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International Archives of the Photogrammetry, Remote Sensing and Spatial Information Sciences, Vol XXXV, Part B7. Istanbul 2004 
An example of the actual signature of one pixel for 195 bands 
of the California 94 AVIRIS dataset and different level of 
lowpass component of wavelet decomposition of this spectral 
signature is shown in figure3. As s seen from this figure as the 
number of wavelet decomposition levels increases, the 
structure of the spectral signature becomes smoother than the 
structure of original signature. 
250. “Original Signature el À 
E: 9 9 Level 1 
Ed 
   
E 
i i ty 
13008 CU bas 
401 8 30 10 1x | 160 Le 70 
Band Number 
  
: ‘wavelet Coefficient: 
   
  
  
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Band Number 
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Band. Number Band Number: 
Figure3. Example of a pixel spectral signature and different levels of 
wavelet decomposition for the low pass component 
In the algorithm of wavelet reduction we need to reconstruct 
the spectral signature to automatically select the number of 
levels of wavelet decomposition. 
While wavelet decomposition involves filtering and down 
sampling the wavelet reconstruction involve up sampling and 
filtering. The up sampling process lengthens decomposed 
spectral data by inserting zeros as high pass component 
between each element. 
3. WAVELET- BASED DIMENSION REDUCTION 
3.1 General Description of Algorithm 
Wavelet-Based reduction can be effectively applied to 
hyperspectral imagery. Performance d? wavelet reduction can 
be better for larger dimensions (Kaewpijit et al, 2003). This 
property is due to very nature wavelet compression, where 
significant feature of the signal might be lost when the signal is 
under sampled. The general description of the wavelet 
reduction algorithm follows; 
1. For each pixel in a hyperspectral scene, the 1-D signal 
corresponding to its spectral signature is decomposed using 
Daubechies wavelet. 
2. For each hyperspectral pixel, approximation the original 
spectral is reconstructed using IDWT. The needed level of 
decomposition for a given pixel is the one that corresponds to 
producing an acceptable correlation whit the original signature. 
3. Combining results from all pixels, the number of the level of 
decomposition (L) is automatically computed as the lowest 
level needed after discarding outliers. 
63 
4. Using the number of L computed in (3) the reduced output 
data are composed of all pixels decomposed to level L. 
Therefore, if the original number of bands was N the output 
number of bands is N/2*. 
3.2 Automatic Decomposed Level Selection 
The correlation between the original spectral signature and the 
reconstructed spectral approximation is an indicator, which 
measures the similarity between two spectral signatures and 
used for selecting how many levels of decomposition can be 
applied while steel yielding good classification accuracy. The 
correlation function between the original spectral signature (x) 
and its reconstructed approximation (y) is shown in (Kaewpijit 
et al, 2003) 
1 
Yur rind x). (4) 
  
po y) ; 
: (ES = CS XY y A ») 
where N is the original dimension of the signal. 
Table.! shows the similarity between the original spectral 
signature and its reconstructed approximation of one class for 
the scene in our image. As seen from the table, as the number 
of levels of decomposition increases and the signal become 
more different from the original data, a proportionate decrease 
in correlation is observed. For each pixel in the hyperspectral 
scene and for each level of decomposition the correlation 
between original and reconstructed signal is computed. All 
correlation higher than the user-specified threshold contributes 
to the histogram for that level of decomposition. When all 
pixels are processed, the lowest level of wavelet decomposition 
needed to produce such correlation is used for the remainder of 
the algorithm. 
Correlation 
Level 
.9974 
.9936 
.9804 
.9558 
.9224 
  
Tablel. Similarity Measures Between The Original 
Versus the Reconstructed Spectral Signature for one 
Class in our image. 
4. WAVELET-BASED REDUCTION AND 
CLASSIFICATION ACCYRACY 
We have experimentally validated the Wavelet Based 
dimension reduction by using remotely sensed image test from 
a hyperspectral scene, using the ENvironment for Visualizing 
Images (ENVI) as a tool for classification accuracy assessment. 
Using the wavelet-reduced data, an error (confusion) matrix of 
several classification methods for the same level of 
decomposition between the Wavelet and PCA was calculated.