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Buchholz, Simone [Author]; Dörich, Benjamin [Author]; Hochbruck, Marlis [Author]

On averaged exponential integrators for semilinear wave equations with solutions of low-regularity

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  • Media type: E-Article; Text
  • Title: On averaged exponential integrators for semilinear wave equations with solutions of low-regularity
  • Contributor: Buchholz, Simone [Author]; Dörich, Benjamin [Author]; Hochbruck, Marlis [Author]
  • imprint: Springer Science and Business Media, 2021-09-23
  • Published in: SN Partial Differential Equations and Applications, 2 (2), Art.-Nr.: 23 ; ISSN: 2662-2963, 2662-2971
  • Language: English
  • DOI: https://doi.org/10.5445/IR/1000137858; https://doi.org/10.1007/s42985-020-00045-9
  • ISSN: 2662-2963; 2662-2971
  • Keywords: Mathematics
  • Origination:
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  • Description: In this paper we introduce a class of second-order exponential schemes for the time integration of semilinear wave equations. They are constructed such that the established error bounds only depend on quantities obtained from a well-posedness result of a classical solution. To compensate missing regularity of the solution the proofs become considerably more involved compared to a standard error analysis. Key tools are appropriate filter functions as well as the integration-by-parts and summation-by-parts formulas. We include numerical examples to illustrate the advantage of the proposed methods.
  • Access State: Open Access