Canonical heights on hyper-K\"ahler varieties and the Kawaguchi-Silverman conjecture

Abstract

The Kawaguchi--Silverman conjecture predicts that if f X X is a dominant rational-self map of a projective variety over Q, and P is a Q-point of X with Zariski-dense orbit, then the dynamical and arithmetic degrees of f coincide: λ1(f) = αf(P). We prove this conjecture in several higher-dimensional settings, including all endomorphisms of non-uniruled smooth projective threefolds with degree larger than 1, and all endomorphisms of hyper-K\"ahler varieties in any dimension. In the latter case, we construct a canonical height function associated to any automorphism f X X of a hyper-K\"ahler variety defined over Q.