A Posteriori Error Estimator for a Non-Standard Finite Difference Scheme Applied to BVPs on Infinite Intervals
It provides a practical error estimation method for numerical solutions of boundary value problems on infinite intervals, though the result is incremental.
This paper develops an a posteriori error estimator for a non-standard finite difference scheme on infinite intervals, showing that Richardson's extrapolation provides an upper bound for the global error when grids are fine and round-off error is negligible.
In this paper, we present a study of an a posteriori estimator for the discretization error of a non-standard finite difference scheme applied to boundary value problems defined on an infinite interval. In particular, we show how Richardson's extrapolation can be used to improve the numerical solution involving the order of accuracy and numerical solutions from two nested quasi-uniform grids. A benchmark problem is examined for which the exact solution is known and we get the following result: if the round-off error is negligible and the grids are sufficiently fine then the Richardson's error estimate gives an upper bound of the global error.