In this paper we consider the problem of stabilizing a bilinear system via linear state feedback control. A procedure is proposed which, given a polytope P surrounding the origin of the state space, finds, if existing, a controller in the form u = Kx, such that the zero equilibrium point of the closed loop system is asymptotically stable and P is enclosed into the domain of attraction of the equilibrium. The controller design requires the solution of a convex optimization problem involving Linear Matrix Inequalities. An example illustrates the applicability of the proposed technique.
Stabilization of Bilinear Systems via Linear State Feedback Control
COSENTINO C;MEROLA A
2007-01-01
Abstract
In this paper we consider the problem of stabilizing a bilinear system via linear state feedback control. A procedure is proposed which, given a polytope P surrounding the origin of the state space, finds, if existing, a controller in the form u = Kx, such that the zero equilibrium point of the closed loop system is asymptotically stable and P is enclosed into the domain of attraction of the equilibrium. The controller design requires the solution of a convex optimization problem involving Linear Matrix Inequalities. An example illustrates the applicability of the proposed technique.File in questo prodotto:
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