Hamilton cycles in almost distance-hereditary graphs

Abstract

Let G be a graph on n≥ 3 vertices. A graph G is almost distance-hereditary if each connected induced subgraph H of G has the property dH(x,y)≤ dG(x,y)+1 for any pair of vertices x,y∈ V(H). A graph G is called 1-heavy (2-heavy) if at least one (two) of the end vertices of each induced subgraph of G isomorphic to K1,3 (a claw) has (have) degree at least n/2, and called claw-heavy if each claw of G has a pair of end vertices with degree sum at least n. Thus every 2-heavy graph is claw-heavy. In this paper we prove the following two results: (1) Every 2-connected, claw-heavy and almost distance-hereditary graph is Hamiltonian. (2) Every 3-connected, 1-heavy and almost distance-hereditary graph is Hamiltonian. In particular, the first result improves a previous theorem of Feng and Guo. Both results are sharp in some sense.