Properties

Label 840.2.bz.a.19.10
Level $840$
Weight $2$
Character 840.19
Analytic conductor $6.707$
Analytic rank $0$
Dimension $96$
Inner twists $4$

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Show commands: Magma / Pari/GP / SageMath

Newspace parameters

Copy content comment:Compute space of new eigenforms
 
Copy content gp:[N,k,chi] = [840,2,Mod(19,840)] mf = mfinit([N,k,chi],0) lf = mfeigenbasis(mf)
 
Copy content magma://Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code chi := DirichletCharacter("840.19"); S:= CuspForms(chi, 2); N := Newforms(S);
 
Copy content sage:from sage.modular.dirichlet import DirichletCharacter H = DirichletGroup(840, base_ring=CyclotomicField(6)) chi = DirichletCharacter(H, H._module([3, 3, 0, 3, 5])) N = Newforms(chi, 2, names="a")
 
Level: \( N \) \(=\) \( 840 = 2^{3} \cdot 3 \cdot 5 \cdot 7 \)
Weight: \( k \) \(=\) \( 2 \)
Character orbit: \([\chi]\) \(=\) 840.bz (of order \(6\), degree \(2\), minimal)

Newform invariants

Copy content comment:select newform
 
Copy content sage:traces = [96,0,-48] f = next(g for g in N if [g.coefficient(i+1).trace() for i in range(3)] == traces)
 
Copy content gp:f = lf[1] \\ Warning: the index may be different
 
Self dual: no
Analytic conductor: \(6.70743376979\)
Analytic rank: \(0\)
Dimension: \(96\)
Relative dimension: \(48\) over \(\Q(\zeta_{6})\)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{6}]$

Embedding invariants

Embedding label 19.10
Character \(\chi\) \(=\) 840.19
Dual form 840.2.bz.a.619.10

$q$-expansion

Copy content comment:q-expansion
 
Copy content sage:f.q_expansion() # note that sage often uses an isomorphic number field
 
Copy content gp:mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-1.19515 + 0.756046i) q^{2} +(-0.500000 - 0.866025i) q^{3} +(0.856789 - 1.80718i) q^{4} +(-1.90078 - 1.17773i) q^{5} +(1.25233 + 0.657011i) q^{6} +(-2.10021 + 1.60907i) q^{7} +(0.342319 + 2.80764i) q^{8} +(-0.500000 + 0.866025i) q^{9} +(3.16214 - 0.0295053i) q^{10} +(1.84936 + 3.20318i) q^{11} +(-1.99346 + 0.161591i) q^{12} -4.06159i q^{13} +(1.29354 - 3.51095i) q^{14} +(-0.0695556 + 2.23499i) q^{15} +(-2.53183 - 3.09675i) q^{16} +(3.58024 + 6.20117i) q^{17} +(-0.0571777 - 1.41306i) q^{18} +(-2.05610 - 1.18709i) q^{19} +(-3.75694 + 2.42599i) q^{20} +(2.44360 + 1.01430i) q^{21} +(-4.63202 - 2.43010i) q^{22} +(1.57001 - 2.71934i) q^{23} +(2.26032 - 1.70027i) q^{24} +(2.22590 + 4.47720i) q^{25} +(3.07075 + 4.85423i) q^{26} +1.00000 q^{27} +(1.10845 + 5.17410i) q^{28} -0.386546i q^{29} +(-1.60662 - 2.72374i) q^{30} +(-0.295740 - 0.512237i) q^{31} +(5.36721 + 1.78692i) q^{32} +(1.84936 - 3.20318i) q^{33} +(-8.96731 - 4.70452i) q^{34} +(5.88708 - 0.585008i) q^{35} +(1.13667 + 1.64559i) q^{36} +(2.87135 - 4.97333i) q^{37} +(3.35485 - 0.135750i) q^{38} +(-3.51744 + 2.03080i) q^{39} +(2.65597 - 5.73985i) q^{40} -12.1918i q^{41} +(-3.68734 + 0.635232i) q^{42} -1.90138i q^{43} +(7.37325 - 0.597679i) q^{44} +(1.97033 - 1.05726i) q^{45} +(0.179539 + 4.43703i) q^{46} +(0.245768 + 0.141894i) q^{47} +(-1.41595 + 3.74100i) q^{48} +(1.82177 - 6.75878i) q^{49} +(-6.04527 - 3.66806i) q^{50} +(3.58024 - 6.20117i) q^{51} +(-7.34004 - 3.47993i) q^{52} +(0.232955 + 0.403490i) q^{53} +(-1.19515 + 0.756046i) q^{54} +(0.257267 - 8.26658i) q^{55} +(-5.23663 - 5.34581i) q^{56} +2.37418i q^{57} +(0.292247 + 0.461983i) q^{58} +(4.30554 - 2.48580i) q^{59} +(3.97944 + 2.04061i) q^{60} +(5.38555 - 9.32804i) q^{61} +(0.740730 + 0.388609i) q^{62} +(-0.343393 - 2.62337i) q^{63} +(-7.76564 + 1.92221i) q^{64} +(-4.78346 + 7.72018i) q^{65} +(0.211484 + 5.22650i) q^{66} +(5.18143 - 2.99150i) q^{67} +(14.2742 - 1.15707i) q^{68} -3.14002 q^{69} +(-6.59368 + 5.15008i) q^{70} +15.5552i q^{71} +(-2.60264 - 1.10736i) q^{72} +(-4.16891 - 7.22077i) q^{73} +(0.328355 + 8.11478i) q^{74} +(2.76442 - 4.16629i) q^{75} +(-3.90693 + 2.69866i) q^{76} +(-9.03820 - 3.75161i) q^{77} +(2.66851 - 5.08646i) q^{78} +(6.20106 + 3.58019i) q^{79} +(1.16530 + 8.86804i) q^{80} +(-0.500000 - 0.866025i) q^{81} +(9.21754 + 14.5710i) q^{82} +16.1072 q^{83} +(3.92668 - 3.54700i) q^{84} +(0.498052 - 16.0036i) q^{85} +(1.43753 + 2.27244i) q^{86} +(-0.334759 + 0.193273i) q^{87} +(-8.36030 + 6.28884i) q^{88} +(-9.05695 - 5.22903i) q^{89} +(-1.55552 + 2.75325i) q^{90} +(6.53540 + 8.53020i) q^{91} +(-3.56917 - 5.16720i) q^{92} +(-0.295740 + 0.512237i) q^{93} +(-0.401010 + 0.0162264i) q^{94} +(2.51011 + 4.67792i) q^{95} +(-1.13609 - 5.54160i) q^{96} +2.21812 q^{97} +(2.93266 + 9.45513i) q^{98} -3.69872 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 96 q - 48 q^{3} - 48 q^{9} + 13 q^{10} + 14 q^{14} + 4 q^{16} - 22 q^{20} + 96 q^{27} + 4 q^{28} - 5 q^{30} + 30 q^{32} - 8 q^{35} + 12 q^{38} - 23 q^{40} + 2 q^{42} - 16 q^{44} - 22 q^{46} - 8 q^{48} + 12 q^{50}+ \cdots + 2 q^{98}+O(q^{100}) \) Copy content Toggle raw display

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/840\mathbb{Z}\right)^\times\).

\(n\) \(241\) \(281\) \(337\) \(421\) \(631\)
\(\chi(n)\) \(e\left(\frac{5}{6}\right)\) \(1\) \(-1\) \(-1\) \(-1\)

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 \(a_p\)
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −1.19515 + 0.756046i −0.845102 + 0.534605i
\(3\) −0.500000 0.866025i −0.288675 0.500000i
\(4\) 0.856789 1.80718i 0.428395 0.903592i
\(5\) −1.90078 1.17773i −0.850053 0.526697i
\(6\) 1.25233 + 0.657011i 0.511263 + 0.268224i
\(7\) −2.10021 + 1.60907i −0.793805 + 0.608172i
\(8\) 0.342319 + 2.80764i 0.121028 + 0.992649i
\(9\) −0.500000 + 0.866025i −0.166667 + 0.288675i
\(10\) 3.16214 0.0295053i 0.999956 0.00933038i
\(11\) 1.84936 + 3.20318i 0.557603 + 0.965796i 0.997696 + 0.0678442i \(0.0216121\pi\)
−0.440093 + 0.897952i \(0.645055\pi\)
\(12\) −1.99346 + 0.161591i −0.575463 + 0.0466472i
\(13\) 4.06159i 1.12648i −0.826292 0.563241i \(-0.809554\pi\)
0.826292 0.563241i \(-0.190446\pi\)
\(14\) 1.29354 3.51095i 0.345714 0.938340i
\(15\) −0.0695556 + 2.23499i −0.0179592 + 0.577071i
\(16\) −2.53183 3.09675i −0.632956 0.774188i
\(17\) 3.58024 + 6.20117i 0.868337 + 1.50400i 0.863695 + 0.504014i \(0.168144\pi\)
0.00464159 + 0.999989i \(0.498523\pi\)
\(18\) −0.0571777 1.41306i −0.0134769 0.333061i
\(19\) −2.05610 1.18709i −0.471701 0.272337i 0.245251 0.969460i \(-0.421130\pi\)
−0.716951 + 0.697123i \(0.754463\pi\)
\(20\) −3.75694 + 2.42599i −0.840077 + 0.542467i
\(21\) 2.44360 + 1.01430i 0.533238 + 0.221338i
\(22\) −4.63202 2.43010i −0.987551 0.518099i
\(23\) 1.57001 2.71934i 0.327370 0.567021i −0.654619 0.755959i \(-0.727171\pi\)
0.981989 + 0.188938i \(0.0605044\pi\)
\(24\) 2.26032 1.70027i 0.461387 0.347067i
\(25\) 2.22590 + 4.47720i 0.445181 + 0.895441i
\(26\) 3.07075 + 4.85423i 0.602224 + 0.951993i
\(27\) 1.00000 0.192450
\(28\) 1.10845 + 5.17410i 0.209478 + 0.977813i
\(29\) 0.386546i 0.0717799i −0.999356 0.0358899i \(-0.988573\pi\)
0.999356 0.0358899i \(-0.0114266\pi\)
\(30\) −1.60662 2.72374i −0.293328 0.497285i
\(31\) −0.295740 0.512237i −0.0531165 0.0920005i 0.838245 0.545294i \(-0.183582\pi\)
−0.891361 + 0.453294i \(0.850249\pi\)
\(32\) 5.36721 + 1.78692i 0.948797 + 0.315886i
\(33\) 1.84936 3.20318i 0.321932 0.557603i
\(34\) −8.96731 4.70452i −1.53788 0.806819i
\(35\) 5.88708 0.585008i 0.995099 0.0988844i
\(36\) 1.13667 + 1.64559i 0.189445 + 0.274265i
\(37\) 2.87135 4.97333i 0.472048 0.817611i −0.527441 0.849592i \(-0.676848\pi\)
0.999488 + 0.0319811i \(0.0101816\pi\)
\(38\) 3.35485 0.135750i 0.544228 0.0220216i
\(39\) −3.51744 + 2.03080i −0.563241 + 0.325188i
\(40\) 2.65597 5.73985i 0.419945 0.907550i
\(41\) 12.1918i 1.90403i −0.306045 0.952017i \(-0.599006\pi\)
0.306045 0.952017i \(-0.400994\pi\)
\(42\) −3.68734 + 0.635232i −0.568969 + 0.0980185i
\(43\) 1.90138i 0.289958i −0.989435 0.144979i \(-0.953689\pi\)
0.989435 0.144979i \(-0.0463114\pi\)
\(44\) 7.37325 0.597679i 1.11156 0.0901035i
\(45\) 1.97033 1.05726i 0.293720 0.157606i
\(46\) 0.179539 + 4.43703i 0.0264716 + 0.654204i
\(47\) 0.245768 + 0.141894i 0.0358490 + 0.0206974i 0.517817 0.855491i \(-0.326745\pi\)
−0.481968 + 0.876189i \(0.660078\pi\)
\(48\) −1.41595 + 3.74100i −0.204375 + 0.539967i
\(49\) 1.82177 6.75878i 0.260253 0.965541i
\(50\) −6.04527 3.66806i −0.854930 0.518743i
\(51\) 3.58024 6.20117i 0.501335 0.868337i
\(52\) −7.34004 3.47993i −1.01788 0.482579i
\(53\) 0.232955 + 0.403490i 0.0319988 + 0.0554236i 0.881581 0.472032i \(-0.156479\pi\)
−0.849583 + 0.527456i \(0.823146\pi\)
\(54\) −1.19515 + 0.756046i −0.162640 + 0.102885i
\(55\) 0.257267 8.26658i 0.0346898 1.11467i
\(56\) −5.23663 5.34581i −0.699774 0.714364i
\(57\) 2.37418i 0.314467i
\(58\) 0.292247 + 0.461983i 0.0383739 + 0.0606613i
\(59\) 4.30554 2.48580i 0.560534 0.323624i −0.192826 0.981233i \(-0.561765\pi\)
0.753360 + 0.657609i \(0.228432\pi\)
\(60\) 3.97944 + 2.04061i 0.513743 + 0.263442i
\(61\) 5.38555 9.32804i 0.689549 1.19433i −0.282435 0.959286i \(-0.591142\pi\)
0.971984 0.235047i \(-0.0755245\pi\)
\(62\) 0.740730 + 0.388609i 0.0940728 + 0.0493534i
\(63\) −0.343393 2.62337i −0.0432634 0.330514i
\(64\) −7.76564 + 1.92221i −0.970705 + 0.240276i
\(65\) −4.78346 + 7.72018i −0.593315 + 0.957570i
\(66\) 0.211484 + 5.22650i 0.0260319 + 0.643338i
\(67\) 5.18143 2.99150i 0.633012 0.365470i −0.148906 0.988851i \(-0.547575\pi\)
0.781918 + 0.623382i \(0.214242\pi\)
\(68\) 14.2742 1.15707i 1.73100 0.140315i
\(69\) −3.14002 −0.378014
\(70\) −6.59368 + 5.15008i −0.788096 + 0.615552i
\(71\) 15.5552i 1.84606i 0.384727 + 0.923030i \(0.374296\pi\)
−0.384727 + 0.923030i \(0.625704\pi\)
\(72\) −2.60264 1.10736i −0.306724 0.130504i
\(73\) −4.16891 7.22077i −0.487935 0.845127i 0.511969 0.859004i \(-0.328916\pi\)
−0.999904 + 0.0138764i \(0.995583\pi\)
\(74\) 0.328355 + 8.11478i 0.0381705 + 0.943324i
\(75\) 2.76442 4.16629i 0.319208 0.481082i
\(76\) −3.90693 + 2.69866i −0.448155 + 0.309558i
\(77\) −9.03820 3.75161i −1.03000 0.427535i
\(78\) 2.66851 5.08646i 0.302149 0.575929i
\(79\) 6.20106 + 3.58019i 0.697674 + 0.402802i 0.806481 0.591261i \(-0.201370\pi\)
−0.108806 + 0.994063i \(0.534703\pi\)
\(80\) 1.16530 + 8.86804i 0.130284 + 0.991477i
\(81\) −0.500000 0.866025i −0.0555556 0.0962250i
\(82\) 9.21754 + 14.5710i 1.01791 + 1.60910i
\(83\) 16.1072 1.76799 0.883996 0.467495i \(-0.154843\pi\)
0.883996 + 0.467495i \(0.154843\pi\)
\(84\) 3.92668 3.54700i 0.428436 0.387009i
\(85\) 0.498052 16.0036i 0.0540214 1.73583i
\(86\) 1.43753 + 2.27244i 0.155013 + 0.245044i
\(87\) −0.334759 + 0.193273i −0.0358899 + 0.0207211i
\(88\) −8.36030 + 6.28884i −0.891211 + 0.670392i
\(89\) −9.05695 5.22903i −0.960035 0.554276i −0.0638512 0.997959i \(-0.520338\pi\)
−0.896184 + 0.443683i \(0.853672\pi\)
\(90\) −1.55552 + 2.75325i −0.163966 + 0.290218i
\(91\) 6.53540 + 8.53020i 0.685096 + 0.894208i
\(92\) −3.56917 5.16720i −0.372112 0.538717i
\(93\) −0.295740 + 0.512237i −0.0306668 + 0.0531165i
\(94\) −0.401010 + 0.0162264i −0.0413610 + 0.00167362i
\(95\) 2.51011 + 4.67792i 0.257532 + 0.479944i
\(96\) −1.13609 5.54160i −0.115951 0.565587i
\(97\) 2.21812 0.225216 0.112608 0.993639i \(-0.464080\pi\)
0.112608 + 0.993639i \(0.464080\pi\)
\(98\) 2.93266 + 9.45513i 0.296243 + 0.955113i
\(99\) −3.69872 −0.371735
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 840.2.bz.a.19.10 96
5.4 even 2 840.2.bz.b.19.39 yes 96
7.3 odd 6 840.2.bz.b.619.24 yes 96
8.3 odd 2 inner 840.2.bz.a.19.25 yes 96
35.24 odd 6 inner 840.2.bz.a.619.25 yes 96
40.19 odd 2 840.2.bz.b.19.24 yes 96
56.3 even 6 840.2.bz.b.619.39 yes 96
280.59 even 6 inner 840.2.bz.a.619.10 yes 96
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
840.2.bz.a.19.10 96 1.1 even 1 trivial
840.2.bz.a.19.25 yes 96 8.3 odd 2 inner
840.2.bz.a.619.10 yes 96 280.59 even 6 inner
840.2.bz.a.619.25 yes 96 35.24 odd 6 inner
840.2.bz.b.19.24 yes 96 40.19 odd 2
840.2.bz.b.19.39 yes 96 5.4 even 2
840.2.bz.b.619.24 yes 96 7.3 odd 6
840.2.bz.b.619.39 yes 96 56.3 even 6