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Sequential sharing of two-qudit entanglement based on the entropic uncertainty relation

Ming‐Liang Hu, Heng Fan

2023Physical review. A/Physical review, A21 citationsDOI

Abstract

Entanglement and uncertainty relation are two focuses of quantum theory. We relate entanglement sharing to the entropic uncertainty relation in a $(d\ifmmode\times\else\texttimes\fi{}d)$-dimensional system via weak measurements with different pointers. We consider both the scenarios of one-sided sequential measurements in which the entangled pair is distributed to multiple Alices and one Bob and two-sided sequential measurements in which the entangled pair is distributed to multiple Alices and Bobs. It is found that the maximum number of observers sharing the entanglement strongly depends on the measurement scenarios, the pointer states of the apparatus, and the local dimension $d$ of each subsystem, while the required minimum measurement precision to achieve entanglement sharing decreases to its asymptotic value with the increase of $d$. The maximum number of observers remain unaltered even when the state is not maximally entangled but has strong-enough entanglement.

Topics & Concepts

Quantum entanglementRelation (database)Entropic uncertaintyStatistical physicsComputer scienceTheoretical physicsTheoretical computer scienceQuantum mechanicsMathematicsPhysicsUncertainty principleData miningQuantumQuantum Information and CryptographyQuantum Mechanics and ApplicationsQuantum Computing Algorithms and Architecture
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