Add to ORKGAbstract. We apply dynamical ideas within probability theory, proving an almost-sure invariance principle in log density for stable processes. The familiar scaling property (self-similarity) of the stable process has a stronger expression, that the scaling flow on Skorokhod path space is a Bernoulli flow. We prove that typical paths of a random walk with iid increments in the domain of attraction of a stable law can be paired with paths of a stable process so that, after applying a non-random regularly varying time change to the walk, the two paths are forward asymptotic in the flow except for a set of times of density zero. This implies that a.e. time-changed random walk path is a generic point for the flow, i.e. it gives all the expected ...
This book provides a self-contained presentation on the structure of a large class of stable process...
Among Markovian processes, the hallmark of Levy flights is superdiffusion, or faster-than-Brownian d...
International audienceWe describe the scaling limits of the persistent random walks (PRWs) for which...
International audienceWe apply dynamical ideas within probability theory, proving an almost-sure inv...
International audienceWe prove an almost sure invariance principle in log density for renewal proces...
International audienceWe prove a log average almost-sure invariance principle (abbreviated log asip)...
Abstract. We prove a log average almost-sure invariance principle (log asip) for renewal processes w...
this paper we consider the stability/approximation properties of certain Markov Processes in the lig...
We prove a law of the iterated logarithm for stable processes in a random scenery. The proof relies ...
Abstract. Let fSng be a random walk in the domain of attraction of a stable law Y, i.e. there exists...
Given a random walk (Sn)n∈Z defined for a doubly infinite sequence of times, we let the time paramet...
Lévy processes are the natural continuous-time analogue of random walks and form a rich class of sto...
We study the asymptotic behaviour of some stochastic processes whose dynamics depends not only on po...
We prove that when a sequence of Lévy processes X(n) or a normed sequence of random walks S(n) conve...
AbstractExtending a path decomposition which is known to hold both for Brownian motion and random wa...
This book provides a self-contained presentation on the structure of a large class of stable process...
Among Markovian processes, the hallmark of Levy flights is superdiffusion, or faster-than-Brownian d...
International audienceWe describe the scaling limits of the persistent random walks (PRWs) for which...
International audienceWe apply dynamical ideas within probability theory, proving an almost-sure inv...
International audienceWe prove an almost sure invariance principle in log density for renewal proces...
International audienceWe prove a log average almost-sure invariance principle (abbreviated log asip)...
Abstract. We prove a log average almost-sure invariance principle (log asip) for renewal processes w...
this paper we consider the stability/approximation properties of certain Markov Processes in the lig...
We prove a law of the iterated logarithm for stable processes in a random scenery. The proof relies ...
Abstract. Let fSng be a random walk in the domain of attraction of a stable law Y, i.e. there exists...
Given a random walk (Sn)n∈Z defined for a doubly infinite sequence of times, we let the time paramet...
Lévy processes are the natural continuous-time analogue of random walks and form a rich class of sto...
We study the asymptotic behaviour of some stochastic processes whose dynamics depends not only on po...
We prove that when a sequence of Lévy processes X(n) or a normed sequence of random walks S(n) conve...
AbstractExtending a path decomposition which is known to hold both for Brownian motion and random wa...
This book provides a self-contained presentation on the structure of a large class of stable process...
Among Markovian processes, the hallmark of Levy flights is superdiffusion, or faster-than-Brownian d...
International audienceWe describe the scaling limits of the persistent random walks (PRWs) for which...