Multidimensional Stein's method for asymptotic independence with invariant measures of diffusion
Abstract
We derive a multidimensional Stein's method for asymptotic independence in the case of a general target μ with a density, being invariant measure of a diffusion process. It allows us to give a general bound in Wasserstein distance between the law of a couple (X, Y), where X is a random variable, and Y a random vector and μ Law(Y). We focus in particular in the case where X and Y are differentiable in the Malliavin sense, by being function of a finite number of stochastic Wiener integrals.
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