Domain Dependence of Solutions to Compressible Navier–Stokes Equations

## Abstract We prove a general compactness result for the solution set of the compressible Navier–Stokes equations with respect to the variation of the underlying spatial domain. Among various corollaries, we then prove a general existence theorem for the system in question with no restrictions on

## Abstract We consider the Navier–Stokes equations for compressible, barotropic flow in two space dimensions, with pressure satisfying __p__(ϱ)=__a__ϱlog^__d__^(ϱ) for large ϱ, here __d__>1 and __a__>0. After introducing useful tools from the theory of Orlicz spaces, we prove a compactness result

We study a steady-state, viscous, compressible Navier-Stokes flow in a rectangle \(\Omega \equiv(0,1) \times(-1,1)\) with the boundary condition \((u, v)=(1,0)\) for the velocity field \((u, v)\) and the condition \(p(0, y)=p^{0}(y)\) for the pressure \(p\) on \(\{0\} \times(-1,1)\), which is the pa