Abstract
We extend the weak universality of KPZ in Hairer and Quastel [Forum Math. Pi 6 (2018) e3] to weakly asymmetric interface models with general growth mechanisms beyond polynomials. A key new ingredient is a pointwise bound on correlations of trigonometric functions of Gaussians in terms of their polynomial counterparts. This enables us to reduce the problem of a general nonlinearity with sufficient regularity to that of a polynomial.
Citation
Martin Hairer. Weijun Xu. "Large scale limit of interface fluctuation models." Ann. Probab. 47 (6) 3478 - 3550, November 2019. https://doi.org/10.1214/18-AOP1317
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