On $C^0$-persistent homology and trees
Algebraic Topology
2022-04-11 v3 Computational Geometry
Abstract
In this paper we give a metric construction of a tree which correctly identifies connected components of superlevel sets of -valued continuous functions on and show that it is possible to retrieve the -persistent diagram from this tree. We revisit the notion of homological dimension previously introduced by Schweinhart and give some bounds for the latter in terms of the upper-box dimension of , thereby partially answering a question of the same author. We prove a quantitative version of the Wasserstein stability theorem valid for regular enough and -H\"older functions and discuss some applications of this theory to random fields and the topology of their superlevel sets.
Cite
@article{arxiv.2012.02634,
title = {On $C^0$-persistent homology and trees},
author = {Daniel Perez},
journal= {arXiv preprint arXiv:2012.02634},
year = {2022}
}
Comments
41 pages