Hostname: page-component-586b7cd67f-2plfb Total loading time: 0 Render date: 2024-11-27T15:48:02.390Z Has data issue: false hasContentIssue false
  • English
  • Français

Finite Sample Performance of Likelihood Ratio Tests for Cointegrating Ranks in Vector Autoregressions

Published online by Cambridge University Press:  11 February 2009

Hiro Y. Toda
Hiro Y. Toda
Affiliation:
Institute of Social and Economic Research Osaka University
Get access Rights & Permissions [Opens in a new window]

Abstract

This paper investigates through Monte Carlo simulation the finite sample properties of likelihood ratio tests for cointegrating ranks that were proposed by Johansen (1991, Econometrica 59, 1551–1580). We transform the model into a canonical form so that the experiment is well controlled without loss of generality and then conduct a comprehensive simulation study. As expected, the test performance is very sensitive to the value of the stationary root(s) of the process. We also find that the test performance depends crucially on the correlation between the innovations that drive the stationary and the nonstationary components of the process. We conclude that 100 observations are not sufficient to ensure reasonably good performance uniformly over the values of the nuisance parameters that affect the distributions of the test statistics.

Type
Articles
Information
Econometric Theory , Volume 11 , Issue 5 , October 1995 , pp. 1015 - 1032
Copyright
Copyright © Cambridge University Press 1995

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, S.K. & Reinsel, G.C. (1990) Estimation for partially nonstationary multivariate autoregressive models. Journal of the American Statistical Association 85, 813823.CrossRefGoogle Scholar
Baillie, R.T. & Bollerslev, T. (1989) Common stochastic trends in a system of exchange rates. Journal of Finance 44, 167181.CrossRefGoogle Scholar
Campbell, J.Y. & Perron, P. (1991) Pitfalls and opportunities: What macroeconomists should know about unit roots. In Blanchard, O.J. & Fischer, S. (eds.), NBER Macroeconomics Annual 1991, pp. 141201. Cambridge: MIT Press.Google Scholar
Clements, M.P. & Mizon, G.E. (1991) Empirical analysis of macroeconomic time series: VAR and structural models. European Economic Review 35, 887932.CrossRefGoogle Scholar
DeJong, D.N., Nankervis, J.C., Savin, N.E., & Whiteman, C.H. (1992) Integration versus trend stationarity in time series. Econometrica 60, 423433.CrossRefGoogle Scholar
Gonzalo, J. (1994) Comparison of five alternative methods of estimating long run equilibrium relationships. Journal of Econometrics 60, 203233.CrossRefGoogle Scholar
Gregory, A.W. (1991) Testing for Cointegration in Linear Quadratic Models. Mimeo, Queen's University.Google Scholar
Johansen, S. (1988) Statistical analysis of cointegration vectors. Journal of Economic Dynamics and Control 12, 231254.CrossRefGoogle Scholar
Johansen, S. (1991) Estimation and hypothesis testing of cointegration vectors in Gaussian vector autoregressive models. Econometrica 59, 15511580.CrossRefGoogle Scholar
Johansen, S. (1992) Determination of cointegration rank in the presence of a linear trend. Oxford Bulletin of Economics and Statistics 54, 383397.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 52, 169210.CrossRefGoogle Scholar
Kunst, R. & Neusser, K. (1990) Cointegration in a macroeconomic system. Journal of Applied Econometrics 5, 351365.CrossRefGoogle Scholar
Osterwald-Lenum, M. (1992) A note with quantiles of the asymptotic distribution of the maximum likelihood cointegration rank test statistics. Oxford Bulletin of Economics and Statistics 54, 461471.CrossRefGoogle Scholar
Park, J.Y. & Ogaki, M. (1991) Inference in Cointegrated Models using VAR Prewhitening to Estimate Shortrun Dynamics. Mimeo, University of Rochester.Google Scholar
Phillips, P.C.B. (1991) Unidentified Components in Reduced Rank Regression Estimation of ECM's. Mimeo, Yale University.Google Scholar
Phillips, P.C.B. (1994) Some exact distribution theory for maximum likelihood estimators of cointegrating coefficients in error correction models. Econometrica 62, 7393.CrossRefGoogle Scholar
Podivinsky, J.M. (1991) Testing Misspecified Cointegrating Relationships. Mimeo, University of Southampton.Google Scholar
Podivinsky, J.M. (1992) Small sample properties of tests of linear restrictions on cointegrating vectors and their weights. Economics Letters 39, 1318.CrossRefGoogle Scholar
Reinsel, G.C. & Ahn, S.K. (1992) Vector autoregressive models with unit roots and reduced rank structure: Estimation, likelihood ratio tests, and forecasting. Journal of Time Series Analysis 13, 353375.CrossRefGoogle Scholar
Toda, H.Y. (1993) Finite Sample Performance of Likelihood Ratio Tests for Cointegrating Ranks in Vector Autoregressions. Mimeo, University of Tsukuba.Google Scholar
Toda, H.Y. (1994) Finite sample properties of likelihood ratio tests for cointegrating ranks when linear trends are present. Review of Economics and Statistics LXXVI, 6679.CrossRefGoogle Scholar
Toda, H.Y. & Phillips, P.C.B. (1994) Vector autoregression and causality: A theoretical overview and simulation study. Econometric Reviews 13, 259285.CrossRefGoogle Scholar