Canonical heights and the arithmetic complexity of morphisms on projective space

Abstract

Let F and G be morphisms of degree at least 2 from PN to PN that are defined over the algebraic closure of Q. We define the arithmetic distance d(F,G) between F and G to be the supremum over all algebraic points P of |hF(P)-hG(P)|, where hF and hG are the canonical heights associated to the morphisms F and G, respectively. We prove comparison theorems relating d(F,G) to more naive height functions and show that for a fixed G, the set of F satisfying d(F,G) < B is a set of bounded height. In particular, there are only finitely many such F defined over any given number field.