Distribution of integral values for the ratio of two linear recurrences

Abstract

Let F and G be linear recurrences over a number field K, and let R be a finitely generated subring of K. Furthermore, let N be the set of positive integers n such that G(n) ≠ 0 and F(n) / G(n) ∈ R. Under mild hypothesis, Corvaja and Zannier proved that N has zero asymptotic density. We prove that \#(N [1, x]) x · ( x / x)h for all x ≥ 3, where h is a positive integer that can be computed in terms of F and G. Assuming the Hardy-Littlewood k-tuple conjecture, our result is optimal except for the term x.