On the growth of the support of positive vorticity for 2D Euler equation in an infinite cylinder
Abstract
We consider the incompressible 2D Euler equation in an infinite cylinder R× T in the case when the initial vorticity is non-negative, bounded, and compactly supported. We study d(t), the diameter of the support of vorticity, and prove that it allows the following bound: d(t)≤ Ct1/32 t when t→∞.
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