Square-Free Shuffles of Words
Abstract
Let u v denote the set of all shuffles of the words u and v. It is shown that for each integer n ≥ 3 there exists a square-free ternary word u of length n such that u u contains a square-free word. This property is then shown to also hold for infinite words, i.e., there exists an infinite square-free word u on three letters such that u can be shuffled with itself to produce an infinite square-free word w ∈ u u.
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