@article{farahani2014,
author = {Farahani, Mohammad Reza},
title = {Connective Eccentric Index of Circumcoronene Homologous Series of Benzenoid Hk},
year = {2014},
month = {4},
volume = {32},
pages = {71--76},
journal = {International Letters of Chemistry, Physics and Astronomy},
doi = {10.18052/www.scipress.com/ILCPA.32.71},
keywords = {Molecular Graph, Benzenoid, Connective Eccentric Index, Eccentric Connectivity Index},
abstract = {Let G be a molecular graph, a topological index is a numeric quantity related to G which is invariant under graph automorphisms. The eccentric connectivity index $\xi$(G) is defined as $\xi$(G) = ∑vV(G) d x $\epsilon$(v) where dv, $\epsilon$(v) denote the degree of vertex v in G and the largest distance between vand any other vertex u of G. The connective eccentric index of graph G is defined as C$\xi$(G) = ∑vV(G) dv /$\epsilon$(v) In the present paper we compute the connective eccentric index of CircumcoroneneHomologous Series of Benzenoid Hk (k ≥ 1).}
}