Omega polynomial in diamond-like networks
Fullerenes, Nanotubes, and Carbon Nanostructures, 2010•Taylor & Francis
Design of diamond-like lattices can be achieved by using some net operations. Hypothetical
networks, thus obtained, can be characterized in their topology by various counting
polynomials and topological indices from which they are derived. The repeat units of the
proposed network are derived from adamantane, the constructive unit of diamond, and
proved to be extremely stable, as shown by computed total energy. Their topology is
described in terms of Omega polynomial.
networks, thus obtained, can be characterized in their topology by various counting
polynomials and topological indices from which they are derived. The repeat units of the
proposed network are derived from adamantane, the constructive unit of diamond, and
proved to be extremely stable, as shown by computed total energy. Their topology is
described in terms of Omega polynomial.
Design of diamond-like lattices can be achieved by using some net operations. Hypothetical networks, thus obtained, can be characterized in their topology by various counting polynomials and topological indices from which they are derived. The repeat units of the proposed network are derived from adamantane, the constructive unit of diamond, and proved to be extremely stable, as shown by computed total energy. Their topology is described in terms of Omega polynomial.
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