Besov Regularity for the Stationary Navier-Stokes Equation on Bounded Lipschitz Domains

Abstract

We use the scale Bsτ(Lτ()), 1/τ=s/d+1/2, s>0, to study the regularity of the stationary Stokes equation on bounded Lipschitz domains ⊂Rd, d≥ 3, with connected boundary. The regularity in these Besov spaces determines the order of convergence of nonlinear approximation schemes. Our proofs rely on a combination of weighted Sobolev estimates and wavelet characterizations of Besov spaces. By using Banach's fixed point theorem, we extend this analysis to the stationary Navier-Stokes equation with suitable Reynolds number and data, respectively.