Validity of Steady Prandtl Layer Expansions

Abstract

Let the viscosity → 0 for the 2D steady Navier-Stokes equations in the region 0≤ x≤ L and 0≤ y<∞ with no slip boundary conditions at y=0. For L<<1, we justify the validity of the steady Prandtl layer expansion for scaled Prandtl layers, including the celebrated Blasius boundary layer. Our uniform estimates in are achieved through a fixed-point scheme: equation* [u0, v0] DNS-1 vL-1 [u0, v0] fixedpoint equation* for solving the Navier-Stokes equations, where [u0, v0] are the tangential and normal velocities at x=0, DNS stands for ∂ x of the vorticity equation for the normal velocity v, and L the compatibility ODE for [u0, v0] at x=0.