Phase Retrieval By Projections

Cahill, Jameson; Casazza, Peter G.; Peterson, Janice; Woodland, Lindsey M.

doi:10.48550/arxiv.1305.6226

Cited by 20 publications

(44 citation statements)

References 16 publications

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“…We also show that this bound is sharp when N = 2 k + 1. The results of this paper answer a number of questions raised in [4].…”

supporting

confidence: 57%

“…The author and his collaborators [1,5] previously considered the problem of reconstructing a vector from the magnitudes of its frame coefficients. In this paper we answer questions raised in the paper [4] about phase retrieval from the magnitudes of orthogonal projections onto a collection of subspaces.…”

Section: Introductionmentioning

confidence: 99%

“…In this paper we consider the problem, originally raised in [4], of reconstructing a vector x (up to a global sign) from the magnitudes ||P 1 x||, ||P 2 x||, . .…”

Section: Introductionmentioning

confidence: 99%

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Projections and phase retrieval

Edidin

2017

Applied and Computational Harmonic Analysis

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Abstract. We characterize collections of orthogonal projections for which it is possible to reconstruct a vector from the magnitudes of the corresponding projections. As a result we are able to show that in an M -dimensional real vector space a vector can be reconstructed from the magnitudes of its projections onto a generic collection of N ≥ 2M − 1 subspaces. We also show that this bound is sharp when N = 2 k + 1. The results of this paper answer a number of questions raised in [4].

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“…We also show that this bound is sharp when N = 2 k + 1. The results of this paper answer a number of questions raised in [4].…”

supporting

confidence: 57%

Section: Introductionmentioning

confidence: 99%

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Projections and phase retrieval

Edidin

2017

Applied and Computational Harmonic Analysis

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“…Fusion phase retrieval deals with the problem of recovering x upto a phase ambiguity from the measurements of the form { P i x } m i=1 , where P i : C n /R n → W i are projection operators onto the subspaces. [46] had the initial results on this problem with regards to the conditions on the subspaces and minimum number of such subspaces required for successful recovery of x under phase ambiguity.…”

Section: Appendix D : Applications a Power System State Estimation Pr...mentioning

confidence: 99%

On the Sample Complexity and Optimization Landscape for Quadratic Feasibility Problems

Thaker,

Dasarathy,

Nedić

2020

Preprint

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We consider the problem of recovering a complex vector x ∈ C n from m quadratic measurements { A i x, x } m i=1 . This problem, known as quadratic feasibility, encompasses the well known phase retrieval problem and has applications in a wide range of important areas including power system state estimation and x-ray crystallography. In general, not only is the the quadratic feasibility problem NP-hard to solve, but it may in fact be unidentifiable. In this paper, we establish conditions under which this problem becomes identifiable, and further prove isometry properties in the case when the matrices {A i } m i=1 are Hermitian matrices sampled from a complex Gaussian distribution. Moreover, we explore a nonconvex optimization formulation of this problem, and establish salient features of the associated optimization landscape that enables gradient algorithms with an arbitrary initialization to converge to a globally optimal point with a high probability. Our results also reveal sample complexity requirements for successfully identifying a feasible solution in these contexts.

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“…For this problem we would like to recover a vector x ∈ F d from a finite number of quadratic measurements {x * A j x} N j=1 where each A j is a Hermitian matrix in F d×d . This is the socalled generalized phase retrieval problem, which was first studied in [22] from a theoretical angle, but earlier in special cases such as that for orthogonal projection matrices {A j } N j=1 by others [3,11,15]. To computationally recover the signal in phase retrieval, the greatest challenge comes from the nonconvexity of the objective function when it is phrased as an optimization problem.…”

Section: Introductionmentioning

confidence: 99%

Phase retrieval for sub-Gaussian measurements

Gao

Liu

Wang

2019

Preprint

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Generally, phase retrieval problem can be viewed as the reconstruction of a function/signal from only the magnitude of the linear measurements. These measurements can be, for example, the Fourier transform of the density function. Computationally the phase retrieval problem is very challenging. Many algorithms for phase retrieval are based on i.i.d. Gaussian random measurements. However, Gaussian random measurements remain one of the very few classes of measurements. In this paper, we develop an efficient phase retrieval algorithm for sub-gaussian random frames. We provide a general condition for measurements and develop a modified spectral initialization. In the algorithm, we first obtain a good approximation of the solution through the initialization, and from there we use Wirtinger Flow to solve for the solution. We prove that the algorithm converges to the global minimizer linearly.

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Phase Retrieval By Projections

Cited by 20 publications

References 16 publications

Projections and phase retrieval

Projections and phase retrieval

On the Sample Complexity and Optimization Landscape for Quadratic Feasibility Problems

Phase retrieval for sub-Gaussian measurements

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