On graphs with 1-matching and 2-matching edges

Abstract

Let \(G\) be a graph admitting a perfect matching. An edge is called a \(k\)-matching edge if it belongs to exactly \(k\) perfect matchings, and a \(k+\)-matching edge if it belongs to at least \(k\) perfect matchings. Thus, an admissible edge is a \(1+\)-matching edge, and a connected graph is matching covered if every edge is admissible. We call a connected graph \(k\)-matching covered if every edge is a \(k\)-matching edge; in particular, a \(2\)-matching covered graph is called matching double covered. Motivated by matching-covered graph theory and the Berge--Fulkerson conjecture (1970s), we introduce the class \(B\) of connected graphs in which every edge is either a \(1\)-matching edge or a \(2\)-matching edge, and no perfect matching contains edges of both types. In particular, every matching double covered graph belongs to \(B\). Using ear decompositions and tight-cut decompositions, we establish a complete structural characterization of graphs in \(B\). These characterizations reveal how restrictions on the number of perfect matchings containing each edge determine the global structure of the corresponding matching-covered graphs.

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