A spatially localized L log L estimate on the vorticity in the 3D NSE
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🧮 math.AP
keywords
vorticityemphlocalizedspatiallyanalysis-motivatedanisotropicassumingblow-up
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The purpose of this note is to present a spatially localized $L \log L$ bound on the vorticity in the 3D Navier-Stokes equations, assuming a very mild, \emph{purely geometric} condition. This yields an extra-log decay of the distribution function of the vorticity, which in turn implies \emph{breaking the criticality} in a physically, numerically, and mathematical analysis-motivated blow-up scenario based on vortex stretching and anisotropic diffusion.
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