Hostname: page-component-cd9895bd7-lnqnp Total loading time: 0 Render date: 2024-12-26T07:00:38.089Z Has data issue: false hasContentIssue false
  • English
  • Français

A SIEVE BOOTSTRAP TEST FOR COINTEGRATION IN A CONDITIONAL ERROR CORRECTION MODEL

Published online by Cambridge University Press:  26 October 2009

Franz C. Palm ,
Stephan Smeekes  and
Jean-Pierre Urbain
Get access Rights & Permissions [Opens in a new window]

Abstract

In this paper we propose a bootstrap version of the Wald test for cointegration in a single-equation conditional error correction model. The multivariate sieve bootstrap is used to deal with dependence in the series. We show that the introduced bootstrap test is asymptotically valid. We also analyze the small sample properties of our test by simulation and compare it with the asymptotic test and several alternative bootstrap tests. The bootstrap test offers significant improvements in terms of size properties over the asymptotic test, while having similar power properties. The sensitivity of the bootstrap test to the allowance for deterministic components is also investigated. Simulation results show that the tests with sufficient deterministic components included are insensitive to the true value of the trends in the model and retain correct size.

Type
Research Article
Information
Econometric Theory , Volume 26 , Issue 3 , June 2010 , pp. 647 - 681
Copyright
Copyright © Cambridge University Press 2009

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.)

Footnotes

Previous versions of this paper have been presented at the Econometric Society European Meeting in Milan, August 2008; at the International Workshop on Recent Advances in Time Series Analysis in Cyprus, June 2008; at the Workshop on Bootstrap and Time Series in Kaiserslautern, June 2008; at the conference entitled Inference and Tests in Econometrics, A Tribute to Russell Davidson in Marseille, April 2008; at an Ente Luigi Einaudi Seminar in Econometrics in Rome, November 2007; and at the first workshop of the Methods in International Finance Network in Maastricht, September 2007. We gratefully acknowledge the comments by participants at these seminars and by Anders Swensen, Pentti Saikkonen, and three anonymous referees. We thank NWO and the Royal Netherlands Academy of Arts and Sciences for financial support.

References

REFERENCES

Ahlgren, N.J.C. (2000) Bootstrapping the Error Correction Model Cointegration Test. Working paper 428, Swedish School of Economics and Business Administration.Google Scholar
Banerjee, A., Dolado, J.J., & Mestre, R. (1998) Error-correction mechanism tests for cointegration in a single-equation framework. Journal of Time Series Analysis 19, 267283.CrossRefGoogle Scholar
Basawa, I.V., Mallik, A.K., McCormick, W.P., Reeves, J.H., & Taylor, R.L. (1991) Bootstrapping unstable first-order autoregressive processes. Annals of Statistics 19, 10981101.CrossRefGoogle Scholar
Berger, E. (1991) Majorization, exponential inequalities and almost sure behavior of vector-valued random variables. Annals of Probability 19, 12061226.CrossRefGoogle Scholar
Berk, K.N. (1974) Consistent autoregressive spectral estimates. Annals of Statistics 2, 489502.CrossRefGoogle Scholar
Boswijk, H.P. (1994) Testing for an unstable root in conditional and structural error correction models. Journal of Econometrics 63, 3760.10.1016/0304-4076(93)01560-9Google Scholar
Boswijk, H.P. & Franses, P.H. (1992) Dynamic specification and cointegration. Oxford Bulletin of Economics and Statistics 54, 369381.CrossRefGoogle Scholar
Bühlmann, P. (1995) Moving-average representations of autoregressive approximations. Stochastic Processes and Their Applications 60, 331342.CrossRefGoogle Scholar
Bühlmann, P. (1997) Sieve bootstrap for time series. Bernoulli 3, 123148.Google Scholar
Chang, Y. & Park, J.Y. (2002) On the asymptotics of ADF tests for unit roots. Econometric Reviews 21, 431447.Google Scholar
Chang, Y. & Park, J.Y. (2003) A sieve bootstrap for the test of a unit root. Journal of Time Series Analysis 24, 379400.10.1111/1467-9892.00312CrossRefGoogle Scholar
Chang, Y., Park, J.Y., & Song, K. (2006) Bootstrapping cointegrating regressions. Journal of Econometrics 133, 703739.Google Scholar
Einmahl, U. (1987) A useful estimate in the multidimensional invariance principle. Probability Theory and Related Fields 76, 81101.10.1007/BF00390277Google Scholar
Engle, R.F. & Granger, C.W.J. (1987) Co-integration and error correction: Representation, estimation and testing. Econometrica 55, 251276.CrossRefGoogle Scholar
Hannan, E.J. & Kavalieris, L. (1986) Regression, autoregression models. Journal of Time Series Analysis 7, 2749.CrossRefGoogle Scholar
Johansen, S. (1995) Likelihood-Based Inference in Cointegrated Vector Autoregressive Models. Oxford University Press.CrossRefGoogle Scholar
Johansen, S. & Juselius, K. (1990) Maximum likelihood estimation and inference on cointegration - with applications to the demand for money. Oxford Bulletin of Economics and Statistics 54, 169210.Google Scholar
Kremers, J.J.M., Ericsson, N.R., & Dolado, J.J. (1992) The power of cointegration tests. Oxford Bulletin of Economics and Statistics 52, 325348.Google Scholar
Mantalos, P. & Shukur, G. (1998) Size and power of the error correction model cointegration test. A bootstrap approach. Oxford Bulletin of Economics and Statistics 60, 249255.10.1111/1468-0084.00097Google Scholar
Palm, F.C., Smeekes, S., & Urbain, J.-P. (2008) Bootstrap unit root tests: Comparison and extensions. Journal of Time Series Analysis 29, 371401.Google Scholar
Paparoditis, E. (1996) Bootstrapping autoregressive and moving average parameter estimates of infinite order vector autoregressive processes. Journal of Multivariate Analysis 57, 277296.Google Scholar
Paparoditis, E. & Politis, D.N. (2003) Residual-based block bootstrap for unit root testing. Econometrica 71, 813855.Google Scholar
Paparoditis, E. & Politis, D.N. (2005) Bootstrapping unit root tests for autoregressive time series. Journal of the American Statistical Association 100, 545553.Google Scholar
Park, J.Y. (2002) An invariance principle for sieve bootstrap in time series. Econometric Theory 18, 469490.CrossRefGoogle Scholar
Park, J.Y. (2003) Bootstrap unit root tests. Econometrica 71, 18451895.Google Scholar
Park, J.Y. & Phillips, P.C.B. (1989) Statistical inference in regressions with integrated processes: Part 2. Econometric Theory 5, 95131.Google Scholar
Pesavento, E. (2004) Analytical evaluation of the power of tests for the absence of cointegration. Journal of Econometrics 122, 349384.Google Scholar
Phillips, P.C.B. (1988) Weak convergence to the matrix stochastic integral . Journal of Multivariate Analysis 24, 252264.10.1016/0047-259X(88)90039-5CrossRefGoogle Scholar
Phillips, P.C.B. & Ouliaris, S. (1990) Asymptotic properties of residual based tests for cointegration. Econometrica 58, 165193.10.2307/2938339CrossRefGoogle Scholar
Phillips, P.C.B. & Solo, V. (1992) Asymptotics for linear processes. Annals of Statistics 20, 9711001.10.1214/aos/1176348666Google Scholar
Poskitt, D.S. (1994) A note on autoregressive modeling. Econometric Theory 10, 884899.Google Scholar
Seo, M. (2006) Bootstrap testing for the null of no cointegration in a threshold vector error correction model. Journal of Econometrics 134, 129150.10.1016/j.jeconom.2005.06.018CrossRefGoogle Scholar
Swensen, A.R. (2006) Bootstrap algorithms for testing and determining the cointegration rank in VAR models. Econometrica 74, 16991714.CrossRefGoogle Scholar
Trenkler, C. (2009) Bootstrapping systems cointegration tests with a prior adjustment for deterministic terms. Econometric Theory 25, 243269.CrossRefGoogle Scholar
Van Giersbergen, N.P.A. & Kiviet, J.F. (1996) Bootstrapping a stable AD model: Weak vs strong exogeneity. Oxford Bulletin of Economics and Statistics 58, 631656.CrossRefGoogle Scholar
Zivot, E. (2000) The power of single equation tests for cointegration when the cointegrating vector is prespecified. Econometric Theory 16, 407439.CrossRefGoogle Scholar