Global regular periodic solutions to equations of weakly compressible barotropic fluid motions (1810.04926v3)

Abstract: We consider barotropic motions described by the compressible Navier-Stokes equations in a box with periodic boundary conditions. We are looking for density $\varrho$ in the form $\varrho=a+\eta$, where $a$ is a constant and $\eta|{t=0}$ is sufficiently small in $H^2$-norm. We assume existence of potentials $\varphi$ and $\psi$ such that $v=\nabla\varphi+\mathrm{rot}\psi$. Next we assume that $\nabla\varphi|{t=0}$ is sufficiently small in $H^2$-norm too. Finally, we assume that the second viscosity coefficient $\nu$ is sufficiently large. Then we prove long time existence of solutions such that $v\in L_\infty(0,T;H^2(\Omega))\cap L_2(0,T;H^3(\Omega))$, $v_{,t}\in L_\infty(0,T;H^1(\Omega))\cap L_2(0,T;H^2(\Omega))$, where the existence time $T$ is proportional to $\nu$. 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.