Diophantine equations over the generalized Fibonacci sequences: exploring sums of powers

Abstract

Let (Fn)n be the classical Fibonacci sequence. It is well-known that it satisfies Fn2 + Fn+12 = F2n+1. In this study, we explore generalizations of this Diophantine equation in several directions. First, we solve the Diophantine equation (Fn(k))2 + (Fn+d(k))2 = Fm(k) over the k-generalized Fibonacci numbers for every k ≥ 2, generalizing Chaves and Marques. Next, we solve Fns + Fn+ds = Fm over the Fibonacci numbers for every s ≥ 2, generalizing Luca and Oyono. Finally, we solve the Diophantine equation Fns + ·s + Fn+ds = Fm for d+1 < n and s ≥ 2.