Dynamical Uniform Bounds for Fibers and a Gap Conjecture

Abstract

We prove a uniform version of the Dynamical Mordell-Lang Conjecture for \'etale maps; also, we obtain a gap result for the growth rate of heights of points in an orbit along an arbitrary endomorphism of a quasiprojective variety defined over a number field. More precisely, for our first result, we assume X is a quasi-projective variety defined over a field K of characteristic 0, endowed with the action of an \'etale endomorphism , and f X Y is a morphism with Y a quasi-projective variety defined over K. Then for any x∈ X(K), if for each y∈ Y(K), the set Sy:=\n∈ N f(n(x))=y\ is finite, then there exists a positive integer N such that \#Sy N for each y∈ Y(K). For our second result, we let K be a number field, f:X P1 is a rational map, and is an arbitrary endomorphism of X. If O(x) denotes the forward orbit of x under the action of , then either f(O(x)) is finite, or n∞ h(f(n(x)))/(n)>0, where h(·) represents the usual logarithmic Weil height for algebraic points.