AbstractSolutions of differential equations are derived by a recursive procedure. For partial differential equations this solution can be transformed to an operator expression. Stronger conditions than in other solution procedures are required to solve the initial-value or boundary value problem. Examples are given, where this method is more favorable than others
For many applied problems it is practically impossible to obtain the exact solution of differential ...
An operator is a symbol for an operation upon a function called the object function. The result of t...
After a brief review of elementary ODE techniques and discussions on Fourier series and Sturm-Liouvi...
AbstractSolutions of differential equations are derived by a recursive procedure. For partial differ...
AbstractWe consider the solution of partial differential equations for initial/boundary conditions u...
The paper deals with solving the partial differential equations by the old and well known "anal...
AbstractReference [1] showed that in partial differential equation problems involving linear operato...
This chapter runs through some techniques that can be used to tackle partial differential equations ...
Differential equations, especially nonlinear, present the most effective way for describing complex ...
A first order linear partial differential equation in two independent variables, involving a partial...
This textbook describes rules and procedures for the use of Differential Operators (DO) in Ordinary ...
We give an operator solution to an advanced-retarded differential equation. The application of the o...
The goal of this work is to introduce some elementary methods of solving ordinary differential equat...
Includes bibliographical references (p. 245-249) and index.Theory of differential equations: an intr...
AbstractWe give a survey of some methods for finding formal solutions of differential equations. The...
For many applied problems it is practically impossible to obtain the exact solution of differential ...
An operator is a symbol for an operation upon a function called the object function. The result of t...
After a brief review of elementary ODE techniques and discussions on Fourier series and Sturm-Liouvi...
AbstractSolutions of differential equations are derived by a recursive procedure. For partial differ...
AbstractWe consider the solution of partial differential equations for initial/boundary conditions u...
The paper deals with solving the partial differential equations by the old and well known "anal...
AbstractReference [1] showed that in partial differential equation problems involving linear operato...
This chapter runs through some techniques that can be used to tackle partial differential equations ...
Differential equations, especially nonlinear, present the most effective way for describing complex ...
A first order linear partial differential equation in two independent variables, involving a partial...
This textbook describes rules and procedures for the use of Differential Operators (DO) in Ordinary ...
We give an operator solution to an advanced-retarded differential equation. The application of the o...
The goal of this work is to introduce some elementary methods of solving ordinary differential equat...
Includes bibliographical references (p. 245-249) and index.Theory of differential equations: an intr...
AbstractWe give a survey of some methods for finding formal solutions of differential equations. The...
For many applied problems it is practically impossible to obtain the exact solution of differential ...
An operator is a symbol for an operation upon a function called the object function. The result of t...
After a brief review of elementary ODE techniques and discussions on Fourier series and Sturm-Liouvi...
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