Nonlinear self adjointness, conservation laws and exact solutions of ill-posed Boussinesq equation

San, Sait Eren; Yaşar, Emrullah

doi:10.1515/phys-2016-0007

Cited by 22 publications

(6 citation statements)

References 47 publications

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“…( 1) is also known as Nwogu's Boussinesq (NB) model is useful for coastal and civil engineering to perform the nonlinear water wave model in a harbour and coastal design. Therefore many scientists studied mathematical properties, such as bifurcation and travelling wave solutions, lie symmetry analysis, single and multiple solitary wave solutions and painleve analysis [8][9][10][11][12][13][14][15][16].…”

Section: Introductionmentioning

confidence: 99%

Extended Jacobi elliptic function solutions for general boussinesq systems

San

2023

Rev. Mex. Fís.

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In this research paper, we have utilized the Jacobi elliptic function expansion method to obtain the exact solutions of (1+1)- dimensional Boussinesq System (GBQS). The most important difference that distinguishes this method from other methods is the parameters included in the auxiliary equation F’ (ξ) = Ö P F4(ξ) + QF2(ξ) + R. As far as the authors know, there is no other study in which such a variety of solutions has been given. Depending on P, Q and R, nineteen the solitary wave and periodic wave solutions are obtained at their limit conditions. In addition, 3D and contour plot graphics for the constructed waves are investigated with the computer package program by giving special values to the parameters involved. The validity and reliability of the method is examined by its applications on a class of nonlinear evolution equations of special interest in nonlinear mathematical physics. The results were acquired to verify that the recommended method is applicable and reliable for the analytic treatment of a wide application of nonlinear phenomena

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Section: Introductionmentioning

confidence: 99%

Extended Jacobi elliptic function solutions for general boussinesq systems

San

2023

Rev. Mex. Fís.

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“…A number of methods have been developed for constructing conservation laws of PDEs [2][3][4][5][6][7][8][9][10][11][12][13][14][15]. Lie symmetry analysis [16][17][18][19][20][21][22] is central to some of the routines used in these methods, in particular to those that have been applied on the Black-Scholes equation before.…”

Section: Introductionmentioning

confidence: 99%

On the Generation of Infinitely Many Conservation Laws of the Black-Scholes Equation

Sinkala

2020

Computation

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Construction of conservation laws of differential equations is an essential part of the mathematical study of differential equations. In this paper we derive, using two approaches, general formulas for finding conservation laws of the Black-Scholes equation. In one approach, we exploit nonlinear self-adjointness and Lie point symmetries of the equation, while in the other approach we use the multiplier method. We present illustrative examples and also show how every solution of the Black-Scholes equation leads to a conservation law of the same equation.

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“…In [35,36], the authors used the theory of Lie group to obtain the symmetry reductions and the group invariant solutions. In [24,37], the authors obtained the new traveling wave solutions and the nonlinear self-adjoint substitution to construct new conservation laws. The second nonlinear partial differential equation is the unstable nonlinear Schrödinger equation:…”

Section: Introductionmentioning

confidence: 99%

The Improvedexp⁡-Φξ-Expansion Method and New Exact Solutions of Nonlinear Evolution Equations in Mathematical Physics

Chen

Xin

Liu

2019

Advances in Mathematical Physics

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Theexp(-Φ(ξ))-expansion method is improved by presenting a new auxiliary ordinary differential equation forΦ(ξ). By using this method, new exact traveling wave solutions of two important nonlinear evolution equations, i.e., the ill-posed Boussinesq equation and the unstable nonlinear Schrödinger equation, are constructed. The obtained solutions contain Jacobi elliptic function solutions which can be degenerated to the hyperbolic function solutions and the trigonometric function solutions. The present method is very concise and effective and can be applied to other types of nonlinear evolution equations.

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Nonlinear self adjointness, conservation laws and exact solutions of ill-posed Boussinesq equation

Cited by 22 publications

References 47 publications

Extended Jacobi elliptic function solutions for general boussinesq systems

Extended Jacobi elliptic function solutions for general boussinesq systems

On the Generation of Infinitely Many Conservation Laws of the Black-Scholes Equation

The Improvedexp⁡-Φξ-Expansion Method and New Exact Solutions of Nonlinear Evolution Equations in Mathematical Physics

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