| Edition |
1st ed. |
| Description |
1 online resource (xiii, 235 pages) : illustrations |
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text txt rdacontent |
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computer c rdamedia |
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online resource cr rdacarrier |
| Series |
Mathematics in science and engineering, 0076-5392 ; v. 210 |
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Mathematics in science and engineering ; v. 210. 0076-5392
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| Summary |
The concept of equilibrium plays a central role in various applied sciences, such as physics (especially, mechanics), economics, engineering, transportation, sociology, chemistry, biology and other fields. If one can formulate the equilibrium problem in the form of a mathematical model, solutions of the corresponding problem can be used for forecasting the future behavior of very complex systems and, also, for correcting the the current state of the system under control. This book presents a unifying look on different equilibrium concepts in economics, including several models from related sciences. - Presents a unifying look on different equilibrium concepts and also the present state of investigations in this field - Describes static and dynamic input-output models, Walras, Cassel-Wald, spatial price, auction market, oligopolistic equilibrium models, transportation and migration equilibrium models - Covers the basics of theory and solution methods both for the complementarity and variational inequality problems - The methods are illustrated by applications and exercises to economic equilibrium models. |
| Bibliography |
Includes bibliographical references (pages 229-231) and index. |
| Contents |
Cover -- Front Cover -- Equilibrium Models and Variational Inequalities -- Copyright Page -- Preface -- Table of Contents -- List of Figures -- Chapter 1 Introduction -- Part I MODELS -- Chapter 2 Linear Models in Economics -- 2.1 Open input-output model -- 2.2 Generalizations -- 2.3 Closed input-output model -- Chapter 3 Linear Dynamic Models of an Economy -- 3.1 Extended dynamic input-output model -- 3.2 The von Neumann model of an expanding economy -- Chapter 4 Optimization and Equilibria -- 4.1 Linear programming problems -- 4.2 Economic interpretation of optimality conditions -- 4.3 Economic interpretation of the solution method -- Chapter 5 Nonlinear Economic Equilibrium Models -- 5.1 Cassel-Wald type economic equilibrium models -- 5.2 General price equilibrium models -- 5.3 Spatial price equilibrium models -- 5.4 Imperfectly competitive equilibrium models -- Chapter 6 Transportation and Migration Models -- 6.1 Network equilibrium models -- 6.2 Migration equilibrium models -- Part II COMPLEMENTARITY PROBLEMS -- Chapter 7 Complementarity with Z Properties -- 7.1 Classes of complementarity problems -- 7.2 Classes of square matrices and their properties -- 7.3 Complementarity problems with Z cost mappings -- Chapter 8 Applications -- 8.1 Input-output models -- 8.2 Price equilibrium models -- 8.3 A pure trade market model -- 8.4 Price oligopoly models -- Chapter 9 Complementarity with P Properties -- 9.1 Existence and uniqueness results -- 9.2 Solution methods for CP's with P properties -- Chapter 10 Applications -- 10.1 Walrasian price equilibrium models -- 10.2 Oligopolistic equilibrium models -- Part III VARIATIONAL INEQUALITIES -- Chapter 11 Theory of Variational Inequalities -- 11.1 Variational inequalities and related problems -- 11.2 Existence and uniqueness results -- Chapter 12 Applications -- 12.1 Cassel-Wald equilibrium models -- 12.2 Walrasian equilibrium models and their modifications -- 12.3 Existence results in Walrasian equilibrium models -- 12.4 Imperfect competition models -- 12.5 Network and migration equilibrium models -- Chapter 13 Projection Type Methods -- 13.1 The classical projection method -- 13.2 The projection methods with linesearch -- 13.3 Modifications and extensions -- Chapter 14 Applications of the Projection Methods -- 14.1 Applications to variational inequalities -- 14.2 Applications to systems of variational inequalities -- Chapter 15 Regularization Methods -- 15.1 The classical regularization method and its modifications -- 15.2 The proximal point method -- Chapter 16 Direct Iterative Methods for Monotone Variational Inequalities -- 16.1 Extrapolation methods -- 16.2 The ellipsoid method -- Chapter 17 Solutions to Exercises -- Bibliography -- Index -- Last Page. |
| Note |
Print version record. |
| Language |
English. |
| Subject |
Variational inequalities (Mathematics)
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Equilibrium (Economics)
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Inégalités variationnelles.
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MATHEMATICS -- Calculus.
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MATHEMATICS -- Mathematical Analysis.
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Equilibrium (Economics)
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Variational inequalities (Mathematics)
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| Genre/Form |
dissertations.
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Academic theses
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Academic theses.
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Thèses et écrits académiques.
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| Other Form: |
Print version: Konnov, Igor, 1958- Equilibrium models and variational inequalities. 1st ed. Amsterdam ; Boston : Elsevier, 2007 9780444530301 0444530304 (DLC) 2006052175 (OCoLC)74967026 |
| ISBN |
9780444530301 |
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0444530304 |
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9780080471389 (electronic bk.) |
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0080471382 (electronic bk.) |
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1280962607 |
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9781280962608 |
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9786610962600 |
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661096260X |
| Standard No. |
(WaSeSS)ssj0000148858 |
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AU@ 000048130235 |
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AU@ 000051556693 |
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AU@ 000059268294 |
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CHNEW 001006085 |
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DEBBG BV036962190 |
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DEBBG BV039834071 |
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DEBBG BV042317171 |
|
DEBBG BV043043926 |
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DEBSZ 276087658 |
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DEBSZ 422219754 |
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DEBSZ 48235416X |
|
NZ1 11778354 |
|
NZ1 14540117 |
|
NZ1 15192400 |
|
