Newspace parameters
comment: Compute space of new eigenforms
[N,k,chi] = [1300,1,Mod(801,1300)]
mf = mfinit([N,k,chi],0)
lf = mfeigenbasis(mf)
from sage.modular.dirichlet import DirichletCharacter
H = DirichletGroup(1300, base_ring=CyclotomicField(4))
chi = DirichletCharacter(H, H._module([0, 0, 1]))
N = Newforms(chi, 1, names="a")
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
chi := DirichletCharacter("1300.801");
S:= CuspForms(chi, 1);
N := Newforms(S);
| Level: | \( N \) | \(=\) | \( 1300 = 2^{2} \cdot 5^{2} \cdot 13 \) |
| Weight: | \( k \) | \(=\) | \( 1 \) |
| Character orbit: | \([\chi]\) | \(=\) | 1300.t (of order \(4\), degree \(2\), 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: | \(0.648784516423\) |
| Analytic rank: | \(0\) |
| Dimension: | \(2\) |
| Coefficient field: | \(\Q(i)\) |
|
comment: defining polynomial
gp: f.mod \\ as an extension of the character field
|
|
| Defining polynomial: |
\( x^{2} + 1 \)
|
| Coefficient ring: | \(\Z[a_1, \ldots, a_{11}]\) |
| Coefficient ring index: | \( 1 \) |
| Twist minimal: | yes |
| Projective image: | \(S_{4}\) |
| Projective field: | Galois closure of 4.0.219700.1 |
$q$-expansion
comment: q-expansion
sage: f.q_expansion() # note that sage often uses an isomorphic number field
gp: mfcoefs(f, 20)
The \(q\)-expansion and trace form are shown below.
Character values
We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/1300\mathbb{Z}\right)^\times\).
| \(n\) | \(301\) | \(651\) | \(677\) |
| \(\chi(n)\) | \(-i\) | \(1\) | \(1\) |
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 | \(\iota_m(\nu)\) | \( a_{2} \) | \( a_{3} \) | \( a_{4} \) | \( a_{5} \) | \( a_{6} \) | \( a_{7} \) | \( a_{8} \) | \( a_{9} \) | \( a_{10} \) | ||||||||||||||||||||||||
|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
| 801.1 |
|
0 | 1.00000 | 0 | 0 | 0 | 0 | 0 | 0 | 0 | ||||||||||||||||||||||||
| 1201.1 | 0 | 1.00000 | 0 | 0 | 0 | 0 | 0 | 0 | 0 | |||||||||||||||||||||||||
Inner twists
| Char | Parity | Ord | Mult | Type |
|---|---|---|---|---|
| 1.a | even | 1 | 1 | trivial |
| 13.d | odd | 4 | 1 | inner |
Twists
| By twisting character orbit | |||||||
|---|---|---|---|---|---|---|---|
| Char | Parity | Ord | Mult | Type | Twist | Min | Dim |
| 1.a | even | 1 | 1 | trivial | 1300.1.t.b | yes | 2 |
| 5.b | even | 2 | 1 | 1300.1.t.a | ✓ | 2 | |
| 5.c | odd | 4 | 1 | 1300.1.k.a | 2 | ||
| 5.c | odd | 4 | 1 | 1300.1.k.b | 2 | ||
| 13.d | odd | 4 | 1 | inner | 1300.1.t.b | yes | 2 |
| 65.f | even | 4 | 1 | 1300.1.k.a | 2 | ||
| 65.g | odd | 4 | 1 | 1300.1.t.a | ✓ | 2 | |
| 65.k | even | 4 | 1 | 1300.1.k.b | 2 | ||
| By twisted newform orbit | |||||||
|---|---|---|---|---|---|---|---|
| Twist | Min | Dim | Char | Parity | Ord | Mult | Type |
| 1300.1.k.a | 2 | 5.c | odd | 4 | 1 | ||
| 1300.1.k.a | 2 | 65.f | even | 4 | 1 | ||
| 1300.1.k.b | 2 | 5.c | odd | 4 | 1 | ||
| 1300.1.k.b | 2 | 65.k | even | 4 | 1 | ||
| 1300.1.t.a | ✓ | 2 | 5.b | even | 2 | 1 | |
| 1300.1.t.a | ✓ | 2 | 65.g | odd | 4 | 1 | |
| 1300.1.t.b | yes | 2 | 1.a | even | 1 | 1 | trivial |
| 1300.1.t.b | yes | 2 | 13.d | odd | 4 | 1 | inner |
Hecke kernels
This newform subspace can be constructed as the kernel of the linear operator
\( T_{3} - 1 \)
acting on \(S_{1}^{\mathrm{new}}(1300, [\chi])\).
Hecke characteristic polynomials
| $p$ | $F_p(T)$ |
|---|---|
| $2$ |
\( T^{2} \)
|
| $3$ |
\( (T - 1)^{2} \)
|
| $5$ |
\( T^{2} \)
|
| $7$ |
\( T^{2} \)
|
| $11$ |
\( T^{2} - 2T + 2 \)
|
| $13$ |
\( T^{2} + 1 \)
|
| $17$ |
\( T^{2} \)
|
| $19$ |
\( T^{2} \)
|
| $23$ |
\( T^{2} + 1 \)
|
| $29$ |
\( (T - 1)^{2} \)
|
| $31$ |
\( T^{2} \)
|
| $37$ |
\( T^{2} + 2T + 2 \)
|
| $41$ |
\( T^{2} - 2T + 2 \)
|
| $43$ |
\( T^{2} + 1 \)
|
| $47$ |
\( T^{2} \)
|
| $53$ |
\( (T + 1)^{2} \)
|
| $59$ |
\( T^{2} - 2T + 2 \)
|
| $61$ |
\( (T + 1)^{2} \)
|
| $67$ |
\( T^{2} + 2T + 2 \)
|
| $71$ |
\( T^{2} + 2T + 2 \)
|
| $73$ |
\( T^{2} \)
|
| $79$ |
\( (T + 1)^{2} \)
|
| $83$ |
\( T^{2} + 2T + 2 \)
|
| $89$ |
\( T^{2} \)
|
| $97$ |
\( T^{2} - 2T + 2 \)
|
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