Nonlinear stability for 3-D plane Poiseuille flow in a finite channel

Abstract

In this paper, we study the nonlinear stability for the 3-D plane Poiseuille flow (1-y2,0,0) at high Reynolds number Re in a finite channel T× [-1,1 ]× T with non-slip boundary condition. We prove that if the initial velocity v0 satisfies \|v0-(1-y2,0,0)\|H4≤ c0 Re-74 for some c0>0 independent of Re, then the solution of 3-D Naiver-Stokes equations is global in time and does not transit away from the plane Poiseuille flow. To our knowledge, this is the first nonlinear stability result for the 3-D plane Poiseuille flow and the transition threshold is accordant with the numerical result by Lundbladh et al. LHR.

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