یک کران بالا برای شاخص گراوواک – پیسانسکی (جی-پی) مکعب های فیبوناچی
Subject Areas : Statistics
Hojat Kaviani
1
,
LOTFALLAH POURFARAJ
2
1 - Department of Mathematics, Central Tehran BranchIslamic Azad University,Tehran, Iran
2 - Department of Mathematics, Central Tehran Branch, Islamic AzadUniversity, Tehran, Iran
Keywords: خودریختی گراف ها", ", شاخص G-Pگراف ", , ", مکعب های فیبوناچی", شاخص وینر گراف",
Abstract :
Let G be a simple connected graph with vertex set V(G) and edge set E(G). A topological index of graph G is a numeric value to which the graph is assigned and is invariant to G automorphisms.The Wiener index of a connected graph G is defined as W(G) = ∑{u,v}⊆V (G) d(u, v) where d(u,v) is the distance between vertices u and v in G . The Graovac-Pisanski (G-P) index of a graph G is a modified version of the Wiener index on the distance between each vertex u and its image α(u) , where α is an automorphism of graph G . Let Fn be the set of all binary strings of length n that have no two consecutive 1s. The Fibonacci cube Γn ,where n>1or n=1, is a graph with the vertex set Fn . In this graph, two vertices are adjacent if and only if their differ be at precisely one coordinate. In this paper, we obtain an upper bound for the G-P index of the Fibonacci cubes.
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