Local-in-time Solvability and Space Analyticity for the Navier-Stokes Equations with BMO-type Initial Data

Abstract

It is proved that there exists a local-in-time solution u∈ C([0,T),bmo(Rd)d) of the Navier-Stokes equations such that every u(t) has an analytic extension on a complex domain whose size only depends on t (and increases with t) and the external force f, assuming only that the initial velocity u0 is a local BMO function. Our method for proving is a combination and refinement of the work by Gruji\'c and Kukavica [13], Guberovi\'c [15] and Kozono et al. [18]. One challenging step is the estimation of the heat and Stokes semigroups from BMO-type spaces to L∞; a result itself of independent interest. We also apply the idea to the analyticity of vorticity with the assistance of Calder\'on-Zygmund theory.