Laminar Tight Cuts in Matching Covered Graphs

Abstract

An edge cut C of a graph G is tight if |C M|=1 for every perfect matching M of G.~Barrier cuts and 2-separation cuts are called ELP-cuts, which are two important types of tight cuts in matching covered graphs.~Edmonds, Lov\'asz and Pulleyblank proved that if a matching covered graph has a nontrivial tight cut, then it also has a nontrivial ELP-cut.~Carvalho, Lucchesi, and Murty made a stronger conjecture: given any nontrivial tight cut C in a matching covered graph G, there exists a nontrivial ELP-cut D in G which does not cross C.~We confirm the conjecture in this paper.