Arithmetic-Geometric Spectral Radius of Trees and Unicyclic Graphs

Abstract

The arithmetic-geometric matrix Aag(G) of a graph G is a square matrix, where the (i,j)-entry is equal to di+dj2didj if the vertices vi and vj are adjacent, and 0 otherwise. The arithmetic-geometric spectral radius of G, denoted by ag(G), is the largest eigenvalue of the arithmetic-geometric matrix Aag(G). Let Sn be the star of order n≥3 and Sn+e be the unicyclic graph obtained from Sn by adding an edge. In this paper, we prove that for any tree T of order n≥2, 2πn+1≤ag(Pn)≤ag(T)≤ag(Sn)=n2, with equality if and only if T Pn for the lower bound, and if and only if T Sn for the upper bound. We also prove that for any unicyclic graph G of order n≥3, 2=ag(Cn)≤ag(G)≤ag(Sn+e), the lower (upper, respectively) bound is attained if and only if T Cn (T Sn+e, respectively) and ag(Sn+e)<n2 for n≥7.