How many double squares can a string contain?
Combinatorics
2014-08-05 v3
Abstract
Counting the types of squares rather than their occurrences, we consider the problem of bounding the number of distinct squares in a string. Fraenkel and Simpson showed in 1998 that a string of length n contains at most 2n distinct squares. Ilie presented in 2007 an asymptotic upper bound of 2n - Theta(log n). We show that a string of length n contains at most 5n/3 distinct squares. This new upper bound is obtained by investigating the combinatorial structure of double squares and showing that a string of length n contains at most 2n/3 double squares. In addition, the established structural properties provide a novel proof of Fraenkel and Simpson's result.
Cite
@article{arxiv.1310.3429,
title = {How many double squares can a string contain?},
author = {Antoine Deza and Frantisek Franek and Adrien Thierry},
journal= {arXiv preprint arXiv:1310.3429},
year = {2014}
}
Comments
29 pages, 20 figures