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Optimal probes and error-correction schemes in multi-parameter quantum metrology

Wojciech Górecki, Sisi Zhou, Liang Jiang, Rafał Demkowicz-Dobrzański

2020Quantum49 citationsDOIOpen Access PDF

Abstract

We derive a necessary and sufficient condition for the possibility of achieving the Heisenberg scaling in general adaptive multi-parameter estimation schemes in presence of Markovian noise. In situations where the Heisenberg scaling is achievable, we provide a semidefinite program to identify the optimal quantum error correcting (QEC) protocol that yields the best estimation precision. We overcome the technical challenges associated with potential incompatibility of the measurement optimally extracting information on different parameters by utilizing the Holevo Cramér-Rao (HCR) bound for pure states. We provide examples of significant advantages offered by our joint-QEC protocols, that sense all the parameters utilizing a single error-corrected subspace, over separate-QEC protocols where each parameter is effectively sensed in a separate subspace.

Topics & Concepts

ScalingSubspace topologyQuantumUpper and lower boundsComputer scienceQuantum metrologyMathematical optimizationMathematicsQuantum error correctionAlgorithmNoise (video)Estimation theoryApplied mathematicsQubitQuantum informationQuantum mechanicsPhysicsArtificial intelligenceMathematical analysisImage (mathematics)Quantum networkGeometryQuantum Information and CryptographyQuantum Mechanics and ApplicationsQuantum Computing Algorithms and Architecture
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