> simulation by means of second-kind Galerkin boundary element method.>> Source: Elke Spindler "Second-Kind Single Trace Boundary Integral>> Formulations for Scattering at Composite Objects", ETH Diss 23620, 2016."" > > simulation by means of second-kind Galerkin boundary element method.>> Source: Elke Spindler "Second-Kind Single Trace Boundary Integral>> Formulations for Scattering at Composite Objects", ETH Diss 23620, 2016."" > Research reports – Seminar for Applied Mathematics | ETH Zurich

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Adaptive wavelet methods for elliptic partial differential equations with random operators

by C. J. Gittelson

(Report number 2011-37)

Abstract
We apply adaptive wavelet methods to boundary value problems with random coefficients, discretized by wavelets or frames in the spatial domain and tensorized polynomials in the parameter domain. Greedy algorithms control the approximate application of the fully discretized random operator, and the construction of sparse approximations to this operator. We suggest a power iteration for estimating errors induced by sparse approximations of linear operators.

Keywords: partial differential equations with random coefficients, uncertainty quantification, stochastic finite element methods, operator equations, adaptive methods

BibTeX 
@Techreport{G11_119,
  author = {C. J. Gittelson},
  title = {Adaptive wavelet methods for elliptic partial differential equations with random operators},
  institution = {Seminar for Applied Mathematics, ETH Z{\"u}rich},
  number = {2011-37},
  address = {Switzerland},
  url = {https://www.sam.math.ethz.ch/sam_reports/reports_final/reports2011/2011-37.pdf },
  year = {2011}
}
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