English

Hypercontractivity and Lower Deviation Estimates in Normed Spaces

Functional Analysis 2021-07-29 v2 Metric Geometry Probability

Abstract

We consider the problem of estimating small ball probabilities P{f(G)δEf(G)}\mathbb P\{f(G) \leqslant \delta \mathbb Ef(G)\} for sub-additive,positively homogeneous functions ff with respect to the Gaussian measure. We establish estimates that depend on global parameters of the underlying function which take into account analytic and statistical measures, such as the variance and the L1L^1-norms of its partial derivatives. This leads to dimension-dependent bounds for small ball and lower small deviation estimates for seminorms when the linear structure is appropriately chosen to optimize the aforementioned parameters. Our bounds are best possible up to numerical constants. In all regimes, G=maxingi\|G\|_\infty = \max_{ i \leqslant n}|g_i| arises as an extremal case in this study. The proofs exploit the convexity and hypercontractivity properties of the Gaussian measure.

Keywords

Cite

@article{arxiv.1906.03208,
  title  = {Hypercontractivity and Lower Deviation Estimates in Normed Spaces},
  author = {Grigoris Paouris and Konstantin Tikhomirov and Petros Valettas},
  journal= {arXiv preprint arXiv:1906.03208},
  year   = {2021}
}

Comments

39 pages; referee's comments incorporated; to appear in Ann. Prob

R2 v1 2026-06-23T09:47:15.537Z