Title :
Lower and upper bounds for the error of the Jth resolution via optimal wavelet choice for a signal
Author :
Xia, Xiang-Gen ; Zhang, Zhen
Author_Institution :
Dept. of Electr. Eng.-Syst., Univ. of Southern California, Los Angeles, CA, USA
Abstract :
Selection of a wavelet for a given signal such that the error of the discrete wavelet representation up to a given scale is minimized is investigated. Lower and upper bounds are derived for the error of the Jth resolution fj of f with respect to f itself when the Fourier spectrum of f is mostly concentrated in -2jπ, 2jπ. The lower and upper bounds only differ from each other by a positive constant multiple. Based on the error bounds, the cost function is chosen as the upper bound with quadratic-form of unknown coefficients. The optimal coefficients of the Daubechies wavelets are formulated as solutions of certain quadratic equations which depend on the signal and J. Optimal wavelets for the signal-independent case are considered
Keywords :
signal processing; wavelet transforms; -2jπ, 2jπ; Daubechies wavelets; Fourier spectrum; Jth resolution; cost function; discrete wavelet representation error; optimal wavelet choice; quadratic equations; Convergence; Cost function; Discrete wavelet transforms; Equations; Error analysis; Fourier transforms; Signal resolution; USA Councils; Upper bound; Wavelet transforms;
Conference_Titel :
Time-Frequency and Time-Scale Analysis, 1992., Proceedings of the IEEE-SP International Symposium
Conference_Location :
Victoria, BC
Print_ISBN :
0-7803-0805-0
DOI :
10.1109/TFTSA.1992.274172
