On the Number of Rational Power Factors in a Finite Word

Abstract

Let w be a finite word of length n. In this paper, we study the maximum possible number of distinct rational power factors in a finite word. A rational power is a word of the form u=pkp', where p is a nonempty finite word, k is an integer larger than 1, pk is a concatenation of k copies of p and p' is a prefix of p. The rational powers can be recognized as a generalization of k-powers, and it is proved in [Li,Pachocki,Radoszewski 24] that, the number Ck(w) of distinct k-powers in w satisfies Ck(w) ≤ n-1k-1. However, the number of rational powers has not been studied in the literature. In this article, we prove that the number RP(w) of distinct rational power factors of w satisfies RP(w)18n2+O(n). We also illustrate a novel approach to study pattern-counting problems: using a graph-theoretic representation of words and a few word equations, we transform the traditional pattern-counting problems into a constrained extremal problem.