We study sequences of empirical measures of Euler schemes associated to some non-Markovian SDEs: SDEs driven by Gaussian processes with stationary increments. We obtain the functional convergence of this sequence to a stationary solution to the SDE. Then, we end the paper by some specific properties of this stationary solution. We show that, in contrast to Markovian SDEs, its initial random value and the driving Gaussian process are always dependent. However, under an integral representation assumption, we also obtain that the past of the solution is independent to the future of the underlying innovation process of the Gaussian driving process
There is a lack of appropriate replication of the asymptotical behaviour of stationary stochastic di...
AbstractThe Euler scheme is a well-known method of approximation of solutions of stochastic differen...
The main aim of this thesis is to build and to study some procedures in view to the simulation of th...
AbstractWe study sequences of empirical measures of Euler schemes associated to some non-Markovian S...
International audienceIn a previous paper, we studied the ergodic properties of an Euler scheme of a...
This thesis investigates the possibility of approximating stationary solutions of stochastic differe...
There is a lack of appropriate replication of the asymptotical behaviour of stationary stochastic di...
AbstractIn principle, once the existence of the stationary distribution of a stochastic differential...
33 pagesInternational audienceWe extend to Lipschitz continuous functionals either of the true paths...
This paper studies the rate of convergence of the weak Euler approximation for solutions to Lévy-dri...
Under a one-sided dissipative Lipschitz condition on its drift, a stochastic evolution equation with...
The convergence to the stationary regime is studied for Stochastic Differential Equations driven by ...
A commonly used approach to analyzing stochastic differential equations (SDEs) relies on performing ...
International audienceWe build a sequence of empirical measures on the space D(R_+,R^d) of R^d-value...
AbstractWe prove that, under appropriate conditions, the sequence of approximate solutions construct...
There is a lack of appropriate replication of the asymptotical behaviour of stationary stochastic di...
AbstractThe Euler scheme is a well-known method of approximation of solutions of stochastic differen...
The main aim of this thesis is to build and to study some procedures in view to the simulation of th...
AbstractWe study sequences of empirical measures of Euler schemes associated to some non-Markovian S...
International audienceIn a previous paper, we studied the ergodic properties of an Euler scheme of a...
This thesis investigates the possibility of approximating stationary solutions of stochastic differe...
There is a lack of appropriate replication of the asymptotical behaviour of stationary stochastic di...
AbstractIn principle, once the existence of the stationary distribution of a stochastic differential...
33 pagesInternational audienceWe extend to Lipschitz continuous functionals either of the true paths...
This paper studies the rate of convergence of the weak Euler approximation for solutions to Lévy-dri...
Under a one-sided dissipative Lipschitz condition on its drift, a stochastic evolution equation with...
The convergence to the stationary regime is studied for Stochastic Differential Equations driven by ...
A commonly used approach to analyzing stochastic differential equations (SDEs) relies on performing ...
International audienceWe build a sequence of empirical measures on the space D(R_+,R^d) of R^d-value...
AbstractWe prove that, under appropriate conditions, the sequence of approximate solutions construct...
There is a lack of appropriate replication of the asymptotical behaviour of stationary stochastic di...
AbstractThe Euler scheme is a well-known method of approximation of solutions of stochastic differen...
The main aim of this thesis is to build and to study some procedures in view to the simulation of th...