Maximal Unbordered Factors of Random Strings
Abstract
A border of a string is a non-empty prefix of the string that is also a suffix of the string, and a string is unbordered if it has no border other than itself. Loptev, Kucherov, and Starikovskaya [CPM 2015] conjectured the following: If we pick a string of length from a fixed non-unary alphabet uniformly at random, then the expected maximum length of its unbordered factors is . We confirm this conjecture by proving that the expected value is, in fact, , where is the size of the alphabet. This immediately implies that we can find such a maximal unbordered factor in linear time on average. However, we go further and show that the optimum average-case running time is in due to analogous bounds by Czumaj and G\k{a}sieniec [CPM 2000] for the problem of computing the shortest period of a uniformly random string.
Keywords
Cite
@article{arxiv.1704.04472,
title = {Maximal Unbordered Factors of Random Strings},
author = {Patrick Hagge Cording and Travis Gagie and Mathias Bæk Tejs Knudsen and Tomasz Kociumaka},
journal= {arXiv preprint arXiv:1704.04472},
year = {2018}
}
Comments
A preliminary version with weaker results was presented at the 23rd Symposium on String Processing and Information Retrieval (SPIRE '16)