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作 者:K.Hosseini M.Mirzazadeh S.Salahshour D.Baleanu A.Zafar
机构地区:[1]Department of Mathematics,Near East University TRNC,Mersin 10,Turkey [2]Department of Engineering Sciences,Faculty of Technology and Engineering,East of Guilan,University of Guilan,P.C.44891-63157 Rudsar-Vajargah,Iran [3]Faculty of Engineering and Natural Sciences,Bahcesehir University,Istanbul,Turkey [4]Department of Mathematics,Faculty of Arts and Sciences,Cankaya University,Ankara 06530,Turkey [5]Institute of Space Sciences,Magurele-Bucharest,Romania [6]Department of Medical Research,China Medical University,Taichung 40447,Taiwan [7]Department of Mathematics,COMSATS University Islamabad,Vehari Campus,Pakistan
出 处:《Journal of Ocean Engineering and Science》2022年第5期462-466,共5页海洋工程与科学(英文)
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.
关 键 词:Nonlinear water wave equation Traveling wave hypothesis Kudryashov methods W-shaped and other solitons Dynamical features
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