研究目的
Investigating the stable soliton propagation in a coupled (2+1) dimensional Ginzburg-Landau system and analyzing the effects of different dispersion term values on soliton propagation.
研究成果
The study successfully derives the bright one-soliton solution of the coupled (2+1)-dimensional variable coefficient Ginzburg-Landau equation using the modified Hirota bilinear method. It demonstrates that the dispersion term significantly affects the soliton's amplitude and envelope shape, offering potential applications in optical device manufacturing.
研究不足
The study is theoretical and does not involve experimental validation. The practical application of the findings in optical devices requires further experimental research.
1:Experimental Design and Method Selection:
The study employs the modified Hirota bilinear method to derive the bright one-soliton solution of the coupled (2+1)-dimensional variable coefficient Ginzburg-Landau equation.
2:Sample Selection and Data Sources:
The research focuses on theoretical analysis without specific sample selection or data sources.
3:List of Experimental Equipment and Materials:
Not applicable as the study is theoretical.
4:Experimental Procedures and Operational Workflow:
The methodology involves deriving the soliton solution and analyzing the propagation phenomena by varying the dispersion term.
5:Data Analysis Methods:
The analysis is based on the derived soliton solution and its behavior under different parameter settings.
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