Square-free Word-representation of Word-representable Graphs

Abstract

A graph G = (V, E) is word-representable, if there exists a word w over the alphabet V such that for letters x, y ∈ V , x and y alternate in w if and only if xy ∈ E. In this paper, we prove that any non-empty word-representable graph can be represented by a word containing no non-trivial squares. This result provides a positive answer to the open problem present in the book Words and graphs written by Sergey Kitaev, and Vadim Lozin. Also, we prove that for a word-representable graph G, if the representation number of G is k, then every k-uniform word representing the graph G is also square-free. Moreover, we prove that every minimal-length word representing a graph is square-free. Then, we count the number of possible square-free word-representations of a complete graph. At last, using the infinite square-free string generated from the Thue-Morse sequence, we prove that infinitely many square-free words represent a non-complete connected word-representable graph.