Precision bounds for frequency estimation under collective dephasing and open-loop control

TL;DR

This paper establishes fundamental limits on frequency estimation precision under collective dephasing noise, demonstrating that quantum advantages are limited by noise correlations and proposing optimal protocols that saturate these bounds.

Contribution

It derives tight, state-independent bounds on estimation precision under collective dephasing and constructs optimal protocols that achieve these bounds, highlighting the impact of noise correlations.

Findings

Precision bounds depend on short-time decoherence behavior.

Optimal protocols use squeezing and echo techniques.

Super-classical scaling cannot be achieved with collective open-loop control.

Abstract

Dephasing noise is a ubiquitous source of decoherence in current atomic sensors. We address the problem of entanglement-assisted frequency estimation subject to classical dephasing noise with full spatial correlations (collective) and arbitrary temporal correlations. Our contributions are threefold. (i) We derive rigorous, state-independent bounds on the achievable estimation precision, showing how they are entirely determined by the short-time behavior of the decoherence function. For temporally uncorrelated (Markovian) dephasing, precision is limited by a probe-independent constant. For temporally correlated stationary noise, the bound approaches the noiseless limit for classical states, precluding any asymptotic quantum advantage. (ii) We show that these scaling bounds are tight, by constructing generalized Ramsey protocols that saturate them. These optimal protocols use squeezing at the input and before readout, both of which are available in state-of-the-art atomic interferometers. Implementing a perfect-echo protocol, which reaches Heisenberg scaling in the absence of noise, remains optimal in this noisy setting, irrespective of the noise temporal correlations. (iii) We prove that arbitrary collective open-loop control cannot lift the no-go for super-classical precision scaling under either Markovian or colored stationary noise, highlighting the detrimental nature of full spatial correlations. In the latter case, temporal correlations may nonetheless enable constant-factor improvements over the standard quantum limit, which may still be important in practical metrological scenarios.