On the irrationality exponent of real numbers with low complexity expansion

Abstract

Let be a real number and b 2 an integer. We study the relationship between the irrationality exponent of and the subword complexity p(n, x) of the b-ary expansion x of , where p(n, x) counts the number of distinct blocks of length n in x, for n 1. If the irrationality exponent of is equal to 2, which is the case for almost all real numbers , we show that the limit superior of the sequence (p(n, x) / n)n 1 is at least equal to 4/3. The proof is based on a careful study of the evolution of the Rauzy graphs of infinite words of low complexity.

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