Space of modular forms of level 3 and weight 18

• Label: 3.18
• Level: 3
• Weight: 18
• Dimension: 3
• Nonzero newspaces: 1
• Newform subspaces: 2
• Sturm bound: 12
• Trace bound: 0

Defining parameters

Level:	\( N \)	=	\( 3 \)
Weight:	\( k \)	=	\( 18 \)
Nonzero newspaces:			\( 1 \)
Newform subspaces:			\( 2 \)
Sturm bound:			\(12\)
Trace bound:			\(0\)

Dimensions

The following table gives the dimensions of various subspaces of \(M_{18}(\Gamma_1(3))\).

	Total	New	Old
Modular forms	7	3	4
Cusp forms	5	3	2
Eisenstein series	2	0	2

Trace form

3 * q + 798 * q^2 + 6561 * q^3 + 87060 * q^4 + 219306 * q^5 + 2558790 * q^6 + 3625008 * q^7 + 85352520 * q^8 + 129140163 * q^9 - 842747436 * q^10 - 170181156 * q^11 + 1745042292 * q^12 - 2219808486 * q^13 - 4688263536 * q^14 + 3585022254 * q^15 + 53159007504 * q^16 - 79088732442 * q^17 + 34351283358 * q^18 + 158802194148 * q^19 - 499895208456 * q^20 + 297332237808 * q^21 - 92958889464 * q^22 - 407443266456 * q^23 + 1150326640584 * q^24 + 1060505718141 * q^25 - 1574420844444 * q^26 + 282429536481 * q^27 - 551289349344 * q^28 - 634167854814 * q^29 - 5091450187644 * q^30 + 4450615285992 * q^31 + 11442856470048 * q^32 - 11842118619948 * q^33 - 24914627178660 * q^34 + 35210876428320 * q^35 + 3747647530260 * q^36 - 9153723676782 * q^37 + 70458442084920 * q^38 - 18495380281122 * q^39 - 91019811331152 * q^40 - 98716763516658 * q^41 + 25044209245584 * q^42 + 177675896172444 * q^43 - 140319636812688 * q^44 + 9440404195626 * q^45 + 302624033519952 * q^46 - 456252236520672 * q^47 + 315345544244496 * q^48 + 262417912322283 * q^49 + 30020883850914 * q^50 + 68644329403554 * q^51 - 776199022315752 * q^52 - 378100541976246 * q^53 + 110147519227590 * q^54 - 441005798390904 * q^55 + 1503419383717440 * q^56 + 8561384733420 * q^57 - 714120377553180 * q^58 + 1464726939790332 * q^59 - 3471798956959944 * q^60 + 1425735374545338 * q^61 + 2372754366104736 * q^62 + 156044707998768 * q^63 - 19526757111744 * q^64 + 2591923576531308 * q^65 - 2797917525081432 * q^66 - 2884438056080892 * q^67 - 2343067864452504 * q^68 + 6573470832979704 * q^69 - 2628913293194400 * q^70 - 17492672971295784 * q^71 + 3674146115086920 * q^72 + 1361422453453854 * q^73 + 14348572647202164 * q^74 + 16618257189589599 * q^75 + 18207808259019792 * q^76 - 30109942873431744 * q^77 - 11131743388510188 * q^78 + 19123349308011960 * q^79 - 15645855535606176 * q^80 + 5559060566555523 * q^81 - 13744587323604564 * q^82 - 13463478996802716 * q^83 - 28087569433031904 * q^84 + 20429373327033492 * q^85 + 90856812547402824 * q^86 - 2011473245489130 * q^87 - 96641522137971360 * q^88 - 31911563984537682 * q^89 - 36277513750957356 * q^90 - 11007612437859168 * q^91 + 301981464587455968 * q^92 + 15424213061762712 * q^93 - 135193059999506592 * q^94 - 105329716438805256 * q^95 - 9118853133499872 * q^96 + 158195160856210758 * q^97 - 129362780127951954 * q^98 - 7325740741789476 * q^99

Decomposition of \(S_{18}^{\mathrm{new}}(\Gamma_1(3))\)

We only show spaces with even parity, since no modular forms exist when this condition is not satisfied. Within each space \( S_k^{\mathrm{new}}(N, \chi) \) we list available newforms together with their dimension.

Label	\(\chi\)	Newforms	Dimension	\(\chi\) degree
3.18.a	\(\chi_{3}(1, \cdot)\)	3.18.a.a	1	1
		3.18.a.b	2

Decomposition of \(S_{18}^{\mathrm{old}}(\Gamma_1(3))\) into lower level spaces

\( S_{18}^{\mathrm{old}}(\Gamma_1(3)) \cong \) \(S_{18}^{\mathrm{new}}(\Gamma_1(1))\)\(^{\oplus 2}\)