In this paper, we present a new method for computing the pseudospectra of delay differential equations (DDEs) with fixed finite delay. This provides information on the sensitivity of eigenvalues under arbitrary perturbations of a given size, and hence insight into how stability may change under variation of parameters. We also investigate how differently weighted perturbations applied to the individual matrices of the delayed eigenvalue problem affect the pseudospectra. Furthermore, we compute pseudospectra of the infinitesimal generator of the DDE, from which a lower bound on the maximum transient growth can be inferred. To illustrate our method, we consider a DDE modelling a semiconductor laser subject to external feedback. © 2005 Elsevie...
iii Analysis of stability for delay differential equations (DDEs) is a tool in a va-riety of fields ...
In this paper we introduce structured pseudospectra for nonlinear eigenvalue problems and derive com...
We apply the pseudospectral discretization approach to nonlinear delay models described by delay dif...
In this paper, we present a new method for computing the pseudospectra of delay differential equatio...
AbstractIn this paper, we present a new method for computing the pseudospectra of delay differential...
This paper deals with the computation of pseudospectra of neutral delay differential equations (NDDE...
This book presents the authors' recent work on the numerical methods for the stability analysis of l...
This book presents the authors' recent work on the numerical methods for the stability analysis of l...
International audienceDefinitions for pseudospectra of an analytic matrix function are given, where ...
AbstractDefinitions for pseudospectra and stability radii of an analytic matrix function are given, ...
In the recent years the authors developed numerical schemes to detect the stability properties of di...
Many problems of growing interest in science, engineering, biology, and medicine are modeled with sy...
Pseudospectral approximation reduces delay differential equations (DDE) to ordinary differential equ...
In this paper we study the pseudospectral approximation of delay differential equations formulated a...
Special Issue on Numerical Methods for Time-Delay SystemsA continuous dynamical system is stable if ...
iii Analysis of stability for delay differential equations (DDEs) is a tool in a va-riety of fields ...
In this paper we introduce structured pseudospectra for nonlinear eigenvalue problems and derive com...
We apply the pseudospectral discretization approach to nonlinear delay models described by delay dif...
In this paper, we present a new method for computing the pseudospectra of delay differential equatio...
AbstractIn this paper, we present a new method for computing the pseudospectra of delay differential...
This paper deals with the computation of pseudospectra of neutral delay differential equations (NDDE...
This book presents the authors' recent work on the numerical methods for the stability analysis of l...
This book presents the authors' recent work on the numerical methods for the stability analysis of l...
International audienceDefinitions for pseudospectra of an analytic matrix function are given, where ...
AbstractDefinitions for pseudospectra and stability radii of an analytic matrix function are given, ...
In the recent years the authors developed numerical schemes to detect the stability properties of di...
Many problems of growing interest in science, engineering, biology, and medicine are modeled with sy...
Pseudospectral approximation reduces delay differential equations (DDE) to ordinary differential equ...
In this paper we study the pseudospectral approximation of delay differential equations formulated a...
Special Issue on Numerical Methods for Time-Delay SystemsA continuous dynamical system is stable if ...
iii Analysis of stability for delay differential equations (DDEs) is a tool in a va-riety of fields ...
In this paper we introduce structured pseudospectra for nonlinear eigenvalue problems and derive com...
We apply the pseudospectral discretization approach to nonlinear delay models described by delay dif...