32 pagesOptimal stoppingThis paper studies an optimal stopping problem for Lévy processes. We give a justification of the form of the Snell envelope using standard results of optimal stopping. We also justify the convexity of the value function, and without a priori restriction to a particular class of stopping times, we deduce that the smallest optimal stopping time is necessarily a hitting time. We propose a method which allows to obtain the optimal threshold. Moreover this method allows to avoid long calculations of the integro-differential operatorused in the usual proofs
We consider the optimal stopping problem of a Markov process {xt : t ≤ 0} when the controller is all...
Given a spectrally negative L\'evy process $X$ drifting to infinity, (inspired on the early ideas of...
AbstractLetB=(Bt)t≥0be a Brownian motion started atx∈R. Given a stopping time τ forBand a real value...
32 pagesOptimal stoppingThis paper studies an optimal stopping problem for Lévy processes. We give a...
Arrêt optimal pour les processus de Markov forts et les fonctions affinesIn this Note we study optim...
This thesis deals with the explicit solution of optimal stopping problems with infinite time horizon...
In this thesis, first we briefly outline the general theory surrounding optimal stopping problems wi...
AbstractWe consider large classes of continuous time optimal stopping problems for which we establis...
In the first part of this thesis, we study some optimal stopping time problems of the form : $ sup_{...
AbstractFor an extremal process (Zt)t the optimal stopping problem for Xt = f(Zt)−g(t) gives the con...
International audienceUnder the hypothesis of convergence in probability of a sequence of càdlàg pro...
In this paper, we study the optimal stopping problem of Dupuis and Wang analyzed in [7]. In this pro...
This paper studies stopping problems of the form $V=\inf_{0 \leq \tau \leq T} \mathbb{E}[U(\frac{\ma...
Solving optimal stopping problems driven by Lévy processes has been a challenging task and has foun...
In this short note, we show that the method introduced by Beibel and Lerche (1997) for solving certa...
We consider the optimal stopping problem of a Markov process {xt : t ≤ 0} when the controller is all...
Given a spectrally negative L\'evy process $X$ drifting to infinity, (inspired on the early ideas of...
AbstractLetB=(Bt)t≥0be a Brownian motion started atx∈R. Given a stopping time τ forBand a real value...
32 pagesOptimal stoppingThis paper studies an optimal stopping problem for Lévy processes. We give a...
Arrêt optimal pour les processus de Markov forts et les fonctions affinesIn this Note we study optim...
This thesis deals with the explicit solution of optimal stopping problems with infinite time horizon...
In this thesis, first we briefly outline the general theory surrounding optimal stopping problems wi...
AbstractWe consider large classes of continuous time optimal stopping problems for which we establis...
In the first part of this thesis, we study some optimal stopping time problems of the form : $ sup_{...
AbstractFor an extremal process (Zt)t the optimal stopping problem for Xt = f(Zt)−g(t) gives the con...
International audienceUnder the hypothesis of convergence in probability of a sequence of càdlàg pro...
In this paper, we study the optimal stopping problem of Dupuis and Wang analyzed in [7]. In this pro...
This paper studies stopping problems of the form $V=\inf_{0 \leq \tau \leq T} \mathbb{E}[U(\frac{\ma...
Solving optimal stopping problems driven by Lévy processes has been a challenging task and has foun...
In this short note, we show that the method introduced by Beibel and Lerche (1997) for solving certa...
We consider the optimal stopping problem of a Markov process {xt : t ≤ 0} when the controller is all...
Given a spectrally negative L\'evy process $X$ drifting to infinity, (inspired on the early ideas of...
AbstractLetB=(Bt)t≥0be a Brownian motion started atx∈R. Given a stopping time τ forBand a real value...