Large N limit of the O(N) linear sigma model in 3D

Abstract

In this paper we study the large N limit of the O(N)-invariant linear sigma model, which is a vector-valued generalization of the 4 quantum field theory, on the three dimensional torus. We study the problem via its stochastic quantization, which yields a coupled system of N interacting SPDEs. We prove tightness of the invariant measures in the large N limit. For large enough mass or small enough coupling constant, they converge to the (massive) Gaussian free field at a rate of order 1/ N with respect to the Wasserstein distance. We also obtain tightness results for certain O(N) invariant observables. These generalize some of the results in SSZZ20 from two dimensions to three dimensions. The proof leverages the method recently developed by GH18 and combines many new techniques such as uniform in N estimates on perturbative objects as well as the solutions.