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@article{32dc87383e164131952d071017c9a8e7,
title = "A new LKF approach to stability analysis of linear systems with uncertain delays",
abstract = "In this paper, we analyze the asymptotic stability of linear systems with multiple uncertain delays assuming the nominal delays to be constant with possible zero or nonzero values. We apply the simple Lyapunov–Krasovskii functional (LKF) with the derivative prescribed as a negative definite quadratic form of the “current” state of a system. We combine this functional with some integral bound for the derivative of the functional along the solutions of an uncertain system, what provides the novelty of approach. This bound consists of an essential integral part and some bounded expression. The fact is that the positiveness of the essential part provides itself the stability of a system. The study is based on recent works where the functional was shown to admit a quadratic lower bound on some special set of functions, though it is only known to have a local cubic one on the set of arbitrary functions. The derived stability condition is much simpler than most ones obtained by LKFs and outlined in the literature. It constitutes an algebraic inequality for delay perturbations based on the so-called Lyapunov matrix and converges to a necessary and sufficient condition in some sense.",
keywords = "Asymptotic stability, Lyapunov–Krasovskii functionals, Time delay systems, Uncertain delay",
author = "Александрова, {Ирина Васильевна} and Жабко, {Алексей Петрович}",
year = "2018",
month = may,
doi = "10.1016/j.automatica.2018.01.012",
language = "English",
volume = "91",
pages = "173--178",
journal = "Automatica",
issn = "0005-1098",
publisher = "Elsevier",

}

RIS

TY - JOUR

T1 - A new LKF approach to stability analysis of linear systems with uncertain delays

AU - Александрова, Ирина Васильевна

AU - Жабко, Алексей Петрович

PY - 2018/5

Y1 - 2018/5

N2 - In this paper, we analyze the asymptotic stability of linear systems with multiple uncertain delays assuming the nominal delays to be constant with possible zero or nonzero values. We apply the simple Lyapunov–Krasovskii functional (LKF) with the derivative prescribed as a negative definite quadratic form of the “current” state of a system. We combine this functional with some integral bound for the derivative of the functional along the solutions of an uncertain system, what provides the novelty of approach. This bound consists of an essential integral part and some bounded expression. The fact is that the positiveness of the essential part provides itself the stability of a system. The study is based on recent works where the functional was shown to admit a quadratic lower bound on some special set of functions, though it is only known to have a local cubic one on the set of arbitrary functions. The derived stability condition is much simpler than most ones obtained by LKFs and outlined in the literature. It constitutes an algebraic inequality for delay perturbations based on the so-called Lyapunov matrix and converges to a necessary and sufficient condition in some sense.

AB - In this paper, we analyze the asymptotic stability of linear systems with multiple uncertain delays assuming the nominal delays to be constant with possible zero or nonzero values. We apply the simple Lyapunov–Krasovskii functional (LKF) with the derivative prescribed as a negative definite quadratic form of the “current” state of a system. We combine this functional with some integral bound for the derivative of the functional along the solutions of an uncertain system, what provides the novelty of approach. This bound consists of an essential integral part and some bounded expression. The fact is that the positiveness of the essential part provides itself the stability of a system. The study is based on recent works where the functional was shown to admit a quadratic lower bound on some special set of functions, though it is only known to have a local cubic one on the set of arbitrary functions. The derived stability condition is much simpler than most ones obtained by LKFs and outlined in the literature. It constitutes an algebraic inequality for delay perturbations based on the so-called Lyapunov matrix and converges to a necessary and sufficient condition in some sense.

KW - Asymptotic stability

KW - Lyapunov–Krasovskii functionals

KW - Time delay systems

KW - Uncertain delay

UR - http://www.scopus.com/inward/record.url?scp=85041815216&partnerID=8YFLogxK

U2 - 10.1016/j.automatica.2018.01.012

DO - 10.1016/j.automatica.2018.01.012

M3 - Article

VL - 91

SP - 173

EP - 178

JO - Automatica

JF - Automatica

SN - 0005-1098

ER -

ID: 18529969