A design method for state-feedback controllers for single-input non-linear systems is proposed. The method makes use of the transformations of the non-linear system into ‘controllable-like’ canonical forms. The resulting non-linear state feedback is designed in such a way that the eigenvalues of the linearized closed-loop model are invariant with respect to any constant operating point. The method constitutes an alternative approach to the design methodology recently proposed by Baumann and Rugh. Also a review of different transformation methods for non-linear systems is presented. An example and simulation results of different control strategies are provided to illustrate the design technique
This work concerns the synthesis of discrete-time nonlinear controllers for nonlinear processes that...
This tutorial chapter uses case studies based on recent engineering applications, to re-examine the ...
The contributions of this thesis are in the area of control of systems with nonlinear dynamics. The ...
AbstractIn this paper, we propose a new controller design approach for a special class of nonlinear ...
AbstractA general framework is constructed upon which an explicit parametric formula can be derived ...
This paper studies the design of feedback controllers for trajectory tracking in single-input/ singl...
The concepts of transformation and canonical form have been used in analyzing linear systems. These ...
This paper presents a new approach for a control law commonly used for the control of nonlinear syst...
We study the feedback group action on single-input nonlinear control systems. We follow an approach ...
AbstractIn this paper, a new method for finding a state feedback matrix in order to control simultan...
In the present work the application of a new approach is demonstrated to a discrete-time state feedb...
We propose a weighted canonical form for single-input systems with noncontrollable first order appro...
This paper presents two approaches to analytical design of nonlinear control systems using transform...
AbstractA method for feedback synthesis of linear control systems with desired linearly equivalent f...
This tutorial chapter uses case studies based on recent engineering applications, to re-examine the ...
This work concerns the synthesis of discrete-time nonlinear controllers for nonlinear processes that...
This tutorial chapter uses case studies based on recent engineering applications, to re-examine the ...
The contributions of this thesis are in the area of control of systems with nonlinear dynamics. The ...
AbstractIn this paper, we propose a new controller design approach for a special class of nonlinear ...
AbstractA general framework is constructed upon which an explicit parametric formula can be derived ...
This paper studies the design of feedback controllers for trajectory tracking in single-input/ singl...
The concepts of transformation and canonical form have been used in analyzing linear systems. These ...
This paper presents a new approach for a control law commonly used for the control of nonlinear syst...
We study the feedback group action on single-input nonlinear control systems. We follow an approach ...
AbstractIn this paper, a new method for finding a state feedback matrix in order to control simultan...
In the present work the application of a new approach is demonstrated to a discrete-time state feedb...
We propose a weighted canonical form for single-input systems with noncontrollable first order appro...
This paper presents two approaches to analytical design of nonlinear control systems using transform...
AbstractA method for feedback synthesis of linear control systems with desired linearly equivalent f...
This tutorial chapter uses case studies based on recent engineering applications, to re-examine the ...
This work concerns the synthesis of discrete-time nonlinear controllers for nonlinear processes that...
This tutorial chapter uses case studies based on recent engineering applications, to re-examine the ...
The contributions of this thesis are in the area of control of systems with nonlinear dynamics. The ...