On weak solutions to the 1d compressible Navier-Stokes equations: a Lipschitz continuous dependence on data in weaker norms and an error of their homogenization

Abstract

We deal with the global in time weak solutions to the 1D compressible Navier-Stokes system of equations for large discontinuous initial data and nonhomogeneous boundary conditions of three standard types. We prove the Lipschitz-type continuous dependence of the solution (η,u,θ), in a norm slightly stronger than L2,∞(Q)× L2(Q)× L2(Q), on the initial data (η0,u0,e0) in a norm of L2()× H-1()× H-1()-type and also on the free terms in all the equations in some dual norms. Here η, u and θ are the specific volume, velocity and absolute temperature as well as η0, u0 and e0 are the initial specific volume, velocity and specific total energy, and Q=× (0,T). We also apply this result to the case of discontinuous rapidly oscillating, with the period , initial data and free terms and derive an estimate O() for the difference between the solutions to the Navier-Stokes equations and their Bakhvalov-Eglit two-scale homogenized version with averaged data.