On an inhomogeneous slip-inflow boundary value problem for a steady flow of a viscous compressible fluid in a cylindrical domain

Abstract

We investigate a steady flow of a viscous compressible fluid with inflow boundary condition on the density and inhomogeneous slip boundary conditions on the velocity in a cylindrical domain = 0 × (0,L) ∈ R3. We show existence of a solution (v,) ∈ W2p() × W1p(), where v is the velocity of the fluid and is the density, that is a small perturbation of a constant flow ( v [1,0,0], 1). We also show that this solution is unique in a class of small perturbations of ( v, ). The term u · ∇ w in the continuity equation makes it impossible to show the existence applying directly a fixed point method. Thus in order to show existence of the solution we construct a sequence (vn,n) that is bounded in W2p() × W1p() and satisfies the Cauchy condition in a larger space L∞(0,L;L2(0)) what enables us to deduce that the weak limit of a subsequence of (vn,n) is in fact a strong solution to our problem.