M-Local type conditions for the C*-crossed product and local trajectories

Abstract

The local trajectories method establishes invertibility in algebras B= (A, UG), for a unital C*-algebra A with a non-trivial center, and a unitary group Ug, g∈ G, with G a discrete group, assuming that G is amenable and the action a UgaUg* is topologically free. It is applicable in particular to C*-algebras associated with convolution type operators with amenable groups of shifts. We introduce here an M-local type condition that allows to establish an isomorphism between and a C*-crossed product, which is fundamental for the local trajectories method to work. We replace amenability of G by the more general condition that action is amenable. The influence of the structure of the fixed points of the group action is analysed and a condition is introduced that applies when the action is not topologically free. If A is commutative, the referred conditions are related to the subalgebra (UG) yielding, in particular, a sufficient condition that depends essentially on UG. It is shown that in π(B)= (π(A), π(UG)), with π the local trajectories representation, the M-local type condition is verified, which allows establishing the isomorphism essential for the local trajectories method.