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Barrenechea, Gabriel R. [VerfasserIn]; John, Volker [VerfasserIn]; Knobloch, Petr [VerfasserIn]

Some analytical results for an algebraic flux correction scheme for a steady convection-diffusion equation in 1D

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  • Medientyp: Sonstige Veröffentlichung; E-Book; Bericht
  • Titel: Some analytical results for an algebraic flux correction scheme for a steady convection-diffusion equation in 1D
  • Beteiligte: Barrenechea, Gabriel R. [VerfasserIn]; John, Volker [VerfasserIn]; Knobloch, Petr [VerfasserIn]
  • Erschienen: Weierstrass Institute for Applied Analysis and Stochastics publication server, 2014
  • Sprache: Englisch
  • DOI: https://doi.org/10.20347/WIAS.PREPRINT.1916
  • Schlagwörter: 65N30 ; finite element method -- convection-diffusion equation -- algebraic flux correction -- discrete maximum principle -- fixed point iteration -- solvability of linear subproblems -- solvability of nonlinear problem ; article ; 65N06
  • Entstehung:
  • Anmerkungen: Diese Datenquelle enthält auch Bestandsnachweise, die nicht zu einem Volltext führen.
  • Beschreibung: Algebraic flux correction schemes are nonlinear discretizations of convection dominated problems. In this work, a scheme from this class is studied for a steady-state convection--diffusion equation in one dimension. It is proved that this scheme satisfies the discrete maximum principle. Also, as it is a nonlinear scheme, the solvability of the linear subproblems arising in a Picard iteration is studied, where positive and negative results are proved. Furthermore, the non-existence of solutions for the nonlinear scheme is proved by means of counterexamples. Therefore, a modification of the method, which ensures the existence of a solution, is proposed. A weak version of the discrete maximum principle is proved for this modified method.