Sparse adaptive Taylor approximation algorithms for parametric and stochastic elliptic PDEs
Open access
Date
2011-07Type
- Report
ETH Bibliography
yes
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Abstract
The numerical approximation of parametric partial differential equations is a computational challenge, in particular when the number of involved parameter is large. This paper considers a model class of second order, linear, parametric, elliptic PDEs on a bounded domain D with diffusion coefficients depending on the parameters in an affine manner. For such models, it was shown in [11, 12] that under very weak assumptions on the diffusion coefficients, the entire family of solutions to such equations can be simultaneously approximated in the Hilbert space V = H1 0 (D) by multivariate sparse polynomials in the parameter vector y with a controlled number N of terms. The convergence rate in terms of N does not depend on the number of parameters in V , which may be arbitrarily large or countably infinite, thereby breaking the curse of dimensionality. However, these approximation results do not describe the concrete construction of these polynomial expansions, and should therefore rather be viewed as benchmark for the convergence analysis of numerical methods. The present paper presents an adaptive numerical algorithm for constructing a sequence of sparse polynomials that is proved to converge toward the solution with the optimal benchmark rate. Numerical experiments are presented in large parameter dimension, which confirm the effectiveness of the adaptive approach. Show more
Permanent link
https://doi.org/10.3929/ethz-a-010402173Publication status
publishedJournal / series
Research ReportsVolume
Publisher
SAM, ETH ZürichSubject
STOCHASTIC DIFFERENTIAL EQUATIONS (PROBABILITY THEORY); PARTIAL DIFFERENTIAL EQUATIONS (NUMERICAL MATHEMATICS); STOCHASTISCHE DIFFERENTIALGLEICHUNGEN (WAHRSCHEINLICHKEITSRECHNUNG); ELLIPTISCHE DIFFERENTIALGLEICHUNGEN (ANALYSIS); ASYMPTOTISCHE APPROXIMATION (NUMERISCHE MATHEMATIK); ASYMPTOTIC APPROXIMATION (NUMERICAL MATHEMATICS); ELLIPTIC DIFFERENTIAL EQUATIONS (MATHEMATICAL ANALYSIS); PARTIELLE DIFFERENTIALGLEICHUNGEN (NUMERISCHE MATHEMATIK)Organisational unit
03435 - Schwab, Christoph / Schwab, Christoph
02501 - Seminar für Angewandte Mathematik / Seminar for Applied Mathematics
Funding
247277 - Automated Urban Parking and Driving (EC)
Related publications and datasets
Is previous version of: http://hdl.handle.net/20.500.11850/685102
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ETH Bibliography
yes
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