Distance matrices perturbed by a Laplacian

Abstract

Let T be a tree with n vertices. To each edge of T, we assign a weight which is a positive definite matrix of some fixed order, say, s. Let Dij denote the sum of all the weights lying in the path connecting the vertices i and j of T. We now say that Dij is the distance between i and j. Define D:=[Dij], where Dii is the s × s null matrix and for i ≠ j, Dij is the distance between i and j. Let G be an arbitrary connected weighted graph with n vertices, where each weight is a positive definite matrix of order s. If i and j are adjacent, then define Lij:=-Wij-1, where Wij is the weight of the edge (i,j). Define Lii:=Σi ≠ j,j=1nWij-1. The Laplacian of G is now the ns × ns block matrix L:=[Lij]. In this paper, we first note that D-1-L is always non-singular and then we prove that D and its perturbation (D-1-L)-1 have many interesting properties in common.