The Navier--Stokes equations in exterior Lipschitz domains: Lp-theory

Abstract

We show that the Stokes operator defined on Lpσ () for an exterior Lipschitz domain ⊂ Rn (n ≥ 3) admits maximal regularity provided that p satisfies | 1/p - 1/2| < 1/(2n) + for some > 0. In particular, we prove that the negative of the Stokes operator generates a bounded analytic semigroup on Lpσ () for such p. In addition, Lp-Lq-mapping properties of the Stokes semigroup and its gradient with optimal decay estimates are obtained. This enables us to prove the existence of mild solutions to the Navier--Stokes equations in the critical space L∞ (0 , T ; L3σ ()) (locally in time and globally in time for small initial data).