The Steiner diameter of a graph

Abstract

The Steiner distance of a graph, introduced by Chartrand, Oellermann, Tian and Zou in 1989, is a natural generalization of the concept of classical graph distance. For a connected graph G of order at least 2 and S⊂eq V(G), the Steiner distance d(S) among the vertices of S is the minimum size among all connected subgraphs whose vertex sets contain S. Let n,k be two integers with 2≤ k≤ n. Then the Steiner k-eccentricity ek(v) of a vertex v of G is defined by ek(v)= \d(S)\,|\,S⊂eq V(G), \ |S|=k, \ and \ v∈ S \. Furthermore, the Steiner k-diameter of G is sdiamk(G)= \ek(v)\,|\, v∈ V(G)\. In 2011, Chartrand, Okamoto and Zhang showed that k-1≤ sdiamk(G)≤ n-1. In this paper, graphs with sdiam3(G)=2,3,n-1 are characterized, respectively. We also consider the Nordhaus-Gaddum-type results for the parameter sdiamk(G). We determine sharp upper and lower bounds of sdiamk(G)+sdiamk(G) and sdiamk(G)· sdiamk(G) for a graph G of order n. Some graph classes attaining these bounds are also given.