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Sine transform based preconditioning techniques for space fractional diffusion equations |
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| Authors: | Hai-Hua Qin Hong-Kui Pang Hai-Wei Sun |
| Institution: | 1. School of Mathematics, China University of Mining and Technology, Xuzhou, Jiangsu, People's Republic of China;2. School of Mathematics and Statistics & Research Institute of Mathematical Science, Jiangsu Normal University, Xuzhou, Jiangsu, People's Republic of China;3. Department of Mathematics, University of Macau, Macau, People's Republic of China |
| Abstract: | We study the preconditioned iterative methods for the linear systems arising from the numerical solution of the multi-dimensional space fractional diffusion equations. A sine transform based preconditioning technique is developed according to the symmetric and skew-symmetric splitting of the Toeplitz factor in the resulting coefficient matrix. Theoretical analyses show that the upper bound of relative residual norm of the GMRES method when applied to the preconditioned linear system is mesh-independent which implies the linear convergence. Numerical experiments are carried out to illustrate the correctness of the theoretical results and the effectiveness of the proposed preconditioning technique. |
| Keywords: | finite difference method GMRES method numerical range space fractional derivative τ$$ \tau $$ preconditioner Toeplitz matrix |