Antisquares and Critical Exponents
Abstract
The (bitwise) complement of a binary word is obtained by changing each in to and vice versa. An is a nonempty word of the form . In this paper, we study infinite binary words that do not contain arbitrarily large antisquares. For example, we show that the repetition threshold for the language of infinite binary words containing exactly two distinct antisquares is . We also study repetition thresholds for related classes, where "two" in the previous sentence is replaced by a larger number. We say a binary word is if the only antisquares it contains are and . We characterize the minimal antisquares, that is, those words that are antisquares but all proper factors are good. We determine the growth rate of the number of good words of length and determine the repetition threshold between polynomial and exponential growth for the number of good words.
Cite
@article{arxiv.2209.09223,
title = {Antisquares and Critical Exponents},
author = {Aseem Baranwal and James Currie and Lucas Mol and Pascal Ochem and Narad Rampersad and Jeffrey Shallit},
journal= {arXiv preprint arXiv:2209.09223},
year = {2024}
}