Existence of periodic solutions for a one-dimensional isentropic model system of compressible viscous gas

In the present short article, we shall introduce our recent results discussed in \([\mathrm{r} \mid\) on large-time behaviors of solutions to the initial boundary value problems in the half space for a one-dimensional isentropic model system of compressible viscous gas. In particular, we focus our a

The aim of this paper is to discuss the global existence and uniqueness of strong solution for a class of the isentropic compressible Navier-Stokes equations with non-Newtonian in one-dimensional bounded intervals. We prove two global existence results on strong solutions of the isentropic compressi

We consider a model of thermal dissipation for a Stefan}Boltzmann model of viscous and reactive gas in a bounded interval. We prove the existence of a global-in-time solution, and we give the asymptotic behaviour for the corresponding Dirichlet problem.

In this article, we give a necessary condition for the existence of periodic solutions of certain three dimensional autonomous systems. This may become useful in further investigations. Our claims are proved and supported by certain examples for the third order autonomous systems.