This work focuses on the asymptotic behavior of the density in small time of a stochastic differential equation driven by an α-stable process with index α ∈ (0, 2). We assume that the process depends on a parameter β = (θ, σ) T and we study the sensitivity of the density with respect to this parameter. This extends the results of [5] which was restricted to the index α ∈ (1, 2) and considered only the sensitivity with respect to the drift coefficient. By using Malliavin calculus, we obtain the representation of the density and its derivative as an expectation and a conditional expectation. This permits to analyze the asymptotic behavior in small time of the density, using the time rescaling property of the stable process. MSC2010: 60G51; 60...
This work focuses on the local asymptotic mixed normality (LAMN) property from high frequency observ...
Let X=(Xt)t>=0 be a Lévy process with absolutely continuous Lévy measure [nu]. Small-time expansions...
We consider a family of stochastic differential equations with a drift depending on the past history...
This work focuses on the asymptotic behavior of the density in small time of a stochastic differenti...
This work focuses on the asymptotic behavior of the density in small time of a stochastic differenti...
International audienceThis work focuses on the asymptotic behavior of the density in small time of a...
In this thesis, we consider a stochastic differential equation driven by a truncated pure jump Lévy...
We study asymptotic properties of Levy flows, changing scales of the space and the time. Let $ξ_t(x)...
The goal of this paper is to show that under some assumptions, for a d-dimensional fractional Browni...
We consider a process Yt which is the solution of a stochastic dif-ferential equation driven by a Le...
International audienceWe prove the Local Asymptotic Mixed Normality property from high frequency obs...
AbstractThe goal of this paper is to show that under some assumptions, for a d-dimensional fractiona...
AbstractWe consider a process Yt which is the solution of a stochastic differential equation driven ...
We consider the asymptotic behaviour of the transition density for processes of jump type as the tim...
We study the existence and properties of the density for the law of the solution to a nonlinear hype...
This work focuses on the local asymptotic mixed normality (LAMN) property from high frequency observ...
Let X=(Xt)t>=0 be a Lévy process with absolutely continuous Lévy measure [nu]. Small-time expansions...
We consider a family of stochastic differential equations with a drift depending on the past history...
This work focuses on the asymptotic behavior of the density in small time of a stochastic differenti...
This work focuses on the asymptotic behavior of the density in small time of a stochastic differenti...
International audienceThis work focuses on the asymptotic behavior of the density in small time of a...
In this thesis, we consider a stochastic differential equation driven by a truncated pure jump Lévy...
We study asymptotic properties of Levy flows, changing scales of the space and the time. Let $ξ_t(x)...
The goal of this paper is to show that under some assumptions, for a d-dimensional fractional Browni...
We consider a process Yt which is the solution of a stochastic dif-ferential equation driven by a Le...
International audienceWe prove the Local Asymptotic Mixed Normality property from high frequency obs...
AbstractThe goal of this paper is to show that under some assumptions, for a d-dimensional fractiona...
AbstractWe consider a process Yt which is the solution of a stochastic differential equation driven ...
We consider the asymptotic behaviour of the transition density for processes of jump type as the tim...
We study the existence and properties of the density for the law of the solution to a nonlinear hype...
This work focuses on the local asymptotic mixed normality (LAMN) property from high frequency observ...
Let X=(Xt)t>=0 be a Lévy process with absolutely continuous Lévy measure [nu]. Small-time expansions...
We consider a family of stochastic differential equations with a drift depending on the past history...