Bayesian Logarithmic Derivative Type Lower Bounds for Quantum Estimation
Abstract
Bayesian approach for quantum parameter estimation has gained a renewed interest from practical applications of quantum estimation theory. Recently, a lower bound, called the Bayesian Nagaoka-Hayashi bound for the Bayes risk in quantum domain was proposed, which is an extension of a new approach to point estimation of quantum states by Conlon et al. (2021). The objective of this paper is to explore this Bayesian Nagaoka-Hayashi bound further by obtaining its lower bounds. We first obtain one-parameter family of lower bounds, which is an analogue of the Holevo bound in point estimation. Thereby, we derive one-parameter family of Bayesian logarithmic derivative type lower bounds in a closed form for the parameter independent weight matrix setting. This new bound includes previously known Bayesian lower bounds as special cases.
Cite
@article{arxiv.2405.10525,
title = {Bayesian Logarithmic Derivative Type Lower Bounds for Quantum Estimation},
author = {Jianchao Zhang and Jun Suzuki},
journal= {arXiv preprint arXiv:2405.10525},
year = {2024}
}
Comments
6 pages