Logo ČVUT
ČESKÉ VYSOKÉ UČENÍ TECHNICKÉ V PRAZE
STUDIJNÍ PLÁNY
2019/2020

Systems Theory

Předmět není vypsán Nerozvrhuje se
Kód Zakončení Kredity Rozsah Jazyk výuky
MIE-TES.1 Z,ZK 3 2P
Přednášející:
Cvičící:
Předmět zajišťuje:
katedra teoretické informatiky
Anotace:

Students gain knowledge needed for handling complex, incompletely known or imprecisely described systems of all kinds (software, hardware, controlled physical processes, etc.)

Požadavky:

Basics of graph theory, mathematical analysis and algebra.

Osnova přednášek:

1. System definition. Structural and functional concept of a system.

2. Compositional and dynamic systems. Hard and soft systems.

3. Identification of a system.

4. Structural tasks of the system analysis. Paths and feedbacks.

5. Tasks of decomposition and composition of a system and tasks of system goals.

6. System behavior, behavior models, the notion of a process.

7. Formalisms for the analysis of model behavior: Petri nets, decision tables.

8. Bulk analysis and other methods of system analysis.

9. Soft systems, methods of their analysis.

10. Selected methodologies of system design, the SSADM method.

11. System synthesis with discrete time.

12. Decision and decision processes.

13. Information in a system and in its neighborhood, system regularity, system viability.

Osnova cvičení:
Cíle studia:

We are surrounded by phenomena and things that are too complex to be completely and in detail described, understood, and analyzed. However, it turns out that many of them, even though of various nature, show similar properties and behaviors: for example, the number of wolfs hunted down in Canada has similar time characteristics as the oscillations of an electronic relaxation oscillator. The structure of a system, i.e., the way how it is assembled from components, often plays substantial role. Students learn to work with these general rules of law both for the analysis of behavior of such systems and for their construction.

Studijní materiály:

1. Bertalanffy, L.v., ''General system theory: foundations, development, applications''. Brazillier, 2003. ISBN 0807604534.

2. Hinrichsen, D., Pritchard, A. J., ''Mathematical systems theory I: modelling, state space analysis, stability''. Springer, 2005. ISBN 3540441255.

Poznámka:
Další informace:
Pro tento předmět se rozvrh nepřipravuje
Předmět je součástí následujících studijních plánů:
Platnost dat k 22. 9. 2019
Aktualizace výše uvedených informací naleznete na adrese http://bilakniha.cvut.cz/cs/predmet1807006.html