Solution to a problem on hamiltonicity of graphs under Ore- and Fan-type heavy subgraph conditions

Abstract

A graph G is called claw-o-heavy if every induced claw (K1,3) of G has two end-vertices with degree sum at least |V(G)| in G. For a given graph R, G is called R-f-heavy if for every induced subgraph H of G isomorphic to R and every pair of vertices u,v∈ V(H) with dH(u,v)=2, there holds \d(u),d(v)\≥ |V(G)|/2. In this paper, we prove that every 2-connected claw-o-heavy and Z3-f-heavy graph is hamiltonian (with two exceptional graphs), where Z3 is the graph obtained from identifying one end-vertex of P4 (a path with 4 vertices) with one vertex of a triangle. This result gives a positive answer to a problem proposed in [B. Ning, S. Zhang, Ore- and Fan-type heavy subgraphs for Hamiltonicity of 2-connected graphs, Discrete Math. 313 (2013) 1715--1725], and also implies two previous theorems of Faudree et al. and Chen et al., respectively.