English

Bounds on Zimin Word Avoidance

Combinatorics 2014-10-30 v2

Abstract

How long can a word be that avoids the unavoidable? Word WW encounters word VV provided there is a homomorphism ϕ\phi defined by mapping letters to nonempty words such that ϕ(V)\phi(V) is a subword of WW. Otherwise, WW is said to avoid VV. If, on any arbitrary finite alphabet, there are finitely many words that avoid VV, then we say VV is unavoidable. Zimin (1982) proved that every unavoidable word is encountered by some word ZnZ_n, defined by: Z1=x1Z_1 = x_1 and Zn+1=Znxn+1ZnZ_{n+1} = Z_n x_{n+1} Z_n. Here we explore bounds on how long words can be and still avoid the unavoidable Zimin words.

Keywords

Cite

@article{arxiv.1409.3080,
  title  = {Bounds on Zimin Word Avoidance},
  author = {Joshua Cooper and Danny Rorabaugh},
  journal= {arXiv preprint arXiv:1409.3080},
  year   = {2014}
}

Comments

9 pages; presented 4 March 2014 at the 45th Southeastern International Conference on Combinatorics, Graph Theory, and Computing at Florida Atlantic University; accepted to appear in Congressus Numerantum

R2 v1 2026-06-22T05:53:27.242Z