On the resolution of the Diophantine equation Un + Um = xq

Abstract

Suppose that (Un)n ≥ 0 is a binary recurrence sequence and has a dominant root α with α>1 and the discriminant D is square-free. In this paper, we study the Diophantine equation Un + Um = xq in integers n ≥ m ≥ 0, x ≥ 2, and q ≥ 2. Firstly, we show that there are only finitely many of them for a fixed x using linear forms in logarithms. Secondly, we show that there are only finitely many solutions in (n, m, x, q) with q, x≥ 2 under the assumption of the abc-conjecture. To prove this, we use several classical results like Schmidt subspace theorem, a fundamental theorem on linear equations in S-units and Siegel's theorem concerning the finiteness of the number of solutions of a hyperelliptic equation.