This thesis extends the basic ordinary differential equations (ODE) course, specifically considering perturbations of ODEs. We introduce uniformly asympto- tic approximation and uniformly ordered approximation. We provide a perturba- tion-based method of computing derivatives of ODE solutions with respect to: an initial value, a parameter, and initial time. We present the method of averaging, error estimate, and a theorem about the existence and stability of a periodic so- lution to ODEs in periodic standard form. Furthermore, we apply the method of averaging to determine the period of a periodic solution of Duffing equation without forcing or damping. All the terms and methods of perturbation theory used in the thesis are accompanied with ...
We prove a periodic averaging theorem for generalized ordinary differential equations and show that ...
AbstractHere we solve singularly perturbed periodic problems in ordinary differential equations when...
The question discussed in this study concerns one of the most helpful approximation methods, namely,...
Differential equations can be divided into those that can be solved and those that cannot. The first...
A nonstandard approach to averaging theory for ordinary differential equations and functional differ...
A nonstandard approach to averaging theory for ordinary differential equations and functional differ...
Approximate Analytical Methods for Solving Ordinary Differential Equations (ODEs) is the first book ...
In this thesis we construct a perturbation method for delay differential equations (DDEs) based on t...
The thesis deals with periodic solutions of ordinary differential equations and examining of their s...
We provide an explicit expression for the solutions of the perturbed first order differential equati...
The article is devoted to the determination of second-order perturbations in rectangular coordinates...
The main purpose of this chapter is to describe the application of perturbation expansion techniques...
International audienceSince the founding theory established by G. Floquet more than a hundred years ...
This book is an introductory graduate text dealing with many of the perturbation methods currently u...
AbstractA perturbation theorem is proved for ordinary differential equations whose righthand side de...
We prove a periodic averaging theorem for generalized ordinary differential equations and show that ...
AbstractHere we solve singularly perturbed periodic problems in ordinary differential equations when...
The question discussed in this study concerns one of the most helpful approximation methods, namely,...
Differential equations can be divided into those that can be solved and those that cannot. The first...
A nonstandard approach to averaging theory for ordinary differential equations and functional differ...
A nonstandard approach to averaging theory for ordinary differential equations and functional differ...
Approximate Analytical Methods for Solving Ordinary Differential Equations (ODEs) is the first book ...
In this thesis we construct a perturbation method for delay differential equations (DDEs) based on t...
The thesis deals with periodic solutions of ordinary differential equations and examining of their s...
We provide an explicit expression for the solutions of the perturbed first order differential equati...
The article is devoted to the determination of second-order perturbations in rectangular coordinates...
The main purpose of this chapter is to describe the application of perturbation expansion techniques...
International audienceSince the founding theory established by G. Floquet more than a hundred years ...
This book is an introductory graduate text dealing with many of the perturbation methods currently u...
AbstractA perturbation theorem is proved for ordinary differential equations whose righthand side de...
We prove a periodic averaging theorem for generalized ordinary differential equations and show that ...
AbstractHere we solve singularly perturbed periodic problems in ordinary differential equations when...
The question discussed in this study concerns one of the most helpful approximation methods, namely,...