Título :	Controlled Markov Processes and Viscosity Solutions
Tipo de documento:	documento electrónico
Autores:	Wendell H. Fleming ; SpringerLink (Online service) ; H.M. Soner
Editorial:	New York, NY : Springer New York
Fecha de publicación:	2006
Colección:	Stochastic Modelling and Applied Probability, ISSN 0172-4568 num. 25
Número de páginas:	XVII, 429 p
Il.:	online resource
ISBN/ISSN/DL:	978-0-387-31071-8
Idioma :	Inglés (eng)
Palabras clave:	Mathematics  Operations  research  Decision  making  Economics,  Mathematical  System  theory  Probabilities  Control  engineering  Robotics  Mechatronics  Probability  Theory  and  Stochastic  Processes  Systems  Theory,  Control,  Robotics,  Operation  Research/Decision  Quantitative  Finance
Clasificación:	51 Matemáticas
Resumen:	This book is intended as an introduction to optimal stochastic control for continuous time Markov processes and to the theory of viscosity solutions. Stochastic control problems are treated using the dynamic programming approach. The authors approach stochastic control problems by the method of dynamic programming. The fundamental equation of dynamic programming is a nonlinear evolution equation for the value function. For controlled Markov diffusion processes, this becomes a nonlinear partial differential equation of second order, called a Hamilton-Jacobi-Bellman (HJB) equation. Typically, the value function is not smooth enough to satisfy the HJB equation in a classical sense. Viscosity solutions provide framework in which to study HJB equations, and to prove continuous dependence of solutions on problem data. The theory is illustrated by applications from engineering, management science, and financial economics. In this second edition, new material on applications to mathematical finance has been added. Concise introductions to risk-sensitive control theory, nonlinear H-infinity control and differential games are also included. Review of the earlier edition: "This book is highly recommended to anyone who wishes to learn the dinamic principle applied to optimal stochastic control for diffusion processes. Without any doubt, this is a fine book and most likely it is going to become a classic on the area... ." SIAM Review, 1994
Nota de contenido:	Deterministic Optimal Control -- Viscosity Solutions -- Optimal Control of Markov Processes: Classical Solutions -- Controlled Markov Diffusions in ?n -- Viscosity Solutions: Second-Order Case -- Logarithmic Transformations and Risk Sensitivity -- Singular Perturbations -- Singular Stochastic Control -- Finite Difference Numerical Approximations -- Applications to Finance -- Differential Games
En línea:	http://dx.doi.org/10.1007/0-387-31071-1
Link:	https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=34778

Controlled Markov Processes and Viscosity Solutions [documento electrónico] / Wendell H. Fleming ; SpringerLink (Online service) ; H.M. Soner . - New York, NY : Springer New York, 2006 . - XVII, 429 p : online resource. - (Stochastic Modelling and Applied Probability, ISSN 0172-4568; 25) .
ISBN : 978-0-387-31071-8
Idioma : Inglés (eng)

Palabras clave:	Mathematics  Operations  research  Decision  making  Economics,  Mathematical  System  theory  Probabilities  Control  engineering  Robotics  Mechatronics  Probability  Theory  and  Stochastic  Processes  Systems  Theory,  Control,  Robotics,  Operation  Research/Decision  Quantitative  Finance
Clasificación:	51 Matemáticas
Resumen:	This book is intended as an introduction to optimal stochastic control for continuous time Markov processes and to the theory of viscosity solutions. Stochastic control problems are treated using the dynamic programming approach. The authors approach stochastic control problems by the method of dynamic programming. The fundamental equation of dynamic programming is a nonlinear evolution equation for the value function. For controlled Markov diffusion processes, this becomes a nonlinear partial differential equation of second order, called a Hamilton-Jacobi-Bellman (HJB) equation. Typically, the value function is not smooth enough to satisfy the HJB equation in a classical sense. Viscosity solutions provide framework in which to study HJB equations, and to prove continuous dependence of solutions on problem data. The theory is illustrated by applications from engineering, management science, and financial economics. In this second edition, new material on applications to mathematical finance has been added. Concise introductions to risk-sensitive control theory, nonlinear H-infinity control and differential games are also included. Review of the earlier edition: "This book is highly recommended to anyone who wishes to learn the dinamic principle applied to optimal stochastic control for diffusion processes. Without any doubt, this is a fine book and most likely it is going to become a classic on the area... ." SIAM Review, 1994
Nota de contenido:	Deterministic Optimal Control -- Viscosity Solutions -- Optimal Control of Markov Processes: Classical Solutions -- Controlled Markov Diffusions in ?n -- Viscosity Solutions: Second-Order Case -- Logarithmic Transformations and Risk Sensitivity -- Singular Perturbations -- Singular Stochastic Control -- Finite Difference Numerical Approximations -- Applications to Finance -- Differential Games
En línea:	http://dx.doi.org/10.1007/0-387-31071-1
Link:	https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=34778