Finite approximation properties of $C^{*}$-modules III
Abstract
We introduce and study a notion of module nuclear dimension for a -algebra which is -module over another -algebra with compatible actions. We show that the module nuclear dimension of is zero if is -NF. The converse is shown to hold when is a -algebra with simple fibers, with compact and totally disconnected. We also introduce a notion of module decomposition rank, and show that when is unital and simple, if the module decomposition rank of is finite then is -QD. We study the set of -valued module traces on and relate the Cuntz semigroup of with lower semicontinuous affine functions on the set . Along the way, we also prove a module Choi-Effros lifting theorem. We give estimates of the module nuclear dimension for a class of examples.
Keywords
Cite
@article{arxiv.2208.05658,
title = {Finite approximation properties of $C^{*}$-modules III},
author = {Massoud Amini},
journal= {arXiv preprint arXiv:2208.05658},
year = {2023}
}