Applications of the Matrix Package MATLAB in Computing the Wiener Polynomial of Armchair Polyhex Nanotubes and Nanotori
The Wiener polynomial of a molecular graph G is defined as W(G, x) = Σ{u,v}⊆V(G)xd(u,v), where the sum is over all unordered pairs u v of distinct vertices in G. In this paper an algorithm for computing the Wiener polynomial of armchair polyhex nanotubes and nanotori are given.
Keywords: ARMCHAIR POLYHEX NANOTUBE; WIENER POLYNOMIAL
Document Type: Research Article
Publication date: 01 June 2010
- 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.
- Editorial Board
- Information for Authors
- Submit a Paper
- Subscribe to this Title
- Terms & Conditions
- Ingenta Connect is not responsible for the content or availability of external websites
- Access Key
- Free content
- Partial Free content
- New content
- Open access content
- Partial Open access content
- Subscribed content
- Partial Subscribed content
- Free trial content