On the Aα spectral radius of strongly connected digraphs

Abstract

Let G be a digraph with adjacency matrix A(G). Let D(G) be the diagonal matrix with outdegrees of vertices of G. Nikiforov Niki proposed to study the convex combinations of the adjacency matrix and diagonal matrix of the degrees of undirected graphs. Liu et al. LWCL extended the definition to digraphs. For any real α∈[0,1], the matrix Aα(G) of a digraph G is defined as Aα(G)=α D(G)+(1-α)A(G). The largest modulus of the eigenvalues of Aα(G) is called the Aα spectral radius of G, denoted by λα(G). This paper proves some extremal results about the spectral radius λα(G) that generalize previous results about λ0(G) and λ12(G). In particular, we characterize the extremal digraph with the maximum (or minimum) Aα spectral radius among all ∞-digraphs and θ-digraphs on n vertices. Furthermore, we determine the digraphs with the second and the third minimum Aα spectral radius among all strongly connected bicyclic digraphs. For 0≤α≤12, we also determine the digraphs with the second, the third and the fourth minimum Aα spectral radius among all strongly connected digraphs on n vertices. Finally, we characterize the digraph with the minimum Aα spectral radius among all strongly connected bipartite digraphs which contain a complete bipartite subdigraph.