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CAGD
2005

A variational approach to spline curves on surfaces

13 years 11 months ago
A variational approach to spline curves on surfaces
Given an m-dimensional surface in Rn , we characterize parametric curves in , which interpolate or approximate a sequence of given points pi and minimize a given energy functional. As energy functionals we study familiar functionals from spline theory, which are linear combinations of L2 norms of certain derivatives. The characterization of the solution curves is similar to the well-known unrestricted case. The counterparts to cubic splines on a given surface, defined as interpolating curves minimizing the L2 norm of the second derivative, are C2 ; their segments possess fourth derivative vectors, which are orthogonal to ; at an end point, the second derivative is orthogonal to . Analogously, we characterize counterparts to splines in tension, quintic C4 splines and smoothing splines. On very special surfaces, some spline segments can be determined explicitly. In general, the computation has to be based on numerical optimization.
Helmut Pottmann, Michael Hofer
Added 15 Dec 2010
Updated 15 Dec 2010
Type Journal
Year 2005
Where CAGD
Authors Helmut Pottmann, Michael Hofer
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