University of Limerick
Browse

Maximum norm a posteriori error estimation for parabolic problems using elliptic reconstructions

Download (280.21 kB)
journal contribution
posted on 2017-03-13, 10:19 authored by Natalia KoptevaNatalia Kopteva, Torsten Linss
A semilinear second-order parabolic equation is considered in a regular and a singularly perturbed regime. For this equation, we give computable a posteriori error estimates in the maximum norm. Semidiscrete and fully discrete versions of the backward Euler, Crank-Nicolson, and discontinuous Galerkin dG(r) methods are addressed. For their full discretizations, we employ elliptic reconstructions that are, respectively, piecewise-constant, piecewise-linear, and piecewise-quadratic for r = 1 in time. We also use certain bounds for the Green's function of the parabolic operator.

History

Publication

SIAM Journal on Numerical Analysis;51 (3), pp. 1494-1524

Publisher

SIAM:Society for Industrial and Applied Mathematics

Note

peer-reviewed

Language

English

Usage metrics

    University of Limerick

    Categories

    No categories selected

    Exports

    RefWorks
    BibTeX
    Ref. manager
    Endnote
    DataCite
    NLM
    DC