Genus two curves with everywhere good reduction over quadratic fields

Abstract: We address the question of existence of absolutely simple abelian varieties of dimension 2 with everywhere good reduction over quadratic fields. The emphasis will be given to the construction of pairs $(K,C)$, where $K$ is a quadratic number field and $C$ is a genus $2$ curve with everywhere good reduction over $K$. We provide the first infinite sequence of pairs $(K,C)$ where $K$ is a real (complex) quadratic field and $C$ has everywhere good reduction over $K$. Moreover, we show that the Jacobian of $C$ is an absolutely simple abelian variety.