English

Vizing's 2-factor Conjecture Involving Large Maximum Degree

Combinatorics 2014-10-02 v2

Abstract

Let GG be a connected simple graph of order nn and let Δ(G)\Delta(G) and χ(G)\chi'(G) denote the maximum degree and chromatic index of GG, respectively. Vizing proved that χ(G)=Δ(G)\chi'(G)=\Delta(G) or Δ(G)+1\Delta(G)+1. Following this result, GG is called Δ\Delta-critical if χ(G)=Δ(G)+1\chi'(G)=\Delta(G)+1 and χ(Ge)=Δ(G)\chi'(G-e)=\Delta(G) for every eE(G)e\in E(G). In 1968, Vizing conjectured that if GG is an nn-vertex Δ\Delta-critical graph, then the independence number α(G)n/2\alpha(G)\le n/2. Furthermore, he conjectured that, in fact, GG has a 2-factor. Luo and Zhao showed that if GG is an nn-vertex Δ\Delta-critical graph with Δ(G)n/2\Delta(G)\ge n/2, then α(G)n/2\alpha(G)\le n/2. More recently, they showed that if GG is an nn-vertex Δ\Delta-critical graph with Δ(G)6n/7\Delta(G)\ge 6n/7, then GG has a hamiltonian cycle, and so GG has a 2-factor. In this paper, we show that if GG is an nn-vertex Δ\Delta-critical graph with Δ(G)n/2\Delta(G)\ge n/2, then GG has a 2-factor.

Keywords

Cite

@article{arxiv.1404.6299,
  title  = {Vizing's 2-factor Conjecture Involving Large Maximum Degree},
  author = {Guantao Chen and Songling Shan},
  journal= {arXiv preprint arXiv:1404.6299},
  year   = {2014}
}
R2 v1 2026-06-22T03:58:22.952Z