This work deals with numerical methods of parameter optimization for asymptotically stable systems.We formulate a special mathematical programming problem that allows us to determine optimal parameters of a stabilizer. This problem involves solutions to a differential equation. We show how to chose the mesh in order to obtain discrete problem guaranteeing the necessary accuracy. The developed methodology is illustrated by an example concerning optimization of parameters for a satellite stabilization system.FCT, QREN, FEDER, COMPET
Formal optimization methods and eigenvalue gradient information are used to develop a stabilizing co...
AbstractThe Routh-Hurwitz, Liénard-Chipart and Stodola criteria are reviewed and then combined into ...
Gradient methods for optimization of dynamic system parameters by hybrid computatio
This work deals with numerical methods of parameter optimization for asymptotically stable systems. ...
Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction...
The aim of this work is to develop an effective numerical tool oriented to optimization of stabilize...
AbstractConsider the affine matrix family A(x)=A0+∑k=1mxkAk, mapping a design vector x∈Rm into the s...
AbstractThe problem considered is the existence and construction of an asymptotically stabilizing fe...
In this paper we study approximations to the infinite-horizon quadratic optimal control problem for ...
In this paper we study approximations to the infinite-horizon quadratic optimal control problem for ...
: In this article, we address the infinite horizonproblem of optimizing a given performance criterio...
AbstractThe major emphasis in this paper is to utilize system-theoretic concepts to adapt econometri...
The numerical operations involved in a currently used optimization technique are discussed and analy...
We develop a controller design for linear systems subject to asymmetric actuator saturation that max...
Stabilized finite element methods for convection-dominated problems require the choice of appropriat...
Formal optimization methods and eigenvalue gradient information are used to develop a stabilizing co...
AbstractThe Routh-Hurwitz, Liénard-Chipart and Stodola criteria are reviewed and then combined into ...
Gradient methods for optimization of dynamic system parameters by hybrid computatio
This work deals with numerical methods of parameter optimization for asymptotically stable systems. ...
Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction...
The aim of this work is to develop an effective numerical tool oriented to optimization of stabilize...
AbstractConsider the affine matrix family A(x)=A0+∑k=1mxkAk, mapping a design vector x∈Rm into the s...
AbstractThe problem considered is the existence and construction of an asymptotically stabilizing fe...
In this paper we study approximations to the infinite-horizon quadratic optimal control problem for ...
In this paper we study approximations to the infinite-horizon quadratic optimal control problem for ...
: In this article, we address the infinite horizonproblem of optimizing a given performance criterio...
AbstractThe major emphasis in this paper is to utilize system-theoretic concepts to adapt econometri...
The numerical operations involved in a currently used optimization technique are discussed and analy...
We develop a controller design for linear systems subject to asymmetric actuator saturation that max...
Stabilized finite element methods for convection-dominated problems require the choice of appropriat...
Formal optimization methods and eigenvalue gradient information are used to develop a stabilizing co...
AbstractThe Routh-Hurwitz, Liénard-Chipart and Stodola criteria are reviewed and then combined into ...
Gradient methods for optimization of dynamic system parameters by hybrid computatio