Add to ORKGThe following paper is devoted to the study of the positivity set $U=\{\mathcal{L}\phi>0\}$ arising in parabolic obstacle problems. It is shown that $U$ is contained in the non-coincidence set with a positive distance between the boundaries uniformly in the spatial variable if the boundary of $U$ satisfies an interior $C^1$-Dini condition in the space variable and a Lipschitz condition in the time variable. We apply our results to American option pricing and we thus show that the positivity set is strictly contained in the continuation region, which means that the option should not be exercised in $U$ or on the boundary of $U$
In the present paper, we investigate the preventive role of space dimension for semilinear paraboli...
Motivated by the pricing of American options for baskets we consider a parabolic variational inequal...
In a cylinder Omega(T) = Omega x (0, T) subset of R-+(n+1) we study the boundary behavior of nonnega...
This thesis consists of four papers and a summary. The common topic of the included papers are the p...
This paper is devoted to regularity results and geometric properties of the singular set of the para...
AbstractThis paper is devoted to regularity results and geometric properties of the singular set of ...
In this paper we propose a new technique for the stability analysis of the coincidence set of a solu...
We study some properties of the coincidence set for the boundary Signorini problem, improving some r...
© Published under licence by IOP Publishing Ltd. Three new weak formulations of the problem of Ameri...
We consider an optimal stopping problem for a Hilbert-space valued diffusion. We prove that the valu...
This paper is devoted to continuity results of the time derivative of the solution to the one-dimens...
Abstract. For the parabolic obstacle-problem-like equation ∆u − ∂tu = λ+χ{u>0} − λ−χ{u<0}, wh...
In this paper we prove optimal interior regularity for solutions to the obstacle problem for a class...
Obstacle identification problems for parabolic equations and systems are considered. Unique continua...
{Let u be a non-negative solution to a singular parabolic equation of p-Laplacian type (1<p<2) or ...
In the present paper, we investigate the preventive role of space dimension for semilinear paraboli...
Motivated by the pricing of American options for baskets we consider a parabolic variational inequal...
In a cylinder Omega(T) = Omega x (0, T) subset of R-+(n+1) we study the boundary behavior of nonnega...
This thesis consists of four papers and a summary. The common topic of the included papers are the p...
This paper is devoted to regularity results and geometric properties of the singular set of the para...
AbstractThis paper is devoted to regularity results and geometric properties of the singular set of ...
In this paper we propose a new technique for the stability analysis of the coincidence set of a solu...
We study some properties of the coincidence set for the boundary Signorini problem, improving some r...
© Published under licence by IOP Publishing Ltd. Three new weak formulations of the problem of Ameri...
We consider an optimal stopping problem for a Hilbert-space valued diffusion. We prove that the valu...
This paper is devoted to continuity results of the time derivative of the solution to the one-dimens...
Abstract. For the parabolic obstacle-problem-like equation ∆u − ∂tu = λ+χ{u>0} − λ−χ{u<0}, wh...
In this paper we prove optimal interior regularity for solutions to the obstacle problem for a class...
Obstacle identification problems for parabolic equations and systems are considered. Unique continua...
{Let u be a non-negative solution to a singular parabolic equation of p-Laplacian type (1<p<2) or ...
In the present paper, we investigate the preventive role of space dimension for semilinear paraboli...
Motivated by the pricing of American options for baskets we consider a parabolic variational inequal...
In a cylinder Omega(T) = Omega x (0, T) subset of R-+(n+1) we study the boundary behavior of nonnega...