Hostname: page-component-84b7d79bbc-2l2gl Total loading time: 0 Render date: 2024-07-26T07:28:11.142Z Has data issue: false hasContentIssue false
  • English
  • Français

Semiparametric Estimation of a Single-Index Model with Nonparametrically Generated Regressors

Published online by Cambridge University Press:  11 February 2009

Hyungtaik Ahn
Hyungtaik Ahn
Affiliation:
Virginia Polytechnic Institute & State University
Get access Rights & Permissions [Opens in a new window]

Abstract

This paper develops a theory of estimating parameters of a generated regressor model in which some explanatory variables in the equation of interest are the unknown conditional means of certain observable variables given other observable regressors. The paper imposes a weak nonparametric restriction on the form of the conditional means and maintains a single-index assumption on the distribution of the dependent variable in the equation of interest. The estimation method follows a two-step approach: The first step estimates the conditional means in the index nonparametrically, and the second step estimates the parameters by an analytically convenient weighted average derivative method. It is established that the two-step estimator is root-n-consistent and asymptotically normal. The asymptotic variance exceeds that of the one-step hypothetical estimator, which would be obtainable if the first-step regression were known.

Type
Articles
Information
Econometric Theory , Volume 13 , Issue 1 , February 1997 , pp. 3 - 31
Copyright
Copyright © Cambridge University Press 1997

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

REFERENCES

Ahn, H. (1995) Nonparametric two-stage estimation of conditional choice probabilities in a binary choice model under uncertainty. Journal of Econometrics 67, 337378.CrossRefGoogle Scholar
Ahn, H. & Manski, C.F. (1993) Distribution theory for the analysis of binary choice under uncertainty with nonparametric estimation of expectations. Journal of Econometrics 56, 291321.CrossRefGoogle Scholar
Ahn, H. & Powell, J.L. (1993) Semiparametric estimation of censored selection models with a nonparametric selection problem. Journal of Econometrics 58, 329.CrossRefGoogle Scholar
Bierens, H.J. (1987) Kernel estimators of regression functions. In Bewley, T.F. (ed.), Advances in Econometrics, Fifth World Congress, vol. I, pp. 99144. Cambridge: Cambridge University Press.CrossRefGoogle Scholar
Collomb, G. & Hardle, W. (1986) Strong uniform convergence rate in robust nonparametric time series analysis and prediction: Kernel regression estimation from dependent observations. Stochastic Processes and Their Applications 23, 7789.CrossRefGoogle Scholar
Cosslett, S.R. (1983) Distribution-free maximum likelihood estimator of the binary choice model. Econometrica 51, 765782.CrossRefGoogle Scholar
Härdle, W. (1990) Applied Nonparametric Regression. Cambridge: Cambridge University Press.CrossRefGoogle Scholar
Härdle, W., Hart, J., Marron, J.S., & Tsybakov, A.B. (1992) Bandwidth choice for average derivative estimation. Journal of the American Statistical Association 87, 218226.Google Scholar
Härdle, W. & Stoker, T.M. (1989) Investigating smooth multiple regression by the method of average derivatives. Journal of the American Statistical Association 84, 986995.Google Scholar
Härdle, W. & Tsybakov, A.B. (1993) How sensitive are average derivatives? Journal of Econometrics 58, 3148.CrossRefGoogle Scholar
Horowitz, J.L. (1992). A smoothed maximum score estimator for the binary response model. Econometrica 60, 505531.CrossRefGoogle Scholar
Horowitz, J.L. & Hardle, W. (1995) Direct Semiparametric Estimation of Single-Index Models with Discrete Covariates. Working paper. Department of Economics, University of Iowa.Google Scholar
Ichimura, H. (1993) Semiparametric least squares (SLS) and weighted SLS estimation of singleindex models. Journal of Econometrics 58, 71120.CrossRefGoogle Scholar
Ichimura, H. & Lee, L.-F. (1991) Semiparametric least squares estimation of multiple index models: Single equation estimation. In Baraett, W.A., Powell, J.L., & Tauchen, G. (eds.), Nonparametric nd Semiparametric Methods in Econometrics and Statistics, pp. 349. Cambridge: Cambridge University Press.Google Scholar
Klein, R.W. & Spady, R.H. (1993) An efficient semiparametric estimator for binary response models. Econometrica 61, 387421.CrossRefGoogle Scholar
Manski, C.F. (1975) Maximum score estimation of the stochastic utility model of choice. Journal of Econometrics 3, 205228.CrossRefGoogle Scholar
Manski, C.F. (1985) Semiparametric analysis of discrete response: Asymptotic properties of the maximum score estimator. Journal of Econometrics 27, 313333.CrossRefGoogle Scholar
Manski, C.F. (1991) Nonparametric estimation of expectations in the analysis of discrete choice under uncertainty. In Barnett, W.A., Powell, J.L., & Tauchen, G. (eds.), Nonparametric and Semiparametric Methods in Econometrics and Statistics, pp. 259275. Cambridge: Cambridge University Press.Google Scholar
Newey, W.K. (1994) The asymptotic variance of semiparametric estimators. Econometrica 62, 13491382.CrossRefGoogle Scholar
Newey, W.K. & Stoker, T.M. (1993) Efficiency of weighted average derivative estimators and index models. Econometrica 61, 11991223.CrossRefGoogle Scholar
Powell, J.L. (1994) Estimation of semiparametric models. In Engle, R.F. & McFadden, D.F. (eds.), Handbook of Econometrics, vol. IV, pp. 24432521. Amsterdam: North Holland.Google Scholar
Powell, J.L., Stock, J.H., & Stoker, T.M. (1989) Semiparametric estimation of index coefficients. Econometrica 57, 14031430.CrossRefGoogle Scholar
Powell, J.L. & Stoker, T.M. (1992) Optimal bandwidth choice for density-weighted averages. Working paper 3424–92-EFA, Sloan School of Management, MIT.Google Scholar
Ruud, P.A. (1986) Consistent estimation of limited dependent variable models despite misspecification of distribution. Journal of Econometrics 32, 157187.CrossRefGoogle Scholar
Serfling, R.J. (1980) Approximation Theorems of Mathematical Statistics. New York: Wiley.CrossRefGoogle Scholar
Silverman, B.W. (1978) Weak and strong uniform consistency of the kernel estimate of a density function and its derivatives. Annals of Statistics 6, 177184; Addendum (1980) Annals of Statistics 8, 11751176.CrossRefGoogle Scholar
Stoker, T.M. (1991) Equivalence of direct and indirect estimators of average derivatives. In Barnett, W.A., Powell, J.L., & Tauchen, G. (eds.), Nonparametric and Semiparametric Methods in Econometrics and Statistics, pp. 99118. Cambridge: Cambridge University Press.Google Scholar