Title :
On exact Kalman filtering of polynomial systems
Author :
Luca, Mihai Bogdan ; Azou, Stéphane ; Burel, Gilles ; Serbanescu, Alexandru
Author_Institution :
Lab. d´´Electronique et des Syst mes de Tele-communications, UMR CNRS, Brest
fDate :
6/1/2006 12:00:00 AM
Abstract :
A closed-form state estimator for some polynomial nonlinear systems is derived in this paper. Exploiting full Taylor series expansion we first give exact matrix expressions to compute mean and covariance of any random variable distribution that has been transformed through a polynomial function. An original discrete-time Kalman filtering implementation relying on this exact polynomial transformation is proposed. The important problem of chaotic synchronization of Chebyshev maps is then considered to illustrate the significance of these results. Mean square error between synchronized signals and consistency criteria are chosen as performance measures under various signal-to-noise ratios. Comparisons to the popular extended Kalman filter and to the recent unscented Kalman filter are also conducted to show the pertinence of our filtering formulation
Keywords :
Chebyshev filters; Kalman filters; chaos; estimation theory; polynomial approximation; Chebyshev maps; chaotic synchronization; closed-form state estimator; discrete-time Kalman filtering; exact Kalman filtering; exact polynomial transformation; full Taylor series expansion; matrix expressions; polynomial function; polynomial nonlinear systems; random variable distribution; synchronized signals; Chaos; Covariance matrix; Distributed computing; Filtering; Kalman filters; Nonlinear systems; Polynomials; Random variables; State estimation; Taylor series; Chaos synchronization; Chebyshev maps; closed-form computations; nonlinear Kalman filter; nonlinear statistical transformation; polynomial models;
Journal_Title :
Circuits and Systems I: Regular Papers, IEEE Transactions on
DOI :
10.1109/TCSI.2006.870899
