Application of entropy compression in pattern avoidance

Abstract

In combinatorics on words, a word w over an alphabet is said to avoid a pattern p over an alphabet if there is no factor f of w such that f= (p) where h: ** is a non-erasing morphism. A pattern p is said to be k-avoidable if there exists an infinite word over a k-letter alphabet that avoids p. We give a positive answer to Problem 3.3.2 in Lothaire's book "Algebraic combinatorics on words", that is, every pattern with k variables of length at least 2k (resp. 3×2k-1) is 3-avoidable (resp. 2-avoidable). This improves previous bounds due to Bell and Goh, and Rampersad.