Sampling rate conversion for linear canonical transform
Signal Processing
An Efficient FPGA-based Implementation of Fractional Fourier Transform Algorithm
Journal of Signal Processing Systems
Short-time fractional fourier transform and its applications
IEEE Transactions on Signal Processing
Sampling random signals in a fractional Fourier domain
Signal Processing
Synthetic aperture radar imaging with fractional Fourier transform and channel equalization
Digital Signal Processing
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The fractional Fourier transform (FRFT) has become a very active area in signal processing community in recent years, with many applications in radar, communication, information security, etc., This study carefully investigates the sampling of a continuous-time band limited signal to obtain its discrete-time version, as well as sampling rate conversion, for the FRFT. Firstly, based on product theorem for the FRFT, the sampling theorems and reconstruction formulas are derived, which explain how to sample a continuous-time signal to obtain its discrete-time version for band limited signals in the fractional Fourier domain. Secondly, the formulas and significance of decimation and interpolation are studied in the fractional Fourier domain. Using the results, the sampling rate conversion theory for the FRFT with a rational fraction as conversion factor is deduced, which illustrates how to sample the discrete-time version without aliasing. The theorems proposed in this study are the generalizations of the conventional versions for the Fourier transform. Finally, the theory introduced in this paper is validated by simulations.