Remarks on the asymptotic Hecke algebra

Abstract

Let G be a split reductive p-adic group. Let H(G) be its Hecke algebra and let C(G)⊃ H(G) be the Harish-Chandra Schwartz algebra. The purpose of this note is to give a spectral interpretation of Lusztig's asymptotic Hecke algebra J (which contains the Iwahori part of H(G) as a subalgebra), which shows that J is a subalgebra of C (G). This spectral description also allows to define a version of J beyond the Iwahori component - i.e. we define certain subalgebra J(G) of C(G) which contains H(G). We explain a relation between J(G) and the Schwartz space of the basic affine space studied by us about 20 years ago.