The relative radius of comparison of the crossed product of a non-unital C*-algebra by a finite group

Abstract

In this paper, we prove results on the relative radius of comparison of C*-algebras and their crossed products, focusing on the non-unital setting. More precisely, let A be a stably finite simple non-type-I (not necessarily unital) C*-algebra, let G be a finite group, and let α G Aut (A) be an action which has the weak tracial Rokhlin property. Let a be a non-zero positive element in Aα K. Then we show that the radius of comparison of Cu (Aα) relative to [a] is bounded above by the radius of comparison of Cu (A) relative to [a]. If further A is exact and a is in the Pedersen ideal of Aα K, then the radius of comparison of Cu (Aα G) relative to [a] is equal to its radius of comparison relative to [p· a], scaled by 1/|G|, where p is the averaging projection in the multiplier algebra of (A K) α id G. Moreover, the radius of comparison of Cu (Aα G) relative to [a] is bounded above by 1/|G| times the radius of comparison of Cu (A) relative to [a]. We also prove that the inclusion of Aα in A induces an isomorphism from the purely positive part of the Cuntz semigroup Cu (Aα) to the fixed point of the purely positive part of Cu (A). An important consequence of our results is that they apply to non-unital C*-algebras and give new insights into comparison theory of C*-algebras and their crossed products.