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Spline Approximations of Real Algebraic Surfaces

✍ Scribed by CHANDRAJIT L. BAJAJ; GUOLIANG XU

Publisher
Elsevier Science
Year
1997
Tongue
English
Weight
919 KB
Volume
23
Category
Article
ISSN
0747-7171

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✦ Synopsis

We use a combination of both symbolic and numerical techniques to construct several degree bounded G 0 and G 1 continuous, piecewise spline approximations of real implicit algebraic surfaces for both computer graphics and geometric modeling. These approximations are based upon an adaptive triangulation (a G 0 planar approximation) of the real components of the algebraic surface, and include both singular points and singular curves on the surface. A curvilinear wireframe is also constructed using minimum bending energy, parametric curves with additionally normals varying along them. The spline approximations over the triangulation or curvilinear wireframe could be one of several forms: either low degree, implicit algebraic splines (triangular A-patches) or multivariate functional B-splines (B-patches) or standardized rational Bernstein-BΓ©zier patches (RBB), or triangular rational B-Splines. The adaptive triangulation is additionally useful for a rapid display and animation of the implicit surface.

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