Title :
Fast Gabor-like windowed Fourier and continuous wavelet transforms
Author_Institution :
Nat. Center for Res. Resources, Nat. Inst. of Health, Bethesda, MD, USA
fDate :
5/1/1994 12:00:00 AM
Abstract :
Fast algorithms for the evaluation of running windowed Fourier and continuous wavelet transforms are presented. The analysis functions approximate complex-modulated Gaussians as closely as desired and may be optimally localized in time and frequency. The Gabor filtering is performed indirectly by convolving a premodulated signal with a Gaussian-like window and demodulating the output. The window functions are either B-splines dilated by an integer factor m or quasi-Gaussians of arbitrary size generated from the n-fold convolution of a symmetrical exponential. Both approaches result in a recursive implementation with a complexity independent of the window size (O(N)).<>
Keywords :
fast Fourier transforms; filtering and prediction theory; signal processing; splines (mathematics); wavelet transforms; B-splines; Gabor filtering; Gabor-like windowed Fourier transforms; Gaussian-like window; analysis functions; complex-modulated Gaussians; continuous wavelet transforms; convolution; fast transforms; running windowed Fourier transforms; signal analysis; symmetrical exponential; window functions; window size; Continuous wavelet transforms; Convolution; Fast Fourier transforms; Filtering; Frequency; Gabor filters; Gaussian approximation; Gaussian processes; Spline; Wavelet transforms;
Journal_Title :
Signal Processing Letters, IEEE
