VOL. 22 | 2021 Quantum Stochastic Products and the Quantum Convolution
Chapter Author(s) Paolo Aniello
Editor(s) Ivaïlo M. Mladenov, Vladimir Pulov, Akira Yoshioka
Geom. Integrability & Quantization, 2021: 64-77 (2021) DOI: 10.7546/giq-22-2021-64-77

Abstract

A quantum stochastic product is a binary operation on the space of quantum states preserving the convex structure. We describe a class of associative stochastic products, the twirled products, that have interesting connections with quantum measurement theory. Constructing such a product involves a square integrable group representation, a probability measure and a fiducial state. By extending a twirled product to the full space of trace class operators, one obtains a Banach algebra. This algebra is commutative if the underlying group is abelian. In the case of the group of translations on phase space, one gets a quantum convolution algebra, a quantum counterpart of the classical phase-space convolution algebra. The peculiar role of the fiducial state characterizing each quantum convolution product is highlighted.

Information

Published: 1 January 2021
First available in Project Euclid: 2 June 2021

Digital Object Identifier: 10.7546/giq-22-2021-64-77

Rights: Copyright © 2021 Institute of Biophysics and Biomedical Engineering, Bulgarian Academy of Sciences

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