Density of orbits of dominant regular self-maps of semiabelian varieties

Abstract

We prove a conjecture of Medvedev and Scanlon in the case of regular morphisms of semiabelian varieties. That is, if G is a semiabelian variety defined over an algebraically closed field K of characteristic 0, and G G is a dominant regular self-map of G which is not necessarily a group homomorphism, we prove that one of the following holds: either there exists a non-constant rational fibration preserved by , or there exists a point x∈ G(K) whose -orbit is Zariski dense in G.