Numerical methods for nonlinear variational problems / by Roland Glowinski.Material type: TextLanguage: English Series: Springer Series in Computational PhysicsCopyright date: New York : Springer-Verlag ; c1984Edition: First EditionDescription: xiii, 493 pages : illustrations ; 24 cmISBN: 9783662126158Subject(s): Physics | Física | Computer science -- Mathematics | Ciencia de la computación -- Matemáticas | Mathematical optimization | Engineering mathematics | Matemáticas de ingeniería | Engineering | Physics | Numerical and Computational Physics | Física Numérica y Computacional | Computational Intelligence | Inteligencia artificial | Computational Mathematics and Numerical Analysis | Matemáticas computacionales y análisis numérico | Classical Continuum Physics | Física Continua Clásica | Appl.Mathematics/Computational Methods of Engineering | Aplicaciones matemáticas | Calculus of Variations and Optimal Control; Optimization | Cálculo de variaciones y control óptimo -- OptimizaciónDDC classification: 518.6
|Item type||Current library||Call number||Copy number||Status||Date due||Barcode||Item holds|
|Libro académico||Biblioteca del Campus||518.6 G5669n 1984 (Browse shelf (Opens below))||Ej. 1||Available||003389|
|Libro académico||Biblioteca del Campus||518.6 G5669n 1984 (Browse shelf (Opens below))||Ej. 2||Available||003390|
|Libro académico||Biblioteca del Campus||518.6 G5669n 1984 (Browse shelf (Opens below))||Ej. 3||Available||003391|
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|518.25 C51864f 2010 Finite element methods and their applications /||518.25 C51864f 2010 Finite element methods and their applications /||518.6 G5669n 1984 Numerical methods for nonlinear variational problems /||518.6 G5669n 1984 Numerical methods for nonlinear variational problems /||518.6 G5669n 1984 Numerical methods for nonlinear variational problems /||518.64 G8789n 2007 Numerical treatment of partial differential equations /||518.64 G8789n 2007 Numerical treatment of partial differential equations /|
I Generalities on Elliptic Variational Inequalities and on Their Approximation -- II Application of the Finite Element Method to the Approximation of Some Second-Order EVI -- III On the Approximation of Parabolic Variational Inequalities -- IV Applications of Elliptic Variational Inequality Methods to the Solution of Some Nonlinear Elliptic Equations -- V Relaxation Methods and Applications -- VI Decomposition-Coordination Methods by Augmented Lagrangian: Applications -- VII Least-Squares Solution of Nonlinear Problems: Application to Nonlinear Problems in Fluid Dynamics -- Appendix I A Brief Introduction to Linear Variational Problems -- 1. Introduction -- 2. A Family of Linear Variational Problems -- 3. Internal Approximation of Problem (P) -- 4. Application to the Solution of Elliptic Problems for Partial Differential Operators -- 5. Further Comments: Conclusion -- Appendix II A Finite Element Method with Upwinding for Second-Order Problems with Large First Order Terms -- 1. Introduction -- 2. The Model Problem -- 3. A Centered Finite Element Approximation -- 4. A Finite Element Approximation with Upwinding -- 5. On the Solution of the Linear System Obtained by Upwinding -- 6. Numerical Experiments -- 7. Concluding Comments -- Appendix III Some Complements on the Navier-Stokes Equations and Their Numerical Treatment -- 1. Introduction -- 4. Further Comments on the Boundary Conditions -- 5. Decomposition Properties of the Continuous and Discrete Stokes Problems of Sec. 4. Application to Their Numerical Solution -- 6. Further Comments -- Some Illustrations from an Industrial Application -- Glossary of Symbols -- Author Index.
Many mechanics and physics problems have variational formulations making them appropriate for numerical treatment by finite element techniques and efficient iterative methods. This book describes the mathematical background and reviews the techniques for solving problems, including those that require large computations such as transonic flows for compressible fluids and the Navier-Stokes equations for incompressible viscous fluids. Finite element approximations and non-linear relaxation, augmented Lagrangians, and nonlinear least square methods are all covered in detail, as are many applications. "Numerical Methods for Nonlinear Variational Problems", originally published in the Springer Series in Computational Physics, is a classic in applied mathematics and computational physics and engineering. This long-awaited softcover re-edition is still a valuable resource for practitioners in industry and physics and for advanced students.