English

Surface embedding of $(n,k)$-extendable graphs

Combinatorics 2014-08-19 v1

Abstract

This paper is concerned with the surface embedding of matching extendable graphs. There are two directions extending the theory of perfect matchings, that is, matching extendability and factor-criticality. In solving a problem posed by Plummer, Dean (The matching extendability of surfaces, J. Combin. Theory Ser. B 54 (1992), 133--141) established the fascinating formula for the minimum number k=μ(Σ)k= \mu (\Sigma) such that every Σ\Sigma-embeddable graph is not kk-extendable. Su and Zhang, Plummer and Zha found the minimum number n=ρ(Σ)n=\rho(\Sigma) such that every Σ\Sigma-embeddable graph is not nn-factor-critical. Based on the notion of (n,k)(n,k)-graphs which associates these two parameters, we found the formula for the minimum number k=μ(n,Σ)k=\mu(n,\Sigma) such that every Σ\Sigma-embeddable graph is not an (n,k)(n,k)-graph. To access this two-parameter-problem, we consider its dual problem and find out μ(n,Σ)\mu(n,\Sigma) conversely. The same approach works for rediscovering the formula of the number ρ(Σ)\rho(\Sigma).

Keywords

Cite

@article{arxiv.1408.4046,
  title  = {Surface embedding of $(n,k)$-extendable graphs},
  author = {Hongliang Lu and David G. L. Wang},
  journal= {arXiv preprint arXiv:1408.4046},
  year   = {2014}
}

Comments

17 pages

R2 v1 2026-06-22T05:32:15.514Z