Maximal qubit violation of n-locality inequalities in a star-shaped quantum network

A tripartite quantum network is said to be bilocal if two independent sources produce a pair of bipartite entangled states. Quantum non-bilocal correlation emerges when the central party which possesses two particles from two different sources performs Bell-state measurement on them and nonlocality is generated between the other two uncorrelated systems in this entanglementswapping protocol. The interaction of such systems with the environment reduces quantum nonbilocal correlations. Here we show that the diminishing effect modelled by the amplitude damping channel can be slowed down by employing the technique of weak measurements and reversals. It is demonstrated that for a large range of parameters the quantum non-bilocal correlations are preserved against decoherence by taking into account the average success rate of the post-selection governing weak measurements.

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“…. The maximum of the quantity B 22 can be calculated following the method described in [26]. Using Eq.…”

Section: Case-1mentioning

confidence: 99%

Preservation of quantum nonbilocal correlations in noisy entanglement-swapping experiments using weak measurements

2018

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“…Recently, nonlinear Bell-type inequalities are proposed for verifying the non-trilocality [40] or non-bilocality [6,41] of correlations originating from the standard entanglement swapping. It is then extended for star-shaped networks [43] or small-sized networks [44,45]. Another procedure is iteratively expanding a given network into the desired network [46].…”

Section: Introductionmentioning

confidence: 99%

“…It follows a new joint conditional probability distribution asSimilar to verifying single entanglement [2, 8], how to decide the nonlocality of a quantum network is also a fundamental question. Nevertheless, identifying the nonlocality of a general quantum network remains an extremely difficult problem [40][41][42][43][44][45][46][47].Here, we introduce a new framework for exploring the nonlocality of all quantum networks. Given a quantum network consisting of a joint quantum system ρ = ρ 1 ⊗ · · · ⊗ ρ k shared by n observers, the main idea is to create quantum subnetworks for special observers (Alice and Charlie shown in Figure 1).…”

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confidence: 99%

“…Additionally, the proof of Theorem 1 also provided an interesting by-product that universal Bell inequality exists for detecting a single entanglement by using local projection and entanglement distilling [1].Nonlocality of all connected quantum networks. The Λ-shaped quantum network can be generalized to chain-shaped quantum networks [7,46] or star-shaped quantum networks with several observers [7,43,46]. Here, we further consider a general quantum network N q with the connectivity in its schematic graph scenario.…”

mentioning

confidence: 99%

“…Similar to verifying single entanglement [2, 8], how to decide the nonlocality of a quantum network is also a fundamental question. Nevertheless, identifying the nonlocality of a general quantum network remains an extremely difficult problem [40][41][42][43][44][45][46][47].…”

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confidence: 99%

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Nonlocality of all quantum networks

Luo

2018

Phys. Rev. A

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The multipartite correlations derived from local measurements on some composite quantum systems are inconsistent with those reproduced classically. This inconsistency is known as quantum nonlocality and shows a milestone in the foundations of quantum theory. Still, it is NP hard to decide a nonlocal quantum state. We investigate an extended question: how to characterize the nonlocal properties of quantum states that are distributed and measured in networks. We first prove the generic tripartite nonlocality of chain-shaped quantum networks using semiquantum nonlocal games. We then introduce a new approach to prove the generic activated nonlocality as a result of entanglement swapping for all bipartite entangled states. The result is further applied to show the multipartite nonlocality and activated nonlocality for all nontrivial quantum networks consisting of any entangled states. Our results provide the nonlocality witnesses and quantum superiorities of all connected quantum networks or nontrivial hybrid networks in contrast to classical networks. arXiv:1806.09758v1 [quant-ph] 26 Jun 2018 {τ a1 , ∀a 1 }, · · · , {τ an , ∀a n } are assumed for all observers shown in Figure 1. It follows a new joint conditional probability distribution asSimilar to verifying single entanglement [2, 8], how to decide the nonlocality of a quantum network is also a fundamental question. Nevertheless, identifying the nonlocality of a general quantum network remains an extremely difficult problem [40][41][42][43][44][45][46][47].Here, we introduce a new framework for exploring the nonlocality of all quantum networks. Given a quantum network consisting of a joint quantum system ρ = ρ 1 ⊗ · · · ⊗ ρ k shared by n observers, the main idea is to create quantum subnetworks for special observers (Alice and Charlie shown in Figure 1). If some nonlocal correlations can be observed in these subnetworks, they are provided by the quantum state ρ, which is then multipartite nonlocal. Within the new scenario, we investigate the activation phenomena for these subnetworks consisting of all independent observers without prior sharing entanglement. It is of the multipartite nonlocality in a network scenario.Definition 1. A quantum network N q is multipartite nonlocal if a set of observables existing for all observers such that multipartite quantum correlations from local measurements are inconsistent with these from the generalized local realism.Definition 2. A quantum network N q consisting of n observers is k-partite activated nonlocal if for any s observers p i1 , · · · , p is with 2 ≤ s ≤ k, there is a set of observables for all observers such that a local measurement of n − s observers p j s with j ∈ {1, · · · , n}\{i 1 , · · · , i s } creates a s-partite nonlocal subnetwork.Nonlocality of all Λ-shaped quantum networks. Consider a Λ-shaped quantum network N q consisting of three observers Alice, Bob and Charlie shown in Figure 1. The nontrivial feature of N q is entanglement swapping [26,41]. Different from the standard nonlocality [3, 6, 8, 9] de...

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Generalized n‐Locality Inequalities in Linear‐Chain Network for Arbitrary Inputs Scenario and Their Quantum Violations

Kumar

Pan

2022

Annalen der Physik

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Multipartite nonlocality in a network is conceptually different from standard multipartite Bell nonlocality. In recent times, network nonlocality has been studied for various topologies. A linear‐chain topology of the network is considered and the quantum nonlocality (the non‐n‐locality) is demonstrated. Such a network scenario involves n number of independent sources and n+1$n+1$ parties, two edge parties (Alice and Charlie), and n−1$n-1$ central parties (Bobs). It is commonly assumed that each party receives only two inputs. In this work, a generalized scenario where the edge parties receive an arbitrary n number of inputs (equals to a number of independent sources) is considered and each of the central parties receives two inputs. A family of generalized n‐locality inequalities for a linear‐chain network for arbitrary n is derived and the optimal quantum violation of the inequalities is demonstrated. An elegant sum‐of‐squares approach enabling the derivation of the optimal quantum violation of aforesaid inequalities without assuming the dimension of the system is introduced. It is shown that the optimal quantum violation requires the observables of edge parties to be mutually anticommuting.

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Maximal qubit violation of n-locality inequalities in a star-shaped quantum network

Cited by 84 publications

References 42 publications

Preservation of quantum nonbilocal correlations in noisy entanglement-swapping experiments using weak measurements

Preservation of quantum nonbilocal correlations in noisy entanglement-swapping experiments using weak measurements

Nonlocality of all quantum networks

Generalized n‐Locality Inequalities in Linear‐Chain Network for Arbitrary Inputs Scenario and Their Quantum Violations

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