On the convergence to the multiple Wiener-Ito integral

Abstract

We 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 C0([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∈ L2([0,T]n). We prove also the weak convergence in the space C0([0,T]) to the second order integral for two important families of processes that converge to a standard Brownian motion.