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Michael A. Matt constructs two trivariate local Lagrange interpolation methods which yield optimal approximation order and C r macro-elements based on the Alfeld and the Worsey-Farin split of a tetrahedral partition. The first interpolation method is based on cubic C 1 splines over type-4 cube partitions, for which numerical tests are given. The second is the first trivariate Lagrange interpolation method using C 2 splines. It is based on arbitrary tetrahedral partitions using splines of degree nine. The author constructs trivariate macro-elements based on the Alfeld split, where each tetrahedron is divided into four subtetrahedra, and the Worsey-Farin split, where each tetrahedron is divided into twelve subtetrahedra, of a tetrahedral partition. In order to obtain the macro-elements based on the Worsey-Farin split minimal determining sets for C r macro-elements are constructed over the Clough-Tocher split of a triangle, which are more variable than those in the literature.

Trivariate Local Lagrange Interpolation and Macro Elements of Arbitrary Smoothness

Lagrange Interpolation on Type-4 Partitions.- Trivariate Lagrange Interpolation with C2 Splines.- C^r Macro-Element over the Clough-Tocher Split.- C^r Macro-Element over the Alfeld Split.- C^r Macro-Element over the Worsey Farin Split.