On Domination Number and Distance in Graphs

Abstract

A vertex set S of a graph G is a dominating set if each vertex of G either belongs to S or is adjacent to a vertex in S. The domination number γ(G) of G is the minimum cardinality of S as S varies over all dominating sets of G. It is known that γ(G) 13(diam(G)+1), where diam(G) denotes the diameter of G. Define Cr as the largest constant such that γ(G) Cr Σ1 i < j rd(xi, xj) for any r vertices of an arbitrary connected graph G; then C2=13 in this view. The main result of this paper is that Cr=1r(r-1) for r≥ 3. It immediately follows that γ(G)≥ μ(G)=1n(n-1)W(G), where μ(G) and W(G) are respectively the average distance and the Wiener index of G of order n. As an application of our main result, we prove a conjecture of DeLaVi\~na et al.\;that γ(G)≥ 12(eccG(B)+1), where eccG(B) denotes the eccentricity of the boundary of an arbitrary connected graph G.