Hostname: page-component-78c5997874-s2hrs Total loading time: 0 Render date: 2024-11-19T20:40:20.410Z Has data issue: false hasContentIssue false
  • English
  • Français

A sharp analysis on the asymptotic behaviorof the Durbin–Watson statistic for the first-order autoregressive process

Published online by Cambridge University Press:  03 June 2013

Bernard Bercu  and
Frédéric Proïa
Bernard Bercu
Affiliation:
Université Bordeaux 1, Institut de Mathématiques de Bordeaux, UMR 5251, and INRIA Bordeaux, team ALEA, 351 Cours de la Libération, 33405 Talence Cedex, France. Bernard.Bercu@math.u-bordeaux1.fr; Frederic.Proia@inria.fr
Frédéric Proïa
Affiliation:
Université Bordeaux 1, Institut de Mathématiques de Bordeaux, UMR 5251, and INRIA Bordeaux, team ALEA, 351 Cours de la Libération, 33405 Talence Cedex, France. Bernard.Bercu@math.u-bordeaux1.fr; Frederic.Proia@inria.fr
Get access

Abstract

The purpose of this paper is to provide a sharp analysis on the asymptotic behavior of the Durbin–Watson statistic. We focus our attention on the first-order autoregressive process where the driven noise is also given by a first-order autoregressive process. We establish the almost sure convergence and the asymptotic normality for both the least squares estimator of the unknown parameter of the autoregressive process as well as for the serial correlation estimator associated with the driven noise. In addition, the almost sure rates of convergence of our estimates are also provided. It allows us to establish the almost sure convergence and the asymptotic normality for the Durbin–Watson statistic. Finally, we propose a new bilateral statistical test for residual autocorrelation. We show how our statistical test procedure performs better, from a theoretical and a practical point of view, than the commonly used Box–Pierce and Ljung–Box procedures, even on small-sized samples.

Keywords

Durbin–Watson statisticautoregressive processresidual autocorrelationstatistical test for serial correlation
Type
Research Article
Information
ESAIM: Probability and Statistics , Volume 17 , 2013 , pp. 500 - 530
Copyright
© EDP Sciences, SMAI, 2013

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

Bercu, B., On the convergence of moments in the almost sure central limit theorem for martingales with statistical applications. Stoch. Process. Appl. 11 (2004) 157173. Google Scholar
Bercu, B., Cenac, P. and Fayolle, G., On the almost sure central limit theorem for vector martingales: convergence of moments and statistical applications. J. Appl. Probab. 46 (2009) 151169. Google Scholar
V. Bitseki Penda, H. Djellout and F. Proïa, Moderate deviations for the Durbin–Watson statistic related to the first-order autoregressive process. Submitted for publication, arXiv:1201.3579 (2012).
Box, G. and Ljung, G., On a measure of a lack of fit in time series models. Biometrika 65 (1978) 297303. Google Scholar
Box, G. and Pierce, D., Distribution of residual autocorrelations in autoregressive-integrated moving average time series models. Amer. Statist. Assn. J. 65 (1970) 15091526. Google Scholar
Breusch, T., Testing for autocorrelation in dynamic linear models. Austral. Econ. Papers. 17 (1978) 334355. Google Scholar
M. Duflo, Random iterative models, Appl. Math., vol. 34. Springer-Verlag, Berlin (1997).
Durbin, J., Testing for serial correlation in least-squares regression when some of the regressors are lagged dependent variables. Econometrica 38 (1970) 410421. Google Scholar
Durbin, J., Approximate distributions of student’s t-statistics for autoregressive coefficients calculated from regression residuals. J. Appl. Probab. 23A (1986) 173185. Google Scholar
Durbin, J. and Watson, G.S., Testing for serial correlation in least squares regression I. Biometrika 37 (1950) 409428. Google ScholarPubMed
Durbin, J. and Watson, G.S., Testing for serial correlation in least squares regression II. Biometrika 38 (1951) 159178. Google ScholarPubMed
Durbin, J. and Watson, G.S., Testing for serial correlation in least squares regession III. Biometrika 58 (1971) 119. Google Scholar
Godfrey, L., Testing against general autoregressive and moving average error models when the regressors include lagged dependent variables. Econometrica 46 (1978) 12931302. Google Scholar
P. Hall and C.C. Heyde, Martingale limit theory and its application, Probability and Mathematical Statistics. Academic Press Inc., New York (1980).
Inder, B.A., Finite-sample power of tests for autocorrelation in models containing lagged dependent variables. Econom. Lett. 14 (1984) 179185. Google Scholar
Inder, B.A., An approximation to the null distribution of the Durbin–Watson statistic in models containing lagged dependent variables. Econom. Theory 2 (1986) 413428. Google Scholar
King, M.L. and Wu, P.X., Small-disturbance asymptotics and the Durbin–Watson and related tests in the dynamic regression model. J. Econometrics 47 (1991) 145152. Google Scholar
Maddala, G.S. and Rao, A.S., Tests for serial correlation in regression models with lagged dependent variables and serially correlated errors. Econometrica 41 (1973) 761774. Google Scholar
Malinvaud, E., Estimation et prévision dans les modèles économiques autorégressifs. Review of the International Institute of Statistics 29 (1961) 132. Google Scholar
Nerlove, M. and Wallis, K.F., Use of the Durbin–Watson statistic in inappropriate situations. Econometrica 34 (1966) 235238. Google Scholar
Park, S.B., On the small-sample power of Durbin’s h-test. J. Amer. Stat. Assoc. 70 (1975) 6063. Google Scholar
F. Proïa, A new statistical procedure for testing the presence of a significative correlation in the residuals of stable autoregressive processes. Submitted for publication, arXiv:1203.1871 (2012).
Stocker, T., On the asymptotic bias of OLS in dynamic regression models with autocorrelated errors. Statist. Papers 48 (2007) 8193. Google Scholar
Stout, W.F., A martingale analogue of Kolmogorov’s law of the iterated logarithm. Z. Wahrscheinlichkeitstheorie und Verw. Gebiete 15 (1970) 279290. Google Scholar
W.F. Stout, Almost sure convergence, Probab. Math. Statist. Academic Press, New York, London 24 (1974).
Tillman, J.A., The power of the Durbin–Watson test. Econometrica 43 (1975) 959974. Google Scholar
Wei, C. and Winnicki, J., Estimation on the means in the branching process with immigration. Ann. Statist. 18 (1990) 17571773. Google Scholar