A rational map with infinitely many points of distinct arithmetic degrees

Abstract

Let f X X be a dominant rational self-map of a smooth projective variety defined over Q. For each point P∈ X( Q) whose forward f-orbit is well-defined, Silverman introduced the arithmetic degree αf(P), which measures the growth rate of the heights of the points fn(P). Kawaguchi and Silverman conjectured that αf(P) is well-defined and that, as P varies, the set of values obtained by αf(P) is finite. Based on constructions of Bedford--Kim and McMullen, we give a counterexample to this conjecture when X= P4.