On the Alekseev-Gröbner formula in Banach spaces (Q2321118)

The Alekseev-Grobner formula is a well known tool in deterministic numerical analysis for describing the effect that a perturbation of an ordinary differential equation has on its solution. Considering numerical methods for ordinary differential equations as appropriate perturbations of the underlying equations makes the Alekseev-Grobner formula applicable for estimating errors of numerical methods. It is the main contribution of this work to provide an extension of the Alekseev-Grobner formula for Banach space valued ordinary differential equations under mild conditions on the perturbation of the considered ordinary differential equations.