Title :
Optimal filtering in fractional Fourier domains
Author :
Kutay, M. Alper ; Ozaktas, Haldun M. ; Ankan, Orhan ; Onural, Levent
Author_Institution :
Dept. of Electr. Eng., Bilkent Univ., Ankara, Turkey
fDate :
5/1/1997 12:00:00 AM
Abstract :
For time-invariant degradation models and stationary signals and noise, the classical Fourier domain Wiener filter, which can be implemented in O(N log N) time, gives the minimum mean-square-error estimate of the original undistorted signal. For time-varying degradations and nonstationary processes, however, the optimal linear estimate requires O(N2) time for implementation. We consider filtering in fractional Fourier domains, which enables significant reduction of the error compared with ordinary Fourier domain filtering for certain types of degradation and noise (especially of chirped nature), while requiring only O(N log N) implementation time. Thus, improved performance is achieved at no additional cost. Expressions for the optimal filter functions in fractional domains are derived, and several illustrative examples are given in which significant reduction of the error (by a factor of 50) is obtained
Keywords :
Wiener filters; fast Fourier transforms; filtering theory; noise; optimisation; signal representation; time-frequency analysis; time-varying filters; Fourier domain Wiener filter; chirped noise; error reduction; fractional Fourier domains; implementation time; minimum mean square error estimate; noise; nonstationary processes; optimal filter functions; optimal filtering; optimal linear estimate; performance; stationary signals; time-frequency signal representation; time-invariant degradation models; time-varying degradations; time-varying filtering algorithms; undistorted signal; 1f noise; Chirp; Convolution; Degradation; Digital filters; Filtering; Fourier transforms; Optical filters; Optical noise; Wiener filter;
Journal_Title :
Signal Processing, IEEE Transactions on
