Title of article
SOLVING A NONLINEAR INVERSE PROBLEM OF IDENTIFYING AN UNKNOWN SOURCE TERM IN A REACTION-DIFFUSION EQUATION BY ADOMIAN DECOMPOSITION METHOD
Author/Authors
POURGHOLI, REZA School of Mathematics and Computer Sciences - Damghan University - Damghan, Iran , SAEEDI, AKRAM School of Mathematics and Computer Sciences - Damghan University - Damghan, Iran
Pages
13
From page
150
To page
162
Abstract
We consider the inverse problem of finding the nonlinear source for nonlinear Reaction-Diffusion equation whenever the initial and boundary condition are given.
We investigate the numerical solution of this problem by using Adomian Decomposition
Method (ADM). The approach of the proposed method is to approximate unknown coefficients by a nonlinear function whose coefficients are determined from the solution of
minimization problem based on the overspecified data. Further, the Tikhonov regularization method is applied to deal with noisy input data and obtain a stable approximate
solution. This method is tested for two examples. The results obtained show that the
method is efficient and accurate. This study showed also, the speed of the convergent of
ADM.
Keywords
Inverse problem , Adomian Decomposition Method (ADM) , Convergence , Overspecified data , Least Square , Tikhonov Regularization Method
Journal title
Turkish World Mathematical Society Journal of Applied and Engineering Mathematics
Serial Year
2016
Record number
2580823
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