@article{farahani2014,
author = {Farahani, Mohammad Reza},
title = {First and Second Zagreb Polynomials of VC5C7[p,q] and HC5C7[p,q]Nanotubes},
year = {2014},
month = {3},
volume = {31},
pages = {56--62},
journal = {International Letters of Chemistry, Physics and Astronomy},
doi = {10.18052/www.scipress.com/ILCPA.31.56},
keywords = {Molecular Graph, Zagreb Polynomial, Zagreb Index, Nanotubes},
abstract = {Let G = (V,E) be a simple connected graph. The sets of vertices and edges of G are denoted by V = V(G) and E = E(G), respectively. There exist many topological indices and connectivity indices in graph theory. The First and Second Zagreb indices were first introduced by Gutman and Trinajsti{\'{c}} In1972. It is reported that these indices are useful in the study of anti-inflammatory activities of certain chemical instances, and in elsewhere. In this paper, we focus on the structure of ”G = VC5C7[p,q]”and ”H = HC5C7[p,q]” nanotubes and counting first Zagreb index Zg1(G) = ∑veVdv2 and Second Zagreb index Zg2(G) =∑e=uveE(G)(du·dv) of G and H, as well as First Zagreb polynomial Zg1(G,x ) =∑e=uveE(G)xdu+dv and Second Zagreb Polynomial Zg2(G,x) = ∑e=uveE(G)xdu·dv}
}