Piotr Sitko
Published 2001-06-08Version 1
The exclusion statistics parameter of composite fermions is determined as an odd number ($\alpha=3$, 5, ...). The statistics of composite fermion excitations at $\nu= \frac{n}{2pn+1}$ is rederived as $\alpha_{qe}^{CF}=1+\frac{2p}{2pn+1}$, $\alpha_{qh}^{CF}=1-\frac{2p}{2pn+1}$. The duality $\frac{1}{\alpha_{qe}(n,2p)}=\alpha_{qh}(n+1,2p)$ is found. The distribution function for $\alpha=3$ is obtained.
Comments: 4 pages (in Latex), proceedings for the EP2DS14 Conference
Charge and Statistics of Quasiholes in Pfaffian States of Composite Fermion Excitations
The Composite Fermion Hierarchy: Condensed States of Composite Fermion Excitations?
Exclusion Statistics of Quasiparticles in Condensed States of Composite Fermion Excitations
