Hilbert modular form search results

Results (1-50 of 19466 matches)

 

Label	Base field	Field degree	Field discriminant	Level	Level norm	Weight	Dimension	CM	Base change
9.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[9, 3, 3]$	$9$	$[2, 2]$	$1$	✓	✓
13.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[13, 13, w + 4]$	$13$	$[2, 2]$	$2$
13.2-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[13,13,-w + 4]$	$13$	$[2, 2]$	$2$
16.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[16, 4, 4]$	$16$	$[2, 2]$	$1$	✓	✓
22.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[22, 22, w + 5]$	$22$	$[2, 2]$	$1$
22.1-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[22, 22, w + 5]$	$22$	$[2, 2]$	$1$
22.2-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[22,22,-w + 5]$	$22$	$[2, 2]$	$1$
22.2-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[22,22,-w + 5]$	$22$	$[2, 2]$	$1$
24.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[24, 12, 2w - 6]$	$24$	$[2, 2]$	$1$		✓
24.1-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[24, 12, 2w - 6]$	$24$	$[2, 2]$	$1$		✓
25.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[25, 5, 5]$	$25$	$[2, 2]$	$4$		✓
33.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[33, 33, w + 6]$	$33$	$[2, 2]$	$1$
33.1-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[33, 33, w + 6]$	$33$	$[2, 2]$	$1$
33.1-c	\(\Q(\sqrt{3}) \)	$2$	$12$	$[33, 33, w + 6]$	$33$	$[2, 2]$	$1$
33.1-d	\(\Q(\sqrt{3}) \)	$2$	$12$	$[33, 33, w + 6]$	$33$	$[2, 2]$	$1$
33.2-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[33,33,-w + 6]$	$33$	$[2, 2]$	$1$
33.2-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[33,33,-w + 6]$	$33$	$[2, 2]$	$1$
33.2-c	\(\Q(\sqrt{3}) \)	$2$	$12$	$[33,33,-w + 6]$	$33$	$[2, 2]$	$1$
33.2-d	\(\Q(\sqrt{3}) \)	$2$	$12$	$[33,33,-w + 6]$	$33$	$[2, 2]$	$1$
36.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[36, 6, 6]$	$36$	$[2, 2]$	$1$	✓	✓
37.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[37, 37, 2w - 7]$	$37$	$[2, 2]$	$4$
37.2-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[37,37,-2w - 7]$	$37$	$[2, 2]$	$4$
46.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[46, 46, w + 7]$	$46$	$[2, 2]$	$2$
46.1-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[46, 46, w + 7]$	$46$	$[2, 2]$	$2$
46.2-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[46,46,-w + 7]$	$46$	$[2, 2]$	$2$
46.2-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[46,46,-w + 7]$	$46$	$[2, 2]$	$2$
47.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[47, 47, -4w - 1]$	$47$	$[2, 2]$	$1$
47.1-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[47, 47, -4w - 1]$	$47$	$[2, 2]$	$1$
47.2-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[47,47,4w - 1]$	$47$	$[2, 2]$	$1$
47.2-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[47,47,4w - 1]$	$47$	$[2, 2]$	$1$
49.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[49, 7, -7]$	$49$	$[2, 2]$	$6$		✓
52.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[52, 26, 2w + 8]$	$52$	$[2, 2]$	$1$
52.1-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[52, 26, 2w + 8]$	$52$	$[2, 2]$	$1$
52.2-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[52,26,-2w + 8]$	$52$	$[2, 2]$	$1$
52.2-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[52,26,-2w + 8]$	$52$	$[2, 2]$	$1$
54.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[54, 18, 3w - 9]$	$54$	$[2, 2]$	$1$
54.1-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[54, 18, 3w - 9]$	$54$	$[2, 2]$	$1$
54.1-c	\(\Q(\sqrt{3}) \)	$2$	$12$	$[54, 18, 3w - 9]$	$54$	$[2, 2]$	$1$
54.1-d	\(\Q(\sqrt{3}) \)	$2$	$12$	$[54, 18, 3w - 9]$	$54$	$[2, 2]$	$1$
59.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[59, 59, 5w - 4]$	$59$	$[2, 2]$	$2$
59.1-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[59, 59, 5w - 4]$	$59$	$[2, 2]$	$2$
59.2-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[59,59,-5w - 4]$	$59$	$[2, 2]$	$2$
59.2-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[59,59,-5w - 4]$	$59$	$[2, 2]$	$2$
61.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[61, 61, -w - 8]$	$61$	$[2, 2]$	$6$
61.2-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[61,61,w - 8]$	$61$	$[2, 2]$	$6$
64.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[64, 8, 8]$	$64$	$[2, 2]$	$1$	✓	✓
64.1-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[64, 8, 8]$	$64$	$[2, 2]$	$2$		✓
69.1-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[69, 69, 2w - 9]$	$69$	$[2, 2]$	$3$
69.1-b	\(\Q(\sqrt{3}) \)	$2$	$12$	$[69, 69, 2w - 9]$	$69$	$[2, 2]$	$3$
69.2-a	\(\Q(\sqrt{3}) \)	$2$	$12$	$[69,69,-2w - 9]$	$69$	$[2, 2]$	$3$