Subgaussian 1-cocycles on discrete groups
Probability
2017-05-17 v3 Group Theory
Operator Algebras
Abstract
We prove the Poincar\'e inequalities with constant for -cocycles on countable discrete groups under Bakry--Emery's -criterion. These inequalities determine an analogue of subgaussian behavior for 1-cocycles. Our theorem improves some of our previous results in this direction, and in particular implies Efraim and Lust-Piquard's Poincar\'e type inequalities for the Walsh system. The key new ingredient in our proof is a decoupling argument. As complementary results, we also show that the spectral gap inequality implies the Poincar\'e inequalities with constant under some conditions in the noncommutative setting. New examples which satisfy the -criterion are provided as well.
Keywords
Cite
@article{arxiv.1311.5098,
title = {Subgaussian 1-cocycles on discrete groups},
author = {Marius Junge and Qiang Zeng},
journal= {arXiv preprint arXiv:1311.5098},
year = {2017}
}
Comments
29 pages