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Abstract
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We prove that every stably projectionless separable simple amenable
-algebra
in the UCT class has rationally generalized tracial rank one. Following Elliott’s
earlier work, we show that the Elliott invariant of any finite separable simple
-algebra
with finite nuclear dimension can always be described as a scaled simple
ordered group pairing together with a countable abelian group (which unifies
the unital and nonunital, as well as stably projectionless cases). We also
show that, for any given such invariant set, there is a finite separable simple
-algebra
whose Elliott invariant is the given set, a refinement of the range
theorem of Elliott. In the stably projectionless case, modified model
-algebras
are constructed in such a way that they are of generalized tracial rank one and have
other technical features.
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Keywords
classification of simple $C^*$-algebras
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Mathematical Subject Classification
Primary: 46L35
Secondary: 46L05
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Milestones
Received: 25 April 2021
Revised: 31 January 2022
Accepted: 17 February 2022
Published: 13 September 2022
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