Stable recovery of complex dictionary-sparse signals from phaseless measurements

Abstract

Dictionary-sparse phase retrieval, which is also known as phase retrieval with redundant dictionary, aims to reconstruct an original dictionary-sparse signal from its measurements without phase information. It is proved that if the measurement matrix A satisfies null space property (NSP)/strong dictionary restricted isometry property (S-DRIP), then the dictionary-sparse signal can be exactly/stably recovered from its magnitude-only measurements up to a global phase. However, the S-DRIP holds only for real signals. Hence, in this paper, we mainly study the stability of the 1-analysis minimization and its generalized q\;(0<q≤1)-analysis minimization for the recovery of complex dictionary-sparse signals from phaseless measurements. First, we introduce a new l1-dictionary restricted isometry property (1-DRIP) for rank-one and dictionary-sparse matrices, and show that complex dictionary-sparse signals can be stably recovered by magnitude-only measurements via 1-analysis minimization provided that the quadratic measurement map A satisfies 1-DRIP. Then, we generalized the 1-DRIP condition under the framework of q\;(0<q≤1)-analysis minimization.