Star product, discrete Wigner functions, and spin-system tomograms


如何引用文章

全文:

开放存取 开放存取
受限制的访问 ##reader.subscriptionAccessGranted##
受限制的访问 订阅存取

详细

We develop the star-product formalism for spin states and consider different methods for constructing operator systems forming sets of dequantizers and quantizers, establishing a relation between them. We study the physical meaning of the operator symbols related to them. Quantum tomograms can also serve as operator symbols. We show that the possibility to express discrete Wigner functions in terms of measurable quantities follows because these functions can be related to quantum tomograms. We investigate the physical meaning of tomograms and spin-system tomogram symbols, which they acquire in the framework of the star-product formalism. We study the structure of the sum kernels, which can be used to express the operator symbols, calculated using different sets of dequantizers and also arising in calculating the star product of operator symbols, in terms of one another.

作者简介

P. Adam

Institute for Solid State Physics and Optics, Wigner Research Centre for Physics

Email: info@pleiadesonline.com
匈牙利, Budapest

V. Andreev

Lebedev Physical Institute, RAS

Email: info@pleiadesonline.com
俄罗斯联邦, Moscow

A. Isar

Horia Hulubei National Institute of Physics and Nuclear Engineering

Email: info@pleiadesonline.com
罗马尼亚, Magurele

V. Man’ko

Institute for Solid State Physics and Optics, Wigner Research Centre for Physics

Email: info@pleiadesonline.com
匈牙利, Budapest

M. Man’ko

Institute for Solid State Physics and Optics, Wigner Research Centre for Physics

Email: info@pleiadesonline.com
匈牙利, Budapest

补充文件

附件文件
动作
1. JATS XML

版权所有 © Pleiades Publishing, Ltd., 2016