Quantum estimation of unknown parameters
Quantum Physics
2017-02-07 v2
Abstract
We discuss the problem of finding the best measurement strategy for estimating the value of a quantum system parameter. In general the optimum quantum measurement, in the sense that it maximizes the quantum Fisher information and hence allows one to minimize the estimation error, can only be determined if the value of the parameter is already known. A modification of the quantum Van Trees inequality, which gives a lower bound on the error in the estimation of a random parameter, is proposed. The suggested inequality allows us to assert if a particular quantum measurement, together with an appropriate estimator, is optimal. An adaptive strategy to estimate the value of a parameter, based on our modified inequality, is proposed.
Cite
@article{arxiv.1606.07899,
title = {Quantum estimation of unknown parameters},
author = {Esteban Martinez and Carlos Pineda and François Leyvraz and Pablo Barberis-Blostein},
journal= {arXiv preprint arXiv:1606.07899},
year = {2017}
}
Comments
6 pages