Instability of Boundary Layers with the Navier Boundary Condition
Abstract
We study the L∞ stability of the 2D Navier-Stokes equations with a viscosity-dependent Navier boundary condition around shear profiles which are linearly unstable for the Euler equation. The dependence from the viscosity is given in the Navier boundary condition as ∂y u = -γu for some γ∈R, where u is the tangential velocity. With the no-slip boundary condition, which corresponds to the limit γ +∞, a celebrated result from E. Grenier provides an instability of order 1/4. M. Paddick proved the same result in the case γ=1/2, furthermore improving the instability to order one. In this paper, we extend these two results to all γ ∈ R, obtaining an instability of order θ, where θ:=cases 14 &if γ ≥ 34;\\ γ - 12 &if 12<γ < 34;\\ 0 &if γ ≤ 12. cases When γ ≥ 1/2, the result denies the validity of the Prandtl boundary layer expansion around the chosen shear profile.
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