Let us now consider a bipartition of the system V as A ∪ B = V , and A ∩ B = ∅, where dA = dim(HA) (dB = HB), HA (HB) being the Hilbert space asso- ciated to A (B)

Bipartite entanglement Let us consider a system of qubits V ≡ {1, 2, · · · , N} forming a connected graph G

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Localizing genuine multiparty entanglement in noisy stabilizer states

quant-ph · 2022-11-02 · unverdicted · novelty 5.0

Lower bounds on localizable genuine multiparty entanglement are computed for graph states and toric codes under single-qubit Pauli noise, revealing critical noise strengths beyond which post-measurement states are biseparable.

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Localizing genuine multiparty entanglement in noisy stabilizer states quant-ph · 2022-11-02 · unverdicted · none · ref 13
Lower bounds on localizable genuine multiparty entanglement are computed for graph states and toric codes under single-qubit Pauli noise, revealing critical noise strengths beyond which post-measurement states are biseparable.

Let us now consider a bipartition of the system V as A ∪ B = V , and A ∩ B = ∅, where dA = dim(HA) (dB = HB), HA (HB) being the Hilbert space asso- ciated to A (B)

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