Numerical solution of fractional diffusion–reaction problems based on BURA. (15th July 2020)
- Record Type:
- Journal Article
- Title:
- Numerical solution of fractional diffusion–reaction problems based on BURA. (15th July 2020)
- Main Title:
- Numerical solution of fractional diffusion–reaction problems based on BURA
- Authors:
- Harizanov, Stanislav
Lazarov, Raytcho
Margenov, Svetozar
Marinov, Pencho - Abstract:
- Abstract: The paper is devoted to the numerical solution of algebraic systems of the type ( A α + q I ) u = f, 0 < α < 1, q > 0, u, f ∈ R N, where A is a symmetric and positive definite matrix. We assume that A is obtained by finite difference approximation of a second order diffusion problem in Ω ⊂ R d, d = 1, 2 so that A α + q I approximates the related fractional diffusion–reaction operator or could be a result of a time-stepping procedure in solving time-dependent sub-diffusion problems. We also assume that a method of optimal complexity for solving linear systems with matrices A + c I, c ≥ 0 is available. We analyze and study numerically a class of solution methods based on the best uniform rational approximation (BURA) of a certain scalar function in the unit interval. The first such method, originally proposed in Harizanov et al. (2018) for numerical solution of fractional-in-space diffusion problems, was based on the BURA r α ( ξ ) of ξ 1 − α in [ 0, 1 ] through scaling of the matrix A by its largest eigenvalue. Then the BURA of t − α in [ 1, ∞ ) is given by t − 1 r α ( t ) and correspondingly, A − 1 r α ( A ) is used as an approximation of A − α . Further, this method was improved in Harizanov et al. (2019) using the same concept but by scaling the matrix A by its smallest eigenvalue. In this paper we consider the BURA r α ( ξ ) of 1 ∕ ( ξ − α + q ) for ξ ∈ ( 0, 1 ] . Then we define the approximation of ( A α + q I ) − 1 as r α ( A − α ) . We also propose anAbstract: The paper is devoted to the numerical solution of algebraic systems of the type ( A α + q I ) u = f, 0 < α < 1, q > 0, u, f ∈ R N, where A is a symmetric and positive definite matrix. We assume that A is obtained by finite difference approximation of a second order diffusion problem in Ω ⊂ R d, d = 1, 2 so that A α + q I approximates the related fractional diffusion–reaction operator or could be a result of a time-stepping procedure in solving time-dependent sub-diffusion problems. We also assume that a method of optimal complexity for solving linear systems with matrices A + c I, c ≥ 0 is available. We analyze and study numerically a class of solution methods based on the best uniform rational approximation (BURA) of a certain scalar function in the unit interval. The first such method, originally proposed in Harizanov et al. (2018) for numerical solution of fractional-in-space diffusion problems, was based on the BURA r α ( ξ ) of ξ 1 − α in [ 0, 1 ] through scaling of the matrix A by its largest eigenvalue. Then the BURA of t − α in [ 1, ∞ ) is given by t − 1 r α ( t ) and correspondingly, A − 1 r α ( A ) is used as an approximation of A − α . Further, this method was improved in Harizanov et al. (2019) using the same concept but by scaling the matrix A by its smallest eigenvalue. In this paper we consider the BURA r α ( ξ ) of 1 ∕ ( ξ − α + q ) for ξ ∈ ( 0, 1 ] . Then we define the approximation of ( A α + q I ) − 1 as r α ( A − α ) . We also propose an alternative method that uses BURA of ξ α to produce certain uniform rational approximation (URA) of 1 ∕ ( ξ − α + q ) . Comprehensive numerical experiments are used to demonstrate the computational efficiency and robustness of the new BURA and URA methods. … (more)
- Is Part Of:
- Computers & mathematics with applications. Volume 80:issue 2(2020)
- Journal:
- Computers & mathematics with applications
- Issue:
- Volume 80:issue 2(2020)
- Issue Display:
- Volume 80, Issue 2 (2020)
- Year:
- 2020
- Volume:
- 80
- Issue:
- 2
- Issue Sort Value:
- 2020-0080-0002-0000
- Page Start:
- 316
- Page End:
- 331
- Publication Date:
- 2020-07-15
- Subjects:
- Fractional diffusion–reaction -- Best uniform rational approximation -- Error analysis
Electronic data processing -- Periodicals
Mathematics -- Data processing -- Periodicals
510.28541 - Journal URLs:
- http://www.sciencedirect.com/science/journal/08981221 ↗
http://www.elsevier.com/journals ↗ - DOI:
- 10.1016/j.camwa.2019.07.002 ↗
- Languages:
- English
- ISSNs:
- 0898-1221
- Deposit Type:
- Legaldeposit
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library DSC - 3394.730000
British Library DSC - BLDSS-3PM
British Library HMNTS - ELD Digital store - Ingest File:
- 13378.xml