Fan-type degree condition restricted to triples of induced subgraphs ensuring Hamiltonicity

Abstract

In 1984, Fan gave a sufficient condition involving maximum degree of every pair of vertices at distance two for a graph to be Hamiltonian. Motivated by Fan's result, we say that an induced subgraph H of a graph G is f-heavy if for every pair of vertices u,v∈ V(H), dH(u,v)=2 implies that \d(u),d(v)\≥ n/2. For a given graph R, G is called R-f-heavy if every induced subgraph of G isomorphic to R is f-heavy. For a family R of graphs, G is R-f-heavy if G is R-f-heavy for every R∈ R. In this note we show that every 2-connected graph G has a Hamilton cycle if G is \K1,3,P7,D\-f-heavy or \K1,3,P7,H\-f-heavy, where D is the deer and H is the hourglass. Our result is a common generalization of previous theorems of Broersma et al. and Fan on Hamiltonicity of 2-connected graphs.