On the theoretical foundation of overset grid methods for hyperbolic problems: Well-posedness and conservation

David A. Kopriva, Jan Nordström, Gregor J. Gassner

Research output: Contribution to journalArticlepeer-review

3 Citations (Scopus)

Abstract

We use the energy method to study the well-posedness of initial-boundary value problems approximated by overset mesh methods in one and two space dimensions for linear constant-coefficient hyperbolic systems. We show that in one space dimension, for both scalar equations and systems of equations, the problem where one domain partially oversets another is well-posed when characteristic coupling conditions are used. If a system cannot be diagonalized, as is usually the case in multiple space dimensions, then the energy method does not give proper bounds in terms of initial and boundary data. For those problems, we propose a novel penalty approach. We show, by using a global energy that accounts for the energy in the overlap region of the domains, that under well-defined conditions on the coupling matrices the penalized overset domain problems are energy bounded, conservative, well-posed and have solutions equivalent to the original single domain problem.

Original languageEnglish
Article number110732
JournalJournal of Computational Physics
Volume448
DOIs
Publication statusPublished - 1 Jan 2022

Keywords

  • Chimera method
  • Conservation
  • Overset grids
  • Penalty methods
  • Stability
  • Well-posedness

ASJC Scopus subject areas

  • Numerical Analysis
  • Modeling and Simulation
  • Physics and Astronomy (miscellaneous)
  • General Physics and Astronomy
  • Computer Science Applications
  • Computational Mathematics
  • Applied Mathematics

Fingerprint

Dive into the research topics of 'On the theoretical foundation of overset grid methods for hyperbolic problems: Well-posedness and conservation'. Together they form a unique fingerprint.

Cite this