A Generalized Bedrosian Theorem in Fractional Fourier Domain
In terms of the fractional Fourier transform and the generalized Hilbert transform, in this note, we prove the kernel function K -p (u,t) of the inverse fractional Fourier transform is a generalized analytic signal. Since there is a close relation between analytic signals and Bedrosian theorem, the...
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Published in | 2006 International Conference on Computational Intelligence and Security Vol. 2; pp. 1785 - 1788 |
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Main Authors | , |
Format | Conference Proceeding |
Language | English |
Published |
IEEE
01.11.2006
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Subjects | |
Online Access | Get full text |
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Summary: | In terms of the fractional Fourier transform and the generalized Hilbert transform, in this note, we prove the kernel function K -p (u,t) of the inverse fractional Fourier transform is a generalized analytic signal. Since there is a close relation between analytic signals and Bedrosian theorem, the generalized Bedrosian theorem is provided in the fractional Fourier domain |
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ISBN: | 1424406048 9781424406043 |
DOI: | 10.1109/ICCIAS.2006.295369 |