Nuclear and type I crossed products of C*-algebras by group and compact quantum group actions

Abstract

If A is a C*-algebra, G a locally compact group, K⊂G a compact subgroup and α:GAut(A) a continuous homomorphism, let AxαG denote the crossed product. In this paper we prove that AxαG is nuclear (respectively type I or liminal) if and only if certain hereditary C*-subalgebras, Sπ, Iπ⊂AxαG π∈K, are nuclear (respectively type I or liminal). These algebras are the analogs of the algebras of spherical functions considered by R. Godement for groups with large compact subgroups. If K=G is a compact group or a compact quantum group, the algebras Sπ are stably isomorphic with the fixed point algebras AB(Hπ)αadπ where Hπ is the Hilbert space of the representation π.