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Higher-Order Improvements of the Parametric Bootstrap for Long-Memory Gaussian ProcessesDonald W. K. AndrewsYale University - Cowles Foundation Offer LiebermanTechnion-Israel Institute of Technology - The William Davidson Faculty of Industrial Engineering & Management August 2003 Cowles Foundation Discussion Paper No. 1378 Abstract: This paper determines coverage probability errors of both delta method and parametric bootstrap confidence intervals (CIs) for the covariance parameters of stationary long-memory Gaussian time series. CIs for the long-memory parameter d_{0} are included. The results establish that the bootstrap provides higher-order improvements over the delta method. Analogous results are given for tests. The CIs and tests are based on one or other of two approximate maximum likelihood estimators. The first estimator solves the first-order conditions with respect to the covariance parameters of a "plug-in" log-likelihood function that has the unknown mean replaced by the sample mean. The second estimator does likewise for a plug-in Whittle log-likelihood. The magnitudes of the coverage probability errors for one-sided bootstrap CIs for covariance parameters for long-memory time series are shown to be essentially the same as they are with iid data. This occurs even though the mean of the time series cannot be estimated at the usual n^{1/2} rate.
Number of Pages in PDF File: 43 Keywords: Asymptotics, Confidence Intervals, Delta Method, Edgeworth Expansion, Gaussian Process, Long Memory, Maximum Likelihood Estimator, Parametric Bootstrap, t Statistic, Whittle Likelihood JEL Classification: C12, C13, C15 working papers seriesDate posted: August 29, 2002Suggested CitationContact Information
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