A reduced basis method for fractional diffusion operators II

IF 3.8 2区 数学 Q1 MATHEMATICS Journal of Numerical Mathematics Pub Date : 2019-04-11 DOI:10.1515/jnma-2020-0042
Tobias Danczul, J. Schöberl
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引用次数: 11

Abstract

Abstract We present a novel numerical scheme to approximate the solution map s ↦ u(s) := 𝓛–sf to fractional PDEs involving elliptic operators. Reinterpreting 𝓛–s as an interpolation operator allows us to write u(s) as an integral including solutions to a parametrized family of local PDEs. We propose a reduced basis strategy on top of a finite element method to approximate its integrand. Unlike prior works, we deduce the choice of snapshots for the reduced basis procedure analytically. The integral is interpreted in a spectral setting to evaluate the surrogate directly. Its computation boils down to a matrix approximation L of the operator whose inverse is projected to the s-independent reduced space, where explicit diagonalization is feasible. Exponential convergence rates are proven rigorously. A second algorithm is presented to avoid inversion of L. Instead, we directly project the matrix to the subspace, where its negative fractional power is evaluated. A numerical comparison with the predecessor highlights its competitive performance.
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分数阶扩散算子的简化基方法[j]
摘要提出了一种新的数值格式来近似含椭圆算子的分数阶偏微分方程的解映射s∑u(s):=𝓛-sf。将𝓛-s重新解释为插值算子允许我们将u(s)写成包含参数化的局部偏微分方程族解的积分。我们在有限元法的基础上提出了一种简化基策略来逼近其被积函数。与以往的工作不同,我们解析地推导了简化基过程的快照选择。在谱设置中解释积分以直接评估代理。它的计算可以归结为算子的矩阵近似L,其逆映射到s无关的简化空间,其中显式对角化是可行的。严格地证明了指数收敛速率。第二种算法是为了避免l的反转,我们直接将矩阵投影到子空间,在子空间中计算其负分数次幂。与前代产品的数值比较突出了其竞争性能。
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来源期刊
CiteScore
5.90
自引率
3.30%
发文量
17
审稿时长
>12 weeks
期刊介绍: The Journal of Numerical Mathematics (formerly East-West Journal of Numerical Mathematics) contains high-quality papers featuring contemporary research in all areas of Numerical Mathematics. This includes the development, analysis, and implementation of new and innovative methods in Numerical Linear Algebra, Numerical Analysis, Optimal Control/Optimization, and Scientific Computing. The journal will also publish applications-oriented papers with significant mathematical content in computational fluid dynamics and other areas of computational engineering, finance, and life sciences.
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