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Optimal control problems arising in ...

Zaslavski, Alexander J.

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Optimal control problems arising in mathematical economics

Record Type:	Electronic resources : Monograph/item
Title/Author:	Optimal control problems arising in mathematical economics/ by Alexander J. Zaslavski.
Author:	Zaslavski, Alexander J.
Published:	Singapore :Springer Nature Singapore : : 2022.,
Description:	xi, 378 p. :ill., digital ;24 cm.
[NT 15003449]:	Preface-1. Introduction -- 2. Turnpike Conditions for Optimal Control Systems -- 3. Nonautonomous Problems with Perturbed Objective Functions -- 4. Nonautonomous Problems with Discounting -- 5. Stability of the Turnpike Phenomenon for Nonautonomous Problems -- 6. Stability of the Turnpike for Nonautonomous Problems with Discounting -- 7. Turnpike Properties for Autonomous Problems -- 8. Autonomous Problems with Perturbed Objective Functions -- 9. Stability Results for Autonomous Problems -- 10. Models with Unbounded Endogenous Economic Growth-Reference -- Index.
Contained By:	Springer Nature eBook
Subject:	Control theory. -
Online resource:	https://doi.org/10.1007/978-981-16-9298-7
ISBN:	9789811692987

Optimal control problems arising in mathematical economics
Zaslavski, Alexander J.

Optimal control problems arising in mathematical economics[electronic resource] /by Alexander J. Zaslavski. - Singapore :Springer Nature Singapore :2022. - xi, 378 p. :ill., digital ;24 cm. - Monographs in mathematical economics,v. 52364-8287 ;. - Monographs in mathematical economics ;v. 5..

Preface-1. Introduction -- 2. Turnpike Conditions for Optimal Control Systems -- 3. Nonautonomous Problems with Perturbed Objective Functions -- 4. Nonautonomous Problems with Discounting -- 5. Stability of the Turnpike Phenomenon for Nonautonomous Problems -- 6. Stability of the Turnpike for Nonautonomous Problems with Discounting -- 7. Turnpike Properties for Autonomous Problems -- 8. Autonomous Problems with Perturbed Objective Functions -- 9. Stability Results for Autonomous Problems -- 10. Models with Unbounded Endogenous Economic Growth-Reference -- Index.

This book is devoted to the study of two large classes of discrete-time optimal control problems arising in mathematical economics. Nonautonomous optimal control problems of the first class are determined by a sequence of objective functions and sequence of constraint maps. They correspond to a general model of economic growth. We are interested in turnpike properties of approximate solutions and in the stability of the turnpike phenomenon under small perturbations of objective functions and constraint maps. The second class of autonomous optimal control problems corresponds to another general class of models of economic dynamics which includes the Robinson-Solow-Srinivasan model as a particular case. In Chap. 1 we discuss turnpike properties for a large class of discrete-time optimal control problems studied in the literature and for the Robinson-Solow-Srinivasan model. In Chap. 2 we introduce the first class of optimal control problems and study its turnpike property. This class of problems is also discussed in Chaps. 3-6. In Chap. 3 we study the stability of the turnpike phenomenon under small perturbations of the objective functions. Analogous results for problems with discounting are considered in Chap. 4. In Chap. 5 we study the stability of the turnpike phenomenon under small perturbations of the objective functions and the constraint maps. Analogous results for problems with discounting are established in Chap. 6. The results of Chaps. 5 and 6 are new. The second class of problems is studied in Chaps. 7-9. In Chap. 7 we study the turnpike properties. The stability of the turnpike phenomenon under small perturbations of the objective functions is established in Chap. 8. In Chap. 9 we establish the stability of the turnpike phenomenon under small perturbations of the objective functions and the constraint maps. The results of Chaps. 8 and 9 are new. In Chap. 10 we study optimal control problems related to a model of knowledge-based endogenous economic growth and show the existence of trajectories of unbounded economic growth and provide estimates for the growth rate.

ISBN: 9789811692987

Standard No.: 10.1007/978-981-16-9298-7doiSubjects--Topical Terms:

535880
Control theory.

LC Class. No.: QA402.3 / .Z37 2022

Dewey Class. No.: 515.642

Optimal control problems arising in mathematical economics
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245 1 0 $a Optimal control problems arising in mathematical economics $h [electronic resource] / $c by Alexander J. Zaslavski.
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520 $a This book is devoted to the study of two large classes of discrete-time optimal control problems arising in mathematical economics. Nonautonomous optimal control problems of the first class are determined by a sequence of objective functions and sequence of constraint maps. They correspond to a general model of economic growth. We are interested in turnpike properties of approximate solutions and in the stability of the turnpike phenomenon under small perturbations of objective functions and constraint maps. The second class of autonomous optimal control problems corresponds to another general class of models of economic dynamics which includes the Robinson-Solow-Srinivasan model as a particular case. In Chap. 1 we discuss turnpike properties for a large class of discrete-time optimal control problems studied in the literature and for the Robinson-Solow-Srinivasan model. In Chap. 2 we introduce the first class of optimal control problems and study its turnpike property. This class of problems is also discussed in Chaps. 3-6. In Chap. 3 we study the stability of the turnpike phenomenon under small perturbations of the objective functions. Analogous results for problems with discounting are considered in Chap. 4. In Chap. 5 we study the stability of the turnpike phenomenon under small perturbations of the objective functions and the constraint maps. Analogous results for problems with discounting are established in Chap. 6. The results of Chaps. 5 and 6 are new. The second class of problems is studied in Chaps. 7-9. In Chap. 7 we study the turnpike properties. The stability of the turnpike phenomenon under small perturbations of the objective functions is established in Chap. 8. In Chap. 9 we establish the stability of the turnpike phenomenon under small perturbations of the objective functions and the constraint maps. The results of Chaps. 8 and 9 are new. In Chap. 10 we study optimal control problems related to a model of knowledge-based endogenous economic growth and show the existence of trajectories of unbounded economic growth and provide estimates for the growth rate.
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