Randi\'c energy and Randi\'c eigenvalues

Abstract

Let G be a graph of order n, and di the degree of a vertex vi of G. The Randi\'c matrix R=(rij) of G is defined by rij = 1 / djdj if the vertices vi and vj are adjacent in G and rij=0 otherwise. The normalized signless Laplacian matrix Q is defined as Q =I+R, where I is the identity matrix. The Randi\'c energy is the sum of absolute values of the eigenvalues of R. In this paper, we find a relation between the normalized signless Laplacian eigenvalues of G and the Randi\'c energy of its subdivided graph S(G). We also give a necessary and sufficient condition for a graph to have exactly k and distinct Randi\'c eigenvalues.