Topological Modelling of Nanostructures and Extended Systems
Topological Modelling of Nanostructures and Extended Systems completes and expands upon the previously published title within this series: The Mathematics and Topology of Fullerenes (Vol. 4, 2011) by gathering the latest research and advances in materials science at nanoscale. It introduces a new sp...
| Corporate Author: | |
|---|---|
| Other Authors: | , , , |
| Format: | Electronic |
| Language: | English |
| Published: |
Dordrecht :
Springer Netherlands : Imprint: Springer,
2013.
|
| Series: | Carbon Materials: Chemistry and Physics,
7 |
| Subjects: | |
| Online Access: | https://ezaccess.library.uitm.edu.my/login?url=http://dx.doi.org/10.1007/978-94-007-6413-2 |
Table of Contents:
- Helical Wrapping of Graphene sheets and their Self-assemble into Core-Shelled Composite Nanostructures with metallic particles
- First-Principles Study of the Electronic and Magnetic Properties of Defects in Carbon Nanostructures
- Structural defects on the Electronic Transport Properties of Carbon-based Nanostructures
- Topological versus Physical and Chemical Properties of Negatively Curved Carbon Surfaces
- Topochemistry of spatially extended sp2 nanocarbons: fullerenes, nanotubes, and grapheme
- A Pariser-Parr-Pople Model Hamiltonian based approach to the eletronic structure and optical properties of graphene nanostructures
- Topological invariants of Mb̲ius-like graphenic nanostructures
- Spanning Fullerenes as Units in Crystal Networks
- Introducing Colored<U+001c> Molecular Topology by Reactivity Indices of Electronegativity and Chemical Hardness
- Nanostructures and Eigenvectors of Matrices
- Theoretical analysis of the reactivity of carbon nanotubes: local versus topological effects
- Computation of the Szeged index of some nanotubes and dendrimers
- The Edge-Wiener index and its computation for some nanostructures
- Study of Fullerenes by Some New Topological Index
- Topological Study of (3,6)- and (4,6)-Fullerenes
- Enumeration of Hetero <U+0013> Molecules by Using Pl̤ya Theorem.