LMFDB - Newform orbit 825.2.bs.e

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms

[N,k,chi] = [825,2,Mod(74,825)]

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

lf = mfeigenbasis(mf)

from sage.modular.dirichlet import DirichletCharacter

H = DirichletGroup(825, base_ring=CyclotomicField(10))

chi = DirichletCharacter(H, H._module([5, 5, 3]))

N = Newforms(chi, 2, names="a")

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

chi := DirichletCharacter("825.74");

S:= CuspForms(chi, 2);

N := Newforms(S);

Level:	$ N $	$=$	$ 825 = 3 \cdot 5^{2} \cdot 11 $
Weight:	$ k $	$=$	$ 2 $
Character orbit:	$[\chi]$	$=$	825.bs (of order $10$, degree $4$, not 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:	$6.58765816676$
Analytic rank:	$0$
Dimension:	$16$
Relative dimension:	$4$ over $\Q(\zeta_{10})$
Coefficient field:	$\mathbb{Q}[x]/(x^{16} - \cdots)$
comment: defining polynomial gp: f.mod \\ as an extension of the character field
Defining polynomial:	$ x^{16} - x^{14} + 15x^{12} - 59x^{10} + 104x^{8} - 59x^{6} + 15x^{4} - x^{2} + 1 $ x^16 - x^14 + 15x^12 - 59x^10 + 104x^8 - 59x^6 + 15*x^4 - x^2 + 1
Coefficient ring:	$\Z[a_1, a_2, a_3]$
Coefficient ring index:	$ 5^{2} $
Twist minimal:	no (minimal twist has level 165)
Sato-Tate group:	$\mathrm{SU}(2)[C_{10}]$

$q$-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 $1,\beta_1,\ldots,\beta_{15}$ for the coefficient ring described below. We also show the integral $q$-expansion of the trace form.

$f(q)$	$=$	$ q + ( - \beta_{11} + \beta_{7} + \beta_{6}) q^{2} + ( - \beta_{9} + \beta_{8} + \beta_{5} - 1) q^{3} + (\beta_{12} - \beta_{7} - \beta_{6} + \cdots + 1) q^{4}+ \cdots + ( - 2 \beta_{14} - 2 \beta_{10} + \cdots + 2) q^{9}+O(q^{10}) $ q + (-b11 + b7 + b6) * q^2 + (-b9 + b8 + b5 - 1) * q^3 + (b12 - b7 - b6 + 2b2 + 1) q^4 + (b14 - b13 + b11 + b8 - b7 + b5 - b3 + b1) * q^6 + (-b15 - 2b14 - 2b10 - b8 - b3) * q^7 + (-b12 - b11 + 2b9 + b6 - b2 - b1 - 2) q^8 + (-2b14 - 2b10 + b9 - 2b8 - 2b5 - 2b2 + 2) q^9	$ q + ( - \beta_{11} + \beta_{7} + \beta_{6}) q^{2} + ( - \beta_{9} + \beta_{8} + \beta_{5} - 1) q^{3} + (\beta_{12} - \beta_{7} - \beta_{6} + \cdots + 1) q^{4}+ \cdots + ( - 2 \beta_{15} - 4 \beta_{14} + \cdots - 4) q^{99}+O(q^{100}) $ q + (-b11 + b7 + b6) * q^2 + (-b9 + b8 + b5 - 1) * q^3 + (b12 - b7 - b6 + 2b2 + 1) q^4 + (b14 - b13 + b11 + b8 - b7 + b5 - b3 + b1) * q^6 + (-b15 - 2b14 - 2b10 - b8 - b3) * q^7 + (-b12 - b11 + 2b9 + b6 - b2 - b1 - 2) q^8 + (-2b14 - 2b10 + b9 - 2b8 - 2b5 - 2b2 + 2) q^9 + (-b15 - 2b13 - b10 + b5 - b3) q^11 + (b15 + b14 - b13 - b11 - b9 + b8 + 2b7 + 2b6 - b5 + b3 - b2 - 2) * q^12 + (-b10 + b3) * q^13 + (-b15 - 2b14 + b13 + b10 + 5b8 + 4b5 - 4b4 - 2b3) q^14 + (2b12 + 2b11 + b9 - b7 - 4b6) q^16 + (2b11 - 2b7 + b6 + 2b2 + 2b1 - 2) * q^17 + (-2b14 + 2b13 + 2b12 + 2b7 + b6 - 2b4 + b1) q^18 + (b12 + b11 + 3b9 + b7 + b6 - b2 + 2b1 - 3) * q^19 + (b15 + b14 + b13 - b12 + b11 + 2b10 + b9 - b8 - 2b6 + b5 + b3 - 4b2 + 1) q^21 + (b15 + 5b14 + 5b10 + 3b8 + 3b5 - b4 + b3) * q^22 + (-b12 - 3b9 - 2b7 + b6 + b2 - 2b1) q^23 + (b15 + 3b14 + b12 + b11 + b10 + b9 - 3b8 - b7 - 2b6 - 2b5 + b4 + b3 + 3b2 + b1 + 4) q^24 + (b14 - 2b8 + b5) q^26 + (b14 + b10 + b9 - 4b6 + 4b5 - b2) * q^27 + (8b14 - 5b13 - 3b10 + 4b8 + 5b5 + b4 - 5b3) * q^28 + (b15 + 2b14 - b13 + 2b10 + b8 + b5 + b4 + b3) * q^29 + (b12 - b11 + 2b9 - b7 - 2b6 - b2 - 3b1 + 4) q^31 + (-2b12 + b9 + 3b6 - 1) * q^32 + (b15 + b13 + b12 - b11 + 2b10 + 2b9 + 2b7 + b5 - b3 - 2b2 + 2b1 + 1) q^33 + (-b12 - 2b11 - 6b9 + 2b7 + 6b6 - b2 - 2b1 - 8) q^34 + (-2b15 - 2b13 + b12 - b11 - 2b10 + 3b9 - b7 + b6 + 2b5 - 4b3 + b2 + 2b1 + 3) q^36 + (-2b15 - b13 + 3b8 + b5 - b4) * q^37 + (2b12 + 2b11 - b9 - b7 + b6 + 2b2) q^38 + (-b13 - b11 + b10 - b6 + b5 + b4 - b3 - b2 - b1 + 2) * q^39 + (-b14 - 3b13 - 2b10 - 4b8 + 3b5) * q^41 + (-3b15 - 3b14 - 2b13 + 2b12 + 3b11 - 3b10 - 2b9 - 3b8 + 3b7 + b6 - 2b5 + 3b4 - b3 - 5b2 + 4b1 + 1) q^42 + (b14 + 2b10 - b8 + b5 + b4 + b3) q^43 + (3b14 - 3b13 - 2b10 - 6b8 - 6b5 + 4b4) * q^44 + (b11 + b9 - b7 - 3b6 - 3b2 - 1) * q^46 + (-4b9 + b7 + 6b6 + 6b2 - b1 - 4) q^47 + (-b15 - 3b14 - 3b12 - 4b11 - 3b8 + 3b7 + 3b6 - 3b5 + b3 - b2 - 2b1 - 1) * q^48 + (-2b12 + 3b11 - 4b7 - 6b6 - b2 - 5b1) q^49 + (b14 + 2b13 + 2b12 + 2b10 + b8 + 2b7 - b6 - b5 - 2b4 - 2b1 + 1) * q^51 + (-b15 - 4b14 - b13 - 2b10 - b8 - 2b5) q^52 + (-b12 - b9 + b6 - 2b2 + b1 + 1) q^53 + (-4b15 - 4b13 - 3b12 + b11 + 3b8 - b6 + 3b5 + b4 - 3b3 - 4b2) q^54 + (2b15 + 5b14 - 2b13 + 7b10 + 11b8 - 4b5 - 2b4 + 4b3) * q^56 + (-2b15 + b14 - b12 + 3b10 - b8 - b6 - 2b4 - 3b3 + 2b2 - b1 + 3) q^57 + (b15 + 2b14 - b13 + 2b10 - 4b8 - 3b5 + 4b4 + 2b3) * q^58 + (-3b14 + b13 + 3b8 - 4b5 + b4 + 2b3) * q^59 + (b11 - 4b9 - 3b7 + 3b6 + 4b2 + b1 - 6) * q^61 + (-b12 + 10b9 - b7 - 8b6 - 5b2 - 3b1 + 5) * q^62 + (-2b15 - 7b14 + b13 - 2b10 - 2b8 - 2b7 - 4b6 - 3b5 + 4b2 - 2b1) q^63 + (-b12 - b11 - 4b9 - b7 + 5b2 - b1 - 4) * q^64 + (-2b15 - 4b14 - 2b13 + 2b12 - b11 - 3b10 - 2b9 + 3b8 + b7 + 4b6 - 3b5 + b4 - 2b3 + 7b2 + b1 - 1) q^66 + (-b15 - 6b14 + b13 + 3b10 + 2b8 + b5 - b3) q^67 + (3b12 + 7b11 + b9 - 7b7 - 6b6 + 8b2 + 3b1 + 7) * q^68 + (2b15 + b14 + b13 + b12 - b11 - 3b10 + 3b9 + b7 - 2b6 - b5 + 2b4 + 4b3 - 2b2 + 3) q^69 + (4b15 - b14 + 3b13 - 2b10 - 2b8 - 7b5 - b4 + b3) q^71 + (2b14 - 2b11 + 6b10 - 5b9 + 10b8 + b7 + 5b6 + 4b5 - 2b4 + 6b2 - 2b1 - 10) * q^72 + (-2b15 - b14 + b13 - 4b10 - 2b8 - 4b5 - b4 - 2b3) q^73 + (3b15 + 9b14 + 3b10 - b8 + 7b5) * q^74 + (-3b12 + b9 + 7b6 + 3b2 - 3) q^76 + (3b12 + 5b11 - 2b9 - b6 - 2b2 + 5b1 + 1) q^77 + (-b14 + 3b10 + 2b9 + 3b8 - 2b6 + 1) * q^78 + (2b12 - 2b11 + 2b9 + 2b7 + b2 + 2b1 + 3) q^79 + (-8b14 - 4b8 - 8b5 - b2) q^81 + (-4b15 + 5b14 - 3b13 + 6b10 + 2b8 + 4b5 + b4 - b3) * q^82 + (-b11 - 3b7 + 4b2 - b1) * q^83 + (b15 - 5b14 + 6b13 + 4b12 + 6b10 + 3b8 + 4b7 + 12b6 + 5b5 - 6b4 + b3 + 9b1 + 3) * q^84 + (-2b15 - 3b14 + b10 - 3b8 + b5 + 2b4) * q^86 + (-2b14 + b12 - 2b11 - 3b10 - b9 + b6 - 3b5 - b4 - b3 + 3b2) q^87 + (3b15 - 5b14 + 8b13 + 2b10 - b8 - 9b5 - 3b4 + 8b3) q^88 + (-2b15 - 9b14 + 2b13 - 5b10 - 3b8 - 2b5 - 4b4 + 2b3) * q^89 + (-b7 + b6 + b2 + b1) * q^91 + (-5b6 - 8b2 + 5) * q^92 + (2b15 + 2b14 - 2b13 - 2b12 - 3b11 - 2b10 - 2b9 - b8 + 2b7 + 3b4 + 4b3 + b2 + b1) * q^93 + (-b11 + 4b9 - 5b7 - 3b6 + 4b2 - b1 + 6) * q^94 + (4b14 + 2b13 + 2b12 + 2b11 + 3b10 - 2b9 + 2b8 - 2b7 - 3b6 + 2b5 + 3b2 + 2) q^96 + (5b15 - 9b14 + 2b13 - 7b10 - 9b8 - 8b5 - 5b4 + b3) q^97 + (-5b12 + 6b11 + 8b9 - 12b6 - 25b2 + 7) q^98 + (-2b15 - 4b14 - b13 + 4b11 - 3b10 - 2b9 - 2b7 - 2b5 - 4b4 - 2b3 + 2b2 + 2b1 - 4) q^99
$\operatorname{Tr}(f)(q)$	$=$	$ 16 q - 12 q^{3} + 12 q^{4} + 10 q^{6} - 50 q^{8} + 20 q^{9}+O(q^{10}) $ 16 * q - 12 * q^3 + 12 * q^4 + 10 * q^6 - 50 * q^8 + 20 * q^9	$ 16 q - 12 q^{3} + 12 q^{4} + 10 q^{6} - 50 q^{8} + 20 q^{9} - 24 q^{12} - 16 q^{16} + 10 q^{18} - 40 q^{19} + 4 q^{23} + 70 q^{24} - 24 q^{27} + 10 q^{31} + 8 q^{33} - 100 q^{34} + 40 q^{36} + 20 q^{38} + 10 q^{39} + 60 q^{42} - 40 q^{46} - 2 q^{47} - 28 q^{48} - 42 q^{49} + 26 q^{53} + 50 q^{57} - 50 q^{61} - 30 q^{62} - 20 q^{63} - 42 q^{64} + 30 q^{66} + 150 q^{68} + 12 q^{69} - 120 q^{72} + 70 q^{77} + 40 q^{79} - 4 q^{81} - 10 q^{83} + 150 q^{84} + 10 q^{91} + 28 q^{92} + 10 q^{93} + 50 q^{94} + 40 q^{96} - 12 q^{99}+O(q^{100}) $ 16 * q - 12 * q^3 + 12 * q^4 + 10 * q^6 - 50 * q^8 + 20 * q^9 - 24 * q^12 - 16 * q^16 + 10 * q^18 - 40 * q^19 + 4 * q^23 + 70 * q^24 - 24 * q^27 + 10 * q^31 + 8 * q^33 - 100 * q^34 + 40 * q^36 + 20 * q^38 + 10 * q^39 + 60 * q^42 - 40 * q^46 - 2 * q^47 - 28 * q^48 - 42 * q^49 + 26 * q^53 + 50 * q^57 - 50 * q^61 - 30 * q^62 - 20 * q^63 - 42 * q^64 + 30 * q^66 + 150 * q^68 + 12 * q^69 - 120 * q^72 + 70 * q^77 + 40 * q^79 - 4 * q^81 - 10 * q^83 + 150 * q^84 + 10 * q^91 + 28 * q^92 + 10 * q^93 + 50 * q^94 + 40 * q^96 - 12 * q^99

Display 100 coefficients 10 coefficients

Basis of coefficient ring in terms of a root $\nu$ of $ x^{16} - x^{14} + 15x^{12} - 59x^{10} + 104x^{8} - 59x^{6} + 15x^{4} - x^{2} + 1 $ x^16 - x^14 + 15*x^12 - 59*x^10 + 104*x^8 - 59*x^6 + 15*x^4 - x^2 + 1 :

$\beta_{1}$	$=$	$ ( 27\nu^{14} + 50\nu^{12} + 355\nu^{10} - 484\nu^{8} - 1348\nu^{6} + 4523\nu^{4} - 750\nu^{2} - 365 ) / 384 $ (27v^14 + 50v^12 + 355v^10 - 484v^8 - 1348v^6 + 4523v^4 - 750*v^2 - 365) / 384
$\beta_{2}$	$=$	$ ( 21\nu^{14} - 22\nu^{12} + 329\nu^{10} - 1260\nu^{8} + 2436\nu^{6} - 1995\nu^{4} + 1498\nu^{2} - 119 ) / 384 $ (21v^14 - 22v^12 + 329v^10 - 1260v^8 + 2436v^6 - 1995v^4 + 1498*v^2 - 119) / 384
$\beta_{3}$	$=$	$ ( \nu^{15} - 35\nu^{13} + 40\nu^{11} - 560\nu^{9} + 1972\nu^{7} - 3075\nu^{5} + 1041\nu^{3} - 12\nu ) / 96 $ (v^15 - 35v^13 + 40v^11 - 560v^9 + 1972v^7 - 3075v^5 + 1041v^3 - 12*v) / 96
$\beta_{4}$	$=$	$ ( 12\nu^{15} + \nu^{13} + 181\nu^{11} - 524\nu^{9} + 688\nu^{7} - 128\nu^{5} + 717\nu^{3} - 231\nu ) / 96 $ (12v^15 + v^13 + 181v^11 - 524v^9 + 688v^7 - 128v^5 + 717v^3 - 231*v) / 96
$\beta_{5}$	$=$	$ ( 9\nu^{15} - 23\nu^{13} + 148\nu^{11} - 736\nu^{9} + 1748\nu^{7} - 1867\nu^{5} + 685\nu^{3} + 16\nu ) / 96 $ (9v^15 - 23v^13 + 148v^11 - 736v^9 + 1748v^7 - 1867v^5 + 685v^3 + 16v) / 96
$\beta_{6}$	$=$	$ ( 9\nu^{14} - 17\nu^{12} + 138\nu^{10} - 648\nu^{8} + 1332\nu^{6} - 1107\nu^{4} + 155\nu^{2} + 30 ) / 96 $ (9v^14 - 17v^12 + 138v^10 - 648v^8 + 1332v^6 - 1107v^4 + 155*v^2 + 30) / 96
$\beta_{7}$	$=$	$ ( -14\nu^{14} + 7\nu^{12} - 195\nu^{10} + 724\nu^{8} - 920\nu^{6} - 210\nu^{4} + 555\nu^{2} - 23 ) / 96 $ (-14v^14 + 7v^12 - 195v^10 + 724v^8 - 920v^6 - 210v^4 + 555*v^2 - 23) / 96
$\beta_{8}$	$=$	$ ( 63\nu^{15} - 42\nu^{13} + 947\nu^{11} - 3428\nu^{9} + 5644\nu^{7} - 2945\nu^{5} + 1990\nu^{3} - 685\nu ) / 384 $ (63v^15 - 42v^13 + 947v^11 - 3428v^9 + 5644v^7 - 2945v^5 + 1990v^3 - 685v) / 384
$\beta_{9}$	$=$	$ ( -17\nu^{14} + 5\nu^{12} - 246\nu^{10} + 824\nu^{8} - 1108\nu^{6} - 101\nu^{4} + 201\nu^{2} - 58 ) / 96 $ (-17v^14 + 5v^12 - 246v^10 + 824v^8 - 1108v^6 - 101v^4 + 201*v^2 - 58) / 96
$\beta_{10}$	$=$	$ ( -77\nu^{15} + 134\nu^{13} - 1185\nu^{11} + 5388\nu^{9} - 10980\nu^{7} + 9107\nu^{5} - 2666\nu^{3} + 543\nu ) / 384 $ (-77v^15 + 134v^13 - 1185v^11 + 5388v^9 - 10980v^7 + 9107v^5 - 2666v^3 + 543v) / 384
$\beta_{11}$	$=$	$ ( 7\nu^{14} - 17\nu^{12} + 112\nu^{10} - 560\nu^{8} + 1276\nu^{6} - 1269\nu^{4} + 411\nu^{2} - 12 ) / 48 $ (7v^14 - 17v^12 + 112v^10 - 560v^8 + 1276v^6 - 1269v^4 + 411*v^2 - 12) / 48
$\beta_{12}$	$=$	$ ( -15\nu^{14} + 9\nu^{12} - 224\nu^{10} + 800\nu^{8} - 1276\nu^{6} + 557\nu^{4} - 307\nu^{2} + 28 ) / 48 $ (-15v^14 + 9v^12 - 224v^10 + 800v^8 - 1276v^6 + 557v^4 - 307*v^2 + 28) / 48
$\beta_{13}$	$=$	$ ( -155\nu^{15} + 166\nu^{13} - 2315\nu^{11} + 9284\nu^{9} - 16444\nu^{7} + 9013\nu^{5} - 410\nu^{3} - 1499\nu ) / 384 $ (-155v^15 + 166v^13 - 2315v^11 + 9284v^9 - 16444v^7 + 9013v^5 - 410v^3 - 1499v) / 384
$\beta_{14}$	$=$	$ ( -91\nu^{15} + 70\nu^{13} - 1355\nu^{11} + 5060\nu^{9} - 8380\nu^{7} + 3765\nu^{5} - 890\nu^{3} - 155\nu ) / 192 $ (-91v^15 + 70v^13 - 1355v^11 + 5060v^9 - 8380v^7 + 3765v^5 - 890v^3 - 155v) / 192
$\beta_{15}$	$=$	$ ( 375\nu^{15} - 270\nu^{13} + 5559\nu^{11} - 20564\nu^{9} + 33388\nu^{7} - 13145\nu^{5} + 2290\nu^{3} + 391\nu ) / 384 $ (375v^15 - 270v^13 + 5559v^11 - 20564v^9 + 33388v^7 - 13145v^5 + 2290v^3 + 391v) / 384

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

$\nu$	$=$	$ ( -\beta_{15} + 3\beta_{14} - 4\beta_{13} + 3\beta_{8} + 2\beta_{5} + \beta_{4} - 2\beta_{3} ) / 5 $ (-b15 + 3b14 - 4b13 + 3b8 + 2b5 + b4 - 2*b3) / 5
$\nu^{2}$	$=$	$ ( 2\beta_{12} - 2\beta_{11} - 2\beta_{7} + \beta_{6} + 11\beta_{2} - \beta_1 ) / 5 $ (2b12 - 2b11 - 2b7 + b6 + 11b2 - b1) / 5
$\nu^{3}$	$=$	$ \beta_{15} + \beta_{14} - 3\beta_{8} - 3\beta_{5} + 2\beta_{4} + 2\beta_{3} $ b15 + b14 - 3b8 - 3b5 + 2b4 + 2b3
$\nu^{4}$	$=$	$ ( -12\beta_{12} + 7\beta_{11} + 5\beta_{9} - 13\beta_{7} - 41\beta_{6} - 11\beta_{2} - 19\beta_1 ) / 5 $ (-12b12 + 7b11 + 5b9 - 13b7 - 41b6 - 11b2 - 19*b1) / 5
$\nu^{5}$	$=$	$ ( -24\beta_{15} - 73\beta_{14} + 24\beta_{13} - 20\beta_{10} - 38\beta_{8} + 18\beta_{5} - 6\beta_{4} - 18\beta_{3} ) / 5 $ (-24b15 - 73b14 + 24b13 - 20b10 - 38b8 + 18b5 - 6b4 - 18b3) / 5
$\nu^{6}$	$=$	$ 5\beta_{12} + 11\beta_{11} - 6\beta_{9} + 11\beta_{7} + 6\beta_{6} - 23\beta_{2} + 17\beta _1 + 6 $ 5b12 + 11b11 - 6b9 + 11b7 + 6b6 - 23b2 + 17*b1 + 6
$\nu^{7}$	$=$	$ ( -36\beta_{15} + 153\beta_{14} - 109\beta_{13} + 333\beta_{8} + 262\beta_{5} - 109\beta_{4} - 182\beta_{3} ) / 5 $ (-36b15 + 153b14 - 109b13 + 333b8 + 262b5 - 109b4 - 182*b3) / 5
$\nu^{8}$	$=$	$ ( 237\beta_{12} - 237\beta_{11} - 110\beta_{9} + 98\beta_{7} + 631\beta_{6} + 631\beta_{2} + 139\beta _1 - 110 ) / 5 $ (237b12 - 237b11 - 110b9 + 98b7 + 631b6 + 631b2 + 139*b1 - 110) / 5
$\nu^{9}$	$=$	$ 124 \beta_{15} + 226 \beta_{14} - 35 \beta_{13} + 67 \beta_{10} - 62 \beta_{8} - 195 \beta_{5} + \cdots + 159 \beta_{3} $ 124b15 + 226b14 - 35b13 + 67b10 - 62b8 - 195b5 + 97b4 + 159b3
$\nu^{10}$	$=$	$ ( - 1032 \beta_{12} - 408 \beta_{11} + 660 \beta_{9} - 1248 \beta_{7} - 2316 \beta_{6} + 624 \beta_{2} + \cdots - 445 ) / 5 $ (-1032b12 - 408b11 + 660b9 - 1248b7 - 2316b6 + 624b2 - 2064*b1 - 445) / 5
$\nu^{11}$	$=$	$ ( - 799 \beta_{15} - 5763 \beta_{14} + 2684 \beta_{13} - 840 \beta_{10} - 5763 \beta_{8} + \cdots + 1342 \beta_{3} ) / 5 $ (-799b15 - 5763b14 + 2684b13 - 840b10 - 5763b8 - 2182b5 + 799b4 + 1342b3) / 5
$\nu^{12}$	$=$	$ -350\beta_{12} + 1106\beta_{11} + 350\beta_{7} - 1141\beta_{6} - 2771\beta_{2} + 553\beta _1 + 588 $ -350b12 + 1106b11 + 350b7 - 1141b6 - 2771b2 + 553b1 + 588
$\nu^{13}$	$=$	$ ( - 9421 \beta_{15} - 5857 \beta_{14} - 3564 \beta_{13} - 3780 \beta_{10} + 21543 \beta_{8} + \cdots - 18842 \beta_{3} ) / 5 $ (-9421b15 - 5857b14 - 3564b13 - 3780b10 + 21543b8 + 25107b5 - 11714b4 - 18842b3) / 5
$\nu^{14}$	$=$	$ ( 24372 \beta_{12} - 7607 \beta_{11} - 12985 \beta_{9} + 19793 \beta_{7} + 60721 \beta_{6} + \cdots + 31979 \beta_1 ) / 5 $ (24372b12 - 7607b11 - 12985b9 + 19793b7 + 60721b6 + 25171b2 + 31979*b1) / 5
$\nu^{15}$	$=$	$ 8280 \beta_{15} + 25393 \beta_{14} - 8280 \beta_{13} + 5480 \beta_{10} + 10610 \beta_{8} + \cdots + 5130 \beta_{3} $ 8280b15 + 25393b14 - 8280b13 + 5480b10 + 10610b8 - 5130b5 + 3150b4 + 5130b3

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

Character values

We give the values of $\chi$ on generators for $\left(\mathbb{Z}/825\mathbb{Z}\right)^\times$.

$n$	$376$	$551$	$727$
$\chi(n)$	$\beta_{2}$	$-1$	$-1$

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} $

74.1

0.280526	+	0.386111i
−0.280526	−	0.386111i
−1.23158	−	1.69513i
1.23158	+	1.69513i
1.28932	−	0.418926i
−1.28932	+	0.418926i
−0.701538	+	0.227943i
0.701538	−	0.227943i
1.28932	+	0.418926i
−1.28932	−	0.418926i
−0.701538	−	0.227943i
0.701538	+	0.227943i
0.280526	−	0.386111i
−0.280526	+	0.386111i
−1.23158	+	1.69513i
1.23158	−	1.69513i

−0.329779

−

0.453901i

−1.72982

−

0.0877853i

0.520762

−

1.60274i

0.530613

0.814119i

−0.0827449

0.254663i

−1.96641

0.638924i

2.98459

0.303706i

74.2

−0.329779

−

0.453901i

1.34786

−

1.08779i

0.520762

−

1.60274i

−0.938242

−

0.253067i

0.0827449

−

0.254663i

−1.96641

0.638924i

0.633446

−

2.93236i

74.3

1.44781

1.99274i

−1.72982

−

0.0877853i

−1.25683

3.86812i

−2.32953

−

3.57419i

−1.59485

4.90846i

−4.84261

1.57346i

2.98459

0.303706i

74.4

1.44781

1.99274i

1.34786

−

1.08779i

−1.25683

3.86812i

4.11912

1.11103i

1.59485

−

4.90846i

−4.84261

1.57346i

0.633446

−

2.93236i

149.1

−2.45244

0.796845i

−1.67229

−

0.451057i

3.76145

−

2.73286i

4.46061

−

0.226367i

2.82816

−

2.05478i

−4.01569

5.52712i

2.59310

1.50859i

149.2

−2.45244

0.796845i

−0.945746

−

1.45106i

3.76145

−

2.73286i

3.47565

2.80501i

−2.82816

2.05478i

−4.01569

5.52712i

−1.21113

2.74466i

149.3

1.33440

−

0.433574i

−1.67229

−

0.451057i

−0.0253869

0.0184446i

−2.42707

0.123169i

0.837304

−

0.608337i

−1.67529

2.30584i

2.59310

1.50859i

149.4

1.33440

−

0.433574i

−0.945746

−

1.45106i

−0.0253869

0.0184446i

−1.89115

−

1.52624i

−0.837304

0.608337i

−1.67529

2.30584i

−1.21113

2.74466i

299.1

−2.45244

−

0.796845i

−1.67229

0.451057i

3.76145

2.73286i

4.46061

0.226367i

2.82816

2.05478i

−4.01569

−

5.52712i

2.59310

−

1.50859i

299.2

−2.45244

−

0.796845i

−0.945746

1.45106i

3.76145

2.73286i

3.47565

−

2.80501i

−2.82816

−

2.05478i

−4.01569

−

5.52712i

−1.21113

−

2.74466i

299.3

1.33440

0.433574i

−1.67229

0.451057i

−0.0253869

−

0.0184446i

−2.42707

−

0.123169i

0.837304

0.608337i

−1.67529

−

2.30584i

2.59310

−

1.50859i

299.4

1.33440

0.433574i

−0.945746

1.45106i

−0.0253869

−

0.0184446i

−1.89115

1.52624i

−0.837304

−

0.608337i

−1.67529

−

2.30584i

−1.21113

−

2.74466i

524.1

−0.329779

0.453901i

−1.72982

0.0877853i

0.520762

1.60274i

0.530613

−

0.814119i

−0.0827449

−

0.254663i

−1.96641

−

0.638924i

2.98459

−

0.303706i

524.2

−0.329779

0.453901i

1.34786

1.08779i

0.520762

1.60274i

−0.938242

0.253067i

0.0827449

0.254663i

−1.96641

−

0.638924i

0.633446

2.93236i

524.3

1.44781

−

1.99274i

−1.72982

0.0877853i

−1.25683

−

3.86812i

−2.32953

3.57419i

−1.59485

−

4.90846i

−4.84261

−

1.57346i

2.98459

−

0.303706i

524.4

1.44781

−

1.99274i

1.34786

1.08779i

−1.25683

−

3.86812i

4.11912

−

1.11103i

1.59485

4.90846i

−4.84261

−

1.57346i

0.633446

2.93236i

Inner twists

Char	Parity	Ord	Mult	Type
1.a	even	1	1	trivial
11.d	odd	10	1	inner
15.d	odd	2	1	inner
165.r	even	10	1	inner

Twists

By twisting character orbit
Char	Parity	Ord	Mult	Type	Twist	Min	Dim
1.a	even	1	1	trivial	825.2.bs.e		16
3.b	odd	2	1		825.2.bs.f		16
5.b	even	2	1		825.2.bs.f		16
5.c	odd	4	1		165.2.p.a	✓	16
5.c	odd	4	1		825.2.bi.d		16
11.d	odd	10	1	inner	825.2.bs.e		16
15.d	odd	2	1	inner	825.2.bs.e		16
15.e	even	4	1		165.2.p.a	✓	16
15.e	even	4	1		825.2.bi.d		16
33.f	even	10	1		825.2.bs.f		16
55.h	odd	10	1		825.2.bs.f		16
55.l	even	20	1		165.2.p.a	✓	16
55.l	even	20	1		825.2.bi.d		16
165.r	even	10	1	inner	825.2.bs.e		16
165.u	odd	20	1		165.2.p.a	✓	16
165.u	odd	20	1		825.2.bi.d		16

By twisted newform orbit
Twist	Min	Dim	Char	Parity	Ord	Mult	Type
165.2.p.a	✓	16	5.c	odd	4	1
165.2.p.a	✓	16	15.e	even	4	1
165.2.p.a	✓	16	55.l	even	20	1
165.2.p.a	✓	16	165.u	odd	20	1
825.2.bi.d		16	5.c	odd	4	1
825.2.bi.d		16	15.e	even	4	1
825.2.bi.d		16	55.l	even	20	1
825.2.bi.d		16	165.u	odd	20	1
825.2.bs.e		16	1.a	even	1	1	trivial
825.2.bs.e		16	11.d	odd	10	1	inner
825.2.bs.e		16	15.d	odd	2	1	inner
825.2.bs.e		16	165.r	even	10	1	inner
825.2.bs.f		16	3.b	odd	2	1
825.2.bs.f		16	5.b	even	2	1
825.2.bs.f		16	33.f	even	10	1
825.2.bs.f		16	55.h	odd	10	1

Hecke kernels

This newform subspace can be constructed as the kernel of the linear operator $ T_{2}^{8} - 5T_{2}^{6} + 15T_{2}^{5} + 20T_{2}^{4} - 75T_{2}^{3} + 25T_{2}^{2} + 25T_{2} + 25 $ T2^8 - 5*T2^6 + 15*T2^5 + 20*T2^4 - 75*T2^3 + 25*T2^2 + 25*T2 + 25 acting on $S_{2}^{\mathrm{new}}(825, [\chi])$.

Hecke characteristic polynomials

$p$	$F_p(T)$
$2$	$ (T^{8} - 5 T^{6} + 15 T^{5} + \cdots + 25)^{2} $ (T^8 - 5T^6 + 15T^5 + 20T^4 - 75T^3 + 25T^2 + 25T + 25)^2
$3$	$ (T^{8} + 6 T^{7} + 13 T^{6} + \cdots + 81)^{2} $ (T^8 + 6T^7 + 13T^6 + 10T^5 + T^4 + 30T^3 + 117T^2 + 162T + 81)^2
$5$	$ T^{16} $ T^16
$7$	$ T^{16} + 35 T^{14} + \cdots + 625 $ T^16 + 35T^14 + 515T^12 + 825T^10 + 105950T^8 - 56625T^6 + 114125T^4 + 13750*T^2 + 625
$11$	$ T^{16} + \cdots + 214358881 $ T^16 - 27T^14 + 528T^12 - 7569T^10 + 87575T^8 - 915849T^6 + 7730448T^4 - 47832147*T^2 + 214358881
$13$	$ T^{16} + 10 T^{14} + \cdots + 625 $ T^16 + 10T^14 + 65T^12 + 375T^10 + 2450T^8 + 5625T^6 + 5375T^4 - 625*T^2 + 625
$17$	$ (T^{8} - 65 T^{6} + \cdots + 25)^{2} $ (T^8 - 65T^6 - 150T^5 + 1555T^4 + 9750T^3 + 23275T^2 + 900T + 25)^2
$19$	$ (T^{8} + 20 T^{7} + \cdots + 3025)^{2} $ (T^8 + 20T^7 + 165T^6 + 725T^5 + 1830T^4 + 1725T^3 - 675T^2 - 4675*T + 3025)^2
$23$	$ (T^{4} - T^{3} - 29 T^{2} + \cdots + 1)^{4} $ (T^4 - T^3 - 29T^2 - 51T + 1)^4
$29$	$ T^{16} + 50 T^{14} + \cdots + 81450625 $ T^16 + 50T^14 + 1065T^12 + 5575T^10 + 206450T^8 + 1029625T^6 + 4290375T^4 + 16019375*T^2 + 81450625
$31$	$ (T^{8} - 5 T^{7} + \cdots + 600625)^{2} $ (T^8 - 5T^7 + 45T^6 + 125T^5 + 150T^4 - 4625T^3 + 104875T^2 + 135625*T + 600625)^2
$37$	$ T^{16} + \cdots + 492884401 $ T^16 + 27T^14 + 3123T^12 - 12571T^10 + 1075080T^8 - 26037271T^6 + 287655003T^4 - 594831393*T^2 + 492884401
$41$	$ T^{16} + \cdots + 184062450625 $ T^16 + 195T^14 + 19055T^12 + 959725T^10 + 219772650T^8 + 1076651875T^6 + 6507197625T^4 + 38204676250*T^2 + 184062450625
$43$	$ (T^{8} - 40 T^{6} + \cdots + 25)^{2} $ (T^8 - 40T^6 + 430T^4 - 775*T^2 + 25)^2
$47$	$ (T^{8} + T^{7} + \cdots + 43681)^{2} $ (T^8 + T^7 + 87T^6 + 593T^5 + 3830T^4 + 6197T^3 + 152727T^2 - 132506T + 43681)^2
$53$	$ (T^{8} - 13 T^{7} + \cdots + 22201)^{2} $ (T^8 - 13T^7 + 98T^6 - 471T^5 + 1805T^4 - 4821T^3 + 13118T^2 - 23393*T + 22201)^2
$59$	$ T^{16} + \cdots + 5465500541281 $ T^16 + 23T^14 + 10563T^12 - 406799T^10 + 23271680T^8 - 1361619179T^6 + 51143793603T^4 - 802433531317*T^2 + 5465500541281
$61$	$ (T^{8} + 25 T^{7} + \cdots + 15625)^{2} $ (T^8 + 25T^7 + 200T^6 + 375T^5 - 875T^4 - 9375T^3 + 12500T^2 + 15625*T + 15625)^2
$67$	$ (T^{8} + 241 T^{6} + \cdots + 78961)^{2} $ (T^8 + 241T^6 + 18626T^4 + 452696*T^2 + 78961)^2
$71$	$ T^{16} + \cdots + 360750390625 $ T^16 - 365T^14 + 53875T^12 - 1745375T^10 + 25890000T^8 - 120709375T^6 + 9661171875T^4 + 28754921875*T^2 + 360750390625
$73$	$ T^{16} + \cdots + 75221362650625 $ T^16 + 45T^14 + 8940T^12 + 797575T^10 + 53202075T^8 + 2698700875T^6 + 175259346000T^4 + 5374890418125*T^2 + 75221362650625
$79$	$ (T^{8} - 20 T^{7} + \cdots + 483025)^{2} $ (T^8 - 20T^7 + 215T^6 - 1120T^5 + 4270T^4 - 33700T^3 + 206300T^2 - 528200*T + 483025)^2
$83$	$ (T^{8} + 5 T^{7} + \cdots + 366025)^{2} $ (T^8 + 5T^7 + 15T^6 - 965T^5 + 1620T^4 + 17875T^3 - 15125T^2 - 33275*T + 366025)^2
$89$	$ (T^{8} + 490 T^{6} + \cdots + 161925625)^{2} $ (T^8 + 490T^6 + 86575T^4 + 6417250*T^2 + 161925625)^2
$97$	$ T^{16} + \cdots + 35503495827361 $ T^16 - 343T^14 + 139268T^12 - 55246881T^10 + 14136070955T^8 - 1846387591221T^6 + 108569113467548T^4 + 37883289304837*T^2 + 35503495827361
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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:	\( N \)	\(=\)	\( 825 = 3 \cdot 5^{2} \cdot 11 \)
Weight:	\( k \)	\(=\)	\( 2 \)
Character orbit:	\([\chi]\)	\(=\)	825.bs (of order \(10\), degree \(4\), not minimal)

\(f(q)\)	\(=\)	\( q + ( - \beta_{11} + \beta_{7} + \beta_{6}) q^{2} + ( - \beta_{9} + \beta_{8} + \beta_{5} - 1) q^{3} + (\beta_{12} - \beta_{7} - \beta_{6} + \cdots + 1) q^{4}+ \cdots + ( - 2 \beta_{14} - 2 \beta_{10} + \cdots + 2) q^{9}+O(q^{10}) \) q + (-b11 + b7 + b6) * q^2 + (-b9 + b8 + b5 - 1) * q^3 + (b12 - b7 - b6 + 2b2 + 1) q^4 + (b14 - b13 + b11 + b8 - b7 + b5 - b3 + b1) * q^6 + (-b15 - 2b14 - 2b10 - b8 - b3) * q^7 + (-b12 - b11 + 2b9 + b6 - b2 - b1 - 2) q^8 + (-2b14 - 2b10 + b9 - 2b8 - 2b5 - 2b2 + 2) q^9	\( q + ( - \beta_{11} + \beta_{7} + \beta_{6}) q^{2} + ( - \beta_{9} + \beta_{8} + \beta_{5} - 1) q^{3} + (\beta_{12} - \beta_{7} - \beta_{6} + \cdots + 1) q^{4}+ \cdots + ( - 2 \beta_{15} - 4 \beta_{14} + \cdots - 4) q^{99}+O(q^{100}) \) q + (-b11 + b7 + b6) * q^2 + (-b9 + b8 + b5 - 1) * q^3 + (b12 - b7 - b6 + 2b2 + 1) q^4 + (b14 - b13 + b11 + b8 - b7 + b5 - b3 + b1) * q^6 + (-b15 - 2b14 - 2b10 - b8 - b3) * q^7 + (-b12 - b11 + 2b9 + b6 - b2 - b1 - 2) q^8 + (-2b14 - 2b10 + b9 - 2b8 - 2b5 - 2b2 + 2) q^9 + (-b15 - 2b13 - b10 + b5 - b3) q^11 + (b15 + b14 - b13 - b11 - b9 + b8 + 2b7 + 2b6 - b5 + b3 - b2 - 2) * q^12 + (-b10 + b3) * q^13 + (-b15 - 2b14 + b13 + b10 + 5b8 + 4b5 - 4b4 - 2b3) q^14 + (2b12 + 2b11 + b9 - b7 - 4b6) q^16 + (2b11 - 2b7 + b6 + 2b2 + 2b1 - 2) * q^17 + (-2b14 + 2b13 + 2b12 + 2b7 + b6 - 2b4 + b1) q^18 + (b12 + b11 + 3b9 + b7 + b6 - b2 + 2b1 - 3) * q^19 + (b15 + b14 + b13 - b12 + b11 + 2b10 + b9 - b8 - 2b6 + b5 + b3 - 4b2 + 1) q^21 + (b15 + 5b14 + 5b10 + 3b8 + 3b5 - b4 + b3) * q^22 + (-b12 - 3b9 - 2b7 + b6 + b2 - 2b1) q^23 + (b15 + 3b14 + b12 + b11 + b10 + b9 - 3b8 - b7 - 2b6 - 2b5 + b4 + b3 + 3b2 + b1 + 4) q^24 + (b14 - 2b8 + b5) q^26 + (b14 + b10 + b9 - 4b6 + 4b5 - b2) * q^27 + (8b14 - 5b13 - 3b10 + 4b8 + 5b5 + b4 - 5b3) * q^28 + (b15 + 2b14 - b13 + 2b10 + b8 + b5 + b4 + b3) * q^29 + (b12 - b11 + 2b9 - b7 - 2b6 - b2 - 3b1 + 4) q^31 + (-2b12 + b9 + 3b6 - 1) * q^32 + (b15 + b13 + b12 - b11 + 2b10 + 2b9 + 2b7 + b5 - b3 - 2b2 + 2b1 + 1) q^33 + (-b12 - 2b11 - 6b9 + 2b7 + 6b6 - b2 - 2b1 - 8) q^34 + (-2b15 - 2b13 + b12 - b11 - 2b10 + 3b9 - b7 + b6 + 2b5 - 4b3 + b2 + 2b1 + 3) q^36 + (-2b15 - b13 + 3b8 + b5 - b4) * q^37 + (2b12 + 2b11 - b9 - b7 + b6 + 2b2) q^38 + (-b13 - b11 + b10 - b6 + b5 + b4 - b3 - b2 - b1 + 2) * q^39 + (-b14 - 3b13 - 2b10 - 4b8 + 3b5) * q^41 + (-3b15 - 3b14 - 2b13 + 2b12 + 3b11 - 3b10 - 2b9 - 3b8 + 3b7 + b6 - 2b5 + 3b4 - b3 - 5b2 + 4b1 + 1) q^42 + (b14 + 2b10 - b8 + b5 + b4 + b3) q^43 + (3b14 - 3b13 - 2b10 - 6b8 - 6b5 + 4b4) * q^44 + (b11 + b9 - b7 - 3b6 - 3b2 - 1) * q^46 + (-4b9 + b7 + 6b6 + 6b2 - b1 - 4) q^47 + (-b15 - 3b14 - 3b12 - 4b11 - 3b8 + 3b7 + 3b6 - 3b5 + b3 - b2 - 2b1 - 1) * q^48 + (-2b12 + 3b11 - 4b7 - 6b6 - b2 - 5b1) q^49 + (b14 + 2b13 + 2b12 + 2b10 + b8 + 2b7 - b6 - b5 - 2b4 - 2b1 + 1) * q^51 + (-b15 - 4b14 - b13 - 2b10 - b8 - 2b5) q^52 + (-b12 - b9 + b6 - 2b2 + b1 + 1) q^53 + (-4b15 - 4b13 - 3b12 + b11 + 3b8 - b6 + 3b5 + b4 - 3b3 - 4b2) q^54 + (2b15 + 5b14 - 2b13 + 7b10 + 11b8 - 4b5 - 2b4 + 4b3) * q^56 + (-2b15 + b14 - b12 + 3b10 - b8 - b6 - 2b4 - 3b3 + 2b2 - b1 + 3) q^57 + (b15 + 2b14 - b13 + 2b10 - 4b8 - 3b5 + 4b4 + 2b3) * q^58 + (-3b14 + b13 + 3b8 - 4b5 + b4 + 2b3) * q^59 + (b11 - 4b9 - 3b7 + 3b6 + 4b2 + b1 - 6) * q^61 + (-b12 + 10b9 - b7 - 8b6 - 5b2 - 3b1 + 5) * q^62 + (-2b15 - 7b14 + b13 - 2b10 - 2b8 - 2b7 - 4b6 - 3b5 + 4b2 - 2b1) q^63 + (-b12 - b11 - 4b9 - b7 + 5b2 - b1 - 4) * q^64 + (-2b15 - 4b14 - 2b13 + 2b12 - b11 - 3b10 - 2b9 + 3b8 + b7 + 4b6 - 3b5 + b4 - 2b3 + 7b2 + b1 - 1) q^66 + (-b15 - 6b14 + b13 + 3b10 + 2b8 + b5 - b3) q^67 + (3b12 + 7b11 + b9 - 7b7 - 6b6 + 8b2 + 3b1 + 7) * q^68 + (2b15 + b14 + b13 + b12 - b11 - 3b10 + 3b9 + b7 - 2b6 - b5 + 2b4 + 4b3 - 2b2 + 3) q^69 + (4b15 - b14 + 3b13 - 2b10 - 2b8 - 7b5 - b4 + b3) q^71 + (2b14 - 2b11 + 6b10 - 5b9 + 10b8 + b7 + 5b6 + 4b5 - 2b4 + 6b2 - 2b1 - 10) * q^72 + (-2b15 - b14 + b13 - 4b10 - 2b8 - 4b5 - b4 - 2b3) q^73 + (3b15 + 9b14 + 3b10 - b8 + 7b5) * q^74 + (-3b12 + b9 + 7b6 + 3b2 - 3) q^76 + (3b12 + 5b11 - 2b9 - b6 - 2b2 + 5b1 + 1) q^77 + (-b14 + 3b10 + 2b9 + 3b8 - 2b6 + 1) * q^78 + (2b12 - 2b11 + 2b9 + 2b7 + b2 + 2b1 + 3) q^79 + (-8b14 - 4b8 - 8b5 - b2) q^81 + (-4b15 + 5b14 - 3b13 + 6b10 + 2b8 + 4b5 + b4 - b3) * q^82 + (-b11 - 3b7 + 4b2 - b1) * q^83 + (b15 - 5b14 + 6b13 + 4b12 + 6b10 + 3b8 + 4b7 + 12b6 + 5b5 - 6b4 + b3 + 9b1 + 3) * q^84 + (-2b15 - 3b14 + b10 - 3b8 + b5 + 2b4) * q^86 + (-2b14 + b12 - 2b11 - 3b10 - b9 + b6 - 3b5 - b4 - b3 + 3b2) q^87 + (3b15 - 5b14 + 8b13 + 2b10 - b8 - 9b5 - 3b4 + 8b3) q^88 + (-2b15 - 9b14 + 2b13 - 5b10 - 3b8 - 2b5 - 4b4 + 2b3) * q^89 + (-b7 + b6 + b2 + b1) * q^91 + (-5b6 - 8b2 + 5) * q^92 + (2b15 + 2b14 - 2b13 - 2b12 - 3b11 - 2b10 - 2b9 - b8 + 2b7 + 3b4 + 4b3 + b2 + b1) * q^93 + (-b11 + 4b9 - 5b7 - 3b6 + 4b2 - b1 + 6) * q^94 + (4b14 + 2b13 + 2b12 + 2b11 + 3b10 - 2b9 + 2b8 - 2b7 - 3b6 + 2b5 + 3b2 + 2) q^96 + (5b15 - 9b14 + 2b13 - 7b10 - 9b8 - 8b5 - 5b4 + b3) q^97 + (-5b12 + 6b11 + 8b9 - 12b6 - 25b2 + 7) q^98 + (-2b15 - 4b14 - b13 + 4b11 - 3b10 - 2b9 - 2b7 - 2b5 - 4b4 - 2b3 + 2b2 + 2b1 - 4) q^99
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 16 q - 12 q^{3} + 12 q^{4} + 10 q^{6} - 50 q^{8} + 20 q^{9}+O(q^{10}) \) 16 * q - 12 * q^3 + 12 * q^4 + 10 * q^6 - 50 * q^8 + 20 * q^9	\( 16 q - 12 q^{3} + 12 q^{4} + 10 q^{6} - 50 q^{8} + 20 q^{9} - 24 q^{12} - 16 q^{16} + 10 q^{18} - 40 q^{19} + 4 q^{23} + 70 q^{24} - 24 q^{27} + 10 q^{31} + 8 q^{33} - 100 q^{34} + 40 q^{36} + 20 q^{38} + 10 q^{39} + 60 q^{42} - 40 q^{46} - 2 q^{47} - 28 q^{48} - 42 q^{49} + 26 q^{53} + 50 q^{57} - 50 q^{61} - 30 q^{62} - 20 q^{63} - 42 q^{64} + 30 q^{66} + 150 q^{68} + 12 q^{69} - 120 q^{72} + 70 q^{77} + 40 q^{79} - 4 q^{81} - 10 q^{83} + 150 q^{84} + 10 q^{91} + 28 q^{92} + 10 q^{93} + 50 q^{94} + 40 q^{96} - 12 q^{99}+O(q^{100}) \) 16 * q - 12 * q^3 + 12 * q^4 + 10 * q^6 - 50 * q^8 + 20 * q^9 - 24 * q^12 - 16 * q^16 + 10 * q^18 - 40 * q^19 + 4 * q^23 + 70 * q^24 - 24 * q^27 + 10 * q^31 + 8 * q^33 - 100 * q^34 + 40 * q^36 + 20 * q^38 + 10 * q^39 + 60 * q^42 - 40 * q^46 - 2 * q^47 - 28 * q^48 - 42 * q^49 + 26 * q^53 + 50 * q^57 - 50 * q^61 - 30 * q^62 - 20 * q^63 - 42 * q^64 + 30 * q^66 + 150 * q^68 + 12 * q^69 - 120 * q^72 + 70 * q^77 + 40 * q^79 - 4 * q^81 - 10 * q^83 + 150 * q^84 + 10 * q^91 + 28 * q^92 + 10 * q^93 + 50 * q^94 + 40 * q^96 - 12 * 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	825.2.bs.e

Level	$825$
Weight	$2$
Character orbit	825.bs
Analytic conductor	$6.588$
Analytic rank	$0$
Dimension	$16$
CM	no
Inner twists	$4$

Self dual:	no
Analytic conductor:	\(6.58765816676\)
Analytic rank:	\(0\)
Dimension:	\(16\)
Relative dimension:	\(4\) over \(\Q(\zeta_{10})\)
Coefficient field:	\(\mathbb{Q}[x]/(x^{16} - \cdots)\)
comment: defining polynomial gp: f.mod \\ as an extension of the character field
Defining polynomial:	\( x^{16} - x^{14} + 15x^{12} - 59x^{10} + 104x^{8} - 59x^{6} + 15x^{4} - x^{2} + 1 \) x^16 - x^14 + 15x^12 - 59x^10 + 104x^8 - 59x^6 + 15*x^4 - x^2 + 1
Coefficient ring:	\(\Z[a_1, a_2, a_3]\)
Coefficient ring index:	\( 5^{2} \)
Twist minimal:	no (minimal twist has level 165)
Sato-Tate group:	$\mathrm{SU}(2)[C_{10}]$

\(\beta_{1}\)	\(=\)	\( ( 27\nu^{14} + 50\nu^{12} + 355\nu^{10} - 484\nu^{8} - 1348\nu^{6} + 4523\nu^{4} - 750\nu^{2} - 365 ) / 384 \) (27v^14 + 50v^12 + 355v^10 - 484v^8 - 1348v^6 + 4523v^4 - 750*v^2 - 365) / 384
\(\beta_{2}\)	\(=\)	\( ( 21\nu^{14} - 22\nu^{12} + 329\nu^{10} - 1260\nu^{8} + 2436\nu^{6} - 1995\nu^{4} + 1498\nu^{2} - 119 ) / 384 \) (21v^14 - 22v^12 + 329v^10 - 1260v^8 + 2436v^6 - 1995v^4 + 1498*v^2 - 119) / 384
\(\beta_{3}\)	\(=\)	\( ( \nu^{15} - 35\nu^{13} + 40\nu^{11} - 560\nu^{9} + 1972\nu^{7} - 3075\nu^{5} + 1041\nu^{3} - 12\nu ) / 96 \) (v^15 - 35v^13 + 40v^11 - 560v^9 + 1972v^7 - 3075v^5 + 1041v^3 - 12*v) / 96
\(\beta_{4}\)	\(=\)	\( ( 12\nu^{15} + \nu^{13} + 181\nu^{11} - 524\nu^{9} + 688\nu^{7} - 128\nu^{5} + 717\nu^{3} - 231\nu ) / 96 \) (12v^15 + v^13 + 181v^11 - 524v^9 + 688v^7 - 128v^5 + 717v^3 - 231*v) / 96
\(\beta_{5}\)	\(=\)	\( ( 9\nu^{15} - 23\nu^{13} + 148\nu^{11} - 736\nu^{9} + 1748\nu^{7} - 1867\nu^{5} + 685\nu^{3} + 16\nu ) / 96 \) (9v^15 - 23v^13 + 148v^11 - 736v^9 + 1748v^7 - 1867v^5 + 685v^3 + 16v) / 96
\(\beta_{6}\)	\(=\)	\( ( 9\nu^{14} - 17\nu^{12} + 138\nu^{10} - 648\nu^{8} + 1332\nu^{6} - 1107\nu^{4} + 155\nu^{2} + 30 ) / 96 \) (9v^14 - 17v^12 + 138v^10 - 648v^8 + 1332v^6 - 1107v^4 + 155*v^2 + 30) / 96
\(\beta_{7}\)	\(=\)	\( ( -14\nu^{14} + 7\nu^{12} - 195\nu^{10} + 724\nu^{8} - 920\nu^{6} - 210\nu^{4} + 555\nu^{2} - 23 ) / 96 \) (-14v^14 + 7v^12 - 195v^10 + 724v^8 - 920v^6 - 210v^4 + 555*v^2 - 23) / 96
\(\beta_{8}\)	\(=\)	\( ( 63\nu^{15} - 42\nu^{13} + 947\nu^{11} - 3428\nu^{9} + 5644\nu^{7} - 2945\nu^{5} + 1990\nu^{3} - 685\nu ) / 384 \) (63v^15 - 42v^13 + 947v^11 - 3428v^9 + 5644v^7 - 2945v^5 + 1990v^3 - 685v) / 384
\(\beta_{9}\)	\(=\)	\( ( -17\nu^{14} + 5\nu^{12} - 246\nu^{10} + 824\nu^{8} - 1108\nu^{6} - 101\nu^{4} + 201\nu^{2} - 58 ) / 96 \) (-17v^14 + 5v^12 - 246v^10 + 824v^8 - 1108v^6 - 101v^4 + 201*v^2 - 58) / 96
\(\beta_{10}\)	\(=\)	\( ( -77\nu^{15} + 134\nu^{13} - 1185\nu^{11} + 5388\nu^{9} - 10980\nu^{7} + 9107\nu^{5} - 2666\nu^{3} + 543\nu ) / 384 \) (-77v^15 + 134v^13 - 1185v^11 + 5388v^9 - 10980v^7 + 9107v^5 - 2666v^3 + 543v) / 384
\(\beta_{11}\)	\(=\)	\( ( 7\nu^{14} - 17\nu^{12} + 112\nu^{10} - 560\nu^{8} + 1276\nu^{6} - 1269\nu^{4} + 411\nu^{2} - 12 ) / 48 \) (7v^14 - 17v^12 + 112v^10 - 560v^8 + 1276v^6 - 1269v^4 + 411*v^2 - 12) / 48
\(\beta_{12}\)	\(=\)	\( ( -15\nu^{14} + 9\nu^{12} - 224\nu^{10} + 800\nu^{8} - 1276\nu^{6} + 557\nu^{4} - 307\nu^{2} + 28 ) / 48 \) (-15v^14 + 9v^12 - 224v^10 + 800v^8 - 1276v^6 + 557v^4 - 307*v^2 + 28) / 48
\(\beta_{13}\)	\(=\)	\( ( -155\nu^{15} + 166\nu^{13} - 2315\nu^{11} + 9284\nu^{9} - 16444\nu^{7} + 9013\nu^{5} - 410\nu^{3} - 1499\nu ) / 384 \) (-155v^15 + 166v^13 - 2315v^11 + 9284v^9 - 16444v^7 + 9013v^5 - 410v^3 - 1499v) / 384
\(\beta_{14}\)	\(=\)	\( ( -91\nu^{15} + 70\nu^{13} - 1355\nu^{11} + 5060\nu^{9} - 8380\nu^{7} + 3765\nu^{5} - 890\nu^{3} - 155\nu ) / 192 \) (-91v^15 + 70v^13 - 1355v^11 + 5060v^9 - 8380v^7 + 3765v^5 - 890v^3 - 155v) / 192
\(\beta_{15}\)	\(=\)	\( ( 375\nu^{15} - 270\nu^{13} + 5559\nu^{11} - 20564\nu^{9} + 33388\nu^{7} - 13145\nu^{5} + 2290\nu^{3} + 391\nu ) / 384 \) (375v^15 - 270v^13 + 5559v^11 - 20564v^9 + 33388v^7 - 13145v^5 + 2290v^3 + 391v) / 384

\(\nu\)	\(=\)	\( ( -\beta_{15} + 3\beta_{14} - 4\beta_{13} + 3\beta_{8} + 2\beta_{5} + \beta_{4} - 2\beta_{3} ) / 5 \) (-b15 + 3b14 - 4b13 + 3b8 + 2b5 + b4 - 2*b3) / 5
\(\nu^{2}\)	\(=\)	\( ( 2\beta_{12} - 2\beta_{11} - 2\beta_{7} + \beta_{6} + 11\beta_{2} - \beta_1 ) / 5 \) (2b12 - 2b11 - 2b7 + b6 + 11b2 - b1) / 5
\(\nu^{3}\)	\(=\)	\( \beta_{15} + \beta_{14} - 3\beta_{8} - 3\beta_{5} + 2\beta_{4} + 2\beta_{3} \) b15 + b14 - 3b8 - 3b5 + 2b4 + 2b3
\(\nu^{4}\)	\(=\)	\( ( -12\beta_{12} + 7\beta_{11} + 5\beta_{9} - 13\beta_{7} - 41\beta_{6} - 11\beta_{2} - 19\beta_1 ) / 5 \) (-12b12 + 7b11 + 5b9 - 13b7 - 41b6 - 11b2 - 19*b1) / 5
\(\nu^{5}\)	\(=\)	\( ( -24\beta_{15} - 73\beta_{14} + 24\beta_{13} - 20\beta_{10} - 38\beta_{8} + 18\beta_{5} - 6\beta_{4} - 18\beta_{3} ) / 5 \) (-24b15 - 73b14 + 24b13 - 20b10 - 38b8 + 18b5 - 6b4 - 18b3) / 5
\(\nu^{6}\)	\(=\)	\( 5\beta_{12} + 11\beta_{11} - 6\beta_{9} + 11\beta_{7} + 6\beta_{6} - 23\beta_{2} + 17\beta _1 + 6 \) 5b12 + 11b11 - 6b9 + 11b7 + 6b6 - 23b2 + 17*b1 + 6
\(\nu^{7}\)	\(=\)	\( ( -36\beta_{15} + 153\beta_{14} - 109\beta_{13} + 333\beta_{8} + 262\beta_{5} - 109\beta_{4} - 182\beta_{3} ) / 5 \) (-36b15 + 153b14 - 109b13 + 333b8 + 262b5 - 109b4 - 182*b3) / 5
\(\nu^{8}\)	\(=\)	\( ( 237\beta_{12} - 237\beta_{11} - 110\beta_{9} + 98\beta_{7} + 631\beta_{6} + 631\beta_{2} + 139\beta _1 - 110 ) / 5 \) (237b12 - 237b11 - 110b9 + 98b7 + 631b6 + 631b2 + 139*b1 - 110) / 5
\(\nu^{9}\)	\(=\)	\( 124 \beta_{15} + 226 \beta_{14} - 35 \beta_{13} + 67 \beta_{10} - 62 \beta_{8} - 195 \beta_{5} + \cdots + 159 \beta_{3} \) 124b15 + 226b14 - 35b13 + 67b10 - 62b8 - 195b5 + 97b4 + 159b3
\(\nu^{10}\)	\(=\)	\( ( - 1032 \beta_{12} - 408 \beta_{11} + 660 \beta_{9} - 1248 \beta_{7} - 2316 \beta_{6} + 624 \beta_{2} + \cdots - 445 ) / 5 \) (-1032b12 - 408b11 + 660b9 - 1248b7 - 2316b6 + 624b2 - 2064*b1 - 445) / 5
\(\nu^{11}\)	\(=\)	\( ( - 799 \beta_{15} - 5763 \beta_{14} + 2684 \beta_{13} - 840 \beta_{10} - 5763 \beta_{8} + \cdots + 1342 \beta_{3} ) / 5 \) (-799b15 - 5763b14 + 2684b13 - 840b10 - 5763b8 - 2182b5 + 799b4 + 1342b3) / 5
\(\nu^{12}\)	\(=\)	\( -350\beta_{12} + 1106\beta_{11} + 350\beta_{7} - 1141\beta_{6} - 2771\beta_{2} + 553\beta _1 + 588 \) -350b12 + 1106b11 + 350b7 - 1141b6 - 2771b2 + 553b1 + 588
\(\nu^{13}\)	\(=\)	\( ( - 9421 \beta_{15} - 5857 \beta_{14} - 3564 \beta_{13} - 3780 \beta_{10} + 21543 \beta_{8} + \cdots - 18842 \beta_{3} ) / 5 \) (-9421b15 - 5857b14 - 3564b13 - 3780b10 + 21543b8 + 25107b5 - 11714b4 - 18842b3) / 5
\(\nu^{14}\)	\(=\)	\( ( 24372 \beta_{12} - 7607 \beta_{11} - 12985 \beta_{9} + 19793 \beta_{7} + 60721 \beta_{6} + \cdots + 31979 \beta_1 ) / 5 \) (24372b12 - 7607b11 - 12985b9 + 19793b7 + 60721b6 + 25171b2 + 31979*b1) / 5
\(\nu^{15}\)	\(=\)	\( 8280 \beta_{15} + 25393 \beta_{14} - 8280 \beta_{13} + 5480 \beta_{10} + 10610 \beta_{8} + \cdots + 5130 \beta_{3} \) 8280b15 + 25393b14 - 8280b13 + 5480b10 + 10610b8 - 5130b5 + 3150b4 + 5130b3

\(n\)	\(376\)	\(551\)	\(727\)
\(\chi(n)\)	\(\beta_{2}\)	\(-1\)	\(-1\)

\(n\):		e.g. 2-40 or 990-1000
Embeddings:		e.g. 1-3 or 74.4
Significant digits:
Format:

$p$	$F_p(T)$
$2$	\( (T^{8} - 5 T^{6} + 15 T^{5} + \cdots + 25)^{2} \) (T^8 - 5T^6 + 15T^5 + 20T^4 - 75T^3 + 25T^2 + 25T + 25)^2
$3$	\( (T^{8} + 6 T^{7} + 13 T^{6} + \cdots + 81)^{2} \) (T^8 + 6T^7 + 13T^6 + 10T^5 + T^4 + 30T^3 + 117T^2 + 162T + 81)^2
$5$	\( T^{16} \) T^16
$7$	\( T^{16} + 35 T^{14} + \cdots + 625 \) T^16 + 35T^14 + 515T^12 + 825T^10 + 105950T^8 - 56625T^6 + 114125T^4 + 13750*T^2 + 625
$11$	\( T^{16} + \cdots + 214358881 \) T^16 - 27T^14 + 528T^12 - 7569T^10 + 87575T^8 - 915849T^6 + 7730448T^4 - 47832147*T^2 + 214358881
$13$	\( T^{16} + 10 T^{14} + \cdots + 625 \) T^16 + 10T^14 + 65T^12 + 375T^10 + 2450T^8 + 5625T^6 + 5375T^4 - 625*T^2 + 625
$17$	\( (T^{8} - 65 T^{6} + \cdots + 25)^{2} \) (T^8 - 65T^6 - 150T^5 + 1555T^4 + 9750T^3 + 23275T^2 + 900T + 25)^2
$19$	\( (T^{8} + 20 T^{7} + \cdots + 3025)^{2} \) (T^8 + 20T^7 + 165T^6 + 725T^5 + 1830T^4 + 1725T^3 - 675T^2 - 4675*T + 3025)^2
$23$	\( (T^{4} - T^{3} - 29 T^{2} + \cdots + 1)^{4} \) (T^4 - T^3 - 29T^2 - 51T + 1)^4
$29$	\( T^{16} + 50 T^{14} + \cdots + 81450625 \) T^16 + 50T^14 + 1065T^12 + 5575T^10 + 206450T^8 + 1029625T^6 + 4290375T^4 + 16019375*T^2 + 81450625
$31$	\( (T^{8} - 5 T^{7} + \cdots + 600625)^{2} \) (T^8 - 5T^7 + 45T^6 + 125T^5 + 150T^4 - 4625T^3 + 104875T^2 + 135625*T + 600625)^2
$37$	\( T^{16} + \cdots + 492884401 \) T^16 + 27T^14 + 3123T^12 - 12571T^10 + 1075080T^8 - 26037271T^6 + 287655003T^4 - 594831393*T^2 + 492884401
$41$	\( T^{16} + \cdots + 184062450625 \) T^16 + 195T^14 + 19055T^12 + 959725T^10 + 219772650T^8 + 1076651875T^6 + 6507197625T^4 + 38204676250*T^2 + 184062450625
$43$	\( (T^{8} - 40 T^{6} + \cdots + 25)^{2} \) (T^8 - 40T^6 + 430T^4 - 775*T^2 + 25)^2
$47$	\( (T^{8} + T^{7} + \cdots + 43681)^{2} \) (T^8 + T^7 + 87T^6 + 593T^5 + 3830T^4 + 6197T^3 + 152727T^2 - 132506T + 43681)^2
$53$	\( (T^{8} - 13 T^{7} + \cdots + 22201)^{2} \) (T^8 - 13T^7 + 98T^6 - 471T^5 + 1805T^4 - 4821T^3 + 13118T^2 - 23393*T + 22201)^2
$59$	\( T^{16} + \cdots + 5465500541281 \) T^16 + 23T^14 + 10563T^12 - 406799T^10 + 23271680T^8 - 1361619179T^6 + 51143793603T^4 - 802433531317*T^2 + 5465500541281
$61$	\( (T^{8} + 25 T^{7} + \cdots + 15625)^{2} \) (T^8 + 25T^7 + 200T^6 + 375T^5 - 875T^4 - 9375T^3 + 12500T^2 + 15625*T + 15625)^2
$67$	\( (T^{8} + 241 T^{6} + \cdots + 78961)^{2} \) (T^8 + 241T^6 + 18626T^4 + 452696*T^2 + 78961)^2
$71$	\( T^{16} + \cdots + 360750390625 \) T^16 - 365T^14 + 53875T^12 - 1745375T^10 + 25890000T^8 - 120709375T^6 + 9661171875T^4 + 28754921875*T^2 + 360750390625
$73$	\( T^{16} + \cdots + 75221362650625 \) T^16 + 45T^14 + 8940T^12 + 797575T^10 + 53202075T^8 + 2698700875T^6 + 175259346000T^4 + 5374890418125*T^2 + 75221362650625
$79$	\( (T^{8} - 20 T^{7} + \cdots + 483025)^{2} \) (T^8 - 20T^7 + 215T^6 - 1120T^5 + 4270T^4 - 33700T^3 + 206300T^2 - 528200*T + 483025)^2
$83$	\( (T^{8} + 5 T^{7} + \cdots + 366025)^{2} \) (T^8 + 5T^7 + 15T^6 - 965T^5 + 1620T^4 + 17875T^3 - 15125T^2 - 33275*T + 366025)^2
$89$	\( (T^{8} + 490 T^{6} + \cdots + 161925625)^{2} \) (T^8 + 490T^6 + 86575T^4 + 6417250*T^2 + 161925625)^2
$97$	\( T^{16} + \cdots + 35503495827361 \) T^16 - 343T^14 + 139268T^12 - 55246881T^10 + 14136070955T^8 - 1846387591221T^6 + 108569113467548T^4 + 37883289304837*T^2 + 35503495827361
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