LMFDB - Newform orbit 693.2.c.e

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms

[N,k,chi] = [693,2,Mod(307,693)]

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

lf = mfeigenbasis(mf)

from sage.modular.dirichlet import DirichletCharacter

H = DirichletGroup(693, base_ring=CyclotomicField(2))

chi = DirichletCharacter(H, H._module([0, 1, 1]))

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

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

chi := DirichletCharacter("693.307");

S:= CuspForms(chi, 2);

N := Newforms(S);

Level:	$ N $	$=$	$ 693 = 3^{2} \cdot 7 \cdot 11 $
Weight:	$ k $	$=$	$ 2 $
Character orbit:	$[\chi]$	$=$	693.c (of order $2$, degree $1$, 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:	$5.53363286007$
Analytic rank:	$0$
Dimension:	$16$
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} - 4x^{12} - 49x^{10} + 11x^{8} + 395x^{6} + 900x^{4} + 1125x^{2} + 625 $ x^16 + x^14 - 4x^12 - 49x^10 + 11x^8 + 395x^6 + 900x^4 + 1125x^2 + 625
Coefficient ring:	$\Z[a_1, \ldots, a_{13}]$
Coefficient ring index:	$ 2^{17} $
Twist minimal:	no (minimal twist has level 231)
Sato-Tate group:	$\mathrm{SU}(2)[C_{2}]$

$q$-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_{6} q^{2} + (\beta_{4} - 1) q^{4} - \beta_1 q^{5} + ( - \beta_{12} + \beta_{5}) q^{7} - \beta_{5} q^{8}+O(q^{10}) $ q - b6 * q^2 + (b4 - 1) * q^4 - b1 * q^5 + (-b12 + b5) * q^7 - b5 * q^8	$ q - \beta_{6} q^{2} + (\beta_{4} - 1) q^{4} - \beta_1 q^{5} + ( - \beta_{12} + \beta_{5}) q^{7} - \beta_{5} q^{8} + (\beta_{15} - \beta_{12} - \beta_{10}) q^{10} + ( - \beta_{14} - \beta_{12} - \beta_{9} + \cdots - 1) q^{11}+ \cdots + ( - 2 \beta_{15} + \beta_{14} + \cdots - 4 \beta_{5}) q^{98}+O(q^{100}) $ q - b6 * q^2 + (b4 - 1) * q^4 - b1 * q^5 + (-b12 + b5) * q^7 - b5 * q^8 + (b15 - b12 - b10) * q^10 + (-b14 - b12 - b9 - b7 - b6 - 1) * q^11 - b15 * q^13 + (-b14 - b12 + b11 - b7 - b3 + b2 - 1) * q^14 + (b4 - b2) * q^16 + (-b15 + b14 - b13 - b12) * q^17 - b13 * q^19 + (-b11 + b8 - b3 + b1) * q^20 + (b14 + b12 - b9 + b7 + b6 - b5 + b4 - b2 - 1) * q^22 + (b14 + b12 + 2b7 + 2b4 - 2) * q^23 + (-b14 - b12 - 2b7 + b2 - 2) q^25 + (-b14 - b12 + 2b11 - b3 - 2b1) * q^26 + (b15 + b10 - 2b9 - b5) q^28 + (b14 + b12 + b9 + b6 + b5) * q^29 + (-b14 - b12 + b11 + b8 - 2b3 - 2b1) * q^31 + (b9 + 2b6 - b5) q^32 + (-b14 - b12 + 3b11 - b8 - 2b3 - 2b1) q^34 + (-b14 - b12 - 2b10 - b9 + b6 + b5) q^35 + (b14 + b12 + 2b7 - b2 + 1) q^37 + (b14 + b12 - b11 - b8 + b3) * q^38 + (2b14 - b13 + 2b10) * q^40 + (b15 + b14 + b13 + b12 + 2b10) q^41 + (b14 + b12 - 2b6 - 4b5) * q^43 + (-b14 - b12 + b7 + b6 + 2b5 - 2b2 + 3) * q^44 + (-b14 - b12 + 2b9 + 4b6) * q^46 + (-b11 + b8 + 2b3 + b1) q^47 + (b14 + b12 - 2b11 + 2b2 - 1) * q^49 + (b14 + b12 - 3b9 + b6 - 4b5) * q^50 + (2b15 - b14 - b10) q^52 + (2b4 - 2) q^53 + (-b13 - 2b3 + 2b1) * q^55 + (b14 + b12 - b8 + b7 - b2 + b1 + 3) * q^56 + (b4 + 2b2 - 2) q^58 + (b11 - b8 + 2b3 + b1) q^59 + (-b15 - b14 + b13 - b12 - 2b10) q^61 + (3b15 + b14 - b13 + b12 + 2b10) * q^62 + (-b14 - b12 - 2b7 - 2b4 - 2b2 + 7) q^64 + (b9 - 3b6 + b5) q^65 + (-b14 - b12 - 2b7 - 2b4 - b2 - 1) * q^67 + (3b15 - b14 - b13 - b12 - 2b10) * q^68 + (2b8 + 2b7 + b4 - 2b3 + 2b1 + 2) * q^70 + (-b14 - b12 - 2b7 - 2b2 + 4) * q^71 + (b15 + 2b13 + 4b12 + 4b10) q^73 + (-b14 - b12 + 3b9 + 4b5) * q^74 + (-b15 - b14 - b13 - 2b12 - 3b10) * q^76 + (-b15 - 2b14 + b13 + b11 - b9 + b6 - b5 - 2b4 - 2b3 + b2 - b1) q^77 + (-3b14 - 3b12 - 2b9 - 6b6) * q^79 + (b14 + b12 - b11 - b8 - b3) * q^80 + (b14 + b12 - b11 - b8 + 2b3) q^82 + (2b13 - 2b12 - 2b10) q^83 + (2b14 + 2b12 + 2b9 + 4b5) * q^85 + (b14 + b12 + 2b7 - 4b2) * q^86 + (b9 - b7 + b6 + 3b5) q^88 + (b14 + b12 - 2b11 + 2b1) * q^89 + (-b11 - b8 - 2b7 - 2b4 + 2b3 + b2 + 1) q^91 + (-b14 - b12 - 2b7 - 4b4 + 2b2 + 8) q^92 + (-2b15 + 2b14 - b13 - b12 + b10) * q^94 + (2b14 + 2b12 + 3b9 + b6 + b5) q^95 + (2b14 + 2b12 - 2b11 - 2b8 + 6b3 + 2b1) * q^97 + (-2b15 + b14 - b12 - 2b9 - b6 - 4b5) q^98
$\operatorname{Tr}(f)(q)$	$=$	$ 16 q - 12 q^{4}+O(q^{10}) $ 16 * q - 12 * q^4	$ 16 q - 12 q^{4} - 16 q^{11} - 8 q^{14} - 4 q^{16} - 20 q^{22} - 24 q^{23} - 24 q^{25} + 8 q^{37} + 32 q^{44} - 24 q^{53} + 40 q^{56} - 12 q^{58} + 88 q^{64} - 32 q^{67} + 36 q^{70} + 48 q^{71} - 32 q^{86} + 16 q^{91} + 128 q^{92}+O(q^{100}) $ 16 * q - 12 * q^4 - 16 * q^11 - 8 * q^14 - 4 * q^16 - 20 * q^22 - 24 * q^23 - 24 * q^25 + 8 * q^37 + 32 * q^44 - 24 * q^53 + 40 * q^56 - 12 * q^58 + 88 * q^64 - 32 * q^67 + 36 * q^70 + 48 * q^71 - 32 * q^86 + 16 * q^91 + 128 * q^92

Display 100 coefficients 10 coefficients

Basis of coefficient ring in terms of a root $\nu$ of $ x^{16} + x^{14} - 4x^{12} - 49x^{10} + 11x^{8} + 395x^{6} + 900x^{4} + 1125x^{2} + 625 $ x^16 + x^14 - 4*x^12 - 49*x^10 + 11*x^8 + 395*x^6 + 900*x^4 + 1125*x^2 + 625 :

$\beta_{1}$	$=$	$ ( - 739864 \nu^{15} + 254886 \nu^{13} + 6858931 \nu^{11} + 26926811 \nu^{9} + \cdots + 1014860875 \nu ) / 858900625 $ (-739864v^15 + 254886v^13 + 6858931v^11 + 26926811v^9 - 104639904v^7 - 341075305v^5 + 72330250v^3 + 1014860875v) / 858900625
$\beta_{2}$	$=$	$ ( 75631 \nu^{14} + 26336 \nu^{12} - 423219 \nu^{10} - 3371514 \nu^{8} + 2776621 \nu^{6} + \cdots + 47672250 ) / 15616375 $ (75631v^14 + 26336v^12 - 423219v^10 - 3371514v^8 + 2776621v^6 + 34025725v^4 + 47891850*v^2 + 47672250) / 15616375
$\beta_{3}$	$=$	$ ( - 1157122 \nu^{15} + 1428203 \nu^{13} + 8678488 \nu^{11} + 43919978 \nu^{9} + \cdots + 1705295750 \nu ) / 858900625 $ (-1157122v^15 + 1428203v^13 + 8678488v^11 + 43919978v^9 - 137248467v^7 - 474206065v^5 + 222668250v^3 + 1705295750v) / 858900625
$\beta_{4}$	$=$	$ ( - 122987 \nu^{14} - 97172 \nu^{12} + 701513 \nu^{10} + 5799603 \nu^{8} - 3932417 \nu^{6} + \cdots - 52412250 ) / 15616375 $ (-122987v^14 - 97172v^12 + 701513v^10 + 5799603v^8 - 3932417v^6 - 54634025v^4 - 77779875*v^2 - 52412250) / 15616375
$\beta_{5}$	$=$	$ ( 1660556 \nu^{14} - 460994 \nu^{12} - 5462774 \nu^{10} - 77606794 \nu^{8} + 106849066 \nu^{6} + \cdots + 854571625 ) / 171780125 $ (1660556v^14 - 460994v^12 - 5462774v^10 - 77606794v^8 + 106849066v^6 + 503635320v^4 + 927067650*v^2 + 854571625) / 171780125
$\beta_{6}$	$=$	$ ( - 4995212 \nu^{14} + 2030168 \nu^{12} + 16902678 \nu^{10} + 220892193 \nu^{8} + \cdots - 2203374500 ) / 171780125 $ (-4995212v^14 + 2030168v^12 + 16902678v^10 + 220892193v^8 - 365647252v^6 - 1473068360v^4 - 2412896875*v^2 - 2203374500) / 171780125
$\beta_{7}$	$=$	$ ( - 5423411 \nu^{14} + 2714684 \nu^{12} + 18323989 \nu^{10} + 234916384 \nu^{8} + \cdots - 2546363000 ) / 171780125 $ (-5423411v^14 + 2714684v^12 + 18323989v^10 + 234916384v^8 - 402906301v^6 - 1537657175v^4 - 2367403750*v^2 - 2546363000) / 171780125
$\beta_{8}$	$=$	$ ( - 483514 \nu^{15} + 5368675 \nu^{14} - 187668 \nu^{13} - 2647980 \nu^{12} + 3071892 \nu^{11} + \cdots + 2174935625 ) / 171780125 $ (-483514v^15 + 5368675v^14 - 187668v^13 - 2647980v^12 + 3071892v^11 - 18915855v^10 + 22607492v^9 - 234898080v^8 - 23482368v^7 + 409333645v^6 - 189602034v^5 + 1553034295v^4 - 233472840v^3 + 2388308150v^2 - 201886600*v + 2174935625) / 171780125
$\beta_{9}$	$=$	$ ( - 691353 \nu^{14} + 217862 \nu^{12} + 2440727 \nu^{10} + 30839287 \nu^{8} - 47497193 \nu^{6} + \cdots - 329532250 ) / 15616375 $ (-691353v^14 + 217862v^12 + 2440727v^10 + 30839287v^8 - 47497193v^6 - 206180345v^4 - 360618175*v^2 - 329532250) / 15616375
$\beta_{10}$	$=$	$ ( - 999856 \nu^{15} - 5368675 \nu^{14} + 1178705 \nu^{13} + 2647980 \nu^{12} + 2692250 \nu^{11} + \cdots - 2174935625 ) / 171780125 $ (-999856v^15 - 5368675v^14 + 1178705v^13 + 2647980v^12 + 2692250v^11 + 18915855v^10 + 41985790v^9 + 234898080v^8 - 106266765v^7 - 409333645v^6 - 228191359v^5 - 1553034295v^4 - 235180440v^3 - 2388308150v^2 - 304566350*v - 2174935625) / 171780125
$\beta_{11}$	$=$	$ ( - 2002098 \nu^{15} + 5368675 \nu^{14} - 339156 \nu^{13} - 2647980 \nu^{12} + 10243964 \nu^{11} + \cdots + 2174935625 ) / 171780125 $ (-2002098v^15 + 5368675v^14 - 339156v^13 - 2647980v^12 + 10243964v^11 - 18915855v^10 + 87780564v^9 - 234898080v^8 - 103438856v^7 + 409333645v^6 - 793074318v^5 + 1553034295v^4 - 961561280v^3 + 2388308150v^2 - 834092200*v + 2174935625) / 171780125
$\beta_{12}$	$=$	$ ( - 23106644 \nu^{15} + 26843375 \nu^{14} + 6020806 \nu^{13} - 13239900 \nu^{12} + \cdots + 10874678125 ) / 858900625 $ (-23106644v^15 + 26843375v^14 + 6020806v^13 - 13239900v^12 + 81123251v^11 - 94579275v^10 + 1034055231v^9 - 1174490400v^8 - 1552651034v^7 + 2046668225v^6 - 7031765455v^5 + 7765171475v^4 - 12171549500v^3 + 11941540750v^2 - 10753920375*v + 10874678125) / 858900625
$\beta_{13}$	$=$	$ ( 2615982 \nu^{15} - 26528 \nu^{13} - 9744263 \nu^{11} - 121007403 \nu^{9} + 150031092 \nu^{7} + \cdots + 1357510875 \nu ) / 78081875 $ (2615982v^15 - 26528v^13 - 9744263v^11 - 121007403v^9 + 150031092v^7 + 865485955v^5 + 1616217900v^3 + 1357510875v) / 78081875
$\beta_{14}$	$=$	$ ( 23106644 \nu^{15} + 26843375 \nu^{14} - 6020806 \nu^{13} - 13239900 \nu^{12} + \cdots + 10874678125 ) / 858900625 $ (23106644v^15 + 26843375v^14 - 6020806v^13 - 13239900v^12 - 81123251v^11 - 94579275v^10 - 1034055231v^9 - 1174490400v^8 + 1552651034v^7 + 2046668225v^6 + 7031765455v^5 + 7765171475v^4 + 12171549500v^3 + 11941540750v^2 + 10753920375*v + 10874678125) / 858900625
$\beta_{15}$	$=$	$ ( - 4168422 \nu^{15} + 1850118 \nu^{13} + 14410753 \nu^{11} + 182638293 \nu^{9} + \cdots - 1809775125 \nu ) / 78081875 $ (-4168422v^15 + 1850118v^13 + 14410753v^11 + 182638293v^9 - 310180202v^7 - 1209840475v^5 - 1971832100v^3 - 1809775125v) / 78081875

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

$\nu$	$=$	$ ( -\beta_{15} - 2\beta_{14} + \beta_{13} + 2\beta_{12} - \beta_{11} - 2\beta_{10} - \beta_{8} + 4\beta_{3} ) / 8 $ (-b15 - 2b14 + b13 + 2b12 - b11 - 2b10 - b8 + 4b3) / 8
$\nu^{2}$	$=$	$ ( -\beta_{9} + \beta_{7} - \beta_{5} + \beta_{4} + \beta_{2} - 1 ) / 2 $ (-b9 + b7 - b5 + b4 + b2 - 1) / 2
$\nu^{3}$	$=$	$ ( -3\beta_{15} - 3\beta_{14} + 2\beta_{13} + 4\beta_{12} + \beta_{11} + 4\beta_{10} + 2\beta_{8} - 2\beta_1 ) / 4 $ (-3b15 - 3b14 + 2b13 + 4b12 + b11 + 4b10 + 2b8 - 2*b1) / 4
$\nu^{4}$	$=$	$ ( -\beta_{14} - \beta_{12} + 6\beta_{9} + 2\beta_{7} - 12\beta_{6} + 2\beta_{5} + 2\beta_{4} + 8\beta_{2} ) / 4 $ (-b14 - b12 + 6b9 + 2b7 - 12b6 + 2b5 + 2b4 + 8b2) / 4
$\nu^{5}$	$=$	$ ( -\beta_{15} - 16\beta_{14} + 7\beta_{13} - 2\beta_{12} - 6\beta_{11} - 10\beta_{10} + 14\beta_{8} ) / 4 $ (-b15 - 16b14 + 7b13 - 2b12 - 6b11 - 10b10 + 14b8) / 4
$\nu^{6}$	$=$	$ ( 6\beta_{14} + 6\beta_{12} + \beta_{9} + 29\beta_{7} - 31\beta_{6} - 29\beta_{5} - 4\beta_{4} - 14\beta_{2} + 75 ) / 4 $ (6b14 + 6b12 + b9 + 29b7 - 31b6 - 29b5 - 4b4 - 14*b2 + 75) / 4
$\nu^{7}$	$=$	$ ( - \beta_{15} - 54 \beta_{14} + 23 \beta_{13} - 16 \beta_{12} + \beta_{11} - 46 \beta_{10} + \cdots - 152 \beta_1 ) / 8 $ (-b15 - 54b14 + 23b13 - 16b12 + b11 - 46b10 + 23b8 + 92b3 - 152*b1) / 8
$\nu^{8}$	$=$	$ ( - 25 \beta_{14} - 25 \beta_{12} - 19 \beta_{9} - 19 \beta_{7} - 34 \beta_{6} - 91 \beta_{5} + 15 \beta_{4} + \cdots - 65 ) / 2 $ (-25b14 - 25b12 - 19b9 - 19b7 - 34b6 - 91b5 + 15b4 + 27b2 - 65) / 2
$\nu^{9}$	$=$	$ ( - 113 \beta_{15} + 76 \beta_{14} - 113 \beta_{13} + 78 \beta_{12} - 77 \beta_{11} + 382 \beta_{10} + \cdots - 228 \beta_1 ) / 8 $ (-113b15 + 76b14 - 113b13 + 78b12 - 77b11 + 382b10 + 305b8 + 152b3 - 228*b1) / 8
$\nu^{10}$	$=$	$ ( -265\beta_{14} - 265\beta_{12} + 248\beta_{9} - 170\beta_{7} - 744\beta_{6} + 56\beta_{5} - 398 ) / 4 $ (-265b14 - 265b12 + 248b9 - 170b7 - 744b6 + 56b5 - 398) / 4
$\nu^{11}$	$=$	$ ( 351 \beta_{15} - 97 \beta_{14} - 104 \beta_{13} - 838 \beta_{12} - 162 \beta_{11} - 402 \beta_{10} + \cdots - 78 \beta_1 ) / 4 $ (351b15 - 97b14 - 104b13 - 838b12 - 162b11 - 402b10 + 695b8 + 38b3 - 78*b1) / 4
$\nu^{12}$	$=$	$ ( - 305 \beta_{14} - 305 \beta_{12} - 77 \beta_{9} + 77 \beta_{7} - 1065 \beta_{6} - 1337 \beta_{5} + \cdots + 1793 ) / 4 $ (-305b14 - 305b12 - 77b9 + 77b7 - 1065b6 - 1337b5 - 988b4 - 1598b2 + 1793) / 4
$\nu^{13}$	$=$	$ ( 2489 \beta_{15} + 3574 \beta_{14} - 2151 \beta_{13} - 3912 \beta_{12} + 57 \beta_{11} + \cdots - 6024 \beta_1 ) / 8 $ (2489b15 + 3574b14 - 2151b13 - 3912b12 + 57b11 - 562b10 - 281b8 + 3740b3 - 6024*b1) / 8
$\nu^{14}$	$=$	$ ( - 3376 \beta_{14} - 3376 \beta_{12} - 1749 \beta_{9} - 5903 \beta_{7} - 287 \beta_{6} - 5903 \beta_{5} + \cdots - 12655 ) / 4 $ (-3376b14 - 3376b12 - 1749b9 - 5903b7 - 287b6 - 5903b5 - 338b4 - 562b2 - 12655) / 4
$\nu^{15}$	$=$	$ ( 1179 \beta_{15} + 10629 \beta_{14} - 7363 \beta_{13} - 3207 \beta_{12} - 786 \beta_{11} + \cdots + 3374 \beta_{8} ) / 4 $ (1179b15 + 10629b14 - 7363b13 - 3207b12 - 786b11 + 10010b10 + 3374*b8) / 4

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

Character values

We give the values of $\chi$ on generators for $\left(\mathbb{Z}/693\mathbb{Z}\right)^\times$.

$n$	$155$	$199$	$442$
$\chi(n)$	$1$	$-1$	$-1$

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} $

307.1

−0.917186	−	1.66637i
0.917186	+	1.66637i
−0.0566033	+	1.17421i
0.0566033	−	1.17421i
1.86824	−	0.357358i
−1.86824	+	0.357358i
0.644389	+	0.983224i
−0.644389	−	0.983224i
−0.644389	+	0.983224i
0.644389	−	0.983224i
−1.86824	−	0.357358i
1.86824	+	0.357358i
0.0566033	+	1.17421i
−0.0566033	−	1.17421i
0.917186	−	1.66637i
−0.917186	+	1.66637i

−

2.30927i

−3.33275

−

3.77447i

−0.474903

−

2.60278i

3.07768i

−8.71628

307.2

−

2.30927i

−3.33275

3.77447i

0.474903

−

2.60278i

3.07768i

8.71628

307.3

−

2.08529i

−2.34841

−

0.833366i

2.19849

1.47195i

0.726543i

−1.73781

307.4

−

2.08529i

−2.34841

0.833366i

−2.19849

1.47195i

0.726543i

1.73781

307.5

−

1.13370i

0.714715

−

2.77447i

−2.60278

0.474903i

−

3.07768i

−3.14542

307.6

−

1.13370i

0.714715

2.77447i

2.60278

0.474903i

−

3.07768i

3.14542

307.7

−

0.183172i

1.96645

−

1.83337i

−1.47195

2.19849i

−

0.726543i

−0.335821

307.8

−

0.183172i

1.96645

1.83337i

1.47195

2.19849i

−

0.726543i

0.335821

307.9

0.183172i

1.96645

−

1.83337i

1.47195

−

2.19849i

0.726543i

0.335821

307.10

0.183172i

1.96645

1.83337i

−1.47195

−

2.19849i

0.726543i

−0.335821

307.11

1.13370i

0.714715

−

2.77447i

2.60278

−

0.474903i

3.07768i

3.14542

307.12

1.13370i

0.714715

2.77447i

−2.60278

−

0.474903i

3.07768i

−3.14542

307.13

2.08529i

−2.34841

−

0.833366i

−2.19849

−

1.47195i

−

0.726543i

1.73781

307.14

2.08529i

−2.34841

0.833366i

2.19849

−

1.47195i

−

0.726543i

−1.73781

307.15

2.30927i

−3.33275

−

3.77447i

0.474903

2.60278i

−

3.07768i

8.71628

307.16

2.30927i

−3.33275

3.77447i

−0.474903

2.60278i

−

3.07768i

−8.71628

Inner twists

Char	Parity	Ord	Mult	Type
1.a	even	1	1	trivial
7.b	odd	2	1	inner
11.b	odd	2	1	inner
77.b	even	2	1	inner

Twists

By twisting character orbit
Char	Parity	Ord	Mult	Type	Twist	Min	Dim
1.a	even	1	1	trivial	693.2.c.e		16
3.b	odd	2	1		231.2.c.a	✓	16
7.b	odd	2	1	inner	693.2.c.e		16
11.b	odd	2	1	inner	693.2.c.e		16
12.b	even	2	1		3696.2.q.e		16
21.c	even	2	1		231.2.c.a	✓	16
33.d	even	2	1		231.2.c.a	✓	16
77.b	even	2	1	inner	693.2.c.e		16
84.h	odd	2	1		3696.2.q.e		16
132.d	odd	2	1		3696.2.q.e		16
231.h	odd	2	1		231.2.c.a	✓	16
924.n	even	2	1		3696.2.q.e		16

By twisted newform orbit
Twist	Min	Dim	Char	Parity	Ord	Mult	Type
231.2.c.a	✓	16	3.b	odd	2	1
231.2.c.a	✓	16	21.c	even	2	1
231.2.c.a	✓	16	33.d	even	2	1
231.2.c.a	✓	16	231.h	odd	2	1
693.2.c.e		16	1.a	even	1	1	trivial
693.2.c.e		16	7.b	odd	2	1	inner
693.2.c.e		16	11.b	odd	2	1	inner
693.2.c.e		16	77.b	even	2	1	inner
3696.2.q.e		16	12.b	even	2	1
3696.2.q.e		16	84.h	odd	2	1
3696.2.q.e		16	132.d	odd	2	1
3696.2.q.e		16	924.n	even	2	1

Hecke kernels

This newform subspace can be constructed as the kernel of the linear operator $ T_{2}^{8} + 11T_{2}^{6} + 36T_{2}^{4} + 31T_{2}^{2} + 1 $ T2^8 + 11*T2^6 + 36*T2^4 + 31*T2^2 + 1 acting on $S_{2}^{\mathrm{new}}(693, [\chi])$.

Hecke characteristic polynomials

$p$	$F_p(T)$
$2$	$ (T^{8} + 11 T^{6} + 36 T^{4} + \cdots + 1)^{2} $ (T^8 + 11T^6 + 36T^4 + 31*T^2 + 1)^2
$3$	$ T^{16} $ T^16
$5$	$ (T^{8} + 26 T^{6} + \cdots + 256)^{2} $ (T^8 + 26T^6 + 201T^4 + 496*T^2 + 256)^2
$7$	$ T^{16} - 4 T^{12} + \cdots + 5764801 $ T^16 - 4T^12 - 314T^8 - 9604*T^4 + 5764801
$11$	$ (T^{4} + 4 T^{3} + \cdots + 121)^{4} $ (T^4 + 4T^3 + 6T^2 + 44*T + 121)^4
$13$	$ (T^{8} - 34 T^{6} + \cdots + 256)^{2} $ (T^8 - 34T^6 + 301T^4 - 544*T^2 + 256)^2
$17$	$ (T^{8} - 116 T^{6} + \cdots + 495616)^{2} $ (T^8 - 116T^6 + 4816T^4 - 83456*T^2 + 495616)^2
$19$	$ (T^{8} - 50 T^{6} + \cdots + 6400)^{2} $ (T^8 - 50T^6 + 685T^4 - 3600*T^2 + 6400)^2
$23$	$ (T^{4} + 6 T^{3} - 44 T^{2} + \cdots - 64)^{4} $ (T^4 + 6T^3 - 44T^2 - 144*T - 64)^4
$29$	$ (T^{8} + 74 T^{6} + \cdots + 256)^{2} $ (T^8 + 74T^6 + 1621T^4 + 11024*T^2 + 256)^2
$31$	$ (T^{8} + 140 T^{6} + \cdots + 102400)^{2} $ (T^8 + 140T^6 + 6160T^4 + 89600*T^2 + 102400)^2
$37$	$ (T^{4} - 2 T^{3} + \cdots + 196)^{4} $ (T^4 - 2T^3 - 51T^2 - 28*T + 196)^4
$41$	$ (T^{8} - 136 T^{6} + \cdots + 4096)^{2} $ (T^8 - 136T^6 + 2896T^4 - 16896*T^2 + 4096)^2
$43$	$ (T^{8} + 204 T^{6} + \cdots + 4946176)^{2} $ (T^8 + 204T^6 + 14656T^4 + 447424*T^2 + 4946176)^2
$47$	$ (T^{8} + 146 T^{6} + \cdots + 1597696)^{2} $ (T^8 + 146T^6 + 7841T^4 + 184096*T^2 + 1597696)^2
$53$	$ (T^{4} + 6 T^{3} + \cdots + 176)^{4} $ (T^4 + 6T^3 - 24T^2 - 104*T + 176)^4
$59$	$ (T^{8} + 194 T^{6} + \cdots + 215296)^{2} $ (T^8 + 194T^6 + 11281T^4 + 204704*T^2 + 215296)^2
$61$	$ (T^{8} - 176 T^{6} + \cdots + 65536)^{2} $ (T^8 - 176T^6 + 9216T^4 - 126976*T^2 + 65536)^2
$67$	$ (T^{4} + 8 T^{3} + \cdots + 176)^{4} $ (T^4 + 8T^3 - 61T^2 - 8*T + 176)^4
$71$	$ (T^{4} - 12 T^{3} + \cdots - 1984)^{4} $ (T^4 - 12T^3 - 36T^2 + 752*T - 1984)^4
$73$	$ (T^{8} - 594 T^{6} + \cdots + 426670336)^{2} $ (T^8 - 594T^6 + 129341T^4 - 12249504*T^2 + 426670336)^2
$79$	$ (T^{8} + 464 T^{6} + \cdots + 38738176)^{2} $ (T^8 + 464T^6 + 62176T^4 + 2756864*T^2 + 38738176)^2
$83$	$ (T^{8} - 484 T^{6} + \cdots + 65536)^{2} $ (T^8 - 484T^6 + 70096T^4 - 3180544*T^2 + 65536)^2
$89$	$ (T^{8} + 184 T^{6} + \cdots + 495616)^{2} $ (T^8 + 184T^6 + 9616T^4 + 127744*T^2 + 495616)^2
$97$	$ (T^{8} + 716 T^{6} + \cdots + 126877696)^{2} $ (T^8 + 716T^6 + 168336T^4 + 13643776*T^2 + 126877696)^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:	\( N \)	\(=\)	\( 693 = 3^{2} \cdot 7 \cdot 11 \)
Weight:	\( k \)	\(=\)	\( 2 \)
Character orbit:	\([\chi]\)	\(=\)	693.c (of order \(2\), degree \(1\), minimal)

\(f(q)\)	\(=\)	\( q - \beta_{6} q^{2} + (\beta_{4} - 1) q^{4} - \beta_1 q^{5} + ( - \beta_{12} + \beta_{5}) q^{7} - \beta_{5} q^{8}+O(q^{10}) \) q - b6 * q^2 + (b4 - 1) * q^4 - b1 * q^5 + (-b12 + b5) * q^7 - b5 * q^8	\( q - \beta_{6} q^{2} + (\beta_{4} - 1) q^{4} - \beta_1 q^{5} + ( - \beta_{12} + \beta_{5}) q^{7} - \beta_{5} q^{8} + (\beta_{15} - \beta_{12} - \beta_{10}) q^{10} + ( - \beta_{14} - \beta_{12} - \beta_{9} + \cdots - 1) q^{11}+ \cdots + ( - 2 \beta_{15} + \beta_{14} + \cdots - 4 \beta_{5}) q^{98}+O(q^{100}) \) q - b6 * q^2 + (b4 - 1) * q^4 - b1 * q^5 + (-b12 + b5) * q^7 - b5 * q^8 + (b15 - b12 - b10) * q^10 + (-b14 - b12 - b9 - b7 - b6 - 1) * q^11 - b15 * q^13 + (-b14 - b12 + b11 - b7 - b3 + b2 - 1) * q^14 + (b4 - b2) * q^16 + (-b15 + b14 - b13 - b12) * q^17 - b13 * q^19 + (-b11 + b8 - b3 + b1) * q^20 + (b14 + b12 - b9 + b7 + b6 - b5 + b4 - b2 - 1) * q^22 + (b14 + b12 + 2b7 + 2b4 - 2) * q^23 + (-b14 - b12 - 2b7 + b2 - 2) q^25 + (-b14 - b12 + 2b11 - b3 - 2b1) * q^26 + (b15 + b10 - 2b9 - b5) q^28 + (b14 + b12 + b9 + b6 + b5) * q^29 + (-b14 - b12 + b11 + b8 - 2b3 - 2b1) * q^31 + (b9 + 2b6 - b5) q^32 + (-b14 - b12 + 3b11 - b8 - 2b3 - 2b1) q^34 + (-b14 - b12 - 2b10 - b9 + b6 + b5) q^35 + (b14 + b12 + 2b7 - b2 + 1) q^37 + (b14 + b12 - b11 - b8 + b3) * q^38 + (2b14 - b13 + 2b10) * q^40 + (b15 + b14 + b13 + b12 + 2b10) q^41 + (b14 + b12 - 2b6 - 4b5) * q^43 + (-b14 - b12 + b7 + b6 + 2b5 - 2b2 + 3) * q^44 + (-b14 - b12 + 2b9 + 4b6) * q^46 + (-b11 + b8 + 2b3 + b1) q^47 + (b14 + b12 - 2b11 + 2b2 - 1) * q^49 + (b14 + b12 - 3b9 + b6 - 4b5) * q^50 + (2b15 - b14 - b10) q^52 + (2b4 - 2) q^53 + (-b13 - 2b3 + 2b1) * q^55 + (b14 + b12 - b8 + b7 - b2 + b1 + 3) * q^56 + (b4 + 2b2 - 2) q^58 + (b11 - b8 + 2b3 + b1) q^59 + (-b15 - b14 + b13 - b12 - 2b10) q^61 + (3b15 + b14 - b13 + b12 + 2b10) * q^62 + (-b14 - b12 - 2b7 - 2b4 - 2b2 + 7) q^64 + (b9 - 3b6 + b5) q^65 + (-b14 - b12 - 2b7 - 2b4 - b2 - 1) * q^67 + (3b15 - b14 - b13 - b12 - 2b10) * q^68 + (2b8 + 2b7 + b4 - 2b3 + 2b1 + 2) * q^70 + (-b14 - b12 - 2b7 - 2b2 + 4) * q^71 + (b15 + 2b13 + 4b12 + 4b10) q^73 + (-b14 - b12 + 3b9 + 4b5) * q^74 + (-b15 - b14 - b13 - 2b12 - 3b10) * q^76 + (-b15 - 2b14 + b13 + b11 - b9 + b6 - b5 - 2b4 - 2b3 + b2 - b1) q^77 + (-3b14 - 3b12 - 2b9 - 6b6) * q^79 + (b14 + b12 - b11 - b8 - b3) * q^80 + (b14 + b12 - b11 - b8 + 2b3) q^82 + (2b13 - 2b12 - 2b10) q^83 + (2b14 + 2b12 + 2b9 + 4b5) * q^85 + (b14 + b12 + 2b7 - 4b2) * q^86 + (b9 - b7 + b6 + 3b5) q^88 + (b14 + b12 - 2b11 + 2b1) * q^89 + (-b11 - b8 - 2b7 - 2b4 + 2b3 + b2 + 1) q^91 + (-b14 - b12 - 2b7 - 4b4 + 2b2 + 8) q^92 + (-2b15 + 2b14 - b13 - b12 + b10) * q^94 + (2b14 + 2b12 + 3b9 + b6 + b5) q^95 + (2b14 + 2b12 - 2b11 - 2b8 + 6b3 + 2b1) * q^97 + (-2b15 + b14 - b12 - 2b9 - b6 - 4b5) q^98
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 16 q - 12 q^{4}+O(q^{10}) \) 16 * q - 12 * q^4	\( 16 q - 12 q^{4} - 16 q^{11} - 8 q^{14} - 4 q^{16} - 20 q^{22} - 24 q^{23} - 24 q^{25} + 8 q^{37} + 32 q^{44} - 24 q^{53} + 40 q^{56} - 12 q^{58} + 88 q^{64} - 32 q^{67} + 36 q^{70} + 48 q^{71} - 32 q^{86} + 16 q^{91} + 128 q^{92}+O(q^{100}) \) 16 * q - 12 * q^4 - 16 * q^11 - 8 * q^14 - 4 * q^16 - 20 * q^22 - 24 * q^23 - 24 * q^25 + 8 * q^37 + 32 * q^44 - 24 * q^53 + 40 * q^56 - 12 * q^58 + 88 * q^64 - 32 * q^67 + 36 * q^70 + 48 * q^71 - 32 * q^86 + 16 * q^91 + 128 * q^92

Introduction

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Modular forms

Varieties

Fields

Representations

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Properties

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Newspace parameters

Newform invariants

$q$-expansion

Character values

Embeddings

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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	693.2.c.e

Level	$693$
Weight	$2$
Character orbit	693.c
Analytic conductor	$5.534$
Analytic rank	$0$
Dimension	$16$
CM	no
Inner twists	$4$

Self dual:	no
Analytic conductor:	\(5.53363286007\)
Analytic rank:	\(0\)
Dimension:	\(16\)
Coefficient field:	\(\mathbb{Q}[x]/(x^{16} + \cdots)\)
comment: defining polynomial gp: f.mod \\ as an extension of the character field
Defining polynomial:	\( x^{16} + x^{14} - 4x^{12} - 49x^{10} + 11x^{8} + 395x^{6} + 900x^{4} + 1125x^{2} + 625 \) x^16 + x^14 - 4x^12 - 49x^10 + 11x^8 + 395x^6 + 900x^4 + 1125x^2 + 625
Coefficient ring:	\(\Z[a_1, \ldots, a_{13}]\)
Coefficient ring index:	\( 2^{17} \)
Twist minimal:	no (minimal twist has level 231)
Sato-Tate group:	$\mathrm{SU}(2)[C_{2}]$

\(\beta_{1}\)	\(=\)	\( ( - 739864 \nu^{15} + 254886 \nu^{13} + 6858931 \nu^{11} + 26926811 \nu^{9} + \cdots + 1014860875 \nu ) / 858900625 \) (-739864v^15 + 254886v^13 + 6858931v^11 + 26926811v^9 - 104639904v^7 - 341075305v^5 + 72330250v^3 + 1014860875v) / 858900625
\(\beta_{2}\)	\(=\)	\( ( 75631 \nu^{14} + 26336 \nu^{12} - 423219 \nu^{10} - 3371514 \nu^{8} + 2776621 \nu^{6} + \cdots + 47672250 ) / 15616375 \) (75631v^14 + 26336v^12 - 423219v^10 - 3371514v^8 + 2776621v^6 + 34025725v^4 + 47891850*v^2 + 47672250) / 15616375
\(\beta_{3}\)	\(=\)	\( ( - 1157122 \nu^{15} + 1428203 \nu^{13} + 8678488 \nu^{11} + 43919978 \nu^{9} + \cdots + 1705295750 \nu ) / 858900625 \) (-1157122v^15 + 1428203v^13 + 8678488v^11 + 43919978v^9 - 137248467v^7 - 474206065v^5 + 222668250v^3 + 1705295750v) / 858900625
\(\beta_{4}\)	\(=\)	\( ( - 122987 \nu^{14} - 97172 \nu^{12} + 701513 \nu^{10} + 5799603 \nu^{8} - 3932417 \nu^{6} + \cdots - 52412250 ) / 15616375 \) (-122987v^14 - 97172v^12 + 701513v^10 + 5799603v^8 - 3932417v^6 - 54634025v^4 - 77779875*v^2 - 52412250) / 15616375
\(\beta_{5}\)	\(=\)	\( ( 1660556 \nu^{14} - 460994 \nu^{12} - 5462774 \nu^{10} - 77606794 \nu^{8} + 106849066 \nu^{6} + \cdots + 854571625 ) / 171780125 \) (1660556v^14 - 460994v^12 - 5462774v^10 - 77606794v^8 + 106849066v^6 + 503635320v^4 + 927067650*v^2 + 854571625) / 171780125
\(\beta_{6}\)	\(=\)	\( ( - 4995212 \nu^{14} + 2030168 \nu^{12} + 16902678 \nu^{10} + 220892193 \nu^{8} + \cdots - 2203374500 ) / 171780125 \) (-4995212v^14 + 2030168v^12 + 16902678v^10 + 220892193v^8 - 365647252v^6 - 1473068360v^4 - 2412896875*v^2 - 2203374500) / 171780125
\(\beta_{7}\)	\(=\)	\( ( - 5423411 \nu^{14} + 2714684 \nu^{12} + 18323989 \nu^{10} + 234916384 \nu^{8} + \cdots - 2546363000 ) / 171780125 \) (-5423411v^14 + 2714684v^12 + 18323989v^10 + 234916384v^8 - 402906301v^6 - 1537657175v^4 - 2367403750*v^2 - 2546363000) / 171780125
\(\beta_{8}\)	\(=\)	\( ( - 483514 \nu^{15} + 5368675 \nu^{14} - 187668 \nu^{13} - 2647980 \nu^{12} + 3071892 \nu^{11} + \cdots + 2174935625 ) / 171780125 \) (-483514v^15 + 5368675v^14 - 187668v^13 - 2647980v^12 + 3071892v^11 - 18915855v^10 + 22607492v^9 - 234898080v^8 - 23482368v^7 + 409333645v^6 - 189602034v^5 + 1553034295v^4 - 233472840v^3 + 2388308150v^2 - 201886600*v + 2174935625) / 171780125
\(\beta_{9}\)	\(=\)	\( ( - 691353 \nu^{14} + 217862 \nu^{12} + 2440727 \nu^{10} + 30839287 \nu^{8} - 47497193 \nu^{6} + \cdots - 329532250 ) / 15616375 \) (-691353v^14 + 217862v^12 + 2440727v^10 + 30839287v^8 - 47497193v^6 - 206180345v^4 - 360618175*v^2 - 329532250) / 15616375
\(\beta_{10}\)	\(=\)	\( ( - 999856 \nu^{15} - 5368675 \nu^{14} + 1178705 \nu^{13} + 2647980 \nu^{12} + 2692250 \nu^{11} + \cdots - 2174935625 ) / 171780125 \) (-999856v^15 - 5368675v^14 + 1178705v^13 + 2647980v^12 + 2692250v^11 + 18915855v^10 + 41985790v^9 + 234898080v^8 - 106266765v^7 - 409333645v^6 - 228191359v^5 - 1553034295v^4 - 235180440v^3 - 2388308150v^2 - 304566350*v - 2174935625) / 171780125
\(\beta_{11}\)	\(=\)	\( ( - 2002098 \nu^{15} + 5368675 \nu^{14} - 339156 \nu^{13} - 2647980 \nu^{12} + 10243964 \nu^{11} + \cdots + 2174935625 ) / 171780125 \) (-2002098v^15 + 5368675v^14 - 339156v^13 - 2647980v^12 + 10243964v^11 - 18915855v^10 + 87780564v^9 - 234898080v^8 - 103438856v^7 + 409333645v^6 - 793074318v^5 + 1553034295v^4 - 961561280v^3 + 2388308150v^2 - 834092200*v + 2174935625) / 171780125
\(\beta_{12}\)	\(=\)	\( ( - 23106644 \nu^{15} + 26843375 \nu^{14} + 6020806 \nu^{13} - 13239900 \nu^{12} + \cdots + 10874678125 ) / 858900625 \) (-23106644v^15 + 26843375v^14 + 6020806v^13 - 13239900v^12 + 81123251v^11 - 94579275v^10 + 1034055231v^9 - 1174490400v^8 - 1552651034v^7 + 2046668225v^6 - 7031765455v^5 + 7765171475v^4 - 12171549500v^3 + 11941540750v^2 - 10753920375*v + 10874678125) / 858900625
\(\beta_{13}\)	\(=\)	\( ( 2615982 \nu^{15} - 26528 \nu^{13} - 9744263 \nu^{11} - 121007403 \nu^{9} + 150031092 \nu^{7} + \cdots + 1357510875 \nu ) / 78081875 \) (2615982v^15 - 26528v^13 - 9744263v^11 - 121007403v^9 + 150031092v^7 + 865485955v^5 + 1616217900v^3 + 1357510875v) / 78081875
\(\beta_{14}\)	\(=\)	\( ( 23106644 \nu^{15} + 26843375 \nu^{14} - 6020806 \nu^{13} - 13239900 \nu^{12} + \cdots + 10874678125 ) / 858900625 \) (23106644v^15 + 26843375v^14 - 6020806v^13 - 13239900v^12 - 81123251v^11 - 94579275v^10 - 1034055231v^9 - 1174490400v^8 + 1552651034v^7 + 2046668225v^6 + 7031765455v^5 + 7765171475v^4 + 12171549500v^3 + 11941540750v^2 + 10753920375*v + 10874678125) / 858900625
\(\beta_{15}\)	\(=\)	\( ( - 4168422 \nu^{15} + 1850118 \nu^{13} + 14410753 \nu^{11} + 182638293 \nu^{9} + \cdots - 1809775125 \nu ) / 78081875 \) (-4168422v^15 + 1850118v^13 + 14410753v^11 + 182638293v^9 - 310180202v^7 - 1209840475v^5 - 1971832100v^3 - 1809775125v) / 78081875

\(\nu\)	\(=\)	\( ( -\beta_{15} - 2\beta_{14} + \beta_{13} + 2\beta_{12} - \beta_{11} - 2\beta_{10} - \beta_{8} + 4\beta_{3} ) / 8 \) (-b15 - 2b14 + b13 + 2b12 - b11 - 2b10 - b8 + 4b3) / 8
\(\nu^{2}\)	\(=\)	\( ( -\beta_{9} + \beta_{7} - \beta_{5} + \beta_{4} + \beta_{2} - 1 ) / 2 \) (-b9 + b7 - b5 + b4 + b2 - 1) / 2
\(\nu^{3}\)	\(=\)	\( ( -3\beta_{15} - 3\beta_{14} + 2\beta_{13} + 4\beta_{12} + \beta_{11} + 4\beta_{10} + 2\beta_{8} - 2\beta_1 ) / 4 \) (-3b15 - 3b14 + 2b13 + 4b12 + b11 + 4b10 + 2b8 - 2*b1) / 4
\(\nu^{4}\)	\(=\)	\( ( -\beta_{14} - \beta_{12} + 6\beta_{9} + 2\beta_{7} - 12\beta_{6} + 2\beta_{5} + 2\beta_{4} + 8\beta_{2} ) / 4 \) (-b14 - b12 + 6b9 + 2b7 - 12b6 + 2b5 + 2b4 + 8b2) / 4
\(\nu^{5}\)	\(=\)	\( ( -\beta_{15} - 16\beta_{14} + 7\beta_{13} - 2\beta_{12} - 6\beta_{11} - 10\beta_{10} + 14\beta_{8} ) / 4 \) (-b15 - 16b14 + 7b13 - 2b12 - 6b11 - 10b10 + 14b8) / 4
\(\nu^{6}\)	\(=\)	\( ( 6\beta_{14} + 6\beta_{12} + \beta_{9} + 29\beta_{7} - 31\beta_{6} - 29\beta_{5} - 4\beta_{4} - 14\beta_{2} + 75 ) / 4 \) (6b14 + 6b12 + b9 + 29b7 - 31b6 - 29b5 - 4b4 - 14*b2 + 75) / 4
\(\nu^{7}\)	\(=\)	\( ( - \beta_{15} - 54 \beta_{14} + 23 \beta_{13} - 16 \beta_{12} + \beta_{11} - 46 \beta_{10} + \cdots - 152 \beta_1 ) / 8 \) (-b15 - 54b14 + 23b13 - 16b12 + b11 - 46b10 + 23b8 + 92b3 - 152*b1) / 8
\(\nu^{8}\)	\(=\)	\( ( - 25 \beta_{14} - 25 \beta_{12} - 19 \beta_{9} - 19 \beta_{7} - 34 \beta_{6} - 91 \beta_{5} + 15 \beta_{4} + \cdots - 65 ) / 2 \) (-25b14 - 25b12 - 19b9 - 19b7 - 34b6 - 91b5 + 15b4 + 27b2 - 65) / 2
\(\nu^{9}\)	\(=\)	\( ( - 113 \beta_{15} + 76 \beta_{14} - 113 \beta_{13} + 78 \beta_{12} - 77 \beta_{11} + 382 \beta_{10} + \cdots - 228 \beta_1 ) / 8 \) (-113b15 + 76b14 - 113b13 + 78b12 - 77b11 + 382b10 + 305b8 + 152b3 - 228*b1) / 8
\(\nu^{10}\)	\(=\)	\( ( -265\beta_{14} - 265\beta_{12} + 248\beta_{9} - 170\beta_{7} - 744\beta_{6} + 56\beta_{5} - 398 ) / 4 \) (-265b14 - 265b12 + 248b9 - 170b7 - 744b6 + 56b5 - 398) / 4
\(\nu^{11}\)	\(=\)	\( ( 351 \beta_{15} - 97 \beta_{14} - 104 \beta_{13} - 838 \beta_{12} - 162 \beta_{11} - 402 \beta_{10} + \cdots - 78 \beta_1 ) / 4 \) (351b15 - 97b14 - 104b13 - 838b12 - 162b11 - 402b10 + 695b8 + 38b3 - 78*b1) / 4
\(\nu^{12}\)	\(=\)	\( ( - 305 \beta_{14} - 305 \beta_{12} - 77 \beta_{9} + 77 \beta_{7} - 1065 \beta_{6} - 1337 \beta_{5} + \cdots + 1793 ) / 4 \) (-305b14 - 305b12 - 77b9 + 77b7 - 1065b6 - 1337b5 - 988b4 - 1598b2 + 1793) / 4
\(\nu^{13}\)	\(=\)	\( ( 2489 \beta_{15} + 3574 \beta_{14} - 2151 \beta_{13} - 3912 \beta_{12} + 57 \beta_{11} + \cdots - 6024 \beta_1 ) / 8 \) (2489b15 + 3574b14 - 2151b13 - 3912b12 + 57b11 - 562b10 - 281b8 + 3740b3 - 6024*b1) / 8
\(\nu^{14}\)	\(=\)	\( ( - 3376 \beta_{14} - 3376 \beta_{12} - 1749 \beta_{9} - 5903 \beta_{7} - 287 \beta_{6} - 5903 \beta_{5} + \cdots - 12655 ) / 4 \) (-3376b14 - 3376b12 - 1749b9 - 5903b7 - 287b6 - 5903b5 - 338b4 - 562b2 - 12655) / 4
\(\nu^{15}\)	\(=\)	\( ( 1179 \beta_{15} + 10629 \beta_{14} - 7363 \beta_{13} - 3207 \beta_{12} - 786 \beta_{11} + \cdots + 3374 \beta_{8} ) / 4 \) (1179b15 + 10629b14 - 7363b13 - 3207b12 - 786b11 + 10010b10 + 3374*b8) / 4

\(n\):		e.g. 2-40 or 990-1000
Embeddings:		e.g. 1-3 or 307.16
Significant digits:
Format:

$p$	$F_p(T)$
$2$	\( (T^{8} + 11 T^{6} + 36 T^{4} + \cdots + 1)^{2} \) (T^8 + 11T^6 + 36T^4 + 31*T^2 + 1)^2
$3$	\( T^{16} \) T^16
$5$	\( (T^{8} + 26 T^{6} + \cdots + 256)^{2} \) (T^8 + 26T^6 + 201T^4 + 496*T^2 + 256)^2
$7$	\( T^{16} - 4 T^{12} + \cdots + 5764801 \) T^16 - 4T^12 - 314T^8 - 9604*T^4 + 5764801
$11$	\( (T^{4} + 4 T^{3} + \cdots + 121)^{4} \) (T^4 + 4T^3 + 6T^2 + 44*T + 121)^4
$13$	\( (T^{8} - 34 T^{6} + \cdots + 256)^{2} \) (T^8 - 34T^6 + 301T^4 - 544*T^2 + 256)^2
$17$	\( (T^{8} - 116 T^{6} + \cdots + 495616)^{2} \) (T^8 - 116T^6 + 4816T^4 - 83456*T^2 + 495616)^2
$19$	\( (T^{8} - 50 T^{6} + \cdots + 6400)^{2} \) (T^8 - 50T^6 + 685T^4 - 3600*T^2 + 6400)^2
$23$	\( (T^{4} + 6 T^{3} - 44 T^{2} + \cdots - 64)^{4} \) (T^4 + 6T^3 - 44T^2 - 144*T - 64)^4
$29$	\( (T^{8} + 74 T^{6} + \cdots + 256)^{2} \) (T^8 + 74T^6 + 1621T^4 + 11024*T^2 + 256)^2
$31$	\( (T^{8} + 140 T^{6} + \cdots + 102400)^{2} \) (T^8 + 140T^6 + 6160T^4 + 89600*T^2 + 102400)^2
$37$	\( (T^{4} - 2 T^{3} + \cdots + 196)^{4} \) (T^4 - 2T^3 - 51T^2 - 28*T + 196)^4
$41$	\( (T^{8} - 136 T^{6} + \cdots + 4096)^{2} \) (T^8 - 136T^6 + 2896T^4 - 16896*T^2 + 4096)^2
$43$	\( (T^{8} + 204 T^{6} + \cdots + 4946176)^{2} \) (T^8 + 204T^6 + 14656T^4 + 447424*T^2 + 4946176)^2
$47$	\( (T^{8} + 146 T^{6} + \cdots + 1597696)^{2} \) (T^8 + 146T^6 + 7841T^4 + 184096*T^2 + 1597696)^2
$53$	\( (T^{4} + 6 T^{3} + \cdots + 176)^{4} \) (T^4 + 6T^3 - 24T^2 - 104*T + 176)^4
$59$	\( (T^{8} + 194 T^{6} + \cdots + 215296)^{2} \) (T^8 + 194T^6 + 11281T^4 + 204704*T^2 + 215296)^2
$61$	\( (T^{8} - 176 T^{6} + \cdots + 65536)^{2} \) (T^8 - 176T^6 + 9216T^4 - 126976*T^2 + 65536)^2
$67$	\( (T^{4} + 8 T^{3} + \cdots + 176)^{4} \) (T^4 + 8T^3 - 61T^2 - 8*T + 176)^4
$71$	\( (T^{4} - 12 T^{3} + \cdots - 1984)^{4} \) (T^4 - 12T^3 - 36T^2 + 752*T - 1984)^4
$73$	\( (T^{8} - 594 T^{6} + \cdots + 426670336)^{2} \) (T^8 - 594T^6 + 129341T^4 - 12249504*T^2 + 426670336)^2
$79$	\( (T^{8} + 464 T^{6} + \cdots + 38738176)^{2} \) (T^8 + 464T^6 + 62176T^4 + 2756864*T^2 + 38738176)^2
$83$	\( (T^{8} - 484 T^{6} + \cdots + 65536)^{2} \) (T^8 - 484T^6 + 70096T^4 - 3180544*T^2 + 65536)^2
$89$	\( (T^{8} + 184 T^{6} + \cdots + 495616)^{2} \) (T^8 + 184T^6 + 9616T^4 + 127744*T^2 + 495616)^2
$97$	\( (T^{8} + 716 T^{6} + \cdots + 126877696)^{2} \) (T^8 + 716T^6 + 168336T^4 + 13643776*T^2 + 126877696)^2
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\(n\)	\(155\)	\(199\)	\(442\)
\(\chi(n)\)	\(1\)	\(-1\)	\(-1\)