Moments in graphs

Abstract

Let G be a connected graph with vertex set V and a weight function that assigns a nonnegative number to each of its vertices. Then, the -moment of G at vertex u is defined to be MG(u)=Σv∈ V (v) (u,v) , where (·,·) stands for the distance function. Adding up all these numbers, we obtain the -moment of G: MG=Σu∈ VMG(u)=1/2Σu,v∈ V(u,v)[(u)+(v)]. This parameter generalizes, or it is closely related to, some well-known graph invariants, such as the Wiener index W(G), when (u)=1/2 for every u∈ V, and the degree distance D'(G), obtained when (u)=δ(u), the degree of vertex u. In this paper we derive some exact formulas for computing the -moment of a graph obtained by a general operation called graft product, which can be seen as a generalization of the hierarchical product, in terms of the corresponding -moments of its factors. As a consequence, we provide a method for obtaining nonisomorphic graphs with the same -moment for every (and hence with equal mean distance, Wiener index, degree distance, etc.). In the case when the factors are trees and/or cycles, techniques from linear algebra allow us to give formulas for the degree distance of their product.