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A SIMPLE EFFICIENT INSTRUMENTAL VARIABLE ESTIMATOR FOR PANEL AR(p) MODELS WHEN BOTH N AND T ARE LARGE

Published online by Cambridge University Press:  01 June 2009

Kazuhiko Hayakawa
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Abstract

In this paper, we show that for panel AR(p) models, an instrumental variable (IV) estimator with instruments deviated from past means has the same asymptotic distribution as the infeasible optimal IV estimator when both N and T, the dimensions of the cross section and time series, are large. If we assume that the errors are normally distributed, the asymptotic variance of the proposed IV estimator is shown to attain the lower bound when both N and T are large. A simulation study is conducted to assess the estimator.

Type
Brief Report
Information
Econometric Theory , Volume 25 , Issue 3 , June 2009 , pp. 873 - 890
Copyright
Copyright © Cambridge University Press 2009

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Footnotes

The author is deeply grateful to the co-editor, two anonymous referees, Kaddour Hadri, Chirok Han, Cheng Hsiao, Naoto Kunitomo, Eiji Kurozumi, Kosuke Oya, Peter Phillips, Donggyu Sul, Taku Yamamoto, and the participants of the 14th International Conference of Panel Data at Xiamen University, the Fall meeting of the Japanese Economic Association at Nihon University, the Hitotsubashi Conference on Econometrics 2007, and the special 18th meeting of the New Zealand Econometric Study Group at the University of Auckland for helpful comments. The author also acknowledges Ryo Okui, who posed a question that inspired this paper. The research benefited from the JSPS fellowship and a Grant-in-Aid for Scientific Research (KAKENHI 20830056) of the JSPS. All remaining errors are mine. Finally, this paper is dedicated to the late Professor Satoru Kanoh, who provided useful comments on an early version of this paper.

References

REFERENCES

Ahn, S.C. & Schmidt, P. (1995) Efficient estimation of models for dynamic panel data. Journal of Econometrics 68, 527.10.1016/0304-4076(94)01641-CCrossRefGoogle Scholar
Ahn, S.C. & Schmidt, P. (1997) Efficient estimation of dynamic panel data models: Alternative assumptions and simplified estimation. Journal of Econometrics 76, 309321.10.1016/0304-4076(95)01793-3CrossRefGoogle Scholar
Alvarez, J. & Arellano, M. (2003) The time series and cross-section asymptotics of dynamic panel data estimators. Econometrica 71, 11211159.10.1111/1468-0262.00441CrossRefGoogle Scholar
Alvarez, J. & Arellano, M. (2004) Robust Likelihood Estimation of Dynamic Panel Data Models. CEMFI Working paper no. 0421.Google Scholar
Anderson, T.W. & Hsiao, C. (1981) Estimation of dynamic models with error components. Journal of the American Statistical Association 76, 598606.10.1080/01621459.1981.10477691CrossRefGoogle Scholar
Anderson, T.W. & Hsiao, C. (1982) Formulation and estimation of dynamic models using panel data. Journal of Econometrics 18, 4782.10.1016/0304-4076(82)90095-1CrossRefGoogle Scholar
Arellano, M. (2003a) Modelling Optimal Instrumental Variables for Dynamic Panel Data Models. CEMFI Working paper no. 0310.Google Scholar
Arellano, M. (2003b) Panel Data Econometrics. Oxford University Press.10.1093/0199245282.001.0001CrossRefGoogle Scholar
Arellano, M. & Bond, S. (1991) Some tests of specification for panel data: Monte Carlo evidence and an application to employment equations. Review of Economic Studies 58, 277297.10.2307/2297968CrossRefGoogle Scholar
Arellano, M. & Bover, O. (1995) Another look at the instrumental variable estimation of error- components models. Journal of Econometrics 68, 2951.10.1016/0304-4076(94)01642-DCrossRefGoogle Scholar
Blundell, R. & Bond, S. (1998) Initial conditions and moment restrictions in dynamic panel data models. Journal of Econometrics 87, 115143.10.1016/S0304-4076(98)00009-8CrossRefGoogle Scholar
Bun, M.J.G. & Kiviet, J.F. (2006) The effects of dynamic feedbacks on LS and MM estimator accuracy in panel data models. Journal of Econometrics 127, 409444.10.1016/j.jeconom.2005.02.006CrossRefGoogle Scholar
Bun, M.J.G. & Windmeijer, F. (2007) The Weak Instrument Problem of the System GMM Estimator in Dynamic Panel Data Models. University of Bristol Economics Working paper no. 07/595.10.2139/ssrn.976398CrossRefGoogle Scholar
Chowdhury, G. (1987) A note on correcting biases in dynamic panel models. Applied Economics 19, 3137.10.1080/00036848700000055CrossRefGoogle Scholar
Hahn, J., Hausman, J., & Kuersteiner, G. (2007) Long difference instrumental variables estimation for dynamic panel models with fixed effects. Journal of Econometrics 127, 574617.10.1016/j.jeconom.2006.07.005CrossRefGoogle Scholar
Hahn, J. & Kuersteiner, G. (2002) Asymptotically unbiased inference for a dynamic panel model with fixed effects when both n and T are large. Econometrica 70, 16391657.10.1111/1468-0262.00344CrossRefGoogle Scholar
Han, C. & Phillips, P.C.B. (2009) GMM estimation for dynamic panels with fixed effects and strong instruments at unity. Econometric Theory, forthcoming.Google Scholar
Hayakawa, K. (2006) A note on bias in first-differenced AR(1) models. Economics Bulletin 3, 110.Google Scholar
Hayakawa, K. (2007a) Consistent OLS estimation of AR(1) dynamic panel data models with short time series. Applied Economics Letters 14, 11411145.10.1080/13504850600606109CrossRefGoogle Scholar
Hayakawa, K. (2007b) Small sample bias properties of the system GMM estimator in dynamic panel data models. Economics Letters 95, 3238.10.1016/j.econlet.2006.09.011CrossRefGoogle Scholar
Hayakawa, K. (2008) On the Effect of Nonstationary Initial Conditions in Dynamic Panel Data Models. Hi-Stat DP series, no. 245, Hitotsubashi University.Google Scholar
Holtz-Eakin, D., Newey, W.K., & Rosen, H.S. (1988) Estimating vector autoregressions with panel data. Econometrica 56, 13711395.10.2307/1913103CrossRefGoogle Scholar
Lee, Y. (2007) A General Approach to Bias Correction in Dynamic Panels under Time Series Misspecification. Working paper, University of Michigan.10.2139/ssrn.1004386Google Scholar
Moon, H.R. & Phillips, P.C.B. (2000) Estimation of autoregressive roots near unity using panel data. Econometric Theory 16, 927997.10.1017/S026646660016606XCrossRefGoogle Scholar
Okui, R. (2008) The Optimal Choice of Moments in Dynamic Panel Data Models. Working paper, HKUST.Google Scholar
Phillips, P.C.B. & Moon, H.R. (1999) Linear regression limit theory for nonstationary panel data. Econometrica, 67, 10571111.10.1111/1468-0262.00070CrossRefGoogle Scholar
Ramalho, J. (2005) Feasible bias-corrected OLS, within-groups, and first-differences estimators for typical micro and macro AR(1) panel data models. Empirical Economics 30, 735748.10.1007/s00181-005-0256-6CrossRefGoogle Scholar
So, B.S. & Shin, D.W. (1999) Recursive mean adjustment in time series inferences. Statistics and Probability Letters 46, 6573.10.1016/S0167-7152(98)00247-8CrossRefGoogle Scholar
Whittle, P. (1951) Hypothesis Testing in Time-Series Analysis. Almqvist and Wiksell.Google Scholar
Wise, J. (1955) The autocorrelation function and the spectral density function. Biometrika 42, 151159.10.1093/biomet/42.1-2.151CrossRefGoogle Scholar