Embedded newform 65.4.e.a.16.7

• Label: 65.4.e.a.16.7
• Level: $65$
• Weight: $4$
• Character: 65.16
• Analytic conductor: $3.835$
• Analytic rank: $0$
• Dimension: $14$
• CM: no
• Inner twists: $2$

Newspace parameters

Level:	\( N \)	\(=\)	\( 65 = 5 \cdot 13 \)
Weight:	\( k \)	\(=\)	\( 4 \)
Character orbit:	\([\chi]\)	\(=\)	65.e (of order \(3\), degree \(2\), minimal)

Newform invariants

Self dual:	no
Analytic conductor:	\(3.83512415037\)
Analytic rank:	\(0\)
Dimension:	\(14\)
Relative dimension:	\(7\) over \(\Q(\zeta_{3})\)
Coefficient field:	\(\mathbb{Q}[x]/(x^{14} - \cdots)\)
Defining polynomial:	x^14 - 2*x^13 + 45*x^12 - 52*x^11 + 1311*x^10 - 1336*x^9 + 20343*x^8 - 11166*x^7 + 216447*x^6 - 107836*x^5 + 1201133*x^4 + 4392*x^3 + 3890980*x^2 - 1936800*x + 1157776
Coefficient ring:	\(\Z[a_1, \ldots, a_{13}]\)
Coefficient ring index:	\( 2^{4}\cdot 3 \)
Twist minimal:	yes
Sato-Tate group:	$\mathrm{SU}(2)[C_{3}]$

Embedding invariants

Embedding label			16.7
Root			\(-2.26209 - 3.91806i\) of defining polynomial
Character	\(\chi\)	\(=\)	65.16
Dual form			65.4.e.a.61.7

$q$-expansion

\(f(q)\)	\(=\)	\(q+(2.26209 + 3.91806i) q^{2} +(0.652503 + 1.13017i) q^{3} +(-6.23413 + 10.7978i) q^{4} -5.00000 q^{5} +(-2.95204 + 5.11309i) q^{6} +(-11.9953 + 20.7765i) q^{7} -20.2152 q^{8} +(12.6485 - 21.9078i) q^{9} +O(q^{10})\)
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 14 q - 2 q^{2} + 4 q^{3} - 30 q^{4} - 70 q^{5} - 23 q^{6} - 7 q^{7} + 42 q^{8} - 87 q^{9}+O(q^{10}) \)

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/65\mathbb{Z}\right)^\times\).

\(n\)	\(27\)	\(41\)
\(\chi(n)\)	\(1\)	\(e\left(\frac{1}{3}\right)\)

Coefficient data

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

(See \(a_n\) instead)

\(p\)	\(a_p\)			\(a_p / p^{(k-1)/2}\)			\( \alpha_p\)			\( \theta_p \)
\(2\)	2.26209	+	3.91806i	0.799771	+	1.38524i	0.919765	+	0.392469i	\(0.128379\pi\)
							−0.119995	+	0.992775i	\(0.538288\pi\)
\(3\)	0.652503	+	1.13017i	0.125574	+	0.217501i	0.921957	−	0.387292i	\(-0.126589\pi\)
							−0.796383	+	0.604793i	\(0.793256\pi\)
\(5\)	−5.00000			−0.447214
							\(7\)	−11.9953	+	20.7765i	−0.647686	+	1.12183i	0.335988	+	0.941866i	\(0.390930\pi\)
−0.983674	+	0.179959i	\(0.942403\pi\)
\(11\)	29.3205	+	50.7846i	0.803678	+	1.39201i	0.917180	+	0.398473i	\(0.130460\pi\)
							−0.113502	+	0.993538i	\(0.536207\pi\)
\(13\)	17.8486	−	43.3408i	0.380794	−	0.924660i
							\(17\)	60.0480	−	104.006i	0.856693	−	1.48384i	−0.0183718	−	0.999831i	\(-0.505848\pi\)
0.875065	−	0.484005i	\(-0.160818\pi\)
\(19\)	−27.3664	+	47.3999i	−0.330436	+	0.572331i	−0.982597	−	0.185749i	\(-0.940529\pi\)
							0.652162	+	0.758080i	\(0.273862\pi\)
\(23\)	−36.1994	−	62.6992i	−0.328178	−	0.568421i	0.653972	−	0.756519i	\(-0.273101\pi\)
							−0.982150	+	0.188097i	\(0.939768\pi\)
\(29\)	85.9073	+	148.796i	0.550089	+	0.952783i	0.998268	+	0.0588385i	\(0.0187397\pi\)
							−0.448178	+	0.893944i	\(0.647927\pi\)
\(31\)	33.9594			0.196751			0.0983756	−	0.995149i	\(-0.468635\pi\)
							0.0983756	+	0.995149i	\(0.468635\pi\)
\(37\)	−15.0648	−	26.0931i	−0.0669364	−	0.115937i	0.830615	−	0.556847i	\(-0.187989\pi\)
							−0.897551	+	0.440910i	\(0.854656\pi\)
\(41\)	−168.452	−	291.767i	−0.641651	−	1.11137i	−0.985064	−	0.172188i	\(-0.944916\pi\)
							0.343413	−	0.939185i	\(-0.388417\pi\)
\(43\)	187.918	−	325.483i	0.666447	−	1.15432i	−0.312444	−	0.949936i	\(-0.601148\pi\)
							0.978891	−	0.204384i	\(-0.0655191\pi\)
\(47\)	−521.206			−1.61757			−0.808783	−	0.588107i	\(-0.799874\pi\)
							−0.808783	+	0.588107i	\(0.799874\pi\)

(See \(a_n\) instead)

Twists

By twisting character
Char	Parity	Ord	Type	Twist	Min	Dim
1.1	even	1	trivial	65.4.e.a.16.7	✓	14
13.3	even	3		845.4.a.k.1.1		7
13.9	even	3	inner	65.4.e.a.61.7	yes	14
13.10	even	6		845.4.a.h.1.7		7

    

By twisted newform
Twist	Min	Dim	Char	Parity	Ord	Type
65.4.e.a.16.7	✓	14	1.1	even	1	trivial
65.4.e.a.61.7	yes	14	13.9	even	3	inner
845.4.a.h.1.7		7	13.10	even	6
845.4.a.k.1.1		7	13.3	even	3