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Testing Heisenberg-Type Measurement Uncertainty Relations of Three Observables

Ya-Li Mao, Hu Chen, Chang Niu, Zheng-Da Li, Sixia Yu, Jingyun Fan

2023Physical Review Letters12 citationsDOI

Abstract

Heisenberg-type measurement uncertainty relations (MURs) of two quantum observables are essential for contemporary research in quantum foundations and quantum information science. Going beyond, here we report the first experimental study of MUR of three quantum observables. We establish rigorously MURs for triplets of unbiased qubit observables as combined approximation errors lower bounded by an incompatibility measure, inspired by the proposal of Busch et al. [Phys. Rev. A 89, 012129 (2014)PLRAAN1050-294710.1103/PhysRevA.89.012129]. We develop a convex programming protocol to numerically find the exact value of the incompatibility measure and the optimal measurements. We propose a novel implementation of the optimal joint measurements and present several experimental demonstrations with a single-photon qubit. We stress that our method is universally applicable to the study of many qubit observables. Besides, we theoretically show that MURs for joint measurement can be attained by sequential measurements in two of our explored cases. We anticipate that this work may stimulate broad interests associated with Heisenberg's uncertainty principle in the case of multiple observables, enriching our understanding of quantum mechanics and inspiring innovative applications in quantum information science.

Topics & Concepts

ObservableMeasure (data warehouse)Uncertainty principleQubitPhysicsQuantumQuantum informationBounded functionQuantum mechanicsStatistical physicsTheoretical physicsComputer scienceMathematicsMathematical analysisDatabaseQuantum Mechanics and ApplicationsQuantum Information and CryptographyQuantum Computing Algorithms and Architecture
Testing Heisenberg-Type Measurement Uncertainty Relations of Three Observables | Litcius