论文信息 - TOPOLOGICAL INDICES OF NANOTUBES, NANOTORI AND NANOSTARS

TOPOLOGICAL INDICES OF NANOTUBES, NANOTORI AND NANOSTARS

The Wiener index of a graph G is defined as W(G) = 1/2∑{x,y}⊆V(G)d(x,y), where V(G) is the set of all vertices of G and for x,y ∈ V(G), d(x,y) denotes the length of a minimal path between x and y. In this paper, we first report our recent results on computing Wiener, PI and Balaban indices of some nanotubes and nanotori. Next, the PI and Szeged indices of a new type of nanostar dendrimers are computed for the first time.

M. H. Khalifeh | A. Ashrafi | H. Yousefi-Azari | I. Iran

[1] N. Trinajstic. Chemical Graph Theory , 1992 .

[2] P. Cameron. Combinatorics: Topics, Techniques, Algorithms , 1995 .

[3] M. Diudea. HOSOYA POLYNOMIAL IN TORI , 2002 .

[4] Mircea V. Diudea. Toroidal Graphenes from 4-Valent Tori , 2002 .

[5] Peter E. John,et al. Wiener index of armchair polyhex nanotubes , 2004 .

[6] Peter E. John,et al. Wiener index of zig-zag polyhex nanotubes , 2004 .

[7] Ali Reza Ashrafi,et al. PI Index of Armchair Polyhex Nanotubes , 2006, Ars Comb..

[8] A. Ashrafi,et al. PI INDEX OF ZIG-ZAG POLYHEX NANOTUBES , 2006 .