论文信息 - An uncertainty principle for real signals in the fractional Fourier transform domain

An uncertainty principle for real signals in the fractional Fourier transform domain

The fractional Fourier transform (FrFT) can be thought of as a generalization of the Fourier transform to rotate a signal representation by an arbitrary angle /spl alpha/ in the time-frequency plane. A lower bound on the uncertainty product of signal representations in two FrFT domains for real signals is obtained, and it is shown that a Gaussian signal achieves the lower bound. The effect of shifting and scaling the signal on the uncertainty relation is discussed. An example is given in which the uncertainty relation for a real signal is obtained, and it is shown that this relation matches with that given by the uncertainty relation derived.

Vikram M. Gadre | Sudarshan Shinde | V. Gadre | Sudarshan Shinde

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