Amenability and weak containment for actions of locally compact groups on C*-algebras

Abstract

In this work we introduce and study a new notion of amenability for actions of locally compact groups on C*-algebras. Our definition extends the definition of amenability for actions of discrete groups due to Claire Anantharaman-Delaroche. We show that our definition has several characterizations and permanence properties analogous to those known in the discrete case. For example, for actions on commutative C*-algebras, we show that our notion of amenability is equivalent to measurewise amenability. Combined with a recent result of Alex Bearden and Jason Crann, this also settles a long standing open problem about the equivalence of topological amenability and measurewise amenability for a second countable G-space X. We use our new notion of amenability to study when the maximal and reduced crossed products agree. One of our main results generalizes a theorem of Matsumura: we show that for an action of an exact locally compact group G on a locally compact space X the full and reduced crossed products C0(X) G and C0(X)red G coincide if and only if the action of G on X is amenable. We also show that the analogue of this theorem does not hold for actions on noncommutative C*-algebras. Finally, we study amenability as it relates to more detailed structure in the case of C*-algebras that fibre over an appropriate G-space X, and the interaction of amenability with various regularity properties such as nuclearity, exactness, and the (L)LP, and the equivariant versions of injectivity and the WEP.