On Eccentricity Matrices of Wheel Graphs

Abstract

The eccentricity matrix E(G) of a simple connected graph G is obtained from the distance matrix D(G) of G by retaining the largest distance in each row and column, and by defining the remaining entries to be zero. This paper focuses on the eccentricity matrix E(Wn) of the wheel graph Wn with n vertices. By establishing a formula for the determinant of E(Wn), we show that E(Wn) is invertible if and only if n 13. We derive a formula for the inverse of E(Wn) by finding a vector w∈ Rn and an n × n symmetric Laplacian-like matrix L of rank n-1 such that eqnarray* E(Wn)-1 = -12L + 6n-1ww. eqnarray* Further, we prove an analogous result for the Moore-Penrose inverse of E(Wn) for the singular case. We also determine the inertia of E(Wn).