On the dynamical and arithmetic degrees of rational self-maps of algebraic varieties

Abstract

Let f : X --> X be a dominant rational map of a projective variety defined over a global field, let df be the dynamical degree of f, and let hX be a Weil height on X relative to an ample divisor. We prove that hX(fn(P)) << (df + e)n hX(P), where the implied constant depends only on X, hX, f, and e. As applications, we prove a fundamental inequality af(P) df for the upper arithmetic degree and we construct canonical heights for (nef) divisors. We conjecture that af(P) = df whenever the orbit of P is Zariski dense, and we describe some cases for which we can prove our conjecture.