Analysis of algebraic flux correction for semi-discrete advection problems

• Verfasst von: Hajduk, Hennes [VerfasserIn]
• Verfasst von: Rupp, Andreas [VerfasserIn]
• Verfasst von: Kuzmin, D. [VerfasserIn]
• Titel: Analysis of algebraic flux correction for semi-discrete advection problems
• Verf.angabe: Hennes Hajduk, Andreas Rupp, and Dmitri Kuzmin
• E-Jahr: 2021
• Jahr: 12 Apr 2021
• Umfang: 27 S.
• Fussnoten: Gesehen am 29.09.2022
• Titel Quelle: Enthalten in: De.arxiv.org
• Ort Quelle: [S.l.] : Arxiv.org, 1991
• Jahr Quelle: 2021
• Band/Heft Quelle: (2021), Artikel-ID 2104.05639, Seite 1-27
• DOI: doi:10.48550/arXiv.2104.05639
• Datenträger: Online-Ressource
• Sprache: eng
• Sach-SW: Mathematics - Numerical Analysis
• K10plus-PPN: 1817782819

Abstract

We present stability and error analysis for algebraic flux correction schemes based on monolithic convex limiting. For a continuous finite element discretization of the time-dependent advection equation, we prove global-in-time existence and the worst-case convergence rate of 1/2 w.r.t. the L2 error of the spatial semi-discretization. Moreover, we address the important issue of stabilization for raw antidiffusive fluxes. Our a priori error analysis reveals that their limited counterparts should satisfy a generalized coercivity condition. We introduce a limiter for enforcing this condition in the process of flux correction. To verify the results of our theoretical studies, we perform numerical experiments for simple one-dimensional test problems. The methods under investigation exhibit the expected behavior in all numerical examples. In particular, the use of stabilized fluxes improves the accuracy of numerical solutions and coercivity enforcement often becomes redundant.