Abstract—Sparse signals whose nonzeros obey a tree-like structure occur in a range of applications such as image modeling, genetic data analysis, and compressive sensing. An important problem encountered in recovering signals is that of optimal tree-projection, i.e., finding the closest tree-sparse signal for a given query signal. However, this problem can be computationally very demanding: for optimally projecting a length-n signal onto a tree with sparsity k, the best existing algorithms incur a high runtime of O(nk). This can often be impractical. We suggest an alternative approach to tree-sparse recovery. Our approach is based on a specific approximation algorithm for tree-projection and provably has a near-linear runtime of O(n log(kr)...
We propose a new algorithm to recover a sparse signal from a system of linear measurements. By proje...
It is now well understood that (1) it is possible to reconstruct sparse signals exactly from what ap...
Compressive sensing accurately reconstructs a signal that is sparse in some basis from measurements,...
Abstract—Recent breakthrough results in compressive sensing (CS) have established that many high dim...
As shown by Blumensath and Davies (2009) and Baraniuk et al. (2010), signals whose wavelet coefficie...
In this paper, we introduce a new sparse signal recovery algorithm referred to as the matching pursu...
Recent studies in linear inverse problems have recognized the sparse representation of unknown signa...
Recently, greedy algorithm has received much attention as a cost-effective means to reconstruct the ...
Compressive sensing is a method for recording a k-sparse signal x ∈ ℝ[superscript n] with (possibly ...
The goal of sparse recovery is to recover a k-sparse signal x ∈ Rn from (possibly noisy) linear meas...
This paper proposes a best basis extension of compressed sensing recovery. Instead of regularizing t...
In real-world applications, most of the signals can be approximated by sparse signals. When dealing ...
Compressive sensing (CS) states that a sparse signal can be recovered from a small number of linear ...
Compressed sensing has a wide range of applications that include error correction, imaging,...
We introduce a new signal model, called (K,C)-sparse, to capture K-sparse signals in N dimensions wh...
We propose a new algorithm to recover a sparse signal from a system of linear measurements. By proje...
It is now well understood that (1) it is possible to reconstruct sparse signals exactly from what ap...
Compressive sensing accurately reconstructs a signal that is sparse in some basis from measurements,...
Abstract—Recent breakthrough results in compressive sensing (CS) have established that many high dim...
As shown by Blumensath and Davies (2009) and Baraniuk et al. (2010), signals whose wavelet coefficie...
In this paper, we introduce a new sparse signal recovery algorithm referred to as the matching pursu...
Recent studies in linear inverse problems have recognized the sparse representation of unknown signa...
Recently, greedy algorithm has received much attention as a cost-effective means to reconstruct the ...
Compressive sensing is a method for recording a k-sparse signal x ∈ ℝ[superscript n] with (possibly ...
The goal of sparse recovery is to recover a k-sparse signal x ∈ Rn from (possibly noisy) linear meas...
This paper proposes a best basis extension of compressed sensing recovery. Instead of regularizing t...
In real-world applications, most of the signals can be approximated by sparse signals. When dealing ...
Compressive sensing (CS) states that a sparse signal can be recovered from a small number of linear ...
Compressed sensing has a wide range of applications that include error correction, imaging,...
We introduce a new signal model, called (K,C)-sparse, to capture K-sparse signals in N dimensions wh...
We propose a new algorithm to recover a sparse signal from a system of linear measurements. By proje...
It is now well understood that (1) it is possible to reconstruct sparse signals exactly from what ap...
Compressive sensing accurately reconstructs a signal that is sparse in some basis from measurements,...