Measuring the self-similarity exponent in Lévy stable processes of financial time series |
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| Authors: | M. Ferná ndez-Martí nez,M.A. Sá nchez-Granero,J.E. Trinidad Segovia |
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| Affiliation: | 1. Area of Geometry and Topology, Faculty of Science, Universidad de Almería, 04120 Almería, Spain;2. Department of Accounting and Finance, Faculty of Economics and Business, Universidad de Almería, 04120 Almería, Spain |
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| Abstract: | Geometric method-based procedures, which will be called GM algorithms herein, were introduced in [M.A. Sánchez Granero, J.E. Trinidad Segovia, J. García Pérez, Some comments on Hurst exponent and the long memory processes on capital markets, Phys. A 387 (2008) 5543-5551], to efficiently calculate the self-similarity exponent of a time series. In that paper, the authors showed empirically that these algorithms, based on a geometrical approach, are more accurate than the classical algorithms, especially with short length time series. The authors checked that GM algorithms are good when working with (fractional) Brownian motions. Moreover, in [J.E. Trinidad Segovia, M. Fernández-Martínez, M.A. Sánchez-Granero, A note on geometric method-based procedures to calculate the Hurst exponent, Phys. A 391 (2012) 2209-2214], a mathematical background for the validity of such procedures to estimate the self-similarity index of any random process with stationary and self-affine increments was provided. In particular, they proved theoretically that GM algorithms are also valid to explore long-memory in (fractional) Lévy stable motions. |
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| Keywords: | Hurst exponent Financial markets Long memory GM algorithms Lé vy stable motion |
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