Binary recurrences for which powers of two are discriminating moduli

Abstract

Given a sequence of distinct positive integers w0 , w1, w2, … and any positive integer n, we define the discriminator function D w(n) to be the smallest positive integer m such that w0,…, wn-1 are pairwise incongruent modulo m. In this paper, we classify all binary recurrent sequences \wn\n≥ 0 consisting of different integer terms such that D w(2e)=2e for every e≥ 1. For all of these sequences it is expected that one can actually give a fairly simple description of D w(n) for every n 1. For two infinite families of such sequences this has been done already in 2019 by Faye, Luca and Moree, respectively Ciolan and Moree.