Classifying Entanglement in Quantum Memory via a Recursive Bell-Inequalities

Classifying Entanglement in Quantum Memoryvia a Recursive Bell-Inequalities Sixia Yu, Zeng-Bing Chen, Jian-Wei Pan, and Yong-De Zhang Department of Modern PhyiscsUniversity of Science and Technology of ChinaHefei 230027, China

Abstract We present an entanglement classification for all states of N-qubit (quantum memory) by using a quadratic Bell- Inequalities, consisted of the recursive Mermin-Klyshko polynomials. An integer index can be used to classify the entanglement, where is the total number of entangled qubits in N-qubit, is the number of the groups of entangled qubits. is a sequence of entanglement-partition to N-qubits. The larger the entanglement index of a state, the more entangled is the state in the sense that a larger maximal violation of the Bell-inequalities as follows

I ) Entanglement Index [1] As an explanation, we consider an example of N=4. In which there are five different entanglement-types: i) 4 qubits are fully entangled , , , ii) 1 entangled 3-qubit and single separable qubit ，，， iii) 2 pairs of entangled 2-qubit ，，， iv) 2 entangled 2-qubit and 2 separated qubits ，，， v) 4 qubits are fully separable states ，，，

The entanglement type and M-K polynomials[2、3] is invariant under the permutation of qubits. The number of partition in N is also number of irreducible representa- tions of the permutation group of N elements. Therefore we can label different types of entanglement of N-qubit by different partition of N. • For a given N-qubit system, we have i.e., there are (N-2) possible values of the entanglement Index. The largest entanglement index N+1 is possessed only by partition --fully entangled, while the smallest index 3 does not correspond to a single partition. In two cases of and , indexes are equal to 3. Therefore, they can’t be distinguished by the following quadratic Bell-inequalities.

2) Mremin-Klyshko polynomials • For a 2-qubit (A+B) system, there are only two types of entanglement, i.e., separated or entangled. If a state is separable (i.e., it is a pure product state or mixture of pure product states),it will satisfy the famous Bell-CHSH inequality, for all observables , where and are Pauli matrices for qubit A and B, and the norms of four real vectors are less than or equal to 1. The maximal violation (upper bound) of this inequality is for maximally entangled states.

For A system (N=1), define the 1st M-K polynomial as • For A+B system (N=2), the 2nd M-K polynomial as • For A+B system, using the 2nd M-K polynomial and the upper bound violating the Bell-CHSH inequality, we have[1] , for all states (inside circle); while the Bell-CHSH inequality is changed into the following form, , for all separable states (inside square)

For A+B+C system (N=3), the entanglement indexes are respectively, Simultaneously, we obtain the 3rd M-K polynomial from the recursive relation between them[3] Therefore, for all three types of entanglement, we have[1] [4] • Indeed, for all cases( ) of fully separated system , their results are same, i.e.,

In ━ diagram of the above 3-qubit system, the whole region is divided into three regions as follows: 1, the -type fully separable states are contained inside the region of the smallest square; 2, the -type entangled states are contained inside the region of the small circle; 3, the -type fully entangled states are contained inside the region of the bigger circle. The region outside the bigger circle is non-physical. • It is interesting to note that 3-qubit diagram looks like the shape of ancient-Chinese-coin----Kang-Xi coin(康熙钱) of Qing-Dynasty, while 2-qubit diagram looks like the Wang-mang coin(王莽钱)of Han-Dynasty.

3) Theorem of General Quadratic Bell- Inequalities[1] Here we present our main result in the form of a theorem. This theorem is stated in terms of the Mermin- Klyshko polynomials, and is expressed as a general quadratic Bell-inequalities with a recursive form. [General Bell-theorem with the entanglement index] “ For a N-qubit system, its Mermin-Klyshko polynomial satisfies the following quadratic Bell-inequalities, where is the N-th Mermin-Klyshko polynomial and is the entanglement index of this system.”

Proof: We use induction argument. Firstly, for above case of 3-qubit system (N=3), we have known that the theorem is true. Secondly, we may delete those qubits which are all single separable since they don’t affect this theorem holds: Without lost of generality, we may assume that the qubit added on N-1 qubit system is the N-th qubit and it is on a separable state, i.e., . Therefore, from the recursive relation of M-K polynomials, we may obtain where we denote for convenience. On the other hand, this don’t change the entanglement index

Thirdly, now we assume that the N-th qubit added is entangled with some qubits, and will affect and change the whole entanglement partition configuration, including previous N-1 qubits and the N-th qubit, i.e., Here, without lost of generality, we have assumed that the last qubits are entangled. From the recursive relation of M-K polynomials, we have also[5] Therefore, we obtain On the other hand, we have

Therefore, finally, we have References [1] Sixia Yu, Zeng-Bing Chen, Jian-Wei Pan, and Yong- De Zhang, Classifying N-Qubit Entanglement via Bell’s Inequalities, Phys. Rev. Lett. 90, 080401(1-4) (2003) [2] N.D.Mermin, Phys. Rev. Lett. 65, 1838(1990) [3] D.N.Klyshko, Phys.Lett.A172,399(1993); A.V.Belinskii and D.N.Klyshko, Phys. Usp. 36, 653(1993) [4] J.Uffink, Phys. Rev. Lett. 88, 230406(2002) [5] N.Gisin,H.Bechmann-Pasquinucci, Phys. Lett.A246, 1(1998).

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Classifying Entanglement in Quantum Memory via a Recursive Bell-Inequalities