Some remarks about the possible blow-up for the Navier-Stokes equations

Jean-Yves Chemin, Isabella Gallagher, Ping Zhang

Published 2018-07-26Version 1

In this work we investigate the question of preventing the three-dimensional, incompressible Navier-Stokes equations from developing singularities, by controlling one component of the velocity field only, in space-time scale invariant norms. In particular we prove that it is not possible for one component of the velocity field to tend to~$0$ too fast near blow up. We also introduce a space "almost" invariant under the action of the scaling such that if one component of the velocity field measured in this space remains small enough, then there is no blow up.