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 (41 matches)

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Label	$A$	$\chi$	$\operatorname{ord}(\chi)$	Dim.	Decomp.	AL-dims.
2790.2.a	$22.278$	$ \chi_{2790}(1, \cdot) $	$1$	$50$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$4$+$4$	$2$+$4$+$3$+$1$+$3$+$5$+$3$+$5$+$3$+$1$+$2$+$4$+$4$+$4$+$5$+$1$
2880.2.a	$22.997$	$ \chi_{2880}(1, \cdot) $	$1$	$40$	$1$+$\cdots$+$1$+$2$+$2$+$2$	$4$+$4$+$7$+$5$+$4$+$4$+$5$+$7$
3146.2.a	$25.121$	$ \chi_{3146}(1, \cdot) $	$1$	$109$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$3$+$4$+$\cdots$+$4$+$6$+$\cdots$+$6$+$8$+$8$	$11$+$18$+$15$+$10$+$18$+$7$+$10$+$20$
3650.2.a	$29.145$	$ \chi_{3650}(1, \cdot) $	$1$	$114$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$3$+$4$+$4$+$5$+$\cdots$+$5$+$7$+$7$+$13$+$13$	$13$+$14$+$18$+$12$+$17$+$10$+$10$+$20$
3654.2.a	$29.177$	$ \chi_{3654}(1, \cdot) $	$1$	$70$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$5$+$\cdots$+$5$	$2$+$5$+$6$+$1$+$6$+$4$+$6$+$6$+$5$+$2$+$1$+$6$+$5$+$6$+$7$+$2$
3760.2.a	$30.024$	$ \chi_{3760}(1, \cdot) $	$1$	$92$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$4$+$4$+$5$+$6$+$7$+$8$+$8$	$10$+$13$+$13$+$10$+$9$+$14$+$9$+$14$
4002.2.a	$31.956$	$ \chi_{4002}(1, \cdot) $	$1$	$101$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$4$+$\cdots$+$4$+$5$+$6$+$7$+$7$+$8$+$8$+$8$	$6$+$5$+$8$+$7$+$4$+$8$+$6$+$6$+$8$+$5$+$4$+$9$+$5$+$9$+$9$+$2$
4278.2.a	$34.160$	$ \chi_{4278}(1, \cdot) $	$1$	$109$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$4$+$4$+$5$+$\cdots$+$5$+$7$+$8$+$10$+$10$	$9$+$5$+$6$+$8$+$9$+$5$+$4$+$10$+$4$+$7$+$7$+$8$+$5$+$10$+$10$+$2$
4592.2.a	$36.667$	$ \chi_{4592}(1, \cdot) $	$1$	$120$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$\cdots$+$4$+$5$+$\cdots$+$5$+$6$+$6$+$7$+$8$+$8$+$9$	$15$+$15$+$15$+$15$+$18$+$11$+$12$+$19$
4600.2.a	$36.731$	$ \chi_{4600}(1, \cdot) $	$1$	$104$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$4$+$5$+$\cdots$+$5$+$7$+$7$+$8$+$8$	$13$+$14$+$14$+$12$+$12$+$11$+$13$+$15$
5577.2.a	$44.533$	$ \chi_{5577}(1, \cdot) $	$1$	$260$	$1$+$\cdots$+$1$+$2$+$2$+$3$+$3$+$3$+$4$+$5$+$\cdots$+$5$+$7$+$7$+$12$+$\cdots$+$12$+$14$+$14$+$18$+$\cdots$+$18$	$29$+$35$+$36$+$29$+$33$+$33$+$26$+$39$
5840.2.a	$46.633$	$ \chi_{5840}(1, \cdot) $	$1$	$144$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$4$+$4$+$5$+$5$+$6$+$7$+$7$+$8$+$8$+$9$+$10$+$10$+$10$+$11$	$17$+$20$+$21$+$14$+$19$+$16$+$15$+$22$
5928.2.a	$47.335$	$ \chi_{5928}(1, \cdot) $	$1$	$108$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$4$+$4$+$6$+$6$+$7$+$7$+$7$+$8$+$8$	$6$+$7$+$9$+$4$+$9$+$5$+$6$+$8$+$8$+$6$+$8$+$6$+$7$+$6$+$7$+$6$
5978.2.a	$47.735$	$ \chi_{5978}(1, \cdot) $	$1$	$205$	$1$+$\cdots$+$1$+$2$+$2$+$2$+$3$+$5$+$5$+$6$+$\cdots$+$6$+$7$+$7$+$7$+$8$+$8$+$11$+$11$+$14$+$\cdots$+$14$	$25$+$27$+$27$+$24$+$28$+$20$+$21$+$33$
6072.2.a	$48.485$	$ \chi_{6072}(1, \cdot) $	$1$	$112$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$\cdots$+$4$+$5$+$5$+$5$+$6$+$7$+$8$+$8$+$9$	$7$+$7$+$8$+$6$+$7$+$6$+$5$+$8$+$9$+$6$+$7$+$8$+$6$+$8$+$7$+$7$
6105.2.a	$48.749$	$ \chi_{6105}(1, \cdot) $	$1$	$241$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$3$+$4$+$6$+$11$+$11$+$12$+$12$+$14$+$15$+$15$+$16$+$16$+$17$+$18$+$18$+$21$	$16$+$12$+$16$+$14$+$15$+$17$+$15$+$15$+$17$+$11$+$13$+$21$+$14$+$18$+$18$+$9$
6125.2.a	$48.908$	$ \chi_{6125}(1, \cdot) $	$1$	$328$	$2$+$\cdots$+$2$+$4$+$\cdots$+$4$+$6$+$\cdots$+$6$+$8$+$8$+$12$+$\cdots$+$12$+$14$+$\cdots$+$14$+$20$+$20$+$24$+$\cdots$+$24$	$76$+$90$+$84$+$78$
6417.2.a	$51.240$	$ \chi_{6417}(1, \cdot) $	$1$	$274$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$5$+$5$+$8$+$9$+$10$+$11$+$12$+$12$+$12$+$15$+$15$+$15$+$18$+$22$+$22$+$27$+$27$	$30$+$24$+$30$+$24$+$43$+$40$+$37$+$46$
882.4.g	$52.040$	$ \chi_{882}(361, \cdot) $	$3$	$100$	$2$+$\cdots$+$2$+$4$+$\cdots$+$4$
6675.2.a	$53.300$	$ \chi_{6675}(1, \cdot) $	$1$	$278$	$1$+$\cdots$+$1$+$2$+$3$+$\cdots$+$3$+$4$+$4$+$5$+$5$+$6$+$7$+$7$+$9$+$10$+$10$+$10$+$12$+$12$+$15$+$15$+$16$+$16$+$22$+$\cdots$+$22$	$31$+$37$+$38$+$34$+$35$+$29$+$35$+$39$
7007.2.a	$55.951$	$ \chi_{7007}(1, \cdot) $	$1$	$410$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$4$+$\cdots$+$4$+$5$+$5$+$5$+$6$+$7$+$8$+$11$+$11$+$11$+$13$+$13$+$15$+$15$+$17$+$17$+$24$+$24$+$25$+$\cdots$+$25$+$34$+$34$	$49$+$59$+$51$+$41$+$57$+$42$+$48$+$63$
7105.2.a	$56.734$	$ \chi_{7105}(1, \cdot) $	$1$	$384$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$6$+$7$+$7$+$8$+$11$+$14$+$\cdots$+$14$+$17$+$\cdots$+$17$+$19$+$19$+$21$+$21$+$26$+$26$+$28$+$28$	$45$+$49$+$52$+$46$+$49$+$45$+$46$+$52$
7200.2.f	$57.492$	$ \chi_{7200}(6049, \cdot) $	$2$	$90$	$2$+$\cdots$+$2$+$4$+$\cdots$+$4$
7450.2.a	$59.489$	$ \chi_{7450}(1, \cdot) $	$1$	$233$	$1$+$\cdots$+$1$+$2$+$3$+$3$+$4$+$4$+$5$+$5$+$6$+$7$+$8$+$8$+$8$+$10$+$10$+$10$+$13$+$13$+$14$+$\cdots$+$14$+$22$+$22$	$28$+$29$+$28$+$32$+$31$+$23$+$26$+$36$
7462.2.a	$59.584$	$ \chi_{7462}(1, \cdot) $	$1$	$241$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$4$+$5$+$6$+$8$+$8$+$9$+$9$+$9$+$10$+$11$+$12$+$15$+$15$+$16$+$16$+$16$+$17$+$19$	$17$+$13$+$15$+$15$+$14$+$16$+$14$+$16$+$15$+$15$+$13$+$17$+$11$+$19$+$21$+$10$
7502.2.a	$59.904$	$ \chi_{7502}(1, \cdot) $	$1$	$272$	$1$+$1$+$1$+$2$+$\cdots$+$2$+$3$+$4$+$4$+$6$+$\cdots$+$6$+$7$+$\cdots$+$7$+$8$+$8$+$12$+$\cdots$+$12$+$18$+$18$+$20$+$20$	$30$+$38$+$39$+$29$+$36$+$28$+$31$+$41$
7550.2.a	$60.287$	$ \chi_{7550}(1, \cdot) $	$1$	$238$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$3$+$4$+$\cdots$+$4$+$5$+$5$+$6$+$9$+$9$+$10$+$10$+$10$+$13$+$13$+$16$+$16$+$17$+$17$+$19$+$19$	$24$+$33$+$34$+$28$+$32$+$23$+$29$+$35$
7688.2.a	$61.389$	$ \chi_{7688}(1, \cdot) $	$1$	$232$	$1$+$\cdots$+$1$+$2$+$3$+$3$+$3$+$4$+$4$+$4$+$8$+$\cdots$+$8$+$12$+$16$+$\cdots$+$16$+$20$+$24$+$32$	$52$+$64$+$60$+$56$
7760.2.a	$61.964$	$ \chi_{7760}(1, \cdot) $	$1$	$192$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$3$+$4$+$4$+$5$+$\cdots$+$5$+$6$+$7$+$7$+$9$+$\cdots$+$9$+$11$+$12$+$12$+$12$+$13$+$13$	$23$+$26$+$27$+$20$+$25$+$22$+$21$+$28$
8892.2.a	$71.003$	$ \chi_{8892}(1, \cdot) $	$1$	$90$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$3$+$4$+$\cdots$+$4$+$5$+$6$+$6$+$6$+$8$	$0$+$0$+$0$+$0$+$0$+$0$+$0$+$0$+$8$+$10$+$8$+$10$+$14$+$13$+$14$+$13$
9050.2.a	$72.265$	$ \chi_{9050}(1, \cdot) $	$1$	$285$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$4$+$5$+$\cdots$+$5$+$8$+$9$+$9$+$10$+$10$+$10$+$12$+$18$+$18$+$19$+$19$+$20$+$20$+$24$+$24$	$29$+$40$+$39$+$35$+$41$+$25$+$31$+$45$
9424.2.a	$75.251$	$ \chi_{9424}(1, \cdot) $	$1$	$270$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$3$+$3$+$4$+$4$+$4$+$5$+$7$+$7$+$9$+$9$+$9$+$10$+$10$+$11$+$12$+$13$+$14$+$14$+$14$+$16$+$16$+$17$+$19$+$20$	$33$+$37$+$34$+$30$+$36$+$32$+$32$+$36$
9536.2.a	$76.145$	$ \chi_{9536}(1, \cdot) $	$1$	$296$	$1$+$\cdots$+$1$+$2$+$2$+$3$+$\cdots$+$3$+$5$+$5$+$6$+$7$+$7$+$8$+$8$+$9$+$9$+$10$+$\cdots$+$10$+$12$+$12$+$14$+$\cdots$+$14$+$16$+$22$+$22$+$24$	$67$+$81$+$81$+$67$
9825.2.a	$78.453$	$ \chi_{9825}(1, \cdot) $	$1$	$412$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$4$+$4$+$5$+$5$+$6$+$7$+$9$+$9$+$10$+$13$+$15$+$17$+$18$+$18$+$19$+$19$+$21$+$21$+$23$+$23$+$31$+$31$+$33$+$33$	$45$+$54$+$57$+$51$+$52$+$43$+$52$+$58$
9834.2.a	$78.525$	$ \chi_{9834}(1, \cdot) $	$1$	$245$	$1$+$\cdots$+$1$+$2$+$2$+$3$+$3$+$3$+$4$+$4$+$5$+$6$+$6$+$8$+$9$+$10$+$10$+$11$+$11$+$13$+$13$+$15$+$16$+$17$+$19$+$21$+$21$	$16$+$16$+$17$+$13$+$13$+$16$+$12$+$19$+$18$+$12$+$11$+$21$+$14$+$17$+$21$+$9$
1440.4.a	$84.963$	$ \chi_{1440}(1, \cdot) $	$1$	$60$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$	$7$+$5$+$9$+$10$+$5$+$7$+$9$+$8$
1638.4.a	$96.645$	$ \chi_{1638}(1, \cdot) $	$1$	$90$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$4$+$4$+$5$+$\cdots$+$5$	$4$+$5$+$5$+$4$+$6$+$7$+$7$+$6$+$4$+$5$+$5$+$4$+$8$+$6$+$6$+$8$
1734.4.a	$102.309$	$ \chi_{1734}(1, \cdot) $	$1$	$135$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$6$+$\cdots$+$6$+$8$+$\cdots$+$8$+$9$+$9$	$19$+$15$+$16$+$17$+$15$+$19$+$21$+$13$
1925.4.a	$113.579$	$ \chi_{1925}(1, \cdot) $	$1$	$284$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$4$+$4$+$5$+$5$+$6$+$7$+$7$+$8$+$8$+$9$+$10$+$10$+$13$+$13$+$16$+$16$+$17$+$17$+$20$+$20$+$24$+$24$	$36$+$32$+$30$+$38$+$37$+$37$+$41$+$33$
2142.4.a	$126.382$	$ \chi_{2142}(1, \cdot) $	$1$	$120$	$1$+$\cdots$+$1$+$2$+$\cdots$+$2$+$3$+$\cdots$+$3$+$4$+$\cdots$+$4$+$5$+$5$+$5$+$7$+$\cdots$+$7$	$7$+$5$+$5$+$7$+$9$+$10$+$9$+$8$+$5$+$7$+$7$+$5$+$9$+$8$+$9$+$10$
2499.4.a	$147.446$	$ \chi_{2499}(1, \cdot) $	$1$	$328$	$1$+$\cdots$+$1$+$2$+$3$+$3$+$4$+$6$+$6$+$6$+$7$+$7$+$7$+$8$+$8$+$14$+$14$+$15$+$\cdots$+$15$+$16$+$16$+$17$+$17$+$20$+$20$+$28$+$28$	$43$+$35$+$40$+$46$+$37$+$45$+$44$+$38$

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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 (41 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.
2790.2.a	$22.278$	\( \chi_{2790}(1, \cdot) \)	$1$	$50$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(4\)+\(4\)	$2$+$4$+$3$+$1$+$3$+$5$+$3$+$5$+$3$+$1$+$2$+$4$+$4$+$4$+$5$+$1$
2880.2.a	$22.997$	\( \chi_{2880}(1, \cdot) \)	$1$	$40$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(2\)	$4$+$4$+$7$+$5$+$4$+$4$+$5$+$7$
3146.2.a	$25.121$	\( \chi_{3146}(1, \cdot) \)	$1$	$109$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(6\)+\(\cdots\)+\(6\)+\(8\)+\(8\)	$11$+$18$+$15$+$10$+$18$+$7$+$10$+$20$
3650.2.a	$29.145$	\( \chi_{3650}(1, \cdot) \)	$1$	$114$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(3\)+\(4\)+\(4\)+\(5\)+\(\cdots\)+\(5\)+\(7\)+\(7\)+\(13\)+\(13\)	$13$+$14$+$18$+$12$+$17$+$10$+$10$+$20$
3654.2.a	$29.177$	\( \chi_{3654}(1, \cdot) \)	$1$	$70$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(5\)+\(\cdots\)+\(5\)	$2$+$5$+$6$+$1$+$6$+$4$+$6$+$6$+$5$+$2$+$1$+$6$+$5$+$6$+$7$+$2$
3760.2.a	$30.024$	\( \chi_{3760}(1, \cdot) \)	$1$	$92$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(4\)+\(4\)+\(5\)+\(6\)+\(7\)+\(8\)+\(8\)	$10$+$13$+$13$+$10$+$9$+$14$+$9$+$14$
4002.2.a	$31.956$	\( \chi_{4002}(1, \cdot) \)	$1$	$101$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(5\)+\(6\)+\(7\)+\(7\)+\(8\)+\(8\)+\(8\)	$6$+$5$+$8$+$7$+$4$+$8$+$6$+$6$+$8$+$5$+$4$+$9$+$5$+$9$+$9$+$2$
4278.2.a	$34.160$	\( \chi_{4278}(1, \cdot) \)	$1$	$109$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(4\)+\(4\)+\(5\)+\(\cdots\)+\(5\)+\(7\)+\(8\)+\(10\)+\(10\)	$9$+$5$+$6$+$8$+$9$+$5$+$4$+$10$+$4$+$7$+$7$+$8$+$5$+$10$+$10$+$2$
4592.2.a	$36.667$	\( \chi_{4592}(1, \cdot) \)	$1$	$120$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(5\)+\(\cdots\)+\(5\)+\(6\)+\(6\)+\(7\)+\(8\)+\(8\)+\(9\)	$15$+$15$+$15$+$15$+$18$+$11$+$12$+$19$
4600.2.a	$36.731$	\( \chi_{4600}(1, \cdot) \)	$1$	$104$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(4\)+\(5\)+\(\cdots\)+\(5\)+\(7\)+\(7\)+\(8\)+\(8\)	$13$+$14$+$14$+$12$+$12$+$11$+$13$+$15$
5577.2.a	$44.533$	\( \chi_{5577}(1, \cdot) \)	$1$	$260$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(3\)+\(3\)+\(3\)+\(4\)+\(5\)+\(\cdots\)+\(5\)+\(7\)+\(7\)+\(12\)+\(\cdots\)+\(12\)+\(14\)+\(14\)+\(18\)+\(\cdots\)+\(18\)	$29$+$35$+$36$+$29$+$33$+$33$+$26$+$39$
5840.2.a	$46.633$	\( \chi_{5840}(1, \cdot) \)	$1$	$144$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(4\)+\(4\)+\(5\)+\(5\)+\(6\)+\(7\)+\(7\)+\(8\)+\(8\)+\(9\)+\(10\)+\(10\)+\(10\)+\(11\)	$17$+$20$+$21$+$14$+$19$+$16$+$15$+$22$
5928.2.a	$47.335$	\( \chi_{5928}(1, \cdot) \)	$1$	$108$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(4\)+\(4\)+\(6\)+\(6\)+\(7\)+\(7\)+\(7\)+\(8\)+\(8\)	$6$+$7$+$9$+$4$+$9$+$5$+$6$+$8$+$8$+$6$+$8$+$6$+$7$+$6$+$7$+$6$
5978.2.a	$47.735$	\( \chi_{5978}(1, \cdot) \)	$1$	$205$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(2\)+\(3\)+\(5\)+\(5\)+\(6\)+\(\cdots\)+\(6\)+\(7\)+\(7\)+\(7\)+\(8\)+\(8\)+\(11\)+\(11\)+\(14\)+\(\cdots\)+\(14\)	$25$+$27$+$27$+$24$+$28$+$20$+$21$+$33$
6072.2.a	$48.485$	\( \chi_{6072}(1, \cdot) \)	$1$	$112$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(5\)+\(5\)+\(5\)+\(6\)+\(7\)+\(8\)+\(8\)+\(9\)	$7$+$7$+$8$+$6$+$7$+$6$+$5$+$8$+$9$+$6$+$7$+$8$+$6$+$8$+$7$+$7$
6105.2.a	$48.749$	\( \chi_{6105}(1, \cdot) \)	$1$	$241$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(3\)+\(4\)+\(6\)+\(11\)+\(11\)+\(12\)+\(12\)+\(14\)+\(15\)+\(15\)+\(16\)+\(16\)+\(17\)+\(18\)+\(18\)+\(21\)	$16$+$12$+$16$+$14$+$15$+$17$+$15$+$15$+$17$+$11$+$13$+$21$+$14$+$18$+$18$+$9$
6125.2.a	$48.908$	\( \chi_{6125}(1, \cdot) \)	$1$	$328$	\(2\)+\(\cdots\)+\(2\)+\(4\)+\(\cdots\)+\(4\)+\(6\)+\(\cdots\)+\(6\)+\(8\)+\(8\)+\(12\)+\(\cdots\)+\(12\)+\(14\)+\(\cdots\)+\(14\)+\(20\)+\(20\)+\(24\)+\(\cdots\)+\(24\)	$76$+$90$+$84$+$78$
6417.2.a	$51.240$	\( \chi_{6417}(1, \cdot) \)	$1$	$274$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(5\)+\(5\)+\(8\)+\(9\)+\(10\)+\(11\)+\(12\)+\(12\)+\(12\)+\(15\)+\(15\)+\(15\)+\(18\)+\(22\)+\(22\)+\(27\)+\(27\)	$30$+$24$+$30$+$24$+$43$+$40$+$37$+$46$
882.4.g	$52.040$	\( \chi_{882}(361, \cdot) \)	$3$	$100$	\(2\)+\(\cdots\)+\(2\)+\(4\)+\(\cdots\)+\(4\)
6675.2.a	$53.300$	\( \chi_{6675}(1, \cdot) \)	$1$	$278$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(4\)+\(5\)+\(5\)+\(6\)+\(7\)+\(7\)+\(9\)+\(10\)+\(10\)+\(10\)+\(12\)+\(12\)+\(15\)+\(15\)+\(16\)+\(16\)+\(22\)+\(\cdots\)+\(22\)	$31$+$37$+$38$+$34$+$35$+$29$+$35$+$39$
7007.2.a	$55.951$	\( \chi_{7007}(1, \cdot) \)	$1$	$410$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(5\)+\(5\)+\(5\)+\(6\)+\(7\)+\(8\)+\(11\)+\(11\)+\(11\)+\(13\)+\(13\)+\(15\)+\(15\)+\(17\)+\(17\)+\(24\)+\(24\)+\(25\)+\(\cdots\)+\(25\)+\(34\)+\(34\)	$49$+$59$+$51$+$41$+$57$+$42$+$48$+$63$
7105.2.a	$56.734$	\( \chi_{7105}(1, \cdot) \)	$1$	$384$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(6\)+\(7\)+\(7\)+\(8\)+\(11\)+\(14\)+\(\cdots\)+\(14\)+\(17\)+\(\cdots\)+\(17\)+\(19\)+\(19\)+\(21\)+\(21\)+\(26\)+\(26\)+\(28\)+\(28\)	$45$+$49$+$52$+$46$+$49$+$45$+$46$+$52$
7200.2.f	$57.492$	\( \chi_{7200}(6049, \cdot) \)	$2$	$90$	\(2\)+\(\cdots\)+\(2\)+\(4\)+\(\cdots\)+\(4\)
7450.2.a	$59.489$	\( \chi_{7450}(1, \cdot) \)	$1$	$233$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(3\)+\(3\)+\(4\)+\(4\)+\(5\)+\(5\)+\(6\)+\(7\)+\(8\)+\(8\)+\(8\)+\(10\)+\(10\)+\(10\)+\(13\)+\(13\)+\(14\)+\(\cdots\)+\(14\)+\(22\)+\(22\)	$28$+$29$+$28$+$32$+$31$+$23$+$26$+$36$
7462.2.a	$59.584$	\( \chi_{7462}(1, \cdot) \)	$1$	$241$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(4\)+\(5\)+\(6\)+\(8\)+\(8\)+\(9\)+\(9\)+\(9\)+\(10\)+\(11\)+\(12\)+\(15\)+\(15\)+\(16\)+\(16\)+\(16\)+\(17\)+\(19\)	$17$+$13$+$15$+$15$+$14$+$16$+$14$+$16$+$15$+$15$+$13$+$17$+$11$+$19$+$21$+$10$
7502.2.a	$59.904$	\( \chi_{7502}(1, \cdot) \)	$1$	$272$	\(1\)+\(1\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(4\)+\(4\)+\(6\)+\(\cdots\)+\(6\)+\(7\)+\(\cdots\)+\(7\)+\(8\)+\(8\)+\(12\)+\(\cdots\)+\(12\)+\(18\)+\(18\)+\(20\)+\(20\)	$30$+$38$+$39$+$29$+$36$+$28$+$31$+$41$
7550.2.a	$60.287$	\( \chi_{7550}(1, \cdot) \)	$1$	$238$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(5\)+\(5\)+\(6\)+\(9\)+\(9\)+\(10\)+\(10\)+\(10\)+\(13\)+\(13\)+\(16\)+\(16\)+\(17\)+\(17\)+\(19\)+\(19\)	$24$+$33$+$34$+$28$+$32$+$23$+$29$+$35$
7688.2.a	$61.389$	\( \chi_{7688}(1, \cdot) \)	$1$	$232$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(3\)+\(3\)+\(3\)+\(4\)+\(4\)+\(4\)+\(8\)+\(\cdots\)+\(8\)+\(12\)+\(16\)+\(\cdots\)+\(16\)+\(20\)+\(24\)+\(32\)	$52$+$64$+$60$+$56$
7760.2.a	$61.964$	\( \chi_{7760}(1, \cdot) \)	$1$	$192$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(3\)+\(4\)+\(4\)+\(5\)+\(\cdots\)+\(5\)+\(6\)+\(7\)+\(7\)+\(9\)+\(\cdots\)+\(9\)+\(11\)+\(12\)+\(12\)+\(12\)+\(13\)+\(13\)	$23$+$26$+$27$+$20$+$25$+$22$+$21$+$28$
8892.2.a	$71.003$	\( \chi_{8892}(1, \cdot) \)	$1$	$90$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(5\)+\(6\)+\(6\)+\(6\)+\(8\)	$0$+$0$+$0$+$0$+$0$+$0$+$0$+$0$+$8$+$10$+$8$+$10$+$14$+$13$+$14$+$13$
9050.2.a	$72.265$	\( \chi_{9050}(1, \cdot) \)	$1$	$285$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(4\)+\(5\)+\(\cdots\)+\(5\)+\(8\)+\(9\)+\(9\)+\(10\)+\(10\)+\(10\)+\(12\)+\(18\)+\(18\)+\(19\)+\(19\)+\(20\)+\(20\)+\(24\)+\(24\)	$29$+$40$+$39$+$35$+$41$+$25$+$31$+$45$
9424.2.a	$75.251$	\( \chi_{9424}(1, \cdot) \)	$1$	$270$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(3\)+\(3\)+\(4\)+\(4\)+\(4\)+\(5\)+\(7\)+\(7\)+\(9\)+\(9\)+\(9\)+\(10\)+\(10\)+\(11\)+\(12\)+\(13\)+\(14\)+\(14\)+\(14\)+\(16\)+\(16\)+\(17\)+\(19\)+\(20\)	$33$+$37$+$34$+$30$+$36$+$32$+$32$+$36$
9536.2.a	$76.145$	\( \chi_{9536}(1, \cdot) \)	$1$	$296$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(5\)+\(5\)+\(6\)+\(7\)+\(7\)+\(8\)+\(8\)+\(9\)+\(9\)+\(10\)+\(\cdots\)+\(10\)+\(12\)+\(12\)+\(14\)+\(\cdots\)+\(14\)+\(16\)+\(22\)+\(22\)+\(24\)	$67$+$81$+$81$+$67$
9825.2.a	$78.453$	\( \chi_{9825}(1, \cdot) \)	$1$	$412$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(4\)+\(4\)+\(5\)+\(5\)+\(6\)+\(7\)+\(9\)+\(9\)+\(10\)+\(13\)+\(15\)+\(17\)+\(18\)+\(18\)+\(19\)+\(19\)+\(21\)+\(21\)+\(23\)+\(23\)+\(31\)+\(31\)+\(33\)+\(33\)	$45$+$54$+$57$+$51$+$52$+$43$+$52$+$58$
9834.2.a	$78.525$	\( \chi_{9834}(1, \cdot) \)	$1$	$245$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(2\)+\(3\)+\(3\)+\(3\)+\(4\)+\(4\)+\(5\)+\(6\)+\(6\)+\(8\)+\(9\)+\(10\)+\(10\)+\(11\)+\(11\)+\(13\)+\(13\)+\(15\)+\(16\)+\(17\)+\(19\)+\(21\)+\(21\)	$16$+$16$+$17$+$13$+$13$+$16$+$12$+$19$+$18$+$12$+$11$+$21$+$14$+$17$+$21$+$9$
1440.4.a	$84.963$	\( \chi_{1440}(1, \cdot) \)	$1$	$60$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)	$7$+$5$+$9$+$10$+$5$+$7$+$9$+$8$
1638.4.a	$96.645$	\( \chi_{1638}(1, \cdot) \)	$1$	$90$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(4\)+\(4\)+\(5\)+\(\cdots\)+\(5\)	$4$+$5$+$5$+$4$+$6$+$7$+$7$+$6$+$4$+$5$+$5$+$4$+$8$+$6$+$6$+$8$
1734.4.a	$102.309$	\( \chi_{1734}(1, \cdot) \)	$1$	$135$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(6\)+\(\cdots\)+\(6\)+\(8\)+\(\cdots\)+\(8\)+\(9\)+\(9\)	$19$+$15$+$16$+$17$+$15$+$19$+$21$+$13$
1925.4.a	$113.579$	\( \chi_{1925}(1, \cdot) \)	$1$	$284$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(4\)+\(4\)+\(5\)+\(5\)+\(6\)+\(7\)+\(7\)+\(8\)+\(8\)+\(9\)+\(10\)+\(10\)+\(13\)+\(13\)+\(16\)+\(16\)+\(17\)+\(17\)+\(20\)+\(20\)+\(24\)+\(24\)	$36$+$32$+$30$+$38$+$37$+$37$+$41$+$33$
2142.4.a	$126.382$	\( \chi_{2142}(1, \cdot) \)	$1$	$120$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(\cdots\)+\(2\)+\(3\)+\(\cdots\)+\(3\)+\(4\)+\(\cdots\)+\(4\)+\(5\)+\(5\)+\(5\)+\(7\)+\(\cdots\)+\(7\)	$7$+$5$+$5$+$7$+$9$+$10$+$9$+$8$+$5$+$7$+$7$+$5$+$9$+$8$+$9$+$10$
2499.4.a	$147.446$	\( \chi_{2499}(1, \cdot) \)	$1$	$328$	\(1\)+\(\cdots\)+\(1\)+\(2\)+\(3\)+\(3\)+\(4\)+\(6\)+\(6\)+\(6\)+\(7\)+\(7\)+\(7\)+\(8\)+\(8\)+\(14\)+\(14\)+\(15\)+\(\cdots\)+\(15\)+\(16\)+\(16\)+\(17\)+\(17\)+\(20\)+\(20\)+\(28\)+\(28\)	$43$+$35$+$40$+$46$+$37$+$45$+$44$+$38$