Global regular motions for compressible barotropic viscous fluids. Stability

Abstract

We consider viscous compressible barotropic motions in a bounded domain ⊂ R3 with the Dirichlet boundary conditions for velocity. We assume the existence of some special sufficiently regular solutions vs (velocity), s (density) of the problem. By the special solutions we can choose spherically symmetric solutions. Let v, be a~solution to our problem. Then we are looking for differences u=v-vs, η=-s. We prove existence of u, η such that u,η∈ L∞(kT,(k+1)T;H2()), ut,ηt∈ L∞(kT,(k+1)T;H1()), u∈ L2(kT,(k+1)T;H3()), ut∈ L2(kT,(k+1)T;H2()), where T>0 is fixed and k ∈ N \0 \. Moreover, u, η are sufficiently small in the above norms. This also means that stability of the special solutions vs, s is proved. Finally, we proved existence of solutions such that v=vs+u, =s+η.