Sumsets of Wythoff Sequences, Fibonacci Representation, and Beyond

Abstract

Let α = (1+5)/2 and define the lower and upper Wythoff sequences by ai = i α , bi = i α2 for i ≥ 1. In a recent interesting paper, Kawsumarng et al. proved a number of results about numbers representable as sums of the form ai + aj, bi + bj, ai + bj, and so forth. In this paper I show how to derive all of their results, using one simple idea and existing free software called Walnut. The key idea is that for each of their sumsets, there is a relatively small automaton accepting the Fibonacci representation of the numbers represented. I also show how the automaton approach can easily prove other results.