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LONG MEMORY TESTING IN THE TIME DOMAIN

Published online by Cambridge University Press:  06 September 2007

Matei Demetrescu ,
Vladimir Kuzin  and
Uwe Hassler
Matei Demetrescu
Affiliation:
Goethe-University Frankfurt
Vladimir Kuzin
Affiliation:
Goethe-University Frankfurt
Uwe Hassler
Affiliation:
Goethe-University Frankfurt
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Abstract

An integration test against fractional alternatives is suggested for univariate time series. The new test is a completely regression-based, lag augmented version of the Lagrange multiplier (LM) test by Robinson (1991, Journal of Econometrics 47, 67–84). Our main contributions, however, are the following. First, we let the short memory component follow a general linear process. Second, the innovations driving this process are martingale differences with eventual conditional heteroskedasticity that is accounted for by means of White's standard errors. Third, we assume the number of lags to grow with the sample size, thus approximating the general linear process. Under these assumptions, limiting normality of the test statistic is retained. The usefulness of the asymptotic results for finite samples is established in Monte Carlo experiments. In particular, several strategies of model selection are studied.An earlier version of this paper was presented at the URCT Conference in Faro, Portugal, 2005, and at the Econometrics Seminar of the University of Zürich. We are in particular grateful to Peter Robinson and Michael Wolf for helpful comments. Moreover, we thank two anonymous referees for reports that greatly helped to improve the paper.

Type
Research Article
Information
Econometric Theory , Volume 24 , Issue 1 , February 2008 , pp. 176 - 215
Copyright
© 2008 Cambridge University Press

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References

REFERENCES

Agiakloglou, C. & P. Newbold (1994) Lagrange multiplier tests for fractional difference. Journal of Time Series Analysis 15, 253262.Google Scholar
Amemiya, T. (1985) Advanced Econometrics. Harvard University Press.
Andrews, D.W.K. (1991) Heteroskedasticity and autocorrelation consistent covariance matrix estimation. Econometrica 59, 817858.Google Scholar
Berk, K.N. (1974) Consistent autoregressive spectral estimates. Annals of Statistics 2, 489502.Google Scholar
Bollerslev, T. (1986) Generalized autoregressive conditional heteroscedasticity. Journal of Econometrics 31, 307327.Google Scholar
Breitung, J. & U. Hassler (2002) Inference on the cointegration rank in fractionally integrated processes. Journal of Econometrics 110, 167185.Google Scholar
Brillinger, D.R. (1975) Times Series: Data Analysis and Theory. Holt, Rinehart and Winston.
Chang, Y. & J. Park (2002) On the asymptotics of ADF tests for unit roots. Econometric Reviews 21, 431448.Google Scholar
Davidson, J. (1994) Stochastic Limit Theory: An Introduction for Econometricians. Oxford University Press.
Demetrescu, M. (2006) On the Dickey-Fuller Test with White Standard Errors. Mimeo, Goethe-University, Frankfurt.
Dickey, D.A. & W.A. Fuller (1979) Distribution of estimators for autoregressive time series with a unit root. Journal of the American Statistical Association 74, 427431.Google Scholar
Dickey, D.A. & W.A. Fuller (1981) Likelihood ratio statistics for autoregressive time series with a unit root. Econometrica 49, 10571072.Google Scholar
Diebold, F.X. & G.D. Rudebusch (1991) On the power of Dickey-Fuller tests against fractional alternatives. Economic Letters 35, 155160.Google Scholar
Dolado, J.J., J. Gonzalo, & L. Mayoral (2002) A fractional Dickey-Fuller test for unit roots. Econometrica 70, 19632006.Google Scholar
Gonçalves, S. & L. Kilian (2003) Asymptotic and Bootstrap Inference for AR(∞) Processes with Conditional Heteroscedasticity. Working paper 2003-s28, CIRANO.
Granger, C.W.J. (1981) Some properties of time series data and their use in econometric model specification. Journal of Econometrics 16, 121130.Google Scholar
Granger, C.W.J. & R. Joyeux (1980) An introduction to long memory time series models and fractional differencing. Journal of Time Series Analysis 1, 1539.Google Scholar
Haldrup, N. (1994) Heteroscedasticity in non-stationary time series, some Monte Carlo evidence. Statistical Papers 35, 287307.Google Scholar
Hassler, U. & J. Breitung (2006) A residual-based LM type test against fractional cointegration. Econometric Theory 22, 10911111.Google Scholar
Hassler, U. & J. Wolters (1994) On the power of unit roots against fractionally integrated alternatives. Economic Letters 45, 15.Google Scholar
Henry, M. (2001) Robust automatic bandwidth for long memory. Journal of Time Series Analysis 22, 293316.Google Scholar
Henry, M. & P. Zaffaroni (2003) The long-range dependence paradigm for macroeconomics and finance. In P. Doukhan, G. Oppenheim, & M.S. Taqqu (eds.), Theory and Applications of Long-Range Dependence, pp. 417438. Birkhäuser.
Krämer, W. (1998) Fractional integration and the augmented Dickey-Fuller test. Economics Letters 61, 269272.Google Scholar
Leeb, H. & B.M. Pötscher (2005) Model selection and inference: Facts and fiction. Econometric Theory 21, 2159.Google Scholar
Lewis, R. & G.C. Reinsel (1985) Prediction of multivariate time series by autoregressive model fitting. Journal of Multivariate Analysis 16, 393411.Google Scholar
Lobato, I.N. & C. Velasco (2005) Optimal Fractional Dickey-Fuller Tests for Unit Roots. Mimeo, Universidad Carlos III de Madrid.
Lütkepohl, H. (1996) Handbook of Matrices. Wiley.
Milhoj, A. (1985) The moment structure of ARCH processes. Scandinavian Journal of Statistics 12, 281292.Google Scholar
Ng, S. & P. Perron (1995) Unit root tests in ARMA models with data-dependent methods for the selection of the truncation lag. Journal of the American Statistical Association 90, 268281.Google Scholar
Robinson, P.M. (1991) Testing for strong serial correlation and dynamic conditional heteroskedasticity in multiple regression. Journal of Econometrics 47, 6784.Google Scholar
Robinson, P.M. (1994) Efficient tests of nonstationary hypotheses. Journal of the American Statistical Association 89, 14201437.Google Scholar
Robinson, P.M. (1995) Gaussian semiparametric estimation of long range dependence. Annals of Statistics 23, 16301661.Google Scholar
Robinson, P.M. & M. Henry (1999) Long and short memory conditional heteroskedasticity in estimating the memory parameter of levels. Econometric Theory 15, 299336.Google Scholar
Said, S.E. & D.A. Dickey (1984) Testing for unit roots in autoregressive-moving average models of unknown order. Biometrika 71, 599607.Google Scholar
Schwert, G.W. (1989) Tests for unit roots: A Monte Carlo investigation. Journal of Business & Economic Statistics 7, 147160.Google Scholar
Sowell, F.B. (1990) The fractional unit root distribution. Econometrica 58, 495505.Google Scholar
Tanaka, K. (1999) The nonstationary fractional unit root. Econometric Theory 15, 549582.Google Scholar
Velasco, C. (1999) Gaussian semiparametric estimation of non-stationary time series. Journal of Time Series Analysis 20, 87127.Google Scholar