Abstract
This paper discusses likelihood-ratio (LR) tests on the cointegrating (CI) rank which consider any possible dimension of the CI rank under the alternative. The trace test and lambda-max test are obtained as special cases. Limit quantiles for all the tests in the class are derived. It is found that any of these tests can be used to construct an estimator of the CI rank, with no differences in asymptotic properties when the alternative is fixed. The properties of the class of tests are investigated by local asymptotic analysis, a simulation study and an empirical illustration. It is found that all the tests in the class have comparable power, which deteriorates substantially as the number of random walks increases. Tests constructed for a specific class of alternatives present minor power gains for alternatives in the class, and require the alternative to be far from the null. No test in this class is found to be asymptotically (in-)admissible. Some of the new tests in the class can also be arranged to give a constrained estimator of the CI rank, that restricts the minimum number of common trends. The power gains that these tests can obtain by constraining the minimum number of common trends appears to be limited and outweighted by the risk of inconsistency induced by the constrains. As a consequence, no value of the CI rank should be left untested, unless it can be excluded beyond any reasonable doubt.
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References
Andrews DWK (1996). Admissibility of the likelihood ratio test when the parameter space is restricted under the alternative. Econometrica 64: 705–718
Billingsley P (1968). Convergence of probability measures. Wiley, New York
Canova F and Ravn MO (1996). International consumption risk sharing. Int Econ Rev 37: 573–601
Cavaliere G, Fanelli L and Gardini A (2006). Regional consumption dynamics and risk sharing in Italy. Int Rev Econ Finance 15: 525–542
Doornik JA (1998). Approximations to the asymptotic distribution of cointegration tests. J Econ Surv 12: 573–593
Horvath MTK and Watson MW (1995). Testing for cointegration when some of the cointegrating vectors are prespecified. Econo Theory 11: 984–1014
Johansen S (1991a). Estimation and hypothesis testing of cointegration vectors in Gaussian autoregressive models. Econometrica 59: 1551–1580
Johansen S (1991b). The power function of the likelihood ratio test for cointegration. In: Gruber, J (eds) Econometric decision models: new methods of modelling and applications, pp 323–335. Springer, New York
Johansen S (1992). Determination of cointegration rank in the presence of a linear trend. Oxford Bul Econ Stat 54: 383–397
Johansen S (1996). Likelihood based inference in cointegrated vector autoregressive models. Oxford University Press, Oxford
Lütkepohl H, Saikkonen P and Trenkler C (2001). Maximum eigenvalue versus trace tests for the cointegrating rank of a VAR process. Econometr J 4: 287–310
Nielsen B (2004). On the distribution of likelihood ratio test statistics for cointegration rank. Econometr Rev 23: 1–23
Paruolo P (2001a). The power of lambda max. Oxford Bull Econ Stat 63: 395–403
Paruolo P (2001b). LR cointegration tests when some cointegrating relations are known. Stat Methods Appl 10: 123–137
Paruolo P (2002). On Monte Carlo estimation of relative power. Econometr J 5: 65–75
Paruolo P (2005) Design of vector autoregressive processes for invariant statistics, Quaderno della Facoltà di Economia 2005/6, University of Insubria
Saikkonen P and Lütkepohl H (2000). Testing for the cointegrating rank of a VAR process with an intercept. Econometr Theory 16: 373–406
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Cavaliere, G., Fanelli, L. & Paruolo, P. Tests for cointegration rank and choice of the alternative. Stat Methods Appl 18, 169–191 (2009). https://doi.org/10.1007/s10260-007-0084-2
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DOI: https://doi.org/10.1007/s10260-007-0084-2