LMFDB - Newform orbit 592.2.bq.d

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms

[N,k,chi] = [592,2,Mod(65,592)]

mf = mfinit([N,k,chi],0)

lf = mfeigenbasis(mf)

from sage.modular.dirichlet import DirichletCharacter

H = DirichletGroup(592, base_ring=CyclotomicField(18))

chi = DirichletCharacter(H, H._module([0, 0, 17]))

N = Newforms(chi, 2, names="a")

//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code

chi := DirichletCharacter("592.65");

S:= CuspForms(chi, 2);

N := Newforms(S);

Level:	$ N $	$=$	$ 592 = 2^{4} \cdot 37 $
Weight:	$ k $	$=$	$ 2 $
Character orbit:	$[\chi]$	$=$	592.bq (of order $18$, degree $6$, not minimal)

Newform invariants

comment: select newform

sage: f = N[0] # Warning: the index may be different

gp: f = lf[1] \\ Warning: the index may be different

Self dual:	no
Analytic conductor:	$4.72714379966$
Analytic rank:	$0$
Dimension:	$18$
Relative dimension:	$3$ over $\Q(\zeta_{18})$
Coefficient field:	$\mathbb{Q}[x]/(x^{18} + \cdots)$
comment: defining polynomial gp: f.mod \\ as an extension of the character field
Defining polynomial:	$ x^{18} + 30x^{16} + 333x^{14} + 1826x^{12} + 5490x^{10} + 9432x^{8} + 9385x^{6} + 5316x^{4} + 1584x^{2} + 192 $ x^18 + 30x^16 + 333x^14 + 1826x^12 + 5490x^10 + 9432x^8 + 9385x^6 + 5316x^4 + 1584x^2 + 192
Coefficient ring:	$\Z[a_1, \ldots, a_{5}]$
Coefficient ring index:	$ 1 $
Twist minimal:	no (minimal twist has level 37)
Sato-Tate group:	$\mathrm{SU}(2)[C_{18}]$

$q$-expansion

comment: q-expansion

sage: f.q_expansion() # note that sage often uses an isomorphic number field

gp: mfcoefs(f, 20)

Coefficients of the $q$-expansion are expressed in terms of a basis $1,\beta_1,\ldots,\beta_{17}$ for the coefficient ring described below. We also show the integral $q$-expansion of the trace form.

$f(q)$	$=$	$ q + ( - \beta_{16} + \beta_{12} + 1) q^{3} + ( - \beta_{17} - \beta_{16} + \beta_{13} + \cdots - 1) q^{5}+ \cdots + (\beta_{17} + \beta_{14} - \beta_{13} + \cdots + 1) q^{9}+O(q^{10}) $ q + (-b16 + b12 + 1) * q^3 + (-b17 - b16 + b13 - b9 + b7 + b6 - b5 - b4 - b3 - 1) * q^5 + (-b15 - b12 - b9 + b8 + b2 - b1) * q^7 + (b17 + b14 - b13 + 2b12 - b11 - b10 + b9 - b7 - 2b6 + b4 - b2 + 1) * q^9	$ q + ( - \beta_{16} + \beta_{12} + 1) q^{3} + ( - \beta_{17} - \beta_{16} + \beta_{13} + \cdots - 1) q^{5}+ \cdots + (2 \beta_{17} - \beta_{16} + \beta_{15} + \cdots - 1) q^{99}+O(q^{100}) $ q + (-b16 + b12 + 1) * q^3 + (-b17 - b16 + b13 - b9 + b7 + b6 - b5 - b4 - b3 - 1) * q^5 + (-b15 - b12 - b9 + b8 + b2 - b1) * q^7 + (b17 + b14 - b13 + 2b12 - b11 - b10 + b9 - b7 - 2b6 + b4 - b2 + 1) * q^9 + (-b12 - b10 - b8 - b7 - b6 - b5) * q^11 + (b11 + b10 + b8 - 2b7 + b4 + b2 - b1) q^13 + (b17 - b16 + b15 + b14 + 2b12 - b11 + b8 - b7 + b6 - 2b5 - b3 - b2 + b1 - 1) * q^15 + (-b15 - b13 + b12 + b11 - b9 - b6 - b4 - b3 - 1) * q^17 + (-b17 - b16 - b14 + 2b13 + b11 + 2b10 - b9 + b7 + 4b6 + b5 - 2b4 - 2b3 + b2 - b1 - 3) q^19 + (-b17 - b16 - b15 - b14 + 3b13 - b12 - b11 - 2b9 + b8 + b7 + b6 - b5 - b1 - 2) * q^21 + (b16 - b13 + b12 - b10 + b8 - 2b6 + 2b4 - b3 - b2 + b1 + 1) * q^23 + (b17 - b16 + b15 - b7 + b6 + b1 + 1) * q^25 + (b16 + b14 - b13 + 3b12 - 2b11 + b9 - b8 - 2b7 - 4b6 + 4b5 - b3 - b2 - b1 + 1) q^27 + (b17 + b15 - b14 + b13 + b12 + b11 + b6 + b5 - b4 - b3 + b1 - 3) * q^29 + (-b17 + b16 + b13 + 2b12 + 2b11 + b10 + b8 - b7 - b6 - 2b5 + b4 + b1 - 2) q^31 + (b17 + b16 + b15 - 2b13 + b10 + b9 - b8 - b7 + b6 + 2b5 - 2b3 + b2) q^33 + (2b13 - 2b9 + 4b7 + 2b5 - 2b4) q^35 + (-2b17 - 2b15 - b14 + b12 - 3b11 - b10 - b9 + 2b8 + 2b7 - 2b6 + b5 - b4 - b2 + 1) * q^37 + (-b17 - b16 - b15 - 2b14 + b13 + b12 - b11 - b10 - b9 + b7 - b6 - 2b5 + b4 + b3 - b2 - b1 + 1) * q^39 + (b17 + b16 + 2b15 + b14 - b13 + b12 + 3b11 + b9 - 2b8 - b7 - b6 + 2b5 + b2) * q^41 + (2b17 + b16 + b15 + 2b14 - 5b13 - b11 - 2b10 + 3b9 - 5b7 - 6b6 + 3b5 + b4 + 2b3 + 5) q^43 + (2b16 + 4b14 - 2b13 + 5b12 - 4b11 - b10 + 2b9 + b8 - 4b7 - 7b6 + 3b4 + b3 + b2 + 3) q^45 + (-b16 - 2b15 - 2b14 + b13 - b12 + 2b11 - 2b9 + b7 + 2b6 - 4b5 - 2b4 - 2b1 - 1) * q^47 + (b17 + 2b16 - 2b15 - 3b13 - b12 - 3b11 + b7 - 2b6 + b3 + b2 - 3b1 + 2) * q^49 + (2b17 + b16 + b15 + 2b14 - 2b13 + b11 + b10 - 2b7 - b6 - b5 - b4 + b1 - 6) * q^51 + (-b17 - b16 - b15 - b14 + b13 - 4b12 + b11 - b10 - 2b9 + b8 - 3b7 - 6b5 + 3b3 - 2b2 - 2b1 - 3) q^53 + (2b16 - 2b15 - 4b13 - b10 + b9 + 2b8 - 2b7 - 2b6 + 2b5 + b4 + b3 + 2b2 - 2b1 + 2) q^55 + (-b17 - 2b16 - b15 - b14 + 2b13 - b12 - 2b11 + 2b10 - 2b9 + 2b8 + b7 + 4b6 - b5 - 2b2 - b1 - 1) * q^57 + (-b16 + 4b15 + b14 + 2b13 + b11 + 4b10 - b8 - 2b7 + 5b6 - 2b3 + 2b2 - 3) q^59 + (-b14 + b13 + 3b12 + b10 - 3b8 + 2b7 - b6 + 2b5 - b4 - b2 + 3b1 + 3) q^61 + (-2b17 - b16 - 3b15 - 3b14 + 3b13 - 2b12 - 2b11 + b10 + b8 + 3b7 + 4b6 + 2b5 - b2 - b1 + 1) q^63 + (-2b12 + 2b11 - b10 + b8 - b6 + b5 - b4 - b2 + 1) * q^65 + (3b17 - b16 + b15 + 2b14 - b13 - 5b11 - 2b10 - 3b8 + 4b7 - 2b6 + 2b5 + b3 - 3b2 + 4b1 + 4) * q^67 + (-b17 - 2b16 - b15 - b14 + b13 - b12 + 3b11 - b9 - 2b8 + 4b7 + b6 - 2b4 - 2b3 + 2b2 - 2b1 - 2) * q^69 + (-2b17 + b16 + 2b14 + b12 - 2b11 - b10 + b9 - 4b7 - 2b5 + b4 - b3 + 1) q^71 + (4b17 + b16 + 3b15 + 3b14 - b13 - b12 + 5b11 + 3b9 + b8 - 4b7 + b5 + 3b4 - b3 + 2b2 + 2b1 - 4) q^73 + (-b16 + b15 + b14 + b13 + 4b12 - 4b11 - b10 + b9 + 2b7 - 3b6 - 2b5 + 2b4 + b3 + b1) * q^75 + (b17 - b16 - b14 + 4b12 + b11 + b10 + 3b9 + 2b7 + b6 + b3 - 3b2 + 3b1 + 1) q^77 + (b17 - b14 - b13 - 6b12 + 2b11 - 3b8 + b7 + 5b6 - 2b5 - 3b4 + 3b2 - 1) q^79 + (-2b17 + b16 - b14 + b12 - 2b11 + 2b10 + b9 - 2b8 + 2b7 + 4b6 + 3b5 + b4 - b3 - 2b2 + 2b1 - 1) q^81 + (-b15 - 2b14 + b13 - 2b12 + 3b11 - b10 - b9 + 2b7 + b5 - b4 + 2b3 - b2 + b1 + 2) q^83 + (2b17 + b16 + 2b15 + 2b14 - 3b13 - 2b11 - 2b10 + b9 - 2b8 + b7 - b6 + 2b5 - b4 + 2b3 + 2b2 - 2b1 + 4) q^85 + (-2b17 + 2b16 - 3b12 - 3b11 + 2b10 + 2b9 + b8 + 4b7 + 4b5 + 4b4 + 2b2 - b1 + 1) * q^87 + (-2b16 + 4b15 + 2b14 + 2b13 + 2b12 - 2b11 - 2b10 - 2b8 + b7 + 2b6 - 4b5 - 2b2 + 6b1 + 1) * q^89 + (-2b16 - b14 + b13 + 2b12 + b10 - b9 + b8 - 2b6 - b5 - b2 - 1) q^91 + (-2b17 - 2b14 - 3b12 + 4b11 + 2b8 - b7 + b6 - 3b5 + b4 + b2 + b1 + 2) * q^93 + (-b16 - b14 + 2b13 - 5b12 + b11 + b10 + b8 + b7 + 7b6 - 2b5 + 2b4 - b2 + b1 - 1) q^95 + (-6b17 - 2b16 - 3b15 - 2b14 + 5b13 - 5b12 - 2b11 - 2b10 - 4b9 + b7 + 3b6 - 5b5 - 2b4 + b2 - 4b1 - 1) q^97 + (2b17 - b16 + b15 - b13 - b12 + 5b11 - b10 - 2b8 - 2b7 + b6 + 2b5 - b4 + b3 + b2 + b1 - 1) q^99
$\operatorname{Tr}(f)(q)$	$=$	$ 18 q + 9 q^{3} - 3 q^{5} + 3 q^{7} - 3 q^{9}+O(q^{10}) $ 18 * q + 9 * q^3 - 3 * q^5 + 3 * q^7 - 3 * q^9	$ 18 q + 9 q^{3} - 3 q^{5} + 3 q^{7} - 3 q^{9} - 9 q^{11} + 9 q^{13} + 15 q^{15} - 15 q^{17} - 6 q^{19} - 12 q^{21} + 9 q^{23} + 21 q^{25} - 21 q^{27} - 18 q^{29} + 6 q^{33} + 12 q^{35} + 6 q^{37} + 6 q^{39} - 24 q^{41} + 36 q^{47} + 21 q^{49} - 81 q^{51} - 39 q^{53} - 12 q^{55} + 15 q^{57} + 6 q^{59} + 42 q^{61} + 27 q^{63} + 18 q^{65} - 36 q^{69} + 9 q^{71} - 54 q^{73} - 18 q^{75} + 33 q^{77} + 6 q^{79} - 45 q^{81} + 24 q^{83} + 6 q^{85} - 21 q^{87} + 18 q^{89} + 3 q^{91} + 66 q^{93} + 15 q^{95} - 9 q^{97} - 60 q^{99}+O(q^{100}) $ 18 * q + 9 * q^3 - 3 * q^5 + 3 * q^7 - 3 * q^9 - 9 * q^11 + 9 * q^13 + 15 * q^15 - 15 * q^17 - 6 * q^19 - 12 * q^21 + 9 * q^23 + 21 * q^25 - 21 * q^27 - 18 * q^29 + 6 * q^33 + 12 * q^35 + 6 * q^37 + 6 * q^39 - 24 * q^41 + 36 * q^47 + 21 * q^49 - 81 * q^51 - 39 * q^53 - 12 * q^55 + 15 * q^57 + 6 * q^59 + 42 * q^61 + 27 * q^63 + 18 * q^65 - 36 * q^69 + 9 * q^71 - 54 * q^73 - 18 * q^75 + 33 * q^77 + 6 * q^79 - 45 * q^81 + 24 * q^83 + 6 * q^85 - 21 * q^87 + 18 * q^89 + 3 * q^91 + 66 * q^93 + 15 * q^95 - 9 * q^97 - 60 * q^99

Display 100 coefficients 10 coefficients

Basis of coefficient ring in terms of a root $\nu$ of $ x^{18} + 30x^{16} + 333x^{14} + 1826x^{12} + 5490x^{10} + 9432x^{8} + 9385x^{6} + 5316x^{4} + 1584x^{2} + 192 $ x^18 + 30*x^16 + 333*x^14 + 1826*x^12 + 5490*x^10 + 9432*x^8 + 9385*x^6 + 5316*x^4 + 1584*x^2 + 192 :

$\beta_{1}$	$=$	$ \nu $ v
$\beta_{2}$	$=$	$ ( - 69 \nu^{16} - 2010 \nu^{14} - 21225 \nu^{12} - 107422 \nu^{10} - 284274 \nu^{8} - 398496 \nu^{6} + \cdots - 13392 ) / 128 $ (-69v^16 - 2010v^14 - 21225v^12 - 107422v^10 - 284274v^8 - 398496v^6 - 289165v^4 - 101208v^2 + 64*v - 13392) / 128
$\beta_{3}$	$=$	$ ( 21 \nu^{17} - 57 \nu^{16} + 600 \nu^{15} - 1678 \nu^{14} + 6125 \nu^{13} - 18037 \nu^{12} + \cdots - 19808 ) / 128 $ (21v^17 - 57v^16 + 600v^15 - 1678v^14 + 6125v^13 - 18037v^12 + 29284v^11 - 93906v^10 + 70238v^9 - 259794v^8 + 82076v^7 - 390328v^6 + 41101v^5 - 313697v^4 + 4902v^3 - 125860v^2 - 1192*v - 19808) / 128
$\beta_{4}$	$=$	$ ( - 153 \nu^{17} + 234 \nu^{16} - 4530 \nu^{15} + 6868 \nu^{14} - 49165 \nu^{13} + 73458 \nu^{12} + \cdots + 65824 ) / 512 $ (-153v^17 + 234v^16 - 4530v^15 + 6868v^14 - 49165v^13 + 73458v^12 - 259878v^11 + 379484v^10 - 735738v^9 + 1037220v^8 - 1142912v^7 + 1528384v^6 - 957761v^5 + 1190394v^4 - 399688v^3 + 454736v^2 - 64208*v + 65824) / 512
$\beta_{5}$	$=$	$ ( 279 \nu^{17} + 8094 \nu^{15} + 84867 \nu^{13} + 424554 \nu^{11} + 1102022 \nu^{9} + 1494432 \nu^{7} + \cdots - 256 ) / 512 $ (279v^17 + 8094v^15 + 84867v^13 + 424554v^11 + 1102022v^9 + 1494432v^7 + 1024431v^5 + 326504v^3 + 37104*v - 256) / 512
$\beta_{6}$	$=$	$ ( - 691 \nu^{17} - 306 \nu^{16} - 20262 \nu^{15} - 9060 \nu^{14} - 216367 \nu^{13} - 98330 \nu^{12} + \cdots - 128416 ) / 1024 $ (-691v^17 - 306v^16 - 20262v^15 - 9060v^14 - 216367v^13 - 98330v^12 - 1114850v^11 - 519756v^10 - 3034622v^9 - 1471476v^8 - 4443072v^7 - 2285824v^6 - 3428267v^5 - 1915522v^4 - 1292568v^3 - 799376v^2 - 185072*v - 128416) / 1024
$\beta_{7}$	$=$	$ ( - 691 \nu^{17} + 306 \nu^{16} - 20262 \nu^{15} + 9060 \nu^{14} - 216367 \nu^{13} + 98330 \nu^{12} + \cdots + 128416 ) / 1024 $ (-691v^17 + 306v^16 - 20262v^15 + 9060v^14 - 216367v^13 + 98330v^12 - 1114850v^11 + 519756v^10 - 3034622v^9 + 1471476v^8 - 4443072v^7 + 2285824v^6 - 3428267v^5 + 1915522v^4 - 1292568v^3 + 799376v^2 - 185072*v + 128416) / 1024
$\beta_{8}$	$=$	$ ( - 127 \nu^{17} - 229 \nu^{16} - 3758 \nu^{15} - 6714 \nu^{14} - 40747 \nu^{13} - 71689 \nu^{12} + \cdots - 65488 ) / 256 $ (-127v^17 - 229v^16 - 3758v^15 - 6714v^14 - 40747v^13 - 71689v^12 - 215066v^11 - 369470v^10 - 607606v^9 - 1006898v^8 - 941568v^7 - 1479584v^6 - 788471v^5 - 1152173v^4 - 331624v^3 - 443000v^2 - 54448*v - 65488) / 256
$\beta_{9}$	$=$	$ ( 667 \nu^{17} + 554 \nu^{16} + 19846 \nu^{15} + 16052 \nu^{14} + 217111 \nu^{13} + 167986 \nu^{12} + \cdots + 91552 ) / 1024 $ (667v^17 + 554v^16 + 19846v^15 + 16052v^14 + 217111v^13 + 167986v^12 + 1161122v^11 + 838268v^10 + 3341230v^9 + 2170596v^8 + 5301344v^7 + 2944576v^6 + 4549715v^5 + 2046138v^4 + 1942632v^3 + 690096v^2 + 319792*v + 91552) / 1024
$\beta_{10}$	$=$	$ ( - 681 \nu^{17} + 754 \nu^{16} - 20018 \nu^{15} + 22180 \nu^{14} - 214685 \nu^{13} + 238170 \nu^{12} + \cdots + 259232 ) / 1024 $ (-681v^17 + 754v^16 - 20018v^15 + 22180v^14 - 214685v^13 + 238170v^12 - 1114278v^11 + 1238668v^10 - 3071322v^9 + 3424628v^8 - 4597888v^7 + 5147392v^6 - 3690001v^5 + 4143426v^4 - 1486312v^3 + 1661904v^2 - 235344*v + 259232) / 1024
$\beta_{11}$	$=$	$ ( 169 \nu^{17} + 343 \nu^{16} + 4958 \nu^{15} + 10070 \nu^{14} + 52997 \nu^{13} + 107763 \nu^{12} + \cdots + 105104 ) / 256 $ (169v^17 + 343v^16 + 4958v^15 + 10070v^14 + 52997v^13 + 107763v^12 + 273634v^11 + 557282v^10 + 748082v^9 + 1526486v^8 + 1105720v^7 + 2260240v^6 + 870673v^5 + 1779567v^4 + 341428v^3 + 694720v^2 + 52064*v + 105104) / 256
$\beta_{12}$	$=$	$ ( 169 \nu^{17} - 343 \nu^{16} + 4958 \nu^{15} - 10070 \nu^{14} + 52997 \nu^{13} - 107763 \nu^{12} + \cdots - 105104 ) / 256 $ (169v^17 - 343v^16 + 4958v^15 - 10070v^14 + 52997v^13 - 107763v^12 + 273634v^11 - 557282v^10 + 748082v^9 - 1526486v^8 + 1105720v^7 - 2260240v^6 + 870673v^5 - 1779567v^4 + 341428v^3 - 694720v^2 + 52064*v - 105104) / 256
$\beta_{13}$	$=$	$ ( 1037 \nu^{17} - 2286 \nu^{16} + 30218 \nu^{15} - 67068 \nu^{14} + 319281 \nu^{13} - 716870 \nu^{12} + \cdots - 657888 ) / 1024 $ (1037v^17 - 2286v^16 + 30218v^15 - 67068v^14 + 319281v^13 - 716870v^12 + 1617550v^11 - 3699860v^10 + 4287330v^9 - 10100748v^8 + 6021536v^7 - 14870336v^6 + 4372501v^5 - 11594014v^4 + 1526936v^3 - 4454544v^2 + 202576*v - 657888) / 1024
$\beta_{14}$	$=$	$ ( - 691 \nu^{17} - 3330 \nu^{16} - 20262 \nu^{15} - 97604 \nu^{14} - 216367 \nu^{13} - 1041578 \nu^{12} + \cdots - 920992 ) / 1024 $ (-691v^17 - 3330v^16 - 20262v^15 - 97604v^14 - 216367v^13 - 1041578v^12 - 1114850v^11 - 5362028v^10 - 3034622v^9 - 14581140v^8 - 4443072v^7 - 21341312v^6 - 3428267v^5 - 16510930v^4 - 1292568v^3 - 6289744v^2 - 185072*v - 920992) / 1024
$\beta_{15}$	$=$	$ ( 2523 \nu^{17} + 1818 \nu^{16} + 73766 \nu^{15} + 53332 \nu^{14} + 783895 \nu^{13} + 569954 \nu^{12} + \cdots + 524704 ) / 1024 $ (2523v^17 + 1818v^16 + 73766v^15 + 53332v^14 + 783895v^13 + 569954v^12 + 4008898v^11 + 2940892v^10 + 10791022v^9 + 8026308v^8 + 15553184v^7 + 11813568v^6 + 11781779v^5 + 9213226v^4 + 4380808v^3 + 3544560v^2 + 624304*v + 524704) / 1024
$\beta_{16}$	$=$	$ ( 837 \nu^{17} - 106 \nu^{16} + 24538 \nu^{15} - 3076 \nu^{14} + 261961 \nu^{13} - 32274 \nu^{12} + \cdots - 16224 ) / 256 $ (837v^17 - 106v^16 + 24538v^15 - 3076v^14 + 261961v^13 - 32274v^12 + 1349598v^11 - 161708v^10 + 3675442v^9 - 421252v^8 + 5395296v^7 - 575744v^6 + 4198509v^5 - 401242v^4 + 1617784v^3 - 132512v^2 + 242064*v - 16224) / 256
$\beta_{17}$	$=$	$ ( - 890 \nu^{17} - 601 \nu^{16} - 26096 \nu^{15} - 17578 \nu^{14} - 278666 \nu^{13} - 186909 \nu^{12} + \cdots - 148720 ) / 256 $ (-890v^17 - 601v^16 - 26096v^15 - 17578v^14 - 278666v^13 - 186909v^12 - 1436200v^11 - 956734v^10 - 3913276v^9 - 2578570v^8 - 5747896v^7 - 3721872v^6 - 4474666v^5 - 2820865v^4 - 1722444v^3 - 1046304v^2 - 256240*v - 148720) / 256

Display $\nu^j$ in terms of $\beta_i$

$\nu$	$=$	$ \beta_1 $ b1
$\nu^{2}$	$=$	$ -\beta_{17} - \beta_{15} + \beta_{10} - \beta_{9} + \beta_{6} + \beta_{5} - 2\beta_{4} - \beta_{3} - \beta _1 - 4 $ -b17 - b15 + b10 - b9 + b6 + b5 - 2*b4 - b3 - b1 - 4
$\nu^{3}$	$=$	$ \beta_{16} - 3 \beta_{15} - \beta_{14} - \beta_{13} + 3 \beta_{12} + \beta_{11} + \beta_{10} + \beta_{9} + \cdots + 3 $ b16 - 3b15 - b14 - b13 + 3b12 + b11 + b10 + b9 + b7 + 6b5 + 2b4 - b3 - 8*b1 + 3
$\nu^{4}$	$=$	$ 8 \beta_{17} - 3 \beta_{16} + 11 \beta_{15} - \beta_{14} + 3 \beta_{13} + 3 \beta_{12} + \beta_{11} + \cdots + 29 $ 8b17 - 3b16 + 11b15 - b14 + 3b13 + 3b12 + b11 - 11b10 + 11b9 + 4b8 + 5b7 - 12b6 - 14b5 + 22b4 + 7b3 + 4b2 + 9*b1 + 29
$\nu^{5}$	$=$	$ - 5 \beta_{17} - 9 \beta_{16} + 40 \beta_{15} + 13 \beta_{14} + 19 \beta_{13} - 57 \beta_{12} + \cdots - 53 $ -5b17 - 9b16 + 40b15 + 13b14 + 19b13 - 57b12 - 21b11 - 14b10 - 14b9 + 8b8 - 5b7 + 3b6 - 101b5 - 28b4 + 22b3 + 80b1 - 53
$\nu^{6}$	$=$	$ - 75 \beta_{17} + 54 \beta_{16} - 129 \beta_{15} + 26 \beta_{14} - 54 \beta_{13} - 68 \beta_{12} + \cdots - 278 $ -75b17 + 54b16 - 129b15 + 26b14 - 54b13 - 68b12 - 10b11 + 121b10 - 129b9 - 70b8 - 98b7 + 139b6 + 175b5 - 250b4 - 51b3 - 78b2 - 90*b1 - 278
$\nu^{7}$	$=$	$ 93 \beta_{17} + 79 \beta_{16} - 514 \beta_{15} - 171 \beta_{14} - 265 \beta_{13} + 819 \beta_{12} + \cdots + 765 $ 93b17 + 79b16 - 514b15 - 171b14 - 265b13 + 819b12 + 311b11 + 164b10 + 172b9 - 172b8 + 23b7 - 63b6 + 1429b5 + 336b4 - 336b3 - 921b1 + 765
$\nu^{8}$	$=$	$ 828 \beta_{17} - 772 \beta_{16} + 1600 \beta_{15} - 436 \beta_{14} + 772 \beta_{13} + 1078 \beta_{12} + \cdots + 3100 $ 828b17 - 772b16 + 1600b15 - 436b14 + 772b13 + 1078b12 + 92b11 - 1420b10 + 1600b9 + 990b8 + 1444b7 - 1656b6 - 2192b5 + 3020b4 + 430b3 + 1186b2 + 1007*b1 + 3100
$\nu^{9}$	$=$	$ - 1365 \beta_{17} - 766 \beta_{16} + 6639 \beta_{15} + 2254 \beta_{14} + 3496 \beta_{13} - 10992 \beta_{12} + \cdots - 10402 $ -1365b17 - 766b16 + 6639b15 + 2254b14 + 3496b13 - 10992b12 - 4234b11 - 1927b10 - 2131b9 + 2700b8 - 94b7 + 999b6 - 19235b5 - 4058b4 + 4627b3 + 11339b1 - 10402
$\nu^{10}$	$=$	$ - 9974 \beta_{17} + 10377 \beta_{16} - 20351 \beta_{15} + 6319 \beta_{14} - 10377 \beta_{13} + \cdots - 37415 $ -9974b17 + 10377b16 - 20351b15 + 6319b14 - 10377b13 - 15207b12 - 919b11 + 17471b10 - 20351b9 - 13246b8 - 19631b7 + 20406b6 + 27848b5 - 37822b4 - 4225b3 - 16542b2 - 12080*b1 - 37415
$\nu^{11}$	$=$	$ 18648 \beta_{17} + 8283 \beta_{16} - 86009 \beta_{15} - 29539 \beta_{14} - 45579 \beta_{13} + \cdots + 138011 $ 18648b17 + 8283b16 - 86009b15 - 29539b14 - 45579b13 + 144461b12 + 56031b11 + 23431b10 + 26931b9 - 38068b8 + 167b7 - 14224b6 + 253874b5 + 50362b4 - 61499b3 - 143775b1 + 138011
$\nu^{12}$	$=$	$ 125127 \beta_{17} - 136617 \beta_{16} + 261744 \beta_{15} - 86255 \beta_{14} + 136617 \beta_{13} + \cdots + 469379 $ 125127b17 - 136617b16 + 261744b15 - 86255b14 + 136617b13 + 204829b12 + 10119b11 - 220796b10 + 261744b9 + 174000b8 + 259615b7 - 257539b6 - 357413b5 + 482540b4 + 46796b3 + 222160b2 + 150664*b1 + 469379
$\nu^{13}$	$=$	$ - 247697 \beta_{17} - 97158 \beta_{16} + 1115619 \beta_{15} + 385382 \beta_{14} + 592552 \beta_{13} + \cdots - 1810496 $ -247697b17 - 97158b16 + 1115619b15 + 385382b14 + 592552b13 - 1884676b12 - 733382b11 - 293195b10 - 344855b9 + 513244b8 + 3566b7 + 192911b6 - 3321635b5 - 638050b4 + 806439b3 + 1846742b1 - 1810496
$\nu^{14}$	$=$	$ - 1599045 \beta_{17} + 1784373 \beta_{16} - 3383418 \beta_{15} + 1146323 \beta_{14} - 1784373 \beta_{13} + \cdots - 5996963 $ -1599045b17 + 1784373b16 - 3383418b15 + 1146323b14 - 1784373b13 - 2704415b12 - 119835b11 + 2829226b10 - 3383418b9 - 2270058b8 - 3397251b7 + 3295781b6 + 4613599b5 - 6212644b4 - 559168b3 - 2931282b2 - 1917777*b1 - 5996963
$\nu^{15}$	$=$	$ 3250014 \beta_{17} + 1197218 \beta_{16} - 14478084 \beta_{15} - 5015426 \beta_{14} - 7697246 \beta_{13} + \cdots + 23623192 $ 3250014b17 + 1197218b16 - 14478084b15 - 5015426b14 - 7697246b13 + 24519142b12 + 9555542b11 + 3734348b10 + 4447232b9 - 6782020b8 - 78882b7 - 2557178b6 + 43283486b5 + 8181580b4 - 10516368b3 - 23858465b1 + 23623192
$\nu^{16}$	$=$	$ 20608451 \beta_{17} - 23229040 \beta_{16} + 43837491 \beta_{15} - 15047460 \beta_{14} + 23229040 \beta_{13} + \cdots + 77276212 $ 20608451b17 - 23229040b16 + 43837491b15 - 15047460b14 + 23229040b13 + 35387360b12 + 1483420b11 - 36501279b10 + 43837491b9 + 29534568b8 + 44261776b7 - 42486555b6 - 59730319b5 + 80338770b4 + 6966711b3 + 38351920b2 + 24661531*b1 + 77276212
$\nu^{17}$	$=$	$ - 42405000 \beta_{17} - 15148291 \beta_{16} + 187934249 \beta_{15} + 65190479 \beta_{14} + \cdots - 307435721 $ -42405000b17 - 15148291b16 + 187934249b15 + 65190479b14 + 99958291b13 - 318622701b12 - 124259615b11 - 48023055b10 - 57553291b9 + 88786740b8 + 1214869b7 + 33530584b6 - 562936206b5 - 105576346b4 + 136809795b3 + 309047952b1 - 307435721

Display $\beta_i$ in terms of $\nu^j$

Character values

We give the values of $\chi$ on generators for $\left(\mathbb{Z}/592\mathbb{Z}\right)^\times$.

$n$	$113$	$149$	$223$
$\chi(n)$	$\beta_{11}$	$1$	$1$

Embeddings

For each embedding $\iota_m$ of the coefficient field, the values $\iota_m(a_n)$ are shown below.

For more information on an embedded modular form you can click on its label.

comment: embeddings in the coefficient field

gp: mfembed(f)

Label

$\iota_m(\nu)$

$ a_{2} $

$ a_{3} $

$ a_{4} $

$ a_{5} $

$ a_{6} $

$ a_{7} $

$ a_{8} $

$ a_{9} $

$ a_{10} $

65.1

	−	0.660907i
		2.47983i
		0.834738i
		0.885952i
	−	1.23399i
		3.60322i
	−	1.77531i
		1.92581i
	−	0.752039i
	−	0.885952i
		1.23399i
	−	3.60322i
		0.660907i
	−	2.47983i
	−	0.834738i
		1.77531i
	−	1.92581i
		0.752039i

−0.354362

2.00969i

0.640888

−

0.763781i

1.58572

1.33057i

−1.09419

−

0.398252i

65.2

−0.199899

1.13369i

−0.986823

1.17605i

−0.422615

−

0.354616i

1.57379

0.572814i

65.3

0.522172

−

2.96139i

1.89897

−

2.26310i

−1.25550

−

1.05349i

−5.67807

−

2.06665i

225.1

0.0473670

−

0.0397456i

0.853756

−

2.34567i

4.17818

1.52073i

−0.520281

2.95066i

225.2

0.968719

−

0.812851i

−0.681528

1.87248i

−2.99976

−

1.09182i

−0.243256

1.37957i

225.3

2.36330

−

1.98304i

−0.253479

0.696428i

1.02732

0.373914i

1.13178

−

6.41863i

289.1

−2.14040

−

0.779043i

−2.84116

0.500973i

−0.251492

−

1.42628i

1.67628

1.40657i

289.2

0.702528

0.255699i

−2.65578

0.468285i

0.231838

1.31482i

−1.86997

−

1.56909i

289.3

2.59058

0.942893i

2.52515

−

0.445253i

−0.593686

−

3.36696i

3.52391

2.95691i

321.1