فهرس المقالات Hyper Wiener

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  1 - A new method for computation of Wiener index if C4C8(S) Nanotorus
  Abbas Heydari
  The Wiener index of a graph G is defined as W(G) = ... where V (G) is the setof all vertices of G and for i,j in V (G), d(i,j) is the minimum distance between i and j. Ashrafiand yousefi (see A. R. Ashrafi and S. Yousefi, Computing the Wiener Index of a TUC4C8(S)Nanotor أکثر

  The Wiener index of a graph G is defined as W(G) = ... where V (G) is the setof all vertices of G and for i,j in V (G), d(i,j) is the minimum distance between i and j. Ashrafiand yousefi (see A. R. Ashrafi and S. Yousefi, Computing the Wiener Index of a TUC4C8(S)Nanotorus, MATCH Commun. Math. Comput. Chem., 57(2)(2007), 403-410) computed theWiener index of TUC4C8(S) Nanotorus. In this paper we use a new method to compute theWiener index of these Nanotorus. تفاصيل المقالة
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  2 - Hyper Wiener Index and Connectivity Index of a Fuzzy Graph
  Ismat Beg Irfan Nazir Tabasam Rashid
  Hyper Wiener index of fuzzy graphs and edge deleted fuzzy subgraphs areproposed in this article. A relationship between Connectivity index andHyper Wiener index of fuzzy graphs is obtained.

  Hyper Wiener index of fuzzy graphs and edge deleted fuzzy subgraphs areproposed in this article. A relationship between Connectivity index andHyper Wiener index of fuzzy graphs is obtained. تفاصيل المقالة