Doubled patterns are 3-avoidable

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=h(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. A pattern is said to be doubled if no variable occurs only once. Doubled patterns with at most 3 variables and patterns with at least 6 variables are 3-avoidable. We show that doubled patterns with 4 and 5 variables are also 3-avoidable.