The Optimal Projection Equations for Fixed - Order Dynamic Compensation
نویسندگان
چکیده
First-order necessary conditions for quadratically optimal, steady-state, fixed-order dynamic compensation of a linear, time-invariant plant in the presence of disturbance and observation noise are derived in a new and highly simplified form. In contrast to the pair of matrix Riccati equations for the full-order LQG case, the optimal steady-state fixed-order dynamic compensator is characterized by four matrix equations (two modified Riccati equations and two modified Lyapunov equations) coupled by a projection whose rank is precisely equal to the order of the compensator and which determines the optimal compensator gains. The coupling represents a graphic portrayal of the demise of the classical separation principle for the reduced-order controller case.
منابع مشابه
Optimal projection equations for discrete-time fixed-order dynamic compensation of linear systems with multiplicative white noise
International Journal of Control Publication details, including instructions for authors and subscription information: http://www.informaworld.com/smpp/title~content=t713393989 Optimal projection equations for discrete-time fixed-order dynamic compensation of linear systems with multiplicative white noise Dennis S. Bernstein a; Wassim M. Haddad b a Harris Corporation, Government Aerospace Syste...
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