Extremal spectral radius of weighted adjacency matrices of bicyclic graphs

Abstract

The weighted adjacency matrix Af(G) of a simple graph G=(V,E) is the |V|×|V| matrix whose ij-entry equals f(di,dj), where f(x,y) is a symmetric function such that f(di,dj)>0 if ij∈ E and f(di,dj)=0 if ij E and di is the degree of the vertex i. In this paper, we determine the unique graph having the largest spectral radius of Af(G) among all the bicyclic graphs under the assumption that f(x,y) is increasing and convex in x and f(x1,y1)≥ f(x2,y2) when |x1-y1|>|x2-y2| and x1+y1=x2+y2. Moreover, we determine the unique graph having the second largest spectral radius of Af(G) among all the bicyclic graphs when f(x,y)=x+y, (x+y)2 or x2+y2, which corresponds to the well-known first Zagreb index, first hyper-Zagreb index, and forgotten index, respectively. In addition, we also characterize the bicyclic graphs with the first two largest spectral radii of Af(G) when f(x,y)=12(x/y+y/x), corresponding to the extended index.