Modular curve search results

Results (16 matches)

 

Label	RSZB label	RZB label	CP label	SZ label	S label	Name	Level	Index	Genus	Rank	$\Q$-gonality	Cusps	$\Q$-cusps	CM points	Conductor	Simple	Squarefree	Contains -1	Decomposition	Models	$j$-points	Local obstruction	$\operatorname{GL}_2(\mathbb{Z}/N\mathbb{Z})$-generators
65.9360.355-65.a.1.1	65.9360.355.2						$65$	$9360$	$355$	$83$	$47 \le \gamma \le 78$	$72$	$0$		$5^{570}\cdot13^{710}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}19&60\\35&33\end{bmatrix}$, $\begin{bmatrix}26&30\\45&1\end{bmatrix}$, $\begin{bmatrix}41&45\\50&11\end{bmatrix}$
65.9360.355-65.a.1.2	65.9360.355.4						$65$	$9360$	$355$	$83$	$47 \le \gamma \le 78$	$72$	$0$		$5^{570}\cdot13^{710}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}9&5\\50&56\end{bmatrix}$, $\begin{bmatrix}9&15\\35&43\end{bmatrix}$, $\begin{bmatrix}36&55\\50&16\end{bmatrix}$
65.9360.355-65.a.1.3	65.9360.355.1						$65$	$9360$	$355$	$83$	$47 \le \gamma \le 78$	$72$	$0$		$5^{570}\cdot13^{710}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}21&25\\10&57\end{bmatrix}$, $\begin{bmatrix}21&30\\35&57\end{bmatrix}$, $\begin{bmatrix}56&25\\35&61\end{bmatrix}$
65.9360.355-65.a.1.4	65.9360.355.3						$65$	$9360$	$355$	$83$	$47 \le \gamma \le 78$	$72$	$0$		$5^{570}\cdot13^{710}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}31&10\\15&53\end{bmatrix}$, $\begin{bmatrix}46&15\\15&19\end{bmatrix}$, $\begin{bmatrix}64&55\\5&53\end{bmatrix}$
65.9360.355-65.a.1.5	65.9360.355.11						$65$	$9360$	$355$	$83$	$47 \le \gamma \le 78$	$72$	$0$		$5^{570}\cdot13^{710}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}26&50\\55&13\end{bmatrix}$, $\begin{bmatrix}34&35\\60&44\end{bmatrix}$, $\begin{bmatrix}39&20\\30&18\end{bmatrix}$
65.9360.355-65.a.1.6	65.9360.355.9						$65$	$9360$	$355$	$83$	$47 \le \gamma \le 78$	$72$	$0$		$5^{570}\cdot13^{710}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}9&50\\15&17\end{bmatrix}$, $\begin{bmatrix}11&30\\45&12\end{bmatrix}$, $\begin{bmatrix}26&15\\10&52\end{bmatrix}$
65.9360.355-65.a.1.7	65.9360.355.10						$65$	$9360$	$355$	$83$	$47 \le \gamma \le 78$	$72$	$0$		$5^{570}\cdot13^{710}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}29&10\\15&23\end{bmatrix}$, $\begin{bmatrix}54&40\\25&11\end{bmatrix}$, $\begin{bmatrix}61&20\\30&27\end{bmatrix}$
65.9360.355-65.a.1.8	65.9360.355.12						$65$	$9360$	$355$	$83$	$47 \le \gamma \le 78$	$72$	$0$		$5^{570}\cdot13^{710}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}34&10\\15&43\end{bmatrix}$, $\begin{bmatrix}51&10\\40&14\end{bmatrix}$, $\begin{bmatrix}59&10\\55&6\end{bmatrix}$
65.9360.355-65.d.1.1	65.9360.355.6						$65$	$9360$	$355$	$81$	$47 \le \gamma \le 156$	$72$	$0$		$5^{570}\cdot13^{680}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}6&45\\30&7\end{bmatrix}$, $\begin{bmatrix}48&25\\55&46\end{bmatrix}$, $\begin{bmatrix}54&10\\35&22\end{bmatrix}$
65.9360.355-65.d.1.2	65.9360.355.7						$65$	$9360$	$355$	$81$	$47 \le \gamma \le 156$	$72$	$0$		$5^{570}\cdot13^{680}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}11&35\\10&54\end{bmatrix}$, $\begin{bmatrix}12&35\\25&17\end{bmatrix}$, $\begin{bmatrix}19&55\\30&12\end{bmatrix}$
65.9360.355-65.d.1.3	65.9360.355.5						$65$	$9360$	$355$	$81$	$47 \le \gamma \le 156$	$72$	$0$		$5^{570}\cdot13^{680}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}41&5\\50&38\end{bmatrix}$, $\begin{bmatrix}49&50\\40&42\end{bmatrix}$, $\begin{bmatrix}52&55\\35&26\end{bmatrix}$
65.9360.355-65.d.1.4	65.9360.355.8						$65$	$9360$	$355$	$81$	$47 \le \gamma \le 156$	$72$	$0$		$5^{570}\cdot13^{680}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}1&0\\15&64\end{bmatrix}$, $\begin{bmatrix}9&45\\60&47\end{bmatrix}$, $\begin{bmatrix}18&25\\55&3\end{bmatrix}$
65.9360.355-65.d.1.5	65.9360.355.14						$65$	$9360$	$355$	$81$	$47 \le \gamma \le 156$	$72$	$0$		$5^{570}\cdot13^{680}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}24&25\\55&48\end{bmatrix}$, $\begin{bmatrix}44&55\\45&34\end{bmatrix}$, $\begin{bmatrix}48&5\\20&4\end{bmatrix}$
65.9360.355-65.d.1.6	65.9360.355.15						$65$	$9360$	$355$	$81$	$47 \le \gamma \le 156$	$72$	$0$		$5^{570}\cdot13^{680}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}13&5\\50&36\end{bmatrix}$, $\begin{bmatrix}14&0\\15&51\end{bmatrix}$, $\begin{bmatrix}34&60\\40&57\end{bmatrix}$
65.9360.355-65.d.1.7	65.9360.355.16						$65$	$9360$	$355$	$81$	$47 \le \gamma \le 156$	$72$	$0$		$5^{570}\cdot13^{680}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}48&55\\30&28\end{bmatrix}$, $\begin{bmatrix}53&25\\25&38\end{bmatrix}$, $\begin{bmatrix}58&10\\55&59\end{bmatrix}$
65.9360.355-65.d.1.8	65.9360.355.13						$65$	$9360$	$355$	$81$	$47 \le \gamma \le 156$	$72$	$0$		$5^{570}\cdot13^{680}$				$1^{7}\cdot2^{23}\cdot3^{9}\cdot4^{7}\cdot5^{4}\cdot6^{10}\cdot9^{3}\cdot10^{2}\cdot12^{2}\cdot18^{4}\cdot24$		$0$	✓	$\begin{bmatrix}24&0\\35&54\end{bmatrix}$, $\begin{bmatrix}42&45\\50&49\end{bmatrix}$, $\begin{bmatrix}51&30\\40&33\end{bmatrix}$