A multi-scale limit of a randomly forced rotating 3-D compressible fluid

Abstract

We study a singular limit of a scaled compressible Navier--Stokes--Coriolis system driven by both a deterministic and stochastic forcing terms in three dimensions. If the Mach number is comparable to the Froude number with both proportional to say 1, whereas the Rossby number scales like m for m>1 large, then we show that any family of weak martingale solution to the 3-D randomly forced rotating compressible equation (under the influence of a deterministic centrifugal force) converges in probability, as →0, to the 2-D incompressible Navier--Stokes system with a corresponding random forcing term.