LMFDB - Embedded newform 140.2.w.b.107.18

Show commands: Magma / Pari/GP / SageMath

Newspace parameters

comment:Compute space of new eigenforms

gp:[N,k,chi] = [140,2,Mod(23,140)] mf = mfinit([N,k,chi],0) lf = mfeigenbasis(mf)

magma://Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code chi := DirichletCharacter("140.23"); S:= CuspForms(chi, 2); N := Newforms(S);

sage:from sage.modular.dirichlet import DirichletCharacter H = DirichletGroup(140, base_ring=CyclotomicField(12)) chi = DirichletCharacter(H, H._module([6, 9, 4])) N = Newforms(chi, 2, names="a")

Level:	$ N $	$=$	$ 140 = 2^{2} \cdot 5 \cdot 7 $
Weight:	$ k $	$=$	$ 2 $
Character orbit:	$[\chi]$	$=$	140.w (of order $12$, degree $4$, minimal)

Newform invariants

comment:select newform

sage:traces = [72] f = next(g for g in N if [g.coefficient(i+1).trace() for i in range(1)] == traces)

gp:f = lf[1] \\ Warning: the index may be different

Self dual:	no
Analytic conductor:	$1.11790562830$
Analytic rank:	$0$
Dimension:	$72$
Relative dimension:	$18$ over $\Q(\zeta_{12})$
Twist minimal:	yes
Sato-Tate group:	$\mathrm{SU}(2)[C_{12}]$

Embedding invariants

Embedding label			107.18
Character	$\chi$	$=$	140.107
Dual form			140.2.w.b.123.18

$q$-expansion

comment:q-expansion

sage:f.q_expansion() # note that sage often uses an isomorphic number field

gp:mfcoefs(f, 20)

$f(q)$	$=$	\(q+(1.41349 - 0.0450897i) q^{2} +(-0.543458 + 2.02821i) q^{3} +(1.99593 - 0.127468i) q^{4} +(-1.62425 + 1.53682i) q^{5} +(-0.676724 + 2.89137i) q^{6} +(-0.0742486 - 2.64471i) q^{7} +(2.81549 - 0.270171i) q^{8} +(-1.22023 - 0.704499i) q^{9} +(-2.22657 + 2.24552i) q^{10} +(0.366133 - 0.211387i) q^{11} +(-0.826174 + 4.11745i) q^{12} +(-1.56422 + 1.56422i) q^{13} +(-0.224199 - 3.73493i) q^{14} +(-2.23429 - 4.12952i) q^{15} +(3.96750 - 0.508836i) q^{16} +(1.18219 - 4.41198i) q^{17} +(-1.75655 - 0.940785i) q^{18} +(3.66683 - 6.35114i) q^{19} +(-3.04600 + 3.27443i) q^{20} +(5.40439 + 1.28670i) q^{21} +(0.507996 - 0.315303i) q^{22} +(-6.44210 + 1.72616i) q^{23} +(-0.982138 + 5.85725i) q^{24} +(0.276371 - 4.99236i) q^{25} +(-2.14049 + 2.28155i) q^{26} +(-2.36225 + 2.36225i) q^{27} +(-0.485311 - 5.26920i) q^{28} +4.72835i q^{29} +(-3.34435 - 5.73631i) q^{30} +(1.70170 - 0.982474i) q^{31} +(5.58510 - 0.898130i) q^{32} +(0.229760 + 0.857477i) q^{33} +(1.47208 - 6.28961i) q^{34} +(4.18504 + 4.18156i) q^{35} +(-2.52529 - 1.25059i) q^{36} +(-7.20177 + 1.92971i) q^{37} +(4.89667 - 9.14263i) q^{38} +(-2.32248 - 4.02266i) q^{39} +(-4.15786 + 4.76573i) q^{40} -4.01882 q^{41} +(7.69709 + 1.57506i) q^{42} +(1.88664 + 1.88664i) q^{43} +(0.703833 - 0.468585i) q^{44} +(3.06464 - 0.730988i) q^{45} +(-9.02804 + 2.73038i) q^{46} +(1.70358 + 6.35786i) q^{47} +(-1.12414 + 8.32348i) q^{48} +(-6.98897 + 0.392732i) q^{49} +(0.165546 - 7.06913i) q^{50} +(8.30597 + 4.79545i) q^{51} +(-2.92269 + 3.32147i) q^{52} +(0.780053 + 0.209015i) q^{53} +(-3.23251 + 3.44554i) q^{54} +(-0.269828 + 0.906026i) q^{55} +(-0.923572 - 7.42610i) q^{56} +(10.8887 + 10.8887i) q^{57} +(0.213200 + 6.68350i) q^{58} +(1.35717 + 2.35069i) q^{59} +(-4.98587 - 7.95745i) q^{60} +(0.925760 - 1.60346i) q^{61} +(2.36104 - 1.46545i) q^{62} +(-1.77259 + 3.27945i) q^{63} +(7.85401 - 1.52133i) q^{64} +(0.136759 - 4.94461i) q^{65} +(0.363428 + 1.20168i) q^{66} +(-8.70137 - 2.33152i) q^{67} +(1.79718 - 8.95671i) q^{68} -14.0041i q^{69} +(6.10408 + 5.72191i) q^{70} +3.16317i q^{71} +(-3.62588 - 1.65384i) q^{72} +(6.67113 + 1.78752i) q^{73} +(-10.0927 + 3.05236i) q^{74} +(9.97537 + 3.27368i) q^{75} +(6.50918 - 13.1438i) q^{76} +(-0.586243 - 0.952621i) q^{77} +(-3.46420 - 5.58129i) q^{78} +(1.77995 - 3.08296i) q^{79} +(-5.66223 + 6.92381i) q^{80} +(-5.62086 - 9.73561i) q^{81} +(-5.68058 + 0.181207i) q^{82} +(4.71846 + 4.71846i) q^{83} +(10.9508 + 1.87928i) q^{84} +(4.86025 + 8.98296i) q^{85} +(2.75182 + 2.58169i) q^{86} +(-9.59011 - 2.56966i) q^{87} +(0.973735 - 0.694078i) q^{88} +(10.0333 + 5.79271i) q^{89} +(4.29889 - 1.17143i) q^{90} +(4.25305 + 4.02077i) q^{91} +(-12.6380 + 4.26646i) q^{92} +(1.06787 + 3.98534i) q^{93} +(2.69468 + 8.90999i) q^{94} +(3.80470 + 15.9511i) q^{95} +(-1.21367 + 11.8159i) q^{96} +(-4.64008 - 4.64008i) q^{97} +(-9.86117 + 0.870255i) q^{98} -0.595688 q^{99} +O(q^{100})\)
$\operatorname{Tr}(f)(q)$	$=$	$ 72 q + 2 q^{2} - 8 q^{5} - 16 q^{6} - 4 q^{8} + 2 q^{10} + 10 q^{12} - 28 q^{16} + 4 q^{17} - 20 q^{18} - 56 q^{20} + 4 q^{21} - 16 q^{22} - 16 q^{25} - 4 q^{26} + 42 q^{28} - 32 q^{30} - 38 q^{32} - 64 q^{33}+ \cdots - 90 q^{98}+O(q^{100}) $ 72 * q + 2 * q^2 - 8 * q^5 - 16 * q^6 - 4 * q^8 + 2 * q^10 + 10 * q^12 - 28 * q^16 + 4 * q^17 - 20 * q^18 - 56 * q^20 + 4 * q^21 - 16 * q^22 - 16 * q^25 - 4 * q^26 + 42 * q^28 - 32 * q^30 - 38 * q^32 - 64 * q^33 + 16 * q^36 - 4 * q^37 + 12 * q^38 + 2 * q^40 - 40 * q^41 + 78 * q^42 - 12 * q^45 - 28 * q^46 + 12 * q^48 - 28 * q^50 + 48 * q^52 - 24 * q^53 + 36 * q^56 - 16 * q^57 + 30 * q^58 - 10 * q^60 - 20 * q^61 + 56 * q^62 + 4 * q^65 + 44 * q^66 - 12 * q^68 + 84 * q^70 + 44 * q^72 - 12 * q^73 + 112 * q^76 + 16 * q^77 + 64 * q^78 + 52 * q^80 - 52 * q^81 - 34 * q^82 + 16 * q^85 + 64 * q^86 + 16 * q^88 - 32 * q^90 + 44 * q^92 + 12 * q^93 - 48 * q^96 - 24 * q^97 - 90 * q^98

Character values

We give the values of $\chi$ on generators for $\left(\mathbb{Z}/140\mathbb{Z}\right)^\times$.

$n$	$57$	$71$	$101$
$\chi(n)$	$e\left(\frac{1}{4}\right)$	$-1$	$e\left(\frac{1}{3}\right)$

Coefficient data

For each $n$ we display the coefficients of the $q$-expansion $a_n$, the Satake parameters $\alpha_p$, and the Satake angles $\theta_p = \textrm{Arg}(\alpha_p)$. You can download additional coefficients here.

Currently showing only $a_p$; display all $a_n$ Currently showing all $a_n$; display only $a_p$

$n$	$a_n$			$a_n / n^{(k-1)/2}$			$ \alpha_n $			$ \theta_n $
$p$	$a_p$			$a_p / p^{(k-1)/2}$			$ \alpha_p$			$ \theta_p $

$2$	1.41349	−	0.0450897i	0.999492	−	0.0318832i
$2$	1.41349	−	0.0450897i	0.999492	−	0.0318832i
$3$	−0.543458	+	2.02821i	−0.313766	+	1.17099i	0.611367	+	0.791347i	$0.290620\pi$
$3$	−0.543458	+	2.02821i	−0.313766	+	1.17099i	−0.925133	+	0.379643i	$0.876047\pi$
$4$	1.99593	−	0.127468i	0.997967	−	0.0637340i
$5$	−1.62425	+	1.53682i	−0.726386	+	0.687287i
$5$	−1.62425	+	1.53682i	−0.726386	+	0.687287i
$6$	−0.676724	+	2.89137i	−0.276271	+	1.18040i
$7$	−0.0742486	−	2.64471i	−0.0280633	−	0.999606i
$7$	−0.0742486	−	2.64471i	−0.0280633	−	0.999606i
$8$	2.81549	−	0.270171i	0.995428	−	0.0955200i
$9$	−1.22023	−	0.704499i	−0.406742	−	0.234833i
$10$	−2.22657	+	2.24552i	−0.704104	+	0.710097i
$11$	0.366133	−	0.211387i	0.110393	−	0.0637356i	−0.443787	−	0.896132i	$-0.646365\pi$
$11$	0.366133	−	0.211387i	0.110393	−	0.0637356i	0.554180	+	0.832397i	$0.313032\pi$
$12$	−0.826174	+	4.11745i	−0.238496	+	1.18861i
$13$	−1.56422	+	1.56422i	−0.433837	+	0.433837i	−0.889931	−	0.456095i	$-0.849248\pi$
$13$	−1.56422	+	1.56422i	−0.433837	+	0.433837i	0.456095	+	0.889931i	$0.349248\pi$
$14$	−0.224199	−	3.73493i	−0.0599197	−	0.998203i
$15$	−2.23429	−	4.12952i	−0.576890	−	1.06624i
$16$	3.96750	−	0.508836i	0.991876	−	0.127209i
$17$	1.18219	−	4.41198i	0.286722	−	1.07006i	−0.660849	−	0.750519i	$-0.729804\pi$
$17$	1.18219	−	4.41198i	0.286722	−	1.07006i	0.947572	−	0.319544i	$-0.103530\pi$
$18$	−1.75655	−	0.940785i	−0.414023	−	0.221745i
$19$	3.66683	−	6.35114i	0.841228	−	1.45705i	−0.0476283	−	0.998865i	$-0.515166\pi$
$19$	3.66683	−	6.35114i	0.841228	−	1.45705i	0.888857	−	0.458185i	$-0.151500\pi$
$20$	−3.04600	+	3.27443i	−0.681106	+	0.732185i
$21$	5.40439	+	1.28670i	1.17933	+	0.280780i
$22$	0.507996	−	0.315303i	0.108305	−	0.0672229i
$23$	−6.44210	+	1.72616i	−1.34327	+	0.359928i	−0.857647	−	0.514239i	$-0.828074\pi$
$23$	−6.44210	+	1.72616i	−1.34327	+	0.359928i	−0.485624	+	0.874168i	$0.661408\pi$
$24$	−0.982138	+	5.85725i	−0.200478	+	1.19561i
$25$	0.276371	−	4.99236i	0.0552743	−	0.998471i
$26$	−2.14049	+	2.28155i	−0.419784	+	0.447448i
$27$	−2.36225	+	2.36225i	−0.454615	+	0.454615i
$28$	−0.485311	−	5.26920i	−0.0917152	−	0.995785i
$29$			4.72835i			0.878033i	0.898479	+	0.439016i	$0.144673\pi$
$29$			4.72835i			0.878033i	−0.898479	+	0.439016i	$0.855327\pi$
$30$	−3.34435	−	5.73631i	−0.610592	−	1.04730i
$31$	1.70170	−	0.982474i	0.305634	−	0.176458i	−0.339337	−	0.940665i	$-0.610203\pi$
$31$	1.70170	−	0.982474i	0.305634	−	0.176458i	0.644971	+	0.764207i	$0.276869\pi$
$32$	5.58510	−	0.898130i	0.987316	−	0.158768i
$33$	0.229760	+	0.857477i	0.0399961	+	0.149268i
$34$	1.47208	−	6.28961i	0.252459	−	1.07866i
$35$	4.18504	+	4.18156i	0.707401	+	0.706813i
$36$	−2.52529	−	1.25059i	−0.420882	−	0.208432i
$37$	−7.20177	+	1.92971i	−1.18396	+	0.317242i	−0.796498	−	0.604641i	$-0.793316\pi$
$37$	−7.20177	+	1.92971i	−1.18396	+	0.317242i	−0.387467	+	0.921884i	$0.626650\pi$
$38$	4.89667	−	9.14263i	0.794345	−	1.48313i
$39$	−2.32248	−	4.02266i	−0.371895	−	0.644141i
$40$	−4.15786	+	4.76573i	−0.657415	+	0.753528i
$41$	−4.01882			−0.627634			−0.313817	−	0.949483i	$-0.601608\pi$
$41$	−4.01882			−0.627634			−0.313817	+	0.949483i	$0.601608\pi$
$42$	7.69709	+	1.57506i	1.18769	+	0.243037i
$43$	1.88664	+	1.88664i	0.287710	+	0.287710i	0.836174	−	0.548464i	$-0.184787\pi$
$43$	1.88664	+	1.88664i	0.287710	+	0.287710i	−0.548464	+	0.836174i	$0.684787\pi$
$44$	0.703833	−	0.468585i	0.106107	−	0.0706419i
$45$	3.06464	−	0.730988i	0.456850	−	0.108969i
$46$	−9.02804	+	2.73038i	−1.33111	+	0.402573i
$47$	1.70358	+	6.35786i	0.248493	+	0.927389i	0.971595	+	0.236648i	$0.0760488\pi$
$47$	1.70358	+	6.35786i	0.248493	+	0.927389i	−0.723102	+	0.690741i	$0.757284\pi$
$48$	−1.12414	+	8.32348i	−0.162256	+	1.20139i
$49$	−6.98897	+	0.392732i	−0.998425	+	0.0561046i
$50$	0.165546	−	7.06913i	0.0234117	−	0.999726i
$51$	8.30597	+	4.79545i	1.16307	+	0.671498i
$52$	−2.92269	+	3.32147i	−0.405304	+	0.460605i
$53$	0.780053	+	0.209015i	0.107149	+	0.0287104i	0.311995	−	0.950084i	$-0.399003\pi$
$53$	0.780053	+	0.209015i	0.107149	+	0.0287104i	−0.204846	+	0.978794i	$0.565669\pi$
$54$	−3.23251	+	3.44554i	−0.439889	+	0.468879i
$55$	−0.269828	+	0.906026i	−0.0363836	+	0.122169i
$56$	−0.923572	−	7.42610i	−0.123417	−	0.992355i
$57$	10.8887	+	10.8887i	1.44224	+	1.44224i
$58$	0.213200	+	6.68350i	0.0279945	+	0.877586i
$59$	1.35717	+	2.35069i	0.176689	+	0.306034i	0.940744	−	0.339116i	$-0.110128\pi$
$59$	1.35717	+	2.35069i	0.176689	+	0.306034i	−0.764056	+	0.645151i	$0.776795\pi$
$60$	−4.98587	−	7.95745i	−0.643673	−	1.02730i
$61$	0.925760	−	1.60346i	0.118531	−	0.205302i	−0.800654	−	0.599126i	$-0.795515\pi$
$61$	0.925760	−	1.60346i	0.118531	−	0.205302i	0.919186	+	0.393824i	$0.128848\pi$
$62$	2.36104	−	1.46545i	0.299852	−	0.186112i
$63$	−1.77259	+	3.27945i	−0.223326	+	0.413172i
$64$	7.85401	−	1.52133i	0.981752	−	0.190167i
$65$	0.136759	−	4.94461i	0.0169629	−	0.613303i
$66$	0.363428	+	1.20168i	0.0447349	+	0.147916i
$67$	−8.70137	−	2.33152i	−1.06304	−	0.284841i	−0.315410	−	0.948955i	$-0.602142\pi$
$67$	−8.70137	−	2.33152i	−1.06304	−	0.284841i	−0.747631	+	0.664114i	$0.768809\pi$
$68$	1.79718	−	8.95671i	0.217940	−	1.08616i
$69$		−	14.0041i		−	1.68589i
$70$	6.10408	+	5.72191i	0.729577	+	0.683899i
$71$			3.16317i			0.375400i	0.982226	+	0.187700i	$0.0601032\pi$
$71$			3.16317i			0.375400i	−0.982226	+	0.187700i	$0.939897\pi$
$72$	−3.62588	−	1.65384i	−0.427314	−	0.194907i
$73$	6.67113	+	1.78752i	0.780797	+	0.209214i	0.627136	−	0.778910i	$-0.284227\pi$
$73$	6.67113	+	1.78752i	0.780797	+	0.209214i	0.153661	+	0.988124i	$0.450894\pi$
$74$	−10.0927	+	3.05236i	−1.17325	+	0.354830i
$75$	9.97537	+	3.27368i	1.15186	+	0.378012i
$76$	6.50918	−	13.1438i	0.746654	−	1.50770i
$77$	−0.586243	−	0.952621i	−0.0668085	−	0.108561i
$78$	−3.46420	−	5.58129i	−0.392243	−	0.631957i
$79$	1.77995	−	3.08296i	0.200260	−	0.346860i	−0.748352	−	0.663301i	$-0.769155\pi$
$79$	1.77995	−	3.08296i	0.200260	−	0.346860i	0.948612	+	0.316441i	$0.102488\pi$
$80$	−5.66223	+	6.92381i	−0.633056	+	0.774106i
$81$	−5.62086	−	9.73561i	−0.624540	−	1.08173i
$82$	−5.68058	+	0.181207i	−0.627315	+	0.0200110i
$83$	4.71846	+	4.71846i	0.517919	+	0.517919i	0.916941	−	0.399022i	$-0.130650\pi$
$83$	4.71846	+	4.71846i	0.517919	+	0.517919i	−0.399022	+	0.916941i	$0.630650\pi$
$84$	10.9508	+	1.87928i	1.19483	+	0.205046i
$85$	4.86025	+	8.98296i	0.527168	+	0.974339i
$86$	2.75182	+	2.58169i	0.296737	+	0.278391i
$87$	−9.59011	−	2.56966i	−1.02817	−	0.275497i
$88$	0.973735	−	0.694078i	0.103801	−	0.0739890i
$89$	10.0333	+	5.79271i	1.06352	+	0.614026i	0.926405	−	0.376529i	$-0.122882\pi$
$89$	10.0333	+	5.79271i	1.06352	+	0.614026i	0.137119	+	0.990555i	$0.456216\pi$
$90$	4.29889	−	1.17143i	0.453143	−	0.123480i
$91$	4.25305	+	4.02077i	0.445841	+	0.421491i
$92$	−12.6380	+	4.26646i	−1.31760	+	0.444809i
$93$	1.06787	+	3.98534i	0.110733	+	0.413260i
$94$	2.69468	+	8.90999i	0.277935	+	0.918995i
$95$	3.80470	+	15.9511i	0.390354	+	1.63655i
$96$	−1.21367	+	11.8159i	−0.123870	+	1.20595i
$97$	−4.64008	−	4.64008i	−0.471128	−	0.471128i	0.431151	−	0.902280i	$-0.358108\pi$
$97$	−4.64008	−	4.64008i	−0.471128	−	0.471128i	−0.902280	+	0.431151i	$0.858108\pi$
$98$	−9.86117	+	0.870255i	−0.996129	+	0.0879090i
$99$	−0.595688			−0.0598689

Currently showing only $a_p$; display all $a_n$ Currently showing all $a_n$; display only $a_p$

Twists

By twisting character
Char	Parity	Ord	Type	Twist	Min	Dim
1.1	even	1	trivial	140.2.w.b.107.18	yes	72
4.3	odd	2	inner	140.2.w.b.107.16	yes	72
5.2	odd	4		700.2.be.e.443.9		72
5.3	odd	4	inner	140.2.w.b.23.10	yes	72
5.4	even	2		700.2.be.e.107.1		72
7.2	even	3		980.2.k.k.687.6		36
7.3	odd	6		980.2.x.m.67.8		72
7.4	even	3	inner	140.2.w.b.67.8	yes	72
7.5	odd	6		980.2.k.j.687.6		36
7.6	odd	2		980.2.x.m.667.18		72
20.3	even	4	inner	140.2.w.b.23.8	✓	72
20.7	even	4		700.2.be.e.443.11		72
20.19	odd	2		700.2.be.e.107.3		72
28.3	even	6		980.2.x.m.67.10		72
28.11	odd	6	inner	140.2.w.b.67.10	yes	72
28.19	even	6		980.2.k.j.687.5		36
28.23	odd	6		980.2.k.k.687.5		36
28.27	even	2		980.2.x.m.667.16		72
35.3	even	12		980.2.x.m.263.16		72
35.4	even	6		700.2.be.e.207.11		72
35.13	even	4		980.2.x.m.863.10		72
35.18	odd	12	inner	140.2.w.b.123.16	yes	72
35.23	odd	12		980.2.k.k.883.5		36
35.32	odd	12		700.2.be.e.543.3		72
35.33	even	12		980.2.k.j.883.5		36
140.3	odd	12		980.2.x.m.263.18		72
140.23	even	12		980.2.k.k.883.6		36
140.39	odd	6		700.2.be.e.207.9		72
140.67	even	12		700.2.be.e.543.1		72
140.83	odd	4		980.2.x.m.863.8		72
140.103	odd	12		980.2.k.j.883.6		36
140.123	even	12	inner	140.2.w.b.123.18	yes	72

By twisted newform
Twist	Min	Dim	Char	Parity	Ord	Type
140.2.w.b.23.8	✓	72	20.3	even	4	inner
140.2.w.b.23.10	yes	72	5.3	odd	4	inner
140.2.w.b.67.8	yes	72	7.4	even	3	inner
140.2.w.b.67.10	yes	72	28.11	odd	6	inner
140.2.w.b.107.16	yes	72	4.3	odd	2	inner
140.2.w.b.107.18	yes	72	1.1	even	1	trivial
140.2.w.b.123.16	yes	72	35.18	odd	12	inner
140.2.w.b.123.18	yes	72	140.123	even	12	inner
700.2.be.e.107.1		72	5.4	even	2
700.2.be.e.107.3		72	20.19	odd	2
700.2.be.e.207.9		72	140.39	odd	6
700.2.be.e.207.11		72	35.4	even	6
700.2.be.e.443.9		72	5.2	odd	4
700.2.be.e.443.11		72	20.7	even	4
700.2.be.e.543.1		72	140.67	even	12
700.2.be.e.543.3		72	35.32	odd	12
980.2.k.j.687.5		36	28.19	even	6
980.2.k.j.687.6		36	7.5	odd	6
980.2.k.j.883.5		36	35.33	even	12
980.2.k.j.883.6		36	140.103	odd	12
980.2.k.k.687.5		36	28.23	odd	6
980.2.k.k.687.6		36	7.2	even	3
980.2.k.k.883.5		36	35.23	odd	12
980.2.k.k.883.6		36	140.23	even	12
980.2.x.m.67.8		72	7.3	odd	6
980.2.x.m.67.10		72	28.3	even	6
980.2.x.m.263.16		72	35.3	even	12
980.2.x.m.263.18		72	140.3	odd	12
980.2.x.m.667.16		72	28.27	even	2
980.2.x.m.667.18		72	7.6	odd	2
980.2.x.m.863.8		72	140.83	odd	4
980.2.x.m.863.10		72	35.13	even	4

Overview	Random
Universe	Knowledge

Classical	Maass
Hilbert	Bianchi

Elliptic curves over $\Q$
Elliptic curves over $\Q(\alpha)$
Genus 2 curves over $\Q$
Higher genus families
Abelian varieties over $\F_{q}$
Belyi maps

Level:	\( N \)	\(=\)	\( 140 = 2^{2} \cdot 5 \cdot 7 \)
Weight:	\( k \)	\(=\)	\( 2 \)
Character orbit:	\([\chi]\)	\(=\)	140.w (of order \(12\), degree \(4\), minimal)

\(f(q)\)	\(=\)	\(q+(1.41349 - 0.0450897i) q^{2} +(-0.543458 + 2.02821i) q^{3} +(1.99593 - 0.127468i) q^{4} +(-1.62425 + 1.53682i) q^{5} +(-0.676724 + 2.89137i) q^{6} +(-0.0742486 - 2.64471i) q^{7} +(2.81549 - 0.270171i) q^{8} +(-1.22023 - 0.704499i) q^{9} +(-2.22657 + 2.24552i) q^{10} +(0.366133 - 0.211387i) q^{11} +(-0.826174 + 4.11745i) q^{12} +(-1.56422 + 1.56422i) q^{13} +(-0.224199 - 3.73493i) q^{14} +(-2.23429 - 4.12952i) q^{15} +(3.96750 - 0.508836i) q^{16} +(1.18219 - 4.41198i) q^{17} +(-1.75655 - 0.940785i) q^{18} +(3.66683 - 6.35114i) q^{19} +(-3.04600 + 3.27443i) q^{20} +(5.40439 + 1.28670i) q^{21} +(0.507996 - 0.315303i) q^{22} +(-6.44210 + 1.72616i) q^{23} +(-0.982138 + 5.85725i) q^{24} +(0.276371 - 4.99236i) q^{25} +(-2.14049 + 2.28155i) q^{26} +(-2.36225 + 2.36225i) q^{27} +(-0.485311 - 5.26920i) q^{28} +4.72835i q^{29} +(-3.34435 - 5.73631i) q^{30} +(1.70170 - 0.982474i) q^{31} +(5.58510 - 0.898130i) q^{32} +(0.229760 + 0.857477i) q^{33} +(1.47208 - 6.28961i) q^{34} +(4.18504 + 4.18156i) q^{35} +(-2.52529 - 1.25059i) q^{36} +(-7.20177 + 1.92971i) q^{37} +(4.89667 - 9.14263i) q^{38} +(-2.32248 - 4.02266i) q^{39} +(-4.15786 + 4.76573i) q^{40} -4.01882 q^{41} +(7.69709 + 1.57506i) q^{42} +(1.88664 + 1.88664i) q^{43} +(0.703833 - 0.468585i) q^{44} +(3.06464 - 0.730988i) q^{45} +(-9.02804 + 2.73038i) q^{46} +(1.70358 + 6.35786i) q^{47} +(-1.12414 + 8.32348i) q^{48} +(-6.98897 + 0.392732i) q^{49} +(0.165546 - 7.06913i) q^{50} +(8.30597 + 4.79545i) q^{51} +(-2.92269 + 3.32147i) q^{52} +(0.780053 + 0.209015i) q^{53} +(-3.23251 + 3.44554i) q^{54} +(-0.269828 + 0.906026i) q^{55} +(-0.923572 - 7.42610i) q^{56} +(10.8887 + 10.8887i) q^{57} +(0.213200 + 6.68350i) q^{58} +(1.35717 + 2.35069i) q^{59} +(-4.98587 - 7.95745i) q^{60} +(0.925760 - 1.60346i) q^{61} +(2.36104 - 1.46545i) q^{62} +(-1.77259 + 3.27945i) q^{63} +(7.85401 - 1.52133i) q^{64} +(0.136759 - 4.94461i) q^{65} +(0.363428 + 1.20168i) q^{66} +(-8.70137 - 2.33152i) q^{67} +(1.79718 - 8.95671i) q^{68} -14.0041i q^{69} +(6.10408 + 5.72191i) q^{70} +3.16317i q^{71} +(-3.62588 - 1.65384i) q^{72} +(6.67113 + 1.78752i) q^{73} +(-10.0927 + 3.05236i) q^{74} +(9.97537 + 3.27368i) q^{75} +(6.50918 - 13.1438i) q^{76} +(-0.586243 - 0.952621i) q^{77} +(-3.46420 - 5.58129i) q^{78} +(1.77995 - 3.08296i) q^{79} +(-5.66223 + 6.92381i) q^{80} +(-5.62086 - 9.73561i) q^{81} +(-5.68058 + 0.181207i) q^{82} +(4.71846 + 4.71846i) q^{83} +(10.9508 + 1.87928i) q^{84} +(4.86025 + 8.98296i) q^{85} +(2.75182 + 2.58169i) q^{86} +(-9.59011 - 2.56966i) q^{87} +(0.973735 - 0.694078i) q^{88} +(10.0333 + 5.79271i) q^{89} +(4.29889 - 1.17143i) q^{90} +(4.25305 + 4.02077i) q^{91} +(-12.6380 + 4.26646i) q^{92} +(1.06787 + 3.98534i) q^{93} +(2.69468 + 8.90999i) q^{94} +(3.80470 + 15.9511i) q^{95} +(-1.21367 + 11.8159i) q^{96} +(-4.64008 - 4.64008i) q^{97} +(-9.86117 + 0.870255i) q^{98} -0.595688 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 72 q + 2 q^{2} - 8 q^{5} - 16 q^{6} - 4 q^{8} + 2 q^{10} + 10 q^{12} - 28 q^{16} + 4 q^{17} - 20 q^{18} - 56 q^{20} + 4 q^{21} - 16 q^{22} - 16 q^{25} - 4 q^{26} + 42 q^{28} - 32 q^{30} - 38 q^{32} - 64 q^{33}+ \cdots - 90 q^{98}+O(q^{100}) \) 72 * q + 2 * q^2 - 8 * q^5 - 16 * q^6 - 4 * q^8 + 2 * q^10 + 10 * q^12 - 28 * q^16 + 4 * q^17 - 20 * q^18 - 56 * q^20 + 4 * q^21 - 16 * q^22 - 16 * q^25 - 4 * q^26 + 42 * q^28 - 32 * q^30 - 38 * q^32 - 64 * q^33 + 16 * q^36 - 4 * q^37 + 12 * q^38 + 2 * q^40 - 40 * q^41 + 78 * q^42 - 12 * q^45 - 28 * q^46 + 12 * q^48 - 28 * q^50 + 48 * q^52 - 24 * q^53 + 36 * q^56 - 16 * q^57 + 30 * q^58 - 10 * q^60 - 20 * q^61 + 56 * q^62 + 4 * q^65 + 44 * q^66 - 12 * q^68 + 84 * q^70 + 44 * q^72 - 12 * q^73 + 112 * q^76 + 16 * q^77 + 64 * q^78 + 52 * q^80 - 52 * q^81 - 34 * q^82 + 16 * q^85 + 64 * q^86 + 16 * q^88 - 32 * q^90 + 44 * q^92 + 12 * q^93 - 48 * q^96 - 24 * q^97 - 90 * q^98

Introduction

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