English

Doubled patterns with reversal and square-free doubled patterns

Combinatorics 2022-03-02 v4

Abstract

In combinatorics on words, a word ww over an alphabet Σ\Sigma is said to avoid a pattern pp over an alphabet Δ\Delta if there is no factor ff of ww such that f=h(p)f=h(p) where h:ΔΣh:\Delta^*\to\Sigma^* is a non-erasing morphism. A pattern pp is said to be kk-avoidable if there exists an infinite word over a kk-letter alphabet that avoids pp. A pattern is \emph{doubled} if every variable occurs at least twice. Doubled patterns are known to be 33-avoidable. Currie, Mol, and Rampersad have considered a generalized notion which allows variable occurrences to be reversed. That is, h(VR)h(V^R) is the mirror image of h(V)h(V) for every VΔV\in\Delta. We show that doubled patterns with reversal are 33-avoidable. We also conjecture that (classical) doubled patterns that do not contain a square are 22-avoidable. We confirm this conjecture for patterns with at most 4 variables. This implies that for every doubled pattern pp, the growth rate of ternary words avoiding pp is at least the growth rate of ternary square-free words. A previous version of this paper containing only the first result has been presented at WORDS 2021.

Keywords

Cite

@article{arxiv.2105.04673,
  title  = {Doubled patterns with reversal and square-free doubled patterns},
  author = {Antoine Domenech and Pascal Ochem},
  journal= {arXiv preprint arXiv:2105.04673},
  year   = {2022}
}
R2 v1 2026-06-24T01:57:56.528Z