| A COMPREHENSIVE PROOF OF THE GREENBERGER-HORNE-ZEILINGER THEOREM FOR THE FOUR-QUBIT SYSTEM |
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| 作者姓名: | 唐莉 陈泽乾 钟杰 任耀峰 詹明生 |
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| 作者单位: | State Key Laboratory of Magnetic Resonance and Atomic and Molecular Physics Wuhan Institute of Physics and Mathematics Chinese Academy of Sciences,Wuhan 430071,China Center for Cold Atom Physics,Chinese Academy of Sciences,Wuhan 430071,China Graduate School,Chinese Academy of Sciences,Wuhan 430071,China,Wuhan Institute of Physics and Mathematics Chinese Academy of Sciences,Wuhan 430071,China,Wuhan Institute of Physics and Mathematics Chinese Academy of Sciences,Wuhan 430071,China Graduate School,Chinese Academy of Sciences,Wuhan 430071,China,Department of Mathematics The Naval University of Engineering,Wuhan 430033,China,State Key Laboratory of Magnetic Resonance and Atomic and Molecular Physics Wuhan Institute of Physics and Mathematics,Chinese Academy of Sciences,Wuhan 430071,China Center for Cold Atom Physics,Chinese Academy of Sciences,Wuhan 430071,China |
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| 基金项目: | 国家自然科学基金,funds from Chinese Academy of Sciences |
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| 摘 要: | Greenberger-Horne-Zeilinger(GHZ)theorem asserts that there is a set of mutually commuting nonlocal observables with a common eigenstate on which those ob- servables assume values that refute the attempt to assign values only required to have them by the local realism of Einstein,Podolsky,and Rosen(EPR).It is known that for a three-qubit system.there is only one form of the GHZ-Mermin-like argument with equiva- lence up to a local unitary transformation,which is exactly Mermin's version of the GHZ theorem.This article for a four-qubit system,which was originally studied by GHZ,the authors show that there are nine distinct forms of the GHZ-Mermin-like argument.The proof is obtained using certain geometric invariants to characterize the sets of mutually commuting nonlocal spin observables on the four-qubit system.It is proved that there are at most nine elements(except for a different sign)in a set of mutually commuting nonlocal spin observables in the four-qubit system,and each GHZ-Mermin-like argument involves a set of at least five mutually commuting four-qubit nonlocal spin observables with a GHZ state as a common eigenstate in GHZ's theorem.Therefore,we present a complete construction of the GHZ theorem for the four-qubit system.
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| 关 键 词: | GHZ定理 GHZ状态 多量子位系统 单式转化 本征函数 |
| 修稿时间: | 2005-12-08 |
A comprehensive proof of the Greenberger–Horne–Zeilinger theorem for the four-qubit system |
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| Tang Li, Chen Zeqian, Zhong Jie, Ren Yaofeng,Zhan Mingsheng.A COMPREHENSIVE PROOF OF THE GREENBERGER-HORNE-ZEILINGER THEOREM FOR THE FOUR-QUBIT SYSTEM[J].Acta Mathematica Scientia,2007,27(4):753-776. |
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| Authors: | Tang Li Chen Zeqian Zhong Jie Ren Yaofeng Zhan Mingsheng |
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| Institution: | State Key Laboratory of Magnetic Resonance and Atomic and Molecular Physics, Wuhan Institute of Physics and Mathematics, Chinese Academy of Sciences, Wuhan 430071, China Center for Cold Atom Physics, Chinese Academy of Sciences, Wuhan 430071, China Graduate School, Chinese Academy of Sciences, Wuhan 430071, China;Wuhan Institute of Physics and Mathematics, Chinese Academy of Sciences, Wuhan 430071, China;Wuhan Institute of Physics and Mathematics, Chinese Academy of Sciences, Wuhan 430071, China Graduate School, Chinese Academy of Sciences, Wuhan 430071, China;Department of Mathematics, The Naval University of Engineering, Wuhan 430033, China; State Key Laboratory of Magnetic Resonance and Atomic and Molecular Physics, Wuhan Institute of Physics and Mathematics, Chinese Academy of Sciences, Wuhan 430071, China Center for Cold Atom Physics, Chinese Academy of Sciences, Wuhan 430071, China |
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| Abstract: | Greenberger-Horne-Zeilinger (GHZ) theorem asserts that there is a set of mutually commuting nonlocal observables with a common eigenstate on which those observables assume values that refute the attempt to assign values only required to have them by the local realism of Einstein, Podolsky, and Rosen (EPR). It is known that for a three-qubit system, there is only one form of the GHZ-Mermin-like argument with equivalence up to a local unitary transformation, which is exactly Mermin's version of the GHZ theorem. This article for a four-qubit system, which was originally studied by GHZ, the authors show that there are nine distinct forms of the GHZ-Mermin-like argument. The proof is obtained using certain geometric invariants to characterize the sets of mutually commuting nonlocal spin observables on the four-qubit system. It is proved that there are at most nine elements (except for a different sign) in a set of mutually commuting nonlocal spin observables in the four-qubit system, and each GHZ-Mermin-like argument involves a set of at least fivemutually commuting four-qubit nonlocal spin observables with a GHZ state as a common eigenstate in GHZ's theorem. Therefore, we present a complete construction of the GHZ theorem for the four-qubit system. |
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| Keywords: | GHZ theorem GHZ state multi-qubit system |
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