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We consider the long-time behavior of a diffusion process on Rᵈ advected by a stationary random vector field which is assumed to be divergence-free, dihedrally symmetric in law and have a log-correlated potential. A special case includes ^ of the Gaussian free field in two dimensions. We show the variance of the diffusion process at a large time t behaves like 2 c_* t (t) ^1/2, in a quenched sense and with a precisely determined, universal prefactor constant c_*>0. We also prove a quenched invariance principle under this superdiffusive scaling. The proof is based on a rigorous renormalization group argument in which we inductively analyze coarse-grained diffusivities, scale-by-scale. Our analysis leads to sharp homogenization and large-scale regularity estimates on the infinitesimal generator, which are subsequently transferred into quantitative information on the process.
Armstrong et al. (Mon,) studied this question.