Enhanced dissipation for the 2D Couette flow in critical space

Abstract

We consider the 2D incompressible Navier-Stokes equations on T× R, with initial vorticity that is δ close in HlogxL2y to -1(the vorticity of the Couette flow (y,0)). We prove that if δ 1/2, where denotes the viscosity, then the solution of the Navier-Stokes equation approaches some shear flow which is also close to Couette flow for time t -1/3 by a mixing-enhanced dissipation effect and then converges back to Couette flow when t +∞. In particular, we show the nonlinear enhanced dissipation and the inviscid damping results in the almost critical space HlogxL2y⊂ L2x,y.