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Estimation Of Fractal Index And Fractal Dimension Of A Gaussian Process By Counting The Number Of Level Crossings

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  • Andrey Feuerverger
  • Peter Hall
  • Andrew T. A. Wood

Abstract

. The fractal index α and fractal dimension D of a Gaussian process are characteristics that describe the smoothness of the process. In principle, smoother processes have fewer crossings of a given level, and so level crossings might be employed to estimate α or D. However, the number of crossings of a level by a non‐differentiable Gaussian process is either zero or infinity, with probability one, so that level crossings are not directly usable. Crossing counts may be rendered finite by smoothing the process. Therefore, we consider estimators that are based on comparing the sizes of the average numbers of crossings for a small, bounded number of different values of the smoothing bandwidth. The averaging here is over values of the level. Strikingly, we show that such estimators are consistent, as the size of the smoothing bandwidths shrinks to zero, if and only if the weight function in the definition of ‘average’ is constant. In this important case we derive the asymptotic bias and variance of the estimators, assuming only a non‐parametric description of covariance, and describe the estimators' numerical properties. We also introduce a novel approach to generating Gaussian process data on a very fine grid.

Suggested Citation

  • Andrey Feuerverger & Peter Hall & Andrew T. A. Wood, 1994. "Estimation Of Fractal Index And Fractal Dimension Of A Gaussian Process By Counting The Number Of Level Crossings," Journal of Time Series Analysis, Wiley Blackwell, vol. 15(6), pages 587-606, November.
  • Handle: RePEc:bla:jtsera:v:15:y:1994:i:6:p:587-606
    DOI: 10.1111/j.1467-9892.1994.tb00214.x
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    Cited by:

    1. Fickel, Norman, 1996. "Visualisierung der Volatilität bei der Interpolation von Zeitreihen: Excel-Makro Saffint," Discussion Papers 15/1996, Friedrich-Alexander University Erlangen-Nuremberg, Chair of Statistics and Econometrics.
    2. Benassi, Albert & Cohen, Serge & Istas, Jacques, 1998. "Identifying the multifractional function of a Gaussian process," Statistics & Probability Letters, Elsevier, vol. 39(4), pages 337-345, August.
    3. Li, Ming, 2017. "Record length requirement of long-range dependent teletraffic," Physica A: Statistical Mechanics and its Applications, Elsevier, vol. 472(C), pages 164-187.
    4. Bianchi, Sergio, 2004. "A new distribution-based test of self-similarity," MPRA Paper 16640, University Library of Munich, Germany.
    5. A. Philippe & E. Thilly, 2002. "Identification of a Locally Self-similar Gaussian Process by Using Convex Rearrangements," Methodology and Computing in Applied Probability, Springer, vol. 4(2), pages 195-209, June.
    6. repec:jss:jstsof:05:i07 is not listed on IDEAS

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