AbstractIn this paper, we study the fractional smoothness of local times of general processes starting from the occupation time formula, and obtain the quasi-sure existence of local times in the sense of the Malliavin calculus. This general result is then applied to the local times of N-parameter d-dimensional Brownian motions, fractional Brownian motions and the self-intersection local time of the 2-dimensional Brownian motion, as well as smooth semimartingales
AbstractFor a suitable definition of the local time of a random walk strong invariance principles ar...
We consider a Gaussian centered random field that has values in the Euclidean space. We investigate ...
In this dissertation, we investigate some problems in fractional Brownian motion and stochastic part...
AbstractIn this paper, we study the fractional smoothness of local times of general processes starti...
We study the local times of fractional Brownian motions for all temporal dimensions, N, spatial dime...
We study the local times of fractional Brownian motions for all temporal dimensions, N, spatial dime...
We study the existence and regularity of local times for general $d$-dimensional stochastic processe...
In this paper we study the local times of Brownian motion from the point of view of algorithmic rand...
This is the published version, also available here: http://dx.doi.org/10.1214/009117905000000017
In R^d, for any dimension d ≥ 1, expansions of self-intersection local times of fractional Brownian ...
AbstractIn this paper we apply Clark–Ocone formula to deduce an explicit integral representation for...
Accepté conditionnellement par Stochastic processes and their applicationsInternational audienceThro...
AbstractWe show how to renormalize the intersection local time of fractional Brownian motion of inde...
Let BH and be two independent d-dimensional fractional Brownian motions with Hurst parameter H[set m...
AbstractLet Xt=∫0tusdWs be the indefinite Skorohod integral on Wiener space (Ω,H,P), and let Lt(x) b...
AbstractFor a suitable definition of the local time of a random walk strong invariance principles ar...
We consider a Gaussian centered random field that has values in the Euclidean space. We investigate ...
In this dissertation, we investigate some problems in fractional Brownian motion and stochastic part...
AbstractIn this paper, we study the fractional smoothness of local times of general processes starti...
We study the local times of fractional Brownian motions for all temporal dimensions, N, spatial dime...
We study the local times of fractional Brownian motions for all temporal dimensions, N, spatial dime...
We study the existence and regularity of local times for general $d$-dimensional stochastic processe...
In this paper we study the local times of Brownian motion from the point of view of algorithmic rand...
This is the published version, also available here: http://dx.doi.org/10.1214/009117905000000017
In R^d, for any dimension d ≥ 1, expansions of self-intersection local times of fractional Brownian ...
AbstractIn this paper we apply Clark–Ocone formula to deduce an explicit integral representation for...
Accepté conditionnellement par Stochastic processes and their applicationsInternational audienceThro...
AbstractWe show how to renormalize the intersection local time of fractional Brownian motion of inde...
Let BH and be two independent d-dimensional fractional Brownian motions with Hurst parameter H[set m...
AbstractLet Xt=∫0tusdWs be the indefinite Skorohod integral on Wiener space (Ω,H,P), and let Lt(x) b...
AbstractFor a suitable definition of the local time of a random walk strong invariance principles ar...
We consider a Gaussian centered random field that has values in the Euclidean space. We investigate ...
In this dissertation, we investigate some problems in fractional Brownian motion and stochastic part...