Quadrature rules for splines of high smoothness on uniformly refined triangles
Abstract
In this paper, we identify families of quadrature rules that are exact for sufficiently smooth spline spaces on uniformly refined triangles in R2. Given any symmetric quadrature rule on a triangle T that is exact for polynomials of a specific degree d, we investigate if it remains exact for sufficiently smooth splines of the same degree d defined on the Clough-Tocher 3-split or the (uniform) Powell-Sabin 6-split of T. We show that this is always true for C2r-1 splines having degree d=3r on the former split or d=2r on the latter split, for any positive integer r. Our analysis is based on the representation of the considered spline spaces in terms of suitable simplex splines.
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