Abstract. This paper analyzes numerically a long-term average stochastic control problem in-volving a controlled diffusion on a bounded region. The solution technique takes advantage of an infinite-dimensional linear programming formulation for the problem which relates the stationary measures to the generators of the diffusion. The restriction of the diffusion to an interval is accom-plished through reflection at one end point and a jump operator acting singularly in time at the other end point. Different approximations of the linear program are obtained using finite differences for the differential operators (a Markov chain approximation to the diffusion) and using a finite element method to approximate the stationary density. The numeric...
This work presents a study of a finite-time horizon stochastic control problem with restrictions on ...
We study a class of infinite-dimensional singular stochastic control problems that might find applic...
The main purpose of the book is to give a rigorous introduction to the most important and useful sol...
Abstract: This paper examines the numerical implementation of a linear pro-gramming (LP) formulation...
Convexity conditions are identified under which optimal controls in the class of strict controls exi...
We consider the problem of controlling a general one-dimensional Itô diffusion by means of a finite-...
We consider the problem of controlling a general one-dimensional Ito ̂ diffusion bymeans of a finite...
The Markov chain approximation methods are used for the numerical solution of nonlinear stochastic c...
International audienceThis paper examines the impulse control of a standard Brownian motion under a ...
This paper studies the monotone follower problem for a one-dimensional singular diffusion process. T...
We consider the problem of worst case performance estimation for a stochastic dynamic model in the p...
We study two examples of infinite dimensional stochastic processes. Situations and techniques involv...
Another approach to finite differences is the well developed Markov Chain Approximation (MCA) of Kus...
Based on linear programming formulations for infinite horizon stochastic control problems, a numeric...
The intent of this book is to present recent results in the control theory for the long run average ...
This work presents a study of a finite-time horizon stochastic control problem with restrictions on ...
We study a class of infinite-dimensional singular stochastic control problems that might find applic...
The main purpose of the book is to give a rigorous introduction to the most important and useful sol...
Abstract: This paper examines the numerical implementation of a linear pro-gramming (LP) formulation...
Convexity conditions are identified under which optimal controls in the class of strict controls exi...
We consider the problem of controlling a general one-dimensional Itô diffusion by means of a finite-...
We consider the problem of controlling a general one-dimensional Ito ̂ diffusion bymeans of a finite...
The Markov chain approximation methods are used for the numerical solution of nonlinear stochastic c...
International audienceThis paper examines the impulse control of a standard Brownian motion under a ...
This paper studies the monotone follower problem for a one-dimensional singular diffusion process. T...
We consider the problem of worst case performance estimation for a stochastic dynamic model in the p...
We study two examples of infinite dimensional stochastic processes. Situations and techniques involv...
Another approach to finite differences is the well developed Markov Chain Approximation (MCA) of Kus...
Based on linear programming formulations for infinite horizon stochastic control problems, a numeric...
The intent of this book is to present recent results in the control theory for the long run average ...
This work presents a study of a finite-time horizon stochastic control problem with restrictions on ...
We study a class of infinite-dimensional singular stochastic control problems that might find applic...
The main purpose of the book is to give a rigorous introduction to the most important and useful sol...