On the Graovac-Ghorbani index for bicyclic graphs with no pendant vertices

Abstract

Let G=(V,E) be a simple undirected and connected graph on n vertices. The Graovac--Ghorbani index of a graph G is defined as ABCGG(G)= Σuv ∈ E(G) nu+nv-2 nu nv, where nu is the number of vertices closer to vertex u than vertex v of the edge uv ∈ E(G) and nv is defined analogously. It is well-known that all bicyclic graphs with no pendant vertices are composed by three families of graphs, which we denote by Bn = B1(n) B2(n) B3(n). In this paper, we give an lower bound to the ABCGG index for all graphs in B1(n) and prove it is sharp by presenting its extremal graphs. Additionally, we conjecture a sharp lower bound to the ABCGG index for all graphs in Bn.