A rigidity framework for Roe-like algebras
Abstract
In this memoir we develop a framework to study rigidity problems for Roe-like C*-algebras of countably generated coarse spaces. The main goal is to give a complete and self-contained solution to the problem of C*-rigidity for proper (extended) metric spaces. Namely, we show that (stable) isomorphisms among Roe algebras always give rise to coarse equivalences. The material is organized as to provide a unified proof of C*-rigidity for Roe algebras, algebras of operators of controlled propagation, and algebras of quasi-local operators. We also prove a more refined C*-rigidity statement which has several additional applications. For instance, we can put the correspondence between coarse geometry and operator algebras in a categorical framework, and we prove that the outer automorphism groups of these C*-algebras are all isomorphic to the group of coarse equivalences of the coarse space.
Keywords
Cite
@article{arxiv.2403.13624,
title = {A rigidity framework for Roe-like algebras},
author = {Diego Martínez and Federico Vigolo},
journal= {arXiv preprint arXiv:2403.13624},
year = {2025}
}
Comments
The exposition of the material has been reorganized to a memoir form. More details and examples have been added, some minor issues have been addressed. 108 pages