On the long time behaviour of solutions to the Navier-Stokes-Fourier system on unbounded domains

Abstract

We consider the Navier-Stokes-Fourier system on an unbounded domain in the Euclidean space R3, supplemented by the far field conditions for the phase variables, specifically: 0,\ ∞, \ u 0 as \ |x| ∞. We study the long time behaviour of solutions and we prove that any global-in-time weak solution to the NSF system approaches the equilibrium s = 0,\ s = ∞,\ us = 0 in the sense of ergodic averages for time tending to infinity. As a consequence of the convergence result combined with the total mass conservation, we can show that the total momentum of global-in-time weak solutions is never globally conserved.