On the Maximum ABC Spectral Radius of Connected Graphs and Trees

Abstract

Let G=(V,E) be a connected graph, where V=\v1, v2, ·s, vn\ and m=|E|. di will denote the degree of vertex vi of G, and =1≤ i ≤ n di. The ABC matrix of G is defined as M(G)=(mij)n × n, where mij=(di + dj -2)/(di dj) if vi vj ∈ E, and 0 otherwise. The largest eigenvalue of M(G) is called the ABC spectral radius of G, denoted by ABC(G). Recently, this graph invariant has attracted some attentions. We prove that ABC(G) ≤ +(2m-n+1)/ -2. As an application, the unique tree with n ≥ 4 vertices having second largest ABC spectral radius is determined.