Regularity Conditions of 3D Navier-Stokes flow in terms of large   spectral components

Namkwon Kim; Minkyu Kwak; Minha Yoo

arXiv:1405.6838·math.AP·May 28, 2014

Regularity Conditions of 3D Navier-Stokes flow in terms of large spectral components

Namkwon Kim, Minkyu Kwak, Minha Yoo

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Abstract

We develop Ladyzhenskaya-Prodi-Serrin type spectral regularity criteria for 3D incompressible Navier-Stokes equations in a torus. Concretely, for any $N > 0$ , let $w_{N}$ be the sum of all spectral components of the velocity fields whose all three wave numbers are greater than $N$ absolutely. Then, we show that for any $N > 0$ , the finiteness of the Serrin type norm of $w_{N}$ implies the regularity of the flow. It implies that if the flow breaks down in a finite time, the energy of the velocity fields cascades down to the arbitrarily large spectral components of $w_{N}$ and corresponding energy spectrum, in some sense, roughly decays slower than $κ^{- 2}$

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TopicsNavier-Stokes equation solutions · Advanced Mathematical Physics Problems · Stability and Controllability of Differential Equations