Properties

Label 168.48.0-12.g.1.6
Level $168$
Index $48$
Genus $0$
Cusps $6$
$\Q$-cusps $6$

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Invariants

Level: $168$ $\SL_2$-level: $12$
Index: $48$ $\PSL_2$-index:$24$
Genus: $0 = 1 + \frac{ 24 }{12} - \frac{ 0 }{4} - \frac{ 0 }{3} - \frac{ 6 }{2}$
Cusps: $6$ (all of which are rational) Cusp widths $1^{2}\cdot3^{2}\cdot4\cdot12$ Cusp orbits $1^{6}$
Elliptic points: $0$ of order $2$ and $0$ of order $3$
$\Q$-gonality: $1$
$\overline{\Q}$-gonality: $1$
Rational cusps: $6$
Rational CM points: none

Other labels

Cummins and Pauli (CP) label: 12E0

Level structure

$\GL_2(\Z/168\Z)$-generators: $\begin{bmatrix}3&64\\22&21\end{bmatrix}$, $\begin{bmatrix}36&131\\1&158\end{bmatrix}$, $\begin{bmatrix}44&63\\161&118\end{bmatrix}$, $\begin{bmatrix}52&3\\117&10\end{bmatrix}$, $\begin{bmatrix}82&155\\9&80\end{bmatrix}$, $\begin{bmatrix}106&51\\79&86\end{bmatrix}$, $\begin{bmatrix}132&31\\121&114\end{bmatrix}$
Contains $-I$: no $\quad$ (see 12.24.0.g.1 for the level structure with $-I$)
Cyclic 168-isogeny field degree: $16$
Cyclic 168-torsion field degree: $768$
Full 168-torsion field degree: $3096576$

Models

This modular curve is isomorphic to $\mathbb{P}^1$.

Rational points

This modular curve has infinitely many rational points, including 330 stored non-cuspidal points.

Maps to other modular curves

$j$-invariant map of degree 24 to the modular curve $X(1)$ :

$\displaystyle j$ $=$ $\displaystyle \frac{1}{2^4}\cdot\frac{x^{24}(3x^{2}-4y^{2})^{3}(3x^{6}-12x^{4}y^{2}+144x^{2}y^{4}-64y^{6})^{3}}{y^{4}x^{36}(x-2y)^{3}(x+2y)^{3}(3x-2y)(3x+2y)}$

Modular covers

This modular curve minimally covers the modular curves listed below.

Covered curve Level Index Degree Genus Rank
168.12.0-4.c.1.1 $168$ $4$ $4$ $0$ $?$

This modular curve is minimally covered by the modular curves in the database listed below.

Covering curve Level Index Degree Genus
168.96.0-12.c.1.4 $168$ $2$ $2$ $0$
168.96.0-12.c.1.5 $168$ $2$ $2$ $0$
168.96.0-12.c.2.3 $168$ $2$ $2$ $0$
168.96.0-12.c.2.6 $168$ $2$ $2$ $0$
168.96.0-12.c.3.4 $168$ $2$ $2$ $0$
168.96.0-12.c.3.5 $168$ $2$ $2$ $0$
168.96.0-12.c.4.4 $168$ $2$ $2$ $0$
168.96.0-12.c.4.5 $168$ $2$ $2$ $0$
168.96.0-84.c.1.19 $168$ $2$ $2$ $0$
168.96.0-84.c.1.26 $168$ $2$ $2$ $0$
168.96.0-84.c.2.19 $168$ $2$ $2$ $0$
168.96.0-84.c.2.26 $168$ $2$ $2$ $0$
168.96.0-84.c.3.8 $168$ $2$ $2$ $0$
168.96.0-84.c.3.37 $168$ $2$ $2$ $0$
168.96.0-84.c.4.8 $168$ $2$ $2$ $0$
168.96.0-84.c.4.37 $168$ $2$ $2$ $0$
168.96.0-24.bs.1.6 $168$ $2$ $2$ $0$
168.96.0-24.bs.1.27 $168$ $2$ $2$ $0$
168.96.0-24.bs.2.7 $168$ $2$ $2$ $0$
168.96.0-24.bs.2.26 $168$ $2$ $2$ $0$
168.96.0-24.bt.1.6 $168$ $2$ $2$ $0$
168.96.0-24.bt.1.27 $168$ $2$ $2$ $0$
168.96.0-24.bt.2.7 $168$ $2$ $2$ $0$
168.96.0-24.bt.2.26 $168$ $2$ $2$ $0$
168.96.0-24.bu.1.6 $168$ $2$ $2$ $0$
168.96.0-24.bu.1.11 $168$ $2$ $2$ $0$
168.96.0-24.bu.2.7 $168$ $2$ $2$ $0$
168.96.0-24.bu.2.10 $168$ $2$ $2$ $0$
168.96.0-24.bu.3.8 $168$ $2$ $2$ $0$
168.96.0-24.bu.3.9 $168$ $2$ $2$ $0$
168.96.0-24.bu.4.8 $168$ $2$ $2$ $0$
168.96.0-24.bu.4.9 $168$ $2$ $2$ $0$
168.96.0-168.do.1.28 $168$ $2$ $2$ $0$
168.96.0-168.do.1.37 $168$ $2$ $2$ $0$
168.96.0-168.do.2.25 $168$ $2$ $2$ $0$
168.96.0-168.do.2.40 $168$ $2$ $2$ $0$
168.96.0-168.dp.1.24 $168$ $2$ $2$ $0$
168.96.0-168.dp.1.41 $168$ $2$ $2$ $0$
168.96.0-168.dp.2.13 $168$ $2$ $2$ $0$
168.96.0-168.dp.2.52 $168$ $2$ $2$ $0$
168.96.0-168.dq.1.22 $168$ $2$ $2$ $0$
168.96.0-168.dq.1.41 $168$ $2$ $2$ $0$
168.96.0-168.dq.2.14 $168$ $2$ $2$ $0$
168.96.0-168.dq.2.49 $168$ $2$ $2$ $0$
168.96.0-168.dq.3.13 $168$ $2$ $2$ $0$
168.96.0-168.dq.3.50 $168$ $2$ $2$ $0$
168.96.0-168.dq.4.21 $168$ $2$ $2$ $0$
168.96.0-168.dq.4.42 $168$ $2$ $2$ $0$
168.96.1-12.b.1.17 $168$ $2$ $2$ $1$
168.96.1-12.h.1.4 $168$ $2$ $2$ $1$
168.96.1-12.k.1.1 $168$ $2$ $2$ $1$
168.96.1-84.k.1.7 $168$ $2$ $2$ $1$
168.96.1-12.l.1.1 $168$ $2$ $2$ $1$
168.96.1-84.l.1.1 $168$ $2$ $2$ $1$
168.96.1-84.o.1.7 $168$ $2$ $2$ $1$
168.96.1-84.p.1.3 $168$ $2$ $2$ $1$
168.96.1-24.cg.1.2 $168$ $2$ $2$ $1$
168.96.1-24.es.1.5 $168$ $2$ $2$ $1$
168.96.1-24.ik.1.1 $168$ $2$ $2$ $1$
168.96.1-24.in.1.6 $168$ $2$ $2$ $1$
168.96.1-24.iq.1.6 $168$ $2$ $2$ $1$
168.96.1-24.iq.1.27 $168$ $2$ $2$ $1$
168.96.1-24.ir.1.3 $168$ $2$ $2$ $1$
168.96.1-24.ir.1.46 $168$ $2$ $2$ $1$
168.96.1-24.is.1.5 $168$ $2$ $2$ $1$
168.96.1-24.is.1.28 $168$ $2$ $2$ $1$
168.96.1-24.it.1.1 $168$ $2$ $2$ $1$
168.96.1-24.it.1.32 $168$ $2$ $2$ $1$
168.96.1-24.iu.1.1 $168$ $2$ $2$ $1$
168.96.1-24.iu.1.32 $168$ $2$ $2$ $1$
168.96.1-24.iv.1.5 $168$ $2$ $2$ $1$
168.96.1-24.iv.1.28 $168$ $2$ $2$ $1$
168.96.1-24.iw.1.3 $168$ $2$ $2$ $1$
168.96.1-24.iw.1.30 $168$ $2$ $2$ $1$
168.96.1-24.ix.1.6 $168$ $2$ $2$ $1$
168.96.1-24.ix.1.27 $168$ $2$ $2$ $1$
168.96.1-168.za.1.3 $168$ $2$ $2$ $1$
168.96.1-168.zd.1.13 $168$ $2$ $2$ $1$
168.96.1-168.zm.1.1 $168$ $2$ $2$ $1$
168.96.1-168.zp.1.11 $168$ $2$ $2$ $1$
168.96.1-168.zs.1.32 $168$ $2$ $2$ $1$
168.96.1-168.zs.1.33 $168$ $2$ $2$ $1$
168.96.1-168.zt.1.1 $168$ $2$ $2$ $1$
168.96.1-168.zt.1.64 $168$ $2$ $2$ $1$
168.96.1-168.zu.1.21 $168$ $2$ $2$ $1$
168.96.1-168.zu.1.44 $168$ $2$ $2$ $1$
168.96.1-168.zv.1.20 $168$ $2$ $2$ $1$
168.96.1-168.zv.1.45 $168$ $2$ $2$ $1$
168.96.1-168.zw.1.20 $168$ $2$ $2$ $1$
168.96.1-168.zw.1.45 $168$ $2$ $2$ $1$
168.96.1-168.zx.1.21 $168$ $2$ $2$ $1$
168.96.1-168.zx.1.44 $168$ $2$ $2$ $1$
168.96.1-168.zy.1.1 $168$ $2$ $2$ $1$
168.96.1-168.zy.1.64 $168$ $2$ $2$ $1$
168.96.1-168.zz.1.32 $168$ $2$ $2$ $1$
168.96.1-168.zz.1.33 $168$ $2$ $2$ $1$
168.96.2-24.f.1.10 $168$ $2$ $2$ $2$
168.96.2-24.f.1.23 $168$ $2$ $2$ $2$
168.96.2-24.f.2.13 $168$ $2$ $2$ $2$
168.96.2-24.f.2.20 $168$ $2$ $2$ $2$
168.96.2-168.f.1.24 $168$ $2$ $2$ $2$
168.96.2-168.f.1.41 $168$ $2$ $2$ $2$
168.96.2-168.f.2.13 $168$ $2$ $2$ $2$
168.96.2-168.f.2.52 $168$ $2$ $2$ $2$
168.96.2-24.g.1.10 $168$ $2$ $2$ $2$
168.96.2-24.g.1.23 $168$ $2$ $2$ $2$
168.96.2-24.g.2.13 $168$ $2$ $2$ $2$
168.96.2-24.g.2.20 $168$ $2$ $2$ $2$
168.96.2-168.g.1.28 $168$ $2$ $2$ $2$
168.96.2-168.g.1.37 $168$ $2$ $2$ $2$
168.96.2-168.g.2.25 $168$ $2$ $2$ $2$
168.96.2-168.g.2.40 $168$ $2$ $2$ $2$
168.144.1-12.f.1.1 $168$ $3$ $3$ $1$
168.384.11-84.bm.1.4 $168$ $8$ $8$ $11$