Arithmetic and Dynamical Degrees on Abelian Varieties

Abstract

Let φ:X X be a dominant rational map of a smooth variety and let x∈ X, all defined over Q. The dynamical degree δ(φ) measures the geometric complexity of the iterates of φ, and the arithmetic degree α(φ,x) measures the arithmetic complexity of the forward φ-orbit of x. It is known that α(φ,x)δ(φ), and it is conjectured that if the φ-orbit of x is Zariski dense in X, then α(φ,x)=δ(φ), i.e., arithmetic complexity equals geometric complexity. In this note we prove this conjecture in the case that X is an abelian variety, extending earlier work in which the conjecture was proven for isogenies.