We give three applications of the Pecherskii-Rogozin-Spitzer identity for Lévy processes. First, we find the joint distribution of the supremum and the epoch at which it is `attained' if a Lévy process has phase-type upward jumps. We also find the characteristics of the ladder process. Second, we establish general properties of perturbed risk models, and obtain explicit fluctuation identities in the case that the Lévy process is spectrally positive. Third, we study the tail asymptotics for the supremum of a Lévy process under different assumptions on the tail of the Lévy measure
We derive factorization identities for a class of preemptive-resume queueing systems, with batch arr...
We study the Wiener-Hopf factorization for Levy processes with bounded positive jumps and arbitrary ...
In this paper, some identities in laws involving ladder processes for random walks and Lévy process...
We give three applications of the Pecherskii-Rogozin-Spitzer identity for Lévy processes. First, we ...
AbstractWe study the Wiener–Hopf factorization for Lévy processes with bounded positive jumps and ar...
This thesis is devoted to the fluctuation theory of Lévy processes, discipline which studies traject...
The last couple of years has seen a remarkable number of new, explicit examples of the Wiener-Hopf f...
We obtain a new fluctuation identity for a general Lévy process giv-ing a quintuple law describing ...
We study the Wiener-Hopf factorization for Lévy processes with bounded positive jumps and arbitrary...
With a view to computing fluctuation identities related to stable processes, we review and extend th...
We obtain a new fluctuation identity for a general Lévy process giving a quintuple law describing th...
In this paper we introduce a ten-parameter family of Lévy processes for which we obtain Wiener–Hopf ...
Meromorphic L´evy processes have attracted the attention of a lot of researchers recently due to it...
In this short communication we analyze the tail asymptotics corresponding to the maximum value attai...
Lévy processes are the natural continuous-time analogue of random walks and form a rich class of sto...
We derive factorization identities for a class of preemptive-resume queueing systems, with batch arr...
We study the Wiener-Hopf factorization for Levy processes with bounded positive jumps and arbitrary ...
In this paper, some identities in laws involving ladder processes for random walks and Lévy process...
We give three applications of the Pecherskii-Rogozin-Spitzer identity for Lévy processes. First, we ...
AbstractWe study the Wiener–Hopf factorization for Lévy processes with bounded positive jumps and ar...
This thesis is devoted to the fluctuation theory of Lévy processes, discipline which studies traject...
The last couple of years has seen a remarkable number of new, explicit examples of the Wiener-Hopf f...
We obtain a new fluctuation identity for a general Lévy process giv-ing a quintuple law describing ...
We study the Wiener-Hopf factorization for Lévy processes with bounded positive jumps and arbitrary...
With a view to computing fluctuation identities related to stable processes, we review and extend th...
We obtain a new fluctuation identity for a general Lévy process giving a quintuple law describing th...
In this paper we introduce a ten-parameter family of Lévy processes for which we obtain Wiener–Hopf ...
Meromorphic L´evy processes have attracted the attention of a lot of researchers recently due to it...
In this short communication we analyze the tail asymptotics corresponding to the maximum value attai...
Lévy processes are the natural continuous-time analogue of random walks and form a rich class of sto...
We derive factorization identities for a class of preemptive-resume queueing systems, with batch arr...
We study the Wiener-Hopf factorization for Levy processes with bounded positive jumps and arbitrary ...
In this paper, some identities in laws involving ladder processes for random walks and Lévy process...