Embedded newform 666.2.bs.a.17.5

• Label: 666.2.bs.a.17.5
• Level: $666$
• Weight: $2$
• Character: 666.17
• Analytic conductor: $5.318$
• Analytic rank: $0$
• Dimension: $72$
• CM: no
• Inner twists: $4$

Newspace parameters

Level:	\( N \)	\(=\)	\( 666 = 2 \cdot 3^{2} \cdot 37 \)
Weight:	\( k \)	\(=\)	\( 2 \)
Character orbit:	\([\chi]\)	\(=\)	666.bs (of order \(36\), degree \(12\), minimal)

Newform invariants

Self dual:	no
Analytic conductor:	\(5.31803677462\)
Analytic rank:	\(0\)
Dimension:	\(72\)
Relative dimension:	\(6\) over \(\Q(\zeta_{36})\)
Twist minimal:	yes
Sato-Tate group:	$\mathrm{SU}(2)[C_{36}]$

Embedding invariants

Embedding label			17.5
Character	\(\chi\)	\(=\)	666.17
Dual form			666.2.bs.a.431.5

$q$-expansion

\(f(q)\)	\(=\)	\(q+(0.573576 - 0.819152i) q^{2} +(-0.342020 - 0.939693i) q^{4} +(0.718088 - 0.0628246i) q^{5} +(-2.07081 - 1.73762i) q^{7} +(-0.965926 - 0.258819i) q^{8} +O(q^{10})\)
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 72 q+O(q^{10}) \)

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/666\mathbb{Z}\right)^\times\).

\(n\)	\(371\)	\(631\)
\(\chi(n)\)	\(-1\)	\(e\left(\frac{7}{36}\right)\)

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)

\(p\)	\(a_p\)			\(a_p / p^{(k-1)/2}\)			\( \alpha_p\)			\( \theta_p \)
\(2\)	0.573576	−	0.819152i	0.405580	−	0.579228i
							\(3\)		0			0
\(5\)	0.718088	−	0.0628246i	0.321139	−	0.0280960i								0.0745532	−	0.997217i	\(-0.476247\pi\)
							0.246586	+	0.969121i	\(0.420691\pi\)
\(7\)	−2.07081	−	1.73762i	−0.782692	−	0.656757i	0.161233	−	0.986916i	\(-0.448453\pi\)
							−0.943925	+	0.330160i	\(0.892897\pi\)
\(11\)	−2.14666	−	3.71813i	−0.647243	−	1.12106i	−0.983779	−	0.179387i	\(-0.942589\pi\)
							0.336536	−	0.941671i	\(-0.390745\pi\)
\(13\)	0.0350998	+	0.0163673i	0.00973493	+	0.00453947i	0.427480	−	0.904025i	\(-0.359402\pi\)
							−0.417745	+	0.908564i	\(0.637179\pi\)
\(17\)	1.26227	−	0.588607i	0.306146	−	0.142758i	−0.263474	−	0.964667i	\(-0.584868\pi\)
							0.569620	+	0.821908i	\(0.307090\pi\)
\(19\)	−1.15999	+	0.812232i	−0.266119	+	0.186339i	−0.699018	−	0.715104i	\(-0.746380\pi\)
							0.432899	+	0.901442i	\(0.357491\pi\)
\(23\)	−1.21793	−	4.54537i	−0.253955	−	0.947775i	−0.968669	−	0.248357i	\(-0.920109\pi\)
							0.714713	−	0.699418i	\(-0.246557\pi\)
\(29\)	2.18568	−	8.15709i	0.405871	−	1.51473i	−0.396571	−	0.918004i	\(-0.629800\pi\)
							0.802443	−	0.596729i	\(-0.203533\pi\)
\(31\)	−3.19999	+	3.19999i	−0.574735	+	0.574735i	−0.933448	−	0.358713i	\(-0.883216\pi\)
							0.358713	+	0.933448i	\(0.383216\pi\)
\(37\)	6.02223	+	0.856003i	0.990049	+	0.140726i
							\(41\)	8.42883	−	3.06784i	1.31636	−	0.479117i	0.414071	−	0.910244i	\(-0.364106\pi\)
0.902291	+	0.431128i	\(0.141884\pi\)
\(43\)	−0.673546	−	0.673546i	−0.102715	−	0.102715i	0.653882	−	0.756597i	\(-0.273139\pi\)
							−0.756597	+	0.653882i	\(0.773139\pi\)
\(47\)	−2.04440	−	1.18033i	−0.298206	−	0.172169i	0.343431	−	0.939178i	\(-0.388411\pi\)
							−0.641637	+	0.767009i	\(0.721744\pi\)