In this paper, a new method for stabilization of a class of discrete time phase-controlled systems is proposed. Based on the geometrical interpretation of the frequency inequalities conditions of Lagrange stability of the system, the frequency conditions is equivalently converted into an H-infinity norm bound requirement, which makes it possible to solve the synthesis problems within the framework of H-infinity control theory. Linear dynamic output controller is constructed and the controller existence conditions are derived in terms of linear matrix inequalities (LMIs). With this LMI approach, the results are extended to the uncertain case with norm-bounded uncertainties in the linear part of the system. Illustrative example is given to sh...
Abstract—This note deals with the control of linear discrete-time sys-tems with uncertain initial co...
In this paper, a new dynamic output feedback approach for absolute stabilization of Lur'e syste...
This is an open access article that can be accessed from the link below - Copyright @ 2002 Springer ...
In this paper, a new method for stabilization of a class of discrete time phase-controlled systems i...
This paper presents new synthesis procedures for discrete-time linear systems. It is based on a rece...
This paper focus on a stabilization problem for a class of nonlinear systems with periodic nonlinear...
This paper investigates the problems of stabilization and mixed H2/H infinity reduced-order dynamic ...
We focus on robust H-infinity control analysis and synthesis for discrete-time switched systems with...
In this paper, a new method for robust Lagrange stability analysis of a class of nonlinear discrete-...
This paper deals with output feedback stabilization and H-infinity control problems for two-dimensio...
This paper presents new synthesis procedures for discrete-time linear systems. It is based on a rece...
In this paper, the stabilization problem for discrete-time systems by means of an output feedback la...
The problem of finding H∞-regulators in the output control problem is considered. Two approaches for...
The problem of output feedback H. control for linear discrete-time systems subject to sensor nonline...
Feedback control of two-dimensional (2-D) systems is a problem of considerable importance in both th...
Abstract—This note deals with the control of linear discrete-time sys-tems with uncertain initial co...
In this paper, a new dynamic output feedback approach for absolute stabilization of Lur'e syste...
This is an open access article that can be accessed from the link below - Copyright @ 2002 Springer ...
In this paper, a new method for stabilization of a class of discrete time phase-controlled systems i...
This paper presents new synthesis procedures for discrete-time linear systems. It is based on a rece...
This paper focus on a stabilization problem for a class of nonlinear systems with periodic nonlinear...
This paper investigates the problems of stabilization and mixed H2/H infinity reduced-order dynamic ...
We focus on robust H-infinity control analysis and synthesis for discrete-time switched systems with...
In this paper, a new method for robust Lagrange stability analysis of a class of nonlinear discrete-...
This paper deals with output feedback stabilization and H-infinity control problems for two-dimensio...
This paper presents new synthesis procedures for discrete-time linear systems. It is based on a rece...
In this paper, the stabilization problem for discrete-time systems by means of an output feedback la...
The problem of finding H∞-regulators in the output control problem is considered. Two approaches for...
The problem of output feedback H. control for linear discrete-time systems subject to sensor nonline...
Feedback control of two-dimensional (2-D) systems is a problem of considerable importance in both th...
Abstract—This note deals with the control of linear discrete-time sys-tems with uncertain initial co...
In this paper, a new dynamic output feedback approach for absolute stabilization of Lur'e syste...
This is an open access article that can be accessed from the link below - Copyright @ 2002 Springer ...