DocumentCode :
1252778
Title :
Finite-dimensional filters with nonlinear drift. V: solution to Kolmogorov equation arising from linear filtering with non-Gaussian initial condition
Author :
Liang, Zhigang ; Yau, Stephen S T ; Yau, S.T.
Author_Institution :
Dept. of Math. Stat. & Comput. Sci., Illinois Univ., Chicago, IL, USA
Volume :
33
Issue :
4
fYear :
1997
Firstpage :
1295
Lastpage :
1308
Abstract :
Despite its usefulness, the Kalman-Bucy filter is not perfect. One of its weaknesses is that it needs a Gaussian assumption on the initial data. Recently Yau and Yau introduced a new direct method to solve the estimation problem for linear filtering with non-Gaussian initial data. They factored the problem into two parts: (1) the on-line solution of a finite system of ordinary differential equations (ODEs), and (2) the off-line calculation of the Kolmogorov equation. Here we derive an explicit closed-form solution of the Kolmogorov equation. We also give some properties and conduct a numerical study of the solution.
Keywords :
Fourier transforms; Kalman filters; differential equations; estimation theory; multidimensional systems; probability; Gaussian assumption; Kolmogorov equation; closed-form solution; estimation problem; finite-dimensional filter; linear filtering; nonGaussian initial condition; nonlinear drift; numerical study; off-line calculation; on-line solution; ordinary differential equations; Algebra; Closed-form solution; Differential algebraic equations; Differential equations; Filtering; Mathematics; Maximum likelihood detection; Nonlinear equations; Nonlinear filters; Partial differential equations; Robustness; State-space methods; Statistical distributions; Statistics;
fLanguage :
English
Journal_Title :
Aerospace and Electronic Systems, IEEE Transactions on
Publisher :
ieee
ISSN :
0018-9251
Type :
jour
DOI :
10.1109/7.625130
Filename :
625130
Link To Document :
https://search.ricest.ac.ir/dl/search/defaultta.aspx?DTC=49&DC=1252778
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