Title :
Lossless integer wavelet transform
Author :
Dewitte, Steven ; Cornelis, Jan
Author_Institution :
Dept. of Acrology, R. Meteorol. Inst., Brussels, Belgium
fDate :
6/1/1997 12:00:00 AM
Abstract :
Signal compression can be obtained by wavelet transformation of integer input data followed by quantification and coding. As the quantification is usually lossy, the whole compression/decompression scheme is lossy too. We define a critical wavelet coefficient quantification, i.e., the coarsest quantification that allows perfect reconstruction. This is demonstrated for the Haar transform and for arbitrarily smooth wavelet transforms derived from it. The new integer wavelet transform allows implementation of multiresolution subband compression schemes, in which the decompressed data are gradually refined, retaining the option of perfect reconstruction.
Keywords :
band-pass filters; data compression; filtering theory; image coding; image reconstruction; image resolution; transform coding; wavelet transforms; Haar transform; coding; compression/decompression scheme; decompressed data; image compression performance; integer input data; lossless integer wavelet transform; lossy quantification; multiresolution subband compression; perfect reconstruction; perfect reconstruction filter banks; signal compression; smooth wavelet transforms; wavelet coefficient quantification; wavelet transformation; Dynamic range; Filter bank; Lattices; Meteorology; Nonlinear filters; Performance loss; Signal resolution; Wavelet coefficients; Wavelet transforms;
Journal_Title :
Signal Processing Letters, IEEE
