Refined Inference on Long Memory in Realized Volatility |
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Authors: | Offer Lieberman Peter C B Phillips |
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Institution: | 1. Department of Economics , University of Haifa , Haifa, Israel offerl@econ.haifa.ac.il;3. Cowles Foundation for Research in Economics , Yale University , New Haven, Connecticut, USA |
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Abstract: | There is an emerging consensus in empirical finance that realized volatility series typically display long range dependence with a memory parameter (d) around 0.4 (Andersen et al., 2001
Andersen , T. G. ,
Bollerslev , T. ,
Diebold , F. X. ,
Labys , P. ( 2001 ). The distribution of realized exchange rate volatility . Journal of the American Statistical Association 96 ( 453 ): 42 – 55 .Taylor & Francis Online], Web of Science ®] , Google Scholar]; Martens et al., 2004
Martnes , M. ,
Van Dijk , D. ,
De Pooter , M. ( 2004 ). Modeling and forecasting S&P 500 volatility: Long memory, structural breaks and nonlinearity. Tinbergen Institute Discussion Paper 2004-067/4 . Google Scholar]). The present article provides some illustrative analysis of how long memory may arise from the accumulative process underlying realized volatility. The article also uses results in Lieberman and Phillips (2004
Lieberman , O. ,
Phillips , P. C. B. ( 2004 ). Expansions for the distribution of the maximum likelihood estimator of the fractional difference parameter . Econometric Theory 20 ( 3 ): 464 – 484 . Google Scholar], 2005
Lieberman , O. ,
Phillips , P. C. B. ( 2005 ). Expansions for approximate maximum likelihood estimators of the fractional difference parameter . The Econometrics Journal 8 : 367 – 379 . Google Scholar]) to refine statistical inference about d by higher order theory. Standard asymptotic theory has an O(n ?1/2) error rate for error rejection probabilities, and the theory used here refines the approximation to an error rate of o(n ?1/2). The new formula is independent of unknown parameters, is simple to calculate and user-friendly. The method is applied to test whether the reported long memory parameter estimates of Andersen et al. (2001
Andersen , T. G. ,
Bollerslev , T. ,
Diebold , F. X. ,
Labys , P. ( 2001 ). The distribution of realized exchange rate volatility . Journal of the American Statistical Association 96 ( 453 ): 42 – 55 .Taylor & Francis Online], Web of Science ®] , Google Scholar]) and Martens et al. (2004
Martnes , M. ,
Van Dijk , D. ,
De Pooter , M. ( 2004 ). Modeling and forecasting S&P 500 volatility: Long memory, structural breaks and nonlinearity. Tinbergen Institute Discussion Paper 2004-067/4 . Google Scholar]) differ significantly from the lower boundary (d = 0.5) of nonstationary long memory, and generally confirms earlier findings. |
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Keywords: | Edgeworth expansion Long memory Realized volatility |
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