Approximation orders for interpolation by surface splines to rough functions

Abstract

In this paper we consider the approximation of functions by radial basic function interpolants. There is a plethora of results about the asymptotic behaviour of the error between appropriately smooth functions and their interpolants, as the interpolation points fill out a bounded domain in R d. In all of these cases, the analysis takes place in a natural function space dictated by the choice of radial basic function - the native space. In many cases, the native space contains functions possessing a certain amount of smoothness. We address the question of what can be said about these error estimates when the function being interpolated fails to have the required smoothness. These are the rough functions of the title. We limit our discussion to surface splines, as an example of a wider class of radial basic functions, because we feel our techniques are most easily seen and understood in this setting.