Saved in:
Bibliographic Details
Main Authors: Ali, Mujtaba, Needham, Tom, Stefanou, Anastasios, Zhou, Ling
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2601.16947
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866909999205187584
author Ali, Mujtaba
Needham, Tom
Stefanou, Anastasios
Zhou, Ling
author_facet Ali, Mujtaba
Needham, Tom
Stefanou, Anastasios
Zhou, Ling
contents The Isometry Theorem of Chazal et al. and Lesnick is a fundamental result in persistence theory, which states that the interleaving distance between two one-parameter persistence modules is equal to the bottleneck distance between their barcodes. Significant effort has been devoted to extending this result to modules defined over more general posets. As these modules do not generally admit nice decompositions, one must restrict attention to the class of interval-decomposable modules in order to define an appropriate notion of bottleneck distance. Even with this assumption, it is known that bottleneck distance may not be equivalent to interleaving distance, but that it is Lipschitz stable under certain, fairly restrictive, assumptions. In this paper, we consider the more basic question of stability of the Hausdorff distance with respect to interleaving distance for interval-decomposable modules. Our main theorem is a Lipschitz stability result, which holds in a fairly general setting of interval-decomposable modules over arbitrary posets, where intervals are assumed to be taken from any family satisfying certain closure conditions. Along the way, we develop some new tools and results for interval-decomposable modules over arbitrary posets, in the form of geometrically-flavored characterizations of the existence of morphisms and interleavings between interval modules.
format Preprint
id arxiv_https___arxiv_org_abs_2601_16947
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle On the Hausdorff stability of barcodes over posets
Ali, Mujtaba
Needham, Tom
Stefanou, Anastasios
Zhou, Ling
Algebraic Topology
The Isometry Theorem of Chazal et al. and Lesnick is a fundamental result in persistence theory, which states that the interleaving distance between two one-parameter persistence modules is equal to the bottleneck distance between their barcodes. Significant effort has been devoted to extending this result to modules defined over more general posets. As these modules do not generally admit nice decompositions, one must restrict attention to the class of interval-decomposable modules in order to define an appropriate notion of bottleneck distance. Even with this assumption, it is known that bottleneck distance may not be equivalent to interleaving distance, but that it is Lipschitz stable under certain, fairly restrictive, assumptions. In this paper, we consider the more basic question of stability of the Hausdorff distance with respect to interleaving distance for interval-decomposable modules. Our main theorem is a Lipschitz stability result, which holds in a fairly general setting of interval-decomposable modules over arbitrary posets, where intervals are assumed to be taken from any family satisfying certain closure conditions. Along the way, we develop some new tools and results for interval-decomposable modules over arbitrary posets, in the form of geometrically-flavored characterizations of the existence of morphisms and interleavings between interval modules.
title On the Hausdorff stability of barcodes over posets
topic Algebraic Topology
url https://arxiv.org/abs/2601.16947