On the maximal sum of exponents of runs in a string

Abstract

A run is an inclusion maximal occurrence in a string (as a subinterval) of a repetition v with a period p such that 2p |v|. The exponent of a run is defined as |v|/p and is 2. We show new bounds on the maximal sum of exponents of runs in a string of length n. Our upper bound of 4.1n is better than the best previously known proven bound of 5.6n by Crochemore & Ilie (2008). The lower bound of 2.035n, obtained using a family of binary words, contradicts the conjecture of Kolpakov & Kucherov (1999) that the maximal sum of exponents of runs in a string of length n is smaller than 2n