Explicit Exact Solutions of the (2+1)-Dimensional Integro-Differential Jaulent–Miodek Evolution Equation Using the Reliable Methods

In this article, we utilize the G′/G2-expansion method and the Jacobi elliptic equation method to analytically solve the (2 + 1)-dimensional integro-differential Jaulent–Miodek equation for exact solutions. The equation is shortly called the Jaulent–Miodek equation, which was first derived by Jaulen...

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Bibliographic Details
Published in:International journal of mathematics and mathematical sciences 2020, Vol.2020 (2020), p.1-19
Main Authors: Kaewta, Supaporn, Khansai, Nattawut, Sirisubtawee, Sekson
Format: Article
Language:English
Subjects:
Algebra
Differential equations
Elliptic functions
Exact solutions
Hyperbolic functions
Mathematical analysis
Methods
Nonlinear differential equations
Nonlinear equations
Partial differential equations
Physics
Polynomials
Software packages
Solitary waves
Transformations (mathematics)
Traveling waves
Trigonometric functions
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Summary:In this article, we utilize the G′/G2-expansion method and the Jacobi elliptic equation method to analytically solve the (2 + 1)-dimensional integro-differential Jaulent–Miodek equation for exact solutions. The equation is shortly called the Jaulent–Miodek equation, which was first derived by Jaulent and Miodek and associated with energy-dependent Schrödinger potentials (Jaulent and Miodek, 1976; Jaulent, 1976). The equation is converted into a fourth order partial differential equation using a transformation. After applying a traveling wave transformation to the resulting partial differential equation, we obtain an ordinary differential equation which is the main equation to which the both schemes are applied. As a first step, the two methods give us distinguish systems of algebraic equations. The first method provides exact traveling wave solutions including the logarithmic function solutions of trigonometric functions, hyperbolic functions, and polynomial functions. The second approach provides the Jacobi elliptic function solutions depending upon their modulus values. Some of the obtained solutions are graphically characterized by the distinct physical structures such as singular periodic traveling wave solutions and peakons. A comparison between our results and the ones obtained from the previous literature is given. Obtaining the exact solutions of the equation shows the simplicity, efficiency, and reliability of the used methods, which can be applied to other nonlinear partial differential equations taking place in mathematical physics.
ISSN:0161-1712
1687-0425
DOI:10.1155/2020/2916395