International audienceThis note focuses on deriving stability conditions for a class of linear parameter-dependent systems in a state-space representation. More precisely, we will compute the set of parameters for which the characteristic roots are located on the imaginary axis, and next we will give the characterization of the way such critical roots are crossing the imaginary axis. The methodology considered makes use of the computation of the generalized eigenvalues of an appropriate matrix pencil combined with an operator perturbation approach for deriving the crossing direction. Finally, the particular case of parameter-dependent polynomials will be also considered, and the stability analysis of time-delay systems is also revisited in ...
International audienceIn this note, we study the stability properties of linear neutral delay system...
International audienceThis paper studies the stability of 2-D dynamic systems. We consider systems c...
International audienceThis paper presents an application of the eigenvalue series developed in Part ...
International audienceThis note focuses on deriving stability conditions for a class of linear param...
International audienceIn this paper we present a stability analysis approach for polynomially-depend...
International audienceThis two-part paper is concerned with stability analysis of linear systems sub...
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 ...
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...
International audienceThis note focuses on the stability and hyperbolicity problems for a class of l...
International audienceThis paper focuses on the stability of some class of delay systems including u...
International audienceThis paper studies the stability of 2-D dynamic systems. We consider systems c...
International audienceStability of systems with a single delay and delay-dependent coefficients is s...
International audienceIn this note, we study the stability properties of linear neutral delay system...
International audienceThis paper studies the stability of 2-D dynamic systems. We consider systems c...
International audienceThis paper presents an application of the eigenvalue series developed in Part ...
International audienceThis note focuses on deriving stability conditions for a class of linear param...
International audienceIn this paper we present a stability analysis approach for polynomially-depend...
International audienceThis two-part paper is concerned with stability analysis of linear systems sub...
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 ...
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...
International audienceThis note focuses on the stability and hyperbolicity problems for a class of l...
International audienceThis paper focuses on the stability of some class of delay systems including u...
International audienceThis paper studies the stability of 2-D dynamic systems. We consider systems c...
International audienceStability of systems with a single delay and delay-dependent coefficients is s...
International audienceIn this note, we study the stability properties of linear neutral delay system...
International audienceThis paper studies the stability of 2-D dynamic systems. We consider systems c...
International audienceThis paper presents an application of the eigenvalue series developed in Part ...