A concentration-of-measure inequality for multiple-measurement models

Author

Liming Wangy;Jiaji Huang;Xin Yuan;Volkan Cevher;Miguel Rodrigues;Robert Calderban;Lawrence Carin

Author_Institution

Dept. of Electrical &

fYear

2015

fDate

6/1/2015 12:00:00 AM

Firstpage

2341

Lastpage

2345

Abstract

Classical compressive sensing typically assumes a single measurement, and theoretical analysis often relies on corresponding concentration-of-measure results. There are many real-world applications involving multiple compressive measurements, from which the underlying signals may be estimated. In this paper, we establish a new concentration-of-measure inequality for a block-diagonal structured random compressive sensing matrix with Rademacher-ensembles. We discuss applications of this newly-derived inequality to two appealing compressive multiple-measurement models: for Gaussian and Poisson systems. In particular, Johnson-Lindenstrauss-type results and a compressed-domain classification result are derived for a Gaussian multiple-measurement model. We also propose, as another contribution, theoretical performance guarantees for signal recovery for multi-measurement Poisson systems, via the inequality.

Keywords

"Sensors","Linear matrix inequalities","Maximum likelihood estimation","Atmospheric measurements","Particle measurements","Adaptation models","Compressed sensing"

Publisher

ieee

Conference_Titel

Information Theory (ISIT), 2015 IEEE International Symposium on

Electronic_ISBN

2157-8117

Type

conf

DOI

10.1109/ISIT.2015.7282874

Filename

7282874