On simplicity of intermediate C*-algebras

Abstract

We prove simplicity of all intermediate C*-algebras C*r()⊂eq B ⊂eq r C(X) in the case of minimal actions of C*-simple groups on compact spaces X. For this, we use the notion of stationary states, recently introduced by Hartman and Kalantar (arXiv:1712.10133v2). We show that the Powers' averaging property holds for the reduced crossed product r A for any action A of a C*-simple group on a unital C*-algebra A, and use it to prove a one-to-one correspondence between stationary states on A and those on r A.