Combinatorics on finite words and the length of a finite-dimensional associative algebra

Abstract

Let fW(n) be the number of different factors of length n appearing in W. A classical result of Morse and Hedlund, stated in 1938, asserts that an infinite word W is ultimately periodic if and only if fW(n)≤ n for some n∈ N. In this paper, we describe the form of finite words that satisfy the condition fW(n)≤ n. We study relations between power avoidance and subword complexity of a finite word. We apply our combinatorial results to study the interrelations between various numerical invariants of finite-dimensional associative algebras.