Enhanced Dissipation and Transition Threshold for the Poiseuille Flow in a Periodic Strip

Abstract

We consider the solution to the 2D Navier-Stokes equations around the Poiseuille flow (y2,0) on T×R with small viscosity >0. Via a hypocoercivity argument, we prove that the x-dependent modes of the solution to the linear problem undergo the enhanced dissipation effect with a rate proportional to 12. Moreover, we study the nonlinear enhanced dissipation effect and we establish a transition threshold of 23+. Namely, when the perturbation of the Poiseuille flow is size at most 23+, its size remains so for all times and the enhanced dissipation persists with a rate proportional to 12.