Forbidden Induced Subgraph Characterization of Word-Representable Co-bipartite Graphs

Abstract

A graph G with vertex set V(G) and edge set E(G) is said to be word-representable if there exists a word w over the alphabet V(G) such that, for any two distinct letters x,y ∈ V(G), the letters x and y alternate in w if and only if (x,y) ∈ E(G). Equivalently, a graph is word-representable if and only if it admits a semi-transitive orientation, that is, an acyclic orientation in which, for every directed path v0 → v1 → ·s → vm with m 2, either there is no arc between v0 and vm, or, for all 1 i < j m, there exists an arc from vi to vj. In this work, we provide a comprehensive structural and algorithmic characterization of word-representable co-bipartite graphs, a class of graphs whose vertex set can be partitioned into two cliques. This work unifies graph-theoretic and matrix-theoretic perspectives. We first establish that a co-bipartite graph is a circle graph if and only if it is a permutation graph, thereby deriving a minimal forbidden induced subgraph characterization for co-bipartite circle graphs. The central contribution then connects semi-transitivity with the circularly compatible ones property of binary matrices. In addition to the structural characterization, the paper introduces a linear-time recognition algorithm for semi-transitive co-bipartite graphs, utilizing Safe's matrix recognition framework.

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