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Carstensen C, Feischl M, Page M, et al. Axioms of adaptivity. Comput Math Appl. 2014;67(6):1195-1253doi: 10.1016/j.camwa.2013.12.003.
Carstensen, C., Feischl, M., Page, M., & Praetorius, D. (2014). Axioms of adaptivity. Computers & mathematics with applications (Oxford, England : 1987), 67(6), 1195-1253. https://doi.org/10.1016/j.camwa.2013.12.003
Carstensen, C, et al. "Axioms of adaptivity." Computers & mathematics with applications (Oxford, England : 1987) vol. 67,6 (2014): 1195-1253. doi: https://doi.org/10.1016/j.camwa.2013.12.003
Carstensen C, Feischl M, Page M, Praetorius D. Axioms of adaptivity. Comput Math Appl. 2014 Apr;67(6):1195-1253. doi: 10.1016/j.camwa.2013.12.003. PMID: 25983390; PMCID: PMC4384743.
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Comput Math Appl. 2014 Apr;67(6):1195-1253. doi: 10.1016/j.camwa.2013.12.003.

Axioms of adaptivity.

Computers & mathematics with applications (Oxford, England : 1987)

C Carstensen, M Feischl, M Page, D Praetorius

Affiliations

  1. Institut für Mathematik, Humboldt Universität zu Berlin, Unter den Linden 6, 10099 Berlin, Germany ; Department of Computational Science and Engineering, Yonsei University, 120-749 Seoul, Republic of Korea.
  2. Institute for Analysis and Scientific Computing, Vienna University of Technology, Wiedner Hauptstraße 8-10, A-1040 Wien, Austria.

PMID: 25983390 PMCID: PMC4384743 DOI: 10.1016/j.camwa.2013.12.003

Abstract

This paper aims first at a simultaneous axiomatic presentation of the proof of optimal convergence rates for adaptive finite element methods and second at some refinements of particular questions like the avoidance of (discrete) lower bounds, inexact solvers, inhomogeneous boundary data, or the use of equivalent error estimators. Solely four axioms guarantee the optimality in terms of the error estimators. Compared to the state of the art in the temporary literature, the improvements of this article can be summarized as follows: First, a general framework is presented which covers the existing literature on optimality of adaptive schemes. The abstract analysis covers linear as well as nonlinear problems and is independent of the underlying finite element or boundary element method. Second, efficiency of the error estimator is neither needed to prove convergence nor quasi-optimal convergence behavior of the error estimator. In this paper, efficiency exclusively characterizes the approximation classes involved in terms of the best-approximation error and data resolution and so the upper bound on the optimal marking parameters does not depend on the efficiency constant. Third, some general quasi-Galerkin orthogonality is not only sufficient, but also necessary for the [Formula: see text]-linear convergence of the error estimator, which is a fundamental ingredient in the current quasi-optimality analysis due to Stevenson 2007. Finally, the general analysis allows for equivalent error estimators and inexact solvers as well as different non-homogeneous and mixed boundary conditions.

Keywords: A posteriori error estimators; Boundary element method; Finite element method; Iterative solvers; Local mesh-refinement; Optimal convergence rates

References

  1. Appl Numer Math. 2012 Jun;62(6):787-801 - PubMed
  2. J Comput Appl Math. 2014 Jan 1;255(100):481-501 - PubMed

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