Embedded newform 26.3.f.a.11.1

• Label: 26.3.f.a.11.1
• Level: $26$
• Weight: $3$
• Character: 26.11
• Analytic conductor: $0.708$
• Analytic rank: $0$
• Dimension: $4$
• Inner twists: $2$

Newspace parameters

Level:	\( N \)	\(=\)	\( 26 = 2 \cdot 13 \)
Weight:	\( k \)	\(=\)	\( 3 \)
Character orbit:	\([\chi]\)	\(=\)	26.f (of order \(12\), degree \(4\), minimal)

Newform invariants

Self dual:	no
Analytic conductor:	\(0.708448687337\)
Analytic rank:	\(0\)
Dimension:	\(4\)
Coefficient field:	\(\Q(\zeta_{12})\)
Defining polynomial:	\( x^{4} - x^{2} + 1 \)
Coefficient ring:	\(\Z[a_1, a_2, a_3]\)
Coefficient ring index:	\( 1 \)
Twist minimal:	yes
Sato-Tate group:	$\mathrm{SU}(2)[C_{12}]$

Embedding invariants

Embedding label			11.1
Root			\(-0.866025 - 0.500000i\) of defining polynomial
Character	\(\chi\)	\(=\)	26.11
Dual form			26.3.f.a.19.1

$q$-expansion

\(f(q)\)	\(=\)	\(q+(-0.366025 + 1.36603i) q^{2} +(0.866025 + 1.50000i) q^{3} +(-1.73205 - 1.00000i) q^{4} +(1.73205 + 1.73205i) q^{5} +(-2.36603 + 0.633975i) q^{6} +(-2.03590 - 7.59808i) q^{7} +(2.00000 - 2.00000i) q^{8} +(3.00000 - 5.19615i) q^{9} +(-3.00000 + 1.73205i) q^{10} +(-4.96410 - 1.33013i) q^{11} -3.46410i q^{12} +(-9.92820 + 8.39230i) q^{13} +11.1244 q^{14} +(-1.09808 + 4.09808i) q^{15} +(2.00000 + 3.46410i) q^{16} +(24.6962 + 14.2583i) q^{17} +(6.00000 + 6.00000i) q^{18} +(-24.8923 + 6.66987i) q^{19} +(-1.26795 - 4.73205i) q^{20} +(9.63397 - 9.63397i) q^{21} +(3.63397 - 6.29423i) q^{22} +(-15.1865 + 8.76795i) q^{23} +(4.73205 + 1.26795i) q^{24} -19.0000i q^{25} +(-7.83013 - 16.6340i) q^{26} +25.9808 q^{27} +(-4.07180 + 15.1962i) q^{28} +(0.356406 + 0.617314i) q^{29} +(-5.19615 - 3.00000i) q^{30} +(-23.3397 - 23.3397i) q^{31} +(-5.46410 + 1.46410i) q^{32} +(-2.30385 - 8.59808i) q^{33} +(-28.5167 + 28.5167i) q^{34} +(9.63397 - 16.6865i) q^{35} +(-10.3923 + 6.00000i) q^{36} +(21.2583 + 5.69615i) q^{37} -36.4449i q^{38} +(-21.1865 - 7.62436i) q^{39} +6.92820 q^{40} +(-11.2583 + 42.0167i) q^{41} +(9.63397 + 16.6865i) q^{42} +(63.7750 + 36.8205i) q^{43} +(7.26795 + 7.26795i) q^{44} +(14.1962 - 3.80385i) q^{45} +(-6.41858 - 23.9545i) q^{46} +(33.0000 - 33.0000i) q^{47} +(-3.46410 + 6.00000i) q^{48} +(-11.1506 + 6.43782i) q^{49} +(25.9545 + 6.95448i) q^{50} +49.3923i q^{51} +(25.5885 - 4.60770i) q^{52} -80.1051 q^{53} +(-9.50962 + 35.4904i) q^{54} +(-6.29423 - 10.9019i) q^{55} +(-19.2679 - 11.1244i) q^{56} +(-31.5622 - 31.5622i) q^{57} +(-0.973721 + 0.260908i) q^{58} +(10.1603 + 37.9186i) q^{59} +(6.00000 - 6.00000i) q^{60} +(14.3038 - 24.7750i) q^{61} +(40.4256 - 23.3397i) q^{62} +(-45.5885 - 12.2154i) q^{63} -8.00000i q^{64} +(-31.7321 - 2.66025i) q^{65} +12.5885 q^{66} +(12.8397 - 47.9186i) q^{67} +(-28.5167 - 49.3923i) q^{68} +(-26.3038 - 15.1865i) q^{69} +(19.2679 + 19.2679i) q^{70} +(7.03590 - 1.88526i) q^{71} +(-4.39230 - 16.3923i) q^{72} +(12.7654 - 12.7654i) q^{73} +(-15.5622 + 26.9545i) q^{74} +(28.5000 - 16.4545i) q^{75} +(49.7846 + 13.3397i) q^{76} +40.4256i q^{77} +(18.1699 - 26.1506i) q^{78} -14.3538 q^{79} +(-2.53590 + 9.46410i) q^{80} +(-4.50000 - 7.79423i) q^{81} +(-53.2750 - 30.7583i) q^{82} +(87.8372 + 87.8372i) q^{83} +(-26.3205 + 7.05256i) q^{84} +(18.0788 + 67.4711i) q^{85} +(-73.6410 + 73.6410i) q^{86} +(-0.617314 + 1.06922i) q^{87} +(-12.5885 + 7.26795i) q^{88} +(-52.2391 - 13.9974i) q^{89} +20.7846i q^{90} +(83.9782 + 58.3494i) q^{91} +35.0718 q^{92} +(14.7968 - 55.2224i) q^{93} +(33.0000 + 57.1577i) q^{94} +(-54.6673 - 31.5622i) q^{95} +(-6.92820 - 6.92820i) q^{96} +(131.488 - 35.2321i) q^{97} +(-4.71281 - 17.5885i) q^{98} +(-21.8038 + 21.8038i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\)	\(=\)	4 * q + 2 * q^2 - 6 * q^6 - 22 * q^7 + 8 * q^8 + 12 * q^9 - 12 * q^10 - 6 * q^11 - 12 * q^13 - 4 * q^14 + 6 * q^15 + 8 * q^16 + 78 * q^17 + 24 * q^18 - 58 * q^19 - 12 * q^20 + 42 * q^21 + 18 * q^22 + 12 * q^23 + 12 * q^24 - 14 * q^26 - 44 * q^28 - 54 * q^29 - 128 * q^31 - 8 * q^32 - 30 * q^33 - 24 * q^34 + 42 * q^35 + 40 * q^37 - 12 * q^39 + 42 * q^42 + 120 * q^43 + 36 * q^44 + 36 * q^45 + 54 * q^46 + 132 * q^47 + 42 * q^49 + 38 * q^50 + 40 * q^52 - 168 * q^53 - 90 * q^54 + 6 * q^55 - 84 * q^56 - 102 * q^57 - 42 * q^58 + 6 * q^59 + 24 * q^60 + 78 * q^61 - 60 * q^62 - 120 * q^63 - 120 * q^65 - 12 * q^66 + 86 * q^67 - 24 * q^68 - 126 * q^69 + 84 * q^70 + 42 * q^71 + 24 * q^72 - 136 * q^73 - 38 * q^74 + 114 * q^75 + 116 * q^76 + 90 * q^78 + 192 * q^79 - 24 * q^80 - 18 * q^81 - 78 * q^82 + 192 * q^83 - 36 * q^84 - 42 * q^85 - 156 * q^86 - 96 * q^87 + 12 * q^88 - 60 * q^89 + 38 * q^91 + 168 * q^92 + 222 * q^93 + 132 * q^94 - 42 * q^95 + 280 * q^97 + 92 * q^98 - 108 * q^99

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/26\mathbb{Z}\right)^\times\).

\(n\)	\(15\)
\(\chi(n)\)	\(e\left(\frac{7}{12}\right)\)

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)

\(p\)	\(a_p\)			\(a_p / p^{(k-1)/2}\)			\( \alpha_p\)			\( \theta_p \)
\(2\)	−0.366025	+	1.36603i	−0.183013	+	0.683013i
							\(3\)	0.866025	+	1.50000i	0.288675	+	0.500000i	0.973494	−	0.228714i	\(-0.0734519\pi\)
−0.684819	+	0.728714i	\(0.740119\pi\)
\(5\)	1.73205	+	1.73205i	0.346410	+	0.346410i	0.858771	−	0.512360i	\(-0.171229\pi\)
							−0.512360	+	0.858771i	\(0.671229\pi\)
\(7\)	−2.03590	−	7.59808i	−0.290843	−	1.08544i	−0.944463	−	0.328617i	\(-0.893417\pi\)
							0.653621	−	0.756822i	\(-0.273249\pi\)
\(11\)	−4.96410	−	1.33013i	−0.451282	−	0.120921i	0.0260172	−	0.999661i	\(-0.491718\pi\)
							−0.477299	+	0.878741i	\(0.658384\pi\)
\(13\)	−9.92820	+	8.39230i	−0.763708	+	0.645562i
							\(17\)	24.6962	+	14.2583i	1.45271	+	0.838725i	0.998635	−	0.0522356i	\(-0.0166347\pi\)
0.454080	+	0.890961i	\(0.349968\pi\)
\(19\)	−24.8923	+	6.66987i	−1.31012	+	0.351046i	−0.845268	−	0.534342i	\(-0.820559\pi\)
							−0.464853	+	0.885388i	\(0.653893\pi\)
\(23\)	−15.1865	+	8.76795i	−0.660284	+	0.381215i	−0.792385	−	0.610021i	\(-0.791161\pi\)
							0.132101	+	0.991236i	\(0.457828\pi\)
\(29\)	0.356406	+	0.617314i	0.0122899	+	0.0212867i	0.872105	−	0.489319i	\(-0.162755\pi\)
							−0.859815	+	0.510606i	\(0.829421\pi\)
\(31\)	−23.3397	−	23.3397i	−0.752895	−	0.752895i	0.222124	−	0.975019i	\(-0.428701\pi\)
							−0.975019	+	0.222124i	\(0.928701\pi\)
\(37\)	21.2583	+	5.69615i	0.574549	+	0.153950i	0.534382	−	0.845243i	\(-0.320544\pi\)
							0.0401672	+	0.999193i	\(0.487211\pi\)
\(41\)	−11.2583	+	42.0167i	−0.274593	+	1.02480i	0.681520	+	0.731800i	\(0.261319\pi\)
							−0.956113	+	0.292997i	\(0.905347\pi\)
\(43\)	63.7750	+	36.8205i	1.48314	+	0.856291i	0.999817	−	0.0191514i	\(-0.00609644\pi\)
							0.483323	+	0.875442i	\(0.339430\pi\)
\(47\)	33.0000	−	33.0000i	0.702128	−	0.702128i	−0.262739	−	0.964867i	\(-0.584626\pi\)
							0.964867	+	0.262739i	\(0.0846259\pi\)

(See \(a_n\) instead)

Twists

By twisting character
Char	Parity	Ord	Type	Twist	Min	Dim
1.1	even	1	trivial	26.3.f.a.11.1	✓	4
3.2	odd	2		234.3.bb.b.37.1		4
4.3	odd	2		208.3.bd.c.193.1		4
13.2	odd	12		338.3.d.d.239.1		4
13.3	even	3		338.3.d.d.99.1		4
13.4	even	6		338.3.f.c.319.1		4
13.5	odd	4		338.3.f.f.249.1		4
13.6	odd	12	inner	26.3.f.a.19.1	yes	4
13.7	odd	12		338.3.f.d.19.1		4
13.8	odd	4		338.3.f.c.249.1		4
13.9	even	3		338.3.f.f.319.1		4
13.10	even	6		338.3.d.e.99.1		4
13.11	odd	12		338.3.d.e.239.1		4
13.12	even	2		338.3.f.d.89.1		4
39.32	even	12		234.3.bb.b.19.1		4
52.19	even	12		208.3.bd.c.97.1		4

    

By twisted newform
Twist	Min	Dim	Char	Parity	Ord	Type
26.3.f.a.11.1	✓	4	1.1	even	1	trivial
26.3.f.a.19.1	yes	4	13.6	odd	12	inner
208.3.bd.c.97.1		4	52.19	even	12
208.3.bd.c.193.1		4	4.3	odd	2
234.3.bb.b.19.1		4	39.32	even	12
234.3.bb.b.37.1		4	3.2	odd	2
338.3.d.d.99.1		4	13.3	even	3
338.3.d.d.239.1		4	13.2	odd	12
338.3.d.e.99.1		4	13.10	even	6
338.3.d.e.239.1		4	13.11	odd	12
338.3.f.c.249.1		4	13.8	odd	4
338.3.f.c.319.1		4	13.4	even	6
338.3.f.d.19.1		4	13.7	odd	12
338.3.f.d.89.1		4	13.12	even	2
338.3.f.f.249.1		4	13.5	odd	4
338.3.f.f.319.1		4	13.9	even	3