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Main Authors: Biswas, Ratul, Chen, Wei-Kuo, Sen, Arnab
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2410.15599
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author Biswas, Ratul
Chen, Wei-Kuo
Sen, Arnab
author_facet Biswas, Ratul
Chen, Wei-Kuo
Sen, Arnab
contents We present a unifying approach to studying the replica symmetric solution in general diluted spin glass models on random $p$-uniform hypergraphs with sparsity parameter $α$. Our result shows that there exist two key regimes in which the model exhibits replica symmetry and the free energy can be explicitly represented as the evaluation of an energy functional at the unique fixed point of a recursive distributional equation. One is called the high temperature regime, where the temperature and the sparsity parameter are essentially inversely proportional to each other; the other is the subcritical regime defined as $αp (p-1)\leq 1$. In particular, the fact that the second regime is independent of the temperature parameter further allows us to deduce an analogous representation of the ground state energy in the subcritical regime. Along the way, we revisit several well-known formulas and also derive new ones for the free and ground state energies in the constraint satisfaction problem, Potts model, XY model, and continuous hardcore model.
format Preprint
id arxiv_https___arxiv_org_abs_2410_15599
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle On the Replica Symmetric Solution in General Diluted Spin Glasses
Biswas, Ratul
Chen, Wei-Kuo
Sen, Arnab
Probability
Disordered Systems and Neural Networks
60G09, 60K35, 82B44, 82B20, 05C80, 82B23
We present a unifying approach to studying the replica symmetric solution in general diluted spin glass models on random $p$-uniform hypergraphs with sparsity parameter $α$. Our result shows that there exist two key regimes in which the model exhibits replica symmetry and the free energy can be explicitly represented as the evaluation of an energy functional at the unique fixed point of a recursive distributional equation. One is called the high temperature regime, where the temperature and the sparsity parameter are essentially inversely proportional to each other; the other is the subcritical regime defined as $αp (p-1)\leq 1$. In particular, the fact that the second regime is independent of the temperature parameter further allows us to deduce an analogous representation of the ground state energy in the subcritical regime. Along the way, we revisit several well-known formulas and also derive new ones for the free and ground state energies in the constraint satisfaction problem, Potts model, XY model, and continuous hardcore model.
title On the Replica Symmetric Solution in General Diluted Spin Glasses
topic Probability
Disordered Systems and Neural Networks
60G09, 60K35, 82B44, 82B20, 05C80, 82B23
url https://arxiv.org/abs/2410.15599