Invariants
Level: | $210$ | $\SL_2$-level: | $42$ | Newform level: | $1$ | ||
Index: | $256$ | $\PSL_2$-index: | $128$ | ||||
Genus: | $5 = 1 + \frac{ 128 }{12} - \frac{ 0 }{4} - \frac{ 8 }{3} - \frac{ 8 }{2}$ | ||||||
Cusps: | $8$ (of which $2$ are rational) | Cusp widths | $2^{2}\cdot6^{2}\cdot14^{2}\cdot42^{2}$ | Cusp orbits | $1^{2}\cdot2^{3}$ | ||
Elliptic points: | $0$ of order $2$ and $8$ of order $3$ | ||||||
Analytic rank: | not computed | ||||||
$\Q$-gonality: | $2 \le \gamma \le 5$ | ||||||
$\overline{\Q}$-gonality: | $2 \le \gamma \le 5$ | ||||||
Rational cusps: | $2$ | ||||||
Rational CM points: | none |
Other labels
Cummins and Pauli (CP) label: | 42I5 |
Level structure
$\GL_2(\Z/210\Z)$-generators: | $\begin{bmatrix}96&127\\61&114\end{bmatrix}$, $\begin{bmatrix}106&117\\67&203\end{bmatrix}$, $\begin{bmatrix}180&191\\47&204\end{bmatrix}$ |
Contains $-I$: | no $\quad$ (see 210.128.5.e.3 for the level structure with $-I$) |
Cyclic 210-isogeny field degree: | $18$ |
Cyclic 210-torsion field degree: | $864$ |
Full 210-torsion field degree: | $1088640$ |
Rational points
This modular curve has 2 rational cusps but no known non-cuspidal rational points.
Modular covers
The following modular covers realize this modular curve as a fiber product over $X(1)$.
Factor curve | Level | Index | Degree | Genus | Rank |
---|---|---|---|---|---|
10.2.0.a.1 | $10$ | $128$ | $64$ | $0$ | $0$ |
21.128.1-21.a.2.4 | $21$ | $2$ | $2$ | $1$ | $0$ |
This modular curve minimally covers the modular curves listed below.
Covered curve | Level | Index | Degree | Genus | Rank |
---|---|---|---|---|---|
21.128.1-21.a.2.4 | $21$ | $2$ | $2$ | $1$ | $0$ |
210.128.1-21.a.2.4 | $210$ | $2$ | $2$ | $1$ | $?$ |
210.128.3-210.a.1.8 | $210$ | $2$ | $2$ | $3$ | $?$ |
210.128.3-210.a.1.13 | $210$ | $2$ | $2$ | $3$ | $?$ |
210.128.3-210.e.1.8 | $210$ | $2$ | $2$ | $3$ | $?$ |
210.128.3-210.e.1.10 | $210$ | $2$ | $2$ | $3$ | $?$ |