Abstract
Abstract
The problem of classifying elliptic curves over
$\mathbb Q$
with a given discriminant has received much attention. The analogous problem for genus
$2$
curves has only been tackled when the absolute discriminant is a power of
$2$
. In this article, we classify genus
$2$
curves C defined over
${\mathbb Q}$
with at least two rational Weierstrass points and whose absolute discriminant is an odd prime. In fact, we show that such a curve C must be isomorphic to a specialization of one of finitely many
$1$
-parameter families of genus
$2$
curves. In particular, we provide genus
$2$
analogues to Neumann–Setzer families of elliptic curves over the rationals.
Publisher
Cambridge University Press (CUP)