Chirped dissipative solitons of the complex cubic-quintic nonlinear Ginzburg-Landau equation

V. L. Kalashnikov
Phys. Rev. E 80, 046606 – Published 15 October 2009

Abstract

Approximate analytical chirped solitary pulse (chirped dissipative soliton) solutions of the one-dimensional complex cubic-quintic nonlinear Ginzburg-Landau equation are obtained. These solutions are stable and highly accurate under condition of domination of a normal dispersion over a spectral dissipation. The parametric space of the solitons is three-dimensional, that makes theirs to be easily traceable within a whole range of the equation parameters. Scaling properties of the chirped dissipative solitons are highly interesting for applications in the field of high-energy ultrafast laser physics.

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  • Received 5 August 2009

DOI:https://doi.org/10.1103/PhysRevE.80.046606

©2009 American Physical Society

Authors & Affiliations

V. L. Kalashnikov*

  • Institut für Photonik, TU Wien, Gusshausstrasse 27/387, A-1040 Vienna, Austria

  • *kalashnikov@tuwien.ac.at

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Vol. 80, Iss. 4 — October 2009

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