On a problem of Pillai with k-generalised Fibonacci numbers and powers of 2

Abstract

For an integer k≥ 2 , let \F(k)n \n≥ 0 be the k--generalized Fibonacci sequence which starts with 0, …, 0, 1 ( k terms) and each term afterwards is the sum of the k preceding terms. In this paper, we find all integers c having at least two representations as a difference between a k--generalized Fibonacci number and a powers of 2 for any fixed k ≥slant 4. This paper extends previous work from [9] for the case k=2 and [6] for the case k=3.