Strict comparison in reduced group C*-algebras
Abstract
We prove that for every n≥ 2, the reduced group C*-algebras of the countable free groups C*r(Fn) have strict comparison. Our method works in a general setting: for G in a large family of non-amenable groups, including hyperbolic groups, free products, mapping class groups, right-angled Artin groups etc., we have C*r(G) have strict comparison. This work also has several applications in the theory of C*-algebras including: resolving Leonel Robert's selflessness problem for C*r(G); uniqueness of embeddings of the Jiang-Su algebra Z up to approximate unitary equivalence into C*r(G); full computations of the Cuntz semigroup of C*r(G) and future directions in the C*-classification program.
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