Augmented Lagrangian methods : applications to the numerical solution of boundary-value problems /
The purpose of this volume is to present the principles of the Augmented Lagrangian Method, together with numerous applications of this method to the numerical solution of boundary-value problems for partial differential equations or inequalities arising in Mathematical Physics, in the Mechanics of...
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Main Authors: | |
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Corporate Authors: | ; |
Group Author: | |
Published: |
North-Holland Pub. Co. ; Sole distributors for the U.S.A. and Canada, Elsevier Science Pub. Co.,
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Publisher Address: | Amsterdam ; New York : New York, N.Y. : |
Publication Dates: | 1983. |
Literature type: | eBook |
Language: |
English French |
Series: |
Studies in mathematics and its applications ;
v. 15 |
Subjects: | |
Online Access: |
http://www.sciencedirect.com/science/bookseries/01682024/15 |
Summary: |
The purpose of this volume is to present the principles of the Augmented Lagrangian Method, together with numerous applications of this method to the numerical solution of boundary-value problems for partial differential equations or inequalities arising in Mathematical Physics, in the Mechanics of Continuous Media and in the Engineering Sciences. |
Item Description: | Translation of: Me thodes de Lagrangien augmente . |
Carrier Form: | 1 online resource (xix, 340 pages) : illustrations. |
Bibliography: | Includes bibliographical references (pages 333-340). |
ISBN: |
9780444866806 0444866809 9780080875361 008087536X |
Index Number: | QA379 |
CLC: | O175.8 |
Contents: | Front Cover; Augmented Lagrangian Methods: Applications to the Numerical Solution of Boundary-Value Problems; Copyright Page; Table of Contents; Chapter 1. Augmented Lagrangian Methods in Quadratic Programming; Chapter 2. Application to the Stokes and Navier-Stokes Equations; Chapter 3. On Decomposition-Coordination Methods Using an Augmented Lagrangian; Chapter 4. Numerical Solution of Mildly Nonlinear Problems by Augmented Lagrangian Methods; Chapter 5. Application to the Solution of Strongly Nonlinear Second-Order Boundary Value Problems. |