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Optimal control of stochastic difference Volterra equations: an introduction

This book showcases a subclass of hereditary systems, that is, systems with behaviour depending not only on their current state but also on their past history; it is an introduction to the mathematical theory of optimal control for stochastic difference Volterra equations of neutral type. As such, i...

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Detalles Bibliográficos
Autor principal: Shaikhet, Leonid
Lenguaje:eng
Publicado: Springer 2015
Materias:
Acceso en línea:https://dx.doi.org/10.1007/978-3-319-13239-6
http://cds.cern.ch/record/1973445
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author Shaikhet, Leonid
author_facet Shaikhet, Leonid
author_sort Shaikhet, Leonid
collection CERN
description This book showcases a subclass of hereditary systems, that is, systems with behaviour depending not only on their current state but also on their past history; it is an introduction to the mathematical theory of optimal control for stochastic difference Volterra equations of neutral type. As such, it will be of much interest to researchers interested in modelling processes in physics, mechanics, automatic regulation, economics and finance, biology, sociology and medicine for all of which such equations are very popular tools. The text deals with problems of optimal control such as meeting given performance criteria, and stabilization, extending them to neutral stochastic difference Volterra equations. In particular, it contrasts the difference analogues of solutions to optimal control and optimal estimation problems for stochastic integral Volterra equations with optimal solutions for corresponding problems in stochastic difference Volterra equations. Optimal Control of Stochastic Difference Volterra Equations commences with an historical introduction to the emergence of this type of equation with some additional mathematical preliminaries. It then deals with the necessary conditions for optimality in the control of the equations and constructs a feedback control scheme. The approximation of stochastic quasilinear Volterra equations with quadratic performance functionals is then considered. Optimal stabilization is discussed and the filtering problem formulated. Finally, two methods of solving the optimal control problem for partly observable linear stochastic processes, also with quadratic performance functionals, are developed. Integrating the author’s own research within the context of the current state-of-the-art of research in difference equations, hereditary systems theory and optimal control, this book is addressed to specialists in mathematical optimal control theory and to graduate students in pure and applied mathematics and control engineering.
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spelling cern-19734452021-04-21T20:42:03Zdoi:10.1007/978-3-319-13239-6http://cds.cern.ch/record/1973445engShaikhet, LeonidOptimal control of stochastic difference Volterra equations: an introductionEngineeringThis book showcases a subclass of hereditary systems, that is, systems with behaviour depending not only on their current state but also on their past history; it is an introduction to the mathematical theory of optimal control for stochastic difference Volterra equations of neutral type. As such, it will be of much interest to researchers interested in modelling processes in physics, mechanics, automatic regulation, economics and finance, biology, sociology and medicine for all of which such equations are very popular tools. The text deals with problems of optimal control such as meeting given performance criteria, and stabilization, extending them to neutral stochastic difference Volterra equations. In particular, it contrasts the difference analogues of solutions to optimal control and optimal estimation problems for stochastic integral Volterra equations with optimal solutions for corresponding problems in stochastic difference Volterra equations. Optimal Control of Stochastic Difference Volterra Equations commences with an historical introduction to the emergence of this type of equation with some additional mathematical preliminaries. It then deals with the necessary conditions for optimality in the control of the equations and constructs a feedback control scheme. The approximation of stochastic quasilinear Volterra equations with quadratic performance functionals is then considered. Optimal stabilization is discussed and the filtering problem formulated. Finally, two methods of solving the optimal control problem for partly observable linear stochastic processes, also with quadratic performance functionals, are developed. Integrating the author’s own research within the context of the current state-of-the-art of research in difference equations, hereditary systems theory and optimal control, this book is addressed to specialists in mathematical optimal control theory and to graduate students in pure and applied mathematics and control engineering.Springeroai:cds.cern.ch:19734452015
spellingShingle Engineering
Shaikhet, Leonid
Optimal control of stochastic difference Volterra equations: an introduction
title Optimal control of stochastic difference Volterra equations: an introduction
title_full Optimal control of stochastic difference Volterra equations: an introduction
title_fullStr Optimal control of stochastic difference Volterra equations: an introduction
title_full_unstemmed Optimal control of stochastic difference Volterra equations: an introduction
title_short Optimal control of stochastic difference Volterra equations: an introduction
title_sort optimal control of stochastic difference volterra equations: an introduction
topic Engineering
url https://dx.doi.org/10.1007/978-3-319-13239-6
http://cds.cern.ch/record/1973445
work_keys_str_mv AT shaikhetleonid optimalcontrolofstochasticdifferencevolterraequationsanintroduction