Title :
A Minimax Chebyshev Estimator for Bounded Error Estimation
Author :
Eldar, Yonina C. ; Beck, Amir ; Teboulle, Marc
Author_Institution :
Technion - Israel Inst. of Technol., Haifa
fDate :
4/1/2008 12:00:00 AM
Abstract :
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 show that the RCC is unique and feasible, meaning it is consistent with the prior information. We then prove that the constrained least-squares (CLS) estimate for this problem can also be obtained as a relaxation of the Chebyshev center, that is looser than the RCC. Finally, we demonstrate through simulations that the RCC can significantly improve the estimation error over the CLS method.
Keywords :
least squares approximations; minimax techniques; nonlinear estimation; regression analysis; approximation theory; bounded error estimation; constrained least-squares estimation; ellipsoid intersection; linear regression model; nonlinear minimax Chebyshev estimator; semidefinite relaxation; Chebyshev approximation; Covariance matrix; Ellipsoids; Error analysis; Estimation error; Image processing; Integral equations; Linear regression; Minimax techniques; Vectors; Bounded error estimation; Chebyshev center; constrained least-squares; semidefinite programming; semidefinite relaxation;
Journal_Title :
Signal Processing, IEEE Transactions on
DOI :
10.1109/TSP.2007.908945
