Thermodynamic properties of particles with intermediate statistics.

Abstract

Analytic expressions for the distribution function of an ideal gas of particles (exclusons) which have statistics intermediate between Fermi-Dirac and Bose-Einstein are obtained for all values of the Haldane statistics parameter \ensuremath{\alpha}\ensuremath{\in}[0,1]. The analytic structure of the distribution function is investigated and found to have no singularities in the physical region when the parameter \ensuremath{\alpha} lies in the range 0\ensuremath{\le}1. High- and low-temperature series are also derived for the internal energy E and heat capacity ${\mathit{C}}_{\mathit{V}}$ of the D-dimensional excluson gas. The low-temperature series for the thermodynamic properties illustrate the pseudofermion nature of exclusons. \textcopyright{} 1996 The American Physical Society.