Related papers: Connes distance of $2D$ harmonic oscillators in quantum phase space

Connes distance of $2D$ harmonic oscillators in quantum phase space

URL: http://arxiv.org/abs/2011.09627v2
Date: Mon, 14 Dec 2020 17:45:02 GMT
Title: Connes distance of $2D$ harmonic oscillators in quantum phase space
Authors: Bing-Sheng Lin, Tai-Hua Heng
Abstract summary: We study the Connes distance of quantum states of $2D$ harmonic oscillators in phase space. We prove that these two-dimensional distances satisfy the Pythagoras theorem.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We study the Connes distance of quantum states of $2D$ harmonic oscillators in phase space. Using the Hilbert-Schmidt operatorial formulation, we construct a boson Fock space and a quantum Hilbert space, and obtain the Dirac operator and a spectral triple corresponding to a $4D$ quantum phase space. Based on the ball condition, we obtain some constraint relations about the optimal elements. We construct the explicit expressions of the corresponding optimal elements and then derive the Connes distance between two arbitrary Fock states of $2D$ quantum harmonic oscillators. We prove that these two-dimensional distances satisfy the Pythagoras theorem.

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