Quenched central limit theorem for the stochastic heat equation in weak disorder

Abstract

We continue with the study of the mollified stochastic heat equation in d≥ 3 given by d uε,t= 12 uε,t+ β ε(d-2)/2 \,uε,t \,d Bε,t with spatially smoothened cylindrical Wiener process B, whose (renormalized) Feynman-Kac solution describes the partition function of the continuous directed polymer. In an earlier work (MSZ16), a phase transition was obtained, depending on the value of β>0 in the limiting object of the smoothened solution uε as the smoothing parameter ε 0 This partition function naturally defines a quenched polymer path measure and we prove that as long as β>0 stays small enough while uε converges to a strictly positive non-degenerate random variable, the distribution of the diffusively rescaled Brownian path converges under the aforementioned polymer path measure to standard Gaussian distribution.