Title of article
Interpolation over arbitrary topology meshes using a two-phase subdivision scheme
Author/Authors
Zheng، نويسنده , , J.، نويسنده , , Cai، نويسنده , , Y.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2006
Pages
10
From page
301
To page
310
Abstract
The construction of a smooth surface interpolating a mesh of arbitrary topological type is an important problem in many
graphics applications. This paper presents a two-phase process, based on a topological modification of the control mesh and a
subsequent Catmull-Clark subdivision, to construct a smooth surface that interpolates some or all of the vertices of a mesh with
arbitrary topology. It is also possible to constrain the surface to have specified tangent planes at an arbitrary subset of the vertices to be
interpolated. The method has the following features: 1) It is guaranteed to always work and the computation is numerically stable,
2) there is no need to solve a system of linear equations and the whole computation complexity is OðKÞ where K is the number of the
vertices, and 3) each vertex can be associated with a scalar shape handle for local shape control. These features make interpolation
using Catmull-Clark surfaces simple and, thus, make the new method itself suitable for interactive free-form shape design.
Keywords
computational geometry and object modeling , Curve , Surface , solid , and object representations , computer-aided engineering , computer-aided design. , Computer graphics
Journal title
IEEE TRANSACTIONS ON VISUALIZATION AND COMPUTER GRAPHICS
Serial Year
2006
Journal title
IEEE TRANSACTIONS ON VISUALIZATION AND COMPUTER GRAPHICS
Record number
401886
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