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Wavelets for time series analysis - a survey and new results

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Języki publikacji
EN
Abstrakty
EN
In the paper we review stochastic properties of wavelet coefficients for time series indexed by continuous or discrete time. The main emphasis is on decorrelation property and its implications for data analysis. Some new properties are developed as the rates of correlation decay for the wavelet coefficients in the case of long-range dependent processes such as the fractional Gaussian noise and the fractional autoregressive integrated moving average processes. It is proved that for such processes the within-scale covariance of the wavelet coefficients at lag k is O(k^2(H-N)-2), where H is the Hurst exponent and N is the number of vanishing moments of the wavelet employed. Some applications of decorrelation property are briefly discussed.
Rocznik
Strony
1093--1125
Opis fizyczny
Bibliogr. 35 poz., wykr.
Twórcy
  • Institute of Computer Science, Polish Academy of Sciences, Ordona 21, 01-237 Warsaw, Poland
  • Institute of Computer Science, Polish Academy of Sciences, Ordona 21, 01-237 Warsaw, Poland
Bibliografia
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  • Craigmile, P.F. and Percival, D.B. (2005) Asymptotic decorrelation of between-scale wavelet coefficients. IEEE Trans. Inform. Theory 51, 1039-1048.
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  • Percival , D.B. and Walden, A.T. (2000) Wavelet Methods for Time Series Analysis. Cambridge University Press, Cambridge.
  • Samorodnitsky, G. and Taqqu, M. (1994) Stable Non-Gaussian Random Processes. Chapman and Hall, New York.
  • Taqqu, M., Teverovsky, V. and Willinger, W. (1995) Estimators for long-range dependence: an empirical study. Fractals 3, 785-798.
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Typ dokumentu
Bibliografia
Identyfikator YADDA
bwmeta1.element.baztech-article-BAT5-0010-0017
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