Anti-Power Prefixes of the Thue-Morse Word

Abstract

Recently, Fici, Restivo, Silva, and Zamboni defined a k-anti-power to be a word of the form w1w2·s wk, where w1,w2,…,wk are distinct words of the same length. They defined AP(x,k) to be the set of all positive integers m such that the prefix of length km of the word x is a k-anti-power. Let t denote the Thue-Morse word, and let F(k)=AP( t,k)(2 Z+-1). For k≥ 3, γ(k)=( F(k)) and (k)=((2 Z+-1) F(k)) are well-defined odd positive integers. Fici et al. speculated that γ(k) grows linearly in k. We prove that this is indeed the case by showing that 1/2≤k∞(γ(k)/k)≤ 9/10 and 1≤k∞(γ(k)/k)≤ 3/2. In addition, we prove that k∞((k)/k)=3/2 and k∞((k)/k)=3.