Add to ORKGWe study the recently introduced notion of output-input stability, which is a robust variant of the minimum-phase property for general smooth nonlinear control systems. This paper develops the theory of output-input stability in the multi-input, multi-output setting. We show that output-input stability is a combination of two system properties, one related to detectability and the other to left-invertibility. For systems affine in controls, we derive a necessary and sufficient condition for output-input stability, which relies on a global version of the nonlinear structure algorithm. This condition leads naturally to a globally asymptotically stabilizing state feedback strategy for affine output-input stable systems
We consider the output regulation problem for a class of nonlinear multivariable systems in the case...
In this work it is shown that adapting the notions of relative degree and strong minimum-phaseness i...
The contributions of this thesis are in the area of control of systems with nonlinear dynamics. The ...
The notion of output-input stability, recently proposed in [2], represents a variant of the minimum...
In this paper, the problem of global stabilization of a rather general class of MIMO nonlinear syste...
In this paper, the problem of global stabilization of a rather general class of MIMO nonlinear syste...
none4siIn this paper, the problem of global stabilization of a rather general class of MIMO nonlinea...
We consider multiple-input multiple-output linear time-invariant feedback systems with unity feedbac...
In this paper we study the problem of globally stabilizing via output feedback a class of nonlinear ...
Abstrnet. The input-output stability of closed loop control systems, which are not necessarily open ...
In this paper we propose some advanced tools for stabilizing nonlinear systems via dynamic output fe...
In this paper, we extend some recent results on the stabilization of output feedback linearizable no...
This paper deals with several related notions of output stability with respect to inputs (which may ...
In this paper, we give sufficient conditions for designing robust globally stabilizing controllers for...
We consider the output regulation problem for a class of nonlinear multivariable systems in the case...
We consider the output regulation problem for a class of nonlinear multivariable systems in the case...
In this work it is shown that adapting the notions of relative degree and strong minimum-phaseness i...
The contributions of this thesis are in the area of control of systems with nonlinear dynamics. The ...
The notion of output-input stability, recently proposed in [2], represents a variant of the minimum...
In this paper, the problem of global stabilization of a rather general class of MIMO nonlinear syste...
In this paper, the problem of global stabilization of a rather general class of MIMO nonlinear syste...
none4siIn this paper, the problem of global stabilization of a rather general class of MIMO nonlinea...
We consider multiple-input multiple-output linear time-invariant feedback systems with unity feedbac...
In this paper we study the problem of globally stabilizing via output feedback a class of nonlinear ...
Abstrnet. The input-output stability of closed loop control systems, which are not necessarily open ...
In this paper we propose some advanced tools for stabilizing nonlinear systems via dynamic output fe...
In this paper, we extend some recent results on the stabilization of output feedback linearizable no...
This paper deals with several related notions of output stability with respect to inputs (which may ...
In this paper, we give sufficient conditions for designing robust globally stabilizing controllers for...
We consider the output regulation problem for a class of nonlinear multivariable systems in the case...
We consider the output regulation problem for a class of nonlinear multivariable systems in the case...
In this work it is shown that adapting the notions of relative degree and strong minimum-phaseness i...
The contributions of this thesis are in the area of control of systems with nonlinear dynamics. The ...