Newform orbit 400.4.n.e

• Label: 400.4.n.e
• Level: $400$
• Weight: $4$
• Character orbit: 400.n
• Analytic conductor: $23.601$
• Analytic rank: $0$
• Dimension: $8$
• CM: no
• Inner twists: $8$

Newspace parameters

Level:	\( N \)	\(=\)	\( 400 = 2^{4} \cdot 5^{2} \)
Weight:	\( k \)	\(=\)	\( 4 \)
Character orbit:	\([\chi]\)	\(=\)	400.n (of order \(4\), degree \(2\), minimal)

Newform invariants

Self dual:	no
Analytic conductor:	\(23.6007640023\)
Analytic rank:	\(0\)
Dimension:	\(8\)
Relative dimension:	\(4\) over \(\Q(i)\)
Coefficient field:	\(\Q(\zeta_{24})\)
Defining polynomial:	\( x^{8} - x^{4} + 1 \)
Coefficient ring:	\(\Z[a_1, \ldots, a_{13}]\)
Coefficient ring index:	\( 2^{4}\cdot 5^{8} \)
Twist minimal:	yes
Sato-Tate group:	$\mathrm{SU}(2)[C_{4}]$

$q$-expansion

Coefficients of the \(q\)-expansion are expressed in terms of a basis \(1,\beta_1,\ldots,\beta_{7}\) for the coefficient ring described below. We also show the integral \(q\)-expansion of the trace form.

\(f(q)\)	\(=\)	\( q + \beta_1 q^{3} + 4 \beta_{4} q^{7} - 2 \beta_{3} q^{9}+O(q^{10}) \)
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 8 q+O(q^{10}) \)

Basis of coefficient ring

\(\beta_{1}\)	\(=\)	\( 5\zeta_{24}^{3} \)
\(\beta_{2}\)	\(=\)	\( 5\zeta_{24}^{5} + 5\zeta_{24} \)
\(\beta_{3}\)	\(=\)	\( \zeta_{24}^{6} \)
\(\beta_{4}\)	\(=\)	\( -5\zeta_{24}^{5} + 5\zeta_{24} \)
\(\beta_{5}\)	\(=\)	\( 10\zeta_{24}^{7} - 5\zeta_{24}^{3} \)
\(\beta_{6}\)	\(=\)	\( 50\zeta_{24}^{4} - 25 \)
\(\beta_{7}\)	\(=\)	\( -25\zeta_{24}^{6} + 50\zeta_{24}^{2} \)

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/400\mathbb{Z}\right)^\times\).

\(n\)	\(101\)	\(177\)	\(351\)
\(\chi(n)\)	\(1\)	\(\beta_{3}\)	\(-1\)

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.

Label  

\(\iota_m(\nu)\)

\( a_{2} \)

\( a_{3} \)

\( a_{4} \)

\( a_{5} \)

\( a_{6} \)

\( a_{7} \)

\( a_{8} \)

\( a_{9} \)

\( a_{10} \)

143.1

0.258819	−	0.965926i
−0.965926	+	0.258819i
−0.258819	+	0.965926i
0.965926	−	0.258819i
−0.965926	−	0.258819i
0.258819	+	0.965926i
0.965926	+	0.258819i
−0.258819	−	0.965926i

0

−3.53553

+

3.53553i

0

0

0

−14.1421

−

14.1421i

0

2.00000i

0

143.2

0

−3.53553

+

3.53553i

0

0

0

−14.1421

−

14.1421i

0

2.00000i

0

143.3

0

3.53553

−

3.53553i

0

0

0

14.1421

+

14.1421i

0

2.00000i

0

143.4

0

3.53553

−

3.53553i

0

0

0

14.1421

+

14.1421i

0

2.00000i

0

207.1

0

−3.53553

−

3.53553i

0

0

0

−14.1421

+

14.1421i

0

−

2.00000i

0

207.2

0

−3.53553

−

3.53553i

0

0

0

−14.1421

+

14.1421i

0

−

2.00000i

0

207.3

0

3.53553

+

3.53553i

0

0

0

14.1421

−

14.1421i

0

−

2.00000i

0

207.4

0

3.53553

+

3.53553i

0

0

0

14.1421

−

14.1421i

0

−

2.00000i

0

Inner twists

Char	Parity	Ord	Mult	Type
1.a	even	1	1	trivial
4.b	odd	2	1	inner
5.b	even	2	1	inner
5.c	odd	4	2	inner
20.d	odd	2	1	inner
20.e	even	4	2	inner

Twists

By twisting character orbit
Char	Parity	Ord	Mult	Type	Twist	Min	Dim
1.a	even	1	1	trivial	400.4.n.e	✓	8
4.b	odd	2	1	inner	400.4.n.e	✓	8
5.b	even	2	1	inner	400.4.n.e	✓	8
5.c	odd	4	2	inner	400.4.n.e	✓	8
20.d	odd	2	1	inner	400.4.n.e	✓	8
20.e	even	4	2	inner	400.4.n.e	✓	8

    

By twisted newform orbit
Twist	Min	Dim	Char	Parity	Ord	Mult	Type
400.4.n.e	✓	8	1.a	even	1	1	trivial
400.4.n.e	✓	8	4.b	odd	2	1	inner
400.4.n.e	✓	8	5.b	even	2	1	inner
400.4.n.e	✓	8	5.c	odd	4	2	inner
400.4.n.e	✓	8	20.d	odd	2	1	inner
400.4.n.e	✓	8	20.e	even	4	2	inner

Hecke kernels

This newform subspace can be constructed as the kernel of the linear operator \( T_{3}^{4} + 625 \) acting on \(S_{4}^{\mathrm{new}}(400, [\chi])\).

Hecke characteristic polynomials

$p$	$F_p(T)$
$2$	\( T^{8} \)
$3$	\( (T^{4} + 625)^{2} \)
$5$	\( T^{8} \)
$7$	\( (T^{4} + 160000)^{2} \)
$11$	\( (T^{2} + 1875)^{4} \)