Effective results for linear Equations in Members of two Recurrence Sequences

Abstract

Let (Un)n=0∞ and (Vm)m=0∞ be two linear recurrence sequences. For fixed positive integers k and , fixed k-tuple (a1,…,ak)∈ Zk and fixed -tuple (b1,…,b)∈ Z we consider the linear equation a1Un1+·s +ak Unk=b1Vm1+·s + b Vm in the unknown non-negative integers n1,…,nk and m1,…,m. Under the assumption that the linear recurrences (Un)n=0∞ and (Vm)m=0∞ have dominant roots and under the assumption of further mild restrictions we show that this equation has only finitely many solutions which can be found effectively.