International audienceThis two-part paper is concerned with stability analysis of linear systems subject to parameter variations, of which linear time-invariant delay systems are of particular interest. We seek to characterize the asymptotic behavior of the characteristic zeros of such systems. This behavior determines, for example, whether the imaginary zeros cross from one half plane into another, and hence plays a critical role in determining the stability of a system. In Part I of the paper we develop necessary mathematical tools for this study, which focuses on the eigenvalue series of holomorphic matrix operators. While of independent interest, the eigenvalue perturbation analysis has a particular bearing on stability analysis and, in...
International audienceThis note focuses on deriving stability conditions for a class of linear param...
Several recent methods used to analyze asymptotic stability of delay-differential equations (DDEs) i...
International audienceThis paper presents a guided tour of some specific problems encountered in the...
International audienceThis two-part paper is concerned with stability analysis of linear systems sub...
International audienceThis paper presents an application of the eigenvalue series developed in Part ...
International audienceIn this paper we present a stability analysis approach for polynomially-depend...
Abstract: We present a matrix method for determining the imaginary axis eigenvalues of a delay diffe...
International audienceThis paper focuses on the stability of some class of delay systems including u...
International audienceWe contribute to the perturbation theory of nonlinear eigenvalue problems in t...
International audienceA time-delay system may or may not be stable for different periods of delay. W...
We contribute to the perturbation theory of nonlinear eigenvalue problems in three ways. First, we e...
International audienceThis note focuses on deriving stability conditions for a class of linear param...
Several recent methods used to analyze asymptotic stability of delay-differential equations (DDEs) i...
International audienceThis paper presents a guided tour of some specific problems encountered in the...
International audienceThis two-part paper is concerned with stability analysis of linear systems sub...
International audienceThis paper presents an application of the eigenvalue series developed in Part ...
International audienceIn this paper we present a stability analysis approach for polynomially-depend...
Abstract: We present a matrix method for determining the imaginary axis eigenvalues of a delay diffe...
International audienceThis paper focuses on the stability of some class of delay systems including u...
International audienceWe contribute to the perturbation theory of nonlinear eigenvalue problems in t...
International audienceA time-delay system may or may not be stable for different periods of delay. W...
We contribute to the perturbation theory of nonlinear eigenvalue problems in three ways. First, we e...
International audienceThis note focuses on deriving stability conditions for a class of linear param...
Several recent methods used to analyze asymptotic stability of delay-differential equations (DDEs) i...
International audienceThis paper presents a guided tour of some specific problems encountered in the...