期刊
ACM TRANSACTIONS ON GRAPHICS
卷 37, 期 6, 页码 -出版社
ASSOC COMPUTING MACHINERY
DOI: 10.1145/3272127.3275007
关键词
Mobius transformations; mesh subdivision; conformal transformations; regular meshes; architectural geometry
资金
- Austrian Science Fund (FWF) [P 29981, I 2978-N35]
- Israel Science Foundation [1869/15, 2102/15]
We present a novel framework for creating Mobius-invariant subdivision operators with a simple conversion of existing linear subdivision operators. By doing so, we create a wide variety of subdivision surfaces that have properties derived from Mbbius geometry; namely, reproducing spheres, circular arcs, and Mobius regularity. Our method is based on establishing a canonical form for each 1-ring in the mesh, representing the class of all 1-rings that are Mbbius equivalent to that 1-ring. We perform a chosen linear subdivision operation on these canonical forms, and blend the positions contributed from adjacent 1-rings, using two novel Mobius-invariant operators, into new face and edge points. The generality of the method allows for easy coarse-to-fine mesh editing with diverse polygonal patterns, and with exact reproduction of circular and spherical features. Our operators are in closed-form and their computation is as local as the computation of the linear operators they correspond to, allowing for efficient subdivision mesh editing and optimization.
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