Reconfiguration graphs for vertex colorings of P5-free graphs

Abstract

For any positive integer k, the reconfiguration graph for all k-colorings of a graph G, denoted by Rk(G), is the graph where vertices represent the k-colorings of G, and two k-colorings are joined by an edge if they differ in color on exactly one vertex. Bonamy et al. established that for any 2-chromatic P5-free graph G, Rk(G) is connected for each k≥ 3. On the other hand, Feghali and Merkel proved the existence of a 7p-chromatic P5-free graph G for every positive integer p, such that R8p(G) is disconnected. In this paper, we offer a detailed classification of the connectivity of R k(G) concerning t-chromatic P5-free graphs G for cases t=3, and t≥4 with t+1≤ k ≤ t2. We demonstrate that Rk(G) remains connected for each 3-chromatic P5-free graph G and each k ≥ 4. Furthermore, for each t≥4 and t+1 ≤ k ≤ t2, we provide a construction of a t-chromatic P5-free graph G with Rk(G) being disconnected. This resolves a question posed by Feghali and Merkel.