Various time series data in applications ranging from telecommunications to financial analysis and from geophysical signals to biological signals exhibit non-stationary and non-Gaussian characteristics. ?-Stable distributions have been popular models for data with impulsive and nonsymmetric characteristics. In this work, we present timevarying autoregressive moving-average ?-stable processes as a potential model for a wide range of data, and we propose a method for tracking the time-varying parameters of the processwith ?-stable distribution. The technique is based on sequential Monte Carlo, which has assumed a wide popularity in various applications where the data or the system is non-stationary and non-Gaussian.
Time-varying ARMA stable process estimation using sequential Monte Carlo
Kuruoglu EE
2013
Abstract
Various time series data in applications ranging from telecommunications to financial analysis and from geophysical signals to biological signals exhibit non-stationary and non-Gaussian characteristics. ?-Stable distributions have been popular models for data with impulsive and nonsymmetric characteristics. In this work, we present timevarying autoregressive moving-average ?-stable processes as a potential model for a wide range of data, and we propose a method for tracking the time-varying parameters of the processwith ?-stable distribution. The technique is based on sequential Monte Carlo, which has assumed a wide popularity in various applications where the data or the system is non-stationary and non-Gaussian.| File | Dimensione | Formato | |
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Descrizione: Time-varying ARMA stable process estimation using sequential Monte Carlo
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