Stability of Poiseuille Flow of Navier-Stokes Equations on R2
Abstract
We consider solutions to the Navier-Stokes equations on R2 close to the Poiseuille flow with viscosity 0< < 1. For the linearized problem, we prove that when the x-frequency satisfy |k| -13, the perturbation decays on a time-scale proportional to -12|k|-12. Since it decays faster than the heat equation, this phenomenon is referred to as enhanced dissipation. Then we concern the non-linear equations. We show that if the initial perturbation ωin is at most of size 73 in an anisotropic Sobolev space, then the size of the perturbation remains no more than twice the size of its initial value.
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