English

Sampling Conditions for Conforming Voronoi Meshing by the VoroCrust Algorithm

Computational Geometry 2018-04-17 v2

Abstract

We study the problem of decomposing a volume bounded by a smooth surface into a collection of Voronoi cells. Unlike the dual problem of conforming Delaunay meshing, a principled solution to this problem for generic smooth surfaces remained elusive. VoroCrust leverages ideas from α\alpha-shapes and the power crust algorithm to produce unweighted Voronoi cells conforming to the surface, yielding the first provably-correct algorithm for this problem. Given an ϵ\epsilon-sample on the bounding surface, with a weak σ\sigma-sparsity condition, we work with the balls of radius δ\delta times the local feature size centered at each sample. The corners of this union of balls are the Voronoi sites, on both sides of the surface. The facets common to cells on opposite sides reconstruct the surface. For appropriate values of ϵ\epsilon, σ\sigma and δ\delta, we prove that the surface reconstruction is isotopic to the bounding surface. With the surface protected, the enclosed volume can be further decomposed into an isotopic volume mesh of fat Voronoi cells by generating a bounded number of sites in its interior. Compared to state-of-the-art methods based on clipping, VoroCrust cells are full Voronoi cells, with convexity and fatness guarantees. Compared to the power crust algorithm, VoroCrust cells are not filtered, are unweighted, and offer greater flexibility in meshing the enclosed volume by either structured grids or random samples.

Keywords

Cite

@article{arxiv.1803.06078,
  title  = {Sampling Conditions for Conforming Voronoi Meshing by the VoroCrust Algorithm},
  author = {Ahmed Abdelkader and Chandrajit L. Bajaj and Mohamed S. Ebeida and Ahmed H. Mahmoud and Scott A. Mitchell and John D. Owens and Ahmad A. Rushdi},
  journal= {arXiv preprint arXiv:1803.06078},
  year   = {2018}
}

Comments

polished up version, results essentially unchanged

R2 v1 2026-06-23T00:55:05.468Z