Euclidean Time Approach to Entanglement Entropy on Lattices and Fuzzy Spaces

• URL: http://arxiv.org/abs/2201.03595v3
• Date: Tue, 18 Jul 2023 10:27:53 GMT
• Title: Euclidean Time Approach to Entanglement Entropy on Lattices and Fuzzy Spaces
• Authors: A. Allouche and D. Dou
• Abstract summary: In a recent letter, we developed a novel Euclidean time approach to compute entanglement entropy on lattices and fuzzy spaces based on Green's function. The present work is devoted in part to the explicit proof of the Green's matrix function formula which was quoted and used in the previous letter, and on the other part to some applications of this formalism.
• Score: 0.0
• License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
• Abstract: In a recent letter, we developed a novel Euclidean time approach to compute R\'{e}nyi entanglement entropy on lattices and fuzzy spaces based on Green's function. The present work is devoted in part to the explicit proof of the Green's matrix function formula which was quoted and used in the previous letter, and on the other part to some applications of this formalism. We focus on scalar theory on 1+1 lattice. We also use the developed approach to go systematically beyond the Gaussian case by considering interacting models, in particular our results confirm earlier expectations concerning the correction to the entanglement at first order. We finally outline how this approach can be used to compute the entanglement entropy on fuzzy spaces for free and interacting scalar theories.

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