LMFDB - Newform orbit 1008.4.bt.c

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms

[N,k,chi] = [1008,4,Mod(17,1008)]

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

lf = mfeigenbasis(mf)

from sage.modular.dirichlet import DirichletCharacter

H = DirichletGroup(1008, base_ring=CyclotomicField(6))

chi = DirichletCharacter(H, H._module([0, 0, 3, 1]))

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

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

chi := DirichletCharacter("1008.17");

S:= CuspForms(chi, 4);

N := Newforms(S);

Level:	$ N $	$=$	$ 1008 = 2^{4} \cdot 3^{2} \cdot 7 $
Weight:	$ k $	$=$	$ 4 $
Character orbit:	$[\chi]$	$=$	1008.bt (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:	$59.4739252858$
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} - 26x^{14} + 451x^{12} - 4330x^{10} + 30081x^{8} - 130232x^{6} + 401200x^{4} - 595840x^{2} + 614656 $ x^16 - 26x^14 + 451x^12 - 4330x^10 + 30081x^8 - 130232x^6 + 401200x^4 - 595840*x^2 + 614656
Coefficient ring:	$\Z[a_1, \ldots, a_{13}]$
Coefficient ring index:	$ 2^{10}\cdot 3^{14}\cdot 7^{2} $
Twist minimal:	no (minimal twist has level 126)
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_{12} - \beta_{10}) q^{5} + (\beta_{8} - \beta_{6} - \beta_{5} + \cdots + 6) q^{7}+O(q^{10}) $ q + (b12 - b10) * q^5 + (b8 - b6 - b5 - b2 - 3b1 + 6) q^7	$ q + (\beta_{12} - \beta_{10}) q^{5} + (\beta_{8} - \beta_{6} - \beta_{5} + \cdots + 6) q^{7}+ \cdots + ( - 32 \beta_{8} + 75 \beta_{7} + \cdots + 12) q^{97}+O(q^{100}) $ q + (b12 - b10) * q^5 + (b8 - b6 - b5 - b2 - 3b1 + 6) q^7 + (b15 - b13 - b10 - b4 + 2b3) q^11 + (-4b8 - 2b7 - b6 + 2b2 - 6b1 + 5) * q^13 + (-5b15 - 3b14 + 5b13 + 5b11 - b3) * q^17 + (-5b9 + 5b8 - 4b6 + 4b5 - 6b2 + 29b1 - 60) * q^19 + (6b15 - 10b13 - 10b11 + 2b10 - 4b4 - 5b3) * q^23 + (-3b9 - 12b8 - 3b7 + 4b6 + 6b5 + b2 + 32b1 - 31) * q^25 + (-5b15 - 6b14 + 15b13 + 2b12 + 5b11 + 12b10 - 6b4) q^29 + (-6b9 + b8 + 6b7 - 5b6 - 2b5 + 7b2 + 48b1 + 59) * q^31 + (-14b15 + 8b14 + 3b13 - 4b12 + 9b11 - 9b10 - 15b4 - 5b3) * q^35 + (-2b9 - 3b8 + 4b7 - 6b6 - 8b5 - 2b2 + 159b1 + 6) q^37 + (-9b14 - b13 - b12 - 2b11 + 5b4 - 3b3) * q^41 + (6b9 - 10b8 - 3b7 + 15b6 - 4b5 + 18b2 - 4b1 + 73) q^43 + (2b15 + 18b12 - 4b11 + 31b10 + 4b3) q^47 + (-18b9 + 22b8 + 19b7 - 10b6 + 3b5 - 16b2 + 90b1 - 119) q^49 + (-3b15 - 8b14 + 3b13 + 18b12 - 26b11 - 14b10 - 14b4 + 20b3) * q^53 + (-12b8 - 22b7 - 3b6 + 6b5 + 6b2 - 66b1 + 36) * q^55 + (20b15 + 19b14 - 9b12 - 10b11 - 28b10 + 28b4 + 10b3) q^59 + (7b9 + 45b8 - 36b6 + 31b5 - 49b2 - 134b1 + 250) * q^61 + (33b15 - 20b14 - 32b13 + 10b12 - 32b11 - 51b10 + 102b4 - 16b3) * q^65 + (20b9 - 12b8 + 20b7 + 4b6 + 22b5 - 7b2 + 18b1 - 25) q^67 + (-16b15 - 44b14 + 42b13 + 58b12 + 16b11 - 66b10 + 33b4 - 2b3) * q^71 + (31b9 - 4b8 - 31b7 + 20b6 + 8b5 - 9b2 - 124b1 - 149) q^73 + (-4b15 - 9b14 + 35b13 + 38b12 - 8b11 + 56b10 - 21b4 + 34b3) * q^77 + (4b9 + 3b8 - 8b7 + 6b6 - 5b5 - 11b2 - 339b1 - 6) q^79 + (-37b15 - 28b14 - 9b13 + 28b12 - 55b11 + 37b4 + 10b3) q^83 + (54b9 + 2b8 - 27b7 - 3b6 - 25b5 + 48b2 - 25b1 - 4) q^85 + (-46b15 - 20b14 + 40b13 - 46b12 + 52b11 - 74b10 - 62b3) q^89 + (61b9 + 31b8 - 29b7 - 39b6 + 27b5 - 14b2 + 328b1 + 190) q^91 + (-32b15 - 56b14 + 32b13 - 108b12 + 52b11 + 17b10 + 17b4 - 116b3) * q^95 + (-32b8 + 75b7 - 8b6 + 11b5 + 16b2 - 3b1 + 12) * q^97
$\operatorname{Tr}(f)(q)$	$=$	$ 16 q + 64 q^{7}+O(q^{10}) $ 16 * q + 64 * q^7	$ 16 q + 64 q^{7} - 684 q^{19} - 212 q^{25} + 1248 q^{31} + 1252 q^{37} + 1112 q^{43} - 1088 q^{49} + 3264 q^{61} - 68 q^{67} - 3132 q^{73} - 2744 q^{79} - 672 q^{85} + 5748 q^{91}+O(q^{100}) $ 16 * q + 64 * q^7 - 684 * q^19 - 212 * q^25 + 1248 * q^31 + 1252 * q^37 + 1112 * q^43 - 1088 * q^49 + 3264 * q^61 - 68 * q^67 - 3132 * q^73 - 2744 * q^79 - 672 * q^85 + 5748 * q^91

Display 100 coefficients 10 coefficients

Basis of coefficient ring in terms of a root $\nu$ of $ x^{16} - 26x^{14} + 451x^{12} - 4330x^{10} + 30081x^{8} - 130232x^{6} + 401200x^{4} - 595840x^{2} + 614656 $ x^16 - 26*x^14 + 451*x^12 - 4330*x^10 + 30081*x^8 - 130232*x^6 + 401200*x^4 - 595840*x^2 + 614656 :

$\beta_{1}$	$=$	$ ( - 142677179 \nu^{14} + 3449734804 \nu^{12} - 58606224029 \nu^{10} + 522506995056 \nu^{8} + \cdots + 67829831095936 ) / 42688070765536 $ (-142677179v^14 + 3449734804v^12 - 58606224029v^10 + 522506995056v^8 - 3538966877735v^6 + 13706008712414v^4 - 45882381109840*v^2 + 67829831095936) / 42688070765536
$\beta_{2}$	$=$	$ ( - 268395985 \nu^{14} + 3082276126 \nu^{12} - 35491743131 \nu^{10} - 313799736514 \nu^{8} + \cdots - 508725620940208 ) / 21344035382768 $ (-268395985v^14 + 3082276126v^12 - 35491743131v^10 - 313799736514v^8 + 4447208220055v^6 - 52287690199316v^4 + 186657666174104*v^2 - 508725620940208) / 21344035382768
$\beta_{3}$	$=$	$ ( - 11698644731 \nu^{15} + 428861881062 \nu^{13} - 6144107391217 \nu^{11} + \cdots - 64\!\cdots\!40 \nu ) / 23\!\cdots\!16 $ (-11698644731v^15 + 428861881062v^13 - 6144107391217v^11 + 52929884294982v^9 - 74473238390811v^7 - 820188255493136v^5 + 7528041620987264v^3 - 6472600198603840v) / 2390531962870016
$\beta_{4}$	$=$	$ ( 32388 \nu^{15} - 519129 \nu^{13} + 6905658 \nu^{11} - 11173011 \nu^{9} - 146158518 \nu^{7} + \cdots + 30203812464 \nu ) / 3440822336 $ (32388v^15 - 519129v^13 + 6905658v^11 - 11173011v^9 - 146158518v^7 + 2885250183v^5 - 11185705092v^3 + 30203812464v) / 3440822336
$\beta_{5}$	$=$	$ ( 1696491632 \nu^{14} - 43710871023 \nu^{12} + 751023188358 \nu^{10} - 7152478495349 \nu^{8} + \cdots - 573488655962320 ) / 21344035382768 $ (1696491632v^14 - 43710871023v^12 + 751023188358v^10 - 7152478495349v^8 + 48646117840830v^6 - 205932862524359v^4 + 539206095120216*v^2 - 573488655962320) / 21344035382768
$\beta_{6}$	$=$	$ ( 13640578801 \nu^{14} - 205507917882 \nu^{12} + 2374377814083 \nu^{10} + \cdots + 48\!\cdots\!36 ) / 170752283062144 $ (13640578801v^14 - 205507917882v^12 + 2374377814083v^10 + 1124930271446v^8 - 100809830468607v^6 + 984000204000872v^4 - 3076605841997472*v^2 + 4848269987974336) / 170752283062144
$\beta_{7}$	$=$	$ ( 3267 \nu^{14} - 37902 \nu^{12} + 492633 \nu^{10} + 624450 \nu^{8} - 1471341 \nu^{6} + \cdots - 126923328 ) / 37158464 $ (3267v^14 - 37902v^12 + 492633v^10 + 624450v^8 - 1471341v^6 + 61998168v^4 + 242270304*v^2 - 126923328) / 37158464
$\beta_{8}$	$=$	$ ( - 16719559391 \nu^{14} + 543918658634 \nu^{12} - 9567740081797 \nu^{10} + \cdots + 47\!\cdots\!72 ) / 170752283062144 $ (-16719559391v^14 + 543918658634v^12 - 9567740081797v^10 + 100675980367618v^8 - 641574452046919v^6 + 2589097545499820v^4 - 5438075215215152*v^2 + 4719845480297472) / 170752283062144
$\beta_{9}$	$=$	$ ( - 10775336067 \nu^{14} + 300711423882 \nu^{12} - 4761110826945 \nu^{10} + \cdots + 18\!\cdots\!44 ) / 85376141531072 $ (-10775336067v^14 + 300711423882v^12 - 4761110826945v^10 + 42809613205362v^8 - 215772080219547v^6 + 706304473275012v^4 - 682313603806896*v^2 + 1848540692242944) / 85376141531072
$\beta_{10}$	$=$	$ ( - 66561205569 \nu^{15} + 1803932697690 \nu^{13} - 31311073580403 \nu^{11} + \cdots + 24\!\cdots\!92 \nu ) / 23\!\cdots\!16 $ (-66561205569v^15 + 1803932697690v^13 - 31311073580403v^11 + 307702257948042v^9 - 2086364696742609v^7 + 8885886137668056v^5 - 22919421990221088v^3 + 24953529151814592v) / 2390531962870016
$\beta_{11}$	$=$	$ ( - 5146531289 \nu^{15} + 151193460438 \nu^{13} - 2786295237283 \nu^{11} + \cdots + 42\!\cdots\!40 \nu ) / 170752283062144 $ (-5146531289v^15 + 151193460438v^13 - 2786295237283v^11 + 29688341498622v^9 - 219758721518001v^7 + 1007629445376388v^5 - 3078634830826864v^3 + 4225633220056640v) / 170752283062144
$\beta_{12}$	$=$	$ ( - 118476251399 \nu^{15} + 1939627683654 \nu^{13} - 29515355504389 \nu^{11} + \cdots + 16\!\cdots\!96 \nu ) / 23\!\cdots\!16 $ (-118476251399v^15 + 1939627683654v^13 - 29515355504389v^11 + 152596510730742v^9 - 1101721120617303v^7 + 3235676827057144v^5 - 18895013703637600v^3 + 16989284910696896v) / 2390531962870016
$\beta_{13}$	$=$	$ ( 19804969753 \nu^{15} - 521275040310 \nu^{13} + 8951349357215 \nu^{11} + \cdots - 32\!\cdots\!36 \nu ) / 298816495358752 $ (19804969753v^15 - 521275040310v^13 + 8951349357215v^11 - 84430092351942v^9 + 556533357224037v^7 - 2152162005417068v^5 + 5582771400777932v^3 - 3280258926145936v) / 298816495358752
$\beta_{14}$	$=$	$ ( - 47521347253 \nu^{15} + 1024316733933 \nu^{13} - 15683606522513 \nu^{11} + \cdots + 88\!\cdots\!48 \nu ) / 597632990717504 $ (-47521347253v^15 + 1024316733933v^13 - 15683606522513v^11 + 113847818201979v^9 - 606773243706879v^7 + 1834381758596843v^5 - 4524808726506380v^3 + 8891861003584048v) / 597632990717504
$\beta_{15}$	$=$	$ ( 1323924075 \nu^{15} - 30864285558 \nu^{13} + 485432943393 \nu^{11} + \cdots + 32596825285824 \nu ) / 12196591647296 $ (1323924075v^15 - 30864285558v^13 + 485432943393v^11 - 3835696366518v^9 + 20648746889835v^7 - 57872310623520v^5 + 87538942514688v^3 + 32596825285824v) / 12196591647296

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

$\nu$	$=$	$ ( -9\beta_{15} - 8\beta_{14} + 16\beta_{13} + 4\beta_{12} + 16\beta_{11} + 8\beta_{3} ) / 84 $ (-9b15 - 8b14 + 16b13 + 4b12 + 16b11 + 8b3) / 84
$\nu^{2}$	$=$	$ ( -7\beta_{9} + 18\beta_{8} - 7\beta_{7} - 6\beta_{6} + 6\beta_{5} - 9\beta_{2} - 414\beta _1 + 405 ) / 63 $ (-7b9 + 18b8 - 7b7 - 6b6 + 6b5 - 9b2 - 414*b1 + 405) / 63
$\nu^{3}$	$=$	$ ( - 555 \beta_{15} - 372 \beta_{14} + 576 \beta_{13} - 3 \beta_{12} + 555 \beta_{11} + \cdots - 363 \beta_{3} ) / 252 $ (-555b15 - 372b14 + 576b13 - 3b12 + 555b11 - 224b10 + 112b4 - 363b3) / 252
$\nu^{4}$	$=$	$ ( 35\beta_{9} + 30\beta_{8} - 70\beta_{7} + 60\beta_{6} + 59\beta_{5} - \beta_{2} - 1201\beta _1 - 60 ) / 21 $ (35b9 + 30b8 - 70b7 + 60b6 + 59b5 - b2 - 1201b1 - 60) / 21
$\nu^{5}$	$=$	$ ( - 1872 \beta_{15} + 324 \beta_{14} + 1872 \beta_{13} - 2199 \beta_{12} + 2523 \beta_{11} + \cdots - 6267 \beta_{3} ) / 252 $ (-1872b15 + 324b14 + 1872b13 - 2199b12 + 2523b11 - 2240b10 - 2240b4 - 6267b3) / 252
$\nu^{6}$	$=$	$ ( 2702 \beta_{9} - 2364 \beta_{8} - 1351 \beta_{7} + 3546 \beta_{6} - 249 \beta_{5} + 2862 \beta_{2} + \cdots - 36537 ) / 63 $ (2702b9 - 2364b8 - 1351b7 + 3546b6 - 249b5 + 2862b2 - 249*b1 - 36537) / 63
$\nu^{7}$	$=$	$ ( 53451 \beta_{15} + 52776 \beta_{14} - 40704 \beta_{13} - 26388 \beta_{12} - 40704 \beta_{11} + \cdots - 20352 \beta_{3} ) / 252 $ (53451b15 + 52776b14 - 40704b13 - 26388b12 - 40704b11 + 33040b10 - 66080b4 - 20352b3) / 252
$\nu^{8}$	$=$	$ ( 5607 \beta_{9} - 15042 \beta_{8} + 5607 \beta_{7} + 5014 \beta_{6} - 13274 \beta_{5} + 11651 \beta_{2} + \cdots - 125127 ) / 21 $ (5607b9 - 15042b8 + 5607b7 + 5014b6 - 13274b5 + 11651b2 + 136778*b1 - 125127) / 21
$\nu^{9}$	$=$	$ ( 296873 \beta_{15} + 184812 \beta_{14} - 235056 \beta_{13} + 5601 \beta_{12} - 296873 \beta_{11} + \cdots + 218521 \beta_{3} ) / 84 $ (296873b15 + 184812b14 - 235056b13 + 5601b12 - 296873b11 + 293440b10 - 146720b4 + 218521b3) / 84
$\nu^{10}$	$=$	$ ( - 207683 \beta_{9} - 188838 \beta_{8} + 415366 \beta_{7} - 377676 \beta_{6} - 448317 \beta_{5} + \cdots + 377676 ) / 63 $ (-207683b9 - 188838b8 + 415366b7 - 377676b6 - 448317b5 - 70641b2 + 4878459*b1 + 377676) / 63
$\nu^{11}$	$=$	$ ( 2804448 \beta_{15} - 1089972 \beta_{14} - 2804448 \beta_{13} + 4179351 \beta_{12} + \cdots + 10878219 \beta_{3} ) / 252 $ (2804448b15 - 1089972b14 - 2804448b13 + 4179351b12 - 5269323b11 + 5624752b10 + 5624752b4 + 10878219b3) / 252
$\nu^{12}$	$=$	$ ( - 5118946 \beta_{9} + 4706196 \beta_{8} + 2559473 \beta_{7} - 7059294 \beta_{6} + 932733 \beta_{5} + \cdots + 56875641 ) / 63 $ (-5118946b9 + 4706196b8 + 2559473b7 - 7059294b6 + 932733b5 - 6571662b2 + 932733*b1 + 56875641) / 63
$\nu^{13}$	$=$	$ ( - 99593451 \beta_{15} - 95455272 \beta_{14} + 68055840 \beta_{13} + 47727636 \beta_{12} + \cdots + 34027920 \beta_{3} ) / 252 $ (-99593451b15 - 95455272b14 + 68055840b13 + 47727636b12 + 68055840b11 - 70561792b10 + 141123584b4 + 34027920b3) / 252
$\nu^{14}$	$=$	$ ( - 10514133 \beta_{9} + 29197230 \beta_{8} - 10514133 \beta_{7} - 9732410 \beta_{6} + 27372858 \beta_{5} + \cdots + 211338591 ) / 21 $ (-10514133b9 + 29197230b8 - 10514133b7 - 9732410b6 + 27372858b5 - 23418839b2 - 234757430*b1 + 211338591) / 21
$\nu^{15}$	$=$	$ ( - 1645565259 \beta_{15} - 1003126356 \beta_{14} + 1249235136 \beta_{13} - 55724259 \beta_{12} + \cdots - 1229153547 \beta_{3} ) / 252 $ (-1645565259b15 - 1003126356b14 + 1249235136b13 - 55724259b12 + 1645565259b11 - 1755311264b10 + 877655632b4 - 1229153547b3) / 252

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

Character values

We give the values of $\chi$ on generators for $\left(\mathbb{Z}/1008\mathbb{Z}\right)^\times$.

$n$	$127$	$577$	$757$	$785$
$\chi(n)$	$1$	$\beta_{1}$	$1$	$-1$

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} $

17.1

−2.03494	+	1.17487i
3.04238	−	1.75652i
2.17636	−	1.25652i
−1.16892	+	0.674875i
1.16892	−	0.674875i
−2.17636	+	1.25652i
−3.04238	+	1.75652i
2.03494	−	1.17487i
−2.03494	−	1.17487i
3.04238	+	1.75652i
2.17636	+	1.25652i
−1.16892	−	0.674875i
1.16892	+	0.674875i
−2.17636	−	1.25652i
−3.04238	−	1.75652i
2.03494	+	1.17487i

−9.88140

−

17.1151i

6.68600

−

17.2713i

17.2

−5.92150

−

10.2563i

18.3701

2.35362i

17.3

−3.62059

−

6.27105i

−12.4914

−

13.6735i

17.4

−2.38434

−

4.12981i

3.43532

18.1989i

17.5

2.38434

4.12981i

3.43532

18.1989i

17.6

3.62059

6.27105i

−12.4914

−

13.6735i

17.7

5.92150

10.2563i

18.3701

2.35362i

17.8

9.88140

17.1151i

6.68600

−

17.2713i

593.1

−9.88140

17.1151i

6.68600

17.2713i

593.2

−5.92150

10.2563i

18.3701

−

2.35362i

593.3

−3.62059

6.27105i

−12.4914

13.6735i

593.4

−2.38434

4.12981i

3.43532

−

18.1989i

593.5

2.38434

−

4.12981i

3.43532

−

18.1989i

593.6

3.62059

−

6.27105i

−12.4914

13.6735i

593.7

5.92150

−

10.2563i

18.3701

−

2.35362i

593.8

9.88140

−

17.1151i

6.68600

17.2713i

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	1008.4.bt.c		16
3.b	odd	2	1	inner	1008.4.bt.c		16
4.b	odd	2	1		126.4.k.a	✓	16
7.d	odd	6	1	inner	1008.4.bt.c		16
12.b	even	2	1		126.4.k.a	✓	16
21.g	even	6	1	inner	1008.4.bt.c		16
28.d	even	2	1		882.4.k.a		16
28.f	even	6	1		126.4.k.a	✓	16
28.f	even	6	1		882.4.d.c		16
28.g	odd	6	1		882.4.d.c		16
28.g	odd	6	1		882.4.k.a		16
84.h	odd	2	1		882.4.k.a		16
84.j	odd	6	1		126.4.k.a	✓	16
84.j	odd	6	1		882.4.d.c		16
84.n	even	6	1		882.4.d.c		16
84.n	even	6	1		882.4.k.a		16

By twisted newform orbit
Twist	Min	Dim	Char	Parity	Ord	Mult	Type
126.4.k.a	✓	16	4.b	odd	2	1
126.4.k.a	✓	16	12.b	even	2	1
126.4.k.a	✓	16	28.f	even	6	1
126.4.k.a	✓	16	84.j	odd	6	1
882.4.d.c		16	28.f	even	6	1
882.4.d.c		16	28.g	odd	6	1
882.4.d.c		16	84.j	odd	6	1
882.4.d.c		16	84.n	even	6	1
882.4.k.a		16	28.d	even	2	1
882.4.k.a		16	28.g	odd	6	1
882.4.k.a		16	84.h	odd	2	1
882.4.k.a		16	84.n	even	6	1
1008.4.bt.c		16	1.a	even	1	1	trivial
1008.4.bt.c		16	3.b	odd	2	1	inner
1008.4.bt.c		16	7.d	odd	6	1	inner
1008.4.bt.c		16	21.g	even	6	1	inner

Hecke kernels

This newform subspace can be constructed as the kernel of the linear operator $ T_{5}^{16} + 606 T_{5}^{14} + 271359 T_{5}^{12} + 48599406 T_{5}^{10} + 6247957437 T_{5}^{8} + \cdots + 42\!\cdots\!76 $ T5^16 + 606*T5^14 + 271359*T5^12 + 48599406*T5^10 + 6247957437*T5^8 + 376348018068*T5^6 + 16309703755836*T5^4 + 310331086648272*T5^2 + 4266535704988176 acting on $S_{4}^{\mathrm{new}}(1008, [\chi])$.

Hecke characteristic polynomials

$p$	$F_p(T)$
$2$	$ T^{16} $ T^16
$3$	$ T^{16} $ T^16
$5$	$ T^{16} + \cdots + 42\!\cdots\!76 $ T^16 + 606T^14 + 271359T^12 + 48599406T^10 + 6247957437T^8 + 376348018068T^6 + 16309703755836T^4 + 310331086648272*T^2 + 4266535704988176
$7$	$ (T^{8} - 32 T^{7} + \cdots + 13841287201)^{2} $ (T^8 - 32T^7 + 784T^6 - 15428T^5 + 218197T^4 - 5291804T^3 + 92236816T^2 - 1291315424*T + 13841287201)^2
$11$	$ T^{16} + \cdots + 51\!\cdots\!36 $ T^16 - 4230T^14 + 13416759T^12 - 15922320822T^10 + 13593918328605T^8 - 6130920746942604T^6 + 1945131508463864220T^4 - 108508754353893346224*T^2 + 5192184206907794270736
$13$	$ (T^{8} + 12498 T^{6} + \cdots + 138656437956)^{2} $ (T^8 + 12498T^6 + 46967157T^4 + 53663709060*T^2 + 138656437956)^2
$17$	$ T^{16} + \cdots + 55\!\cdots\!56 $ T^16 + 11316T^14 + 94520556T^12 + 327843717840T^10 + 832412880715536T^8 + 864995109273568512T^6 + 665470040380278451200T^4 + 60753989996177080320*T^2 + 5545868553743302656
$19$	$ (T^{8} + \cdots + 95\!\cdots\!84)^{2} $ (T^8 + 342T^7 + 37317T^6 - 571482T^5 - 319198401T^4 + 6152755680T^3 + 4682605493538T^2 + 359983993314240*T + 9558284220524484)^2
$23$	$ T^{16} + \cdots + 84\!\cdots\!76 $ T^16 - 84708T^14 + 4824806796T^12 - 153834529181328T^10 + 3578523034623431184T^8 - 48301372227683204310528T^6 + 444366568421717307477405696T^4 - 657672573938257165287992721408*T^2 + 843727643775345203438399416958976
$29$	$ (T^{8} + \cdots + 11\!\cdots\!16)^{2} $ (T^8 + 93222T^6 + 2339171217T^4 + 15266770826256*T^2 + 11166424489060416)^2
$31$	$ (T^{8} + \cdots + 35\!\cdots\!41)^{2} $ (T^8 - 624T^7 + 139692T^6 - 6177600T^5 - 1960154991T^4 + 126295686000T^3 + 48354537716100T^2 - 7594582230471060*T + 354406055992576641)^2
$37$	$ (T^{8} + \cdots + 38\!\cdots\!64)^{2} $ (T^8 - 626T^7 + 271117T^6 - 57999926T^5 + 8879610619T^4 - 817216513220T^3 + 53750161734094T^2 - 1722793952842232*T + 38347570835828164)^2
$41$	$ (T^{8} + \cdots + 399206154260736)^{2} $ (T^8 - 52284T^6 + 580462308T^4 - 1397603661120*T^2 + 399206154260736)^2
$43$	$ (T^{4} - 278 T^{3} + \cdots - 863420834)^{4} $ (T^4 - 278T^3 - 48009T^2 + 16079332*T - 863420834)^4
$47$	$ T^{16} + \cdots + 35\!\cdots\!76 $ T^16 + 393744T^14 + 111605348808T^12 + 14664813693615360T^10 + 1406488852692103446576T^8 + 52729361144747001923613696T^6 + 1474287620765711899082275511424T^4 + 227878261432514495465253693502464*T^2 + 35029644992895981901024034936914176
$53$	$ T^{16} + \cdots + 38\!\cdots\!36 $ T^16 - 541638T^14 + 252777114963T^12 - 21327821669660742T^10 + 1468625622626748979521T^8 - 12718800156756598150389552T^6 + 83617469736608586772693073088T^4 - 204809459345977942626902013201408*T^2 + 385466977761498056934596689457319936
$59$	$ T^{16} + \cdots + 57\!\cdots\!36 $ T^16 + 529446T^14 + 229460861835T^12 + 24224125437956502T^10 + 1863776037689473843665T^8 + 60602686184764881929076624T^6 + 1435932099949937771424071782080T^4 + 10237499147608948149457141103920128*T^2 + 57533732521242839860375946525067841536
$61$	$ (T^{8} + \cdots + 80\!\cdots\!36)^{2} $ (T^8 - 1632T^7 + 607362T^6 + 457687872T^5 - 230667180804T^4 - 205614721703376T^3 + 204287293224470736T^2 - 65638982770750764864*T + 8015189074692724662336)^2
$67$	$ (T^{8} + \cdots + 34\!\cdots\!36)^{2} $ (T^8 + 34T^7 + 770551T^6 + 265054354T^5 + 538100230909T^4 + 108029517948148T^3 + 66456464932766044T^2 - 8564461892073008048*T + 3459682930258094469136)^2
$71$	$ (T^{8} + \cdots + 21\!\cdots\!36)^{2} $ (T^8 + 2016720T^6 + 1359080305848T^4 + 342767097035217216*T^2 + 21307399586034093125136)^2
$73$	$ (T^{8} + \cdots + 11\!\cdots\!64)^{2} $ (T^8 + 1566T^7 + 572619T^6 - 383408478T^5 - 172302742323T^4 + 110494683182556T^3 + 68709222775801044T^2 + 1505542169350562544*T + 11128663095042568464)^2
$79$	$ (T^{8} + \cdots + 39\!\cdots\!81)^{2} $ (T^8 + 1372T^7 + 1288396T^6 + 681924544T^5 + 267884832241T^4 + 56849213509144T^3 + 8177814452632708T^2 - 420338995882303064*T + 39937402414094042881)^2
$83$	$ (T^{8} + \cdots + 37\!\cdots\!36)^{2} $ (T^8 - 2767026T^6 + 2410713305109T^4 - 680568464358120996*T^2 + 37353031365174555679236)^2
$89$	$ T^{16} + \cdots + 33\!\cdots\!36 $ T^16 + 2815560T^14 + 6270027511536T^12 + 4004988335913684096T^10 + 1797298494954215782821120T^8 + 444274753921871204934166745088T^6 + 78807235422774843931981354909286400T^4 + 6095478524528940092397409601827937452032*T^2 + 339759196572062097092515284005709235891470336
$97$	$ (T^{8} + \cdots + 17\!\cdots\!44)^{2} $ (T^8 + 6437022T^6 + 12948192745353T^4 + 9346186108440987192*T^2 + 1770834724890553045353744)^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:	\( N \)	\(=\)	\( 1008 = 2^{4} \cdot 3^{2} \cdot 7 \)
Weight:	\( k \)	\(=\)	\( 4 \)
Character orbit:	\([\chi]\)	\(=\)	1008.bt (of order \(6\), degree \(2\), not minimal)

\(f(q)\)	\(=\)	\( q + (\beta_{12} - \beta_{10}) q^{5} + (\beta_{8} - \beta_{6} - \beta_{5} + \cdots + 6) q^{7}+O(q^{10}) \) q + (b12 - b10) * q^5 + (b8 - b6 - b5 - b2 - 3b1 + 6) q^7	\( q + (\beta_{12} - \beta_{10}) q^{5} + (\beta_{8} - \beta_{6} - \beta_{5} + \cdots + 6) q^{7}+ \cdots + ( - 32 \beta_{8} + 75 \beta_{7} + \cdots + 12) q^{97}+O(q^{100}) \) q + (b12 - b10) * q^5 + (b8 - b6 - b5 - b2 - 3b1 + 6) q^7 + (b15 - b13 - b10 - b4 + 2b3) q^11 + (-4b8 - 2b7 - b6 + 2b2 - 6b1 + 5) * q^13 + (-5b15 - 3b14 + 5b13 + 5b11 - b3) * q^17 + (-5b9 + 5b8 - 4b6 + 4b5 - 6b2 + 29b1 - 60) * q^19 + (6b15 - 10b13 - 10b11 + 2b10 - 4b4 - 5b3) * q^23 + (-3b9 - 12b8 - 3b7 + 4b6 + 6b5 + b2 + 32b1 - 31) * q^25 + (-5b15 - 6b14 + 15b13 + 2b12 + 5b11 + 12b10 - 6b4) q^29 + (-6b9 + b8 + 6b7 - 5b6 - 2b5 + 7b2 + 48b1 + 59) * q^31 + (-14b15 + 8b14 + 3b13 - 4b12 + 9b11 - 9b10 - 15b4 - 5b3) * q^35 + (-2b9 - 3b8 + 4b7 - 6b6 - 8b5 - 2b2 + 159b1 + 6) q^37 + (-9b14 - b13 - b12 - 2b11 + 5b4 - 3b3) * q^41 + (6b9 - 10b8 - 3b7 + 15b6 - 4b5 + 18b2 - 4b1 + 73) q^43 + (2b15 + 18b12 - 4b11 + 31b10 + 4b3) q^47 + (-18b9 + 22b8 + 19b7 - 10b6 + 3b5 - 16b2 + 90b1 - 119) q^49 + (-3b15 - 8b14 + 3b13 + 18b12 - 26b11 - 14b10 - 14b4 + 20b3) * q^53 + (-12b8 - 22b7 - 3b6 + 6b5 + 6b2 - 66b1 + 36) * q^55 + (20b15 + 19b14 - 9b12 - 10b11 - 28b10 + 28b4 + 10b3) q^59 + (7b9 + 45b8 - 36b6 + 31b5 - 49b2 - 134b1 + 250) * q^61 + (33b15 - 20b14 - 32b13 + 10b12 - 32b11 - 51b10 + 102b4 - 16b3) * q^65 + (20b9 - 12b8 + 20b7 + 4b6 + 22b5 - 7b2 + 18b1 - 25) q^67 + (-16b15 - 44b14 + 42b13 + 58b12 + 16b11 - 66b10 + 33b4 - 2b3) * q^71 + (31b9 - 4b8 - 31b7 + 20b6 + 8b5 - 9b2 - 124b1 - 149) q^73 + (-4b15 - 9b14 + 35b13 + 38b12 - 8b11 + 56b10 - 21b4 + 34b3) * q^77 + (4b9 + 3b8 - 8b7 + 6b6 - 5b5 - 11b2 - 339b1 - 6) q^79 + (-37b15 - 28b14 - 9b13 + 28b12 - 55b11 + 37b4 + 10b3) q^83 + (54b9 + 2b8 - 27b7 - 3b6 - 25b5 + 48b2 - 25b1 - 4) q^85 + (-46b15 - 20b14 + 40b13 - 46b12 + 52b11 - 74b10 - 62b3) q^89 + (61b9 + 31b8 - 29b7 - 39b6 + 27b5 - 14b2 + 328b1 + 190) q^91 + (-32b15 - 56b14 + 32b13 - 108b12 + 52b11 + 17b10 + 17b4 - 116b3) * q^95 + (-32b8 + 75b7 - 8b6 + 11b5 + 16b2 - 3b1 + 12) * q^97
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 16 q + 64 q^{7}+O(q^{10}) \) 16 * q + 64 * q^7	\( 16 q + 64 q^{7} - 684 q^{19} - 212 q^{25} + 1248 q^{31} + 1252 q^{37} + 1112 q^{43} - 1088 q^{49} + 3264 q^{61} - 68 q^{67} - 3132 q^{73} - 2744 q^{79} - 672 q^{85} + 5748 q^{91}+O(q^{100}) \) 16 * q + 64 * q^7 - 684 * q^19 - 212 * q^25 + 1248 * q^31 + 1252 * q^37 + 1112 * q^43 - 1088 * q^49 + 3264 * q^61 - 68 * q^67 - 3132 * q^73 - 2744 * q^79 - 672 * q^85 + 5748 * q^91

Introduction

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Newspace parameters

Newform invariants

$q$-expansion

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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	1008.4.bt.c

Level	$1008$
Weight	$4$
Character orbit	1008.bt
Analytic conductor	$59.474$
Analytic rank	$0$
Dimension	$16$
CM	no
Inner twists	$4$

Self dual:	no
Analytic conductor:	\(59.4739252858\)
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:	\( x^{16} - 26x^{14} + 451x^{12} - 4330x^{10} + 30081x^{8} - 130232x^{6} + 401200x^{4} - 595840x^{2} + 614656 \) x^16 - 26x^14 + 451x^12 - 4330x^10 + 30081x^8 - 130232x^6 + 401200x^4 - 595840*x^2 + 614656
Coefficient ring:	\(\Z[a_1, \ldots, a_{13}]\)
Coefficient ring index:	\( 2^{10}\cdot 3^{14}\cdot 7^{2} \)
Twist minimal:	no (minimal twist has level 126)
Sato-Tate group:	$\mathrm{SU}(2)[C_{6}]$

\(\beta_{1}\)	\(=\)	\( ( - 142677179 \nu^{14} + 3449734804 \nu^{12} - 58606224029 \nu^{10} + 522506995056 \nu^{8} + \cdots + 67829831095936 ) / 42688070765536 \) (-142677179v^14 + 3449734804v^12 - 58606224029v^10 + 522506995056v^8 - 3538966877735v^6 + 13706008712414v^4 - 45882381109840*v^2 + 67829831095936) / 42688070765536
\(\beta_{2}\)	\(=\)	\( ( - 268395985 \nu^{14} + 3082276126 \nu^{12} - 35491743131 \nu^{10} - 313799736514 \nu^{8} + \cdots - 508725620940208 ) / 21344035382768 \) (-268395985v^14 + 3082276126v^12 - 35491743131v^10 - 313799736514v^8 + 4447208220055v^6 - 52287690199316v^4 + 186657666174104*v^2 - 508725620940208) / 21344035382768
\(\beta_{3}\)	\(=\)	\( ( - 11698644731 \nu^{15} + 428861881062 \nu^{13} - 6144107391217 \nu^{11} + \cdots - 64\!\cdots\!40 \nu ) / 23\!\cdots\!16 \) (-11698644731v^15 + 428861881062v^13 - 6144107391217v^11 + 52929884294982v^9 - 74473238390811v^7 - 820188255493136v^5 + 7528041620987264v^3 - 6472600198603840v) / 2390531962870016
\(\beta_{4}\)	\(=\)	\( ( 32388 \nu^{15} - 519129 \nu^{13} + 6905658 \nu^{11} - 11173011 \nu^{9} - 146158518 \nu^{7} + \cdots + 30203812464 \nu ) / 3440822336 \) (32388v^15 - 519129v^13 + 6905658v^11 - 11173011v^9 - 146158518v^7 + 2885250183v^5 - 11185705092v^3 + 30203812464v) / 3440822336
\(\beta_{5}\)	\(=\)	\( ( 1696491632 \nu^{14} - 43710871023 \nu^{12} + 751023188358 \nu^{10} - 7152478495349 \nu^{8} + \cdots - 573488655962320 ) / 21344035382768 \) (1696491632v^14 - 43710871023v^12 + 751023188358v^10 - 7152478495349v^8 + 48646117840830v^6 - 205932862524359v^4 + 539206095120216*v^2 - 573488655962320) / 21344035382768
\(\beta_{6}\)	\(=\)	\( ( 13640578801 \nu^{14} - 205507917882 \nu^{12} + 2374377814083 \nu^{10} + \cdots + 48\!\cdots\!36 ) / 170752283062144 \) (13640578801v^14 - 205507917882v^12 + 2374377814083v^10 + 1124930271446v^8 - 100809830468607v^6 + 984000204000872v^4 - 3076605841997472*v^2 + 4848269987974336) / 170752283062144
\(\beta_{7}\)	\(=\)	\( ( 3267 \nu^{14} - 37902 \nu^{12} + 492633 \nu^{10} + 624450 \nu^{8} - 1471341 \nu^{6} + \cdots - 126923328 ) / 37158464 \) (3267v^14 - 37902v^12 + 492633v^10 + 624450v^8 - 1471341v^6 + 61998168v^4 + 242270304*v^2 - 126923328) / 37158464
\(\beta_{8}\)	\(=\)	\( ( - 16719559391 \nu^{14} + 543918658634 \nu^{12} - 9567740081797 \nu^{10} + \cdots + 47\!\cdots\!72 ) / 170752283062144 \) (-16719559391v^14 + 543918658634v^12 - 9567740081797v^10 + 100675980367618v^8 - 641574452046919v^6 + 2589097545499820v^4 - 5438075215215152*v^2 + 4719845480297472) / 170752283062144
\(\beta_{9}\)	\(=\)	\( ( - 10775336067 \nu^{14} + 300711423882 \nu^{12} - 4761110826945 \nu^{10} + \cdots + 18\!\cdots\!44 ) / 85376141531072 \) (-10775336067v^14 + 300711423882v^12 - 4761110826945v^10 + 42809613205362v^8 - 215772080219547v^6 + 706304473275012v^4 - 682313603806896*v^2 + 1848540692242944) / 85376141531072
\(\beta_{10}\)	\(=\)	\( ( - 66561205569 \nu^{15} + 1803932697690 \nu^{13} - 31311073580403 \nu^{11} + \cdots + 24\!\cdots\!92 \nu ) / 23\!\cdots\!16 \) (-66561205569v^15 + 1803932697690v^13 - 31311073580403v^11 + 307702257948042v^9 - 2086364696742609v^7 + 8885886137668056v^5 - 22919421990221088v^3 + 24953529151814592v) / 2390531962870016
\(\beta_{11}\)	\(=\)	\( ( - 5146531289 \nu^{15} + 151193460438 \nu^{13} - 2786295237283 \nu^{11} + \cdots + 42\!\cdots\!40 \nu ) / 170752283062144 \) (-5146531289v^15 + 151193460438v^13 - 2786295237283v^11 + 29688341498622v^9 - 219758721518001v^7 + 1007629445376388v^5 - 3078634830826864v^3 + 4225633220056640v) / 170752283062144
\(\beta_{12}\)	\(=\)	\( ( - 118476251399 \nu^{15} + 1939627683654 \nu^{13} - 29515355504389 \nu^{11} + \cdots + 16\!\cdots\!96 \nu ) / 23\!\cdots\!16 \) (-118476251399v^15 + 1939627683654v^13 - 29515355504389v^11 + 152596510730742v^9 - 1101721120617303v^7 + 3235676827057144v^5 - 18895013703637600v^3 + 16989284910696896v) / 2390531962870016
\(\beta_{13}\)	\(=\)	\( ( 19804969753 \nu^{15} - 521275040310 \nu^{13} + 8951349357215 \nu^{11} + \cdots - 32\!\cdots\!36 \nu ) / 298816495358752 \) (19804969753v^15 - 521275040310v^13 + 8951349357215v^11 - 84430092351942v^9 + 556533357224037v^7 - 2152162005417068v^5 + 5582771400777932v^3 - 3280258926145936v) / 298816495358752
\(\beta_{14}\)	\(=\)	\( ( - 47521347253 \nu^{15} + 1024316733933 \nu^{13} - 15683606522513 \nu^{11} + \cdots + 88\!\cdots\!48 \nu ) / 597632990717504 \) (-47521347253v^15 + 1024316733933v^13 - 15683606522513v^11 + 113847818201979v^9 - 606773243706879v^7 + 1834381758596843v^5 - 4524808726506380v^3 + 8891861003584048v) / 597632990717504
\(\beta_{15}\)	\(=\)	\( ( 1323924075 \nu^{15} - 30864285558 \nu^{13} + 485432943393 \nu^{11} + \cdots + 32596825285824 \nu ) / 12196591647296 \) (1323924075v^15 - 30864285558v^13 + 485432943393v^11 - 3835696366518v^9 + 20648746889835v^7 - 57872310623520v^5 + 87538942514688v^3 + 32596825285824v) / 12196591647296

\(\nu\)	\(=\)	\( ( -9\beta_{15} - 8\beta_{14} + 16\beta_{13} + 4\beta_{12} + 16\beta_{11} + 8\beta_{3} ) / 84 \) (-9b15 - 8b14 + 16b13 + 4b12 + 16b11 + 8b3) / 84
\(\nu^{2}\)	\(=\)	\( ( -7\beta_{9} + 18\beta_{8} - 7\beta_{7} - 6\beta_{6} + 6\beta_{5} - 9\beta_{2} - 414\beta _1 + 405 ) / 63 \) (-7b9 + 18b8 - 7b7 - 6b6 + 6b5 - 9b2 - 414*b1 + 405) / 63
\(\nu^{3}\)	\(=\)	\( ( - 555 \beta_{15} - 372 \beta_{14} + 576 \beta_{13} - 3 \beta_{12} + 555 \beta_{11} + \cdots - 363 \beta_{3} ) / 252 \) (-555b15 - 372b14 + 576b13 - 3b12 + 555b11 - 224b10 + 112b4 - 363b3) / 252
\(\nu^{4}\)	\(=\)	\( ( 35\beta_{9} + 30\beta_{8} - 70\beta_{7} + 60\beta_{6} + 59\beta_{5} - \beta_{2} - 1201\beta _1 - 60 ) / 21 \) (35b9 + 30b8 - 70b7 + 60b6 + 59b5 - b2 - 1201b1 - 60) / 21
\(\nu^{5}\)	\(=\)	\( ( - 1872 \beta_{15} + 324 \beta_{14} + 1872 \beta_{13} - 2199 \beta_{12} + 2523 \beta_{11} + \cdots - 6267 \beta_{3} ) / 252 \) (-1872b15 + 324b14 + 1872b13 - 2199b12 + 2523b11 - 2240b10 - 2240b4 - 6267b3) / 252
\(\nu^{6}\)	\(=\)	\( ( 2702 \beta_{9} - 2364 \beta_{8} - 1351 \beta_{7} + 3546 \beta_{6} - 249 \beta_{5} + 2862 \beta_{2} + \cdots - 36537 ) / 63 \) (2702b9 - 2364b8 - 1351b7 + 3546b6 - 249b5 + 2862b2 - 249*b1 - 36537) / 63
\(\nu^{7}\)	\(=\)	\( ( 53451 \beta_{15} + 52776 \beta_{14} - 40704 \beta_{13} - 26388 \beta_{12} - 40704 \beta_{11} + \cdots - 20352 \beta_{3} ) / 252 \) (53451b15 + 52776b14 - 40704b13 - 26388b12 - 40704b11 + 33040b10 - 66080b4 - 20352b3) / 252
\(\nu^{8}\)	\(=\)	\( ( 5607 \beta_{9} - 15042 \beta_{8} + 5607 \beta_{7} + 5014 \beta_{6} - 13274 \beta_{5} + 11651 \beta_{2} + \cdots - 125127 ) / 21 \) (5607b9 - 15042b8 + 5607b7 + 5014b6 - 13274b5 + 11651b2 + 136778*b1 - 125127) / 21
\(\nu^{9}\)	\(=\)	\( ( 296873 \beta_{15} + 184812 \beta_{14} - 235056 \beta_{13} + 5601 \beta_{12} - 296873 \beta_{11} + \cdots + 218521 \beta_{3} ) / 84 \) (296873b15 + 184812b14 - 235056b13 + 5601b12 - 296873b11 + 293440b10 - 146720b4 + 218521b3) / 84
\(\nu^{10}\)	\(=\)	\( ( - 207683 \beta_{9} - 188838 \beta_{8} + 415366 \beta_{7} - 377676 \beta_{6} - 448317 \beta_{5} + \cdots + 377676 ) / 63 \) (-207683b9 - 188838b8 + 415366b7 - 377676b6 - 448317b5 - 70641b2 + 4878459*b1 + 377676) / 63
\(\nu^{11}\)	\(=\)	\( ( 2804448 \beta_{15} - 1089972 \beta_{14} - 2804448 \beta_{13} + 4179351 \beta_{12} + \cdots + 10878219 \beta_{3} ) / 252 \) (2804448b15 - 1089972b14 - 2804448b13 + 4179351b12 - 5269323b11 + 5624752b10 + 5624752b4 + 10878219b3) / 252
\(\nu^{12}\)	\(=\)	\( ( - 5118946 \beta_{9} + 4706196 \beta_{8} + 2559473 \beta_{7} - 7059294 \beta_{6} + 932733 \beta_{5} + \cdots + 56875641 ) / 63 \) (-5118946b9 + 4706196b8 + 2559473b7 - 7059294b6 + 932733b5 - 6571662b2 + 932733*b1 + 56875641) / 63
\(\nu^{13}\)	\(=\)	\( ( - 99593451 \beta_{15} - 95455272 \beta_{14} + 68055840 \beta_{13} + 47727636 \beta_{12} + \cdots + 34027920 \beta_{3} ) / 252 \) (-99593451b15 - 95455272b14 + 68055840b13 + 47727636b12 + 68055840b11 - 70561792b10 + 141123584b4 + 34027920b3) / 252
\(\nu^{14}\)	\(=\)	\( ( - 10514133 \beta_{9} + 29197230 \beta_{8} - 10514133 \beta_{7} - 9732410 \beta_{6} + 27372858 \beta_{5} + \cdots + 211338591 ) / 21 \) (-10514133b9 + 29197230b8 - 10514133b7 - 9732410b6 + 27372858b5 - 23418839b2 - 234757430*b1 + 211338591) / 21
\(\nu^{15}\)	\(=\)	\( ( - 1645565259 \beta_{15} - 1003126356 \beta_{14} + 1249235136 \beta_{13} - 55724259 \beta_{12} + \cdots - 1229153547 \beta_{3} ) / 252 \) (-1645565259b15 - 1003126356b14 + 1249235136b13 - 55724259b12 + 1645565259b11 - 1755311264b10 + 877655632b4 - 1229153547b3) / 252

\(n\)	\(127\)	\(577\)	\(757\)	\(785\)
\(\chi(n)\)	\(1\)	\(\beta_{1}\)	\(1\)	\(-1\)

\(n\):		e.g. 2-40 or 990-1000
Embeddings:		e.g. 1-3 or 17.8
Significant digits:
Format:

$p$	$F_p(T)$
$2$	\( T^{16} \) T^16
$3$	\( T^{16} \) T^16
$5$	\( T^{16} + \cdots + 42\!\cdots\!76 \) T^16 + 606T^14 + 271359T^12 + 48599406T^10 + 6247957437T^8 + 376348018068T^6 + 16309703755836T^4 + 310331086648272*T^2 + 4266535704988176
$7$	\( (T^{8} - 32 T^{7} + \cdots + 13841287201)^{2} \) (T^8 - 32T^7 + 784T^6 - 15428T^5 + 218197T^4 - 5291804T^3 + 92236816T^2 - 1291315424*T + 13841287201)^2
$11$	\( T^{16} + \cdots + 51\!\cdots\!36 \) T^16 - 4230T^14 + 13416759T^12 - 15922320822T^10 + 13593918328605T^8 - 6130920746942604T^6 + 1945131508463864220T^4 - 108508754353893346224*T^2 + 5192184206907794270736
$13$	\( (T^{8} + 12498 T^{6} + \cdots + 138656437956)^{2} \) (T^8 + 12498T^6 + 46967157T^4 + 53663709060*T^2 + 138656437956)^2
$17$	\( T^{16} + \cdots + 55\!\cdots\!56 \) T^16 + 11316T^14 + 94520556T^12 + 327843717840T^10 + 832412880715536T^8 + 864995109273568512T^6 + 665470040380278451200T^4 + 60753989996177080320*T^2 + 5545868553743302656
$19$	\( (T^{8} + \cdots + 95\!\cdots\!84)^{2} \) (T^8 + 342T^7 + 37317T^6 - 571482T^5 - 319198401T^4 + 6152755680T^3 + 4682605493538T^2 + 359983993314240*T + 9558284220524484)^2
$23$	\( T^{16} + \cdots + 84\!\cdots\!76 \) T^16 - 84708T^14 + 4824806796T^12 - 153834529181328T^10 + 3578523034623431184T^8 - 48301372227683204310528T^6 + 444366568421717307477405696T^4 - 657672573938257165287992721408*T^2 + 843727643775345203438399416958976
$29$	\( (T^{8} + \cdots + 11\!\cdots\!16)^{2} \) (T^8 + 93222T^6 + 2339171217T^4 + 15266770826256*T^2 + 11166424489060416)^2
$31$	\( (T^{8} + \cdots + 35\!\cdots\!41)^{2} \) (T^8 - 624T^7 + 139692T^6 - 6177600T^5 - 1960154991T^4 + 126295686000T^3 + 48354537716100T^2 - 7594582230471060*T + 354406055992576641)^2
$37$	\( (T^{8} + \cdots + 38\!\cdots\!64)^{2} \) (T^8 - 626T^7 + 271117T^6 - 57999926T^5 + 8879610619T^4 - 817216513220T^3 + 53750161734094T^2 - 1722793952842232*T + 38347570835828164)^2
$41$	\( (T^{8} + \cdots + 399206154260736)^{2} \) (T^8 - 52284T^6 + 580462308T^4 - 1397603661120*T^2 + 399206154260736)^2
$43$	\( (T^{4} - 278 T^{3} + \cdots - 863420834)^{4} \) (T^4 - 278T^3 - 48009T^2 + 16079332*T - 863420834)^4
$47$	\( T^{16} + \cdots + 35\!\cdots\!76 \) T^16 + 393744T^14 + 111605348808T^12 + 14664813693615360T^10 + 1406488852692103446576T^8 + 52729361144747001923613696T^6 + 1474287620765711899082275511424T^4 + 227878261432514495465253693502464*T^2 + 35029644992895981901024034936914176
$53$	\( T^{16} + \cdots + 38\!\cdots\!36 \) T^16 - 541638T^14 + 252777114963T^12 - 21327821669660742T^10 + 1468625622626748979521T^8 - 12718800156756598150389552T^6 + 83617469736608586772693073088T^4 - 204809459345977942626902013201408*T^2 + 385466977761498056934596689457319936
$59$	\( T^{16} + \cdots + 57\!\cdots\!36 \) T^16 + 529446T^14 + 229460861835T^12 + 24224125437956502T^10 + 1863776037689473843665T^8 + 60602686184764881929076624T^6 + 1435932099949937771424071782080T^4 + 10237499147608948149457141103920128*T^2 + 57533732521242839860375946525067841536
$61$	\( (T^{8} + \cdots + 80\!\cdots\!36)^{2} \) (T^8 - 1632T^7 + 607362T^6 + 457687872T^5 - 230667180804T^4 - 205614721703376T^3 + 204287293224470736T^2 - 65638982770750764864*T + 8015189074692724662336)^2
$67$	\( (T^{8} + \cdots + 34\!\cdots\!36)^{2} \) (T^8 + 34T^7 + 770551T^6 + 265054354T^5 + 538100230909T^4 + 108029517948148T^3 + 66456464932766044T^2 - 8564461892073008048*T + 3459682930258094469136)^2
$71$	\( (T^{8} + \cdots + 21\!\cdots\!36)^{2} \) (T^8 + 2016720T^6 + 1359080305848T^4 + 342767097035217216*T^2 + 21307399586034093125136)^2
$73$	\( (T^{8} + \cdots + 11\!\cdots\!64)^{2} \) (T^8 + 1566T^7 + 572619T^6 - 383408478T^5 - 172302742323T^4 + 110494683182556T^3 + 68709222775801044T^2 + 1505542169350562544*T + 11128663095042568464)^2
$79$	\( (T^{8} + \cdots + 39\!\cdots\!81)^{2} \) (T^8 + 1372T^7 + 1288396T^6 + 681924544T^5 + 267884832241T^4 + 56849213509144T^3 + 8177814452632708T^2 - 420338995882303064*T + 39937402414094042881)^2
$83$	\( (T^{8} + \cdots + 37\!\cdots\!36)^{2} \) (T^8 - 2767026T^6 + 2410713305109T^4 - 680568464358120996*T^2 + 37353031365174555679236)^2
$89$	\( T^{16} + \cdots + 33\!\cdots\!36 \) T^16 + 2815560T^14 + 6270027511536T^12 + 4004988335913684096T^10 + 1797298494954215782821120T^8 + 444274753921871204934166745088T^6 + 78807235422774843931981354909286400T^4 + 6095478524528940092397409601827937452032*T^2 + 339759196572062097092515284005709235891470336
$97$	\( (T^{8} + \cdots + 17\!\cdots\!44)^{2} \) (T^8 + 6437022T^6 + 12948192745353T^4 + 9346186108440987192*T^2 + 1770834724890553045353744)^2
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