Injectivity of sampled Gabor phase retrieval in spaces with general integrability conditions
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It was recently shown that functions in $L^4([-B,B])$ can be uniquely recovered up to a global phase factor from the absolute values of their Gabor transforms sampled on a rectangular lattice. We prove that this remains true if one replaces $L^4([-B,B])$ by $L^p([-B,B])$ with $p \in [1,\infty]$. To do so, we adapt the original proof by Grohs and Liehr and use a classical sampling result due to Beurling. Furthermore, we present a minor modification of a result of M\"untz-Sz\'asz type by Zalik. Finally, we consider the implications of our results for more general function spaces obtained by applying the fractional Fourier transform to $L^p([-B,B])$ and for more general nonuniform sampling sets.
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Sampling at twice the Nyquist rate in two frequency bins guarantees uniqueness in Gabor phase retrieval
Bandlimited signals are uniquely recoverable up to global phase from Gabor magnitudes sampled at twice the Nyquist rate in two frequency bins.
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