Embedded newform 729.2.g.a.28.2

• Label: 729.2.g.a.28.2
• Level: $729$
• Weight: $2$
• Character: 729.28
• Analytic conductor: $5.821$
• Analytic rank: $0$
• Dimension: $144$
• CM: no
• Inner twists: $2$

Newspace parameters

Level:	\( N \)	\(=\)	\( 729 = 3^{6} \)
Weight:	\( k \)	\(=\)	\( 2 \)
Character orbit:	\([\chi]\)	\(=\)	729.g (of order \(27\), degree \(18\), not minimal)

Newform invariants

Self dual:	no
Analytic conductor:	\(5.82109430735\)
Analytic rank:	\(0\)
Dimension:	\(144\)
Relative dimension:	\(8\) over \(\Q(\zeta_{27})\)
Twist minimal:	no (minimal twist has level 81)
Sato-Tate group:	$\mathrm{SU}(2)[C_{27}]$

Embedding invariants

Embedding label			28.2
Character	\(\chi\)	\(=\)	729.28
Dual form			729.2.g.a.703.2

$q$-expansion

\(f(q)\)	\(=\)	\(q+(-1.97349 + 1.29799i) q^{2} +(1.41775 - 3.28671i) q^{4} +(-1.82524 + 1.93464i) q^{5} +(-4.56284 - 0.533319i) q^{7} +(0.647845 + 3.67411i) q^{8} +O(q^{10})\)
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 144 q - 9 q^{2} + 9 q^{4} - 9 q^{5} + 9 q^{7} + 18 q^{8}+O(q^{10}) \)

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/729\mathbb{Z}\right)^\times\).

\(n\)	\(2\)
\(\chi(n)\)	\(e\left(\frac{22}{27}\right)\)

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)

\(p\)	\(a_p\)			\(a_p / p^{(k-1)/2}\)			\( \alpha_p\)			\( \theta_p \)
\(2\)	−1.97349	+	1.29799i	−1.39547	+	0.917816i	−1.00000		0.000662916i	\(-0.999789\pi\)
							−0.395471	+	0.918478i	\(0.629419\pi\)
\(3\)		0			0
							\(5\)	−1.82524	+	1.93464i	−0.816273	+	0.865199i	−0.992884	−	0.119082i	\(-0.962005\pi\)
0.176611	+	0.984281i	\(0.443486\pi\)
\(7\)	−4.56284	−	0.533319i	−1.72459	−	0.201576i	−0.804682	−	0.593707i	\(-0.797664\pi\)
							−0.919909	+	0.392131i	\(0.871738\pi\)
\(11\)	0.138834	−	0.463739i	0.0418601	−	0.139822i	−0.934505	−	0.355950i	\(-0.884157\pi\)
							0.976365	+	0.216127i	\(0.0693426\pi\)
\(13\)	0.253222	−	4.34765i	0.0702311	−	1.20582i	−0.760571	−	0.649254i	\(-0.775081\pi\)
							0.830803	−	0.556567i	\(-0.187882\pi\)
\(17\)	−0.936739	+	0.340945i	−0.227193	+	0.0826914i	−0.453108	−	0.891456i	\(-0.649685\pi\)
							0.225916	+	0.974147i	\(0.427463\pi\)
\(19\)	0.818296	+	0.297835i	0.187730	+	0.0683281i	0.434175	−	0.900829i	\(-0.357040\pi\)
							−0.246445	+	0.969157i	\(0.579262\pi\)
\(23\)	−2.03881	+	0.238302i	−0.425121	+	0.0496895i	−0.325964	−	0.945382i	\(-0.605689\pi\)
							−0.0991571	+	0.995072i	\(0.531615\pi\)
\(29\)	−0.741930	−	0.372611i	−0.137773	−	0.0691922i	0.378577	−	0.925570i	\(-0.376413\pi\)
							−0.516350	+	0.856378i	\(0.672710\pi\)
\(31\)	2.39289	+	3.21420i	0.429775	+	0.577288i	0.963277	−	0.268511i	\(-0.0865316\pi\)
							−0.533502	+	0.845799i	\(0.679124\pi\)
\(37\)	0.840131	+	0.704953i	0.138117	+	0.115894i	0.709229	−	0.704979i	\(-0.249043\pi\)
							−0.571112	+	0.820872i	\(0.693488\pi\)
\(41\)	0.244464	+	0.160787i	0.0381789	+	0.0251106i	0.568455	−	0.822714i	\(-0.307541\pi\)
							−0.530276	+	0.847825i	\(0.677912\pi\)
\(43\)	10.9207	−	2.58825i	1.66539	−	0.394704i	0.713379	−	0.700779i	\(-0.247164\pi\)
							0.952007	+	0.306075i	\(0.0990158\pi\)
\(47\)	2.41144	−	3.23913i	0.351745	−	0.472475i	−0.590674	−	0.806910i	\(-0.701138\pi\)
							0.942419	+	0.334435i	\(0.108546\pi\)