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Optimal Lagrange interpolation by quartic splines on triangulations

✍ Scribed by C.K. Chui; G. Hecklin; G. Nürnberger; F. Zeilfelder

Publisher
Elsevier Science
Year
2008
Tongue
English
Weight
333 KB
Volume
216
Category
Article
ISSN
0377-0427

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✦ Synopsis

We develop a local Lagrange interpolation scheme for quartic C 1 splines on triangulations. Given an arbitrary triangulation , we decompose into pairs of neighboring triangles and add "diagonals" to some of these pairs. Only in exceptional cases, a few triangles are split. Based on this simple refinement of , we describe an algorithm for constructing Lagrange interpolation points such that the interpolation method is local, stable and has optimal approximation order. The complexity for computing the interpolating splines is linear in the number of triangles. For the local Lagrange interpolation methods known in the literature, about half of the triangles have to be split.

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