This paper addresses heavy-tailed large-deviation estimates for the distribution tail of functionals of a class of spectrally one-sided Lévy processes. Our contribution is to show that these estimates remain valid in a near-critical regime. This complements recent similar results that have been obtained for the all-time supremum of such processes. Specifically, we consider local asymptotics of the all-time supremum, the supremum of the process until exiting [0,∞), the maximum jump until that time, and the time it takes until exiting [0,∞). The proofs rely, among other things, on properties of scale functions.</p
In this paper, we discuss max-sum equivalence and convolution closure of heavy-tailed distributions....
The main result o f this dissertation concerns the asymptotics, uniform in t and x, of the probabili...
We obtain a new fluctuation identity for a general Lévy process giving a quintuple law describing th...
This paper addresses heavy-tailed large-deviation estimates for the distribution tail of functionals...
Consider compound Poisson processes with negative drift and no negative jumps, which converge to som...
International audienceConsider compound Poisson processes with negative drift and no negative jumps,...
Abstract Consider compound Poisson processes with negative drift and no negative jumps, which conver...
Distributional identities for a Lévy process Xt , its quadratic variation process Vt and its maximal...
Compound Poisson processes are the textbook example of pure jump stochastic processes and the buildi...
This paper considers the so-called M/G/∞ model: jobs arrive according to a Poisson process with rate...
This paper considers the so-called M/G/infinity model: jobs arrive according to a Poisson process wi...
In this paper, we discuss max-sum equivalence and convolution closure of heavy-tailed distributions....
The main result o f this dissertation concerns the asymptotics, uniform in t and x, of the probabili...
We obtain a new fluctuation identity for a general Lévy process giving a quintuple law describing th...
This paper addresses heavy-tailed large-deviation estimates for the distribution tail of functionals...
Consider compound Poisson processes with negative drift and no negative jumps, which converge to som...
International audienceConsider compound Poisson processes with negative drift and no negative jumps,...
Abstract Consider compound Poisson processes with negative drift and no negative jumps, which conver...
Distributional identities for a Lévy process Xt , its quadratic variation process Vt and its maximal...
Compound Poisson processes are the textbook example of pure jump stochastic processes and the buildi...
This paper considers the so-called M/G/∞ model: jobs arrive according to a Poisson process with rate...
This paper considers the so-called M/G/infinity model: jobs arrive according to a Poisson process wi...
In this paper, we discuss max-sum equivalence and convolution closure of heavy-tailed distributions....
The main result o f this dissertation concerns the asymptotics, uniform in t and x, of the probabili...
We obtain a new fluctuation identity for a general Lévy process giving a quintuple law describing th...