Reconstructing randomly sampled signals by the FFT

Author

Lo, K.C. ; Purvis, A.

Author_Institution

Dept. of Electron. Eng., Hong Kong Polytech., Hung Hom, Hong Kong

Volume

2

fYear

1996

fDate

12-15 May 1996

Firstpage

124

Abstract

The frequency spectrum of a signal that is sampled by a random sampling scheme can be obtained by applying the DFT to the sample sequence. A direct inverse transform on the resulting spectrum, however, will not restore the sample sequence since the orthogonality of the transform kernel is destroyed by the randomization. Apart from orthogonality, an inverse procedure has to deal with other problems, namely, sequence length and noise. In this paper, we propose a procedure to reconstruct from the spectrum a regularly spaced sequence that is equivalent to the original random sequence. Windowing is involved and the FFT can be used for the computation of the inverse

Keywords

discrete Fourier transforms; inverse problems; signal reconstruction; signal sampling; DFT; FFT; frequency spectrum; inverse transform; noise; orthogonality; random sampling; sequence; signal reconstruction; windowing; Frequency domain analysis; Frequency estimation; Kernel; Mean square error methods; Minimization methods; Random sequences; Random variables; Sampling methods; Signal restoration; Timing;

fLanguage

English

Publisher

ieee

Conference_Titel

Circuits and Systems, 1996. ISCAS '96., Connecting the World., 1996 IEEE International Symposium on

Conference_Location

Atlanta, GA

Print_ISBN

0-7803-3073-0

Type

conf

DOI

10.1109/ISCAS.1996.540368

Filename

540368