A 3rd/2nd order MOOD limited scheme for the shallow water equations

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Abstract: We present a high‐order accurate, positivity‐preserving and well‐balanced finite volume scheme for the shallow water equations with variable topography. An unlimited third‐order scheme is combined with the recent, second‐order accurate Bottom‐Surface‐Gradient Method (BSGM, [5]). This is monitored by an a‐posteriori MOOD (Multidimensional Optimal Order Detection) limiting step [2, 7–9], which detects possible local instabilities of a high‐order candidate solution such as loss of positivity or local oscillations, and switches locally to a lower order, stable and robust “parachute” scheme if necessary. We demonstrate the accuracy, effectiveness and robustness of the proposed adaptive methodology with numerical experiments, both for near‐equilibrium and non‐equilibrium depth‐averaged flows.

Standort
Deutsche Nationalbibliothek Frankfurt am Main
Umfang
Online-Ressource
Sprache
Englisch

Erschienen in
A 3rd/2nd order MOOD limited scheme for the shallow water equations ; volume:23 ; number:1 ; year:2023 ; extent:6
Proceedings in applied mathematics and mechanics ; 23, Heft 1 (2023) (gesamt 6)

Urheber
Hörnschemeyer, Sophie
Bacigaluppi, Paola
Noelle, Sebastian
Chen, Guoxian

DOI
10.1002/pamm.202200252
URN
urn:nbn:de:101:1-2023060115105854967156
Rechteinformation
Open Access; Der Zugriff auf das Objekt ist unbeschränkt möglich.
Letzte Aktualisierung
14.08.2024, 10:19 MESZ

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Beteiligte

  • Hörnschemeyer, Sophie
  • Bacigaluppi, Paola
  • Noelle, Sebastian
  • Chen, Guoxian

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