A finite horizon optimal stopping problem for an infinite dimensional diffusion X is analyzed by means of variational techniques. The diffusion is driven by a SDE on a Hilbert space H with a non-linear diffusion coefficient σ(X) and a generic unbounded operator A in the drift term. When the gain function is time-dependent and fulfils mild regularity assumptions, the value function U of the optimal stopping problem is shown to solve an infinite-dimensional, parabolic, degenerate variational inequality on an unbounded domain. Once the coefficient σ(X) is specified, the solution of the variational problem is found in a suitable Banach space V fully characterized in terms of a Gaussian measure μ. This work provides the infinite-dimensional cou...
Consider a set of discounted optimal stopping problems for a one-parameter family of objective funct...
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...
A finite horizon optimal stopping problem for an infinite dimensional diffusion X is analyzed by mea...
We study the existence theory for parabolic variational inequalities in weighted L2 spaces with resp...
International audienceWe consider optimal stopping problems with finite horizon for one dimensional ...
We consider an optimal stopping problem for a Hilbert-space valued diffusion. We prove that the valu...
The value function of an optimal stopping problem for jump diffusions is known to be a generalized s...
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 present a solution to some discounted optimal stopping problem for the maximum of a geometric Bro...
We consider problems of optimal stopping where the driving process is a (one- or multi-dimensional) ...
In this paper we give a characterization of the optimal cost of a stopping time problem as the maxim...
Consider a set of discounted optimal stopping problems for a one-parameter family of objective funct...
A new characterization of excessive functions for arbitrary one–dimensional regular diffusion proces...
Consider a set of discounted optimal stopping problems for a one-parameter family of objective funct...
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...
A finite horizon optimal stopping problem for an infinite dimensional diffusion X is analyzed by mea...
We study the existence theory for parabolic variational inequalities in weighted L2 spaces with resp...
International audienceWe consider optimal stopping problems with finite horizon for one dimensional ...
We consider an optimal stopping problem for a Hilbert-space valued diffusion. We prove that the valu...
The value function of an optimal stopping problem for jump diffusions is known to be a generalized s...
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 present a solution to some discounted optimal stopping problem for the maximum of a geometric Bro...
We consider problems of optimal stopping where the driving process is a (one- or multi-dimensional) ...
In this paper we give a characterization of the optimal cost of a stopping time problem as the maxim...
Consider a set of discounted optimal stopping problems for a one-parameter family of objective funct...
A new characterization of excessive functions for arbitrary one–dimensional regular diffusion proces...
Consider a set of discounted optimal stopping problems for a one-parameter family of objective funct...
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...