Improved maximum-norm a posteriori error estimates for linear and semilinear parabolic equations

Natalia Kopteva, Torsten Linß

Research output: Contribution to journalArticlepeer-review

Abstract

Linear and semilinear second-order parabolic equations are considered. For these equations, we give a posteriori error estimates in the maximum norm that improve upon recent results in the literature. In particular it is shown that logarithmic dependence on the time step size can be eliminated. Semidiscrete and fully discrete versions of the backward Euler and of the Crank-Nicolson methods are considered. For their full discretizations, we use elliptic reconstructions that are, respectively, piecewise-constant and piecewise-linear in time. Certain bounds for the Green’s function of the parabolic operator are also employed.

Original languageEnglish
Pages (from-to)999-1022
Number of pages24
JournalAdvances in Computational Mathematics
Volume43
Issue number5
DOIs
Publication statusPublished - 1 Oct 2017

Keywords

  • Backward Euler
  • Crank-Nicolson
  • Elliptic reconstructions
  • Maximum-norm a posteriori error estimates
  • Parabolic problems

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