Add to ORKGPeriodic Differential Equations: An Introduction to Mathieu, Lamé, and Allied Functions covers the fundamental problems and techniques of solution of periodic differential equations. This book is composed of 10 chapters that present important equations and the special functions they generate, ranging from Mathieu's equation to the intractable ellipsoidal wave equation.This book starts with a survey of the main problems related to the formation of periodic differential equations. The subsequent chapters deal with the general theory of Mathieu's equation, Mathieu functions of integral order, an
Abstract. In this paper boundary value problem method and initial value problem method for periodic ...
This book is an introduction to the problem of the existence of solutions to some type of semilinear...
summary:Some linear and weakly nonlinear partial differential equations with Dirichlet boundary cond...
International audienceWe propose two methods to find analytic periodic approximations intended for d...
Consider a second order differential linear periodic equation. The periodic coefficient is an approx...
The utility of the Laplace transformation (and other forms of operational mathematics) for the solut...
The Mathieu equation $X^n$ +(a–2q cos2t)x=0 has been studied in great detail since its discovery in...
AbstractWe introduce a method to obtain explicitly periodic solutions of some types of functional di...
This thesis is devoted to the construction of periodic solutions for partial differential equations....
The thesis deals with periodic solutions of ordinary differential equations and examining of their s...
Abstract: We consider a second-order differential equation containing a large parameter. S...
Ordinary differential equations of various types appear in the mathematical modelling in mechanics. ...
This thesis presents new numerical methods for solving differential equations with periodicity. Sp...
The equation \[x''(t)=a(t,x(t))+b(t,x)+d(t,x)e(x'(t))\] is considered, where $a:\mathbb{R}^2\to\math...
A new definition of a guiding function for functional differential equations is given, which is some...
Abstract. In this paper boundary value problem method and initial value problem method for periodic ...
This book is an introduction to the problem of the existence of solutions to some type of semilinear...
summary:Some linear and weakly nonlinear partial differential equations with Dirichlet boundary cond...
International audienceWe propose two methods to find analytic periodic approximations intended for d...
Consider a second order differential linear periodic equation. The periodic coefficient is an approx...
The utility of the Laplace transformation (and other forms of operational mathematics) for the solut...
The Mathieu equation $X^n$ +(a–2q cos2t)x=0 has been studied in great detail since its discovery in...
AbstractWe introduce a method to obtain explicitly periodic solutions of some types of functional di...
This thesis is devoted to the construction of periodic solutions for partial differential equations....
The thesis deals with periodic solutions of ordinary differential equations and examining of their s...
Abstract: We consider a second-order differential equation containing a large parameter. S...
Ordinary differential equations of various types appear in the mathematical modelling in mechanics. ...
This thesis presents new numerical methods for solving differential equations with periodicity. Sp...
The equation \[x''(t)=a(t,x(t))+b(t,x)+d(t,x)e(x'(t))\] is considered, where $a:\mathbb{R}^2\to\math...
A new definition of a guiding function for functional differential equations is given, which is some...
Abstract. In this paper boundary value problem method and initial value problem method for periodic ...
This book is an introduction to the problem of the existence of solutions to some type of semilinear...
summary:Some linear and weakly nonlinear partial differential equations with Dirichlet boundary cond...