Inverse of the Squared Distance Matrix of a Complete Multipartite Graph

Abstract

Let G be a connected graph on n vertices and dij be the length of the shortest path between vertices i and j in G. We set dii=0 for every vertex i in G. The squared distance matrix (G) of G is the n× n matrix with (i,j)th entry equal to 0 if i = j and equal to dij2 if i ≠ j. For a given complete t-partite graph Kn1,n2,·s,nt on n=Σi=1t ni vertices, under some condition we find the inverse (Kn1,n2,·s,nt)-1 as a rank-one perturbation of a symmetric Laplacian-like matrix L with rank (L)=n-1. We also investigate the inertia of L.

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