Squared distance matrices of trees with matrix weights

Abstract

Let T be a tree on n vertices whose edge weights are positive definite matrices of order s. The squared distance matrix of T, denoted by , is the ns × ns block matrix with ij=d(i,j)2, where d(i,j) is the sum of the weights of the edges in the unique (i,j)-path. In this article, we obtain a formula for the determinant of and find -1 under some conditions.

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