On the eccentricity energy of complete mutipartite graph

Abstract

The eccentricity (anti-adjacency) matrix (G) of a graph G is obtained from the distance matrix by retaining the eccentricities in each row and each column. The -eigenvalues of a graph G are those of its eccentricity matrix (G), and the eccentricity energy (or the -energy) of G is the sum of the absolute values of -eigenvalues. In this paper, we establish some bounds for the -energy of the complete multipartite graph Kn1, n2, …,np of order n= Σi=1p ni and characterize the extreme graphs. This partially answers the problem given in Wang et al. (2019). We finish the paper showing graphs that are not -cospectral with the same -energy.