Avoiding abelian powers cyclically

TL;DR

This paper introduces a new concept of cyclic avoidance of abelian powers in words, establishing bounds for the minimal N such that words over k-letter alphabets avoid abelian N-powers cyclically, with exact values for infinite cases.

Contribution

It defines and analyzes the parameters  and _\u221e for cyclic abelian power avoidance, providing bounds and exact values across different alphabet sizes.

Findings

(2) between 5 and 8

(3) between 3 and 4

(4) between 2 and 3

Abstract

We study a new notion of cyclic avoidance of abelian powers. A finite word $w$ avoids abelian $N$-powers cyclically if for each abelian $N$-power of period $m$ occurring in the infinite word $w^\omega$, we have $m \geq |w|$. Let $\mathcal{A}(k)$ be the least integer $N$ such that for all $n$ there exists a word of length $n$ over a $k$-letter alphabet that avoids abelian $N$-powers cyclically. Let $\mathcal{A}_\infty(k)$ be the least integer $N$ such that there exist arbitrarily long words over a $k$-letter alphabet that avoid abelian $N$-powers cyclically. We prove that $5 \leq \mathcal{A}(2) \leq 8$, $3 \leq \mathcal{A}(3) \leq 4$, $2 \leq \mathcal{A}(4) \leq 3$, and $\mathcal{A}(k) = 2$ for $k \geq 5$. Moreover, we show that $\mathcal{A}_\infty(2) = 4$, $\mathcal{A}_\infty(3) = 3$, and $\mathcal{A}_\infty(4) = 2$.