Title :
The distribution of nonstationary autoregressive processes under general noise conditions
Author_Institution :
Appl. Phys. Lab., Johns Hopkins Univ., Laurel, MD, USA
Abstract :
This paper considers the large-sample distribution of a multivariate autoregressive process of the form xn=An-1 xn-1+noise, where the noise has an unknown distribution and An is a (generally) time-varying transition matrix. It can be easily shown that the process xn need not have a known large-sample distribution (in particular, central limit theorem effects do not generally hold). However, if the distribution of the noise approaches a known distribution as n gets large, we show that the distribution of xn may also approach a known distribution for large n. Such results have applications in, e.g., adaptive tracking, filtering, model validation, etc
Keywords :
Kalman filters; noise; stochastic processes; time series; Kalman filter; central limit theorem; general noise conditions; large sample distribution; multivariate autoregressive process; nonstationary autoregressive processes; time varying transition matrix; Adaptive filters; Autoregressive processes; Electronic mail; Estimation error; Filtering; Laboratories; Maximum likelihood estimation; Physics; Random sequences; Stability;
Conference_Titel :
Decision and Control, 1993., Proceedings of the 32nd IEEE Conference on
Conference_Location :
San Antonio, TX
Print_ISBN :
0-7803-1298-8
DOI :
10.1109/CDC.1993.325025
