Adomian Decomposition Method With Inverse Differential Operator and Orthogonal Polynomials for Nonlinear Models

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DOI: https://doi.org/10.28924/2291-8639-22-2024-65
Published: Apr 8, 2024
Cite as:
M. Almazmumy, A. A. Alsulami, H. O. Bakodah, N. A. Alzaid, Adomian Decomposition Method With Inverse Differential Operator and Orthogonal Polynomials for Nonlinear Models, Int. J. Anal. Appl., 22 (2024), 65.

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M. Almazmumy, A. A. Alsulami, H. O. Bakodah, N. A. Alzaid

Abstract

A proficient Adomian decomposition method is proposed amidst the presence of inverse differential operator and orthogonal polynomials for solving nonlinear differential models. The method is indeed a reformation of the standard Adomian method thereby improving the rapidity of the solution's convergence rate. A generalized recurrent scheme for a general nonlinear model was derived and further utilized to solve certain nonlinear test models. Lastly, numerical results are reported in comparative tables, demonstrating absolute error differences between the exact and approximate solutions with regards to various employed orthogonal polynomials.

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