English

Comparison inequalities on Wiener space

Probability 2013-06-12 v1

Abstract

We define a covariance-type operator on Wiener space: for F and G two random variables in the Gross-Sobolev space D1,2D^{1,2} of random variables with a square-integrable Malliavin derivative, we let GammaF,G=Gamma_{F,G}= where DD is the Malliavin derivative operator and L1L^{-1} is the pseudo-inverse of the generator of the Ornstein-Uhlenbeck semigroup. We use Γ\Gamma to extend the notion of covariance and canonical metric for vectors and random fields on Wiener space, and prove corresponding non-Gaussian comparison inequalities on Wiener space, which extend the Sudakov-Fernique result on comparison of expected suprema of Gaussian fields, and the Slepian inequality for functionals of Gaussian vectors. These results are proved using a so-called smart-path method on Wiener space, and are illustrated via various examples. We also illustrate the use of the same method by proving a Sherrington-Kirkpatrick universality result for spin systems in correlated and non-stationary non-Gaussian random media.

Keywords

Cite

@article{arxiv.1306.2430,
  title  = {Comparison inequalities on Wiener space},
  author = {Ivan Nourdin and Giovanni Peccati and Frederi Viens},
  journal= {arXiv preprint arXiv:1306.2430},
  year   = {2013}
}

Comments

16 pages

R2 v1 2026-06-22T00:31:49.902Z