On monochromatic arithmetic progressions in binary words associated with pattern sequences

Abstract

Let ev(n) denote the number of occurrences of a fixed pattern v in the binary expansion of n ∈ N. In this paper we study monochromatic arithmetic progressions in the class of binary words (ev(n) 2)n ≥ 0, which includes the famous Thue--Morse word t and Rudin--Shapiro word r. We prove that the length of a monochromatic arithmetic progression of difference d ≥ 3 starting at 0 in r is at most (d+3)/2, with equality for infinitely many d. Moreover, we compute the maximal length of a monochromatic arithmetic progression in r of difference 2k-1 and 2k+1. For a general pattern v we provide an upper bound on the length of a monochromatic arithmetic progression of any difference d. We also prove other miscellaneous results and offer a number of related problems and conjectures.