Phaseless Reconstruction from Space-Time Samples
Abstract
Phaseless reconstruction from space-time samples is a nonlinear problem of recovering a function x in a Hilbert space H from the modulus of linear measurements \ x, φi , …, ALix, φi : i ∈ I\, where \φi; i ∈ I\⊂ H is a set of functionals on H, and A is a bounded operator on H that acts as an evolution operator. In this paper, we provide various sufficient or necessary conditions for solving this problem, which has connections to X-ray crystallography, the scattering transform, and deep learning.
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