Simultaneous Periods for Families of Rational Maps Modulo Primes

Abstract

Let K be a number field, and φ1,…,φg∈ K(t) be finitely many rational maps, each of degree at least 2. We first show that for generic finite sets A1,…,Ag consisting entirely of points that are not φi-periodic, there exists a set of primes p of K of positive density such that for each Ai and every α∈Ai, α is not φi-periodic modulo p. The notion of genericity used here is defined in terms of the associated arboreal fields and is sharper than those previously used in the literature. Leveraging our proof in the generic case, we then show that the same conclusion holds for most expected cases of non-generic sets Ai. Finally, we apply our result to confirm the dynamical Mordell--Lang conjecture for coordinate-wise actions of a class of maps that includes rational maps that are generic in this sense.