Boundary Asymptotic Analysis for an Incompressible Viscous Flow: Navier Wall Laws

Abstract

We consider a new way of establishing Navier wall laws. Considering a bounded domain of R N , N=2,3, surrounded by a thin layer ε, along a part 2 of its boundary ∂ , we consider a Navier-Stokes flow in ∂ ε with Reynolds' number of order 1/ε in ε. Using -convergence arguments, we describe the asymptotic behaviour of the solution of this problem and get a general Navier law involving a matrix of Borel measures having the same support contained in the interface 2. We then consider two special cases where we characterize this matrix of measures. As a further application, we consider an optimal control problem within this context.