Hamiltonian cycles in 15 -tough ( P3 3P1 )-free graphs
Abstract
A graph G is called t -tough if |S|≥ t· w(G-S) for every cutset S of G. Chv\'atal conjectured that there exists a constant t0 such that every t0 -tough graph has a hamiltonian cycle. Gao and Shan have proved that every 7-tough (P3 2P1)-free grah is hamiltonian. In this paper, we confirm this conjecture for (P3 3P1) -free graphs.
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