A characterization of extremal non-transmission-regular graphs by the distance (signless Laplacian) spectral radius

Abstract

Let G be a simple connected graph of order n and ∂(G) is the spectral radius of the distance matrix D(G) of G. The transmission Di of vertex i is the i-th row sum of D(G). Denote by D(G) the maximum of transmissions over all vertices of G, and ∂Q(G) is the spectral radius of the distance signless Laplacian matrix D(G)+diag(D1,D2,…,Dn). In this paper, we present a sharp lower bound of 2D(G)-∂Q(G) among all n-vertex connected graphs, and characterize the extremal graphs. Furthermore, we give the minimum values of respective D(G)-∂(G) and 2D(G)-∂Q(G) on trees and characterize the extremal trees.