Sharp one component regularity for Navier-Stokes
Abstract
We consider the conditional regularity of mild solution v to the incompressible Navier-Stokes equations in three dimensions. Let e ∈ S2 and 0 < T < ∞. J. Chemin and P. Zhang CP proved the regularity of v on (0,T] if there exists p ∈ (4, 6) such that ∫0T\|v· e\|pH12+2pdt < ∞. J. Chemin, P. Zhang and Z. F. Zhang CPZ extended the range of p to (4, ∞). In this article we settle the case p ∈ [2, 4]. Our proof also works for the case p ∈ (4,∞).
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