Very Well-Covered Graphs of Girth at least Four and Local Maximum Stable Set Greedoids

Abstract

A maximum stable set in a graph G is a stable set of maximum cardinality. S is a local maximum stable set of G, and we write S∈(G), if S is a maximum stable set of the subgraph induced by S N(S), where N(S) is the neighborhood of S. Nemhauser and Trotter Jr. (1975), proved that any S∈(G) is a subset of a maximum stable set of G. In (Levit & Mandrescu, 2002) we have shown that the family (T) of a forest T forms a greedoid on its vertex set. The cases where G is bipartite, triangle-free, well-covered, while (G) is a greedoid, were analyzed in (Levit & Mandrescu, 2002),(Levit & Mandrescu, 2004),(Levit & Mandrescu, 2007), respectively. In this paper we demonstrate that if G is a very well-covered graph of girth ≥4, then the family (G) is a greedoid if and only if G has a unique perfect matching.