July 2021 Marginal triviality of the scaling limits of critical 4D Ising and $\lambda\phi_4^4$ models
Michael Aizenman, Hugo Duminil-Copin
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Ann. of Math. (2) 194(1): 163-235 (July 2021). DOI: 10.4007/annals.2021.194.1.3

Abstract

We prove that the scaling limits of spin fluctuations in four-dimensional Ising-type models with nearest-neighbor ferromagnetic interaction at or near the critical point are Gaussian. A similar statement is proven for the $\lambda \phi^4$ fields over $\mathbb{R}^4$ with a lattice ultraviolet cutoff, in the limit of infinite volume and vanishing lattice spacing. The proofs are enabled by the models' random current representation, in which the correlation functions' deviation from Wick's law is expressed in terms of intersection probabilities of random currents with sources at distances which are large on the model's lattice scale. Guided by the analogy with random walk intersection amplitudes, the analysis focuses on the improvement of the so-called tree diagram bound by a logarithmic correction term, which is derived here through multi-scale analysis.

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Michael Aizenman. Hugo Duminil-Copin. "Marginal triviality of the scaling limits of critical 4D Ising and $\lambda\phi_4^4$ models." Ann. of Math. (2) 194 (1) 163 - 235, July 2021. https://doi.org/10.4007/annals.2021.194.1.3

Information

Published: July 2021
First available in Project Euclid: 21 December 2021

Digital Object Identifier: 10.4007/annals.2021.194.1.3

Subjects:
Primary: 60G60 , 82B20 , 82B27

Keywords: Critical behavior , field theory , Ising model , marginal dimension , scaling limits

Rights: Copyright © 2021 Department of Mathematics, Princeton University

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Vol.194 • No. 1 • July 2021
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