We present a solution to some discounted optimal stopping problem for the maximum of a geometric Brownian motion on a finite time interval. The method of proof is based on reducing the initial optimal stopping problem with the continuation region determined by an increasing continuous boundary...

We present a closed form solution to the perpetual American double barrier call option problem in a model driven by Brownian motion and a compound Poisson process with exponential jumps. The method of proof is based on reducing the inital irregular optimal stopping problem to an...

We present solutions to some discounted optimal stopping problems for the maximum process in a model driven by a Brownian motion and a compound Poisson process with exponential jumps. The method of proof is based on reducing the initial problems to integro-differential free-boundary problems...

We present a solution to the considered in [5] and [22] optimal stopping problem for some jump processes. The method of proof is based on reducing the initial problem to an integro-differential free-boundary problem where the normal reflection and smooth fit may break down and the latter then be...

We present an explicit solution to the formulated in [17] optimal stopping problem for a geometric compound Poisson process with exponential jumps. The method of proof is based on reducing the initial problem to an integro-differential free-boundary problem where the smooth fit may break down...

The multiple disorder problem consists of finding a sequence of stopping times which are as close as possible to the (unknown) times of 'disorder' when the distribution of an observed process changes its probability characteristics. We present a formulation and solution of the multiple disorder...

SFB 649 Discussion Paper 2006-068 Integral Options in Models with Jumps Pavel V. Gapeev* * Weierstrass Institute for Applied Analysis and Stochastics, Berlin, Germany and Russian Academy of Sciences, Institute of Control Sciences, Moscow, Russia This research...

SFB 649 Discussion Paper 2006-058 Perpetual Barrier Options in Jump-Diffusion Models Pavel V. Gapeev* * Weierstrass Institute for Applied Analysis and Stochastics, Berlin, Germany and Russian Academy of Sciences, Institute of Control Sciences, Moscow, Russia ...

SFB 649 Discussion Paper 2006-057 Discounted Optimal Stopping for Maxima in Diffusion Models with Finite Horizon Pavel V. Gapeev* * Weierstrass Institute for Applied Analysis and Stochastics, Berlin, Germany and Russian Academy of Sciences, Institute of...