Former Member

Dr. Svetlana Matculevich

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Peer Reviewed Journal Publication
  • Langer, Ulrich; Matculevich, Svetlana; Repin, Sergey (2019) Guaranteed error bounds and local indicators for adaptive solvers using stabilised space-time IgA approximations to parabolic problems. Comput. Math. Appl., Bd. 78 (8), S. 2641-2671.
  • Matculevich, Svetlana; Wolfmayr, Monika (2018) On the a posteriori error analysis for linear Fokker-Planck models in convection-dominated diffusion problems. Appl. Math. Comput., Bd. 339, S. 779-804.
  • Repin, S. V. Matculevich and S. I. Estimates for the difference between exact and approximate solutions of parabolicequations on the basis of Poincaré inequalities for traces of functions on the boundary. Differential Equations, Bd. 52 (10), S. 11.

Research Report
  • Ulrich Langer, Svetlana Matculevich, and Sergey Repin (2017) Guaranteed error control bounds for the stabilised space-time IgA approximations to parabolic problems.
  • Holm, Svetlana Matculevich and Bärbel (2017) Fully reliable error control for first-order evolutionary problems. <'Computers and Mathematics with Applications'>.
  • Repin, S. Matculevich and S. (2016) Explicit constants in Poincaré-type inequalities for simplicial domains and applicationto a posteriori estimates. <'Comput. Methods Appl. Math. 2016; 16 (2):277–298'>. (link)
  • A posteriori error estimates for space-time IgA approximations to parabolic initial boundary value problems. Bericht-Nr. arXiv:1612.08998;. (link)
  • Langer, U.; Matculevich, S.; Repin, S. (online: 2016) A posteriori error estimates for space-time iga approximations to parabolic initial boundary value problems. (link)