Litcius/Paper detail

Hierarchies of Frequentist Bounds for Quantum Metrology: From Cramér-Rao to Barankin

Manuel Gessner, Augusto Smerzi

2023Physical Review Letters14 citationsDOIOpen Access PDF

Abstract

We derive lower bounds on the variance of estimators in quantum metrology by choosing test observables that define constraints on the unbiasedness of the estimator. The quantum bounds are obtained by analytical optimization over all possible quantum measurements and estimators that satisfy the given constraints. We obtain hierarchies of increasingly tight bounds that include the quantum Cramér-Rao bound at the lowest order. In the opposite limit, the quantum Barankin bound is the variance of the locally best unbiased estimator in quantum metrology. Our results reveal generalizations of the quantum Fisher information that are able to avoid regularity conditions and identify threshold behavior in quantum measurements with mixed states, caused by finite data.

Topics & Concepts

EstimatorFrequentist inferenceQuantum metrologyQuantumUpper and lower boundsCramér–Rao boundMathematicsObservableStatistical physicsVariance (accounting)Applied mathematicsPhysicsStatisticsQuantum mechanicsQuantum discordOpen quantum systemBayesian probabilityMathematical analysisBayesian inferenceAccountingBusinessQuantum Information and CryptographyQuantum Computing Algorithms and ArchitectureQuantum Mechanics and Applications