Relativistic statistical systems of particles with scalar interactions
Abstract
On the basis of a generally covariant LiouvilleVlasov equation, relativistic statistical systems of particles interacting by means of chiral of other nonlinear fields are considered. A functional arbitrariness in description of such systems is found. Exact solutions of the kinetic equation, depending on the linear first integral of equations of motion, are found. For a twocomponent statistical system with a neutral scalar field which is described by a power Vlasov distribution function, the critical temperature is found, which separates chargesymmetric and chargeasymmetric ground states of the system.
 Publication:

Soviet Physics Journal
 Pub Date:
 January 1983
 DOI:
 10.1007/BF00892176
 Bibcode:
 1983SvPhJ..26...31I