The differential on Graph Operator R(G)

Abstract

Let G=(V(G), E(G)) be a simple graph with vertex set V(G) and edge set E(G). Let S be a subset of V(G), and let B(S) be the set of neighbours of S in V(G) S. The differential ∂(S) of S is the number |B(S)|-|S|. The maximum value of ∂(S) taken over all subsets S⊂eq V(G) is the differential ∂(G) of G. The graph RG is defined as the graph obtained from G by adding a new vertex ve for each e∈ E(G), and by joining ve to the end vertices of e. In this paper we study the relationship between ∂(G) and ∂(R(G)), and give tight asymptotic bounds for ∂(R(G)). We also exhibit some relationships between certain vertex sets of G and R(G) which involve well known graph theoretical parameters.