Optimal Filtering for Linear System States over Polynomial Observations

Author

Basin, Michael ; Perez, Joel

Author_Institution

Dept. of Phys. & Math. Sci., Autonomous Univ. of Nuevo Leon

Volume

1

fYear

2006

fDate

Aug. 30 2006-Sept. 1 2006

Firstpage

101

Lastpage

104

Abstract

In this paper, the optimal filtering problem for linear system states over polynomial observations is treated proceeding from the general expression for the stochastic Ito differential of the optimal estimate and the error variance. As a result, the Ito differentials for the optimal estimate and error variance corresponding to the stated filtering problem are first derived. The procedure for obtaining a closed system of the filtering equations for a linear state over observations with any polynomial drift is then established. In the example, the obtained optimal filter is applied to solution of the optimal third order sensor filtering problem, assuming a Gaussian initial condition for the third order state. The resulting filter yields a reliable and rapidly converging estimate

Keywords

Gaussian processes; control nonlinearities; filtering theory; linear systems; nonlinear systems; optimal systems; polynomials; stochastic systems; Gaussian initial condition; closed system; error variance; linear system; optimal estimate; optimal filtering equation; optimal third order sensor filtering problem; polynomial observations; stochastic Ito differential; Equations; Filtering; Genetic expression; Indium tin oxide; Linear systems; Nonlinear filters; Polynomials; State estimation; Stochastic systems; Yield estimation; Optimal filtering; linear system state; nonlinear polynomial observations.; stochastic system;

fLanguage

English

Publisher

ieee

Conference_Titel

Innovative Computing, Information and Control, 2006. ICICIC '06. First International Conference on

Conference_Location

Beijing

Print_ISBN

0-7695-2616-0

Type

conf

DOI

10.1109/ICICIC.2006.127

Filename

1691751