Thermodynamic and Scaling Limits of the non-Gaussian Membrane Model
Abstract
We characterize the behavior of a random discrete interface φ on [-L,L]d Zd with energy Σ V( φ(x)) as L ∞, where is the discrete Laplacian and V is a uniformly convex, symmetric, and smooth potential. The interface φ is called the non-Gaussian membrane model. By analyzing the Helffer-Sj\"ostrand representation associated to φ, we provide a unified approach to continuous scaling limits of the rescaled and interpolated interface in dimensions d=2,3, Gaussian approximation in negative regularity spaces for all d ≥ 2, and the infinite volume limit in d ≥ 5. Our results generalize some of those of arXiv:1801.05663.
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