A Generalized Bedrosian Theorem in Fractional Fourier Domain

机译：分数傅里叶域的广义胆道理定理

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摘要

In terms of the fractional Fourier transform and the generalized Hilbert transform, in this note, we prove the kernel function K{sub}(-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.

机译：就分数傅里叶变换和广义的Hilbert变换而言，在本说明中，我们证明了逆分数傅里叶变换的内核函数K {sub}（ - p）（u，t）是广义分析信号。由于分析信号和胆管定理之间存在密切关系，因此在分数傅立叶结构域中提供了广义的胆管定理。

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《International Conference on Computational Intelligence and Security》|2006年||共4页
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Yingxiong Fu; Luoqing Li;
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中图分类 TP18-53;
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A Generalized Bedrosian Theorem in Fractional Fourier Domain

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