Squarefree words with interior disposable factors

Abstract

We give a partial answer to a problem of Harju by constructing an infinite ternary squarefree word w with the property that for every k ≥ 3312 there is an interior length-k factor of w that can be deleted while still preserving squarefreeness. We also examine Thue's famous squarefree word (generated by iterating the map 0 012, 1 02, 2 1) and characterize the positions i for which deleting the symbol appearing at position i preserves squarefreeness.