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Main Authors: Xu, Dazhuan, Zhang, Han, Wang, Nan
Format: Preprint
Published: 2021
Subjects:
Online Access:https://arxiv.org/abs/2107.04986
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author Xu, Dazhuan
Zhang, Han
Wang, Nan
author_facet Xu, Dazhuan
Zhang, Han
Wang, Nan
contents In this paper, we employ the thoughts and methodologies of Shannon's information theory to solve the problem of the optimal radar parameter estimation. Based on a general radar system model, the \textit{a posteriori} probability density function of targets' parameters is derived. Range information (RI) and entropy error (EE) are defined to evaluate the performance. It is proved that acquiring 1 bit of the range information is equivalent to reducing estimation deviation by half. The closed-form approximation for the EE is deduced in all signal-to-noise ratio (SNR) regions, which demonstrates that the EE degenerates to the mean square error (MSE) when the SNR is tending to infinity. Parameter estimation theorem is then proved, which claims that the theoretical RI is achievable. The converse claims that there exists no unbiased estimator whose empirical RI is larger than the theoretical RI. Simulation result demonstrates that the theoretical EE is tighter than the commonly used Cramér-Rao bound and the ZivZakai bound.
format Preprint
id arxiv_https___arxiv_org_abs_2107_04986
institution arXiv
publishDate 2021
record_format arxiv
spellingShingle Theoretical Performance Limit for Radar Parameter Estimation
Xu, Dazhuan
Zhang, Han
Wang, Nan
Information Theory
Signal Processing
In this paper, we employ the thoughts and methodologies of Shannon's information theory to solve the problem of the optimal radar parameter estimation. Based on a general radar system model, the \textit{a posteriori} probability density function of targets' parameters is derived. Range information (RI) and entropy error (EE) are defined to evaluate the performance. It is proved that acquiring 1 bit of the range information is equivalent to reducing estimation deviation by half. The closed-form approximation for the EE is deduced in all signal-to-noise ratio (SNR) regions, which demonstrates that the EE degenerates to the mean square error (MSE) when the SNR is tending to infinity. Parameter estimation theorem is then proved, which claims that the theoretical RI is achievable. The converse claims that there exists no unbiased estimator whose empirical RI is larger than the theoretical RI. Simulation result demonstrates that the theoretical EE is tighter than the commonly used Cramér-Rao bound and the ZivZakai bound.
title Theoretical Performance Limit for Radar Parameter Estimation
topic Information Theory
Signal Processing
url https://arxiv.org/abs/2107.04986