Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
4605235 | Applied and Computational Harmonic Analysis | 2012 | 8 Pages |
Abstract
We show that the de Branges theory provides a useful generalization of the Fourier transform (FT). The formulation is quite rich in that by selecting the appropriate parametrization, one can obtain spectral representation for a number of important cases. We demonstrate two such cases in this paper: the finite sum of elementary chirp-like signals, and a decaying chirp using Bessel functions. We show that when defined in the framework of de Branges spaces, these cases admit a representation very much similar to the spectral representation of a finite sum of sinusoids for the usual FT.
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