Hamiltonian cycles in tough (P2 P3)-free graphs

Abstract

Let t>0 be a real number and G be a graph. We say G is t-tough if for every cutset S of G, the ratio of |S| to the number of components of G-S is at least t. Determining toughness is an NP-hard problem for arbitrary graphs. The Toughness Conjecture of Chv\'atal, stating that there exists a constant t0 such that every t0-tough graph with at least three vertices is hamiltonian, is still open in general. A graph is called (P2 P3)-free if it does not contain any induced subgraph isomorphic to P2 P3, the union of two vertex-disjoint paths of order 2 and 3, respectively. In this paper, we show that every 15-tough (P2 P3)-free graph with at least three vertices is hamiltonian.