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Stability threshold for 2D shear flows near Couette of the Navier-Stokes equation
Published 27 Mar 2022 in math.AP | (2203.14332v1)
Abstract: In this paper, we consider the stability threshold of the 2D shear flow $(U(y),0){\top}$ of the Navier-Stokes equation at high Reynolds number $Re$. When the shear flow is near in Sobolev norm to the Couette flow $(y,0){\top}$ in some sense, we prove that if the initial data $u_0$ satisfies $|u_0-(U(y),0){\top}|\leq \epsilon Re{-1/3}$, then the solution of the 2D Navier-Stokes equation approaches to some shear flow which is also close to the Couette flow for $t\gg Re{1/3}$, as $t\to\infty$.
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