A posteriori error estimates of the discontinuous Galerkin method for parabolic problem

Šebestová, Ivana; Dolejší, Vít

  • Programs and Algorithms of Numerical Mathematics, Publisher: Institute of Mathematics AS CR(Prague), page 158-163

Abstract

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We deal with a posteriori error estimates of the discontinuous Galerkin method applied to the nonstationary heat conduction equation. The problem is discretized in time by the backward Euler scheme and a posteriori error analysis is based on the Helmholtz decomposition.

How to cite

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Šebestová, Ivana, and Dolejší, Vít. "A posteriori error estimates of the discontinuous Galerkin method for parabolic problem." Programs and Algorithms of Numerical Mathematics. Prague: Institute of Mathematics AS CR, 2010. 158-163. <http://eudml.org/doc/271315>.

@inProceedings{Šebestová2010,
abstract = {We deal with a posteriori error estimates of the discontinuous Galerkin method applied to the nonstationary heat conduction equation. The problem is discretized in time by the backward Euler scheme and a posteriori error analysis is based on the Helmholtz decomposition.},
author = {Šebestová, Ivana, Dolejší, Vít},
booktitle = {Programs and Algorithms of Numerical Mathematics},
keywords = {a posteriori error estimates; discontinuous Galerkin; heat equation},
location = {Prague},
pages = {158-163},
publisher = {Institute of Mathematics AS CR},
title = {A posteriori error estimates of the discontinuous Galerkin method for parabolic problem},
url = {http://eudml.org/doc/271315},
year = {2010},
}

TY - CLSWK
AU - Šebestová, Ivana
AU - Dolejší, Vít
TI - A posteriori error estimates of the discontinuous Galerkin method for parabolic problem
T2 - Programs and Algorithms of Numerical Mathematics
PY - 2010
CY - Prague
PB - Institute of Mathematics AS CR
SP - 158
EP - 163
AB - We deal with a posteriori error estimates of the discontinuous Galerkin method applied to the nonstationary heat conduction equation. The problem is discretized in time by the backward Euler scheme and a posteriori error analysis is based on the Helmholtz decomposition.
KW - a posteriori error estimates; discontinuous Galerkin; heat equation
UR - http://eudml.org/doc/271315
ER -

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