We propose a general framework for studying last passage times, suprema, and drawdowns of a large class of continuous-time stochastic processes. Our approach is based on processes of class Sigma and the more general concept of two processes, one of which moves only when the other is at the origin. After investigating certain transformations of such processes and their convergence properties, we provide three general representation results. The first allows the recovery of a process of class Sigma from its final value and the last time it visited the origin. In many situations this gives access to the distribution of the last time a stochastic process attains a certain level or is equal to its running maximum. It also leads to recently disco...
We compute some functionals related to the joint generalised Laplace transforms of the first times a...
We compute some functionals related to the generalized joint Laplace transforms of the first times a...
This PhD thesis studies various mathematical aspects of problems related to the Markovian projection...
In this survey on last passage times, we propose a new viewpoint which provides a unified approach t...
This paper contributes to the study of a new and remarkable family of stochastic processes that we w...
Lévy processes are the natural continuous-time analogue of random walks and form a rich class of sto...
We develop a computational method for expected functionals of the drawdown and its duration in expon...
AbstractThe drawdown process Y of a completely asymmetric Lévy process X is equal to X reflected at ...
In this thesis we study the pricing of options of American type in a continuous time setting. We beg...
"This comprehensive guide to stochastic processes gives a complete overview of the theory and addres...
Le;vy processes form a wide and rich class of random process, and have many applications ranging fro...
In this paper, we derive a variation of the Azéma martingale using two approaches—a direct probabili...
This dissertation addresses the change point detection problem when either the post-change distribut...
In this paper, a study of random times on filtered probability spaces is undertaken. The main messag...
We obtain closed-form expressions for the value of the joint Laplace transform of the running maximu...
We compute some functionals related to the joint generalised Laplace transforms of the first times a...
We compute some functionals related to the generalized joint Laplace transforms of the first times a...
This PhD thesis studies various mathematical aspects of problems related to the Markovian projection...
In this survey on last passage times, we propose a new viewpoint which provides a unified approach t...
This paper contributes to the study of a new and remarkable family of stochastic processes that we w...
Lévy processes are the natural continuous-time analogue of random walks and form a rich class of sto...
We develop a computational method for expected functionals of the drawdown and its duration in expon...
AbstractThe drawdown process Y of a completely asymmetric Lévy process X is equal to X reflected at ...
In this thesis we study the pricing of options of American type in a continuous time setting. We beg...
"This comprehensive guide to stochastic processes gives a complete overview of the theory and addres...
Le;vy processes form a wide and rich class of random process, and have many applications ranging fro...
In this paper, we derive a variation of the Azéma martingale using two approaches—a direct probabili...
This dissertation addresses the change point detection problem when either the post-change distribut...
In this paper, a study of random times on filtered probability spaces is undertaken. The main messag...
We obtain closed-form expressions for the value of the joint Laplace transform of the running maximu...
We compute some functionals related to the joint generalised Laplace transforms of the first times a...
We compute some functionals related to the generalized joint Laplace transforms of the first times a...
This PhD thesis studies various mathematical aspects of problems related to the Markovian projection...