Mixed and Hybrid Finite Element Methods
Published on 17. September 2011
Book
Paperback/Softback
IX, 350 pages
978-1-4612-7824-5 (ISBN)
Description
Research on non-standard finite element methods is evolving rapidly and in this text Brezzi and Fortin give a general framework in which the development is taking place. The presentation is built around a few classic examples: Dirichlet's problem, Stokes problem, Linear elasticity. The authors provide with this publication an analysis of the methods in order to understand their properties as thoroughly as possible.
More details
Series
Edition
Softcover reprint of the original 1st ed. 1991
Language
English
Place of publication
New York
United States
Target group
Professional and scholarly
Research
Illustrations
IX, 350 p.
Dimensions
Height: 235 mm
Width: 155 mm
Thickness: 20 mm
Weight
557 gr
ISBN-13
978-1-4612-7824-5 (9781461278245)
DOI
10.1007/978-1-4612-3172-1
Schweitzer Classification
Other editions
Additional editions
Franco Brezzi | Michel Fortin
Mixed and Hybrid Finite Element Methods
Book
07/1991
Springer
€85.55
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Content
I: Variational Formulations and Finite Element Methods.- §1. Classical Methods.- §2. Model Problems and Elementary Properties of Some Functional Spaces.- §3. Duality Methods.- §4. Domain Decomposition Methods, Hybrid Methods.- §5. Augmented Variational Formulations.- §6. Transposition Methods.- §7. Bibliographical remarks.- II: Approximation of Saddle Point Problems.- §1. Existence and Uniqueness of Solutions.- §2. Approximation of the Problem.- §3. Numerical Properties of the Discrete Problem.- §4. Solution by Penalty Methods, Convergence of Regularized Problems.- §5. Iterative Solution Methods. Uzawa's Algorithm.- §6. Concluding Remarks.- III: Function Spaces and Finite Element Approximations.- §1. Properties of the spaces Hs(?) and H(div; ?).- §2. Finite Element Approximations of H1(?) and H2(?).- §3. Approximations of H (div; ?).- §4. Concluding Remarks.- IV: Various Examples.- §1. Nonstandard Methods for Dirichlet's Problem.- §2. Stokes Problem.- §3. Elasticity Problems.- §4. A Mixed Fourth-Order Problem.- §5. Dual Hybrid Methods for Plate Bending Problems.- V: Complements on Mixed Methods for Elliptic Problems.- §1. Numerical Solutions.- §2. A Brief Analysis of the Computational Effort.- §3. Error Analysis for the Multiplier.- §4. Error Estimates in Other Norms.- §5. Application to an Equation Arising from Semiconductor Theory.- §6. How Things Can Go Wrong.- §7. Augmented Formulations.- VI: Incompressible Materials and Flow Problems.- §1. Introduction.- §2. The Stokes Problem as a Mixed Problem.- §3. Examples of Elements for Incompressible Materials.- §4. Standard Techniques of Proof for the inf-sup Condition.- §5. Macroelement Techniques and Spurious Pressure Modes.- §6. An Alternative Technique of Proof and Generalized Taylor-Hood Element.- §7. Nearly Incompressible Elasticity, Reduced Integration Methods and Relation with Penalty Methods.- §8. Divergence-Free Basis, Discrete Stream Functions.- §9. Other Mixed and Hybrid Methods for Incompressible Flows.- VII: Other Applications.- §1. Mixed Methods for Linear Thin Plates.- §2. Mixed Methods for Linear Elasticity Problems.- §3. Moderately Thick Plates.- References.