Navier-Stokes equations in Besov space \(B^{-s}_{\infty ,\infty}({\mathbb R}^n_+)\) (Q2870418)

This paper is devoted to the construction of a mild solution for special initial data of the Navier-Stokes equations. The equations are considered in the \(n\)-dimensional half space \({\mathbb{R}}^{n}_{+}, n \geq 2\). The initial data are supposed to belong to the Besov space \(B_{\infty,\infty}^{-\alpha}({\mathbb{R}} _{+}^{n}), 0 < \alpha < 1\). For this purpose the author derives estimates of the Stokes flow with singular initial data in \(B_{\infty, q}^{-\alpha}({\mathbb{R}} _{+}^{n}), 0 < \alpha < 1, 1 < q \leq \infty \). The author gives an interesting survey about the preceding results for similar questions. He applies modern tools like the theory of semigroups, the potential theory with Green functions or the Helmholtz-Weyl projection operator. The proofs are presented in full detail.NEWLINENEWLINEThe bibliography contains 23 items.