Bänsch E, Brenner A (2019)
Publication Type: Journal article
Publication year: 2019
Book Volume: 39
Pages Range: 713-759
Journal Issue: 2
We derive optimal order residual-based a posteriori error estimates for fully discrete finite element approximations to the time-dependent Stokes equations. The time discretization uses the two-step backward differentiation formula, and the space discretization is based on inf-sup stable pairs of finite elements, which are allowed to change with time. We show that the time error estimators are of optimal order. This proof of optimality uses time regularity of the semidiscrete (discrete in space) time-dependent Stokes equations. Computational examples are given to confirm the theoretical findings. For completeness, a priori estimates are also presented.
APA:
Bänsch, E., & Brenner, A. (2019). A posteriori estimates for the two-step backward differentiation formula and discrete regularity for the time-dependent Stokes equations. IMA Journal of Numerical Analysis, 39(2), 713-759. https://doi.org/10.1093/imanum/dry014
MLA:
Bänsch, Eberhard, and Andreas Brenner. "A posteriori estimates for the two-step backward differentiation formula and discrete regularity for the time-dependent Stokes equations." IMA Journal of Numerical Analysis 39.2 (2019): 713-759.
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