On the expansions of real numbers in two integer bases
Abstract
Let r and s be multiplicatively independent positive integers. We establish that the r-ary expansion and the s-ary expansion of an irrational real number, viewed as infinite words on \0, 1, … , r-1\ and \0, 1, … , s-1\, respectively, cannot have simultaneously a low block complexity. In particular, they cannot be both Sturmian words.
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