AbstractThis paper studies bounded-velocity control of a Brownian motion when discretionary stopping, or ‘leaving’, is allowed. The goal is to choose a control law and a stopping time in order to minimize the expected sum of a running and a termination cost, when both costs increase as a function of distance from the origin. There are two versions of this problem: the fully observed case, in which the control multiplies a known gain, and the partially observed case, in which the gain is random and unknown. Without the extra feature of stopping, the fully observed problem originates with Beneš (Stochastic Process. Appl. 2 (1974) 127–140), who showed that the optimal control takes the ‘bang–bang’ form of pushing with maximum velocity toward t...
AbstractLetB=(Bt)t≥0be a Brownian motion started atx∈R. Given a stopping time τ forBand a real value...
We present closed-form solutions to some double optimal stopping problems with payoffs representing ...
This thesis deals with the explicit solution of optimal stopping problems with infinite time horizon...
This paper studies bounded-velocity control of a Brownian motion when discretionary stopping, or 'le...
AbstractThis paper studies bounded-velocity control of a Brownian motion when discretionary stopping...
In this thesis, first we briefly outline the general theory surrounding optimal stopping problems wi...
A singular stochastic control problem with state constraints in two-dimensions is studied. We show t...
We consider optimal stopping problems for a Brownian motion and a geometric Brownian motion with a “...
In this thesis, we study three separate problems, all of which relate to the optimal stopping and co...
10.1016/j.jspi.2003.09.042Journal of Statistical Planning and Inference1301-221-47JSPI
A singular stochastic control problem with state constraints in twodimensions is studied. We show th...
This thesis is concerned with two explicitly solvable stochastic control problems that incorporate ...
We solve the problem of optimal stopping of a Brownian motion subject to the constraint that the sto...
AbstractWe study two classes of stochastic control problems with semicontinuous cost: the Mayer prob...
Abstract. Optimal stopping of stochastic processes having both absolutely continuous and singular be...
AbstractLetB=(Bt)t≥0be a Brownian motion started atx∈R. Given a stopping time τ forBand a real value...
We present closed-form solutions to some double optimal stopping problems with payoffs representing ...
This thesis deals with the explicit solution of optimal stopping problems with infinite time horizon...
This paper studies bounded-velocity control of a Brownian motion when discretionary stopping, or 'le...
AbstractThis paper studies bounded-velocity control of a Brownian motion when discretionary stopping...
In this thesis, first we briefly outline the general theory surrounding optimal stopping problems wi...
A singular stochastic control problem with state constraints in two-dimensions is studied. We show t...
We consider optimal stopping problems for a Brownian motion and a geometric Brownian motion with a “...
In this thesis, we study three separate problems, all of which relate to the optimal stopping and co...
10.1016/j.jspi.2003.09.042Journal of Statistical Planning and Inference1301-221-47JSPI
A singular stochastic control problem with state constraints in twodimensions is studied. We show th...
This thesis is concerned with two explicitly solvable stochastic control problems that incorporate ...
We solve the problem of optimal stopping of a Brownian motion subject to the constraint that the sto...
AbstractWe study two classes of stochastic control problems with semicontinuous cost: the Mayer prob...
Abstract. Optimal stopping of stochastic processes having both absolutely continuous and singular be...
AbstractLetB=(Bt)t≥0be a Brownian motion started atx∈R. Given a stopping time τ forBand a real value...
We present closed-form solutions to some double optimal stopping problems with payoffs representing ...
This thesis deals with the explicit solution of optimal stopping problems with infinite time horizon...