Related papers: Characterizing multipartite entanglement by violation of CHSH inequalities

Characterizing multipartite entanglement by violation of CHSH inequalities

URL: http://arxiv.org/abs/2003.08881v1
Date: Thu, 19 Mar 2020 16:07:07 GMT
Title: Characterizing multipartite entanglement by violation of CHSH inequalities
Authors: Ming Li, Huihui Qin, Chengjie Zhang, Shuqian Shen, Shao-Ming Fei, Heng Fan
Abstract summary: Entanglement of high-dimensional and multipartite quantum systems offer promising perspectives in quantum information processing. We consider the overlaps between the maximal quantum mean values and the classical bound of the CHSH inequalities for pairwise-qubit states in two-dimensional subspaces. We show that the concurrence of a pure state in any high-dimensional multipartite system can be equivalently represented by these overlaps.
Score: 15.437374103470939
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Entanglement of high-dimensional and multipartite quantum systems offer promising perspectives in quantum information processing. However, the characterization and measure of such kind of entanglement is of great challenge. Here we consider the overlaps between the maximal quantum mean values and the classical bound of the CHSH inequalities for pairwise-qubit states in two-dimensional subspaces. We show that the concurrence of a pure state in any high-dimensional multipartite system can be equivalently represented by these overlaps. Here we consider the projections of an arbitrary high-dimensional multipartite state to two-qubit states. We investigate the non-localities of these projected two-qubit sub-states by their violations of CHSH inequalities. From these violations, the overlaps between the maximal quantum mean values and the classical bound of the CHSH inequality, we show that the concurrence of a high-dimensional multipartite pure state can be exactly expressed by these overlaps. We further derive a lower bound of the concurrence for any quantum states, which is tight for pure states. The lower bound not only imposes restriction on the non-locality distributions among the pairwise qubit states, but also supplies a sufficient condition for distillation of bipartite entanglement. Effective criteria for detecting genuine tripartite entanglement and the lower bound of concurrence for genuine tripartite entanglement are also presented based on such non-localities.

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