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Proceedings Paper

Novel topological quasi-soliton solutions for the nonlinear cubic-quintic Schrodinger equation model
Author(s): Vladmir N. Serkin; Tatyana L. Belyaeva; Igor V. Alexandrov; Gaston Melo Melchor
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Paper Abstract

The methodology based on the quasi-soliton concept provides for a systematic way to discover an infinite number of the novel stable bright and dark soliton management regimes for the nonlinear cubic-quintic Schrödinger equation model with varying dispersion, nonlinearity and gain or absorption. Q uasi-soliton solutions for this model must be of rather general character than canonical solitons of standard nonlinear Schrödinger equation model, because the generalized model takes into account the saturation nonlinear effect and arbitrary variations of group velocity dispersion, nonlinearity and gain or absorption. Novel topological and nontopological quasi-soliton solutions for the nonlinear cubicquintic Schrödinger equation model have been discovered. It is shown that, today, the most attractive media to discover novel topological quasi-solitons are organic thin films and polymeric waveguides.

Paper Details

Date Published: 12 April 2001
PDF: 11 pages
Proc. SPIE 4271, Optical Pulse and Beam Propagation III, (12 April 2001); doi: 10.1117/12.424706
Show Author Affiliations
Vladmir N. Serkin, Benemerita Univ. Autonoma de Puebla (Mexico)
Tatyana L. Belyaeva, Benemerita Univ. Autonoma de Puebla (Mexico)
Igor V. Alexandrov, S.I. Vavilov State Optical Institute (Russia)
Gaston Melo Melchor, Benemerita Univ. Autonoma de Puebla (Mexico)


Published in SPIE Proceedings Vol. 4271:
Optical Pulse and Beam Propagation III
Yehuda B. Band, Editor(s)

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