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Heisenberg-Limited Metrology via Weak-Value Amplification without Using Entangled Resources

Yosep Kim, Seung-Yeun Yoo, Yoon-Ho Kim

2022Physical Review Letters30 citationsDOIOpen Access PDF

Abstract

Weak-value amplification (WVA) provides a way for amplified detection of a tiny physical signal at the expense of a lower detection probability. Despite this trade-off, due to its robustness against certain types of noise, WVA has advantages over conventional measurements in precision metrology. Moreover, it has been shown that WVA-based metrology can reach the Heisenberg limit using entangled resources, but preparing macroscopic entangled resources remains challenging. Here, we demonstrate a novel WVA scheme based on iterative interactions, achieving the Heisenberg-limited precision scaling without resorting to entanglement. This indicates that the perceived advantages of the entanglement-assisted WVA are in fact due to iterative interactions between each particle of an entangled system and a meter, rather than coming from the entanglement itself. Our work opens a practical pathway for achieving the Heisenberg-limited WVA without using fragile and experimentally demanding entangled resources.

Topics & Concepts

Quantum entanglementQuantum metrologyMetrologyPhysicsRobustness (evolution)ScalingComputer scienceLimit (mathematics)Statistical physicsHeisenberg limitIterative methodQuantum mechanicsElectronic engineeringQuantum sensorScheme (mathematics)Quantum nonlocalityPhysical systemWork (physics)OpticsTopology (electrical circuits)AlgorithmSIGNAL (programming language)Interference (communication)Quantum Information and CryptographyQuantum Mechanics and ApplicationsMechanical and Optical Resonators
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