Linear combinations of prime powers in sums of terms of binary recurrence sequences

Abstract

Let \ Un\n ≥ 0 be a non-degenerate binary recurrence sequence with positive discriminant. Let \p1,…, ps\ be fixed prime numbers and \b1,… ,bs\ be fixed non-negative integers. In this paper, we obtain the finiteness result for the solution of the Diophantine equation Un1 + ·s + Unt = b1 p1z1 + ·s+ bs pszs under certain assumptions. Moreover, we explicitly solve the equation Fn1+ Fn2= 2z1 +3z2, in non-negative integers n1, n2, z1, z2 with z2≥ z1. The main tools used in this work are the lower bound for linear forms in logarithms and the Baker-Davenport reduction method.