Local lagrange interpolation with cubic C1 splines on tetrahedral partitions
Journal of Approximation Theory
Dimension of C1-splines on type-6 tetrahedral partitions
Journal of Approximation Theory
Local Lagrange interpolation using cubic C1 splines on type-4 cube partitions
Journal of Approximation Theory
| Hi-index | 7.29 |
We develop a Lagrange interpolation method for quintic C^1 splines on cube partitions with 24 tetrahedra in each cube. The construction of the interpolation points is based on a new priority principle by decomposing the tetrahedral partition into special classes of octahedra such that no tetrahedron has to be refined. It follows that the interpolation method is local and stable, and has optimal approximation order six and linear complexity. The interpolating splines are uniquely determined by data values, but no derivatives are needed.