The Moore-Penrose Inverse of the Distance Matrix of a Helm Graph

Abstract

In this paper, we give necessary and sufficient conditions for a real symmetric matrix, and in particular, for the distance matrix D(Hn) of a helm graph Hn to have their Moore-Penrose inverses as the sum of a symmetric Laplacian-like matrix and a rank one matrix. As a consequence, we present a short proof of the inverse formula, given by Goel (Linear Algebra Appl. 621:86--104, 2021), for D(Hn) when n is even. Further, we derive a formula for the Moore-Penrose inverse of singular D(Hn) that is analogous to the formula for D(Hn)-1. Precisely, if n is odd, we find a symmetric positive semidefinite Laplacian-like matrix L of order 2n-1 and a vector w∈ R2n-1 such that eqnarray* D(Hn)2 = -12L + 43(n-1)ww, eqnarray* where the rank of L is 2n-3. We also investigate the inertia of D(Hn).