Title :
On periodic pulse interval analysis with outliers and missing observations
Author :
Sadler, Brian M. ; Casey, Stephen D.
Author_Institution :
Army Res. Lab., Adelphi, MD, USA
fDate :
11/1/1998 12:00:00 AM
Abstract :
Analysis of periodic pulse trains based on time of arrival is considered, with perhaps very many missing observations and contaminated data. A period estimator is developed based on a modified Euclidean algorithm. This algorithm is a computationally simple, robust method for estimating the greatest common divisor of a noisy contaminated data set. The resulting estimate, although it is not maximum likelihood, is used as initialization in a three-step algorithm that achieves the Cramer-Rao bound (CRB) for moderate noise levels, as shown by comparing Monte Carlo results with the CRBs. This approach solves linear regression problems with missing observations and outliers. Comparisons with a periodogram approach based on a point process model are shown. An extension using multiple independent data records is also developed that overcomes high levels of contamination
Keywords :
Monte Carlo methods; estimation theory; noise; spectral analysis; statistical analysis; Cramer-Rao bound; Monte Carlo results; greatest common divisor; initialization; linear regression problems; missing observations; modified Euclidean algorithm; noise levels; noisy contaminated data set; outliers; period estimator; periodic pulse interval analysis; periodic pulse trains; periodogram approach; point process; three-step algorithm; time of arrival; Additive white noise; Data models; Gaussian noise; Linear regression; Maximum likelihood detection; Maximum likelihood estimation; Nervous system; Noise level; Noise robustness; Signal to noise ratio;
Journal_Title :
Signal Processing, IEEE Transactions on
