On stability of linear differential equations with commensurate delayed arguments

On stability of linear differential equations with commensurate delayed arguments

WoS Article

The paper studies a class of linear differential equations with several delayed arguments formed by iterates of a given function. The main result of this paper improves the existing stability criteria and formulates an effective necessary and sufficient condition relating stability of the studied differential equations to stability of some auxiliary difference equations. In the case of a two-delay equation, this condition is presented explicitly in terms of the equation’s parameters. As an accompanying result, the asymptotic decay rate of the solutions is described as well.

The paper studies a class of linear differential equations with several delayed arguments formed by iterates of a given function. The main result of this paper improves the existing stability criteria and formulates an effective necessary and sufficient condition relating stability of the studied differential equations to stability of some auxiliary difference equations. In the case of a two-delay equation, this condition is presented explicitly in terms of the equation’s parameters. As an accompanying result, the asymptotic decay rate of the solutions is described as well.

Linear differential and difference equation; Commensurate delays; Asymptotic stability

Linear differential and difference equation; Commensurate delays; Asymptotic stability

ČERMÁK, J.; NECHVÁTAL, L.

2022

01.03.2022

PERGAMON-ELSEVIER SCIENCE LTD

THE BOULEVARD, LANGFORD LANE, KIDLINGTON, OXFORD OX5 1GB, ENGLAND

0893-9659

Applied Mathematics Letters

125

1

United States of America

1

8

8

https://www.sciencedirect.com/science/article/pii/S089396592100402X