Related papers: Quantum Tomography and the Quantum Radon Transform

Quantum Tomography and the Quantum Radon Transform

URL: http://arxiv.org/abs/2401.09978v1
Date: Thu, 18 Jan 2024 13:46:08 GMT
Title: Quantum Tomography and the Quantum Radon Transform
Authors: Alberto Ibort and Alberto L\'opez-Yela
Abstract summary: Given a $C*$-algebra, the main ingredients for a tomographical description of its states are identified. A generalization of the notion of dual tomographic pair provides the background for a sampling theory on $C*$-algebras. explicit reconstruction formulas are obtained by making a judiciously use of the theory of frames.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: A general framework in the setting of $C^*$-algebras for the tomographical description of states, that includes, among other tomographical schemes, the classical Radon transform, quantum state tomography and group quantum tomography, is presented. Given a $C^*$-algebra, the main ingredients for a tomographical description of its states are identified: A generalized sampling theory and a positive transform. A generalization of the notion of dual tomographic pair provides the background for a sampling theory on $C^*$-algebras and, an extension of Bochner's theorem for functions of positive type, the positive transform. The abstract theory is realized by using dynamical systems, that is, groups represented on $C^*$-algebra. Using a fiducial state and the corresponding GNS construction, explicit expressions for tomograms associated with states defined by density operators on the corresponding Hilbert spade are obtained. In particular a general quantum version of the classical definition of the Radon transform is presented. The theory is completed by proving that if the representation of the group is square integrable, the representation itself defines a dual tomographic map and explicit reconstruction formulas are obtained by making a judiciously use of the theory of frames. A few significant examples are discussed that illustrates the use and scope of the theory.

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