CONCENTRATION INEQUALITIES FOR LOG-CONCAVE DISTRIBUTIONS WITH APPLICATIONS TO RANDOM SURFACE FLUCTUATIONS
成果类型:
Article
署名作者:
Magazinov, Alexander; Peled, Ron
署名单位:
Tel Aviv University
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/21-AOP1545
发表日期:
2022
页码:
735-770
关键词:
scaling limit
isoperimetric inequality
brunn-minkowski
brascamp-lieb
perturbations
percolation
symmetry
摘要:
We derive two concentration inequalities for linear functions of log-concave distributions: an enhanced version of the classical Brascamp-Lieb concentration inequality and an inequality quantifying log-concavity of marginals in a manner suitable for obtaining variance and tail probability bounds. These inequalities are applied to the statistical mechanics problem of estimating the fluctuations of random surfaces of the del phi type. The classical Brascamp-Lieb inequality bounds the fluctuations whenever the interaction potential is uniformly convex. We extend these bounds to the case of convex potentials whose second derivative vanishes only on a zero measure set, when the underlying graph is a d-dimensional discrete torus. The result applies, in particular, to potentials of the form U (x) = vertical bar x vertical bar(p) with p > 1 and answers a question discussed by Brascamp-Lieb-Lebowitz (In Statistical Mechanics (1975) 379-390, Springer). Additionally, new tail probability bounds are obtained for the family of potentials U (x) = vertical bar x vertical bar(p) + x(2), p > 2. This result answers a question mentioned by Deuschel and Giacomin.