English

Concentration inequalities for bounded functionals via generalized log-Sobolev inequalities

Probability 2020-06-16 v5

Abstract

In this paper we prove multilevel concentration inequalities for bounded functionals f=f(X1,,Xn)f = f(X_1, \ldots, X_n) of random variables X1,,XnX_1, \ldots, X_n that are either independent or satisfy certain logarithmic Sobolev inequalities. The constants in the tail estimates depend on the operator norms of kk-tensors of higher order differences of ff. We provide applications in both dependent and independent random variables. This includes deviation inequalities for empirical processes f(X)=supgFg(X)f(X) = \sup_{g \in \mathcal{F}} \lvert g(X) \rvert and suprema of homogeneous chaos in bounded random variables in the Banach space case given by f(X)=supti1idti1idXi1XidBf(X) = \sup_{t} \lVert \sum_{i_1 \neq \ldots \neq i_d} t_{i_1 \ldots i_d} X_{i_1} \cdots X_{i_d}\rVert_{\mathcal{B}}. The latter application is comparable to earlier results of Boucheron-Bousquet-Lugosi-Massart and provides the upper tail bounds of Talagrand. In the case of Rademacher random variables, we give an interpretation of the results in terms of quantities familiar in Boolean analysis. Further applications are concentration inequalities for UU-statistics with bounded kernels hh and for the number of triangles in an exponential random graph model.

Keywords

Cite

@article{arxiv.1812.01092,
  title  = {Concentration inequalities for bounded functionals via generalized log-Sobolev inequalities},
  author = {Friedrich Götze and Holger Sambale and Arthur Sinulis},
  journal= {arXiv preprint arXiv:1812.01092},
  year   = {2020}
}

Comments

changed in v5: final version (restructured the article and several minor revisions; version accepted for publication at Journal of Theoretical Probability)

R2 v1 2026-06-23T06:30:12.328Z