LMFDB - Newform orbit 294.4.f.a

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms

[N,k,chi] = [294,4,Mod(215,294)]

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

lf = mfeigenbasis(mf)

from sage.modular.dirichlet import DirichletCharacter

H = DirichletGroup(294, base_ring=CyclotomicField(6))

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

N = Newforms(chi, 4, names="a")

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

chi := DirichletCharacter("294.215");

S:= CuspForms(chi, 4);

N := Newforms(S);

Level:	$ N $	$=$	$ 294 = 2 \cdot 3 \cdot 7^{2} $
Weight:	$ k $	$=$	$ 4 $
Character orbit:	$[\chi]$	$=$	294.f (of order $6$, degree $2$, 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:	$17.3465615417$
Analytic rank:	$0$
Dimension:	$16$
Relative dimension:	$8$ over $\Q(\zeta_{6})$
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} - 2 x^{15} - x^{14} - 2 x^{13} + 9 x^{12} - 24 x^{11} + 714 x^{10} - 1940 x^{9} - 2834 x^{8} + \cdots + 43046721 $ x^16 - 2x^15 - x^14 - 2x^13 + 9x^12 - 24x^11 + 714x^10 - 1940x^9 - 2834x^8 - 17460x^7 + 57834x^6 - 17496x^5 + 59049x^4 - 118098x^3 - 531441x^2 - 9565938x + 43046721
Coefficient ring:	$\Z[a_1, \ldots, a_{5}]$
Coefficient ring index:	$ 2^{6}\cdot 3^{8} $
Twist minimal:	no (minimal twist has level 42)
Sato-Tate group:	$\mathrm{SU}(2)[C_{6}]$

$q$-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_{7} q^{2} + (\beta_{3} - \beta_1) q^{3} - 4 \beta_{5} q^{4} + (\beta_{11} + \beta_{7} + \beta_{2}) q^{5} + (\beta_{5} - \beta_{4}) q^{6} + ( - 4 \beta_{7} - 4 \beta_{2}) q^{8} + ( - 2 \beta_{15} - \beta_{14} + \cdots + 3) q^{9}+O(q^{10}) $ q - b7 * q^2 + (b3 - b1) * q^3 - 4b5 q^4 + (b11 + b7 + b2) * q^5 + (b5 - b4) * q^6 + (-4b7 - 4b2) * q^8 + (-2b15 - b14 - b13 + b12 - b11 - b10 - b8 + b6 + 2b5 + 2b4 - b2 + 3) q^9	$ q - \beta_{7} q^{2} + (\beta_{3} - \beta_1) q^{3} - 4 \beta_{5} q^{4} + (\beta_{11} + \beta_{7} + \beta_{2}) q^{5} + (\beta_{5} - \beta_{4}) q^{6} + ( - 4 \beta_{7} - 4 \beta_{2}) q^{8} + ( - 2 \beta_{15} - \beta_{14} + \cdots + 3) q^{9}+ \cdots + (6 \beta_{15} - 48 \beta_{14} + \cdots - 297) q^{99}+O(q^{100}) $ q - b7 * q^2 + (b3 - b1) * q^3 - 4b5 q^4 + (b11 + b7 + b2) * q^5 + (b5 - b4) * q^6 + (-4b7 - 4b2) * q^8 + (-2b15 - b14 - b13 + b12 - b11 - b10 - b8 + b6 + 2b5 + 2b4 - b2 + 3) q^9 + (-b14 - b13 + b12 - 2b10 + b9 - b8 + b6 + b5 + b4 + 2b3 - 2b1 + 3) q^10 + (b15 - b14 + b13 - b12 - b11 + 2b10 + b9 + 3b8 + b6 - b5 - b4 - 2b3 - b2 - 2b1 - 1) * q^11 - 4b1 q^12 + (-b12 - b10 + b9 - b8 + b6 - 16b5 + 2b4 - 2b3 - 7) q^13 + (b15 + 2b13 + 2b11 - 4b10 + 15b7 + 2b6 - b3 + 14b2 + 2b1 + 1) q^15 + (-16b5 - 16) q^16 + (-4b15 - 3b14 + b13 + b12 - 4b11 - 3b10 - b9 + 2b8 - 8b7 + b6 - b5 + 3b4 - 9b3 - 4b2 + 9b1 + 1) * q^17 + (-2b15 + b13 + b12 + 2b11 + b9 + b8 - b6 + 6b5 + 2b2) * q^18 + (2b14 - b13 - 3b12 + 7b10 - 4b9 + 3b8 - b6 - 13b5 + 7b1 + 15) q^19 + (-4b15 - 4b7) * q^20 + (6b14 + 3b13 - 2b12 - 2b9 + 2b8 + b6 + 3b5 - 3b4 + 2b3 - 4b1 + 4) q^22 + (4b14 - 4b12 + 4b9 + 3b8 - 6b7 - 8b4 + 2b3 - b1 - 4) q^23 + (4b14 + 4b5 - 4b4 + 4) q^24 + (4b14 + b13 - 4b12 + 10b10 + b9 + 11b8 + 4b6 + 25b5 + 4b4 + 10b3 + 10b1 + 4) q^25 + (3b14 - 2b13 + b12 + 2b11 - 4b10 - b9 - 3b8 - 5b7 - 2b6 + 2b5 - 12b2 + 6b1 + 1) * q^26 + (3b15 + 3b13 - 9b12 - b10 + 9b9 + 7b8 + 3b7 + 6b6 + 27b5 + 3b4 + 6b3 + 15) * q^27 + (-b15 - 10b14 + 5b13 - 2b11 + b10 - 27b7 + 5b6 - 5b5 + 5b4 + b3 - 26b2 - 2b1) q^29 + (-2b14 - 2b13 - 3b12 - 2b10 + 5b9 + 11b8 + 3b7 + 2b6 + 42b5 + 4b4 + 4b3 - 2b1 + 44) * q^30 + (9b14 + 5b13 - b12 + 2b10 - 5b9 + 5b8 - b6 - 28b5 - 9b4 + 6b3 - 6b1 - 65) q^31 - 16b2 q^32 + (-6b14 - 2b13 + 7b12 - 3b11 + 5b9 - b8 + 18b7 - 2b6 + 53b5 + 39b2 - 3b1 - 59) * q^33 + (7b13 - 6b12 + 4b10 + 6b9 + 14b8 - b6 - 33b5 + 5b4 + 4b3 - 14) * q^34 + (-4b15 - 8b14 + 4b12 - 8b11 - 8b10 + 4b9 - 4b8 + 4b6 - 4b5 + 4b4 + 4b2 + 8) q^36 + (-7b14 + 7b13 - 14b12 + 7b10 + 7b9 + 14b8 - 7b6 - 129b5 + 14b4 - 14b3 + 7b1 - 122) q^37 + (14b15 + 14b11 + 2b10 - 2b8 - 14b7 + 6b3 - 7b2 - 6b1) * q^38 + (6b15 - 2b14 + 3b13 - 4b12 - 6b11 + 2b10 + 3b9 + 5b8 + 4b6 - 77b5 - 2b4 - 6b3 + 42b2 - 6b1 - 2) * q^39 + (-4b14 + 4b12 - 8b10 + 4b9 - 4b8 - 8b5 - 8b1 + 4) q^40 + (8b15 + 8b13 - 16b12 - 2b10 + 16b9 + 12b8 + 8b7 + 8b6 - 8b5 - 24b4 + 6b3 - 16) q^41 + (20b14 + 10b13 + 3b12 + b10 + 3b9 - 3b8 + 13b6 + 10b5 - 10b4 - 4b3 + 8b1 + 119) * q^43 + (8b15 + 4b14 - 4b12 + 4b11 + 4b9 + 12b8 + 12b7 - 8b4 - 16b3 + 4b2 + 8b1 - 4) q^44 + (6b15 - 9b14 + 3b13 + 6b11 - b10 - 3b9 + 4b8 + 138b7 + 96b5 + 9b4 - 6b3 + 69b2 + 6b1 + 201) * q^45 + (-b14 - b13 + b12 - 16b10 - b9 - 17b8 - b6 - 21b5 - b4 - 16b3 - 16b1 - 1) q^46 + (-14b11 + 18b10 + 9b8 - 56b7 - 98b2 - 27b1) * q^47 - 16b3 q^48 + (6b15 - 14b14 + 7b13 + 12b11 - 10b10 + 43b7 + 7b6 - 7b5 + 7b4 - 10b3 + 37b2 + 20b1) * q^50 + (22b15 + 9b14 + 3b13 - 14b12 + 11b11 + 3b10 + 11b9 - 8b8 + 39b7 - 3b6 + 203b5 - 18b4 + 8b3 + 11b2 - 4b1 + 194) q^51 + (-8b14 - 4b13 + 4b9 - 4b8 - 36b5 + 8b4 - 8b3 + 8b1 - 64) * q^52 + (-11b15 - 6b14 + 6b13 - 6b12 + 11b11 + 6b9 + 6b8 + 6b6 - 6b5 - 6b4 - 85b2 - 6) q^53 + (-2b13 - 2b12 + 6b11 - 30b10 - 4b9 - 16b8 + 27b7 - 2b6 + 8b5 + 48b2 + 12b1 - 8) q^54 + (5b13 - 13b12 - 5b10 + 13b9 + 3b8 + 8b6 - 125b5 + 21b4 - 12b3 - 52) q^55 + (3b15 + 14b14 + 16b13 - 4b12 + 6b11 + 39b10 - 4b9 + 4b8 - 42b7 + 12b6 + 7b5 - 7b4 + 14b3 - 45b2 - 28b1 - 156) q^57 + (2b14 + 2b13 + 2b10 - 2b9 + 20b8 - 2b6 - 96b5 - 4b4 + 36b3 - 18b1 - 98) * q^58 + (-5b15 + 3b14 - b13 - b12 - 5b11 + 14b10 + b9 - 13b8 - 262b7 - b6 + b5 - 3b4 + 42b3 - 131b2 - 42b1 - 1) * q^59 + (-4b15 + 8b13 - 8b12 + 4b11 - 16b10 + 8b9 - 8b8 + 8b6 - 4b5 + 4b3 + 52b2 + 4b1) * q^60 + (-7b14 + 7b12 + 4b10 + 7b9 + 2b8 - 196b5 + 13b1 + 189) q^61 + (12b15 + 4b13 - 8b12 + 8b10 + 8b9 + 24b8 + 47b7 + 4b6 - 4b5 - 12b4 - 24b3 - 35b2 - 8) * q^62 - 64 * q^64 + (-20b15 - 2b14 + 2b12 - 10b11 - 2b9 - 24b8 - 36b7 + 4b4 + 44b3 - 10b2 - 22b1 + 2) q^65 + (-24b15 - 6b14 + 9b13 + 3b12 - 24b11 + 10b10 - 9b9 - 7b8 + 78b7 + 3b6 + 84b5 + 6b4 - 6b3 + 39b2 + 6b1 + 174) q^66 + (13b13 - 11b10 + 13b9 + 2b8 + 85b5 - 11b3 - 11b1) q^67 + (-12b14 + 8b13 - 4b12 - 16b11 - 24b10 + 4b9 - 8b8 - 16b7 + 8b6 - 8b5 - 16b2 + 36b1 - 4) * q^68 + (-27b15 + 10b13 + b12 + 8b10 - b9 + 15b8 - 132b7 - 11b6 + 5b5 - 3b4 + 105b2 + 1) q^69 + (-12b15 - 20b14 + 10b13 - 24b11 + 14b10 + 90b7 + 10b6 - 10b5 + 10b4 + 14b3 + 102b2 - 28b1) * q^71 + (-16b15 + 8b13 - 4b12 - 8b11 + 8b10 - 4b9 + 12b8 - 24b7 - 8b6 + 24b5 - 8b2 + 24) q^72 + (b14 - 2b13 + 5b12 + 9b10 + 2b9 - 21b8 + 5b6 - 136b5 - b4 - 41b3 + 41b1 - 273) q^73 + (14b15 - 14b11 - 42b10 - 42b8 + 42b3 - 87b2 + 42b1) q^74 + (30b14 + 5b13 - 25b12 + 6b11 + 59b10 - 20b9 + 32b8 + 48b7 + 5b6 + 271b5 + 90b2 + 34b1 - 241) * q^75 + (-16b13 + 4b12 - 4b9 - 4b8 + 12b6 - 112b5 + 8b4 + 28b3 - 52) * q^76 + (2b15 + 26b14 + 7b13 - 12b12 + 4b11 + 10b10 - 12b9 + 12b8 - 69b7 - 5b6 + 13b5 - 13b4 - 2b3 - 71b2 + 4b1 + 184) q^78 + (-11b14 - 40b13 + 29b12 - 40b10 + 11b9 - 95b8 + 40b6 - 333b5 + 22b4 - 52b3 + 26b1 - 322) q^79 + (-16b15 - 16b11 - 32b7 - 16b2) * q^80 + (3b15 + 6b14 - 6b13 - 3b12 - 3b11 + 30b10 - 6b9 + 24b8 + 3b6 - 12b5 + 6b4 + 21b3 + 312b2 + 21b1 + 6) * q^81 + (2b14 - 4b13 - 6b12 - 48b10 - 10b9 - 26b8 - 4b6 + 20b5 - 80b1 - 18) q^82 + (-19b15 - 9b13 + 18b12 - 9b10 - 18b9 - 36b8 + 191b7 - 9b6 + 9b5 + 27b4 + 27b3 - 210b2 + 18) * q^83 + (-26b14 - 13b13 + 23b10 - 13b6 - 13b5 + 13b4 - 23b3 + 46b1 + 314) * q^85 + (-12b15 - 7b14 + 7b12 - 6b11 - 7b9 + 39b8 - 85b7 + 14b4 - 92b3 - 6b2 + 46b1 + 7) q^86 + (24b15 + 21b14 - 18b13 + 15b12 + 24b11 - 19b10 + 18b9 - 29b8 + 300b7 + 15b6 - 33b5 - 21b4 + 3b3 + 150b2 - 3b1 - 87) q^87 + (12b14 + 4b13 - 12b12 - 8b10 + 4b9 - 4b8 + 12b6 - 4b5 + 12b4 - 8b3 - 8b1 + 12) q^88 + (27b14 - 18b13 + 9b12 + 84b11 + 22b10 - 9b9 + 2b8 + 42b7 - 18b6 + 18b5 - 33b1 + 9) q^89 + (6b15 - 2b13 - 8b12 + 6b10 + 8b9 + 20b8 - 99b7 + 10b6 + 503b5 + 9b4 + 54b3 + 105b2 + 256) * q^90 + (32b14 - 16b13 + 4b10 - 24b7 - 16b6 + 16b5 - 16b4 + 4b3 - 24b2 - 8b1) * q^92 + (-48b15 - 6b14 + 6b13 + 15b12 - 24b11 + 6b10 - 21b9 - 27b8 + 117b7 - 6b6 + 258b5 + 12b4 - 82b3 - 24b2 + 41b1 + 264) q^93 + (41b14 + 23b13 - 5b12 + 28b10 - 23b9 + 5b8 - 5b6 - 137b5 - 41b4 - 28b3 + 28b1 - 315) q^94 + (20b14 - 20b13 + 20b12 + 47b10 - 20b9 + 27b8 - 20b6 + 20b5 + 20b4 - 47b3 - 534b2 - 47b1 + 20) * q^95 + (16b14 + 16) q^96 + (-3b13 + 17b12 + 6b10 - 17b9 - 5b8 - 14b6 + 267b5 - 31b4 + 7b3 + 118) q^97 + (6b15 - 48b14 - 36b13 + 3b12 + 12b11 - 42b10 + 3b9 - 3b8 - 108b7 - 33b6 - 24b5 + 24b4 - 48b3 - 114b2 + 96b1 - 297) q^99
$\operatorname{Tr}(f)(q)$	$=$	$ 16 q + 32 q^{4} + 18 q^{9}+O(q^{10}) $ 16 * q + 32 * q^4 + 18 * q^9	$ 16 q + 32 q^{4} + 18 q^{9} + 36 q^{10} - 128 q^{16} - 48 q^{18} + 342 q^{19} + 24 q^{22} + 48 q^{24} - 194 q^{25} + 360 q^{30} - 804 q^{31} - 1332 q^{33} + 144 q^{36} - 962 q^{37} + 594 q^{39} + 144 q^{40} + 1732 q^{43} + 2394 q^{45} + 168 q^{46} + 1638 q^{51} - 744 q^{52} - 180 q^{54} - 2664 q^{57} - 780 q^{58} + 4620 q^{61} - 1024 q^{64} + 2016 q^{66} - 706 q^{67} + 192 q^{72} - 3294 q^{73} - 6174 q^{75} + 2832 q^{78} - 2656 q^{79} + 126 q^{81} - 432 q^{82} + 5232 q^{85} - 1026 q^{87} + 48 q^{88} + 2016 q^{93} - 3888 q^{94} + 192 q^{96} - 4284 q^{99}+O(q^{100}) $ 16 * q + 32 * q^4 + 18 * q^9 + 36 * q^10 - 128 * q^16 - 48 * q^18 + 342 * q^19 + 24 * q^22 + 48 * q^24 - 194 * q^25 + 360 * q^30 - 804 * q^31 - 1332 * q^33 + 144 * q^36 - 962 * q^37 + 594 * q^39 + 144 * q^40 + 1732 * q^43 + 2394 * q^45 + 168 * q^46 + 1638 * q^51 - 744 * q^52 - 180 * q^54 - 2664 * q^57 - 780 * q^58 + 4620 * q^61 - 1024 * q^64 + 2016 * q^66 - 706 * q^67 + 192 * q^72 - 3294 * q^73 - 6174 * q^75 + 2832 * q^78 - 2656 * q^79 + 126 * q^81 - 432 * q^82 + 5232 * q^85 - 1026 * q^87 + 48 * q^88 + 2016 * q^93 - 3888 * q^94 + 192 * q^96 - 4284 * q^99

Display 100 coefficients 10 coefficients

Basis of coefficient ring in terms of a root $\nu$ of $ x^{16} - 2 x^{15} - x^{14} - 2 x^{13} + 9 x^{12} - 24 x^{11} + 714 x^{10} - 1940 x^{9} - 2834 x^{8} + \cdots + 43046721 $ x^16 - 2*x^15 - x^14 - 2*x^13 + 9*x^12 - 24*x^11 + 714*x^10 - 1940*x^9 - 2834*x^8 - 17460*x^7 + 57834*x^6 - 17496*x^5 + 59049*x^4 - 118098*x^3 - 531441*x^2 - 9565938*x + 43046721 :

$\beta_{1}$	$=$	$ ( - 11783 \nu^{15} - 129119 \nu^{14} - 517471 \nu^{13} + 606928 \nu^{12} - 14603832 \nu^{11} + \cdots + 756665695800 ) / 802467406944 $ (-11783v^15 - 129119v^14 - 517471v^13 + 606928v^12 - 14603832v^11 + 41353032v^10 - 40265502v^9 + 53965450v^8 - 392955662v^7 + 1778268744v^6 - 3008422296v^5 + 39016272456v^4 + 110463994377v^3 + 163835052489v^2 - 800613209295*v + 756665695800) / 802467406944
$\beta_{2}$	$=$	$ ( - 99716 \nu^{15} - 525581 \nu^{14} - 4176229 \nu^{13} + 461611 \nu^{12} + \cdots - 74485176237 ) / 4413570738192 $ (-99716v^15 - 525581v^14 - 4176229v^13 + 461611v^12 - 656424v^11 + 115779900v^10 - 5977428v^9 - 100103006v^8 - 2177986010v^7 + 3121868142v^6 + 5634915336v^5 - 6477453684v^4 + 27572576256v^3 + 28249454943v^2 - 1410719168997*v - 74485176237) / 4413570738192
$\beta_{3}$	$=$	$ ( - 212507 \nu^{15} - 5626388 \nu^{14} - 25621768 \nu^{13} - 99499205 \nu^{12} + \cdots - 21889683312741 ) / 8827141476384 $ (-212507v^15 - 5626388v^14 - 25621768v^13 - 99499205v^12 - 308400336v^11 + 890922000v^10 + 2273573622v^9 + 935214484v^8 - 11480207372v^7 - 20499423642v^6 + 20807095968v^5 + 1009683312480v^4 + 2258075337057v^3 + 4343313293208v^2 - 16875583713108*v - 21889683312741) / 8827141476384
$\beta_{4}$	$=$	$ ( 2357 \nu^{15} - 76480 \nu^{14} + 402562 \nu^{13} + 93215 \nu^{12} - 52902 \nu^{11} + \cdots + 475470165321 ) / 90072872208 $ (2357v^15 - 76480v^14 + 402562v^13 + 93215v^12 - 52902v^11 - 2581176v^10 - 10594434v^9 - 124678732v^8 - 129897586v^7 + 356616720v^6 + 1654725186v^5 - 6803786160v^4 - 1343266335v^3 - 16310987172v^2 - 72639481644*v + 475470165321) / 90072872208
$\beta_{5}$	$=$	$ ( 1025 \nu^{15} - 7522 \nu^{14} - 1448 \nu^{13} + 4529 \nu^{12} + 66042 \nu^{11} + \cdots - 60620943429 ) / 30024290736 $ (1025v^15 - 7522v^14 - 1448v^13 + 4529v^12 + 66042v^11 + 322620v^10 + 2446566v^9 + 2014304v^8 - 7719994v^7 - 24266412v^6 + 128621250v^5 + 43066404v^4 + 341572221v^3 + 683039466v^2 - 12045641706*v - 60620943429) / 30024290736
$\beta_{6}$	$=$	$ ( 38623 \nu^{15} + 1198056 \nu^{14} - 5469812 \nu^{13} + 5048117 \nu^{12} + \cdots - 9719194424139 ) / 980793497376 $ (38623v^15 + 1198056v^14 - 5469812v^13 + 5048117v^12 + 91977224v^11 + 273691056v^10 + 580611186v^9 - 137054516v^8 - 4409276604v^7 - 4021210726v^6 - 3106763496v^5 + 153718002720v^4 - 127900569213v^3 - 1310836230540v^2 - 2328952553784*v - 9719194424139) / 980793497376
$\beta_{7}$	$=$	$ ( - 286331 \nu^{15} - 1172447 \nu^{14} - 3463231 \nu^{13} - 17257904 \nu^{12} + \cdots + 545449784760 ) / 4413570738192 $ (-286331v^15 - 1172447v^14 - 3463231v^13 - 17257904v^12 + 49540536v^11 + 76849140v^10 + 32041542v^9 - 621195842v^8 - 255995654v^7 + 277800696v^6 + 53069502888v^5 + 129384485892v^4 + 226114636401v^3 - 957931318899v^2 - 623668865463*v + 545449784760) / 4413570738192
$\beta_{8}$	$=$	$ ( - 80557 \nu^{15} - 475105 \nu^{14} + 29131 \nu^{13} + 26780 \nu^{12} + 12598524 \nu^{11} + \cdots + 476938536804 ) / 326931165792 $ (-80557v^15 - 475105v^14 + 29131v^13 + 26780v^12 + 12598524v^11 + 7246644v^10 - 32616894v^9 - 273397906v^8 + 153425198v^7 + 1266876720v^6 - 913564980v^5 + 3717856260v^4 + 1830354975v^3 - 162634704417v^2 - 114262472205*v + 476938536804) / 326931165792
$\beta_{9}$	$=$	$ ( 370944 \nu^{15} - 1248091 \nu^{14} - 538303 \nu^{13} - 14904299 \nu^{12} + \cdots + 5989636082637 ) / 980793497376 $ (370944v^15 - 1248091v^14 - 538303v^13 - 14904299v^12 - 87963988v^11 - 357861492v^10 - 278588100v^9 + 734243010v^8 + 2333238362v^7 + 6714774578v^6 + 11983444956v^5 - 87923774052v^4 + 316363730508v^3 + 2331892439469v^2 + 6605115383241*v + 5989636082637) / 980793497376
$\beta_{10}$	$=$	$ ( - 193901 \nu^{15} - 416618 \nu^{14} - 1981174 \nu^{13} + 5790835 \nu^{12} + \cdots + 1369512296739 ) / 326931165792 $ (-193901v^15 - 416618v^14 - 1981174v^13 + 5790835v^12 + 7775244v^11 + 26275764v^10 - 130741998v^9 - 118606412v^8 - 524615396v^7 + 7736574438v^6 + 13819426524v^5 + 27002466180v^4 - 110194048593v^3 - 86204099826v^2 - 243730534302*v + 1369512296739) / 326931165792
$\beta_{11}$	$=$	$ ( 5816395 \nu^{15} + 4462603 \nu^{14} - 58985857 \nu^{13} - 70253912 \nu^{12} + \cdots - 185904439092000 ) / 8827141476384 $ (5816395v^15 + 4462603v^14 - 58985857v^13 - 70253912v^12 - 510053436v^11 - 1391063244v^10 + 9327548154v^9 + 12058070998v^8 - 21168407762v^7 - 253393254504v^6 - 66277109196v^5 + 614369803428v^4 + 4285317878271v^3 + 11486205988443v^2 + 24934743520479*v - 185904439092000) / 8827141476384
$\beta_{12}$	$=$	$ ( - 3030617 \nu^{15} - 6794630 \nu^{14} + 2799530 \nu^{13} - 11951165 \nu^{12} + \cdots + 2314040260275 ) / 2942380492128 $ (-3030617v^15 - 6794630v^14 + 2799530v^13 - 11951165v^12 + 40715880v^11 - 63345192v^10 + 744805470v^9 - 3483960380v^8 + 6148152436v^7 + 77075174166v^6 + 38386369800v^5 - 73495997352v^4 + 1371421101591v^3 - 1364448589110v^2 - 8731794229398*v + 2314040260275) / 2942380492128
$\beta_{13}$	$=$	$ ( - 1111135 \nu^{15} - 1280964 \nu^{14} + 6759296 \nu^{13} + 6088015 \nu^{12} + \cdots - 890478819513 ) / 980793497376 $ (-1111135v^15 - 1280964v^14 + 6759296v^13 + 6088015v^12 - 23922104v^11 + 62393280v^10 + 203938398v^9 - 806713708v^8 + 3160773852v^7 + 17612125126v^6 + 15062725080v^5 - 98632791504v^4 + 285502192749v^3 - 943343046936v^2 - 1746194429844*v - 890478819513) / 980793497376
$\beta_{14}$	$=$	$ ( - 28607 \nu^{15} + 29539 \nu^{14} + 231701 \nu^{13} + 96310 \nu^{12} - 379746 \nu^{11} + \cdots + 576366896376 ) / 22518218052 $ (-28607v^15 + 29539v^14 + 231701v^13 + 96310v^12 - 379746v^11 - 1096566v^10 - 29136138v^9 - 10559702v^8 + 26686030v^7 + 707918058v^6 - 999264114v^5 - 2972265678v^4 - 2852007651v^3 - 5844020481v^2 - 3239132895*v + 576366896376) / 22518218052
$\beta_{15}$	$=$	$ ( - 4503491 \nu^{15} - 4051820 \nu^{14} + 29323772 \nu^{13} + 95485939 \nu^{12} + \cdots + 55258803118467 ) / 2942380492128 $ (-4503491v^15 - 4051820v^14 + 29323772v^13 + 95485939v^12 + 204560964v^11 + 311170116v^10 - 3506282358v^9 - 6256386860v^8 + 14301802036v^7 + 116556367446v^6 + 51467300100v^5 - 477886674204v^4 - 1649137112883v^3 - 2790931616928v^2 - 8992178707464*v + 55258803118467) / 2942380492128

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

$\nu$	$=$	$ ( \beta_{13} - \beta_{12} + \beta_{9} + \beta_{8} + \beta_{6} - 2\beta_{5} ) / 6 $ (b13 - b12 + b9 + b8 + b6 - 2*b5) / 6
$\nu^{2}$	$=$	$ ( 2 \beta_{15} - \beta_{13} + \beta_{11} - \beta_{10} + \beta_{9} - \beta_{8} + \beta_{6} + 2 \beta_{5} + \cdots + 2 ) / 3 $ (2b15 - b13 + b11 - b10 + b9 - b8 + b6 + 2b5 + 2*b3 + b2 - b1 + 2) / 3
$\nu^{3}$	$=$	$ ( 2 \beta_{15} + 2 \beta_{12} + 4 \beta_{11} - 6 \beta_{10} + 2 \beta_{9} - 2 \beta_{8} + 27 \beta_{7} + \cdots + 8 ) / 6 $ (2b15 + 2b12 + 4b11 - 6b10 + 2b9 - 2b8 + 27b7 + 2b6 - 16b3 + 25b2 + 32*b1 + 8) / 6
$\nu^{4}$	$=$	$ ( - \beta_{15} + \beta_{14} - \beta_{13} - 2 \beta_{12} + \beta_{11} + 7 \beta_{10} - \beta_{9} + \cdots + 1 ) / 3 $ (-b15 + b14 - b13 - 2b12 + b11 + 7b10 - b9 + 6b8 + 2b6 - 5b5 + b4 + 10b3 - 104b2 + 10b1 + 1) / 3
$\nu^{5}$	$=$	$ ( 32 \beta_{15} - 13 \beta_{14} + 4 \beta_{13} - 12 \beta_{12} + 16 \beta_{11} + 4 \beta_{10} + 8 \beta_{9} + \cdots + 123 ) / 6 $ (32b15 - 13b14 + 4b13 - 12b12 + 16b11 + 4b10 + 8b9 - 116b8 + 300b7 - 4b6 + 110b5 + 26b4 - 24b3 + 16b2 + 12*b1 + 123) / 6
$\nu^{6}$	$=$	$ ( - 56 \beta_{15} - 16 \beta_{14} + 12 \beta_{13} + 66 \beta_{12} - 112 \beta_{11} + 28 \beta_{10} + \cdots - 715 ) / 3 $ (-56b15 - 16b14 + 12b13 + 66b12 - 112b11 + 28b10 + 66b9 - 66b8 - 264b7 + 78b6 - 8b5 + 8b4 - 22b3 - 208b2 + 44*b1 - 715) / 3
$\nu^{7}$	$=$	$ ( 368 \beta_{15} - 704 \beta_{14} - 9 \beta_{13} + 261 \beta_{12} - 368 \beta_{11} - 372 \beta_{10} + \cdots - 704 ) / 6 $ (368b15 - 704b14 - 9b13 + 261b12 - 368b11 - 372b10 - 9b9 - 381b8 - 261b6 - 3646b5 - 704b4 + 148b3 - 788b2 + 148b1 - 704) / 6
$\nu^{8}$	$=$	$ ( - 642 \beta_{15} + 682 \beta_{14} + 259 \beta_{13} - 262 \beta_{12} - 321 \beta_{11} + 259 \beta_{10} + \cdots + 10092 ) / 3 $ (-642b15 + 682b14 + 259b13 - 262b12 - 321b11 + 259b10 + 3b9 + 71b8 + 906b7 - 259b6 + 10774b5 - 1364b4 - 1102b3 - 321b2 + 551*b1 + 10092) / 3
$\nu^{9}$	$=$	$ ( - 370 \beta_{15} - 1520 \beta_{14} + 2312 \beta_{13} + 1554 \beta_{12} - 740 \beta_{11} + 814 \beta_{10} + \cdots + 80552 ) / 6 $ (-370b15 - 1520b14 + 2312b13 + 1554b12 - 740b11 + 814b10 + 1554b9 - 1554b8 - 17763b7 + 3866b6 - 760b5 + 760b4 + 5812b3 - 17393b2 - 11624*b1 + 80552) / 6
$\nu^{10}$	$=$	$ ( 4273 \beta_{15} - 2997 \beta_{14} + 7897 \beta_{13} - 8840 \beta_{12} - 4273 \beta_{11} - 6513 \beta_{10} + \cdots - 2997 ) / 3 $ (4273b15 - 2997b14 + 7897b13 - 8840b12 - 4273b11 - 6513b10 + 7897b9 + 1384b8 + 8840b6 - 6375b5 - 2997b4 + 5272b3 + 42782b2 + 5272b1 - 2997) / 3
$\nu^{11}$	$=$	$ ( 40896 \beta_{15} + 10137 \beta_{14} - 39840 \beta_{13} + 16424 \beta_{12} + 20448 \beta_{11} + \cdots + 208345 ) / 6 $ (40896b15 + 10137b14 - 39840b13 + 16424b12 + 20448b11 - 39840b10 + 23416b9 - 184b8 + 113256b7 + 39840b6 + 218482b5 - 20274b4 - 33600b3 + 20448b2 + 16800*b1 + 208345) / 6
$\nu^{12}$	$=$	$ ( 31536 \beta_{15} - 20440 \beta_{14} + 13868 \beta_{13} - 14848 \beta_{12} + 63072 \beta_{11} + \cdots + 622547 ) / 3 $ (31536b15 - 20440b14 + 13868b13 - 14848b12 + 63072b11 + 22456b10 - 14848b9 + 14848b8 - 43824b7 - 980b6 - 10220b5 + 10220b4 - 127304b3 - 75360b2 + 254608*b1 + 622547) / 3
$\nu^{13}$	$=$	$ ( 40992 \beta_{15} + 224312 \beta_{14} + 210401 \beta_{13} - 313729 \beta_{12} - 40992 \beta_{11} + \cdots + 224312 ) / 6 $ (40992b15 + 224312b14 + 210401b13 - 313729b12 - 40992b11 - 91808b10 + 210401b9 + 118593b8 + 313729b6 + 2983030b5 + 224312b4 + 222352b3 - 3261720b2 + 222352b1 + 224312) / 6
$\nu^{14}$	$=$	$ ( 432322 \beta_{15} - 100872 \beta_{14} - 339137 \beta_{13} + 382692 \beta_{12} + 216161 \beta_{11} + \cdots - 4241030 ) / 3 $ (432322b15 - 100872b14 - 339137b13 + 382692b12 + 216161b11 - 339137b10 - 43555b9 - 1764237b8 + 1316412b7 + 339137b6 - 4341902b5 + 201744b4 - 94142b3 + 216161b2 + 47071*b1 - 4241030) / 3
$\nu^{15}$	$=$	$ ( - 2937310 \beta_{15} - 3314576 \beta_{14} - 576456 \beta_{13} + 1478274 \beta_{12} - 5874620 \beta_{11} + \cdots - 16054616 ) / 6 $ (-2937310b15 - 3314576b14 - 576456b13 + 1478274b12 - 5874620b11 - 833654b10 + 1478274b9 - 1478274b8 - 7894293b7 + 901818b6 - 1657288b5 + 1657288b4 - 5727200b3 - 4956983b2 + 11454400*b1 - 16054616) / 6

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

Character values

We give the values of $\chi$ on generators for $\left(\mathbb{Z}/294\mathbb{Z}\right)^\times$.

$n$	$197$	$199$
$\chi(n)$	$-1$	$1 + \beta_{5}$

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} $

215.1

−0.0204843	−	2.99993i
2.99617	−	0.151487i
−2.81518	+	1.03671i
0.339489	+	2.98073i
−1.62928	+	2.51902i
2.41164	+	1.78437i
−2.58777	−	1.51770i
2.30541	−	1.91966i
−0.0204843	+	2.99993i
2.99617	+	0.151487i
−2.81518	−	1.03671i
0.339489	−	2.98073i
−1.62928	−	2.51902i
2.41164	−	1.78437i
−2.58777	+	1.51770i
2.30541	+	1.91966i

−1.73205

−

1.00000i

−4.48216

−

2.62874i

2.00000

3.46410i

5.27257

−

9.13236i

5.13458

9.03527i

−

8.00000i

13.1794

23.5649i

−18.2647

10.5451i

215.2

−1.73205

−

1.00000i

−2.82199

4.36307i

2.00000

3.46410i

−2.24534

3.88904i

9.25090

−

4.73506i

−

8.00000i

−11.0727

−

24.6251i

7.77808

−

4.49068i

215.3

−1.73205

−

1.00000i

3.99309

−

3.32495i

2.00000

3.46410i

−9.90442

17.1550i

−10.2412

1.76589i

−

8.00000i

4.88947

−

26.5536i

34.3099

−

19.8088i

215.4

−1.73205

−

1.00000i

4.17709

3.09062i

2.00000

3.46410i

4.27911

−

7.41164i

−4.14431

−

9.53020i

−

8.00000i

7.89612

25.8196i

−14.8233

8.55823i

215.5

1.73205

1.00000i

−5.18952

0.262384i

2.00000

3.46410i

2.24534

−

3.88904i

−9.25090

−

4.73506i

8.00000i

26.8623

−

2.72329i

7.77808

−

4.49068i

215.6

1.73205

1.00000i

−0.588012

−

5.16277i

2.00000

3.46410i

−4.27911

7.41164i

4.14431

−

9.53020i

8.00000i

−26.3085

6.07155i

−14.8233

8.55823i

215.7

1.73205

1.00000i

0.0354799

5.19603i

2.00000

3.46410i

−5.27257

9.13236i

−5.13458

9.03527i

8.00000i

−26.9975

0.368709i

−18.2647

10.5451i

215.8

1.73205

1.00000i

4.87603

−

1.79564i

2.00000

3.46410i

9.90442

−

17.1550i

10.2412

1.76589i

8.00000i

20.5514

−

17.5112i

34.3099

−

19.8088i

227.1

−1.73205

1.00000i

−4.48216

2.62874i

2.00000

−

3.46410i

5.27257

9.13236i

5.13458

−

9.03527i

8.00000i

13.1794

−

23.5649i

−18.2647

−

10.5451i

227.2

−1.73205

1.00000i

−2.82199

−

4.36307i

2.00000

−

3.46410i

−2.24534

−

3.88904i

9.25090

4.73506i

8.00000i

−11.0727

24.6251i

7.77808

4.49068i

227.3

−1.73205

1.00000i

3.99309

3.32495i

2.00000

−

3.46410i

−9.90442

−

17.1550i

−10.2412

−

1.76589i

8.00000i

4.88947

26.5536i

34.3099

19.8088i

227.4

−1.73205

1.00000i

4.17709

−

3.09062i

2.00000

−

3.46410i

4.27911

7.41164i

−4.14431

9.53020i

8.00000i

7.89612

−

25.8196i

−14.8233

−

8.55823i

227.5

1.73205

−

1.00000i

−5.18952

−

0.262384i

2.00000

−

3.46410i

2.24534

3.88904i

−9.25090

4.73506i

−

8.00000i

26.8623

2.72329i

7.77808

4.49068i

227.6

1.73205

−

1.00000i

−0.588012

5.16277i

2.00000

−

3.46410i

−4.27911

−

7.41164i

4.14431

9.53020i

−

8.00000i

−26.3085

−

6.07155i

−14.8233

−

8.55823i

227.7

1.73205

−

1.00000i

0.0354799

−

5.19603i

2.00000

−

3.46410i

−5.27257

−

9.13236i

−5.13458

−

9.03527i

−

8.00000i

−26.9975

−

0.368709i

−18.2647

−

10.5451i

227.8

1.73205

−

1.00000i

4.87603

1.79564i

2.00000

−

3.46410i

9.90442

17.1550i

10.2412

−

1.76589i

−

8.00000i

20.5514

17.5112i

34.3099

19.8088i

Inner twists

Char	Parity	Ord	Mult	Type
1.a	even	1	1	trivial
3.b	odd	2	1	inner
7.d	odd	6	1	inner
21.g	even	6	1	inner

Twists

By twisting character orbit
Char	Parity	Ord	Mult	Type	Twist	Min	Dim
1.a	even	1	1	trivial	294.4.f.a		16
3.b	odd	2	1	inner	294.4.f.a		16
7.b	odd	2	1		42.4.f.a	✓	16
7.c	even	3	1		42.4.f.a	✓	16
7.c	even	3	1		294.4.d.a		16
7.d	odd	6	1		294.4.d.a		16
7.d	odd	6	1	inner	294.4.f.a		16
21.c	even	2	1		42.4.f.a	✓	16
21.g	even	6	1		294.4.d.a		16
21.g	even	6	1	inner	294.4.f.a		16
21.h	odd	6	1		42.4.f.a	✓	16
21.h	odd	6	1		294.4.d.a		16
28.d	even	2	1		336.4.bc.e		16
28.g	odd	6	1		336.4.bc.e		16
84.h	odd	2	1		336.4.bc.e		16
84.n	even	6	1		336.4.bc.e		16

By twisted newform orbit
Twist	Min	Dim	Char	Parity	Ord	Mult	Type
42.4.f.a	✓	16	7.b	odd	2	1
42.4.f.a	✓	16	7.c	even	3	1
42.4.f.a	✓	16	21.c	even	2	1
42.4.f.a	✓	16	21.h	odd	6	1
294.4.d.a		16	7.c	even	3	1
294.4.d.a		16	7.d	odd	6	1
294.4.d.a		16	21.g	even	6	1
294.4.d.a		16	21.h	odd	6	1
294.4.f.a		16	1.a	even	1	1	trivial
294.4.f.a		16	3.b	odd	2	1	inner
294.4.f.a		16	7.d	odd	6	1	inner
294.4.f.a		16	21.g	even	6	1	inner
336.4.bc.e		16	28.d	even	2	1
336.4.bc.e		16	28.g	odd	6	1
336.4.bc.e		16	84.h	odd	2	1
336.4.bc.e		16	84.n	even	6	1

Hecke kernels

This newform subspace can be constructed as the kernel of the linear operator $ T_{5}^{16} + 597 T_{5}^{14} + 264258 T_{5}^{12} + 45374877 T_{5}^{10} + 5550035922 T_{5}^{8} + \cdots + 41\!\cdots\!56 $ T5^16 + 597*T5^14 + 264258*T5^12 + 45374877*T5^10 + 5550035922*T5^8 + 367182336789*T5^6 + 17289861638841*T5^4 + 310619615073840*T5^2 + 4153645759078656 acting on $S_{4}^{\mathrm{new}}(294, [\chi])$.

Hecke characteristic polynomials

$p$	$F_p(T)$
$2$	$ (T^{4} - 4 T^{2} + 16)^{4} $ (T^4 - 4*T^2 + 16)^4
$3$	$ T^{16} + \cdots + 282429536481 $ T^16 - 9T^14 + 9T^12 + 4536T^11 + 17766T^10 - 9072T^9 - 442422T^8 - 244944T^7 + 12951414T^6 + 89282088T^5 + 4782969T^4 - 3486784401*T^2 + 282429536481
$5$	$ T^{16} + \cdots + 41\!\cdots\!56 $ T^16 + 597T^14 + 264258T^12 + 45374877T^10 + 5550035922T^8 + 367182336789T^6 + 17289861638841T^4 + 310619615073840*T^2 + 4153645759078656
$7$	$ T^{16} $ T^16
$11$	$ T^{16} + \cdots + 24\!\cdots\!16 $ T^16 - 5391T^14 + 22614066T^12 - 30424674303T^10 + 29836951734258T^8 - 13464145104313743T^6 + 4392246020177179521T^4 - 107222708372158886976*T^2 + 2440487028417814204416
$13$	$ (T^{8} + 4551 T^{6} + \cdots + 16498888704)^{2} $ (T^8 + 4551T^6 + 2979108T^4 + 570419712*T^2 + 16498888704)^2
$17$	$ T^{16} + \cdots + 87\!\cdots\!00 $ T^16 + 22782T^14 + 387463563T^12 + 2831427288342T^10 + 15419407094864361T^8 + 10884654228190861980T^6 + 6823590140179442638800T^4 + 24511824186353490528000*T^2 + 87552360667406338560000
$19$	$ (T^{8} + \cdots + 69773043356676)^{2} $ (T^8 - 171T^7 - 1842T^6 + 1981719T^5 + 46647738T^4 - 16123787289T^3 + 548436272553T^2 + 11621573426826*T + 69773043356676)^2
$23$	$ T^{16} + \cdots + 40\!\cdots\!96 $ T^16 - 44802T^14 + 1432520235T^12 - 21745254238794T^10 + 238601271153713481T^8 - 969119601478530267924T^6 + 2844116853911884311685200T^4 - 4041773605682047226068008192*T^2 + 4079068812534267004985733943296
$29$	$ (T^{8} + \cdots + 20\!\cdots\!96)^{2} $ (T^8 + 72729T^6 + 1509134976T^4 + 10537006777344*T^2 + 20034685818372096)^2
$31$	$ (T^{8} + \cdots + 81\!\cdots\!01)^{2} $ (T^8 + 402T^7 + 41736T^6 - 4877064T^5 - 855373959T^4 + 116636150232T^3 + 34275384741024T^2 + 2746763081118126*T + 81628318996303401)^2
$37$	$ (T^{8} + \cdots + 81\!\cdots\!56)^{2} $ (T^8 + 481T^7 + 314992T^6 + 102777379T^5 + 50423553172T^4 + 14673347636587T^3 + 4356757010847979T^2 + 646161179732391370*T + 81666889425188053156)^2
$41$	$ (T^{8} + \cdots + 15\!\cdots\!76)^{2} $ (T^8 - 432408T^6 + 52068871440T^4 - 1898169992301312*T^2 + 15703157914051608576)^2
$43$	$ (T^{4} - 433 T^{3} + \cdots + 966156928)^{4} $ (T^4 - 433T^3 - 85728T^2 + 37466096*T + 966156928)^4
$47$	$ T^{16} + \cdots + 20\!\cdots\!76 $ T^16 + 339978T^14 + 85463986203T^12 + 8488943280174618T^10 + 605030860859728798737T^8 + 23317876952262147392636256T^6 + 631367312688707787440993753856T^4 + 3943086387032758537387306721894400*T^2 + 20271517042551867310524846030706507776
$53$	$ T^{16} + \cdots + 65\!\cdots\!00 $ T^16 - 569799T^14 + 212669417970T^12 - 45756035835996519T^10 + 7142879178328676547186T^8 - 720319285173432262398665175T^6 + 52943745899382875184693158870625T^4 - 2307580763353529682019075878584250000*T^2 + 65287172450444586808229722789424100000000
$59$	$ T^{16} + \cdots + 11\!\cdots\!36 $ T^16 + 1029045T^14 + 775669902066T^12 + 271081786005979821T^10 + 69733896332695474599522T^8 + 2883654276895085833508868693T^6 + 103177775220759498146177450600793T^4 + 34486809666391241700901174502880048*T^2 + 11421128798691498051411901613271572736
$61$	$ (T^{8} + \cdots + 25\!\cdots\!44)^{2} $ (T^8 - 2310T^7 + 2370615T^6 - 1367323650T^5 + 480636786753T^4 - 104045523589980T^3 + 13303541774870928T^2 - 892159531070742144*T + 25760656722530386944)^2
$67$	$ (T^{8} + \cdots + 30\!\cdots\!04)^{2} $ (T^8 + 353T^7 + 260152T^6 - 32172037T^5 + 19396001164T^4 - 167895466285T^3 + 297604295739955T^2 - 13656359405763358*T + 3036229573514088004)^2
$71$	$ (T^{8} + \cdots + 18\!\cdots\!16)^{2} $ (T^8 + 678168T^6 + 20183760144T^4 + 123867835918848*T^2 + 182329765184802816)^2
$73$	$ (T^{8} + \cdots + 13\!\cdots\!64)^{2} $ (T^8 + 1647T^7 + 1022484T^6 + 194808807T^5 - 42941956140T^4 - 14737310733717T^3 + 3817932715234431T^2 + 1429202978440395444*T + 131577405664148738064)^2
$79$	$ (T^{8} + \cdots + 11\!\cdots\!61)^{2} $ (T^8 + 1328T^7 + 2621710T^6 + 1841095856T^5 + 3059389735471T^4 + 2192123600069456T^3 + 1926071802117069670T^2 + 512429626335775061048*T + 118221278650035601669561)^2
$83$	$ (T^{8} + \cdots + 16\!\cdots\!56)^{2} $ (T^8 - 2852067T^6 + 2014371869040T^4 - 360446437983184128*T^2 + 16674078085265215328256)^2
$89$	$ T^{16} + \cdots + 18\!\cdots\!36 $ T^16 + 3316302T^14 + 6939745175403T^12 + 9111941852559810822T^10 + 8832414627220842835829577T^8 + 5969112231006651616910190968364T^6 + 2978674006074807124116597289958157456T^4 + 933446357484172565984921999797925279477760*T^2 + 184527661559301380910022800801801417781737947136
$97$	$ (T^{8} + \cdots + 10\!\cdots\!36)^{2} $ (T^8 + 832731T^6 + 84302904096T^4 + 2451916579670784*T^2 + 10175730882067316736)^2
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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:	\( N \)	\(=\)	\( 294 = 2 \cdot 3 \cdot 7^{2} \)
Weight:	\( k \)	\(=\)	\( 4 \)
Character orbit:	\([\chi]\)	\(=\)	294.f (of order \(6\), degree \(2\), not minimal)

\(f(q)\)	\(=\)	\( q - \beta_{7} q^{2} + (\beta_{3} - \beta_1) q^{3} - 4 \beta_{5} q^{4} + (\beta_{11} + \beta_{7} + \beta_{2}) q^{5} + (\beta_{5} - \beta_{4}) q^{6} + ( - 4 \beta_{7} - 4 \beta_{2}) q^{8} + ( - 2 \beta_{15} - \beta_{14} + \cdots + 3) q^{9}+O(q^{10}) \) q - b7 * q^2 + (b3 - b1) * q^3 - 4b5 q^4 + (b11 + b7 + b2) * q^5 + (b5 - b4) * q^6 + (-4b7 - 4b2) * q^8 + (-2b15 - b14 - b13 + b12 - b11 - b10 - b8 + b6 + 2b5 + 2b4 - b2 + 3) q^9	\( q - \beta_{7} q^{2} + (\beta_{3} - \beta_1) q^{3} - 4 \beta_{5} q^{4} + (\beta_{11} + \beta_{7} + \beta_{2}) q^{5} + (\beta_{5} - \beta_{4}) q^{6} + ( - 4 \beta_{7} - 4 \beta_{2}) q^{8} + ( - 2 \beta_{15} - \beta_{14} + \cdots + 3) q^{9}+ \cdots + (6 \beta_{15} - 48 \beta_{14} + \cdots - 297) q^{99}+O(q^{100}) \) q - b7 * q^2 + (b3 - b1) * q^3 - 4b5 q^4 + (b11 + b7 + b2) * q^5 + (b5 - b4) * q^6 + (-4b7 - 4b2) * q^8 + (-2b15 - b14 - b13 + b12 - b11 - b10 - b8 + b6 + 2b5 + 2b4 - b2 + 3) q^9 + (-b14 - b13 + b12 - 2b10 + b9 - b8 + b6 + b5 + b4 + 2b3 - 2b1 + 3) q^10 + (b15 - b14 + b13 - b12 - b11 + 2b10 + b9 + 3b8 + b6 - b5 - b4 - 2b3 - b2 - 2b1 - 1) * q^11 - 4b1 q^12 + (-b12 - b10 + b9 - b8 + b6 - 16b5 + 2b4 - 2b3 - 7) q^13 + (b15 + 2b13 + 2b11 - 4b10 + 15b7 + 2b6 - b3 + 14b2 + 2b1 + 1) q^15 + (-16b5 - 16) q^16 + (-4b15 - 3b14 + b13 + b12 - 4b11 - 3b10 - b9 + 2b8 - 8b7 + b6 - b5 + 3b4 - 9b3 - 4b2 + 9b1 + 1) * q^17 + (-2b15 + b13 + b12 + 2b11 + b9 + b8 - b6 + 6b5 + 2b2) * q^18 + (2b14 - b13 - 3b12 + 7b10 - 4b9 + 3b8 - b6 - 13b5 + 7b1 + 15) q^19 + (-4b15 - 4b7) * q^20 + (6b14 + 3b13 - 2b12 - 2b9 + 2b8 + b6 + 3b5 - 3b4 + 2b3 - 4b1 + 4) q^22 + (4b14 - 4b12 + 4b9 + 3b8 - 6b7 - 8b4 + 2b3 - b1 - 4) q^23 + (4b14 + 4b5 - 4b4 + 4) q^24 + (4b14 + b13 - 4b12 + 10b10 + b9 + 11b8 + 4b6 + 25b5 + 4b4 + 10b3 + 10b1 + 4) q^25 + (3b14 - 2b13 + b12 + 2b11 - 4b10 - b9 - 3b8 - 5b7 - 2b6 + 2b5 - 12b2 + 6b1 + 1) * q^26 + (3b15 + 3b13 - 9b12 - b10 + 9b9 + 7b8 + 3b7 + 6b6 + 27b5 + 3b4 + 6b3 + 15) * q^27 + (-b15 - 10b14 + 5b13 - 2b11 + b10 - 27b7 + 5b6 - 5b5 + 5b4 + b3 - 26b2 - 2b1) q^29 + (-2b14 - 2b13 - 3b12 - 2b10 + 5b9 + 11b8 + 3b7 + 2b6 + 42b5 + 4b4 + 4b3 - 2b1 + 44) * q^30 + (9b14 + 5b13 - b12 + 2b10 - 5b9 + 5b8 - b6 - 28b5 - 9b4 + 6b3 - 6b1 - 65) q^31 - 16b2 q^32 + (-6b14 - 2b13 + 7b12 - 3b11 + 5b9 - b8 + 18b7 - 2b6 + 53b5 + 39b2 - 3b1 - 59) * q^33 + (7b13 - 6b12 + 4b10 + 6b9 + 14b8 - b6 - 33b5 + 5b4 + 4b3 - 14) * q^34 + (-4b15 - 8b14 + 4b12 - 8b11 - 8b10 + 4b9 - 4b8 + 4b6 - 4b5 + 4b4 + 4b2 + 8) q^36 + (-7b14 + 7b13 - 14b12 + 7b10 + 7b9 + 14b8 - 7b6 - 129b5 + 14b4 - 14b3 + 7b1 - 122) q^37 + (14b15 + 14b11 + 2b10 - 2b8 - 14b7 + 6b3 - 7b2 - 6b1) * q^38 + (6b15 - 2b14 + 3b13 - 4b12 - 6b11 + 2b10 + 3b9 + 5b8 + 4b6 - 77b5 - 2b4 - 6b3 + 42b2 - 6b1 - 2) * q^39 + (-4b14 + 4b12 - 8b10 + 4b9 - 4b8 - 8b5 - 8b1 + 4) q^40 + (8b15 + 8b13 - 16b12 - 2b10 + 16b9 + 12b8 + 8b7 + 8b6 - 8b5 - 24b4 + 6b3 - 16) q^41 + (20b14 + 10b13 + 3b12 + b10 + 3b9 - 3b8 + 13b6 + 10b5 - 10b4 - 4b3 + 8b1 + 119) * q^43 + (8b15 + 4b14 - 4b12 + 4b11 + 4b9 + 12b8 + 12b7 - 8b4 - 16b3 + 4b2 + 8b1 - 4) q^44 + (6b15 - 9b14 + 3b13 + 6b11 - b10 - 3b9 + 4b8 + 138b7 + 96b5 + 9b4 - 6b3 + 69b2 + 6b1 + 201) * q^45 + (-b14 - b13 + b12 - 16b10 - b9 - 17b8 - b6 - 21b5 - b4 - 16b3 - 16b1 - 1) q^46 + (-14b11 + 18b10 + 9b8 - 56b7 - 98b2 - 27b1) * q^47 - 16b3 q^48 + (6b15 - 14b14 + 7b13 + 12b11 - 10b10 + 43b7 + 7b6 - 7b5 + 7b4 - 10b3 + 37b2 + 20b1) * q^50 + (22b15 + 9b14 + 3b13 - 14b12 + 11b11 + 3b10 + 11b9 - 8b8 + 39b7 - 3b6 + 203b5 - 18b4 + 8b3 + 11b2 - 4b1 + 194) q^51 + (-8b14 - 4b13 + 4b9 - 4b8 - 36b5 + 8b4 - 8b3 + 8b1 - 64) * q^52 + (-11b15 - 6b14 + 6b13 - 6b12 + 11b11 + 6b9 + 6b8 + 6b6 - 6b5 - 6b4 - 85b2 - 6) q^53 + (-2b13 - 2b12 + 6b11 - 30b10 - 4b9 - 16b8 + 27b7 - 2b6 + 8b5 + 48b2 + 12b1 - 8) q^54 + (5b13 - 13b12 - 5b10 + 13b9 + 3b8 + 8b6 - 125b5 + 21b4 - 12b3 - 52) q^55 + (3b15 + 14b14 + 16b13 - 4b12 + 6b11 + 39b10 - 4b9 + 4b8 - 42b7 + 12b6 + 7b5 - 7b4 + 14b3 - 45b2 - 28b1 - 156) q^57 + (2b14 + 2b13 + 2b10 - 2b9 + 20b8 - 2b6 - 96b5 - 4b4 + 36b3 - 18b1 - 98) * q^58 + (-5b15 + 3b14 - b13 - b12 - 5b11 + 14b10 + b9 - 13b8 - 262b7 - b6 + b5 - 3b4 + 42b3 - 131b2 - 42b1 - 1) * q^59 + (-4b15 + 8b13 - 8b12 + 4b11 - 16b10 + 8b9 - 8b8 + 8b6 - 4b5 + 4b3 + 52b2 + 4b1) * q^60 + (-7b14 + 7b12 + 4b10 + 7b9 + 2b8 - 196b5 + 13b1 + 189) q^61 + (12b15 + 4b13 - 8b12 + 8b10 + 8b9 + 24b8 + 47b7 + 4b6 - 4b5 - 12b4 - 24b3 - 35b2 - 8) * q^62 - 64 * q^64 + (-20b15 - 2b14 + 2b12 - 10b11 - 2b9 - 24b8 - 36b7 + 4b4 + 44b3 - 10b2 - 22b1 + 2) q^65 + (-24b15 - 6b14 + 9b13 + 3b12 - 24b11 + 10b10 - 9b9 - 7b8 + 78b7 + 3b6 + 84b5 + 6b4 - 6b3 + 39b2 + 6b1 + 174) q^66 + (13b13 - 11b10 + 13b9 + 2b8 + 85b5 - 11b3 - 11b1) q^67 + (-12b14 + 8b13 - 4b12 - 16b11 - 24b10 + 4b9 - 8b8 - 16b7 + 8b6 - 8b5 - 16b2 + 36b1 - 4) * q^68 + (-27b15 + 10b13 + b12 + 8b10 - b9 + 15b8 - 132b7 - 11b6 + 5b5 - 3b4 + 105b2 + 1) q^69 + (-12b15 - 20b14 + 10b13 - 24b11 + 14b10 + 90b7 + 10b6 - 10b5 + 10b4 + 14b3 + 102b2 - 28b1) * q^71 + (-16b15 + 8b13 - 4b12 - 8b11 + 8b10 - 4b9 + 12b8 - 24b7 - 8b6 + 24b5 - 8b2 + 24) q^72 + (b14 - 2b13 + 5b12 + 9b10 + 2b9 - 21b8 + 5b6 - 136b5 - b4 - 41b3 + 41b1 - 273) q^73 + (14b15 - 14b11 - 42b10 - 42b8 + 42b3 - 87b2 + 42b1) q^74 + (30b14 + 5b13 - 25b12 + 6b11 + 59b10 - 20b9 + 32b8 + 48b7 + 5b6 + 271b5 + 90b2 + 34b1 - 241) * q^75 + (-16b13 + 4b12 - 4b9 - 4b8 + 12b6 - 112b5 + 8b4 + 28b3 - 52) * q^76 + (2b15 + 26b14 + 7b13 - 12b12 + 4b11 + 10b10 - 12b9 + 12b8 - 69b7 - 5b6 + 13b5 - 13b4 - 2b3 - 71b2 + 4b1 + 184) q^78 + (-11b14 - 40b13 + 29b12 - 40b10 + 11b9 - 95b8 + 40b6 - 333b5 + 22b4 - 52b3 + 26b1 - 322) q^79 + (-16b15 - 16b11 - 32b7 - 16b2) * q^80 + (3b15 + 6b14 - 6b13 - 3b12 - 3b11 + 30b10 - 6b9 + 24b8 + 3b6 - 12b5 + 6b4 + 21b3 + 312b2 + 21b1 + 6) * q^81 + (2b14 - 4b13 - 6b12 - 48b10 - 10b9 - 26b8 - 4b6 + 20b5 - 80b1 - 18) q^82 + (-19b15 - 9b13 + 18b12 - 9b10 - 18b9 - 36b8 + 191b7 - 9b6 + 9b5 + 27b4 + 27b3 - 210b2 + 18) * q^83 + (-26b14 - 13b13 + 23b10 - 13b6 - 13b5 + 13b4 - 23b3 + 46b1 + 314) * q^85 + (-12b15 - 7b14 + 7b12 - 6b11 - 7b9 + 39b8 - 85b7 + 14b4 - 92b3 - 6b2 + 46b1 + 7) q^86 + (24b15 + 21b14 - 18b13 + 15b12 + 24b11 - 19b10 + 18b9 - 29b8 + 300b7 + 15b6 - 33b5 - 21b4 + 3b3 + 150b2 - 3b1 - 87) q^87 + (12b14 + 4b13 - 12b12 - 8b10 + 4b9 - 4b8 + 12b6 - 4b5 + 12b4 - 8b3 - 8b1 + 12) q^88 + (27b14 - 18b13 + 9b12 + 84b11 + 22b10 - 9b9 + 2b8 + 42b7 - 18b6 + 18b5 - 33b1 + 9) q^89 + (6b15 - 2b13 - 8b12 + 6b10 + 8b9 + 20b8 - 99b7 + 10b6 + 503b5 + 9b4 + 54b3 + 105b2 + 256) * q^90 + (32b14 - 16b13 + 4b10 - 24b7 - 16b6 + 16b5 - 16b4 + 4b3 - 24b2 - 8b1) * q^92 + (-48b15 - 6b14 + 6b13 + 15b12 - 24b11 + 6b10 - 21b9 - 27b8 + 117b7 - 6b6 + 258b5 + 12b4 - 82b3 - 24b2 + 41b1 + 264) q^93 + (41b14 + 23b13 - 5b12 + 28b10 - 23b9 + 5b8 - 5b6 - 137b5 - 41b4 - 28b3 + 28b1 - 315) q^94 + (20b14 - 20b13 + 20b12 + 47b10 - 20b9 + 27b8 - 20b6 + 20b5 + 20b4 - 47b3 - 534b2 - 47b1 + 20) * q^95 + (16b14 + 16) q^96 + (-3b13 + 17b12 + 6b10 - 17b9 - 5b8 - 14b6 + 267b5 - 31b4 + 7b3 + 118) q^97 + (6b15 - 48b14 - 36b13 + 3b12 + 12b11 - 42b10 + 3b9 - 3b8 - 108b7 - 33b6 - 24b5 + 24b4 - 48b3 - 114b2 + 96b1 - 297) q^99
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 16 q + 32 q^{4} + 18 q^{9}+O(q^{10}) \) 16 * q + 32 * q^4 + 18 * q^9	\( 16 q + 32 q^{4} + 18 q^{9} + 36 q^{10} - 128 q^{16} - 48 q^{18} + 342 q^{19} + 24 q^{22} + 48 q^{24} - 194 q^{25} + 360 q^{30} - 804 q^{31} - 1332 q^{33} + 144 q^{36} - 962 q^{37} + 594 q^{39} + 144 q^{40} + 1732 q^{43} + 2394 q^{45} + 168 q^{46} + 1638 q^{51} - 744 q^{52} - 180 q^{54} - 2664 q^{57} - 780 q^{58} + 4620 q^{61} - 1024 q^{64} + 2016 q^{66} - 706 q^{67} + 192 q^{72} - 3294 q^{73} - 6174 q^{75} + 2832 q^{78} - 2656 q^{79} + 126 q^{81} - 432 q^{82} + 5232 q^{85} - 1026 q^{87} + 48 q^{88} + 2016 q^{93} - 3888 q^{94} + 192 q^{96} - 4284 q^{99}+O(q^{100}) \) 16 * q + 32 * q^4 + 18 * q^9 + 36 * q^10 - 128 * q^16 - 48 * q^18 + 342 * q^19 + 24 * q^22 + 48 * q^24 - 194 * q^25 + 360 * q^30 - 804 * q^31 - 1332 * q^33 + 144 * q^36 - 962 * q^37 + 594 * q^39 + 144 * q^40 + 1732 * q^43 + 2394 * q^45 + 168 * q^46 + 1638 * q^51 - 744 * q^52 - 180 * q^54 - 2664 * q^57 - 780 * q^58 + 4620 * q^61 - 1024 * q^64 + 2016 * q^66 - 706 * q^67 + 192 * q^72 - 3294 * q^73 - 6174 * q^75 + 2832 * q^78 - 2656 * q^79 + 126 * q^81 - 432 * q^82 + 5232 * q^85 - 1026 * q^87 + 48 * q^88 + 2016 * q^93 - 3888 * q^94 + 192 * q^96 - 4284 * 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	294.4.f.a

Level	$294$
Weight	$4$
Character orbit	294.f
Analytic conductor	$17.347$
Analytic rank	$0$
Dimension	$16$
CM	no
Inner twists	$4$

Self dual:	no
Analytic conductor:	\(17.3465615417\)
Analytic rank:	\(0\)
Dimension:	\(16\)
Relative dimension:	\(8\) over \(\Q(\zeta_{6})\)
Coefficient field:	\(\mathbb{Q}[x]/(x^{16} - \cdots)\)
comment: defining polynomial gp: f.mod \\ as an extension of the character field
Defining polynomial:	\( x^{16} - 2 x^{15} - x^{14} - 2 x^{13} + 9 x^{12} - 24 x^{11} + 714 x^{10} - 1940 x^{9} - 2834 x^{8} + \cdots + 43046721 \) x^16 - 2x^15 - x^14 - 2x^13 + 9x^12 - 24x^11 + 714x^10 - 1940x^9 - 2834x^8 - 17460x^7 + 57834x^6 - 17496x^5 + 59049x^4 - 118098x^3 - 531441x^2 - 9565938x + 43046721
Coefficient ring:	\(\Z[a_1, \ldots, a_{5}]\)
Coefficient ring index:	\( 2^{6}\cdot 3^{8} \)
Twist minimal:	no (minimal twist has level 42)
Sato-Tate group:	$\mathrm{SU}(2)[C_{6}]$

\(\beta_{1}\)	\(=\)	\( ( - 11783 \nu^{15} - 129119 \nu^{14} - 517471 \nu^{13} + 606928 \nu^{12} - 14603832 \nu^{11} + \cdots + 756665695800 ) / 802467406944 \) (-11783v^15 - 129119v^14 - 517471v^13 + 606928v^12 - 14603832v^11 + 41353032v^10 - 40265502v^9 + 53965450v^8 - 392955662v^7 + 1778268744v^6 - 3008422296v^5 + 39016272456v^4 + 110463994377v^3 + 163835052489v^2 - 800613209295*v + 756665695800) / 802467406944
\(\beta_{2}\)	\(=\)	\( ( - 99716 \nu^{15} - 525581 \nu^{14} - 4176229 \nu^{13} + 461611 \nu^{12} + \cdots - 74485176237 ) / 4413570738192 \) (-99716v^15 - 525581v^14 - 4176229v^13 + 461611v^12 - 656424v^11 + 115779900v^10 - 5977428v^9 - 100103006v^8 - 2177986010v^7 + 3121868142v^6 + 5634915336v^5 - 6477453684v^4 + 27572576256v^3 + 28249454943v^2 - 1410719168997*v - 74485176237) / 4413570738192
\(\beta_{3}\)	\(=\)	\( ( - 212507 \nu^{15} - 5626388 \nu^{14} - 25621768 \nu^{13} - 99499205 \nu^{12} + \cdots - 21889683312741 ) / 8827141476384 \) (-212507v^15 - 5626388v^14 - 25621768v^13 - 99499205v^12 - 308400336v^11 + 890922000v^10 + 2273573622v^9 + 935214484v^8 - 11480207372v^7 - 20499423642v^6 + 20807095968v^5 + 1009683312480v^4 + 2258075337057v^3 + 4343313293208v^2 - 16875583713108*v - 21889683312741) / 8827141476384
\(\beta_{4}\)	\(=\)	\( ( 2357 \nu^{15} - 76480 \nu^{14} + 402562 \nu^{13} + 93215 \nu^{12} - 52902 \nu^{11} + \cdots + 475470165321 ) / 90072872208 \) (2357v^15 - 76480v^14 + 402562v^13 + 93215v^12 - 52902v^11 - 2581176v^10 - 10594434v^9 - 124678732v^8 - 129897586v^7 + 356616720v^6 + 1654725186v^5 - 6803786160v^4 - 1343266335v^3 - 16310987172v^2 - 72639481644*v + 475470165321) / 90072872208
\(\beta_{5}\)	\(=\)	\( ( 1025 \nu^{15} - 7522 \nu^{14} - 1448 \nu^{13} + 4529 \nu^{12} + 66042 \nu^{11} + \cdots - 60620943429 ) / 30024290736 \) (1025v^15 - 7522v^14 - 1448v^13 + 4529v^12 + 66042v^11 + 322620v^10 + 2446566v^9 + 2014304v^8 - 7719994v^7 - 24266412v^6 + 128621250v^5 + 43066404v^4 + 341572221v^3 + 683039466v^2 - 12045641706*v - 60620943429) / 30024290736
\(\beta_{6}\)	\(=\)	\( ( 38623 \nu^{15} + 1198056 \nu^{14} - 5469812 \nu^{13} + 5048117 \nu^{12} + \cdots - 9719194424139 ) / 980793497376 \) (38623v^15 + 1198056v^14 - 5469812v^13 + 5048117v^12 + 91977224v^11 + 273691056v^10 + 580611186v^9 - 137054516v^8 - 4409276604v^7 - 4021210726v^6 - 3106763496v^5 + 153718002720v^4 - 127900569213v^3 - 1310836230540v^2 - 2328952553784*v - 9719194424139) / 980793497376
\(\beta_{7}\)	\(=\)	\( ( - 286331 \nu^{15} - 1172447 \nu^{14} - 3463231 \nu^{13} - 17257904 \nu^{12} + \cdots + 545449784760 ) / 4413570738192 \) (-286331v^15 - 1172447v^14 - 3463231v^13 - 17257904v^12 + 49540536v^11 + 76849140v^10 + 32041542v^9 - 621195842v^8 - 255995654v^7 + 277800696v^6 + 53069502888v^5 + 129384485892v^4 + 226114636401v^3 - 957931318899v^2 - 623668865463*v + 545449784760) / 4413570738192
\(\beta_{8}\)	\(=\)	\( ( - 80557 \nu^{15} - 475105 \nu^{14} + 29131 \nu^{13} + 26780 \nu^{12} + 12598524 \nu^{11} + \cdots + 476938536804 ) / 326931165792 \) (-80557v^15 - 475105v^14 + 29131v^13 + 26780v^12 + 12598524v^11 + 7246644v^10 - 32616894v^9 - 273397906v^8 + 153425198v^7 + 1266876720v^6 - 913564980v^5 + 3717856260v^4 + 1830354975v^3 - 162634704417v^2 - 114262472205*v + 476938536804) / 326931165792
\(\beta_{9}\)	\(=\)	\( ( 370944 \nu^{15} - 1248091 \nu^{14} - 538303 \nu^{13} - 14904299 \nu^{12} + \cdots + 5989636082637 ) / 980793497376 \) (370944v^15 - 1248091v^14 - 538303v^13 - 14904299v^12 - 87963988v^11 - 357861492v^10 - 278588100v^9 + 734243010v^8 + 2333238362v^7 + 6714774578v^6 + 11983444956v^5 - 87923774052v^4 + 316363730508v^3 + 2331892439469v^2 + 6605115383241*v + 5989636082637) / 980793497376
\(\beta_{10}\)	\(=\)	\( ( - 193901 \nu^{15} - 416618 \nu^{14} - 1981174 \nu^{13} + 5790835 \nu^{12} + \cdots + 1369512296739 ) / 326931165792 \) (-193901v^15 - 416618v^14 - 1981174v^13 + 5790835v^12 + 7775244v^11 + 26275764v^10 - 130741998v^9 - 118606412v^8 - 524615396v^7 + 7736574438v^6 + 13819426524v^5 + 27002466180v^4 - 110194048593v^3 - 86204099826v^2 - 243730534302*v + 1369512296739) / 326931165792
\(\beta_{11}\)	\(=\)	\( ( 5816395 \nu^{15} + 4462603 \nu^{14} - 58985857 \nu^{13} - 70253912 \nu^{12} + \cdots - 185904439092000 ) / 8827141476384 \) (5816395v^15 + 4462603v^14 - 58985857v^13 - 70253912v^12 - 510053436v^11 - 1391063244v^10 + 9327548154v^9 + 12058070998v^8 - 21168407762v^7 - 253393254504v^6 - 66277109196v^5 + 614369803428v^4 + 4285317878271v^3 + 11486205988443v^2 + 24934743520479*v - 185904439092000) / 8827141476384
\(\beta_{12}\)	\(=\)	\( ( - 3030617 \nu^{15} - 6794630 \nu^{14} + 2799530 \nu^{13} - 11951165 \nu^{12} + \cdots + 2314040260275 ) / 2942380492128 \) (-3030617v^15 - 6794630v^14 + 2799530v^13 - 11951165v^12 + 40715880v^11 - 63345192v^10 + 744805470v^9 - 3483960380v^8 + 6148152436v^7 + 77075174166v^6 + 38386369800v^5 - 73495997352v^4 + 1371421101591v^3 - 1364448589110v^2 - 8731794229398*v + 2314040260275) / 2942380492128
\(\beta_{13}\)	\(=\)	\( ( - 1111135 \nu^{15} - 1280964 \nu^{14} + 6759296 \nu^{13} + 6088015 \nu^{12} + \cdots - 890478819513 ) / 980793497376 \) (-1111135v^15 - 1280964v^14 + 6759296v^13 + 6088015v^12 - 23922104v^11 + 62393280v^10 + 203938398v^9 - 806713708v^8 + 3160773852v^7 + 17612125126v^6 + 15062725080v^5 - 98632791504v^4 + 285502192749v^3 - 943343046936v^2 - 1746194429844*v - 890478819513) / 980793497376
\(\beta_{14}\)	\(=\)	\( ( - 28607 \nu^{15} + 29539 \nu^{14} + 231701 \nu^{13} + 96310 \nu^{12} - 379746 \nu^{11} + \cdots + 576366896376 ) / 22518218052 \) (-28607v^15 + 29539v^14 + 231701v^13 + 96310v^12 - 379746v^11 - 1096566v^10 - 29136138v^9 - 10559702v^8 + 26686030v^7 + 707918058v^6 - 999264114v^5 - 2972265678v^4 - 2852007651v^3 - 5844020481v^2 - 3239132895*v + 576366896376) / 22518218052
\(\beta_{15}\)	\(=\)	\( ( - 4503491 \nu^{15} - 4051820 \nu^{14} + 29323772 \nu^{13} + 95485939 \nu^{12} + \cdots + 55258803118467 ) / 2942380492128 \) (-4503491v^15 - 4051820v^14 + 29323772v^13 + 95485939v^12 + 204560964v^11 + 311170116v^10 - 3506282358v^9 - 6256386860v^8 + 14301802036v^7 + 116556367446v^6 + 51467300100v^5 - 477886674204v^4 - 1649137112883v^3 - 2790931616928v^2 - 8992178707464*v + 55258803118467) / 2942380492128

\(\nu\)	\(=\)	\( ( \beta_{13} - \beta_{12} + \beta_{9} + \beta_{8} + \beta_{6} - 2\beta_{5} ) / 6 \) (b13 - b12 + b9 + b8 + b6 - 2*b5) / 6
\(\nu^{2}\)	\(=\)	\( ( 2 \beta_{15} - \beta_{13} + \beta_{11} - \beta_{10} + \beta_{9} - \beta_{8} + \beta_{6} + 2 \beta_{5} + \cdots + 2 ) / 3 \) (2b15 - b13 + b11 - b10 + b9 - b8 + b6 + 2b5 + 2*b3 + b2 - b1 + 2) / 3
\(\nu^{3}\)	\(=\)	\( ( 2 \beta_{15} + 2 \beta_{12} + 4 \beta_{11} - 6 \beta_{10} + 2 \beta_{9} - 2 \beta_{8} + 27 \beta_{7} + \cdots + 8 ) / 6 \) (2b15 + 2b12 + 4b11 - 6b10 + 2b9 - 2b8 + 27b7 + 2b6 - 16b3 + 25b2 + 32*b1 + 8) / 6
\(\nu^{4}\)	\(=\)	\( ( - \beta_{15} + \beta_{14} - \beta_{13} - 2 \beta_{12} + \beta_{11} + 7 \beta_{10} - \beta_{9} + \cdots + 1 ) / 3 \) (-b15 + b14 - b13 - 2b12 + b11 + 7b10 - b9 + 6b8 + 2b6 - 5b5 + b4 + 10b3 - 104b2 + 10b1 + 1) / 3
\(\nu^{5}\)	\(=\)	\( ( 32 \beta_{15} - 13 \beta_{14} + 4 \beta_{13} - 12 \beta_{12} + 16 \beta_{11} + 4 \beta_{10} + 8 \beta_{9} + \cdots + 123 ) / 6 \) (32b15 - 13b14 + 4b13 - 12b12 + 16b11 + 4b10 + 8b9 - 116b8 + 300b7 - 4b6 + 110b5 + 26b4 - 24b3 + 16b2 + 12*b1 + 123) / 6
\(\nu^{6}\)	\(=\)	\( ( - 56 \beta_{15} - 16 \beta_{14} + 12 \beta_{13} + 66 \beta_{12} - 112 \beta_{11} + 28 \beta_{10} + \cdots - 715 ) / 3 \) (-56b15 - 16b14 + 12b13 + 66b12 - 112b11 + 28b10 + 66b9 - 66b8 - 264b7 + 78b6 - 8b5 + 8b4 - 22b3 - 208b2 + 44*b1 - 715) / 3
\(\nu^{7}\)	\(=\)	\( ( 368 \beta_{15} - 704 \beta_{14} - 9 \beta_{13} + 261 \beta_{12} - 368 \beta_{11} - 372 \beta_{10} + \cdots - 704 ) / 6 \) (368b15 - 704b14 - 9b13 + 261b12 - 368b11 - 372b10 - 9b9 - 381b8 - 261b6 - 3646b5 - 704b4 + 148b3 - 788b2 + 148b1 - 704) / 6
\(\nu^{8}\)	\(=\)	\( ( - 642 \beta_{15} + 682 \beta_{14} + 259 \beta_{13} - 262 \beta_{12} - 321 \beta_{11} + 259 \beta_{10} + \cdots + 10092 ) / 3 \) (-642b15 + 682b14 + 259b13 - 262b12 - 321b11 + 259b10 + 3b9 + 71b8 + 906b7 - 259b6 + 10774b5 - 1364b4 - 1102b3 - 321b2 + 551*b1 + 10092) / 3
\(\nu^{9}\)	\(=\)	\( ( - 370 \beta_{15} - 1520 \beta_{14} + 2312 \beta_{13} + 1554 \beta_{12} - 740 \beta_{11} + 814 \beta_{10} + \cdots + 80552 ) / 6 \) (-370b15 - 1520b14 + 2312b13 + 1554b12 - 740b11 + 814b10 + 1554b9 - 1554b8 - 17763b7 + 3866b6 - 760b5 + 760b4 + 5812b3 - 17393b2 - 11624*b1 + 80552) / 6
\(\nu^{10}\)	\(=\)	\( ( 4273 \beta_{15} - 2997 \beta_{14} + 7897 \beta_{13} - 8840 \beta_{12} - 4273 \beta_{11} - 6513 \beta_{10} + \cdots - 2997 ) / 3 \) (4273b15 - 2997b14 + 7897b13 - 8840b12 - 4273b11 - 6513b10 + 7897b9 + 1384b8 + 8840b6 - 6375b5 - 2997b4 + 5272b3 + 42782b2 + 5272b1 - 2997) / 3
\(\nu^{11}\)	\(=\)	\( ( 40896 \beta_{15} + 10137 \beta_{14} - 39840 \beta_{13} + 16424 \beta_{12} + 20448 \beta_{11} + \cdots + 208345 ) / 6 \) (40896b15 + 10137b14 - 39840b13 + 16424b12 + 20448b11 - 39840b10 + 23416b9 - 184b8 + 113256b7 + 39840b6 + 218482b5 - 20274b4 - 33600b3 + 20448b2 + 16800*b1 + 208345) / 6
\(\nu^{12}\)	\(=\)	\( ( 31536 \beta_{15} - 20440 \beta_{14} + 13868 \beta_{13} - 14848 \beta_{12} + 63072 \beta_{11} + \cdots + 622547 ) / 3 \) (31536b15 - 20440b14 + 13868b13 - 14848b12 + 63072b11 + 22456b10 - 14848b9 + 14848b8 - 43824b7 - 980b6 - 10220b5 + 10220b4 - 127304b3 - 75360b2 + 254608*b1 + 622547) / 3
\(\nu^{13}\)	\(=\)	\( ( 40992 \beta_{15} + 224312 \beta_{14} + 210401 \beta_{13} - 313729 \beta_{12} - 40992 \beta_{11} + \cdots + 224312 ) / 6 \) (40992b15 + 224312b14 + 210401b13 - 313729b12 - 40992b11 - 91808b10 + 210401b9 + 118593b8 + 313729b6 + 2983030b5 + 224312b4 + 222352b3 - 3261720b2 + 222352b1 + 224312) / 6
\(\nu^{14}\)	\(=\)	\( ( 432322 \beta_{15} - 100872 \beta_{14} - 339137 \beta_{13} + 382692 \beta_{12} + 216161 \beta_{11} + \cdots - 4241030 ) / 3 \) (432322b15 - 100872b14 - 339137b13 + 382692b12 + 216161b11 - 339137b10 - 43555b9 - 1764237b8 + 1316412b7 + 339137b6 - 4341902b5 + 201744b4 - 94142b3 + 216161b2 + 47071*b1 - 4241030) / 3
\(\nu^{15}\)	\(=\)	\( ( - 2937310 \beta_{15} - 3314576 \beta_{14} - 576456 \beta_{13} + 1478274 \beta_{12} - 5874620 \beta_{11} + \cdots - 16054616 ) / 6 \) (-2937310b15 - 3314576b14 - 576456b13 + 1478274b12 - 5874620b11 - 833654b10 + 1478274b9 - 1478274b8 - 7894293b7 + 901818b6 - 1657288b5 + 1657288b4 - 5727200b3 - 4956983b2 + 11454400*b1 - 16054616) / 6

\(n\):		e.g. 2-40 or 990-1000
Embeddings:		e.g. 1-3 or 215.8
Significant digits:
Format:

$p$	$F_p(T)$
$2$	\( (T^{4} - 4 T^{2} + 16)^{4} \) (T^4 - 4*T^2 + 16)^4
$3$	\( T^{16} + \cdots + 282429536481 \) T^16 - 9T^14 + 9T^12 + 4536T^11 + 17766T^10 - 9072T^9 - 442422T^8 - 244944T^7 + 12951414T^6 + 89282088T^5 + 4782969T^4 - 3486784401*T^2 + 282429536481
$5$	\( T^{16} + \cdots + 41\!\cdots\!56 \) T^16 + 597T^14 + 264258T^12 + 45374877T^10 + 5550035922T^8 + 367182336789T^6 + 17289861638841T^4 + 310619615073840*T^2 + 4153645759078656
$7$	\( T^{16} \) T^16
$11$	\( T^{16} + \cdots + 24\!\cdots\!16 \) T^16 - 5391T^14 + 22614066T^12 - 30424674303T^10 + 29836951734258T^8 - 13464145104313743T^6 + 4392246020177179521T^4 - 107222708372158886976*T^2 + 2440487028417814204416
$13$	\( (T^{8} + 4551 T^{6} + \cdots + 16498888704)^{2} \) (T^8 + 4551T^6 + 2979108T^4 + 570419712*T^2 + 16498888704)^2
$17$	\( T^{16} + \cdots + 87\!\cdots\!00 \) T^16 + 22782T^14 + 387463563T^12 + 2831427288342T^10 + 15419407094864361T^8 + 10884654228190861980T^6 + 6823590140179442638800T^4 + 24511824186353490528000*T^2 + 87552360667406338560000
$19$	\( (T^{8} + \cdots + 69773043356676)^{2} \) (T^8 - 171T^7 - 1842T^6 + 1981719T^5 + 46647738T^4 - 16123787289T^3 + 548436272553T^2 + 11621573426826*T + 69773043356676)^2
$23$	\( T^{16} + \cdots + 40\!\cdots\!96 \) T^16 - 44802T^14 + 1432520235T^12 - 21745254238794T^10 + 238601271153713481T^8 - 969119601478530267924T^6 + 2844116853911884311685200T^4 - 4041773605682047226068008192*T^2 + 4079068812534267004985733943296
$29$	\( (T^{8} + \cdots + 20\!\cdots\!96)^{2} \) (T^8 + 72729T^6 + 1509134976T^4 + 10537006777344*T^2 + 20034685818372096)^2
$31$	\( (T^{8} + \cdots + 81\!\cdots\!01)^{2} \) (T^8 + 402T^7 + 41736T^6 - 4877064T^5 - 855373959T^4 + 116636150232T^3 + 34275384741024T^2 + 2746763081118126*T + 81628318996303401)^2
$37$	\( (T^{8} + \cdots + 81\!\cdots\!56)^{2} \) (T^8 + 481T^7 + 314992T^6 + 102777379T^5 + 50423553172T^4 + 14673347636587T^3 + 4356757010847979T^2 + 646161179732391370*T + 81666889425188053156)^2
$41$	\( (T^{8} + \cdots + 15\!\cdots\!76)^{2} \) (T^8 - 432408T^6 + 52068871440T^4 - 1898169992301312*T^2 + 15703157914051608576)^2
$43$	\( (T^{4} - 433 T^{3} + \cdots + 966156928)^{4} \) (T^4 - 433T^3 - 85728T^2 + 37466096*T + 966156928)^4
$47$	\( T^{16} + \cdots + 20\!\cdots\!76 \) T^16 + 339978T^14 + 85463986203T^12 + 8488943280174618T^10 + 605030860859728798737T^8 + 23317876952262147392636256T^6 + 631367312688707787440993753856T^4 + 3943086387032758537387306721894400*T^2 + 20271517042551867310524846030706507776
$53$	\( T^{16} + \cdots + 65\!\cdots\!00 \) T^16 - 569799T^14 + 212669417970T^12 - 45756035835996519T^10 + 7142879178328676547186T^8 - 720319285173432262398665175T^6 + 52943745899382875184693158870625T^4 - 2307580763353529682019075878584250000*T^2 + 65287172450444586808229722789424100000000
$59$	\( T^{16} + \cdots + 11\!\cdots\!36 \) T^16 + 1029045T^14 + 775669902066T^12 + 271081786005979821T^10 + 69733896332695474599522T^8 + 2883654276895085833508868693T^6 + 103177775220759498146177450600793T^4 + 34486809666391241700901174502880048*T^2 + 11421128798691498051411901613271572736
$61$	\( (T^{8} + \cdots + 25\!\cdots\!44)^{2} \) (T^8 - 2310T^7 + 2370615T^6 - 1367323650T^5 + 480636786753T^4 - 104045523589980T^3 + 13303541774870928T^2 - 892159531070742144*T + 25760656722530386944)^2
$67$	\( (T^{8} + \cdots + 30\!\cdots\!04)^{2} \) (T^8 + 353T^7 + 260152T^6 - 32172037T^5 + 19396001164T^4 - 167895466285T^3 + 297604295739955T^2 - 13656359405763358*T + 3036229573514088004)^2
$71$	\( (T^{8} + \cdots + 18\!\cdots\!16)^{2} \) (T^8 + 678168T^6 + 20183760144T^4 + 123867835918848*T^2 + 182329765184802816)^2
$73$	\( (T^{8} + \cdots + 13\!\cdots\!64)^{2} \) (T^8 + 1647T^7 + 1022484T^6 + 194808807T^5 - 42941956140T^4 - 14737310733717T^3 + 3817932715234431T^2 + 1429202978440395444*T + 131577405664148738064)^2
$79$	\( (T^{8} + \cdots + 11\!\cdots\!61)^{2} \) (T^8 + 1328T^7 + 2621710T^6 + 1841095856T^5 + 3059389735471T^4 + 2192123600069456T^3 + 1926071802117069670T^2 + 512429626335775061048*T + 118221278650035601669561)^2
$83$	\( (T^{8} + \cdots + 16\!\cdots\!56)^{2} \) (T^8 - 2852067T^6 + 2014371869040T^4 - 360446437983184128*T^2 + 16674078085265215328256)^2
$89$	\( T^{16} + \cdots + 18\!\cdots\!36 \) T^16 + 3316302T^14 + 6939745175403T^12 + 9111941852559810822T^10 + 8832414627220842835829577T^8 + 5969112231006651616910190968364T^6 + 2978674006074807124116597289958157456T^4 + 933446357484172565984921999797925279477760*T^2 + 184527661559301380910022800801801417781737947136
$97$	\( (T^{8} + \cdots + 10\!\cdots\!36)^{2} \) (T^8 + 832731T^6 + 84302904096T^4 + 2451916579670784*T^2 + 10175730882067316736)^2
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\(n\)	\(197\)	\(199\)
\(\chi(n)\)	\(-1\)	\(1 + \beta_{5}\)