Foundations Of Mathematical Optimization

Foundations of Mathematical Optimization

Author : Diethard Ernst Pallaschke

Publisher : Springer Science & Business Media

Page : 597 pages

File Size : 10,3 MB

Release : 2013-03-14

Category : Mathematics

ISBN : 9401715882

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Book Description

Many books on optimization consider only finite dimensional spaces. This volume is unique in its emphasis: the first three chapters develop optimization in spaces without linear structure, and the analog of convex analysis is constructed for this case. Many new results have been proved specially for this publication. In the following chapters optimization in infinite topological and normed vector spaces is considered. The novelty consists in using the drop property for weak well-posedness of linear problems in Banach spaces and in a unified approach (by means of the Dolecki approximation) to necessary conditions of optimality. The method of reduction of constraints for sufficient conditions of optimality is presented. The book contains an introduction to non-differentiable and vector optimization. Audience: This volume will be of interest to mathematicians, engineers, and economists working in mathematical optimization.



Foundations of Optimization

Author : Osman Güler

Publisher : Springer Science & Business Media

Page : 445 pages

File Size : 44,93 MB

Release : 2010-08-03

Category : Business & Economics

ISBN : 0387684077

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Book Description

This book covers the fundamental principles of optimization in finite dimensions. It develops the necessary material in multivariable calculus both with coordinates and coordinate-free, so recent developments such as semidefinite programming can be dealt with.





Mathematical Theory of Optimization

Author : Ding-Zhu Du

Publisher : Springer Science & Business Media

Page : 277 pages

File Size : 17,33 MB

Release : 2013-03-14

Category : Mathematics

ISBN : 1475757956

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Book Description

This book provides an introduction to the mathematical theory of optimization. It emphasizes the convergence theory of nonlinear optimization algorithms and applications of nonlinear optimization to combinatorial optimization. Mathematical Theory of Optimization includes recent developments in global convergence, the Powell conjecture, semidefinite programming, and relaxation techniques for designs of approximation solutions of combinatorial optimization problems.



Mathematical Optimization and Economic Theory

Author : Michael D. Intriligator

Publisher : SIAM

Page : 515 pages

File Size : 12,90 MB

Release : 2002-01-01

Category : Mathematics

ISBN : 0898715113

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Book Description

A classic account of mathematical programming and control techniques and their applications to static and dynamic problems in economics.



Foundations of Optimization

Author : M. S. Bazaraa

Publisher : Springer Science & Business Media

Page : 203 pages

File Size : 48,44 MB

Release : 2012-12-06

Category : Business & Economics

ISBN : 3642482945

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Book Description

Current1y there is a vast amount of literature on nonlinear programming in finite dimensions. The pub1ications deal with convex analysis and severa1 aspects of optimization. On the conditions of optima1ity they deal mainly with generali- tions of known results to more general problems and also with less restrictive assumptions. There are also more general results dealing with duality. There are yet other important publications dealing with algorithmic deve10pment and their applications. This book is intended for researchers in nonlinear programming, and deals mainly with convex analysis, optimality conditions and duality in nonlinear programming. It consolidates the classic results in this area and some of the recent results. The book has been divided into two parts. The first part gives a very comp- hensive background material. Assuming a background of matrix algebra and a senior level course in Analysis, the first part on convex analysis is self-contained, and develops some important results needed for subsequent chapters. The second part deals with optimality conditions and duality. The results are developed using extensively the properties of cones discussed in the first part. This has faci- tated derivations of optimality conditions for equality and inequality constrained problems. Further, minimum-principle type conditions are derived under less restrictive assumptions. We also discuss constraint qualifications and treat some of the more general duality theory in nonlinear programming.



Mathematical Foundations of Nature-Inspired Algorithms

Author : Xin-She Yang

Publisher : Springer

Page : 107 pages

File Size : 38,75 MB

Release : 2019-05-08

Category : Mathematics

ISBN : 3030169367

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Book Description

This book presents a systematic approach to analyze nature-inspired algorithms. Beginning with an introduction to optimization methods and algorithms, this book moves on to provide a unified framework of mathematical analysis for convergence and stability. Specific nature-inspired algorithms include: swarm intelligence, ant colony optimization, particle swarm optimization, bee-inspired algorithms, bat algorithm, firefly algorithm, and cuckoo search. Algorithms are analyzed from a wide spectrum of theories and frameworks to offer insight to the main characteristics of algorithms and understand how and why they work for solving optimization problems. In-depth mathematical analyses are carried out for different perspectives, including complexity theory, fixed point theory, dynamical systems, self-organization, Bayesian framework, Markov chain framework, filter theory, statistical learning, and statistical measures. Students and researchers in optimization, operations research, artificial intelligence, data mining, machine learning, computer science, and management sciences will see the pros and cons of a variety of algorithms through detailed examples and a comparison of algorithms.



Variational Methods for Structural Optimization

Author : Andrej Cherkaev

Publisher : Springer Science & Business Media

Page : 561 pages

File Size : 34,35 MB

Release : 2012-12-06

Category : Science

ISBN : 1461211883

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Book Description

This book bridges a gap between a rigorous mathematical approach to variational problems and the practical use of algorithms of structural optimization in engineering applications. The foundations of structural optimization are presented in sufficiently simple form as to make them available for practical use.



Foundations of Mathematical Optimization

Author : Diethard Pallaschke

Publisher : Springer Science & Business Media

Page : 608 pages

File Size : 34,51 MB

Release : 1997-02-28

Category : Mathematics

ISBN : 9780792344247

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Book Description

Many books on optimization consider only finite dimensional spaces. This volume is unique in its emphasis: the first three chapters develop optimization in spaces without linear structure, and the analog of convex analysis is constructed for this case. Many new results have been proved specially for this publication. In the following chapters optimization in infinite topological and normed vector spaces is considered. The novelty consists in using the drop property for weak well-posedness of linear problems in Banach spaces and in a unified approach (by means of the Dolecki approximation) to necessary conditions of optimality. The method of reduction of constraints for sufficient conditions of optimality is presented. The book contains an introduction to non-differentiable and vector optimization. Audience: This volume will be of interest to mathematicians, engineers, and economists working in mathematical optimization.



Foundations of Optimization

Author : Douglass J. Wilde

Publisher :

Page : 504 pages

File Size : 23,78 MB

Release : 1967

Category : Mathematical optimization

ISBN :

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Book Description