4-Velocity distribution function using Maxwell-Boltzmann's original approach and a new form of the relativistic equation of state

Abstract

Following the original approach of Maxwell-Boltzmann(MB), we derive a 4-velocity distribution function for the relativistic ideal gas. This distribution function perfectly reduces to original MB distribution in the non-relativistic limit. We express the relativistic equation of state(EOS), -0=(γ-1)-1p,\ in the two equations: =0 f(λ),\ and p=0 g(λ), where λ\ is a parameter related to the kinetic energy, hence the temperature, of the gas. In the both extreme limits, they give correct EOS:\ =3p\ in the ultra-relativistic, and\ -0=3/2p in the non-relativistic regime. Using these equations the adiabatic index γ (=cpcv) and the sound speed as are calculated as a function of λ. They also satisfy the inequalities: 4/3 γ 5/3 and as 13 perfectly.