Weighted estimate of the Stokes flow in the half space

## Abstract We establish the moment estimates for a class of global weak solutions to the Navier–Stokes equations in the half‐space. Copyright © 2009 John Wiley & Sons, Ltd.

## Abstract In this paper, we investigate the Stokes system and the biharmonic equation in a half‐space of ℝ^__n__^. Our approach rests on the use of a family of weighted Sobolev spaces as a framework for describing the behaviour at infinity. A complete class of existence, uniqueness and regularity

## Abstract In this paper we consider a resolvent problem of the Stokes operator with some boundary condition in the half space, which is obtained as a model problem arising in evolution free boundary problems for viscous, incompressible fluid flow. We show standard resolvent estimates in the __L~q

## Abstract ## SUMMARY The main objective of this paper is to propose two vorticity–vector potential formulations of the Stokes problem in the half space of ℝ^3^. Weighted spaces are used for describing the behaviour at large distances. ## RÉSUMÉ On propose deux formulations de type vorticité–po

We consider the motion of a fluid in the exterior of a rotating obstacle. This leads to a modified version of the Stokes system which we consider in the whole space R n , n = 2 or n = 3 and in an exterior domain D ⊂ R 3 . For every q ∈ (1, ∞) we prove existence of solutions and estimates in function