Lectures on Gaussian approximations with Malliavin calculus

profil-zyak-2012 - Ivan Nourdin

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72 pages

English

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Niveau: Supérieur, Doctorat, Bac+8
Lectures on Gaussian approximations with Malliavin calculus Ivan Nourdin Université de Lorraine, Institut de Mathématiques Élie Cartan B.P. 70239, 54506 Vandoeuvre-lès-Nancy Cedex, France March 20th, 2012 Overview. In a seminal paper of 2005, Nualart and Peccati [37] discovered a surprising central limit theorem (called the Fourth Moment Theorem in the sequel) for sequences of multiple stochastic integrals of a xed order: in this context, convergence in distribution to the standard normal law is equivalent to convergence of just the fourth moment. Shortly afterwards, Peccati and Tudor [44] gave a multidimensional version of this characterization. Since the publication of these two beautiful papers, many improvements and developments on this theme have been considered. Among them is the work by Nualart and Ortiz-Latorre [36], giving a new proof only based on Malliavin calculus and the use of integration by parts on Wiener space. A second step is my joint paper [25] (written in collaboration with Peccati) in which, by bringing together Stein's method with Malliavin calculus, we have been able (among other things) to associate quantitative bounds to the Fourth Moment Theorem. It turns out that Stein's method and Malliavin calculus t together admirably well. Their interaction has led to some remarkable new results involving central and non-central limit theorems for functionals of innite-dimensional Gaussian elds.

hermite polynomials

gaussian limit

hq has

central limit

function ? ?

centered random

fondation des sciences mathématiques

Sujets

Nur al-Din

Cartan

Université de Lorraine

Hermite polynomials

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Publié par	profil-zyak-2012
Nombre de lectures	18
Langue	English

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