Pseudospectral approximation reduces delay differential equations (DDE) to ordinary differential equations (ODE). Next one can use ODE tools to perform a numerical bifurcation analysis. By way of an example we show that this yields an efficient and reliable method to qualitatively as well as quantitatively analyze certain DDE. To substantiate the method, we next show that the structure of the approximating ODE is reminiscent of the structure of the generator of translation along solutions of the DDE. Concentrating on the Hopf bifurcation, we then exploit this similarity to reveal the connection between DDE and ODE bifurcation coefficients and to prove the convergence of the latter to the former when the dimension approaches infinity
AbstractWe are interested in nonlinear delay differential equations which have a Hopf bifurcation. W...
This work concerns the occurrence of Hopf bifurcations in delay differential equations (DDE). Such b...
We are interested in equations of the form y 0 (t) = f(y(t); y(t \Gamma ø )): (z) In recent work ...
Pseudospectral approximation reduces delay differential equations (DDE) to ordinary differential equ...
AbstractIn this paper we consider the numerical solution of delay differential equations (DDEs) unde...
We apply the pseudospectral discretization approach to nonlinear delay models described by delay dif...
We apply the pseudospectral discretization approach to nonlinear delay models described by delay dif...
In this paper we study the pseudospectral approximation of delay differential equations formulated a...
We address the problem of the numerical bifurcation analysis of general nonlinear delay equations, i...
We address the problem of the numerical bifurcation analysis of general nonlinear delay equations, i...
We propose an approximation of nonlinear renewal equations by means of ordinary differential equatio...
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...
In [D. Breda, S. Maset, and R. Vermiglio, IMA J. Numer. Anal., 24 (2004), pp. 1\u2013 19.] and [D. B...
A formal framework for the analysis of Hopf bifurcations in delay differential equations with a sing...
AbstractWe are interested in nonlinear delay differential equations which have a Hopf bifurcation. W...
This work concerns the occurrence of Hopf bifurcations in delay differential equations (DDE). Such b...
We are interested in equations of the form y 0 (t) = f(y(t); y(t \Gamma ø )): (z) In recent work ...
Pseudospectral approximation reduces delay differential equations (DDE) to ordinary differential equ...
AbstractIn this paper we consider the numerical solution of delay differential equations (DDEs) unde...
We apply the pseudospectral discretization approach to nonlinear delay models described by delay dif...
We apply the pseudospectral discretization approach to nonlinear delay models described by delay dif...
In this paper we study the pseudospectral approximation of delay differential equations formulated a...
We address the problem of the numerical bifurcation analysis of general nonlinear delay equations, i...
We address the problem of the numerical bifurcation analysis of general nonlinear delay equations, i...
We propose an approximation of nonlinear renewal equations by means of ordinary differential equatio...
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...
In [D. Breda, S. Maset, and R. Vermiglio, IMA J. Numer. Anal., 24 (2004), pp. 1\u2013 19.] and [D. B...
A formal framework for the analysis of Hopf bifurcations in delay differential equations with a sing...
AbstractWe are interested in nonlinear delay differential equations which have a Hopf bifurcation. W...
This work concerns the occurrence of Hopf bifurcations in delay differential equations (DDE). Such b...
We are interested in equations of the form y 0 (t) = f(y(t); y(t \Gamma ø )): (z) In recent work ...