Several recent methods used to analyze asymptotic stability of delay-differential equations (DDEs) involve determining the eigenvalues of a matrix, a matrix pencil or a matrix polynomial constructed by Kronecker products. Despite some similarities between the different types of these so-called matrix pencil methods, the general ideas used as well as the proofs differ considerably. Moreover, the available theory hardly reveals the relations between the different methods. In this work, a different derivation of various matrix pencil methods is presented using a unifying framework of a new type of eigenvalue problem: the polynomial two-parameter eigenvalue problem, of which the quadratic two-parameter eigenvalue problem is a special case. This...
International audienceThis two-part paper is concerned with stability analysis of linear systems sub...
International audienceWe contribute to the perturbation theory of nonlinear eigenvalue problems in t...
The eigenvalues and the stability of a singular neutral differential system with single delay are co...
Several recent methods used to analyze asymptotic stability of delay-differential equations (DDEs) i...
AbstractSeveral recent methods used to analyze asymptotic stability of delay-differential equations ...
AbstractIn this work we present a new method to compute the delays of delay-differential equations (...
International audienceThis note focuses on the stability and hyperbolicity problems for a class of l...
This note focuses on the problem of asymptotic stability and hyperbolicity of a class of linear syst...
This paper focuses on the problem of asymptotic stability of a linear system described by delay-diff...
We propose Jacobi-Davidson type methods for polynomial two-parameter eigenvalue problems (PMEP). Suc...
Abstract In this paper, we study the finite time stability of delay differential equations via a del...
We contribute to the perturbation theory of nonlinear eigenvalue problems in three ways. First, we e...
Abstract: We present a matrix method for determining the imaginary axis eigenvalues of a delay diffe...
International audienceThis note focuses on deriving stability conditions for a class of linear param...
International audienceThis two-part paper is concerned with stability analysis of linear systems sub...
International audienceWe contribute to the perturbation theory of nonlinear eigenvalue problems in t...
The eigenvalues and the stability of a singular neutral differential system with single delay are co...
Several recent methods used to analyze asymptotic stability of delay-differential equations (DDEs) i...
AbstractSeveral recent methods used to analyze asymptotic stability of delay-differential equations ...
AbstractIn this work we present a new method to compute the delays of delay-differential equations (...
International audienceThis note focuses on the stability and hyperbolicity problems for a class of l...
This note focuses on the problem of asymptotic stability and hyperbolicity of a class of linear syst...
This paper focuses on the problem of asymptotic stability of a linear system described by delay-diff...
We propose Jacobi-Davidson type methods for polynomial two-parameter eigenvalue problems (PMEP). Suc...
Abstract In this paper, we study the finite time stability of delay differential equations via a del...
We contribute to the perturbation theory of nonlinear eigenvalue problems in three ways. First, we e...
Abstract: We present a matrix method for determining the imaginary axis eigenvalues of a delay diffe...
International audienceThis note focuses on deriving stability conditions for a class of linear param...
International audienceThis two-part paper is concerned with stability analysis of linear systems sub...
International audienceWe contribute to the perturbation theory of nonlinear eigenvalue problems in t...
The eigenvalues and the stability of a singular neutral differential system with single delay are co...