Ordering Trees by Their ABC Spectral Radii

Abstract

Let G=(V,E) be a connected graph, where V=\v1, v2, ·s, vn\. Let di denote the degree of vertex vi. 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 ABC spectral radius of G is the largest eigenvalue of M(G). In the present paper, we establish two graph perturbations with respect to ABC spectral radius. By applying these perturbations, the trees with the third, fourth, and fifth largest ABC spectral radii are determined.