A Dynamic Working Set Method for Compressed Sensing

Abstract

We propose a dynamic working set method (DWS) for the problem x ∈ Rn 12\|Ax-b\|2 + η\|x\|1 that arises from compressed sensing. DWS manages the working set while iteratively calling a regression solver to generate progressively better solutions. Our experiments show that DWS is more efficient than other state-of-the-art software in the context of compressed sensing. Scale space such that \|b\|=1. Let s be the number of non-zeros in the unknown signal. We prove that for any given > 0, DWS reaches a solution with an additive error /η2 such that each call of the solver uses only O(1s s 1) variables, and each intermediate solution has O(1s s1) non-zero coordinates.