Asymptotic repetitive threshold of balanced sequences
Abstract
The critical exponent E( u) of an infinite sequence u over a finite alphabet expresses the maximal repetition of a factor in u. By the famous Dejean's theorem, E( u) ≥ 1+1d-1 for every d-ary sequence u. We define the asymptotic critical exponent E*( u) as the upper limit of the maximal repetition of factors of length n. We show that for any d>1 there exists a d-ary sequence u having E*( u) arbitrarily close to 1. Then we focus on the class of d-ary balanced sequences. In this class, the values E*( u) are bounded from below by a threshold strictly bigger than 1. We provide a method which enables us to find a d-ary balanced sequence with the least asymptotic critical exponent for 2≤ d≤ 10.
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