Related papers: Algebraic law of local correlation in the dynamically tuned Ising model

Algebraic law of local correlation in the dynamically tuned Ising model

URL: http://arxiv.org/abs/2412.03114v1
Date: Wed, 04 Dec 2024 08:28:17 GMT
Title: Algebraic law of local correlation in the dynamically tuned Ising model
Authors: X. Wang, X. F. Wu, B. Yang, B. Zhang, B. Xiong,
Abstract summary: Antiferromagnetic (AF) correlation in the dynamically tuned Ising model with various geometries is investigated. We find that the magnitude of AF correlation for the same Manhattan distance is the algebraic sum of the correlations contributed by all shortest paths.
Score: 1.0152859069606663
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Abstract: We investigate both analytically and numerically the buildup of antiferromagnetic (AF) correlation in the dynamically tuned Ising model with various geometries by using the Rydberg atomic system. It is shown that Magnus expansion up to second order for the local lattice geometries can describe quantitatively the creation of the AF correlation for different lattice arrays, e.g., $2 \times n$ lattice, cyclic lattice with star, and triangular lattice. We find that the magnitude of AF correlation for the same Manhattan distance is the algebraic sum of the correlations contributed by all shortest paths -- a typical superposition law. Such a law is independent of nonequivalent paths, lattice geometries, and quench style.

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