On the α-spectral radius of graphs

Abstract

For 0 α 1, Nikiforov proposed to study the spectral properties of the family of matrices Aα(G)=α D(G)+(1-α)A(G) of a graph G, where D(G) is the degree diagonal matrix and A(G) is the adjacency matrix. The α-spectral radius of G is the largest eigenvalue of Aα(G). We give upper bounds for α-spectral radius for unicyclic graphs G with maximum degree 2, connected irregular graphs with given maximum degree and and some other graph parameters, and graphs with given domination number, respectively. We determine the unique tree with second maximum α-spectral radius among trees, and the unique tree with maximum α-spectral radius among trees with given diameter. For a graph with two pendant paths at a vertex or at two adjacent vertex, we prove results concerning the behavior of the α-spectral radius under relocation of a pendant edge in a pendant path. We also determine the unique graphs such that the difference between the maximum degree and the α-spectral radius is maximum among trees, unicyclic graphs and non-bipartite graphs, respectively.