Excluded conformal minors of Birkhoff-von Neumann graphs with equal global forcing number and maximum anti-forcing number

Abstract

Global forcing number and maximum anti-forcing number of matchable graphs (graphs with a perfect matching) were proposed in completely different situations with applications in theoretical chemistry. Surprisingly for bipartite graphs and some nonbipartite graphs as solid bricks (or Birkhoff-von Neumann graphs) G, the global forcing number gf(G) is at least the maximum anti-forcing number Af(G). It is natural to consider when gf(G) = Af(G) holds. For convenience, we call a matchable graph G strongly uniform if each conformal matchable subgraph G' always satisfies gf(G') = Af(G'). In this article, by applying the ear decomposition theorem and discussing the existence of a Hamilton cycle with positions of chords, we give "excluded conformal minors" and "structural" characterizations of matchable bipartite graphs and Birkhoff-von Neumann graphs that are strongly uniform respectively.

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