Entanglement and non-classical properties of generalized supercoherent states

Abstract

Three classes of generalized supercoherent states have been recently introduced, degenerate, singular and generic. We have studied the entanglement, squeezing and statistical properties of these supercoherent states. Using concurrence, we calculate the entanglement of these states. We find that the degenerate and the generic supercoherent states classes may be entangled and squeezed. While the singular supercoherent states generally have Poissonian statistics, the degenerate and generic classes have sub-Poissonian statistics in some ranges of the parameters. Also, we have optimized the super-annihilation operator which has been used to obtain maximum of entanglement.