A Sparse Delaunay Filtration
Abstract
We show how a filtration of Delaunay complexes can be used to approximate the persistence diagram of the distance to a point set in . Whereas the full Delaunay complex can be used to compute this persistence diagram exactly, it may have size . In contrast, our construction uses only simplices. The central idea is to connect Delaunay complexes on progressively denser subsamples by considering the flips in an incremental construction as simplices in dimensions. This approach leads to a very simple and straightforward proof of correctness in geometric terms, because the final filtration is dual to a -dimensional Voronoi construction similar to the standard Delaunay filtration complex. We also, show how this complex can be efficiently constructed.
Keywords
Cite
@article{arxiv.2012.01947,
title = {A Sparse Delaunay Filtration},
author = {Donald R. Sheehy},
journal= {arXiv preprint arXiv:2012.01947},
year = {2020}
}
Comments
23 pages 4 figures