On the critical one component regularity for 3-D Navier-Stokes system
Abstract
Given an initial data v0 with vorticity 0=× v0 in L 3 2, (which implies that v0 belongs to the Sobolev space H12), we prove that the solution v given by the classical Fujita-Kato theorem blows up in a finite time T only if, for any p in ]4,6[ and any unit vector e in 3, there holds ∫0T\|v(t)· e\|12+2pp\,dt=∞. We remark that all these quantities are scaling invariant under the scaling transformation of Navier-Stokes system.
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