Hamiltonicity of 3-tough (K2 3K1)-free graphs
Abstract
Chv\'atal conjectured in 1973 the existence of some constant t such that all t-tough graphs with at least three vertices are hamiltonian. While the conjecture has been proven for some special classes of graphs, it remains open in general. We say that a graph is (K2 3K1)-free if it contains no induced subgraph isomorphic to K2 3K1, where K2 3K1 is the disjoint union of an edge and three isolated vertices. In this paper, we show that every 3-tough (K2 3K1)-free graph with at least three vertices is hamiltonian.
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