On the Regularity of Navier-Stokes Equations in Critical Space
Abstract
This paper focuses on the regularity of the Navier-Stokes equations in critical space. Let u(x,t) and p(x,t) denote suitable weak solution of the Navier-Stokes equations in QT=R3×(-T, 0). We prove that if u(x,t) is in the scaling invariant spaces Lt∞Lx3p1Lxhp2(QT) , where 1p1+2p2=1 , p1≥ 2 and xh = (x1, x2) , then u is a smooth solution in QT and doesn't blow up at t = 0 . In particular, if u(x,t) ∈ Lt∞Lx3∞Lxh2(QT), then u(x,t) is a smooth solution in QT and regular up to t = 0 .
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