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Dynamic balance research of protected systems

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Języki publikacji
EN
Abstrakty
EN
The dynamic models of the complex ergatic objects' behavior, presented in the form of differentia equations and their systems were studied. The stability and other properties are researched. The methods of analysis and reduce of harmful factors and their impact on people were theoretically proved. The methods of analysis and critical points removal in dynamic models of hazards distribution are offered. The object of study is the system of the harmful external factors protection. Subject of research is the system of two nonlinear differential equations as a model of technical systems with protection. The object of protection is described by logistic equation. and defense system - by non-linear differential equation with a security functions of rather general form. This paper describes critical modes analysis and stationary states’ stability of protected systems with harmful influences. Numerical solution of general problem and also the analytical solution for the case of fixed expected harmful effects have been obtained. Various types of general models for "Man-machine-environment" systems were studied. Each of describes some kind of the practically important quality of object in an appropriate way. And All together they describe the object in terms of it’s safe operation. Their further detailing process results to either well-known, or some new subsystems’ models. Systems with "fast" protection at a relatively slow dynamics of the object were studied. This leads to the models with small parameter and asymptotic solutions of differentia equations. Some estimates for protection cost in different price-functional and for different functions in the right part of equation, which describes the dynamics of defense were obtained. For calculations, analysis and graphical representations some of mathematical packages was applied.
Twórcy
autor
  • Kharkiv National University of Radio Electronics
  • Kharkiv National University of Radio Electronics
Bibliografia
  • 1. Alexeev I., Voloshyn O. 2013. Formation of Compensation Mechanism of Regional Enterprises’ Human Resources Regeneration in the Labor Potential Development System. ECONTECHMOD. An International Quaterly Journal. Vol. 2. No. 3, 3-8.
  • 2. Inozemtsev G. 2012. Scientific and technical preconditions of electric field application at plants protection. ECONTECHMOD. An International Quaterly Journal. Vol. 1. No. 1, 47-50.
  • 3. Saati Т. 1993. Decisions making. Method of hierarchy analysis. Moscow: Radio and Communications. 282. (in Russian).
  • 4. Dzundzjuk B. W., Naumeyko I. V., Serdyuk N. N. 2000. Content model for number of harmful factors of impact on human. Radioelektronika i informatika, №3(12), 127-128. (in Russian).
  • 5. Naumeyko I. V., Al-Refai V. A. 2013. Concerning issue of critical regimes analysis with dynamic defense systems from harmful influence. Yevpatoriya 2013, September16-22. 2-nd IST-2013, 12. (In Russian).
  • 6. Naumeyko I. V. 2011. Critical points of dynamic model for harmful factors distributing. Materials of International scientific conference. ISTE 2011. Kharkov-Yalta October 1-6 2011, 60-61. (in Russian).
  • 7. Dolinskii A., Draganov B., Kozirskii V. 2012. Nonequilibrium state of engineering systems. ECONTECHMOD. An International Quaterly Journal. Vol. 1. No. 1, 33-35.
  • 8. Haken H. 2004. Synergetics: introduction and advanced topics, Springer-Verlag, 201.
  • 9. Ilyichev V. G. 2003. Stabilization and adaptation mechanisms in ecology models: Dis. Doctors of technology sciences: 05.13.01, 05.13.18 : Rostov-on-Don, 279. RGB OD, 71:04-5/418. (in Russian).
  • 10. Nasritdinov G. and Dalimov R.T. 2010. Limit cycle, trophic function and the dynamics of intersectoral interaction. Current Research J. of Economic Theory, 2(2), 32–40.
  • 11. Brauer F., Castillo-Chavez C. 2000. Mathematical Models in Population Biology and Epidemiology. Springer-Verlag, 412.
  • 12. Hoppensteadt F. 2006. Predator-prey model. Scholarpedia, 1(10), 1563.
  • 13. Jost C., Devulder G., Vucetich J. A., Peterson R., and Arditi R. 2005. The wolves of Isle Royale display scale-invariant satiation and density dependent predation on moose. J. Anim. Ecol. 74(5), 809–816.
  • 14. Arditi R. and Ginzburg L.R. 2012. How Species Interact: Altering the Standard View on Trophic Ecology. Oxford University Press. ISBN 9780199913831.
  • 15. Sahal D. 1976. System Complexity : Its Conception and measurement in the Design of Engineering systems. IEEE Trans. Syst. Man. Cybern., SMC 6, 152.
  • 16. Arrowsmith D., Place C. 1986. Ordinary differentia equations. A qualitative approach with applications. Moscow: Mir, 243. (in Russian).
  • 17. Barbashin Y.A. 1968. Introduction to the theory of stability. Moscow: Nauka, 224. (in Russian).
  • 18. Sidorov S. V. 2009. Mathematical and numerical study of dynamic chaos in dissipative systems of nonlinear differential equations: Thesis ... doctor of Mathematics and Physics science : 05.13.18 ; [Place of defense: Moscow state municipal university].- Moscow, 2009, 283 : il. RGB OD, 71 10-1/73. (in Russian).
  • 19. Amirokov S. R. 2006. Numerical methods and simulation experiment in research of dynamics and structure of interacting societies: Thesis ... Candidate of Physical and Mathematical Science : 05.13.18.- Stavropol 2006, 187 : il. RGB OD, 61 06-1/929 (In Russian).
  • 20. Koronovskiy A. A. 2007. Synchronized behavior, complicated dynamics and transmission processes in self-sustained oscillation systems and standard reference models of non-linear theory of oscillations : thesis ... Doctor of Physics and Mathematics science : 01.04.03; [Place of defense: Saratov State University].- Saratov, 2007, 462 : il. RGB OD, 71 07-1/420 (in Russian).
  • 21. Latypov V. N. 2010. Mathematical models of perturbed motion of a high order of accuracy: thesis ... candidate of Physics and Mathematics science : 05.13.18; [Place of defense: St-Petersburg state university].- St-Petersbourg, 2010, 133: il. RGB OD, 61 10-1/736. (in Russian).
  • 22. Dyakonov V. P. 2004. Mathematica 4.1/4.2/5.0 in Mathematics and scientific and technical calculations. Moscow: SOLON-Press, 542. (in Russian).
Typ dokumentu
Bibliografia
Identyfikator YADDA
bwmeta1.element.baztech-038e0da1-adf0-4618-be3b-eb7318b271d7
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