Janeska, Margarita and Taleska, Suzana
(2000)
*Optimization of linear dynamic systems with automatically controleed.*
In: The 3rd International Conference/Workshop on automatic Differentiation From Simulation to Optimization, AD 2000, Nice, France.

## Abstract

Optimization problem in the linear dynamic systems' study is settled on the determination of an extreme of a certain functional having one or more functions with one or more independently variable dimensions i.e. an extreme of certain function with one or more independently variable dimensions and that leads to an integration of one differential equation or a system of differential equations with defined limited conditions.

The integral calculation and the differential equations represent relevant mathematics techniques for the dynamic analysis of variables that are tested in case when the time is considered to be a continuous variable.

It means that in the dynamic models are described the variable’s time movements with differential equations.

The system of linear differential equations, with which the linear dynamic system is represented by, can be represented by a system of homogeneous linear equations or with a matrix equation when a characteristic equation is required, and its coefficients in this case are always real. To each solution of the characteristic equation corresponds one particular solution of the given matrix equation.

Item Type: | Conference or Workshop Item (Paper) |
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Subjects: | Scientific Fields (Frascati) > Social Sciences > Economics and Business |

Divisions: | Faculty of Economics |

Depositing User: | Mr Dimitar Risteski |

Date Deposited: | 05 Feb 2020 12:12 |

Last Modified: | 05 Feb 2020 12:12 |

URI: | https://eprints.uklo.edu.mk/id/eprint/2400 |

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