LMFDB - Newform orbit 50.24.b.c

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms

[N,k,chi] = [50,24,Mod(49,50)]

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

lf = mfeigenbasis(mf)

from sage.modular.dirichlet import DirichletCharacter

H = DirichletGroup(50, base_ring=CyclotomicField(2))

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

N = Newforms(chi, 24, names="a")

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

chi := DirichletCharacter("50.49");

S:= CuspForms(chi, 24);

N := Newforms(S);

Level:	$ N $	$=$	$ 50 = 2 \cdot 5^{2} $
Weight:	$ k $	$=$	$ 24 $
Character orbit:	$[\chi]$	$=$	50.b (of order $2$, degree $1$, 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:	$167.602018673$
Analytic rank:	$0$
Dimension:	$4$
Coefficient field:	$\mathbb{Q}[x]/(x^{4} + \cdots)$
comment: defining polynomial gp: f.mod \\ as an extension of the character field
Defining polynomial:	$ x^{4} + 746131x^{2} + 139177494225 $ x^4 + 746131*x^2 + 139177494225
Coefficient ring:	$\Z[a_1, \ldots, a_{13}]$
Coefficient ring index:	$ 2^{12}\cdot 3^{2}\cdot 5^{2} $
Twist minimal:	no (minimal twist has level 10)
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 $1,\beta_1,\beta_2,\beta_3$ for the coefficient ring described below. We also show the integral $q$-expansion of the trace form.

$f(q)$	$=$	$ q + 1024 \beta_1 q^{2} + ( - \beta_{2} + 22971 \beta_1) q^{3} - 4194304 q^{4} + (1024 \beta_{3} - 94089216) q^{6} + ( - 15687 \beta_{2} + 536514727 \beta_1) q^{7} - 4294967296 \beta_1 q^{8} + (45942 \beta_{3} + 6078277863) q^{9}+ \cdots + ( - 18\!\cdots\!55 \beta_{3} - 94\!\cdots\!44) q^{99}+O(q^{100}) $ q + 1024b1 q^2 + (-b2 + 22971b1) q^3 - 4194304 * q^4 + (1024b3 - 94089216) q^6 + (-15687b2 + 536514727b1) * q^7 - 4294967296b1 q^8 + (45942b3 + 6078277863) q^9 + (-465993b3 - 346144785888) q^11 + (4194304b2 - 96347357184b1) * q^12 + (28528308b2 + 427113075371b1) * q^13 + (16063488b3 - 2197564321792) q^14 + 17592186044416 * q^16 + (259977492b2 - 23287333060083b1) * q^17 + (188178432b2 + 6224156531712b1) * q^18 + (-219638628b3 + 485219267308300) q^19 + (896860804b3 - 1397661181658868) q^21 + (-1908707328b2 - 354452260749312b1) * q^22 + (-10959625971b2 + 240500624602491b1) * q^23 + (-4294967296b3 + 394638775025664) q^24 + (-29212987392b3 - 1749455156719616) q^26 + (-96000121962b2 - 1646722318425210b1) * q^27 + (65796046848b2 - 2250305865515008b1) * q^28 + (-136189148796b3 + 20197378195845090) q^29 + (142474809519b3 - 27409501007759548) q^31 + 18014398509481984b1 q^32 + (303327485076b2 + 32102779301331552b1) * q^33 + (-266216951808b3 + 95384916214099968) q^34 + (-192694714368b3 - 25494145153892352) q^36 + (-1852033198968b2 - 524636010709446083b1) * q^37 + (-899639820288b2 + 496864529723699200b1) * q^38 + (-228210687697b3 + 2412883992227359836) q^39 + (-4560533719074b3 - 2136869907348170538) q^41 + (3673541853184b2 - 1431205050018680832b1) * q^42 + (7213868351127b2 + 2709580292075815391b1) * q^43 + (1954516303872b3 + 1451836460029181952) q^44 + (11222656994304b3 - 985090558371803136) q^46 + (51322829531913b2 - 6670134365640182973b1) * q^47 + (-17592186044416b2 + 404110105626279936b1) * q^48 + (16832613044898b3 + 5065568082755419827) q^49 + (-29259276028815b3 + 24485899389002797572) q^51 + (-119656396357632b2 - 1791442080480886784b1) * q^52 + (-205554967125012b2 - 8438312556562926489b1) * q^53 + (98304124889088b3 + 6744974616269660160) q^54 + (-67375151972352b3 + 9217252825149472768) q^56 + (-505400543003452b2 + 30024841728034460100b1) * q^57 + (-557830753468416b2 + 20682115272545372160b1) * q^58 + (-345612497343282b3 - 20099760963745788420) q^59 + (-221169666054672b3 + 401803119294771813002) q^61 + (583576819789824b2 - 28067329031945777152b1) * q^62 + (3244293514455b2 - 58685456170305585999b1) * q^63 - 73786976294838206464 * q^64 + (-310607344717824b3 - 131492984018254036992) q^66 + (-1405911474061821b2 + 525654710793729016987b1) * q^67 + (-1090424634605568b2 + 97674154203238367232b1) * q^68 + (492254192782332b3 - 964124410270936108644) q^69 + (-5196737676907017b3 + 359121610336681233132) q^71 + (-789277550051328b2 - 26106004637585768448b1) * q^72 + (-9519010764432372b2 - 785728958301781083769b1) * q^73 + (1896481995743232b3 + 2148909099865891155968) q^74 + (921231175974912b3 - 2035157113748271923200) q^76 + (4429924827509412b2 + 442616439265560045024b1) * q^77 + (-934750976806912b2 + 2470793208040816472064b1) * q^78 + (-584209194824538b3 + 3526159726009448490760) q^79 + (4883622404833926b3 - 7528081075427451920859) q^81 + (-18679946113327104b2 - 2188154785124526630912b1) * q^82 + (-27945208381914765b2 + 5476148460315635202111b1) * q^83 + (-3761706857660416b3 + 5862215884876516687872) q^84 + (-7387001191554048b3 - 11098440876342539841536) q^86 + (-32710981943816754b2 + 12169987883933300307990b1) * q^87 + (8005698780659712b2 + 1486680535069882318848b1) * q^88 + (23732385590343060b3 + 99061804059156779190) q^89 + (-8605734565047039b3 + 37549935450528764470732) q^91 + (45968003048669184b2 - 1008732731772726411264b1) * q^92 + (40500656405603344b2 - 12875936707160874215508b1) * q^93 + (-52554577440678912b3 + 27320870361662189457408) q^94 + (18014398509481984b3 - 1655234992645242617856) q^96 + (185885650910046780b2 + 28944331519897942677697b1) * q^97 + (68946383031902208b2 + 5187141716741549902848b1) * q^98 + (-18735018689479455b3 - 9464620741688140563744) q^99
$\operatorname{Tr}(f)(q)$	$=$	$ 4 q - 16777216 q^{4} - 376356864 q^{6} + 24313111452 q^{9} - 1384579143552 q^{11} - 8790257287168 q^{14} + 70368744177664 q^{16} + 19\!\cdots\!00 q^{19} - 55\!\cdots\!72 q^{21} + 15\!\cdots\!56 q^{24} - 69\!\cdots\!64 q^{26}+ \cdots - 37\!\cdots\!76 q^{99}+O(q^{100}) $ 4 * q - 16777216 * q^4 - 376356864 * q^6 + 24313111452 * q^9 - 1384579143552 * q^11 - 8790257287168 * q^14 + 70368744177664 * q^16 + 1940877069233200 * q^19 - 5590644726635472 * q^21 + 1578555100102656 * q^24 - 6997820626878464 * q^26 + 80789512783380360 * q^29 - 109638004031038192 * q^31 + 381539664856399872 * q^34 - 101976580615569408 * q^36 + 9651535968909439344 * q^39 - 8547479629392682152 * q^41 + 5807345840116727808 * q^44 - 3940362233487212544 * q^46 + 20262272331021679308 * q^49 + 97943597556011190288 * q^51 + 26979898465078640640 * q^54 + 36869011300597891072 * q^56 - 80399043854983153680 * q^59 + 1607212477179087252008 * q^61 - 295147905179352825856 * q^64 - 525971936073016147968 * q^66 - 3856497641083744434576 * q^69 + 1436486441346724932528 * q^71 + 8595636399463564623872 * q^74 - 8140628454993087692800 * q^76 + 14104638904037793963040 * q^79 - 30112324301709807683436 * q^81 + 23448863539506066751488 * q^84 - 44393763505370159366144 * q^86 + 396247216236627116760 * q^89 + 150199741802115057882928 * q^91 + 109283481446648757829632 * q^94 - 6620939970580970471424 * q^96 - 37858482966752562254976 * q^99

Basis of coefficient ring in terms of a root $\nu$ of $ x^{4} + 746131x^{2} + 139177494225 $ x^4 + 746131*x^2 + 139177494225 :

$\beta_{1}$	$=$	$ ( 2\nu^{3} + 746132\nu ) / 373065 $ (2v^3 + 746132v) / 373065
$\beta_{2}$	$=$	$ ( 16\nu^{3} + 17907136\nu ) / 24871 $ (16v^3 + 17907136v) / 24871
$\beta_{3}$	$=$	$ 960\nu^{2} + 358142880 $ 960*v^2 + 358142880

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

$\nu$	$=$	$ ( \beta_{2} - 120\beta_1 ) / 480 $ (b2 - 120*b1) / 480
$\nu^{2}$	$=$	$ ( \beta_{3} - 358142880 ) / 960 $ (b3 - 358142880) / 960
$\nu^{3}$	$=$	$ ( -186533\beta_{2} + 67151760\beta_1 ) / 240 $ (-186533b2 + 67151760b1) / 240

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

Character values

We give the values of $\chi$ on generators for $\left(\mathbb{Z}/50\mathbb{Z}\right)^\times$.

$n$	$27$
$\chi(n)$	$-1$

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} $

49.1

		611.291i
	−	610.291i
		610.291i
	−	611.291i

−

2048.00i

−

339122.i

−4.19430e6

−6.94521e8

−

5.67214e9i

8.58993e9i

−2.08602e10

49.2

−

2048.00i

247238.i

−4.19430e6

5.06342e8

3.52608e9i

8.58993e9i

3.30168e10

49.3

2048.00i

−

247238.i

−4.19430e6

5.06342e8

−

3.52608e9i

−

8.58993e9i

3.30168e10

49.4

2048.00i

339122.i

−4.19430e6

−6.94521e8

5.67214e9i

−

8.58993e9i

−2.08602e10

Inner twists

Char	Parity	Ord	Mult	Type
1.a	even	1	1	trivial
5.b	even	2	1	inner

Twists

By twisting character orbit
Char	Parity	Ord	Mult	Type	Twist	Min	Dim
1.a	even	1	1	trivial	50.24.b.c		4
5.b	even	2	1	inner	50.24.b.c		4
5.c	odd	4	1		10.24.a.c	✓	2
5.c	odd	4	1		50.24.a.b		2

By twisted newform orbit
Twist	Min	Dim	Char	Parity	Ord	Mult	Type
10.24.a.c	✓	2	5.c	odd	4	1
50.24.a.b		2	5.c	odd	4	1
50.24.b.c		4	1.a	even	1	1	trivial
50.24.b.c		4	5.b	even	2	1	inner

Hecke kernels

This newform subspace can be constructed as the kernel of the linear operator $ T_{3}^{4} + 176129801928T_{3}^{2} + 7029743599170519207696 $ T3^4 + 176129801928*T3^2 + 7029743599170519207696 acting on $S_{24}^{\mathrm{new}}(50, [\chi])$.

Hecke characteristic polynomials

$p$	$F_p(T)$
$2$	$ (T^{2} + 4194304)^{2} $ (T^2 + 4194304)^2
$3$	$ T^{4} + \cdots + 70\!\cdots\!96 $ T^4 + 176129801928*T^2 + 7029743599170519207696
$5$	$ T^{4} $ T^4
$7$	$ T^{4} + \cdots + 40\!\cdots\!56 $ T^4 + 44606358514650993032*T^2 + 400015793716794664985805531221134640656
$11$	$ (T^{2} + \cdots + 45\!\cdots\!44)^{2} $ (T^2 + 692289571776*T + 45156545635715959762944)^2
$13$	$ T^{4} + \cdots + 47\!\cdots\!96 $ T^4 + 141369578812747803312361928*T^2 + 4792153896990794343692121613927214474638325463386896
$17$	$ T^{4} + \cdots + 13\!\cdots\!36 $ T^4 + 15957399474014973305437635912*T^2 + 13251789103404228913964796194251255105028795024983128336
$19$	$ (T^{2} + \cdots + 21\!\cdots\!00)^{2} $ (T^2 - 970438534616600*T + 218851621001101393505309280400)^2
$23$	$ T^{4} + \cdots + 10\!\cdots\!76 $ T^4 + 21111235132489066929590830555848*T^2 + 101866492395110145942175864705468038544906753799823755405500176
$29$	$ (T^{2} + \cdots - 59\!\cdots\!00)^{2} $ (T^2 - 40394756391690180*T - 5969005089605310707490631820082300)^2
$31$	$ (T^{2} + \cdots - 62\!\cdots\!96)^{2} $ (T^2 + 54819002015519096*T - 6227883736361474498193952806554096)^2
$37$	$ T^{4} + \cdots + 64\!\cdots\!36 $ T^4 + 2791594228746027972677691094283555912*T^2 + 649872075456396395847334411895008190655856346401758311572428602361304336
$41$	$ (T^{2} + \cdots - 25\!\cdots\!56)^{2} $ (T^2 + 4273739814696341076*T - 2584652439249378699275874877374364956)^2
$43$	$ T^{4} + \cdots + 61\!\cdots\!76 $ T^4 + 67680701729230320389199552362116131848*T^2 + 619723783089100571398589013130898136690066158972866938205320194031574671376
$47$	$ T^{4} + \cdots + 23\!\cdots\!56 $ T^4 + 808738086205054962728866969096371586632*T^2 + 2346773027185866653438353095172432539673283053785593733568254358156841258256
$53$	$ T^{4} + \cdots + 11\!\cdots\!56 $ T^4 + 7833262684931576446048041772134162213768*T^2 + 11202344684460338181084620188887266191430550993934691882874140359375703287447056
$59$	$ (T^{2} + \cdots - 40\!\cdots\!00)^{2} $ (T^2 + 40199521927491576840*T - 40664244211750933774995235665024833929200)^2
$61$	$ (T^{2} + \cdots + 14\!\cdots\!04)^{2} $ (T^2 - 803606238589543626004*T + 144627590228915173523480846464940537762404)^2
$67$	$ T^{4} + \cdots + 87\!\cdots\!76 $ T^4 + 2550295053826458294196658946410390302820552*T^2 + 874889860728658949154797485020440933466016159270580415040710951127074116680833365776
$71$	$ (T^{2} + \cdots - 91\!\cdots\!76)^{2} $ (T^2 - 718243220673362466264*T - 9156180158305084280028711513106977186712176)^2
$73$	$ T^{4} + \cdots + 28\!\cdots\!36 $ T^4 + 20515855377511001305458812028238232704567688*T^2 + 28291417621757691790904121301389268853451230572715290428807274027362860654749492753936
$79$	$ (T^{2} + \cdots + 12\!\cdots\!00)^{2} $ (T^2 - 7052319452018896981520*T + 12316457561829249066579010277328279579304000)^2
$83$	$ T^{4} + \cdots + 27\!\cdots\!56 $ T^4 + 374154898037724099421715042908524556291970568*T^2 + 2790815192284441381733370335876440480297868224202241539913207898524800615647546188400656
$89$	$ (T^{2} + \cdots - 19\!\cdots\!00)^{2} $ (T^2 - 198123608118313558380*T - 193636866708520377784643152386505372050783900)^2
$97$	$ T^{4} + \cdots + 14\!\cdots\!96 $ T^4 + 12642229577585274672581403542601203700286270472*T^2 + 145221835519950241480834605610506783209534647495688633724618732259550181825095420006215696
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Classical	Maass
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Elliptic curves over $\Q$
Elliptic curves over $\Q(\alpha)$
Genus 2 curves over $\Q$
Higher genus families
Abelian varieties over $\F_{q}$

Level:	\( N \)	\(=\)	\( 50 = 2 \cdot 5^{2} \)
Weight:	\( k \)	\(=\)	\( 24 \)
Character orbit:	\([\chi]\)	\(=\)	50.b (of order \(2\), degree \(1\), not minimal)

\(f(q)\)	\(=\)	\( q + 1024 \beta_1 q^{2} + ( - \beta_{2} + 22971 \beta_1) q^{3} - 4194304 q^{4} + (1024 \beta_{3} - 94089216) q^{6} + ( - 15687 \beta_{2} + 536514727 \beta_1) q^{7} - 4294967296 \beta_1 q^{8} + (45942 \beta_{3} + 6078277863) q^{9}+ \cdots + ( - 18\!\cdots\!55 \beta_{3} - 94\!\cdots\!44) q^{99}+O(q^{100}) \) q + 1024b1 q^2 + (-b2 + 22971b1) q^3 - 4194304 * q^4 + (1024b3 - 94089216) q^6 + (-15687b2 + 536514727b1) * q^7 - 4294967296b1 q^8 + (45942b3 + 6078277863) q^9 + (-465993b3 - 346144785888) q^11 + (4194304b2 - 96347357184b1) * q^12 + (28528308b2 + 427113075371b1) * q^13 + (16063488b3 - 2197564321792) q^14 + 17592186044416 * q^16 + (259977492b2 - 23287333060083b1) * q^17 + (188178432b2 + 6224156531712b1) * q^18 + (-219638628b3 + 485219267308300) q^19 + (896860804b3 - 1397661181658868) q^21 + (-1908707328b2 - 354452260749312b1) * q^22 + (-10959625971b2 + 240500624602491b1) * q^23 + (-4294967296b3 + 394638775025664) q^24 + (-29212987392b3 - 1749455156719616) q^26 + (-96000121962b2 - 1646722318425210b1) * q^27 + (65796046848b2 - 2250305865515008b1) * q^28 + (-136189148796b3 + 20197378195845090) q^29 + (142474809519b3 - 27409501007759548) q^31 + 18014398509481984b1 q^32 + (303327485076b2 + 32102779301331552b1) * q^33 + (-266216951808b3 + 95384916214099968) q^34 + (-192694714368b3 - 25494145153892352) q^36 + (-1852033198968b2 - 524636010709446083b1) * q^37 + (-899639820288b2 + 496864529723699200b1) * q^38 + (-228210687697b3 + 2412883992227359836) q^39 + (-4560533719074b3 - 2136869907348170538) q^41 + (3673541853184b2 - 1431205050018680832b1) * q^42 + (7213868351127b2 + 2709580292075815391b1) * q^43 + (1954516303872b3 + 1451836460029181952) q^44 + (11222656994304b3 - 985090558371803136) q^46 + (51322829531913b2 - 6670134365640182973b1) * q^47 + (-17592186044416b2 + 404110105626279936b1) * q^48 + (16832613044898b3 + 5065568082755419827) q^49 + (-29259276028815b3 + 24485899389002797572) q^51 + (-119656396357632b2 - 1791442080480886784b1) * q^52 + (-205554967125012b2 - 8438312556562926489b1) * q^53 + (98304124889088b3 + 6744974616269660160) q^54 + (-67375151972352b3 + 9217252825149472768) q^56 + (-505400543003452b2 + 30024841728034460100b1) * q^57 + (-557830753468416b2 + 20682115272545372160b1) * q^58 + (-345612497343282b3 - 20099760963745788420) q^59 + (-221169666054672b3 + 401803119294771813002) q^61 + (583576819789824b2 - 28067329031945777152b1) * q^62 + (3244293514455b2 - 58685456170305585999b1) * q^63 - 73786976294838206464 * q^64 + (-310607344717824b3 - 131492984018254036992) q^66 + (-1405911474061821b2 + 525654710793729016987b1) * q^67 + (-1090424634605568b2 + 97674154203238367232b1) * q^68 + (492254192782332b3 - 964124410270936108644) q^69 + (-5196737676907017b3 + 359121610336681233132) q^71 + (-789277550051328b2 - 26106004637585768448b1) * q^72 + (-9519010764432372b2 - 785728958301781083769b1) * q^73 + (1896481995743232b3 + 2148909099865891155968) q^74 + (921231175974912b3 - 2035157113748271923200) q^76 + (4429924827509412b2 + 442616439265560045024b1) * q^77 + (-934750976806912b2 + 2470793208040816472064b1) * q^78 + (-584209194824538b3 + 3526159726009448490760) q^79 + (4883622404833926b3 - 7528081075427451920859) q^81 + (-18679946113327104b2 - 2188154785124526630912b1) * q^82 + (-27945208381914765b2 + 5476148460315635202111b1) * q^83 + (-3761706857660416b3 + 5862215884876516687872) q^84 + (-7387001191554048b3 - 11098440876342539841536) q^86 + (-32710981943816754b2 + 12169987883933300307990b1) * q^87 + (8005698780659712b2 + 1486680535069882318848b1) * q^88 + (23732385590343060b3 + 99061804059156779190) q^89 + (-8605734565047039b3 + 37549935450528764470732) q^91 + (45968003048669184b2 - 1008732731772726411264b1) * q^92 + (40500656405603344b2 - 12875936707160874215508b1) * q^93 + (-52554577440678912b3 + 27320870361662189457408) q^94 + (18014398509481984b3 - 1655234992645242617856) q^96 + (185885650910046780b2 + 28944331519897942677697b1) * q^97 + (68946383031902208b2 + 5187141716741549902848b1) * q^98 + (-18735018689479455b3 - 9464620741688140563744) q^99
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 4 q - 16777216 q^{4} - 376356864 q^{6} + 24313111452 q^{9} - 1384579143552 q^{11} - 8790257287168 q^{14} + 70368744177664 q^{16} + 19\!\cdots\!00 q^{19} - 55\!\cdots\!72 q^{21} + 15\!\cdots\!56 q^{24} - 69\!\cdots\!64 q^{26}+ \cdots - 37\!\cdots\!76 q^{99}+O(q^{100}) \) 4 * q - 16777216 * q^4 - 376356864 * q^6 + 24313111452 * q^9 - 1384579143552 * q^11 - 8790257287168 * q^14 + 70368744177664 * q^16 + 1940877069233200 * q^19 - 5590644726635472 * q^21 + 1578555100102656 * q^24 - 6997820626878464 * q^26 + 80789512783380360 * q^29 - 109638004031038192 * q^31 + 381539664856399872 * q^34 - 101976580615569408 * q^36 + 9651535968909439344 * q^39 - 8547479629392682152 * q^41 + 5807345840116727808 * q^44 - 3940362233487212544 * q^46 + 20262272331021679308 * q^49 + 97943597556011190288 * q^51 + 26979898465078640640 * q^54 + 36869011300597891072 * q^56 - 80399043854983153680 * q^59 + 1607212477179087252008 * q^61 - 295147905179352825856 * q^64 - 525971936073016147968 * q^66 - 3856497641083744434576 * q^69 + 1436486441346724932528 * q^71 + 8595636399463564623872 * q^74 - 8140628454993087692800 * q^76 + 14104638904037793963040 * q^79 - 30112324301709807683436 * q^81 + 23448863539506066751488 * q^84 - 44393763505370159366144 * q^86 + 396247216236627116760 * q^89 + 150199741802115057882928 * q^91 + 109283481446648757829632 * q^94 - 6620939970580970471424 * q^96 - 37858482966752562254976 * q^99

Introduction

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Newspace parameters

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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	50.24.b.c

Level	$50$
Weight	$24$
Character orbit	50.b
Analytic conductor	$167.602$
Analytic rank	$0$
Dimension	$4$
Inner twists	$2$

Self dual:	no
Analytic conductor:	\(167.602018673\)
Analytic rank:	\(0\)
Dimension:	\(4\)
Coefficient field:	\(\mathbb{Q}[x]/(x^{4} + \cdots)\)
comment: defining polynomial gp: f.mod \\ as an extension of the character field
Defining polynomial:	\( x^{4} + 746131x^{2} + 139177494225 \) x^4 + 746131*x^2 + 139177494225
Coefficient ring:	\(\Z[a_1, \ldots, a_{13}]\)
Coefficient ring index:	\( 2^{12}\cdot 3^{2}\cdot 5^{2} \)
Twist minimal:	no (minimal twist has level 10)
Sato-Tate group:	$\mathrm{SU}(2)[C_{2}]$

\(\beta_{1}\)	\(=\)	\( ( 2\nu^{3} + 746132\nu ) / 373065 \) (2v^3 + 746132v) / 373065
\(\beta_{2}\)	\(=\)	\( ( 16\nu^{3} + 17907136\nu ) / 24871 \) (16v^3 + 17907136v) / 24871
\(\beta_{3}\)	\(=\)	\( 960\nu^{2} + 358142880 \) 960*v^2 + 358142880

\(\nu\)	\(=\)	\( ( \beta_{2} - 120\beta_1 ) / 480 \) (b2 - 120*b1) / 480
\(\nu^{2}\)	\(=\)	\( ( \beta_{3} - 358142880 ) / 960 \) (b3 - 358142880) / 960
\(\nu^{3}\)	\(=\)	\( ( -186533\beta_{2} + 67151760\beta_1 ) / 240 \) (-186533b2 + 67151760b1) / 240

$p$	$F_p(T)$
$2$	\( (T^{2} + 4194304)^{2} \) (T^2 + 4194304)^2
$3$	\( T^{4} + \cdots + 70\!\cdots\!96 \) T^4 + 176129801928*T^2 + 7029743599170519207696
$5$	\( T^{4} \) T^4
$7$	\( T^{4} + \cdots + 40\!\cdots\!56 \) T^4 + 44606358514650993032*T^2 + 400015793716794664985805531221134640656
$11$	\( (T^{2} + \cdots + 45\!\cdots\!44)^{2} \) (T^2 + 692289571776*T + 45156545635715959762944)^2
$13$	\( T^{4} + \cdots + 47\!\cdots\!96 \) T^4 + 141369578812747803312361928*T^2 + 4792153896990794343692121613927214474638325463386896
$17$	\( T^{4} + \cdots + 13\!\cdots\!36 \) T^4 + 15957399474014973305437635912*T^2 + 13251789103404228913964796194251255105028795024983128336
$19$	\( (T^{2} + \cdots + 21\!\cdots\!00)^{2} \) (T^2 - 970438534616600*T + 218851621001101393505309280400)^2
$23$	\( T^{4} + \cdots + 10\!\cdots\!76 \) T^4 + 21111235132489066929590830555848*T^2 + 101866492395110145942175864705468038544906753799823755405500176
$29$	\( (T^{2} + \cdots - 59\!\cdots\!00)^{2} \) (T^2 - 40394756391690180*T - 5969005089605310707490631820082300)^2
$31$	\( (T^{2} + \cdots - 62\!\cdots\!96)^{2} \) (T^2 + 54819002015519096*T - 6227883736361474498193952806554096)^2
$37$	\( T^{4} + \cdots + 64\!\cdots\!36 \) T^4 + 2791594228746027972677691094283555912*T^2 + 649872075456396395847334411895008190655856346401758311572428602361304336
$41$	\( (T^{2} + \cdots - 25\!\cdots\!56)^{2} \) (T^2 + 4273739814696341076*T - 2584652439249378699275874877374364956)^2
$43$	\( T^{4} + \cdots + 61\!\cdots\!76 \) T^4 + 67680701729230320389199552362116131848*T^2 + 619723783089100571398589013130898136690066158972866938205320194031574671376
$47$	\( T^{4} + \cdots + 23\!\cdots\!56 \) T^4 + 808738086205054962728866969096371586632*T^2 + 2346773027185866653438353095172432539673283053785593733568254358156841258256
$53$	\( T^{4} + \cdots + 11\!\cdots\!56 \) T^4 + 7833262684931576446048041772134162213768*T^2 + 11202344684460338181084620188887266191430550993934691882874140359375703287447056
$59$	\( (T^{2} + \cdots - 40\!\cdots\!00)^{2} \) (T^2 + 40199521927491576840*T - 40664244211750933774995235665024833929200)^2
$61$	\( (T^{2} + \cdots + 14\!\cdots\!04)^{2} \) (T^2 - 803606238589543626004*T + 144627590228915173523480846464940537762404)^2
$67$	\( T^{4} + \cdots + 87\!\cdots\!76 \) T^4 + 2550295053826458294196658946410390302820552*T^2 + 874889860728658949154797485020440933466016159270580415040710951127074116680833365776
$71$	\( (T^{2} + \cdots - 91\!\cdots\!76)^{2} \) (T^2 - 718243220673362466264*T - 9156180158305084280028711513106977186712176)^2
$73$	\( T^{4} + \cdots + 28\!\cdots\!36 \) T^4 + 20515855377511001305458812028238232704567688*T^2 + 28291417621757691790904121301389268853451230572715290428807274027362860654749492753936
$79$	\( (T^{2} + \cdots + 12\!\cdots\!00)^{2} \) (T^2 - 7052319452018896981520*T + 12316457561829249066579010277328279579304000)^2
$83$	\( T^{4} + \cdots + 27\!\cdots\!56 \) T^4 + 374154898037724099421715042908524556291970568*T^2 + 2790815192284441381733370335876440480297868224202241539913207898524800615647546188400656
$89$	\( (T^{2} + \cdots - 19\!\cdots\!00)^{2} \) (T^2 - 198123608118313558380*T - 193636866708520377784643152386505372050783900)^2
$97$	\( T^{4} + \cdots + 14\!\cdots\!96 \) T^4 + 12642229577585274672581403542601203700286270472*T^2 + 145221835519950241480834605610506783209534647495688633724618732259550181825095420006215696
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\(n\)	\(27\)
\(\chi(n)\)	\(-1\)

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