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On the Degree Distance of C4C8 Nanotubes

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For a graph G = (V,E), the degree distance of G is defined as DD(G) = Σ{u,v}⊆V(G)(dG(u + dG(v))dG(u,v) where dG(u) (or d(u)) is the degree of the vertex u of G, and dG(u,v) is the distance between u and v. Explicit formulas for calculating the degree distance of C4C8 nanotubes are provided in this report.
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Keywords: C4C8 NANOTUBES; DEGREE DISTANCE; DISTANCE; WIENER INDEX

Document Type: Research Article

Publication date: 2010-06-01

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  • Journal of Computational and Theoretical Nanoscience is an international peer-reviewed journal with a wide-ranging coverage, consolidates research activities in all aspects of computational and theoretical nanoscience into a single reference source. This journal offers scientists and engineers peer-reviewed research papers in all aspects of computational and theoretical nanoscience and nanotechnology in chemistry, physics, materials science, engineering and biology to publish original full papers and timely state-of-the-art reviews and short communications encompassing the fundamental and applied research.
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