An introduction to polynomial and semi-algebraic optimization Lasserre, Jean Bernard
Series: Cambridge Texts in Applied MathematicsPublication details: Cambridge University Press 2015 UKDescription: xiv, 339 pISBN:- 9781107630697
- 512.9422 L2I6
| Item type | Current library | Collection | Call number | Status | Date due | Barcode | Item holds | |
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Ahmedabad | Non-fiction | 512.9422 L2I6 (Browse shelf(Opens below)) | Available | 190349 | |||
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Amritsar | 512.9422 (Browse shelf(Opens below)) | Available | IIMASR-00706 |
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| 512.9422 L2I6 An introduction to polynomial and semi-algebraic optimization | 512.9434 F7M2 Matrix theory | 512.9434 F7M2 Matrices: algebra, analysis and applications | 512.9434 H4I6 Introduction to matrix analysis and applications |
Table of contents:
1. Introduction and messages of the book
Part I. Positive Polynomials and Moment Problems:
2. Positive polynomials and moment problems
3. Another look at nonnegativity
4. The cone of polynomials nonnegative on K
Part II. Polynomial and Semi-algebraic Optimization:
5. The primal and dual points of view
6. Semidefinite relaxations for polynomial optimization
7. Global optimality certificates
8. Exploiting sparsity or symmetry
9. LP relaxations for polynomial optimization
10. Minimization of rational functions
11. Semidefinite relaxations for semi-algebraic optimization
12. An eigenvalue problem
Part III. Specializations and Extensions:
13. Convexity in polynomial optimization
14. Parametric optimization
15. Convex underestimators of polynomials
16. Inverse polynomial optimization
17. Approximation of sets defined with quantifiers
18. Level sets and a generalization of the Löwner-John's problem
This is the first comprehensive introduction to the powerful moment approach for solving global optimization problems (and some related problems) described by polynomials (and even semi-algebraic functions). In particular, the author explains how to use relatively recent results from real algebraic geometry to provide a systematic numerical scheme for computing the optimal value and global minimizers. Indeed, among other things, powerful positivity certificates from real algebraic geometry allow one to define an appropriate hierarchy of semidefinite (SOS) relaxations or LP relaxations whose optimal values converge to the global minimum. Several extensions to related optimization problems are also described. Graduate students, engineers and researchers entering the field can use this book to understand, experiment with and master this new approach through the simple worked examples provided.
• The first textbook entirely devoted to this hot topic in optimization and computer science.
• Demonstrates the power and versatility of the new moment approach.
• Introduces new powerful algebraic techniques that have potential uses in many other fields and applications.
(http://www.cambridge.org/us/academic/subjects/mathematics/optimization-or-and-risk-analysis/introduction-polynomial-and-semi-algebraic-optimization?format=PB)
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