Space of modular forms of level 75 and weight 18

• Label: 75.18
• Level: 75
• Weight: 18
• Dimension: 2329
• Nonzero newspaces: 6
• Sturm bound: 7200
• Trace bound: 1

Defining parameters

Level:	\( N \)	=	\( 75 = 3 \cdot 5^{2} \)
Weight:	\( k \)	=	\( 18 \)
Nonzero newspaces:			\( 6 \)
Sturm bound:			\(7200\)
Trace bound:			\(1\)

Dimensions

The following table gives the dimensions of various subspaces of \(M_{18}(\Gamma_1(75))\).

	Total	New	Old
Modular forms	3456	2369	1087
Cusp forms	3344	2329	1015
Eisenstein series	112	40	72

Trace form

2329 * q - 226 * q^2 - 649 * q^3 - 699392 * q^4 - 512046 * q^5 - 10495452 * q^6 - 53292628 * q^7 + 290154864 * q^8 - 43046731 * q^9 + 1924003456 * q^10 - 1876805428 * q^11 + 1296053906 * q^12 + 23816210990 * q^13 - 99129815424 * q^14 + 27285365306 * q^15 + 96529494476 * q^16 + 117125474938 * q^17 + 137801393204 * q^18 - 670384972600 * q^19 + 123911712156 * q^20 + 1344522341370 * q^21 - 4140900169724 * q^22 - 2211745646144 * q^23 + 5113037950920 * q^24 - 2195560515466 * q^25 - 5357653646460 * q^26 - 6064319527849 * q^27 + 37198190484444 * q^28 - 8156884639390 * q^29 - 25419130272526 * q^30 - 9014018038068 * q^31 + 91905527276792 * q^32 + 16340646685670 * q^33 - 87680457721464 * q^34 - 43262193911540 * q^35 - 45436711561726 * q^36 + 218736617472912 * q^37 + 253005607629308 * q^38 - 546085863973284 * q^39 + 588281597558872 * q^40 + 386371052446574 * q^41 - 729488949212574 * q^42 - 425402996273672 * q^43 + 771152103319836 * q^44 + 671415823697944 * q^45 + 165170210787972 * q^46 + 234977659187776 * q^47 - 1241605447149248 * q^48 + 179994007059073 * q^49 + 2608253775630916 * q^50 - 1977247402304926 * q^51 - 8023364333509752 * q^52 + 2441962359380156 * q^53 + 8807276727317922 * q^54 + 4410100018562404 * q^55 + 6328683781225080 * q^56 - 3277141178587742 * q^57 - 9111881309062044 * q^58 - 1788978275141540 * q^59 + 3327632834521034 * q^60 + 15114680179050086 * q^61 - 714029528981156 * q^62 - 7267609822505948 * q^63 - 48035928406102312 * q^64 + 8311742928020222 * q^65 + 49799907608276790 * q^66 + 34787168812163408 * q^67 - 21766235287139432 * q^68 - 45705872267121044 * q^69 + 12799411050105700 * q^70 + 22275139256650840 * q^71 + 9158057772554934 * q^72 - 30542599441686814 * q^73 + 98923661438116 * q^74 - 42961857844810434 * q^75 - 60126724161176776 * q^76 + 23325467664450624 * q^77 + 64839402946775752 * q^78 - 68805969320487420 * q^79 + 397951355003636 * q^80 - 78085181798319691 * q^81 - 27126085674915896 * q^82 + 363455929297421492 * q^83 + 124401491132264294 * q^84 - 463015024876956842 * q^85 - 185348466138573328 * q^86 + 80974840158949746 * q^87 + 186718445122304044 * q^88 - 140970877852754340 * q^89 + 180091226127816206 * q^90 - 176596940935056068 * q^91 - 122218018902196408 * q^92 - 168417431141087432 * q^93 + 262583972501160156 * q^94 - 546494694228063784 * q^95 - 174797073161662062 * q^96 - 473122403324196062 * q^97 + 2938729220359733750 * q^98 + 75449673089733708 * q^99

Decomposition of \(S_{18}^{\mathrm{new}}(\Gamma_1(75))\)

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
75.18.a	\(\chi_{75}(1, \cdot)\)	75.18.a.a	1	1
		75.18.a.b	2
		75.18.a.c	2
		75.18.a.d	3
		75.18.a.e	3
		75.18.a.f	4
		75.18.a.g	5
		75.18.a.h	5
		75.18.a.i	6
		75.18.a.j	6
		75.18.a.k	8
		75.18.a.l	8
75.18.b	\(\chi_{75}(49, \cdot)\)	75.18.b.a	2	1
		75.18.b.b	4
		75.18.b.c	4
		75.18.b.d	6
		75.18.b.e	6
		75.18.b.f	8
		75.18.b.g	10
		75.18.b.h	12
75.18.e	\(\chi_{75}(32, \cdot)\)	n/a	200	2
75.18.g	\(\chi_{75}(16, \cdot)\)	n/a	344	4
75.18.i	\(\chi_{75}(4, \cdot)\)	n/a	336	4
75.18.l	\(\chi_{75}(2, \cdot)\)	n/a	1344	8

"n/a" means that newforms for that character have not been added to the database yet

Decomposition of \(S_{18}^{\mathrm{old}}(\Gamma_1(75))\) into lower level spaces

\( S_{18}^{\mathrm{old}}(\Gamma_1(75)) \cong \) \(S_{18}^{\mathrm{new}}(\Gamma_1(1))\)\(^{\oplus 6}\)\(\oplus\)\(S_{18}^{\mathrm{new}}(\Gamma_1(3))\)\(^{\oplus 3}\)\(\oplus\)\(S_{18}^{\mathrm{new}}(\Gamma_1(5))\)\(^{\oplus 4}\)\(\oplus\)\(S_{18}^{\mathrm{new}}(\Gamma_1(15))\)\(^{\oplus 2}\)\(\oplus\)\(S_{18}^{\mathrm{new}}(\Gamma_1(25))\)\(^{\oplus 2}\)