On balanced and abelian properties of circular words over a ternary alphabet

Abstract

We revisit the question of classification of balanced circular words and focus on the case of a ternary alphabet. We propose a 3-dimensional generalisation of the discrete approximation representation of Christoffel words. By considering the minimal bound 3 for abelian complexity of balanced circular words over a ternary alphabet, we provide a classification of all circular words over a ternary alphabet with abelian complexity subject to this bound. This result also allows us to construct an uncountable set of bi-infinite aperiodic words with abelian complexity equal to 3.