Almost Optimal Phaseless Compressed Sensing with Sublinear Decoding Time

Abstract

In the problem of compressive phase retrieval, one wants to recover an approximately k-sparse signal x ∈ Cn, given the magnitudes of the entries of x, where ∈ Cm × n. This problem has received a fair amount of attention, with sublinear time algorithms appearing in cai2014super,pedarsani2014phasecode,yin2015fast. In this paper we further investigate the direction of sublinear decoding for real signals by giving a recovery scheme under the 2 / 2 guarantee, with almost optimal, (k n ), number of measurements. Our result outperforms all previous sublinear-time algorithms in the case of real signals. Moreover, we give a very simple deterministic scheme that recovers all k-sparse vectors in (k3) time, using 4k-1 measurements.