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Autores principales: Johnstone, Iain M., Klochkov, Yegor, Onatski, Alexei, Pavlyshyn, Damian
Formato: Preprint
Publicado: 2021
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Acceso en línea:https://arxiv.org/abs/2104.07629
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author Johnstone, Iain M.
Klochkov, Yegor
Onatski, Alexei
Pavlyshyn, Damian
author_facet Johnstone, Iain M.
Klochkov, Yegor
Onatski, Alexei
Pavlyshyn, Damian
contents This paper studies spin glass to paramagnetic transition in the Spherical Sherrington-Kirkpatrick model with ferromagnetic Curie-Weiss interaction with coupling constant $J$ and inverse temperature $β$. The disorder of the system is represented by a general Wigner matrix. We confirm a conjecture of \cite{Baik2016} and \cite{Baik2017}, that the critical window of temperatures for this transition is $β= 1 + bN^{-1/3} \sqrt{\log N}$ with $b\in\mathbb{R}$. The limiting distribution of the scaled free energy is Gaussian for negative $b$ and a weighted linear combination of independent Gaussian and Tracy-Widom components for positive $b$. In the special case where the Wigner matrix is from the Gaussian Orthogonal or Unitary Ensemble, we describe the triple point transition between spin glass, paramagnetic, and ferromagnetic regimes in a critical window for $(β, J)$ around the triple point $(1,1)$: the Tracy-Widom component is replaced by the one parameter family of deformations described by Bloemendal and Virag, \cite{BloVirI}.
format Preprint
id arxiv_https___arxiv_org_abs_2104_07629
institution arXiv
publishDate 2021
record_format arxiv
spellingShingle Spin glass to paramagnetic transition and triple point in Spherical SK model
Johnstone, Iain M.
Klochkov, Yegor
Onatski, Alexei
Pavlyshyn, Damian
Probability
60F05, 60B20
This paper studies spin glass to paramagnetic transition in the Spherical Sherrington-Kirkpatrick model with ferromagnetic Curie-Weiss interaction with coupling constant $J$ and inverse temperature $β$. The disorder of the system is represented by a general Wigner matrix. We confirm a conjecture of \cite{Baik2016} and \cite{Baik2017}, that the critical window of temperatures for this transition is $β= 1 + bN^{-1/3} \sqrt{\log N}$ with $b\in\mathbb{R}$. The limiting distribution of the scaled free energy is Gaussian for negative $b$ and a weighted linear combination of independent Gaussian and Tracy-Widom components for positive $b$. In the special case where the Wigner matrix is from the Gaussian Orthogonal or Unitary Ensemble, we describe the triple point transition between spin glass, paramagnetic, and ferromagnetic regimes in a critical window for $(β, J)$ around the triple point $(1,1)$: the Tracy-Widom component is replaced by the one parameter family of deformations described by Bloemendal and Virag, \cite{BloVirI}.
title Spin glass to paramagnetic transition and triple point in Spherical SK model
topic Probability
60F05, 60B20
url https://arxiv.org/abs/2104.07629