Periodicity and Unbordered Words: A Proof of the Extended Duval Conjecture
Abstract
The relationship between the length of a word and the maximum length of its unbordered factors is investigated in this paper. Consider a finite word w of length n. We call a word bordered, if it has a proper prefix which is also a suffix of that word. Let f(w) denote the maximum length of all unbordered factors of w, and let p(w) denote the period of w. Clearly, f(w) < p(w)+1. We establish that f(w) = p(w), if w has an unbordered prefix of length f(w) and n > 2f(w)-2. This bound is tight and solves the stronger version of a 21 years old conjecture by Duval. It follows from this result that, in general, n > 3f(w)-3 implies f(w) = p(w) which gives an improved bound for the question asked by Ehrenfeucht and Silberger in 1979.
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