On rational Krylov and reduced basis methods for fractional diffusion

IF 4.3 3区 材料科学 Q1 ENGINEERING, ELECTRICAL & ELECTRONIC ACS Applied Electronic Materials Pub Date : 2021-02-26 DOI:10.1515/jnma-2021-0032
Tobias Danczul, C. Hofreither
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引用次数: 6

Abstract

Abstract We establish an equivalence between two classes of methods for solving fractional diffusion problems, namely, Reduced Basis Methods (RBM) and Rational Krylov Methods (RKM). In particular, we demonstrate that several recently proposed RBMs for fractional diffusion can be interpreted as RKMs. This changed point of view allows us to give convergence proofs for some methods where none were previously available. We also propose a new RKM for fractional diffusion problems with poles chosen using the best rational approximation of the function z−s with z ranging over the spectral interval of the spatial discretization matrix. We prove convergence rates for this method and demonstrate numerically that it is competitive with or superior to many methods from the reduced basis, rational Krylov, and direct rational approximation classes. We provide numerical tests for some elliptic fractional diffusion model problems.
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分数阶扩散的有理Krylov和约基方法
摘要建立了求解分数阶扩散问题的两类方法,即简化基方法(RBM)和有理Krylov方法(RKM)之间的等价性。特别是,我们证明了最近提出的几个分数扩散的rbm可以解释为rkm。这种改变的观点使我们能够对一些以前没有的方法给出收敛性证明。对于分数阶扩散问题,我们还提出了一个新的RKM,该RKM使用函数z−s的最佳有理逼近来选择极点,其中z在空间离散化矩阵的谱区间内取值。我们证明了该方法的收敛速度,并在数值上证明了它与来自简化基、有理Krylov和直接有理逼近类的许多方法相竞争或优于。给出了若干椭圆型分数扩散模型问题的数值检验。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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CiteScore
7.20
自引率
4.30%
发文量
567
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