A gap of the exponents of repetitions of Sturmian words

Abstract

By measuring second occurring times of factors of an infinite word x, Bugeaud and Kim introduced a new quantity rep(x) called the exponent of repetition of x. It was proved by Bugeaud and Kim that 1 ≤ rep(x) ≤ r = 10 - 3/2 if x is a Sturmian words. In this paper, we determine the value r1 such that there is no Sturmian word x satisfying r1 < rep(x) < r and r1 is an accumulation point of the set of rep(x) when x runs over the Sturmian words.