We investigate the relationships between the infinitely many characteristic zeros (or modes) of linear systems subject to point delays and their delay-free counterparts based on algebraic results and theory of analytic functions. The cases when the delay tends to zero or to infinity are emphasized in the study. It is found that when the delay is arbitrarily small, infinitely many of those zeros are located in the stable region with arbitrarily large modulus, while their contribution to the system dynamics becomes irrelevant. The remaining finite characteristic zeros converge to those of the delay-free nominal system. When the delay tends to infinity, infinitely many zeros are close to the origin. Furthermore, there exist two auxiliary delay...
summary:We first consider the finite time stability of second order linear differential systems with...
This paper investigates the causality properties of a class of linear time-delay systems under const...
International audienceThe notion of structure at infinity for general linear time- delay systems is ...
We investigate the relationships between the infinitely many characteristic zeros (or modes) of line...
International audienceIn this paper we study stability properties of linear time-delay systems with ...
International audienceA time-delay system may or may not be stable for different periods of delay. W...
International audienceA general class of linear time invariant systems with time delay is studied. R...
Paper extends some basic results from the area of finite time and practical stability to linear, con...
AbstractThis paper introduces some results about stability for a class of linear point-delayed syste...
International audienceThis paper presents an application of the eigenvalue series developed in Part ...
AbstractA formula is given that counts the number of roots in the positive half plane of the charact...
Delays appear always more frequently in applications, ranging, e.g., from population dynam...
Paper extends some basic results from the area of finite time and practical stability to linear, con...
An analytic criterion for determining the stability of linear differential delay systems is presente...
This paper investigates the global asymptotic stability independent of the sizes of the delays of li...
summary:We first consider the finite time stability of second order linear differential systems with...
This paper investigates the causality properties of a class of linear time-delay systems under const...
International audienceThe notion of structure at infinity for general linear time- delay systems is ...
We investigate the relationships between the infinitely many characteristic zeros (or modes) of line...
International audienceIn this paper we study stability properties of linear time-delay systems with ...
International audienceA time-delay system may or may not be stable for different periods of delay. W...
International audienceA general class of linear time invariant systems with time delay is studied. R...
Paper extends some basic results from the area of finite time and practical stability to linear, con...
AbstractThis paper introduces some results about stability for a class of linear point-delayed syste...
International audienceThis paper presents an application of the eigenvalue series developed in Part ...
AbstractA formula is given that counts the number of roots in the positive half plane of the charact...
Delays appear always more frequently in applications, ranging, e.g., from population dynam...
Paper extends some basic results from the area of finite time and practical stability to linear, con...
An analytic criterion for determining the stability of linear differential delay systems is presente...
This paper investigates the global asymptotic stability independent of the sizes of the delays of li...
summary:We first consider the finite time stability of second order linear differential systems with...
This paper investigates the causality properties of a class of linear time-delay systems under const...
International audienceThe notion of structure at infinity for general linear time- delay systems is ...