A note on the maximum number of k-powers in a finite word

Abstract

A power is a word of the form uu...uk \; times, where u is a word and k is a positive integer; the power is also called a k-power and k is its exponent. We prove that for any k 2, the maximum number of different non-empty k-power factors in a word of length n is between nk-1-(n) and n-1k-1. We also show that the maximum number of different non-empty power factors of exponent at least 2 in a length-n word is at most n-1. Both upper bounds generalize the recent upper bound of n-1 on the maximum number of different square factors in a length-n word by Brlek and Li (2022).

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