In real world observation problems it may happen that, given a linear time invariant system, the classical unknown input observers theory cannot guarantee a complete decoupling between the estimation errors and the unknown inputs. However there is some degree of freedom that may be used to minimize, in some sense, the remaining effect of the disturbance inputs. In this paper we propose a procedure that allows to design an unknown input observer decoupling, where possible, the disturbance input from the estimation error, and minimising the effect of the remaining disturbances in an H∞ sense. The design procedure is formulated in terms of Linear Matrix Inequalities; if a feasible solution exists, such a procedure also guarantees a desired rate of convergence for the estimation dynamics.
Design of full order Unknown Input Observers with H-infinity performance
MATTEI, Massimiliano
2002
Abstract
In real world observation problems it may happen that, given a linear time invariant system, the classical unknown input observers theory cannot guarantee a complete decoupling between the estimation errors and the unknown inputs. However there is some degree of freedom that may be used to minimize, in some sense, the remaining effect of the disturbance inputs. In this paper we propose a procedure that allows to design an unknown input observer decoupling, where possible, the disturbance input from the estimation error, and minimising the effect of the remaining disturbances in an H∞ sense. The design procedure is formulated in terms of Linear Matrix Inequalities; if a feasible solution exists, such a procedure also guarantees a desired rate of convergence for the estimation dynamics.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.