Localized quantitative estimates and potential blow-up rates for the Navier-Stokes equations

Abstract

We show that if v is a smooth suitable weak solution to the Navier-Stokes equations on B(0,4)× (0,T*), that possesses a singular point (x0,T*)∈ B(0,4)× \T*\, then for all δ>0 sufficiently small one necessarily has t T* \|v(·,t)\|L3(B(x0,δ))((1(T*-t)14))11129=∞. This local result improves upon the corresponding global result recently established by Tao. The proof is based upon a quantification of Escauriaza, Seregin and Sverak's qualitative local result. In order to prove the required localized quantitative estimates, we show that in certain settings one can quantify a qualitative truncation/localization procedure introduced by Neustupa and Penel. After performing the quantitative truncation procedure, the remainder of the proof hinges on a physical space analogue of Tao's breakthrough strategy, established by Prange and the author.