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mild solutions $u$ of NS in $L^p(\\mathbb{R}^d)$ which blow up at finite time $T>0$, respectively, one has that for $d <p \\leq \\infty$, $$ \\|u(t)\\|_p \\gtrsim ( T-t )^{-(1-d/p)/2}, \\ \\ 0< t<T. $$ We will obtain the blowup profile and the concentration phenomena in $L^p(\\mathbb{R}^d)$ with $d\\leq p\\leq \\infty$ for 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