A new characterization of excessive functions for arbitrary one-dimensional regular diffusion processes is provided, using the notion of concavity. It is shown that excessivity is equivalent to concavity in some suitable generalized sense. This permits a characterization of the value function of the optimal stopping problem as "the smallest nonnegative concave majorant of the reward function" and allows us to generalize results of Dynkin and Yushkevich for standard Brownian motion. Moreover, we show how to reduce the discounted optimal stopping problems for an arbitrary diffusion process to an undiscounted optimal stopping problem for standard Brownian motion. The concavity of the value functions also leads to conclusions about their smooth...
In this paper we present closed form solutions of some discounted optimal stopping problems for the ...
Consider a set of discounted optimal stopping problems for a one-parameter family of objective funct...
International audienceWe consider optimal stopping problems with finite horizon for one dimensional ...
AbstractA new characterization of excessive functions for arbitrary one-dimensional regular diffusio...
A new characterization of excessive functions for arbitrary one–dimensional regular diffusion proces...
Consider the optimal stopping problem of a one-dimensional diffusion with posit-ive discount. Based ...
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...
The value function of an optimal stopping problem for jump diffusions is known to be a generalized s...
We connect two approaches for solving discounted optimal stopping problems for one-dimensional time-...
The value function of an optimal stopping problem for jump diffusions is known to be a generalized s...
Summary. Let X be a one-dimensional regular diffusion, A a positive continuous additive functional o...
Consider a set of discounted optimal stopping problems for a one-parameter family of objective funct...
We consider problems of optimal stopping where the driving process is a (one- or multi-dimensional) ...
In this paper we present closed form solutions of some discounted optimal stopping problems for the ...
Consider a set of discounted optimal stopping problems for a one-parameter family of objective funct...
International audienceWe consider optimal stopping problems with finite horizon for one dimensional ...
AbstractA new characterization of excessive functions for arbitrary one-dimensional regular diffusio...
A new characterization of excessive functions for arbitrary one–dimensional regular diffusion proces...
Consider the optimal stopping problem of a one-dimensional diffusion with posit-ive discount. Based ...
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...
The value function of an optimal stopping problem for jump diffusions is known to be a generalized s...
We connect two approaches for solving discounted optimal stopping problems for one-dimensional time-...
The value function of an optimal stopping problem for jump diffusions is known to be a generalized s...
Summary. Let X be a one-dimensional regular diffusion, A a positive continuous additive functional o...
Consider a set of discounted optimal stopping problems for a one-parameter family of objective funct...
We consider problems of optimal stopping where the driving process is a (one- or multi-dimensional) ...
In this paper we present closed form solutions of some discounted optimal stopping problems for the ...
Consider a set of discounted optimal stopping problems for a one-parameter family of objective funct...
International audienceWe consider optimal stopping problems with finite horizon for one dimensional ...