Title :
Robust filtering for uncertain linear systems with delayed states and outputs
Author :
Wang, Zidong ; Yang, Fuwen
Author_Institution :
Control Theor. & Applications Centre, Coventry Univ., UK
fDate :
1/1/2002 12:00:00 AM
Abstract :
Deals with the robust filtering problem for uncertain linear systems with delayed states and outputs. Both time-invariant and time-varying cases are considered. For the time-invariant case, an algebraic Riccati matrix inequality approach is proposed to design a robust H∞ filter such that the filtering process remains asymptotically stable for all admissible uncertainties, and the transfer function from the disturbance inputs to error state outputs satisfies the prespecified H∞ norm upper bound constraint. We establish the conditions under which the desired robust H ∞ filters exist, and derive the explicit expression of these filters. For the time-varying case, we develop a differential Riccati inequality method to design the robust filters. A numerical example is provided to demonstrate the validity of the proposed design approach
Keywords :
Riccati equations; asymptotic stability; filtering theory; linear systems; time-varying systems; transfer functions; uncertain systems; admissible uncertainties; algebraic Riccati matrix inequality; asymptotically stable filtering; delayed outputs; delayed states; differential Riccati inequality; disturbance inputs; error state outputs; explicit expression; prespecified H∞ norm upper bound; robust H∞ filter; robust filtering; time-invariant cases; time-varying case; time-varying cases; transfer function; uncertain linear systems; Delay lines; Delay systems; Filtering; Linear matrix inequalities; Linear systems; Matrices; Nonlinear filters; Riccati equations; Robustness; Uncertainty;
Journal_Title :
Circuits and Systems I: Fundamental Theory and Applications, IEEE Transactions on
