Embedded newform 363.3.h.n.269.4

• Label: 363.3.h.n.269.4
• Level: $363$
• Weight: $3$
• Character: 363.269
• Analytic conductor: $9.891$
• Analytic rank: $0$
• Dimension: $16$
• Inner twists: $4$

Newspace parameters

Level:	\( N \)	\(=\)	\( 363 = 3 \cdot 11^{2} \)
Weight:	\( k \)	\(=\)	\( 3 \)
Character orbit:	\([\chi]\)	\(=\)	363.h (of order \(10\), degree \(4\), not minimal)

Newform invariants

Self dual:	no
Analytic conductor:	\(9.89103359628\)
Analytic rank:	\(0\)
Dimension:	\(16\)
Relative dimension:	\(4\) over \(\Q(\zeta_{10})\)
Coefficient field:	\(\mathbb{Q}[x]/(x^{16} - \cdots)\)
Defining polynomial:	\( x^{16} - 12x^{14} + 180x^{12} - 2562x^{10} + 25179x^{8} - 96398x^{6} + 239275x^{4} - 536393x^{2} + 1771561 \)
Coefficient ring:	\(\Z[a_1, a_2, a_3]\)
Coefficient ring index:	\( 1 \)
Twist minimal:	no (minimal twist has level 33)
Sato-Tate group:	$\mathrm{SU}(2)[C_{10}]$

Embedding invariants

Embedding label			269.4
Root			\(-2.10855 - 2.90217i\) of defining polynomial
Character	\(\chi\)	\(=\)	363.269
Dual form			363.3.h.n.251.4

$q$-expansion

\(f(q)\)	\(=\)	\(q+(3.41170 - 1.10853i) q^{2} +(1.50565 + 2.59480i) q^{3} +(7.17480 - 5.21280i) q^{4} +(-1.98428 - 0.644731i) q^{5} +(8.01326 + 7.18363i) q^{6} +(7.17034 - 5.20956i) q^{7} +(10.2655 - 14.1293i) q^{8} +(-4.46601 + 7.81376i) q^{9} -7.48447 q^{10} +(24.3290 + 10.7685i) q^{12} +(0.508273 + 1.56430i) q^{13} +(18.6881 - 25.7220i) q^{14} +(-1.31469 - 6.11955i) q^{15} +(8.39811 - 25.8467i) q^{16} +(-11.8154 - 3.83907i) q^{17} +(-6.57491 + 31.6089i) q^{18} +(8.54780 + 6.21034i) q^{19} +(-17.5977 + 5.71782i) q^{20} +(24.3138 + 10.7618i) q^{21} +20.3378i q^{23} +(52.1192 + 5.36321i) q^{24} +(-16.7037 - 12.1360i) q^{25} +(3.46815 + 4.77350i) q^{26} +(-26.9994 + 0.176408i) q^{27} +(24.2894 - 74.7550i) q^{28} +(6.82340 + 9.39161i) q^{29} +(-11.2690 - 19.4207i) q^{30} +(-7.22737 - 22.2436i) q^{31} -27.6317i q^{32} -44.5665 q^{34} +(-17.5867 + 5.71427i) q^{35} +(8.68881 + 79.3425i) q^{36} +(-5.86208 + 4.25905i) q^{37} +(36.0469 + 11.7123i) q^{38} +(-3.29377 + 3.67417i) q^{39} +(-29.4793 + 21.4180i) q^{40} +(-22.8512 + 31.4520i) q^{41} +(94.8813 + 9.76355i) q^{42} +15.8444 q^{43} +(13.8996 - 12.6253i) q^{45} +(22.5450 + 69.3864i) q^{46} +(26.6317 - 36.6554i) q^{47} +(79.7118 - 17.1248i) q^{48} +(9.13245 - 28.1068i) q^{49} +(-70.4413 - 22.8878i) q^{50} +(-7.82835 - 36.4391i) q^{51} +(11.8011 + 8.57403i) q^{52} +(-38.3428 + 12.4583i) q^{53} +(-91.9184 + 30.5315i) q^{54} -154.791i q^{56} +(-3.24458 + 31.5305i) q^{57} +(33.6903 + 24.4774i) q^{58} +(-66.5264 - 91.5657i) q^{59} +(-41.3326 - 37.0534i) q^{60} +(-23.9538 + 73.7222i) q^{61} +(-49.3152 - 67.8766i) q^{62} +(8.68341 + 79.2932i) q^{63} +(2.96194 + 9.11592i) q^{64} -3.43171i q^{65} +62.9082 q^{67} +(-104.786 + 34.0470i) q^{68} +(-52.7725 + 30.6217i) q^{69} +(-53.6662 + 38.9908i) q^{70} +(-9.71270 - 3.15585i) q^{71} +(64.5570 + 143.314i) q^{72} +(-60.3706 + 43.8618i) q^{73} +(-15.2784 + 21.0289i) q^{74} +(6.34041 - 61.6155i) q^{75} +93.7020 q^{76} +(-7.16445 + 16.1864i) q^{78} +(-26.6720 - 82.0879i) q^{79} +(-33.3284 + 45.8726i) q^{80} +(-41.1096 - 69.7926i) q^{81} +(-43.0961 + 132.636i) q^{82} +(-11.2304 - 3.64896i) q^{83} +(230.546 - 49.5291i) q^{84} +(20.9700 + 15.2356i) q^{85} +(54.0563 - 17.5639i) q^{86} +(-14.0957 + 31.8459i) q^{87} +74.5782i q^{89} +(33.4257 - 58.4818i) q^{90} +(11.7938 + 8.56870i) q^{91} +(106.017 + 145.919i) q^{92} +(46.8357 - 52.2447i) q^{93} +(50.2259 - 154.579i) q^{94} +(-12.9572 - 17.8341i) q^{95} +(71.6987 - 41.6037i) q^{96} +(-23.8462 - 73.3909i) q^{97} -106.016i q^{98} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\)	\(=\)	16 * q + 5 * q^3 + 18 * q^4 - 32 * q^6 + 34 * q^7 + 17 * q^9 + 12 * q^10 + 106 * q^12 + 2 * q^13 - 28 * q^15 + 102 * q^16 - 42 * q^18 - 66 * q^19 + 12 * q^21 + 74 * q^24 - 176 * q^25 - 55 * q^27 + 146 * q^28 - 110 * q^30 - 126 * q^31 - 132 * q^34 + 226 * q^36 - 230 * q^37 - 136 * q^39 - 226 * q^40 - 72 * q^42 + 156 * q^43 - 72 * q^45 - 308 * q^46 + 255 * q^48 + 170 * q^49 + 169 * q^51 + 224 * q^52 - 1046 * q^54 + 259 * q^57 + 184 * q^58 - 316 * q^60 - 104 * q^61 + 108 * q^63 - 184 * q^64 + 368 * q^67 - 22 * q^69 - 52 * q^70 - 73 * q^72 - 354 * q^73 + 54 * q^75 + 900 * q^76 - 492 * q^78 - 566 * q^79 + 377 * q^81 + 200 * q^82 + 720 * q^84 + 162 * q^85 - 132 * q^87 + 774 * q^90 - 226 * q^91 - 370 * q^93 + 530 * q^94 + 67 * q^96 + 252 * q^97

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/363\mathbb{Z}\right)^\times\).

\(n\)	\(122\)	\(244\)
\(\chi(n)\)	\(-1\)	\(e\left(\frac{2}{5}\right)\)

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)

\(p\)	\(a_p\)			\(a_p / p^{(k-1)/2}\)			\( \alpha_p\)			\( \theta_p \)
\(2\)	3.41170	−	1.10853i	1.70585	−	0.554264i	0.716217	−	0.697878i	\(-0.245872\pi\)
							0.989634	+	0.143614i	\(0.0458722\pi\)
\(3\)	1.50565	+	2.59480i	0.501885	+	0.864934i
							\(5\)	−1.98428	−	0.644731i	−0.396856	−	0.128946i	0.103789	−	0.994599i	\(-0.466903\pi\)
−0.500644	+	0.865653i	\(0.666903\pi\)
\(7\)	7.17034	−	5.20956i	1.02433	−	0.744222i	0.0571672	−	0.998365i	\(-0.481793\pi\)
							0.967167	+	0.254142i	\(0.0817932\pi\)
\(11\)		0			0
							\(13\)	0.508273	+	1.56430i	0.0390979	+	0.120331i	0.968700	−	0.248233i	\(-0.0798497\pi\)
−0.929603	+	0.368564i	\(0.879850\pi\)
\(17\)	−11.8154	−	3.83907i	−0.695026	−	0.225828i	−0.0598641	−	0.998207i	\(-0.519067\pi\)
							−0.635162	+	0.772379i	\(0.719067\pi\)
\(19\)	8.54780	+	6.21034i	0.449884	+	0.326860i	0.789550	−	0.613686i	\(-0.210314\pi\)
							−0.339666	+	0.940546i	\(0.610314\pi\)
\(23\)			20.3378i			0.884251i	0.896953	+	0.442126i	\(0.145775\pi\)
							−0.896953	+	0.442126i	\(0.854225\pi\)
\(29\)	6.82340	+	9.39161i	0.235290	+	0.323849i	0.910292	−	0.413967i	\(-0.135857\pi\)
							−0.675002	+	0.737816i	\(0.735857\pi\)
\(31\)	−7.22737	−	22.2436i	−0.233141	−	0.717534i	−0.997363	−	0.0725803i	\(-0.976877\pi\)
							0.764222	−	0.644954i	\(-0.223123\pi\)
\(37\)	−5.86208	+	4.25905i	−0.158435	+	0.115109i	−0.664178	−	0.747575i	\(-0.731218\pi\)
							0.505743	+	0.862684i	\(0.331218\pi\)
\(41\)	−22.8512	+	31.4520i	−0.557347	+	0.767122i	−0.990986	−	0.133964i	\(-0.957229\pi\)
							0.433639	+	0.901087i	\(0.357229\pi\)
\(43\)	15.8444			0.368474			0.184237	−	0.982882i	\(-0.441019\pi\)
							0.184237	+	0.982882i	\(0.441019\pi\)
\(47\)	26.6317	−	36.6554i	0.566633	−	0.779903i	−0.425518	−	0.904950i	\(-0.639908\pi\)
							0.992151	+	0.125047i	\(0.0399082\pi\)

(See \(a_n\) instead)

Twists

By twisting character
Char	Parity	Ord	Type	Twist	Min	Dim
1.1	even	1	trivial	363.3.h.n.269.4		16
3.2	odd	2	inner	363.3.h.n.269.1		16
11.2	odd	10		363.3.h.o.251.4		16
11.3	even	5		363.3.b.l.122.1		8
11.4	even	5		363.3.h.j.245.4		16
11.5	even	5		363.3.h.j.323.1		16
11.6	odd	10		33.3.h.b.26.4	yes	16
11.7	odd	10		33.3.h.b.14.1	✓	16
11.8	odd	10		363.3.b.m.122.8		8
11.9	even	5	inner	363.3.h.n.251.1		16
11.10	odd	2		363.3.h.o.269.1		16
33.2	even	10		363.3.h.o.251.1		16
33.5	odd	10		363.3.h.j.323.4		16
33.8	even	10		363.3.b.m.122.1		8
33.14	odd	10		363.3.b.l.122.8		8
33.17	even	10		33.3.h.b.26.1	yes	16
33.20	odd	10	inner	363.3.h.n.251.4		16
33.26	odd	10		363.3.h.j.245.1		16
33.29	even	10		33.3.h.b.14.4	yes	16
33.32	even	2		363.3.h.o.269.4		16

    

By twisted newform
Twist	Min	Dim	Char	Parity	Ord	Type
33.3.h.b.14.1	✓	16	11.7	odd	10
33.3.h.b.14.4	yes	16	33.29	even	10
33.3.h.b.26.1	yes	16	33.17	even	10
33.3.h.b.26.4	yes	16	11.6	odd	10
363.3.b.l.122.1		8	11.3	even	5
363.3.b.l.122.8		8	33.14	odd	10
363.3.b.m.122.1		8	33.8	even	10
363.3.b.m.122.8		8	11.8	odd	10
363.3.h.j.245.1		16	33.26	odd	10
363.3.h.j.245.4		16	11.4	even	5
363.3.h.j.323.1		16	11.5	even	5
363.3.h.j.323.4		16	33.5	odd	10
363.3.h.n.251.1		16	11.9	even	5	inner
363.3.h.n.251.4		16	33.20	odd	10	inner
363.3.h.n.269.1		16	3.2	odd	2	inner
363.3.h.n.269.4		16	1.1	even	1	trivial
363.3.h.o.251.1		16	33.2	even	10
363.3.h.o.251.4		16	11.2	odd	10
363.3.h.o.269.1		16	11.10	odd	2
363.3.h.o.269.4		16	33.32	even	2