RANKS OF SOFT OPERATORS IN NOWHERE SCATTERED C∗-ALGEBRAS
Artikel i vetenskaplig tidskrift, 2025
We show that for C∗-algebras with the global Glimm property, the rank of every operator can be realized as the rank of a soft operator, that is, an element whose hereditary sub-C∗-algebra has no nonzero, unital quotients. This implies that the radius of comparison of such a C∗-algebra is determined by the soft part of its Cuntz semigroup. Under a mild additional assumption, we show that every Cuntz class dominates a (unique) largest soft Cuntz class. This defines a retract from the Cuntz semigroup onto its soft part, and it follows that the covering dimensions of these semigroups differ by at most 1.
rank of operator
the global Glimm property
dimension function
soft operators
C*-algebras
Cuntz semigroup
quasitrace
scatteredness
Författare
M. Ali Asadi-Vasfi
Fields Institute
University of Toronto
Hannes Thiel
Göteborgs universitet
Chalmers, Matematiska vetenskaper, Analys och sannolikhetsteori
Eduard Vilalta Vila
Göteborgs universitet
Chalmers, Matematiska vetenskaper, Analys och sannolikhetsteori
Publicerad i
Journal of the Institute of Mathematics of Jussieu
1474-7480 (ISSN) 1475-3030 (eISSN)
Vol. 24 Nummer/häfte 2 s. 371-410Kategorisering
Ämneskategorier (SSIF 2011)
Algebra och logik
Identifikatorer
DOI
10.1017/S1474748024000318