This work is devoted to stabilization of unstable continuous-time linear systems in the presence of saturating actuators. We show that, if the state matrix has real eigenvalues, it is possible to construct a linear feedback such that the set of values satysfying the saturation constraint is an invariant set for the closed-loop system. Moreover, once the initial datum is arbitrarily fixed, we can ensure asymptotic stabilization of the system splitting the control variable in a predefined number of saturating components. A design technique for a controller having such invariance property is also given for discrete linear systems.

Asymptotic Stabilization of Planar Unstable Linear Systems by a finite number of Saturating Actuators

CORRADINI, Maria Letizia;CRISTOFARO, ANDREA;GIANNONI, Fabio
2009-01-01

Abstract

This work is devoted to stabilization of unstable continuous-time linear systems in the presence of saturating actuators. We show that, if the state matrix has real eigenvalues, it is possible to construct a linear feedback such that the set of values satysfying the saturation constraint is an invariant set for the closed-loop system. Moreover, once the initial datum is arbitrarily fixed, we can ensure asymptotic stabilization of the system splitting the control variable in a predefined number of saturating components. A design technique for a controller having such invariance property is also given for discrete linear systems.
2009
9789633113691
273
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11581/233068
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