Filling polygonal holes with minimal energy surfaces on Powell–Sabin type triangulations

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摘要

In this paper we present two different methods for filling in a hole in an explicit 3D surface, defined by a smooth function f in a part of a polygonal domain D⊂R2. We obtain the final reconstructed surface over the whole domain D. We do the filling in two different ways: discontinuous and continuous. In the discontinuous case, we fill the hole with a function in a Powell–Sabin spline space that minimizes a linear combination of the usual seminorms in an adequate Sobolev space, and approximates (in the least squares sense) the values of f and those of its normal derivatives at an adequate set of points. In the continuous case, we will first replace f outside the hole by a smoothing bivariate spline sf, and then we fill the hole also with a Powell–Sabin spline minimizing a linear combination of given seminorms. In both cases, we obtain existence and uniqueness of solutions and we present some graphical examples, and, in the continuous case, we also give a local convergence result.

论文关键词:Filling holes,Minimal energy,Powell–Sabin,α-triangulation,Finite element

论文评审过程:Received 1 October 2008, Revised 13 April 2009, Available online 23 April 2009.

论文官网地址:https://doi.org/10.1016/j.cam.2009.04.012