Add to ORKGThe aim of this paper is to present a result of discrete approximation of some class of stable self-similar stationary increments processes. The properties of such processes were intensively investigated, but little is known about the context in which such processes can arise. To our knowledge, discretization and con-vergence theorems are available only in the case of stable Lévy motions and fractional Brownian motions. This paper yields new results in this direction. Our main result is the convergence of the random rewards schema first introduced by Cohen and Samorodnitsky, which we consider in a more general setting. Strong relationships with Kesten and Spitzer’s random walk in random sceneries are evidenced. Finally, we study some path p...
AbstractIn this note we settle a question posed by Kasahara, Maejima, and Vervaat. We show that the ...
AbstractWe study a non-Gaussian and non-stable process arising as the limit of sums of rescaled rene...
International audienceIt is classical to approximate the distribution of fractional Brownian motion ...
31 pagesInternational audienceThe aim of this paper is to present a result of discrete approximation...
31 pagesInternational audienceThe aim of this paper is to present a result of discrete approximation...
We generalize the BM-local time fractional symmetric a-stable motion introduced by Cohen and Samorod...
Given a random walk (Sn)n∈Z defined for a doubly infinite sequence of times, we let the time paramet...
Non-Gaussian stable stochastic models have attracted growing interest in recent years, due to their ...
We generalize the BM-local time fractional symmetric a-stable motion introduced by Cohen and Samorod...
We generalize the BM-local time fractional symmetric a-stable motion introduced by Cohen and Samorod...
This thesis investigates ruin probabilities and first passage times for self-similar processes. We p...
This thesis investigates ruin probabilities and first passage times for self-similar processes. We p...
Non-Gaussian stable stochastic models have attracted growing interest in recent years, due to their ...
International audienceIt is classical to approximate the distribution of fractional Brownian motion ...
Non-Gaussian stable stochastic models have attracted growing interest in recent years, due to their ...
AbstractIn this note we settle a question posed by Kasahara, Maejima, and Vervaat. We show that the ...
AbstractWe study a non-Gaussian and non-stable process arising as the limit of sums of rescaled rene...
International audienceIt is classical to approximate the distribution of fractional Brownian motion ...
31 pagesInternational audienceThe aim of this paper is to present a result of discrete approximation...
31 pagesInternational audienceThe aim of this paper is to present a result of discrete approximation...
We generalize the BM-local time fractional symmetric a-stable motion introduced by Cohen and Samorod...
Given a random walk (Sn)n∈Z defined for a doubly infinite sequence of times, we let the time paramet...
Non-Gaussian stable stochastic models have attracted growing interest in recent years, due to their ...
We generalize the BM-local time fractional symmetric a-stable motion introduced by Cohen and Samorod...
We generalize the BM-local time fractional symmetric a-stable motion introduced by Cohen and Samorod...
This thesis investigates ruin probabilities and first passage times for self-similar processes. We p...
This thesis investigates ruin probabilities and first passage times for self-similar processes. We p...
Non-Gaussian stable stochastic models have attracted growing interest in recent years, due to their ...
International audienceIt is classical to approximate the distribution of fractional Brownian motion ...
Non-Gaussian stable stochastic models have attracted growing interest in recent years, due to their ...
AbstractIn this note we settle a question posed by Kasahara, Maejima, and Vervaat. We show that the ...
AbstractWe study a non-Gaussian and non-stable process arising as the limit of sums of rescaled rene...
International audienceIt is classical to approximate the distribution of fractional Brownian motion ...