Statistically self-similar mixing by Gaussian random fields

Abstract

We study the passive transport of a scalar field by a spatially smooth but white-in-time incompressible Gaussian random velocity field on Rd. If the velocity field u is homogeneous, isotropic, and statistically self-similar, we derive an exact formula which captures non-diffusive mixing. For zero diffusivity, the formula takes the shape of E\ \| θt \|H-s2 = e-λd,s t \| θ0 \|H-s2 with any s∈ (0,d/2) and λd,sD1:= s(λ1D1-2s) where λ1/D1 = d is the top Lyapunov exponent associated to the random Lagrangian flow generated by u and D1 is small-scale shear rate of the velocity. Moreover, the mixing is shown to hold uniformly in diffusivity.