Divisibility and Real Rank Zero
Abstract
Let be a simple separable exact -algebra that has traces. We show the following existed regularity properties are equivalent: \quad(1) has real rank zero, where is the trace kernel ideal. \quad(2) is tracially almost divisible. \quad(3) is tracially -almost divisible for some \quad(4) has tracial approximate oscillation zero. \quad(5) has Property (TM). We also show that for an algebraically simple separable stable rank one \CA\ with non-empty compact and locally finite nuclear dimension, its uniform tracial completion is hyperfinite, type and isomorphic to . Furthermore, is pure, has real rank zero and stable rank one, and satisfies Consequently, every simple separable unital diagonal AH-algebra (e.g. Villadsen algebras of the first type) has the following tracial strict comparison: For every if holds for all traces then there is a sequence such that
Cite
@article{arxiv.2605.21655,
title = {Divisibility and Real Rank Zero},
author = {Xuanlong Fu},
journal= {arXiv preprint arXiv:2605.21655},
year = {2026}
}
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30 pages