On the critical one component regularity for 3-D Navier-Stokes system (Q2801756)

The authors consider a three-dimensional Navier-Stokes system with the initial data \(v_0\) such that the vorticity \(\nabla\times v_0\) belongs to \(L^{3/2}\) so that \(v_0\in H^{1/2}\). The main result is that a solution \(v\) (constructed by the Fujita-Kato approach) blows up in a finite time \(T^\ast<\infty\) if and only if the (scaling invariant) quantity satisfies \(\int_0^{T^\ast}\|v(t)\cdot e\|^p_{H^{1/2+1/p}}dt=\infty\) for \(p\in(4,6)\) and unit vectors \(e\in\mathbb R^3\).