Optimal Estimate of Quantum States - Journal of Applied Mathematics and Physics

JAMP > Vol.6 No.6, June 2018

Journal of Applied Mathematics and Physics

Volume 6, Issue 6 (June 2018)

ISSN Print: 2327-4352 ISSN Online: 2327-4379

Google-based Impact Factor: 0.70 Citations

Optimal Estimate of Quantum States ()

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Download as PDF (Size: 1095KB) PP. 1363-1381

DOI: 10.4236/jamp.2018.66114 1,012 Downloads 2,213 Views Citations

Author(s)

Mario Mastriani

Affiliation(s)

Quantum Information Group, Merx Research, Aventura, FL, USA.

ABSTRACT

An optimal estimator of quantum states based on a modified Kalman’s filter is proposed in this work. Such estimator acts after a state measurement, allowing us to obtain an optimal estimate of the quantum state resulting in the output of any quantum algorithm. This method is much more accurate than other types of quantum measurements, such as, weak measurement, strong measurement, and quantum state tomography, among others.

KEYWORDS

Kalman’s Filter, Quantum Algorithms, Quantum Measurement

Share and Cite:

Mastriani, M. (2018) Optimal Estimate of Quantum States. Journal of Applied Mathematics and Physics, 6, 1363-1381. doi: 10.4236/jamp.2018.66114.

Cited by

[1]	Optimal probabilistic quantum control theory
	arXiv preprint arXiv:2210.16184, 2022

[2]	Phase measurement of optical fiber via weak-value amplification
	2019

[3]	Simplified Protocol of Quantum Teleportation
	Pré-publication, Document de travail, 2018

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