LMFDB - Newform orbit 130.3.f.b

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms

[N,k,chi] = [130,3,Mod(99,130)]

mf = mfinit([N,k,chi],0)

lf = mfeigenbasis(mf)

from sage.modular.dirichlet import DirichletCharacter

H = DirichletGroup(130, base_ring=CyclotomicField(4))

chi = DirichletCharacter(H, H._module([2, 1]))

N = Newforms(chi, 3, names="a")

//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code

chi := DirichletCharacter("130.99");

S:= CuspForms(chi, 3);

N := Newforms(S);

Level:	$ N $	$=$	$ 130 = 2 \cdot 5 \cdot 13 $
Weight:	$ k $	$=$	$ 3 $
Character orbit:	$[\chi]$	$=$	130.f (of order $4$, degree $2$, minimal)

Newform invariants

comment: select newform

sage: f = N[0] # Warning: the index may be different

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

Self dual:	no
Analytic conductor:	$3.54224343668$
Analytic rank:	$0$
Dimension:	$14$
Relative dimension:	$7$ over $\Q(i)$
Coefficient field:	$\mathbb{Q}[x]/(x^{14} + \cdots)$
comment: defining polynomial gp: f.mod \\ as an extension of the character field
Defining polynomial:	$ x^{14} + 84x^{12} + 2668x^{10} + 40556x^{8} + 303080x^{6} + 1000960x^{4} + 1045476x^{2} + 193600 $ x^14 + 84x^12 + 2668x^10 + 40556x^8 + 303080x^6 + 1000960x^4 + 1045476x^2 + 193600
Coefficient ring:	$\Z[a_1, \ldots, a_{5}]$
Coefficient ring index:	$ 2^{2} $
Twist minimal:	yes
Sato-Tate group:	$\mathrm{SU}(2)[C_{4}]$

$q$-expansion

comment: q-expansion

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

gp: mfcoefs(f, 20)

Coefficients of the $q$-expansion are expressed in terms of a basis $1,\beta_1,\ldots,\beta_{13}$ for the coefficient ring described below. We also show the integral $q$-expansion of the trace form.

$f(q)$	$=$	$ q + (\beta_{4} + 1) q^{2} - \beta_1 q^{3} + 2 \beta_{4} q^{4} + \beta_{10} q^{5} + (\beta_{2} - \beta_1) q^{6} + \beta_{12} q^{7} + (2 \beta_{4} - 2) q^{8} + (\beta_{3} - \beta_{2} - 3) q^{9}+O(q^{10}) $ q + (b4 + 1) * q^2 - b1 * q^3 + 2b4 q^4 + b10 * q^5 + (b2 - b1) * q^6 + b12 * q^7 + (2b4 - 2) q^8 + (b3 - b2 - 3) * q^9	$ q + (\beta_{4} + 1) q^{2} - \beta_1 q^{3} + 2 \beta_{4} q^{4} + \beta_{10} q^{5} + (\beta_{2} - \beta_1) q^{6} + \beta_{12} q^{7} + (2 \beta_{4} - 2) q^{8} + (\beta_{3} - \beta_{2} - 3) q^{9} + (\beta_{10} - \beta_{7}) q^{10} + ( - \beta_{6} + \beta_{4} + 1) q^{11} + 2 \beta_{2} q^{12} + ( - \beta_{12} + \beta_{11} + \cdots - \beta_1) q^{13}+ \cdots + (5 \beta_{10} - 2 \beta_{9} + \cdots + 20) q^{99}+O(q^{100}) $ q + (b4 + 1) * q^2 - b1 * q^3 + 2b4 q^4 + b10 * q^5 + (b2 - b1) * q^6 + b12 * q^7 + (2b4 - 2) q^8 + (b3 - b2 - 3) * q^9 + (b10 - b7) * q^10 + (-b6 + b4 + 1) * q^11 + 2b2 q^12 + (-b12 + b11 - b9 + b8 + b7 + b6 + b2 - b1) * q^13 + (b13 + b12) * q^14 + (-b13 + b11 + b9 - 2b8 - b7 - b5 + b3 - 4) q^15 - 4 * q^16 + (-2b11 - 2b10 - b8 + b7 + b6 - b5 + 2b2 + 6) q^17 + (-b9 - 3b4 + b3 - b2 - b1 - 3) q^18 + (-b11 - b7 + b5 - 4b4 + b2 - b1 + 4) q^19 - 2b7 q^20 + (2b13 - b11 + b9 + b7 - 2b6 + b4 - b3 - b2 - b1 + 1) * q^21 + (-b6 - b5 + 2b4) q^22 + (b13 + b12 + b11 + b10 - 2b6 + 2b5 - 2b3 - 3b2 + 2) * q^23 + (2b2 + 2b1) * q^24 + (-2b13 + b10 + b8 + 2b6 + b4 - 2b2 + 4b1 - 4) * q^25 + (-b13 - b12 + 2b11 + b10 - b9 + b7 + b6 + b5 - b3 + 2b2) * q^26 + (-b13 + b12 + 2b11 - 2b10 + 2b9 + b8 + b7 + 10b4 + 2b1) q^27 + 2b13 q^28 + (-b13 - b12 - 2b11 - 2b10 + 2b8 - 2b7 + b6 - b5 - b3 - 3b2 + 6) q^29 + (-b13 + b12 - b11 - b10 - 3b8 - b7 + b6 - b5 - 4b4 + 2b3 - 4) q^30 + (-4b12 + 3b11 + 3b10 - b9 + 3b8 + 3b7 + b5 + 5b4 - b3 - b2 + b1 - 5) * q^31 + (-4b4 - 4) q^32 + (-b12 + b10 - b9 + b8 + 2b5 - 5b4 - b3 - 2b2 + 2b1 + 5) * q^33 + (-3b11 - b10 + b8 + 3b7 + 2b6 + 6b4 + 2b2 + 2b1 + 6) * q^34 + (b13 - b12 - 4b11 - 2b10 + 2b9 + 2b6 - 2b5 - 2b4 + b3 + b2 - 2b1 + 8) q^35 + (-2b9 - 6b4 - 2b1) q^36 + (b12 - 2b11 + 2b10 - 2b9 + 2b8 - 2b7 + 2b5 - 9b4 - 2b3 - 2b2 + 2b1 + 9) * q^37 + (-b11 - b10 + b8 - b7 - b6 + b5 + 2b2 + 8) q^38 + (-2b13 + 2b12 + 5b11 + 2b10 - 3b8 - 2b7 - b5 - 8b4 + b3 - 4b2 - 3b1 - 12) q^39 + (-2b10 - 2b7) * q^40 + (-2b12 + 6b11 - b10 - 3b9 - b8 + 6b7 + 2b5 - 8b4 - 3b3 + b2 - b1 + 8) q^41 + (2b13 - 2b12 - b11 + b10 + 2b9 + b8 + b7 - 2b6 - 2b5 + 2b4 - 2b1) q^42 + (-3b11 - 3b10 - 4b8 + 4b7 + 2b3 - b2 - 10) q^43 + (-2b5 + 2b4 - 2) * q^44 + (-b13 + 4b12 - 2b11 - b10 + 3b9 - 2b7 - 2b6 + 6b4 - b3 + 3b2 + 9b1 + 8) * q^45 + (2b13 + b11 + b10 + 2b9 - b8 - b7 - 4b6 + 2b4 - 2b3 - 3b2 - 3b1 + 2) q^46 + (-b12 - 3b11 - 3b10 + 4b9 - 3b8 - 3b7 + 2b4 + 4b3 - 4b2 + 4b1 - 2) q^47 + 4b1 q^48 + (-b13 + b12 + 2b11 - 2b10 + 2b9 - 6b8 - 6b7 - b6 - b5 - 9b4 + 6b1) q^49 + (-2b13 + 2b12 + b11 + b10 + b8 - b7 + 2b6 + 2b5 - 3b4 - 6b2 + 2b1 - 5) q^50 + (2b13 - 2b12 - 2b9 + 6b8 + 6b7 - b6 - b5 - 6b4 - 14b1) q^51 + (-2b13 + 2b11 + 2b10 - 2b8 + 2b5 - 2b3 + 2b2 + 2b1) * q^52 + (2b13 - 2b12 + 4b11 - 4b10 + 2b9 + 2b8 + 2b7 - 2b6 - 2b5 - 8b4) * q^53 + (2b12 + 3b11 - b10 + 2b9 - b8 + 3b7 + 10b4 + 2b3 - 2b2 + 2b1 - 10) * q^54 + (b13 + 3b12 - 3b11 - b10 + 4b8 - 2b7 - b6 - 3b5 - 4b4 + b3 - b2 - 3b1 - 4) q^55 + (2b13 - 2b12) * q^56 + (b13 - 3b11 - 4b9 + 3b7 + 4b6 - 21b4 + 4b3 - 2b2 - 2b1 - 21) * q^57 + (-2b13 - 4b10 + b9 + 4b8 + 2b6 + 6b4 - b3 - 3b2 - 3b1 + 6) q^58 + (-8b13 - 3b11 + 2b10 - b9 - 2b8 + 3b7 + 3b6 - 4b4 + b3 + 6b2 + 6b1 - 4) q^59 + (2b12 - 4b11 - 2b10 - 2b9 - 2b8 + 2b6 - 8b4 + 2b3) * q^60 + (-3b11 - 3b10 - 3b8 + 3b7 - 2b6 + 2b5 - 3b3 + 7b2 - 12) * q^61 + (-4b13 - 4b12 + 6b11 + 6b10 - b6 + b5 - 2b3 - 2b2 - 10) * q^62 + (-b12 - b11 + 7b10 + 7b8 - b7 + 10b4 + 3b2 - 3b1 - 10) q^63 - 8b4 q^64 + (2b13 - 2b12 + 4b11 + b10 - 2b9 - 3b8 + b5 - 11b4 + 2b3 - 5b2 + 10b1 + 16) q^65 + (-b13 - b12 + b11 + b10 + b8 - b7 - 2b6 + 2b5 - 2b3 - 4b2 + 10) * q^66 + (3b13 + 8b11 + 4b10 - 2b9 - 4b8 - 8b7 + 2b3 - 2b2 - 2b1) q^67 + (-2b11 + 2b10 + 4b8 + 4b7 + 2b6 + 2b5 + 12b4 + 4b1) * q^68 + (5b13 - 5b12 - 6b11 + 6b10 + b9 - 2b8 - 2b7 + b6 + b5 + 22b4 - 3b1) * q^69 + (-2b12 - 4b11 - 2b10 + b9 + 4b8 + 2b7 + 4b6 + 6b4 + 3b3 + 3b2 - b1 + 10) q^70 + (4b11 + 3b10 - 3b9 + 3b8 + 4b7 + b5 + 8b4 - 3b3 - 4b2 + 4b1 - 8) q^71 + (-2b9 - 6b4 - 2b3 + 2b2 - 2b1 + 6) q^72 + (3b12 - 3b11 - 7b10 - 7b8 - 3b7 - 8b5 + 7b4 + 8b2 - 8b1 - 7) q^73 + (b13 + b12 + 4b8 - 4b7 - 2b6 + 2b5 - 4b3 - 4b2 + 18) * q^74 + (-2b13 + 6b12 + 2b11 - 2b10 + 2b9 - 6b8 - 2b7 + 28b4 - 4b3 + 9b2 + 2b1 + 36) q^75 + (-2b10 + 2b8 - 2b6 + 8b4 + 2b2 + 2b1 + 8) * q^76 + (b13 + b12 - b11 - b10 + 8b8 - 8b7 + b6 - b5 - 10b2 - 20) q^77 + (4b12 + 2b11 - b9 - 8b8 - 4b7 + b6 - b5 - 20b4 + b3 - b2 - 7b1 - 4) * q^78 + (6b13 + 6b12 - b11 - b10 + 7b8 - 7b7 + b6 - b5 + 2b3 + 8b2 + 28) * q^79 - 4b10 q^80 + (b13 + b12 - 2b11 - 2b10 + 6b8 - 6b7 - 5b6 + 5b5 - 3b3 + 15b2 + 11) * q^81 + (-2b13 - 2b12 + 5b11 + 5b10 - 7b8 + 7b7 - 2b6 + 2b5 - 6b3 + 2b2 + 16) * q^82 + (-b13 - 8b11 + 8b7 + 20b4 + 3b2 + 3b1 + 20) q^83 + (-4b12 + 2b10 + 2b9 + 2b8 - 4b5 + 2b4 + 2b3 + 2b2 - 2b1 - 2) q^84 + (6b13 - 4b12 + 2b11 + 3b10 - 3b9 - 5b8 + 4b7 + 2b6 + 19b4 + b3 + 12b2 - 4b1 - 33) q^85 + (-7b11 + b10 - 2b9 - b8 + 7b7 - 10b4 + 2b3 - b2 - b1 - 10) q^86 + (-2b13 + 2b12 - 4b11 + 4b10 - 6b9 + b8 + b7 + 4b6 + 4b5 + 30b4 - 14b1) q^87 + (2b6 - 2b5 - 4) * q^88 + (2b13 - 2b11 - 6b10 + 6b8 + 2b7 + 2b6 - 27b4 - 4b2 - 4b1 - 27) q^89 + (3b13 + 5b12 - 2b11 - 3b10 + 4b9 + 2b8 - b7 - 2b6 - 2b5 + 14b4 + 2b3 - 6b2 + 12b1 + 2) * q^90 + (4b13 - 4b12 + 8b11 + 7b10 + 3b9 - 6b8 + b7 - 6b6 - 2b5 + 31b4 + 13b2 - 8b1 + 1) q^91 + (2b13 - 2b12 + 4b9 - 2b8 - 2b7 - 4b6 - 4b5 + 4b4 - 6b1) q^92 + (-11b13 + 14b11 + 9b10 + b9 - 9b8 - 14b7 + 4b6 + 5b4 - b3 + 6b2 + 6b1 + 5) q^93 + (-b13 - b12 - 6b11 - 6b10 + 8b3 - 8b2 - 4) * q^94 + (-4b13 + 4b12 - 4b11 + 4b10 + b9 - 6b8 - 2b6 + 2b5 - 4b4 + 2b3 - 7b2 - b1 - 34) * q^95 + (-4b2 + 4b1) * q^96 + (2b13 + 2b11 - 3b10 - 6b9 + 3b8 - 2b7 - 10b4 + 6b3 - 2b2 - 2b1 - 10) * q^97 + (2b12 - 4b11 - 8b10 + 2b9 - 8b8 - 4b7 - 2b5 - 9b4 + 2b3 - 6b2 + 6b1 + 9) q^98 + (5b10 - 2b9 - 5b8 - 3b6 + 20b4 + 2b3 - 3b2 - 3b1 + 20) * q^99
$\operatorname{Tr}(f)(q)$	$=$	$ 14 q + 14 q^{2} + 2 q^{5} - 28 q^{8} - 42 q^{9}+O(q^{10}) $ 14 * q + 14 * q^2 + 2 * q^5 - 28 * q^8 - 42 * q^9	$ 14 q + 14 q^{2} + 2 q^{5} - 28 q^{8} - 42 q^{9} - 2 q^{10} + 8 q^{11} + 8 q^{13} - 44 q^{15} - 56 q^{16} + 96 q^{17} - 42 q^{18} + 44 q^{19} - 8 q^{20} + 4 q^{21} + 8 q^{23} - 46 q^{25} + 10 q^{26} + 72 q^{29} - 40 q^{30} - 64 q^{31} - 56 q^{32} + 56 q^{33} + 96 q^{34} + 124 q^{35} + 98 q^{37} + 88 q^{38} - 144 q^{39} - 12 q^{40} + 138 q^{41} - 120 q^{43} - 16 q^{44} + 86 q^{45} + 8 q^{46} - 40 q^{47} - 74 q^{50} + 4 q^{52} - 120 q^{54} - 76 q^{55} - 264 q^{57} + 72 q^{58} - 20 q^{59} + 8 q^{60} - 180 q^{61} - 128 q^{62} - 160 q^{63} + 240 q^{65} + 112 q^{66} + 8 q^{67} + 144 q^{70} - 100 q^{71} + 84 q^{72} - 54 q^{73} + 196 q^{74} + 520 q^{75} + 88 q^{76} - 336 q^{77} - 24 q^{78} + 344 q^{79} - 8 q^{80} + 38 q^{81} + 276 q^{82} + 296 q^{83} - 8 q^{84} - 404 q^{85} - 120 q^{86} - 32 q^{88} - 398 q^{89} + 6 q^{90} + 48 q^{91} + 120 q^{93} - 80 q^{94} - 476 q^{95} - 162 q^{97} + 130 q^{98} + 292 q^{99}+O(q^{100}) $ 14 * q + 14 * q^2 + 2 * q^5 - 28 * q^8 - 42 * q^9 - 2 * q^10 + 8 * q^11 + 8 * q^13 - 44 * q^15 - 56 * q^16 + 96 * q^17 - 42 * q^18 + 44 * q^19 - 8 * q^20 + 4 * q^21 + 8 * q^23 - 46 * q^25 + 10 * q^26 + 72 * q^29 - 40 * q^30 - 64 * q^31 - 56 * q^32 + 56 * q^33 + 96 * q^34 + 124 * q^35 + 98 * q^37 + 88 * q^38 - 144 * q^39 - 12 * q^40 + 138 * q^41 - 120 * q^43 - 16 * q^44 + 86 * q^45 + 8 * q^46 - 40 * q^47 - 74 * q^50 + 4 * q^52 - 120 * q^54 - 76 * q^55 - 264 * q^57 + 72 * q^58 - 20 * q^59 + 8 * q^60 - 180 * q^61 - 128 * q^62 - 160 * q^63 + 240 * q^65 + 112 * q^66 + 8 * q^67 + 144 * q^70 - 100 * q^71 + 84 * q^72 - 54 * q^73 + 196 * q^74 + 520 * q^75 + 88 * q^76 - 336 * q^77 - 24 * q^78 + 344 * q^79 - 8 * q^80 + 38 * q^81 + 276 * q^82 + 296 * q^83 - 8 * q^84 - 404 * q^85 - 120 * q^86 - 32 * q^88 - 398 * q^89 + 6 * q^90 + 48 * q^91 + 120 * q^93 - 80 * q^94 - 476 * q^95 - 162 * q^97 + 130 * q^98 + 292 * q^99

Display 100 coefficients 10 coefficients

Basis of coefficient ring in terms of a root $\nu$ of $ x^{14} + 84x^{12} + 2668x^{10} + 40556x^{8} + 303080x^{6} + 1000960x^{4} + 1045476x^{2} + 193600 $ x^14 + 84*x^12 + 2668*x^10 + 40556*x^8 + 303080*x^6 + 1000960*x^4 + 1045476*x^2 + 193600 :

$\beta_{1}$	$=$	$ \nu $ v
$\beta_{2}$	$=$	$ ( - 4669 \nu^{12} - 346476 \nu^{10} - 9112322 \nu^{8} - 103760778 \nu^{6} - 488446468 \nu^{4} + \cdots - 48986080 ) / 180068312 $ (-4669v^12 - 346476v^10 - 9112322v^8 - 103760778v^6 - 488446468v^4 - 690311148v^2 - 48986080) / 180068312
$\beta_{3}$	$=$	$ ( - 4669 \nu^{12} - 346476 \nu^{10} - 9112322 \nu^{8} - 103760778 \nu^{6} - 488446468 \nu^{4} + \cdots + 2111833664 ) / 180068312 $ (-4669v^12 - 346476v^10 - 9112322v^8 - 103760778v^6 - 488446468v^4 - 510242836v^2 + 2111833664) / 180068312
$\beta_{4}$	$=$	$ ( - 27833 \nu^{13} - 1824382 \nu^{11} - 36146084 \nu^{9} - 126439728 \nu^{7} + \cdots + 46835492772 \nu ) / 19807514320 $ (-27833v^13 - 1824382v^11 - 36146084v^9 - 126439728v^7 + 2978059940v^5 + 25869391800v^3 + 46835492772*v) / 19807514320
$\beta_{5}$	$=$	$ ( - 11986499 \nu^{13} - 169174104 \nu^{12} + 682799468 \nu^{11} - 15606716422 \nu^{10} + \cdots + 11599785775600 ) / 12498541535920 $ (-11986499v^13 - 169174104v^12 + 682799468v^11 - 15606716422v^10 + 85649480770v^9 - 549548557580v^8 + 2281241747056v^7 - 9158494358024v^6 + 21605832497944v^5 - 70360233601196v^4 + 51283672623316v^3 - 182837248063184v^2 - 93853275290700*v + 11599785775600) / 12498541535920
$\beta_{6}$	$=$	$ ( - 11986499 \nu^{13} + 169174104 \nu^{12} + 682799468 \nu^{11} + 15606716422 \nu^{10} + \cdots - 11599785775600 ) / 12498541535920 $ (-11986499v^13 + 169174104v^12 + 682799468v^11 + 15606716422v^10 + 85649480770v^9 + 549548557580v^8 + 2281241747056v^7 + 9158494358024v^6 + 21605832497944v^5 + 70360233601196v^4 + 51283672623316v^3 + 182837248063184v^2 - 93853275290700*v - 11599785775600) / 12498541535920
$\beta_{7}$	$=$	$ ( - 72278873 \nu^{13} - 495832062 \nu^{12} - 6855618434 \nu^{11} - 38633004036 \nu^{10} + \cdots - 101689195713600 ) / 12498541535920 $ (-72278873v^13 - 495832062v^12 - 6855618434v^11 - 38633004036v^10 - 244843021960v^9 - 1105621540210v^8 - 4071142197148v^7 - 14584040456832v^6 - 31369470748452v^5 - 89324280291928v^4 - 95103442384088v^3 - 216758476874412v^2 - 79267150082900*v - 101689195713600) / 12498541535920
$\beta_{8}$	$=$	$ ( - 72278873 \nu^{13} + 495832062 \nu^{12} - 6855618434 \nu^{11} + 38633004036 \nu^{10} + \cdots + 101689195713600 ) / 12498541535920 $ (-72278873v^13 + 495832062v^12 - 6855618434v^11 + 38633004036v^10 - 244843021960v^9 + 1105621540210v^8 - 4071142197148v^7 + 14584040456832v^6 - 31369470748452v^5 + 89324280291928v^4 - 95103442384088v^3 + 216758476874412v^2 - 79267150082900*v + 101689195713600) / 12498541535920
$\beta_{9}$	$=$	$ ( - 89797 \nu^{13} - 8109888 \nu^{11} - 284301206 \nu^{9} - 4948204422 \nu^{7} + \cdots - 293610948192 \nu ) / 9903757160 $ (-89797v^13 - 8109888v^11 - 284301206v^9 - 4948204422v^7 - 44732915380v^5 - 193183463940v^3 - 293610948192*v) / 9903757160
$\beta_{10}$	$=$	$ ( - 168852424 \nu^{13} - 25605129 \nu^{12} - 13976177177 \nu^{11} - 2271622562 \nu^{10} + \cdots + 16994772218600 ) / 6249270767960 $ (-168852424v^13 - 25605129v^12 - 13976177177v^11 - 2271622562v^10 - 433967819980v^9 - 69913931065v^8 - 6369147629104v^7 - 831974562584v^6 - 44943755051106v^5 - 2294380641476v^4 - 132113758408384v^3 + 11482310900346v^2 - 86080012502320*v + 16994772218600) / 6249270767960
$\beta_{11}$	$=$	$ ( 168852424 \nu^{13} - 25605129 \nu^{12} + 13976177177 \nu^{11} - 2271622562 \nu^{10} + \cdots + 16994772218600 ) / 6249270767960 $ (168852424v^13 - 25605129v^12 + 13976177177v^11 - 2271622562v^10 + 433967819980v^9 - 69913931065v^8 + 6369147629104v^7 - 831974562584v^6 + 44943755051106v^5 - 2294380641476v^4 + 132113758408384v^3 + 11482310900346v^2 + 86080012502320*v + 16994772218600) / 6249270767960
$\beta_{12}$	$=$	$ ( - 200996947 \nu^{13} - 143545314 \nu^{12} - 16529243204 \nu^{11} - 9278768697 \nu^{10} + \cdots + 41334214997680 ) / 6249270767960 $ (-200996947v^13 - 143545314v^12 - 16529243204v^11 - 9278768697v^10 - 509099620484v^9 - 185362278750v^8 - 7380948498432v^7 - 913727797664v^6 - 50674194678556v^5 + 8172825259874v^4 - 138710630827064v^3 + 67264863202856v^2 - 83633639181468*v + 41334214997680) / 6249270767960
$\beta_{13}$	$=$	$ ( 200996947 \nu^{13} - 143545314 \nu^{12} + 16529243204 \nu^{11} - 9278768697 \nu^{10} + \cdots + 41334214997680 ) / 6249270767960 $ (200996947v^13 - 143545314v^12 + 16529243204v^11 - 9278768697v^10 + 509099620484v^9 - 185362278750v^8 + 7380948498432v^7 - 913727797664v^6 + 50674194678556v^5 + 8172825259874v^4 + 138710630827064v^3 + 67264863202856v^2 + 83633639181468*v + 41334214997680) / 6249270767960

Display $\nu^j$ in terms of $\beta_i$

$\nu$	$=$	$ \beta_1 $ b1
$\nu^{2}$	$=$	$ \beta_{3} - \beta_{2} - 12 $ b3 - b2 - 12
$\nu^{3}$	$=$	$ \beta_{13} - \beta_{12} - 2\beta_{11} + 2\beta_{10} - 2\beta_{9} - \beta_{8} - \beta_{7} - 10\beta_{4} - 20\beta_1 $ b13 - b12 - 2b11 + 2b10 - 2b9 - b8 - b7 - 10b4 - 20*b1
$\nu^{4}$	$=$	$ \beta_{13} + \beta_{12} - 2 \beta_{11} - 2 \beta_{10} + 6 \beta_{8} - 6 \beta_{7} - 5 \beta_{6} + \cdots + 254 $ b13 + b12 - 2b11 - 2b10 + 6b8 - 6b7 - 5b6 + 5b5 - 30b3 + 42b2 + 254
$\nu^{5}$	$=$	$ - 33 \beta_{13} + 33 \beta_{12} + 74 \beta_{11} - 74 \beta_{10} + 96 \beta_{9} + 24 \beta_{8} + \cdots + 478 \beta_1 $ -33b13 + 33b12 + 74b11 - 74b10 + 96b9 + 24b8 + 24b7 - 16b6 - 16b5 + 540b4 + 478*b1
$\nu^{6}$	$=$	$ - 4 \beta_{13} - 4 \beta_{12} + 115 \beta_{11} + 115 \beta_{10} - 273 \beta_{8} + 273 \beta_{7} + \cdots - 6362 $ -4b13 - 4b12 + 115b11 + 115b10 - 273b8 + 273b7 + 196b6 - 196b5 + 868b3 - 1528b2 - 6362
$\nu^{7}$	$=$	$ 914 \beta_{13} - 914 \beta_{12} - 2324 \beta_{11} + 2324 \beta_{10} - 3556 \beta_{9} + \cdots - 12798 \beta_1 $ 914b13 - 914b12 - 2324b11 + 2324b10 - 3556b9 - 596b8 - 596b7 + 772b6 + 772b5 - 20736b4 - 12798*b1
$\nu^{8}$	$=$	$ - 772 \beta_{13} - 772 \beta_{12} - 4234 \beta_{11} - 4234 \beta_{10} + 9890 \beta_{8} - 9890 \beta_{7} + \cdots + 174604 $ -772b13 - 772b12 - 4234b11 - 4234b10 + 9890b8 - 9890b7 - 6292b6 + 6292b5 - 25566b3 + 51966b2 + 174604
$\nu^{9}$	$=$	$ - 24658 \beta_{13} + 24658 \beta_{12} + 70776 \beta_{11} - 70776 \beta_{10} + 119908 \beta_{9} + \cdots + 366236 \beta_1 $ -24658b13 + 24658b12 + 70776b11 - 70776b10 + 119908b9 + 17234b8 + 17234b7 - 28252b6 - 28252b5 + 716044b4 + 366236*b1
$\nu^{10}$	$=$	$ 45302 \beta_{13} + 45302 \beta_{12} + 135388 \beta_{11} + 135388 \beta_{10} - 331420 \beta_{8} + \cdots - 5053060 $ 45302b13 + 45302b12 + 135388b11 + 135388b10 - 331420b8 + 331420b7 + 193830b6 - 193830b5 + 767984b3 - 1702808b2 - 5053060
$\nu^{11}$	$=$	$ 675178 \beta_{13} - 675178 \beta_{12} - 2151304 \beta_{11} + 2151304 \beta_{10} - 3882672 \beta_{9} + \cdots - 10878172 \beta_1 $ 675178b13 - 675178b12 - 2151304b11 + 2151304b10 - 3882672b9 - 544712b8 - 544712b7 + 945072b6 + 945072b5 - 23577992b4 - 10878172*b1
$\nu^{12}$	$=$	$ - 1870796 \beta_{13} - 1870796 \beta_{12} - 4129946 \beta_{11} - 4129946 \beta_{10} + 10731254 \beta_{8} + \cdots + 150784228 $ -1870796b13 - 1870796b12 - 4129946b11 - 4129946b10 + 10731254b8 - 10731254b7 - 5936516b6 + 5936516b5 - 23393376b3 + 54614080b2 + 150784228
$\nu^{13}$	$=$	$ - 18986992 \beta_{13} + 18986992 \beta_{12} + 65713672 \beta_{11} - 65713672 \beta_{10} + \cdots + 329791252 \beta_1 $ -18986992b13 + 18986992b12 + 65713672b11 - 65713672b10 + 123344480b9 + 17669072b8 + 17669072b7 - 30475824b6 - 30475824b5 + 757538992b4 + 329791252*b1

Display $\beta_i$ in terms of $\nu^j$

Character values

We give the values of $\chi$ on generators for $\left(\mathbb{Z}/130\mathbb{Z}\right)^\times$.

$n$	$27$	$41$
$\chi(n)$	$-1$	$-\beta_{4}$

Embeddings

For each embedding $\iota_m$ of the coefficient field, the values $\iota_m(a_n)$ are shown below.

For more information on an embedded modular form you can click on its label.

comment: embeddings in the coefficient field

gp: mfembed(f)

Label

$\iota_m(\nu)$

$ a_{2} $

$ a_{3} $

$ a_{4} $

$ a_{5} $

$ a_{6} $

$ a_{7} $

$ a_{8} $

$ a_{9} $

$ a_{10} $

99.1

		4.36592i
		3.84840i
		2.42206i
	−	0.483741i
	−	1.18066i
	−	3.39370i
	−	5.57826i
		5.57826i
		3.39370i
		1.18066i
		0.483741i
	−	2.42206i
	−	3.84840i
	−	4.36592i

1.00000

−

1.00000i

−

4.36592i

−

2.00000i

−2.40291

−

4.38475i

−4.36592

−

4.36592i

8.01138

8.01138i

−2.00000

−

2.00000i

−10.0613

−6.78766

−

1.98184i

99.2

1.00000

−

1.00000i

−

3.84840i

−

2.00000i

4.98149

0.429852i

−3.84840

−

3.84840i

−2.44952

−

2.44952i

−2.00000

−

2.00000i

−5.81016

5.41134

−

4.55164i

99.3

1.00000

−

1.00000i

−

2.42206i

−

2.00000i

−4.70813

1.68330i

−2.42206

−

2.42206i

−7.75310

−

7.75310i

−2.00000

−

2.00000i

3.13365

−3.02484

6.39143i

99.4

1.00000

−

1.00000i

0.483741i

−

2.00000i

2.27109

4.45445i

0.483741

0.483741i

4.16889

4.16889i

−2.00000

−

2.00000i

8.76599

6.72554

2.18336i

99.5

1.00000

−

1.00000i

1.18066i

−

2.00000i

−0.234938

−

4.99448i

1.18066

1.18066i

−5.55697

−

5.55697i

−2.00000

−

2.00000i

7.60603

−5.22942

−

4.75954i

99.6

1.00000

−

1.00000i

3.39370i

−

2.00000i

3.49911

−

3.57158i

3.39370

3.39370i

4.87525

4.87525i

−2.00000

−

2.00000i

−2.51723

−0.0724711

−

7.07070i

99.7

1.00000

−

1.00000i

5.57826i

−

2.00000i

−2.40571

4.38321i

5.57826

5.57826i

−1.29593

−

1.29593i

−2.00000

−

2.00000i

−22.1170

1.97750

6.78893i

109.1

1.00000

1.00000i

−

5.57826i

2.00000i

−2.40571

−

4.38321i

5.57826

−

5.57826i

−1.29593

1.29593i

−2.00000

2.00000i

−22.1170

1.97750

−

6.78893i

109.2

1.00000

1.00000i

−

3.39370i

2.00000i

3.49911

3.57158i

3.39370

−

3.39370i

4.87525

−

4.87525i

−2.00000

2.00000i

−2.51723

−0.0724711

7.07070i

109.3

1.00000

1.00000i

−

1.18066i

2.00000i

−0.234938

4.99448i

1.18066

−

1.18066i

−5.55697

5.55697i

−2.00000

2.00000i

7.60603

−5.22942

4.75954i

109.4

1.00000

1.00000i

−

0.483741i

2.00000i

2.27109

−

4.45445i

0.483741

−

0.483741i

4.16889

−

4.16889i

−2.00000

2.00000i

8.76599

6.72554

−

2.18336i

109.5

1.00000

1.00000i

2.42206i

2.00000i

−4.70813

−

1.68330i

−2.42206

2.42206i

−7.75310

7.75310i

−2.00000

2.00000i

3.13365

−3.02484

−

6.39143i

109.6

1.00000

1.00000i

3.84840i

2.00000i

4.98149

−

0.429852i

−3.84840

3.84840i

−2.44952

2.44952i

−2.00000

2.00000i

−5.81016

5.41134

4.55164i

109.7

1.00000

1.00000i

4.36592i

2.00000i

−2.40291

4.38475i

−4.36592

4.36592i

8.01138

−

8.01138i

−2.00000

2.00000i

−10.0613

−6.78766

1.98184i

Inner twists

Char	Parity	Ord	Mult	Type
1.a	even	1	1	trivial
65.g	odd	4	1	inner

Twists

By twisting character orbit
Char	Parity	Ord	Mult	Type	Twist	Min	Dim
1.a	even	1	1	trivial	130.3.f.b	yes	14
5.b	even	2	1		130.3.f.a	✓	14
5.c	odd	4	1		650.3.k.l		14
5.c	odd	4	1		650.3.k.m		14
13.d	odd	4	1		130.3.f.a	✓	14
65.f	even	4	1		650.3.k.l		14
65.g	odd	4	1	inner	130.3.f.b	yes	14
65.k	even	4	1		650.3.k.m		14

By twisted newform orbit
Twist	Min	Dim	Char	Parity	Ord	Mult	Type
130.3.f.a	✓	14	5.b	even	2	1
130.3.f.a	✓	14	13.d	odd	4	1
130.3.f.b	yes	14	1.a	even	1	1	trivial
130.3.f.b	yes	14	65.g	odd	4	1	inner
650.3.k.l		14	5.c	odd	4	1
650.3.k.l		14	65.f	even	4	1
650.3.k.m		14	5.c	odd	4	1
650.3.k.m		14	65.k	even	4	1

Hecke kernels

This newform subspace can be constructed as the kernel of the linear operator $ T_{7}^{14} + 64 T_{7}^{11} + 19184 T_{7}^{10} + 5776 T_{7}^{9} + 2048 T_{7}^{8} + 410992 T_{7}^{7} + \cdots + 63476270208 $ T7^14 + 64*T7^11 + 19184*T7^10 + 5776*T7^9 + 2048*T7^8 + 410992*T7^7 + 58999264*T7^6 - 1511872*T7^5 + 3695744*T7^4 + 2804394944*T7^3 + 26805548176*T7^2 + 58335516096*T7 + 63476270208 acting on $S_{3}^{\mathrm{new}}(130, [\chi])$.

Hecke characteristic polynomials

$p$	$F_p(T)$
$2$	$ (T^{2} - 2 T + 2)^{7} $ (T^2 - 2*T + 2)^7
$3$	$ T^{14} + 84 T^{12} + \cdots + 193600 $ T^14 + 84T^12 + 2668T^10 + 40556T^8 + 303080T^6 + 1000960T^4 + 1045476T^2 + 193600
$5$	$ T^{14} + \cdots + 6103515625 $ T^14 - 2T^13 + 25T^12 - 120T^11 + 467T^10 - 1990T^9 - 4581T^8 - 44400T^7 - 114525T^6 - 1243750T^5 + 7296875T^4 - 46875000T^3 + 244140625T^2 - 488281250*T + 6103515625
$7$	$ T^{14} + \cdots + 63476270208 $ T^14 + 64T^11 + 19184T^10 + 5776T^9 + 2048T^8 + 410992T^7 + 58999264T^6 - 1511872T^5 + 3695744T^4 + 2804394944T^3 + 26805548176T^2 + 58335516096*T + 63476270208
$11$	$ T^{14} + \cdots + 35146428192 $ T^14 - 8T^13 + 32T^12 + 2068T^11 + 59292T^10 + 6480T^9 + 189128T^8 + 8344864T^7 + 128682788T^6 + 213090104T^5 + 241826528T^4 + 1567276048T^3 + 14742330724T^2 + 32191311504*T + 35146428192
$13$	$ T^{14} + \cdots + 39\!\cdots\!89 $ T^14 - 8T^13 + 285T^12 - 1424T^11 + 33863T^10 + 32552T^9 - 387517T^8 + 74170720T^7 - 65490373T^6 + 929717672T^5 + 163450233167T^4 - 1161600546704T^3 + 39289670176965T^2 - 186384680979848*T + 3937376385699289
$17$	$ (T^{7} - 48 T^{6} + \cdots + 210654400)^{2} $ (T^7 - 48T^6 - 30T^5 + 27552T^4 - 200300T^3 - 4234272T^2 + 28223672T + 210654400)^2
$19$	$ T^{14} + \cdots + 35\!\cdots\!52 $ T^14 - 44T^13 + 968T^12 - 4788T^11 + 57416T^10 - 2825416T^9 + 80202088T^8 - 249036120T^7 + 605464204T^6 - 41904694856T^5 + 1836706868672T^4 - 1419166981632T^3 + 168804296164T^2 - 34598782759184*T + 3545750302629152
$23$	$ (T^{7} - 4 T^{6} + \cdots - 389696200)^{2} $ (T^7 - 4T^6 - 2380T^5 + 21664T^4 + 1156496T^3 - 24505500T^2 + 169939818T - 389696200)^2
$29$	$ (T^{7} - 36 T^{6} + \cdots + 6769663296)^{2} $ (T^7 - 36T^6 - 3016T^5 + 82228T^4 + 2210588T^3 - 48329400T^2 - 404084540T + 6769663296)^2
$31$	$ T^{14} + \cdots + 81\!\cdots\!00 $ T^14 + 64T^13 + 2048T^12 + 40948T^11 + 10386820T^10 + 662381912T^9 + 21958604360T^8 + 358195783232T^7 + 5308606689764T^6 + 147384370379624T^5 + 4522801869295872T^4 + 71204394288795360T^3 + 657792483482164900T^2 + 3280193611687002000*T + 8178620461876980000
$37$	$ T^{14} + \cdots + 16\!\cdots\!88 $ T^14 - 98T^13 + 4802T^12 - 71920T^11 + 7530396T^10 - 643525656T^9 + 29490795896T^8 - 544707514848T^7 + 7658147578752T^6 - 248370559120512T^5 + 11726518101571584T^4 - 217813911504688512T^3 + 1967861205901095696T^2 + 2547260619500490336*T + 1648626601358016288
$41$	$ T^{14} + \cdots + 50\!\cdots\!28 $ T^14 - 138T^13 + 9522T^12 - 364480T^11 + 33559776T^10 - 3625763936T^9 + 247222071296T^8 - 9250635835648T^7 + 288981859721472T^6 - 14034205443602432T^5 + 833071557175578624T^4 - 30299904914391985152T^3 + 672506087756073296896T^2 - 8254282089064111540224*T + 50656175495140931094528
$43$	$ (T^{7} + 60 T^{6} + \cdots + 3768790720)^{2} $ (T^7 + 60T^6 - 3992T^5 - 219296T^4 + 3934532T^3 + 132241436T^2 - 2214745286T + 3768790720)^2
$47$	$ T^{14} + \cdots + 18\!\cdots\!00 $ T^14 + 40T^13 + 800T^12 - 13296T^11 + 71837264T^10 + 2630987200T^9 + 47858068608T^8 + 1394207570256T^7 + 1040218631448000T^6 + 43653942671415360T^5 + 918499532003002112T^4 + 3669627507546774400T^3 + 1943866189314944410000T^2 + 84214116314601770424000*T + 1824204110764599111196800
$53$	$ T^{14} + \cdots + 65\!\cdots\!00 $ T^14 + 15648T^12 + 90444736T^10 + 247227801344T^8 + 342795352503296T^6 + 236336233138462720T^4 + 72404647928936546304T^2 + 6546105499622440960000
$59$	$ T^{14} + \cdots + 18\!\cdots\!08 $ T^14 + 20T^13 + 200T^12 - 459012T^11 + 102929168T^10 - 1581897392T^9 + 53122226632T^8 - 19364735603832T^7 + 2907210764133420T^6 - 108104584783493592T^5 + 1928485260358576800T^4 + 12086655264933164784T^3 + 62223926830554509476T^2 - 485218238911280566096*T + 1891850541780299659808
$61$	$ (T^{7} + 90 T^{6} + \cdots - 398456455688)^{2} $ (T^7 + 90T^6 - 5372T^5 - 557532T^4 + 6050816T^3 + 919410960T^2 + 351685924T - 398456455688)^2
$67$	$ T^{14} + \cdots + 17\!\cdots\!72 $ T^14 - 8T^13 + 32T^12 + 396496T^11 + 148848912T^10 + 2957757552T^9 + 50179313408T^8 + 14926604930448T^7 + 4397156581550688T^6 + 113114191230479360T^5 + 1777745270568157568T^4 + 167066091470331177536T^3 + 32680544368424015503504T^2 + 1065650723013786486960576*T + 17374426977982581623993472
$71$	$ T^{14} + \cdots + 16\!\cdots\!00 $ T^14 + 100T^13 + 5000T^12 + 208252T^11 + 44205872T^10 + 4355807392T^9 + 236235826952T^8 + 7222477707592T^7 + 235916635972396T^6 + 12669006293275912T^5 + 634931167073719072T^4 + 18726232238566893520T^3 + 336190116897756168100T^2 + 3313038052643429374000*T + 16324425654668352980000
$73$	$ T^{14} + \cdots + 35\!\cdots\!00 $ T^14 + 54T^13 + 1458T^12 - 225360T^11 + 332340956T^10 + 18957582600T^9 + 564549911352T^8 - 111009753802272T^7 + 9799703734019296T^6 + 186091167079602240T^5 + 12850024864450852800T^4 - 2376607720206269520000T^3 + 146539095425840354410000T^2 - 3208024848251666162100000*T + 35114941159877532100500000
$79$	$ (T^{7} + \cdots + 2603398327360)^{2} $ (T^7 - 172T^6 - 11852T^5 + 2359784T^4 + 27945832T^3 - 6846037504T^2 - 94433131600T + 2603398327360)^2
$83$	$ T^{14} + \cdots + 16\!\cdots\!92 $ T^14 - 296T^13 + 43808T^12 - 3599368T^11 + 187606808T^10 - 7757534368T^9 + 555276127776T^8 - 41511229715184T^7 + 2068811047167216T^6 - 58423578029154016T^5 + 1993184464505674624T^4 - 113705853474028694848T^3 + 5475888920643310291600T^2 - 135755671387038454397120*T + 1682795485886193980657792
$89$	$ T^{14} + \cdots + 70\!\cdots\!00 $ T^14 + 398T^13 + 79202T^12 + 9335904T^11 + 710503884T^10 + 34473275880T^9 + 1026586928280T^8 + 16307085262080T^7 + 282239328582704T^6 + 14730797095007392T^5 + 559695610724787808T^4 + 4998031410789305856T^3 + 2464052197552960576T^2 + 587458316682470299520*T + 70028401626825535875200
$97$	$ T^{14} + \cdots + 26\!\cdots\!00 $ T^14 + 162T^13 + 13122T^12 + 336384T^11 + 260344560T^10 + 43910158688T^9 + 3753781488864T^8 + 68463255521792T^7 - 1316386560840960T^6 - 78010153365287424T^5 + 14440351299848955392T^4 - 239940902955769618432T^3 + 1847878350380788781056T^2 + 31462475751207424368640*T + 267844303763646283980800
show more
show less

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 $\F_{q}$

Level:	\( N \)	\(=\)	\( 130 = 2 \cdot 5 \cdot 13 \)
Weight:	\( k \)	\(=\)	\( 3 \)
Character orbit:	\([\chi]\)	\(=\)	130.f (of order \(4\), degree \(2\), minimal)

\(f(q)\)	\(=\)	\( q + (\beta_{4} + 1) q^{2} - \beta_1 q^{3} + 2 \beta_{4} q^{4} + \beta_{10} q^{5} + (\beta_{2} - \beta_1) q^{6} + \beta_{12} q^{7} + (2 \beta_{4} - 2) q^{8} + (\beta_{3} - \beta_{2} - 3) q^{9}+O(q^{10}) \) q + (b4 + 1) * q^2 - b1 * q^3 + 2b4 q^4 + b10 * q^5 + (b2 - b1) * q^6 + b12 * q^7 + (2b4 - 2) q^8 + (b3 - b2 - 3) * q^9	\( q + (\beta_{4} + 1) q^{2} - \beta_1 q^{3} + 2 \beta_{4} q^{4} + \beta_{10} q^{5} + (\beta_{2} - \beta_1) q^{6} + \beta_{12} q^{7} + (2 \beta_{4} - 2) q^{8} + (\beta_{3} - \beta_{2} - 3) q^{9} + (\beta_{10} - \beta_{7}) q^{10} + ( - \beta_{6} + \beta_{4} + 1) q^{11} + 2 \beta_{2} q^{12} + ( - \beta_{12} + \beta_{11} + \cdots - \beta_1) q^{13}+ \cdots + (5 \beta_{10} - 2 \beta_{9} + \cdots + 20) q^{99}+O(q^{100}) \) q + (b4 + 1) * q^2 - b1 * q^3 + 2b4 q^4 + b10 * q^5 + (b2 - b1) * q^6 + b12 * q^7 + (2b4 - 2) q^8 + (b3 - b2 - 3) * q^9 + (b10 - b7) * q^10 + (-b6 + b4 + 1) * q^11 + 2b2 q^12 + (-b12 + b11 - b9 + b8 + b7 + b6 + b2 - b1) * q^13 + (b13 + b12) * q^14 + (-b13 + b11 + b9 - 2b8 - b7 - b5 + b3 - 4) q^15 - 4 * q^16 + (-2b11 - 2b10 - b8 + b7 + b6 - b5 + 2b2 + 6) q^17 + (-b9 - 3b4 + b3 - b2 - b1 - 3) q^18 + (-b11 - b7 + b5 - 4b4 + b2 - b1 + 4) q^19 - 2b7 q^20 + (2b13 - b11 + b9 + b7 - 2b6 + b4 - b3 - b2 - b1 + 1) * q^21 + (-b6 - b5 + 2b4) q^22 + (b13 + b12 + b11 + b10 - 2b6 + 2b5 - 2b3 - 3b2 + 2) * q^23 + (2b2 + 2b1) * q^24 + (-2b13 + b10 + b8 + 2b6 + b4 - 2b2 + 4b1 - 4) * q^25 + (-b13 - b12 + 2b11 + b10 - b9 + b7 + b6 + b5 - b3 + 2b2) * q^26 + (-b13 + b12 + 2b11 - 2b10 + 2b9 + b8 + b7 + 10b4 + 2b1) q^27 + 2b13 q^28 + (-b13 - b12 - 2b11 - 2b10 + 2b8 - 2b7 + b6 - b5 - b3 - 3b2 + 6) q^29 + (-b13 + b12 - b11 - b10 - 3b8 - b7 + b6 - b5 - 4b4 + 2b3 - 4) q^30 + (-4b12 + 3b11 + 3b10 - b9 + 3b8 + 3b7 + b5 + 5b4 - b3 - b2 + b1 - 5) * q^31 + (-4b4 - 4) q^32 + (-b12 + b10 - b9 + b8 + 2b5 - 5b4 - b3 - 2b2 + 2b1 + 5) * q^33 + (-3b11 - b10 + b8 + 3b7 + 2b6 + 6b4 + 2b2 + 2b1 + 6) * q^34 + (b13 - b12 - 4b11 - 2b10 + 2b9 + 2b6 - 2b5 - 2b4 + b3 + b2 - 2b1 + 8) q^35 + (-2b9 - 6b4 - 2b1) q^36 + (b12 - 2b11 + 2b10 - 2b9 + 2b8 - 2b7 + 2b5 - 9b4 - 2b3 - 2b2 + 2b1 + 9) * q^37 + (-b11 - b10 + b8 - b7 - b6 + b5 + 2b2 + 8) q^38 + (-2b13 + 2b12 + 5b11 + 2b10 - 3b8 - 2b7 - b5 - 8b4 + b3 - 4b2 - 3b1 - 12) q^39 + (-2b10 - 2b7) * q^40 + (-2b12 + 6b11 - b10 - 3b9 - b8 + 6b7 + 2b5 - 8b4 - 3b3 + b2 - b1 + 8) q^41 + (2b13 - 2b12 - b11 + b10 + 2b9 + b8 + b7 - 2b6 - 2b5 + 2b4 - 2b1) q^42 + (-3b11 - 3b10 - 4b8 + 4b7 + 2b3 - b2 - 10) q^43 + (-2b5 + 2b4 - 2) * q^44 + (-b13 + 4b12 - 2b11 - b10 + 3b9 - 2b7 - 2b6 + 6b4 - b3 + 3b2 + 9b1 + 8) * q^45 + (2b13 + b11 + b10 + 2b9 - b8 - b7 - 4b6 + 2b4 - 2b3 - 3b2 - 3b1 + 2) q^46 + (-b12 - 3b11 - 3b10 + 4b9 - 3b8 - 3b7 + 2b4 + 4b3 - 4b2 + 4b1 - 2) q^47 + 4b1 q^48 + (-b13 + b12 + 2b11 - 2b10 + 2b9 - 6b8 - 6b7 - b6 - b5 - 9b4 + 6b1) q^49 + (-2b13 + 2b12 + b11 + b10 + b8 - b7 + 2b6 + 2b5 - 3b4 - 6b2 + 2b1 - 5) q^50 + (2b13 - 2b12 - 2b9 + 6b8 + 6b7 - b6 - b5 - 6b4 - 14b1) q^51 + (-2b13 + 2b11 + 2b10 - 2b8 + 2b5 - 2b3 + 2b2 + 2b1) * q^52 + (2b13 - 2b12 + 4b11 - 4b10 + 2b9 + 2b8 + 2b7 - 2b6 - 2b5 - 8b4) * q^53 + (2b12 + 3b11 - b10 + 2b9 - b8 + 3b7 + 10b4 + 2b3 - 2b2 + 2b1 - 10) * q^54 + (b13 + 3b12 - 3b11 - b10 + 4b8 - 2b7 - b6 - 3b5 - 4b4 + b3 - b2 - 3b1 - 4) q^55 + (2b13 - 2b12) * q^56 + (b13 - 3b11 - 4b9 + 3b7 + 4b6 - 21b4 + 4b3 - 2b2 - 2b1 - 21) * q^57 + (-2b13 - 4b10 + b9 + 4b8 + 2b6 + 6b4 - b3 - 3b2 - 3b1 + 6) q^58 + (-8b13 - 3b11 + 2b10 - b9 - 2b8 + 3b7 + 3b6 - 4b4 + b3 + 6b2 + 6b1 - 4) q^59 + (2b12 - 4b11 - 2b10 - 2b9 - 2b8 + 2b6 - 8b4 + 2b3) * q^60 + (-3b11 - 3b10 - 3b8 + 3b7 - 2b6 + 2b5 - 3b3 + 7b2 - 12) * q^61 + (-4b13 - 4b12 + 6b11 + 6b10 - b6 + b5 - 2b3 - 2b2 - 10) * q^62 + (-b12 - b11 + 7b10 + 7b8 - b7 + 10b4 + 3b2 - 3b1 - 10) q^63 - 8b4 q^64 + (2b13 - 2b12 + 4b11 + b10 - 2b9 - 3b8 + b5 - 11b4 + 2b3 - 5b2 + 10b1 + 16) q^65 + (-b13 - b12 + b11 + b10 + b8 - b7 - 2b6 + 2b5 - 2b3 - 4b2 + 10) * q^66 + (3b13 + 8b11 + 4b10 - 2b9 - 4b8 - 8b7 + 2b3 - 2b2 - 2b1) q^67 + (-2b11 + 2b10 + 4b8 + 4b7 + 2b6 + 2b5 + 12b4 + 4b1) * q^68 + (5b13 - 5b12 - 6b11 + 6b10 + b9 - 2b8 - 2b7 + b6 + b5 + 22b4 - 3b1) * q^69 + (-2b12 - 4b11 - 2b10 + b9 + 4b8 + 2b7 + 4b6 + 6b4 + 3b3 + 3b2 - b1 + 10) q^70 + (4b11 + 3b10 - 3b9 + 3b8 + 4b7 + b5 + 8b4 - 3b3 - 4b2 + 4b1 - 8) q^71 + (-2b9 - 6b4 - 2b3 + 2b2 - 2b1 + 6) q^72 + (3b12 - 3b11 - 7b10 - 7b8 - 3b7 - 8b5 + 7b4 + 8b2 - 8b1 - 7) q^73 + (b13 + b12 + 4b8 - 4b7 - 2b6 + 2b5 - 4b3 - 4b2 + 18) * q^74 + (-2b13 + 6b12 + 2b11 - 2b10 + 2b9 - 6b8 - 2b7 + 28b4 - 4b3 + 9b2 + 2b1 + 36) q^75 + (-2b10 + 2b8 - 2b6 + 8b4 + 2b2 + 2b1 + 8) * q^76 + (b13 + b12 - b11 - b10 + 8b8 - 8b7 + b6 - b5 - 10b2 - 20) q^77 + (4b12 + 2b11 - b9 - 8b8 - 4b7 + b6 - b5 - 20b4 + b3 - b2 - 7b1 - 4) * q^78 + (6b13 + 6b12 - b11 - b10 + 7b8 - 7b7 + b6 - b5 + 2b3 + 8b2 + 28) * q^79 - 4b10 q^80 + (b13 + b12 - 2b11 - 2b10 + 6b8 - 6b7 - 5b6 + 5b5 - 3b3 + 15b2 + 11) * q^81 + (-2b13 - 2b12 + 5b11 + 5b10 - 7b8 + 7b7 - 2b6 + 2b5 - 6b3 + 2b2 + 16) * q^82 + (-b13 - 8b11 + 8b7 + 20b4 + 3b2 + 3b1 + 20) q^83 + (-4b12 + 2b10 + 2b9 + 2b8 - 4b5 + 2b4 + 2b3 + 2b2 - 2b1 - 2) q^84 + (6b13 - 4b12 + 2b11 + 3b10 - 3b9 - 5b8 + 4b7 + 2b6 + 19b4 + b3 + 12b2 - 4b1 - 33) q^85 + (-7b11 + b10 - 2b9 - b8 + 7b7 - 10b4 + 2b3 - b2 - b1 - 10) q^86 + (-2b13 + 2b12 - 4b11 + 4b10 - 6b9 + b8 + b7 + 4b6 + 4b5 + 30b4 - 14b1) q^87 + (2b6 - 2b5 - 4) * q^88 + (2b13 - 2b11 - 6b10 + 6b8 + 2b7 + 2b6 - 27b4 - 4b2 - 4b1 - 27) q^89 + (3b13 + 5b12 - 2b11 - 3b10 + 4b9 + 2b8 - b7 - 2b6 - 2b5 + 14b4 + 2b3 - 6b2 + 12b1 + 2) * q^90 + (4b13 - 4b12 + 8b11 + 7b10 + 3b9 - 6b8 + b7 - 6b6 - 2b5 + 31b4 + 13b2 - 8b1 + 1) q^91 + (2b13 - 2b12 + 4b9 - 2b8 - 2b7 - 4b6 - 4b5 + 4b4 - 6b1) q^92 + (-11b13 + 14b11 + 9b10 + b9 - 9b8 - 14b7 + 4b6 + 5b4 - b3 + 6b2 + 6b1 + 5) q^93 + (-b13 - b12 - 6b11 - 6b10 + 8b3 - 8b2 - 4) * q^94 + (-4b13 + 4b12 - 4b11 + 4b10 + b9 - 6b8 - 2b6 + 2b5 - 4b4 + 2b3 - 7b2 - b1 - 34) * q^95 + (-4b2 + 4b1) * q^96 + (2b13 + 2b11 - 3b10 - 6b9 + 3b8 - 2b7 - 10b4 + 6b3 - 2b2 - 2b1 - 10) * q^97 + (2b12 - 4b11 - 8b10 + 2b9 - 8b8 - 4b7 - 2b5 - 9b4 + 2b3 - 6b2 + 6b1 + 9) q^98 + (5b10 - 2b9 - 5b8 - 3b6 + 20b4 + 2b3 - 3b2 - 3b1 + 20) * q^99
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 14 q + 14 q^{2} + 2 q^{5} - 28 q^{8} - 42 q^{9}+O(q^{10}) \) 14 * q + 14 * q^2 + 2 * q^5 - 28 * q^8 - 42 * q^9	\( 14 q + 14 q^{2} + 2 q^{5} - 28 q^{8} - 42 q^{9} - 2 q^{10} + 8 q^{11} + 8 q^{13} - 44 q^{15} - 56 q^{16} + 96 q^{17} - 42 q^{18} + 44 q^{19} - 8 q^{20} + 4 q^{21} + 8 q^{23} - 46 q^{25} + 10 q^{26} + 72 q^{29} - 40 q^{30} - 64 q^{31} - 56 q^{32} + 56 q^{33} + 96 q^{34} + 124 q^{35} + 98 q^{37} + 88 q^{38} - 144 q^{39} - 12 q^{40} + 138 q^{41} - 120 q^{43} - 16 q^{44} + 86 q^{45} + 8 q^{46} - 40 q^{47} - 74 q^{50} + 4 q^{52} - 120 q^{54} - 76 q^{55} - 264 q^{57} + 72 q^{58} - 20 q^{59} + 8 q^{60} - 180 q^{61} - 128 q^{62} - 160 q^{63} + 240 q^{65} + 112 q^{66} + 8 q^{67} + 144 q^{70} - 100 q^{71} + 84 q^{72} - 54 q^{73} + 196 q^{74} + 520 q^{75} + 88 q^{76} - 336 q^{77} - 24 q^{78} + 344 q^{79} - 8 q^{80} + 38 q^{81} + 276 q^{82} + 296 q^{83} - 8 q^{84} - 404 q^{85} - 120 q^{86} - 32 q^{88} - 398 q^{89} + 6 q^{90} + 48 q^{91} + 120 q^{93} - 80 q^{94} - 476 q^{95} - 162 q^{97} + 130 q^{98} + 292 q^{99}+O(q^{100}) \) 14 * q + 14 * q^2 + 2 * q^5 - 28 * q^8 - 42 * q^9 - 2 * q^10 + 8 * q^11 + 8 * q^13 - 44 * q^15 - 56 * q^16 + 96 * q^17 - 42 * q^18 + 44 * q^19 - 8 * q^20 + 4 * q^21 + 8 * q^23 - 46 * q^25 + 10 * q^26 + 72 * q^29 - 40 * q^30 - 64 * q^31 - 56 * q^32 + 56 * q^33 + 96 * q^34 + 124 * q^35 + 98 * q^37 + 88 * q^38 - 144 * q^39 - 12 * q^40 + 138 * q^41 - 120 * q^43 - 16 * q^44 + 86 * q^45 + 8 * q^46 - 40 * q^47 - 74 * q^50 + 4 * q^52 - 120 * q^54 - 76 * q^55 - 264 * q^57 + 72 * q^58 - 20 * q^59 + 8 * q^60 - 180 * q^61 - 128 * q^62 - 160 * q^63 + 240 * q^65 + 112 * q^66 + 8 * q^67 + 144 * q^70 - 100 * q^71 + 84 * q^72 - 54 * q^73 + 196 * q^74 + 520 * q^75 + 88 * q^76 - 336 * q^77 - 24 * q^78 + 344 * q^79 - 8 * q^80 + 38 * q^81 + 276 * q^82 + 296 * q^83 - 8 * q^84 - 404 * q^85 - 120 * q^86 - 32 * q^88 - 398 * q^89 + 6 * q^90 + 48 * q^91 + 120 * q^93 - 80 * q^94 - 476 * q^95 - 162 * q^97 + 130 * q^98 + 292 * q^99

Introduction

L-functions

Modular forms

Varieties

Fields

Representations

Groups

Database

Properties

Related objects

Downloads

Learn more

Newspace parameters

Newform invariants

$q$-expansion

Character values

Embeddings

Inner twists

Twists

Hecke kernels

Hecke characteristic polynomials

This project is supported by grants from the US National Science Foundation, the UK Engineering and Physical Sciences Research Council, and the Simons Foundation.

Label	130.3.f.b

Level	$130$
Weight	$3$
Character orbit	130.f
Analytic conductor	$3.542$
Analytic rank	$0$
Dimension	$14$
CM	no
Inner twists	$2$

Self dual:	no
Analytic conductor:	\(3.54224343668\)
Analytic rank:	\(0\)
Dimension:	\(14\)
Relative dimension:	\(7\) over \(\Q(i)\)
Coefficient field:	\(\mathbb{Q}[x]/(x^{14} + \cdots)\)
comment: defining polynomial gp: f.mod \\ as an extension of the character field
Defining polynomial:	\( x^{14} + 84x^{12} + 2668x^{10} + 40556x^{8} + 303080x^{6} + 1000960x^{4} + 1045476x^{2} + 193600 \) x^14 + 84x^12 + 2668x^10 + 40556x^8 + 303080x^6 + 1000960x^4 + 1045476x^2 + 193600
Coefficient ring:	\(\Z[a_1, \ldots, a_{5}]\)
Coefficient ring index:	\( 2^{2} \)
Twist minimal:	yes
Sato-Tate group:	$\mathrm{SU}(2)[C_{4}]$

\(\beta_{1}\)	\(=\)	\( \nu \) v
\(\beta_{2}\)	\(=\)	\( ( - 4669 \nu^{12} - 346476 \nu^{10} - 9112322 \nu^{8} - 103760778 \nu^{6} - 488446468 \nu^{4} + \cdots - 48986080 ) / 180068312 \) (-4669v^12 - 346476v^10 - 9112322v^8 - 103760778v^6 - 488446468v^4 - 690311148v^2 - 48986080) / 180068312
\(\beta_{3}\)	\(=\)	\( ( - 4669 \nu^{12} - 346476 \nu^{10} - 9112322 \nu^{8} - 103760778 \nu^{6} - 488446468 \nu^{4} + \cdots + 2111833664 ) / 180068312 \) (-4669v^12 - 346476v^10 - 9112322v^8 - 103760778v^6 - 488446468v^4 - 510242836v^2 + 2111833664) / 180068312
\(\beta_{4}\)	\(=\)	\( ( - 27833 \nu^{13} - 1824382 \nu^{11} - 36146084 \nu^{9} - 126439728 \nu^{7} + \cdots + 46835492772 \nu ) / 19807514320 \) (-27833v^13 - 1824382v^11 - 36146084v^9 - 126439728v^7 + 2978059940v^5 + 25869391800v^3 + 46835492772*v) / 19807514320
\(\beta_{5}\)	\(=\)	\( ( - 11986499 \nu^{13} - 169174104 \nu^{12} + 682799468 \nu^{11} - 15606716422 \nu^{10} + \cdots + 11599785775600 ) / 12498541535920 \) (-11986499v^13 - 169174104v^12 + 682799468v^11 - 15606716422v^10 + 85649480770v^9 - 549548557580v^8 + 2281241747056v^7 - 9158494358024v^6 + 21605832497944v^5 - 70360233601196v^4 + 51283672623316v^3 - 182837248063184v^2 - 93853275290700*v + 11599785775600) / 12498541535920
\(\beta_{6}\)	\(=\)	\( ( - 11986499 \nu^{13} + 169174104 \nu^{12} + 682799468 \nu^{11} + 15606716422 \nu^{10} + \cdots - 11599785775600 ) / 12498541535920 \) (-11986499v^13 + 169174104v^12 + 682799468v^11 + 15606716422v^10 + 85649480770v^9 + 549548557580v^8 + 2281241747056v^7 + 9158494358024v^6 + 21605832497944v^5 + 70360233601196v^4 + 51283672623316v^3 + 182837248063184v^2 - 93853275290700*v - 11599785775600) / 12498541535920
\(\beta_{7}\)	\(=\)	\( ( - 72278873 \nu^{13} - 495832062 \nu^{12} - 6855618434 \nu^{11} - 38633004036 \nu^{10} + \cdots - 101689195713600 ) / 12498541535920 \) (-72278873v^13 - 495832062v^12 - 6855618434v^11 - 38633004036v^10 - 244843021960v^9 - 1105621540210v^8 - 4071142197148v^7 - 14584040456832v^6 - 31369470748452v^5 - 89324280291928v^4 - 95103442384088v^3 - 216758476874412v^2 - 79267150082900*v - 101689195713600) / 12498541535920
\(\beta_{8}\)	\(=\)	\( ( - 72278873 \nu^{13} + 495832062 \nu^{12} - 6855618434 \nu^{11} + 38633004036 \nu^{10} + \cdots + 101689195713600 ) / 12498541535920 \) (-72278873v^13 + 495832062v^12 - 6855618434v^11 + 38633004036v^10 - 244843021960v^9 + 1105621540210v^8 - 4071142197148v^7 + 14584040456832v^6 - 31369470748452v^5 + 89324280291928v^4 - 95103442384088v^3 + 216758476874412v^2 - 79267150082900*v + 101689195713600) / 12498541535920
\(\beta_{9}\)	\(=\)	\( ( - 89797 \nu^{13} - 8109888 \nu^{11} - 284301206 \nu^{9} - 4948204422 \nu^{7} + \cdots - 293610948192 \nu ) / 9903757160 \) (-89797v^13 - 8109888v^11 - 284301206v^9 - 4948204422v^7 - 44732915380v^5 - 193183463940v^3 - 293610948192*v) / 9903757160
\(\beta_{10}\)	\(=\)	\( ( - 168852424 \nu^{13} - 25605129 \nu^{12} - 13976177177 \nu^{11} - 2271622562 \nu^{10} + \cdots + 16994772218600 ) / 6249270767960 \) (-168852424v^13 - 25605129v^12 - 13976177177v^11 - 2271622562v^10 - 433967819980v^9 - 69913931065v^8 - 6369147629104v^7 - 831974562584v^6 - 44943755051106v^5 - 2294380641476v^4 - 132113758408384v^3 + 11482310900346v^2 - 86080012502320*v + 16994772218600) / 6249270767960
\(\beta_{11}\)	\(=\)	\( ( 168852424 \nu^{13} - 25605129 \nu^{12} + 13976177177 \nu^{11} - 2271622562 \nu^{10} + \cdots + 16994772218600 ) / 6249270767960 \) (168852424v^13 - 25605129v^12 + 13976177177v^11 - 2271622562v^10 + 433967819980v^9 - 69913931065v^8 + 6369147629104v^7 - 831974562584v^6 + 44943755051106v^5 - 2294380641476v^4 + 132113758408384v^3 + 11482310900346v^2 + 86080012502320*v + 16994772218600) / 6249270767960
\(\beta_{12}\)	\(=\)	\( ( - 200996947 \nu^{13} - 143545314 \nu^{12} - 16529243204 \nu^{11} - 9278768697 \nu^{10} + \cdots + 41334214997680 ) / 6249270767960 \) (-200996947v^13 - 143545314v^12 - 16529243204v^11 - 9278768697v^10 - 509099620484v^9 - 185362278750v^8 - 7380948498432v^7 - 913727797664v^6 - 50674194678556v^5 + 8172825259874v^4 - 138710630827064v^3 + 67264863202856v^2 - 83633639181468*v + 41334214997680) / 6249270767960
\(\beta_{13}\)	\(=\)	\( ( 200996947 \nu^{13} - 143545314 \nu^{12} + 16529243204 \nu^{11} - 9278768697 \nu^{10} + \cdots + 41334214997680 ) / 6249270767960 \) (200996947v^13 - 143545314v^12 + 16529243204v^11 - 9278768697v^10 + 509099620484v^9 - 185362278750v^8 + 7380948498432v^7 - 913727797664v^6 + 50674194678556v^5 + 8172825259874v^4 + 138710630827064v^3 + 67264863202856v^2 + 83633639181468*v + 41334214997680) / 6249270767960

\(\nu\)	\(=\)	\( \beta_1 \) b1
\(\nu^{2}\)	\(=\)	\( \beta_{3} - \beta_{2} - 12 \) b3 - b2 - 12
\(\nu^{3}\)	\(=\)	\( \beta_{13} - \beta_{12} - 2\beta_{11} + 2\beta_{10} - 2\beta_{9} - \beta_{8} - \beta_{7} - 10\beta_{4} - 20\beta_1 \) b13 - b12 - 2b11 + 2b10 - 2b9 - b8 - b7 - 10b4 - 20*b1
\(\nu^{4}\)	\(=\)	\( \beta_{13} + \beta_{12} - 2 \beta_{11} - 2 \beta_{10} + 6 \beta_{8} - 6 \beta_{7} - 5 \beta_{6} + \cdots + 254 \) b13 + b12 - 2b11 - 2b10 + 6b8 - 6b7 - 5b6 + 5b5 - 30b3 + 42b2 + 254
\(\nu^{5}\)	\(=\)	\( - 33 \beta_{13} + 33 \beta_{12} + 74 \beta_{11} - 74 \beta_{10} + 96 \beta_{9} + 24 \beta_{8} + \cdots + 478 \beta_1 \) -33b13 + 33b12 + 74b11 - 74b10 + 96b9 + 24b8 + 24b7 - 16b6 - 16b5 + 540b4 + 478*b1
\(\nu^{6}\)	\(=\)	\( - 4 \beta_{13} - 4 \beta_{12} + 115 \beta_{11} + 115 \beta_{10} - 273 \beta_{8} + 273 \beta_{7} + \cdots - 6362 \) -4b13 - 4b12 + 115b11 + 115b10 - 273b8 + 273b7 + 196b6 - 196b5 + 868b3 - 1528b2 - 6362
\(\nu^{7}\)	\(=\)	\( 914 \beta_{13} - 914 \beta_{12} - 2324 \beta_{11} + 2324 \beta_{10} - 3556 \beta_{9} + \cdots - 12798 \beta_1 \) 914b13 - 914b12 - 2324b11 + 2324b10 - 3556b9 - 596b8 - 596b7 + 772b6 + 772b5 - 20736b4 - 12798*b1
\(\nu^{8}\)	\(=\)	\( - 772 \beta_{13} - 772 \beta_{12} - 4234 \beta_{11} - 4234 \beta_{10} + 9890 \beta_{8} - 9890 \beta_{7} + \cdots + 174604 \) -772b13 - 772b12 - 4234b11 - 4234b10 + 9890b8 - 9890b7 - 6292b6 + 6292b5 - 25566b3 + 51966b2 + 174604
\(\nu^{9}\)	\(=\)	\( - 24658 \beta_{13} + 24658 \beta_{12} + 70776 \beta_{11} - 70776 \beta_{10} + 119908 \beta_{9} + \cdots + 366236 \beta_1 \) -24658b13 + 24658b12 + 70776b11 - 70776b10 + 119908b9 + 17234b8 + 17234b7 - 28252b6 - 28252b5 + 716044b4 + 366236*b1
\(\nu^{10}\)	\(=\)	\( 45302 \beta_{13} + 45302 \beta_{12} + 135388 \beta_{11} + 135388 \beta_{10} - 331420 \beta_{8} + \cdots - 5053060 \) 45302b13 + 45302b12 + 135388b11 + 135388b10 - 331420b8 + 331420b7 + 193830b6 - 193830b5 + 767984b3 - 1702808b2 - 5053060
\(\nu^{11}\)	\(=\)	\( 675178 \beta_{13} - 675178 \beta_{12} - 2151304 \beta_{11} + 2151304 \beta_{10} - 3882672 \beta_{9} + \cdots - 10878172 \beta_1 \) 675178b13 - 675178b12 - 2151304b11 + 2151304b10 - 3882672b9 - 544712b8 - 544712b7 + 945072b6 + 945072b5 - 23577992b4 - 10878172*b1
\(\nu^{12}\)	\(=\)	\( - 1870796 \beta_{13} - 1870796 \beta_{12} - 4129946 \beta_{11} - 4129946 \beta_{10} + 10731254 \beta_{8} + \cdots + 150784228 \) -1870796b13 - 1870796b12 - 4129946b11 - 4129946b10 + 10731254b8 - 10731254b7 - 5936516b6 + 5936516b5 - 23393376b3 + 54614080b2 + 150784228
\(\nu^{13}\)	\(=\)	\( - 18986992 \beta_{13} + 18986992 \beta_{12} + 65713672 \beta_{11} - 65713672 \beta_{10} + \cdots + 329791252 \beta_1 \) -18986992b13 + 18986992b12 + 65713672b11 - 65713672b10 + 123344480b9 + 17669072b8 + 17669072b7 - 30475824b6 - 30475824b5 + 757538992b4 + 329791252*b1

\(n\):		e.g. 2-40 or 990-1000
Embeddings:		e.g. 1-3 or 99.7
Significant digits:
Format:

$p$	$F_p(T)$
$2$	\( (T^{2} - 2 T + 2)^{7} \) (T^2 - 2*T + 2)^7
$3$	\( T^{14} + 84 T^{12} + \cdots + 193600 \) T^14 + 84T^12 + 2668T^10 + 40556T^8 + 303080T^6 + 1000960T^4 + 1045476T^2 + 193600
$5$	\( T^{14} + \cdots + 6103515625 \) T^14 - 2T^13 + 25T^12 - 120T^11 + 467T^10 - 1990T^9 - 4581T^8 - 44400T^7 - 114525T^6 - 1243750T^5 + 7296875T^4 - 46875000T^3 + 244140625T^2 - 488281250*T + 6103515625
$7$	\( T^{14} + \cdots + 63476270208 \) T^14 + 64T^11 + 19184T^10 + 5776T^9 + 2048T^8 + 410992T^7 + 58999264T^6 - 1511872T^5 + 3695744T^4 + 2804394944T^3 + 26805548176T^2 + 58335516096*T + 63476270208
$11$	\( T^{14} + \cdots + 35146428192 \) T^14 - 8T^13 + 32T^12 + 2068T^11 + 59292T^10 + 6480T^9 + 189128T^8 + 8344864T^7 + 128682788T^6 + 213090104T^5 + 241826528T^4 + 1567276048T^3 + 14742330724T^2 + 32191311504*T + 35146428192
$13$	\( T^{14} + \cdots + 39\!\cdots\!89 \) T^14 - 8T^13 + 285T^12 - 1424T^11 + 33863T^10 + 32552T^9 - 387517T^8 + 74170720T^7 - 65490373T^6 + 929717672T^5 + 163450233167T^4 - 1161600546704T^3 + 39289670176965T^2 - 186384680979848*T + 3937376385699289
$17$	\( (T^{7} - 48 T^{6} + \cdots + 210654400)^{2} \) (T^7 - 48T^6 - 30T^5 + 27552T^4 - 200300T^3 - 4234272T^2 + 28223672T + 210654400)^2
$19$	\( T^{14} + \cdots + 35\!\cdots\!52 \) T^14 - 44T^13 + 968T^12 - 4788T^11 + 57416T^10 - 2825416T^9 + 80202088T^8 - 249036120T^7 + 605464204T^6 - 41904694856T^5 + 1836706868672T^4 - 1419166981632T^3 + 168804296164T^2 - 34598782759184*T + 3545750302629152
$23$	\( (T^{7} - 4 T^{6} + \cdots - 389696200)^{2} \) (T^7 - 4T^6 - 2380T^5 + 21664T^4 + 1156496T^3 - 24505500T^2 + 169939818T - 389696200)^2
$29$	\( (T^{7} - 36 T^{6} + \cdots + 6769663296)^{2} \) (T^7 - 36T^6 - 3016T^5 + 82228T^4 + 2210588T^3 - 48329400T^2 - 404084540T + 6769663296)^2
$31$	\( T^{14} + \cdots + 81\!\cdots\!00 \) T^14 + 64T^13 + 2048T^12 + 40948T^11 + 10386820T^10 + 662381912T^9 + 21958604360T^8 + 358195783232T^7 + 5308606689764T^6 + 147384370379624T^5 + 4522801869295872T^4 + 71204394288795360T^3 + 657792483482164900T^2 + 3280193611687002000*T + 8178620461876980000
$37$	\( T^{14} + \cdots + 16\!\cdots\!88 \) T^14 - 98T^13 + 4802T^12 - 71920T^11 + 7530396T^10 - 643525656T^9 + 29490795896T^8 - 544707514848T^7 + 7658147578752T^6 - 248370559120512T^5 + 11726518101571584T^4 - 217813911504688512T^3 + 1967861205901095696T^2 + 2547260619500490336*T + 1648626601358016288
$41$	\( T^{14} + \cdots + 50\!\cdots\!28 \) T^14 - 138T^13 + 9522T^12 - 364480T^11 + 33559776T^10 - 3625763936T^9 + 247222071296T^8 - 9250635835648T^7 + 288981859721472T^6 - 14034205443602432T^5 + 833071557175578624T^4 - 30299904914391985152T^3 + 672506087756073296896T^2 - 8254282089064111540224*T + 50656175495140931094528
$43$	\( (T^{7} + 60 T^{6} + \cdots + 3768790720)^{2} \) (T^7 + 60T^6 - 3992T^5 - 219296T^4 + 3934532T^3 + 132241436T^2 - 2214745286T + 3768790720)^2
$47$	\( T^{14} + \cdots + 18\!\cdots\!00 \) T^14 + 40T^13 + 800T^12 - 13296T^11 + 71837264T^10 + 2630987200T^9 + 47858068608T^8 + 1394207570256T^7 + 1040218631448000T^6 + 43653942671415360T^5 + 918499532003002112T^4 + 3669627507546774400T^3 + 1943866189314944410000T^2 + 84214116314601770424000*T + 1824204110764599111196800
$53$	\( T^{14} + \cdots + 65\!\cdots\!00 \) T^14 + 15648T^12 + 90444736T^10 + 247227801344T^8 + 342795352503296T^6 + 236336233138462720T^4 + 72404647928936546304T^2 + 6546105499622440960000
$59$	\( T^{14} + \cdots + 18\!\cdots\!08 \) T^14 + 20T^13 + 200T^12 - 459012T^11 + 102929168T^10 - 1581897392T^9 + 53122226632T^8 - 19364735603832T^7 + 2907210764133420T^6 - 108104584783493592T^5 + 1928485260358576800T^4 + 12086655264933164784T^3 + 62223926830554509476T^2 - 485218238911280566096*T + 1891850541780299659808
$61$	\( (T^{7} + 90 T^{6} + \cdots - 398456455688)^{2} \) (T^7 + 90T^6 - 5372T^5 - 557532T^4 + 6050816T^3 + 919410960T^2 + 351685924T - 398456455688)^2
$67$	\( T^{14} + \cdots + 17\!\cdots\!72 \) T^14 - 8T^13 + 32T^12 + 396496T^11 + 148848912T^10 + 2957757552T^9 + 50179313408T^8 + 14926604930448T^7 + 4397156581550688T^6 + 113114191230479360T^5 + 1777745270568157568T^4 + 167066091470331177536T^3 + 32680544368424015503504T^2 + 1065650723013786486960576*T + 17374426977982581623993472
$71$	\( T^{14} + \cdots + 16\!\cdots\!00 \) T^14 + 100T^13 + 5000T^12 + 208252T^11 + 44205872T^10 + 4355807392T^9 + 236235826952T^8 + 7222477707592T^7 + 235916635972396T^6 + 12669006293275912T^5 + 634931167073719072T^4 + 18726232238566893520T^3 + 336190116897756168100T^2 + 3313038052643429374000*T + 16324425654668352980000
$73$	\( T^{14} + \cdots + 35\!\cdots\!00 \) T^14 + 54T^13 + 1458T^12 - 225360T^11 + 332340956T^10 + 18957582600T^9 + 564549911352T^8 - 111009753802272T^7 + 9799703734019296T^6 + 186091167079602240T^5 + 12850024864450852800T^4 - 2376607720206269520000T^3 + 146539095425840354410000T^2 - 3208024848251666162100000*T + 35114941159877532100500000
$79$	\( (T^{7} + \cdots + 2603398327360)^{2} \) (T^7 - 172T^6 - 11852T^5 + 2359784T^4 + 27945832T^3 - 6846037504T^2 - 94433131600T + 2603398327360)^2
$83$	\( T^{14} + \cdots + 16\!\cdots\!92 \) T^14 - 296T^13 + 43808T^12 - 3599368T^11 + 187606808T^10 - 7757534368T^9 + 555276127776T^8 - 41511229715184T^7 + 2068811047167216T^6 - 58423578029154016T^5 + 1993184464505674624T^4 - 113705853474028694848T^3 + 5475888920643310291600T^2 - 135755671387038454397120*T + 1682795485886193980657792
$89$	\( T^{14} + \cdots + 70\!\cdots\!00 \) T^14 + 398T^13 + 79202T^12 + 9335904T^11 + 710503884T^10 + 34473275880T^9 + 1026586928280T^8 + 16307085262080T^7 + 282239328582704T^6 + 14730797095007392T^5 + 559695610724787808T^4 + 4998031410789305856T^3 + 2464052197552960576T^2 + 587458316682470299520*T + 70028401626825535875200
$97$	\( T^{14} + \cdots + 26\!\cdots\!00 \) T^14 + 162T^13 + 13122T^12 + 336384T^11 + 260344560T^10 + 43910158688T^9 + 3753781488864T^8 + 68463255521792T^7 - 1316386560840960T^6 - 78010153365287424T^5 + 14440351299848955392T^4 - 239940902955769618432T^3 + 1847878350380788781056T^2 + 31462475751207424368640*T + 267844303763646283980800
show more
show less

\(n\)	\(27\)	\(41\)
\(\chi(n)\)	\(-1\)	\(-\beta_{4}\)