A new method, the Hilbert-Huang Transform (HHT), developed initially for natural and engineering sciences has now been applied to financial data. THe HHT method is specially developed for analyzing nonlinear and nonstationary data. The method consists of two parts: 1.) the Empirical Mode Decomposition (EMD), and 2.) the Hilbert Spectral Analysis. The key part of the method is the first step, the EMD, with which any complicated data set can be decomposed into a finite and often small number of Intrinsic Mode Funcitons (IMF). An IMF is defined here as any function having the same number of zero-crossing and extrema, and also having symmetric envelopes defined by a local maxima and minima respectively. The IMF also thus admits well-behaved Hilbert tranforms. This decomposition method is adaptive, and, therefore, highly efficient. Since the decompostion is based on the local characteristic time scale of the data, it is applicable to nonlinear and nonstationary processes. With the Hilbert transform, the Intrinsic Mode Functions yield instantaneous frequencies as functions of time that give sharp identifications of imbedded structures. The final presentation of the results is an energy-frequency-time distribution, which we designate as the Hilbert Spectrum. Comparisions with Wavelet Fourier analyses show the new method offers much better temporal and frequency resolutions. The EMD is also useful as a filter to extract variablity of different scales. In the present application, HHt has been used to examine the changeablitiy of the market, as a measure of volatility of the market.
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Public Release Date:
9/19/2006
Reference Number: GSC-14807-1
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