A non-stable C*-algebra with an elementary essential composition series
Abstract
A C*-algebra is said to be stable if it is isomorphic to . Hjelmborg and R\o rdam have shown that countable inductive limits of separable stable C*-algebras are stable. We show that this is no longer true in the nonseparable context even for the most natural case of an uncountable inductive limit of an increasing chain of separable stable and AF ideals: we construct a GCR, AF (in fact, scattered) subalgebra of , which is the inductive limit of length of its separable stable ideals () satisfying for each , while is not stable. The sequence is the GCR composition series of which in this case coincides with the Cantor-Bendixson composition series as a scattered C*-algebra. has the property that all of its proper two-sided ideals are listed as s for some and therefore the family of stable ideals of has no maximal element. By taking we obtain a stable C*-algebra with analogous composition series whose ideals s are isomorphic to s for each . In particular, there are nonisomorphic scattered C*-algebras whose GCR composition series satisfy for all , for which the composition series differ first at .
Keywords
Cite
@article{arxiv.1712.02090,
title = {A non-stable C*-algebra with an elementary essential composition series},
author = {Saeed Ghasemi and Piotr Koszmider},
journal= {arXiv preprint arXiv:1712.02090},
year = {2017}
}