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A posteriori error estimates in the maximum norm for parabolic problems

Numerical Analysis 2011-04-06 v1 Analysis of PDEs
Authors: Alan Demlow , Omar Lakkis , Charalambos Makridakis
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Abstract

We derive a posteriori error estimates in the L((0,T];L(Ω))L_\infty((0,T];L_\infty(\Omega)) norm for approximations of solutions to linear para bolic equations. Using the elliptic reconstruction technique introduced by Makridakis and Nochetto and heat kernel estimates for linear parabolic pr oblems, we first prove a posteriori bounds in the maximum norm for semidiscrete finite element approximations. We then establish a posteriori bounds for a fully discrete backward Euler finite element approximation. The elliptic reconstruction technique greatly simplifies our development by allow\ ing the straightforward combination of heat kernel estimates with existing elliptic maximum norm error estimators.

Keywords

a posteriori error estimation finite element method gradient estimates

Cite

@article{arxiv.0711.3928,
  title  = {A posteriori error estimates in the maximum norm for parabolic problems},
  author = {Alan Demlow and Omar Lakkis and Charalambos Makridakis},
  journal= {arXiv preprint arXiv:0711.3928},
  year   = {2011}
}

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