Tracial stability for C*-algebras
Abstract
We consider tracial stability, which requires that tuples of elements of a C*-algebra with a trace that nearly satisfy the relation are close to tuples that actually satisfy the relation. Here both "near" and "close" are in terms of the associated 2-norm from the trace, e.g., the Hilbert-Schmidt norm for matrices. Precise definitions are stated in terms of liftings from tracial ultraproducts of C*-algebras. We completely characterize matricial tracial stability for nuclear C*-algebras in terms of certain approximation properties for traces. For non-nuclear -algebras we find new obstructions for stability by relating it to Voiculescu's free entropy dimension. We show that the class of C*-algebras that are stable with respect to tracial norms on real-rank-zero C*-algebras is closed under tensoring with commutative C*-algebras. We show that is tracially stable with respect to tracial norms on all -algebras if and only if is approximately path-connected.
Keywords
Cite
@article{arxiv.1607.04470,
title = {Tracial stability for C*-algebras},
author = {Don Hadwin and Tatiana Shulman},
journal= {arXiv preprint arXiv:1607.04470},
year = {2017}
}