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Abstract
Corresponding to the BIFORE (Binary FOurier Representation) Power spectrum, a phase spectrum is developed. The frequency content of each of the (log2 N+1) phase spectrum points is identical to that of the corresponding power spectrum points. It is shown that the BIFORE and discrete Fourier phase spectra have several analogous properties. A fast algorithm which yields the BIFORE power and phase spectra in approximately N log2 N arithmetic operations is also developed.
†A paper based on part of this material was presented at the 13th Midwest Symposium on Circuit Theory, University of Minnesota, Minneapolis, Minn, May 7–8, 1970.
†A paper based on part of this material was presented at the 13th Midwest Symposium on Circuit Theory, University of Minnesota, Minneapolis, Minn, May 7–8, 1970.
Notes
†A paper based on part of this material was presented at the 13th Midwest Symposium on Circuit Theory, University of Minnesota, Minneapolis, Minn, May 7–8, 1970.