Single peak solitary wave solutions for the generalized KP–MEW (2,2) equation under boundary condition

Wei, Minzhi; Tang, Shengqiang; Fu, Hualiang; Chen, Guangxi

doi:10.1016/j.amc.2013.03.007

Cited by 17 publications

(16 citation statements)

References 18 publications

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“…The solutions of (1) have been studied in various aspects. See, for example, the recent papers [26][27][28]. Wazwaz [26] used the tanh method and the sine-cosine method, for finding solitary waves and periodic solutions.…”

Section: Introductionmentioning

confidence: 99%

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Symmetry Analysis and Conservation Laws of a Generalized Two-Dimensional Nonlinear KP-MEW Equation

Adem

Khalique

2015

Mathematical Problems in Engineering

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Lie symmetry analysis is performed on a generalized two-dimensional nonlinear Kadomtsev-Petviashvili-modified equal width equation. The symmetries and adjoint representations for this equation are given and an optimal system of one-dimensional subalgebras is derived. The similarity reductions and exact solutions with the aid of ( / )-expansion method are obtained based on the optimal systems of one-dimensional subalgebras. Finally conservation laws are constructed by using the multiplier method.

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Section: Introductionmentioning

confidence: 99%

“…Saha [27] used the theory of bifurcations of planar dynamical systems to prove the existence of smooth and nonsmooth travelling wave solutions. Wei et al [28] used the qualitative theory of differential equations and obtained peakon, compacton, cuspons, loop soliton solutions, and smooth soliton solutions.…”

Section: Introductionmentioning

confidence: 99%

Symmetry Analysis and Conservation Laws of a Generalized Two-Dimensional Nonlinear KP-MEW Equation

Adem

Khalique

2015

Mathematical Problems in Engineering

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“…Studies of various physical structures of nonlinear dispersive equations had attracted much attention in connection with the important problems that arise in scientific applications. Mathematically, these physical structures have been studied by using various powerful and efficient methods, such as inverse scattering method [1], Darboux transformation method [2,3], Hirota bilinear method [4], Lie group method [5,6], bifurcation method of dynamic systems [7,8], tanh function method [9][10][11][12], Fan-expansion method [13,14], and homogenous balance method [15]. Practically, there is no unified technique that can be employed to handle all types of nonlinear dispersive equations.…”

Section: Introductionmentioning

confidence: 99%

“…Systems (8) are planar dynamical systems defined in the 3-parameter space ( , , ). For a fixed , we will investigate the bifurcations of phase portraits of (8) in the phase plane ( , ) as the parameters , are changed.…”

Section: Introductionmentioning

confidence: 99%

Peakon, Cuspon, Compacton, and Loop Solutions of a Three-Dimensional 3DKP(3, 2) Equation with Nonlinear Dispersion

Zhao

Qiao

Tang

2014

Abstract and Applied Analysis

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We study peakon, cuspon, compacton, and loop solutions for the three-dimensional Kadomtsev-Petviashvili equation (3DKP(3,2)equation) with nonlinear dispersion. Based on the method of dynamical systems, the 3DKP(3,2)equation is shown to have the parametric representations of the solitary wave solutions such as peakon, cuspon, compacton, and loop solutions. As a result, the conditions under which peakon, cuspon, compacton, and loop solutions appear are also given.

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“…under the inhomogeneous boundary condition and obtained smooth, peaked, cusped soliton solutions of the osmosis (2, 2) equation by using the phase portrait analytical technique. Wei et al [28] investigated the generalized KP-MEW(2,2) equation…”

Section: Introductionmentioning

confidence: 99%

Cusped and Smooth Solitons for the Generalized Camassa-Holm Equation on the Nonzero Constant Pedestal

Liu

Xie

Tang

2014

Abstract and Applied Analysis

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We investigate the traveling solitary wave solutions of the generalized Camassa-Holm equationut - uxxt + 3u2ux=2uxuxx + uuxxxon the nonzero constant pedestallimξ→±∞⁡uξ=A. Our procedure shows that the generalized Camassa-Holm equation with nonzero constant boundary has cusped and smooth soliton solutions. Mathematical analysis and numerical simulations are provided for these traveling soliton solutions of the generalized Camassa-Holm equation. Some exact explicit solutions are obtained. We show some graphs to explain our these solutions.

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Single peak solitary wave solutions for the generalized KP–MEW (2,2) equation under boundary condition

Cited by 17 publications

References 18 publications

Symmetry Analysis and Conservation Laws of a Generalized Two-Dimensional Nonlinear KP-MEW Equation

Symmetry Analysis and Conservation Laws of a Generalized Two-Dimensional Nonlinear KP-MEW Equation

Peakon, Cuspon, Compacton, and Loop Solutions of a Three-Dimensional 3DKP(3, 2) Equation with Nonlinear Dispersion

Cusped and Smooth Solitons for the Generalized Camassa-Holm Equation on the Nonzero Constant Pedestal

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