Approximate bias correction in econometrics

This paper discusses ways to reduce the bias of consistent estimators that are biased in finite samples. It is necessary that the bias function, which relates parameter values to bias, should be estimable by computer simulation or by some other method. If so, bias can be reduced or, in some cases that may not be unrealistic, even eliminated. In general, several evaluations of the bias function will be required to do this. Unfortunately, reducing bias may increase the variance, or even the mean squared error, of an estimator. Whether or not it does so depends on the shape of the bias functions. The techniques of the paper are illustrated by applying them to two problems: estimating the autoregressive parameter in an AR(1) model with a constant term, and estimation of a logit model.

[1]  Maurice G. Kendall,et al.  NOTE ON BIAS IN THE ESTIMATION OF AUTOCORRELATION , 1954 .

[2]  Takeshi Amemiya,et al.  The $n^{-2}$-Order Mean Squared Errors of the Maximum Likelihood and the Minimum Logit Chi-Square Estimator , 1980 .

[3]  N. Touzi,et al.  Calibrarion By Simulation for Small Sample Bias Correction , 1996 .

[4]  Peter C. B. Phillips,et al.  The ET Interview: Professor James Durbin , 1988, Econometric Theory.

[5]  A. Chesher A MIRROR IMAGE INVARIANCE FOR M-ESTIMATORS , 1995 .

[6]  B. Efron,et al.  Bootstrap confidence intervals , 1996 .

[7]  R. Tibshirani,et al.  An introduction to the bootstrap , 1993 .

[8]  James G. MacKinnon,et al.  Regression-based methods for using control variates in Monte Carlo experiments , 1992 .

[9]  T. Sawa The exact moments of the least squares estimator for the autoregressive model , 1978 .

[10]  SamplesAnthony,et al.  Fractional Integration with Drift : Estimation in Small , 1996 .

[11]  Herbert S. Winokur,et al.  First Order Autoregression: Inference, Estimation, and Prediction , 1969 .

[12]  Jan F. Kiviet,et al.  Bias Assessment and Reduction in Linear Error Correction Models , 1994 .

[13]  A. Chesher,et al.  Symmetry, Regression Design, and Sampling Distributions , 1994, Econometric Theory.

[14]  Stanley E. Zin,et al.  Fractional integration with drift: estimation in small samples , 1997 .

[15]  F. H. C. Marriott,et al.  BIAS IN THE ESTIMATION OF AUTOCORRELATIONS , 1954 .

[16]  D. Andrews Exactly Median-Unbiased Estimation of First Order Autoregressive/Unit Root Models , 1993 .

[17]  P. Hall The Bootstrap and Edgeworth Expansion , 1992 .

[18]  Anthony A. Smith,et al.  Estimating Nonlinear Time-Series Models Using Simulated Vector Autoregressions , 1993 .

[19]  J. Kiviet,et al.  Alternative Bias Approximations in Regressions with a Lagged-Dependent Variable , 1993, Econometric Theory.

[20]  G. Alastair Young 6. The Bootstrap and Edgeworth Expansion , 1993 .

[21]  R. Beran Prepivoting to reduce level error of confidence sets , 1987 .