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Reliable and efficient a posteriori error estimates for finite element approximations of the parabolic p-Laplacian

Abstract:: We generalize the a posteriori techniques for the linear heat equation in [Ver03] to the case of the nonlinear parabolic p-Laplace problem thereby proving reliable and efficient a posteriori error estimates for a fully discrete implicite Euler Galerkin finite element scheme. The error is analyzed using the so-called quasi-norm and a related dual error expression. This leads to equivalence of the error and the residual, which is the key property for proving the error bounds.

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APA Style

Kreuzer, C. (2011). Reliable and efficient a posteriori error estimates for finite element approximations of the parabolic p-Laplacian. Springer.

MLA Style

Kreuzer, C. Reliable and Efficient a Posteriori Error Estimates for Finite Element Approximations of the Parabolic p-Laplacian. Springer, 2011.

Chicago Style

Kreuzer, C. 2011. “Reliable and Efficient a Posteriori Error Estimates for Finite Element Approximations of the Parabolic p-Laplacian.” Springer.
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Files:: NA-11-19.pdf

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+ Kreuzer, C More by this author

Role:: Author

Publisher:: Springer
Publication date:: 2011-12-01

UUID:: uuid:09b79855-4186-43f3-87a3-996ba792b8e5
Local pid:: oai:eprints.maths.ox.ac.uk:1456
Deposit date:: 2011-12-16

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Copyright date:: 2011

Licence:: Terms and Conditions of Use for Oxford University Research Archive

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