Flat bundles, von Neumann algebras and K-theory with /-coefficients

Abstract

Let M be a closed manifold and α : π1(M) Un a representation. We give a purely K-theoretic description of the associated element [α] in the K-theory of M with /-coefficients. To that end, it is convenient to describe the /-K-theory as a relative K-theory with respect to the inclusion of in a finite von Neumann algebra B. We use the following fact: there is, associated with α, a finite von Neumann algebra B together with a flat bundle M with fibers B, such that E is canonically isomorphic with n , where Eα denotes the flat bundle with fiber n associated with α. We also discuss the spectral flow and rho type description of the pairing of the class [α] with the K-homology class of an elliptic selfadjoint (pseudo)-differential operator D of order 1.