Title :
Kolmogorov n-widths and wavelet representations for signal classes
Author :
Liang, Jie ; Parks, Thomas W.
Author_Institution :
Sch. of Electr. Eng., Cornell Univ., Ithaca, NY, USA
fDate :
7/1/1996 12:00:00 AM
Abstract :
We address the problem of basis selection and wavelet representations for two important signal classes: the ellipsoidal signal class and the bounded cone class. We define time-frequency concentrated signals in this paper as the class of signals whose Wigner distributions are concentrated in some region of the Wigner domain. We use the concept of the Kolmogorov n-width and the constrained n-width to quantitatively measure the ability of a basis to represent a signal class. We select the best wavelet representation by comparing the constrained widths of different wavelet bases. Explicit formulas are given to compute the Kolmogorov n-width for both signal models. A globally convergent algorithm is proposed to calculate the constrained n-width for a given basis
Keywords :
Wigner distribution; convergence of numerical methods; signal representation; time-frequency analysis; wavelet transforms; Kolmogorov n-widths; Wigner distributions; Wigner domain; basis selection; bounded cone class; constrained n-width; ellipsoidal signal class; signal class; time-frequency concentrated signals; wavelet representation; wavelet representations; Algorithm design and analysis; Entropy; Filter bank; Libraries; Matching pursuit algorithms; Signal processing algorithms; Time frequency analysis; Upper bound; Wavelet coefficients; Wavelet packets;
Journal_Title :
Signal Processing, IEEE Transactions on
