Add to ORKGThis paper gives a norm bounding closed loop solution to a discrete, linear time-varying fixed finite horizon control problem. Methods of computing the achieved closed loop norms are considered. It is shown that the Riccati equation associated with the synthesis of the control is equivalent to the Riccati equation associated with a bounded real type result when invoked with the minimal closed loop dynamics. By showing a relationship between three time-varying Riccati equations, the optimum norm for the closed loop solution to the normalized left factor perturbed problem is explicitly obtained in terms of the Hankel norm of the normalized left factors. Explicit controller formulae are derived for a particular class of problem. A class of sub...
The linear-quadratic (LQ) problem is the prototype of a large number of optimal control problems, in...
In this paper we deal with some finite-time control problems for discrete-time linear systems. In pa...
This thesis deals with the optimal regulation of constrained discrete-time systems. The class of pro...
This paper is concerned with the finite-horizon version of the H∞ problem with measurement feedback....
AbstractThis paper is concerned with the finite-horizon version of the H∞ problem with measurement f...
This paper is concerned with the finite horizon version of the $H_\infty$ problem with measurement f...
In this paper the possibility to stabilize linear discrete time-varying systems by state feedback is...
This paper considers the problem of controlling continuous-time linear parameter varying (LPV) syste...
This paper is concerned with the finite-horizon version of the H8 problem with measurement feedback....
In this paper, a new methodology is developed for the closed-form solution of a generalized version ...
In this paper we study the finite horizon version of the standard $H^\infty$ control problem by meas...
The aim of this paper is to propose a new method for the optimal "H_∞ norm" computation of time-vary...
Most control problems of practical interest have several performance and robustness requirements. A ...
In this paper, a new stabilizing receding horizon control (RHC) scheme is proposed for linear discre...
The linear-quadratic (LQ) problem is the prototype of a large number of optimal control problems, in...
In this paper we deal with some finite-time control problems for discrete-time linear systems. In pa...
This thesis deals with the optimal regulation of constrained discrete-time systems. The class of pro...
This paper is concerned with the finite-horizon version of the H∞ problem with measurement feedback....
AbstractThis paper is concerned with the finite-horizon version of the H∞ problem with measurement f...
This paper is concerned with the finite horizon version of the $H_\infty$ problem with measurement f...
In this paper the possibility to stabilize linear discrete time-varying systems by state feedback is...
This paper considers the problem of controlling continuous-time linear parameter varying (LPV) syste...
This paper is concerned with the finite-horizon version of the H8 problem with measurement feedback....
In this paper, a new methodology is developed for the closed-form solution of a generalized version ...
In this paper we study the finite horizon version of the standard $H^\infty$ control problem by meas...
The aim of this paper is to propose a new method for the optimal "H_∞ norm" computation of time-vary...
Most control problems of practical interest have several performance and robustness requirements. A ...
In this paper, a new stabilizing receding horizon control (RHC) scheme is proposed for linear discre...
The linear-quadratic (LQ) problem is the prototype of a large number of optimal control problems, in...
In this paper we deal with some finite-time control problems for discrete-time linear systems. In pa...
This thesis deals with the optimal regulation of constrained discrete-time systems. The class of pro...