Monogamy equality in 2 2 d quantum systems

Abstract

There is an interesting property about multipartite entanglement, called the monogamy of entanglement. The property can be shown by the monogamy inequality, called the Coffman-Kundu-Wootters inequality [Phys. Rev. A 61, 052306 (2000); Phys. Rev. Lett. 96, 220503 (2006)], and more explicitly by the monogamy equality in terms of the concurrence and the concurrence of assistance, CA(BC)2=CAB2+(CACa)2, in the three-qubit system. In this paper, we consider the monogamy equality in 2 2 d quantum systems. We show that CA(BC)=CAB if and only if CACa=0, and also show that if CA(BC)=CACa then CAB=0, while there exists a state in a 2 2 d system such that CAB=0 but CA(BC)>CACa.