liu.seSearch for publications in DiVA
Change search
CiteExportLink to record
Permanent link

Direct link
Cite
Citation style
  • apa
  • ieee
  • modern-language-association-8th-edition
  • vancouver
  • oxford
  • Other style
More styles
Language
  • de-DE
  • en-GB
  • en-US
  • fi-FI
  • nn-NO
  • nn-NB
  • sv-SE
  • Other locale
More languages
Output format
  • html
  • text
  • asciidoc
  • rtf
Efficient implementation of modern entropy stable and kinetic energy preserving discontinuous Galerkin methods for conservation laws
University of Münster, Germany.ORCID iD: 0000-0002-3456-2277
University of Stuttgart, Germany. (High-Performance Computing Center)ORCID iD: 0000-0002-3195-2536
Rice University, Houston, Texas, US. (Computational and Applied Mathematics)ORCID iD: 0000-0003-2077-3636
University of Cologne, Germany. (Mathematical Institute)ORCID iD: 0000-0001-6557-9162
Show others and affiliations
2021 (English)Other (Other academic)
Abstract [en]

Many modern discontinuous Galerkin (DG) methods for conservation laws make use of summation by parts operators and flux differencing to achieve kinetic energy preservation or entropy stability. While these techniques increase the robustness of DG methods significantly, they are also computationally more demanding than standard weak form nodal DG methods. We present several implementation techniques to improve the efficiency of flux differencing DG methodsthat use tensor product quadrilateral or hexahedral elements, in 2D or 3D respectively. Focus is mostly given to CPUs and DG methods for the compressible Euler equations, although these techniques are generally also useful for GPU computing and other physical systems including the compressible Navier-Stokes and magnetohydrodynamics equations. We present results using two open source codes, Trixi.jl written in Julia and FLUXO written in Fortran, to demonstrate that our proposed implementation techniques are applicable to different code bases and programming languages.

Place, publisher, year, pages
2021. , p. 29
Series
arXiv.org ; 2112.10517
Keywords [en]
flux differencing, entropy stability, conservation laws, summation by parts, discontinuous Galerkin
National Category
Computational Mathematics
Identifiers
URN: urn:nbn:se:liu:diva-182128OAI: oai:DiVA.org:liu-182128DiVA, id: diva2:1624443
Funder
EU, European Research Council, 714487German Research Foundation (DFG), 2044-390685587Swedish Research Council, 2020-03642Available from: 2022-01-04 Created: 2022-01-04 Last updated: 2022-01-04

Open Access in DiVA

No full text in DiVA

Other links

Full text in arXiv

Authority records

Winters, Andrew Ross

Search in DiVA

By author/editor
Ranocha, HendrikSchlottke-Lakemper, MichaelChan, JesseRueda-Ramírez, Andrés MWinters, Andrew RossHindenlang, FlorianGassner, Gregor J
By organisation
Faculty of Science & EngineeringApplied Mathematics
Computational Mathematics

Search outside of DiVA

GoogleGoogle Scholar

urn-nbn

Altmetric score

urn-nbn
Total: 101 hits
CiteExportLink to record
Permanent link

Direct link
Cite
Citation style
  • apa
  • ieee
  • modern-language-association-8th-edition
  • vancouver
  • oxford
  • Other style
More styles
Language
  • de-DE
  • en-GB
  • en-US
  • fi-FI
  • nn-NO
  • nn-NB
  • sv-SE
  • Other locale
More languages
Output format
  • html
  • text
  • asciidoc
  • rtf