Approximation in FEM, DG and IGA: A Theoretical Comparison

Abstract

In this paper we compare approximation properties of degree p spline spaces with different numbers of continuous derivatives. We prove that, for a given space dimension, p-1 splines provide better a priori error bounds for the approximation of functions in Hp+1(0,1). Our result holds for all practically interesting cases when comparing p-1 splines with -1 (discontinuous) splines. When comparing p-1 splines with 0 splines our proof covers almost all cases for p 3, but we can not conclude anything for p=2. The results are generalized to the approximation of functions in Hq+1(0,1) for q<p, to broken Sobolev spaces and to tensor product spaces.