A secondary pairing between K-theory and K-homology, relative eta invariants, and zeta maps

Abstract

The K-homology groups of a C*-algebra are receptacles for information from topology, operator algebra theory, and representation theory. For applications, one often wants to know if two K-homology classes are the same: the simplest way to deduce this is typically via the `primary' pairing between K-homology and the dual theory (K-theory). However, this pairing will typically miss some information: for example, it cannot detect torsion elements of K-homology. In this paper, we introduce a `secondary' pairing between subgroups of K-homology and K-theory that takes values in Q/Z. In good cases we show that this pairing will detect all the classes in K-homology that are missed by the primary pairing. We then relate our secondary pairing to the relative eta invariants of Atiyah-Patodi-Singer, and to the Thomsen exact sequence and zeta maps from C*-algebra classification theory.