General Properties of Certain Non-linear Integro-Differential Equations

## Abstract Using a degree‐theoretic result of Granas, a homotopy is constructed enabling us to show that if there is an __a priori__ bound on all possible __T__‐periodic solutions of a Volterra equation, then there is a __T__‐periodic solution. The __a priori__ bound is established by means of a L

This paper is concerned with the numerical solution of a particular non-linear Volterra integro-dierential equation with a weakly singular kernel. The technique of subtracting out singularities is used together with the product integration methods introduced by McKee and Stokes (1983) to obtain high

The spectral method of G. N. Elnagar, which yields spectral convergence rate for the approximate solutions of Fredholm and Volterra-Hammerstein integral equations, is generalized in order to solve the larger class of integro-differential functional operator equations with spectral accuracy. In order

In this study, a practical matrix method is presented to find an approximate solution for high-order linear Fredholm integro-differential equations with piecewise intervals under the initial boundary conditions in terms of Taylor polynomials. The method converts the integro differential equation to