International audienceWe study the convergence to the multiple Wiener-It\^{o} integral from processes with absolutely continuous paths. More precisely, consider a family of processes, with paths in the Cameron-Martin space, that converges weakly to a standard Brownian motion in $\mathcal C_0([0,T])$. Using these processes, we construct a family that converges weakly, in the sense of the finite dimensional distributions, to the multiple Wiener-It\^{o} integral process of a function $f\in L^2([0,T]^n)$. We prove also the weak convergence in the space $\mathcal C_0([0,T])$ to the second order integral for two important families of processes that converge to a standard Brownian motion
International audienceWe consider the convergence of the approximation schemes related to Itô's inte...
AbstractAssuming that {(Un,Vn)} is a sequence of càdlàg processes converging in distribution to (U,V...
This paper deals with weak convergence of multiple integrals with respect to the empirical process. ...
International audienceWe study the convergence to the multiple Wiener-It\^{o} integral from processe...
AbstractWe study the convergence to the multiple Wiener–Itô integral from processes with absolutely ...
AbstractWe have considered the problem of the weak convergence, as ε tends to zero, of the multiple ...
International audienceWe construct a family $I_{n_{\eps}}(f)_{t}$ of continuous stochastic processes...
AbstractWe construct a family Inε(f)t of continuous stochastic processes that converges in the sense...
The convergence in variation of the laws of multiple Wiener–Ito ̂ integrals with respect to their ke...
Given $\left\{W^{(m)}(t), t \in[0, T]\right\}_{m \geq 1}$, a sequence of approximations to a standar...
We show that the random process $X_{n}=¥{X_{n}(t) : 0¥leqq t¥leqq 1¥}$ defined by $X_{n}(t)=¥Sigma Q...
14 pages. To appear in The Annals of Probability.Fix ν>0, denote by G(v/2) a Gamma random variable w...
This is the published version, also available here: http://dx.doi.org/10.1214/009117904000000621.We ...
In this paper, we show an approximation in law, in the space of the continuous functions on $[0,1]^2...
The thesis deals with the probabilistic approximation in a fractional context, which means in models...
International audienceWe consider the convergence of the approximation schemes related to Itô's inte...
AbstractAssuming that {(Un,Vn)} is a sequence of càdlàg processes converging in distribution to (U,V...
This paper deals with weak convergence of multiple integrals with respect to the empirical process. ...
International audienceWe study the convergence to the multiple Wiener-It\^{o} integral from processe...
AbstractWe study the convergence to the multiple Wiener–Itô integral from processes with absolutely ...
AbstractWe have considered the problem of the weak convergence, as ε tends to zero, of the multiple ...
International audienceWe construct a family $I_{n_{\eps}}(f)_{t}$ of continuous stochastic processes...
AbstractWe construct a family Inε(f)t of continuous stochastic processes that converges in the sense...
The convergence in variation of the laws of multiple Wiener–Ito ̂ integrals with respect to their ke...
Given $\left\{W^{(m)}(t), t \in[0, T]\right\}_{m \geq 1}$, a sequence of approximations to a standar...
We show that the random process $X_{n}=¥{X_{n}(t) : 0¥leqq t¥leqq 1¥}$ defined by $X_{n}(t)=¥Sigma Q...
14 pages. To appear in The Annals of Probability.Fix ν>0, denote by G(v/2) a Gamma random variable w...
This is the published version, also available here: http://dx.doi.org/10.1214/009117904000000621.We ...
In this paper, we show an approximation in law, in the space of the continuous functions on $[0,1]^2...
The thesis deals with the probabilistic approximation in a fractional context, which means in models...
International audienceWe consider the convergence of the approximation schemes related to Itô's inte...
AbstractAssuming that {(Un,Vn)} is a sequence of càdlàg processes converging in distribution to (U,V...
This paper deals with weak convergence of multiple integrals with respect to the empirical process. ...