AbstractThe concept of “stability with respect to measurement” was introduced by H. Hermes to characterize those feedback control systems which are tolerant of errors in state variable measurement within the feedback loop. This paper considers autonomous linear strictly normal systems with two-dimensional controls and develops necessary and sufficient conditions for local measurement stability of the time-optimal feedback control system
In this paper, we characterize the achievable input performance for linear time invariant systems un...
Abstract. We consider one-dimensional ane control systems. We show that if such a system is stabiliz...
Motivated by the design of perturbation (output) feedback controllers for nonlinear systems, tempora...
AbstractThis paper is concerned with the properties of closed-loop time-optimal control of linear sy...
In this paper the possibility to stabilize linear discrete time-varying systems by state feedback is...
This paper is concerned with the $H_\infty $ problem with measurement feedback. The problem is to fi...
Abstract—A fundamental result in linear system theory is the development of a linear state feedback ...
this paper. The first one deals with the characterization and parameterization of all H 2 optimal me...
International audienceThis chapter considers the feedback stabilization of partial differential equa...
In this work, we develop a geometric method for solving the problem of H2-optimal rejection of distu...
For a general H/sub 2/ optimal control problem, first all H/sub 2/ optimal measurement feedback cont...
Abstract—We consider the problem of stabilizing a linear time-invariant system using sampled encoded...
For a general H2 optimal control problem, at first all H2 optimal measurement feedback controllers a...
In this note, we give a general result on the control of linear systems with measurement nonlinearit...
In this paper the problem of disturbance rejection and data sensitivity is studied for the case of l...
In this paper, we characterize the achievable input performance for linear time invariant systems un...
Abstract. We consider one-dimensional ane control systems. We show that if such a system is stabiliz...
Motivated by the design of perturbation (output) feedback controllers for nonlinear systems, tempora...
AbstractThis paper is concerned with the properties of closed-loop time-optimal control of linear sy...
In this paper the possibility to stabilize linear discrete time-varying systems by state feedback is...
This paper is concerned with the $H_\infty $ problem with measurement feedback. The problem is to fi...
Abstract—A fundamental result in linear system theory is the development of a linear state feedback ...
this paper. The first one deals with the characterization and parameterization of all H 2 optimal me...
International audienceThis chapter considers the feedback stabilization of partial differential equa...
In this work, we develop a geometric method for solving the problem of H2-optimal rejection of distu...
For a general H/sub 2/ optimal control problem, first all H/sub 2/ optimal measurement feedback cont...
Abstract—We consider the problem of stabilizing a linear time-invariant system using sampled encoded...
For a general H2 optimal control problem, at first all H2 optimal measurement feedback controllers a...
In this note, we give a general result on the control of linear systems with measurement nonlinearit...
In this paper the problem of disturbance rejection and data sensitivity is studied for the case of l...
In this paper, we characterize the achievable input performance for linear time invariant systems un...
Abstract. We consider one-dimensional ane control systems. We show that if such a system is stabiliz...
Motivated by the design of perturbation (output) feedback controllers for nonlinear systems, tempora...