Robust Estimators of Errors-in-Variables Models: Part 1
Copyright policy )Robust Estimators of Errors-in-Variables Models: Part 1
It is well known that consistent estimators of errors-in-variables models require knowledge of the ratio of error variances. What is not well known is that a Joint Least Squares estimator is robust to a wide misspecification of that ratio. Through a series of Monte Carlo experiments we show that an easy-to-implement estimator produces estimates that are nearly unbiased for a wide range of the ratio of error variances. These MC analyses encompass linear and nonlinear specifications and also a system on nonlinear equations where all the variables are measured with errors.
- University of California, Davis United States
- University of California, San Francisco United States
Ratio of error variances, Research Methods/ Statistical Methods,, Monte Carlo experiments, Joint least squares, errors-in-variables, concentrated joint least squares, Robust Estimators
Ratio of error variances, Research Methods/ Statistical Methods,, Monte Carlo experiments, Joint least squares, errors-in-variables, concentrated joint least squares, Robust Estimators
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