A Sharp Bound for the Marginal Appendage Number

For a connected graph G, the distance d(u, v) between two vertices u and v is the length of a shortest u − v path in G and the distance d(v) of a vertex v is the sum of the distances between v and all vertices of G. The margin, μ (G), is the subgraph induced by vertices of G having the maximum distance. It is known that every graph is isomorphic to the margin of some graph H. For a graph G, the marginal appendage number is defined as min{p(H) − p(G) ∣ μ(H) = G}. In this paper it is shown that Δ (G) + 2 is a sharp bound for the marginal appendage number.