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200 10$aTurnpike Phenomenon in Metric Spaces$b[electronic resource] /$fby Alexander J. Zaslavski
205   $a1st ed. 2023.
210  1$aCham :$cSpringer Nature Switzerland :$cImprint: Springer,$d2023.
215   $a1 online resource (X, 362 p.) 
225 1 $aSpringer Optimization and Its Applications,$x1931-6836 ;$v201
311   $a3-031-27207-2 
327   $aPreface -- 1. Introduction -- 2. Differential inclusions -- 3. Discrete-time dynamical systems -- 4. Continuous-time dynamical systems -- 5. General dynamical systems with a Lyapunov function -- 6. Discrete-time nonautonomous problems on half-axis -- 7. Infinite-dimensional control -- 8. Continuous-time nonautonomous problems on half-axis -- 9. Stability and genericity results -- References -- Index.
330   $aThis book is devoted to the study of the turnpike phenomenon arising in optimal control theory. Special focus is placed on Turnpike results, in sufficient and necessary conditions for the turnpike phenomenon and in its stability under small perturbations of objective functions. The most important feature of this book is that it develops a large, general class of optimal control problems in metric space. Additional value is in the provision of solutions to a number of difficult and interesting problems in optimal control theory in metric spaces. Mathematicians working in optimal control, optimization, and experts in applications of optimal control to economics and engineering, will find this book particularly useful. All main results obtained in the book are new. The monograph contains nine chapters. Chapter 1 is an introduction. Chapter 2 discusses Banach space valued functions, set-valued mappings in infinite dimensional spaces, and related continuous-time dynamical systems. Some convergence results are obtained. In Chapter 3, a discrete-time dynamical system with a Lyapunov function in a metric space induced by a set-valued mapping, is studied. Chapter 4 is devoted to the study of a class of continuous-time dynamical systems, an analog of the class of discrete-time dynamical systems considered in Chapter 3. Chapter 5 develops a turnpike theory for a class of general dynamical systems in a metric space with a Lyapunov function. Chapter 6 contains a study of the turnpike phenomenon for discrete-time nonautonomous problems on subintervals of half-axis in metric spaces, which are not necessarily compact. Chapter 7 contains preliminaries which are needed in order to study turnpike properties of infinite-dimensional optimal control problems. In Chapter 8, sufficient and necessary conditions for the turnpike phenomenon for continuous-time optimal control problems on subintervals of the half-axis in metric spaces, is established. In Chapter 9, the examination continues of the turnpike phenomenon for the continuous-time optimal control problems on subintervals of half-axis in metric spaces discussed in Chapter 8.
410  0$aSpringer Optimization and Its Applications,$x1931-6836 ;$v201
606   $aMathematical optimization
606   $aCalculus of variations
606   $aSystem theory
606   $aControl theory
606   $aCalculus of Variations and Optimization
606   $aSystems Theory, Control 
615  0$aMathematical optimization.
615  0$aCalculus of variations.
615  0$aSystem theory.
615  0$aControl theory.
615 14$aCalculus of Variations and Optimization.
615 24$aSystems Theory, Control .
676   $a519.6
676   $a515.64
700   $aZaslavski$b Alexander J$4aut$4http://id.loc.gov/vocabulary/relators/aut$0721713
906   $aBOOK
912   $a9910698643703321
996   $aTurnpike Phenomenon in Metric Spaces$93106953
997   $aUNINA