The classical Chapman-Enskog expansions for the pressure deviator P and hea
t flux q provide a natural bridge between the kinetic description of gas dy
namics as given by the Boltzmann equation and continuum mechanics as given
by the balance laws of mass, momentum, energy supplemented by the expansion
s for P and q. Truncation of these expansions beyond first (Navier-Stokes)
order yields instability of the rest state and is inconsistent with thermod
ynamics. In this paper we propose a visco-elastic relaxation approximation
that eliminates the instability paradox. This system is weakly parabolic, h
as a linearly hyperbolic convection part, and is endowed with a generalized
entropy inequality. It agrees with the solution of the Boltzmann equation
up to the Burnett order via the Chapman Enskog expansion.