Convergence and optimality of adaptive nonconforming finite element methods for nonsymmetric and indefinite problems

Recently an adaptive nonconforming finite element method (ANFEM) has been developed by Carstensen and Hoppe. In this paper, we extend their result to nonsymmetric and indefinite problems. The main tools in our analysis are a posteriori error estimators and a quasi-orthogonality property. In this case, we need to overcome two main difficulties: one stems from the nonconformity of the finite element space, the other is how to handle the effect of a nonsymmetric and indefinite bilinear form. Two ANFEM algorithms (ANFEM I, ANFEM II) are proposed for the lowest order Crouzeix-Raviart element. It is shown that both ANFEM algorithms are a contraction for the sum of the energy error and a scaled volume term between two consecutive adaptive loops. Moreover, optimality in the sense of optimal algorithmic complexity can be shown for ANFEM II. The results of numerical experiments confirm the theoretical findings.

Metadaten
Author:	Huangxin Chen, Xuejun Xu, Ronald H. W. Hoppe ORCiD GND
URN:	urn:nbn:de:bvb:384-opus4-5040
Frontdoor URL	https://opus.bibliothek.uni-augsburg.de/opus4/636
Series (Serial Number):	Preprints des Instituts für Mathematik der Universität Augsburg (2008-11)
Type:	Preprint
Language:	English
Publishing Institution:	Universität Augsburg
Contributing Corporation:	LSEC, Chines Academy of Sciences, Beijing, University of Houston
Release Date:	2008/02/29
Tag:	adaptive finite element methods; convergence; optimality; nonsymmetric problems
GND-Keyword:	Finite-Elemente-Methode; Konvergenz; Optimum
Institutes:	Mathematisch-Naturwissenschaftlich-Technische Fakultät
	Mathematisch-Naturwissenschaftlich-Technische Fakultät / Institut für Mathematik
	Mathematisch-Naturwissenschaftlich-Technische Fakultät / Institut für Mathematik / Lehrstuhl für Numerische Mathematik
Dewey Decimal Classification:	5 Naturwissenschaften und Mathematik / 51 Mathematik / 510 Mathematik

Open Access