Reconstruction of Sparse Signals From <formula formulatype="inline"> <tex Notation="TeX">$\ell_1$</tex></formula> Dimensionality-Reduced Cauchy Random Projections

“…A modified version, that accelerates the reconstruction of sparse signals by determining which coordinates are allowed to be estimated at each iteration, was proposed in [83].…”

“…Carrillo et al propose reconstruction approaches based on the Lorentzian norm as the data fidelity term [41,42]. In addition, Ramirez et al develop an iterative algorithm to solve a Lorentzian 0 -regularized cost function using iterative weighted myriad filters [43]. A similar approach is used in [44] by solving an 0 -regularized least absolute deviation (LAD) regression problem yielding an iterative weighted median algorithm.…”

Robust compressive sensing of sparse signals: a review

“…A modified version, that accelerates the reconstruction of sparse signals by determining which coordinates are allowed to be estimated at each iteration, was proposed in [83].…”

“…Carrillo et al propose reconstruction approaches based on the Lorentzian norm as the data fidelity term [41,42]. In addition, Ramirez et al develop an iterative algorithm to solve a Lorentzian 0 -regularized cost function using iterative weighted myriad filters [43]. A similar approach is used in [44] by solving an 0 -regularized least absolute deviation (LAD) regression problem yielding an iterative weighted median algorithm.…”

Robust compressive sensing of sparse signals: a review

“…However, Ramirez et al, proposed in [14] a distancepreserving condition between the geometric mean of the projections in the dimensionality reduced space, and the 1 norm of the original high-dimensional space satisfied by Cauchy random matrices. More precisely, the definition of the distance preservation condition for Cauchy random matrices is as follows.…”

“…The · 0 -norm encourages sparsity in the solution and the Lorentzian norm is chosen in robust linear regression problems because it has optimality properties for Cauchy distributed samples [3,4]. The algorithm used to solve the problem in (4) is based on a coordinate-descent method, where at each iteration all the entries of the sparse vector are held constant except one, which is allowed to vary, and is estimated by a weighted myriad operator [14].…”

“…Carrillo et al, propose reconstruction approaches based on the Lorentzian norm as data fidelity term [12,13]. In addition, Ramirez et al, develop an iterative algorithm to solve a Lorentzian 0 -regularized cost function using iterative weighted myriad filters [14]. A similar approach is used in [15] by solving an 0 -regularized least absolute deviation regression problem yielding an iterative weighted median algorithm.…”

An overview of robust compressive sensing of sparse signals in impulsive noise

Random Projection