Add to ORKGWe study the exit time $\tau=\tau_{(0,\infty)}$ for 1-dimensional strictly stable processes and express its Laplace transform at $t^\alpha$ as the Laplace transform of a positive random variable with explicit density. Consequently, $\tau$ satisfies some multiplicative convolution relations. For some stable processes, e.g. for the symmetric $\frac23$-stable process, explicit formulas for the Laplace transform and the density of $\tau$ are obtained as an application
We generate the fractional Poisson process by subordinating the standard Poisson process to the inve...
We consider a Lindley process with Laplace distributed space increments. We obtain closed form recur...
AbstractA tempered stable Lévy process combines both the α-stable and Gaussian trends. In a short ti...
We study the exit time τ = τ ( 0 , ∞ ) for 1-dimensional strictly stable processes and express its L...
AbstractWe study the exit time τ=τ(0,∞) for 1-dimensional strictly stable processes and express its ...
International audienceWe consider the one-sided exit problem for stable LÈvy process in random scene...
Bernyk etal. [Bernyk, V., Dalang, R.C., Peskir, G., 2008. The law of the supremum of a stable Lvy pr...
Fractional relaxation equations, as well as relaxation functions time-changed by independent stochas...
In [5], the Laplace transform was found of the last time a spectrally negative Lévy process, which d...
We analyse an additive-increase and multiplicative-decrease (also known as growth-collapse) process ...
Using a generalization of the skew-product representation of planar Brownian motion and the analogue...
By killing a stable Lévy process when it leaves the positive half-line, or by conditioning it to sta...
AbstractWe study the exit problem of solutions of the stochastic differential equation dXtε=−U′(Xtε)...
International audienceLet $X$ be a mixed process, sum of a brownian motion and a renewal-reward proc...
For a stable process, we give an explicit formula for the potential measure of the process killed ou...
We generate the fractional Poisson process by subordinating the standard Poisson process to the inve...
We consider a Lindley process with Laplace distributed space increments. We obtain closed form recur...
AbstractA tempered stable Lévy process combines both the α-stable and Gaussian trends. In a short ti...
We study the exit time τ = τ ( 0 , ∞ ) for 1-dimensional strictly stable processes and express its L...
AbstractWe study the exit time τ=τ(0,∞) for 1-dimensional strictly stable processes and express its ...
International audienceWe consider the one-sided exit problem for stable LÈvy process in random scene...
Bernyk etal. [Bernyk, V., Dalang, R.C., Peskir, G., 2008. The law of the supremum of a stable Lvy pr...
Fractional relaxation equations, as well as relaxation functions time-changed by independent stochas...
In [5], the Laplace transform was found of the last time a spectrally negative Lévy process, which d...
We analyse an additive-increase and multiplicative-decrease (also known as growth-collapse) process ...
Using a generalization of the skew-product representation of planar Brownian motion and the analogue...
By killing a stable Lévy process when it leaves the positive half-line, or by conditioning it to sta...
AbstractWe study the exit problem of solutions of the stochastic differential equation dXtε=−U′(Xtε)...
International audienceLet $X$ be a mixed process, sum of a brownian motion and a renewal-reward proc...
For a stable process, we give an explicit formula for the potential measure of the process killed ou...
We generate the fractional Poisson process by subordinating the standard Poisson process to the inve...
We consider a Lindley process with Laplace distributed space increments. We obtain closed form recur...
AbstractA tempered stable Lévy process combines both the α-stable and Gaussian trends. In a short ti...