On the spectral sequence associated with the Baum-Connes Conjecture for Zn

Abstract

We examine a spectral sequence that is naturally associated with the Baum-Connes Conjecture with coefficients for Zn and also constitutes an instance of Kasparov's construction in his work on equivariant KK-theory. For k≤ n, we give a partial description of the k-th page differential of this spectral sequence, which takes into account the natural Zk-subactions. In the special case that the action is trivial in K-theory, the associated second page differential is given by a formula involving the second page differentials of the canonical Z2-subactions. For n=2, we give a concrete realisation of the second page differential in terms of Bott elements. We prove the existence of Z2-actions, whose associated second page differentials are non-trivial. One class of examples is given by certain outer Z2-actions on Kirchberg algebras, which act trivially on KK-theory. This relies on a classification result by Izumi and Matui. A second class of examples consists of certain pointwise inner Z2-actions. One instance is given as a natural action on the group C*-algebra of the discrete Heisenberg group H3. We also compute the K-theory of the corresponding crossed product. Moreover, a general and concrete construction yields various examples of pointwise inner Z2-actions on amalgamated free product C*-algebras with non-trivial second page differentials. Among these, there are actions which are universal, in a suitable sense, for pointwise inner Z2-actions with non-trivial second page differentials. We also compute the K-theory of the crossed products associated with these universal C*-dynamical systems.