In this paper, bounded variation control of one-dimensional diffusion processes is considered. We assume that the agent is allowed to control the diffusion only at the jump times of an observable, independent Poisson process. The agent's objective is to maximize the expected present value of the cumulative payoff generated by the controlled diffusion over its lifetime. We propose a relatively weak set of assumptions on the underlying diffusion and the instantaneous payoff structure, under which we solve the problem in closed form. Moreover, we illustrate the main results with an explicit example
We consider the problem faced by a decision maker who can switch between two random payoff flows. Ea...
We study the optimal stopping problem proposed by Dupuis and Wang in [9]. In this maximiza- tion pro...
We study the optimal stopping problem proposed by Dupuis and Wang (Adv. Appl. Probab. 34:141–157, 20...
In this paper, bounded variation control of one-dimensional diffusion processes is considered. We as...
We study a class of two-sided optimal control problems of general linear diffusions under a so-calle...
We study the asymptotic relations between certain singular and constrained control problems for one-...
AbstractA comprehensive development of effective numerical methods for stochastic control problems i...
We consider the problem of optimally tracking a Brownian motion by a sequence of impulse controls, i...
We consider stochastic control problems with jump-diffusion processes and formulate an algorith...
AbstractThis paper deals with a one-dimensional controlled diffusion process on a compact interval w...
In this paper, we study the optimal stopping problem of Dupuis and Wang analyzed in [7]. In this pro...
Ferrari G. On a Class of Singular Stochastic Control Problems for Reflected Diffusions . Center for...
Continuous stochastic control theory has found many applications in optimal investment. However, it ...
We consider the problem of controlling a general one-dimensional Ito ̂ diffusion bymeans of a finite...
ABSTRACT: Let X(t) be a controlled one-dimensional diffusion process having constant infinitesimal v...
We consider the problem faced by a decision maker who can switch between two random payoff flows. Ea...
We study the optimal stopping problem proposed by Dupuis and Wang in [9]. In this maximiza- tion pro...
We study the optimal stopping problem proposed by Dupuis and Wang (Adv. Appl. Probab. 34:141–157, 20...
In this paper, bounded variation control of one-dimensional diffusion processes is considered. We as...
We study a class of two-sided optimal control problems of general linear diffusions under a so-calle...
We study the asymptotic relations between certain singular and constrained control problems for one-...
AbstractA comprehensive development of effective numerical methods for stochastic control problems i...
We consider the problem of optimally tracking a Brownian motion by a sequence of impulse controls, i...
We consider stochastic control problems with jump-diffusion processes and formulate an algorith...
AbstractThis paper deals with a one-dimensional controlled diffusion process on a compact interval w...
In this paper, we study the optimal stopping problem of Dupuis and Wang analyzed in [7]. In this pro...
Ferrari G. On a Class of Singular Stochastic Control Problems for Reflected Diffusions . Center for...
Continuous stochastic control theory has found many applications in optimal investment. However, it ...
We consider the problem of controlling a general one-dimensional Ito ̂ diffusion bymeans of a finite...
ABSTRACT: Let X(t) be a controlled one-dimensional diffusion process having constant infinitesimal v...
We consider the problem faced by a decision maker who can switch between two random payoff flows. Ea...
We study the optimal stopping problem proposed by Dupuis and Wang in [9]. In this maximiza- tion pro...
We study the optimal stopping problem proposed by Dupuis and Wang (Adv. Appl. Probab. 34:141–157, 20...