On Braverman-Kazhdan's asymptotic Hecke algebra for inner forms of GLn

Abstract

We study Braverman-Kazhdan's asymptotic Hecke algebra J(G) for inner forms G of p-adic GLn. We show that J(G) and the property for a G-representation to extend to a J(G)-module are defined over Q, and hence make sense in the context of the categorical local Langlands correspondence. We show a rudimentary form of compatibility with Hecke operators, allowing us discuss stalks of sheaves on Bunn corresponding to the trivial vector bundles on the stack of L-parameters, in particular the Whittaker sheaf, in terms of J(GLn)-modules. We provide explicit formulas in terms of reductive centralizer of L-parameters for many functions in J(G), and show that J(G) has the same Hochschild homology as Cc∞(G), and that the Kazhdan-Lusztig bijection appears in the isomorphism. We proceed via Bushnell-Kutzko and Sécherre-Stevens types, generalizing a theorem of Suzuki for GLn for which we provide a proof.