Abundant optical soliton solutions for an integrable (2+1)-dimensional nonlinear conformable Schrödinger system

•Analytical solutions of the integrable generalized (2+1)-dimensional nonlinear conformable Schrodinger system of equations.•The use of (G′/G)-expansion method, generalized Riccati equation mapping method and the Kudryashov method in the conformable sense.•To discover a new and more general variety...

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Bibliographic Details
Published in:Results in physics 2021-06, Vol.25, p.104177, Article 104177
Main Authors: Akinyemi, Lanre, Şenol, Mehmet, Rezazadeh, Hadi, Ahmad, Hijaz, Wang, Hao
Format: Article
Language:English
Subjects:
(G′/G)-expansion method
[formula omitted]-expansion method
Conformable derivative
Generalized Riccati equation mapping method
Integrable (2+1)-dimensional NLCS system
Integrable [formula omitted]-dimensional NLCS system
Kudryashov method
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Summary:•Analytical solutions of the integrable generalized (2+1)-dimensional nonlinear conformable Schrodinger system of equations.•The use of (G′/G)-expansion method, generalized Riccati equation mapping method and the Kudryashov method in the conformable sense.•To discover a new and more general variety of exact traveling wave solutions.•Several plots illustrating the behavior of dynamic shapes of the solutions. The analytical solutions of the integrable generalized (2+1)-dimensional nonlinear conformable Schrödinger (NLCS) system of equations was explored in this paper with the aid of three novel techniques which consist of (G′/G)-expansion method, generalized Riccati equation mapping method and the Kudryashov method in the conformable sense. We have discovered a new and more general variety of exact traveling wave solutions by using the proposed methods with a variety of soliton solutions of several structures. With several plots illustrating the behavior of dynamic shapes of the solutions, the findings are highly applicable and detailed the physical dynamic of the considered nonlinear system.
ISSN:2211-3797
2211-3797
DOI:10.1016/j.rinp.2021.104177