Add to ORKGA method is proposed for designing multivariable systems based on an alternate derivation of Davison's theorem on pole placement and the solution of the nonlinear equations for the feedback gains by the least square error method. Output feedback is used to control a complex dynamical system. The freedom in design, after allocating poles, is used to place zeros and/or satisfy other design objectives. This method results in algorithms which are computationally attractive. However, this is done at a considerable sacrifice in terms of the design freedom available. For a system with m inputs and p outputs only m + p variables are available instead of mp variables
Abstract — The pole placement is one of the most important methods for designing controller for line...
Traditional pole-placement methods for calculating state-feedback gains for multivariable regulators...
In this paper a two stage, sequential at each stage, algorithm is proposed for output feedback contr...
The research being performed under NASA Grant NAG1-1361 involves a more clear understanding and defi...
This paper presenting a design method commonly called the pole-placement or pole-a...
For many dynamical systems it is required to specifically shift individual poles, especially when th...
summary:This paper deals with the direct solution of the pole placement problem by state-derivative ...
summary:This paper deals with the direct solution of the pole placement problem by state-derivative ...
A closed-form analytical solution is developed for the first time that fully addresses the problem o...
We discuss the pole placement problem for single-input or multi-input control models of the form _x=...
This paper deals with the direct solution of the pole placement problem for single-input linear syst...
summary:This paper deals with the direct solution of the pole placement problem by state-derivative ...
The control of linear multivariable systems (LMS) where only some of the state variables are directl...
It is shown that for a controllable, linear time invariant multivariable system at least max (m,p) p...
A new procedure for selecting closed-loop poles in the state feedback controller design is proposed...
Abstract — The pole placement is one of the most important methods for designing controller for line...
Traditional pole-placement methods for calculating state-feedback gains for multivariable regulators...
In this paper a two stage, sequential at each stage, algorithm is proposed for output feedback contr...
The research being performed under NASA Grant NAG1-1361 involves a more clear understanding and defi...
This paper presenting a design method commonly called the pole-placement or pole-a...
For many dynamical systems it is required to specifically shift individual poles, especially when th...
summary:This paper deals with the direct solution of the pole placement problem by state-derivative ...
summary:This paper deals with the direct solution of the pole placement problem by state-derivative ...
A closed-form analytical solution is developed for the first time that fully addresses the problem o...
We discuss the pole placement problem for single-input or multi-input control models of the form _x=...
This paper deals with the direct solution of the pole placement problem for single-input linear syst...
summary:This paper deals with the direct solution of the pole placement problem by state-derivative ...
The control of linear multivariable systems (LMS) where only some of the state variables are directl...
It is shown that for a controllable, linear time invariant multivariable system at least max (m,p) p...
A new procedure for selecting closed-loop poles in the state feedback controller design is proposed...
Abstract — The pole placement is one of the most important methods for designing controller for line...
Traditional pole-placement methods for calculating state-feedback gains for multivariable regulators...
In this paper a two stage, sequential at each stage, algorithm is proposed for output feedback contr...