The symmetric discontinuous Galerkin method does not need stabilization in 1D for polynomial orders p ≥ 2

Erik Burman; Alexandre Ern; Igor Mozolevski; Benjamin Stamm

doi:10.1016/j.crma.2007.10.028

The symmetric discontinuous Galerkin method does not need stabilization in 1D for polynomial orders p ≥ 2

Erik Burman
, Alexandre Ern
, Igor Mozolevski
, Benjamin Stamm

ENAC-IIC-GEL
École des ponts
Universidade Federal de Santa Catarina

Research output: Contribution to journal › Article › peer-review

Abstract

In this Note we prove that in one space dimension, the symmetric discontinuous Galerkin method for second order elliptic problems is stable for polynomial orders p ≥ 2 without using any stabilization parameter. The method yields optimal convergence rates in both the energy norm (L²-norm of broken gradient plus jump terms) and the L²-norm and can be written in conservative form with fluxes independent of any stabilization parameter. To cite this article: E. Burman et al., C. R. Acad. Sci. Paris, Ser. I 345 (2007).

Original language	English
Pages (from-to)	599-602
Number of pages	4
Journal	Comptes Rendus Mathematique
Volume	345
Issue number	10
DOIs	https://doi.org/10.1016/j.crma.2007.10.028
Publication status	Published - 15 Nov 2007

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abstract = "In this Note we prove that in one space dimension, the symmetric discontinuous Galerkin method for second order elliptic problems is stable for polynomial orders p ≥ 2 without using any stabilization parameter. The method yields optimal convergence rates in both the energy norm (L2-norm of broken gradient plus jump terms) and the L2-norm and can be written in conservative form with fluxes independent of any stabilization parameter. To cite this article: E. Burman et al., C. R. Acad. Sci. Paris, Ser. I 345 (2007).",

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AU - Burman, Erik

AU - Ern, Alexandre

AU - Mozolevski, Igor

AU - Stamm, Benjamin

PY - 2007/11/15

Y1 - 2007/11/15

N2 - In this Note we prove that in one space dimension, the symmetric discontinuous Galerkin method for second order elliptic problems is stable for polynomial orders p ≥ 2 without using any stabilization parameter. The method yields optimal convergence rates in both the energy norm (L2-norm of broken gradient plus jump terms) and the L2-norm and can be written in conservative form with fluxes independent of any stabilization parameter. To cite this article: E. Burman et al., C. R. Acad. Sci. Paris, Ser. I 345 (2007).

AB - In this Note we prove that in one space dimension, the symmetric discontinuous Galerkin method for second order elliptic problems is stable for polynomial orders p ≥ 2 without using any stabilization parameter. The method yields optimal convergence rates in both the energy norm (L2-norm of broken gradient plus jump terms) and the L2-norm and can be written in conservative form with fluxes independent of any stabilization parameter. To cite this article: E. Burman et al., C. R. Acad. Sci. Paris, Ser. I 345 (2007).

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DO - 10.1016/j.crma.2007.10.028

M3 - Article

AN - SCOPUS:36248963652

SN - 1631-073X

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EP - 602

JO - Comptes Rendus Mathematique

JF - Comptes Rendus Mathematique

IS - 10

ER -

The symmetric discontinuous Galerkin method does not need stabilization in 1D for polynomial orders p ≥ 2

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