Small scales in inviscid limits of steady fluids

Abstract

In this article, we study the 2D incompressible steady Navier-Stokes equation in a channel (-L,0)×(-1,1) with the no-slip boundary condition on \Y = 1\, and consider the inviscid limit 0. In the special case of Euler shear flow (ue(Y),0), we construct a steady Navier-Stokes solution for 1, \ aligned &u ue + up + O(),\\ &v h(Y) \Xue(Y)/\ + O(), aligned. where up represents the classical Prandtl layer profile, and h(Y) is an arbitrary smooth, compactly-supported function with small magnitude. While the classical Prandtl boundary layer up exhibits a small scale of order in Y near Y = 1, the profile we construct reveals an small scale of Xue(Y) in the vertical velocity component.