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An application of approximate finite sample results to parameter estimation in a linear errors-in-variables model
Authors:R. Friedmann  H. J. Mittag  A. Brandtstater
Affiliation:Department of Economics University of Saarland W-6600 Saarbriicken Federal Republic of Germany;Department ot Economics University of Hagen W-5800 Fagen Federal Republic of Germany;Branch Office Koln IBM Germany W-5000 Koln 51 Federal Republic of Germany
Abstract:In the simple errors-in-variables model the least squares estimator of the slope coefficient is known to be biased towards zero for finite sample size as well as asymptotically. In this paper we suggest a new corrected least squares estimator, where the bias correction is based on approximating the finite sample bias by a lower bound. This estimator is computationally very simple. It is compared with previously proposed corrected least squares estimators, where the correction aims at removing the asymptotic bias or the exact finite sample bias. For each type of corrected least squares estimators we consider the theoretical form, which depends on an unknown parameter, as well as various feasible forms. An analytical comparison of the theoretical estimators is complemented by a Monte Carlo study evaluating the performance of the feasible estimators. The new estimator proposed in this paper proves to be superior with respect to the mean squared error.
Keywords:least squares estimator    exact and approximate least squares bias    corrected least squares estimators    Monte Carlo study
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