \cdot)\)$,$ \(\chi_{6930}(2509, \cdot)\)	$6930$	$315$	$6$	odd		✓
6930.bu	\(\chi_{6930}(1759, \cdot)\)$,$ \(\chi_{6930}(2419, \cdot)\)	$6930$	$3465$	$6$	odd		✓
6930.bv	\(\chi_{6930}(2441, \cdot)\)$,$ \(\chi_{6930}(4091, \cdot)\)	$6930$	$693$	$6$	odd		✓
6930.bw	\(\chi_{6930}(221, \cdot)\)$,$ \(\chi_{6930}(6491, \cdot)\)	$6930$	$63$	$6$	odd		✓
6930.bx	\(\chi_{6930}(131, \cdot)\)$,$ \(\chi_{6930}(6401, \cdot)\)	$6930$	$693$	$6$	odd		✓