Global regular periodic solutions to equations of weakly compressible barotropic fluid motions

Abstract

We consider barotropic motions described by the compressible Navier-Stokes equations in a box with periodic boundary conditions. We are looking for density in the form =a+η, where a is a constant and η|t=0 is sufficiently small in H2-norm. We assume existence of potentials and such that v=∇+rot. Next we assume that ∇|t=0 is sufficiently small in H2-norm too. Finally, we assume that the second viscosity coefficient is sufficiently large. Then we prove long time existence of solutions such that v∈ L∞(0,T;H2()) L2(0,T;H3()), v,t∈ L∞(0,T;H1()) L2(0,T;H2()), where the existence time T is proportional to . Next for T sufficiently large we obtain that v(T) is correspondingly small so global existence is proved using the methods appropriate for problems with small data.