Hamiltonian cycles in 7-tough (P3 2P1)-free graphs

Abstract

The toughness of a noncomplete graph G is the maximum real number t such that the ratio of |S| to the number of components of G-S is at least t for every cutset S of G, and the toughness of a complete graph is defined to be ∞. Determining the toughness for a given graph is NP-hard. Chv\'atal's toughness conjecture, stating that there exists a constant t0 such that every graph with toughness at least t0 is hamiltonian, is still open for general graphs. A graph is called (P3 2P1)-free if it does not contain any induced subgraph isomorphic to P3 2P1, the disjoint union of P3 and two isolated vertices. In this paper, we confirm Chv\'atal's toughness conjecture for (P3 2P1)-free graphs by showing that every 7-tough (P3 2P1)-free graph on at least three vertices is hamiltonian.