Stabilization of unstable states

Author

Buts, Vyacheslav A.

Author_Institution

Nat. Sci. Center “Kharkov Inst. of Phys. & Technol.”, Kharkov, Ukraine

fYear

2014

fDate

16-18 June 2014

Firstpage

1

Lastpage

5

Abstract

The whirligig principle, which is an efficient approach to the stabilization of many both quantum and classical physical systems, is reviewed. Examples of the application of this principle are given. In particular, the possibility of the suppression of instabilities that occur during the propagation of radiation flows in a nonlinear media (explosive instability) is demonstrated. The suppression of chaotic oscillations is also demonstrated by using the Lorentz´s system as an example.

Keywords

chaos; oscillations; quantum theory; stability; Lorentzs system; chaotic oscillation suppression; classical physical system stabilization; explosive instability; instability suppression; nonlinear media; quantum physical system stabilization; radiation flow propagation; unstable state stabilization; whirligig principle application; Chaos; Equations; Explosives; Mathematical model; Oscillators; Physics; Resonant frequency; Quantum Zeno effect; controlling chaos; explosive instability; stabilization;

fLanguage

English

Publisher

ieee

Conference_Titel

Microwaves, Radar, and Wireless Communication (MIKON), 2014 20th International Conference on

Conference_Location

Gdansk

Print_ISBN

978-617-607-553-0

Type

conf

DOI

10.1109/MIKON.2014.6899984

Filename

6899984