We consider problems of optimal stopping where the driving process is a (one- or multi-dimensional) diffusion. Our approach is motivated by a change of measure techniques and gives a characterization of the optimal stopping set in terms of harmonic functions for one-dimensional diffusions. The generalization to multidimensional diffusions uses the theory of Martin boundaries. Various applications, including exchange options, are given. We treat an example where halfspaces, which are plausible candidates for the optimal stopping set, are in fact strict subsets of it. \ua9 2011 Copyright Taylor and Francis Group, LLC
AbstractWe treat optimal stopping problems of controlled diffusions under partial observation. Two k...
We consider optimal stopping problems for a Brownian motion and a geometric Brownian motion with a “...
International audienceWe consider optimal stopping problems with finite horizon for one dimensional ...
For a class of optimal stopping problems, we provide a complete characterization for optimal stoppin...
Abstract. A new approach to the solution of optimal stopping problems for one-dimensional diffusions...
International audienceWe consider a one-dimensional diffusion which solves a stochastic differential...
A new characterization of excessive functions for arbitrary one–dimensional regular diffusion proces...
AbstractA new characterization of excessive functions for arbitrary one-dimensional regular diffusio...
Consider the optimal stopping problem of a one-dimensional diffusion with posit-ive discount. Based ...
This thesis deals with the explicit solution of optimal stopping problems with infinite time horizon...
A finite horizon optimal stopping problem for an infinite dimensional diffusion X is analyzed by mea...
We connect two approaches for solving discounted optimal stopping problems for one-dimensional time-...
Consider a set of discounted optimal stopping problems for a one-parameter family of objective funct...
Consider a set of discounted optimal stopping problems for a one-parameter family of objective funct...
Summary. Let X be a one-dimensional regular diffusion, A a positive continuous additive functional o...
AbstractWe treat optimal stopping problems of controlled diffusions under partial observation. Two k...
We consider optimal stopping problems for a Brownian motion and a geometric Brownian motion with a “...
International audienceWe consider optimal stopping problems with finite horizon for one dimensional ...
For a class of optimal stopping problems, we provide a complete characterization for optimal stoppin...
Abstract. A new approach to the solution of optimal stopping problems for one-dimensional diffusions...
International audienceWe consider a one-dimensional diffusion which solves a stochastic differential...
A new characterization of excessive functions for arbitrary one–dimensional regular diffusion proces...
AbstractA new characterization of excessive functions for arbitrary one-dimensional regular diffusio...
Consider the optimal stopping problem of a one-dimensional diffusion with posit-ive discount. Based ...
This thesis deals with the explicit solution of optimal stopping problems with infinite time horizon...
A finite horizon optimal stopping problem for an infinite dimensional diffusion X is analyzed by mea...
We connect two approaches for solving discounted optimal stopping problems for one-dimensional time-...
Consider a set of discounted optimal stopping problems for a one-parameter family of objective funct...
Consider a set of discounted optimal stopping problems for a one-parameter family of objective funct...
Summary. Let X be a one-dimensional regular diffusion, A a positive continuous additive functional o...
AbstractWe treat optimal stopping problems of controlled diffusions under partial observation. Two k...
We consider optimal stopping problems for a Brownian motion and a geometric Brownian motion with a “...
International audienceWe consider optimal stopping problems with finite horizon for one dimensional ...