LMFDB - Newspace search results

Note: Search results may be incomplete due to uncomputed quantities: num_forms (558562 objects)

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Level	Weight	Analytic conductor	$Nk^2$	Dim.

Bad $p$	Char.	Primitive character	Character order	Num. newforms

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Results (1-50 of 81 matches)

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Label	$A$	$\chi$	$\operatorname{ord}(\chi)$	Dim.	Decomp.	AL-dims.
1925.2.a	$15.371$	$ \chi_{1925}(1, \cdot) $	$1$	$96$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$3$+$4$+$6$+$6$+$7$+$\cdots$+$7$+$8$+$8$	$9$+$13$+$15$+$7$+$13$+$13$+$9$+$17$
2048.2.g	$16.353$	$ \chi_{2048}(257, \cdot) $	$8$	$256$	$4$+$\cdots$+$4$+$8$+$\cdots$+$8$+$16$+$\cdots$+$16$
2736.2.a	$21.847$	$ \chi_{2736}(1, \cdot) $	$1$	$45$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$3$+$4$	$2$+$8$+$8$+$5$+$4$+$4$+$7$+$7$
3248.2.a	$25.935$	$ \chi_{3248}(1, \cdot) $	$1$	$84$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$3$+$4$+$\cdots$+$4$+$5$+$6$+$6$+$7$+$7$	$9$+$12$+$15$+$6$+$9$+$12$+$9$+$12$
3480.2.a	$27.788$	$ \chi_{3480}(1, \cdot) $	$1$	$56$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$4$+$4$+$5$+$5$	$4$+$3$+$3$+$5$+$3$+$3$+$3$+$4$+$6$+$2$+$2$+$5$+$3$+$4$+$4$+$2$
3486.2.a	$27.836$	$ \chi_{3486}(1, \cdot) $	$1$	$81$	$1$+$\cdots$+$1$+$2$+$2$+$2$+$3$+$3$+$3$+$4$+$4$+$5$+$5$+$7$+$7$+$8$+$8$	$4$+$6$+$6$+$5$+$8$+$3$+$3$+$7$+$4$+$5$+$3$+$7$+$4$+$6$+$8$+$2$
3672.2.a	$29.321$	$ \chi_{3672}(1, \cdot) $	$1$	$64$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$4$+$4$+$5$+$\cdots$+$5$	$9$+$7$+$7$+$9$+$9$+$5$+$7$+$11$
3744.2.a	$29.896$	$ \chi_{3744}(1, \cdot) $	$1$	$60$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$4$+$\cdots$+$4$	$6$+$6$+$10$+$7$+$6$+$6$+$8$+$11$
3774.2.a	$30.136$	$ \chi_{3774}(1, \cdot) $	$1$	$97$	$1$+$\cdots$+$1$+$3$+$4$+$\cdots$+$4$+$5$+$7$+$\cdots$+$7$+$8$+$8$	$5$+$6$+$7$+$5$+$9$+$4$+$4$+$8$+$7$+$5$+$6$+$7$+$4$+$8$+$8$+$4$
3834.2.a	$30.615$	$ \chi_{3834}(1, \cdot) $	$1$	$92$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$5$+$5$+$7$+$7$+$8$+$8$+$9$+$9$	$10$+$14$+$13$+$9$+$15$+$7$+$8$+$16$
3952.2.a	$31.557$	$ \chi_{3952}(1, \cdot) $	$1$	$108$	$1$+$\cdots$+$1$+$2$+$2$+$3$+$\cdots$+$3$+$4$+$\cdots$+$4$+$5$+$5$+$5$+$7$+$7$+$10$+$10$	$15$+$12$+$15$+$12$+$15$+$12$+$12$+$15$
4074.2.a	$32.531$	$ \chi_{4074}(1, \cdot) $	$1$	$97$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$4$+$4$+$5$+$6$+$\cdots$+$6$+$7$+$10$	$6$+$6$+$7$+$5$+$6$+$6$+$5$+$7$+$6$+$5$+$3$+$10$+$6$+$7$+$9$+$3$
4214.2.a	$33.649$	$ \chi_{4214}(1, \cdot) $	$1$	$143$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$\cdots$+$4$+$6$+$7$+$\cdots$+$7$+$8$+$12$+$14$	$13$+$21$+$22$+$16$+$23$+$11$+$14$+$23$
4270.2.a	$34.096$	$ \chi_{4270}(1, \cdot) $	$1$	$121$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$5$+$5$+$6$+$6$+$7$+$8$+$8$+$9$+$9$+$10$+$10$	$6$+$9$+$9$+$7$+$9$+$7$+$7$+$8$+$6$+$8$+$5$+$10$+$8$+$7$+$10$+$5$
1296.3.o	$35.313$	$ \chi_{1296}(271, \cdot) $	$6$	$96$	$2$+$\cdots$+$2$+$4$+$\cdots$+$4$
4522.2.a	$36.108$	$ \chi_{4522}(1, \cdot) $	$1$	$145$	$1$+$\cdots$+$1$+$2$+$2$+$2$+$3$+$\cdots$+$3$+$4$+$5$+$6$+$\cdots$+$6$+$7$+$8$+$8$+$10$+$11$+$11$+$11$+$15$	$12$+$6$+$8$+$10$+$7$+$11$+$9$+$9$+$9$+$9$+$6$+$12$+$6$+$12$+$15$+$4$
4730.2.a	$37.769$	$ \chi_{4730}(1, \cdot) $	$1$	$141$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$4$+$5$+$8$+$8$+$8$+$10$+$10$+$11$+$11$+$11$+$12$+$13$	$8$+$11$+$11$+$5$+$8$+$8$+$8$+$11$+$10$+$6$+$6$+$13$+$6$+$13$+$13$+$4$
4806.2.a	$38.376$	$ \chi_{4806}(1, \cdot) $	$1$	$116$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$4$+$5$+$\cdots$+$5$+$8$+$8$+$10$+$10$	$13$+$17$+$16$+$12$+$17$+$11$+$12$+$18$
4880.2.a	$38.967$	$ \chi_{4880}(1, \cdot) $	$1$	$120$	$1$+$\cdots$+$1$+$2$+$2$+$2$+$3$+$\cdots$+$3$+$4$+$\cdots$+$4$+$5$+$6$+$6$+$7$+$\cdots$+$7$+$9$	$13$+$17$+$17$+$13$+$17$+$13$+$13$+$17$
5049.2.a	$40.316$	$ \chi_{5049}(1, \cdot) $	$1$	$212$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$4$+$4$+$7$+$\cdots$+$7$+$10$+$10$+$11$+$11$+$13$+$\cdots$+$13$+$15$+$\cdots$+$15$	$24$+$28$+$28$+$24$+$29$+$25$+$25$+$29$
5085.2.a	$40.604$	$ \chi_{5085}(1, \cdot) $	$1$	$188$	$1$+$\cdots$+$1$+$2$+$2$+$4$+$4$+$4$+$5$+$6$+$6$+$7$+$8$+$10$+$10$+$10$+$11$+$11$+$11$+$12$+$13$+$20$+$20$	$16$+$22$+$22$+$16$+$27$+$28$+$25$+$32$
5110.2.a	$40.804$	$ \chi_{5110}(1, \cdot) $	$1$	$145$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$4$+$\cdots$+$4$+$6$+$7$+$7$+$8$+$8$+$10$+$11$+$11$+$12$+$15$	$10$+$8$+$7$+$11$+$12$+$6$+$7$+$11$+$7$+$11$+$7$+$11$+$7$+$11$+$15$+$4$
5208.2.a	$41.586$	$ \chi_{5208}(1, \cdot) $	$1$	$92$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$\cdots$+$4$+$6$+$6$+$7$+$7$+$7$+$9$	$8$+$3$+$5$+$6$+$4$+$7$+$5$+$6$+$8$+$4$+$3$+$9$+$5$+$7$+$8$+$4$
5232.2.a	$41.778$	$ \chi_{5232}(1, \cdot) $	$1$	$108$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$5$+$\cdots$+$5$+$6$+$7$+$8$+$9$+$9$+$9$	$15$+$12$+$15$+$12$+$15$+$12$+$9$+$18$
5400.2.f	$43.119$	$ \chi_{5400}(649, \cdot) $	$2$	$72$	$2$+$\cdots$+$2$+$4$+$\cdots$+$4$
5454.2.a	$43.550$	$ \chi_{5454}(1, \cdot) $	$1$	$132$	$1$+$\cdots$+$1$+$4$+$4$+$5$+$5$+$7$+$\cdots$+$7$+$8$+$8$+$10$+$\cdots$+$10$	$15$+$18$+$18$+$15$+$18$+$15$+$15$+$18$
5625.2.a	$44.916$	$ \chi_{5625}(1, \cdot) $	$1$	$192$	$2$+$\cdots$+$2$+$4$+$\cdots$+$4$+$6$+$\cdots$+$6$+$8$+$\cdots$+$8$+$24$	$36$+$44$+$58$+$54$
5650.2.a	$45.115$	$ \chi_{5650}(1, \cdot) $	$1$	$176$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$4$+$4$+$5$+$6$+$6$+$6$+$7$+$7$+$8$+$9$+$11$+$\cdots$+$11$+$15$+$15$	$23$+$19$+$23$+$23$+$25$+$17$+$19$+$27$
5805.2.a	$46.353$	$ \chi_{5805}(1, \cdot) $	$1$	$224$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$9$+$9$+$11$+$11$+$12$+$12$+$13$+$\cdots$+$13$+$17$+$17$	$27$+$31$+$29$+$25$+$29$+$25$+$27$+$31$
5838.2.a	$46.617$	$ \chi_{5838}(1, \cdot) $	$1$	$137$	$1$+$\cdots$+$1$+$2$+$3$+$4$+$5$+$5$+$6$+$\cdots$+$6$+$7$+$7$+$7$+$8$+$9$+$10$+$10$+$11$+$11$	$7$+$11$+$11$+$6$+$9$+$8$+$8$+$10$+$7$+$9$+$6$+$11$+$8$+$9$+$12$+$5$
5888.2.a	$47.016$	$ \chi_{5888}(1, \cdot) $	$1$	$176$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$\cdots$+$4$+$6$+$\cdots$+$6$+$8$+$\cdots$+$8$+$12$+$\cdots$+$12$	$42$+$48$+$46$+$40$
5934.2.a	$47.383$	$ \chi_{5934}(1, \cdot) $	$1$	$153$	$1$+$\cdots$+$1$+$2$+$3$+$\cdots$+$3$+$4$+$\cdots$+$4$+$5$+$7$+$7$+$8$+$8$+$8$+$10$+$10$+$11$+$11$+$12$+$13$	$9$+$11$+$10$+$8$+$12$+$7$+$8$+$13$+$10$+$8$+$9$+$11$+$7$+$12$+$11$+$7$
6084.2.a	$48.581$	$ \chi_{6084}(1, \cdot) $	$1$	$64$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$6$+$6$	$0$+$0$+$0$+$0$+$15$+$10$+$18$+$21$
6200.2.a	$49.507$	$ \chi_{6200}(1, \cdot) $	$1$	$142$	$1$+$\cdots$+$1$+$2$+$2$+$2$+$3$+$3$+$4$+$5$+$5$+$6$+$\cdots$+$6$+$8$+$8$+$10$+$10$+$11$+$\cdots$+$11$	$15$+$21$+$20$+$16$+$19$+$13$+$17$+$21$
6290.2.a	$50.226$	$ \chi_{6290}(1, \cdot) $	$1$	$193$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$5$+$6$+$6$+$8$+$9$+$9$+$9$+$10$+$11$+$11$+$13$+$13$+$14$+$14$+$14$+$16$	$14$+$13$+$11$+$11$+$13$+$10$+$11$+$13$+$14$+$10$+$11$+$14$+$10$+$16$+$14$+$8$
6325.2.a	$50.505$	$ \chi_{6325}(1, \cdot) $	$1$	$348$	$1$+$\cdots$+$1$+$2$+$3$+$3$+$5$+$5$+$6$+$7$+$7$+$8$+$9$+$10$+$11$+$12$+$12$+$15$+$15$+$15$+$20$+$20$+$22$+$22$+$28$+$\cdots$+$28$	$44$+$38$+$47$+$35$+$44$+$48$+$42$+$50$
6350.2.a	$50.705$	$ \chi_{6350}(1, \cdot) $	$1$	$200$	$1$+$\cdots$+$1$+$2$+$2$+$2$+$3$+$\cdots$+$3$+$5$+$\cdots$+$5$+$7$+$8$+$9$+$9$+$11$+$\cdots$+$11$+$12$+$12$+$20$+$20$	$22$+$26$+$30$+$22$+$25$+$21$+$23$+$31$
6440.2.a	$51.424$	$ \chi_{6440}(1, \cdot) $	$1$	$132$	$1$+$\cdots$+$1$+$2$+$2$+$3$+$\cdots$+$3$+$4$+$4$+$5$+$6$+$6$+$6$+$7$+$\cdots$+$7$+$8$+$8$+$9$+$10$+$11$	$7$+$9$+$10$+$8$+$11$+$7$+$6$+$10$+$7$+$7$+$9$+$9$+$8$+$10$+$8$+$6$
6468.2.a	$51.647$	$ \chi_{6468}(1, \cdot) $	$1$	$70$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$4$+$4$+$5$+$5$+$6$+$\cdots$+$6$	$0$+$0$+$0$+$0$+$0$+$0$+$0$+$0$+$10$+$8$+$7$+$10$+$9$+$11$+$9$+$6$
6512.2.a	$51.999$	$ \chi_{6512}(1, \cdot) $	$1$	$180$	$1$+$\cdots$+$1$+$2$+$2$+$2$+$3$+$\cdots$+$3$+$4$+$\cdots$+$4$+$5$+$5$+$6$+$7$+$7$+$8$+$8$+$9$+$10$+$11$+$11$+$11$+$12$+$12$+$12$	$23$+$22$+$23$+$22$+$26$+$19$+$18$+$27$
6608.2.a	$52.765$	$ \chi_{6608}(1, \cdot) $	$1$	$174$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$4$+$4$+$5$+$\cdots$+$5$+$6$+$9$+$\cdots$+$9$+$10$+$\cdots$+$10$+$11$+$13$	$19$+$24$+$24$+$19$+$24$+$19$+$20$+$25$
6728.2.a	$53.723$	$ \chi_{6728}(1, \cdot) $	$1$	$203$	$1$+$\cdots$+$1$+$2$+$2$+$2$+$3$+$\cdots$+$3$+$4$+$4$+$6$+$\cdots$+$6$+$12$+$\cdots$+$12$+$16$+$16$+$24$+$24$	$45$+$56$+$53$+$49$
7020.2.a	$56.055$	$ \chi_{7020}(1, \cdot) $	$1$	$64$	$1$+$\cdots$+$1$+$2$+$2$+$4$+$\cdots$+$4$	$0$+$0$+$0$+$0$+$0$+$0$+$0$+$0$+$9$+$7$+$7$+$9$+$7$+$9$+$9$+$7$
7035.2.a	$56.175$	$ \chi_{7035}(1, \cdot) $	$1$	$265$	$1$+$\cdots$+$1$+$2$+$3$+$3$+$3$+$8$+$9$+$9$+$11$+$12$+$12$+$13$+$15$+$16$+$17$+$17$+$19$+$19$+$21$+$22$+$22$	$19$+$13$+$17$+$15$+$22$+$12$+$12$+$22$+$16$+$18$+$18$+$16$+$13$+$19$+$23$+$10$
7070.2.a	$56.454$	$ \chi_{7070}(1, \cdot) $	$1$	$201$	$1$+$\cdots$+$1$+$2$+$2$+$2$+$3$+$3$+$3$+$4$+$4$+$4$+$6$+$7$+$10$+$10$+$12$+$12$+$13$+$14$+$14$+$15$+$17$+$17$+$17$	$10$+$15$+$18$+$8$+$14$+$12$+$9$+$16$+$12$+$12$+$8$+$17$+$11$+$14$+$18$+$7$
7128.2.a	$56.917$	$ \chi_{7128}(1, \cdot) $	$1$	$120$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$4$+$\cdots$+$4$+$5$+$5$+$6$+$\cdots$+$6$+$8$+$\cdots$+$8$	$16$+$15$+$14$+$15$+$18$+$13$+$12$+$17$
7310.2.a	$58.371$	$ \chi_{7310}(1, \cdot) $	$1$	$225$	$1$+$\cdots$+$1$+$2$+$2$+$3$+$3$+$7$+$8$+$8$+$8$+$9$+$11$+$12$+$13$+$14$+$14$+$14$+$15$+$16$+$17$+$18$+$19$	$14$+$16$+$15$+$10$+$17$+$11$+$10$+$19$+$15$+$13$+$12$+$17$+$12$+$18$+$17$+$9$
7398.2.a	$59.073$	$ \chi_{7398}(1, \cdot) $	$1$	$180$	$1$+$\cdots$+$1$+$2$+$2$+$3$+$3$+$4$+$4$+$5$+$5$+$6$+$\cdots$+$6$+$7$+$7$+$8$+$\cdots$+$8$+$10$+$10$+$13$+$13$+$14$+$14$	$22$+$24$+$23$+$21$+$26$+$18$+$19$+$27$
7644.2.a	$61.038$	$ \chi_{7644}(1, \cdot) $	$1$	$82$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$5$+$5$+$6$+$\cdots$+$6$	$0$+$0$+$0$+$0$+$0$+$0$+$0$+$0$+$9$+$11$+$12$+$9$+$9$+$11$+$12$+$9$
7749.2.a	$61.876$	$ \chi_{7749}(1, \cdot) $	$1$	$320$	$1$+$\cdots$+$1$+$2$+$2$+$3$+$\cdots$+$3$+$13$+$13$+$14$+$14$+$16$+$16$+$18$+$18$+$20$+$\cdots$+$20$+$21$+$21$+$25$+$25$	$39$+$41$+$45$+$35$+$41$+$39$+$35$+$45$

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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 81 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.

Label	$A$	$\chi$	$\operatorname{ord}(\chi)$	Dim.	Decomp.	AL-dims.
1925.2.a	$15.371$	\( \chi_{1925}(1, \cdot) \)	$1$	$96$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(3\)+\(4\)+\(6\)+\(6\)+\(7\)+\(\cdots\)+\(7\)+\(8\)+\(8\)	$9$+$13$+$15$+$7$+$13$+$13$+$9$+$17$
2048.2.g	$16.353$	\( \chi_{2048}(257, \cdot) \)	$8$	$256$	\(4\)+\(\cdots\)+\(4\)+\(8\)+\(\cdots\)+\(8\)+\(16\)+\(\cdots\)+\(16\)
2736.2.a	$21.847$	\( \chi_{2736}(1, \cdot) \)	$1$	$45$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(3\)+\(4\)	$2$+$8$+$8$+$5$+$4$+$4$+$7$+$7$
3248.2.a	$25.935$	\( \chi_{3248}(1, \cdot) \)	$1$	$84$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(5\)+\(6\)+\(6\)+\(7\)+\(7\)	$9$+$12$+$15$+$6$+$9$+$12$+$9$+$12$
3480.2.a	$27.788$	\( \chi_{3480}(1, \cdot) \)	$1$	$56$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(4\)+\(4\)+\(5\)+\(5\)	$4$+$3$+$3$+$5$+$3$+$3$+$3$+$4$+$6$+$2$+$2$+$5$+$3$+$4$+$4$+$2$
3486.2.a	$27.836$	\( \chi_{3486}(1, \cdot) \)	$1$	$81$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(2\)+\(3\)+\(3\)+\(3\)+\(4\)+\(4\)+\(5\)+\(5\)+\(7\)+\(7\)+\(8\)+\(8\)	$4$+$6$+$6$+$5$+$8$+$3$+$3$+$7$+$4$+$5$+$3$+$7$+$4$+$6$+$8$+$2$
3672.2.a	$29.321$	\( \chi_{3672}(1, \cdot) \)	$1$	$64$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(4\)+\(4\)+\(5\)+\(\cdots\)+\(5\)	$9$+$7$+$7$+$9$+$9$+$5$+$7$+$11$
3744.2.a	$29.896$	\( \chi_{3744}(1, \cdot) \)	$1$	$60$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(4\)+\(\cdots\)+\(4\)	$6$+$6$+$10$+$7$+$6$+$6$+$8$+$11$
3774.2.a	$30.136$	\( \chi_{3774}(1, \cdot) \)	$1$	$97$	\(1\)+\(\cdots\)+\(1\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(5\)+\(7\)+\(\cdots\)+\(7\)+\(8\)+\(8\)	$5$+$6$+$7$+$5$+$9$+$4$+$4$+$8$+$7$+$5$+$6$+$7$+$4$+$8$+$8$+$4$
3834.2.a	$30.615$	\( \chi_{3834}(1, \cdot) \)	$1$	$92$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(5\)+\(5\)+\(7\)+\(7\)+\(8\)+\(8\)+\(9\)+\(9\)	$10$+$14$+$13$+$9$+$15$+$7$+$8$+$16$
3952.2.a	$31.557$	\( \chi_{3952}(1, \cdot) \)	$1$	$108$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(5\)+\(5\)+\(5\)+\(7\)+\(7\)+\(10\)+\(10\)	$15$+$12$+$15$+$12$+$15$+$12$+$12$+$15$
4074.2.a	$32.531$	\( \chi_{4074}(1, \cdot) \)	$1$	$97$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(4\)+\(4\)+\(5\)+\(6\)+\(\cdots\)+\(6\)+\(7\)+\(10\)	$6$+$6$+$7$+$5$+$6$+$6$+$5$+$7$+$6$+$5$+$3$+$10$+$6$+$7$+$9$+$3$
4214.2.a	$33.649$	\( \chi_{4214}(1, \cdot) \)	$1$	$143$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(6\)+\(7\)+\(\cdots\)+\(7\)+\(8\)+\(12\)+\(14\)	$13$+$21$+$22$+$16$+$23$+$11$+$14$+$23$
4270.2.a	$34.096$	\( \chi_{4270}(1, \cdot) \)	$1$	$121$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(5\)+\(5\)+\(6\)+\(6\)+\(7\)+\(8\)+\(8\)+\(9\)+\(9\)+\(10\)+\(10\)	$6$+$9$+$9$+$7$+$9$+$7$+$7$+$8$+$6$+$8$+$5$+$10$+$8$+$7$+$10$+$5$
1296.3.o	$35.313$	\( \chi_{1296}(271, \cdot) \)	$6$	$96$	\(2\)+\(\cdots\)+\(2\)+\(4\)+\(\cdots\)+\(4\)
4522.2.a	$36.108$	\( \chi_{4522}(1, \cdot) \)	$1$	$145$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(5\)+\(6\)+\(\cdots\)+\(6\)+\(7\)+\(8\)+\(8\)+\(10\)+\(11\)+\(11\)+\(11\)+\(15\)	$12$+$6$+$8$+$10$+$7$+$11$+$9$+$9$+$9$+$9$+$6$+$12$+$6$+$12$+$15$+$4$
4730.2.a	$37.769$	\( \chi_{4730}(1, \cdot) \)	$1$	$141$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(4\)+\(5\)+\(8\)+\(8\)+\(8\)+\(10\)+\(10\)+\(11\)+\(11\)+\(11\)+\(12\)+\(13\)	$8$+$11$+$11$+$5$+$8$+$8$+$8$+$11$+$10$+$6$+$6$+$13$+$6$+$13$+$13$+$4$
4806.2.a	$38.376$	\( \chi_{4806}(1, \cdot) \)	$1$	$116$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(4\)+\(5\)+\(\cdots\)+\(5\)+\(8\)+\(8\)+\(10\)+\(10\)	$13$+$17$+$16$+$12$+$17$+$11$+$12$+$18$
4880.2.a	$38.967$	\( \chi_{4880}(1, \cdot) \)	$1$	$120$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(5\)+\(6\)+\(6\)+\(7\)+\(\cdots\)+\(7\)+\(9\)	$13$+$17$+$17$+$13$+$17$+$13$+$13$+$17$
5049.2.a	$40.316$	\( \chi_{5049}(1, \cdot) \)	$1$	$212$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(4\)+\(4\)+\(7\)+\(\cdots\)+\(7\)+\(10\)+\(10\)+\(11\)+\(11\)+\(13\)+\(\cdots\)+\(13\)+\(15\)+\(\cdots\)+\(15\)	$24$+$28$+$28$+$24$+$29$+$25$+$25$+$29$
5085.2.a	$40.604$	\( \chi_{5085}(1, \cdot) \)	$1$	$188$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(4\)+\(4\)+\(4\)+\(5\)+\(6\)+\(6\)+\(7\)+\(8\)+\(10\)+\(10\)+\(10\)+\(11\)+\(11\)+\(11\)+\(12\)+\(13\)+\(20\)+\(20\)	$16$+$22$+$22$+$16$+$27$+$28$+$25$+$32$
5110.2.a	$40.804$	\( \chi_{5110}(1, \cdot) \)	$1$	$145$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(6\)+\(7\)+\(7\)+\(8\)+\(8\)+\(10\)+\(11\)+\(11\)+\(12\)+\(15\)	$10$+$8$+$7$+$11$+$12$+$6$+$7$+$11$+$7$+$11$+$7$+$11$+$7$+$11$+$15$+$4$
5208.2.a	$41.586$	\( \chi_{5208}(1, \cdot) \)	$1$	$92$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(6\)+\(6\)+\(7\)+\(7\)+\(7\)+\(9\)	$8$+$3$+$5$+$6$+$4$+$7$+$5$+$6$+$8$+$4$+$3$+$9$+$5$+$7$+$8$+$4$
5232.2.a	$41.778$	\( \chi_{5232}(1, \cdot) \)	$1$	$108$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(5\)+\(\cdots\)+\(5\)+\(6\)+\(7\)+\(8\)+\(9\)+\(9\)+\(9\)	$15$+$12$+$15$+$12$+$15$+$12$+$9$+$18$
5400.2.f	$43.119$	\( \chi_{5400}(649, \cdot) \)	$2$	$72$	\(2\)+\(\cdots\)+\(2\)+\(4\)+\(\cdots\)+\(4\)
5454.2.a	$43.550$	\( \chi_{5454}(1, \cdot) \)	$1$	$132$	\(1\)+\(\cdots\)+\(1\)+\(4\)+\(4\)+\(5\)+\(5\)+\(7\)+\(\cdots\)+\(7\)+\(8\)+\(8\)+\(10\)+\(\cdots\)+\(10\)	$15$+$18$+$18$+$15$+$18$+$15$+$15$+$18$
5625.2.a	$44.916$	\( \chi_{5625}(1, \cdot) \)	$1$	$192$	\(2\)+\(\cdots\)+\(2\)+\(4\)+\(\cdots\)+\(4\)+\(6\)+\(\cdots\)+\(6\)+\(8\)+\(\cdots\)+\(8\)+\(24\)	$36$+$44$+$58$+$54$
5650.2.a	$45.115$	\( \chi_{5650}(1, \cdot) \)	$1$	$176$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(4\)+\(4\)+\(5\)+\(6\)+\(6\)+\(6\)+\(7\)+\(7\)+\(8\)+\(9\)+\(11\)+\(\cdots\)+\(11\)+\(15\)+\(15\)	$23$+$19$+$23$+$23$+$25$+$17$+$19$+$27$
5805.2.a	$46.353$	\( \chi_{5805}(1, \cdot) \)	$1$	$224$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(9\)+\(9\)+\(11\)+\(11\)+\(12\)+\(12\)+\(13\)+\(\cdots\)+\(13\)+\(17\)+\(17\)	$27$+$31$+$29$+$25$+$29$+$25$+$27$+$31$
5838.2.a	$46.617$	\( \chi_{5838}(1, \cdot) \)	$1$	$137$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(3\)+\(4\)+\(5\)+\(5\)+\(6\)+\(\cdots\)+\(6\)+\(7\)+\(7\)+\(7\)+\(8\)+\(9\)+\(10\)+\(10\)+\(11\)+\(11\)	$7$+$11$+$11$+$6$+$9$+$8$+$8$+$10$+$7$+$9$+$6$+$11$+$8$+$9$+$12$+$5$
5888.2.a	$47.016$	\( \chi_{5888}(1, \cdot) \)	$1$	$176$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(6\)+\(\cdots\)+\(6\)+\(8\)+\(\cdots\)+\(8\)+\(12\)+\(\cdots\)+\(12\)	$42$+$48$+$46$+$40$
5934.2.a	$47.383$	\( \chi_{5934}(1, \cdot) \)	$1$	$153$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(5\)+\(7\)+\(7\)+\(8\)+\(8\)+\(8\)+\(10\)+\(10\)+\(11\)+\(11\)+\(12\)+\(13\)	$9$+$11$+$10$+$8$+$12$+$7$+$8$+$13$+$10$+$8$+$9$+$11$+$7$+$12$+$11$+$7$
6084.2.a	$48.581$	\( \chi_{6084}(1, \cdot) \)	$1$	$64$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(6\)+\(6\)	$0$+$0$+$0$+$0$+$15$+$10$+$18$+$21$
6200.2.a	$49.507$	\( \chi_{6200}(1, \cdot) \)	$1$	$142$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(2\)+\(3\)+\(3\)+\(4\)+\(5\)+\(5\)+\(6\)+\(\cdots\)+\(6\)+\(8\)+\(8\)+\(10\)+\(10\)+\(11\)+\(\cdots\)+\(11\)	$15$+$21$+$20$+$16$+$19$+$13$+$17$+$21$
6290.2.a	$50.226$	\( \chi_{6290}(1, \cdot) \)	$1$	$193$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(5\)+\(6\)+\(6\)+\(8\)+\(9\)+\(9\)+\(9\)+\(10\)+\(11\)+\(11\)+\(13\)+\(13\)+\(14\)+\(14\)+\(14\)+\(16\)	$14$+$13$+$11$+$11$+$13$+$10$+$11$+$13$+$14$+$10$+$11$+$14$+$10$+$16$+$14$+$8$
6325.2.a	$50.505$	\( \chi_{6325}(1, \cdot) \)	$1$	$348$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(3\)+\(3\)+\(5\)+\(5\)+\(6\)+\(7\)+\(7\)+\(8\)+\(9\)+\(10\)+\(11\)+\(12\)+\(12\)+\(15\)+\(15\)+\(15\)+\(20\)+\(20\)+\(22\)+\(22\)+\(28\)+\(\cdots\)+\(28\)	$44$+$38$+$47$+$35$+$44$+$48$+$42$+$50$
6350.2.a	$50.705$	\( \chi_{6350}(1, \cdot) \)	$1$	$200$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(5\)+\(\cdots\)+\(5\)+\(7\)+\(8\)+\(9\)+\(9\)+\(11\)+\(\cdots\)+\(11\)+\(12\)+\(12\)+\(20\)+\(20\)	$22$+$26$+$30$+$22$+$25$+$21$+$23$+$31$
6440.2.a	$51.424$	\( \chi_{6440}(1, \cdot) \)	$1$	$132$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(4\)+\(5\)+\(6\)+\(6\)+\(6\)+\(7\)+\(\cdots\)+\(7\)+\(8\)+\(8\)+\(9\)+\(10\)+\(11\)	$7$+$9$+$10$+$8$+$11$+$7$+$6$+$10$+$7$+$7$+$9$+$9$+$8$+$10$+$8$+$6$
6468.2.a	$51.647$	\( \chi_{6468}(1, \cdot) \)	$1$	$70$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(4\)+\(4\)+\(5\)+\(5\)+\(6\)+\(\cdots\)+\(6\)	$0$+$0$+$0$+$0$+$0$+$0$+$0$+$0$+$10$+$8$+$7$+$10$+$9$+$11$+$9$+$6$
6512.2.a	$51.999$	\( \chi_{6512}(1, \cdot) \)	$1$	$180$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(5\)+\(5\)+\(6\)+\(7\)+\(7\)+\(8\)+\(8\)+\(9\)+\(10\)+\(11\)+\(11\)+\(11\)+\(12\)+\(12\)+\(12\)	$23$+$22$+$23$+$22$+$26$+$19$+$18$+$27$
6608.2.a	$52.765$	\( \chi_{6608}(1, \cdot) \)	$1$	$174$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(4\)+\(4\)+\(5\)+\(\cdots\)+\(5\)+\(6\)+\(9\)+\(\cdots\)+\(9\)+\(10\)+\(\cdots\)+\(10\)+\(11\)+\(13\)	$19$+$24$+$24$+$19$+$24$+$19$+$20$+$25$
6728.2.a	$53.723$	\( \chi_{6728}(1, \cdot) \)	$1$	$203$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(4\)+\(6\)+\(\cdots\)+\(6\)+\(12\)+\(\cdots\)+\(12\)+\(16\)+\(16\)+\(24\)+\(24\)	$45$+$56$+$53$+$49$
7020.2.a	$56.055$	\( \chi_{7020}(1, \cdot) \)	$1$	$64$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(4\)+\(\cdots\)+\(4\)	$0$+$0$+$0$+$0$+$0$+$0$+$0$+$0$+$9$+$7$+$7$+$9$+$7$+$9$+$9$+$7$
7035.2.a	$56.175$	\( \chi_{7035}(1, \cdot) \)	$1$	$265$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(3\)+\(3\)+\(3\)+\(8\)+\(9\)+\(9\)+\(11\)+\(12\)+\(12\)+\(13\)+\(15\)+\(16\)+\(17\)+\(17\)+\(19\)+\(19\)+\(21\)+\(22\)+\(22\)	$19$+$13$+$17$+$15$+$22$+$12$+$12$+$22$+$16$+$18$+$18$+$16$+$13$+$19$+$23$+$10$
7070.2.a	$56.454$	\( \chi_{7070}(1, \cdot) \)	$1$	$201$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(2\)+\(3\)+\(3\)+\(3\)+\(4\)+\(4\)+\(4\)+\(6\)+\(7\)+\(10\)+\(10\)+\(12\)+\(12\)+\(13\)+\(14\)+\(14\)+\(15\)+\(17\)+\(17\)+\(17\)	$10$+$15$+$18$+$8$+$14$+$12$+$9$+$16$+$12$+$12$+$8$+$17$+$11$+$14$+$18$+$7$
7128.2.a	$56.917$	\( \chi_{7128}(1, \cdot) \)	$1$	$120$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(5\)+\(5\)+\(6\)+\(\cdots\)+\(6\)+\(8\)+\(\cdots\)+\(8\)	$16$+$15$+$14$+$15$+$18$+$13$+$12$+$17$
7310.2.a	$58.371$	\( \chi_{7310}(1, \cdot) \)	$1$	$225$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(3\)+\(3\)+\(7\)+\(8\)+\(8\)+\(8\)+\(9\)+\(11\)+\(12\)+\(13\)+\(14\)+\(14\)+\(14\)+\(15\)+\(16\)+\(17\)+\(18\)+\(19\)	$14$+$16$+$15$+$10$+$17$+$11$+$10$+$19$+$15$+$13$+$12$+$17$+$12$+$18$+$17$+$9$
7398.2.a	$59.073$	\( \chi_{7398}(1, \cdot) \)	$1$	$180$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(3\)+\(3\)+\(4\)+\(4\)+\(5\)+\(5\)+\(6\)+\(\cdots\)+\(6\)+\(7\)+\(7\)+\(8\)+\(\cdots\)+\(8\)+\(10\)+\(10\)+\(13\)+\(13\)+\(14\)+\(14\)	$22$+$24$+$23$+$21$+$26$+$18$+$19$+$27$
7644.2.a	$61.038$	\( \chi_{7644}(1, \cdot) \)	$1$	$82$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(5\)+\(5\)+\(6\)+\(\cdots\)+\(6\)	$0$+$0$+$0$+$0$+$0$+$0$+$0$+$0$+$9$+$11$+$12$+$9$+$9$+$11$+$12$+$9$
7749.2.a	$61.876$	\( \chi_{7749}(1, \cdot) \)	$1$	$320$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(13\)+\(13\)+\(14\)+\(14\)+\(16\)+\(16\)+\(18\)+\(18\)+\(20\)+\(\cdots\)+\(20\)+\(21\)+\(21\)+\(25\)+\(25\)	$39$+$41$+$45$+$35$+$41$+$39$+$35$+$45$