Optimal solution of the two-stage Kalman estimator

Author

Hsieh, Chien-Shu ; Chen, Fu-Chuang

Author_Institution

Dept. of Control Eng., Nat. Chiao Tung Univ., Hsinchu, Taiwan

Volume

2

fYear

1995

fDate

13-15 Dec 1995

Firstpage

1532

Abstract

The optimal solution of estimating a set of dynamic state in the presence of a random bias employing a two-stage Kalman estimator is addressed. It is well known that, under an algebraic constraint, the optimal estimate of the system state can be obtained from a two-stage Kalman estimator. Unfortunately, this algebraic constraint is seldom satisfied for practical systems. This paper proposes a general form of the optimal solution of the two-stage estimator, in which the algebraic constraint is removed. Furthermore, it is shown that, by applying the adaptive process noise covariance concept, the optimal solution of the two-stage Kalman estimator is composed of a modified bias-free filter and an bias-compensating filter, which can be viewed as a generalized form of the conventional two-stage Kalman estimator

Keywords

Kalman filters; noise; state estimation; adaptive process noise covariance; algebraic constraint; bias-compensating filter; bias-free filter; random bias; two-stage Kalman estimator; Adaptive filters; Computational efficiency; Control engineering; Equations; Filtering; Gaussian noise; Kalman filters; Nonlinear filters; State estimation; White noise;

fLanguage

English

Publisher

ieee

Conference_Titel

Decision and Control, 1995., Proceedings of the 34th IEEE Conference on

Conference_Location

New Orleans, LA

ISSN

0191-2216

Print_ISBN

0-7803-2685-7

Type

conf

DOI

10.1109/CDC.1995.480355

Filename

480355