Well-posedness of the Stokes-transport system in bounded domains and in the infinite strip

Abstract

We consider the Stokes-transport system, a model for the evolution of an incompressible viscous fluid with inhomogeneous density. This equation was already known to be globally well-posed for any L1 L∞ initial density with finite first moment in R3. We show that similar results hold on different domain types. We prove that the system is globally well-posed for L∞ initial data in bounded domains of R2 and R3 as well as in the infinite strip R×(0,1). These results contrast with the ill-posedness of a similar problem, the incompressible porous medium equation, for which uniqueness is known to fail for such a density regularity.