Structure and K-theory of crossed products by proper actions

Abstract

We study the C*-algebra crossed product C0(X) G of a locally compact group G acting properly on a locally compact Hausdorff space X. Under some mild extra conditions, which are automatic if G is discrete or a Lie group, we describe in detail, and in terms of the action, the primitive ideal space of such crossed products as a topological space, in particular with respect to its fibring over the quotient space G X. We also give some results on the -theory of such C*-algebras. These more or less compute the -theory in the case of isolated orbits with non-trivial (finite) stabilizers. We also give a purely -theoretic proof of a result due to Paul Baum and Alain Connes on ()-theory with complex coefficients of crossed products by finite groups.