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Main Authors: Chen, Wei-Kuo, Kim, Heejune, Sen, Arnab
Format: Preprint
Published: 2023
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Online Access:https://arxiv.org/abs/2303.06084
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author Chen, Wei-Kuo
Kim, Heejune
Sen, Arnab
author_facet Chen, Wei-Kuo
Kim, Heejune
Sen, Arnab
contents We study the Lévy spin glass model, a fully connected model on $N$ vertices with heavy-tailed interactions governed by a power law distribution of order $0<α<2.$ Our investigation is divided into three cases $0<α<1$, $α=1$, and $1<α<2.$ When $1<α<2,$ we identify a high temperature regime, in which the limit and fluctuation of the free energy are explicitly obtained and the site and bond overlaps are shown to exhibit concentration, interestingly, while the former is concentrated around zero, the latter obeys a positivity behavior. At any temperature, we further establish the existence of the limiting free energy and derive a variational formula analogous to Panchenko's framework in the setting of the Poissonian Viana-Bray model. For $α=1$, the free energy scales super-linearly and converges to a constant proportional to $β$ in probability at any temperature. In the case of $0<α<1$, the scaling for the free energy is again super-linear, however, it converges weakly to the sum of a Poisson Point Process at any temperature. Additionally, we show that the Gibbs measure puts most of its mass on the configurations that align with signs of the polynomially many heaviest edge weights.
format Preprint
id arxiv_https___arxiv_org_abs_2303_06084
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Some Rigorous Results on the Lévy Spin Glass Model
Chen, Wei-Kuo
Kim, Heejune
Sen, Arnab
Probability
Mathematical Physics
We study the Lévy spin glass model, a fully connected model on $N$ vertices with heavy-tailed interactions governed by a power law distribution of order $0<α<2.$ Our investigation is divided into three cases $0<α<1$, $α=1$, and $1<α<2.$ When $1<α<2,$ we identify a high temperature regime, in which the limit and fluctuation of the free energy are explicitly obtained and the site and bond overlaps are shown to exhibit concentration, interestingly, while the former is concentrated around zero, the latter obeys a positivity behavior. At any temperature, we further establish the existence of the limiting free energy and derive a variational formula analogous to Panchenko's framework in the setting of the Poissonian Viana-Bray model. For $α=1$, the free energy scales super-linearly and converges to a constant proportional to $β$ in probability at any temperature. In the case of $0<α<1$, the scaling for the free energy is again super-linear, however, it converges weakly to the sum of a Poisson Point Process at any temperature. Additionally, we show that the Gibbs measure puts most of its mass on the configurations that align with signs of the polynomially many heaviest edge weights.
title Some Rigorous Results on the Lévy Spin Glass Model
topic Probability
Mathematical Physics
url https://arxiv.org/abs/2303.06084