Lq-estimates for the stationary Oseen equations on the exterior of a rotating obstacle

We study the Dirichlet problem for the stationary Oseen equations around a rotating body in an exterior domain. Our main results are the existence and uniqueness of weak and very weak solutions satisfying appropriate L-q-estimates. The uniqueness of very weak solutions is shown by the method of cut-off functions with an anisotropic decay. Then our existence result for very weak solutions is deduced by a duality argument from the existence and estimates of strong solutions. From this and interior regularity of very weak solutions, we finally establish the complete D-1,D-r-result for weak solutions of the Oseen equations around a rotating body in an exterior domain, where 4/3<r <4. Here, D-1,D-r is the homogeneous Sobolev space.