Optical Solitons for the Dispersive Concatenation Model: Undetermined Coefficients

IF 0.6 Q3 MATHEMATICS
Anjan Biswas, José Vega-Guzmán, Yakup Yildirim, Asim Asiri
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引用次数: 0

Abstract

This paper recovers optical solitons to the dispersive concatenation model that is studied with Kerr law of self-phase modulation. The method of undetermined coefficients is the adopted integration algorithm, enabling this retrieval possible. A full spectrum of optical solitons is recovered. The parameter constraints for the existence of the solitons, that naturally emerge during the course of their derivation, are also presented. The practical applications of this research include advancements in optical communication, nonlinear optics, and optical signal processing, as well as the potential for optimizing optical soliton-based technologies. In our current work, we have achieved the following novel findings: optical soliton recovery, integration algorithm innovation, and parameter constraints.
色散级联模型的光孤子:待定系数
本文利用克尔自相位调制定律将光孤子恢复到色散级联模型。待定系数的方法是采用积分算法,使这种检索成为可能。光孤子的全谱被恢复。给出了在推导过程中自然出现的孤子存在性的参数约束。该研究的实际应用包括光通信、非线性光学和光信号处理方面的进展,以及优化基于光孤子的技术的潜力。在我们目前的工作中,我们取得了以下新发现:光孤子恢复、积分算法创新和参数约束。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
CiteScore
0.60
自引率
33.30%
发文量
0
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