We apply the pseudospectral discretization approach to nonlinear delay models described by delay differential equations, renewal equations or systems of coupled renewal equations and delay differential equations. The aim is to derive ordinary differential equations and to investigate the stability and bifurcation of equilibria of the original model by available software packages for continuation and bifurcation for ordinary differential equations. Theoretical and numerical results confirm the effectiveness and the versatility of the approach, opening a new perspective for the bifurcation analysis of delay equations, in particular coupled renewal and delay differential equations
Many problems of growing interest in science, engineering, biology, and medicine are modeled with sy...
AbstractThis work represents Hopf bifurcation analysis of a general non-linear differential equation...
A formal framework for the analysis of Hopf bifurcations in delay differential equations with a sing...
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...
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...
Many mathematical models of population dynamics are formulated as Volterra integral equations couple...
We show, by way of an example, that numerical bifurcation tools for ODE yield reliable bifurcation d...
We propose an approximation of nonlinear renewal equations by means of ordinary differential equatio...
In this paper we study the pseudospectral approximation of delay differential equations formulated a...
Pseudospectral approximation reduces delay differential equations (DDE) to ordinary differential equ...
This is the author accepted manuscript. The final version is available from the publisher via the DO...
AbstractWe present a numerical technique for the stability analysis and the computation of branches ...
AbstractNumerical methods for the bifurcation analysis of delay differential equations (DDEs) have o...
Many problems of growing interest in science, engineering, biology, and medicine are modeled with sy...
AbstractThis work represents Hopf bifurcation analysis of a general non-linear differential equation...
A formal framework for the analysis of Hopf bifurcations in delay differential equations with a sing...
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...
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...
Many mathematical models of population dynamics are formulated as Volterra integral equations couple...
We show, by way of an example, that numerical bifurcation tools for ODE yield reliable bifurcation d...
We propose an approximation of nonlinear renewal equations by means of ordinary differential equatio...
In this paper we study the pseudospectral approximation of delay differential equations formulated a...
Pseudospectral approximation reduces delay differential equations (DDE) to ordinary differential equ...
This is the author accepted manuscript. The final version is available from the publisher via the DO...
AbstractWe present a numerical technique for the stability analysis and the computation of branches ...
AbstractNumerical methods for the bifurcation analysis of delay differential equations (DDEs) have o...
Many problems of growing interest in science, engineering, biology, and medicine are modeled with sy...
AbstractThis work represents Hopf bifurcation analysis of a general non-linear differential equation...
A formal framework for the analysis of Hopf bifurcations in delay differential equations with a sing...