AbstractLewis and Mordecki have computed the Wiener–Hopf factorization of a Lévy process whose restriction of the Lévy measure on ]0,+∞[ has a rational Laplace transform. This allowed them to compute the distribution of (Xt,inf0≤s≤tXs). For the same class of Lévy processes, we compute the distribution of (Xt,inf0≤s≤tXs,sup0≤s≤tXs) and also the behavior of this triple at certain stopping times, such as the time of first exit of an interval containing the origin. Some applications to the pricing of double-barrier options with or without rebate are described
The free-boundary and the martingale approach are competitive methods of solving discounted optimal ...
We study the first-exit-time problem for the two-dimensional Wiener and Ornstein-Uhlenbeck processe...
AbstractConsider the American put and Russian option (Ann. Appl. Probab. 3 (1993) 603; Theory Probab...
AbstractLewis and Mordecki have computed the Wiener–Hopf factorization of a Lévy process whose restr...
We consider spectrally negative Lévy process and determine the joint Laplace trans- form of the exi...
We consider spectrally negative Levy process and determine the joint Laplace trans form of the exit ...
In this thesis we study the pricing of options of American type in a continuous time setting. We beg...
We connect two approaches for solving discounted optimal stopping problems for one-dimensional time-...
AbstractWe consider first passage times for piecewise exponential Markov processes that may be viewe...
This paper focuses on numerical evaluation techniques related to fluctuation theory for Lévy process...
Abstract. The Laplace transform of the first exit time from a finite interval by a spectrally negati...
In this paper we address the pricing of double barrier options. To derive the density function of th...
We suggest two new fast and accurate methods, Fast Wiener-Hopf method (FWH-method) and Iterative Wie...
We present a numerical scheme to calculate fluctuation identities for exponential Lévy processes in ...
Solving optimal stopping problems driven by Lévy processes has been a challenging task and has foun...
The free-boundary and the martingale approach are competitive methods of solving discounted optimal ...
We study the first-exit-time problem for the two-dimensional Wiener and Ornstein-Uhlenbeck processe...
AbstractConsider the American put and Russian option (Ann. Appl. Probab. 3 (1993) 603; Theory Probab...
AbstractLewis and Mordecki have computed the Wiener–Hopf factorization of a Lévy process whose restr...
We consider spectrally negative Lévy process and determine the joint Laplace trans- form of the exi...
We consider spectrally negative Levy process and determine the joint Laplace trans form of the exit ...
In this thesis we study the pricing of options of American type in a continuous time setting. We beg...
We connect two approaches for solving discounted optimal stopping problems for one-dimensional time-...
AbstractWe consider first passage times for piecewise exponential Markov processes that may be viewe...
This paper focuses on numerical evaluation techniques related to fluctuation theory for Lévy process...
Abstract. The Laplace transform of the first exit time from a finite interval by a spectrally negati...
In this paper we address the pricing of double barrier options. To derive the density function of th...
We suggest two new fast and accurate methods, Fast Wiener-Hopf method (FWH-method) and Iterative Wie...
We present a numerical scheme to calculate fluctuation identities for exponential Lévy processes in ...
Solving optimal stopping problems driven by Lévy processes has been a challenging task and has foun...
The free-boundary and the martingale approach are competitive methods of solving discounted optimal ...
We study the first-exit-time problem for the two-dimensional Wiener and Ornstein-Uhlenbeck processe...
AbstractConsider the American put and Russian option (Ann. Appl. Probab. 3 (1993) 603; Theory Probab...