Consider compound Poisson processes with negative drift and no negative jumps, which converge to some spectrally positive Lévy process with nonzero Lévy measure. In this paper, we study the asymptotic behavior of the local time process, in the spatial variable, of these processes killed at two different random times: either at the time of the first visit of the Lévy process to 0, in which case we prove results at the excur- sion level under suitable conditionings; or at the time when the local time at 0 exceeds some fixed level. We prove that finite-dimensional distributions converge under gen- eral assumptions, even if the limiting process is not càdlàg. Making an assumption on the distribution of the jumps of the compound Poisson processe...
In this paper we provide a proof of the conjecture for the asymptotic order of the expected mean len...
A computational simplification of the Kalman filter (KF) is introduced – the parametric Kalman filte...
Since its introduction in the late 19th century, symmetry breaking has been found to play a crucial ...
We establish a general sufficient condition for a sequence of Galton–Watson branching processes in v...
Crump-Mode-Jagers (CMJ) trees generalize Galton-Watson trees by allowing individuals to live for an ...
A common idea in the PinT community is that Parareal, one of the most popular time-parallel algorith...
Consider a spatial branching particle process where the underlying motion is a conservative diffusio...
We report time-dependent Probability Density Functions (PDFs) for a nonlinear stochastic process wi...
Crump-Mode-Jagers (CMJ) trees generalize Galton-Watson trees by allowing individuals to live for an ...
We study limiting distributions of exponential sums $S_N(t)=\sum_{i=1}^N e^{tX_i}$ as $t\to\infty$, ...
We study stochastic differential equations with a small perturbation parameter. Under the dissipativ...
We are dealing with regression models for point processes having a multiplicative intensity process ...
We consider the following Markovian dynamic on point processes: at constant rate and with equal prob...
In this thesis we consider the limit behaviour of the power variation of fractional Lévy processes....
Let $Y\in\R^n$ be a random vector with mean $s$ and covariance matrix $\sigma^2P_n\tra{P_n}$ where $...
In this paper we provide a proof of the conjecture for the asymptotic order of the expected mean len...
A computational simplification of the Kalman filter (KF) is introduced – the parametric Kalman filte...
Since its introduction in the late 19th century, symmetry breaking has been found to play a crucial ...
We establish a general sufficient condition for a sequence of Galton–Watson branching processes in v...
Crump-Mode-Jagers (CMJ) trees generalize Galton-Watson trees by allowing individuals to live for an ...
A common idea in the PinT community is that Parareal, one of the most popular time-parallel algorith...
Consider a spatial branching particle process where the underlying motion is a conservative diffusio...
We report time-dependent Probability Density Functions (PDFs) for a nonlinear stochastic process wi...
Crump-Mode-Jagers (CMJ) trees generalize Galton-Watson trees by allowing individuals to live for an ...
We study limiting distributions of exponential sums $S_N(t)=\sum_{i=1}^N e^{tX_i}$ as $t\to\infty$, ...
We study stochastic differential equations with a small perturbation parameter. Under the dissipativ...
We are dealing with regression models for point processes having a multiplicative intensity process ...
We consider the following Markovian dynamic on point processes: at constant rate and with equal prob...
In this thesis we consider the limit behaviour of the power variation of fractional Lévy processes....
Let $Y\in\R^n$ be a random vector with mean $s$ and covariance matrix $\sigma^2P_n\tra{P_n}$ where $...
In this paper we provide a proof of the conjecture for the asymptotic order of the expected mean len...
A computational simplification of the Kalman filter (KF) is introduced – the parametric Kalman filte...
Since its introduction in the late 19th century, symmetry breaking has been found to play a crucial ...