Twisted cyclic theory, equivariant KK theory and KMS States

Abstract

Recently, examples of an index theory for KMS states of circle actions were discovered, CPR2,CRT. We show that these examples are not isolated. Rather there is a general framework in which we use KMS states for circle actions on a C*-algebra A to construct Kasparov modules and semifinite spectral triples. By using a residue construction analogous to that used in the semifinite local index formula we associate to these triples a twisted cyclic cocycle on a dense subalgebra of A. This cocycle pairs with the equivariant KK-theory of the mapping cone algebra for the inclusion of the fixed point algebra of the circle action in A. The pairing is expressed in terms of spectral flow between a pair of unbounded self adjoint operators that are Fredholm in the semifinite sense. A novel aspect of our work is the discovery of an eta cocycle that forms a part of our twisted residue cocycle. To illustrate our theorems we observe firstly that they incorporate the results in CPR2,CRT as special cases. Next we use the Araki-Woods IIIλ representations of the Fermion algebra to show that there are examples which are not Cuntz-Krieger systems.