Performance bounds for constrained parameter estimation

Tirza Routtenberg; Joseph Tabrikian

doi:10.1109/SAM.2012.6250553

Performance bounds for constrained parameter estimation

Tirza Routtenberg, Joseph Tabrikian

Department of Electrical & Computer Engineering

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

15 Scopus citations

Abstract

In this paper, we propose a new class of lower bounds on the mean-squared error (MSE) in non-Bayesian constrained parameter estimation. The new class includes lower bounds on the MSE of any constrained-unbiased estimator, where the constrained-unbiasedness is defined for the first time using the Lehmann-unbiasedness. The proposed class of constrained lower bounds is derived by employing Cauchy-Schwarz inequality and it can be used to derive various bounds for constrained parameter estimation. For example, it is demonstrated that the constrained Cramér-Rao bound (CCRB) is a special case of the proposed class. In addition, the new constrained Hammersley-Chapman-Robbins bound (CHCRB) is derived by using this class. Finally, the CCRB and CHCRB are exemplified in the estimation of the eigenvalues of a structured covariance matrix subject to signal subspace constraints. It is shown that the proposed CHCRB is tighter than the CCRB at any signal-to-noise ratio.

Original language	English
Title of host publication	2012 IEEE 7th Sensor Array and Multichannel Signal Processing Workshop, SAM 2012
Pages	513-516
Number of pages	4
DOIs	https://doi.org/10.1109/SAM.2012.6250553
State	Published - 12 Oct 2012
Event	2012 IEEE 7th Sensor Array and Multichannel Signal Processing Workshop, SAM 2012 - Hoboken, NJ, United States Duration: 17 Jun 2012 → 20 Jun 2012

Publication series

Name	Proceedings of the IEEE Sensor Array and Multichannel Signal Processing Workshop
ISSN (Electronic)	2151-870X

Conference

Conference	2012 IEEE 7th Sensor Array and Multichannel Signal Processing Workshop, SAM 2012
Country/Territory	United States
City	Hoboken, NJ
Period	17/06/12 → 20/06/12

Keywords

Cauchy-Schwarz inequality
Cramér-Rao bound
Lehmann-unbiased
Non-Bayesian constrained estimation
mean-square-error (MSE)

ASJC Scopus subject areas

Signal Processing
Control and Systems Engineering
Electrical and Electronic Engineering

Access to Document

10.1109/SAM.2012.6250553

Cite this

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title = "Performance bounds for constrained parameter estimation",

abstract = "In this paper, we propose a new class of lower bounds on the mean-squared error (MSE) in non-Bayesian constrained parameter estimation. The new class includes lower bounds on the MSE of any constrained-unbiased estimator, where the constrained-unbiasedness is defined for the first time using the Lehmann-unbiasedness. The proposed class of constrained lower bounds is derived by employing Cauchy-Schwarz inequality and it can be used to derive various bounds for constrained parameter estimation. For example, it is demonstrated that the constrained Cram{\'e}r-Rao bound (CCRB) is a special case of the proposed class. In addition, the new constrained Hammersley-Chapman-Robbins bound (CHCRB) is derived by using this class. Finally, the CCRB and CHCRB are exemplified in the estimation of the eigenvalues of a structured covariance matrix subject to signal subspace constraints. It is shown that the proposed CHCRB is tighter than the CCRB at any signal-to-noise ratio.",

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author = "Tirza Routtenberg and Joseph Tabrikian",

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language = "English",

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pages = "513--516",

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note = "2012 IEEE 7th Sensor Array and Multichannel Signal Processing Workshop, SAM 2012 ; Conference date: 17-06-2012 Through 20-06-2012",

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Routtenberg, T & Tabrikian, J 2012, Performance bounds for constrained parameter estimation. in 2012 IEEE 7th Sensor Array and Multichannel Signal Processing Workshop, SAM 2012., 6250553, Proceedings of the IEEE Sensor Array and Multichannel Signal Processing Workshop, pp. 513-516, 2012 IEEE 7th Sensor Array and Multichannel Signal Processing Workshop, SAM 2012, Hoboken, NJ, United States, 17/06/12. https://doi.org/10.1109/SAM.2012.6250553

Performance bounds for constrained parameter estimation. / Routtenberg, Tirza ; Tabrikian, Joseph.
2012 IEEE 7th Sensor Array and Multichannel Signal Processing Workshop, SAM 2012. 2012. p. 513-516 6250553 (Proceedings of the IEEE Sensor Array and Multichannel Signal Processing Workshop).

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

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AU - Tabrikian, Joseph

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N2 - In this paper, we propose a new class of lower bounds on the mean-squared error (MSE) in non-Bayesian constrained parameter estimation. The new class includes lower bounds on the MSE of any constrained-unbiased estimator, where the constrained-unbiasedness is defined for the first time using the Lehmann-unbiasedness. The proposed class of constrained lower bounds is derived by employing Cauchy-Schwarz inequality and it can be used to derive various bounds for constrained parameter estimation. For example, it is demonstrated that the constrained Cramér-Rao bound (CCRB) is a special case of the proposed class. In addition, the new constrained Hammersley-Chapman-Robbins bound (CHCRB) is derived by using this class. Finally, the CCRB and CHCRB are exemplified in the estimation of the eigenvalues of a structured covariance matrix subject to signal subspace constraints. It is shown that the proposed CHCRB is tighter than the CCRB at any signal-to-noise ratio.

AB - In this paper, we propose a new class of lower bounds on the mean-squared error (MSE) in non-Bayesian constrained parameter estimation. The new class includes lower bounds on the MSE of any constrained-unbiased estimator, where the constrained-unbiasedness is defined for the first time using the Lehmann-unbiasedness. The proposed class of constrained lower bounds is derived by employing Cauchy-Schwarz inequality and it can be used to derive various bounds for constrained parameter estimation. For example, it is demonstrated that the constrained Cramér-Rao bound (CCRB) is a special case of the proposed class. In addition, the new constrained Hammersley-Chapman-Robbins bound (CHCRB) is derived by using this class. Finally, the CCRB and CHCRB are exemplified in the estimation of the eigenvalues of a structured covariance matrix subject to signal subspace constraints. It is shown that the proposed CHCRB is tighter than the CCRB at any signal-to-noise ratio.

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KW - mean-square-error (MSE)

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Performance bounds for constrained parameter estimation

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