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Main Authors: Kaiyuan, Cui, Fuzhou, Gong
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2405.06943
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author Kaiyuan, Cui
Fuzhou, Gong
author_facet Kaiyuan, Cui
Fuzhou, Gong
contents In this paper, we introduce new reference observables to establish a scaling formula in the renormalization group equation. Using the transfer matrix method, we calculate the two point observables of the one dimensional Ising model without an external field under general boundary conditions. The results indicate that the two point observables exhibit exponential decay as the distance between these two sites tends to infinity, except at the critical point. Corresponding to the renormalization procedure underlying the correlation function, we establish a similar procedure for new observables, which aligning with findings in physics. Additionally, from the dynamic point of view, we construct a random system using the stochastic quantization method. We calculate the new observables of this random system under the initial distribution that satisfies Dobrushin Lanford Ruelle(DLR) equations. Furthermore, we formulate a new renormalization scaling equation with respect to the two point observables. Finally, these results can be extended to a more general case of finite point observables, and demonstrating independence from the choice of system parameters.
format Preprint
id arxiv_https___arxiv_org_abs_2405_06943
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle The behavior of renormalization and related observables
Kaiyuan, Cui
Fuzhou, Gong
Probability
In this paper, we introduce new reference observables to establish a scaling formula in the renormalization group equation. Using the transfer matrix method, we calculate the two point observables of the one dimensional Ising model without an external field under general boundary conditions. The results indicate that the two point observables exhibit exponential decay as the distance between these two sites tends to infinity, except at the critical point. Corresponding to the renormalization procedure underlying the correlation function, we establish a similar procedure for new observables, which aligning with findings in physics. Additionally, from the dynamic point of view, we construct a random system using the stochastic quantization method. We calculate the new observables of this random system under the initial distribution that satisfies Dobrushin Lanford Ruelle(DLR) equations. Furthermore, we formulate a new renormalization scaling equation with respect to the two point observables. Finally, these results can be extended to a more general case of finite point observables, and demonstrating independence from the choice of system parameters.
title The behavior of renormalization and related observables
topic Probability
url https://arxiv.org/abs/2405.06943