Embedded newform 59.7.b.c.58.14

• Label: 59.7.b.c.58.14
• Level: $59$
• Weight: $7$
• Character: 59.58
• Analytic conductor: $13.573$
• Analytic rank: $0$
• Dimension: $26$
• Inner twists: $2$

Newspace parameters

Level:	$N$	$=$	$59$
Weight:	$k$	$=$	$7$
Character orbit:	$[\chi]$	$=$	59.b (of order $2$, degree $1$, minimal)

Newform invariants

Self dual:	no
Analytic conductor:	$13.5731909336$
Analytic rank:	$0$
Dimension:	$26$
Twist minimal:	yes
Sato-Tate group:	$\mathrm{SU}(2)[C_{2}]$

Embedding invariants

Embedding label			58.14
Character	$\chi$	$=$	59.58
Dual form			59.7.b.c.58.13

$q$-expansion

$f(q)$	$=$	$q+3.85246i q^{2} +13.0960 q^{3} +49.1585 q^{4} -100.422 q^{5} +50.4519i q^{6} -365.384 q^{7} +435.939i q^{8} -557.495 q^{9} -386.871i q^{10} -61.8507i q^{11} +643.780 q^{12} +4006.24i q^{13} -1407.63i q^{14} -1315.12 q^{15} +1466.71 q^{16} -670.367 q^{17} -2147.73i q^{18} -4252.09 q^{19} -4936.59 q^{20} -4785.07 q^{21} +238.277 q^{22} +6238.59i q^{23} +5709.06i q^{24} -5540.46 q^{25} -15433.9 q^{26} -16847.9 q^{27} -17961.8 q^{28} -741.535 q^{29} -5066.47i q^{30} -49303.7i q^{31} +33550.5i q^{32} -809.997i q^{33} -2582.56i q^{34} +36692.6 q^{35} -27405.6 q^{36} +58183.7i q^{37} -16381.0i q^{38} +52465.7i q^{39} -43777.8i q^{40} +67462.6 q^{41} -18434.3i q^{42} -40630.5i q^{43} -3040.49i q^{44} +55984.6 q^{45} -24033.9 q^{46} +19917.3i q^{47} +19208.0 q^{48} +15856.6 q^{49} -21344.4i q^{50} -8779.13 q^{51} +196941. i q^{52} +164402. q^{53} -64906.1i q^{54} +6211.16i q^{55} -159285. i q^{56} -55685.4 q^{57} -2856.73i q^{58} +(197780. + 55351.3i) q^{59} -64649.6 q^{60} -101054. i q^{61} +189941. q^{62} +203700. q^{63} -35382.9 q^{64} -402314. i q^{65} +3120.48 q^{66} +120981. i q^{67} -32954.3 q^{68} +81700.6i q^{69} +141357. i q^{70} +43899.5 q^{71} -243034. i q^{72} -49458.8i q^{73} -224150. q^{74} -72557.8 q^{75} -209026. q^{76} +22599.3i q^{77} -202122. q^{78} -658281. q^{79} -147289. q^{80} +185773. q^{81} +259897. i q^{82} +930063. i q^{83} -235227. q^{84} +67319.5 q^{85} +156528. q^{86} -9711.14 q^{87} +26963.1 q^{88} +383075. i q^{89} +215679. i q^{90} -1.46382e6i q^{91} +306680. i q^{92} -645682. i q^{93} -76730.8 q^{94} +427002. q^{95} +439378. i q^{96} -379358. i q^{97} +61087.1i q^{98} +34481.4i q^{99} +O(q^{100})$
$\operatorname{Tr}(f)(q)$	$=$	26 * q + 10 * q^3 - 1090 * q^4 + 142 * q^5 + 406 * q^7 + 5432 * q^9 - 1124 * q^12 + 14982 * q^15 + 12734 * q^16 - 9108 * q^17 + 3850 * q^19 - 46896 * q^20 - 49034 * q^21 + 11238 * q^22 + 18792 * q^25 - 64590 * q^26 + 3550 * q^27 - 45542 * q^28 - 31730 * q^29 + 163558 * q^35 - 325266 * q^36 + 91914 * q^41 + 736396 * q^45 + 287148 * q^46 + 479572 * q^48 - 462900 * q^49 + 329932 * q^51 + 8238 * q^53 - 187506 * q^57 + 326182 * q^59 - 970064 * q^60 + 630140 * q^62 + 630508 * q^63 - 1800262 * q^64 - 869200 * q^66 - 319586 * q^68 + 1763840 * q^71 - 2294090 * q^74 + 354736 * q^75 + 247144 * q^76 - 375064 * q^78 + 4702 * q^79 + 1920984 * q^80 - 2435946 * q^81 - 1007672 * q^84 + 864044 * q^85 + 5031110 * q^86 - 1519202 * q^87 + 725994 * q^88 + 2835768 * q^94 - 2396490 * q^95

Character values

We give the values of $\chi$ on generators for $\left(\mathbb{Z}/59\mathbb{Z}\right)^\times$.

$n$	$2$
$\chi(n)$	$-1$

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)

$p$	$a_p$			$a_p / p^{(k-1)/2}$			$\alpha_p$			$\theta_p$
$2$			3.85246i			0.481558i	0.970580	+	0.240779i	$0.0774029\pi$
							−0.970580	+	0.240779i	$0.922597\pi$
$3$	13.0960			0.485037			0.242519	−	0.970147i	$-0.422026\pi$
							0.242519	+	0.970147i	$0.422026\pi$
$5$	−100.422			−0.803375			−0.401687	−	0.915777i	$-0.631576\pi$
							−0.401687	+	0.915777i	$0.631576\pi$
$7$	−365.384			−1.06526			−0.532630	−	0.846348i	$-0.678796\pi$
							−0.532630	+	0.846348i	$0.678796\pi$
$11$		−	61.8507i		−	0.0464693i	−0.999730	−	0.0232347i	$-0.992604\pi$
							0.999730	−	0.0232347i	$-0.00739649\pi$
$13$			4006.24i			1.82350i	0.410742	+	0.911752i	$0.365270\pi$
							−0.410742	+	0.911752i	$0.634730\pi$
$17$	−670.367			−0.136448			−0.0682238	−	0.997670i	$-0.521733\pi$
							−0.0682238	+	0.997670i	$0.521733\pi$
$19$	−4252.09			−0.619928			−0.309964	−	0.950748i	$-0.600317\pi$
							−0.309964	+	0.950748i	$0.600317\pi$
$23$			6238.59i			0.512747i	0.966578	+	0.256373i	$0.0825277\pi$
							−0.966578	+	0.256373i	$0.917472\pi$
$29$	−741.535			−0.0304045			−0.0152022	−	0.999884i	$-0.504839\pi$
							−0.0152022	+	0.999884i	$0.504839\pi$
$31$		−	49303.7i		−	1.65499i	−0.561476	−	0.827493i	$-0.689766\pi$
							0.561476	−	0.827493i	$-0.310234\pi$
$37$			58183.7i			1.14867i	0.818620	+	0.574336i	$0.194740\pi$
							−0.818620	+	0.574336i	$0.805260\pi$
$41$	67462.6			0.978840			0.489420	−	0.872048i	$-0.337208\pi$
							0.489420	+	0.872048i	$0.337208\pi$
$43$		−	40630.5i		−	0.511031i	−0.966805	−	0.255515i	$-0.917755\pi$
							0.966805	−	0.255515i	$-0.0822451\pi$
$47$			19917.3i			0.191839i	0.995389	+	0.0959197i	$0.0305792\pi$
							−0.995389	+	0.0959197i	$0.969421\pi$

(See $a_n$ instead)

Twists

By twisting character
Char	Parity	Ord	Type	Twist	Min	Dim
1.1	even	1	trivial	59.7.b.c.58.14	yes	26
59.58	odd	2	inner	59.7.b.c.58.13	✓	26

    

By twisted newform
Twist	Min	Dim	Char	Parity	Ord	Type
59.7.b.c.58.13	✓	26	59.58	odd	2	inner
59.7.b.c.58.14	yes	26	1.1	even	1	trivial