English

Tower-type bounds for unavoidable patterns in words

Combinatorics 2018-11-06 v2

Abstract

A word ww is said to contain the pattern PP if there is a way to substitute a nonempty word for each letter in PP so that the resulting word is a subword of ww. Bean, Ehrenfeucht and McNulty and, independently, Zimin characterised the patterns PP which are unavoidable, in the sense that any sufficiently long word over a fixed alphabet contains PP. Zimin's characterisation says that a pattern is unavoidable if and only if it is contained in a Zimin word, where the Zimin words are defined by Z1=x1Z_1 = x_1 and Zn=Zn1xnZn1Z_n=Z_{n-1} x_n Z_{n-1}. We study the quantitative aspects of this theorem, obtaining essentially tight tower-type bounds for the function f(n,q)f(n,q), the least integer such that any word of length f(n,q)f(n, q) over an alphabet of size qq contains ZnZ_n. When n=3n = 3, the first non-trivial case, we determine f(n,q)f(n,q) up to a constant factor, showing that f(3,q)=Θ(2qq!)f(3,q) = \Theta(2^q q!).

Keywords

Cite

@article{arxiv.1704.03479,
  title  = {Tower-type bounds for unavoidable patterns in words},
  author = {David Conlon and Jacob Fox and Benny Sudakov},
  journal= {arXiv preprint arXiv:1704.03479},
  year   = {2018}
}

Comments

17 pages

R2 v1 2026-06-22T19:14:43.317Z