Word-Representable Co-Bipartite Graphs: Vertex Ordering, Representation Number, Speed, and Entropy

Abstract

A graph G(V, E) is word-representable if there exists a word w over the alphabet V such that for distinct letters x,y∈ V, x and y alternate in w if and only if they are adjacent in G. In general, determining whether a graph is word-representable is an NP-complete problem. A graph is co-bipartite if its complement is bipartite. Therefore, the vertex set of a co-bipartite graph can be partitioned into two disjoint subsets X and Y such that the subgraphs induced by X and Y are cliques. In this paper, we obtain necessary and sufficient conditions for a co-bipartite graph to be word-representable in terms of a vertex ordering. Based on this ordering, we study the representation number of word-representable co-bipartite graphs and analyse the speed and entropy of this graph class. We show that the representation number of any word-representable co-bipartite graph is at most 3, and that permutation graphs are the only co-bipartite graphs with representation number 2. We prove that the speed is 2O(n n) and the entropy is 0. This provides an asymptotic bound on the number of labelled graphs in this class, which is significantly smaller than the known bound for the class of all co-bipartite graphs. These results provide a better understanding of the structure and enumeration of word-representable co-bipartite graphs and show that vertex ordering is an effective tool for studying this class.