Title :
Optimal Filtering for Systems with Unknown Inputs Via Unbiased Minimum-Variance Estimation
Author :
Hsieh, Chien-Shu
Author_Institution :
Electr. Eng. Dept., Ta Hwa Inst. of Technol., Hsinchu
Abstract :
This paper considers the optimal unbiased minimum-variance estimation for systems with unknown inputs that affect both the system model and the measurements. By making use of the well-known matrix equation solution theory, the optimal unbiased minimum-variance filter, which appears to have the most general form, is proposed. Specific forms of this new filter are also presented to illustrate their relationships with the existing literature results. A numerical example is included in order to illustrate the proposed results
Keywords :
filtering theory; matrix algebra; matrix equation solution theory; optimal filtering; unbiased minimum-variance estimation; Covariance matrix; Equations; Estimation error; Fault detection; Filtering theory; Filters; Geophysical measurements; Matrix decomposition; Noise measurement; State estimation;
Conference_Titel :
TENCON 2006. 2006 IEEE Region 10 Conference
Conference_Location :
Hong Kong
Print_ISBN :
1-4244-0548-3
Electronic_ISBN :
1-4244-0549-1
DOI :
10.1109/TENCON.2006.344113
