127 related articles for article (PubMed ID: 37450793)
1. Hierarchies of Frequentist Bounds for Quantum Metrology: From Cramér-Rao to Barankin.
Gessner M; Smerzi A
Phys Rev Lett; 2023 Jun; 130(26):260801. PubMed ID: 37450793
[TBL] [Abstract][Full Text] [Related]
2. Ziv-Zakai error bounds for quantum parameter estimation.
Tsang M
Phys Rev Lett; 2012 Jun; 108(23):230401. PubMed ID: 23003924
[TBL] [Abstract][Full Text] [Related]
3. Frequentist and Bayesian Quantum Phase Estimation.
Li Y; Pezzè L; Gessner M; Ren Z; Li W; Smerzi A
Entropy (Basel); 2018 Aug; 20(9):. PubMed ID: 33265717
[TBL] [Abstract][Full Text] [Related]
4. Transmission estimation at the quantum Cramér-Rao bound with macroscopic quantum light.
Woodworth TS; Hermann-Avigliano C; Chan KWC; Marino AM
EPJ Quantum Technol; 2022; 9(1):38. PubMed ID: 36573927
[TBL] [Abstract][Full Text] [Related]
5. Biased Cramér-Rao lower bound calculations for inequality-constrained estimators.
Matson CL; Haji A
J Opt Soc Am A Opt Image Sci Vis; 2006 Nov; 23(11):2702-13. PubMed ID: 17047695
[TBL] [Abstract][Full Text] [Related]
6. Evaluating the Holevo Cramér-Rao Bound for Multiparameter Quantum Metrology.
Albarelli F; Friel JF; Datta A
Phys Rev Lett; 2019 Nov; 123(20):200503. PubMed ID: 31809066
[TBL] [Abstract][Full Text] [Related]
7. Cramér-Rao bounds: an evaluation tool for quantitation.
Cavassila S; Deval S; Huegen C; van Ormondt D; Graveron-Demilly D
NMR Biomed; 2001 Jun; 14(4):278-83. PubMed ID: 11410946
[TBL] [Abstract][Full Text] [Related]
8. Quantum metrology in open systems: dissipative Cramér-Rao bound.
Alipour S; Mehboudi M; Rezakhani AT
Phys Rev Lett; 2014 Mar; 112(12):120405. PubMed ID: 24724633
[TBL] [Abstract][Full Text] [Related]
9. On the Quantumness of Multiparameter Estimation Problems for Qubit Systems.
Razavian S; Paris MGA; Genoni MG
Entropy (Basel); 2020 Oct; 22(11):. PubMed ID: 33286965
[TBL] [Abstract][Full Text] [Related]
10. Cramer-Rao lower bounds on the estimation of the degree of polarization in coherent imaging systems.
Roux N; Goudail F; Réfrégier P
J Opt Soc Am A Opt Image Sci Vis; 2005 Nov; 22(11):2532-41. PubMed ID: 16302405
[TBL] [Abstract][Full Text] [Related]
11. The Cramér-Rao Bounds and Sensor Selection for Nonlinear Systems with Uncertain Observations.
Wang Z; Shen X; Wang P; Zhu Y
Sensors (Basel); 2018 Apr; 18(4):. PubMed ID: 29621158
[TBL] [Abstract][Full Text] [Related]
12. Limiting Uncertainty Relations in Laser-Based Measurements of Position and Velocity Due to Quantum Shot Noise.
Fischer A
Entropy (Basel); 2019 Mar; 21(3):. PubMed ID: 33266979
[TBL] [Abstract][Full Text] [Related]
13. Environmental information content of ocean ambient noise.
Siderius M; Gebbie J
J Acoust Soc Am; 2019 Sep; 146(3):1824. PubMed ID: 31590547
[TBL] [Abstract][Full Text] [Related]
14. Cramer-Rao bounds for intensity interferometry measurements.
Holmes R; Calef B; Gerwe D; Crabtree P
Appl Opt; 2013 Jul; 52(21):5235-46. PubMed ID: 23872772
[TBL] [Abstract][Full Text] [Related]
15. Cramér-Rao bounds for parametric shape estimation in inverse problems.
Ye JC; Bresler Y; Moulin P
IEEE Trans Image Process; 2003; 12(1):71-84. PubMed ID: 18237880
[TBL] [Abstract][Full Text] [Related]
16. Prediction of human's ability in sound localization based on the statistical properties of spike trains along the brainstem auditory pathway.
Krips R; Furst M
Comput Intell Neurosci; 2014; 2014():575716. PubMed ID: 24799888
[TBL] [Abstract][Full Text] [Related]
17. Differential Geometric Aspects of Parametric Estimation Theory for States on Finite-Dimensional
Ciaglia FM; Jost J; Schwachhöfer L
Entropy (Basel); 2020 Nov; 22(11):. PubMed ID: 33266515
[TBL] [Abstract][Full Text] [Related]
18. Cramér-Rao bounds on mensuration errors.
Gonsalves RA
Appl Opt; 1976 May; 15(5):1270-5. PubMed ID: 20165164
[TBL] [Abstract][Full Text] [Related]
19. Toward Heisenberg scaling in non-Hermitian metrology at the quantum regime.
Yu X; Zhao X; Li L; Hu XM; Duan X; Yuan H; Zhang C
Sci Adv; 2024 May; 10(19):eadk7616. PubMed ID: 38728399
[TBL] [Abstract][Full Text] [Related]
20. Cramér-Rao Bounds for DoA Estimation of Sparse Bayesian Learning with the Laplace Prior.
Bai H; Duarte MF; Janaswamy R
Sensors (Basel); 2022 Dec; 23(1):. PubMed ID: 36616904
[TBL] [Abstract][Full Text] [Related]
[Next] [New Search]