Advanced Search
Home > Journals > Ann. Probab. > Volume 41 > Issue 6 > Article
Open Access
November 2013 Noncommutative Bennett and Rosenthal inequalities
Marius Junge, Qiang Zeng
Ann. Probab. 41(6): 4287-4316 (November 2013). DOI: 10.1214/12-AOP771

Abstract

In this paper we extend the Bernstein, Prohorov and Bennett inequalities to the noncommutative setting. In addition we provide an improved version of the noncommutative Rosenthal inequality, essentially due to Nagaev, Pinelis and Pinelis, Utev for commutative random variables. We also present new best constants in Rosenthal’s inequality. Applying these results to random Fourier projections, we recover and elaborate on fundamental results from compressed sensing, due to Candes, Romberg and Tao.

Citation

Download Citation

Marius Junge. Qiang Zeng. "Noncommutative Bennett and Rosenthal inequalities." Ann. Probab. 41 (6) 4287 - 4316, November 2013. https://doi.org/10.1214/12-AOP771

Information

Published: November 2013
First available in Project Euclid: 20 November 2013

zbMATH: 1290.46056
MathSciNet: MR3161475
Digital Object Identifier: 10.1214/12-AOP771

Subjects:
Primary: 46L53 , 60E15
Secondary: 46L52 , 60F10 , 94A12

Keywords: (Noncommutative) Bennett inequality , (noncommutative) Bernstein inequality , (noncommutative) Prohorov inequality , (noncommutative) Rosenthal inequality , compressed sensing , Cramér’s theorem , large deviation , noncommutative $L_{p}$ spaces

Rights: Copyright © 2013 Institute of Mathematical Statistics

JOURNAL ARTICLE
 30 PAGES
DOWNLOAD PDF + SAVE TO MY LIBRARY
GET CITATION
< Previous Article
|
Next Article >
Vol.41 • No. 6 • November 2013
Institute of Mathematical Statistics
Subscribe to Project Euclid
Receive erratum alerts for this article
Back to Top