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Optical solitons for complex Ginzburg–Landau model with Kerr, quadratic–cubic and parabolic law nonlinearities in nonlinear optics by the exp($-\Phi(\zeta))$ expansion method
Research Article Volume 94 Published: 21 September 2020 Article ID 0139
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Permanent link:
https://www.ias.ac.in/article/fulltext/pram/094/0139 -
Keywords
Complex Ginzburg–Landau model ;exp($-\Phi(\zeta))$ expansion method ;complex wave solutions. -
Abstract
The optical solitons for the complex Ginzburg–Landau model with Kerr law, quadratic–cubic law and parabolic law are obtained via the exp($-\Phi(\zeta))$ expansion method. Many abundant solutions such as complex dark singular, complex periodic-singular and plane-wave solutions are derived for this model. These complex solutions are useful for understanding the physical properties for this model. Figures are presented for these solutions to show the dynamics for these waves.
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Author Affiliations
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Dates
- Published
- 21 September 2020
- Manuscript received
- 7 July 2019
- Manuscript revised
- 8 November 2019
- Accepted
- 1 July 2020
- Final version published online
- 21 September 2020
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Pramana – Journal of Physics
Volume 95, 2021
All articles
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