A radial basis functions method for fractional diffusion equations

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• 作者：Cé ; cile Piret^a ; ^{cecile.piret@uclouvain.be} ; Emmanuel Hanert^b ; ^{emmanuel.hanert@uclouvain.be}
• 关键词：Radial basis functions ; RBF ; Fractional diffusion equation ; Anomalous diffusion
• 刊名：Journal of Computational Physics
• 出版年：2013
• 出版时间：1 April, 2013
• 年：2013
• 卷：238
• 期：Complete
• 页码：71-81
• 全文大小：500 K

文摘

One of the ongoing issues with fractional diffusion models is the design of an efficient high-order numerical discretization. This is one of the reasons why fractional diffusion models are not yet more widely used to describe complex systems. In this paper, we derive a radial basis functions (RBF) discretization of the one-dimensional space-fractional diffusion equation. In order to remove the ill-conditioning that often impairs the convergence rate of standard RBF methods, we use the RBF-QR method . By using this algorithm, we can analytically remove the ill-conditioning that appears when the number of nodes increases or when basis functions are made increasingly flat. The resulting RBF-QR-based method exhibits an exponential rate of convergence for infinitely smooth solutions that is comparable to the one achieved with pseudo-spectral methods. We illustrate the flexibility of the algorithm by comparing the standard RBF and RBF-QR methods for two numerical examples. Our results suggest that the global character of the RBFs makes them well-suited to fractional diffusion equations. They naturally take the global behavior of the solution into account and thus do not result in an extra computational cost when moving from a second-order to a fractional-order diffusion model. As such, they should be considered as one of the methods of choice to discretize fractional diffusion models of complex systems.