@article {
author = {Ediz, Suleyman},
title = {The augmented eccentric connectivity index of nanotubes and nanotori},
journal = {Journal of Discrete Mathematics and Its Applications},
volume = {2},
number = {1-2},
pages = {1-8},
year = {2012},
publisher = {Shahid Rajaee Teacher Training University},
issn = {2981-0809},
eissn = {2981-0809},
doi = {10.22061/jmns.2012.465},
abstract = {Let G be a connected graph, the augmented eccentric connectivity index is a topological index was defined as $\zeta(G)=\sum_{i=1}^nM_i/E_i$, where Mi is the product of degrees of all vertices vj, adjacent to vertex vi, Ei is the largest distance between vi and any other vertex vk of G or the eccentricity of i v and n is the number of vertices in graph G. In this paper exact formulas for the augmented eccentric connectivity index of TUC4C8(S) nanotube and TC4C8(R) nanotorus are given.},
keywords = {Augmented eccentric connectivity index,Nanotube,Nanotorus},
url = {https://jdma.sru.ac.ir/article_465.html},
eprint = {https://jdma.sru.ac.ir/article_465_6c646b1105719b9fcfc9eb7c3ef4bba5.pdf}
}