In this paper we show how to completely and exactly decompose the optimal Kalman filter of stochastic systems in multimodeling form in terms of one pure-slow and two pure-fast, reduced-order, independent, Kalman filters. The reduced-order Kalman filters are all driven by the system measurements. This leads to a parallel Kalman filtering scheme and removes ill-conditioning of the original full-order singularly perturbed Kalman filter. The results obtained are valid for steady state. In that direction, the corresponding algebraic filter Riccati equation is completely decoupled and solved in terms of one pure-slow and two pure fast, reduced-order, independent, algebraic Riccati equations. A nonsingular state transformation that exactly relates the state variables in the original and new coordinates (in which the required decomposition is achieved) is also established. The eighth order model of a passenger car under road disturbances is used to demonstrate efficiency of the proposed filtering technique. [S0022-0434(00)01703-2]
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September 2000
Technical Papers
Parallel Optimal Kalman Filtering for Stochastic Systems in Multimodeling Form
Cyril Coumarbatch,
Cyril Coumarbatch
Department of Mathematics, Rutgers University, New Brunswick, NJ 08903
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Zoran Gajic
Zoran Gajic
Department of Electrical and Computer Engineering, Rutgers University, Piscataway, NJ 08854
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Cyril Coumarbatch
Department of Mathematics, Rutgers University, New Brunswick, NJ 08903
Zoran Gajic
Department of Electrical and Computer Engineering, Rutgers University, Piscataway, NJ 08854
Contributed by the Dynamic Systems and Control Division for publication in the JOURNAL OF DYNAMIC SYSTEMS, MEASUREMENT, AND CONTROL. Manuscript received by the Dynamic Systems and Control Division January 4, 1999. Associate Technical Editor: N. Olgac.
J. Dyn. Sys., Meas., Control. Sep 2000, 122(3): 542-550 (9 pages)
Published Online: January 4, 1999
Article history
Received:
January 4, 1999
Citation
Coumarbatch, C., and Gajic, Z. (January 4, 1999). "Parallel Optimal Kalman Filtering for Stochastic Systems in Multimodeling Form ." ASME. J. Dyn. Sys., Meas., Control. September 2000; 122(3): 542–550. https://doi.org/10.1115/1.1286679
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