Variations of the Morse-Hedlund Theorem for k-Abelian Equivalence

Abstract

In this paper we investigate local to global phenomena for a new family of complexity functions of infinite words indexed by k ∈ \+∞\ where denotes the set of positive integers. Two finite words u and v in A* are said to be k-Abelian equivalent if for all x ∈ A* of length less than or equal to k, the number of occurrences of x in u is equal to the number of occurrences of x in v. This defines a family of equivalence relations k on A*, bridging the gap between the usual notion of Abelian equivalence (when k = 1) and equality (when k = +∞). Given an infinite word w ∈ Aω, we consider the associated complexity function P(k)w : → which counts the number of k-Abelian equivalence classes of factors of w of length n. As a whole, these complexity functions have a number of common features: Each gives a characterization of periodicity in the context of bi-infinite words, and each can be used to characterize Sturmian words in the framework of aperiodic one-sided infinite words. Nevertheless, they also exhibit a number of striking differences, the study of which is one of the main topics of our paper.