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Electrons on Hexagonal Lattices and Applications to Nanotubes

Hartmann, B.; Zakrzewski, W.J.

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Authors

B. Hartmann

W.J. Zakrzewski



Abstract

We consider a Fröhlich-type Hamiltonian on a hexagonal lattice. Aiming to describe nanotubes, we choose this two-dimensional lattice to be periodic and to have a large extension in one (x) direction and a small extension in the other (y) direction. We study the existence of solitons in this model using both analytical and numerical methods. We find exact solutions of our equations and discuss some of their properties.

Citation

Hartmann, B., & Zakrzewski, W. (2003). Electrons on Hexagonal Lattices and Applications to Nanotubes. Physical review B, 68(18), https://doi.org/10.1103/physrevb.68.184302

Journal Article Type Article
Publication Date Nov 1, 2003
Deposit Date Apr 26, 2007
Publicly Available Date Mar 15, 2011
Journal Physical review B - Condensed Matter and Materials Physics
Print ISSN 1098-0121
Electronic ISSN 1550-235X
Publisher American Physical Society
Peer Reviewed Peer Reviewed
Volume 68
Issue 18
DOI https://doi.org/10.1103/physrevb.68.184302
Public URL https://durham-repository.worktribe.com/output/1567034

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Published Journal Article (109 Kb)
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Copyright Statement
© 2003 The American Physical Society






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