Abstract
In this paper, we develop a numerical method for the Lévy-Fokker-Planck equation with the fractional diffusive scaling. There are two main challenges. One comes from a two-fold nonlocality, that is, the need to apply the fractional Laplacian operator to a power law decay distribution. The other arises from long-time/small mean-free-path scaling, which introduces stiffness into the equation. To resolve the first difficulty, we use a change of variable to convert the unbounded domain into a bounded one and then apply the Chebyshev polynomial based pseudo-spectral method. To treat the multiple scales, we propose an asymptotic preserving scheme based on a novel micro-macro decomposition that uses the structure of the test function in proving the fractional diffusion limit analytically. Finally, the efficiency and accuracy of our scheme are illustrated by a suite of numerical examples.
Original language | English (US) |
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Pages (from-to) | 1-23 |
Number of pages | 23 |
Journal | Communications in Mathematical Sciences |
Volume | 21 |
Issue number | 1 |
DOIs | |
State | Published - 2023 |
Bibliographical note
Funding Information:Acknowledgment. This work is partially supported by NSF grant DMS-1846854. L.W. would like to thank Dr. Min Tang and Dr. Jingwei Hu for the discussion on computing the fractional Laplacian operator.
Publisher Copyright:
© 2023 International Press
Keywords
- Asymptotic preserving
- Fractional laplacian
- Lévy-fokker-planck
- Micro-macro decomposition