Optimal quantum estimation of loss in bosonic channels
arXiv:quant-ph/0701216 · doi:10.1103/PhysRevLett.98.160401
Abstract
We address the estimation of the loss parameter of a bosonic channel probed by Gaussian signals. We derive the ultimate quantum bound on precision and show that no improvement may be obtained by having access to the environment degrees of freedom. We found that, for small losses, the variance of the optimal estimator is proportional to the loss parameter itself, a result that represents a qualitative improvement over the shot noise limit. An observable based on the symmetric logarithmic derivative is derived, which attains the ultimate bound and may be implemented using Gaussian operations and photon counting.
4 pages, 2 figures, replaced with published version