Infinite Boundary Friction Limit for Weak Solutions of the Stochastic Navier-Stokes Equations

Abstract

We address convergence of the unique weak solutions of the 2D stochastic Navier-Stokes equations with Navier boundary conditions, as the boundary friction is taken uniformly to infinity, to the unique weak solution under the no-slip condition. Our result is that for initial velocity in L2x, the convergence holds in probability in CtW-,2x L2tL2x for any 0 < . The noise is of transport-stretching type, although the theorem holds with other transport, multiplicative and additive noise structures. This seems to be the first work concerning the large boundary friction limit with noise, and convergence for weak solutions, due to only L2x initial data, appears new even deterministically.

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