Wavelet-based Estimation of Generalized Fractional Process

 

 Buy Article Permissions and Reprints

Summary

Objectives : This paper aims to propose an estimation procedure for the parameters of a generalized fractional process, a fairly general model of long-memory applicable in modeling biomedical signals whose autocorrelations exhibit hyperbolic decay.

Methods : We derive a wavelet-based weighted least squares estimator of the long-memory parameter based on the maximal-overlap estimator of the wavelet variance. Short-memory parameters can then be estimated using standard methods. We illustrate our approach by an example applying ECG heart rate data.

Results and Conclusion : The proposed method is relatively computationally and statistically efficient. It allows for estimation of the long-memory parameter without knowledge of the short-memory parameters. Moreover it provides a more general model of biomedical signals that exhibit periodic long-range dependence, such as ECG data, whose relatively unobtrusive recording may be advantageous in assessing or predicting some physiological or pathological conditions from the estimated values of the parameters.

• References

• 1. Bullmore E. et al. Wavelets and statistical analysis of functional magnetic resonance images of the human brain. Statistical Methods in Medical Research 2003; 12: 375-399.
  CrossrefPubMedGoogle Scholar
• 2. Beran J, Bhansali RJ, Ocker D. On unified model selection for stationary and nonstationary short- and long-memory autoregressive processes. Biometrika 1998; 85 (04) 921-934.
  CrossrefPubMedGoogle Scholar
• 3. Nakamura Y, Yamamoto Y, Muraoka I. Autonomic control of heart rate during physical exercise and fractional dimension of heart rate variability. Journal of Applied Physiology 1993; 74: 875-881.
  CrossrefPubMedGoogle Scholar
• 4. Bigger JT. et al. Power law behavior of RR-interval variability in healthy middle-aged persons, patients with recent acute myocardial infarction, and patients with heart transplants. Circulation 1996; 93: 2142-2151.
  CrossrefPubMedGoogle Scholar
• 5. Brockwell P, Davis R. Time Series: Theory and Methods. New York: Springer-Verlag; 1991
  PubMedGoogle Scholar
• 6. Nason G, Sapatinas T, Sawczenko A. Wavelet packet modeling of infant sleep state using heart rate data. Sankhya Series B 2001; 63: 199-217.
  PubMedGoogle Scholar
• 7. Gray HL, Zhang NF, Woodward W. On Generalized Fractional Processes. Journal of Time Series Analysis 1989; 10 (03) 233-257.
  CrossrefPubMedGoogle Scholar
• 8. Ramachandran R, Bhethanabotla VN. Generalized Autoregressive Moving Average Modeling of the Bellcore Data. Proceedings of the 25th Annual IEEE Conference on Local Computer Networks. Tampa, Florida, USA: IEEE Computer Society Press, 2000: 654-661.
  PubMedGoogle Scholar
• 9. Chung C. Estimating a generalized long-memory process. Journal of Econometrics 1996; 73: 237-259.
  CrossrefPubMedGoogle Scholar
• 10. Whitcher B. Wavelet-based estimation for seasonal long-memory. Technometrics 2004; 46 (02) 225-238.
  CrossrefPubMedGoogle Scholar
• 11. Walden A. Wavelet Analysis of Discrete Time Series. Proceedings of the European Congress of Mathematics. Barcelona: Birkhauser; 2000
  PubMedGoogle Scholar
• 12. Fan Y. On the Approximate Decorrelation Property of Discrete Wavelet Transform for Fractionally Differenced Process. IEEE Transactions on Information Theory 2003; 49: 516-521.
  CrossrefPubMedGoogle Scholar
• 13. Percival D. On Estimation of the Wavelet Variance. Biometrika 1995; 82 (03) 619-631.
  CrossrefPubMedGoogle Scholar
• 14. Bickel P, Doksum K. Mathematical Statistics. San Francisco: Holden-Day, Inc.; 1977
  PubMedGoogle Scholar
• 15. Moody G, Goldberger A. Heart rate time series. Available from URL: http://ecg.mit.edu/time-series
  PubMedGoogle Scholar