Rational Chebyshev collocation method for solving higher-order linear ordinary differential equations

## Abstract In this article, a collocation method is developed to find an approximate solution of higher order linear complex differential equations with variable coefficients in rectangular domains. This method is essentially based on the matrix representations of the truncated Taylor series of th

## Abstract There have been many numerical solution approaches to ordinary differential equations in the literature. However, very few are effective in solving non‐linear ordinary differential equations (ODEs), particularly when they are of order higher than one. With modern symbolic calculation pa

## Abstract A numerical method for solving two‐point boundary value problems associated with systems of first‐order nonlinear ordinary differential equations is described. It needs three function evaluations for each sub‐interval and is of order O(__h__^7^), where __h__ is the space chop. Results o

A numerical method based on the Taylor polynomials is introduced in this article for the approximate solution of the pantograph equations with constant and variable coefficients. Some numerical examples, which consist of the initial conditions, are given to show the properties of the method.