Detail publikace
On stabilization of unstable steady states of autonomous ordinary differential equations via delayed feedback controls
ČERMÁK, J. NECHVÁTAL, L.
Anglický název
On stabilization of unstable steady states of autonomous ordinary differential equations via delayed feedback controls
Typ
článek v časopise ve Web of Science, Jimp
Jazyk
en
Originální abstrakt
The paper discusses stabilizing effects of some time-delayed feedback controls applied to unstable steady states of an autonomous system of ordinary differential equations. First, we derive explicit delay-dependent stability conditions that are applicable to a family of time-delayed systems with simultaneously triangularizable system matrices. Then, using this criterion and other argumentation, we employ diagonal delayed feedback controls of conventional and Pyragas type to stabilize unstable steady states of the studied autonomous system. More precisely, we formulate explicit, non-improvable and immediately applicable conditions on time delay and feedback strength that enable such a stabilization. As an illustration, we stabilize the unstable steady states of the Rössler dynamical system considered under the standard choice of entry parameters when the uncontrolled system displays a chaotic behavior. Also, we consider a non-diagonal feedback control (whose rotational gain matrix, involving a feedback strength and phase, commutes with the Jacobi matrix of the uncontrolled system) and show its larger stabilization potential with respect to the appropriate diagonal control. The obtained results are tested by numerical experiments and confronted with the existing results. As a supplement, we provide MATLAB codes supporting theoretical conclusions.
Anglický abstrakt
The paper discusses stabilizing effects of some time-delayed feedback controls applied to unstable steady states of an autonomous system of ordinary differential equations. First, we derive explicit delay-dependent stability conditions that are applicable to a family of time-delayed systems with simultaneously triangularizable system matrices. Then, using this criterion and other argumentation, we employ diagonal delayed feedback controls of conventional and Pyragas type to stabilize unstable steady states of the studied autonomous system. More precisely, we formulate explicit, non-improvable and immediately applicable conditions on time delay and feedback strength that enable such a stabilization. As an illustration, we stabilize the unstable steady states of the Rössler dynamical system considered under the standard choice of entry parameters when the uncontrolled system displays a chaotic behavior. Also, we consider a non-diagonal feedback control (whose rotational gain matrix, involving a feedback strength and phase, commutes with the Jacobi matrix of the uncontrolled system) and show its larger stabilization potential with respect to the appropriate diagonal control. The obtained results are tested by numerical experiments and confronted with the existing results. As a supplement, we provide MATLAB codes supporting theoretical conclusions.
Klíčová slova anglicky
Delay differential equation; Stability and stabilization; Feedback control; Rössler dynamical system
Vydáno
01.03.2020
Nakladatel
ELSEVIER B.V.
Místo
RADARWEG 29, 1043 NX AMSTERDAM, NETHERLANDS
ISSN
0167-2789
Ročník
404
Číslo
1
Strany od–do
1–30
Počet stran
30
BIBTEX
@article{BUT162614,
author="Jan {Čermák} and Luděk {Nechvátal},
title="On stabilization of unstable steady states of autonomous ordinary differential equations via delayed feedback controls",
year="2020",
volume="404",
number="1",
month="March",
pages="1--30",
publisher="ELSEVIER B.V.",
address="RADARWEG 29, 1043 NX AMSTERDAM, NETHERLANDS",
issn="0167-2789"
}