English

Heavy subgraphs, stability and hamiltonicity

Combinatorics 2017-06-20 v3

Abstract

Let GG be a graph. Adopting the terminology of Broersma et al. and \v{C}ada, respectively, we say that GG is 2-heavy if every induced claw (K1,3K_{1,3}) of GG contains two end-vertices each one has degree at least V(G)/2|V(G)|/2; and GG is o-heavy if every induced claw of GG contains two end-vertices with degree sum at least V(G)|V(G)| in GG. In this paper, we introduce a new concept, and say that GG is \emph{SS-c-heavy} if for a given graph SS and every induced subgraph GG' of GG isomorphic to SS and every maximal clique CC of GG', every non-trivial component of GCG'-C contains a vertex of degree at least V(G)/2|V(G)|/2 in GG. In terms of this concept, our original motivation that a theorem of Hu in 1999 can be stated as every 2-connected 2-heavy and NN-c-heavy graph is hamiltonian, where NN is the graph obtained from a triangle by adding three disjoint pendant edges. In this paper, we will characterize all connected graphs SS such that every 2-connected o-heavy and SS-c-heavy graph is hamiltonian. Our work results in a different proof of a stronger version of Hu's theorem. Furthermore, our main result improves or extends several previous results.

Keywords

Cite

@article{arxiv.1506.02795,
  title  = {Heavy subgraphs, stability and hamiltonicity},
  author = {Binlong Li and Bo Ning},
  journal= {arXiv preprint arXiv:1506.02795},
  year   = {2017}
}

Comments

21 pages, 6 figures, finial version for publication in Discussiones Mathematicae Graph Theory

R2 v1 2026-06-22T09:49:53.714Z