Qiuping A. Wang, A. Le Mehaute, L. Nivanen, M. Pezeril
Published 2003-04-17, updated 2003-04-18Version 2
We show that it is possible to replace the actual implicit distribution function of the fractional exclusion statistics by an explicit one whose form does not change with the parameter $\alpha$. This alternative simpler distribution function given by a generalization of Pauli exclusion principle from the level of the maximal occupation number is not completely equivalent to the distributions obtained from the level of state number counting of the fractional exclusion particles. Our result shows that the two distributions are equivalent for weakly bosonized fermions ($\alpha>>0$) at not very high temperatures.
Comments: 8 pages, 3 eps figures, TeX. Nuovo Cimento B (2004), in press
Journal: Nuovo Comento B, 06, 635(2003)
Stochastic simulations for the time evolution of systems which obey generalized statistics: Fractional exclusion statistics and Gentile's statistics
Properties of Fractional Exclusion Statistics in Interacting Particle Systems
Comment on ``Quantum Statistical Mechanics of an Ideal Gas with Fractional Exclusion Statistics in Arbitrary Dimension"
