Comparison Properties of the Cuntz semigroup and applications to C*-algebras
Abstract
We study comparison properties in the category Cu aiming to lift results to the C*-algebraic setting. We introduce a new comparison property and relate it to both the CFP and ω-comparison. We show differences of all properties by providing examples, which suggest that the corona factorization property for C*-algebras might allow for both finite and infinite projections. In addition, we show that Rrdam's simple, nuclear C*-algebra with a finite and an infinite projection does not have the CFP.
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