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Bibliographic Details
Main Author: Nakajima, Shuta
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2512.23195
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Table of Contents:
  • We study the replica-symmetric saddle point equations for the Ising perceptron with Gaussian disorder and margin $κ\ge 0$. We prove that for each $κ\ge 0$ there is a critical capacity $α_c(κ)=\frac{2}{π\,\mathbb E[(κ-Z)_+^2]}$, where $Z$ is a standard normal and $(x)_+=\max\{x,0\}$, such that the saddle point equation has a unique solution for $α\in(0,α_c(κ))$ and has no solution when $α\ge α_c(κ)$. When $α\uparrow α_c(κ)$ and $κ>0$, the replica-symmetric free energy at this solution diverges to $-\infty$. In the zero-margin case $κ=0$, Ding and Sun obtained a conditional uniqueness result, with one step verified numerically. Our argument gives a fully analytic proof without computer assistance. We used GPT-5 to help develop intermediate proof steps and to perform sanity-check computations.