Towards a better compressed sensing

Abstract

In this paper we look at a well known linear inverse problem that is one of the mathematical cornerstones of the compressed sensing field. In seminal works CRT,DOnoho06CS 1 optimization and its success when used for recovering sparse solutions of linear inverse problems was considered. Moreover, CRT,DOnoho06CS established for the first time in a statistical context that an unknown vector of linear sparsity can be recovered as a known existing solution of an under-determined linear system through 1 optimization. In DonohoPol,DonohoUnsigned (and later in StojnicCSetam09,StojnicUpper10) the precise values of the linear proportionality were established as well. While the typical 1 optimization behavior has been essentially settled through the work of DonohoPol,DonohoUnsigned,StojnicCSetam09,StojnicUpper10, we in this paper look at possible upgrades of 1 optimization. Namely, we look at a couple of algorithms that turn out to be capable of recovering a substantially higher sparsity than the 1. However, these algorithms assume a bit of "feedback" to be able to work at full strength. This in turn then translates the original problem of improving upon 1 to designing algorithms that would be able to provide output needed to feed the 1 upgrades considered in this papers.