Pseudo-Isometric Surgery
Metric Geometry
2025-08-01 v1
Abstract
We introduce a type of surgery on metric spaces. This surgery, in some sense, seeks to replace a subspace of a metric space with another metric space via a function . When is a discrete space, this amounts to collapsing the subspace according to the function. This surgery results in a new metric space we denote and there is a natural function induced from . Our primary interest is investigating if properties of the original function are inherited by the induced function . We show that if is a pseudo-isometry then so is . However, for a quasi-isometry, a very natural generalization of a pseudo-isometry that is prevalent in geometric group theory, such a result does not hold.
Keywords
Cite
@article{arxiv.2507.23666,
title = {Pseudo-Isometric Surgery},
author = {Matt Clay and Josh Thompson},
journal= {arXiv preprint arXiv:2507.23666},
year = {2025}
}
Comments
This article replaces arxiv article 2202.05915