On distance matrices of wheel graphs with odd number of vertices

Abstract

Let Wn denote the wheel graph having n-vertices. If i and j are any two vertices of Wn, define \[dij:= cases 0 & if~i=j \\ 1 & if~i~ and ~j~ are adjacent \\ 2 & else. cases\] Let D be the n × n matrix with (i,j) th entry equal to dij. The matrix D is called the distance matrix of Wn. Suppose n ≥ 5 is an odd integer. In this paper, we deduce a formula to compute the Moore-Penrose inverse of D. More precisely, we obtain an n× n matrix L and a rank one matrix ww' such that \[D = -12 L+4n-1ww'.\] Here, L is positive semidefinite, rank(L)=n-2 and all row sums are equal to zero.