AbstractRecently, a new approach in the fine analysis of sample paths of stochastic processes has been developed to predict the evolution of the local regularity under (pseudo-)differential operators. In this paper, we study the sample paths of continuous martingales and stochastic integrals. We proved that the almost sure 2-microlocal frontier of a martingale can be obtained through the local regularity of its quadratic variation. It allows to link the Hölder regularity of a stochastic integral to the regularity of the integrand and integrator processes. These results provide a methodology to predict the local regularity of diffusions from the fine analysis of its coefficients. We illustrate our work with examples of martingales with unusu...
In this thesis, local regularity properties of some multiparameter, set-indexed and eventually L2-in...
AbstractLet {Xt} be a continuous square integrable martingale. Denote its increasing (natural) proce...
AbstractThis paper is devoted to analyzing several properties of the bifractional Brownian motion in...
AbstractRecently, a new approach in the fine analysis of sample paths of stochastic processes has be...
40 pages, 3 figuresInternational audienceRecently, a new approach in the fine analysis of stochastic...
Abstract: Recently, a new approach in the fine analysis of stochastic processes sample paths has bee...
AbstractA lot is known about the Hölder regularity of stochastic processes, in particular in the cas...
International audienceA lot is known about the Hölder regularity of stochastic processes, in particu...
Abstract. A lot is known about the Hölder regularity of stochastic processes, in particular in the ...
Les travaux présentés dans cette thèse s'intéressent à la géométrie fractale de processus stochastiq...
The work presented in this thesis concerns the study of the fractal geometry of stochastic processes...
We study the existence and regularity of local times for general $d$-dimensional stochastic processe...
In this thesis, we study the strict local martingale property of solutions of various types of stoch...
It is often important, in applications of stochastic calculus to financial modelling, to know whethe...
This note studies the martingale property of a nonnegative, continuous local martingale Z, given as ...
In this thesis, local regularity properties of some multiparameter, set-indexed and eventually L2-in...
AbstractLet {Xt} be a continuous square integrable martingale. Denote its increasing (natural) proce...
AbstractThis paper is devoted to analyzing several properties of the bifractional Brownian motion in...
AbstractRecently, a new approach in the fine analysis of sample paths of stochastic processes has be...
40 pages, 3 figuresInternational audienceRecently, a new approach in the fine analysis of stochastic...
Abstract: Recently, a new approach in the fine analysis of stochastic processes sample paths has bee...
AbstractA lot is known about the Hölder regularity of stochastic processes, in particular in the cas...
International audienceA lot is known about the Hölder regularity of stochastic processes, in particu...
Abstract. A lot is known about the Hölder regularity of stochastic processes, in particular in the ...
Les travaux présentés dans cette thèse s'intéressent à la géométrie fractale de processus stochastiq...
The work presented in this thesis concerns the study of the fractal geometry of stochastic processes...
We study the existence and regularity of local times for general $d$-dimensional stochastic processe...
In this thesis, we study the strict local martingale property of solutions of various types of stoch...
It is often important, in applications of stochastic calculus to financial modelling, to know whethe...
This note studies the martingale property of a nonnegative, continuous local martingale Z, given as ...
In this thesis, local regularity properties of some multiparameter, set-indexed and eventually L2-in...
AbstractLet {Xt} be a continuous square integrable martingale. Denote its increasing (natural) proce...
AbstractThis paper is devoted to analyzing several properties of the bifractional Brownian motion in...