| Curve name |
$X_{208b}$ |
| Index |
$96$ |
| Level |
$16$ |
| Genus |
$0$ |
| Does the subgroup contain $-I$? |
No |
| Generating matrices |
$
\left[ \begin{matrix} 3 & 0 \\ 8 & 3 \end{matrix}\right],
\left[ \begin{matrix} 7 & 0 \\ 0 & 3 \end{matrix}\right],
\left[ \begin{matrix} 1 & 0 \\ 8 & 7 \end{matrix}\right],
\left[ \begin{matrix} 5 & 10 \\ 8 & 1 \end{matrix}\right]$ |
| Images in lower levels |
|
| Meaning/Special name |
|
| Chosen covering |
$X_{208}$ |
| Curves that $X_{208b}$ minimally covers |
|
| Curves that minimally cover $X_{208b}$ |
|
| Curves that minimally cover $X_{208b}$ and have infinitely many rational
points. |
|
| Model |
$\mathbb{P}^{1}$, a universal elliptic curve over an appropriate base is
given by
\[y^2 = x^3 + A(t)x + B(t), \text{ where}\]
\[A(t) = -27t^{24} - 54t^{20} + 54t^{12} - 54t^{4} - 27\]
\[B(t) = -54t^{36} - 162t^{32} - 81t^{28} + 189t^{24} + 324t^{20} + 324t^{16} +
189t^{12} - 81t^{8} - 162t^{4} - 54\]
|
| Info about rational points |
| Comments on finding rational points |
None |
| Elliptic curve whose $2$-adic image is the subgroup |
$y^2 = x^3 - x^2 - 6288736x - 6067652864$, with conductor $69360$ |
| Generic density of odd order reductions |
$109/896$ |