KNM MFF UK

Katedra numerické matematiky Matematicko-fyzikální fakulta Univerzita Karlova

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

  • ID: 2445, RIV: 10081172
  • ISSN: neuvedeno, ISBN: 978-80-85823-57-8
  • zdroj: Programs and Algorithms of Numerical Mathematics 15
  • klíčová slova: a posteriori error estimates; discontinuous Galerkin method; Helmholz decomposition
  • autoři: Ivana Šebestová, Vít Dolejší
  • autoři z KNM: Dolejší Vít

Abstrakt

We deal with the heat equation discretized by discontinuous Galerkin finite element method in space and by backward Euler method in time. We present a simple and efficient a posteriori error estimate based on Helmholz decomposition technique.