Abstract
In this article, we solve the Stokes problem in an exterior domain of R-3, with non-standard boundary conditions. Our approach uses weighted Sobolev spaces to prove the existence, uniqueness of weak and strong solutions. This work is based on the vector potentials studied in [7] for exterior domains, and in [1] for bounded domains. This problem is well known in the classical Sobolev spaces W-m,W-2 Omega when Omega is bounded; see [3, 4].