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TW 359

J. Maes, E. Vanraes, P. Dierckx, A. Bultheel
On the stability of normalized Powell-Sabin B-splines

Abstract

In this paper we show that the normalized Powell-Sabin B-splines form a stable basis for the max norm. The approximation constants depend only on the smallest angle in the underlying triangulation. Because the B-splines refer to the size of the Powell-Sabin triangles, we have that small Powell-Sabin triangles correspond to better approximation constants than big Powell-Sabin triangles. Next, in addition to the max norm, we treat the L_p norm. Here the approximation constants depend also on a fraction proper to the triangulation. Finally, as a special case, we consider the B-spline bases obtained from Powell-Sabin triangles with minimal area and pay extra attention to the approximation constants for the max norm.