Advances in Optimization and Numerical Analysis
In January 1992, the Sixth Workshop on Optimization and Numerical Analysis was held in the heart of the Mixteco-Zapoteca region, in the city of Oaxaca, Mexico, a beautiful and culturally rich site in ancient, colonial and modern Mexican civiliza tion. The Workshop was organized by the Numerical Ana...
Other Authors: | , |
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Format: | eBook |
Language: | English |
Published: |
Dordrecht
Springer Netherlands
1994, 1994
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Edition: | 1st ed. 1994 |
Series: | Mathematics and Its Applications
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Subjects: | |
Online Access: | |
Collection: | Springer Book Archives -2004 - Collection details see MPG.ReNa |
Table of Contents:
- 1. Analysis of Interior-Point Methods for Linear Programming Problems with Variable Upper Bounds
- 2. On the Complexity of the Simplex Method
- 3. The Linear Complementarity Problem
- 4. A Direct Search Optimization Method that Models the Objective and Constraint Functions by Linear Interpolation
- 5. A Truncated SQP Algorithm for Large Scale Nonlinear Programming Problems
- 6. Performance of a Multifrontal Scheme for Partially Separable Optimization
- 7. Towards Second-Order Methods for Structured Nonsmooth Optimization
- 8. Homotopy Methods in Control System Design and Analysis
- 9. How to Properly Relax Delayed Controls
- 10. On Operator Extensions: the Algebraic Theory Approach
- 11. Global Space-time Finite Element Methods for Time-dependent Convection Diffusion Problems
- 12. Eulerian-Lagrangian Localized Adjoint Methods for Variable-Coefficient Advective-Diffusive-Reactive Equations in Groundwater Contaminant Transport
- 13. The Communication Patterns of Nested Preconditionings for Massively Parallel Architectures
- 14. Smoothness and Superconvergence for Approximate Solutions to the One Dimensional Monoenergetic Transport Equation
- 15. Experiments with the Power and Arnoldi Methods for Solving the Two-Group Neutron Diffusion Eigen-value Problem
- 16. Computational Study of a Free-Boundary Model
- 17. Numerical Approximation to a Class of Weakly Singular Integral Operators
- 18. Directional Second Derivative of the Regularized Function that Smoothes the Min-Max Problem