Local Hadamard well-posedness results for the Navier-Stokes equations

Abstract

In this paper we consider classes of initial data that ensure local-in-time Hadamard well-posedness of the associated weak Leray-Hopf solutions of the three-dimensional Navier-Stokes equations. In particular, for any solenodial L2 initial data u0 belonging to certain subsets of VMO-1(R3), we show that weak Leray-Hopf solutions depend continuously with respect to small divergence-free L2 perturbations of the initial data u0 (on some finite-time interval). Our main result is inspired and improves upon previous work of the author barker2018 and work of Jean-Yves Chemin chemin. Our method builds upon barker2018 and chemin. In particular our method hinges on decomposition results for the initial data inspired by Calder\'on Calderon90 together with use of persistence of regularity results. The persistence of regularity statement presented may be of independent interest, since it does not rely upon the solution or the initial data being in the perturbative regime.