More results on the distance (signless) Laplacian eigenvalues of graphs

Abstract

Let G be a connected graph with vertex set V(G) and edge set E(G). Let Tr(G) be the diagonal matrix of vertex transmissions of G and D(G) be the distance matrix of G. The distance Laplacian matrix of G is defined as L(G)=Tr(G)-D(G). The distance signless Laplacian matrix of G is defined as Q(G)=Tr(G)+D(G). In this paper, we give a lower bound on the distance Laplacian spectral radius in terms of D1, as a consequence, we show that ∂1L(G)≥ n+nω where ω is the clique number of G. Furthermore, we give some graft transformations, by using them, we characterize the extremal graph attains the maximum distance spectral radius in terms of n and ω. Moreover, we also give bounds on the distance signless Laplacian eigenvalues of G, and give a confirmation on a conjecture due to Aouchiche and Hansen.