Invariants
| Level: | $120$ | $\SL_2$-level: | $8$ | ||||
| Index: | $48$ | $\PSL_2$-index: | $24$ | ||||
| Genus: | $0 = 1 + \frac{ 24 }{12} - \frac{ 0 }{4} - \frac{ 0 }{3} - \frac{ 6 }{2}$ | ||||||
| Cusps: | $6$ (of which $2$ are rational) | Cusp widths | $2^{4}\cdot8^{2}$ | Cusp orbits | $1^{2}\cdot2^{2}$ | ||
| Elliptic points: | $0$ of order $2$ and $0$ of order $3$ | ||||||
| $\Q$-gonality: | $1$ | ||||||
| $\overline{\Q}$-gonality: | $1$ | ||||||
| Rational cusps: | $2$ | ||||||
| Rational CM points: | none |
Other labels
| Cummins and Pauli (CP) label: | 8G0 |
Level structure
| $\GL_2(\Z/120\Z)$-generators: | $\begin{bmatrix}31&44\\84&113\end{bmatrix}$, $\begin{bmatrix}41&20\\114&49\end{bmatrix}$, $\begin{bmatrix}59&8\\40&81\end{bmatrix}$, $\begin{bmatrix}69&52\\118&91\end{bmatrix}$, $\begin{bmatrix}113&28\\30&67\end{bmatrix}$, $\begin{bmatrix}119&0\\82&23\end{bmatrix}$ |
| Contains $-I$: | no $\quad$ (see 24.24.0.m.1 for the level structure with $-I$) |
| Cyclic 120-isogeny field degree: | $48$ |
| Cyclic 120-torsion field degree: | $1536$ |
| Full 120-torsion field degree: | $737280$ |
Models
This modular curve is isomorphic to $\mathbb{P}^1$.
Rational points
This modular curve has infinitely many rational points, including 54 stored non-cuspidal points.
Maps to other modular curves
$j$-invariant map of degree 24 to the modular curve $X(1)$ :
| $\displaystyle j$ | $=$ | $\displaystyle \frac{2^2}{3^4}\cdot\frac{(3x+y)^{24}(1513728x^{8}+1824768x^{7}y+891648x^{6}y^{2}+235008x^{5}y^{3}+53856x^{4}y^{4}+19584x^{3}y^{5}+6192x^{2}y^{6}+1056xy^{7}+73y^{8})^{3}}{(2x+y)^{8}(3x+y)^{24}(6x+y)^{8}(12x^{2}-y^{2})^{2}(12x^{2}+6xy+y^{2})^{2}}$ |
Modular covers
This modular curve minimally covers the modular curves listed below.
| Covered curve | Level | Index | Degree | Genus | Rank |
|---|---|---|---|---|---|
| 40.24.0-4.b.1.2 | $40$ | $2$ | $2$ | $0$ | $0$ |
| 120.24.0-4.b.1.2 | $120$ | $2$ | $2$ | $0$ | $?$ |
This modular curve is minimally covered by the modular curves in the database listed below.