Critical Independent Sets of a Graph

Abstract

Let G be a simple graph with vertex set V( G) . A set S⊂eq V( G) is independent if no two vertices from S are adjacent, and by Ind(G) we mean the family of all independent sets of G. The number d( X) = X - N(X) is the difference of X⊂eq V( G) , and a set A∈Ind(G) is critical if d(A)= \d( I) :I∈Ind(G)\ (Zhang, 1990). Let us recall the following definitions: core( G) = S : S is a maximum independent set. corona( G) = S :S is a maximum independent set. (G) = S : S is a critical independent set. diadem(G) = S : S is a critical independent set. In this paper we present various structural properties of (G), in relation with core( G) , corona( G) , and diadem(G).