Specific wave structures of a fifth-order nonlinear water wave equation

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摘要 Investigated in the present paper is a fifth-order nonlinear evolution(FONLE)equation,known as a nonlinear water wave(NLWW)equation,with applications in the applied sciences.More precisely,a traveling wave hypothesis is firstly applied that reduces the FONLE equation to a 1D domain.The Kudryashov methods(KMs)are then adopted as leading techniques to construct specific wave structures of the governing model which are classified as W-shaped and other solitons.In the end,the effect of changing the coefficients of nonlinear terms on the dynamical features of W-shaped and other solitons is investigated in detail for diverse groups of the involved parameters.

作者 K.Hosseini M.Mirzazadeh S.Salahshour D.Baleanu A.Zafar

机构地区 Department of Mathematics Department of Engineering Sciences Faculty of Engineering and Natural Sciences Department of Mathematics Institute of Space Sciences Department of Medical Research Department of Mathematics

出处《Journal of Ocean Engineering and Science》 SCIE 2022年第5期462-466,共5页 海洋工程与科学（英文）

关键词 Nonlinear water wave equation Traveling wave hypothesis Kudryashov methods W-shaped and other solitons Dynamical features

分类号 O17 [理学—基础数学]

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参考文献3

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二级参考文献1

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共引文献10

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Journal of Ocean Engineering and Science

2022年第5期

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Specific wave structures of a fifth-order nonlinear water wave equation

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