Mass generation for the two dimensional O(N) Linear Sigma Model in the large N limit

Abstract

This work studies the O(N) Linear Sigma Model on R2 under a scaling dictated by the formal 1/N expansion. We show that in the large N limit, correlations decay exponentially fast, where the acquired mass decays exponentially in the inverse temperature. In fact, each marginal converges to a massive Gaussian Free Field (GFF) on R2, quantified in the 2-Wasserstein distance with a weighted H1(R2) cost function. In contrast to prior work on the torus via parabolic stochastic quantization, our results hold without restrictions on the coupling constants, allowing us to also obtain a massive GFF in a suitable double scaling limit. Our proof combines the Feyel/\"Ust\"unel extension of Talagrand's inequality with some classical tools in Euclidean Quantum Field Theory.