Inclusions of C*-algebras arising from fixed-point algebras

Abstract

We examine inclusions of C*-algebras of the form AH ⊂eq A r G, where G and H are groups acting on a unital simple C*-algebra A by outer automorphisms and H is finite. It follows from a theorem of Izumi that AH ⊂eq A is C*-irreducible, in the sense that all intermediate C*-algebras are simple. We show that AH ⊂eq A r G is C*-irreducible for all G and H as above if and only if G and H have trivial intersection in the outer automorphisms of A, and we give a Galois type classification of all intermediate C*-algebras in the case when H is abelian and the two actions of G and H on A commute. We illustrate these results with examples of outer group actions on the irrational rotation C*-algebras. We exhibit, among other examples, C*-irreducible inclusions of AF-algebras that have intermediate C*-algebras that are not AF-algebras, in fact, the irrational rotation C*-algebra appears as an intermediate C*-algebra.