Solution of Non-Linear Ito System of Equations by Homotopy Analysis Method (HAM)
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https://doi.org/10.14419/ijet.v8i1.10.28321
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Ito coupled system, Adomian decomposition method, homotopy analysis method, analytical solutions, symbolic computation, Mathematica. -
Nonlinear Ito system of equations have wide application in applied physics. Many authors have found solution of this complex problem by using Adomain Decomposition Method (ADM), Reduced Differential Transform Method (RDTM) etc. All of these methods have a drawback as their convergence is quite slow and it requires a very good approximation to converge these schemes in considerable iterations. To overcome this difficulty, Liao has proposedHomotopy Analysis Method (HAM) that is quite effective due to the presence of convergence control parameter . It has been shown that for  the scheme converges after very few iterations. Analytical solution obtained by HAM has been compared with the exact solution and both are found in good agreement. Computations are performed using the software package MATHEMATICA.This work verifies the validity and the potential of the HAM for the study of nonlinear systems of partial differential equations.
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How to Cite
Junaid Siddiqui, M., & Iqbal, A. (2019). Solution of Non-Linear Ito System of Equations by Homotopy Analysis Method (HAM). International Journal of Engineering & Technology, 8(1.10), 144-150. https://doi.org/10.14419/ijet.v8i1.10.28321
