Composite controls for singularly perturbed systems

The controllability and the stabilizability invariance of the reduced system (slow subsystem) of the nonlinear singularly perturbed system due to a class of fast feedback controls is shown. The general type composite control for the nonlinear singularly perturbed system is proposed and its application for the synthesis problem is considered.

[1]  A. B. Vasil’eva ASYMPTOTIC BEHAVIOUR OF SOLUTIONS TO CERTAIN PROBLEMS INVOLVING NON-LINEAR DIFFERENTIAL EQUATIONS CONTAINING A?SMALL PARAMETER MULTIPLYING THE HIGHEST DERIVATIVES , 1963 .

[2]  P. Kokotovic,et al.  Stability of singularly perturbed systems and networks with parasitics , 1972 .

[3]  C. Desoer,et al.  Global inverse function theorem , 1972 .

[4]  M. Ikeda,et al.  Large-scale dynamical systems: State equations, Lipschitz conditions, and linearization , 1973 .

[5]  P. Kokotovic,et al.  A decomposition of near-optimum regulators for systems with slow and fast modes , 1976 .

[6]  Petar V. Kokotovic,et al.  Singular perturbations and order reduction in control theory - An overview , 1975, at - Automatisierungstechnik.

[7]  M. Suzuki,et al.  Stabilizing feedback controllers for singularly perturbed linear constant systems , 1976 .

[8]  J. Chow Preservation of controllability in linear time-invariant perturbed systems† , 1977 .

[9]  P. Sannuti On the controllability of singularly perturbed systems , 1977 .

[10]  P. Kokotovic,et al.  Near-optimal feedback stabilization of a class of nonlinear singularly perturbed systems , 1978, 1978 IEEE Conference on Decision and Control including the 17th Symposium on Adaptive Processes.

[11]  Joe H. Chow,et al.  Two-time-scale feedback design of a class of nonlinear systems , 1978 .

[12]  J. O'Reilly Two Time-Scale Feedback Stabilization of Linear Time-Varying Singularly Perturbed Systems , 1979 .