A minimum critical blowup rate for the high-dimensional Navier-Stokes equations

Abstract

We prove quantitative regularity and blowup theorems for the incompressible Navier-Stokes equations in Rd, d≥4 when the solution lies in the critical space Lt∞ Lxd. Explicit subcritical bounds on the solution are obtained in terms of the critical norm. A consequence is that \|u(t)\|Lxd( Rd) grows at a minimum rate of ((T*-t)-1)c along a sequence of times approaching a hypothetical blowup at T*. These results quantify a theorem of Dong and Du and extend the three-dimensional work of Tao.