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Semiparametric estimation and inference on the fractal index of Gaussian and conditionally Gaussian time series data

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  • Mikkel Bennedsen

Abstract

This paper studies the properties of a particular estimator of the fractal index of a time series with a view to applications in financial econometrics and mathematical finance. We show how measurement noise (e.g., microstructure noise) in the observations will bias the estimator, potentially resulting in the econometrician erroneously finding evidence of fractal characteristics in a time series. We propose a new estimator which is robust to such noise and construct a formal hypothesis test for the presence of noise in the observations. A number of simulation exercises are carried out, providing guidance for implementation of the theory. Finally, the methods are illustrated on two empirical data sets; one of turbulent velocity flows and one of financial prices.

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  • Mikkel Bennedsen, 2020. "Semiparametric estimation and inference on the fractal index of Gaussian and conditionally Gaussian time series data," Econometric Reviews, Taylor & Francis Journals, vol. 39(9), pages 875-903, October.
    • Handle: RePEc:taf:emetrv:v:39:y:2020:i:9:p:875-903
    DOI: 10.1080/07474938.2020.1721832
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    Cited by:

    1. Christian Bayer & Paul Hager & Sebastian Riedel & John Schoenmakers, 2021. "Optimal stopping with signatures," Papers 2105.00778, arXiv.org.
    2. Wu, Peng & Muzy, Jean-François & Bacry, Emmanuel, 2022. "From rough to multifractal volatility: The log S-fBM model," Physica A: Statistical Mechanics and its Applications, Elsevier, vol. 604(C).
    3. Peter Christensen, 2024. "Roughness Signature Functions," Papers 2401.02819, arXiv.org.
    4. Peng Wu & Jean-Franc{c}ois Muzy & Emmanuel Bacry, 2022. "From Rough to Multifractal volatility: the log S-fBM model," Papers 2201.09516, arXiv.org, revised Jul 2022.

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