Title :
Fast minimum variance resampling
Author :
Brennan, Todd Findley ; Milenkovic, Paul N.
Author_Institution :
Dept. of Electr. & Comput. Eng., Wisconsin Univ., Madison, WI, USA
Abstract :
A novel method is introduced for resampling irregularly sampled data in the presence of noise. The estimator is minimum variance (MV) and minimum mean square error, under Gaussian assumptions, and well-conditioned in general. The Shannon-Whittaker sampling theorem is generalized to use raised cosine pulses as basis functions. It is shown that this generalization permits fast estimation with O(N) computational requirements for mildly oversampled signals (bandwidth less than 0.9 B N, where BN is the Nyquist bandwidth of the resampled data). Also, some extensions of the inverse estimator and its error characteristics are discussed
Keywords :
computational complexity; error statistics; estimation theory; noise; signal reconstruction; signal sampling; Gaussian assumptions; Nyquist bandwidth; O(N) computational requirements; Shannon-Whittaker sampling theorem; basis functions; error characteristics; estimator; fast minimum variance resampling; inverse estimator; irregularly sampled data; mildly oversampled signals; minimum mean square error; noise; raised cosine pulses; signal recovery; Bandwidth; Curve fitting; Data acquisition; Deconvolution; Filters; Hardware; Mean square error methods; Sampling methods; Speech; Tracking;
Conference_Titel :
Acoustics, Speech, and Signal Processing, 1995. ICASSP-95., 1995 International Conference on
Conference_Location :
Detroit, MI
Print_ISBN :
0-7803-2431-5
DOI :
10.1109/ICASSP.1995.480321
