A New Family of Difference Schemes for Space Fractional Advection Diffusion Equation

Advances in Applied Mathematics and Mechanics
Vol. 9 No. 2 (2017), pp. 282-306
DOI: 10.4208/aamm.2015.m1069
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Author(s)
,
1 Xian Univ Technol, Sch Sci, Dept Appl Math, Xian 710054, Shaanxi, Peoples R China
2 Lanzhou Univ, Sch Math & Stat, Gansu Key Lab Appl Math & Complex Syst, Lanzhou 730000, Gansu, Peoples R China
Received
April 27, 2015
Accepted
May 11, 2016
Abstract

The second order weighted and shifted Grünwald difference (WSGD) operators are developed in [Tian, Zhou and Deng, Math. Comput., 84 (2015), pp. 1703–1727] to solve space fractional partial differential equations. Along this direction, we further design a new family of second order WSGD operators; by properly choosing the weighted parameters, they can be effectively used to discretize space (Riemann-Liouville) fractional derivatives. Based on the new second order WSGD operators, we derive a family of difference schemes for the space fractional advection diffusion equation. By von Neumann stability analysis, it is proved that the obtained schemes are unconditionally stable. Finally, extensive numerical experiments are performed to demonstrate the performance of the schemes and confirm the convergence orders.

Keywords
Riemann-Liouville fractional derivative WSGD operator fractional advection diffusion equation finite difference approximation stability.
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