The Fourier Decomposition Method for nonlinear and nonstationary time series analysis (1503.06675v2)

Abstract: Since many decades, there is a general perception in literature that the Fourier methods are not suitable for the analysis of nonlinear and nonstationary data. In this paper, we propose a Fourier Decomposition Method (FDM) and demonstrate its efficacy for the analysis of nonlinear (i.e. data generated by nonlinear systems) and nonstationary time series. The proposed FDM decomposes any data into a small number of `Fourier intrinsic band functions' (FIBFs). The FDM presents a generalized Fourier expansion with variable amplitudes and frequencies of a time series by the Fourier method itself. We propose an idea of zero-phase filter bank based multivariate FDM (MFDM) algorithm, for the analysis of multivariate nonlinear and nonstationary time series, from the FDM. We also present an algorithm to obtain cutoff frequencies for MFDM. The MFDM algorithm is generating finite number of band limited multivariate FIBFs (MFIBFs). The MFDM preserves some intrinsic physical properties of the multivariate data, such as scale alignment, trend and instantaneous frequency. The proposed methods produce the results in a time-frequency-energy distribution that reveal the intrinsic structures of a data. Simulations have been carried out and comparison is made with the Empirical Mode Decomposition (EMD) methods in the analysis of various simulated as well as real life time series, and results show that the proposed methods are powerful tools for analyzing and obtaining the time-frequency-energy representation of any data.

• The paper introduces the Fourier Decomposition Method (FDM) utilizing Fourier Intrinsic Band Functions (FIBFs) to analyze nonlinear and nonstationary time series, challenging conventional limitations of Fourier methods.
• FDM demonstrates computational efficiency and enhanced time-frequency-energy resolution compared to Empirical Mode Decomposition (EMD), effectively avoiding issues like mode mixing.
• This method has significant implications for analyzing complex data in fields like biomedical processing, seismic interpretation, and speech analysis, suggesting a new direction for Fourier-based techniques.

Insights into the Fourier Decomposition Method for Time Series Analysis

The paper presents an in-depth exploration of the Fourier Decomposition Method (FDM) tailored for analyzing nonlinear and nonstationary time series. Traditionally, Fourier-based methods have faced skepticism concerning their applicability to such data due to assumptions of periodicity and stationarity. This research shifts the paradigm by illustrating that the Fourier methods can be efficiently adapted for complex time series data.

Methodological Overview

The authors introduce the concept of Fourier Intrinsic Band Functions (FIBFs), which form the foundational building blocks of the FDM. These functions offer a decomposition technique where data is broken down into a finite number of FIBFs. This not only ensures a generalized Fourier expansion with variable amplitudes and frequencies but also maintains orthogonality and locality, important factors for adaptive time series analysis. By leveraging zero-phase filter banks, the modified Fourier approach preserves essential features such as scale alignment, trends, and instantaneous frequency, ensuring a robust time-frequency-energy distribution.

Furthermore, the paper develops a multivariate FDM (MFDM) algorithm that extends the application of FDM to multivariate data sets. This involves an innovative use of zero-phase filtering to generate multivariate FIBFs, analogous to the univariate case but accommodating the complexities of multichannel data.

Comparative Analysis and Results

FDM is positioned against established methods like Empirical Mode Decomposition (EMD) and its variants, such as Ensemble EMD (EEMD) and Multivariate EMD (MEMD). While EMD has been a cornerstone in signal decomposition for its adaptiveness to nonlinear and nonstationary signals, it is not devoid of limitations such as mode mixing and end-effect issues. Unlike EMD, which relies on empirical procedures, FDM benefits from the theoretical grounding of Fourier transforms, producing decompositions without mode mixing and other artefacts attributed to EMD.

Simulation results demonstrate that FDM not only provides a more computationally efficient solution compared to MEMD but also retains consistency in producing aligned intrinsic modes across multivariate data. The paper showcases enhanced time-frequency-energy resolution through FDM, outperforming EMD and similarly coupled with an advantage in execution time. This is particularly evident in applications ranging from synthetic data, capturing phenomena like intermittency and mode mixing, to real-world scenarios such as earthquake and speech signal analysis.

Implications and Future Directions

The implication of this work extends into practical domains where accurate time-frequency analysis is crucial, such as biomedical signal processing, seismic data interpretation, and speech analysis. The ability of FDM to handle nonstationary and nonlinear data without empirical constraints points towards a new trajectory for Fourier-based time series analysis, challenging the conventional boundaries entrenched in empirical decomposition methods.

Looking forward, future developments could explore further optimization of this method, particularly in real-time applications, and potential integration with other transform methods for hybrid approaches. FDM opens avenues for deeper mathematical analysis and cross-validation with linear and nonlinear dynamical systems theories, broadening its application scope beyond the current domains. Moreover, adaptations for handling irregularly sampled data could further extend its utility in diverse scientific fields.

In summary, this paper potentially redefines the contours of time series analysis by restoring Fourier methods to a prominent position alongside adaptive techniques, thus paving the way for more refined analytical tools in handling complex data structures. The introduction of FDM represents a significant methodological advancement, grounded in robust mathematical principles and offering far-reaching implications across varied research landscapes.