Abstract—Compressed sensing deals with efficient recovery of analog signals from linear encodings. This paper presents a statistical study of compressed sensing by modeling the input signal as an i.i.d. random process. Three classes of encoders are considered, namely, optimal nonlinear, optimal linear and random linear encoders. Focusing on optimal decoders, we investigate the fundamental tradeoff between measurement rate and reconstruction fidelity gauged by the noise sensitivity. The optimal phase-transition threshold is determined as a functional of the input distribution and compared to suboptimal thresholds achieved by popular reconstruction algorithms. In particular, we show that Gaussian sensing matrices incur no penalty on the phase...
This paper introduces a simple and very general theory of compressive sensing. In this theory, the s...
A novel framework of compressed sensing, namely statistical compressed sensing (SCS), that aims at e...
The sensitivity of recovery algorithms with respect to a perfect knowledge of the encoding matrix is...
Compressed sensing deals with efficient recovery of analog signals from linear encodings. This paper...
Abstract—Compressed sensing deals with efficient recovery of analog signals from linear encodings. T...
42 pages, 37 figures, 3 appendixesInternational audienceCompressed sensing is a signal processing me...
Abstract—Compressed sensing is designed to measure sparse signals directly in a compressed form. How...
8 pages, 10 figuresInternational audienceCompressed sensing is designed to measure sparse signals di...
Compressed sensing is a signal processing technique to encode analog sources by real numbers rather ...
This paper provides a sharp analysis of the optimally tuned denoising problem and establishes a rela...
Consider the noisy underdetermined system of linear equations: y = Ax0 + z0, with n × N measurement ...
We provide a scheme for exploring the reconstruction limits of compressed sensing by minimizing the ...
AbstractCompressed sensing is a technique to sample compressible signals below the Nyquist rate, whi...
The practice of compressed sensing suffers importantly in terms of the efficiency/accuracy trade-off...
Recently, great strides in sparse approximation theory and its application have been made. Many of t...
This paper introduces a simple and very general theory of compressive sensing. In this theory, the s...
A novel framework of compressed sensing, namely statistical compressed sensing (SCS), that aims at e...
The sensitivity of recovery algorithms with respect to a perfect knowledge of the encoding matrix is...
Compressed sensing deals with efficient recovery of analog signals from linear encodings. This paper...
Abstract—Compressed sensing deals with efficient recovery of analog signals from linear encodings. T...
42 pages, 37 figures, 3 appendixesInternational audienceCompressed sensing is a signal processing me...
Abstract—Compressed sensing is designed to measure sparse signals directly in a compressed form. How...
8 pages, 10 figuresInternational audienceCompressed sensing is designed to measure sparse signals di...
Compressed sensing is a signal processing technique to encode analog sources by real numbers rather ...
This paper provides a sharp analysis of the optimally tuned denoising problem and establishes a rela...
Consider the noisy underdetermined system of linear equations: y = Ax0 + z0, with n × N measurement ...
We provide a scheme for exploring the reconstruction limits of compressed sensing by minimizing the ...
AbstractCompressed sensing is a technique to sample compressible signals below the Nyquist rate, whi...
The practice of compressed sensing suffers importantly in terms of the efficiency/accuracy trade-off...
Recently, great strides in sparse approximation theory and its application have been made. Many of t...
This paper introduces a simple and very general theory of compressive sensing. In this theory, the s...
A novel framework of compressed sensing, namely statistical compressed sensing (SCS), that aims at e...
The sensitivity of recovery algorithms with respect to a perfect knowledge of the encoding matrix is...