@article {
author = {Ghorbani, Modjtaba and Rahmani, Shaghayegh and Ori, Ottorino},
title = {On the Graovac-Ghorbani Index},
journal = {Iranian Journal of Mathematical Chemistry},
volume = {10},
number = {4},
pages = {295-305},
year = {2019},
publisher = {University of Kashan},
issn = {2228-6489},
eissn = {2008-9015},
doi = {10.22052/ijmc.2019.169508.1420},
abstract = {For the edge e = uv of a graph G, let nu = n(u|G) be the number of vertices of G lying closer to the vertex u than to the vertex v and nv= n(v|G) can be defined simailarly. Then the ABCGG index of G is defined as ABCGGÂ =\sum_{e=uv} \sqrt{f(u,v)}, where f(u,v)= (nu+nv-2)/nunvThe aim of this paper is to give some new results on this graph invariant. We also calculate the ABCGG of an infinite family of fullerenes.},
keywords = {Atom bond connectivity index,Molecular graphs,topological index},
url = {https://ijmc.kashanu.ac.ir/article_102447.html},
eprint = {https://ijmc.kashanu.ac.ir/article_102447_320bebdec70cf381ee9f7a601e0ce167.pdf}
}