Related papers: Modular Operators and Entanglement in Supersymmetric Quantum Mechanics

Modular Operators and Entanglement in Supersymmetric Quantum Mechanics

URL: http://arxiv.org/abs/2103.06353v1
Date: Wed, 10 Mar 2021 21:52:14 GMT
Title: Modular Operators and Entanglement in Supersymmetric Quantum Mechanics
Authors: Rupak Chatterjee and Ting Yu
Abstract summary: Theory is applied to the case of two-dimensional Dirac fermions, as is found in graphene, and a supersymmetric Jaynes Cummings Model.
Score: 9.850972494562512
License: http://creativecommons.org/licenses/by/4.0/
Abstract: The modular operator approach of Tomita-Takesaki to von Neumann algebras is elucidated in the algebraic structure of certain supersymmetric quantum mechanical systems. A von Neumann algebra is constructed from the operators of the system. An explicit operator characterizing the dual infinite degeneracy structure of a supersymmetric two dimensional system is given by the modular conjugation operator. Furthermore, the entanglement of formation for these supersymmetric systems using concurrence is shown to be related to the expectation value of the modular conjugation operator in an entangled bi-partite supermultiplet state thus providing a direct physical meaning to this anti-unitary, anti-linear operator as a quantitative measure of entanglement. Finally, the theory is applied to the case of two-dimensional Dirac fermions, as is found in graphene, and a supersymmetric Jaynes Cummings Model.

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