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Upper bounds on the Holevo Cramér-Rao bound for multiparameter quantum parametric and semiparametric estimation

We formulate multiparameter quantum estimation in the parametric and semiparametric setting. While the Holevo Cramér-Rao bound (CRB) requires no substantial modifications in moving from the former to the latter, we generalize the Helstrom CRB appropriately. We show that the Holevo CRB cannot be greater than twice the generalized Helstrom CRB. We also present a tighter, intermediate, bound. Finally, we show that for parameters encoded in the first moments of a Gaussian state there always exists a Gaussian measurement that gives a classical Fisher information matrix that is one-half of the quantum Fisher information matrix.

preprint2020arXivOpen access
Francesco AlbarelliMankei TsangAnimesh Datta
quant-ph
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Francesco AlbarelliMankei TsangAnimesh Datta

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