Equimatchable Graphs on Surfaces
| Authors | |
|---|---|
| Year of publication | 2016 |
| Type | Article in Periodical |
| Magazine / Source | Journal of Graph Theory |
| MU Faculty or unit | |
| Citation | |
| Web | http://dx.doi.org/10.1002/jgt.21859 |
| Doi | http://dx.doi.org/10.1002/jgt.21859 |
| Field | Informatics |
| Keywords | graph; matching; equimatchable; factor-critical; embedding; genus; bipartite; degeneracy |
| Description | A graph G is equimatchable if each matching in G is a subset of a maximum-size matching and it is factor critical if G - v has a perfect matching for each vertex v of G. It is known that any 2-connected equimatchable graph is either bipartite or factor critical. We prove that for 2-connected factor-critical equimatchable graph G the graph G\(V(M) U {v}) is either K_{2n} or K_{n,n} for some n for any vertex v of G and any minimal matching M such that {v} is a component of G\V(M). We use this result to improve the upper bounds on the maximum number of vertices of 2-connected equimatchable factor-critical graphs embeddable in the orientable surface of genus g to 4\sqrt{g} + 17 if g <= 2 and to 12\sqrt{g} + 5 if g >= 3. Moreover, for any nonnegative integer g we construct a 2-connected equimatchable factor-critical graph with genus g and more than 4\sqrt{2g} vertices, which establishes that the maximum size of such graphs is \Theta(\sqrt{g}). Similar bounds are obtained also for nonorientable surfaces. In the bipartite case for any nonnegative integers g, h, and k we provide a construction of arbitrarily large 2-connected equimatchable bipartite graphs with orientable genus g, respectively nonorientable genus h, and a genus embedding with face-width k. Finally, we prove that any d-degenerate 2-connected equimatchable factor-critical graph has at most 4d + 1 vertices, where a graph is d-degenerate if every its induced subgraph contains a vertex of degree at most d. |
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