Numerical analysis of a locking‐free mixed finite element method for a bending moment formulation of Reissner‐Mindlin plate model. Issue 1 (9th February 2012)
- Record Type:
- Journal Article
- Title:
- Numerical analysis of a locking‐free mixed finite element method for a bending moment formulation of Reissner‐Mindlin plate model. Issue 1 (9th February 2012)
- Main Title:
- Numerical analysis of a locking‐free mixed finite element method for a bending moment formulation of Reissner‐Mindlin plate model
- Authors:
- da Veiga, Lourenço Beirão
Mora, David
Rodríguez, Rodolfo - Abstract:
- <abstract abstract-type="main" xml:lang="en"> <title>Abstract</title> <p>This article deals with the approximation of the bending of a clamped plate, modeled by Reissner‐Mindlin equations. It is known that standard finite element methods applied to this model lead to wrong results when the thickness <italic>t</italic> is small. Here, we propose a mixed formulation based on the Hellinger‐Reissner principle which is written in terms of the bending moments, the shear stress, the rotations and the transverse displacement. To prove that the resulting variational formulation is well posed, we use the Babuška‐Brezzi theory with appropriate <italic>t</italic> ‐dependent norms. The problem is discretized by standard mixed finite elements without the need of any reduction operator. Error estimates are proved. These estimates have an optimal dependence on the mesh size <italic>h</italic> and a mild dependence on the plate thickness <italic>t</italic>. This allows us to conclude that the method is locking‐free. The proposed method yields direct approximation of the bending moments and the shear stress. A local postprocessing leading to <italic>H</italic><sup>1</sup> ‐type approximations of transverse displacement and rotations is introduced. Moreover, we propose a hybridization procedure, which leads to solving a significantly smaller positive definite system. Finally, we report numerical experiments which allow us to assess the performance of the method. © 2012 Wiley Periodicals, Inc.<abstract abstract-type="main" xml:lang="en"> <title>Abstract</title> <p>This article deals with the approximation of the bending of a clamped plate, modeled by Reissner‐Mindlin equations. It is known that standard finite element methods applied to this model lead to wrong results when the thickness <italic>t</italic> is small. Here, we propose a mixed formulation based on the Hellinger‐Reissner principle which is written in terms of the bending moments, the shear stress, the rotations and the transverse displacement. To prove that the resulting variational formulation is well posed, we use the Babuška‐Brezzi theory with appropriate <italic>t</italic> ‐dependent norms. The problem is discretized by standard mixed finite elements without the need of any reduction operator. Error estimates are proved. These estimates have an optimal dependence on the mesh size <italic>h</italic> and a mild dependence on the plate thickness <italic>t</italic>. This allows us to conclude that the method is locking‐free. The proposed method yields direct approximation of the bending moments and the shear stress. A local postprocessing leading to <italic>H</italic><sup>1</sup> ‐type approximations of transverse displacement and rotations is introduced. Moreover, we propose a hybridization procedure, which leads to solving a significantly smaller positive definite system. Finally, we report numerical experiments which allow us to assess the performance of the method. © 2012 Wiley Periodicals, Inc. Numer Methods Partial Differential Eq, 2013</p> </abstract> … (more)
- Is Part Of:
- Numerical methods for partial differential equations. Volume 29:Issue 1(2013:Jan.)
- Journal:
- Numerical methods for partial differential equations
- Issue:
- Volume 29:Issue 1(2013:Jan.)
- Issue Display:
- Volume 29, Issue 1 (2013)
- Year:
- 2013
- Volume:
- 29
- Issue:
- 1
- Issue Sort Value:
- 2013-0029-0001-0000
- Page Start:
- 40
- Page End:
- 63
- Publication Date:
- 2012-02-09
- Subjects:
- Differential equations, Partial -- Numerical solutions -- Periodicals
515.353 - Journal URLs:
- http://onlinelibrary.wiley.com/ ↗
- DOI:
- 10.1002/num.21698 ↗
- Languages:
- English
- ISSNs:
- 0749-159X
- Deposit Type:
- Legaldeposit
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library DSC - 6184.696600
British Library DSC - BLDSS-3PM
British Library HMNTS - ELD Digital store - Ingest File:
- 4142.xml