Abstract A type of optimal investment problem can be regarded as an optimal stopping problem in the field of applied stochastic analysis. This study derives the existence conditions of the optimal stopping time when the stochastic process is a geometric Brownian motion or an arithmetic Brownian motion. The conditions concern the intrinsic value function and are natural extensions of the certainty case. Additionally, they are essential for a well-known result in recent investment theory. They are also applied to an optimal land development problem. The analyses give existing studies rigorous foundations and generalize them
In this paper, we investigate dynamic optimization problems featuring both stochastic control and op...
In this project, we present a methodology to transform Optimal Stopping Problems into Free Boundary ...
In this paper we demonstrate that optimal stopping problems can be solved very effectively using as ...
We consider optimal stopping problems for a Brownian motion and a geometric Brownian motion with a “...
Abstract. Optimal stopping of stochastic processes having both absolutely continuous and singular be...
This thesis considers several optimal stopping problems motivated by mathematical fi- nance, using t...
In this thesis, first we briefly outline the general theory surrounding optimal stopping problems wi...
Some non-linear optimal stopping problems can be solved explicitly by using a common method which is...
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...
We present closed-form solutions to some double optimal stopping problems with payoffs representing ...
Abstract: We study the perpetual American option characteristics in the case where the underlying dy...
We formulate an optimal stopping problem for a geometric Brownian motion where the probability scale...
10.1016/j.jspi.2003.09.042Journal of Statistical Planning and Inference1301-221-47JSPI
This thesis deals with the explicit solution of optimal stopping problems with infinite time horizon...
In this paper, we investigate dynamic optimization problems featuring both stochastic control and op...
In this project, we present a methodology to transform Optimal Stopping Problems into Free Boundary ...
In this paper we demonstrate that optimal stopping problems can be solved very effectively using as ...
We consider optimal stopping problems for a Brownian motion and a geometric Brownian motion with a “...
Abstract. Optimal stopping of stochastic processes having both absolutely continuous and singular be...
This thesis considers several optimal stopping problems motivated by mathematical fi- nance, using t...
In this thesis, first we briefly outline the general theory surrounding optimal stopping problems wi...
Some non-linear optimal stopping problems can be solved explicitly by using a common method which is...
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...
We present closed-form solutions to some double optimal stopping problems with payoffs representing ...
Abstract: We study the perpetual American option characteristics in the case where the underlying dy...
We formulate an optimal stopping problem for a geometric Brownian motion where the probability scale...
10.1016/j.jspi.2003.09.042Journal of Statistical Planning and Inference1301-221-47JSPI
This thesis deals with the explicit solution of optimal stopping problems with infinite time horizon...
In this paper, we investigate dynamic optimization problems featuring both stochastic control and op...
In this project, we present a methodology to transform Optimal Stopping Problems into Free Boundary ...
In this paper we demonstrate that optimal stopping problems can be solved very effectively using as ...