Using the method of averaging we analyze periodic solutions to delay-differential equations, where the period is near to the value of the delay time (or a fraction thereof). The difference between the period and the delay time defines the small parameter used in the perturbation method. This allows us to consider problems with arbitrarily size delay times or of the delay term itself. We present a general theory and then apply the method to a specific model that has application in disease dynamics and lasers
AbstractThis work focuses on the existence of quasi-periodic solutions for linear autonomous delay d...
ABSTRACT. Dierent from studying the normal asymptotic periodicity of the solution, a new kind of asy...
The aim of this paper is to generalize the classical theorems on averaging of differential equations...
We prove the existence of an asymptotically stable periodic solution of a system of delay differenti...
Abstract In this chapter, delay differential equations with constant and time-periodic coefficients ...
AbstractThis work discusses the persistence of quasi-periodic solutions for delay differential equat...
A nonlinear differential equation with delay serving as a mathematical model of several applied prob...
In this paper we develop a general computer-assisted proof method for periodic solutions to delay di...
A nonlinear differential equation with delay serving as a mathematical model of several applied pro...
We consider periodic solutions which bifurcate from equilibria in simple population models which inc...
International audienceAn overview of eigenvalue based tools for the stability analysis of linear per...
We consider properties of periodic solutions of the differential-delay system, which models a laser ...
In this thesis we construct a perturbation method for delay differential equations (DDEs) based on t...
In this paper we study the Hopf bifurcation for the tumor-immune system model with one delay. This m...
AbstractThe aim of this paper is to generalize the classical theorems on averaging of differential e...
AbstractThis work focuses on the existence of quasi-periodic solutions for linear autonomous delay d...
ABSTRACT. Dierent from studying the normal asymptotic periodicity of the solution, a new kind of asy...
The aim of this paper is to generalize the classical theorems on averaging of differential equations...
We prove the existence of an asymptotically stable periodic solution of a system of delay differenti...
Abstract In this chapter, delay differential equations with constant and time-periodic coefficients ...
AbstractThis work discusses the persistence of quasi-periodic solutions for delay differential equat...
A nonlinear differential equation with delay serving as a mathematical model of several applied prob...
In this paper we develop a general computer-assisted proof method for periodic solutions to delay di...
A nonlinear differential equation with delay serving as a mathematical model of several applied pro...
We consider periodic solutions which bifurcate from equilibria in simple population models which inc...
International audienceAn overview of eigenvalue based tools for the stability analysis of linear per...
We consider properties of periodic solutions of the differential-delay system, which models a laser ...
In this thesis we construct a perturbation method for delay differential equations (DDEs) based on t...
In this paper we study the Hopf bifurcation for the tumor-immune system model with one delay. This m...
AbstractThe aim of this paper is to generalize the classical theorems on averaging of differential e...
AbstractThis work focuses on the existence of quasi-periodic solutions for linear autonomous delay d...
ABSTRACT. Dierent from studying the normal asymptotic periodicity of the solution, a new kind of asy...
The aim of this paper is to generalize the classical theorems on averaging of differential equations...