Density of orbits of endomorphisms of abelian varieties

Abstract

Let A be an abelian variety defined over Q, and let be a dominant endomorphism of A as an algebraic variety. We prove that either there exists a non-constant rational fibration preserved by , or there exists a point x∈ A(Q) whose -orbit is Zariski dense in A. This provides a positive answer for abelian varieties of a question raised by Medvedev and the second author ("nvariant varieties for polynomial dynamical systems", Ann. of Math. (2) 179 (2014), no. 1, 81-177). We prove also a stronger statement of this result in which is replaced by any commutative finitely generated monoid of dominant endomorphisms of A.