Extended backward differentiation formulae in the numerical solution of general Volterra integro-differential equations

The numerical solution of first order Voiterra integro-differential equations of neutral type with continuous kernel is considered. Preliminary results from the application of extended backward differentiation methods are given and comparisons are made with Adams-Bashforth / Adams-Moulton predictor-

The numerical stability of the Backward Di erentiation methods for linear systems of Volterra integro-di erential equations with convolution kernel whose logarithmic norm is nonpositive, is analyzed.

In this paper, numerical solution of Volterra integro-differential equation by means of the Sinc collocation method is considered. Convergence analysis is given, it is shown that the Sinc solution produces an error of order O e Àk ffiffi ffi where k > 0 is a constant. This approximation reduces the

The aim of this paper is to present an efficient analytical and numerical procedure for solving the high-order nonlinear Volterra-Fredholm integro-differential equations. Our method depends mainly on a Taylor expansion approach. This method transforms the integro-differential equation and the given