International audienceThis paper presents an application of the eigenvalue series developed in Part I [J. Chen et al., SIAM J. Control Optim., 48 (2010), pp. 5564-5582] to the study of linear time-invariant delay systems, focusing on the asymptotic behavior of critical characteristic zeros on the imaginary axis. We consider systems given in state-space form and as quasi-polynomials, and we develop an eigenvalue perturbation analysis approach which appears to be both conceptually appealing and computationally efficient. Our results reveal that the zero asymptotic behavior of time-delay systems can in general be characterized by solving a simple eigenvalue problem, and, additionally, when described by a quasi-polynomial, by computing the deri...
International audienceThis paper presents a systematic method to analyse the stability of systems wi...
We investigate the relationships between the infinitely many characteristic zeros (or modes) of line...
International audienceA general class of linear time invariant systems with time delay is studied. R...
International audienceThis paper presents an application of the eigenvalue series developed in Part ...
International audienceThis two-part paper is concerned with stability analysis of linear systems sub...
International audienceA time-delay system may or may not be stable for different periods of delay. W...
International audienceIn this paper we study stability properties of linear time-delay systems with ...
Abstract: We present a matrix method for determining the imaginary axis eigenvalues of a delay diffe...
International audienceThis work focus on the asymptotic behavior of critical roots of linear time-de...
AbstractIn this work we present a new method to compute the delays of delay-differential equations (...
International audienceWe contribute to the perturbation theory of nonlinear eigenvalue problems in t...
We contribute to the perturbation theory of nonlinear eigenvalue problems in three ways. First, we e...
International audienceThis paper presents a systematic method to analyse the stability of systems wi...
We investigate the relationships between the infinitely many characteristic zeros (or modes) of line...
International audienceA general class of linear time invariant systems with time delay is studied. R...
International audienceThis paper presents an application of the eigenvalue series developed in Part ...
International audienceThis two-part paper is concerned with stability analysis of linear systems sub...
International audienceA time-delay system may or may not be stable for different periods of delay. W...
International audienceIn this paper we study stability properties of linear time-delay systems with ...
Abstract: We present a matrix method for determining the imaginary axis eigenvalues of a delay diffe...
International audienceThis work focus on the asymptotic behavior of critical roots of linear time-de...
AbstractIn this work we present a new method to compute the delays of delay-differential equations (...
International audienceWe contribute to the perturbation theory of nonlinear eigenvalue problems in t...
We contribute to the perturbation theory of nonlinear eigenvalue problems in three ways. First, we e...
International audienceThis paper presents a systematic method to analyse the stability of systems wi...
We investigate the relationships between the infinitely many characteristic zeros (or modes) of line...
International audienceA general class of linear time invariant systems with time delay is studied. R...