English

Critical edges in Rips complexes and persistence

Algebraic Topology 2024-11-13 v1 Geometric Topology Metric Geometry

Abstract

We consider persistent homology obtained by applying homology to the open Rips filtration of a compact metric space (X,d)(X,d). We show that each decrease in zero-dimensional persistence and each increase in one-dimensional persistence is induced by local minima of the distance function dd. When dd attains local minimum at only finitely many pairs of points, we prove that each above mentioned change in persistence is induced by a specific critical edge in Rips complexes, which represents a local minimum of dd. We use this fact to develop a theory (including interpretation) of critical edges of persistence. The obtained results include upper bounds for the rank of one-dimensional persistence and a corresponding reconstruction result. Of potential computational interest is a simple geometric criterion recognizing local minima of dd that induce a change in persistence. We conclude with a proof that each locally isolated minimum of dd can be detected through persistent homology with selective Rips complexes. The results of this paper offer the first interpretation of critical scales of persistent homology (obtained via Rips complexes) for general compact metric spaces.

Keywords

Cite

@article{arxiv.2304.05185,
  title  = {Critical edges in Rips complexes and persistence},
  author = {Peter Goričan and Žiga Virk},
  journal= {arXiv preprint arXiv:2304.05185},
  year   = {2024}
}

Comments

20 pages, 5 figures

R2 v1 2026-06-28T09:59:35.205Z