On the generalized distance spectral radius of graphs

Abstract

The generalized distance spectral radius of a connected graph G is the spectral radius of the generalized distance matrix of G, defined by Dα(G)=α Tr(G)+(1-α)D(G), \;\;0α 1, where D(G) and Tr(G) denote the distance matrix and diagonal matrix of the vertex transmissions of G, respectively. This paper characterizes the unique graph with minimum generalized distance spectral radius among the connected graphs with fixed chromatic number, which answers a question about the generalized distance spectral radius in spectral extremal theories. In addition, we also determine graphs with minimum generalized distance spectral radius among the n-vertex trees and unicyclic graphs, respectively. These results generalize some known results about distance spectral radius and distance signless Laplacian spectral radius of graphs.