Related papers: Practical robust Bayesian spin-squeezing-enhanced quantum sensing under noises

Practical robust Bayesian spin-squeezing-enhanced quantum sensing under noises

URL: http://arxiv.org/abs/2509.08316v2
Date: Thu, 09 Oct 2025 03:53:48 GMT
Title: Practical robust Bayesian spin-squeezing-enhanced quantum sensing under noises
Authors: Jinye Wei, Jungeng Zhou, Yi Shen, Jiahao Huang, Chaohong Lee,
Abstract summary: We present an adaptive Bayesian quantum estimation protocol that achieves optimal measurement precision with spin-squeezed states under noises.<n>Our protocol can be applied to various scenarios, such as quantum gravimeters and atomic clocks, achieving precision enhancement over conventional fitting methods under noises.
Score: 4.276364453866415
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Spin-squeezed states constitute a valuable entanglement resource capable of surpassing the standard quantum limit (SQL). However, spin-squeezed states only enable sub-SQL uncertainty within a narrow parametric window near some specific points. Identifying optimal measurement protocols for spin-squeezed states remains an outstanding challenge. Here we present an adaptive Bayesian quantum estimation protocol that achieves optimal measurement precision with spin-squeezed states under noises. Our protocol operates by maintaining measurements near the optimal point and employing Bayesian inference to sequentially perform phase estimation, enabling robust high-precision measurement. To account for realistic experimental conditions, we explicitly incorporate phase noises into the Bayesian likelihood function for more accurate estimation. Our protocol can be applied to various scenarios, such as quantum gravimeters and atomic clocks, achieving precision enhancement over conventional fitting methods under noises. Our approach offers superior precision and enhanced robustness against noises, making it highly promising for squeezing-enhanced quantum sensing.

Related papers

Towards gravimetry enhancement with squeezed states [0.0]
We analyze how the squeezing phase, beyond its amplitudes, of the probes affects the attainable precision.<n>Our results are important to highlight the fundamental role of phase-engineered squeezing in experimental gravimetry protocols.
arXiv Detail & Related papers (2025-10-15T18:02:08Z)
Extending the dynamic range in quantum frequency estimation with sequential weak measurements [0.10923877073891443]
We study schemes to extend the dynamic range and overcome phase slip noise through weak measurements with ancilla qubits.<n>We find optimal weak measurements protocols: we identify optimal measurement strength for any given optical number of atoms.<n>Then we combine weak and projective measurements to construct a protocol that saturates the noiseless precision limits, and outperforms previously proposed methods for phase slip noise suppression.
arXiv Detail & Related papers (2025-09-01T13:42:17Z)
Optimal Quantum Estimation with Stabilizer-Based Local Measurements [3.9436039611833964]
We present a sufficient criterion for metrological schemes to saturate the quantum Cram'er-Rao bound (QCRB) using local measurements.<n>A family of graph states is identified as probe states that achieve suboptimal precision scaling.<n>We construct several subspaces of probe states that not only saturate the QCRB with local measurements but also maintain approximately invariant precision scaling.
arXiv Detail & Related papers (2025-08-10T02:51:07Z)
Calibration of Quantum Devices via Robust Statistical Methods [45.464983015777314]
We numerically analyze advanced statistical methods for Bayesian inference against the state-of-the-art in quantum parameter learning.<n>We show advantages of these approaches over existing ones, namely under multi-modality and high dimensionality.<n>Our findings have applications in challenging quantumcharacterization tasks namely learning the dynamics of open quantum systems.
arXiv Detail & Related papers (2025-07-09T15:22:17Z)
Squeezing-enhanced accurate differential sensing under large phase noise [0.0]
Atom interferometers are reaching sensitivities fundamentally constrained by quantum fluctuations.<n>Here, we theoretically investigate differential phase measurements with two atom interferometers using spin-squeezed states.<n>We identify optimal squeezed states that minimize the differential phase variance, scaling as $N-2/3$, while eliminating bias inherent in ellipse fitting methods.
arXiv Detail & Related papers (2025-01-30T10:38:45Z)
Bayesian Quantum Amplitude Estimation [46.03321798937855]
We present BAE, a problem-tailored and noise-aware Bayesian algorithm for quantum amplitude estimation.<n>In a fault tolerant scenario, BAE is capable of saturating the Heisenberg limit; if device noise is present, BAE can dynamically characterize it and self-adapt.<n>We propose a benchmark for amplitude estimation algorithms and use it to test BAE against other approaches.
arXiv Detail & Related papers (2024-12-05T18:09:41Z)
Time-adaptive phase estimation [0.0]
We present Bayesian phase estimation methods that adaptively choose a control phase and the time of coherent evolution based on prior phase knowledge.<n>We find near-optimal performance with respect to known theoretical bounds, and demonstrate some robustness of the estimates to noise that is not accounted for in the model of the estimator.<n>The methods provide optimal solutions accounting for available prior knowledge and experimental imperfections with minimal effort from the user.
arXiv Detail & Related papers (2024-05-14T19:49:22Z)
Finding the optimal probe state for multiparameter quantum metrology using conic programming [61.98670278625053]
We present a conic programming framework that allows us to determine the optimal probe state for the corresponding precision bounds. We also apply our theory to analyze the canonical field sensing problem using entangled quantum probe states.
arXiv Detail & Related papers (2024-01-11T12:47:29Z)
Robust and efficient verification of graph states in blind measurement-based quantum computation [52.70359447203418]
Blind quantum computation (BQC) is a secure quantum computation method that protects the privacy of clients. It is crucial to verify whether the resource graph states are accurately prepared in the adversarial scenario. Here, we propose a robust and efficient protocol for verifying arbitrary graph states with any prime local dimension.
arXiv Detail & Related papers (2023-05-18T06:24:45Z)
Optimal protocols for quantum metrology with noisy measurements [0.0]
We show that a quantum preprocessing-optimized parameter determines the ultimate precision limit for quantum sensors under measurement noise. Applications to noisy quantum states and thermometry are presented, as well as explicit circuit constructions of optimal controls.
arXiv Detail & Related papers (2022-10-20T16:37:47Z)
Probing finite-temperature observables in quantum simulators of spin systems with short-time dynamics [62.997667081978825]
We show how finite-temperature observables can be obtained with an algorithm motivated from the Jarzynski equality. We show that a finite temperature phase transition in the long-range transverse field Ising model can be characterized in trapped ion quantum simulators.
arXiv Detail & Related papers (2022-06-03T18:00:02Z)
Dynamical learning of a photonics quantum-state engineering process [48.7576911714538]
Experimentally engineering high-dimensional quantum states is a crucial task for several quantum information protocols. We implement an automated adaptive optimization protocol to engineer photonic Orbital Angular Momentum (OAM) states. This approach represents a powerful tool for automated optimizations of noisy experimental tasks for quantum information protocols and technologies.
arXiv Detail & Related papers (2022-01-14T19:24:31Z)
Quantum probes for universal gravity corrections [62.997667081978825]
We review the concept of minimum length and show how it induces a perturbative term appearing in the Hamiltonian of any quantum system. We evaluate the Quantum Fisher Information in order to find the ultimate bounds to the precision of any estimation procedure. Our results show that quantum probes are convenient resources, providing potential enhancement in precision.
arXiv Detail & Related papers (2020-02-13T19:35:07Z)

This list is automatically generated from the titles and abstracts of the papers in this site.