Distance matrix correlation spectrum of graphs

Abstract

Let G be a simple, connected graph, D(G) be the distance matrix of G, and Tr(G) be the diagonal matrix of vertex transmissions of G. The distance Laplacian matrix and distance signless Laplacian matrix of G are defined by L(G) = Tr(G)-D(G) and Q(G) = Tr(G)+D(G), respectively. The eigenvalues of D(G), L(G) and Q(G) is called the D-spectrum, L-spectrum and Q-spectrum, respectively. The generalized distance matrix of G is defined as Dα(G)=α Tr(G)+(1-α)D(G),~0≤α≤1, and the generalized distance spectral radius of G is the largest eigenvalue of Dα(G). In this paper, we give a complete description of the D-spectrum, L-spectrum and Q-spectrum of some graphs obtained by operations. In addition, we present some new upper and lower bounds on the generalized distance spectral radius of G and of its line graph L(G), based on other graph-theoretic parameters, and characterize the extremal graphs. Finally, we study the generalized distance spectrum of some composite graphs.