论文信息 - Curve subdivision with arc-length control

Curve subdivision with arc-length control

In this paper we present a new nonstationary, interpolatory, curve subdivision scheme. We show that the scheme converges and the subdivision curve is continuous. Moreover, starting with the chord length parametrization of the initial polygon, we obtain a subdivision curve parametrized by a multiple of the arc-length. The proposed method focuses on convexity preservation, limiting the oscillations of the subdivision curve and avoiding artifacts. A bound for the Hausdorff distance between the limit curve and the initial polygon is also obtained.

[1] Peter Schröder,et al. A multiresolution framework for variational subdivision , 1998, TOGS.

[2] Gilles Deslauriers,et al. Symmetric iterative interpolation processes , 1989 .

[3] Xunnian Yang. Normal based subdivision scheme for curve design , 2006, Comput. Aided Geom. Des..

[4] Nira Dyn,et al. Geometrically Controlled 4-Point Interpolatory Schemes , 2005, Advances in Multiresolution for Geometric Modelling.

[5] Nira Dyn,et al. A 4-point interpolatory subdivision scheme for curve design , 1987, Comput. Aided Geom. Des..

[6] Neil A. Dodgson,et al. Advances in Multiresolution for Geometric Modelling , 2005 .

[7] Nira Dyn,et al. Four-point curve subdivision based on iterated chordal and centripetal parameterizations , 2009, Comput. Aided Geom. Des..

[8] S. Dubuc. Interpolation through an iterative scheme , 1986 .

[9] Bert Jüttler,et al. A non-linear circle-preserving subdivision scheme , 2007, Adv. Comput. Math..