Irreversibility of Entanglement Concentration for Pure State

Abstract

For a pure state on a composite system HAB, both the entanglement cost EC() and the distillable entanglement ED() coincide with the von Neumann entropy H(TrB). Therefore, the entanglement concentration from the multiple state n of a pure state to the multiple state Ln of the EPR state seems to be able to be reversibly performed with an asymptotically infinitesimal error when the rate Ln/n goes to H(TrB). In this paper, we show that it is impossible to reversibly perform the entanglement concentration for a multiple pure state even in asymptotic situation. In addition, in the case when we recover the multiple state Mn after the concentration for n, we evaluate the asymptotic behavior of the loss number n-Mn of . This evaluation is thought to be closely related to the entanglement compression in distant parties.