Common values of a class of linear recurrence

Abstract

Let (an), (bn) be linear recursive sequences of integers with characteristic polynomials A(X),B(X)∈ Z[X] respectively. Assume that A(X) has a dominating and simple real root α, while B(X) has a pair of conjugate complex dominating and simple roots β,β. Assume further that α/ β and β/β are not roots of unity and δ = |α|/ |β| ∈ Q. Then there are effectively computable constants c0,c1>0 such that the inequality |an - bm| > |an|1-(c0 2 n)/n holds for all n,m ∈ Z2 0 with \n,m\>c1.