We study the effect of the Maximum Entropy Principle (MEP) on the thermodyn
amic behaviour of gases. The MEP relies on the kinetic theory of gases and
yields the local constitutive equations of Extended Thermodynamics.
There are two extreme cases on the scale of the kinetic theory: Dominance o
f particle interactions and free flight. In its current form the MEP gives
the phase density that maximizes the entropy at each instant of time. This
is appropriate in case of dominant particle interaction but it is not adequ
ate for free flight. Here we introduce a modified MEP that is capable to li
nk both extreme cases.
To illustrate the way the modified MEP works, we consider an example which
leads in the case of dominant particle interactions to the EULER equations.
In addition there results a representation theorem that contains the globa
l solutions of the EULER equations with all shock interactions for arbitrar
y large variations of the initial data.