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Hilbert-Schmidt distance and entanglement witnessing

Palash Pandya, Omer Sakarya, Marcin Wieśniak

2020Physical review. A/Physical review, A24 citationsDOIOpen Access PDF

Abstract

Gilbert proposed an algorithm for bounding the distance between a given point and a convex set. We apply the Gilbert's algorithm to get an upper bound on the Hilbert-Schmidt distance between a given state and the set of separable states. While Hilbert-Schmidt distance does not form a proper entanglement measure, it can nevertheless be useful for witnessing entanglement. We provide a few methods based on the Gilbert's algorithm that can reliably qualify a given state as strongly entangled or practically separable, while being computationally efficient. The method also outputs successively improved approximations to the closest separable state for the given state. We demonstrate the efficacy of the method with examples.

Topics & Concepts

Quantum entanglementMathematicsState (computer science)Separable stateSeparable spaceMeasure (data warehouse)Set (abstract data type)Bounding overwatchRegular polygonPoint (geometry)AlgorithmDiscrete mathematicsMathematical analysisComputer scienceQuantum mechanicsArtificial intelligencePhysicsGeometryQuantum discordData miningProgramming languageQuantumQuantum Information and CryptographyQuantum Computing Algorithms and ArchitectureQuantum Mechanics and Applications
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