Sparse phase retrieval via Phaseliftoff

Abstract

The aim of sparse phase retrieval is to recover a k-sparse signal x0∈ Cd from quadratic measurements | ai,x0|2 where ai∈ Cd, i=1,…,m. Noting | ai,x0|2=Tr(AiX0) with Ai=aiai*∈ Cd× d, X0=x0x0*∈ Cd× d, one can recast sparse phase retrieval as a problem of recovering a rank-one sparse matrix from linear measurements. Yin and Xin introduced PhaseLiftOff which presents a proxy of rank-one condition via the difference of trace and Frobenius norm. By adding sparsity penalty to PhaseLiftOff, in this paper, we present a novel model to recover sparse signals from quadratic measurements. Theoretical analysis shows that the solution to our model provides the stable recovery of x0 under almost optimal sampling complexity m=O(k(d/k)). The computation of our model is carried out by the difference of convex function algorithm (DCA). Numerical experiments demonstrate that our algorithm outperforms other state-of-the-art algorithms used for solving sparse phase retrieval.