Lie complexity of words

Abstract

Given a finite alphabet and a right-infinite word w over , we define the Lie complexity function L w:N N, whose value at n is the number of conjugacy classes (under cyclic shift) of length-n factors x of w with the property that every element of the conjugacy class appears in w. We show that the Lie complexity function is uniformly bounded for words with linear factor complexity, and as a result we show that words of linear factor complexity have at most finitely many primitive factors y with the property that yn is again a factor for every n. We then look at automatic sequences and show that the Lie complexity function of a k-automatic sequence is again k-automatic.