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Projekt Druckansicht

Rate Optimality of Adaptive Finite Elements for Parabolic Partial Differential Equations

Fachliche Zuordnung Mathematik
Förderung Förderung von 2015 bis 2019
Projektkennung Deutsche Forschungsgemeinschaft (DFG) - Projektnummer 273218570
 
Erstellungsjahr 2019

Zusammenfassung der Projektergebnisse

The most important advances made during the project were without a doubt the the design and analysis of the TAFEM algorithm and the a posteriori analysis for dG(s) in time discretizations, as well as a simplified algorithm and the extension of the result to isogeometric discretizations which we expect to be extensible to more general problems. The H1-stability result for the L2-projection also helped extend the type of refinement and polynomial degree for which the quasi-best approximation result holds true, as well as many other applications.

Projektbezogene Publikationen (Auswahl)

  • A Weak Compatibility Condition for Newest Vertex Bisection in Any Dimension. SIAM J. Sci. Comput., 40(6):A3853–A3872, 2018
    M. Alkämper, F. D. Gaspoz, and R. Klöfkorn
    (Siehe online unter https://doi.org/10.1137/17M1156137)
  • A convergent time-space adaptive dG(s) finite element method for parabolic problems motivated by equal error distribution. IMA J. of Numer. Anal., 39(2):650–686, 2019
    F. D. Gaspoz, C. Kreuzer, K. G. Siebert, and D. Ziegler
    (Siehe online unter https://doi.org/10.1093/imanum/dry005)
  • An Alternative Proof of the H1-Stability of the L2 -Projection on Graded Meshes. Stuttgarter Mathematische Berichte 2019-001, Universität Stuttgart, ISSN 1613-8309
    F. D. Gaspoz, C.-J. Heine and K. G. Siebert
 
 

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