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On phase retrieval via matrix completion and the estimation of low rank PSD matrices

Given underdetermined measurements of a Positive Semi-Definite (PSD) matrix $X$ of known low rank $K$, we present a new algorithm to estimate $X$ based on recent advances in non-convex optimization schemes. We apply this in particular to the phase retrieval problem for Fourier data, which can be formulated as a rank 1 PSD matrix recovery problem. Moreover, we provide theory for how oversampling affects the stability of the lifted inverse problem.

preprint2019arXivOpen access
Marcus CarlssonDaniele Gerosa
math.OC
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Open access2 authors1 topic
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Marcus CarlssonDaniele Gerosa

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