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Main Authors: Feng, Libo, Liu, Fawang, Turner, Ian
Format: Preprint
Published: 2019
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Online Access:https://arxiv.org/abs/1901.03938
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author Feng, Libo
Liu, Fawang
Turner, Ian
author_facet Feng, Libo
Liu, Fawang
Turner, Ian
contents In this paper, we propose a novel unstructured mesh control volume method to deal with the space fractional derivative on arbitrarily shaped convex domains, which to the best of our knowledge is a new contribution to the literature. Firstly, we present the finite volume scheme for the two-dimensional space fractional diffusion equation with variable coefficients and provide the full implementation details for the case where the background interpolation mesh is based on triangular elements. Secondly, we explore the property of the stiffness matrix generated by the integral of space fractional derivative. We find that the stiffness matrix is sparse and not regular. Therefore, we choose a suitable sparse storage format for the stiffness matrix and develop a fast iterative method to solve the linear system, which is more efficient than using the Gaussian elimination method. Finally, we present several examples to verify our method, in which we make a comparison of our method with the finite element method for solving a Riesz space fractional diffusion equation on a circular domain. The numerical results demonstrate that our method can reduce CPU time significantly while retaining the same accuracy and approximation property as the finite element method. The numerical results also illustrate that our method is effective and reliable and can be applied to problems on arbitrarily shaped convex domains.
format Preprint
id arxiv_https___arxiv_org_abs_1901_03938
institution arXiv
publishDate 2019
record_format arxiv
spellingShingle An unstructured mesh control volume method for two-dimensional space fractional diffusion equations with variable coefficients on convex domains
Feng, Libo
Liu, Fawang
Turner, Ian
Numerical Analysis
26A33 65M08 65F10
In this paper, we propose a novel unstructured mesh control volume method to deal with the space fractional derivative on arbitrarily shaped convex domains, which to the best of our knowledge is a new contribution to the literature. Firstly, we present the finite volume scheme for the two-dimensional space fractional diffusion equation with variable coefficients and provide the full implementation details for the case where the background interpolation mesh is based on triangular elements. Secondly, we explore the property of the stiffness matrix generated by the integral of space fractional derivative. We find that the stiffness matrix is sparse and not regular. Therefore, we choose a suitable sparse storage format for the stiffness matrix and develop a fast iterative method to solve the linear system, which is more efficient than using the Gaussian elimination method. Finally, we present several examples to verify our method, in which we make a comparison of our method with the finite element method for solving a Riesz space fractional diffusion equation on a circular domain. The numerical results demonstrate that our method can reduce CPU time significantly while retaining the same accuracy and approximation property as the finite element method. The numerical results also illustrate that our method is effective and reliable and can be applied to problems on arbitrarily shaped convex domains.
title An unstructured mesh control volume method for two-dimensional space fractional diffusion equations with variable coefficients on convex domains
topic Numerical Analysis
26A33 65M08 65F10
url https://arxiv.org/abs/1901.03938