Hecke modules for arithmetic groups via bivariant K-theory

Abstract

Let be a lattice in a locally compact group G. In earlier work, we used KK-theory to equip the K-groups of any -C*-algebra on which the commensurator of acts with Hecke operators. When is arithmetic, this gives Hecke operators on the K-theory of certain C*-algebras that are naturally associated with . In this paper, we first study the topological K-theory of the arithmetic manifold associated to . We prove that the Chern character commutes with Hecke operators. Afterwards, we show that the Shimura product of double cosets naturally corresponds to the Kasparov product and thus that the KK-groups associated to an arithmetic group become true Hecke modules. We conclude by discussing Hecke equivariant maps in KK-theory in great generality and apply this to the Borel-Serre compactification as well as various noncommutative compactifications associated with . Along the way we discuss the relation between the K-theory and the integral cohomology of low-dimensional manifolds as Hecke modules.