Overview

Editors:

Stephan Dempe⁰,
Vyacheslav Kalashnikov¹

Stephan Dempe
1. TU Bergakademie Freiberg, Germany
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Vyacheslav Kalashnikov
1. ITESM, Monterrey, Mexico
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Latest approaches and applications are discussed
Includes supplementary material: sn.pub/extras

Part of the book series: Springer Optimization and Its Applications (SOIA, volume 2)

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Table of contents (13 chapters)

Front Matter

Pages i-xii

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Bilevel Programming
1. Front Matter
  
  Pages 1-1
  
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2. Optimality conditions for bilevel programming problems
  
  Stephan Dempe, Vyatcheslav V. Kalashnikov, Nataliya Kalashnykova
  
  Pages 3-28
3. Path-based formulations of a bilevel toll setting problem
  
  Mohamed Didi-Biha, Patrice Marcotte, Gilles Savard
  
  Pages 29-50
4. Bilevel programming with convex lower level problems
  
  Joydeep Dutta, Stephan Dempe
  
  Pages 51-71
5. Optimality criteria for bilevel programming problems using the radial subdifferential
  
  D. Fanghänel
  
  Pages 73-95
6. On approximate mixed Nash equilibria and average marginal functions for two-stage three-players games
  
  Lina Mallozzi, Jacqueline Morgan
  
  Pages 97-107
Mathematical Programs with Equilibrium Constraints
1. Front Matter
  
  Pages 109-109
  
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2. A direct proof for M-stationarity under MPEC-GCQ for mathematical programs with equilibrium constraints
  
  Michael L. Flegel, Christian Kanzow
  
  Pages 111-122
3. On the use of bilevel programming for solving a structural optimization problem with discrete variables
  
  Joaquim J. Júdice, Ana M. Faustino, Isabel M. Ribeiro, A. Serra Neves
  
  Pages 123-142
4. On the control of an evolutionary equilibrium in micromagnetics
  
  Michal Kočvara, Martin Kružík, Jiří V. Outrata
  
  Pages 143-168
5. Complementarity constraints as nonlinear equations: Theory and numerical experience
  
  Sven Leyffer
  
  Pages 169-208
6. A semi-infinite approach to design centering
  
  Oliver Stein
  
  Pages 209-228
Set-Valued Optimization
1. Front Matter
  
  Pages 229-229
  
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2. Contraction mapping fixed point algorithms for solving multivalued mixed variational inequalities
  
  Pham Ngoc Anh, Dung Le Muu
  
  Pages 231-249
3. Optimality conditions for a d.c. set-valued problem via the extremal principle
  
  N. Gadhi
  
  Pages 251-264
4. First and second order optimality conditions in set optimization
  
  V. Kalashnikov, B. Jadamba, A. A. Khan
  
  Pages 265-276

Keywords

About this book

In the field of nondifferentiable nonconvex optimization, one of the most intensely investigated areas is that of optimization problems involving multivalued mappings in constraints or as the objective function. This book focuses on the tremendous development in the field that has taken place since the publication of the most recent volumes on the subject. The new topics studied include the formulation of optimality conditions using different kinds of generalized derivatives for set-valued mappings (such as, for example, the coderivative of Mordukhovich), the opening of new applications (e.g., the calibration of water supply systems), or the elaboration of new solution algorithms (e.g., smoothing methods).

The book is divided into three parts. The focus in the first part is on bilevel programming. The chapters in the second part contain investigations of mathematical programs with equilibrium constraints. The third part is on multivalued set-valued optimization. The chapters were written by outstanding experts in the areas of bilevel programming, mathematical programs with equilibrium (or complementarity) constraints (MPEC), and set-valued optimization problems.

Editors and Affiliations

TU Bergakademie Freiberg, Germany

Stephan Dempe
ITESM, Monterrey, Mexico

Vyacheslav Kalashnikov

Bibliographic Information

Book Title: Optimization with Multivalued Mappings
Book Subtitle: Theory, Applications and Algorithms
Editors: Stephan Dempe, Vyacheslav Kalashnikov
Series Title: Springer Optimization and Its Applications
DOI: https://doi.org/10.1007/0-387-34221-4
Publisher: Springer New York, NY
eBook Packages: Mathematics and Statistics, Mathematics and Statistics (R0)
Hardcover ISBN: 978-0-387-34220-7Published: 18 July 2006
Softcover ISBN: 978-1-4419-4167-1Published: 29 November 2010
eBook ISBN: 978-0-387-34221-4Published: 19 September 2006
Series ISSN: 1931-6828
Series E-ISSN: 1931-6836
Edition Number: 1
Number of Pages: XII, 276
Number of Illustrations: 16 b/w illustrations
Topics: Optimization, Calculus of Variations and Optimal Control; Optimization

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Optimization with Multivalued Mappings

Overview

Access this book

Other ways to access

Table of contents (13 chapters)

Front Matter

Bilevel Programming

Front Matter

Mathematical Programs with Equilibrium Constraints

Front Matter

Set-Valued Optimization

Front Matter

Keywords

About this book

Editors and Affiliations

TU Bergakademie Freiberg, Germany

ITESM, Monterrey, Mexico

Bibliographic Information

Publish with us

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