Inverting Spectrogram Measurements via Aliased Wigner Distribution Deconvolution and Angular Synchronization
Abstract
We propose a two-step approach for reconstructing a signal from subsampled short-time Fourier transform magnitude (spectogram) measurements: First, we use an aliased Wigner distribution deconvolution approach to solve for a portion of the rank-one matrix Second, we use angular syncrhonization to solve for (and then for by Fourier inversion). Using this method, we produce two new efficient phase retrieval algorithms that perform well numerically in comparison to standard approaches and also prove two theorems, one which guarantees the recovery of discrete, bandlimited signals from fewer than STFT magnitude measurements and another which establishes a new class of deterministic coded diffraction pattern measurements which are guaranteed to allow efficient and noise robust recovery.
Cite
@article{arxiv.1907.10773,
title = {Inverting Spectrogram Measurements via Aliased Wigner Distribution Deconvolution and Angular Synchronization},
author = {Michael Perlmutter and Sami Merhi and Aditya Viswanathan and Mark Iwen},
journal= {arXiv preprint arXiv:1907.10773},
year = {2019}
}