Characterization of P3-connected graphs

Abstract

For any pair of edges e,f of a graph G, we say that e,f are P3-connected in G if there exists a sequence of edges e=e0,e1,…, ek=f such that ei and ei+1 are two edges of an induced 3-vertex path in G for every 0≤ i≤ k-1. If every pair of edges of G are P3-connected in G, then G is P3-connected. P3-connectivity was first defined by Chudnovsky et al. in 2024 to prove that every connected graph not containing P5 as an induced subgraph has cop number at most two. In this paper, we give a characterization of P3-connected graphs and prove that a simple graph is P3-connected if and only if it is connected and has no homogeneous set whose induced subgraph contains an edge.

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