Zak Transform and non-uniqueness in an extension of Pauli's phase retrieval problem
Idioma
en
Article de revue
Este ítem está publicado en
Analysis Mathematica. 2016, vol. 42, p. 185-201
Springer Verlag
Resumen en inglés
The aim of this paper is to pursue the investigation of the phase retrieval problem for the fractional Fourier transform $\ff_\alpha$started by the second author.We here extend a method of A.E.J.M Janssen toshow that there ...Leer más >
The aim of this paper is to pursue the investigation of the phase retrieval problem for the fractional Fourier transform $\ff_\alpha$started by the second author.We here extend a method of A.E.J.M Janssen toshow that there is a countable set $\qq$ such that for every finite subset $\aa\subset \qq$, there exist twofunctions $f,g$ not multiple of one an other such that $|\ff_\alpha f|=|\ff_\alpha g|$ for every $\alpha\in \aa$.Equivalently, in quantum mechanics, this result reformulates as follows:if $Q_\alpha=Q\cos\alpha+P\sin\alpha$ ($Q,P$ be the position and momentum observables),then $\{Q_\alpha,\alpha\in\aa\}$ is not informationally complete with respect to pure states.This is done by constructing two functions $\ffi,\psi$ such that $\ff_\alpha\ffi$ and $\ff_\alpha\psi$ have disjoint support for each $\alpha\in \aa$. To do so, we establish a link between $\ff_\alpha[f]$, $\alpha\in \qq$ and the Zak transform $Z[f]$generalizing the well known marginal properties of $Z$.< Leer menos
Palabras clave en inglés
Zak transform
Weyl-Heisenberg transform
Fractional Fourier Transform
Pauli problem
Phase Retrieval
Proyecto ANR
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