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...

Full description

Saved in:
Bibliographic Details
Published in2006 International Conference on Computational Intelligence and Security Vol. 2; pp. 1785 - 1788
Main Authors Yingxiong Fu, Luoqing Li
Format Conference Proceeding
LanguageEnglish
Published IEEE 01.11.2006
Subjects
Chirp modulation
Computer science
Fourier transforms
Frequency
Kernel
Laboratories
Mathematics
Signal analysis
Online AccessGet full text

Cover

More Information
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
ISBN:1424406048
9781424406043
DOI:10.1109/ICCIAS.2006.295369