Integrality of Seshadri constants and irreducibility of principal polarizations on products of two isogenous elliptic curves

Abstract

In this paper we consider the question of when all Seshadri constants on a product of two isogenous elliptic curves E1× E2 without complex multiplication are integers. By studying elliptic curves on E1× E2 we translate this question into a purely numerical problem expressed by quadratic forms. By solving that problem, we show that all Seshadri constants on E1× E2 are integers if and only if the minimal degree of an isogeny E1 E2 equals 1 or 2. Furthermore, this method enables a characterization of irreducible principal polarizations on E1× E2.