Analytic regularity and nonlinear approximation of a class of parametric semilinear elliptic PDEs

Media type: E-Book; Report

Title: Analytic regularity and nonlinear approximation of a class of parametric semilinear elliptic PDEs

Contributor: Hansen, Markus [Author]; Schwab, Christoph [Author]

imprint: Seminar for Applied Mathematics, ETH Zurich, 2011-05

Language: English

DOI: https://doi.org/20.500.11850/568256; https://doi.org/10.3929/ethz-a-010403202

Keywords: Tensor Product Taylor- ; Infinite dimensional spaces ; N-term approximation ; Legendre- and Chebyshev polynomial Approximation ; Semilinear elliptic partial differential equations ; Mathematics ; Analyticity in Infinite Dimensional Spaces

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Description: We investigate existence and regularity of a class of semilinear, parametric elliptic PDEs with affine dependence of the principal part of the differential operator on countably many parameters. We establish a-priori estimates and analyticity of the parametric solutions. We establish summability results of coefficient sequences of polynomial chaos type expansions of the parametric solutions in terms of tensorized Taylor-, Legendre- and Chebyshev polynomials on the infinite-dimensional parameter domain. We deduce rates of convergence for N term truncated approximations of expansions of the parametric solution. We also deduce spatial regularity of the solution, and establish convergence rates of N -term discretizations of the parametric solutions with respect to these polynomials in parameter space and with respect to a multilevel hierarchy of Finite Element spaces in the spatial domain of the PDE.

Access State: Open Access

Rights information: In Copyright - Non-commercial Use Permitted

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