English

2-connected equimatchable graphs on surfaces

Combinatorics 2013-12-13 v1

Abstract

A graph GG is equimatchable if any matching in GG is a subset of a maximum-size matching. It is known that any 22-connected equimatchable graph is either bipartite or factor-critical. We prove that for any vertex vv of a 22-connected factor-critical equimatchable graph GG and a minimal matching MM that isolates vv the graph G(M{v})G\setminus(M\cup\{ v\}) is either K2nK_{2n} or Kn,nK_{n,n} for some nn. We use this result to improve the upper bounds on the maximum size of 22-connected equimatchable factor-critical graphs embeddable in the orientable surface of genus gg to 4g+174\sqrt g+17 if g2g\le 2 and to 12g+512\sqrt g+5 if g3g\ge 3. Moreover, for any nonnegative integer gg we construct a 22-connected equimatchable factor-critical graph with genus gg and more than 42g4\sqrt{2g} vertices, which establishes that the maximum size of such graphs is Θ(g)\Theta(\sqrt g). Similar bounds are obtained also for nonorientable surfaces. Finally, for any nonnegative integers gg, hh and kk we provide a construction of arbitrarily large 22-connected equimatchable bipartite graphs with orientable genus gg, respectively nonorientable genus hh, and a genus embedding with face-width kk.

Keywords

Cite

@article{arxiv.1312.3423,
  title  = {2-connected equimatchable graphs on surfaces},
  author = {Eduard Eiben and Michal Kotrbčík},
  journal= {arXiv preprint arXiv:1312.3423},
  year   = {2013}
}

Comments

10 pages

R2 v1 2026-06-22T02:26:06.067Z