Guiding-center solitons of the first order, associated with the complex cubic Landau-Ginzburg equation

Alexandre S. Shcherbakov; Eduardo Tepichin-Rodriguez; Alexey Y. Kosarsky

doi:10.1117/12.418826

9 March 2001 Guiding-center solitons of the first order, associated with the complex cubic Landau-Ginzburg equation

Alexandre S. Shcherbakov, Eduardo Tepichin-Rodriguez, Alexey Y. Kosarsky

Proceedings Volume 4354, Laser Optics 2000: Semiconductor Lasers and Optical Communication; (2001) https://doi.org/10.1117/12.418826
Event: Laser Optics 2000, 2000, St. Petersburg, Russian Federation

Abstract

The initial field amplitude (alpha) ₀, normalized to the amplitude of a fundamental soliton, and the ratio (Gamma) of the dispersion distance to the loss distance are successfully used to classify the areas of originating the `light' solitary waves of the first order in optical systems belonging to Landau-Ginzburg type. We analyze the model, described by the complex cubic Landau-Ginzburg equation in a reduced form, and demonstrate for the first time that the guiding-center solitons, associated usually with the interval of (alpha) ₀ (epsilon) [1.0;1.5], (Gamma) >= 1, can exist even if (Gamma) <EQ 1. The application of peculiarities inherent in picosecond optical guiding- center solitons of the first order to the problem of creating a fiber network for a precise synchronization is proposed and discussed.

Citation Download Citation

Alexandre S. Shcherbakov, Eduardo Tepichin-Rodriguez, and Alexey Y. Kosarsky "Guiding-center solitons of the first order, associated with the complex cubic Landau-Ginzburg equation", Proc. SPIE 4354, Laser Optics 2000: Semiconductor Lasers and Optical Communication, (9 March 2001); https://doi.org/10.1117/12.418826

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