A simple manifold-based construction of surfaces of arbitrary smoothness

We present a smooth surface construction based on the manifold approach of Grimm and Hughes. We demonstrate how this approach can relatively easily produce a number of desirable properties which are hard to achieve simultaneously with polynomial patches, subdivision or variational surfaces. Our surfaces are C∞-continuous with explicit nonsingular C∞ parameterizations, high-order flexible at control vertices, depend linearly on control points, have fixed-size local support for basis functions, and have good visual quality.

[1]  O. Bruno,et al.  A fast, high-order algorithm for the solution of surface scattering problems: basic implementation, tests, and applications , 2001 .

[2]  Ulrich Reif,et al.  Degenerate Bézier patches with continuous curvature , 1997, Comput. Aided Geom. Des..

[3]  Dinesh K. Pai,et al.  ArtDefo: accurate real time deformable objects , 1999, SIGGRAPH.

[4]  Jos Stam,et al.  Flows on surfaces of arbitrary topology , 2003, ACM Trans. Graph..

[5]  Thomas Hermann,et al.  G2 interpolation of free form curve networks by biquintic Gregory patches , 1996, Comput. Aided Geom. Des..

[6]  Tony DeRose,et al.  A multisided generalization of Bézier surfaces , 1989, TOGS.

[7]  John F. Hughes,et al.  Parameterizing N-Holed Tori , 2003, IMA Conference on the Mathematics of Surfaces.

[8]  Josep Cotrina Navau,et al.  Modeling surfaces from meshes of arbitrary topology , 2000, Comput. Aided Geom. Des..

[9]  Tianjun Wang,et al.  A C2-quintic spline interpolation scheme on triangulation , 1992, Comput. Aided Geom. Des..

[10]  Jos Stam,et al.  Exact evaluation of Catmull-Clark subdivision surfaces at arbitrary parameter values , 1998, SIGGRAPH.

[11]  Jörg Peters,et al.  Patching Catmull-Clark meshes , 2000, SIGGRAPH.

[12]  Cindy Grimm Simple Manifolds for Surface Modeling and Parameterization , 2002, Shape Modeling International.

[13]  S. Yau,et al.  Global conformal surface parameterization , 2003 .

[14]  Jörg Peters,et al.  C2 free-form surfaces of degree (3, 5) , 2002, Comput. Aided Geom. Des..

[15]  Jörg Peters,et al.  Curvature continuous spline surfaces over irregular meshes , 1996, Comput. Aided Geom. Des..

[16]  Hartmut Prautzsch,et al.  Freeform splines , 1997, Computer Aided Geometric Design.

[17]  U. Reif TURBS—Topologically Unrestricted Rational B-Splines , 1998 .

[18]  J. Warren,et al.  Subdivision methods for geometric design , 1995 .

[19]  W. Stuetzle,et al.  HIERARCHICAL COMPUTATION OF PL HARMONIC EMBEDDINGS , 1997 .

[20]  John F. Hughes,et al.  Modeling surfaces of arbitrary topology using manifolds , 1995, SIGGRAPH.