We prove the instability of the Couette flow if the disturbances is less smooth than the Gevrey space of class 2. This shows that this is the critical regularity for this problem since it was proved in [5] that stability and inviscid damping hold for disturbances which are smoother than the Gevrey space of class 2. A big novelty is that this critical space is due to an instability mechanism which is completely nonlinear and is due to some energy cascade.
Transition threshold for the 2-D Couette flow in a finite channel
Local Rigidity of the Couette Flow for the Stationary Triple-Deck Equations
Transition threshold for the 2-D Couette flow in whole space via Green's function
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