'Analytic' wavelet thresholding

We introduce so-called analytic stationary wavelet transform thresholding where, using the discrete Hilbert transform, we create a complex-valued 'analytic' vector from which an amplitude vector is defined. Thresholding of a real-valued wavelet coefficient at some transform level is carried out according to the corresponding value in this amplitude vector; relevant statistical results follow from properties of the discrete Hilbert transform. Analytic stationary wavelet transform thresholding is found to produce consistently a reduced mean squared error compared to using standard stationary wavelet transform, or 'cycle spinning', thresholding. For signals with extensive oscillations at some transform levels, this improvement is very marked. Furthermore we show that our thresholding test is invariant to phase shifts in the data, whereas, if complex wavelet filters are being used, the filters must be analytic or anti-analytic at each level of the wavelet transform. Copyright 2004, Oxford University Press.

[1]  D. Percival,et al.  Analysis of Subtidal Coastal Sea Level Fluctuations Using Wavelets , 1997 .

[2]  Jr. S. Marple,et al.  Computing the discrete-time 'analytic' signal via FFT , 1999, Conference Record of the Thirty-First Asilomar Conference on Signals, Systems and Computers (Cat. No.97CB36136).

[3]  Sylvain Sardy Minimax threshold for denoising complex signals with Waveshrink , 2000, IEEE Trans. Signal Process..

[4]  W. Stuetzle,et al.  SUBSET-SELECTION AND ENSEMBLE METHODS FOR WAVELET DE-NOISING , 1999 .

[5]  D. Donoho,et al.  Translation-Invariant DeNoising , 1995 .

[6]  J. Lina,et al.  Complex Daubechies Wavelets , 1995 .

[7]  Alberto Contreras-Cristán,et al.  Matching pursuit by undecimated discrete wavelet transform for non-stationary time series of arbitrary length , 1998, Stat. Comput..

[8]  R. Dykstra,et al.  Product Inequalities Involving the Multivariate Normal Distribution , 1980 .

[9]  Andrew T. Walden,et al.  Deconvolution, bandwidth, and the trispectrum , 1993 .

[10]  Jonathan M. Lilly,et al.  Multiwavelet spectral and polarization analyses of seismic records , 1995 .

[11]  Wayne Lawton,et al.  Applications of complex valued wavelet transforms to subband decomposition , 1993, IEEE Trans. Signal Process..

[12]  I. Johnstone,et al.  Ideal spatial adaptation by wavelet shrinkage , 1994 .

[13]  R. White,et al.  Maximum Kurtosis Phase Correction , 1988 .

[14]  Michael R. Chernick,et al.  Wavelet Methods for Time Series Analysis , 2001, Technometrics.

[15]  Athanasios Papoulis,et al.  Probability, Random Variables and Stochastic Processes , 1965 .