A \(C^r\) trivariate macro-element based on the Alfeld split of tetrahedra
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Publication:741100
DOI10.1016/j.jat.2013.07.013zbMath1300.41006OpenAlexW2065196236MaRDI QIDQ741100
Publication date: 10 September 2014
Published in: Journal of Approximation Theory (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jat.2013.07.013
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Cites Work
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- Intrinsic supersmoothness of multivariate splines
- A trivariate Clough-Tocher scheme for tetrahedral data
- An \(n\)-dimensional Clough-Tocher interpolant
- A trivariate Powell-Sabin interpolant
- Polynomial approximation on tetrahedrons in the finite element method
- A \(C^r\) trivariate macro-element based on the Worsey-Farin split of a tetrahedron
- A \(C^2\) trivariate macro-element based on the Clough-Tocher-split of a tetrahedron
- Trivariate \(C^{r}\) polynomial macroelements
- Trivariate Local Lagrange Interpolation and Macro Elements of Arbitrary Smoothness
- Spline Functions on Triangulations
- A Nodal Basis for C 1 Piecewise Polynomials of Degree n ≥5
- Macro-elements and stable local bases for splines on Powell-Sabin triangulations
- A $C^2$ Trivariate Macroelement Based on the Worsey--Farin Split of a Tetrahedron
- Macro-elements and stable local bases for splines on Clough-Tocher triangulations
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