Using Proposed Approach to Solve nonlinear Partial Differential Equations
DOI:
https://doi.org/10.24297/jam.v22i.9552Keywords:
nonlinear differential equations, converging analysis, suggested approachAbstract
The purpose of this research is to employ a new method to solve nonlinear differential equations to obtain precise analytical solutions and overcome computation challenges without the need to discretize the domain or assume the presence of a small parameter, where the method demonstrated a quick and highly accurate solving nonlinear partial differential equations with initial conditions, in compared to existing methods. The phases of the proposed method are straightforward to implement, highly precise, and quickly converge to the correct result.
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References
D. Zwillinger, "Handbook of Differential Equations", 3rd edition Academic Press, 1997.
A.M. Wazwaz, The Variational iteration method for solving linear and nonlinear systems of PDEs, Comput. Math. Appl. 54: 895–902, 2007.
A.M. Wazwaz, Partial differential equations: Methods and applications, Balkema Publishers, The Netherlands, 2002.
G. Adomian, Solving frontier problems of physics: The decomposition method, Kluwer Academic Publishers, Boston and London, 1994.
J. H. He, A coupling method of a homotopy technique and a perturbation technique for nonlinear problems. International Journal of Non- Linear Mechanics. 35: 37-43, 2000.
J. H. He and X. H. Wu, Variational iteration method: New development and applications, Computers & matics with Applications, 54 (7-8): 881–894, 2007.
A.-M. Wazwaz, The Variational iteration method for solving linear and nonlinear systems of PDEs, Computers and Mathematics with Applications, 54: 895–902, 2007.
A.S.V. Ravi Kanth and K. Aruna, Differential transform method for solving linear and non-linear systems of partial differential equations, Physics Letters A, 372: 6896–6898, 2018.
A.M. Wazwaz, Adomian decomposition method for a reliable treatment of the Emden- Fowler equation. Applied Mathematics and Computation. 161:543-560, 2005.
T. Achouri and K. Omrani, Numerical solutions for the damped generalized regularized long-wave equationwith a variable coefficient by Adomian Decomposition method, Commun. Nonlinear. Sci. Numer. Simulat, 14: 2025-2033, 2009 .
F. Jasem, Application of laplace−adomian decomposition method on linear and nonlinear system of PDEs, Applied Mathematical Sciences, 5 (27): 1307–1315, 2016.
A.K. Jabber and L.N.M.Tawfiq, New Approach for Solving Partial Differential Equations Based on Collocation Method. Journal of Advances in Mathematics. 18: 118-128, 2020.
N.A.Hussein and L.N.M. Tawfiq, New Approach for Solving (1+1)-Dimensional Differential Equation, Journal of Physics: Conference Series, 1530: 1-11, 2020 .
A. Wazwaz, and A. Gorguis, Exact solutions for heat-like and wave-like equations with variable coefficients Appl. Math. Comput, 2004.
A. Soufyane, and M. Boulmalf, Solution of linear and nonlinear parabolic equations by the decomposition method. Appl. Math. Comput, 2015.
T. Achouri, and K. Omrani, Numerical solutions for the damped generalized regularized long-wave equation with a variable coefficient by Adomian Decomposition method. Commun. Nonlinear. Sci. Numer . Simulat . 2009.
M. Suleman, Q. Wu, and G.h. Abbas, Approximate analytic solution of (2+1) dimensional coupled differential Burger’s equation using Elzaki Homotopy Perturbation Method, Alexandria Engineering Journal, 55: 1817- 1826, 2016.
M. J. Xua, , S.F. Tian, J. M. Tua, and T. T. Zhang, Bäcklund transformation, infinite conservation laws and periodic wave solutions to a generalized (2+1)- dimensional Boussinesq equation, Nonlinear Anal. Real. 31: 388-408, 2018.
K. Khan, and M. A. Akbar, Exact solutions of the (2+1)-dimensional cubic Klein–Gordon equation and the (3+1)-dimensional Zakharov–Kuznetsov equation using the modified simple equation method, Journal of the Association of Arab Universities for Basic and Applied Sciences. 2014.
G. Adomian, Solving frontier problems of physics: The decomposition method, Kluwer Academic Publishers, Boston and London, 1994.
A-M. Wazwaz, Partial Differential Equations and Solitary Waves Theory , Higher Education Press, Beijing and Springer-Verlag Berlin Heidelberg, 2009.
N. A. Hussein and L.N.M. Tawfiq, New Approach for solving (2+1)-dimensional differential equations, College of Education for Pure Sciences, University of Baghdad, 2022.
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