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Numerical investigation of fractional-order Kersten–Krasil’shchik coupled KdV–mKdV system with Atangana–Baleanu derivative

Naveed Iqbal, Thongchai Botmart, Wael W. Mohammed, Akbar Ali

2022Advances in Continuous and Discrete Models22 citationsDOIOpen Access PDF

Abstract

Abstract In this article, we present a fractional Kersten–Krasil’shchik coupled KdV-mKdV nonlinear model associated with newly introduced Atangana–Baleanu derivative of fractional order which uses Mittag-Leffler function as a nonsingular and nonlocal kernel. We investigate the nonlinear behavior of multi-component plasma. For this effective approach, named homotopy perturbation, transformation approach is suggested. This scheme of nonlinear model generally occurs as a characterization of waves in traffic flow, multi-component plasmas, electrodynamics, electromagnetism, shallow water waves, elastic media, etc. The main objective of this study is to provide a new class of methods, which requires not using small variables for finding estimated solution of fractional coupled frameworks and unrealistic factors and eliminate linearization. Analytical simulation represents that the suggested method is effective, accurate, and straightforward to use to a wide range of physical frameworks. This analysis indicates that analytical simulation obtained by the homotopy perturbation transform method is very efficient and precise for evaluation of the nonlinear behavior of the scheme. This result also suggests that the homotopy perturbation transform method is much simpler and easier, more convenient and effective than other available mathematical techniques.

Topics & Concepts

Homotopy analysis methodNonlinear systemFractional calculusKorteweg–de Vries equationHomotopyMathematicsPerturbation (astronomy)LinearizationApplied mathematicsMathematical analysisPhysicsPure mathematicsQuantum mechanicsFractional Differential Equations SolutionsNonlinear Waves and SolitonsDifferential Equations and Numerical Methods
Numerical investigation of fractional-order Kersten–Krasil’shchik coupled KdV–mKdV system with Atangana–Baleanu derivative | Litcius