2-connected equimatchable graphs on surfaces
Abstract
A graph is equimatchable if any matching in is a subset of a maximum-size matching. It is known that any -connected equimatchable graph is either bipartite or factor-critical. We prove that for any vertex of a -connected factor-critical equimatchable graph and a minimal matching that isolates the graph is either or for some . We use this result to improve the upper bounds on the maximum size of -connected equimatchable factor-critical graphs embeddable in the orientable surface of genus to if and to if . Moreover, for any nonnegative integer we construct a -connected equimatchable factor-critical graph with genus and more than vertices, which establishes that the maximum size of such graphs is . Similar bounds are obtained also for nonorientable surfaces. Finally, for any nonnegative integers , and we provide a construction of arbitrarily large -connected equimatchable bipartite graphs with orientable genus , respectively nonorientable genus , and a genus embedding with face-width .
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