有界误差估计:一种Chebyshev中心方法

2007 2nd IEEE International Workshop on Computational Advances in Multi-Sensor Adaptive Processing Pub Date : 2007-12-01 DOI:10.1109/CAMSAP.2007.4498001

Y. Eldar, A. Beck, M. Teboulle

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引用次数: 5

摘要

对于经典线性回归模型，假设真参数向量在椭球的交点上，我们给出了一个非线性极大极小估计量。我们寻求在给定参数集上最小化最坏情况估计误差的估计。由于这个问题难以处理，我们使用半定松弛来近似它，并将得到的估计称为松弛切比雪夫中心(RCC)。然后，我们通过仿真证明了RCC可以显著改善传统约束最小二乘法的估计误差。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Bounded Error Estimation: A Chebyshev Center Approach

We develop a nonlinear minimax estimator for the classical linear regression model assuming that the true parameter vector lies in an intersection of ellipsoids. We seek an estimate that minimizes the worst-case estimation error over the given parameter set. Since this problem is intractable, we approximate it using semidefinite relaxation, and refer to the resulting estimate as the relaxed Chebyshev center (RCC). We then demonstrate through simulations that the RCC can significantly improve the estimation error over the conventional constrained least-squares method.

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2007 2nd IEEE International Workshop on Computational Advances in Multi-Sensor Adaptive Processing

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