Navier-Stokes equations

BEIRÃO DA VEIGA, The stability of one dimensional stationary flows of compressible viscous fluids, Quaderni dell’Istituto di Matematiche Appli-. cate

The first global well-posedness result was established by Kazhikhov–Shelukhin [21], where they proved the global well-posedness of strong solutions of the initial boundary value

The proof is based on the weighted estimates of both pressure and kinetic energy for the approximate system which result in some higher integrability of the density, and the method

in Sobolev spaces of sufficiently high order, then we show the existence of a solution in a particular case and finally we solve the general case by using the

We first establish the existence and uniqueness of the solution for the two-dimensional unsteady linearized compressible Navier–Stokes equations in a rectangle with

Tartar, Incompressible fluid flow in a porous medium: convergence of the homogenization process, in Nonhomogeneous media and vibration theory, edited by E. Temam,

In this paper, in order to approximate the solution of discretized problem (10, 11), we use the Galerkin method for the momentum and continuity equations which allows to circumvent

We first study the local stabilization of the one dimensional compressible Navier-Stokes system, with periodic boundary conditions, by a distributed control... Let ω be any