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Stable phase retrieval from locally stable and conditionally connected measurements

Publication ,  Journal Article
Cheng, C; Daubechies, I; Dym, N; Lu, J
Published in: Applied and Computational Harmonic Analysis
November 1, 2021

In this paper, we study the stability of phase retrieval problems via a family of locally stable phase retrieval frame measurements in Banach spaces, which we call “locally stable and conditionally connected” (LSCC) measurement schemes. For any signal f in the Banach space, we associate it with a weighted graph Gf, defined by the LSCC measurement scheme, and show that the phase retrievability of the signal f is determined by the connectivity of Gf. We quantify the phase retrieval stability of the signal by two common measures of graph connectivity: The Cheeger constant for real-valued signals, and algebraic connectivity for complex-valued signals. We then use our results to study the stability of two phase retrieval models. In the first model, we study a finite-dimensional phase retrieval problem from locally supported measurements such as the windowed Fourier transform. We show that signals “without large holes” are phase retrievable, and that for such signals in Rd the phase retrieval stability constant grows proportionally to d1/2, while in Cd it grows proportionally to d. The second model we consider is an infinite-dimensional phase retrieval problem in a shift-invariant space. In infinite-dimension spaces, even phase retrievable signals can have the Cheeger constant being zero, and hence have an infinite stability constant. We give an example of signals with monotone polynomial decay which has the Cheeger constant being zero, and an example with exponential decay which has a strictly positive Cheeger constant.

Duke Scholars

Published In

Applied and Computational Harmonic Analysis

DOI

EISSN

1096-603X

ISSN

1063-5203

Publication Date

November 1, 2021

Volume

55

Start / End Page

440 / 465

Related Subject Headings

  • Numerical & Computational Mathematics
  • 4904 Pure mathematics
  • 4901 Applied mathematics
  • 0103 Numerical and Computational Mathematics
  • 0102 Applied Mathematics
  • 0101 Pure Mathematics
 

Citation

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Cheng, C., Daubechies, I., Dym, N., & Lu, J. (2021). Stable phase retrieval from locally stable and conditionally connected measurements. Applied and Computational Harmonic Analysis, 55, 440–465. https://doi.org/10.1016/j.acha.2021.07.001
Cheng, C., I. Daubechies, N. Dym, and J. Lu. “Stable phase retrieval from locally stable and conditionally connected measurements.” Applied and Computational Harmonic Analysis 55 (November 1, 2021): 440–65. https://doi.org/10.1016/j.acha.2021.07.001.
Cheng C, Daubechies I, Dym N, Lu J. Stable phase retrieval from locally stable and conditionally connected measurements. Applied and Computational Harmonic Analysis. 2021 Nov 1;55:440–65.
Cheng, C., et al. “Stable phase retrieval from locally stable and conditionally connected measurements.” Applied and Computational Harmonic Analysis, vol. 55, Nov. 2021, pp. 440–65. Scopus, doi:10.1016/j.acha.2021.07.001.
Cheng C, Daubechies I, Dym N, Lu J. Stable phase retrieval from locally stable and conditionally connected measurements. Applied and Computational Harmonic Analysis. 2021 Nov 1;55:440–465.
Journal cover image

Published In

Applied and Computational Harmonic Analysis

DOI

EISSN

1096-603X

ISSN

1063-5203

Publication Date

November 1, 2021

Volume

55

Start / End Page

440 / 465

Related Subject Headings

  • Numerical & Computational Mathematics
  • 4904 Pure mathematics
  • 4901 Applied mathematics
  • 0103 Numerical and Computational Mathematics
  • 0102 Applied Mathematics
  • 0101 Pure Mathematics