Tripartite Entanglement and Quantum Correlation
Abstract
We provide an analytical tripartite-study from the generalized -matrix. It provides the upper bound of the maximum violation of Mermin's inequality. For a generic 2-qubit pure state, the concurrence or -matrix characterizes the maximum violation of Bell's inequality. Therefore, people expect that the maximum violation should be proper to quantify Quantum Entanglement. The -matrix gives the maximum violation of Bell's inequality. For a general 3-qubit state, we have five invariant entanglement quantities up to local unitary transformations. We show that the five invariant quantities describe the correlation in the generalized -matrix. The violation of Mermin's inequality is not a proper diagnosis due to the non-monotonic behavior. We then classify 3-qubit quantum states. Each classification quantifies Quantum Entanglement by the total concurrence. In the end, we relate the experiment correlators to Quantum Entanglement.
Cite
@article{arxiv.2103.02983,
title = {Tripartite Entanglement and Quantum Correlation},
author = {Xingyu Guo and Chen-Te Ma},
journal= {arXiv preprint arXiv:2103.02983},
year = {2023}
}
Comments
16 pages, 4 figures, minor changes, reference added