The Innovation Iterative Method and its Stability in Time-Fractional Diffusion Equations

Andang Sunarto and Jumat Sulaiman (2020) The Innovation Iterative Method and its Stability in Time-Fractional Diffusion Equations. International Journal of Innovation, Creativity and Change. pp. 560-579.

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Abstract

In this research, we deal with the innovation or application iterative methods of an unconditionally implicit finite difference approximation equation and the one-dimensional, linear time fractional diffusion equations (TFDEs) via Caputo’s time fractional derivative. Based on this implicit approximation equation, the corresponding linear system can be generated, in which its coefficient matrix is large scale and sparse. To speed up the convergence rate in solving the linear system iteratively, we construct the corresponding preconditioned linear system. Then we formulate and implement the Preconditioned Gauss-Seidel (PGS) iterative method for solving the generated linear system. Two examples of the problem are presented to illustrate the effectiveness of the PGS method. The two numerical results of this study show that the proposed iterative method is superior to the basic GS iterative method.

Item Type: Article
Keyword: Caputo’s fractional derivative, Implicit finite difference, PGS
Subjects: Q Science > Q Science (General)
Department: FACULTY > Faculty of Science and Natural Resources
Depositing User: SITI AZIZAH BINTI IDRIS -
Date Deposited: 23 Oct 2020 19:11
Last Modified: 15 Jan 2021 16:03
URI: https://eprints.ums.edu.my/id/eprint/26177

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