Title :
Interpolation of Discrete Chirp-periodic Signals Based on Fractional Fourier Transform
Author :
Li, Bing-Zhao ; Tao, Ran ; Wang, Yue
Author_Institution :
Dept. of Electron. Eng., Beijing Inst. of Technol.
fDate :
Aug. 30 2006-Sept. 1 2006
Abstract :
The sampling theorem associated with the fractional Fourier transform can be looked as the convolution of the sinc kernel with infinite sequence of signal points and chirp signal modulations. But in most practical applications we only have finite number of samples, which makes a perfect reconstruction of the original signal impossible. To solve this problem, we obtain a new formula for perfect reconstruction of discrete chirp-periodic signal points based on the fractional Fourier transform in this paper. The method is equivalent to trigonometrically interpolation by fractional Fourier series expansion and can be looked as a generalization of the classical results
Keywords :
Fourier series; Fourier transforms; chirp modulation; interpolation; signal reconstruction; signal sampling; chirp signal modulation; discrete chirp-periodic signal point; fractional Fourier series expansion; fractional Fourier transform; sampling theorem; signal reconstruction; sinc kernel; trigonometrically interpolation; Chirp; Convolution; Fourier transforms; Interpolation; Mathematics; Optical signal processing; Radio access networks; Sampling methods; Signal processing; Signal sampling;
Conference_Titel :
Innovative Computing, Information and Control, 2006. ICICIC '06. First International Conference on
Conference_Location :
Beijing
Print_ISBN :
0-7695-2616-0
DOI :
10.1109/ICICIC.2006.467
