Phase retrieval from the norms of affine transformations

Abstract

In this paper, we consider the generalized phase retrieval from affine measurements. This problem aims to recover signals x ∈ Fd from the affine measurements yj=Mj* + bj2,\; j=1,…,m, where Mj ∈ Fd× r, bj∈ Fr, F∈ \ R, C\ and we call it as generalized affine phase retrieval. We develop a framework for generalized affine phase retrieval with presenting necessary and sufficient conditions for \(Mj, bj)\j=1m having generalized affine phase retrieval property. We also establish results on minimal measurement number for generalized affine phase retrieval. Particularly, we show if \(Mj, bj)\j=1m ⊂ Fd× r× Fr has generalized affine phase retrieval property, then m≥ d+d/r for F= R (m≥ 2d+d/r for F= C ). We also show that the bound is tight provided r d. These results imply that one can reduce the measurement number by raising r, i.e. the rank of Mj. This highlights a notable difference between generalized affine phase retrieval and generalized phase retrieval. Furthermore, using tools of algebraic geometry, we show that m≥ 2d (resp. m≥ 4d-1) generic measurements A=\(Mj,bj)\j=1m have the generalized phase retrieval property for F= R (resp. F= C).