Elliptic curves of bounded degree in a polarized Abelian variety

Abstract

For a polarized complex Abelian variety A, of dimension g>1, we study the function NA(t) counting the number of elliptic curves in A with degree bounded by t. We describe elliptic curves as solutions of Diophantine equations which, at least for small dimensions g=2 and g=3, can actually be made explicit, and we show that computing the number of solutions is reduced to the classical topic in Number Theory of counting points of the lattice Zn lying on an explicit bounded subset of Rn. We obtain, for Abelian varieties of small dimension, some upper bounds for the counting function.