mswden
Multisignal 1-D denoising using wavelets
mswden is no longer recommended. Use wdenoise
instead.
Syntax
[XD,DECDEN,THRESH] = mswden('den',...)
[XD,THRESH] = mswden('densig',...)
[DECDEN,THRESH]
= mswden('dendec',...)
THRESH = mswden('thr',...)
[...] = mswden(OPTION,DIRDEC,X,WNAME,LEV,METH,PARAM)
[...] = mswden(...,S_OR_H)
[...]
= mswden(...,S_OR_H,KEEPAPP)
[...]
= mswden(...,S_OR_H,KEEPAPP,IDXSIG)
Description
mswden computes thresholds
and, depending on the selected option, performs denoising of 1-D signals
using wavelets.
[XD,DECDEN,THRESH] = mswden('den',...) returns
a denoised version XD of the original multisignal
matrix X, whose wavelet decomposition structure
is DEC. The output XD is obtained
by thresholding the wavelet coefficients, DECDEN is
the wavelet decomposition associated to XD (see mdwtdec), and THRESH
is the matrix of threshold values. The input METH is
the name of the denoising method and PARAM is the
associated parameter, if required.
Valid denoising methods METH and associated
parameters PARAM are:
'rigrsure' | Principle of Stein's Unbiased Risk |
'heursure' | Heuristic variant of the first option |
'sqtwolog' | Universal threshold |
'minimaxi' | Minimax thresholding (see |
For these methods PARAM defines the multiplicative
threshold rescaling:
'one' | No rescaling |
'sln' | Rescaling using a single estimation of level noise based on first level coefficients |
'mln' | Rescaling using a level dependent estimation of level noise |
Penalization methods
'penal' | Penal |
'penalhi' | Penal high, |
'penalme' | Penal medium, |
'penallo' | Penal low, |
PARAM is a sparsity parameter, and it should
be such that: 1 ≤ PARAM ≤
10. For penal method, no control
is done.
Manual method
'man_thr' | Manual method |
PARAM is an NbSIG-by-NbLEV matrix
or NbSIG-by-(NbLEV+1) matrix
such that:
PARAM(i,j)is the threshold for the detail coefficients of leveljfor the ith signal (1≤j≤NbLEV).PARAM(i,NbLEV+1)is the threshold for the approximation coefficients for theith signal (ifKEEPAPPis0).
where NbSIG is the number of signals and NbLEV the
number of levels of decomposition.
Instead of the 'den' input OPTION,
you can use 'densig', 'dendec' or 'thr' OPTION to
select output arguments:
[XD,THRESH] = mswden('densig',...) or [DECDEN,THRESH]
= mswden('dendec',...)
THRESH = mswden('thr',...) returns the
computed thresholds, but denoising is not performed.
The decomposition structure input argument DEC can
be replaced by four arguments: DIRDEC, X, WNAME and LEV.
[...] = mswden(OPTION,DIRDEC,X,WNAME,LEV,METH,PARAM) before
performing a denoising or computing thresholds, the multisignal matrix X is
decomposed at level LEV using the wavelet WNAME,
in the direction DIRDEC.
You can use three more optional inputs:
[...] = mswden(...,S_OR_H) or
[...]
= mswden(...,S_OR_H,KEEPAPP) or
[...]
= mswden(...,S_OR_H,KEEPAPP,IDXSIG)
S_OR_H ('s' or 'h')stands for soft or hard thresholding (seemswthreshfor more details).KEEPAPP (true or false)indicates whether to keep approximation coefficients (true) or not (false).IDXSIGis a vector that contains the indices of the initial signals, or'all'.
The defaults are, respectively, 'h', false and 'all'.
Examples
Multisignal 1-D Wavelet Denoising
Load the 23 channel EEG data Espiga3 [8]. The channels are arranged column-wise. The data is sampled at 200 Hz.
load Espiga3Perform a decomposition at level 2 using the db2 wavelet.
dec = mdwtdec('c',Espiga3,2,'db2')
dec = struct with fields:
dirDec: 'c'
level: 2
wname: 'db2'
dwtFilters: [1x1 struct]
dwtEXTM: 'sym'
dwtShift: 0
dataSize: [995 23]
ca: [251x23 double]
cd: {[499x23 double] [251x23 double]}
Denoise the signals using the universal method of thresholding (sqtwolog) and the 'sln' threshold rescaling (with a single estimation of level noise, based on the first level coefficients).
[xd,decden,thresh] = mswden('den',dec,'sqtwolog','sln');
Plot an original signal, and the corresponding denoised signal.
idxA = 3; plot(Espiga3(:,idxA),'r') hold on plot(xd(:,idxA),'b') grid on legend('Original','Denoised')
References
[1] Birgé, L., and P. Massart. “From Model Selection to Adaptive Estimation.” Festschrift for Lucien Le Cam: Research Papers in Probability and Statistics (E. Torgersen, D. Pollard, and G. Yang, eds.). New York: Springer-Verlag, 1997, pp. 55–88.
[2] DeVore, R. A., B. Jawerth, and B. J. Lucier. “Image Compression Through Wavelet Transform Coding.” IEEE Transactions on Information Theory. Vol. 38, Number 2, 1992, pp. 719–746.
[3] Donoho, D. L. “Progress in Wavelet Analysis and WVD: A Ten Minute Tour.” Progress in Wavelet Analysis and Applications (Y. Meyer, and S. Roques, eds.). Gif-sur-Yvette: Editions Frontières, 1993.
[4] Donoho, D. L., and I. M. Johnstone. “Ideal Spatial Adaptation by Wavelet Shrinkage.” Biometrika. Vol. 81, pp. 425–455, 1994.
[5] Donoho, D. L., I. M. Johnstone, G. Kerkyacharian, and D. Picard. “Wavelet Shrinkage: Asymptopia?” Journal of the Royal Statistical Society, series B, Vol. 57, No. 2, pp. 301–369, 1995.
[6] Donoho, D. L., and I. M. Johnstone. “Ideal denoising in an orthonormal basis chosen from a library of bases.” C. R. Acad. Sci. Paris, Ser. I, Vol. 319, pp. 1317–1322, 1994.
[7] Donoho, D. L. “De-noising by Soft-Thresholding.” IEEE Transactions on Information Theory. Vol. 42, Number 3, pp. 613–627, 1995.
[8] Mesa, Hector. “Adapted Wavelets for Pattern Detection.” In Progress in Pattern Recognition, Image Analysis and Applications, edited by Alberto Sanfeliu and Manuel Lazo Cortés, 3773:933–44. Berlin, Heidelberg: Springer Berlin Heidelberg, 2005. https://doi.org/10.1007/11578079_96.