A novel *R-based perspective on solving ordinary differential equations

Abstract

The real numbers, it is taught at universities, correspond to our idea of a continuum, although the hyperreal numbers are located ``in between'' the real numbers. The number x + dx, where dx should be an infinitesimal number and x real, is infinitesimally close to x but ``infinitely'' far away from all other real numbers. Analogously: If f'(x0) and f(x0) are given for a differentiable function f:R→R at x0∈R, we can not determine f(x) at any point x∈ R different from x0. These points seem to be ``infinitely'' far away. That is one conceptual problem of solving differential equations in numerical mathematics. In this article, we will present a numerical algorithm to solve very simple initial value problems. However, the change of paradigm is, that we will not ``leave'' the point x0. Solving ordinary differential equations is like searching for ``recipes'' f. Instead of trying to find these recipes for values x∈R, we will learn them from special relations in the ``monad'' of x0.