Local Projection-Based Stabilized Mixed Finite Element Methods for Kirchhoff Plate Bending Problems

Local Projection-Based Stabilized Mixed Finite Element Methods for Kirchhoff Plate Bending Problems

Based on stress-deflection variational formulation, we propose a family of local projection-based stabilized mixed finite element methods for Kirchhoff plate bending problems. According to the error equations, we obtain the error estimates of the approximation to stress tensor in energy norm. And by...

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Main Author: Xuehai Huang
Format: Article
Language:English
Published: Hindawi Limited 2013-01-01
Series:Abstract and Applied Analysis
Online Access:http://dx.doi.org/10.1155/2013/523909
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spelling doaj-03eaed6a2a5c4c6296f835e7852fc3a42020-11-24T23:46:41ZengHindawi LimitedAbstract and Applied Analysis1085-33751687-04092013-01-01201310.1155/2013/523909523909Local Projection-Based Stabilized Mixed Finite Element Methods for Kirchhoff Plate Bending ProblemsXuehai Huang0College of Mathematics and Information Science, Wenzhou University, Wenzhou 325035, ChinaBased on stress-deflection variational formulation, we propose a family of local projection-based stabilized mixed finite element methods for Kirchhoff plate bending problems. According to the error equations, we obtain the error estimates of the approximation to stress tensor in energy norm. And by duality argument, error estimates of the approximation to deflection in H1-norm are achieved. Then we design an a posteriori error estimator which is closely related to the equilibrium equation, constitutive equation, and nonconformity of the finite element spaces. With the help of Zienkiewicz-Guzmán-Neilan element spaces, we prove the reliability of the a posteriori error estimator. And the efficiency of the a posteriori error estimator is proved by standard bubble function argument.http://dx.doi.org/10.1155/2013/523909
collection DOAJ
language English
format Article
sources DOAJ
author Xuehai Huang
spellingShingle Xuehai Huang
Local Projection-Based Stabilized Mixed Finite Element Methods for Kirchhoff Plate Bending Problems
Abstract and Applied Analysis
author_facet Xuehai Huang
author_sort Xuehai Huang
title Local Projection-Based Stabilized Mixed Finite Element Methods for Kirchhoff Plate Bending Problems
title_short Local Projection-Based Stabilized Mixed Finite Element Methods for Kirchhoff Plate Bending Problems
title_full Local Projection-Based Stabilized Mixed Finite Element Methods for Kirchhoff Plate Bending Problems
title_fullStr Local Projection-Based Stabilized Mixed Finite Element Methods for Kirchhoff Plate Bending Problems
title_full_unstemmed Local Projection-Based Stabilized Mixed Finite Element Methods for Kirchhoff Plate Bending Problems
title_sort local projection-based stabilized mixed finite element methods for kirchhoff plate bending problems
publisher Hindawi Limited
series Abstract and Applied Analysis
issn 1085-3375
1687-0409
publishDate 2013-01-01
description Based on stress-deflection variational formulation, we propose a family of local projection-based stabilized mixed finite element methods for Kirchhoff plate bending problems. According to the error equations, we obtain the error estimates of the approximation to stress tensor in energy norm. And by duality argument, error estimates of the approximation to deflection in H1-norm are achieved. Then we design an a posteriori error estimator which is closely related to the equilibrium equation, constitutive equation, and nonconformity of the finite element spaces. With the help of Zienkiewicz-Guzmán-Neilan element spaces, we prove the reliability of the a posteriori error estimator. And the efficiency of the a posteriori error estimator is proved by standard bubble function argument.
url http://dx.doi.org/10.1155/2013/523909
work_keys_str_mv AT xuehaihuang localprojectionbasedstabilizedmixedfiniteelementmethodsforkirchhoffplatebendingproblems
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