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SEMIPARAMETRIC ESTIMATION OF A HETEROSKEDASTIC SAMPLE SELECTION MODEL

Published online by Cambridge University Press:  24 September 2003

Songnian Chen  and
Shakeeb Khan
Songnian Chen
Affiliation:
Hong Kong University of Science and Technology
Shakeeb Khan
Affiliation:
University of Rochester
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Abstract

This paper considers estimation of a sample selection model subject to conditional heteroskedasticity in both the selection and outcome equations. The form of heteroskedasticity allowed for in each equation is multiplicative, and each of the two scale functions is left unspecified. A three-step estimator for the parameters of interest in the outcome equation is proposed. The first two stages involve nonparametric estimation of the “propensity score” and the conditional interquartile range of the outcome equation, respectively. The third stage reweights the data so that the conditional expectation of the reweighted dependent variable is of a partially linear form, and the parameters of interest are estimated by an approach analogous to that adopted in Ahn and Powell (1993, Journal of Econometrics 58, 3–29). Under standard regularity conditions the proposed estimator is shown to be -consistent and asymptotically normal, and the form of its limiting covariance matrix is derived.We are grateful to B. Honoré, R. Klein, E. Kyriazidou, L.-F. Lee, J. Powell, two anonymous referees, and the co-editor D. Andrews and also to seminar participants at Princeton, Queens, UCLA, and the University of Toronto for helpful comments. Chen's research was supported by RGC grant HKUST 6070/01H from the Research Grants Council of Hong Kong.

Type
Research Article
Information
Econometric Theory , Volume 19 , Issue 6 , December 2003 , pp. 1040 - 1064
Copyright
© 2003 Cambridge University Press

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References

REFERENCES

Ahn, H. & J.L. Powell (1993) Semiparametric estimation of censored selection models with a nonparametric selection mechanism. Journal of Econometrics 58, 329.Google Scholar
Amemiya, T. (1985) Advanced Econometrics. Cambridge: Harvard University Press.
Andrews, D.W.K. (1991) Asymptotic normality for nonparametric and semiparametric regression models. Econometrica 59, 307345.Google Scholar
Andrews, D.W.K. (1994) Asymptotics for semiparametric econometric models via stochastic equicontinuity. Econometrica 62, 4372.Google Scholar
Andrews, D.W.K. & M.M.A. Schafgans (1998) Semiparametric estimation of the intercept of a sample selection model. Review of Economic Studies 65, 497517.Google Scholar
Bierens, H.J. (1987) Kernel estimators of regression functions. In T.F. Bewley (ed.), Advances in Econometrics, Fifth World Congress, vol. 1, pp. 99144. Cambridge: Cambridge University Press.
Buchinsky, M. (1998) Recent advances in quantile regression models: A practical guideline for empirical research. Journal of Human Resources 33, 88126.Google Scholar
Carroll, R.J. (1982) Adapting for heteroskedasticity in linear models. Annals of Statistics 10, 12241233.Google Scholar
Chaudhuri, P. (1991a) Nonparametric estimates of regression quantiles and their local Bahadur representation. Annals of Statistics 19, 760777.Google Scholar
Chaudhuri, P. (1991b) Global nonparametric estimation of conditional quantiles and their derivatives. Journal of Multivariate Analysis 39, 246269.Google Scholar
Chaudhuri, P., K. Doksum, & A. Samarov (1997) On average derivative quantile regression. Annals of Statistics 25, 715744.Google Scholar
Chen, S. (1999) Semiparametric estimation of heteroskedastic binary choice sample selection models under symmetry. Manuscript, Hong Kong University of Science and Technology.
Chen, S. & S. Khan (2000) Estimating censored regression models in the presence of nonparametric multiplicative heteroskedasticity. Journal of Econometrics 98, 283316.Google Scholar
Chen, S. & S. Khan (2001) Semiparametric estimation of a partially linear censored regression model. Econometric Theory 17, 567590.Google Scholar
Chen, S. & S. Khan (2003) Rates of convergence for estimating regression coefficients in heteroskedastic discrete response models. Journal of Econometrics, in press.Google Scholar
Choi, K. (1990) Semiparametric Estimation of the Sample Selection Model Using Series Expansion and the Propensity Score. Manuscript, University of Chicago.
Delgado, M. (1992) Semiparametric generalized least squares in the multivariate nonlinear regression model. Econometric Theory 8, 203222.Google Scholar
Donald, S.G. (1995) Two-step estimation of heteroscedastic sample selection models. Journal of Econometrics 65, 347380.Google Scholar
Gronau, R. (1974) Wage comparisons: A selectivity bias. Journal of Political Economy 82, 11191144.Google Scholar
Heckman, J.J. (1976) The common structure of statistical models of truncation, sample selection, and limited dependent variables and a simple estimator of such models. Annals of Economic and Social Measurement 15, 475492.Google Scholar
Heckman, J.J. (1979) Sample selection bias as a specification error. Econometrica 47, 153161.Google Scholar
Heckman, J.J. (1990) Varieties of selection bias. American Economic Review 80, 313318.Google Scholar
Hildago, J. (1992) Adaptive estimation in time series models with heteroskedasticity of unknown form. Econometric Theory 8, 161187.Google Scholar
Horowitz, J.L. (1992) A smoothed maximum score estimator for the binary response model. Econometrica 60, 505531.Google Scholar
Khan, S. (2001) Two stage rank estimation of quantile index models. Journal of Econometrics 100, 319355.Google Scholar
Khan, S. & J.L. Powell (2001) Two-step quantile estimation of semiparametric censored regression models. Journal of Econometrics 103, 73110.Google Scholar
Koenker, R. & G.S. Bassett, Jr. (1978) Regression quantiles. Econometrica 46, 3350.Google Scholar
Kyriazidou, E. (1997) Estimation of a panel data sample selection model. Econometrica 65, 13351364.Google Scholar
Li, Q. & J. Racine (2000) Nonparametric Estimation of Regression Functions with Both Categorical and Continuous Data. Manuscript, Texas A&M University.
Mroz, T.A. (1987) The sensitivity of an empirical model of married women's hours of work to economic and statistical assumptions. Econometrica 55, 765799.Google Scholar
Powell, J.L. (1989) Semiparametric Estimation of Censored Selection Models. Manuscript, University of Wisconsin.
Robinson, P.M. (1987) Asymptotically efficient estimation in the presence of heteroskedasticity of unknown form. Econometrica 56, 875891.Google Scholar
Robinson, P.M. (1988) Root-N-consistent semiparametric regression. Econometrica 56, 931954.Google Scholar
Rosenbaum, P.R. & D.B. Rubin (1983) The central role of the propensity score in observational studies for causal effects. Biometrika 70, 4155.Google Scholar
Sherman, R.P. (1994) Maximal inequalities for degenerate U-processes with applications to optimization estimators. Annals of Statistics 22, 439459.Google Scholar