Winding Numbers on Discrete Surfaces

Nicole Feng, M. Gillespie, Keenan Crane
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引用次数: 1

Abstract

In the plane, the winding number is the number of times a curve wraps around a given point. Winding numbers are a basic component of geometric algorithms such as point-in-polygon tests, and their generalization to data with noise or topological errors has proven valuable for geometry processing tasks ranging from surface reconstruction to mesh booleans. However, standard definitions do not immediately apply on surfaces, where not all curves bound regions. We develop a meaningful generalization, starting with the well-known relationship between winding numbers and harmonic functions. By processing the derivatives of such functions, we can robustly filter out components of the input that do not bound any region. Ultimately, our algorithm yields (i) a closed, completed version of the input curves, (ii) integer labels for regions that are meaningfully bounded by these curves, and (iii) the complementary curves that do not bound any region. The main computational cost is solving a standard Poisson equation, or for surfaces with nontrivial topology, a sparse linear program. We also introduce special basis functions to represent singularities that naturally occur at endpoints of open curves.
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离散曲面上的圈数
在平面中,圈数是曲线绕给定点旋转的次数。圈数是多边形点测试等几何算法的基本组成部分,其对具有噪声或拓扑错误的数据的泛化已被证明在从曲面重构到网格布尔的几何处理任务中具有价值。然而,标准定义不能立即适用于曲面,因为不是所有的曲线都限定了区域。我们从众所周知的圈数和调和函数之间的关系开始,提出了一个有意义的推广。通过处理这些函数的导数,我们可以鲁棒地滤除输入中不绑定任何区域的分量。最终,我们的算法产生(i)输入曲线的封闭、完整版本,(ii)被这些曲线有意义地限定的区域的整数标签,以及(iii)不限定任何区域的互补曲线。主要的计算成本是解决一个标准泊松方程,或者对于具有非平凡拓扑的曲面,一个稀疏线性程序。我们还引入了特殊的基函数来表示在开放曲线的端点自然出现的奇点。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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