On the Aα spectral radius and Aα energy of digraphs

Abstract

Let G be a digraph with adjacency matrix A(G) and outdegrees diagonal matrix D(G). For any real α∈[0,1], the Aα matrix Aα(G) of a digraph G is defined as Aα(G)=α D(G)+(1-α)A(G). The eigenvalue of Aα(G) with the largest modulus is called the Aα spectral radius of G. In this paper, we first give some upper bounds for the Aα spectral radius of a digraph and we also characterize the extremal digraphs attaining these bounds. Moreover, we define the Aα energy of a digraph G as EAα(G)=Σi=1n(λαi(G))2, where n is the number of vertices and λαi(G) (i=1,2,…,n) are the eigenvalues of Aα(G). We obtain a formula for EAα(G), and give a lower and upper bounds for EAα(G) and characterize the extremal digraphs that attain the lower and upper bounds. Finally, we characterize the extremal digraphs with maximum and minimum Aα energy among all directed trees and unicyclic digraphs, respectively.