A Lorentz invariant velocity distribution for a relativistic gas

Abstract

We derive a Lorentz invariant distribution of velocities for a relativistic gas. Our derivation is based on three pillars: the special theory of relativity, the central limit theorem and the Lobachevskyian structure of the velocity space of the theory. The rapidity variable plays a crucial role in our results. For v2/c2 1 and 1/β=kT/2 m0 c2 1 the distribution tends to the Maxwell-Boltzmann distribution. The mean v2 evaluated with the Lorentz invariant distribution is always smaller than the Maxwell-Boltzmann mean and is bounded by v2 /c2=1. This implies that for a given v2 the temperature is larger than the temperature estimated using the Maxwell-Boltzmann distribution. For temperatures of the order of T 1012~ K and T 108~ K the difference is of the order of 10 \%, respectively for particles with the hydrogen and the electron rest masses.