A quantitative formulation of the global regularity problem for the periodic Navier-Stokes equation

Abstract

The global regularity problem for the periodic Navier-Stokes system asks whether to every smooth divergence-free initial datum u0: (/)3 3 there exists a global smooth solution u. In this note we observe (using a simple compactness argument) that this qualitative question is equivalent to the more quantitative assertion that there exists a non-decreasing function F: + + for which one has a local-in-time a priori bound \| u(T) \|H1x((/)3) ≤ F(\|u0\|H1x((/)3)) for all 0 < T ≤ 1 and all smooth solutions u: [0,T] × (/)3 3 to the Navier-Stokes system. We also show that this local-in-time bound is equivalent to the corresponding global-in-time bound.