Analysis of a discontinuous galerkin method for heterogeneous diffusion problems with low-regularity solutions

Daniele A. Di Pietro; Alexandre Ern

doi:10.1002/num.20675

Analysis of a discontinuous galerkin method for heterogeneous diffusion problems with low-regularity solutions

Daniele A. Di Pietro
, Alexandre Ern

IFP Energies nouvelles

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Résumé

We study the convergence of the Symmetric Weighted Interior Penalty discontinuous Galerkin method for heterogeneous diffusion problems with low-regularity solutions only belonging to W ^{2, p} with p ε (1,2]. In 2d, we infer an optimal algebraic convergence rate. In any space dimension d, we achieve the same result for p > 2 d/(d + 2). We also prove convergence without algebraic rates for exact solutions only belonging to the energy space.

langue originale	Anglais
Pages (de - à)	1161-1177
Nombre de pages	17
journal	Numerical Methods for Partial Differential Equations
Volume	28
Numéro de publication	4
Les DOIs	https://doi.org/10.1002/num.20675
état	Publié - 1 juil. 2012

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10.1002/num.20675

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title = "Analysis of a discontinuous galerkin method for heterogeneous diffusion problems with low-regularity solutions",

abstract = "We study the convergence of the Symmetric Weighted Interior Penalty discontinuous Galerkin method for heterogeneous diffusion problems with low-regularity solutions only belonging to W 2, p with p ε (1,2]. In 2d, we infer an optimal algebraic convergence rate. In any space dimension d, we achieve the same result for p > 2 d/(d + 2). We also prove convergence without algebraic rates for exact solutions only belonging to the energy space.",

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AU - Ern, Alexandre

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N2 - We study the convergence of the Symmetric Weighted Interior Penalty discontinuous Galerkin method for heterogeneous diffusion problems with low-regularity solutions only belonging to W 2, p with p ε (1,2]. In 2d, we infer an optimal algebraic convergence rate. In any space dimension d, we achieve the same result for p > 2 d/(d + 2). We also prove convergence without algebraic rates for exact solutions only belonging to the energy space.

AB - We study the convergence of the Symmetric Weighted Interior Penalty discontinuous Galerkin method for heterogeneous diffusion problems with low-regularity solutions only belonging to W 2, p with p ε (1,2]. In 2d, we infer an optimal algebraic convergence rate. In any space dimension d, we achieve the same result for p > 2 d/(d + 2). We also prove convergence without algebraic rates for exact solutions only belonging to the energy space.

KW - discontinuous Galerkin

KW - error analysis

KW - heterogeneous diffusion

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U2 - 10.1002/num.20675

DO - 10.1002/num.20675

M3 - Article

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JO - Numerical Methods for Partial Differential Equations

JF - Numerical Methods for Partial Differential Equations

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Analysis of a discontinuous galerkin method for heterogeneous diffusion problems with low-regularity solutions

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