Polynomial mixing for the white-forced Navier-Stokes system in the whole space
Abstract
We study the mixing properties of the white-forced Navier-Stokes system in the whole space R2. Assuming that the noise is sufficiently non-degenerate, we prove the uniqueness of stationary measure and polynomial mixing in the dual-Lipschitz metric. The proof combines the coupling method with a Foias-Prodi type estimate, weighted growth estimates for trajectories, and an estimate for the Leray projector involving Muckenhoupt A2-class weights.
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