The Sobolev stability threshold for 2D shear flows near Couette

Abstract

We consider the 2D Navier-Stokes equation on T × R, with initial datum that is -close in HN to a shear flow (U(y),0), where \| U(y) - y\|HN+4 1 and N>1. We prove that if 1/2, where denotes the inverse Reynolds number, then the solution of the Navier-Stokes equation remains -close in H1 to (et ∂yyU(y),0) for all t>0. Moreover, the solution converges to a decaying shear flow for times t -1/3 by a mixing-enhanced dissipation effect, and experiences a transient growth of gradients. In particular, this shows that the stability threshold in finite regularity scales no worse than 1/2 for 2D shear flows close to the Couette flow.