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Asymptotics For The Low‐Frequency Ordinates Of The Periodogram Of A Long‐Memory Time Series

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  • Clifford M. Hurvich
  • Kaizo I. Beltrao

Abstract

. We consider the asymptotic distribution of the normalized periodogram ordinates I(ωj)/f(ωj) (j= 1,2,…) of a general long‐memory time series. Here, I(ω;) is the periodogram based on a sample size n, f(ω) is the spectral density and ωj= 2πj/n. We assume that n→∝ with j held fixed, and so our focus is on low frequencies; these are the most important frequencies for the periodogram‐based estimation of the memory parameter d. Contrary to popular belief, the normalized periodogram ordinates obtained from a Gaussian process are asymptotically neither independent identically distributed nor exponentially distributed. In fact, limn E{I(ωj)/f(ωj)} depends on both j and d and is typically greater than unity, implying a positive asymptotic relative bias in I(ωj) as an estimator of f(ωj). Tapering is found to reduce this bias dramatically, except at frequency ω1. The asymptotic distribution of I(ωj)/f(ωj) for a Gaussian process is, in general, that of an unequally weighted linear combination of two independent X21 random variables. The asymptotic mean of the log normalized periodogram depends on j and d and is not in general equal to the negative of Euler's constant, as is commonly assumed. Consequently, the regression estimator of d proposed by Geweke and Porter‐Hudak will be asymptotically biased if the number of frequencies used in the regression is held fixed as n→∝.

Suggested Citation

  • Clifford M. Hurvich & Kaizo I. Beltrao, 1993. "Asymptotics For The Low‐Frequency Ordinates Of The Periodogram Of A Long‐Memory Time Series," Journal of Time Series Analysis, Wiley Blackwell, vol. 14(5), pages 455-472, September.
  • Handle: RePEc:bla:jtsera:v:14:y:1993:i:5:p:455-472
    DOI: 10.1111/j.1467-9892.1993.tb00157.x
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    Cited by:

    1. Yaeji Lim & Hee-Seok Oh, 2022. "Quantile spectral analysis of long-memory processes," Empirical Economics, Springer, vol. 62(3), pages 1245-1266, March.
    2. Grace Yap & Wen Cheong Chin, 2016. "Spectral bandwidth selection for long memory," Modern Applied Science, Canadian Center of Science and Education, vol. 10(8), pages 1-63, August.
    3. Mark J. Jensen, 1997. "Using Wavelets to Obtain a Consistent Ordinary Least Squares Estimator of the Long Memory Parameter," Econometrics 9710002, University Library of Munich, Germany.
    4. Francis In & Sangbae Kim, 2012. "An Introduction to Wavelet Theory in Finance:A Wavelet Multiscale Approach," World Scientific Books, World Scientific Publishing Co. Pte. Ltd., number 8431, August.
    5. Erhard Reschenhofer & Thomas Stark & Manveer K. Mangat, 2020. "Robust Estimation of the Memory Parameter," Journal of Statistical and Econometric Methods, SCIENPRESS Ltd, vol. 9(4), pages 1-5.
    6. Aeneas Rooch & Ieva Zelo & Roland Fried, 2019. "Estimation methods for the LRD parameter under a change in the mean," Statistical Papers, Springer, vol. 60(1), pages 313-347, February.

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