A sparsity result for the Dynamical Mordell-Lang Conjecture in positive characteristic

Abstract

We prove a quantitative partial result in support of the Dynamical Mordell-Lang Conjecture (also known as the DML conjecture) in positive characteristic. More precisely, we show the following: given a field K of characteristic p, given a semiabelian variety X defined over a finite subfield of K and endowed with a regular self-map :X X defined over K, given a point α∈ X(K) and a subvariety V⊂eq X, then the set of all non-negative integers n such that n(α)∈ V(K) is a union of finitely many arithmetic progressions along with a subset S with the property that there exists a positive real number A (depending only on N, , α, V) such that for each positive integer M, we have \#\n∈ S~ n M\ A· (1+ M) V.