@article{farahani2014,
author = {Farahani, Mohammad Reza},
title = {Connective Eccentric Index of an Infinite Family of Linear Polycene Parallelogram Benzenoid},
year = {2014},
month = {8},
volume = {37},
pages = {57--62},
journal = {International Letters of Chemistry, Physics and Astronomy},
doi = {10.18052/www.scipress.com/ILCPA.37.57},
keywords = {Molecular Graph, Benzenoid, Connective Eccentric Index, Linear Polycene Parallelogram, Eccentric Connectivityindex},
abstract = {Let G=(V, E) be a graph, where V(G) is a non-empty set of vertices and E(G) is a set of edges.We defined dv denote the degree of vertex v∈V(G). The Eccentric Connectivity index $\xi$(G) and theConnective Eccentric index C$\xi$(G) of graph G are defined as $\xi$(G)= ∑ v∈V(G)dv x $\xi$(v) and C$\xi$(G)=$\xi$(G)= ∑ v∈V(G)dv x $\xi$(v)- where $\epsilon$(v) is defined as the length of a maximal path connecting a vertex v toanother vertex of G. In this present paper, we compute these Eccentric indices for an infinite family oflinear polycene parallelogram benzenod by a new method.Keywords: Molecular graphs; Linear polycene parallelogram; Benzenoid; Eccentric connectivityindex; Connective eccentric index}
}