Various thresholds for 1-optimization in compressed sensing

Abstract

Recently, CRT,DonohoPol theoretically analyzed the success of a polynomial 1-optimization algorithm in solving an under-determined system of linear equations. In a large dimensional and statistical context CRT,DonohoPol proved that if the number of equations (measurements in the compressed sensing terminology) in the system is proportional to the length of the unknown vector then there is a sparsity (number of non-zero elements of the unknown vector) also proportional to the length of the unknown vector such that 1-optimization succeeds in solving the system. In this paper, we provide an alternative performance analysis of 1-optimization and obtain the proportionality constants that in certain cases match or improve on the best currently known ones from DonohoPol,DT.