On completions of Hecke algebras

Abstract

Let G be a reductive p-adic group and let H(G)s be a Bernstein block of the Hecke algebra of G. We consider two important topological completions of H(G)s: a direct summand S(G)s of the Harish-Chandra--Schwartz algebra of G and a two-sided ideal C*r (G)s of the reduced C*-algebra of G. These are useful for the study of all tempered smooth G-representations. We suppose that H(G)s is Morita equivalent to an affine Hecke algebra H(R,q) -- as is known in many cases. The latter algebra also has a Schwartz completion S(R,q) and a C*-completion C*r (R,q), both defined in terms of the underlying root datum R and the parameters q. We prove that, under some mild conditions, a Morita equivalence between H(G)s and H(R,q) extends to Morita equivalences between S(G)s and S(R,q), and between C*r (G)s and C*r (R,q). We also check that our conditions are fulfilled in all known cases of such Morita equivalences between Hecke algebras. This is applied to compute the topological K-theory of the reduced C*-algebra of a classical p-adic group.