The radius of comparison of the crossed product by a tracially strictly approximately inner action

Abstract

Let G be a finite group, let A be an infinite-dimensional stably finite simple unital C*-algebra, and let α G Aut (A) be a tracially strictly approximately inner action of G on A. Then the radius of comparison satisfies rc (A) ≤ rc ( C*(G, A, α) ) and if C*(G, A, α) is simple, then rc (A) ≤ rc ( C*(G, A, α) ) ≤ rc (Aα). Further, the inclusion of A in C*(G, A, α) induces an isomorphism from the purely positive part of the Cuntz semigroup Cu (A) to its image in Cu (C*(G, A, α)). If α is strictly approximately inner, then in fact Cu (A) Cu (C*(G, A, α) ) is an ordered semigroup isomorphism onto its range. Also, for every finite group G and for every η ∈ (0, 1card (G)), we construct a simple separable unital AH algebra A with stable rank one and a strictly approximately inner action α G Aut (A) such that: (1) α is pointwise outer and doesn't have the weak tracial Rokhlin property. (2) rc (A) =rc (C*(G, A, α))= η.