LMFDB - Embedded newform 80.11.h.c.79.3

Show commands: Magma / Pari/GP / SageMath

Newspace parameters

comment:Compute space of new eigenforms

gp:[N,k,chi] = [80,11,Mod(79,80)] mf = mfinit([N,k,chi],0) lf = mfeigenbasis(mf)

magma://Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code chi := DirichletCharacter("80.79"); S:= CuspForms(chi, 11); N := Newforms(S);

sage:from sage.modular.dirichlet import DirichletCharacter H = DirichletGroup(80, base_ring=CyclotomicField(2)) chi = DirichletCharacter(H, H._module([1, 0, 1])) N = Newforms(chi, 11, names="a")

Level:	$ N $	$=$	$ 80 = 2^{4} \cdot 5 $
Weight:	$ k $	$=$	$ 11 $
Character orbit:	$[\chi]$	$=$	80.h (of order $2$, degree $1$, minimal)

Newform invariants

comment:select newform

sage:traces = [20] f = next(g for g in N if [g.coefficient(i+1).trace() for i in range(1)] == traces)

gp:f = lf[1] \\ Warning: the index may be different

Self dual:	no
Analytic conductor:	$50.8285802139$
Analytic rank:	$0$
Dimension:	$20$
Coefficient field:	$\mathbb{Q}[x]/(x^{20} - \cdots)$
comment:defining polynomial gp:f.mod \\ as an extension of the character field
Defining polynomial:	$ x^{20} - 10 x^{19} - 214065 x^{18} + 1926870 x^{17} + 18968501725 x^{16} - 151791690812 x^{15} + \cdots + 19\!\cdots\!07 $ x^20 - 10x^19 - 214065x^18 + 1926870x^17 + 18968501725x^16 - 151791690812x^15 - 902509057687710x^14 + 6320219911274660x^13 + 25149806639226868205x^12 - 150981009601297521310x^11 - 424721632969752082446931x^10 + 2124992308086770262858130x^9 + 4416119216716945090091828055x^8 - 17677228481765665286177431460x^7 - 28205908842254805246850374647570x^6 + 84679605753079351811071943161932x^5 + 107391072475341785783771967456383675x^4 - 214923298254622747695853817303185810x^3 - 223218497096280455990144915735000010485x^2 + 223325972861622235247709821925222032910*x + 194778931182571164656591746997324510793307
Coefficient ring:	$\Z[a_1, \ldots, a_{11}]$
Coefficient ring index:	$ 2^{139}\cdot 3^{14}\cdot 5^{12}\cdot 7^{4} $
Twist minimal:	yes
Sato-Tate group:	$\mathrm{SU}(2)[C_{2}]$

Embedding invariants

Embedding label			79.3
Root			$197.935 + 0.866025i$ of defining polynomial
Character	$\chi$	$=$	80.79
Dual form			80.11.h.c.79.4

$q$-expansion

comment:q-expansion

sage:f.q_expansion() # note that sage often uses an isomorphic number field

gp:mfcoefs(f, 20)

$f(q)$	$=$	\(q-394.871 q^{3} +(540.369 - 3077.93i) q^{5} +29913.4 q^{7} +96874.0 q^{9} -105843. i q^{11} -356330. i q^{13} +(-213376. + 1.21538e6i) q^{15} +1.69563e6i q^{17} +3.65226e6i q^{19} -1.18119e7 q^{21} +1.00168e7 q^{23} +(-9.18163e6 - 3.32643e6i) q^{25} -1.49360e7 q^{27} -6.03662e6 q^{29} +1.91238e7i q^{31} +4.17942e7i q^{33} +(1.61643e7 - 9.20713e7i) q^{35} -5.62702e7i q^{37} +1.40704e8i q^{39} +2.78531e6 q^{41} +1.65546e8 q^{43} +(5.23477e7 - 2.98171e8i) q^{45} +1.89866e8 q^{47} +6.12337e8 q^{49} -6.69555e8i q^{51} +6.83741e8i q^{53} +(-3.25776e8 - 5.71941e7i) q^{55} -1.44217e9i q^{57} -2.98791e8i q^{59} -4.22796e7 q^{61} +2.89783e9 q^{63} +(-1.09676e9 - 1.92549e8i) q^{65} +7.22294e8 q^{67} -3.95533e9 q^{69} +3.22537e9i q^{71} -4.43270e8i q^{73} +(3.62556e9 + 1.31351e9i) q^{75} -3.16612e9i q^{77} -2.31113e9i q^{79} +1.77476e8 q^{81} +2.74762e9 q^{83} +(5.21902e9 + 9.16265e8i) q^{85} +2.38369e9 q^{87} +3.11807e9 q^{89} -1.06590e10i q^{91} -7.55141e9i q^{93} +(1.12414e10 + 1.97357e9i) q^{95} -1.58875e10i q^{97} -1.02534e10i q^{99} +O(q^{100})\)
$\operatorname{Tr}(f)(q)$	$=$	$ 20 q - 8644 q^{5} + 531980 q^{9} - 9918720 q^{21} - 27949132 q^{25} + 72610760 q^{29} - 22549160 q^{41} - 376019996 q^{45} + 1955095660 q^{49} + 1108414520 q^{61} + 1858963008 q^{65} - 3380864640 q^{69}+ \cdots - 5262787480 q^{89}+O(q^{100}) $ 20 * q - 8644 * q^5 + 531980 * q^9 - 9918720 * q^21 - 27949132 * q^25 + 72610760 * q^29 - 22549160 * q^41 - 376019996 * q^45 + 1955095660 * q^49 + 1108414520 * q^61 + 1858963008 * q^65 - 3380864640 * q^69 + 18825762580 * q^81 + 19740011904 * q^85 - 5262787480 * q^89

Character values

We give the values of $\chi$ on generators for $\left(\mathbb{Z}/80\mathbb{Z}\right)^\times$.

$n$	$17$	$21$	$31$
$\chi(n)$	$-1$	$1$	$-1$

Coefficient data

For each $n$ we display the coefficients of the $q$-expansion $a_n$, the Satake parameters $\alpha_p$, and the Satake angles $\theta_p = \textrm{Arg}(\alpha_p)$. You can download additional coefficients here.

Currently showing only $a_p$; display all $a_n$ Currently showing all $a_n$; display only $a_p$

$n$	$a_n$			$a_n / n^{(k-1)/2}$			$ \alpha_n $			$ \theta_n $
$p$	$a_p$			$a_p / p^{(k-1)/2}$			$ \alpha_p$			$ \theta_p $

$2$		0			0
$2$		0			0
$3$	−394.871			−1.62498			−0.812492	−	0.582973i	$-0.801889\pi$
$3$	−394.871			−1.62498			−0.812492	+	0.582973i	$0.801889\pi$
$4$		0			0
$5$	540.369	−	3077.93i	0.172918	−	0.984936i
$5$	540.369	−	3077.93i	0.172918	−	0.984936i
$6$		0			0
$7$	29913.4			1.77982			0.889909	−	0.456137i	$-0.150767\pi$
$7$	29913.4			1.77982			0.889909	+	0.456137i	$0.150767\pi$
$8$		0			0
$9$	96874.0			1.64057
$10$		0			0
$11$		−	105843.i		−	0.657200i	−0.944469	−	0.328600i	$-0.893423\pi$
$11$		−	105843.i		−	0.657200i	0.944469	−	0.328600i	$-0.106577\pi$
$12$		0			0
$13$		−	356330.i		−	0.959700i	−0.877351	−	0.479850i	$-0.840691\pi$
$13$		−	356330.i		−	0.959700i	0.877351	−	0.479850i	$-0.159309\pi$
$14$		0			0
$15$	−213376.	+	1.21538e6i	−0.280989	+	1.60050i
$16$		0			0
$17$			1.69563e6i			1.19423i	0.802157	+	0.597113i	$0.203686\pi$
$17$			1.69563e6i			1.19423i	−0.802157	+	0.597113i	$0.796314\pi$
$18$		0			0
$19$			3.65226e6i			1.47501i	0.675344	+	0.737503i	$0.263995\pi$
$19$			3.65226e6i			1.47501i	−0.675344	+	0.737503i	$0.736005\pi$
$20$		0			0
$21$	−1.18119e7			−2.89218
$22$		0			0
$23$	1.00168e7			1.55628			0.778142	−	0.628089i	$-0.216163\pi$
$23$	1.00168e7			1.55628			0.778142	+	0.628089i	$0.216163\pi$
$24$		0			0
$25$	−9.18163e6	−	3.32643e6i	−0.940199	−	0.340626i
$26$		0			0
$27$	−1.49360e7			−1.04092
$28$		0			0
$29$	−6.03662e6			−0.294309			−0.147155	−	0.989113i	$-0.547012\pi$
$29$	−6.03662e6			−0.294309			−0.147155	+	0.989113i	$0.547012\pi$
$30$		0			0
$31$			1.91238e7i			0.667982i	0.942576	+	0.333991i	$0.108395\pi$
$31$			1.91238e7i			0.667982i	−0.942576	+	0.333991i	$0.891605\pi$
$32$		0			0
$33$			4.17942e7i			1.06794i
$34$		0			0
$35$	1.61643e7	−	9.20713e7i	0.307763	−	1.75301i
$36$		0			0
$37$		−	5.62702e7i		−	0.811465i	−0.913992	−	0.405732i	$-0.867016\pi$
$37$		−	5.62702e7i		−	0.811465i	0.913992	−	0.405732i	$-0.132984\pi$
$38$		0			0
$39$			1.40704e8i			1.55950i
$40$		0			0
$41$	2.78531e6			0.0240411			0.0120205	−	0.999928i	$-0.496174\pi$
$41$	2.78531e6			0.0240411			0.0120205	+	0.999928i	$0.496174\pi$
$42$		0			0
$43$	1.65546e8			1.12610			0.563050	−	0.826423i	$-0.309628\pi$
$43$	1.65546e8			1.12610			0.563050	+	0.826423i	$0.309628\pi$
$44$		0			0
$45$	5.23477e7	−	2.98171e8i	0.283684	−	1.61586i
$46$		0			0
$47$	1.89866e8			0.827860			0.413930	−	0.910309i	$-0.364156\pi$
$47$	1.89866e8			0.827860			0.413930	+	0.910309i	$0.364156\pi$
$48$		0			0
$49$	6.12337e8			2.16775
$50$		0			0
$51$		−	6.69555e8i		−	1.94060i
$52$		0			0
$53$			6.83741e8i			1.63498i	0.575943	+	0.817490i	$0.304635\pi$
$53$			6.83741e8i			1.63498i	−0.575943	+	0.817490i	$0.695365\pi$
$54$		0			0
$55$	−3.25776e8	−	5.71941e7i	−0.647300	−	0.113642i
$56$		0			0
$57$		−	1.44217e9i		−	2.39686i
$58$		0			0
$59$		−	2.98791e8i		−	0.417934i	−0.977923	−	0.208967i	$-0.932990\pi$
$59$		−	2.98791e8i		−	0.417934i	0.977923	−	0.208967i	$-0.0670101\pi$
$60$		0			0
$61$	−4.22796e7			−0.0500589			−0.0250295	−	0.999687i	$-0.507968\pi$
$61$	−4.22796e7			−0.0500589			−0.0250295	+	0.999687i	$0.507968\pi$
$62$		0			0
$63$	2.89783e9			2.91992
$64$		0			0
$65$	−1.09676e9	−	1.92549e8i	−0.945243	−	0.165949i
$66$		0			0
$67$	7.22294e8			0.534983			0.267491	−	0.963560i	$-0.413805\pi$
$67$	7.22294e8			0.534983			0.267491	+	0.963560i	$0.413805\pi$
$68$		0			0
$69$	−3.95533e9			−2.52893
$70$		0			0
$71$			3.22537e9i			1.78767i	0.448394	+	0.893836i	$0.351996\pi$
$71$			3.22537e9i			1.78767i	−0.448394	+	0.893836i	$0.648004\pi$
$72$		0			0
$73$		−	4.43270e8i		−	0.213823i	−0.994269	−	0.106911i	$-0.965904\pi$
$73$		−	4.43270e8i		−	0.213823i	0.994269	−	0.106911i	$-0.0340961\pi$
$74$		0			0
$75$	3.62556e9	+	1.31351e9i	1.52781	+	0.553512i
$76$		0			0
$77$		−	3.16612e9i		−	1.16970i
$78$		0			0
$79$		−	2.31113e9i		−	0.751085i	−0.926805	−	0.375542i	$-0.877456\pi$
$79$		−	2.31113e9i		−	0.751085i	0.926805	−	0.375542i	$-0.122544\pi$
$80$		0			0
$81$	1.77476e8			0.0508995
$82$		0			0
$83$	2.74762e9			0.697536			0.348768	−	0.937209i	$-0.386600\pi$
$83$	2.74762e9			0.697536			0.348768	+	0.937209i	$0.386600\pi$
$84$		0			0
$85$	5.21902e9	+	9.16265e8i	1.17624	+	0.206503i
$86$		0			0
$87$	2.38369e9			0.478248
$88$		0			0
$89$	3.11807e9			0.558387			0.279194	−	0.960235i	$-0.409933\pi$
$89$	3.11807e9			0.558387			0.279194	+	0.960235i	$0.409933\pi$
$90$		0			0
$91$		−	1.06590e10i		−	1.70809i
$92$		0			0
$93$		−	7.55141e9i		−	1.08546i
$94$		0			0
$95$	1.12414e10	+	1.97357e9i	1.45279	+	0.255055i
$96$		0			0
$97$		−	1.58875e10i		−	1.85011i	−0.379830	−	0.925056i	$-0.624017\pi$
$97$		−	1.58875e10i		−	1.85011i	0.379830	−	0.925056i	$-0.375983\pi$
$98$		0			0
$99$		−	1.02534e10i		−	1.07818i

Currently showing only $a_p$; display all $a_n$ Currently showing all $a_n$; display only $a_p$

Twists

By twisting character
Char	Parity	Ord	Type	Twist	Min	Dim
1.1	even	1	trivial	80.11.h.c.79.3	✓	20
4.3	odd	2	inner	80.11.h.c.79.17	yes	20
5.4	even	2	inner	80.11.h.c.79.18	yes	20
20.19	odd	2	inner	80.11.h.c.79.4	yes	20

By twisted newform
Twist	Min	Dim	Char	Parity	Ord	Type
80.11.h.c.79.3	✓	20	1.1	even	1	trivial
80.11.h.c.79.4	yes	20	20.19	odd	2	inner
80.11.h.c.79.17	yes	20	4.3	odd	2	inner
80.11.h.c.79.18	yes	20	5.4	even	2	inner

Overview	Random
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Classical	Maass
Hilbert	Bianchi

Elliptic curves over $\Q$
Elliptic curves over $\Q(\alpha)$
Genus 2 curves over $\Q$
Higher genus families
Abelian varieties over $\F_{q}$
Belyi maps

Level:	\( N \)	\(=\)	\( 80 = 2^{4} \cdot 5 \)
Weight:	\( k \)	\(=\)	\( 11 \)
Character orbit:	\([\chi]\)	\(=\)	80.h (of order \(2\), degree \(1\), minimal)

\(f(q)\)	\(=\)	\(q-394.871 q^{3} +(540.369 - 3077.93i) q^{5} +29913.4 q^{7} +96874.0 q^{9} -105843. i q^{11} -356330. i q^{13} +(-213376. + 1.21538e6i) q^{15} +1.69563e6i q^{17} +3.65226e6i q^{19} -1.18119e7 q^{21} +1.00168e7 q^{23} +(-9.18163e6 - 3.32643e6i) q^{25} -1.49360e7 q^{27} -6.03662e6 q^{29} +1.91238e7i q^{31} +4.17942e7i q^{33} +(1.61643e7 - 9.20713e7i) q^{35} -5.62702e7i q^{37} +1.40704e8i q^{39} +2.78531e6 q^{41} +1.65546e8 q^{43} +(5.23477e7 - 2.98171e8i) q^{45} +1.89866e8 q^{47} +6.12337e8 q^{49} -6.69555e8i q^{51} +6.83741e8i q^{53} +(-3.25776e8 - 5.71941e7i) q^{55} -1.44217e9i q^{57} -2.98791e8i q^{59} -4.22796e7 q^{61} +2.89783e9 q^{63} +(-1.09676e9 - 1.92549e8i) q^{65} +7.22294e8 q^{67} -3.95533e9 q^{69} +3.22537e9i q^{71} -4.43270e8i q^{73} +(3.62556e9 + 1.31351e9i) q^{75} -3.16612e9i q^{77} -2.31113e9i q^{79} +1.77476e8 q^{81} +2.74762e9 q^{83} +(5.21902e9 + 9.16265e8i) q^{85} +2.38369e9 q^{87} +3.11807e9 q^{89} -1.06590e10i q^{91} -7.55141e9i q^{93} +(1.12414e10 + 1.97357e9i) q^{95} -1.58875e10i q^{97} -1.02534e10i q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 20 q - 8644 q^{5} + 531980 q^{9} - 9918720 q^{21} - 27949132 q^{25} + 72610760 q^{29} - 22549160 q^{41} - 376019996 q^{45} + 1955095660 q^{49} + 1108414520 q^{61} + 1858963008 q^{65} - 3380864640 q^{69}+ \cdots - 5262787480 q^{89}+O(q^{100}) \) 20 * q - 8644 * q^5 + 531980 * q^9 - 9918720 * q^21 - 27949132 * q^25 + 72610760 * q^29 - 22549160 * q^41 - 376019996 * q^45 + 1955095660 * q^49 + 1108414520 * q^61 + 1858963008 * q^65 - 3380864640 * q^69 + 18825762580 * q^81 + 19740011904 * q^85 - 5262787480 * q^89

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