Related papers: Multi-parameter quantum estimation of single- and two-mode pure Gaussian states

Multi-parameter quantum estimation of single- and two-mode pure Gaussian states

URL: http://arxiv.org/abs/2403.03919v1
Date: Wed, 6 Mar 2024 18:29:17 GMT
Title: Multi-parameter quantum estimation of single- and two-mode pure Gaussian states
Authors: Gabriele Bressanini, Marco G. Genoni, M.S. Kim and Matteo G. A. Paris
Abstract summary: We derive the Holevo Cram'er-Rao bound (HCRB) for both displacement and squeezing parameter characterizing single and two-mode squeezed states. In the single-mode scenario, we obtain an analytical bound and find that it degrades monotonically as the squeezing increases. In the two-mode setting, the HCRB improves as the squeezing parameter grows and we show that it can be attained using double-homodyne detection.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We discuss the ultimate precision bounds on the multiparameter estimation of single- and two-mode pure Gaussian states. By leveraging on previous approaches that focused on the estimation of a complex displacement only, we derive the Holevo Cram\'er-Rao bound (HCRB) for both displacement and squeezing parameter characterizing single and two-mode squeezed states. In the single-mode scenario, we obtain an analytical bound and find that it degrades monotonically as the squeezing increases. Furthermore, we prove that heterodyne detection is nearly optimal in the large squeezing limit, but in general the optimal measurement must include non-Gaussian resources. On the other hand, in the two-mode setting, the HCRB improves as the squeezing parameter grows and we show that it can be attained using double-homodyne detection.

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