Soojoon Lee scite author profile

We extend the concept of the negativity, a good measure of entanglement for bipartite pure states, to mixed states by means of the convex-roof extension. We show that the measure does not increase under local quantum operations and classical communication, and derive explicit formulae for the entanglement measure of isotropic states and Werner states, applying the formalism presented by Vollbrecht and Werner [Phys. Rev. A 64, 062307 (2001)].

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Concentrating Tripartite Quantum Information

Streltsov

2015

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We introduce the concentrated information of tripartite quantum states. For three parties Alice, Bob, and Charlie, it is defined as the maximal mutual information achievable between Alice and Charlie via local operations and classical communication performed by Charlie and Bob. We derive upper and lower bounds to the concentrated information, and obtain a closed expression for it on several classes of states including arbitrary pure tripartite states in the asymptotic setting. We show that distillable entanglement, entanglement of assistance, and quantum discord can all be expressed in terms of the concentrated information, thus revealing its role as a unifying informational primitive. We finally investigate quantum state merging of mixed states with and without additional entanglement. The gap between classical and quantum concentrated information is proven to be an operational figure of merit for mixed state merging in the absence of additional entanglement. Contrary to the pure state merging, our analysis shows that classical communication in both directions can provide an advantage for merging of mixed states.

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Erratum: Strong Monogamy Conjecture for Multiqubit Entanglement: The Four-Qubit Case [Phys. Rev. Lett.113, 110501 (2014)]

Regula¹,

Martino²,

Lee³

et al. 2016

Phys. Rev. Lett.

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Strong Monogamy Conjecture for Multiqubit Entanglement: The Four-Qubit Case

et al. 2014

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We investigate the distribution of bipartite and multipartite entanglement in multiqubit states. In particular, we define a set of monogamy inequalities sharpening the conventional Coffman-Kundu-Wootters constraints, and we provide analytical proofs of their validity for relevant classes of states. We present extensive numerical evidence validating the conjectured strong monogamy inequalities for arbitrary pure states of four qubits.

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Soojoon Lee

Convex-roof extended negativity as an entanglement measure for bipartite quantum systems

Concentrating Tripartite Quantum Information

Erratum: Strong Monogamy Conjecture for Multiqubit Entanglement: The Four-Qubit Case [Phys. Rev. Lett.113, 110501 (2014)]

Strong Monogamy Conjecture for Multiqubit Entanglement: The Four-Qubit Case

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