LMFDB - Newform orbit 2548.2.a.q

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms

[N,k,chi] = [2548,2,Mod(1,2548)]

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

lf = mfeigenbasis(mf)

from sage.modular.dirichlet import DirichletCharacter

H = DirichletGroup(2548, base_ring=CyclotomicField(2))

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

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

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

chi := DirichletCharacter("2548.1");

S:= CuspForms(chi, 2);

N := Newforms(S);

Level:	$ N $	$=$	$ 2548 = 2^{2} \cdot 7^{2} \cdot 13 $
Weight:	$ k $	$=$	$ 2 $
Character orbit:	$[\chi]$	$=$	2548.a (trivial)

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:	yes
Analytic conductor:	$20.3458824350$
Analytic rank:	$0$
Dimension:	$4$
Coefficient field:	4.4.29268.1
comment: defining polynomial gp: f.mod \\ as an extension of the character field
Defining polynomial:	$ x^{4} - x^{3} - 9x^{2} + 5x + 16 $ x^4 - x^3 - 9x^2 + 5x + 16
Coefficient ring:	$\Z[a_1, \ldots, a_{11}]$
Coefficient ring index:	$ 1 $
Twist minimal:	no (minimal twist has level 364)
Fricke sign:	$-1$
Sato-Tate group:	$\mathrm{SU}(2)$

$q$-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 $1,\beta_1,\beta_2,\beta_3$ for the coefficient ring described below. We also show the integral $q$-expansion of the trace form.

$f(q)$	$=$	$ q + ( - \beta_1 + 1) q^{3} + \beta_{3} q^{5} + (\beta_{3} - 2 \beta_1 + 3) q^{9} + (\beta_{3} - \beta_{2} + \beta_1 + 1) q^{11} - q^{13} + (\beta_{3} - 2 \beta_{2} - 2) q^{15} + ( - \beta_{3} + 2 \beta_{2} - \beta_1) q^{17}+ \cdots + (4 \beta_{3} - \beta_{2} - 3 \beta_1 + 1) q^{99}+O(q^{100}) $ q + (-b1 + 1) * q^3 + b3 * q^5 + (b3 - 2b1 + 3) q^9 + (b3 - b2 + b1 + 1) * q^11 - q^13 + (b3 - 2b2 - 2) q^15 + (-b3 + 2b2 - b1) q^17 + b2 * q^19 + (-b1 + 3) * q^23 + (-b3 + 2b2 + 1) q^25 + (3b3 - 2b2 - 2b1 + 8) q^27 + (-2b3 + 2b2 + b1 + 2) * q^29 + (-2b2 - b1 - 1) q^31 + (2b3 - 2b2 - b1 - 3) * q^33 + (-b1 + 7) * q^37 + (b1 - 1) * q^39 + (-b3 + b1 + 1) * q^41 + (b3 + b1 + 1) * q^43 + (2b3 - 2b2 + 2) * q^45 + (-b3 - b2 - b1 + 1) * q^47 + (-4b3 + 2b2 + b1 + 1) * q^51 + (2b2 - 2b1 + 5) * q^53 + (-b3 + 4b2 - 2b1 + 6) * q^55 + (-2b3 + b1 - 3) q^57 + (b3 - b2 - 3b1 - 3) q^59 + (4b2 - 2b1 + 3) * q^61 - b3 * q^65 + (-2b3 - b2 + 4b1 - 2) * q^67 + (b3 - 4b1 + 8) q^69 + (-3b3 + 5b2 - 2) * q^71 + (b3 + 2b2 + 2b1 - 2) * q^73 + (-5b3 + 2b2 + b1 - 3) * q^75 + (b3 - 4b2 + 2b1 + 4) * q^79 + (6b3 - 6b2 - 6b1 + 9) q^81 + (-3b3 + 3b1 - 3) * q^83 + (3b3 - 4b2 + 4b1 - 4) q^85 + (-7b3 + 4b2 + b1 - 5) * q^87 + (-2b3 - 4b2 + 5b1 - 7) q^89 + (5b3 - 2b1 + 10) * q^93 + (b3 + 2b1 + 2) q^95 + (-b3 + 3b1 + 1) q^97 + (4b3 - b2 - 3b1 + 1) * q^99
$\operatorname{Tr}(f)(q)$	$=$	$ 4 q + 3 q^{3} - q^{5} + 9 q^{9} + 4 q^{11} - 4 q^{13} - 9 q^{15} + 11 q^{23} + 5 q^{25} + 27 q^{27} + 11 q^{29} - 5 q^{31} - 15 q^{33} + 27 q^{37} - 3 q^{39} + 6 q^{41} + 4 q^{43} + 6 q^{45} + 4 q^{47}+ \cdots - 3 q^{99}+O(q^{100}) $ 4 * q + 3 * q^3 - q^5 + 9 * q^9 + 4 * q^11 - 4 * q^13 - 9 * q^15 + 11 * q^23 + 5 * q^25 + 27 * q^27 + 11 * q^29 - 5 * q^31 - 15 * q^33 + 27 * q^37 - 3 * q^39 + 6 * q^41 + 4 * q^43 + 6 * q^45 + 4 * q^47 + 9 * q^51 + 18 * q^53 + 23 * q^55 - 9 * q^57 - 16 * q^59 + 10 * q^61 + q^65 - 2 * q^67 + 27 * q^69 - 5 * q^71 - 7 * q^73 - 6 * q^75 + 17 * q^79 + 24 * q^81 - 6 * q^83 - 15 * q^85 - 12 * q^87 - 21 * q^89 + 33 * q^93 + 9 * q^95 + 8 * q^97 - 3 * q^99

Basis of coefficient ring in terms of a root $\nu$ of $ x^{4} - x^{3} - 9x^{2} + 5x + 16 $ x^4 - x^3 - 9*x^2 + 5*x + 16 :

$\beta_{1}$	$=$	$ \nu $ v
$\beta_{2}$	$=$	$ ( \nu^{3} - 5\nu - 2 ) / 2 $ (v^3 - 5*v - 2) / 2
$\beta_{3}$	$=$	$ \nu^{2} - 5 $ v^2 - 5

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

$\nu$	$=$	$ \beta_1 $ b1
$\nu^{2}$	$=$	$ \beta_{3} + 5 $ b3 + 5
$\nu^{3}$	$=$	$ 2\beta_{2} + 5\beta _1 + 2 $ 2b2 + 5b1 + 2

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

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} $

1.1

2.85121
1.83719
−1.25548
−2.43292

−1.85121

3.12941

0.426985

1.2

−0.837188

−1.62474

−2.29912

1.3

2.25548

−3.42378

2.08718

1.4

3.43292

0.919111

8.78496

Atkin-Lehner signs

$ p $	Sign
$2$	$ -1 $
$7$	$ +1 $
$13$	$ +1 $

Inner twists

This newform does not admit any (nontrivial) inner twists.

Twists

By twisting character orbit
Char	Parity	Ord	Mult	Type	Twist	Min	Dim
1.a	even	1	1	trivial	2548.2.a.q		4
7.b	odd	2	1		2548.2.a.p		4
7.c	even	3	2		364.2.j.e	✓	8
7.d	odd	6	2		2548.2.j.q		8
21.h	odd	6	2		3276.2.r.j		8
28.g	odd	6	2		1456.2.r.o		8

By twisted newform orbit
Twist	Min	Dim	Char	Parity	Ord	Mult	Type
364.2.j.e	✓	8	7.c	even	3	2
1456.2.r.o		8	28.g	odd	6	2
2548.2.a.p		4	7.b	odd	2	1
2548.2.a.q		4	1.a	even	1	1	trivial
2548.2.j.q		8	7.d	odd	6	2
3276.2.r.j		8	21.h	odd	6	2

Hecke kernels

This newform subspace can be constructed as the intersection of the kernels of the following linear operators acting on $S_{2}^{\mathrm{new}}(\Gamma_0(2548))$:

$ T_{3}^{4} - 3T_{3}^{3} - 6T_{3}^{2} + 12T_{3} + 12 $

$ T_{5}^{4} + T_{5}^{3} - 12T_{5}^{2} - 8T_{5} + 16 $

Hecke characteristic polynomials

$p$	$F_p(T)$
$2$	$ T^{4} $ T^4
$3$	$ T^{4} - 3 T^{3} + \cdots + 12 $ T^4 - 3T^3 - 6T^2 + 12*T + 12
$5$	$ T^{4} + T^{3} + \cdots + 16 $ T^4 + T^3 - 12T^2 - 8T + 16
$7$	$ T^{4} $ T^4
$11$	$ T^{4} - 4 T^{3} + \cdots - 101 $ T^4 - 4T^3 - 18T^2 + 98*T - 101
$13$	$ (T + 1)^{4} $ (T + 1)^4
$17$	$ T^{4} - 42 T^{2} + \cdots + 93 $ T^4 - 42T^2 - 60T + 93
$19$	$ T^{4} - 12 T^{2} + \cdots + 21 $ T^4 - 12T^2 - 6T + 21
$23$	$ T^{4} - 11 T^{3} + \cdots + 4 $ T^4 - 11T^3 + 36T^2 - 32*T + 4
$29$	$ T^{4} - 11 T^{3} + \cdots - 746 $ T^4 - 11T^3 - 27T^2 + 451*T - 746
$31$	$ T^{4} + 5 T^{3} + \cdots + 268 $ T^4 + 5T^3 - 66T^2 - 16*T + 268
$37$	$ T^{4} - 27 T^{3} + \cdots + 1668 $ T^4 - 27T^3 + 264T^2 - 1104*T + 1668
$41$	$ T^{4} - 6 T^{3} + \cdots - 24 $ T^4 - 6T^3 + 36T - 24
$43$	$ T^{4} - 4 T^{3} + \cdots + 16 $ T^4 - 4T^3 - 24T^2 + 20*T + 16
$47$	$ T^{4} - 4 T^{3} + \cdots - 581 $ T^4 - 4T^3 - 54T^2 + 362*T - 581
$53$	$ T^{4} - 18 T^{3} + \cdots - 1257 $ T^4 - 18T^3 + 72T^2 + 210*T - 1257
$59$	$ T^{4} + 16 T^{3} + \cdots - 2537 $ T^4 + 16T^3 - 6T^2 - 866*T - 2537
$61$	$ T^{4} - 10 T^{3} + \cdots + 727 $ T^4 - 10T^3 - 120T^2 + 1130*T + 727
$67$	$ T^{4} + 2 T^{3} + \cdots - 53 $ T^4 + 2T^3 - 126T^2 - 208*T - 53
$71$	$ T^{4} + 5 T^{3} + \cdots + 12208 $ T^4 + 5T^3 - 267T^2 - 865*T + 12208
$73$	$ T^{4} + 7 T^{3} + \cdots - 3896 $ T^4 + 7T^3 - 150T^2 - 1580*T - 3896
$79$	$ T^{4} - 17 T^{3} + \cdots + 904 $ T^4 - 17T^3 - 42T^2 + 868*T + 904
$83$	$ T^{4} + 6 T^{3} + \cdots + 1296 $ T^4 + 6T^3 - 108T^2 - 108*T + 1296
$89$	$ T^{4} + 21 T^{3} + \cdots - 27348 $ T^4 + 21T^3 - 120T^2 - 5016*T - 27348
$97$	$ T^{4} - 8 T^{3} + \cdots - 248 $ T^4 - 8T^3 - 48T^2 + 412*T - 248
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Level:	\( N \)	\(=\)	\( 2548 = 2^{2} \cdot 7^{2} \cdot 13 \)
Weight:	\( k \)	\(=\)	\( 2 \)
Character orbit:	\([\chi]\)	\(=\)	2548.a (trivial)

\(f(q)\)	\(=\)	\( q + ( - \beta_1 + 1) q^{3} + \beta_{3} q^{5} + (\beta_{3} - 2 \beta_1 + 3) q^{9} + (\beta_{3} - \beta_{2} + \beta_1 + 1) q^{11} - q^{13} + (\beta_{3} - 2 \beta_{2} - 2) q^{15} + ( - \beta_{3} + 2 \beta_{2} - \beta_1) q^{17}+ \cdots + (4 \beta_{3} - \beta_{2} - 3 \beta_1 + 1) q^{99}+O(q^{100}) \) q + (-b1 + 1) * q^3 + b3 * q^5 + (b3 - 2b1 + 3) q^9 + (b3 - b2 + b1 + 1) * q^11 - q^13 + (b3 - 2b2 - 2) q^15 + (-b3 + 2b2 - b1) q^17 + b2 * q^19 + (-b1 + 3) * q^23 + (-b3 + 2b2 + 1) q^25 + (3b3 - 2b2 - 2b1 + 8) q^27 + (-2b3 + 2b2 + b1 + 2) * q^29 + (-2b2 - b1 - 1) q^31 + (2b3 - 2b2 - b1 - 3) * q^33 + (-b1 + 7) * q^37 + (b1 - 1) * q^39 + (-b3 + b1 + 1) * q^41 + (b3 + b1 + 1) * q^43 + (2b3 - 2b2 + 2) * q^45 + (-b3 - b2 - b1 + 1) * q^47 + (-4b3 + 2b2 + b1 + 1) * q^51 + (2b2 - 2b1 + 5) * q^53 + (-b3 + 4b2 - 2b1 + 6) * q^55 + (-2b3 + b1 - 3) q^57 + (b3 - b2 - 3b1 - 3) q^59 + (4b2 - 2b1 + 3) * q^61 - b3 * q^65 + (-2b3 - b2 + 4b1 - 2) * q^67 + (b3 - 4b1 + 8) q^69 + (-3b3 + 5b2 - 2) * q^71 + (b3 + 2b2 + 2b1 - 2) * q^73 + (-5b3 + 2b2 + b1 - 3) * q^75 + (b3 - 4b2 + 2b1 + 4) * q^79 + (6b3 - 6b2 - 6b1 + 9) q^81 + (-3b3 + 3b1 - 3) * q^83 + (3b3 - 4b2 + 4b1 - 4) q^85 + (-7b3 + 4b2 + b1 - 5) * q^87 + (-2b3 - 4b2 + 5b1 - 7) q^89 + (5b3 - 2b1 + 10) * q^93 + (b3 + 2b1 + 2) q^95 + (-b3 + 3b1 + 1) q^97 + (4b3 - b2 - 3b1 + 1) * q^99
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 4 q + 3 q^{3} - q^{5} + 9 q^{9} + 4 q^{11} - 4 q^{13} - 9 q^{15} + 11 q^{23} + 5 q^{25} + 27 q^{27} + 11 q^{29} - 5 q^{31} - 15 q^{33} + 27 q^{37} - 3 q^{39} + 6 q^{41} + 4 q^{43} + 6 q^{45} + 4 q^{47}+ \cdots - 3 q^{99}+O(q^{100}) \) 4 * q + 3 * q^3 - q^5 + 9 * q^9 + 4 * q^11 - 4 * q^13 - 9 * q^15 + 11 * q^23 + 5 * q^25 + 27 * q^27 + 11 * q^29 - 5 * q^31 - 15 * q^33 + 27 * q^37 - 3 * q^39 + 6 * q^41 + 4 * q^43 + 6 * q^45 + 4 * q^47 + 9 * q^51 + 18 * q^53 + 23 * q^55 - 9 * q^57 - 16 * q^59 + 10 * q^61 + q^65 - 2 * q^67 + 27 * q^69 - 5 * q^71 - 7 * q^73 - 6 * q^75 + 17 * q^79 + 24 * q^81 - 6 * q^83 - 15 * q^85 - 12 * q^87 - 21 * q^89 + 33 * q^93 + 9 * q^95 + 8 * q^97 - 3 * q^99

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