The Inviscid Limit of the Navier-Stokes Equations with Kinematic and Navier Boundary Conditions

Abstract

We are concerned with the inviscid limit of the Navier-Stokes equations on bounded regular domains in R3 with the kinematic and Navier boundary conditions. We first establish the existence and uniqueness of strong solutions in the class C([0,T); Hr(; R3)) C1([0,T); Hr-2(;R3)) with some T>0 for the initial-boundary value problem with the kinematic and Navier boundary conditions on ∂ and divergence-free initial data in the Sobolev space Hr(; R3) for r≥ 2. Then, for the strong solution with Hr+1--regularity in the spatial variables, we establish the inviscid limit in Hr(; R3) uniformly on [0,T) for r > 52. This shows that the boundary layers do not develop up to the highest order Sobolev norm in Hr(;R3) in the inviscid limit. Furthermore, we present an intrinsic geometric proof for the failure of the strong inviscid limit under a non-Navier slip-type boundary condition.