On the classification of irreducible representations of affine Hecke algebras with unequal parameters (1008.0177v3)
Abstract: Let $R$ be a root datum with affine Weyl group $We$, and let $H = H (R,q)$ be an affine Hecke algebra with positive, possibly unequal, parameters $q$. Then $H$ is a deformation of the group algebra $\mathbb C [We]$, so it is natural to compare the representation theory of $H$ and of $We$. We define a map from irreducible $H$-representations to $We$-representations and we show that, when extended to the Grothendieck groups of finite dimensional representations, this map becomes an isomorphism, modulo torsion. The map can be adjusted to a (nonnatural) continuous bijection from the dual space of $H$ to that of $We$. We use this to prove the affine Hecke algebra version of a conjecture of Aubert, Baum and Plymen, which predicts a strong and explicit geometric similarity between the dual spaces of $H$ and $We$. An important role is played by the Schwartz completion $S = S (R,q)$ of $H$, an algebra whose representations are precisely the tempered $H$-representations. We construct isomorphisms $\zeta_\epsilon : S (R,q\epsilon) \to S (R,q)$ $(\epsilon >0)$ and injection $\zeta_0 : S (We) = S (R,q0) \to S (R,q)$, depending continuously on $\epsilon$. Although $\zeta_0$ is not surjective, it behaves like an algebra isomorphism in many ways. Not only does $\zeta_0$ extend to a bijection on Grothendieck groups of finite dimensional representations, it also induces isomorphisms on topological $K$-theory and on periodic cyclic homology (the first two modulo torsion). This proves a conjecture of Higson and Plymen, which says that the $K$-theory of the $C*$-completion of an affine Hecke algebra $H (R,q)$ does not depend on the parameter(s) $q$.