Moin-ud-Din Junjua, Almetwally M. Mostafa, Nouf F. AlQahtani, Ahmet Bekir
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引用次数: 0
摘要
本研究通过应用萨达尔子方程和广义库德里亚索夫方法,探索了非线性 (4+1)-dimensional Davey-Stewartson-Kadomtsev-Petviashvili (DSKP) 模型沿截断 M 分数的不同类型精确波孤子。该模型描述了内波之间的相互作用。该模型用于表示非线性自然现象。获得的结果涉及暗孤子、奇异孤子、亮孤子、周期孤子和其他孤子。所得结果符合相关模型,并以二维、三维和等值线图表示。由于使用了分数导数,所获得的结果在文献中并不存在。截断的 M 分数导数对所得结果的影响也用图形表示。因此,我们获得的结果对这些模型的未来研究很有帮助。最后,我们得出结论,所应用的技术对于求解数学物理中的其他模型是简单、有效和可靠的。
Impact of truncated M-fractional derivative on the new types of exact solitons to the (4+1)-dimensional DSKP model
This research explores different types of exact wave solitons of nonlinear (4+1)-dimensional Davey–Stewartson–Kadomtsev–Petviashvili (DSKP) model along truncated M-fractional by applying the Sardar sub-equation and generalized Kudryashov methods. This model describes the interactions among internal waves. This model is used to represent the nonlinear natural occurrence. The obtained results involve dark, singular, bright, periodic and other solitons. The gained results satisfy the concerned model and are represented by 2D, 3D and contour graphs. The gained results are not present in the literature due to the use of fractional derivative. Impacts of truncated M-fractional derivative on gained results are also represented by graphs. Hence, our gained results are fruitful in the future study for these models. Finally, we conclude that the applied techniques are simple, fruitful and reliable to solve the other models in mathematical physics.
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